Imported Upstream version 8.2~beta4+dfsgupstream/8.2.beta4+dfsg

314 files changed, 16600 insertions, 105628 deletions

diff --git a/CHANGES b/CHANGES
index 675db3f1..01a81554 100644
--- a/CHANGES
+++ b/CHANGES
@@ -21,10 +21,16 @@ Language
 - Several evolutions of the module system (handling of module aliases, 
   functorial module types, an Include feature, etc). (TODO: Say more!)
 - Prop now a subtype of Set (predicative and impredicative forms).
+- Recursive inductive types in Prop with a single constructor of which
+  all arguments are in Prop is now considered to be a singleton
+  type. It consequently supports all eliminations to Prop, Set and Type.
+  As a consequence, Acc_rect has now a more direct proof [possible source
+  of easily fixed incompatibility in case of manual definition of a recursor
+  in a recursive singleton inductive type].
 
 Vernacular commands
 
-- Added option Global to "Arguments Scope" for section surviving. (DOC TODO)
+- Added option Global to "Arguments Scope" for section surviving.
 - Added option "Unset Elimination Schemes" to deactivate the automatic
   generation of elimination schemes.
 - Modification of the Scheme command so you can ask for the name to be
@@ -51,6 +57,8 @@ Vernacular commands
   that should be expanded first.
 - New command "Print Assumptions" to display all variables, parameters
   or axioms a theorem or definition relies on.
+- "Add Rec LoadPath" now provides references to libraries using partially
+  qualified names (this holds also for coqtop/coqc option -R).
 
 Libraries (DOC TO CHECK)
 
@@ -146,6 +154,8 @@ Libraries (DOC TO CHECK)
   descriptions: Epsilon.v, Description.v and IndefiniteDescription.v.
 - Definition of pred and minus made compatible with the structural
   decreasing criterion for use in fixpoints.
+- Files Relations/Rstar.v and Relations/Newman.v moved out to the user
+  contribution repository (contribution CoC_History).
 
 Notations, coercions, implicit arguments and type inference
 
@@ -174,6 +184,8 @@ Tactic Language
 
 - Second-order pattern-matching now working in Ltac "match" clauses
   (syntax for second-order unification variable is "@?X").
+- (?X ?Y) patterns now match any application instead of only unary 
+  applications (possible source of incompatibility).
 - Ltac accepts integer arguments (syntax is "ltac:nnn" for nnn an integer).
 - The general sequence tactical "expr_0 ; [ expr_1 | ... | expr_n ]"
   is extended so that at most one expr_i may have the form "expr .."
@@ -194,6 +206,7 @@ Tactic Language
   "let ... in ..." into a lazy one.
 - Patterns for hypotheses types in "match goal" are now interpreted in
   type_scope.
+- New printing of Ltac call trace for better debugging.
 
 Tactics
 
@@ -239,6 +252,9 @@ Tactics
   * "rewrite 3?A" means rewriting A at most three times.
   * "rewrite ?A" means rewriting A as long as possible (possibly never).
   * many of the above extensions can be combined with each other.  
+- Introduction patterns better respect the structure of context in presence of
+  missing or extra names in nested disjunction-conjunction patterns [possible 
+  source of rare incompatibilities].
 - New syntax "rename a into b, c into d" for "rename a into b; rename c into d"
 - New tactics "dependent induction/destruction H [ generalizing id_1 .. id_n ]"
   to do induction-inversion on instantiated inductive families à la BasicElim.
@@ -250,6 +266,7 @@ Tactics
 - Tactic "apply" now able to traverse conjunctions and to select the first 
   matching lemma among the components of the conjunction; tactic apply also
   able to apply lemmas of conclusion an empty type.
+- Tactic "apply" now supports application of several lemmas in a row.
 - Tactics "set" and "pose" can set functions using notation "(f x1..xn := c)".
 - New tactic "instantiate" (without argument).
 - Tactic firstorder "with" and "using" options have their meaning swapped for
@@ -268,6 +285,7 @@ Tactics
   now obsolete.
 - Tactics f_equal is now done in ML instead of Ltac: it now works on any 
   equality of functions, regardless of the arity of the function.
+- New options "before id", "at top", "at bottom" for tactics "move"/"intro".
 - Some more debug of reflexive omega (romega), and internal clarifications. 
   Moreover, romega now has a variant "romega with *" that can be also used
   on non-Z goals (nat, N, positive) via a call to a translation tactic named
@@ -275,6 +293,8 @@ Tactics
   independantly of romega. 
 - Tactic "remember" now supports an "in" clause to remember only selected 
   occurrences of a term.
+- Tactic "pose proof" supports name overwriting in case of specialization of an
+  hypothesis.
 
 Program
 
@@ -283,13 +303,11 @@ Program
   programming (id, apply, flip...)
 - More robust obligation handling, dependent pattern-matching and
   well-founded definitions.
-- New syntax " dest term as pat in term " for destructing objects using
-  an irrefutable pattern while keeping equalities (use this instead of 
-  "let" in Programs).
 - Program CoFixpoint is accepted, Program Fixpoint uses the new way to infer 
   which argument decreases structurally.
 - Program Lemma, Axiom etc... now permit to have obligations in the statement 
   iff they can be automatically solved by the default tactic.
+- Renamed "Obligations Tactic" command to "Obligation Tactic".
 - New command "Preterm [ of id ]" to see the actual term fed to Coq for
   debugging purposes.
 - New option "Transparent Obligations" to control the declaration of 
@@ -403,6 +421,8 @@ CoqIDE
 Tools
 
 - New stand-alone .vo files verifier "coqchk".
+- Extended -I coqtop/coqc option to specify a logical dir: "-I dir -as coqdir".
+- New coqtop/coqc option -exclude-dir to exclude subdirs for option -R.
 
 Miscellaneous
 
@@ -413,6 +433,7 @@ Miscellaneous
 - Syntax of "Test Printing Let ref" and "Test Printing If ref" changed into
   "Test Printing Let for ref" and "Test Printing If for ref".
 - An overhauled build system (new Makefiles); see dev/doc/build-system.txt
+- Add -browser option to configure script
 
 Changes from V8.1gamma to V8.1
 ==============================
diff --git a/COMPATIBILITY b/COMPATIBILITY
index b44f344d..d85a5f3f 100644
--- a/COMPATIBILITY
+++ b/COMPATIBILITY
@@ -39,6 +39,10 @@ Tactics
   the names in the brackets are synchronized so that H denotes the same
   hypothesis in every subgoal.
 
+- Application patterns with a meta variable in function position (?X ?Y) now
+  match arbitrary applications as expected. Use a nested 
+  [match X with (_ _) => fail 1 | _ => ..] to recover the old semantics.
+
 - Some bug fixes may lead to incompatibilities (see CHANGES for a detailed
   account).
 
diff --git a/doc/INSTALL b/INSTALL.doc
index 9223a41b..3eb72e08 100644
--- a/doc/INSTALL
+++ b/INSTALL.doc
@@ -15,12 +15,7 @@ html files are generated.
 Prerequisite
 ------------
 
-To produce the documents, you need the coqtop, coq-tex, coqdoc and
-gallina tools, with same version number as the current
-documentation. These four tools normally come with any basic Coq
-installation.
-
-In addition, to produce the PostScript documents, the following tools
+To produce the PostScript documents, the following tools
 are needed:
 
   - latex (latex2e)
@@ -38,26 +33,47 @@ To produce the html documents, the following tools are needed:
 
   - hevea (e.g. 1.07 works)
 
-To produce the documentation of the standard library, a source copy of
-the coq distribution is needed.
-
 Compilation
 -----------
 
-To produce all PostScript documents, do:                make all-ps
-To produce all PDF documents, do:                       make all-pdf
-To produce all html documents, do:                      make all-html
-To produce all formats of the Reference Manual, do:     make refman
-To produce all formats of the Tutorial, do:             make tutorial
-To produce all formats of the Coq Standard Library, do: make stdlib
-To produce all formats of the FAQ, do:                  make faq
+To produce all documentation about Coq, just run:
+
+   make doc
+
+
+Alternatively, you can use some specific targets:
+
+   make doc-ps 
+   	to produce all PostScript documents
+
+   make doc-pdf
+        to produce all PDF documents
+
+   make doc-html
+        to produce all html documents
+
+   make refman
+        to produce all formats of the reference manual
+
+   make tutorial
+        to produce all formats of the tutorial
+
+   make rectutorial
+        to produce all formats of the tutorial on recursive types
+
+   make faq
+        to produce all formats of the FAQ
+
+   make stdlib
+   	to produce all formats of the Coq standard library 
+
 
 Installation
 ------------
 
 To install all produced documents, do:
 
-  make DOCDIR=/some/directory/for/documentation install
+  make DOCDIR=/some/directory/for/documentation install-doc
 
 DOCDIR defauts to /usr/share/doc/coq-x.y were x.y is the version number
 
diff --git a/Makefile b/Makefile
index 0cbc0f1c..1f770724 100644
--- a/Makefile
+++ b/Makefile
@@ -6,7 +6,7 @@
 #         #       GNU Lesser General Public License Version 2.1       #
 #######################################################################
 
-# $Id: Makefile 11029 2008-06-01 19:39:44Z herbelin $ 
+# $Id: Makefile 11309 2008-08-06 10:30:35Z herbelin $ 
 
 
 # Makefile for Coq
@@ -180,7 +180,6 @@ archclean: clean-ide cleantheories
 	rm -f bin/parser.opt$(EXE) bin/coq-interface.opt$(EXE)
 	find . -name '*.cmx' -or -name '*.cmxa' -or -name '*.[soa]' | xargs rm -f
 	rm -f $(TOOLS)
-	rm -f $(MINICOQ)
 
 clean-ide:
 	rm -f $(COQIDECMO) $(COQIDECMX) $(COQIDECMO:.cmo=.cmi) $(COQIDEBYTE) $(COQIDEOPT) $(COQIDE)
diff --git a/Makefile.build b/Makefile.build
index e759aafe..a5bae4ea 100644
--- a/Makefile.build
+++ b/Makefile.build
@@ -6,7 +6,7 @@
 #         #       GNU Lesser General Public License Version 2.1       #
 #######################################################################
 
-# $Id: Makefile.build 11174 2008-06-25 17:13:26Z notin $ 
+# $Id: Makefile.build 11309 2008-08-06 10:30:35Z herbelin $ 
 
 
 # Makefile for Coq
@@ -36,7 +36,12 @@ NOARG: world
 # build and install the three subsystems: coq, coqide, pcoq
 world: revision coq coqide pcoq
 
+ifeq ($(WITHDOC),all)
 install: install-coq install-coqide install-pcoq install-doc
+else
+install: install-coq install-coqide install-pcoq
+endif
+
 #install-manpages: install-coq-manpages install-pcoq-manpages
 
 ###########################################################################
@@ -491,7 +496,7 @@ install-pcoq-manpages:
 # tests
 ###########################################################################
 
-check:: world pcoq
+check:: world
 	cd test-suite; \
 	env COQBIN=../bin COQLIB=.. ./check -$(BEST) | tee check.log
 	if grep -F 'Error!' test-suite/check.log ; then false; fi
@@ -601,14 +606,6 @@ $(COQDOC): $(COQDOCCMO)
 	$(HIDE)$(OCAMLC) $(BYTEFLAGS) -custom -o $@ str.cma unix.cma $(COQDOCCMO)
 
 ###########################################################################
-# minicoq
-###########################################################################
-
-$(MINICOQ): $(MINICOQCMO)
-	$(SHOW)'OCAMLC -o $@'
-	$(HIDE)$(OCAMLC) $(BYTEFLAGS) -custom -o $@ $(CMA) $(MINICOQCMO) $(OSDEPLIBS)
-
-###########################################################################
 # Installation
 ###########################################################################
 
@@ -624,6 +621,7 @@ FULLCOQLIB=$(COQLIB:"$(OLDROOT)%="$(COQINSTALLPREFIX)%)
 FULLMANDIR=$(MANDIR:"$(OLDROOT)%="$(COQINSTALLPREFIX)%)
 FULLEMACSLIB=$(EMACSLIB:"$(OLDROOT)%="$(COQINSTALLPREFIX)%)
 FULLCOQDOCDIR=$(COQDOCDIR:"$(OLDROOT)%="$(COQINSTALLPREFIX)%)
+FULLDOCDIR=$(DOCDIR:"$(OLDROOT)%="$(COQINSTALLPREFIX)%)
 
 install-coq: install-binaries install-library install-coq-info
 install-coqlight: install-binaries install-library-light
@@ -632,12 +630,12 @@ install-binaries:: install-$(BEST) install-tools
 
 install-byte::
 	$(MKDIR) $(FULLBINDIR)
-	$(INSTALLBIN) $(COQMKTOP) $(COQC) $(COQTOPBYTE) $(FULLBINDIR)
+	$(INSTALLBIN) $(COQMKTOP) $(COQC) $(COQTOPBYTE) $(CSDPCERT) $(FULLBINDIR)
 	cd $(FULLBINDIR); ln -sf coqtop.byte$(EXE) coqtop$(EXE)
 
 install-opt::
 	$(MKDIR) $(FULLBINDIR)
-	$(INSTALLBIN) $(COQMKTOP) $(COQC) $(COQTOPBYTE) $(COQTOPOPT) $(FULLBINDIR)
+	$(INSTALLBIN) $(COQMKTOP) $(COQC) $(COQTOPBYTE) $(COQTOPOPT) $(CSDPCERT) $(FULLBINDIR)
 	cd $(FULLBINDIR); ln -sf coqtop.opt$(EXE) coqtop$(EXE)
 
 install-tools::
@@ -861,7 +859,7 @@ endif
 
 %.ml: %.mll
 	$(SHOW)'OCAMLLEX  $<'
-	$(HIDE)$(OCAMLLEX) "$*.mll" -o $@
+	$(HIDE)$(OCAMLLEX) -o $@ "$*.mll"
 
 %.ml %.mli: %.mly
 	$(SHOW)'OCAMLYACC $<'
diff --git a/Makefile.common b/Makefile.common
index 509ceedb..0a5d4260 100644
--- a/Makefile.common
+++ b/Makefile.common
@@ -46,8 +46,6 @@ COQBINARIES:= $(COQMKTOP) $(COQC) \
 endif
 OTHERBINARIES:=$(COQMKTOPBYTE) $(COQCBYTE)
 
-MINICOQ:=bin/minicoq$(EXE)
-
 CSDPCERT:=bin/csdpcert$(EXE)
 
 ###########################################################################
@@ -88,7 +86,7 @@ REFMANCOQTEXFILES:=\
   doc/refman/RefMan-oth.v.tex doc/refman/RefMan-ltac.v.tex \
   doc/refman/RefMan-decl.v.tex \
   doc/refman/Cases.v.tex doc/refman/Coercion.v.tex doc/refman/Extraction.v.tex \
-  doc/refman/Program.v.tex doc/refman/Omega.v.tex doc/refman/Polynom.v.tex \
+  doc/refman/Program.v.tex doc/refman/Omega.v.tex doc/refman/Micromega.v.tex doc/refman/Polynom.v.tex \
   doc/refman/Setoid.v.tex doc/refman/Helm.tex doc/refman/Classes.v.tex
 
 REFMANTEXFILES:=\
@@ -123,8 +121,8 @@ CONFIG:=\
   config/coq_config.cmo
 
 LIBREP:=\
-  lib/pp_control.cmo lib/pp.cmo lib/compat.cmo lib/util.cmo lib/bigint.cmo \
-  lib/hashcons.cmo lib/dyn.cmo lib/system.cmo lib/flags.cmo \
+  lib/pp_control.cmo lib/pp.cmo lib/compat.cmo lib/flags.cmo \
+  lib/util.cmo lib/bigint.cmo lib/hashcons.cmo lib/dyn.cmo lib/system.cmo \
   lib/bstack.cmo lib/edit.cmo lib/gset.cmo lib/gmap.cmo \
   lib/tlm.cmo lib/gmapl.cmo lib/profile.cmo lib/explore.cmo \
   lib/predicate.cmo lib/rtree.cmo lib/heap.cmo lib/option.cmo
@@ -411,8 +409,8 @@ COQDOCCMO:=$(CONFIG) tools/coqdoc/cdglobals.cmo tools/coqdoc/alpha.cmo \
 MCHECKER:=\
   config/coq_config.cmo \
   lib/pp_control.cmo lib/pp.cmo lib/compat.cmo \
-  lib/util.cmo lib/option.cmo lib/hashcons.cmo \
-  lib/system.cmo lib/flags.cmo \
+  lib/flags.cmo lib/util.cmo lib/option.cmo lib/hashcons.cmo \
+  lib/system.cmo \
   lib/predicate.cmo lib/rtree.cmo \
   kernel/names.cmo kernel/univ.cmo \
   kernel/esubst.cmo checker/term.cmo \
@@ -426,17 +424,11 @@ MCHECKER:=\
   checker/safe_typing.cmo checker/check.cmo \
   checker/check_stat.cmo checker/checker.cmo
 
-# minicoq
-
-MINICOQCMO:=$(CONFIG) $(LIBREP) $(KERNEL) \
-	   parsing/lexer.cmo parsing/g_minicoq.cmo \
-	   toplevel/fhimsg.cmo toplevel/minicoq.cmo
-
 # grammar modules with camlp4
 
 GRAMMARNEEDEDCMO:=\
-  lib/pp_control.cmo lib/pp.cmo lib/compat.cmo lib/util.cmo lib/bigint.cmo \
-  lib/dyn.cmo lib/flags.cmo lib/hashcons.cmo lib/predicate.cmo \
+  lib/pp_control.cmo lib/pp.cmo lib/compat.cmo lib/flags.cmo \
+  lib/util.cmo lib/bigint.cmo lib/dyn.cmo lib/hashcons.cmo lib/predicate.cmo \
   lib/rtree.cmo lib/option.cmo \
   kernel/names.cmo kernel/univ.cmo \
   kernel/esubst.cmo kernel/term.cmo kernel/mod_subst.cmo kernel/sign.cmo \
@@ -469,7 +461,7 @@ GRAMMARSCMO:=\
   parsing/g_prim.cmo parsing/g_tactic.cmo \
   parsing/g_ltac.cmo parsing/g_constr.cmo
 
-GRAMMARCMO:=$(GRAMMARNEEDEDCMO) $(CAMLP4EXTENSIONSCMO) $(GRAMMARSCMO)
+GRAMMARCMO:=$(CONFIG) $(GRAMMARNEEDEDCMO) $(CAMLP4EXTENSIONSCMO) $(GRAMMARSCMO)
 
 GRAMMARCMA:=parsing/grammar.cma
 
@@ -511,9 +503,9 @@ PRINTERSCMO:=\
   parsing/lexer.cmo interp/ppextend.cmo interp/genarg.cmo \
   interp/topconstr.cmo interp/notation.cmo interp/reserve.cmo		\
   library/impargs.cmo interp/constrextern.cmo \
-  interp/syntax_def.cmo interp/implicit_quantifiers.cmo  interp/constrintern.cmo \
-  proofs/proof_trees.cmo proofs/logic.cmo proofs/refiner.cmo \
-  proofs/tacexpr.cmo \
+  interp/syntax_def.cmo interp/implicit_quantifiers.cmo \
+  interp/constrintern.cmo proofs/proof_trees.cmo proofs/tacexpr.cmo \
+  proofs/proof_type.cmo proofs/logic.cmo proofs/refiner.cmo \
   proofs/evar_refiner.cmo proofs/pfedit.cmo proofs/tactic_debug.cmo \
   proofs/decl_mode.cmo \
   parsing/ppconstr.cmo parsing/extend.cmo parsing/pcoq.cmo \
@@ -622,8 +614,8 @@ FSETSVO:=$(FSETSBASEVO) $(FSETS_$(FSETS))
 ALLFSETS:=$(FSETSBASEVO) $(FSETS_all)
 
 RELATIONSVO:=$(addprefix theories/Relations/, \
- Newman.vo 		Operators_Properties.vo	Relation_Definitions.vo \
- Relation_Operators.vo 	Relations.vo 		Rstar.vo )
+ Operators_Properties.vo	Relation_Definitions.vo \
+ Relation_Operators.vo 		Relations.vo )
 
 WELLFOUNDEDVO:=$(addprefix theories/Wellfounded/, \
  Disjoint_Union.vo 	Inclusion.vo 	Inverse_Image.vo \
@@ -723,8 +715,7 @@ RATIONALSPECVIAQVO:=$(addprefix theories/Numbers/Rational/SpecViaQ/, \
  QSig.vo )
 
 RATIONALBIGQVO:=$(addprefix theories/Numbers/Rational/BigQ/, \
- QMake_base.vo	QpMake.vo	QvMake.vo	Q0Make.vo 	\
- QifMake.vo 	QbiMake.vo 	BigQ.vo )
+ QMake.vo	BigQ.vo )
 
 RATIONALVO:=$(RATIONALSPECVIAQVO) $(RATIONALBIGQVO)
 
@@ -767,7 +758,7 @@ MICROMEGAVO:=$(addprefix contrib/micromega/, \
   Env.vo                RingMicromega.vo \
   EnvRing.vo            VarMap.vo \
   OrderedRing.vo        ZCoeff.vo \
-  Micromegatac.vo       ZMicromega.vo \
+  Psatz.vo	       ZMicromega.vo \
   QMicromega.vo         RMicromega.vo \
   Tauto.vo )
 
@@ -872,13 +863,13 @@ STAGE2_TARGETS:=$(COQBINARIES) lib kernel byterun library proofs tactics \
   interp parsing pretyping highparsing toplevel hightactics \
   coqide-binaries coqide-byte coqide-opt $(COQIDEOPT) $(COQIDEBYTE) $(COQIDE) \
   pcoq-binaries $(COQINTERFACE) $(CSDPCERT) coqbinaries pcoq $(TOOLS) tools \
-  printers $(MINICOQ) debug
+  printers debug
 VO_TARGETS:=logic arith bool narith zarith qarith lists strings sets \
   fsets allfsets relations wellfounded ints reals allreals \
   setoids sorting natural integer rational numbers noreal \
   omega micromega ring setoid_ring dp xml extraction field fourier jprover \
   funind cc programs subtac rtauto
-DOC_TARGETS:=doc doc-html doc-ps doc-pdf stdlib refman tutorial faq rectutorial
+DOC_TARGETS:=doc doc-html doc-ps doc-pdf stdlib refman tutorial faq rectutorial refman-quick refman-nodep stdlib-nodep
 STAGE3_TARGETS:=world install coqide coqide-files coq coqlib \
   coqlight states pcoq-files check init theories theories-light contrib \
   $(DOC_TARGETS) $(VO_TARGETS)
diff --git a/Makefile.doc b/Makefile.doc
index 4046d5e7..54fa5f80 100644
--- a/Makefile.doc
+++ b/Makefile.doc
@@ -27,13 +27,19 @@ doc-ps:\
   doc/tutorial/Tutorial.v.ps doc/refman/Reference-Manual.ps \
   doc/faq/FAQ.v.ps doc/stdlib/Library.ps doc/RecTutorial/RecTutorial.v.ps
 
-refman:\
+refman: coq
+	$(MAKE) -f Makefile.stage3 refman-nodep
+
+refman-nodep:\
   doc/refman/html/index.html doc/refman/Reference-Manual.ps doc/refman/Reference-Manual.pdf
 
 tutorial:\
   doc/tutorial/Tutorial.v.html doc/tutorial/Tutorial.v.ps doc/tutorial/Tutorial.v.pdf
 
-stdlib:\
+stdlib: $(THEORIESVO) $(COQDOC)
+	$(MAKE) -f Makefile.stage3 stdlib-nodep
+
+stdlib-nodep:\
   doc/stdlib/html/index.html doc/stdlib/Library.ps doc/stdlib/Library.pdf
 
 faq:\
@@ -47,7 +53,7 @@ rectutorial:\
 ### Implicit rules
 ######################################################################
 
-%.v.tex: %.tex coq
+%.v.tex: %.tex
 	(cd `dirname $<`; $(COQSRC)/$(COQTEX) $(COQTEXOPTS) `basename $<`)
 
 %.ps: %.dvi
@@ -103,7 +109,7 @@ doc/refman/html/index.html: doc/refman/Reference-Manual.html $(REFMANPNGFILES) \
 	$(INSTALLLIB) doc/refman/cover.html doc/refman/menu.html doc/refman/html
 	$(INSTALLLIB) doc/refman/index.html doc/refman/html
 
-doc/refman-quick:
+refman-quick:
 	(cd doc/refman; \
 	 $(PDFLATEX) Reference-Manual.tex; \
 	 $(HEVEA) $(HEVEAOPTS) ./Reference-Manual.tex)
@@ -152,7 +158,7 @@ doc/faq/html/index.html: doc/faq/FAQ.v.html
 
 ### Standard library (browsable html format)
 
-doc/stdlib/index-body.html: $(THEORIESVO:.vo=.glob) $(COQDOC)
+doc/stdlib/index-body.html: 
 	- rm -rf doc/stdlib/html
 	$(MKDIR) doc/stdlib/html
 	$(COQDOC) -q -d doc/stdlib/html --multi-index --html \
@@ -169,7 +175,7 @@ doc/stdlib/html/index.html: doc/stdlib/index-list.html doc/stdlib/index-body.htm
 
 ### Standard library (light version, full version is definitely too big)
 
-doc/stdlib/Library.coqdoc.tex: $(THEORIESLIGHTVO:.vo=.glob) $(COQDOC)
+doc/stdlib/Library.coqdoc.tex: 
 	$(COQSRC)/$(COQDOC) -q --gallina --body-only --latex --stdout \
             -R theories Coq $(THEORIESLIGHTVO:.vo=.v) >> $@
 
@@ -215,26 +221,26 @@ ide/index_urls.txt: doc/refman/html/index.html
 install-doc: install-doc-meta install-doc-html install-doc-printable
 
 install-doc-meta:
-	$(MKDIR) $(DOCDIR)
-	$(INSTALLLIB) doc/LICENCE $(DOCDIR)/LICENCE.doc
+	$(MKDIR) $(FULLDOCDIR)
+	$(INSTALLLIB) doc/LICENSE $(FULLDOCDIR)/LICENSE.doc
 
 install-doc-html: doc-html
-	$(MKDIR) $(addprefix $(DOCDIR)/html/, refman stdlib faq)
-	$(INSTALLLIB) doc/refman/html/* $(DOCDIR)/html/refman 
-	$(INSTALLLIB) doc/stdlib/html/* $(DOCDIR)/html/stdlib 
-	$(INSTALLLIB) doc/RecTutorial/RecTutorial.v.html $(DOCDIR)/html/RecTutorial.html
-	$(INSTALLLIB) doc/faq/html/* $(DOCDIR)/html/faq
-	$(INSTALLLIB) doc/tutorial/Tutorial.v.html $(DOCDIR)/html/Tutorial.html
+	$(MKDIR) $(addprefix $(FULLDOCDIR)/html/, refman stdlib faq)
+	$(INSTALLLIB) doc/refman/html/* $(FULLDOCDIR)/html/refman 
+	$(INSTALLLIB) doc/stdlib/html/* $(FULLDOCDIR)/html/stdlib 
+	$(INSTALLLIB) doc/RecTutorial/RecTutorial.v.html $(FULLDOCDIR)/html/RecTutorial.html
+	$(INSTALLLIB) doc/faq/html/* $(FULLDOCDIR)/html/faq
+	$(INSTALLLIB) doc/tutorial/Tutorial.v.html $(FULLDOCDIR)/html/Tutorial.html
 
 install-doc-printable: doc-pdf doc-ps
-	$(MKDIR) $(DOCDIR)/ps $(DOCDIR)/pdf
+	$(MKDIR) $(FULLDOCDIR)/ps $(FULLDOCDIR)/pdf
 	$(INSTALLLIB) doc/refman/Reference-Manual.pdf \
-		doc/stdlib/Library.pdf $(DOCDIR)/pdf
+		doc/stdlib/Library.pdf $(FULLDOCDIR)/pdf
 	$(INSTALLLIB) doc/refman/Reference-Manual.ps \
-		doc/stdlib/Library.ps $(DOCDIR)/ps
-	$(INSTALLLIB) doc/tutorial/Tutorial.v.pdf $(DOCDIR)/pdf/Tutorial.pdf
-	$(INSTALLLIB) doc/RecTutorial/RecTutorial.v.pdf $(DOCDIR)/pdf/RecTutorial.pdf
-	$(INSTALLLIB) doc/faq/FAQ.v.pdf $(DOCDIR)/pdf/FAQ.pdf
-	$(INSTALLLIB) doc/tutorial/Tutorial.v.ps $(DOCDIR)/ps/Tutorial.ps
-	$(INSTALLLIB) doc/RecTutorial/RecTutorial.v.ps $(DOCDIR)/ps/RecTutorial.ps
-	$(INSTALLLIB) doc/faq/FAQ.v.ps $(DOCDIR)/ps/FAQ.ps
+		doc/stdlib/Library.ps $(FULLDOCDIR)/ps
+	$(INSTALLLIB) doc/tutorial/Tutorial.v.pdf $(FULLDOCDIR)/pdf/Tutorial.pdf
+	$(INSTALLLIB) doc/RecTutorial/RecTutorial.v.pdf $(FULLDOCDIR)/pdf/RecTutorial.pdf
+	$(INSTALLLIB) doc/faq/FAQ.v.pdf $(FULLDOCDIR)/pdf/FAQ.pdf
+	$(INSTALLLIB) doc/tutorial/Tutorial.v.ps $(FULLDOCDIR)/ps/Tutorial.ps
+	$(INSTALLLIB) doc/RecTutorial/RecTutorial.v.ps $(FULLDOCDIR)/ps/RecTutorial.ps
+	$(INSTALLLIB) doc/faq/FAQ.v.ps $(FULLDOCDIR)/ps/FAQ.ps
diff --git a/README.doc b/README.doc
new file mode 100755
index 00000000..4e72c894
--- /dev/null
+++ b/README.doc
@@ -0,0 +1,18 @@
+                           The Coq documentation
+                           =====================
+
+The Coq documentation includes:
+
+- a reference manual;
+- a generic tutorial on Coq;
+- a tutorial on recursive types;
+- a document presenting the Coq standard library;
+- a list of questions/answers in the FAQ style
+
+All these documents are available online from the Coq official site
+(http://coq.inria.fr), either as PS/PDF files or as HTML documents.
+
+The sources of the documentation are available along with the sources
+of the Coq proof assistant. It is released under the Open Publication
+License (see file doc/LICENSE in the sources of Coq)
+
diff --git a/checker/check.ml b/checker/check.ml
index f8844975..e91516c7 100644
--- a/checker/check.ml
+++ b/checker/check.ml
@@ -209,7 +209,7 @@ let locate_absolute_library dir =
   if loadpath = [] then raise LibUnmappedDir;
   try
     let name = string_of_id base^".vo" in
-    let _, file = System.where_in_path loadpath name in
+    let _, file = System.where_in_path false loadpath name in
     (dir, file)
   with Not_found ->
   (* Last chance, removed from the file system but still in memory *)
@@ -229,7 +229,7 @@ let locate_qualified_library qid =
     in
     if loadpath = [] then raise LibUnmappedDir;
     let name =  qid.basename^".vo" in
-    let path, file = System.where_in_path loadpath name in
+    let path, file = System.where_in_path true loadpath name in
     let dir =
       extend_dirpath (find_logical_path path) (id_of_string qid.basename) in
     (* Look if loaded *)
@@ -267,10 +267,8 @@ let try_locate_qualified_library qid =
 
 (*s Loading from disk to cache (preparation phase) *)
 
-let vo_magic_number = 08190 (* trunk *)
-
 let (raw_extern_library, raw_intern_library) =
-  System.raw_extern_intern vo_magic_number ".vo"
+  System.raw_extern_intern Coq_config.vo_magic_number ".vo"
 
 let with_magic_number_check f a =
   try f a
@@ -323,7 +321,8 @@ let get_deps (dir, f) =
 
 (* Read a compiled library and all dependencies, in reverse order.
    Do not include files that are already in the context. *)
-let rec intern_library (dir, f) needed =
+let rec intern_library seen (dir, f) needed =
+  if LibrarySet.mem dir seen then failwith "Recursive dependencies!";
   (* Look if in the current logical environment *)
   try let _ = find_library dir in needed
   with Not_found ->
@@ -332,28 +331,34 @@ let rec intern_library (dir, f) needed =
   else
     (* [dir] is an absolute name which matches [f] which must be in loadpath *)
     let m = intern_from_file (dir,f) in
-    (dir,m)::List.fold_right intern_mandatory_library m.library_deps needed
-
-(* digest error with checked modules could be a warning *)
-and intern_mandatory_library (dir,_) needed =
-  intern_library (try_locate_absolute_library dir) needed
+    let seen' = LibrarySet.add dir seen in
+    let deps =
+      List.map (fun (d,_) -> try_locate_absolute_library d) m.library_deps in
+    (dir,m) :: List.fold_right (intern_library seen') deps needed
 
 (* Compute the reflexive transitive dependency closure *)
-let rec fold_deps ff (dir,f) s =
-  if  LibrarySet.mem dir s then s
+let rec fold_deps seen ff (dir,f) (s,acc) =
+  if LibrarySet.mem dir seen then failwith "Recursive dependencies!";
+  if LibrarySet.mem dir s then (s,acc)
   else
     let deps = get_deps (dir,f) in
     let deps = List.map (fun (d,_) -> try_locate_absolute_library d) deps in
-    ff dir (List.fold_right (fold_deps ff) deps s)
+    let seen' = LibrarySet.add dir seen in
+    let (s',acc') = List.fold_right (fold_deps seen' ff) deps (s,acc) in
+    (LibrarySet.add dir s', ff dir acc')
+
+and fold_deps_list seen ff modl needed =
+  List.fold_right (fold_deps seen ff) modl needed
 
-and fold_deps_list  ff modl needed =
-  List.fold_right (fold_deps ff) modl needed
+let fold_deps_list ff modl acc =
+  snd (fold_deps_list LibrarySet.empty ff modl (LibrarySet.empty,acc))
 
 let recheck_library ~norec ~admit ~check =
   let ml = List.map try_locate_qualified_library check in
   let nrl = List.map try_locate_qualified_library norec in
   let al =  List.map try_locate_qualified_library admit in
-  let needed = List.rev (List.fold_right intern_library (ml@nrl) []) in
+  let needed = List.rev
+    (List.fold_right (intern_library LibrarySet.empty) (ml@nrl) []) in
   (* first compute the closure of norec, remove closure of check,
      add closure of admit, and finally remove norec and check *)
   let nochk = fold_deps_list LibrarySet.add nrl LibrarySet.empty in
diff --git a/checker/checker.ml b/checker/checker.ml
index 1c7ace12..7de25835 100644
--- a/checker/checker.ml
+++ b/checker/checker.ml
@@ -73,16 +73,14 @@ let convert_string d =
     failwith "caught"
 
 let add_rec_path ~unix_path:dir ~coq_root:coq_dirpath =
-  let dirs = all_subdirs dir in
-  let prefix = repr_dirpath coq_dirpath in
-  if dirs <> [] then
+  if exists_dir dir then
+    let dirs = all_subdirs dir in
+    let prefix = repr_dirpath coq_dirpath in
     let convert_dirs (lp,cp) =
-      (lp,Names.make_dirpath
-            ((List.map convert_string (List.rev cp))@prefix)) in
+      (lp,make_dirpath (List.map convert_string (List.rev cp)@prefix)) in
     let dirs = map_succeed convert_dirs dirs in
-    begin
-      List.iter Check.add_load_path dirs
-    end
+    List.iter Check.add_load_path dirs;
+    Check.add_load_path (dir,coq_dirpath)
   else
     msg_warning (str ("Cannot open " ^ dir))
 
@@ -101,6 +99,14 @@ let set_default_rec_include d =
   let p = Check.default_root_prefix in
   check_coq_overwriting p; 
   push_rec_include (d, p)
+let set_include d p =
+  let p = dirpath_of_string p in
+  check_coq_overwriting p;
+  push_include (d,p)
+let set_rec_include d p =
+  let p = dirpath_of_string p in
+  check_coq_overwriting p;
+  push_rec_include(d,p)
 
 (* Initializes the LoadPath according to COQLIB and Coq_config *)
 let init_load_path () =
@@ -174,9 +180,11 @@ let print_usage_channel co command =
   output_string co command;
   output_string co "Coq options are:\n";
   output_string co
-"  -I dir                 add directory dir in the include path
+"  -I dir -as coqdir      map physical dir to logical coqdir
+  -I dir                 map directory dir to the empty logical path
   -include dir           (idem)
-  -R dir coqdir          recursively map physical dir to logical coqdir 
+  -R dir -as coqdir      recursively map physical dir to logical coqdir 
+  -R dir coqdir          (idem)
 
   -admit module          load module and dependencies without checking
   -norec module          check module but admit dependencies without checking
@@ -297,11 +305,14 @@ let parse_args() =
    | "-impredicative-set" :: rem -> 
        set_engagement Declarations.ImpredicativeSet; parse rem
 
+    | ("-I"|"-include") :: d :: "-as" :: p :: rem -> set_include d p; parse rem
+    | ("-I"|"-include") :: d :: "-as" :: [] -> usage ()
     | ("-I"|"-include") :: d :: rem -> set_default_include d; parse rem
     | ("-I"|"-include") :: []       -> usage ()
 
-    | "-R" :: d :: p :: rem ->
-        push_rec_include (d, dirpath_of_string p);parse rem
+    | "-R" :: d :: "-as" :: p :: rem -> set_rec_include d p;parse rem
+    | "-R" :: d :: "-as" :: [] -> usage ()
+    | "-R" :: d :: p :: rem -> set_rec_include d p;parse rem
     | "-R" :: ([] | [_]) -> usage ()
 
     | "-debug" :: rem -> set_debug (); parse rem
diff --git a/config/Makefile.template b/config/Makefile.template
index e5061ebe..fc8af173 100644
--- a/config/Makefile.template
+++ b/config/Makefile.template
@@ -141,6 +141,9 @@ DOT=dot
 DOTOPTS=-Tps
 ODOCDOTOPTS=-dot -dot-reduce
 
+# Option to control compilation and installation of the documentation
+WITHDOC=WITHDOCOPT
+
 # make or sed are bogus and believe lines not terminating by a return
 # are inexistent
 
diff --git a/config/coq_config.mli b/config/coq_config.mli
index 23d3efbd..3898a0f3 100644
--- a/config/coq_config.mli
+++ b/config/coq_config.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: coq_config.mli 10122 2007-09-15 10:35:59Z letouzey $ i*)
+(*i $Id: coq_config.mli 11313 2008-08-07 11:15:03Z barras $ i*)
 
 val local : bool        (* local use (no installation) *)
 
@@ -28,12 +28,17 @@ val osdeplibs : string  (* OS dependant link options for ocamlc *)
 (* val defined : string list  (* options for lib/ocamlpp *) *)
 
 val version : string    (* version number of Coq *)
-val versionsi : string  (* version number of Coq\_SearchIsos *)
 val date : string       (* release date *)
 val compile_date : string (* compile date *)
+val vo_magic_number : int
+val state_magic_number : int
 
 val theories_dirs : string list
 val contrib_dirs : string list
 
 val exec_extension : string (* "" under Unix, ".exe" under MS-windows *)
 val with_geoproof : bool ref (* to (de)activate functions specific to Geoproof with Coqide *)
+
+val browser : string
+(** default web browser to use, may be overriden by environment
+    variable COQREMOTEBROWSER *)
diff --git a/configure b/configure
index 59cfcb9f..2747ee2f 100755
--- a/configure
+++ b/configure
@@ -6,8 +6,10 @@
 # 
 ##################################
 
-VERSION=8.2beta3
-DATE="Jun. 2008"
+VERSION=8.2beta4
+VOMAGIC=08193 
+STATEMAGIC=19764
+DATE="Aug. 2008"
 
 # a local which command for sh
 which () {
@@ -23,7 +25,7 @@ done
 }
 
 usage () {
-    echo "Available options for configure are:\n"
+    printf "Available options for configure are:\n"
     echo "-help"
     printf "\tDisplays this help page\n"
     echo "-prefix <dir>"
@@ -57,6 +59,10 @@ usage () {
     printf "\tSpecifies whether or not to compile full FSets/Reals library\n"
     echo "-coqide (opt|byte|no)"
     printf "\tSpecifies whether or not to compile Coqide\n"
+    echo "-browser <command>"
+    printf "\tUse <command> to open URL %%s\n"
+    echo "-with-doc (yes|no)"
+    printf "\tSpecifies whether or not to compile the documentation\n"
     echo "-with-geoproof (yes|no)"
     printf "\tSpecifies whether or not to use Geoproof binding\n"
     echo "-with-cc <file>"
@@ -113,7 +119,10 @@ fsets=all
 reals=all
 arch_spec=no
 coqide_spec=no
+browser_spec=no
 with_geoproof=false
+with_doc=all
+with_doc_spec=no
 
 COQSRC=`pwd`
 
@@ -183,6 +192,15 @@ while : ; do
 			  *) COQIDE=no
 		      esac
 		      shift;;
+    -browser|--browser) browser_spec=yes
+		      BROWSER=$2
+		      shift;;
+    -with-doc|--with-doc) with_doc_spec=yes
+		      case "$2" in
+			  yes|all) with_doc=all;;
+			  *) with_doc=no
+		      esac
+		      shift;;
     -with-geoproof|--with-geoproof) 
 	  case $2 in
 	      yes) with_geoproof=true;;
@@ -321,6 +339,15 @@ else
   echo "Cannot find GNU Make 3.81"
 fi
 
+# Browser command
+
+if [ "$browser_spec" = "no" ]; then
+    case $ARCH in
+        win32) BROWSER='C:\PROGRA~1\INTERN~1\IEXPLORE %s' ;;
+        *) BROWSER='firefox -remote "OpenURL(%s,new-tab)" || firefox %s &' ;;
+    esac
+fi
+
 #########################################
 # Objective Caml programs
 
@@ -594,6 +621,24 @@ esac
 #    "") MKTEXLSR=true;;
 #esac
 
+# "
+### Test if documentation can be compiled (latex, hevea)
+
+if test "$with_doc" = "all" 
+then
+    if test "`which latex`" = ""
+    then 
+	echo "latex was not found; documentation will not be available"
+	with_doc=no
+    else
+	if test "`which hevea`" = ""
+	then
+	    with_doc=no
+	    echo "hevea was not found: documentation will not be available"
+	fi
+    fi
+fi
+
 ###########################################
 # bindir, libdir, mandir, docdir, etc.
 
@@ -747,7 +792,13 @@ echo "  Reals theory                      : All"
 else
 echo "  Reals theory                      : Basic"
 fi
+if test "$with_doc" = "all"; then
+echo "  Documentation                     : All"
+else
+echo "  Documentation                     : None"
+fi
 echo "  CoqIde                            : $COQIDE"
+echo "  Web browser                       : $BROWSER"
 echo ""
 
 echo "  Paths for true installation:"
@@ -769,6 +820,10 @@ escape_var () {
 EOF
 }
 
+# Escaped version of browser command
+export BROWSER
+ESCBROWSER=`VAR=BROWSER escape_var`
+
 # damned backslashes under M$Windows
 case $ARCH in
     win32)
@@ -818,11 +873,13 @@ let best = "$best_compiler"
 let arch = "$ARCH"
 let osdeplibs = "$OSDEPLIBS"
 let version = "$VERSION"
-let versionsi = "$VERSIONSI"
 let date = "$DATE"
 let compile_date = "$COMPILEDATE"
+let vo_magic_number = $VOMAGIC
+let state_magic_number = $STATEMAGIC
 let exec_extension = "$EXE"
 let with_geoproof = ref $with_geoproof
+let browser = "$ESCBROWSER"
 
 END_OF_COQ_CONFIG
 
@@ -895,6 +952,7 @@ sed -e "s|LOCALINSTALLATION|$local|" \
     -e "s|REALSOPT|$reals|" \
     -e "s|COQIDEOPT|$COQIDE|" \
     -e "s|CHECKEDOUTSOURCETREE|$checkedout|" \
+    -e "s|WITHDOCOPT|$with_doc|" \
       "$COQSRC/config/Makefile.template" > "$COQSRC/config/Makefile"
 
 chmod a-w "$COQSRC/config/Makefile"
@@ -936,4 +994,4 @@ echo
 echo "*Warning* To compile the system for a new architecture"
 echo "          don't forget to do a 'make archclean' before './configure'."
 
-# $Id: configure 11181 2008-06-27 07:35:45Z notin $
+# $Id: configure 11320 2008-08-07 19:40:59Z notin $
diff --git a/contrib/extraction/modutil.ml b/contrib/extraction/modutil.ml
index 48444509..0c906712 100644
--- a/contrib/extraction/modutil.ml
+++ b/contrib/extraction/modutil.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: modutil.ml 10665 2008-03-14 12:10:09Z soubiran $ i*)
+(*i $Id: modutil.ml 11262 2008-07-24 20:59:29Z letouzey $ i*)
 
 open Names
 open Declarations
@@ -347,6 +347,73 @@ and optim_me to_appear s = function
       MEapply (optim_me to_appear s me, optim_me to_appear s me')
   | MEfunctor (mbid,mt,me) -> MEfunctor (mbid,mt, optim_me to_appear s me)
 
-let optimize_struct to_appear struc = 
-  let subst = ref (Refmap.empty : ml_ast Refmap.t) in 
-  List.map (fun (mp,lse) -> (mp, optim_se true to_appear subst lse)) struc
+(* After these optimisations, some dependencies may not be needed anymore. 
+   For monolithic extraction, we recompute a minimal set of dependencies. *)
+
+exception NoDepCheck
+
+let base_r = function
+  | ConstRef c as r -> r
+  | IndRef (kn,_) -> IndRef (kn,0)
+  | ConstructRef ((kn,_),_) -> IndRef (kn,0)
+  | _ -> assert false
+
+let reset_needed, add_needed, found_needed, is_needed =
+  let needed = ref Refset.empty in
+  ((fun l -> needed := Refset.empty),
+   (fun r -> needed := Refset.add (base_r r) !needed),
+   (fun r -> needed := Refset.remove (base_r r) !needed),
+   (fun r -> Refset.mem (base_r r) !needed))
+
+let declared_refs = function
+  | Dind (kn,_) -> [|IndRef (kn,0)|]
+  | Dtype (r,_,_) -> [|r|]
+  | Dterm (r,_,_) -> [|r|]
+  | Dfix (rv,_,_) -> rv
+
+(* Computes the dependencies of a declaration, except in case 
+   of custom extraction. *)
+
+let compute_deps_decl = function
+  | Dind (kn,ind) ->
+      (* Todo Later : avoid dependencies when Extract Inductive *)
+      ind_iter_references add_needed add_needed add_needed kn ind
+  | Dtype (r,ids,t) ->
+      if not (is_custom r) then type_iter_references add_needed t
+  | Dterm (r,u,t) ->
+      type_iter_references add_needed t;
+      if not (is_custom r) then
+	ast_iter_references add_needed add_needed add_needed u
+  | Dfix _ as d ->
+      (* Todo Later : avoid dependencies when Extract Constant *)
+      decl_iter_references add_needed add_needed add_needed d
+
+let rec depcheck_se = function
+  | [] -> []
+  | ((l,SEdecl d) as t)::se ->
+      let se' = depcheck_se se in
+      let rv = declared_refs d in
+      if not (array_exists is_needed rv) then
+	(Array.iter remove_info_axiom rv; se')
+      else
+	(Array.iter found_needed rv; compute_deps_decl d; t::se')
+  | _ -> raise NoDepCheck
+
+let rec depcheck_struct = function
+  | [] -> []
+  | (mp,lse)::struc ->
+      let struc' = depcheck_struct struc in
+      let lse' = depcheck_se lse in
+      (mp,lse')::struc'
+
+let optimize_struct to_appear struc =
+  let subst = ref (Refmap.empty : ml_ast Refmap.t) in
+  let opt_struc =
+    List.map (fun (mp,lse) -> (mp, optim_se true to_appear subst lse)) struc
+  in
+  try
+    if modular () then raise NoDepCheck;
+    reset_needed ();
+    List.iter add_needed to_appear;
+    depcheck_struct opt_struc
+  with NoDepCheck -> opt_struc
diff --git a/contrib/extraction/table.ml b/contrib/extraction/table.ml
index abf461c1..10f669e1 100644
--- a/contrib/extraction/table.ml
+++ b/contrib/extraction/table.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: table.ml 10348 2007-12-06 17:36:14Z aspiwack $ i*)
+(*i $Id: table.ml 11262 2008-07-24 20:59:29Z letouzey $ i*)
 
 open Names
 open Term
@@ -175,6 +175,7 @@ let info_axioms = ref Refset.empty
 let log_axioms = ref Refset.empty
 let init_axioms () = info_axioms := Refset.empty; log_axioms := Refset.empty
 let add_info_axiom r = info_axioms := Refset.add r !info_axioms
+let remove_info_axiom r = info_axioms := Refset.remove r !info_axioms
 let add_log_axiom r = log_axioms := Refset.add r !log_axioms
 
 (*s Extraction mode: modular or monolithic *)
diff --git a/contrib/extraction/table.mli b/contrib/extraction/table.mli
index ca02cb4d..4dbccd08 100644
--- a/contrib/extraction/table.mli
+++ b/contrib/extraction/table.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: table.mli 10245 2007-10-21 13:41:53Z letouzey $ i*)
+(*i $Id: table.mli 11262 2008-07-24 20:59:29Z letouzey $ i*)
 
 open Names
 open Libnames
@@ -77,6 +77,7 @@ val is_projection : global_reference -> bool
 val projection_arity : global_reference -> int
 
 val add_info_axiom : global_reference -> unit
+val remove_info_axiom : global_reference -> unit
 val add_log_axiom : global_reference -> unit
 
 val reset_tables : unit -> unit
diff --git a/contrib/firstorder/sequent.ml b/contrib/firstorder/sequent.ml
index c832d30f..e931f8fd 100644
--- a/contrib/firstorder/sequent.ml
+++ b/contrib/firstorder/sequent.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: sequent.ml 10824 2008-04-21 13:57:03Z msozeau $ *)
+(* $Id: sequent.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Term
 open Util
@@ -281,7 +281,7 @@ let create_with_auto_hints l depth gl=
 	searchtable_map dbname
       with Not_found-> 
 	error ("Firstorder: "^dbname^" : No such Hint database") in
-      Hint_db.iter g (snd hdb) in
+      Hint_db.iter g hdb in
     List.iter h l;
     !seqref
 
diff --git a/contrib/funind/functional_principles_proofs.ml b/contrib/funind/functional_principles_proofs.ml
index 3d80bd00..bd335d30 100644
--- a/contrib/funind/functional_principles_proofs.ml
+++ b/contrib/funind/functional_principles_proofs.ml
@@ -136,7 +136,7 @@ let change_hyp_with_using msg hyp_id t tac : tactic =
   fun g -> 
     let prov_id = pf_get_new_id hyp_id g in 
     tclTHENS
-      ((* observe_tac msg *) (forward (Some  (tclCOMPLETE tac)) (Genarg.IntroIdentifier prov_id) t))
+      ((* observe_tac msg *) (forward (Some  (tclCOMPLETE tac)) (dummy_loc,Genarg.IntroIdentifier prov_id) t))
       [tclTHENLIST 
       [	
 	(* observe_tac "change_hyp_with_using thin" *) (thin [hyp_id]);
@@ -388,7 +388,7 @@ let clean_hyp_with_heq ptes_infos eq_hyps hyp_id env sigma =
 		     in
 (* 		     observe_tac "rec hyp " *)
 		       (tclTHENS
-		       (assert_as true (Genarg.IntroIdentifier rec_pte_id) t_x)
+		       (assert_as true (dummy_loc, Genarg.IntroIdentifier rec_pte_id) t_x)
 		       [
 			 (* observe_tac "prove rec hyp" *) (prove_rec_hyp eq_hyps);
 (* 			observe_tac "prove rec hyp" *)
@@ -571,7 +571,7 @@ let instanciate_hyps_with_args (do_prove:identifier list -> tactic) hyps args_id
 	fun g -> 
 	  let prov_hid = pf_get_new_id hid g in
 	  tclTHENLIST[
-	    forward None (Genarg.IntroIdentifier prov_hid) (mkApp(mkVar hid,args));
+	    forward None (dummy_loc,Genarg.IntroIdentifier prov_hid) (mkApp(mkVar hid,args));
 	    thin [hid];
 	    h_rename [prov_hid,hid]
 	  ] g
@@ -1399,7 +1399,7 @@ let new_prove_with_tcc is_mes acc_inv hrec tcc_hyps eqs : tactic =
 				      false
 				      (true,5)
 				      [Lazy.force refl_equal]
-				      [empty_transparent_state, Auto.Hint_db.empty]
+				      [Auto.Hint_db.empty false]
 				  )
 			   )
 			)
@@ -1497,7 +1497,7 @@ let prove_principle_for_gen
 	    (tclTHEN
 	       (forward 
 		  (Some ((fun g -> (* observe_tac "prove wf" *) (tclCOMPLETE (wf_tac is_mes)) g)))
-		  (Genarg.IntroIdentifier wf_thm_id)
+		  (dummy_loc,Genarg.IntroIdentifier wf_thm_id)
 		  (mkApp (delayed_force well_founded,[|input_type;relation|])))
 	       (
 		 (* observe_tac  *)
@@ -1561,7 +1561,7 @@ let prove_principle_for_gen
 	);
       (* observe_tac "" *) (forward
 	 (Some (prove_rec_arg_acc))
-	 (Genarg.IntroIdentifier acc_rec_arg_id)
+	 (dummy_loc,Genarg.IntroIdentifier acc_rec_arg_id)
  	 (mkApp (delayed_force acc_rel,[|input_type;relation;mkVar rec_arg_id|]))
       );
 (*       observe_tac "reverting" *) (revert (List.rev (acc_rec_arg_id::args_ids)));
diff --git a/contrib/funind/g_indfun.ml4 b/contrib/funind/g_indfun.ml4
index dae76f2d..d435f513 100644
--- a/contrib/funind/g_indfun.ml4
+++ b/contrib/funind/g_indfun.ml4
@@ -90,11 +90,6 @@ END
 TACTIC EXTEND newfunind
    ["functional" "induction" ne_constr_list(cl) fun_ind_using(princl) with_names(pat)] -> 
      [ 
-       let pat = 
-	 match pat with 
-	   | None -> IntroAnonymous
-	   | Some pat -> pat
-       in
        let c = match cl with 
 	 | [] -> assert false
 	 | [c] -> c 
@@ -106,11 +101,6 @@ END
 TACTIC EXTEND snewfunind
    ["soft" "functional" "induction" ne_constr_list(cl) fun_ind_using(princl) with_names(pat)] -> 
      [ 
-       let pat = 
-	 match pat with 
-	   | None -> IntroAnonymous
-	   | Some pat -> pat
-       in
        let c = match cl with 
 	 | [] -> assert false
 	 | [c] -> c 
@@ -319,7 +309,7 @@ let poseq_unsafe idunsafe cstr gl =
   tclTHEN
     (Tactics.letin_tac None (Name idunsafe) cstr allClauses)
     (tclTHENFIRST 
-      (Tactics.assert_as true IntroAnonymous (mkEq typ (mkVar idunsafe) cstr)) 
+      (Tactics.assert_as true (Util.dummy_loc,IntroAnonymous) (mkEq typ (mkVar idunsafe) cstr)) 
       Tactics.reflexivity)
     gl
   
@@ -396,7 +386,7 @@ let finduction (oid:identifier option) (heuristic: fapp_info list -> fapp_info l
 	      fun gl -> 
 		  (functional_induction 
 		    true (applist (info.fname, List.rev !list_constr_largs)) 
-		    None IntroAnonymous) gl)) 
+		    None None) gl)) 
 	  nexttac)) ordered_info_list in
   (* we try each (f t u v) until one does not fail *)
   (* TODO: try also to mix functional schemes *)
diff --git a/contrib/funind/indfun.ml b/contrib/funind/indfun.ml
index a6cbb321..79ef0097 100644
--- a/contrib/funind/indfun.ml
+++ b/contrib/funind/indfun.ml
@@ -120,7 +120,7 @@ let functional_induction with_clean c princl pat =
 	 princ_infos
 	 args_as_induction_constr
 	 princ'
-	 pat
+	 (None,pat)
          None)
       subst_and_reduce
       g
diff --git a/contrib/funind/invfun.ml b/contrib/funind/invfun.ml
index 63d44916..f62d70ab 100644
--- a/contrib/funind/invfun.ml
+++ b/contrib/funind/invfun.ml
@@ -280,13 +280,13 @@ let prove_fun_correct functional_induction funs_constr graphs_constr schemes lem
       List.map
 	(fun (_,_,br_type) ->
 	   List.map
-	     (fun id -> Genarg.IntroIdentifier id)
+	     (fun id -> dummy_loc, Genarg.IntroIdentifier id)
 	     (generate_fresh_id (id_of_string "y") ids (List.length (fst (decompose_prod_assum br_type))))
 	)
 	branches
     in
     (* before building the full intro pattern for the principle *)
-    let pat = Genarg.IntroOrAndPattern intro_pats in
+    let pat = Some (dummy_loc,Genarg.IntroOrAndPattern intro_pats) in
     let eq_ind = Coqlib.build_coq_eq () in
     let eq_construct = mkConstruct((destInd eq_ind),1) in
     (* The next to referencies will be used to find out which constructor to apply in each branch *)
@@ -297,7 +297,7 @@ let prove_fun_correct functional_induction funs_constr graphs_constr schemes lem
       (* We get the identifiers of this branch *)
       let this_branche_ids =
 	List.fold_right
-	  (fun pat acc ->
+	  (fun (_,pat) acc ->
 	     match pat with
 	       | Genarg.IntroIdentifier id -> Idset.add id acc
 	       | _ -> anomaly "Not an identifier"
@@ -447,7 +447,7 @@ let prove_fun_correct functional_induction funs_constr graphs_constr schemes lem
       [ observe_tac "intro args_names" (tclMAP h_intro args_names);
 	observe_tac "principle" (forward
 	  (Some (h_exact f_principle))
-	  (Genarg.IntroIdentifier principle_id)
+	  (dummy_loc,Genarg.IntroIdentifier principle_id)
 	  princ_type);
 	tclTHEN_i
 	  (observe_tac "functional_induction" (
@@ -948,7 +948,7 @@ let functional_inversion kn hid fconst f_correct : tactic =
 	    h_generalize [applist(f_correct,(Array.to_list f_args)@[res;mkVar hid])];
 	    thin [hid];
 	    h_intro hid;
-	    Inv.inv FullInversion Genarg.IntroAnonymous (Rawterm.NamedHyp hid);
+	    Inv.inv FullInversion None (Rawterm.NamedHyp hid);
 	    (fun g ->
 	       let new_ids = List.filter (fun id -> not (Idset.mem id old_ids)) (pf_ids_of_hyps g) in 
 	       tclMAP (revert_graph kn pre_tac)  (hid::new_ids)  g
diff --git a/contrib/funind/recdef.ml b/contrib/funind/recdef.ml
index c9bf2f1f..5bd7a6b2 100644
--- a/contrib/funind/recdef.ml
+++ b/contrib/funind/recdef.ml
@@ -8,7 +8,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: recdef.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: recdef.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Term
 open Termops
@@ -1157,7 +1157,7 @@ let rec introduce_all_values_eq cont_tac functional termine
       [] ->
        let heq2 = next_global_ident_away true heq_id ids in
 	tclTHENLIST
-	  [forward None (IntroIdentifier heq2)
+	  [forward None (dummy_loc,IntroIdentifier heq2)
              (mkApp(mkVar heq1, [|f_S(f_S(mkVar pmax))|]));
            simpl_iter (onHyp heq2);
            unfold_in_hyp [((true,[1]), evaluable_of_global_reference 
diff --git a/contrib/interface/blast.ml b/contrib/interface/blast.ml
index 6ec0fac4..767a7dd6 100644
--- a/contrib/interface/blast.ml
+++ b/contrib/interface/blast.ml
@@ -161,21 +161,22 @@ let rec e_trivial_fail_db db_list local_db goal =
 	  let d = pf_last_hyp g' in
 	  let hintl = make_resolve_hyp (pf_env g') (project g') d in
           (e_trivial_fail_db db_list
-	     (add_hint_list hintl local_db) g'))) ::
+	     (Hint_db.add_list hintl local_db) g'))) ::
     (List.map fst (e_trivial_resolve db_list local_db (pf_concl goal)) )
   in 
   tclFIRST (List.map tclCOMPLETE tacl) goal 
 
 and e_my_find_search db_list local_db hdc concl = 
   let hdc = head_of_constr_reference hdc in
-  let flags = Auto.auto_unif_flags in
   let hintl =
     if occur_existential concl then 
-      list_map_append (fun (st, db) -> List.map (fun x -> ({flags with Unification.modulo_delta = st}, x))
-	(Hint_db.map_all hdc db)) (local_db::db_list)
+      list_map_append (fun db -> 
+	let flags = {Auto.auto_unif_flags with Unification.modulo_delta = Hint_db.transparent_state db} in
+	  List.map (fun x -> flags, x) (Hint_db.map_all hdc db)) (local_db::db_list)
     else 
-      list_map_append (fun (st, db) -> List.map (fun x -> ({flags with Unification.modulo_delta = st}, x)) 
-	(Hint_db.map_auto (hdc,concl) db)) (local_db::db_list)
+      list_map_append (fun db -> 
+	let flags = {Auto.auto_unif_flags with Unification.modulo_delta = Hint_db.transparent_state db} in
+	  List.map (fun x -> flags, x) (Hint_db.map_auto (hdc,concl) db)) (local_db::db_list)
   in 
   let tac_of_hint = 
     fun (st, ({pri=b; pat = p; code=t} as _patac)) -> 
@@ -279,7 +280,7 @@ module MySearchProblem = struct
 	     let hintl = 
 	       make_resolve_hyp (pf_env g') (project g') (pf_last_hyp g')
 	     in
-             let ldb = add_hint_list hintl (List.hd s.localdb) in
+             let ldb = Hint_db.add_list hintl (List.hd s.localdb) in
 	     { depth = s.depth; tacres = res; 
 	       last_tactic = pp; dblist = s.dblist;
 	       localdb = ldb :: List.tl s.localdb })
@@ -375,7 +376,7 @@ let rec trivial_fail_db db_list local_db gl =
     tclTHEN intro 
       (fun g'->
 	 let hintl = make_resolve_hyp (pf_env g') (project g') (pf_last_hyp g')
-	 in trivial_fail_db db_list (add_hint_list hintl local_db) g')
+	 in trivial_fail_db db_list (Hint_db.add_list hintl local_db) g')
   in
   tclFIRST 
     (assumption::intro_tac::
@@ -383,14 +384,15 @@ let rec trivial_fail_db db_list local_db gl =
 	(trivial_resolve db_list local_db (pf_concl gl)))) gl
 
 and my_find_search db_list local_db hdc concl =
-  let flags = Auto.auto_unif_flags in
   let tacl = 
     if occur_existential concl then 
-      list_map_append (fun (st, db) -> List.map (fun x -> {flags with Unification.modulo_delta = st}, x) 
-	(Hint_db.map_all hdc db)) (local_db::db_list)
+      list_map_append (fun db -> 
+	let flags = {Auto.auto_unif_flags with Unification.modulo_delta = Hint_db.transparent_state db} in
+	  List.map (fun x -> flags, x) (Hint_db.map_all hdc db)) (local_db::db_list)
     else 
-      list_map_append (fun (st, db) -> List.map (fun x -> {flags with Unification.modulo_delta = st}, x)
-	(Hint_db.map_auto (hdc,concl) db)) (local_db::db_list)
+      list_map_append (fun db -> 
+	let flags = {Auto.auto_unif_flags with Unification.modulo_delta = Hint_db.transparent_state db} in
+	  List.map (fun x -> flags, x) (Hint_db.map_auto (hdc,concl) db)) (local_db::db_list)
   in
   List.map 
     (fun (st, {pri=b; pat=p; code=t} as _patac) -> 
@@ -477,7 +479,7 @@ let rec search_gen decomp n db_list local_db extra_sign goal =
 	   with Failure _ -> [] 
 	 in
          (free_try
-	  (search_gen decomp n db_list (add_hint_list hintl local_db) [d])
+	  (search_gen decomp n db_list (Hint_db.add_list hintl local_db) [d])
 	  g'))
   in
   let rec_tacs = 
diff --git a/contrib/interface/depends.ml b/contrib/interface/depends.ml
index dd40c5cc..203bc9e3 100644
--- a/contrib/interface/depends.ml
+++ b/contrib/interface/depends.ml
@@ -57,8 +57,7 @@ let explore_tree pfs =
   and explain_prim = function
     | Refine c -> "Refine " ^ (string_of_ppcmds (Printer.prterm c))
     | Intro identifier -> "Intro"
-    | Intro_replacing identifier -> "Intro_replacing"
-    | Cut (bool, identifier, types) -> "Cut"
+    | Cut (bool, _, identifier, types) -> "Cut"
     | FixRule (identifier, int, l) -> "FixRule"
     | Cofix (identifier, l) -> "Cofix"
     | Convert_concl (types, cast_kind) -> "Convert_concl"
@@ -269,7 +268,7 @@ let rec depends_of_gen_tactic_expr depends_of_'constr depends_of_'ind depends_of
 	     igtal
 	     acc)
     | TacMatch (_, tac, tacexpr_mrl) -> failwith "depends_of_tacexpr of a Match not implemented yet"
-    | TacMatchContext (_, _, tacexpr_mrl) -> failwith "depends_of_tacexpr of a Match Context not implemented yet"
+    | TacMatchGoal (_, _, tacexpr_mrl) -> failwith "depends_of_tacexpr of a Match Context not implemented yet"
     | TacFun tacfa -> depends_of_tac_fun_ast tacfa acc
     | TacArg tacarg -> depends_of_tac_arg tacarg acc
   and depends_of_atomic_tacexpr atexpr acc = let depends_of_'constr_with_bindings = depends_of_'a_with_bindings depends_of_'constr in match atexpr with
@@ -281,7 +280,8 @@ let rec depends_of_gen_tactic_expr depends_of_'constr depends_of_'ind depends_of
     | TacExact          c
     | TacExactNoCheck   c
     | TacVmCastNoCheck  c  -> depends_of_'constr c acc
-    | TacApply (_, _, cb) -> depends_of_'constr_with_bindings cb acc
+    | TacApply (_, _, [cb]) -> depends_of_'constr_with_bindings cb acc
+    | TacApply (_, _, _) -> failwith "TODO"
     | TacElim (_, cwb, cwbo) ->
 	depends_of_'constr_with_bindings cwb
 	  (Option.fold_right depends_of_'constr_with_bindings cwbo acc)
@@ -302,14 +302,13 @@ let rec depends_of_gen_tactic_expr depends_of_'constr depends_of_'ind depends_of
     | TacLetTac (_,c,_,_) -> depends_of_'constr c acc
 
     (* Derived basic tactics *)
-    | TacSimpleInduction _
-    | TacSimpleDestruct  _
+    | TacSimpleInductionDestruct _
     | TacDoubleInduction _ -> acc
-    | TacNewInduction (_, cwbial, cwbo, _, _)
-    | TacNewDestruct (_, cwbial, cwbo, _, _) ->
+    | TacInductionDestruct (_, _, [cwbial, cwbo, _, _]) ->
 	list_union_map (depends_of_'a_induction_arg depends_of_'constr_with_bindings)
 	  cwbial
 	  (Option.fold_right depends_of_'constr_with_bindings cwbo acc)
+    | TacInductionDestruct (_, _, _) -> failwith "TODO"
     | TacDecomposeAnd c
     | TacDecomposeOr  c -> depends_of_'constr c acc
     | TacDecompose (il, c) -> depends_of_'constr c (list_union_map depends_of_'ind il acc)
@@ -410,8 +409,7 @@ let depends_of_compound_rule cr acc = match cr with
 and depends_of_prim_rule pr acc = match pr with
   | Refine c                     -> depends_of_constr c acc
   | Intro id                     -> acc
-  | Intro_replacing id           -> acc
-  | Cut (_, _, t)                -> depends_of_constr t acc (* TODO: check what 2nd argument contains *)
+  | Cut (_, _, _, t)             -> depends_of_constr t acc (* TODO: check what 3nd argument contains *)
   | FixRule (_, _, l)            -> list_union_map (o depends_of_constr trd_of_3) l acc (* TODO: check what the arguments contain *)
   | Cofix (_, l)                 -> list_union_map (o depends_of_constr snd) l acc (* TODO: check what the arguments contain *)
   | Convert_concl (t, _)         -> depends_of_constr t acc
diff --git a/contrib/interface/pbp.ml b/contrib/interface/pbp.ml
index 06b957d9..65eadf13 100644
--- a/contrib/interface/pbp.ml
+++ b/contrib/interface/pbp.ml
@@ -48,7 +48,7 @@ type pbp_atom =
   | PbpTryClear of identifier list
   | PbpGeneralize of identifier * identifier list
   | PbpLApply of identifier (* = CutAndApply *)
-  | PbpIntros of intro_pattern_expr list
+  | PbpIntros of intro_pattern_expr located list
   | PbpSplit
   (* Existential *)
   | PbpExists of identifier
@@ -93,7 +93,7 @@ type pbp_rule = (identifier list *
                     pbp_sequence option;;
 
 
-let make_named_intro id = PbpIntros [IntroIdentifier id];;
+let make_named_intro id = PbpIntros [zz,IntroIdentifier id];;
 
 let make_clears str_list = PbpThen [PbpTryClear str_list]
 
@@ -171,7 +171,7 @@ let make_pbp_atomic_tactic = function
   | PbpRight -> TacAtom (zz, TacRight (false,NoBindings))
   | PbpIntros l -> TacAtom (zz, TacIntroPattern l)
   | PbpLApply h -> TacAtom (zz, TacLApply (make_var h))
-  | PbpApply h -> TacAtom (zz, TacApply (true,false,(make_var h,NoBindings)))
+  | PbpApply h -> TacAtom (zz, TacApply (true,false,[make_var h,NoBindings]))
   | PbpElim (hyp_name, names) ->
       let bind = List.map (fun s ->(zz,NamedHyp s,make_pbp_pattern s)) names in
       TacAtom
@@ -255,9 +255,9 @@ fun avoid c path -> match kind_of_term c, path with
 	or_and_tree_to_intro_pattern (id2::avoid) cont_expr path in
       let patt_list = 
 	if a = 1 then
-	  [cont_patt; IntroIdentifier id2]
+	  [zz,cont_patt; zz,IntroIdentifier id2]
 	else
-	  [IntroIdentifier id2; cont_patt] in
+	  [zz,IntroIdentifier id2; zz,cont_patt] in
       	(IntroOrAndPattern[patt_list], avoid_names, id, c, path, rank, 
 	 total_branches)
   | (App(oper, [|c1; c2|]), 2::3::path)
@@ -268,7 +268,7 @@ fun avoid c path -> match kind_of_term c, path with
 	     let id1 = next_global_ident x avoid in
 	     let cont_patt, avoid_names, id, c, path, rank, total_branches =
 	       or_and_tree_to_intro_pattern (id1::avoid) body path in
-	     (IntroOrAndPattern[[IntroIdentifier id1; cont_patt]],
+	     (IntroOrAndPattern[[zz,IntroIdentifier id1; zz,cont_patt]],
 	      avoid_names, id, c, path, rank, total_branches)
 	 | _ -> assert false)
   | (App(oper, [|c1; c2|]), 2::a::path)
@@ -282,9 +282,9 @@ fun avoid c path -> match kind_of_term c, path with
       let new_rank = if a = 1 then rank else rank+1 in
       let patt_list =
 	if a = 1 then
-	  [[cont_patt];[IntroIdentifier id2]]
+	  [[zz,cont_patt];[zz,IntroIdentifier id2]]
 	else
-	  [[IntroIdentifier id2];[cont_patt]] in
+	  [[zz,IntroIdentifier id2];[zz,cont_patt]] in
 	(IntroOrAndPattern patt_list, 
 	 avoid_names, id, c, path, new_rank, total_branches+1)
   | (_, path) -> let id = next_global_ident hyp_radix avoid in
@@ -305,13 +305,13 @@ let (imply_intro3: pbp_rule) = function
       let intro_patt, avoid_names, id, c, p, rank, total_branches =
 	or_and_tree_to_intro_pattern avoid prem path in
 	if total_branches = 1 then
-	  Some(chain_tactics [PbpIntros [intro_patt]]
+	  Some(chain_tactics [PbpIntros [zz,intro_patt]]
 		 (f avoid_names clear_names clear_flag (Some id)
 		    (kind_of_term c) path))
 	else
 	  Some
 	    (PbpThens
-	       ([PbpIntros [intro_patt]],
+	       ([PbpIntros [zz,intro_patt]],
 	    	auxiliary_goals clear_names clear_flag id
 		  (rank - 1)
 		  ((f avoid_names clear_names clear_flag (Some id)
@@ -667,7 +667,7 @@ let rec cleanup_clears str_list = function
 
 let rec optim3_aux str_list = function
     (PbpGeneralize (h,l1))::
-    (PbpIntros [IntroIdentifier s])::(PbpGeneralize (h',l2))::others
+    (PbpIntros [zz,IntroIdentifier s])::(PbpGeneralize (h',l2))::others
       when s=h' ->
       optim3_aux (s::str_list) (PbpGeneralize (h,l1@l2)::others)
   | (PbpTryClear names)::other ->
diff --git a/contrib/interface/showproof.ml b/contrib/interface/showproof.ml
index 953fb5e7..4b9c1332 100644
--- a/contrib/interface/showproof.ml
+++ b/contrib/interface/showproof.ml
@@ -1197,12 +1197,12 @@ let rec natural_ntree ig ntree =
 	  | TacAssumption -> natural_trivial ig lh g gs ltree
 	  | TacClear _ -> natural_clear ig lh g gs ltree
 (* Besoin de l'argument de la tactique *)
-	  | TacSimpleInduction (NamedHyp id) -> 
+	  | TacSimpleInductionDestruct (true,NamedHyp id) -> 
               natural_induction ig lh g gs ge id ltree false
 	  | TacExtend (_,"InductionIntro",[a]) -> 
               let id=(out_gen wit_ident a) in
               natural_induction ig lh g gs ge id ltree true
-	  | TacApply (_,false,(c,_)) -> natural_apply ig lh g gs (snd c) ltree
+	  | TacApply (_,false,[c,_]) -> natural_apply ig lh g gs (snd c) ltree
 	  | TacExact c -> natural_exact ig lh g gs (snd c) ltree
 	  | TacCut c -> natural_cut ig lh g gs (snd c) ltree
 	  | TacExtend (_,"CutIntro",[a]) ->
diff --git a/contrib/interface/xlate.ml b/contrib/interface/xlate.ml
index 7d1f57fe..da4908e5 100644
--- a/contrib/interface/xlate.ml
+++ b/contrib/interface/xlate.ml
@@ -615,8 +615,7 @@ let get_flag r =
   (* Rem: EVAR flag obsolète *)
   conv_flags, red_ids
 
-let rec xlate_intro_pattern =
- function
+let rec xlate_intro_pattern (loc,pat) = match pat with
   | IntroOrAndPattern [] -> assert false
   | IntroOrAndPattern (fp::ll) ->
       CT_disj_pattern
@@ -684,8 +683,8 @@ let xlate_one_unfold_block = function
 ;;
 
 let xlate_with_names = function
-    IntroAnonymous -> CT_coerce_ID_OPT_to_INTRO_PATT_OPT ctv_ID_OPT_NONE
-  | fp -> CT_coerce_INTRO_PATT_to_INTRO_PATT_OPT (xlate_intro_pattern fp)
+    None -> CT_coerce_ID_OPT_to_INTRO_PATT_OPT ctv_ID_OPT_NONE
+  | Some fp -> CT_coerce_INTRO_PATT_to_INTRO_PATT_OPT (xlate_intro_pattern fp)
 
 let rawwit_main_tactic = Pcoq.rawwit_tactic Pcoq.tactic_main_level
 
@@ -829,11 +828,11 @@ and xlate_tactic =
                          | [] -> assert false
                          | fst::others ->
                              CT_match_tac_rules(fst, others))
-   | TacMatchContext (_,_,[]) | TacMatchContext (true,_,_) -> failwith ""
-   | TacMatchContext (false,false,rule1::rules) ->
+   | TacMatchGoal (_,_,[]) | TacMatchGoal (true,_,_) -> failwith ""
+   | TacMatchGoal (false,false,rule1::rules) ->
          CT_match_context(xlate_context_rule rule1,
                           List.map xlate_context_rule rules)
-   | TacMatchContext (false,true,rule1::rules) ->
+   | TacMatchGoal (false,true,rule1::rules) ->
          CT_match_context_reverse(xlate_context_rule rule1,
                           List.map xlate_context_rule rules)
    | TacLetIn (false, l, t) ->
@@ -926,23 +925,26 @@ and xlate_tac =
     | TacExtend (_,"contradiction",[]) -> CT_contradiction
     | TacDoubleInduction (n1, n2) ->
 	CT_tac_double (xlate_quantified_hypothesis n1, xlate_quantified_hypothesis n2)
-    | TacExtend (_,"discriminate", [idopt]) ->
+    | TacExtend (_,"discriminate", []) ->
+     CT_discriminate_eq (CT_coerce_ID_OPT_to_ID_OR_INT_OPT ctv_ID_OPT_NONE)
+    | TacExtend (_,"discriminate", [id]) ->
      CT_discriminate_eq
          (xlate_quantified_hypothesis_opt
-	    (out_gen (wit_opt rawwit_quant_hyp) idopt))
-    | TacExtend (_,"simplify_eq", [idopt]) ->
-	let idopt1 = out_gen (wit_opt rawwit_quant_hyp) idopt in
-	let idopt2 = match idopt1 with
-	    None -> CT_coerce_ID_OPT_to_ID_OR_INT_OPT
-		(CT_coerce_NONE_to_ID_OPT CT_none)
-	  | Some v ->
-	      CT_coerce_ID_OR_INT_to_ID_OR_INT_OPT
-	      	(xlate_quantified_hypothesis v) in
-	  CT_simplify_eq idopt2
-    | TacExtend (_,"injection", [idopt]) ->
+	    (Some (out_gen rawwit_quant_hyp id)))
+    | TacExtend (_,"simplify_eq", []) ->
+	  CT_simplify_eq (CT_coerce_ID_OPT_to_ID_OR_INT_OPT
+		(CT_coerce_NONE_to_ID_OPT CT_none))
+    | TacExtend (_,"simplify_eq", [id]) ->
+	let id1 = out_gen rawwit_quant_hyp id in
+	let id2 = CT_coerce_ID_OR_INT_to_ID_OR_INT_OPT
+	      	(xlate_quantified_hypothesis id1) in
+	  CT_simplify_eq id2
+    | TacExtend (_,"injection", []) ->
+     CT_injection_eq (CT_coerce_ID_OPT_to_ID_OR_INT_OPT ctv_ID_OPT_NONE)
+    | TacExtend (_,"injection", [id]) ->
      CT_injection_eq
          (xlate_quantified_hypothesis_opt
-	    (out_gen (wit_opt rawwit_quant_hyp) idopt))
+	    (Some (out_gen rawwit_quant_hyp id)))
     | TacExtend (_,"injection_as", [idopt;ipat]) ->
 	xlate_error "TODO: injection as"
     | TacFix (idopt, n) ->
@@ -967,19 +969,22 @@ and xlate_tac =
 	CT_intros_until (CT_coerce_ID_to_ID_OR_INT (xlate_ident id))
     | TacIntrosUntil (AnonHyp n) -> 
 	CT_intros_until (CT_coerce_INT_to_ID_OR_INT (CT_int n))
-    | TacIntroMove (Some id1, Some (_,id2)) ->
-     CT_intro_after(CT_coerce_ID_to_ID_OPT (xlate_ident id1),xlate_ident id2)
-    | TacIntroMove (None, Some (_,id2)) ->
-	CT_intro_after(CT_coerce_NONE_to_ID_OPT CT_none, xlate_ident id2)
-    | TacMove (true, id1, id2) ->
+    | TacIntroMove (Some id1, MoveAfter id2) ->
+     CT_intro_after(CT_coerce_ID_to_ID_OPT (xlate_ident id1),xlate_hyp id2)
+    | TacIntroMove (None, MoveAfter id2) ->
+	CT_intro_after(CT_coerce_NONE_to_ID_OPT CT_none, xlate_hyp id2)
+    | TacMove (true, id1, MoveAfter id2) ->
 	CT_move_after(xlate_hyp id1, xlate_hyp id2)
     | TacMove (false, id1, id2) -> xlate_error "Non dep Move is only internal"
+    | TacMove _ -> xlate_error "TODO: move before, at top, at bottom"
     | TacIntroPattern patt_list ->
 	CT_intros
 	  (CT_intro_patt_list (List.map xlate_intro_pattern patt_list))
-    | TacIntroMove (Some id, None) ->
+    | TacIntroMove (Some id, MoveToEnd true) ->
      CT_intros (CT_intro_patt_list[CT_coerce_ID_to_INTRO_PATT(xlate_ident id)])
-    | TacIntroMove (None, None) ->  CT_intro (CT_coerce_NONE_to_ID_OPT CT_none)
+    | TacIntroMove (None, MoveToEnd true) ->
+	CT_intro (CT_coerce_NONE_to_ID_OPT CT_none)
+    | TacIntroMove _ -> xlate_error "TODO"
     | TacLeft (false,bindl) -> CT_left (xlate_bindings bindl)
     | TacRight (false,bindl) -> CT_right (xlate_bindings bindl)
     | TacSplit (false,false,bindl) -> CT_split (xlate_bindings bindl)
@@ -1150,11 +1155,12 @@ and xlate_tac =
 	xlate_error "TODO: trivial using"
     | TacReduce (red, l) ->
      CT_reduce (xlate_red_tactic red, xlate_clause l)
-    | TacApply (true,false,(c,bindl)) ->
+    | TacApply (true,false,[c,bindl]) ->
      CT_apply (xlate_formula c, xlate_bindings bindl)
-    | TacApply (true,true,(c,bindl)) ->
+    | TacApply (true,true,[c,bindl]) ->
      CT_eapply (xlate_formula c, xlate_bindings bindl)
-    | TacApply (false,_,_) -> xlate_error "TODO: simple (e)apply"
+    | TacApply (_,_,_) ->
+	xlate_error "TODO: simple (e)apply and iterated apply"
     | TacConstructor (false,n_or_meta, bindl) ->
 	let n = match n_or_meta with AI n -> n | MetaId _ -> xlate_error ""
 	in CT_constructor (CT_int n, xlate_bindings bindl)
@@ -1178,10 +1184,12 @@ and xlate_tac =
     | TacCase (false,(c1,sl)) ->
      CT_casetac (xlate_formula c1, xlate_bindings sl)
     | TacElim (true,_,_) | TacCase (true,_)
-    | TacNewDestruct (true,_,_,_,_) | TacNewInduction (true,_,_,_,_) ->
+    | TacInductionDestruct (_,true,_) ->
 	xlate_error "TODO: eelim, ecase, edestruct, einduction"
-    | TacSimpleInduction h -> CT_induction (xlate_quantified_hypothesis h)
-    | TacSimpleDestruct h -> CT_destruct (xlate_quantified_hypothesis h)
+    | TacSimpleInductionDestruct (true,h) ->
+	CT_induction (xlate_quantified_hypothesis h)
+    | TacSimpleInductionDestruct (false,h) ->
+	CT_destruct (xlate_quantified_hypothesis h)
     | TacCut c -> CT_cut (xlate_formula c)
     | TacLApply c -> CT_use (xlate_formula c)
     | TacDecompose ([],c) ->
@@ -1222,19 +1230,16 @@ and xlate_tac =
 	CT_dauto(xlate_int_or_var_opt_to_int_opt a, xlate_int_opt b)
     | TacDAuto (a, b, _) ->
 	xlate_error "TODO: dauto using"
-    | TacNewDestruct(false,a,b,c,None) ->
+    | TacInductionDestruct(true,false,[a,b,(None,c),None]) ->
 	CT_new_destruct
 	  (List.map  xlate_int_or_constr a, xlate_using b, 
 	   xlate_with_names c)
-    | TacNewInduction(false,a,b,c,None) ->
+    | TacInductionDestruct(false,false,[a,b,(None,c),None]) ->
 	CT_new_induction
 	  (List.map xlate_int_or_constr a, xlate_using b,
 	   xlate_with_names c)
-    | TacNewDestruct(false,a,b,c,_) -> xlate_error "TODO: destruct in"
-    | TacNewInduction(false,a,b,c,_) ->xlate_error "TODO: induction in"
-    (*| TacInstantiate (a, b, cl) -> 
-        CT_instantiate(CT_int a, xlate_formula b,
-		       assert false) *)
+    | TacInductionDestruct(_,false,_) -> 
+	xlate_error "TODO: clause 'in' and full 'as' of destruct/induction"
     | TacLetTac (na, c, cl, true) when cl = nowhere -> 
         CT_pose(xlate_id_opt_aux na, xlate_formula c)
     | TacLetTac (na, c, cl, true) ->
@@ -1243,13 +1248,13 @@ and xlate_tac =
 		     but the structures are different *)
 		  xlate_clause cl)
     | TacLetTac (na, c, cl, false) -> xlate_error "TODO: remember"
-    | TacAssert (None, IntroIdentifier id, c) -> 
+    | TacAssert (None, (_,IntroIdentifier id), c) -> 
         CT_assert(xlate_id_opt ((0,0),Name id), xlate_formula c)
-    | TacAssert (None, IntroAnonymous, c) -> 
+    | TacAssert (None, (_,IntroAnonymous), c) -> 
         CT_assert(xlate_id_opt ((0,0),Anonymous), xlate_formula c)
-    | TacAssert (Some (TacId []), IntroIdentifier id, c) -> 
+    | TacAssert (Some (TacId []), (_,IntroIdentifier id), c) -> 
         CT_truecut(xlate_id_opt ((0,0),Name id), xlate_formula c)
-    | TacAssert (Some (TacId []), IntroAnonymous, c) -> 
+    | TacAssert (Some (TacId []), (_,IntroAnonymous), c) -> 
         CT_truecut(xlate_id_opt ((0,0),Anonymous), xlate_formula c)
     | TacAssert _ ->
 	xlate_error "TODO: assert with 'as' and 'by' and pose proof with 'as'"
diff --git a/contrib/micromega/Micromegatac.v b/contrib/micromega/Psatz.v
index 13c7eace..b2dd9910 100644
--- a/contrib/micromega/Micromegatac.v
+++ b/contrib/micromega/Psatz.v
@@ -23,57 +23,53 @@ Require Export RingMicromega.
 Require Import VarMap.
 Require Tauto.
 
-Ltac micromegac dom d :=
+Ltac xpsatz dom d :=
   let tac := lazymatch dom with
   | Z => 
-    micromegap d ;
+    (sos_Z || psatz_Z d) ;
     intros __wit __varmap __ff ; 
     change (Tauto.eval_f (Zeval_formula (@find Z Z0 __varmap)) __ff) ; 
     apply (ZTautoChecker_sound __ff __wit); vm_compute ; reflexivity
   | R =>
-    rmicromegap d ;
+    (sos_R || psatz_R d) ;
     intros __wit __varmap __ff ; 
     change (Tauto.eval_f (Reval_formula (@find R 0%R __varmap)) __ff) ; 
     apply (RTautoChecker_sound __ff __wit); vm_compute ; reflexivity
+  | Q =>
+      (sos_Q || psatz_Q d) ;
+    intros __wit __varmap __ff ; 
+    change (Tauto.eval_f (Qeval_formula (@find Q 0%Q __varmap)) __ff) ; 
+    apply (QTautoChecker_sound __ff __wit); vm_compute ; reflexivity
   | _ => fail "Unsupported domain"
   end in tac.
 
-Tactic Notation "micromega" constr(dom) int_or_var(n) := micromegac dom n.
-Tactic Notation "micromega" constr(dom) := micromegac dom ltac:-1.
+Tactic Notation "psatz" constr(dom) int_or_var(n) := xpsatz dom n.
+Tactic Notation "psatz" constr(dom) := xpsatz dom ltac:-1.
 
-Ltac zfarkas :=  omicronp ;
-  intros __wit __varmap __ff ; 
-  change (Tauto.eval_f (Zeval_formula (@find Z Z0 __varmap)) __ff) ; 
-  apply (ZTautoChecker_sound __ff __wit); vm_compute ; reflexivity.
-
-Ltac omicron dom :=
+Ltac psatzl dom :=
   let tac := lazymatch dom with
   | Z =>
-    zomicronp ;
+    psatzl_Z ;
     intros __wit __varmap __ff ;
     change (Tauto.eval_f (Zeval_formula (@find Z Z0 __varmap)) __ff) ; 
     apply (ZTautoChecker_sound __ff __wit); vm_compute ; reflexivity
   | Q =>
-    qomicronp ; 
+    psatzl_Q ; 
     intros __wit __varmap __ff ; 
     change (Tauto.eval_f (Qeval_formula (@find Q 0%Q __varmap)) __ff) ; 
     apply (QTautoChecker_sound __ff __wit); vm_compute ; reflexivity
   | R => 
-    romicronp ;
+    psatzl_R ;
     intros __wit __varmap __ff ;
     change (Tauto.eval_f (Reval_formula (@find R 0%R __varmap)) __ff) ; 
     apply (RTautoChecker_sound __ff __wit); vm_compute ; reflexivity
   | _ => fail "Unsupported domain"
   end in tac.
 
-Ltac sos dom :=
-  let tac := lazymatch dom with
-  | Z =>
-    sosp ;
-    intros __wit __varmap __ff ;
-    change (Tauto.eval_f (Zeval_formula (@find Z Z0 __varmap)) __ff) ; 
-    apply (ZTautoChecker_sound __ff __wit); vm_compute ; reflexivity
-  | _ => fail "Unsupported domain"
-  end in tac.
 
 
+Ltac lia := 
+  xlia ;
+  intros __wit __varmap __ff ;
+    change (Tauto.eval_f (Zeval_formula (@find Z Z0 __varmap)) __ff) ; 
+      apply (ZTautoChecker_sound __ff __wit); vm_compute ; reflexivity.
diff --git a/contrib/micromega/QMicromega.v b/contrib/micromega/QMicromega.v
index 9e95f6c4..c054f218 100644
--- a/contrib/micromega/QMicromega.v
+++ b/contrib/micromega/QMicromega.v
@@ -16,38 +16,11 @@ Require Import OrderedRing.
 Require Import RingMicromega.
 Require Import Refl.
 Require Import QArith.
-Require Import Qring.
-
-(* Qsrt has been removed from the library ? *)
-Definition Qsrt : ring_theory 0 1 Qplus Qmult Qminus Qopp Qeq.
-Proof.
-  constructor.
-  exact Qplus_0_l.
-  exact Qplus_comm.
-  exact Qplus_assoc.
-  exact Qmult_1_l.
-  exact Qmult_comm.
-  exact Qmult_assoc.
-  exact Qmult_plus_distr_l.
-  reflexivity.
-  exact Qplus_opp_r.
-Qed.
-
-
-Add Ring Qring : Qsrt.
-
-Lemma Qmult_neutral : forall x , 0 * x == 0.
-Proof.
-  intros.
-  compute.
-  reflexivity.
-Qed.
-
-(* Is there any qarith database ? *)
+Require Import Qfield.
 
 Lemma Qsor : SOR 0 1 Qplus Qmult Qminus Qopp Qeq  Qle Qlt.
 Proof.
-  constructor; intros ; subst ; try (intuition (subst; auto  with qarith)).
+  constructor; intros ; subst ; try (intuition (subst; auto with qarith)).
   apply Q_Setoid.
   rewrite H ; rewrite H0 ; reflexivity.
   rewrite H ; rewrite H0 ; reflexivity.
@@ -67,45 +40,12 @@ Proof.
   destruct(Q_dec n m) as [[H1 |H1] | H1 ] ; tauto.
   apply (Qplus_le_compat  p p n m  (Qle_refl p) H).
   generalize (Qmult_lt_compat_r 0 n m H0 H).
-  rewrite Qmult_neutral.
+  rewrite Qmult_0_l.
   auto.
   compute in H.
   discriminate.
 Qed.
 
-Definition Qeq_bool (p q : Q) : bool := Zeq_bool (Qnum p * ' Qden q)%Z  (Qnum q * ' Qden p)%Z.
-
-Definition Qle_bool (x y : Q) : bool := Zle_bool (Qnum x * ' Qden y)%Z (Qnum y * ' Qden x)%Z.
-
-Require ZMicromega.
-
-Lemma Qeq_bool_ok : forall x y, Qeq_bool x y = true -> x == y.
-Proof.
-  intros.
-  unfold Qeq_bool in H.
-  unfold Qeq.
-  apply (Zeqb_ok  _ _ H).
-Qed.
-
-
-Lemma Qeq_bool_neq : forall x y, Qeq_bool x y = false -> ~ x == y.
-Proof.
-  unfold Qeq_bool,Qeq.
-  red ; intros ; subst.
-  rewrite H0 in H.
-  apply  (ZMicromega.Zeq_bool_neq _ _ H).
-  reflexivity.
-Qed.
-
-Lemma Qle_bool_imp_le : forall x y : Q, Qle_bool x y = true -> x <= y.
-Proof.
-  unfold Qle_bool, Qle.
-  intros.
-  apply Zle_bool_imp_le ; auto.
-Qed.
-  
-
-
 
 Lemma QSORaddon :
   SORaddon 0 1 Qplus Qmult Qminus Qopp  Qeq  Qle (* ring elements *)
@@ -115,7 +55,7 @@ Lemma QSORaddon :
 Proof.
   constructor.
   constructor ; intros ; try reflexivity.
-  apply Qeq_bool_ok ; auto.
+  apply Qeq_bool_eq; auto.
   constructor.
   reflexivity.
   intros x y.
@@ -173,9 +113,9 @@ match o with
 | OpEq =>  Qeq
 | OpNEq => fun x y  => ~ x == y
 | OpLe => Qle
-| OpGe => Qge
+| OpGe => fun x y => Qle y x
 | OpLt => Qlt
-| OpGt => Qgt
+| OpGt => fun x y => Qlt y x
 end.
 
 Definition Qeval_formula (e:PolEnv Q) (ff : Formula Q) :=
diff --git a/contrib/micromega/RMicromega.v b/contrib/micromega/RMicromega.v
index ef28db32..7c6969c2 100644
--- a/contrib/micromega/RMicromega.v
+++ b/contrib/micromega/RMicromega.v
@@ -76,12 +76,12 @@ Proof.
   apply mult_IZR.
   apply Ropp_Ropp_IZR.
   apply IZR_eq.
-  apply Zeqb_ok ; auto.
+  apply Zeq_bool_eq ; auto.
   apply R_power_theory.
   intros x y.
   intro.
   apply IZR_neq.
-  apply ZMicromega.Zeq_bool_neq ; auto.
+  apply Zeq_bool_neq ; auto.
   intros. apply IZR_le.  apply Zle_bool_imp_le. auto.
 Qed.
 
@@ -97,9 +97,34 @@ Definition INZ (n:N) : R :=
 Definition Reval_expr := eval_pexpr  Rplus Rmult Rminus Ropp IZR Nnat.nat_of_N pow.
 
 
-Definition Reval_formula :=
+Definition Reval_op2 (o:Op2) : R -> R -> Prop :=
+    match o with
+      | OpEq =>  @eq R
+      | OpNEq => fun x y  => ~ x = y
+      | OpLe => Rle
+      | OpGe => Rge
+      | OpLt => Rlt
+      | OpGt => Rgt
+    end.
+
+
+Definition Reval_formula (e: PolEnv R) (ff : Formula Z) :=
+  let (lhs,o,rhs) := ff in Reval_op2 o (Reval_expr e lhs) (Reval_expr e rhs).
+
+Definition Reval_formula' :=
   eval_formula  Rplus Rmult Rminus Ropp (@eq R) Rle Rlt IZR Nnat.nat_of_N pow.
 
+Lemma Reval_formula_compat : forall env f, Reval_formula env f <-> Reval_formula' env f.
+Proof.
+  intros.
+  unfold Reval_formula.
+  destruct f.
+  unfold Reval_formula'.
+  unfold Reval_expr.
+  split ; destruct Fop ; simpl ; auto.
+  apply Rge_le.
+  apply Rle_ge.
+Qed.
 
 Definition Reval_nformula :=
   eval_nformula 0 Rplus Rmult Rminus Ropp (@eq R) Rle Rlt IZR Nnat.nat_of_N pow.
@@ -139,8 +164,9 @@ Proof.
   unfold RTautoChecker.
   apply (tauto_checker_sound  Reval_formula Reval_nformula).
   apply Reval_nformula_dec.
-  intros. unfold Reval_formula. now apply (cnf_normalise_correct Rsor).
-  intros. unfold Reval_formula. now apply (cnf_negate_correct Rsor).
+  intros. rewrite Reval_formula_compat.
+  unfold Reval_formula'. now apply (cnf_normalise_correct Rsor).
+  intros. rewrite Reval_formula_compat. unfold Reval_formula. now apply (cnf_negate_correct Rsor).
   intros t w0.
   apply RWeakChecker_sound.
 Qed.
diff --git a/contrib/micromega/ZMicromega.v b/contrib/micromega/ZMicromega.v
index 94c83f73..0855925a 100644
--- a/contrib/micromega/ZMicromega.v
+++ b/contrib/micromega/ZMicromega.v
@@ -39,15 +39,6 @@ Proof.
   apply Zmult_lt_0_compat ; auto.
 Qed.
 
-Lemma Zeq_bool_neq : forall x y, Zeq_bool x y = false -> x <> y.
-Proof.
-  red ; intros.
-  subst.
-  unfold Zeq_bool in H.
-  rewrite Zcompare_refl  in H.
-  discriminate.
-Qed.
-
 Lemma ZSORaddon :
   SORaddon 0 1 Zplus Zmult Zminus Zopp  (@eq Z) Zle (* ring elements *)
   0%Z 1%Z Zplus Zmult Zminus Zopp (* coefficients *)
@@ -56,7 +47,7 @@ Lemma ZSORaddon :
 Proof.
   constructor.
   constructor ; intros ; try reflexivity.
-  apply Zeqb_ok ; auto.
+  apply Zeq_bool_eq ; auto.
   constructor.
   reflexivity.
   intros x y.
diff --git a/contrib/micromega/certificate.ml b/contrib/micromega/certificate.ml
index 88e882e6..f4efcd08 100644
--- a/contrib/micromega/certificate.ml
+++ b/contrib/micromega/certificate.ml
@@ -108,7 +108,7 @@ struct
   if compare_num v (Int 0) <> 0
   then 
    if Monomial.compare Monomial.const k = 0
-   then 	Printf.fprintf o "%s " (string_of_num v)
+   then         Printf.fprintf o "%s " (string_of_num v)
    else Printf.fprintf o "%s*%a " (string_of_num v) Monomial.pp k) p  
 
  (* Get the coefficient of monomial mn *)
@@ -304,8 +304,8 @@ let factorise_linear_cone c =
       (match pending with
        | None -> rebuild_cone l (Some e) 
        | Some p -> (match factorise p e with
-	  | None -> Mc.S_Add(p, rebuild_cone l (Some e))
-	  | Some f -> rebuild_cone l (Some f) )
+          | None -> Mc.S_Add(p, rebuild_cone l (Some e))
+          | Some f -> rebuild_cone l (Some f) )
       ) in
 
   (rebuild_cone (List.sort Pervasives.compare (cone_list c [])) None)
@@ -387,10 +387,10 @@ let build_linear_system l =
   (* I need at least something strictly positive *)
  let strict = {
   coeffs = Vect.from_list ((Big_int unit_big_int)::
-			    (List.map (fun (x,y) -> 
-			     match y with Mc.Strict -> 
-			      Big_int unit_big_int 
-			      | _ -> Big_int zero_big_int) l));
+                            (List.map (fun (x,y) -> 
+                             match y with Mc.Strict -> 
+                              Big_int unit_big_int 
+                              | _ -> Big_int zero_big_int) l));
   op = Ge ; cst = Big_int unit_big_int } in
   (* Add the positivity constraint *)
   {coeffs = Vect.from_list ([Big_int unit_big_int]) ; 
@@ -414,22 +414,22 @@ let make_certificate n_spec cert li =
       in
       let rec scalar_product cert l =
        match cert with
-	| [] -> Mc.S_Z
-	| c::cert -> match l with
-	   | [] -> failwith "make_certificate(1)"
-	   | i::l ->  
-	      let r = scalar_product cert l in
-	       match compare_big_int c  zero_big_int with
-		| -1 -> Mc.S_Add (
-		   Mc.S_Ideal (Mc.PEc ( bint_to_cst c), Mc.S_In (Ml2C.nat i)), 
-		   r)
-		| 0  -> r
-		| _ ->  Mc.S_Add (
-		   Mc.S_Mult (Mc.S_Pos (bint_to_cst c), Mc.S_In (Ml2C.nat i)),
-		   r) in
+        | [] -> Mc.S_Z
+        | c::cert -> match l with
+           | [] -> failwith "make_certificate(1)"
+           | i::l ->  
+              let r = scalar_product cert l in
+               match compare_big_int c  zero_big_int with
+                | -1 -> Mc.S_Add (
+                   Mc.S_Ideal (Mc.PEc ( bint_to_cst c), Mc.S_In (Ml2C.nat i)), 
+                   r)
+                | 0  -> r
+                | _ ->  Mc.S_Add (
+                   Mc.S_Mult (Mc.S_Pos (bint_to_cst c), Mc.S_In (Ml2C.nat i)),
+                   r) in
        
       Some ((factorise_linear_cone 
-	      (simplify_cone n_spec (Mc.S_Add (cst, scalar_product cert' li)))))
+              (simplify_cone n_spec (Mc.S_Add (cst, scalar_product cert' li)))))
 
 
 exception Found of Monomial.t
@@ -444,7 +444,7 @@ let raw_certificate l =
   with x -> 
    if debug 
    then (Printf.printf "raw certificate %s" (Printexc.to_string x);   
-	 flush stdout) ;
+         flush stdout) ;
    None
 
 
@@ -462,9 +462,9 @@ let linear_prover n_spec l  =
   (fun (x,_) -> if snd' x = Mc.NonEqual then true else false) li in
  let l' = List.map 
   (fun (c,i) -> let (Mc.Pair(x,y)) = c in 
-		 match y with 
-		   Mc.NonEqual -> failwith "cannot happen" 
-		  |  y -> ((dev_form n_spec x, y),i)) l' in
+                 match y with 
+                   Mc.NonEqual -> failwith "cannot happen" 
+                  |  y -> ((dev_form n_spec x, y),i)) l' in
   
   simple_linear_prover n_spec l' 
 
@@ -513,106 +513,228 @@ let rec remove_assoc p x l =
 
 let eq x y = Vect.compare x y = 0
 
-(* Beurk... this code is a shame *)
+let  remove e  l  = List.fold_left (fun l x -> if eq x e then l else x::l) [] l
 
-let rec zlinear_prover sys = xzlinear_prover [] sys
 
-and xzlinear_prover enum l :  (Mc.proofTerm option) = 
- match linear_prover z_spec l with
-  | Some prf ->  Some (Mc.RatProof prf)
-  | None     ->  
+(* The prover is (probably) incomplete --
+   only searching for naive cutting planes *)
+
+let candidates sys = 
+ let ll = List.fold_right (
+  fun (Mc.Pair(e,k)) r -> 
+   match k with 
+    | Mc.NonStrict -> (dev_form z_spec e , Ge)::r
+    | Mc.Equal     ->  (dev_form z_spec e , Eq)::r 
+       (* we already know the bound -- don't compute it again *)
+    | _     -> failwith "Cannot happen candidates") sys [] in
+
+ let (sys,var_mn) = make_linear_system ll in
+ let vars = mapi (fun _ i -> Vect.set i (Int 1) Vect.null) var_mn in
+  (List.fold_left (fun l cstr ->   
+   let gcd = Big_int (Vect.gcd cstr.coeffs) in
+    if gcd =/ (Int 1) && cstr.op = Eq 
+    then l 
+    else  (Vect.mul (Int 1 // gcd) cstr.coeffs)::l) [] sys) @ vars
+
+
+let rec xzlinear_prover planes sys = 
+ match linear_prover z_spec sys with
+  | Some prf -> Some (Mc.RatProof prf)
+  | None     -> (* find the candidate with the smallest range *)
+     (* Grrr - linear_prover is also calling 'make_linear_system' *)
      let ll = List.fold_right (fun (Mc.Pair(e,k)) r -> match k with 
        Mc.NonEqual -> r  
       | k -> (dev_form z_spec e , 
-	     match k with
-	      | Mc.Strict | Mc.NonStrict -> Ge 
-		 (* Loss of precision -- weakness of fourier*)
-	      | Mc.Equal              -> Eq
-	      | Mc.NonEqual -> failwith "Cannot happen") :: r) l [] in
-
-     let (sys,var) = make_linear_system ll in
-     let res = 
-      match Fourier.find_Q_interval sys with
-       | Some(i,x,j) -> if i =/ j 
-	 then Some(i,Vect.set x (Int 1) Vect.null,i) else None 
-       | None -> None in
-     let res = match res with
-      | None ->
-	 begin
-	  let candidates = List.fold_right 
-	   (fun cstr acc -> 
-	    let gcd = Big_int (Vect.gcd cstr.coeffs) in
-	    let vect = Vect.mul (Int 1 // gcd) cstr.coeffs in
-	     if mem eq vect enum then acc
-	     else ((vect,Fourier.optimise vect sys)::acc)) sys [] in
-	  let candidates = List.fold_left (fun l (x,i) -> 
-	   match i with 
-	     None -> (x,Empty)::l 
-	    | Some i ->  (x,i)::l) [] (candidates) in
-	   match List.fold_left (fun (x1,i1) (x2,i2) -> 
-	    if smaller_itv i1 i2 
-	    then (x1,i1) else (x2,i2)) (Vect.null,Itv(None,None)) candidates 
-	   with
-	    | (i,Empty) -> None
-	    | (x,Itv(Some i, Some j))  -> Some(i,x,j)
-	    | (x,Point n) ->  Some(n,x,n)
-	    |   x        ->   match Fourier.find_Q_interval sys with
-		 | None -> None
-		 | Some(i,x,j) -> 
-		    if i =/ j 
-		    then Some(i,Vect.set x (Int 1) Vect.null,i) 
-		    else None 
-	 end
-      |   _ -> res in
-
-      match res with 
+             match k with
+               Mc.NonStrict -> Ge 
+              | Mc.Equal              -> Eq
+              | Mc.Strict | Mc.NonEqual -> failwith "Cannot happen") :: r) sys [] in
+     let (ll,var) = make_linear_system ll in
+     let candidates = List.fold_left (fun  acc vect -> 
+      match Fourier.optimise vect ll with
+       | None -> acc
+       | Some i -> 
+(*	  Printf.printf "%s in %s\n" (Vect.string vect) (string_of_intrvl i) ; *)
+	  flush stdout ; 
+	  (vect,i) ::acc)  [] planes in
+
+     let smallest_interval = 
+      match List.fold_left (fun (x1,i1) (x2,i2) -> 
+       if smaller_itv i1 i2 
+       then (x1,i1) else (x2,i2)) (Vect.null,Itv(None,None)) candidates 
+      with
+       | (x,Itv(Some i, Some j))  -> Some(i,x,j)
+       | (x,Point n) ->  Some(n,x,n)
+       |   x        ->   None (* This might be a cutting plane *)
+      in
+      match smallest_interval with
        | Some (lb,e,ub) -> 
-	  let (lbn,lbd) = 
-	   (Ml2C.bigint (sub_big_int (numerator lb)  unit_big_int),
-	   Ml2C.bigint (denominator lb)) in
-	  let (ubn,ubd) = 
-	   (Ml2C.bigint (add_big_int unit_big_int (numerator ub)) , 
-	   Ml2C.bigint (denominator ub)) in
-	  let expr = list_to_polynomial var (Vect.to_list e) in
-	   (match 
-	     (*x <= ub ->  x  > ub *)
-	     linear_prover  z_spec 
-	      (Mc.Pair(pplus (pmult (pconst ubd) expr) (popp (pconst  ubn)),
-		      Mc.NonStrict) :: l),
-	    (* lb <= x  -> lb > x *)
-	    linear_prover z_spec 
-	     (Mc.Pair( pplus  (popp (pmult  (pconst lbd) expr)) (pconst lbn) ,  
-		     Mc.NonStrict)::l) 
-	    with
-	     | Some cub , Some clb  ->   
-		(match zlinear_enum (e::enum)   expr 
-		  (ceiling_num lb)  (floor_num ub) l 
-		 with
-		 | None -> None
-		 | Some prf -> 
-		    Some (Mc.EnumProof(Ml2C.q lb,expr,Ml2C.q ub,clb,cub,prf)))
-	     | _ -> None
-	   )
+          let (lbn,lbd) = 
+           (Ml2C.bigint (sub_big_int (numerator lb)  unit_big_int),
+           Ml2C.bigint (denominator lb)) in
+          let (ubn,ubd) = 
+           (Ml2C.bigint (add_big_int unit_big_int (numerator ub)) , 
+           Ml2C.bigint (denominator ub)) in
+          let expr = list_to_polynomial var (Vect.to_list e) in
+           (match 
+             (*x <= ub ->  x  > ub *)
+             linear_prover  z_spec 
+              (Mc.Pair(pplus (pmult (pconst ubd) expr) (popp (pconst  ubn)),
+                      Mc.NonStrict) :: sys),
+            (* lb <= x  -> lb > x *)
+            linear_prover z_spec 
+             (Mc.Pair( pplus  (popp (pmult  (pconst lbd) expr)) (pconst lbn) ,  
+                     Mc.NonStrict)::sys) 
+            with
+             | Some cub , Some clb  ->   
+                (match zlinear_enum  (remove e planes)   expr 
+                  (ceiling_num lb)  (floor_num ub) sys 
+                 with
+                  | None -> None
+                  | Some prf -> 
+                     Some (Mc.EnumProof(Ml2C.q lb,expr,Ml2C.q ub,clb,cub,prf)))
+             | _ -> None
+           )
        |  _ -> None
-and xzlinear_enum enum expr clb cub l = 
+and zlinear_enum  planes expr clb cub l = 
  if clb >/  cub
  then Some Mc.Nil
  else 
   let pexpr = pplus (popp (pconst (Ml2C.bigint (numerator clb)))) expr in
   let sys' = (Mc.Pair(pexpr, Mc.Equal))::l in
-   match xzlinear_prover enum sys' with
+   (*let enum =  *)
+   match xzlinear_prover planes sys' with
     | None -> if debug then print_string "zlp?"; None
     | Some prf -> if debug then print_string "zlp!";
-    match zlinear_enum enum expr (clb +/ (Int 1)) cub l with
+    match zlinear_enum planes expr (clb +/ (Int 1)) cub l with
      | None -> None
      | Some prfl -> Some (Mc.Cons(prf,prfl))
 
-and zlinear_enum enum expr clb cub l = 
- let res = xzlinear_enum enum expr clb cub l in
-  if debug then Printf.printf "zlinear_enum %s %s -> %s\n" 
-   (string_of_num clb) 
-   (string_of_num cub) 
-   (match res with
-    | None -> "None"
-    | Some r -> "Some") ; res
+let zlinear_prover sys =  
+ let candidates = candidates sys in
+ (*  Printf.printf "candidates %d" (List.length candidates) ; *) 
+ xzlinear_prover candidates sys
+
+open Sos
+
+let rec scale_term t = 
+ match t with
+  | Zero    -> unit_big_int , Zero
+  | Const n ->  (denominator n) , Const (Big_int (numerator n))
+  | Var n   -> unit_big_int , Var n
+  | Inv _   -> failwith "scale_term : not implemented"
+  | Opp t   -> let s, t = scale_term t in s, Opp t
+  | Add(t1,t2) -> let s1,y1 = scale_term t1 and s2,y2 = scale_term t2 in
+    let g = gcd_big_int s1 s2 in
+    let s1' = div_big_int s1 g in
+    let s2' = div_big_int s2 g in
+    let e = mult_big_int g (mult_big_int s1' s2') in
+     if (compare_big_int e unit_big_int) = 0
+     then (unit_big_int, Add (y1,y2))
+     else 	e, Add (Mul(Const (Big_int s2'), y1),
+		       Mul (Const (Big_int s1'), y2))
+  | Sub _ -> failwith "scale term: not implemented"
+  | Mul(y,z) ->       let s1,y1 = scale_term y and s2,y2 = scale_term z in
+		       mult_big_int s1 s2 , Mul (y1, y2)
+  |  Pow(t,n) -> let s,t = scale_term t in
+		  power_big_int_positive_int s  n , Pow(t,n)
+  |   _ -> failwith "scale_term : not implemented"
+
+let scale_term t =
+ let (s,t') = scale_term t in
+  s,t'
+
+
+let get_index_of_ith_match f i l  =
+ let rec get j res l =
+  match l with
+   | [] -> failwith "bad index"
+   | e::l -> if f e
+     then 
+       (if j = i then res else get (j+1) (res+1) l )
+     else get j (res+1) l in
+  get 0 0 l
+
+
+let rec scale_certificate pos = match pos with
+ | Axiom_eq i ->  unit_big_int , Axiom_eq i
+ | Axiom_le i ->  unit_big_int , Axiom_le i
+ | Axiom_lt i ->   unit_big_int , Axiom_lt i
+ | Monoid l   -> unit_big_int , Monoid l
+ | Rational_eq n ->  (denominator n) , Rational_eq (Big_int (numerator n))
+ | Rational_le n ->  (denominator n) , Rational_le (Big_int (numerator n))
+ | Rational_lt n ->  (denominator n) , Rational_lt (Big_int (numerator n))
+ | Square t -> let s,t' =  scale_term t in 
+		mult_big_int s s , Square t'
+ | Eqmul (t, y) -> let s1,y1 = scale_term t and s2,y2 = scale_certificate y in
+		    mult_big_int s1 s2 , Eqmul (y1,y2)
+ | Sum (y, z) -> let s1,y1 = scale_certificate y 
+   and s2,y2 = scale_certificate z in
+   let g = gcd_big_int s1 s2 in
+   let s1' = div_big_int s1 g in
+   let s2' = div_big_int s2 g in
+    mult_big_int g (mult_big_int s1' s2'), 
+    Sum (Product(Rational_le (Big_int s2'), y1),
+	Product (Rational_le (Big_int s1'), y2))
+ | Product (y, z) -> 
+    let s1,y1 = scale_certificate y and s2,y2 = scale_certificate z in
+     mult_big_int s1 s2 , Product (y1,y2)
+
+
+open Micromega
+ let rec term_to_q_expr = function
+  | Const n ->  PEc (Ml2C.q n)
+  | Zero   ->  PEc ( Ml2C.q (Int 0))
+  | Var s   ->  PEX (Ml2C.index 
+		      (int_of_string (String.sub s 1 (String.length s - 1))))
+  | Mul(p1,p2) ->  PEmul(term_to_q_expr p1, term_to_q_expr p2)
+  | Add(p1,p2) ->   PEadd(term_to_q_expr p1, term_to_q_expr p2)
+  | Opp p ->   PEopp (term_to_q_expr p)
+  | Pow(t,n) ->  PEpow (term_to_q_expr t,Ml2C.n n)
+  | Sub(t1,t2) ->  PEsub (term_to_q_expr t1,  term_to_q_expr t2)
+  | _ -> failwith "term_to_q_expr: not implemented"
+
+let  q_cert_of_pos  pos = 
+ let rec _cert_of_pos = function
+   Axiom_eq i ->  Mc.S_In (Ml2C.nat i)
+  | Axiom_le i ->  Mc.S_In (Ml2C.nat i)
+  | Axiom_lt i ->  Mc.S_In (Ml2C.nat i)
+  | Monoid l  -> Mc.S_Monoid (Ml2C.list Ml2C.nat l)
+  | Rational_eq n | Rational_le n | Rational_lt n -> 
+     if compare_num n (Int 0) = 0 then Mc.S_Z else
+      Mc.S_Pos (Ml2C.q   n)
+  | Square t -> Mc.S_Square (term_to_q_expr  t)
+  | Eqmul (t, y) -> Mc.S_Ideal(term_to_q_expr t, _cert_of_pos y)
+  | Sum (y, z) -> Mc.S_Add  (_cert_of_pos y, _cert_of_pos z)
+  | Product (y, z) -> Mc.S_Mult (_cert_of_pos y, _cert_of_pos z) in
+  simplify_cone q_spec (_cert_of_pos pos)
+
+
+ let rec term_to_z_expr = function
+  | Const n ->  PEc (Ml2C.bigint (big_int_of_num n))
+  | Zero   ->  PEc ( Z0)
+  | Var s   ->  PEX (Ml2C.index 
+		      (int_of_string (String.sub s 1 (String.length s - 1))))
+  | Mul(p1,p2) ->  PEmul(term_to_z_expr p1, term_to_z_expr p2)
+  | Add(p1,p2) ->   PEadd(term_to_z_expr p1, term_to_z_expr p2)
+  | Opp p ->   PEopp (term_to_z_expr p)
+  | Pow(t,n) ->  PEpow (term_to_z_expr t,Ml2C.n n)
+  | Sub(t1,t2) ->  PEsub (term_to_z_expr t1,  term_to_z_expr t2)
+  | _ -> failwith "term_to_z_expr: not implemented"
+
+let  z_cert_of_pos  pos = 
+ let s,pos = (scale_certificate pos) in
+ let rec _cert_of_pos = function
+   Axiom_eq i ->  Mc.S_In (Ml2C.nat i)
+  | Axiom_le i ->  Mc.S_In (Ml2C.nat i)
+  | Axiom_lt i ->  Mc.S_In (Ml2C.nat i)
+  | Monoid l  -> Mc.S_Monoid (Ml2C.list Ml2C.nat l)
+  | Rational_eq n | Rational_le n | Rational_lt n -> 
+     if compare_num n (Int 0) = 0 then Mc.S_Z else
+      Mc.S_Pos (Ml2C.bigint (big_int_of_num  n))
+  | Square t -> Mc.S_Square (term_to_z_expr  t)
+  | Eqmul (t, y) -> Mc.S_Ideal(term_to_z_expr t, _cert_of_pos y)
+  | Sum (y, z) -> Mc.S_Add  (_cert_of_pos y, _cert_of_pos z)
+  | Product (y, z) -> Mc.S_Mult (_cert_of_pos y, _cert_of_pos z) in
+  simplify_cone z_spec (_cert_of_pos pos)
 
diff --git a/contrib/micromega/coq_micromega.ml b/contrib/micromega/coq_micromega.ml
index 29e2a183..02ff61a1 100644
--- a/contrib/micromega/coq_micromega.ml
+++ b/contrib/micromega/coq_micromega.ml
@@ -106,6 +106,7 @@ struct
      ["Coq" ; "micromega" ; "EnvRing"];
      ["Coq";"QArith"; "QArith_base"];
      ["Coq";"Reals" ; "Rdefinitions"];
+     ["Coq";"Reals" ; "Rpow_def"];
      ["LRing_normalise"]]
    
  let constant = gen_constant_in_modules "ZMicromega" coq_modules
@@ -163,6 +164,9 @@ struct
 
 
  let coq_Qmake = lazy (constant "Qmake")
+ let coq_R0    = lazy (constant "R0")
+ let coq_R1    = lazy (constant "R1")
+
 
  let coq_proofTerm = lazy (constant "ProofTerm")
  let coq_ratProof = lazy (constant "RatProof")
@@ -179,10 +183,36 @@ struct
  let coq_Zminus = lazy (constant "Zminus")
  let coq_Zopp = lazy (constant "Zopp")
  let coq_Zmult = lazy (constant "Zmult")
+ let coq_Zpower = lazy (constant "Zpower")
  let coq_N_of_Z = lazy 
   (gen_constant_in_modules "ZArithRing" 
     [["Coq";"setoid_ring";"ZArithRing"]] "N_of_Z")
 
+ let coq_Qgt = lazy (constant "Qgt")
+ let coq_Qge = lazy (constant "Qge")
+ let coq_Qle = lazy (constant "Qle")
+ let coq_Qlt = lazy (constant "Qlt")
+ let coq_Qeq = lazy (constant "Qeq")
+
+
+ let coq_Qplus = lazy (constant "Qplus")
+ let coq_Qminus = lazy (constant "Qminus")
+ let coq_Qopp = lazy (constant "Qopp")
+ let coq_Qmult = lazy (constant "Qmult")
+ let coq_Qpower = lazy (constant "Qpower")
+
+
+ let coq_Rgt = lazy (constant "Rgt")
+ let coq_Rge = lazy (constant "Rge")
+ let coq_Rle = lazy (constant "Rle")
+ let coq_Rlt = lazy (constant "Rlt")
+
+ let coq_Rplus = lazy (constant "Rplus")
+ let coq_Rminus = lazy (constant "Rminus")
+ let coq_Ropp = lazy (constant "Ropp")
+ let coq_Rmult = lazy (constant "Rmult")
+ let coq_Rpower = lazy (constant "pow")
+
 
  let coq_PEX = lazy (constant "PEX" )
  let coq_PEc = lazy (constant"PEc")
@@ -225,6 +255,7 @@ struct
   (gen_constant_in_modules "RingMicromega" 
     [["Coq" ; "micromega" ; "RingMicromega"] ; ["RingMicromega"] ] "Formula")
 
+
  type parse_error  = 
    | Ukn 
    | BadStr of string 
@@ -347,16 +378,11 @@ let dump_q q =
 
 let parse_q term =  
  match Term.kind_of_term term with
-  | Term.App(c, args) -> 
-     (
-      match Term.kind_of_term c with
-	Term.Construct((n,j),i) -> 
-      if Names.string_of_kn n  = "Coq.QArith.QArith_base#<>#Q"
-      then {Mc.qnum = parse_z args.(0) ; Mc.qden = parse_positive args.(1) }
+  | Term.App(c, args) -> if c = Lazy.force coq_Qmake then
+	{Mc.qnum = parse_z args.(0) ; Mc.qden = parse_positive args.(1) }
       else raise ParseError
-       |  _ -> raise ParseError
-     )
-  |   _ -> raise ParseError
+  |  _ -> raise ParseError
+
   
  let rec parse_list parse_elt term = 
   let (i,c) = get_left_construct term in
@@ -466,19 +492,6 @@ let parse_q term =
    pp_cone o e
 
 
-
-
- let rec parse_op term = 
-  let (i,c) = get_left_construct term in
-   match i with
-    | 1 -> Mc.OpEq
-    | 2 -> Mc.OpLe
-    | 3 -> Mc.OpGe
-    | 4 -> Mc.OpGt
-    | 5 -> Mc.OpLt
-    | i -> raise ParseError
-
-
  let rec dump_op = function
   | Mc.OpEq-> Lazy.force coq_OpEq
   | Mc.OpNEq-> Lazy.force coq_OpNEq
@@ -510,68 +523,52 @@ let parse_q term =
 		dump_op o ; 
 		dump_expr typ dump_constant e2|])
 
+ let assoc_const x l = 
+  try 
+  snd (List.find (fun (x',y) -> x = Lazy.force x') l)
+  with
+    Not_found -> raise ParseError
+
+ let zop_table = [ 
+  coq_Zgt, Mc.OpGt ; 
+  coq_Zge, Mc.OpGe ;
+  coq_Zlt, Mc.OpLt ;
+  coq_Zle, Mc.OpLe ]
+
+ let rop_table = [ 
+  coq_Rgt, Mc.OpGt ; 
+  coq_Rge, Mc.OpGe ;
+  coq_Rlt, Mc.OpLt ;
+  coq_Rle, Mc.OpLe ]
+
+ let qop_table = [ 
+  coq_Qlt, Mc.OpLt ;
+  coq_Qle, Mc.OpLe ;
+  coq_Qeq, Mc.OpEq
+ ]
 
 
  let parse_zop (op,args) =
   match kind_of_term op with
-   | Const x -> 
-      (match Names.string_of_con x with
-       | "Coq.ZArith.BinInt#<>#Zgt" -> (Mc.OpGt, args.(0), args.(1))
-       | "Coq.ZArith.BinInt#<>#Zge" -> (Mc.OpGe, args.(0), args.(1))
-       | "Coq.ZArith.BinInt#<>#Zlt" -> (Mc.OpLt, args.(0), args.(1))
-       | "Coq.ZArith.BinInt#<>#Zle" -> (Mc.OpLe, args.(0), args.(1))
-       (*| "Coq.Init.Logic#<>#not"    -> Mc.OpNEq  (* for backward compat *)*)
-       |   s -> raise ParseError
-      )
+   | Const x -> (assoc_const op zop_table, args.(0) , args.(1))
    |  Ind(n,0) -> 
-       (match Names.string_of_kn n with
-	| "Coq.Init.Logic#<>#eq" -> 
-	   if args.(0) <> Lazy.force coq_Z
-	   then raise ParseError
-	   else (Mc.OpEq, args.(1), args.(2))
-	|  _ -> raise ParseError)
+       if op = Lazy.force coq_Eq &&   args.(0) = Lazy.force coq_Z
+       then (Mc.OpEq, args.(1), args.(2))
+       else raise ParseError
    |   _ -> failwith "parse_zop"
 
 
  let parse_rop (op,args) =
-  try 
    match kind_of_term op with
-    | Const x -> 
-       (match Names.string_of_con x with
-	| "Coq.Reals.Rdefinitions#<>#Rgt" -> (Mc.OpGt, args.(0), args.(1))
-	| "Coq.Reals.Rdefinitions#<>#Rge" -> (Mc.OpGe, args.(0), args.(1))
-	| "Coq.Reals.Rdefinitions#<>#Rlt" -> (Mc.OpLt, args.(0), args.(1))
-	| "Coq.Reals.Rdefinitions#<>#Rle" -> (Mc.OpLe, args.(0), args.(1))
-	   (*| "Coq.Init.Logic#<>#not"-> Mc.OpNEq  (* for backward compat *)*)
-       |   s -> raise ParseError
-       )
+    | Const x -> (assoc_const op rop_table, args.(0) , args.(1))
     |  Ind(n,0) -> 
-	(match Names.string_of_kn n with
-	 | "Coq.Init.Logic#<>#eq" -> 
-	    (*   if args.(0) <> Lazy.force coq_R
-		 then raise ParseError
-		 else*) (Mc.OpEq, args.(1), args.(2))
-	 |  _ -> raise ParseError)
-    |   _ -> failwith "parse_rop"
-  with x -> 
-   (Pp.pp (Pp.str "parse_rop failure ") ; 
-    Pp.pp (Printer.prterm op) ; Pp.pp_flush ()) 
-   ; raise x
-
+       if op = Lazy.force coq_Eq &&   args.(0) = Lazy.force coq_R
+       then (Mc.OpEq, args.(1), args.(2))
+       else raise ParseError
+   |   _ -> failwith "parse_zop"
 
  let parse_qop (op,args) =
-  (
-   (match kind_of_term op with
-   | Const x -> 
-      (match Names.string_of_con x with
-       | "Coq.QArith.QArith_base#<>#Qgt" -> Mc.OpGt
-       | "Coq.QArith.QArith_base#<>#Qge" -> Mc.OpGe
-       | "Coq.QArith.QArith_base#<>#Qlt" -> Mc.OpLt
-       | "Coq.QArith.QArith_base#<>#Qle" -> Mc.OpLe
-       | "Coq.QArith.QArith_base#<>#Qeq" -> Mc.OpEq
-       |   s -> raise ParseError
-      )
-   |   _ -> failwith "parse_zop") , args.(0) , args.(1))
+   (assoc_const op qop_table, args.(0) , args.(1))
 
 
  module Env =
@@ -612,6 +609,14 @@ let parse_q term =
    | Ukn of string
 
 
+ let assoc_ops x l = 
+  try 
+    snd (List.find (fun (x',y) -> x = Lazy.force x') l)
+  with
+    Not_found -> Ukn "Oups"
+
+
+
  let parse_expr parse_constant parse_exp ops_spec env term = 
  if debug 
  then (Pp.pp (Pp.str "parse_expr: ");   
@@ -634,7 +639,7 @@ let parse_q term =
 	(
 	 match kind_of_term t with
 	  | Const c -> 
-	     ( match ops_spec (Names.string_of_con c) with
+	     ( match assoc_ops t ops_spec  with
 	      | Binop f -> combine env f (args.(0),args.(1))
 	      | Opp     -> let (expr,env) = parse_expr env args.(0) in
 			    (Mc.PEopp expr, env)
@@ -653,29 +658,29 @@ let parse_q term =
    parse_expr env term
     
 
-let zop_spec = function
- | "Coq.ZArith.BinInt#<>#Zplus"    -> Binop (fun x y -> Mc.PEadd(x,y))
- | "Coq.ZArith.BinInt#<>#Zminus"   -> Binop (fun x y -> Mc.PEsub(x,y)) 
- | "Coq.ZArith.BinInt#<>#Zmult"    -> Binop  (fun x y -> Mc.PEmul (x,y))
-  | "Coq.ZArith.BinInt#<>#Zopp"     ->  Opp
-  | "Coq.ZArith.Zpow_def#<>#Zpower" -> Power
-  |  s                                   -> Ukn s
+ let zop_spec = 
+   [ 
+     coq_Zplus , Binop (fun x y -> Mc.PEadd(x,y)) ;
+     coq_Zminus , Binop (fun x y -> Mc.PEsub(x,y)) ;
+     coq_Zmult  , Binop  (fun x y -> Mc.PEmul (x,y)) ; 
+     coq_Zopp   , Opp ; 
+     coq_Zpower , Power]
 
-let qop_spec = function
- | "Coq.QArith.QArith_base#<>#Qplus"    -> Binop (fun x y -> Mc.PEadd(x,y))
- | "Coq.QArith.QArith_base#<>#Qminus"   -> Binop (fun x y -> Mc.PEsub(x,y)) 
- | "Coq.QArith.QArith_base#<>#Qmult"    -> Binop  (fun x y -> Mc.PEmul (x,y)) 
-  | "Coq.QArith.QArith_base#<>#Qopp"     ->  Opp
-  | "Coq.QArith.QArith_base#<>#Qpower" -> Power
-  |  s                                   -> Ukn s
+let qop_spec = 
+  [
+     coq_Qplus , Binop (fun x y -> Mc.PEadd(x,y)) ;
+     coq_Qminus , Binop (fun x y -> Mc.PEsub(x,y)) ;
+     coq_Qmult  , Binop  (fun x y -> Mc.PEmul (x,y)) ; 
+     coq_Qopp   , Opp ; 
+     coq_Qpower , Power]
 
-let rop_spec = function
- | "Coq.Reals.Rdefinitions#<>#Rplus"    -> Binop (fun x y -> Mc.PEadd(x,y))
- | "Coq.Reals.Rdefinitions#<>#Rminus"   -> Binop (fun x y -> Mc.PEsub(x,y)) 
- | "Coq.Reals.Rdefinitions#<>#Rmult"    -> Binop  (fun x y -> Mc.PEmul (x,y))
- | "Coq.Reals.Rdefinitions#<>#Ropp"     -> Opp
- | "Coq.Reals.Rpow_def#<>#pow"          -> Power
- |  s                                        -> Ukn s
+let rop_spec = 
+  [
+     coq_Rplus , Binop (fun x y -> Mc.PEadd(x,y)) ;
+     coq_Rminus , Binop (fun x y -> Mc.PEsub(x,y)) ;
+     coq_Rmult  , Binop  (fun x y -> Mc.PEmul (x,y)) ; 
+     coq_Ropp   , Opp ; 
+     coq_Rpower , Power]
 
 
 
@@ -691,12 +696,12 @@ let rconstant term =
        Pp.pp (Pp.str "rconstant: ");
        Pp.pp (Printer.prterm  term); Pp.pp_flush ());
  match Term.kind_of_term term with
-  | Const x ->        
-     (match Names.string_of_con x with
-      | "Coq.Reals.Rdefinitions#<>#R0" -> Mc.Z0
-      | "Coq.Reals.Rdefinitions#<>#R1" -> Mc.Zpos Mc.XH
-      | _   -> raise ParseError
-     )
+  | Const x ->  
+      if term = Lazy.force coq_R0
+      then Mc.Z0
+      else if term = Lazy.force coq_R1
+      then Mc.Zpos Mc.XH
+      else raise ParseError
   |  _ -> raise ParseError
 
 
@@ -731,23 +736,6 @@ let parse_rexpr =
   
  (* generic parsing of arithmetic expressions *)
   
- let rec parse_conj parse_arith env term = 
-  match kind_of_term term with
-   | App(l,rst) -> 
-      (match kind_of_term l with
-       | Ind (n,_) -> 
-	  ( match Names.string_of_kn n with
-	   | "Coq.Init.Logic#<>#and" -> 
-	      let (e1,env) = parse_arith env rst.(0) in
-	      let (e2,env) = parse_conj parse_arith env rst.(1) in
-	       (Mc.Cons(e1,e2),env)
-	   |   _ -> (* This might be an equality *) 
-		let (e,env) = parse_arith env term in
-		 (Mc.Cons(e,Mc.Nil),env))
-       |  _ -> (* This is an arithmetic expression *)
-	   let (e,env) = parse_arith env term in
-	    (Mc.Cons(e,Mc.Nil),env))
-   |  _ -> failwith "parse_conj(2)"
 
 
 
@@ -850,46 +838,6 @@ let parse_rexpr =
    xdump f
     
 
- (* Backward compat *)
-
- let rec parse_concl parse_arith env term =
-  match kind_of_term term with
-   | Prod(_,expr,rst) -> (* a -> b *)
-      let (lhs,rhs,env) = parse_concl parse_arith env rst in
-      let (e,env) = parse_arith env expr in
-       (Mc.Cons(e,lhs),rhs,env)
-   | App(_,_) -> 
-      let (conj, env) = parse_conj parse_arith env term in
-       (Mc.Nil,conj,env)
-   |  Ind(n,_) -> 
-       (match (Names.string_of_kn n) with
-	| "Coq.Init.Logic#<>#False" -> (Mc.Nil,Mc.Nil,env)
-	|    s                           -> 
-	      print_string s ; flush stdout;
-	      failwith "parse_concl")
-   |  _ -> failwith "parse_concl"
-
-
- let rec parse_hyps parse_arith env goal_hyps hyps = 
-  match hyps with
-   | [] -> ([],goal_hyps,env)
-   | (i,t)::l -> 
-      let (li,lt,env) = parse_hyps parse_arith env goal_hyps l in
-       try 
-	let (c,env) = parse_arith env  t in
-	 (i::li, Mc.Cons(c,lt), env)
-       with  x -> 
-	(*(if debug then Printf.printf "parse_arith : %s\n" x);*)
-	(li,lt,env)
-
-
- let parse_goal parse_arith env hyps term = 
-  try
-   let (lhs,rhs,env) = parse_concl parse_arith env term in
-   let (li,lt,env) = parse_hyps parse_arith env lhs hyps in
-    (li,lt,rhs,env)
-  with Failure x -> raise ParseError
-   (* backward compat *)
 
 
  (* ! reverse the list of bindings *)
@@ -1235,8 +1183,8 @@ let lift_ratproof prover l =
   | Some c -> Some (Mc.RatProof c)
 
 
-type csdpcert = Certificate.Mc.z Certificate.Mc.coneMember option
-type micromega_polys = (Micromega.z Mc.pExpr, Mc.op1) Micromega.prod list
+type csdpcert = Sos.positivstellensatz option
+type micromega_polys = (Micromega.q Mc.pExpr, Mc.op1) Micromega.prod list
 type provername = string * int option
 
 let call_csdpcert provername poly =
@@ -1255,36 +1203,84 @@ let call_csdpcert provername poly =
   close_in ch_from; Sys.remove tmp_from;
   cert
 
-let omicron gl = 
+let rec z_to_q_expr e = 
+ match e with
+  | Mc.PEc z   -> Mc.PEc {Mc.qnum = z ; Mc.qden = Mc.XH}
+  | Mc.PEX x   -> Mc.PEX x
+  | Mc.PEadd(e1,e2) -> Mc.PEadd(z_to_q_expr e1, z_to_q_expr e2)
+  | Mc.PEsub(e1,e2) -> Mc.PEsub(z_to_q_expr e1, z_to_q_expr e2)
+  | Mc.PEmul(e1,e2) -> Mc.PEmul(z_to_q_expr e1, z_to_q_expr e2)
+  | Mc.PEopp(e) -> Mc.PEopp(z_to_q_expr e)
+  | Mc.PEpow(e,n) -> Mc.PEpow(z_to_q_expr e,n)
+
+
+let call_csdpcert_q provername poly = 
+ match call_csdpcert provername poly with
+  | None -> None
+  | Some cert -> 
+     let cert = Certificate.q_cert_of_pos cert in
+      match Mc.qWeakChecker (CamlToCoq.list (fun x -> x) poly)  cert with
+       | Mc.True -> Some cert
+       | Mc.False ->  (print_string "buggy certificate" ; flush stdout) ;None
+
+
+let call_csdpcert_z provername poly = 
+ let l = List.map (fun (Mc.Pair(e,o)) -> (Mc.Pair(z_to_q_expr e,o))) poly in
+  match call_csdpcert provername l with
+   | None -> None
+   | Some cert -> 
+      let cert = Certificate.z_cert_of_pos cert in
+       match Mc.zWeakChecker (CamlToCoq.list (fun x -> x) poly)  cert with
+	| Mc.True -> Some cert
+	| Mc.False ->  (print_string "buggy certificate" ; flush stdout) ;None
+
+
+
+
+let psatzl_Z gl = 
  micromega_gen parse_zarith  Mc.negate Mc.normalise zz_domain_spec
   [lift_ratproof 
     (Certificate.linear_prover Certificate.z_spec), "fourier refutation" ] gl
 
 
-let qomicron gl = 
+let psatzl_Q gl = 
  micromega_gen  parse_qarith Mc.cnf_negate Mc.cnf_normalise qq_domain_spec 
   [ Certificate.linear_prover Certificate.q_spec, "fourier refutation" ]   gl
 
-let romicron gl = 
+let psatz_Q i gl = 
+ micromega_gen parse_qarith Mc.cnf_negate Mc.cnf_normalise qq_domain_spec
+  [ call_csdpcert_q ("real_nonlinear_prover", Some i), "fourier refutation" ]  gl
+
+let psatzl_R gl = 
  micromega_gen  parse_rarith Mc.cnf_negate Mc.cnf_normalise rz_domain_spec 
   [ Certificate.linear_prover Certificate.z_spec, "fourier refutation" ]   gl
 
 
-let rmicromega i gl = 
- micromega_gen parse_rarith Mc.negate Mc.normalise rz_domain_spec
-  [ call_csdpcert ("real_nonlinear_prover", Some i), "fourier refutation" ]  gl
+let psatz_R i gl = 
+ micromega_gen parse_rarith Mc.cnf_negate Mc.cnf_normalise rz_domain_spec
+  [ call_csdpcert_z  ("real_nonlinear_prover", Some i), "fourier refutation" ]  gl
 
   
-let micromega i gl = 
+let psatz_Z i gl = 
  micromega_gen parse_zarith Mc.negate Mc.normalise zz_domain_spec 
- [lift_ratproof (call_csdpcert ("real_nonlinear_prover",Some i)), 
+ [lift_ratproof (call_csdpcert_z ("real_nonlinear_prover",Some i)), 
   "fourier refutation" ] gl
 
 
-let sos gl = 
+let sos_Z gl = 
  micromega_gen parse_zarith Mc.negate Mc.normalise  zz_domain_spec 
-  [lift_ratproof (call_csdpcert ("pure_sos", None)), "pure sos refutation"]  gl
+  [lift_ratproof (call_csdpcert_z ("pure_sos", None)), "pure sos refutation"]  gl
+
+let sos_Q gl = 
+ micromega_gen parse_qarith Mc.cnf_negate Mc.cnf_normalise  qq_domain_spec 
+  [call_csdpcert_q ("pure_sos", None), "pure sos refutation"]  gl
+
+let sos_R gl = 
+ micromega_gen parse_rarith Mc.cnf_negate Mc.cnf_normalise  rz_domain_spec 
+  [call_csdpcert_z ("pure_sos", None), "pure sos refutation"]  gl
+
+
 
-let zomicron gl = 
+let xlia gl = 
  micromega_gen parse_zarith Mc.negate Mc.normalise   zz_domain_spec 
   [Certificate.zlinear_prover, "zprover"] gl
diff --git a/contrib/micromega/csdpcert.ml b/contrib/micromega/csdpcert.ml
index cfaf6ae1..e451a38f 100644
--- a/contrib/micromega/csdpcert.ml
+++ b/contrib/micromega/csdpcert.ml
@@ -27,7 +27,7 @@ struct
  open Mc
 
  let rec expr_to_term = function
-  |  PEc z ->  Const  (Big_int (C2Ml.z_big_int z))
+  |  PEc z ->  Const  (C2Ml.q_to_num z)
   |  PEX v ->  Var ("x"^(string_of_int (C2Ml.index v)))
   |  PEmul(p1,p2) -> 
       let p1 = expr_to_term p1 in
@@ -40,25 +40,15 @@ struct
   |  PEopp p ->  Opp (expr_to_term p)
 
       
- let rec term_to_expr = function
-  | Const n ->  PEc (Ml2C.bigint (big_int_of_num n))
-  | Zero   ->  PEc ( Z0)
-  | Var s   ->  PEX (Ml2C.index 
-		      (int_of_string (String.sub s 1 (String.length s - 1))))
-  | Mul(p1,p2) ->  PEmul(term_to_expr p1, term_to_expr p2)
-  | Add(p1,p2) ->   PEadd(term_to_expr p1, term_to_expr p2)
-  | Opp p ->   PEopp (term_to_expr p)
-  | Pow(t,n) ->  PEpow (term_to_expr t,Ml2C.n n)
-  | Sub(t1,t2) ->  PEsub (term_to_expr t1,  term_to_expr t2)
-  | _ -> failwith "term_to_expr: not implemented"
-
- let term_to_expr e =
+
+
+(* let term_to_expr e =
   let e' = term_to_expr e in
    if debug 
    then Printf.printf "term_to_expr : %s - %s\n"  
     (string_of_poly (poly_of_term  e)) 
     (string_of_poly (poly_of_term (expr_to_term e')));
-   e'
+   e' *)
 
 end 
 open M      
@@ -66,110 +56,8 @@ open M
 open List
 open Mutils 
 
-let rec scale_term t = 
- match t with
-  | Zero    -> unit_big_int , Zero
-  | Const n ->  (denominator n) , Const (Big_int (numerator n))
-  | Var n   -> unit_big_int , Var n
-  | Inv _   -> failwith "scale_term : not implemented"
-  | Opp t   -> let s, t = scale_term t in s, Opp t
-  | Add(t1,t2) -> let s1,y1 = scale_term t1 and s2,y2 = scale_term t2 in
-    let g = gcd_big_int s1 s2 in
-    let s1' = div_big_int s1 g in
-    let s2' = div_big_int s2 g in
-    let e = mult_big_int g (mult_big_int s1' s2') in
-     if (compare_big_int e unit_big_int) = 0
-     then (unit_big_int, Add (y1,y2))
-     else 	e, Add (Mul(Const (Big_int s2'), y1),
-		       Mul (Const (Big_int s1'), y2))
-  | Sub _ -> failwith "scale term: not implemented"
-  | Mul(y,z) ->       let s1,y1 = scale_term y and s2,y2 = scale_term z in
-		       mult_big_int s1 s2 , Mul (y1, y2)
-  |  Pow(t,n) -> let s,t = scale_term t in
-		  power_big_int_positive_int s  n , Pow(t,n)
-  |   _ -> failwith "scale_term : not implemented"
-
-let scale_term t =
- let (s,t') = scale_term t in
-  s,t'
-   
-
 
 
-let rec scale_certificate pos = match pos with
- | Axiom_eq i ->  unit_big_int , Axiom_eq i
- | Axiom_le i ->  unit_big_int , Axiom_le i
- | Axiom_lt i ->   unit_big_int , Axiom_lt i
- | Monoid l   -> unit_big_int , Monoid l
- | Rational_eq n ->  (denominator n) , Rational_eq (Big_int (numerator n))
- | Rational_le n ->  (denominator n) , Rational_le (Big_int (numerator n))
- | Rational_lt n ->  (denominator n) , Rational_lt (Big_int (numerator n))
- | Square t -> let s,t' =  scale_term t in 
-		mult_big_int s s , Square t'
- | Eqmul (t, y) -> let s1,y1 = scale_term t and s2,y2 = scale_certificate y in
-		    mult_big_int s1 s2 , Eqmul (y1,y2)
- | Sum (y, z) -> let s1,y1 = scale_certificate y 
-   and s2,y2 = scale_certificate z in
-   let g = gcd_big_int s1 s2 in
-   let s1' = div_big_int s1 g in
-   let s2' = div_big_int s2 g in
-    mult_big_int g (mult_big_int s1' s2'), 
-    Sum (Product(Rational_le (Big_int s2'), y1),
-	Product (Rational_le (Big_int s1'), y2))
- | Product (y, z) -> 
-    let s1,y1 = scale_certificate y and s2,y2 = scale_certificate z in
-     mult_big_int s1 s2 , Product (y1,y2)
-
-
-let is_eq = function  Mc.Equal -> true | _ -> false
-let is_le = function  Mc.NonStrict -> true | _ -> false
-let is_lt = function  Mc.Strict -> true | _ -> false
-
-let get_index_of_ith_match f i l  =
- let rec get j res l =
-  match l with
-   | [] -> failwith "bad index"
-   | e::l -> if f e
-     then 
-       (if j = i then res else get (j+1) (res+1) l )
-     else get j (res+1) l in
-  get 0 0 l
-
-
-let  cert_of_pos eq le lt ll l pos = 
- let s,pos = (scale_certificate pos) in
- let rec _cert_of_pos = function
-   Axiom_eq i -> let idx = get_index_of_ith_match is_eq i l in
-		  Mc.S_In (Ml2C.nat idx)
-  | Axiom_le i -> let idx = get_index_of_ith_match is_le i l in
-		   Mc.S_In (Ml2C.nat idx)
-  | Axiom_lt i -> let idx = get_index_of_ith_match is_lt i l in
-		   Mc.S_In (Ml2C.nat idx)
-  | Monoid l  -> Mc.S_Monoid (Ml2C.list Ml2C.nat l)
-  | Rational_eq n | Rational_le n | Rational_lt n -> 
-     if compare_num n (Int 0) = 0 then Mc.S_Z else
-      Mc.S_Pos (Ml2C.bigint (big_int_of_num  n))
-  | Square t -> Mc.S_Square (term_to_expr  t)
-  | Eqmul (t, y) -> Mc.S_Ideal(term_to_expr t, _cert_of_pos y)
-  | Sum (y, z) -> Mc.S_Add  (_cert_of_pos y, _cert_of_pos z)
-  | Product (y, z) -> Mc.S_Mult (_cert_of_pos y, _cert_of_pos z) in
-  s, Certificate.simplify_cone Certificate.z_spec (_cert_of_pos pos)
-
-
-let  term_of_cert l pos = 
- let l = List.map fst' l in
- let rec _cert_of_pos = function
-  | Mc.S_In i -> expr_to_term (List.nth l (C2Ml.nat i))
-  | Mc.S_Pos p -> Const (C2Ml.num  p)
-  | Mc.S_Z     -> Const (Int 0)
-  | Mc.S_Square t -> Mul(expr_to_term t, expr_to_term t)
-  | Mc.S_Monoid m -> List.fold_right 
-     (fun x m -> Mul (expr_to_term (List.nth l (C2Ml.nat x)),m)) 
-     (C2Ml.list (fun x -> x) m)  (Const (Int 1))
-  | Mc.S_Ideal (t, y) -> Mul(expr_to_term t, _cert_of_pos y)
-  | Mc.S_Add (y, z) -> Add  (_cert_of_pos y, _cert_of_pos z)
-  | Mc.S_Mult (y, z) -> Mul (_cert_of_pos y, _cert_of_pos z) in
-  (_cert_of_pos pos)
 
 let rec canonical_sum_to_string = function s -> failwith "not implemented"
 
@@ -208,22 +96,6 @@ let rec sets_of_list l =
   | e::l -> let s = sets_of_list l in
 	     s@(List.map (fun s0 -> e::s0) s) 
 
-let  cert_of_pos  pos = 
- let s,pos = (scale_certificate pos) in
- let rec _cert_of_pos = function
-   Axiom_eq i ->  Mc.S_In (Ml2C.nat i)
-  | Axiom_le i ->  Mc.S_In (Ml2C.nat i)
-  | Axiom_lt i ->  Mc.S_In (Ml2C.nat i)
-  | Monoid l  -> Mc.S_Monoid (Ml2C.list Ml2C.nat l)
-  | Rational_eq n | Rational_le n | Rational_lt n -> 
-     if compare_num n (Int 0) = 0 then Mc.S_Z else
-      Mc.S_Pos (Ml2C.bigint (big_int_of_num  n))
-  | Square t -> Mc.S_Square (term_to_expr  t)
-  | Eqmul (t, y) -> Mc.S_Ideal(term_to_expr t, _cert_of_pos y)
-  | Sum (y, z) -> Mc.S_Add  (_cert_of_pos y, _cert_of_pos z)
-  | Product (y, z) -> Mc.S_Mult (_cert_of_pos y, _cert_of_pos z) in
-  s, Certificate.simplify_cone Certificate.z_spec (_cert_of_pos pos)
-
 (* The exploration is probably not complete - for simple cases, it works... *)
 let real_nonlinear_prover d l =
  try 
@@ -272,15 +144,7 @@ let real_nonlinear_prover d l =
 
   let proof = list_fold_right_elements 
    (fun s t -> Sum(s,t)) (proof_ne :: proofs_ideal @ proofs_cone) in
-   
-  let s,proof' = scale_certificate proof in
-  let cert  = snd (cert_of_pos proof') in
-   if debug 
-   then Printf.printf "cert poly : %s\n" 
-    (string_of_poly (poly_of_term (term_of_cert l cert)));
-   match Mc.zWeakChecker (Ml2C.list (fun x -> x) l)  cert with
-    | Mc.True -> Some cert
-    | Mc.False ->  (print_string "buggy certificate" ; flush stdout) ;None
+   Some proof
  with 
   | Sos.TooDeep -> None
 
@@ -300,16 +164,16 @@ let pure_sos  l =
 		     (term_of_poly p)), rst)) 
 		     polys (Rational_lt (Int 0))) in
   let proof = Sum(Axiom_lt i, pos) in
-  let s,proof' = scale_certificate proof in
-  let cert  = snd (cert_of_pos proof') in
-   Some cert
+(*  let s,proof' = scale_certificate proof in
+  let cert  = snd (cert_of_pos proof') in *)
+   Some proof
  with
   | Not_found -> (* This is no strict inequality *) None
   |  x        -> None
 
 
-type micromega_polys = (Micromega.z Mc.pExpr, Mc.op1) Micromega.prod list
-type csdp_certificate = Certificate.Mc.z Certificate.Mc.coneMember option
+type micromega_polys = (Micromega.q Mc.pExpr, Mc.op1) Micromega.prod list
+type csdp_certificate = Sos.positivstellensatz option
 type provername = string * int option
 
 let main () =
diff --git a/contrib/micromega/g_micromega.ml4 b/contrib/micromega/g_micromega.ml4
index 259b5d4b..50024e78 100644
--- a/contrib/micromega/g_micromega.ml4
+++ b/contrib/micromega/g_micromega.ml4
@@ -14,7 +14,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: g_micromega.ml4 10947 2008-05-19 19:10:40Z herbelin $ *)
+(* $Id: g_micromega.ml4 11306 2008-08-05 16:51:08Z notin $ *)
 
 open Quote
 open Ring
@@ -26,34 +26,49 @@ let out_arg = function
   | ArgVar _ -> anomaly "Unevaluated or_var variable"
   | ArgArg x -> x
 
-TACTIC EXTEND Micromega
-| [ "micromegap" int_or_var(i) ] -> [ Coq_micromega.micromega (out_arg i) ]
-| [ "micromegap" ] -> [ Coq_micromega.micromega (-1) ]
+TACTIC EXTEND PsatzZ
+| [ "psatz_Z" int_or_var(i) ] -> [ Coq_micromega.psatz_Z (out_arg i) ]
+| [ "psatz_Z" ] -> [ Coq_micromega.psatz_Z (-1) ]
 END
 
-TACTIC EXTEND Sos
-[ "sosp" ] -> [ Coq_micromega.sos]
+TACTIC EXTEND Sos_Z
+| [ "sos_Z" ] -> [ Coq_micromega.sos_Z]
+   END
+
+TACTIC EXTEND Sos_Q
+| [ "sos_Q" ] -> [ Coq_micromega.sos_Q]
+   END
+
+TACTIC EXTEND Sos_R
+| [ "sos_R" ] -> [ Coq_micromega.sos_R]
 END
 
 
 TACTIC EXTEND Omicron
-[ "omicronp"  ] -> [ Coq_micromega.omicron]
+[ "psatzl_Z"  ] -> [ Coq_micromega.psatzl_Z]
 END
 
 TACTIC EXTEND QOmicron
-[ "qomicronp"  ] -> [ Coq_micromega.qomicron]
+[ "psatzl_Q"  ] -> [ Coq_micromega.psatzl_Q]
 END
 
 
 TACTIC EXTEND ZOmicron
-[ "zomicronp"  ] -> [ Coq_micromega.zomicron]
+[ "xlia"  ] -> [ Coq_micromega.xlia]
 END
 
 TACTIC EXTEND ROmicron
-[ "romicronp"  ] -> [ Coq_micromega.romicron]
+[ "psatzl_R"  ] -> [ Coq_micromega.psatzl_R]
 END
 
 TACTIC EXTEND RMicromega
-| [ "rmicromegap" int_or_var(i) ] -> [ Coq_micromega.rmicromega (out_arg i) ]
-| [ "rmicromegap" ] -> [ Coq_micromega.rmicromega (-1) ]
+| [ "psatz_R" int_or_var(i) ] -> [ Coq_micromega.psatz_R (out_arg i) ]
+| [ "psatz_R" ] -> [ Coq_micromega.psatz_R (-1) ]
+END
+
+
+TACTIC EXTEND QMicromega
+| [ "psatz_Q" int_or_var(i) ] -> [ Coq_micromega.psatz_Q (out_arg i) ]
+| [ "psatz_Q" ] -> [ Coq_micromega.psatz_Q (-1) ]
 END
+
diff --git a/contrib/romega/ROmega.v b/contrib/romega/ROmega.v
index 68bc43bb..4281cc57 100644
--- a/contrib/romega/ROmega.v
+++ b/contrib/romega/ROmega.v
@@ -9,3 +9,4 @@
 Require Import ReflOmegaCore.
 Require Export Setoid.
 Require Export PreOmega.
+Require Export ZArith_base.
diff --git a/contrib/romega/ReflOmegaCore.v b/contrib/romega/ReflOmegaCore.v
index 9d379548..12176d66 100644
--- a/contrib/romega/ReflOmegaCore.v
+++ b/contrib/romega/ReflOmegaCore.v
@@ -7,7 +7,7 @@
 
  *************************************************************************)
 
-Require Import List Bool Sumbool EqNat Setoid Ring_theory Decidable.
+Require Import List Bool Sumbool EqNat Setoid Ring_theory Decidable ZArith_base.
 Delimit Scope Int_scope with I.
 
 (* Abstract Integers. *)
@@ -81,7 +81,6 @@ End Int.
 
 Module Z_as_Int <: Int.
 
-  Require Import ZArith_base.
   Open Scope Z_scope.
 
   Definition int := Z. 
diff --git a/contrib/setoid_ring/Field_theory.v b/contrib/setoid_ring/Field_theory.v
index 65a397ac..b2e5cc4b 100644
--- a/contrib/setoid_ring/Field_theory.v
+++ b/contrib/setoid_ring/Field_theory.v
@@ -1619,6 +1619,7 @@ split.
 generalize (PCond_cons_inv_l _ _ _ H1); simpl; auto.
 apply H0.
 generalize (PCond_cons_inv_r _ _ _ H1); simpl; auto.
+clear get_sign get_sign_spec. 
 generalize Hp; case l0; simpl; intuition.
 Qed.
 
diff --git a/contrib/setoid_ring/InitialRing.v b/contrib/setoid_ring/InitialRing.v
index c1fa963f..e664b3b7 100644
--- a/contrib/setoid_ring/InitialRing.v
+++ b/contrib/setoid_ring/InitialRing.v
@@ -38,14 +38,6 @@ Proof.
  exact Zmult_plus_distr_l. trivial. exact Zminus_diag.
 Qed.
 
- Lemma Zeqb_ok : forall x y, Zeq_bool x y = true -> x = y.
- Proof.
-  intros x y.
-  assert (H := Zcompare_Eq_eq x y);unfold Zeq_bool;
-  destruct (Zcompare x y);intros H1;auto;discriminate H1.
- Qed.
-
-
 (** Two generic morphisms from Z to (abrbitrary) rings, *)
 (**second one is more convenient for proofs but they are ext. equal*)
 Section ZMORPHISM.
@@ -174,7 +166,7 @@ Section ZMORPHISM.
    Zeq_bool x y = true -> [x] == [y].
  Proof.
   intros x y H.
-  assert (H1 := Zeqb_ok x y H);unfold IDphi in H1.
+  assert (H1 := Zeq_bool_eq x y H);unfold IDphi in H1.
   rewrite H1;rrefl.
  Qed.
   
diff --git a/contrib/setoid_ring/Ring_theory.v b/contrib/setoid_ring/Ring_theory.v
index 29feab5c..531ab3ca 100644
--- a/contrib/setoid_ring/Ring_theory.v
+++ b/contrib/setoid_ring/Ring_theory.v
@@ -494,7 +494,7 @@ Qed.
  Proof. intros;mrewrite. Qed.
 
  Lemma ARdistr_r : forall x y z, z * (x + y) == z*x + z*y.
- Proof. 
+ Proof.
   intros;mrewrite. 
   repeat rewrite (ARth.(ARmul_comm) z);sreflexivity.
  Qed.
diff --git a/contrib/setoid_ring/ZArithRing.v b/contrib/setoid_ring/ZArithRing.v
index 4a5b623b..942915ab 100644
--- a/contrib/setoid_ring/ZArithRing.v
+++ b/contrib/setoid_ring/ZArithRing.v
@@ -50,7 +50,7 @@ Ltac Zpower_neg :=
   end.   
 
 Add Ring Zr : Zth
-  (decidable Zeqb_ok, constants [Zcst], preprocess [Zpower_neg;unfold Zsucc],
+  (decidable Zeq_bool_eq, constants [Zcst], preprocess [Zpower_neg;unfold Zsucc],
    power_tac Zpower_theory [Zpow_tac],
     (* The two following option are not needed, it is the default chose when the set of 
         coefficiant is usual ring Z *)
diff --git a/contrib/setoid_ring/newring.ml4 b/contrib/setoid_ring/newring.ml4
index dd79801d..3d022add 100644
--- a/contrib/setoid_ring/newring.ml4
+++ b/contrib/setoid_ring/newring.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(*i $Id: newring.ml4 11094 2008-06-10 19:35:23Z herbelin $ i*)
+(*i $Id: newring.ml4 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 open Pp
 open Util
@@ -452,11 +452,14 @@ let (theory_to_obj, obj_to_theory) =
 
 
 let setoid_of_relation env a r =
-  lapp coq_mk_Setoid
-    [|a ; r ; 
-      Class_tactics.reflexive_proof env a r ; 
-      Class_tactics.symmetric_proof env a r ; 
-      Class_tactics.transitive_proof env a r |]
+  try 
+    lapp coq_mk_Setoid
+      [|a ; r ; 
+	Class_tactics.reflexive_proof env a r ; 
+	Class_tactics.symmetric_proof env a r ; 
+	Class_tactics.transitive_proof env a r |]
+  with Not_found ->
+    error "cannot find setoid relation"
 
 let op_morph r add mul opp req m1 m2 m3 =
   lapp coq_mk_reqe [| r; add; mul; opp; req; m1; m2; m3 |]
diff --git a/contrib/subtac/g_subtac.ml4 b/contrib/subtac/g_subtac.ml4
index 88243b60..4cf5336d 100644
--- a/contrib/subtac/g_subtac.ml4
+++ b/contrib/subtac/g_subtac.ml4
@@ -14,7 +14,7 @@
   Syntax for the subtac terms and types.
   Elaborated from correctness/psyntax.ml4 by Jean-Christophe Filliâtre *)
 
-(* $Id: g_subtac.ml4 10919 2008-05-11 22:04:26Z msozeau $ *)
+(* $Id: g_subtac.ml4 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 
 open Flags
@@ -139,10 +139,10 @@ VERNAC COMMAND EXTEND Subtac_Admit_Obligations
     END
 
 VERNAC COMMAND EXTEND Subtac_Set_Solver
-| [ "Obligations" "Tactic" ":=" tactic(t) ] -> [ 
+| [ "Obligation" "Tactic" ":=" tactic(t) ] -> [ 
     Coqlib.check_required_library ["Coq";"Program";"Tactics"];
     Tacinterp.add_tacdef false 
-      [(Qualid (dummy_loc, qualid_of_string "Coq.Program.Tactics.obligations_tactic"), true, t)] ]
+      [(Qualid (dummy_loc, qualid_of_string "Coq.Program.Tactics.obligation_tactic"), true, t)] ]
 END
 
 VERNAC COMMAND EXTEND Subtac_Show_Obligations
diff --git a/contrib/subtac/subtac.ml b/contrib/subtac/subtac.ml
index a59ad6f5..7bfa107b 100644
--- a/contrib/subtac/subtac.ml
+++ b/contrib/subtac/subtac.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: subtac.ml 11150 2008-06-19 11:38:27Z msozeau $ *)
+(* $Id: subtac.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Global
 open Pp
@@ -229,7 +229,8 @@ let subtac (loc, command) =
       debug 2 (Himsg.explain_pretype_error env exn);
       raise e
 	
-  | (Stdpp.Exc_located (loc, e')) as e ->
+  | (Stdpp.Exc_located (loc, Proof_type.LtacLocated (_,e')) |
+     Stdpp.Exc_located (loc, e') as e) ->
       debug 2 (str "Parsing exception: ");
       (match e' with
       | Type_errors.TypeError (env, exn) ->
diff --git a/contrib/subtac/subtac_cases.ml b/contrib/subtac/subtac_cases.ml
index c7182bd2..04bf54d3 100644
--- a/contrib/subtac/subtac_cases.ml
+++ b/contrib/subtac/subtac_cases.ml
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: subtac_cases.ml 11154 2008-06-19 18:42:19Z msozeau $ *)
+(* $Id: subtac_cases.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Cases
 open Util
@@ -2056,8 +2056,10 @@ let compile_cases loc style (typing_fun, isevars) (tycon : Evarutil.type_constra
 	    t, prepare_predicate_from_arsign_tycon loc env (Evd.evars_of !isevars)
 	      tomatchs sign (lift tomatchs_len t)
       in
-      let arity = 
-	it_mkProd_or_LetIn (lift neqs arity) (context_of_arsign eqs)
+      let neqs, arity = 
+	let ctx = context_of_arsign eqs in
+	let neqs = List.length ctx in
+	  neqs, it_mkProd_or_LetIn (lift neqs arity) ctx
       in
       let lets, matx = 
 	(* Type the rhs under the assumption of equations *)
diff --git a/contrib/subtac/subtac_classes.ml b/contrib/subtac/subtac_classes.ml
index 15addb44..9a5539e2 100644
--- a/contrib/subtac/subtac_classes.ml
+++ b/contrib/subtac/subtac_classes.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: subtac_classes.ml 11047 2008-06-03 23:08:00Z msozeau $ i*)
+(*i $Id: subtac_classes.ml 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 open Pretyping
 open Evd
@@ -73,26 +73,18 @@ let interp_casted_constr_evars evdref env ?(impls=([],[])) c typ =
 let type_ctx_instance isevars env ctx inst subst =
   List.fold_left2
     (fun (subst, instctx) (na, _, t) ce ->
-      let t' = replace_vars subst t in
+      let t' = substl subst t in
       let c = interp_casted_constr_evars isevars env ce t' in
+      isevars := resolve_typeclasses ~onlyargs:true ~fail:true env !isevars;
       let d = na, Some c, t' in
-	(na, c) :: subst, d :: instctx)
+	c :: subst, d :: instctx)
     (subst, []) (List.rev ctx) inst
 
-(*let superclass_ce = CRef (Ident (dummy_loc, id_of_string ".superclass"))*)
-
 let type_class_instance_params isevars env id n ctx inst subst =
   List.fold_left2
     (fun (subst, instctx) (na, _, t) ce ->
       let t' = replace_vars subst t in
-      let c = 
-(* 	if ce = superclass_ce then *)
-	(* 	  (\* Control over the evars which are direct superclasses to avoid partial instanciations *)
-	(* 	     in instance search. *\) *)
-	(* 	  Evarutil.e_new_evar isevars env ~src:(dummy_loc, ImplicitArg (VarRef id, (n, Some na))) t' *)
-	(* 	else *)
-	interp_casted_constr_evars isevars env ce t' 
-      in
+      let c = interp_casted_constr_evars isevars env ce t' in
       let d = na, Some c, t' in
 	(na, c) :: subst, d :: instctx)
     (subst, []) (List.rev ctx) inst
@@ -140,9 +132,9 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=Class
   let k, ctx', imps, subst = 
     let c = Command.generalize_constr_expr tclass ctx in
     let c', imps = interp_type_evars_impls ~evdref:isevars env c in
-    let ctx, c = Classes.decompose_named_assum c' in
+    let ctx, c = Sign.decompose_prod_assum c' in
     let cl, args = Typeclasses.dest_class_app c in
-      cl, ctx, imps, substitution_of_constrs (List.map snd cl.cl_context) (List.rev (Array.to_list args))
+      cl, ctx, imps, (List.rev (Array.to_list args))
   in
   let id = 
     match snd instid with
@@ -155,11 +147,11 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=Class
 	  let i = Nameops.add_suffix (Classes.id_of_class k) "_instance_0" in
 	    Termops.next_global_ident_away false i (Termops.ids_of_context env)
   in
-  let env' = Classes.push_named_context ctx' env in
+  let env' = push_rel_context ctx' env in
   isevars := Evarutil.nf_evar_defs !isevars;
   isevars := resolve_typeclasses ~onlyargs:false ~fail:true env' !isevars;
   let sigma = Evd.evars_of !isevars in
-  let substctx = Typeclasses.nf_substitution sigma subst in
+  let substctx = List.map (Evarutil.nf_evar sigma) subst in
   let subst, _propsctx = 
     let props = 
       List.map (fun (x, l, d) -> 
@@ -172,8 +164,8 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=Class
 	List.fold_left
 	  (fun (props, rest) (id,_,_) -> 
 	    try 
-	      let ((loc, mid), c) = List.find (fun ((_,id'), c) -> id' = id) rest in
-	      let rest' = List.filter (fun ((_,id'), c) -> id' <> id) rest in
+	      let ((loc, mid), c) = List.find (fun ((_,id'), c) -> Name id' = id) rest in
+	      let rest' = List.filter (fun ((_,id'), c) -> Name id' <> id) rest in
 		Constrintern.add_glob loc (ConstRef (List.assoc mid k.cl_projs));
 		c :: props, rest'
 	    with Not_found -> (CHole (Util.dummy_loc, None) :: props), rest)
@@ -184,20 +176,13 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=Class
 	else
 	  type_ctx_instance isevars env' k.cl_props props substctx
   in
-  let inst_constr, ty_constr = instance_constructor k (List.rev_map snd subst) in
+  let inst_constr, ty_constr = instance_constructor k (List.rev subst) in
     isevars := Evarutil.nf_evar_defs !isevars;
-    let term = Evarutil.nf_isevar !isevars (it_mkNamedLambda_or_LetIn inst_constr ctx')
-    and termtype = Evarutil.nf_isevar !isevars (it_mkNamedProd_or_LetIn ty_constr ctx') 
+    let term = Evarutil.nf_isevar !isevars (it_mkLambda_or_LetIn inst_constr ctx')
+    and termtype = Evarutil.nf_isevar !isevars (it_mkProd_or_LetIn ty_constr ctx') 
     in
       isevars := undefined_evars !isevars;
       Evarutil.check_evars env Evd.empty !isevars termtype;
-(*   let imps =  *)
-(*     Util.list_map_i  *)
-(*       (fun i binder -> *)
-(* 	match binder with *)
-(* 	ExplByPos (i, Some na), (true, true)) *)
-(*       1 ctx *)
-(*   in *)
       let hook gr = 
 	let cst = match gr with ConstRef kn -> kn | _ -> assert false in
 	let inst = Typeclasses.new_instance k pri global cst in
diff --git a/contrib/subtac/subtac_classes.mli b/contrib/subtac/subtac_classes.mli
index 43f00107..afb0d38d 100644
--- a/contrib/subtac/subtac_classes.mli
+++ b/contrib/subtac/subtac_classes.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: subtac_classes.mli 10797 2008-04-15 13:19:33Z msozeau $ i*)
+(*i $Id: subtac_classes.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -26,11 +26,11 @@ open Classes
 
 val type_ctx_instance :     Evd.evar_defs ref ->
     Environ.env ->
-    (Names.identifier * 'a * Term.constr) list ->
+    ('a * Term.constr option * Term.constr) list ->
     Topconstr.constr_expr list ->
-    (Names.identifier * Term.constr) list ->
-    (Names.identifier * Term.constr) list *
-    (Names.identifier * Term.constr option * Term.constr) list
+    Term.constr list ->
+    Term.constr list *
+    ('a * Term.constr option * Term.constr) list
 
 val new_instance : 
   ?global:bool ->
diff --git a/contrib/subtac/subtac_coercion.ml b/contrib/subtac/subtac_coercion.ml
index b45e23d0..b046f0b3 100644
--- a/contrib/subtac/subtac_coercion.ml
+++ b/contrib/subtac/subtac_coercion.ml
@@ -6,7 +6,7 @@
 (*    //   *      This file is distributed under the terms of the       *)
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
-(* $Id: subtac_coercion.ml 11143 2008-06-18 15:52:42Z msozeau $ *)
+(* $Id: subtac_coercion.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Util
 open Names
@@ -111,41 +111,31 @@ module Coercion = struct
       : (Term.constr -> Term.constr) option 
       =
     let x = nf_evar (evars_of !isevars) x and y = nf_evar (evars_of !isevars) y in
-(*       (try debug 1 (str "Coerce called for " ++ (my_print_constr env x) ++  *)
-(* 		  str " and "++ my_print_constr env y ++  *)
-(* 		  str " with evars: " ++ spc () ++ *)
-(* 		  my_print_evardefs !isevars); *)
-(*        with _ -> ()); *)
     let rec coerce_unify env x y =
-(*       (try debug 1 (str "coerce_unify from " ++ (my_print_constr env x) ++  *)
-(* 		  str " to "++ my_print_constr env y) *)
-(*        with _ -> ()); *)
       let x = hnf env isevars x and y = hnf env isevars y in
 	try 
 	  isevars := the_conv_x_leq env x y !isevars;
-	  (* 	(try debug 1 (str "Unified " ++ (my_print_constr env x) ++  *)
-	  (* 			str " and "++ my_print_constr env y); *)
-	  (* 	 with _ -> ()); *)
 	  None
 	with Reduction.NotConvertible -> coerce' env x y
     and coerce' env x y : (Term.constr -> Term.constr) option =
       let subco () = subset_coerce env isevars x y in
+      let dest_prod c =
+	match Reductionops.decomp_n_prod env (evars_of !isevars) 1 c with
+	| [(na,b,t)], c -> (na,t), c
+	| _ -> raise NoSubtacCoercion
+      in
       let rec coerce_application typ typ' c c' l l' =
 	let len = Array.length l in
 	let rec aux tele typ typ' i co = 
-(* 	  (try trace (str "coerce_application.aux from " ++ (my_print_constr env x) ++ *)
-(* 			 str " to "++ my_print_constr env y *)
-(* 		       ++ str "in env:" ++ my_print_env env); *)
-(* 	    with _ -> ()); *)
 	  if i < len then
 	    let hdx = l.(i) and hdy = l'.(i) in
 	      try isevars := the_conv_x_leq env hdx hdy !isevars;
-		let (n, eqT, restT) = destProd typ in
-		let (n', eqT', restT') = destProd typ' in
+		let (n, eqT), restT = dest_prod typ in
+		let (n', eqT'), restT' = dest_prod typ' in
 		aux (hdx :: tele) (subst1 hdx restT) (subst1 hdy restT') (succ i) co
 	      with Reduction.NotConvertible ->
-		let (n, eqT, restT) = destProd typ in
-		let (n', eqT', restT') = destProd typ' in
+		let (n, eqT), restT = dest_prod typ in
+		let (n', eqT'), restT' = dest_prod typ' in
 		let _ = 
 		  try isevars := the_conv_x_leq env eqT eqT' !isevars
 		  with Reduction.NotConvertible -> raise NoSubtacCoercion
@@ -163,12 +153,12 @@ module Coercion = struct
 				      [| eqT; hdx; pred; x; hdy; evar|]) in
 		  aux (hdy :: tele) (subst1 hdx restT) (subst1 hdy restT') (succ i)  (fun x -> eq_app (co x))
 	  else Some co
-	in aux [] typ typ' 0 (fun x -> x)
+	in 
+	  if isEvar c || isEvar c' then
+	    (* Second-order unification needed. *)
+	    raise NoSubtacCoercion;
+	  aux [] typ typ' 0 (fun x -> x)
       in
-(* 	(try trace (str "coerce' from " ++ (my_print_constr env x) ++ *)
-(* 		       str " to "++ my_print_constr env y *)
-(* 		       ++ str "in env:" ++ my_print_env env); *)
-(* 	  with _ -> ()); *)
 	match (kind_of_term x, kind_of_term y) with
 	  | Sort s, Sort s' -> 
 	      (match s, s' with
@@ -179,13 +169,6 @@ module Coercion = struct
 	  | Prod (name, a, b), Prod (name', a', b') ->
 	      let name' = Name (Nameops.next_ident_away (id_of_string "x") (Termops.ids_of_context env)) in
 	      let env' = push_rel (name', None, a') env in
-		
-(* 	      let c1 = coerce_unify env' (lift 1 a') (lift 1 a) in *)
-(* 	      let name'' = Name (Nameops.next_ident_away (id_of_string "x'") (Termops.ids_of_context env)) in *)
-(* 	      let env'' = push_rel (name'', Some (app_opt c1 (mkRel 1)), lift 1 a) env' in *)
-(* 	      let c2 = coerce_unify env'' (liftn 1 1 b) (lift 1 b') in *)
-(* 				     mkLetIn (name'', app_opt c1 (mkRel 1), (lift 1 a), *)
-
 	      let c1 = coerce_unify env' (lift 1 a') (lift 1 a) in
 		(* env, x : a' |- c1 : lift 1 a' > lift 1 a *)
 	      let coec1 = app_opt c1 (mkRel 1) in
@@ -295,7 +278,6 @@ module Coercion = struct
     and subset_coerce env isevars x y =
       match disc_subset x with
 	  Some (u, p) -> 
-	    (* trace (str "Inserting projection ");	     *)
 	    let c = coerce_unify env u y in
 	    let f x = 
 	      app_opt c (mkApp ((Lazy.force sig_).proj1, 
@@ -423,7 +405,11 @@ module Coercion = struct
       isevars, { uj_val = app_opt ct j.uj_val; 
 		 uj_type = typ' }
 
-
+  let inh_coerce_to_prod loc env isevars t =
+    let typ = whd_betadeltaiota env (evars_of isevars) (snd t) in
+    let _, typ' = mu env isevars typ in
+      isevars, (fst t, typ')
+	
   let inh_coerce_to_fail env evd rigidonly v t c1 =
     if rigidonly & not (Heads.is_rigid env c1 && Heads.is_rigid env t)
     then
@@ -504,14 +490,13 @@ module Coercion = struct
 	  None -> 0, 0
 	| Some (init, cur) -> init, cur
     in
-      (* a little more effort to get products is needed *)
-      try let rels, rng = decompose_prod_n nabs t in
+      try 
+	let rels, rng = Reductionops.decomp_n_prod env (evars_of isevars) nabs t in
 	(* The final range free variables must have been replaced by evars, we accept only that evars
 	   in rng are applied to free vars. *)
-	if noccur_with_meta 0 (succ nabsinit) rng then (
-(* 	  trace (str "No occur between 0 and " ++ int (succ nabsinit)); *)
+	if noccur_with_meta 1 (succ nabs) rng then (
 	  let env', t, t' =
-	    let env' = List.fold_right (fun (n, t) env -> push_rel (n, None, t) env) rels env in
+	    let env' = push_rel_context rels env in
 	      env', rng, lift nabs t'
 	  in
 	    try
@@ -523,6 +508,4 @@ module Coercion = struct
 		error_cannot_coerce env' sigma (t, t'))
 	else isevars
       with _ -> isevars
-(*  	trace (str "decompose_prod_n failed"); *)
-(*  	raise (Invalid_argument "Subtac_coercion.inh_conv_coerces_to") *)
 end
diff --git a/contrib/subtac/subtac_command.ml b/contrib/subtac/subtac_command.ml
index 5bff6ad1..a2f54b02 100644
--- a/contrib/subtac/subtac_command.ml
+++ b/contrib/subtac/subtac_command.ml
@@ -350,9 +350,27 @@ let compute_possible_guardness_evidences (n,_) (_, fixctx) fixtype =
 
 let push_named_context = List.fold_right push_named
 
+let check_evars env initial_sigma evd c =
+  let sigma = evars_of evd in
+  let c = nf_evar sigma c in
+  let rec proc_rec c =
+    match kind_of_term c with
+      | Evar (evk,args) ->
+          assert (Evd.mem sigma evk);
+	  if not (Evd.mem initial_sigma evk) then
+            let (loc,k) = evar_source evk evd in
+	      (match k with
+	      | QuestionMark _ -> ()
+	      | _ ->
+		  let evi = nf_evar_info sigma (Evd.find sigma evk) in
+		    Pretype_errors.error_unsolvable_implicit loc env sigma evi k None)
+      | _ -> iter_constr proc_rec c
+  in proc_rec c
+
 let interp_recursive fixkind l boxed =
   let env = Global.env() in
   let fixl, ntnl = List.split l in
+  let kind = if fixkind <> Command.IsCoFixpoint then Fixpoint else CoFixpoint in
   let fixnames = List.map (fun fix -> fix.Command.fix_name) fixl in
 
   (* Interp arities allowing for unresolved types *)
@@ -384,20 +402,17 @@ let interp_recursive fixkind l boxed =
   let rec_sign = nf_named_context_evar (evars_of evd) rec_sign in
     
   let recdefs = List.length rec_sign in
-(*   List.iter (check_evars env_rec Evd.empty evd) fixdefs; *)
-(*   List.iter (check_evars env Evd.empty evd) fixtypes; *)
-(*   check_mutuality env kind (List.combine fixnames fixdefs); *)
+  List.iter (check_evars env_rec Evd.empty evd) fixdefs;
+  List.iter (check_evars env Evd.empty evd) fixtypes;
+  Command.check_mutuality env kind (List.combine fixnames fixdefs);
 
   (* Russell-specific code *)
 
   (* Get the interesting evars, those that were not instanciated *)
   let isevars = Evd.undefined_evars evd in
-  trace (str "got undefined evars" ++ Evd.pr_evar_defs isevars);
   let evm = Evd.evars_of isevars in
-  trace (str "got the evm, recdefs is " ++ int recdefs);
   (* Solve remaining evars *)
   let rec collect_evars id def typ imps = 
-    let _ = try trace (str "In collect evars, isevars is: " ++ Evd.pr_evar_defs isevars) with _ -> () in
       (* Generalize by the recursive prototypes  *)
     let def = 
       Termops.it_mkNamedLambda_or_LetIn def rec_sign
diff --git a/contrib/subtac/subtac_command.mli b/contrib/subtac/subtac_command.mli
index 27520867..3a6a351b 100644
--- a/contrib/subtac/subtac_command.mli
+++ b/contrib/subtac/subtac_command.mli
@@ -42,6 +42,7 @@ val interp_binder :     Evd.evar_defs ref ->
     Environ.env -> Names.name -> Topconstr.constr_expr -> Term.constr
 
 
+
 val build_recursive :
   (fixpoint_expr * decl_notation) list -> bool -> unit
 
diff --git a/contrib/subtac/subtac_obligations.ml b/contrib/subtac/subtac_obligations.ml
index 55cdc7c4..a393e2c9 100644
--- a/contrib/subtac/subtac_obligations.ml
+++ b/contrib/subtac/subtac_obligations.ml
@@ -119,7 +119,7 @@ let from_prg : program_info ProgMap.t ref = ref ProgMap.empty
 let freeze () = !from_prg, !default_tactic_expr
 let unfreeze (v, t) = from_prg := v; set_default_tactic t
 let init () =
-  from_prg := ProgMap.empty; set_default_tactic (Subtac_utils.tactics_call "obligations_tactic" [])
+  from_prg := ProgMap.empty; set_default_tactic (Subtac_utils.tactics_call "obligation_tactic" [])
 
 let _ = 
   Summary.declare_summary "program-tcc-table"
@@ -442,6 +442,7 @@ and solve_obligation_by_tac prg obls i tac =
 	       true		 
 	    else false
 	  with
+	    | Stdpp.Exc_located(_, Proof_type.LtacLocated (_, Refiner.FailError (_, s)))
 	    | Stdpp.Exc_located(_, Refiner.FailError (_, s))
 	    | Refiner.FailError (_, s) ->
 		user_err_loc (obl.obl_location, "solve_obligation", s)
diff --git a/contrib/subtac/subtac_pretyping.ml b/contrib/subtac/subtac_pretyping.ml
index 0e987cf2..ad76bdeb 100644
--- a/contrib/subtac/subtac_pretyping.ml
+++ b/contrib/subtac/subtac_pretyping.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: subtac_pretyping.ml 11047 2008-06-03 23:08:00Z msozeau $ *)
+(* $Id: subtac_pretyping.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Global
 open Pp
@@ -117,7 +117,6 @@ let env_with_binders env isevars l =
   in aux (env, []) l
 
 let subtac_process env isevars id bl c tycon =
-(*   let bl = Implicit_quantifiers.ctx_of_class_binders (vars_of_env env) cbl @ l in *)
   let c = Command.abstract_constr_expr c bl in
   let tycon = 
     match tycon with
@@ -132,12 +131,14 @@ let subtac_process env isevars id bl c tycon =
   let imps = Implicit_quantifiers.implicits_of_rawterm c in
   let coqc, ctyp = interp env isevars c tycon in
   let evm = non_instanciated_map env isevars (evars_of !isevars) in
-    evm, coqc, (match tycon with Some (None, c) -> c | _ -> ctyp), imps
+  let ty = nf_isevar !isevars (match tycon with Some (None, c) -> c | _ -> ctyp) in
+    evm, coqc, ty, imps
 
 open Subtac_obligations
 
 let subtac_proof kind env isevars id bl c tycon =
   let evm, coqc, coqt, imps = subtac_process env isevars id bl c tycon in
-  let evm = Subtac_utils.evars_of_term evm Evd.empty coqc in
-  let evars, def, ty = Eterm.eterm_obligations env id !isevars evm 0 coqc coqt in
+  let evm' = Subtac_utils.evars_of_term evm Evd.empty coqc in
+  let evm' = Subtac_utils.evars_of_term evm evm' coqt in
+  let evars, def, ty = Eterm.eterm_obligations env id !isevars evm' 0 coqc coqt in
     add_definition id def ty ~implicits:imps ~kind:kind evars
diff --git a/contrib/subtac/subtac_pretyping_F.ml b/contrib/subtac/subtac_pretyping_F.ml
index afa5817f..559b6ac1 100644
--- a/contrib/subtac/subtac_pretyping_F.ml
+++ b/contrib/subtac/subtac_pretyping_F.ml
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: subtac_pretyping_F.ml 11143 2008-06-18 15:52:42Z msozeau $ *)
+(* $Id: subtac_pretyping_F.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Pp
 open Util
@@ -246,6 +246,8 @@ module SubtacPretyping_F (Coercion : Coercion.S) = struct
 		  uj_type = it_mkProd_or_LetIn j.uj_type ctxt })
             ctxtv vdef in
 	evar_type_fixpoint loc env isevars names ftys vdefj;
+	let ftys = Array.map (nf_evar (evars_of !isevars)) ftys in
+	let fdefs = Array.map (fun x -> nf_evar (evars_of !isevars) (j_val x)) vdefj in
 	let fixj = match fixkind with
 	  | RFix (vn,i) ->
 	      (* First, let's find the guard indexes. *)
@@ -260,11 +262,11 @@ module SubtacPretyping_F (Coercion : Coercion.S) = struct
 		   | None -> list_map_i (fun i _ -> i) 0 ctxtv.(i))
 		vn)
 	      in 
-	      let fixdecls = (names,ftys,Array.map j_val vdefj) in 
+	      let fixdecls = (names,ftys,fdefs) in 
 	      let indexes = search_guard loc env possible_indexes fixdecls in 
 	      make_judge (mkFix ((indexes,i),fixdecls)) ftys.(i)
 	  | RCoFix i -> 
-	      let cofix = (i,(names,ftys,Array.map j_val vdefj)) in
+	      let cofix = (i,(names,ftys,fdefs)) in
 	      (try check_cofix env cofix with e -> Stdpp.raise_with_loc loc e);
 	      make_judge (mkCoFix cofix) ftys.(i) in
 	inh_conv_coerce_to_tycon loc env isevars fixj tycon
@@ -273,13 +275,15 @@ module SubtacPretyping_F (Coercion : Coercion.S) = struct
 	inh_conv_coerce_to_tycon loc env isevars (pretype_sort s) tycon
 
     | RApp (loc,f,args) -> 
-	let length = List.length args in	 
+	let length = List.length args in 
 	let ftycon = 
-	  match tycon with
-	      None -> None
+	  if length > 0 then
+	    match tycon with
+	    | None -> None
 	    | Some (None, ty) -> mk_abstr_tycon length ty
 	    | Some (Some (init, cur), ty) ->
 		Some (Some (length + init, length + cur), ty)
+	  else tycon
 	in
 	let fj = pretype ftycon env isevars lvar f in
  	let floc = loc_of_rawconstr f in
@@ -291,23 +295,13 @@ module SubtacPretyping_F (Coercion : Coercion.S) = struct
               let resty = whd_betadeltaiota env (evars_of !isevars) resj.uj_type in
       		match kind_of_term resty with
 		  | Prod (na,c1,c2) ->
-		      let hj = pretype (mk_tycon c1) env isevars lvar c in
+		      Option.iter (fun ty -> isevars :=
+			Coercion.inh_conv_coerces_to loc env !isevars resty ty) tycon;
+		      let evd, (_, _, tycon) = split_tycon loc env !isevars tycon in
+		      isevars := evd;
+		      let hj = pretype (mk_tycon (nf_isevar !isevars c1)) env isevars lvar c in
 		      let value, typ = applist (j_val resj, [j_val hj]), subst1 hj.uj_val c2 in
 		      let typ' = nf_isevar !isevars typ in
-		      let tycon = 
-			Option.map 
-			  (fun (abs, ty) ->
-			     match abs with
-				 None ->
-				   isevars := Coercion.inh_conv_coerces_to loc env !isevars typ'
-				     (abs, ty);
-				   (abs, ty)
-			       | Some (init, cur) ->
-				   isevars := Coercion.inh_conv_coerces_to loc env !isevars typ' 
-				     (abs, ty);
-				   (Some (init, pred cur), ty))
-			  tycon
-		      in 
 			apply_rec env (n+1) 
 			  { uj_val = nf_isevar !isevars value;
 			    uj_type = nf_isevar !isevars typ' }
@@ -319,7 +313,6 @@ module SubtacPretyping_F (Coercion : Coercion.S) = struct
 			  (join_loc floc argloc) env (evars_of !isevars)
 	      		  resj [hj]
 	in
-	let ftycon = Option.map (lift_abstr_tycon_type (-1)) ftycon in
 	let resj = j_nf_evar (evars_of !isevars) (apply_rec env 1 fj ftycon args) in
 	let resj =
 	  match kind_of_term resj.uj_val with
@@ -332,12 +325,22 @@ module SubtacPretyping_F (Coercion : Coercion.S) = struct
 	  inh_conv_coerce_to_tycon loc env isevars resj tycon
 
     | RLambda(loc,name,k,c1,c2)      ->
-	let (name',dom,rng) = evd_comb1 (split_tycon loc env) isevars tycon in
+	let tycon' = evd_comb1 
+	  (fun evd tycon -> 
+	    match tycon with 
+	    | None -> evd, tycon 
+	    | Some ty -> 
+		let evd, ty' = Coercion.inh_coerce_to_prod loc env evd ty in
+		  evd, Some ty') 
+	  isevars tycon 
+	in
+	let (name',dom,rng) = evd_comb1 (split_tycon loc env) isevars tycon' in
 	let dom_valcon = valcon_of_tycon dom in
 	let j = pretype_type dom_valcon env isevars lvar c1 in
 	let var = (name,None,j.utj_val) in
 	let j' = pretype rng (push_rel var env) isevars lvar c2 in 
-	  judge_of_abstraction env name j j'
+	let resj = judge_of_abstraction env name j j' in
+	  inh_conv_coerce_to_tycon loc env isevars resj tycon
 
     | RProd(loc,name,k,c1,c2)        ->
 	let j = pretype_type empty_valcon env isevars lvar c1 in
diff --git a/contrib/subtac/test/ListsTest.v b/contrib/subtac/test/ListsTest.v
index 3ceea173..05fc0803 100644
--- a/contrib/subtac/test/ListsTest.v
+++ b/contrib/subtac/test/ListsTest.v
@@ -1,5 +1,5 @@
 (* -*- coq-prog-args: ("-emacs-U" "-debug") -*- *)
-Require Import Coq.subtac.Utils.
+Require Import Coq.Program.Program.
 Require Import List.
 
 Set Implicit Arguments.
@@ -7,7 +7,7 @@ Set Implicit Arguments.
 Section Accessors.
   Variable A : Set.
 
-  Program Definition myhd : forall { l : list A | length l <> 0 }, A :=  
+  Program Definition myhd : forall (l : list A | length l <> 0), A :=  
     fun l =>
       match l with
         | nil => !
@@ -39,7 +39,7 @@ Section app.
 
   Next Obligation.
     intros.
-    destruct_call app ; subtac_simpl.
+    destruct_call app ; program_simpl.
   Defined.
   
   Program Lemma app_id_l : forall l : list A, l = nil ++ l.
@@ -49,7 +49,7 @@ Section app.
   
   Program Lemma app_id_r : forall l : list A, l = l ++ nil.
   Proof.
-    induction l ; simpl ; auto.
+    induction l ; simpl in * ; auto. 
     rewrite <- IHl ; auto.
   Qed.
 
@@ -70,16 +70,24 @@ Section Nth.
 
   Next Obligation.
   Proof.
-    intros.
-    inversion H.
+    simpl in *. auto with arith. 
   Defined.
 
+  Next Obligation.
+  Proof.
+    inversion H.
+  Qed.
+
   Program Fixpoint nth' (l : list A) (n : nat | n < length l) { struct l } : A := 
     match l, n with
       | hd :: _, 0 => hd
       | _ :: tl, S n' => nth' tl n'
       | nil, _ => !
     end.
+  Next Obligation.
+  Proof.
+    simpl in *. auto with arith. 
+  Defined.
 
   Next Obligation.
   Proof.
diff --git a/contrib/subtac/test/take.v b/contrib/subtac/test/take.v
index 87ab47d6..2e17959c 100644
--- a/contrib/subtac/test/take.v
+++ b/contrib/subtac/test/take.v
@@ -1,9 +1,12 @@
 (* -*- coq-prog-args: ("-emacs-U" "-debug") -*- *)
 Require Import JMeq.
 Require Import List.
-Require Import Coq.subtac.Utils.
+Require Import Program.
 
 Set Implicit Arguments.
+Obligations Tactic := idtac.
+
+Print cons.
 
 Program Fixpoint take (A : Set) (l : list A) (n : nat | n <= length l) { struct l } : { l' : list A | length l' = n } :=
   match n with
@@ -16,21 +19,14 @@ Program Fixpoint take (A : Set) (l : list A) (n : nat | n <= length l) { struct
   end.
 
 Require Import Omega.
-
+Solve All Obligations.
 Next Obligation.
-  intros.
-  simpl in l0.
-  apply le_S_n ; exact l0.
-Defined.
-
-Next Obligation.
-  intros.
-  destruct_call take ; subtac_simpl.
+  destruct_call take ; program_simpl.
 Defined.
 
 Next Obligation.
   intros.
-  inversion l0.
+  inversion H.
 Defined.
 
 
diff --git a/contrib/xml/proofTree2Xml.ml4 b/contrib/xml/proofTree2Xml.ml4
index 9afd07a6..05be01bc 100644
--- a/contrib/xml/proofTree2Xml.ml4
+++ b/contrib/xml/proofTree2Xml.ml4
@@ -82,8 +82,7 @@ let first_word s =
 
 let string_of_prim_rule x = match x with
   | Proof_type.Intro _-> "Intro"
-  | Proof_type.Intro_replacing _-> "Intro_replacing"
-  | Proof_type.Cut (_,_,_) -> "Cut"
+  | Proof_type.Cut _ -> "Cut"
   | Proof_type.FixRule (_,_,_) -> "FixRule"
   | Proof_type.Cofix (_,_)-> "Cofix"
   | Proof_type.Refine _ -> "Refine"
diff --git a/dev/doc/style.txt b/dev/doc/style.txt
index 2e597dc4..a8924ba6 100644
--- a/dev/doc/style.txt
+++ b/dev/doc/style.txt
@@ -20,6 +20,32 @@ match expr with
   | A -> ...
   | B x -> ...
 
+Remarque : à partir de la 8.2 environ, la tendance est à utiliser le
+format suivant qui permet de limiter l'escalade d'indentation tout en
+produisant un aspect visuel intéressant de bloc :
+
+type t =
+| A 
+| B of machin
+
+match expr with
+| A -> ...
+| B x -> ...
+
+let f expr = match expr with
+| A -> ...
+| B x -> ...
+
+let f expr = function
+| A -> ...
+| B x -> ...
+
+Le deuxième cas est obtenu sous tuareg avec les réglages
+
+  (setq tuareg-with-indent 0)
+  (setq tuareg-function-indent 0)
+  (setq tuareg-let-always-indent nil) /// notons que cette dernière est bien 
+                                      /// pour les let mais pas pour les let-in
 
 Conditionnelles
 ===============
diff --git a/dev/top_printers.ml b/dev/top_printers.ml
index afae141b..a2285015 100644
--- a/dev/top_printers.ml
+++ b/dev/top_printers.ml
@@ -128,6 +128,8 @@ let ppenv e = pp
 
 let pptac = (fun x -> pp(Pptactic.pr_glob_tactic (Global.env()) x))
 
+let ppinsts c = pp (pr_instance_gmap c)
+
 let ppobj obj = Format.print_string (Libobject.object_tag obj)
 
 let cnt = ref 0
diff --git a/doc/LICENCE b/doc/LICENSE
index 99087480..99087480 100644
--- a/doc/LICENCE
+++ b/doc/LICENSE
diff --git a/doc/README b/doc/README
deleted file mode 100755
index 14cb6e44..00000000
--- a/doc/README
+++ /dev/null
@@ -1,30 +0,0 @@
-You can get the whole documentation of Coq in the tar file all-ps-docs.tar.
-
-You can also get separately each document. The documentation of Coq
-V8.0 is divided into the following documents :
-
-     * Tutorial.ps: An introduction to the use of the Coq Proof Assistant;
-
-     * Reference-Manual.ps:
-
-       Base chapters:
-       - the description of Gallina, the language of Coq
-       - the description of the Vernacular, the commands of Coq
-       - the description of each tactic
-       - index on tactics, commands and error messages
-
-       Additional chapters:
-       - the extended Cases (C.Cornes)
-       - the coercions (A. Saïbi)
-       - the tactic Omega (P. Crégut)
-       - the extraction features (J.-C. Filliâtre and P. Letouzey) 
-       - the tactic Ring (S. Boutin and P. Loiseleur)
-       - the Setoid_replace tactic (C. Renard)
-       - etc.
-
-     * Library.ps: A description of the Coq standard library;
-
-     * rectypes.ps : A tutorial on recursive types by Eduardo Gimenez
-
-Documentation is also available in the PDF format and HTML format
-(online at http://coq.inria.fr or by ftp in the file doc-html.tar.gz).
diff --git a/ide/coq.ml b/ide/coq.ml
index 5166fb21..c560f0db 100644
--- a/ide/coq.ml
+++ b/ide/coq.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coq.ml 11126 2008-06-13 18:45:04Z herbelin $ *)
+(* $Id: coq.ml 11238 2008-07-19 09:34:03Z herbelin $ *)
 
 open Vernac
 open Vernacexpr
@@ -44,6 +44,8 @@ let init () =
      messages *)
 (**)
   Flags.make_silent true;
+  (* don't set a too large undo stack because Edit.create allocates an array *)
+  Pfedit.set_undo (Some 5000);
 (**)
   Coqtop.init_ide ()
 
@@ -98,7 +100,7 @@ let is_in_loadpath dir =
 let is_in_coq_path f = 
   try 
   let base = Filename.chop_extension (Filename.basename f) in
-  let _ = Library.locate_qualified_library 
+  let _ = Library.locate_qualified_library false
 	    (Libnames.make_qualid Names.empty_dirpath 
 	       (Names.id_of_string base)) in
   prerr_endline (f ^ " is in coq path");
@@ -246,9 +248,9 @@ let rec attribute_of_vernac_command = function
   | VernacSolveExistential _ -> [SolveCommand]
 
   (* MMode *)
-  | VernacDeclProof -> []
-  | VernacReturn -> []
-  | VernacProofInstr _ -> []
+  | VernacDeclProof -> [SolveCommand]
+  | VernacReturn -> [SolveCommand]
+  | VernacProofInstr _ -> [SolveCommand]
 
   (* Auxiliary file and library management *)
   | VernacRequireFrom _ -> []
diff --git a/ide/coq.png b/ide/coq.png
index 6ad66dbd..06aac459 100644
--- a/ide/coq.png
+++ b/ide/coq.png
diff --git a/ide/coqide.ml b/ide/coqide.ml
index 12716197..07ee698f 100644
--- a/ide/coqide.ml
+++ b/ide/coqide.ml
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coqide.ml 11126 2008-06-13 18:45:04Z herbelin $ *)
+(* $Id: coqide.ml 11221 2008-07-11 23:28:25Z herbelin $ *)
 
 open Preferences
 open Vernacexpr
@@ -543,8 +543,11 @@ type backtrack =
 | NoBacktrack
 
 let add_undo = function (n,a,b,p,l as x) -> if p = 0 then (n+1,a,b,p,l) else x
-let add_abort = function (n,a,b,0,l) -> (0,a+1,b,0,l) | (n,a,b,p,l) -> (n,a,b,p-1,l)
-let add_qed q (n,a,b,p,l) = (n,a,b,p+q,l)
+let add_abort = function
+  | (n,a,b,0,l) -> (0,a+1,b,0,l)
+  | (n,a,b,p,l) -> (n,a,b,p-1,l)
+let add_qed q (n,a,b,p,l as x) =
+  if q = 0 then x else (n,a,BacktrackToNextActiveMark,p+q,l)
 let add_backtrack (n,a,b,p,l) b' = (n,a,b',p,l)
 
 let update_proofs (n,a,b,p,cur_lems) prev_lems =
@@ -580,38 +583,46 @@ let pop_command undos t =
   ignore (pop ());
   undos
 
-let rec apply_backtrack l = function
-  | 0, BacktrackToMark mark -> reset_to mark
-  | 0, NoBacktrack -> ()
-  | 0, BacktrackToModSec id -> reset_to_mod id
-  | p, _ ->
-      (* re-synchronize Coq to the current state of the stack *)
-      if is_empty () then
-        Coq.reset_initial ()
-      else
-        begin
-          let t = top () in
-          let undos = (0,0,BacktrackToNextActiveMark,p,l) in
-          let (_,_,b,p,l) = pop_command undos t in
-          apply_backtrack l (p,b);
-          let reset_info = Coq.compute_reset_info (snd t.ast) in
-          interp_last t.ast;
-          repush_phrase reset_info t
-        end
-
-let rec apply_undos (n,a,b,p,l) =
-  (* Aborts *)
+let apply_aborts a =
   if a <> 0 then prerr_endline ("Applying "^string_of_int a^" aborts");
-  (try Util.repeat a Pfedit.delete_current_proof ()
-   with e -> prerr_endline "WARNING : found a closed environment"; raise e);
-  (* Undos *)
-  if n<>0 then 
+  try Util.repeat a Pfedit.delete_current_proof ()
+  with e -> prerr_endline "WARNING : found a closed environment"; raise e
+
+exception UndoStackExhausted
+
+let apply_tactic_undo n =
+  if n<>0 then
     (prerr_endline ("Applying "^string_of_int n^" undos");
-     try Pfedit.undo n
-     with _ -> (* Undo stack exhausted *)
-       apply_backtrack l (p,BacktrackToNextActiveMark));
-  (* Reset *)
-  apply_backtrack l (p,b)
+     try Pfedit.undo n with _ -> raise UndoStackExhausted)
+
+let apply_reset = function
+  | BacktrackToMark mark -> reset_to mark
+  | BacktrackToModSec id -> reset_to_mod id
+  | NoBacktrack -> ()
+  | BacktrackToNextActiveMark -> assert false
+
+let rec apply_undos (n,a,b,p,l as undos) =
+  if p = 0 & b <> BacktrackToNextActiveMark then
+    begin
+      apply_aborts a;
+      try
+	apply_tactic_undo n;
+	apply_reset b
+      with UndoStackExhausted ->
+	apply_undos (n,0,BacktrackToNextActiveMark,p,l)
+    end
+  else
+    (* re-synchronize Coq to the current state of the stack *)
+    if is_empty () then
+      Coq.reset_initial ()
+    else
+      begin
+        let t = top () in
+        apply_undos (pop_command undos t);
+        let reset_info = Coq.compute_reset_info (snd t.ast) in
+        interp_last t.ast;
+        repush_phrase reset_info t
+      end
 
 (* For electric handlers *)
 exception Found
@@ -3521,24 +3532,33 @@ with _ := Induction for _ Sort _.\n",61,10, Some GdkKeysyms._S);
        \n"
 							    in
 							    let initial_about (b:GText.buffer) =
-							      (try 
-								let image = lib_ide_file "coq.png" in
-								let startup_image = GdkPixbuf.from_file image in
-								b#insert_pixbuf ~iter:b#start_iter ~pixbuf:startup_image;
-								b#insert ~iter:b#start_iter "\t\t   "
-							       with _ -> ());
+							      let initial_string = "Welcome to CoqIDE, an Integrated Development Environment for Coq\n" in
 							      let coq_version = Coq.short_version () in
-							      b#insert ~iter:b#start_iter "\n\n";
-							      if Glib.Utf8.validate coq_version then b#insert ~iter:b#start_iter coq_version;
-							      b#insert ~iter:b#start_iter "\n   "
+								b#insert ~iter:b#start_iter "\n\n";
+								if Glib.Utf8.validate ("You are running " ^ coq_version) then b#insert ~iter:b#start_iter ("You are running " ^ coq_version);
+								if Glib.Utf8.validate initial_string then b#insert ~iter:b#start_iter initial_string;
+								(try 
+								    let image = lib_ide_file "coq.png" in
+								    let startup_image = GdkPixbuf.from_file image in
+								      b#insert ~iter:b#start_iter "\n\n";
+								      b#insert_pixbuf ~iter:b#start_iter ~pixbuf:startup_image;
+								      b#insert ~iter:b#start_iter "\n\n\t\t   "
+								  with _ -> ())
 							    in
 
 							    let about (b:GText.buffer) =
-							      if Glib.Utf8.validate about_full_string
-							      then b#insert about_full_string;
-							      let coq_version = Coq.version () in
-							      if Glib.Utf8.validate coq_version
-							      then b#insert coq_version
+							      (try 
+								  let image = lib_ide_file "coq.png" in
+								  let startup_image = GdkPixbuf.from_file image in
+								    b#insert ~iter:b#start_iter "\n\n";
+								    b#insert_pixbuf ~iter:b#start_iter ~pixbuf:startup_image;
+								    b#insert ~iter:b#start_iter "\n\n\t\t   "
+								with _ -> ());
+								if Glib.Utf8.validate about_full_string
+								then b#insert about_full_string;
+								let coq_version = Coq.version () in
+								  if Glib.Utf8.validate coq_version
+								  then b#insert coq_version
 
 							    in
 							      initial_about tv2#buffer;
diff --git a/ide/preferences.ml b/ide/preferences.ml
index 444b2c2b..dba56a77 100644
--- a/ide/preferences.ml
+++ b/ide/preferences.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: preferences.ml 11058 2008-06-06 08:21:03Z herbelin $ *)
+(* $Id: preferences.ml 11276 2008-07-28 00:28:34Z glondu $ *)
 
 open Configwin
 open Printf
@@ -507,12 +507,11 @@ let configure ?(apply=(fun () -> ())) () =
   in    
   let cmd_browse =
     let predefined = [
+      Coq_config.browser;
       "netscape -remote \"openURL(%s)\"";
       "mozilla -remote \"openURL(%s)\"";
-      "firefox -remote \"openURL(%s,new-tab)\" || firefox %s &";
       "firefox -remote \"openURL(%s,new-windows)\" || firefox %s &";
       "seamonkey -remote \"openURL(%s)\" || seamonkey %s &";
-      "C:\\PROGRA~1\\INTERN~1\\IEXPLORE %s";
       "open -a Safari %s &"
     ] in
     combo 
@@ -585,4 +584,3 @@ let configure ?(apply=(fun () -> ())) () =
   match x with 
     | Return_apply | Return_ok -> save_pref ()
     | Return_cancel -> ()
-
diff --git a/interp/constrextern.ml b/interp/constrextern.ml
index 141e8f8a..efb6c853 100644
--- a/interp/constrextern.ml
+++ b/interp/constrextern.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: constrextern.ml 11024 2008-05-30 12:41:39Z msozeau $ *)
+(* $Id: constrextern.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (*i*)
 open Pp
@@ -98,7 +98,7 @@ let ids_of_ctxt ctxt =
        (function c -> match kind_of_term c with
 	  | Var id -> id
 	  | _ ->
-       error "arbitrary substitution of references not implemented")
+       error "Arbitrary substitution of references not implemented.")
      ctxt)
 
 let idopt_of_name = function 
@@ -973,7 +973,7 @@ and raw_of_eqn env constr construct_nargs branch =
             buildrec new_ids (pat::patlist) new_env (n-1) b
 
 	| _ ->
-	    error "Unsupported branch in case-analysis while printing pattern"
+	    error "Unsupported branch in case-analysis while printing pattern."
   in 
   buildrec [] [] env construct_nargs branch
 
diff --git a/interp/constrintern.ml b/interp/constrintern.ml
index 9abee4d4..9af7e769 100644
--- a/interp/constrintern.ml
+++ b/interp/constrintern.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: constrintern.ml 11065 2008-06-06 22:39:43Z msozeau $ *)
+(* $Id: constrintern.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -50,7 +50,7 @@ let for_grammar f x =
 type internalisation_error =
   | VariableCapture of identifier
   | WrongExplicitImplicit
-  | NegativeMetavariable
+  | IllegalMetavariable
   | NotAConstructor of reference
   | UnboundFixName of bool * identifier
   | NonLinearPattern of identifier
@@ -66,8 +66,8 @@ let explain_wrong_explicit_implicit =
   str "Found an explicitly given implicit argument but was expecting" ++
   fnl () ++ str "a regular one"
 
-let explain_negative_metavariable =
-  str "Metavariable numbers must be positive"
+let explain_illegal_metavariable =
+  str "Metavariables allowed only in patterns"
 
 let explain_not_a_constructor ref =
   str "Unknown constructor: " ++ pr_reference ref
@@ -99,24 +99,26 @@ let explain_bad_explicitation_number n po =
       str "Bad explicitation name: found " ++ pr_id id ++ 
       str" but was expecting " ++ s
 
-let explain_internalisation_error = function
+let explain_internalisation_error e =
+  let pp = match e with
   | VariableCapture id -> explain_variable_capture id
   | WrongExplicitImplicit -> explain_wrong_explicit_implicit
-  | NegativeMetavariable -> explain_negative_metavariable
+  | IllegalMetavariable -> explain_illegal_metavariable
   | NotAConstructor ref -> explain_not_a_constructor ref
   | UnboundFixName (iscofix,id) -> explain_unbound_fix_name iscofix id
   | NonLinearPattern id -> explain_non_linear_pattern id
   | BadPatternsNumber (n1,n2) -> explain_bad_patterns_number n1 n2
-  | BadExplicitationNumber (n,po) -> explain_bad_explicitation_number n po
+  | BadExplicitationNumber (n,po) -> explain_bad_explicitation_number n po in
+  pp ++ str "."
 
 let error_unbound_patvar loc n =
   user_err_loc
     (loc,"glob_qualid_or_patvar", str "?" ++ pr_patvar n ++ 
-      str " is unbound")
+      str " is unbound.")
 
 let error_bad_inductive_type loc =
   user_err_loc (loc,"",str 
-    "This should be an inductive type applied to names or \"_\"")
+    "This should be an inductive type applied to names or \"_\".")
 
 let error_inductive_parameter_not_implicit loc =
   user_err_loc (loc,"", str
@@ -324,7 +326,7 @@ let set_var_scope loc id (_,scopt,scopes) varscopes =
     make_current_scope (Option.get !idscopes)
     <> make_current_scope (scopt,scopes) then
       user_err_loc (loc,"set_var_scope",
-      pr_id id ++ str " already occurs in a different scope")
+      pr_id id ++ str " already occurs in a different scope.")
   else
     idscopes := Some (scopt,scopes)
 
@@ -444,7 +446,7 @@ let intern_var (env,_,_ as genv) (ltacvars,vars2,vars3,(_,impls)) loc id =
   try
     match List.assoc id unbndltacvars with
       | None -> user_err_loc (loc,"intern_var",
-	  str "variable " ++ pr_id id ++ str " should be bound to a term")
+	  str "variable " ++ pr_id id ++ str " should be bound to a term.")
       | Some id0 -> Pretype_errors.error_var_not_found_loc loc id0
   with Not_found ->
   (* Is [id] a goal or section variable *)
@@ -463,14 +465,14 @@ let find_appl_head_data (_,_,_,(_,impls)) = function
   | x -> x,[],[],[]
 
 let error_not_enough_arguments loc =
-  user_err_loc (loc,"",str "Abbreviation is not applied enough")
+  user_err_loc (loc,"",str "Abbreviation is not applied enough.")
 
 let check_no_explicitation l =
   let l = List.filter (fun (a,b) -> b <> None) l in
   if l <> [] then
     let loc = fst (Option.get (snd (List.hd l))) in
     user_err_loc
-      (loc,"",str"Unexpected explicitation of the argument of an abbreviation")
+     (loc,"",str"Unexpected explicitation of the argument of an abbreviation.")
 
 (* Is it a global reference or a syntactic definition? *)
 let intern_qualid loc qid intern env args =
@@ -580,7 +582,7 @@ let check_number_of_pattern loc n l =
 let check_or_pat_variables loc ids idsl =
   if List.exists (fun ids' -> not (list_eq_set ids ids')) idsl then
     user_err_loc (loc, "", str 
-    "The components of this disjunctive pattern must bind the same variables")
+    "The components of this disjunctive pattern must bind the same variables.")
 
 let check_constructor_length env loc cstr pl pl0 =
   let n = List.length pl + List.length pl0 in
@@ -607,7 +609,7 @@ let message_redundant_alias (id1,id2) =
 (* Expanding notations *)
 
 let error_invalid_pattern_notation loc =
-  user_err_loc (loc,"",str "Invalid notation for pattern")
+  user_err_loc (loc,"",str "Invalid notation for pattern.")
 
 let chop_aconstr_constructor loc (ind,k) args =
   let nparams = (fst (Global.lookup_inductive ind)).Declarations.mind_nparams in
@@ -815,9 +817,9 @@ let locate_if_isevar loc na = function
 
 let check_hidden_implicit_parameters id (_,_,_,(indnames,_)) =
   if List.mem id indnames then
-    errorlabstrm "" (str "A parameter or name of an inductive type " ++
-    pr_id id ++ str " must not be used as a bound variable in the type \
-of its constructor")
+    errorlabstrm "" (strbrk "A parameter or name of an inductive type " ++
+    pr_id id ++ strbrk " must not be used as a bound variable in the type \
+of its constructor.")
 
 let push_name_env lvar (ids,tmpsc,scopes as env) = function
   | Anonymous -> env 
@@ -840,11 +842,9 @@ let intern_typeclass_binders intern_type lvar env bl =
 	(env, (na,bk,None,ty)::bl))
     env bl
 
-let intern_typeclass_binder intern_type lvar (env,bl) na b ty =
-  let ctx = (na, b, ty) in
-  let (fvs, bind) = Implicit_quantifiers.generalize_class_binders_raw (pi1 env) [ctx] in
-  let env, ifvs = intern_typeclass_binders intern_type lvar (env,bl) fvs in
-    intern_typeclass_binders intern_type lvar (env,ifvs) bind
+let intern_typeclass_binder intern_type lvar (env,bl) cb =
+  let (ids, fvs, bind) = Implicit_quantifiers.generalize_class_binder_raw (pi1 env) cb in
+    intern_typeclass_binders intern_type lvar (env,bl) (fvs@[bind])
     
 let intern_local_binder_aux intern intern_type lvar ((ids,ts,sc as env),bl) = function
   | LocalRawAssum(nal,bk,ty) ->
@@ -857,8 +857,8 @@ let intern_local_binder_aux intern intern_type lvar ((ids,ts,sc as env),bl) = fu
 		(fun ((ids,ts,sc),bl) (_,na) ->
 		  ((name_fold Idset.add na ids,ts,sc), (na,k,None,ty)::bl))
 		(env,bl) nal
-	| TypeClass b ->
-	    intern_typeclass_binder intern_type lvar (env,bl) (List.hd nal) b ty)
+	| TypeClass (b,b') ->
+	    intern_typeclass_binder intern_type lvar (env,bl) (List.hd nal, (b,b'), ty))
   | LocalRawDef((loc,na),def) ->
       ((name_fold Idset.add na ids,ts,sc),
       (na,Explicit,Some(intern env def),RHole(loc,Evd.BinderType na))::bl)
@@ -880,11 +880,11 @@ let check_projection isproj nargs r =
       (try
 	let n = Recordops.find_projection_nparams ref + 1 in
 	if nargs <> n then
-	  user_err_loc (loc,"",str "Projection has not the right number of explicit parameters");
+	  user_err_loc (loc,"",str "Projection has not the right number of explicit parameters.");
       with Not_found -> 
 	user_err_loc
-	(loc,"",pr_global_env Idset.empty ref ++ str " is not a registered projection"))
-  | _, Some _ -> user_err_loc (loc_of_rawconstr r, "", str "Not a projection")
+	(loc,"",pr_global_env Idset.empty ref ++ str " is not a registered projection."))
+  | _, Some _ -> user_err_loc (loc_of_rawconstr r, "", str "Not a projection.")
   | _, None -> ()
 
 let get_implicit_name n imps =
@@ -909,10 +909,11 @@ let extract_explicit_arg imps args =
 	  let id = match pos with
 	  | ExplByName id ->
 	      if not (exists_implicit_name id imps) then
-		user_err_loc (loc,"",str "Wrong argument name: " ++ pr_id id);
+		user_err_loc
+		  (loc,"",str "Wrong argument name: " ++ pr_id id ++ str ".");
 	      if List.mem_assoc id eargs then
 		user_err_loc (loc,"",str "Argument name " ++ pr_id id
-		++ str " occurs more than once");
+		++ str " occurs more than once.");
 	      id
 	  | ExplByPos (p,_id) ->
 	      let id =
@@ -921,11 +922,12 @@ let extract_explicit_arg imps args =
 		  if not (is_status_implicit imp) then failwith "imp";
 		  name_of_implicit imp
 		with Failure _ (* "nth" | "imp" *) ->
-		  user_err_loc (loc,"",str"Wrong argument position: " ++ int p)
+		  user_err_loc
+		    (loc,"",str"Wrong argument position: " ++ int p ++ str ".")
 	      in
 	      if List.mem_assoc id eargs then
 		user_err_loc (loc,"",str"Argument at position " ++ int p ++
-		  str " is mentioned more than once");
+		  str " is mentioned more than once.");
 	      id in
 	  ((id,(loc,a))::eargs,rargs)
   in aux args
@@ -1086,7 +1088,7 @@ let internalise sigma globalenv env allow_patvar lvar c =
     | CPatVar (loc, n) when allow_patvar ->
 	RPatVar (loc, n)
     | CPatVar (loc, _) ->
-	raise (InternalisationError (loc,NegativeMetavariable))
+	raise (InternalisationError (loc,IllegalMetavariable))
     | CEvar (loc, n, l) ->
 	REvar (loc, n, Option.map (List.map (intern env)) l)
     | CSort (loc, s) ->
@@ -1149,7 +1151,7 @@ let internalise sigma globalenv env allow_patvar lvar c =
 	let nal = List.map (function
 	  | RHole loc -> Anonymous
 	  | RVar (_,id) -> Name id
-	  | c -> user_err_loc (loc_of_rawconstr c,"",str "Not a name")) l in
+	  | c -> user_err_loc (loc_of_rawconstr c,"",str "Not a name.")) l in
 	let parnal,realnal = list_chop nparams nal in
 	if List.exists ((<>) Anonymous) parnal then
 	  error_inductive_parameter_not_implicit loc;
@@ -1173,9 +1175,9 @@ let internalise sigma globalenv env allow_patvar lvar c =
     in
       match bk with
 	| Default b -> default env b nal
-	| TypeClass b -> 
+	| TypeClass (b,b') -> 
 	    let env, ibind = intern_typeclass_binder intern_type lvar
-	      (env, []) (List.hd nal) b ty in
+	      (env, []) (List.hd nal,(b,b'),ty) in
 	    let body = intern_type env body in
 	      it_mkRProd ibind body
 					   
@@ -1189,9 +1191,9 @@ let internalise sigma globalenv env allow_patvar lvar c =
       | [] -> intern env body
     in match bk with
       | Default b -> default env b nal
-      | TypeClass b ->	  
+      | TypeClass (b, b') ->	  
 	  let env, ibind = intern_typeclass_binder intern_type lvar
-	    (env, []) (List.hd nal) b ty in
+	    (env, []) (List.hd nal,(b,b'),ty) in
 	  let body = intern env body in
 	    it_mkRLambda ibind body
 	      
@@ -1221,7 +1223,8 @@ let internalise sigma globalenv env allow_patvar lvar c =
 	  if eargs <> [] then 
 	    (let (id,(loc,_)) = List.hd eargs in
 	       user_err_loc (loc,"",str "Not enough non implicit
-	    arguments to accept the argument bound to " ++ pr_id id));
+	    arguments to accept the argument bound to " ++ 
+		 pr_id id ++ str"."));
 	  []
       | ([], rargs) ->
 	  assert (eargs = []);
@@ -1275,23 +1278,6 @@ let intern_ltac isarity ltacvars sigma env c =
 
 type manual_implicits = (explicitation * (bool * bool)) list
 
-let implicits_of_rawterm l = 
-  let rec aux i c = 
-    match c with
-	RProd (loc, na, bk, t, b) | RLambda (loc, na, bk, t, b) -> 
-	  let rest = aux (succ i) b in
-	    if bk = Implicit then
-	      let name =
-		match na with
-		    Name id -> Some id
-		  | Anonymous -> None
-	      in
-		(ExplByPos (i, name), (true, true)) :: rest
-	    else rest
-      | RLetIn (loc, na, t, b) -> aux i b
-      | _ -> []
-  in aux 1 l
-
 (*********************************************************************)
 (* Functions to parse and interpret constructions *)
 
@@ -1321,11 +1307,11 @@ let interp_constr_evars_gen_impls ?evdref
   match evdref with 
     | None -> 
 	let c = intern_gen (kind=IsType) ~impls Evd.empty env c in
-	let imps = implicits_of_rawterm c in
+	let imps = Implicit_quantifiers.implicits_of_rawterm c in
 	  Default.understand_gen kind Evd.empty env c, imps
     | Some evdref ->
 	let c = intern_gen (kind=IsType) ~impls (Evd.evars_of !evdref) env c in
-	let imps = implicits_of_rawterm c in
+	let imps = Implicit_quantifiers.implicits_of_rawterm c in
 	  Default.understand_tcc_evars evdref env kind c, imps
 
 let interp_constr_evars_gen evdref env ?(impls=([],[])) kind c =
diff --git a/interp/coqlib.ml b/interp/coqlib.ml
index 65e4dcd5..ca758458 100644
--- a/interp/coqlib.ml
+++ b/interp/coqlib.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coqlib.ml 11072 2008-06-08 16:13:37Z herbelin $ *)
+(* $Id: coqlib.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -70,7 +70,7 @@ let check_required_library d =
      (dummy_loc,make_qualid (make_dirpath (List.rev prefix)) m)
 *)
 (* or failing ...*)
-    error ("Library "^(string_of_dirpath dir)^" has to be required first")
+    error ("Library "^(string_of_dirpath dir)^" has to be required first.")
 
 (************************************************************************)
 (* Specific Coq objects *)
diff --git a/interp/genarg.ml b/interp/genarg.ml
index 49c157f2..c54dfe23 100644
--- a/interp/genarg.ml
+++ b/interp/genarg.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: genarg.ml 10753 2008-04-04 14:55:47Z herbelin $ *)
+(* $Id: genarg.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -75,24 +75,24 @@ let create_arg s =
 let exists_argtype s = List.mem s !dyntab
 
 type intro_pattern_expr =
-  | IntroOrAndPattern of case_intro_pattern_expr
+  | IntroOrAndPattern of or_and_intro_pattern_expr
   | IntroWildcard
-  | IntroIdentifier of identifier
-  | IntroAnonymous
   | IntroRewrite of bool
+  | IntroIdentifier of identifier
   | IntroFresh of identifier
-and case_intro_pattern_expr = intro_pattern_expr list list
+  | IntroAnonymous
+and or_and_intro_pattern_expr = (loc * intro_pattern_expr) list list
 
-let rec pr_intro_pattern = function
-  | IntroOrAndPattern pll -> pr_case_intro_pattern pll
+let rec pr_intro_pattern (_,pat) = match pat with
+  | IntroOrAndPattern pll -> pr_or_and_intro_pattern pll
   | IntroWildcard -> str "_"
-  | IntroIdentifier id -> pr_id id
-  | IntroAnonymous -> str "?"
   | IntroRewrite true -> str "->"
   | IntroRewrite false -> str "<-"
+  | IntroIdentifier id -> pr_id id
   | IntroFresh id -> str "?" ++ pr_id id
+  | IntroAnonymous -> str "?"
 
-and pr_case_intro_pattern = function
+and pr_or_and_intro_pattern = function
   | [pl] ->
       str "(" ++ hv 0 (prlist_with_sep pr_coma pr_intro_pattern pl) ++ str ")"
   | pll ->
diff --git a/interp/genarg.mli b/interp/genarg.mli
index 3548585b..da175078 100644
--- a/interp/genarg.mli
+++ b/interp/genarg.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: genarg.mli 10753 2008-04-04 14:55:47Z herbelin $ i*)
+(*i $Id: genarg.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Util
 open Names
@@ -32,16 +32,16 @@ type open_rawconstr = unit * rawconstr_and_expr
 type 'a with_ebindings = 'a * open_constr bindings
 
 type intro_pattern_expr =
-  | IntroOrAndPattern of case_intro_pattern_expr
+  | IntroOrAndPattern of or_and_intro_pattern_expr
   | IntroWildcard
-  | IntroIdentifier of identifier
-  | IntroAnonymous
   | IntroRewrite of bool
+  | IntroIdentifier of identifier
   | IntroFresh of identifier
-and case_intro_pattern_expr = intro_pattern_expr list list
+  | IntroAnonymous
+and or_and_intro_pattern_expr = (loc * intro_pattern_expr) list list
 
-val pr_intro_pattern : intro_pattern_expr -> Pp.std_ppcmds
-val pr_case_intro_pattern : case_intro_pattern_expr -> Pp.std_ppcmds
+val pr_intro_pattern : intro_pattern_expr located -> Pp.std_ppcmds
+val pr_or_and_intro_pattern : or_and_intro_pattern_expr -> Pp.std_ppcmds
 
 (* The route of a generic argument, from parsing to evaluation
 
@@ -128,15 +128,16 @@ val wit_int_or_var : (int or_var,tlevel) abstract_argument_type
 
 val rawwit_string : (string,rlevel) abstract_argument_type
 val globwit_string : (string,glevel) abstract_argument_type
+
 val wit_string : (string,tlevel) abstract_argument_type
 
 val rawwit_pre_ident : (string,rlevel) abstract_argument_type
 val globwit_pre_ident : (string,glevel) abstract_argument_type
 val wit_pre_ident : (string,tlevel) abstract_argument_type
 
-val rawwit_intro_pattern : (intro_pattern_expr,rlevel) abstract_argument_type
-val globwit_intro_pattern : (intro_pattern_expr,glevel) abstract_argument_type
-val wit_intro_pattern : (intro_pattern_expr,tlevel) abstract_argument_type
+val rawwit_intro_pattern : (intro_pattern_expr located,rlevel) abstract_argument_type
+val globwit_intro_pattern : (intro_pattern_expr located,glevel) abstract_argument_type
+val wit_intro_pattern : (intro_pattern_expr located,tlevel) abstract_argument_type
 
 val rawwit_ident : (identifier,rlevel) abstract_argument_type
 val globwit_ident : (identifier,glevel) abstract_argument_type
diff --git a/interp/implicit_quantifiers.ml b/interp/implicit_quantifiers.ml
index d480ad39..a83071d1 100644
--- a/interp/implicit_quantifiers.ml
+++ b/interp/implicit_quantifiers.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: implicit_quantifiers.ml 10922 2008-05-12 12:47:17Z msozeau $ i*)
+(*i $Id: implicit_quantifiers.ml 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -29,7 +29,6 @@ open Pp
 let ids_of_list l = 
   List.fold_right Idset.add l Idset.empty
 
-
 let locate_reference qid =
   match Nametab.extended_locate qid with
     | TrueGlobal ref -> true
@@ -88,44 +87,17 @@ let rec make_fresh ids env x =
 let freevars_of_ids env ids = 
   List.filter (is_freevar env (Global.env())) ids
 
-let compute_constrs_freevars env constrs =
-  let ids = 
-    List.rev (List.fold_left 
-		 (fun acc x -> free_vars_of_constr_expr x acc) 
-		 [] constrs)
-  in freevars_of_ids env ids
-
-(* let compute_context_freevars env ctx = *)
-(*   let ids = *)
-(*     List.rev *)
-(*       (List.fold_left *)
-(* 	  (fun acc (_,i,x) -> free_vars_of_constr_expr x acc) *)
-(* 	  [] constrs) *)
-(*   in freevars_of_ids ids *)
-
-let compute_constrs_freevars_binders env constrs =
-  let elts = compute_constrs_freevars env constrs in
-    List.map (fun id -> (dummy_loc, id), CHole (dummy_loc, None)) elts
-
 let binder_list_of_ids ids =
   List.map (fun id -> LocalRawAssum ([dummy_loc, Name id], Default Implicit, CHole (dummy_loc, None))) ids
       
 let next_ident_away_from id avoid = make_fresh avoid (Global.env ()) id
-(*   let rec name_rec id = *)
-(*     if Idset.mem id avoid then name_rec (Nameops.lift_ident id) else id in  *)
-(*   name_rec id  *)
-
-let ids_of_named_context_avoiding avoid l =
-  List.fold_left (fun (ids, avoid) id -> 
-    let id' = next_ident_away_from id avoid in id' :: ids, Idset.add id' avoid) 
-    ([], avoid) (Termops.ids_of_named_context l)
     
 let combine_params avoid fn applied needed =
   let named, applied = 
     List.partition 
       (function
 	  (t, Some (loc, ExplByName id)) -> 
-	    if not (List.exists (fun (_, (id', _, _)) -> id = id') needed) then
+	    if not (List.exists (fun (_, (id', _, _)) -> Name id = id') needed) then
 	      user_err_loc (loc,"",str "Wrong argument name: " ++ Nameops.pr_id id);
 	    true
 	| _ -> false) applied
@@ -138,13 +110,13 @@ let combine_params avoid fn applied needed =
     match app, need with
 	[], [] -> List.rev ids, avoid
 
-      | app, (_, (id, _, _)) :: need when List.mem_assoc id named ->
+      | app, (_, (Name id, _, _)) :: need when List.mem_assoc id named ->
 	  aux (List.assoc id named :: ids) avoid app need
 	    
-      | (x, None) :: app, (None, (id, _, _)) :: need ->
+      | (x, None) :: app, (None, (Name id, _, _)) :: need ->
 	  aux (x :: ids) avoid app need
 	    
-      | _, (Some cl, (id, _, _) as d) :: need -> 
+      | _, (Some cl, (Name id, _, _) as d) :: need -> 
 	  let t', avoid' = fn avoid d in
 	    aux (t' :: ids) avoid' app need
 
@@ -155,12 +127,14 @@ let combine_params avoid fn applied needed =
 	    aux (t' :: ids) avoid' app need
 
       | _ :: _, [] -> failwith "combine_params: overly applied typeclass"
+
+      | _, _ -> raise (Invalid_argument "combine_params")
   in aux [] avoid applied needed
 
 let combine_params_freevar avoid applied needed =
   combine_params avoid
     (fun avoid (_, (id, _, _)) -> 
-      let id' = next_ident_away_from id avoid in
+      let id' = next_ident_away_from (Nameops.out_name id) avoid in
 	(CRef (Ident (dummy_loc, id')), Idset.add id' avoid))
     applied needed
 
@@ -201,19 +175,6 @@ let full_class_binders env l =
 	| Explicit -> (x :: l', avoid))
       ([], avoid) l
   in List.rev l'
-      
-let constr_expr_of_constraint (kind, id) l =
-  match kind with
-    | Implicit -> CAppExpl (fst id, (None, Ident id), l)
-    | Explicit -> CApp (fst id, (None, CRef (Ident id)),
-		       List.map (fun x -> x, None) l)
-
-(*    | CApp of loc * (proj_flag * constr_expr) *  *)
-(*         (constr_expr * explicitation located option) list *)
-
-
-let constrs_of_context l =
-  List.map (fun (_, id, l) -> constr_expr_of_constraint id l) l
 
 let compute_context_freevars env ctx =
   let bound, ids = 
@@ -232,41 +193,50 @@ let resolve_class_binders env l =
   in
     fv_ctx, ctx
 
-let generalize_class_binders env l = 
-  let fv_ctx, cstrs = resolve_class_binders env l in
-    List.map (fun ((loc, id), t) -> LocalRawAssum ([loc, Name id], Default Implicit, t)) fv_ctx,
-  List.map (fun (iid, bk, c) -> LocalRawAssum ([iid], Default Implicit, c)) 
-    cstrs
+let full_class_binder env (iid, (bk, bk'), cl as c) = 
+  let avoid = Idset.union env (ids_of_list (compute_context_vars env [c])) in
+  let c, avoid =
+    match bk' with
+    | Implicit -> 
+	let (loc, id, l) = 
+	  try destClassAppExpl cl 
+	  with Not_found -> 
+	    user_err_loc (constr_loc cl, "class_binders", str"Not an applied type class")
+	in
+	let gr = Nametab.global id in
+	  (try
+	      let c = class_info gr in
+	      let args, avoid = combine_params_freevar avoid l (List.rev c.cl_context) in
+		(iid, bk, CAppExpl (loc, (None, id), args)), avoid
+	    with Not_found -> not_a_class (Global.env ()) (constr_of_global gr))
+    | Explicit -> ((iid,bk,cl), avoid)
+  in c
+
+let compute_constraint_freevars env (oid, _, x) =
+  let bound = match snd oid with Name n -> Idset.add n env | Anonymous -> env in
+  let ids = free_vars_of_constr_expr x ~bound [] in
+    freevars_of_ids env (List.rev ids)
+
+let resolve_class_binder env c = 
+  let cstr = full_class_binder env c in
+  let fv_ctx = 
+    let elts = compute_constraint_freevars env cstr in
+      List.map (fun id -> (dummy_loc, id), CHole (dummy_loc, None)) elts
+  in fv_ctx, cstr
+    
+let generalize_class_binder_raw env c = 
+  let env = Idset.union env (Termops.vars_of_env (Global.env())) in
+  let fv_ctx, cstr = resolve_class_binder env c in
+  let ids' = List.fold_left (fun acc ((loc, id), t) -> Idset.add id acc) env fv_ctx in
+  let ctx' = List.map (fun ((loc, id), t) -> ((loc, Name id), Implicit, t)) fv_ctx in
+    ids', ctx', cstr
 
 let generalize_class_binders_raw env l = 
   let env = Idset.union env (Termops.vars_of_env (Global.env())) in
   let fv_ctx, cstrs = resolve_class_binders env l in
     List.map (fun ((loc, id), t) -> ((loc, Name id), Implicit, t)) fv_ctx,
   List.map (fun (iid, bk, c) -> (iid, Implicit, c)) cstrs
-
-let ctx_of_class_binders env l = 
-  let (x, y) = generalize_class_binders env l in x @ y
 	
-let implicits_of_binders l = 
-  let rec aux i l = 
-    match l with 
-	[] -> []
-      | hd :: tl -> 
-	  let res, reslen = 
-	    match hd with
-		LocalRawAssum (nal, Default Implicit, t) -> 
-		  list_map_i (fun i (_,id) ->
-		    let name =
-		      match id with
-			  Name id -> Some id
-			| Anonymous -> None
-		    in ExplByPos (i, name), (true, true))
-		    i nal, List.length nal
-	      | LocalRawAssum (nal, _, _) -> [], List.length nal
-	      | LocalRawDef _ -> [], 1
-	  in res @ (aux (i + reslen) tl)
-  in aux 1 l
-  
 let implicits_of_rawterm l = 
   let rec aux i c = 
     match c with
diff --git a/interp/implicit_quantifiers.mli b/interp/implicit_quantifiers.mli
index ff81dc10..1ee81ce9 100644
--- a/interp/implicit_quantifiers.mli
+++ b/interp/implicit_quantifiers.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: implicit_quantifiers.mli 10739 2008-04-01 14:45:20Z herbelin $ i*)
+(*i $Id: implicit_quantifiers.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -39,30 +39,23 @@ val make_fresh : Names.Idset.t -> Environ.env -> identifier -> identifier
 val free_vars_of_binders :
   ?bound:Idset.t -> Names.identifier list -> local_binder list -> Idset.t * Names.identifier list
 
-val compute_constrs_freevars : Idset.t -> constr_expr list -> identifier list
-val compute_constrs_freevars_binders : Idset.t -> constr_expr list -> (identifier located * constr_expr) list
 val resolve_class_binders : Idset.t -> typeclass_context -> 
   (identifier located * constr_expr) list * typeclass_context
 
 val full_class_binders : Idset.t -> typeclass_context -> typeclass_context
+
+val generalize_class_binder_raw : Idset.t -> name located * (binding_kind * binding_kind) * constr_expr -> 
+  Idset.t * typeclass_context * typeclass_constraint
   
 val generalize_class_binders_raw : Idset.t -> typeclass_context -> 
   (name located * binding_kind * constr_expr) list * (name located * binding_kind * constr_expr) list
 
-val ctx_of_class_binders : Idset.t -> typeclass_context -> local_binder list
-
-val implicits_of_binders : local_binder list -> (Topconstr.explicitation * (bool * bool)) list
-
 val implicits_of_rawterm : Rawterm.rawconstr -> (Topconstr.explicitation * (bool * bool)) list
 
 val combine_params : Names.Idset.t ->
-  (Names.Idset.t -> (global_reference * bool) option * (Names.identifier * Term.constr option * Term.types) ->
+  (Names.Idset.t -> (global_reference * bool) option * (Names.name * Term.constr option * Term.types) ->
     Topconstr.constr_expr * Names.Idset.t) ->
   (Topconstr.constr_expr * Topconstr.explicitation located option) list ->
-  ((global_reference * bool) option * Term.named_declaration) list ->
+  ((global_reference * bool) option * Term.rel_declaration) list ->
   Topconstr.constr_expr list * Names.Idset.t
 
-
-val ids_of_named_context_avoiding :     Names.Idset.t ->
-    Sign.named_context -> Names.Idset.elt list * Names.Idset.t
-
diff --git a/interp/notation.ml b/interp/notation.ml
index 98a199ad..9e83b860 100644
--- a/interp/notation.ml
+++ b/interp/notation.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: notation.ml 10893 2008-05-07 09:20:43Z herbelin $ *)
+(* $Id: notation.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (*i*)
 open Util
@@ -78,7 +78,7 @@ let declare_scope scope =
 
 let find_scope scope =
   try Gmap.find scope !scope_map
-  with Not_found -> error ("Scope "^scope^" is not declared")
+  with Not_found -> error ("Scope "^scope^" is not declared.")
 
 let check_scope sc = let _ = find_scope sc in ()
 
@@ -159,7 +159,7 @@ let find_delimiters_scope loc key =
   try Gmap.find key !delimiters_map
   with Not_found -> 
     user_err_loc 
-    (loc, "find_delimiters", str ("Unknown scope delimiting key "^key))
+    (loc, "find_delimiters", str ("Unknown scope delimiting key "^key^"."))
 
 (* Uninterpretation tables *)
 
@@ -251,7 +251,7 @@ let check_required_module loc sc (sp,d) =
   with Not_found ->
     user_err_loc (loc,"prim_token_interpreter",
     str ("Cannot interpret in "^sc^" without requiring first module "
-    ^(list_last d)))
+    ^(list_last d)^"."))
 
 (* Look if some notation or numeral printer in [scope] can be used in
    the scope stack [scopes], and if yes, using delimiters or not *)
@@ -348,7 +348,7 @@ let interp_prim_token_gen g loc p local_scopes =
     user_err_loc (loc,"interp_prim_token",
     (match p with
       | Numeral n -> str "No interpretation for numeral " ++ pr_bigint n
-      | String s -> str "No interpretation for string " ++ qs s))
+      | String s -> str "No interpretation for string " ++ qs s) ++ str ".")
 
 let interp_prim_token =
   interp_prim_token_gen (fun x -> x)
@@ -361,7 +361,7 @@ let rec interp_notation loc ntn local_scopes =
   try find_interpretation (find_notation ntn) scopes
   with Not_found ->
     user_err_loc
-    (loc,"",str ("Unknown interpretation for notation \""^ntn^"\""))
+    (loc,"",str ("Unknown interpretation for notation \""^ntn^"\"."))
 
 let uninterp_notations c =
   Gmapl.find (rawconstr_key c) !notations_key_table
@@ -464,10 +464,10 @@ let subst_arguments_scope (_,subst,(req,r,scl)) =
   (ArgsScopeNoDischarge,fst (subst_global subst r),scl)
 
 let discharge_arguments_scope (_,(req,r,l)) =
-  if req = ArgsScopeNoDischarge then None
-  else Some (req,pop_global_reference r,l)
+  if req = ArgsScopeNoDischarge or (isVarRef r & Lib.is_in_section r) then None
+  else Some (req,Lib.discharge_global r,l)
 
-let rebuild_arguments_scope (_,(req,r,l)) =
+let rebuild_arguments_scope (req,r,l) =
   match req with
     | ArgsScopeNoDischarge -> assert false
     | ArgsScopeAuto ->
@@ -493,8 +493,7 @@ let declare_arguments_scope_gen req r scl =
   Lib.add_anonymous_leaf (inArgumentsScope (req,r,scl))
 
 let declare_arguments_scope local ref scl =
-  let req =
-    if local or isVarRef ref then ArgsScopeNoDischarge else ArgsScopeManual in
+  let req = if local then ArgsScopeNoDischarge else ArgsScopeManual in
   declare_arguments_scope_gen req ref scl
 
 let find_arguments_scope r =
@@ -503,8 +502,7 @@ let find_arguments_scope r =
 
 let declare_ref_arguments_scope ref =
   let t = Global.type_of_global ref in
-  let req = if isVarRef ref then ArgsScopeNoDischarge else ArgsScopeAuto in
-  declare_arguments_scope_gen req ref (compute_arguments_scope t)
+  declare_arguments_scope_gen ArgsScopeAuto ref (compute_arguments_scope t)
 
 (********************************)
 (* Encoding notations as string *)
@@ -627,12 +625,12 @@ let global_reference_of_notation test (ntn,(sc,c,_)) =
   | _ -> None
 
 let error_ambiguous_notation loc _ntn =
-  user_err_loc (loc,"",str "Ambiguous notation")
+  user_err_loc (loc,"",str "Ambiguous notation.")
 
 let error_notation_not_reference loc ntn =
   user_err_loc (loc,"",
     str "Unable to interpret " ++ quote (str ntn) ++
-    str " as a reference")
+    str " as a reference.")
 
 let interp_notation_as_global_reference loc test ntn =
   let ntns = browse_notation true ntn !scope_map in
diff --git a/interp/topconstr.ml b/interp/topconstr.ml
index b858eecb..a51b6bb0 100644
--- a/interp/topconstr.ml
+++ b/interp/topconstr.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: topconstr.ml 11024 2008-05-30 12:41:39Z msozeau $ *)
+(* $Id: topconstr.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (*i*)
 open Pp
@@ -150,7 +150,7 @@ let compare_rawconstr f t1 t2 = match t1,t2 with
     | RPatVar _ | REvar _ | RLetTuple _ | RIf _ | RCast _),_
   | _,(RLetIn _ | RCases _ | RRec _ | RDynamic _
       | RPatVar _ | REvar _ | RLetTuple _ | RIf _ | RCast _)
-      -> error "Unsupported construction in recursive notations"
+      -> error "Unsupported construction in recursive notations."
   | (RRef _ | RVar _ | RApp _ | RLambda _ | RProd _ | RHole _ | RSort _), _
       -> false
 
@@ -168,13 +168,13 @@ let discriminate_patterns foundvars nl l1 l2 =
   | _ -> compare_rawconstr (aux (n+1)) c1 c2 in
   let l = list_map2_i aux 0 l1 l2 in
   if not (List.for_all ((=) true) l) then
-    error "Both ends of the recursive pattern differ";
+    error "Both ends of the recursive pattern differ.";
   match !diff with
-    | None ->  error "Both ends of the recursive pattern are the same"
+    | None ->  error "Both ends of the recursive pattern are the same."
     | Some (x,y,_ as discr) ->
 	List.iter (fun id ->
           if List.mem id !foundvars
-          then error "Variables used in the recursive part of a pattern are not allowed to occur outside of the recursive part";
+          then errorlabstrm "" (strbrk "Variables used in the recursive part of a pattern are not allowed to occur outside of the recursive part.");
           foundvars := id::!foundvars) [x;y];
 	discr
 
@@ -212,7 +212,7 @@ let aconstr_and_vars_of_rawconstr a =
       Array.iter (fun id -> found := id::!found) idl;
       let dll = Array.map (List.map (fun (na,bk,oc,b) -> 
 	 if bk <> Explicit then 
-	   error "Binders marked as implicit not allowed in notations";
+	   error "Binders marked as implicit not allowed in notations.";
 	 add_name found na; (na,Option.map aux oc,aux b))) dll in
       ARec (fk,idl,dll,Array.map aux tl,Array.map aux bl)
   | RCast (_,c,k) -> ACast (aux c, 
@@ -223,17 +223,17 @@ let aconstr_and_vars_of_rawconstr a =
   | RRef (_,r) -> ARef r
   | RPatVar (_,(_,n)) -> APatVar n
   | RDynamic _ | REvar _ ->
-      error "Existential variables not allowed in notations"
+      error "Existential variables not allowed in notations."
 
   (* Recognizing recursive notations *)
   and terminator_of_pat f1 ll1 lr1 = function
   | RApp (loc,f2,l2) ->
-      if not (eq_rawconstr f1 f2) then error
-	"Cannot recognize the same head to both ends of the recursive pattern";
+      if not (eq_rawconstr f1 f2) then errorlabstrm ""
+	(strbrk "Cannot recognize the same head to both ends of the recursive pattern.");
       let nl = List.length ll1 in
       let nr = List.length lr1 in
       if List.length l2 <> nl + nr + 1 then
-	error "Both ends of the recursive pattern have different lengths";
+	error "Both ends of the recursive pattern have different lengths.";
       let ll2,l2' = list_chop nl l2 in
       let t = List.hd l2' and lr2 = List.tl l2' in
       let x,y,order = discriminate_patterns found nl (ll1@lr1) (ll2@lr2) in
@@ -241,8 +241,8 @@ let aconstr_and_vars_of_rawconstr a =
         if order then RApp (loc,f2,ll2@RVar (loc,ldots_var)::lr2)
         else RApp (loc,f1,ll1@RVar (loc,ldots_var)::lr1) in
       (if order then y else x),(if order then x else y), aux iter, aux t, order
-  | _ -> error "One end of the recursive pattern is not an application"
-    
+  | _ -> error "One end of the recursive pattern is not an application."
+
   and make_aconstr_list f args =
     let rec find_patterns acc = function
       | RApp(_,RVar (_,a),[c]) :: l when a = ldots_var ->
@@ -250,7 +250,7 @@ let aconstr_and_vars_of_rawconstr a =
 	  let x,y,iter,term,lassoc = terminator_of_pat f (List.rev acc) l c in
 	  AList (x,y,iter,term,lassoc)
       | a::l -> find_patterns (a::acc) l
-      | [] -> error "Ill-formed recursive notation"
+      | [] -> error "Ill-formed recursive notation."
     in find_patterns [] args
 
   in
@@ -262,7 +262,7 @@ let aconstr_of_rawconstr vars a =
   let a,foundvars = aconstr_and_vars_of_rawconstr a in
   let check_type x =
     if not (List.mem x foundvars) then
-      error ((string_of_id x)^" is unbound in the right-hand-side") in
+      error ((string_of_id x)^" is unbound in the right-hand-side.") in
   List.iter check_type vars;
   a
 
@@ -590,7 +590,7 @@ type notation = string
 
 type explicitation = ExplByPos of int * identifier option | ExplByName of identifier
 
-type binder_kind = Default of binding_kind | TypeClass of binding_kind
+type binder_kind = Default of binding_kind | TypeClass of binding_kind * binding_kind
 
 type proj_flag = int option (* [Some n] = proj of the n-th visible argument *)
 
@@ -853,7 +853,7 @@ let coerce_to_id = function
   | CRef (Ident (loc,id)) -> (loc,id)
   | a -> user_err_loc
         (constr_loc a,"coerce_to_id",
-         str "This expression should be a simple identifier")
+         str "This expression should be a simple identifier.")
 
 (* Used in correctness and interface *)
 
diff --git a/interp/topconstr.mli b/interp/topconstr.mli
index d4fef0dc..2ac9da11 100644
--- a/interp/topconstr.mli
+++ b/interp/topconstr.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: topconstr.mli 11024 2008-05-30 12:41:39Z msozeau $ i*)
+(*i $Id: topconstr.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Pp
@@ -95,7 +95,7 @@ type notation = string
 
 type explicitation = ExplByPos of int * identifier option | ExplByName of identifier
   
-type binder_kind = Default of binding_kind | TypeClass of binding_kind
+type binder_kind = Default of binding_kind | TypeClass of binding_kind * binding_kind
 
 type proj_flag = int option (* [Some n] = proj of the n-th visible argument *)
 
diff --git a/kernel/environ.ml b/kernel/environ.ml
index ad435eb5..86e02623 100644
--- a/kernel/environ.ml
+++ b/kernel/environ.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: environ.ml 11001 2008-05-27 16:56:07Z aspiwack $ *)
+(* $Id: environ.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -379,17 +379,14 @@ let insert_after_hyp (ctxt,vals) id d check =
 
 (* To be used in Logic.clear_hyps *)
 let remove_hyps ids check_context check_value (ctxt, vals) =
-  let ctxt,vals,rmv = 
-    List.fold_right2 (fun (id,_,_ as d) (id',v) (ctxt,vals,rmv) ->
+  List.fold_right2 (fun (id,_,_ as d) (id',v) (ctxt,vals) ->
       if List.mem id ids then 
-	(ctxt,vals,id::rmv)
+	(ctxt,vals)
       else 	  
 	let nd = check_context d in
 	let nv = check_value v in
-	  (nd::ctxt,(id',nv)::vals,rmv))
-		     ctxt vals ([],[],[])
-  in ((ctxt,vals),rmv)
-
+	  (nd::ctxt,(id',nv)::vals))
+		     ctxt vals ([],[])
 
 
 
diff --git a/kernel/environ.mli b/kernel/environ.mli
index 30f555a4..97e19782 100644
--- a/kernel/environ.mli
+++ b/kernel/environ.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: environ.mli 11001 2008-05-27 16:56:07Z aspiwack $ i*)
+(*i $Id: environ.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -222,7 +222,7 @@ val insert_after_hyp : named_context_val -> variable ->
   named_declaration -> 
     (named_context -> unit) -> named_context_val
 
-val remove_hyps : identifier list -> (named_declaration -> named_declaration) -> (Pre_env.lazy_val -> Pre_env.lazy_val) -> named_context_val -> named_context_val * identifier list
+val remove_hyps : identifier list -> (named_declaration -> named_declaration) -> (Pre_env.lazy_val -> Pre_env.lazy_val) -> named_context_val -> named_context_val
 
 
 (* spiwack: functions manipulating the retroknowledge *)
diff --git a/kernel/indtypes.ml b/kernel/indtypes.ml
index 7cedebbd..01b8aca1 100644
--- a/kernel/indtypes.ml
+++ b/kernel/indtypes.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: indtypes.ml 10920 2008-05-12 10:19:32Z herbelin $ *)
+(* $Id: indtypes.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -254,16 +254,19 @@ let typecheck_inductive env mie =
     array_fold_map2' (fun ((id,full_arity,ar_level),cn,info,lc,_) lev cst ->
       let sign, s = dest_arity env full_arity in
       let status,cst = match s with
-      | Type _ when ar_level <> None (* Explicitly polymorphic *) ->
+      | Type u when ar_level <> None (* Explicitly polymorphic *) 
+            && no_upper_constraints u cst ->
 	  (* The polymorphic level is a function of the level of the *)
 	  (* conclusions of the parameters *)
-	  Inr (param_ccls, lev), cst
+          (* We enforce [u >= lev] in case [lev] has a strict upper *)
+          (* constraints over [u] *)
+	  Inr (param_ccls, lev), enforce_geq u lev cst
       | Type u (* Not an explicit occurrence of Type *) ->
 	  Inl (info,full_arity,s), enforce_geq u lev cst
       | Prop Pos when engagement env <> Some ImpredicativeSet ->
 	  (* Predicative set: check that the content is indeed predicative *)
 	  if not (is_type0m_univ lev) & not (is_type0_univ lev) then
-	    error "Large non-propositional inductive types must be in Type";
+	    error "Large non-propositional inductive types must be in Type.";
 	  Inl (info,full_arity,s), cst
       | Prop _ ->
 	  Inl (info,full_arity,s), cst in
@@ -598,7 +601,6 @@ let build_inductive env env_ar params isrecord isfinite inds nmr recargs cst =
 	      poly_level = lev; 
 	    }, all_sorts
       | Inl ((issmall,isunit),ar,s) ->
-	  let isunit = isunit && ntypes = 1 && not (is_recursive recargs.(0)) in
 	  let kelim = allowed_sorts issmall isunit s in
 	    Monomorphic {
 		mind_user_arity = ar;
diff --git a/kernel/inductive.ml b/kernel/inductive.ml
index 9415941d..4bb8e9d6 100644
--- a/kernel/inductive.ml
+++ b/kernel/inductive.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: inductive.ml 10920 2008-05-12 10:19:32Z herbelin $ *)
+(* $Id: inductive.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -218,7 +218,7 @@ let type_of_constructor cstr (mib,mip) =
   let specif = mip.mind_user_lc in
   let i = index_of_constructor cstr in
   let nconstr = Array.length mip.mind_consnames in
-  if i > nconstr then error "Not enough constructors in the type";
+  if i > nconstr then error "Not enough constructors in the type.";
   constructor_instantiate (fst ind) mib specif.(i-1)
 
 let arities_of_specif kn (mib,mip) = 
@@ -228,7 +228,9 @@ let arities_of_specif kn (mib,mip) =
 let arities_of_constructors ind specif = 
   arities_of_specif (fst ind) specif
 
-
+let type_of_constructors ind (mib,mip) =
+  let specif = mip.mind_user_lc in
+  Array.map (constructor_instantiate (fst ind) mib) specif
 
 (************************************************************************)
 
diff --git a/kernel/inductive.mli b/kernel/inductive.mli
index c2c38d8d..8059051b 100644
--- a/kernel/inductive.mli
+++ b/kernel/inductive.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: inductive.mli 9420 2006-12-08 15:34:09Z barras $ i*)
+(*i $Id: inductive.mli 11301 2008-08-04 19:41:18Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -47,6 +47,9 @@ val type_of_constructor : constructor -> mind_specif -> types
 (* Return constructor types in normal form *)
 val arities_of_constructors : inductive -> mind_specif -> types array
 
+(* Return constructor types in user form *)
+val type_of_constructors : inductive -> mind_specif -> types array
+
 (* Transforms inductive specification into types (in nf) *)
 val arities_of_specif : mutual_inductive -> mind_specif -> types array 
 
diff --git a/kernel/modops.ml b/kernel/modops.ml
index 9242a757..7bed3254 100644
--- a/kernel/modops.ml
+++ b/kernel/modops.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: modops.ml 11142 2008-06-18 15:37:31Z soubiran $ i*)
+(*i $Id: modops.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Util
@@ -22,51 +22,51 @@ open Mod_subst
 
 
 let error_existing_label l = 
-  error ("The label "^string_of_label l^" is already declared")
+  error ("The label "^string_of_label l^" is already declared.")
 
-let error_declaration_not_path _ = error "Declaration is not a path"
+let error_declaration_not_path _ = error "Declaration is not a path."
 
-let error_application_to_not_path _ = error "Application to not path"
+let error_application_to_not_path _ = error "Application to not path."
 
-let error_not_a_functor _ = error "Application of not a functor"
+let error_not_a_functor _ = error "Application of not a functor."
 
-let error_incompatible_modtypes _ _ = error "Incompatible module types"
+let error_incompatible_modtypes _ _ = error "Incompatible module types."
 
-let error_not_equal _ _ = error "Not equal modules"
+let error_not_equal _ _ = error "Non equal modules."
 
-let error_not_match l _ = error ("Signature components for label "^string_of_label l^" do not match")
+let error_not_match l _ = error ("Signature components for label "^string_of_label l^" do not match.")
 
-let error_no_such_label l = error ("No such label "^string_of_label l)
+let error_no_such_label l = error ("No such label "^string_of_label l^".")
 
 let error_incompatible_labels l l' = 
   error ("Opening and closing labels are not the same: "
 	 ^string_of_label l^" <> "^string_of_label l'^" !")
 
 let error_result_must_be_signature () = 
-  error "The result module type must be a signature"
+  error "The result module type must be a signature."
 
 let error_signature_expected mtb =
-  error "Signature expected"
+  error "Signature expected."
 
 let error_no_module_to_end _ = 
-  error "No open module to end"
+  error "No open module to end."
 
 let error_no_modtype_to_end _ =
-  error "No open module type to end"
+  error "No open module type to end."
 
 let error_not_a_modtype_loc loc s = 
-  user_err_loc (loc,"",str ("\""^s^"\" is not a module type"))
+  user_err_loc (loc,"",str ("\""^s^"\" is not a module type."))
 
 let error_not_a_module_loc loc s = 
-  user_err_loc (loc,"",str ("\""^s^"\" is not a module"))
+  user_err_loc (loc,"",str ("\""^s^"\" is not a module."))
 
 let error_not_a_module s = error_not_a_module_loc dummy_loc s
 
 let error_not_a_constant l = 
-  error ("\""^(string_of_label l)^"\" is not a constant")
+  error ("\""^(string_of_label l)^"\" is not a constant.")
 
 let error_with_incorrect l =
-  error ("Incorrect constraint for label \""^(string_of_label l)^"\"")
+  error ("Incorrect constraint for label \""^(string_of_label l)^"\".")
 
 let error_a_generative_module_expected l =
   error ("The module " ^ string_of_label l ^ " is not generative. Only " ^
@@ -79,7 +79,7 @@ let error_local_context lo =
 	error ("The local context is not empty.")
     | (Some l) ->
 	error ("The local context of the component "^
-	       (string_of_label l)^" is not empty")
+	       (string_of_label l)^" is not empty.")
 
 
 let error_no_such_label_sub l l1 l2 =
diff --git a/kernel/names.ml b/kernel/names.ml
index 26bcc2eb..25f03495 100644
--- a/kernel/names.ml
+++ b/kernel/names.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: names.ml 10919 2008-05-11 22:04:26Z msozeau $ *)
+(* $Id: names.ml 11238 2008-07-19 09:34:03Z herbelin $ *)
 
 open Pp
 open Util
@@ -101,7 +101,7 @@ let label_of_mbid (_,s,_) = s
 
 
 let mk_label l = l
-let string_of_label l = l
+let string_of_label = string_of_id
 
 let id_of_label l = l
 let label_of_id id = id
diff --git a/kernel/safe_typing.ml b/kernel/safe_typing.ml
index 6906fb29..3c7461b2 100644
--- a/kernel/safe_typing.ml
+++ b/kernel/safe_typing.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: safe_typing.ml 11170 2008-06-25 08:31:04Z soubiran $ *)
+(* $Id: safe_typing.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -163,7 +163,7 @@ let safe_push_named (id,_,_ as d) env =
   let _ =
     try
       let _ = lookup_named id env in 
-      error ("identifier "^string_of_id id^" already defined")
+      error ("Identifier "^string_of_id id^" already defined.")
     with Not_found -> () in
   Environ.push_named d env
 
@@ -446,7 +446,7 @@ let end_module l restype senv =
    let senv = add_constraints (struct_expr_constraints struct_expr) senv in
    let msid,str = match (eval_struct senv.env struct_expr) with
      | SEBstruct(msid,str_l) -> msid,str_l
-     | _ -> error ("You cannot Include a higher-order Module or Module Type" )
+     | _ -> error ("You cannot Include a higher-order Module or Module Type.")
    in
    let mp_sup = senv.modinfo.modpath in
    let str1 = subst_signature_msid msid mp_sup str in
@@ -660,7 +660,7 @@ let check_engagement env c =
     | Some ImpredicativeSet, Some ImpredicativeSet -> ()
     | _, None -> ()
     | _, Some ImpredicativeSet ->
-        error "Needs option -impredicative-set"
+        error "Needs option -impredicative-set."
 
 let set_engagement c senv =
   {senv with
@@ -739,9 +739,10 @@ let check_imports senv needed =
     try
       let actual_stamp = List.assoc id imports in
       if stamp <> actual_stamp then
-	error ("Inconsistent assumptions over module " ^(string_of_dirpath id))
+	error
+	  ("Inconsistent assumptions over module "^(string_of_dirpath id)^".")
     with Not_found -> 
-      error ("Reference to unknown module " ^ (string_of_dirpath id))
+      error ("Reference to unknown module "^(string_of_dirpath id)^".")
   in
   List.iter check needed
 
diff --git a/kernel/term.ml b/kernel/term.ml
index c920c80b..1f3d2635 100644
--- a/kernel/term.ml
+++ b/kernel/term.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: term.ml 10859 2008-04-27 16:46:15Z herbelin $ *)
+(* $Id: term.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (* This module instantiates the structure of generic deBruijn terms to Coq *)
 
@@ -370,16 +370,22 @@ let destProd c = match kind_of_term c with
   | Prod (x,t1,t2) -> (x,t1,t2) 
   | _ -> invalid_arg "destProd"
 
+let isProd c = match kind_of_term c with | Prod _ -> true | _ -> false
+
 (* Destructs the abstraction [x:t1]t2 *)
 let destLambda c = match kind_of_term c with 
   | Lambda (x,t1,t2) -> (x,t1,t2) 
   | _ -> invalid_arg "destLambda"
 
+let isLambda c = match kind_of_term c with | Lambda _ -> true | _ -> false
+
 (* Destructs the let [x:=b:t1]t2 *)
 let destLetIn c = match kind_of_term c with 
   | LetIn (x,b,t1,t2) -> (x,b,t1,t2) 
   | _ -> invalid_arg "destProd"
 
+let isLetIn c =  match kind_of_term c with LetIn _ -> true | _ -> false
+
 (* Destructs an application *)
 let destApp c = match kind_of_term c with
   | App (f,a) -> (f, a)
@@ -389,10 +395,6 @@ let destApplication = destApp
 
 let isApp c = match kind_of_term c with App _ -> true | _ -> false
 
-let isProd c = match kind_of_term c with | Prod _ -> true | _ -> false
-
-let isLambda c = match kind_of_term c with | Lambda _ -> true | _ -> false
-
 (* Destructs a constant *)
 let destConst c = match kind_of_term c with
   | Const kn -> kn
@@ -419,22 +421,27 @@ let destConstruct c = match kind_of_term c with
   | Construct (kn, a as r) -> r
   | _ -> invalid_arg "dest"
 
-let isConstruct c = match kind_of_term c with
-    Construct _ -> true | _ -> false
+let isConstruct c = match kind_of_term c with Construct _ -> true | _ -> false
 
 (* Destructs a term <p>Case c of lc1 | lc2 .. | lcn end *)
 let destCase c = match kind_of_term c with
   | Case (ci,p,c,v) -> (ci,p,c,v)
   | _ -> anomaly "destCase"
 
+let isCase c =  match kind_of_term c with Case _ -> true | _ -> false
+
 let destFix c = match kind_of_term c with 
   | Fix fix -> fix
   | _ -> invalid_arg "destFix"
-	
+
+let isFix c =  match kind_of_term c with Fix _ -> true | _ -> false
+
 let destCoFix c = match kind_of_term c with 
   | CoFix cofix -> cofix
   | _ -> invalid_arg "destCoFix"
 
+let isCoFix c =  match kind_of_term c with CoFix _ -> true | _ -> false
+
 (******************************************************************)
 (* Cast management                                                *)
 (******************************************************************)
diff --git a/kernel/term.mli b/kernel/term.mli
index 6236dc39..3b5a2bc1 100644
--- a/kernel/term.mli
+++ b/kernel/term.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: term.mli 10859 2008-04-27 16:46:15Z herbelin $ i*)
+(*i $Id: term.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -230,9 +230,13 @@ val isSort : constr -> bool
 val isCast : constr -> bool
 val isApp : constr -> bool
 val isLambda : constr -> bool
+val isLetIn : constr -> bool
 val isProd : constr -> bool
 val isConst : constr -> bool
 val isConstruct : constr -> bool
+val isFix : constr -> bool
+val isCoFix : constr -> bool
+val isCase : constr -> bool
 
 val is_Prop : constr -> bool
 val is_Set  : constr -> bool
diff --git a/kernel/term_typing.ml b/kernel/term_typing.ml
index 0f649057..f50a0b83 100644
--- a/kernel/term_typing.ml
+++ b/kernel/term_typing.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: term_typing.ml 10877 2008-04-30 21:58:41Z herbelin $ *)
+(* $Id: term_typing.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -60,7 +60,7 @@ let safe_push_named (id,_,_ as d) env =
   let _ =
     try
       let _ = lookup_named id env in 
-      error ("identifier "^string_of_id id^" already defined")
+      error ("Identifier "^string_of_id id^" already defined.")
     with Not_found -> () in
   push_named d env
 
diff --git a/kernel/univ.ml b/kernel/univ.ml
index 3791c3e1..11a5452c 100644
--- a/kernel/univ.ml
+++ b/kernel/univ.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: univ.ml 11063 2008-06-06 16:03:45Z soubiran $ *)
+(* $Id: univ.ml 11301 2008-08-04 19:41:18Z herbelin $ *)
 
 (* Initial Caml version originates from CoC 4.8 [Dec 1988] *)
 (* Extension with algebraic universes by HH [Sep 2001] *)
@@ -550,6 +550,11 @@ let subst_large_constraint u u' v =
 let subst_large_constraints =
   List.fold_right (fun (u,u') -> subst_large_constraint u u')
 
+let no_upper_constraints u cst =
+  match u with
+  | Atom u -> Constraint.for_all (fun (u1,_,_) -> u1 <> u) cst
+  | Max _ -> anomaly "no_upper_constraints"
+
 (* Pretty-printing *)
 
 let num_universes g =
diff --git a/kernel/univ.mli b/kernel/univ.mli
index 0a1a8328..668e99a0 100644
--- a/kernel/univ.mli
+++ b/kernel/univ.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: univ.mli 11063 2008-06-06 16:03:45Z soubiran $ i*)
+(*i $Id: univ.mli 11301 2008-08-04 19:41:18Z herbelin $ i*)
 
 (* Universes. *)
 
@@ -76,6 +76,8 @@ val subst_large_constraint : universe -> universe -> universe -> universe
 val subst_large_constraints : 
   (universe * universe) list -> universe -> universe
 
+val no_upper_constraints : universe -> constraints -> bool
+
 (*s Pretty-printing of universes. *)
 
 val pr_uni : universe -> Pp.std_ppcmds
diff --git a/lib/flags.ml b/lib/flags.ml
index de971c7c..16ae0c64 100644
--- a/lib/flags.ml
+++ b/lib/flags.ml
@@ -6,9 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: flags.ml 11077 2008-06-09 11:26:32Z herbelin $ i*)
-
-open Util
+(*i $Id: flags.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 let with_option o f x =
   let old = !o in o:=true;
@@ -78,6 +76,8 @@ let print_hyps_limit () = !print_hyps_limit
 (* A list of the areas of the system where "unsafe" operation
  * has been requested *)
 
+module Stringset = Set.Make(struct type t = string let compare = compare end)
+
 let unsafe_set = ref Stringset.empty
 let add_unsafe s = unsafe_set := Stringset.add s !unsafe_set
 let is_unsafe s = Stringset.mem s !unsafe_set
@@ -126,7 +126,4 @@ let browser_cmd_fmt =
   let coq_netscape_remote_var = "COQREMOTEBROWSER" in
   Sys.getenv coq_netscape_remote_var
  with
-  Not_found ->
-   if Sys.os_type = "Win32"
-   then "C:\\PROGRA~1\\INTERN~1\\IEXPLORE %s"
-   else "firefox -remote \"OpenURL(%s,new-tab)\" || firefox %s &"
+  Not_found -> Coq_config.browser
diff --git a/lib/system.ml b/lib/system.ml
index aa71ddfa..22eb52ee 100644
--- a/lib/system.ml
+++ b/lib/system.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: system.ml 10437 2008-01-11 14:50:44Z bertot $ *)
+(* $Id: system.ml 11209 2008-07-05 10:17:49Z herbelin $ *)
 
 open Pp
 open Util
@@ -68,6 +68,14 @@ let string_of_physical_path p = p
 let exists_dir dir =
   try let _ = opendir dir in true with Unix_error _ -> false
 
+let skipped_dirnames = ref ["CVS"; "_darcs"]
+
+let exclude_search_in_dirname f = skipped_dirnames := f :: !skipped_dirnames
+
+let ok_dirname f = 
+  f <> "" && f.[0] <> '.' && not (List.mem f !skipped_dirnames) &&
+  try ignore (check_ident f); true with _ -> false
+
 let all_subdirs ~unix_path:root =
   let l = ref [] in
   let add f rel = l := (f, rel) :: !l in
@@ -76,8 +84,7 @@ let all_subdirs ~unix_path:root =
     try
       while true do
 	let f = readdir dirh in
-	if f <> "" && f.[0] <> '.' && (not Coq_config.local or (f <> "CVS"))
-        then
+	if ok_dirname f then
 	  let file = Filename.concat dir f in
 	  try 
 	    if (stat file).st_kind = S_DIR then begin
@@ -90,52 +97,44 @@ let all_subdirs ~unix_path:root =
     with End_of_file ->
       closedir dirh
   in
-  if exists_dir root then
-   begin
-     add root [];
-     traverse root []
-   end ;
+  if exists_dir root then traverse root [];
   List.rev !l
 
-let where_in_path path filename =
-  let rec search acc = function
+let where_in_path warn path filename =
+  let rec search = function
     | lpe :: rem ->
 	let f = Filename.concat lpe filename in
 	  if Sys.file_exists f 
-	  then (search ((lpe,f)::acc) rem) 
-	  else search acc rem
-    | [] -> acc in
-  let rec check_and_warn cont acc l = 
+	  then (lpe,f) :: search rem
+	  else search rem
+    | [] -> [] in
+  let rec check_and_warn l =
     match l with
-      | [] -> if cont then assert false else raise Not_found
-      | [ (lpe, f) ] -> 
-	  if cont then begin
-	      warning (acc ^ (string_of_physical_path lpe) ^ " ]");
-	      warning ("Loading " ^ f)
-	    end;
-	  (lpe, f)
+      | [] -> raise Not_found
       | (lpe, f) :: l' -> 
-	  if cont then
-	    check_and_warn true (acc ^ (string_of_physical_path lpe) ^ "; ") l'
-	  else
-	    check_and_warn true 
-	      (filename ^ " has been found in [ " ^ (string_of_physical_path lpe) ^ "; ") l' 
-  in
-    check_and_warn false "" (search [] path)
-  
+	  if warn & l' <> [] then
+	    msg_warning
+	      (str filename ++ str " has been found in" ++ spc () ++
+	       hov 0 (str "[ " ++
+	         hv 0 (prlist_with_sep pr_semicolon (fun (lpe,_) -> str lpe) l)
+	         ++ str " ];") ++ fnl () ++
+	       str "loading " ++ str f);
+	  (lpe, f) in
+  check_and_warn (search path)
+
 let find_file_in_path paths filename =
   if not (Filename.is_implicit filename) then
     let root = Filename.dirname filename in
     root, filename
   else 
-    try where_in_path paths filename
+    try where_in_path true paths filename
     with Not_found ->
       errorlabstrm "System.find_file_in_path"
 	(hov 0 (str "Can't find file" ++ spc () ++ str filename ++ spc () ++ 
 		str "on loadpath"))
 
 let is_in_path lpath filename =
-  try ignore (where_in_path lpath filename); true
+  try ignore (where_in_path false lpath filename); true
   with Not_found -> false
 
 let make_suffix name suffix =
diff --git a/lib/system.mli b/lib/system.mli
index 6d535464..eb83cbf8 100644
--- a/lib/system.mli
+++ b/lib/system.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: system.mli 9398 2006-11-21 21:51:18Z herbelin $ i*)
+(*i $Id: system.mli 11209 2008-07-05 10:17:49Z herbelin $ i*)
 
 (*s Files and load paths. Load path entries remember the original root
     given by the user. For efficiency, we keep the full path (field
@@ -16,9 +16,11 @@
 type physical_path = string
 type load_path = physical_path list
 
+val exclude_search_in_dirname : string -> unit
+
 val all_subdirs : unix_path:string -> (physical_path * string list) list
 val is_in_path : load_path -> string -> bool
-val where_in_path : load_path -> string -> physical_path * string
+val where_in_path : bool -> load_path -> string -> physical_path * string
 
 val physical_path_of_string : string -> physical_path
 val string_of_physical_path : physical_path -> string
diff --git a/lib/util.ml b/lib/util.ml
index 9fa92f94..75ee4246 100644
--- a/lib/util.ml
+++ b/lib/util.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1       *)
 (***********************************************************************)
 
-(* $Id: util.ml 11083 2008-06-09 22:08:14Z herbelin $ *)
+(* $Id: util.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 
@@ -576,6 +576,12 @@ let list_fold_left_i f =
   in 
   it_list_f 
 
+let rec list_fold_left3 f accu l1 l2 l3 =
+  match (l1, l2, l3) with
+    ([], [], []) -> accu
+  | (a1::l1, a2::l2, a3::l3) -> list_fold_left3 f (f accu a1 a2 a3) l1 l2 l3
+  | (_, _, _) -> invalid_arg "list_fold_left3"
+
 (* [list_fold_right_and_left f [a1;...;an] hd =
    f (f (... (f (f hd
                    an
@@ -1196,6 +1202,8 @@ let pr_opt_no_spc pr = function None -> mt () | Some x -> pr x
 
 let nth n = str (ordinal n)
 
+(* [prlist pr [a ; ... ; c]] outputs [pr a ++ ... ++ pr c] *)
+
 let rec prlist elem l = match l with 
   | []   -> mt ()
   | h::t -> Stream.lapp (fun () -> elem h) (prlist elem t)
@@ -1207,6 +1215,9 @@ let rec prlist_strict elem l = match l with
   | []   -> mt ()
   | h::t -> (elem h)++(prlist_strict elem t)
 
+(* [prlist_with_sep sep pr [a ; ... ; c]] outputs
+   [pr a ++ sep() ++ ... ++ sep() ++ pr c] *)
+
 let rec prlist_with_sep sep elem l = match l with
   | []   -> mt ()
   | [h]  -> elem h
@@ -1214,6 +1225,23 @@ let rec prlist_with_sep sep elem l = match l with
       let e = elem h and s = sep() and r = prlist_with_sep sep elem t in
       e ++ s ++ r
 
+(* Print sequence of objects separated by space (unless an element is empty) *)
+
+let rec pr_sequence elem = function
+  | []   -> mt ()
+  | [h]  -> elem h
+  | h::t ->
+      let e = elem h and r = pr_sequence elem t in
+      if e = mt () then r else e ++ spc () ++ r
+
+(* [pr_enum pr [a ; b ; ... ; c]] outputs 
+   [pr a ++ str "," ++ pr b ++ str "," ++ ... ++ str "and" ++ pr c] *)
+
+let pr_enum pr l =
+  let c,l' = list_sep_last l in
+  prlist_with_sep pr_coma pr l' ++
+  (if l'<>[] then str " and" ++ spc () else mt()) ++ pr c
+
 let pr_vertical_list pr = function
   | [] -> str "none" ++ fnl ()
   | l -> fnl () ++ str "  " ++ hov 0 (prlist_with_sep pr_fnl pr l) ++ fnl ()
@@ -1228,6 +1256,9 @@ let prvecti elem v =
   in
   if n = 0 then mt () else pr (n - 1)
 
+(* [prvect_with_sep sep pr [|a ; ... ; c|]] outputs
+   [pr a ++ sep() ++ ... ++ sep() ++ pr c] *)
+
 let prvect_with_sep sep elem v =
   let rec pr n =
     if n = 0 then 
@@ -1239,8 +1270,16 @@ let prvect_with_sep sep elem v =
   let n = Array.length v in
   if n = 0 then mt () else pr (n - 1)
 
+(* [prvect pr [|a ; ... ; c|]] outputs [pr a ++ ... ++ pr c] *)
+
 let prvect elem v = prvect_with_sep mt elem v
 
+let pr_located pr (loc,x) =
+  if Flags.do_translate() && loc<>dummy_loc then
+    let (b,e) = unloc loc in
+    comment b ++ pr x ++ comment e
+  else pr x
+
 let surround p = hov 1 (str"(" ++ p ++ str")")
 
 (*s Size of ocaml values. *)
diff --git a/lib/util.mli b/lib/util.mli
index 7807bbbd..99ad3c03 100644
--- a/lib/util.mli
+++ b/lib/util.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1       *)
 (***********************************************************************)
 
-(*i $Id: util.mli 11083 2008-06-09 22:08:14Z herbelin $ i*)
+(*i $Id: util.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Pp
@@ -132,6 +132,7 @@ val list_fold_right_i :  (int -> 'a -> 'b -> 'b) -> int -> 'a list -> 'b -> 'b
 val list_fold_left_i :  (int -> 'a -> 'b -> 'a) -> int -> 'a -> 'b list -> 'a
 val list_fold_right_and_left :
     ('a -> 'b -> 'b list -> 'a) -> 'b list -> 'a -> 'a
+val list_fold_left3 : ('a -> 'b -> 'c -> 'd -> 'a) -> 'a -> 'b list -> 'c list -> 'd list -> 'a
 val list_for_all_i : (int -> 'a -> bool) -> int -> 'a list -> bool
 val list_except : 'a -> 'a list -> 'a list
 val list_remove : 'a -> 'a list -> 'a list
@@ -279,6 +280,9 @@ val prvecti : (int -> 'a -> std_ppcmds) -> 'a array -> std_ppcmds
 val prvect_with_sep :
    (unit -> std_ppcmds) -> ('b -> std_ppcmds) -> 'b array -> std_ppcmds
 val pr_vertical_list : ('b -> std_ppcmds) -> 'b list -> std_ppcmds
+val pr_enum : ('a -> std_ppcmds) -> 'a list -> std_ppcmds
+val pr_located : ('a -> std_ppcmds) -> 'a located -> std_ppcmds
+val pr_sequence : ('a -> std_ppcmds) -> 'a list -> std_ppcmds
 val surround : std_ppcmds -> std_ppcmds
 
 
diff --git a/library/declare.ml b/library/declare.ml
index 07810e3c..4bdc11c3 100644
--- a/library/declare.ml
+++ b/library/declare.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: declare.ml 10840 2008-04-23 21:29:34Z herbelin $ *)
+(* $Id: declare.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 (** This module is about the low-level declaration of logical objects *)
 
@@ -57,10 +57,12 @@ let cache_variable ((sp,_),o) =
   let impl,opaq,cst,keep = match d with (* Fails if not well-typed *)
     | SectionLocalAssum (ty, impl, keep) ->
         let cst = Global.push_named_assum (id,ty) in
-        impl, true, cst, (if keep then Some ty else None)
+	let impl = if impl then Lib.Implicit else Lib.Explicit in
+	let keep = if keep then Some ty else None in
+	impl, true, cst, keep
     | SectionLocalDef (c,t,opaq) -> 
         let cst = Global.push_named_def (id,c,t) in
-        false, opaq, cst, None in
+        Lib.Explicit, opaq, cst, None in
   Nametab.push (Nametab.Until 1) (restrict_path 0 sp) (VarRef id);
   add_section_variable id impl keep;
   Dischargedhypsmap.set_discharged_hyps sp [];
@@ -116,7 +118,7 @@ let cache_constant ((sp,kn),(cdt,dhyps,kind)) =
 
 let discharged_hyps kn sechyps =
   let (_,dir,_) = repr_kn kn in
-  let args = array_map_to_list destVar (instance_from_named_context sechyps) in
+  let args = Array.to_list (instance_from_variable_context sechyps) in
   List.rev (List.map (Libnames.make_path dir) args)
 
 let discharge_constant ((sp,kn),(cdt,dhyps,kind)) =
@@ -124,7 +126,7 @@ let discharge_constant ((sp,kn),(cdt,dhyps,kind)) =
   let cb = Global.lookup_constant con in
   let repl = replacement_context () in
   let sechyps = section_segment_of_constant con in
-  let recipe = { d_from=cb; d_modlist=repl; d_abstract=sechyps } in
+  let recipe = { d_from=cb; d_modlist=repl; d_abstract=named_of_variable_context sechyps } in
   Some (GlobalRecipe recipe,(discharged_hyps kn sechyps)@dhyps,kind)
 
 (* Hack to reduce the size of .vo: we keep only what load/open needs *)
@@ -235,7 +237,7 @@ let discharge_inductive ((sp,kn),(dhyps,mie)) =
   let repl = replacement_context () in
   let sechyps = section_segment_of_mutual_inductive kn in
   Some (discharged_hyps kn sechyps,
-        Discharge.process_inductive sechyps repl mie)
+        Discharge.process_inductive (named_of_variable_context sechyps) repl mie)
 
 let dummy_one_inductive_entry mie = {
   mind_entry_typename = mie.mind_entry_typename;
diff --git a/library/declaremods.ml b/library/declaremods.ml
index 123417a6..b630b5dc 100644
--- a/library/declaremods.ml
+++ b/library/declaremods.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: declaremods.ml 11142 2008-06-18 15:37:31Z soubiran $ i*)
+(*i $Id: declaremods.ml 11246 2008-07-22 15:10:05Z soubiran $ i*)
 open Pp
 open Util
 open Names
@@ -433,10 +433,12 @@ and subst_module_alias ((sp,kn),subst,(entry,substobjs,_)) =
 			 mod_entry_expr = 
 			      Some (MSEident mp')},sub),
 		    substobjs, match mbids with
-		      | [] -> 
+		      | [] -> let subst = update_subst subst' (map_mp mp' mp) in
 			  Some (subst_objects (dir,(mp',empty_dirpath)) 
-				  (join subst' (join (map_msid msid mp')
-						  (map_mp mp mp'))) objs)
+				  (join (join subst' subst) (join (map_msid msid mp')
+						  (map_mp mp mp')))
+				   objs)
+			    
 		      | _ -> None)
 		     
 	      | _ -> anomaly "Modops: Not an alias"
diff --git a/library/heads.ml b/library/heads.ml
index 626f1795..970ae87b 100644
--- a/library/heads.ml
+++ b/library/heads.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: heads.ml 10841 2008-04-24 07:19:57Z herbelin $ *)
+(* $Id: heads.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Pp
 open Util
@@ -158,7 +158,7 @@ let discharge_head (_,(ref,k)) =
   | EvalConstRef cst -> Some (EvalConstRef (pop_con cst), k)
   | EvalVarRef id -> None
 
-let rebuild_head (info,(ref,k)) =
+let rebuild_head (ref,k) =
   (ref, compute_head ref)
 
 let export_head o = Some o
diff --git a/library/impargs.ml b/library/impargs.ml
index cae1986e..3a505ddb 100644
--- a/library/impargs.ml
+++ b/library/impargs.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: impargs.ml 10796 2008-04-15 12:00:50Z herbelin $ *)
+(* $Id: impargs.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Util
 open Names
@@ -20,13 +20,14 @@ open Libobject
 open Lib
 open Nametab
 open Pp
-open Termops
 open Topconstr
+open Termops
 
 (*s Flags governing the computation of implicit arguments *)
 
 type implicits_flags = {
   main : bool;
+  manual : bool;                     (* automatic or manual only *)
   strict : bool;                   (* true = strict *)
   strongly_strict : bool;            (* true = strongly strict *)
   reversible_pattern : bool;
@@ -38,6 +39,7 @@ type implicits_flags = {
 
 let implicit_args = ref { 
   main = false;
+  manual = false;
   strict = true;
   strongly_strict = false;
   reversible_pattern = false;
@@ -48,6 +50,10 @@ let implicit_args = ref {
 let make_implicit_args flag =
   implicit_args := { !implicit_args with main = flag }
 
+let make_manual_implicit_args flag =
+  implicit_args := { !implicit_args with main = if flag then true else !implicit_args.main;
+    manual = flag }
+
 let make_strict_implicit_args flag =
   implicit_args := { !implicit_args with strict = flag }
 
@@ -64,6 +70,7 @@ let make_maximal_implicit_args flag =
   implicit_args := { !implicit_args with maximal = flag }
 
 let is_implicit_args () = !implicit_args.main
+let is_manual_implicit_args () = !implicit_args.manual
 let is_strict_implicit_args () = !implicit_args.strict
 let is_strongly_strict_implicit_args () = !implicit_args.strongly_strict
 let is_reversible_pattern_implicit_args () = !implicit_args.reversible_pattern
@@ -88,7 +95,7 @@ let set_maximality imps b =
 
 (*s Computation of implicit arguments *)
 
-(* We remember various information about why an argument is (automatically)
+(* We remember various information about why an argument is
    inferable as implicit
 
 - [DepRigid] means that the implicit argument can be found by
@@ -105,6 +112,8 @@ let set_maximality imps b =
   inferable following a rigid path (useful to know how to print a
   partial application)
 
+- [Manual] means the argument has been explicitely set as implicit.
+
   We also consider arguments inferable from the conclusion but it is
   operational only if [conclusion_matters] is true.
 *)
@@ -117,7 +126,7 @@ type implicit_explanation =
   | DepRigid of argument_position
   | DepFlex of argument_position
   | DepFlexAndRigid of (*flex*) argument_position * (*rig*) argument_position
-  | Manual of bool
+  | Manual
 
 let argument_less = function
   | Hyp n, Hyp n' -> n<n'
@@ -137,7 +146,7 @@ let update pos rig (na,st) =
       | Some (DepFlex fpos) ->
           if argument_less (pos,fpos) or pos=fpos then DepRigid pos
           else DepFlexAndRigid (fpos,pos)
-      | Some (Manual _) -> assert false
+      | Some Manual -> assert false
   else
     match st with
       | None -> DepFlex pos
@@ -147,7 +156,7 @@ let update pos rig (na,st) =
           if argument_less (pos,fpos) then DepFlexAndRigid (pos,rpos) else x
       | Some (DepFlex fpos as x) ->
           if argument_less (pos,fpos) then DepFlex pos else x
-      | Some (Manual _) -> assert false
+      | Some Manual -> assert false
   in na, Some e
 
 (* modified is_rigid_reference with a truncated env *)
@@ -241,11 +250,7 @@ let compute_implicits_flags env f all t =
     f.reversible_pattern f.contextual all env t
     
 let set_implicit id imp insmax =
-  (id,(match imp with None -> Manual false | Some imp -> imp),insmax)
-
-let merge_imps f = function 
-    None -> Some (Manual f)
-  | x -> x
+  (id,(match imp with None -> Manual | Some imp -> imp),insmax)
 
 let rec assoc_by_pos k = function
     (ExplByPos (k', x), b) :: tl when k = k' -> (x,b), tl
@@ -262,7 +267,7 @@ let compute_manual_implicits env flags t enriching l =
       let (id, (b, f)), l' = assoc_by_pos k l in
 	if f then
 	  let id = match id with Some id -> id | None -> id_of_string ("arg_" ^ string_of_int k) in
-	    l', Some (id,Manual f,b)
+	    l', Some (id,Manual,b)
 	else l, None
     with Not_found -> l, None
   in
@@ -274,11 +279,11 @@ let compute_manual_implicits env flags t enriching l =
       let l',imp,m =
 	try 
 	  let (b, f) = List.assoc (ExplByName id) l in
-	  List.remove_assoc (ExplByName id) l, merge_imps f imp,Some b
+	  List.remove_assoc (ExplByName id) l, (Some Manual), (Some b)
 	with Not_found ->
 	try 
 	  let (id, (b, f)), l' = assoc_by_pos k l in
-	    l', merge_imps f imp,Some b
+	    l', (Some Manual), (Some b)
 	with Not_found ->
 	  l,imp, if enriching && imp <> None then Some flags.maximal else None
       in
@@ -305,11 +310,15 @@ let compute_manual_implicits env flags t enriching l =
   in
   merge 1 l autoimps
 
+let const v _ = v
+
 let compute_implicits_auto env f manual t =
   match manual with
-      [] -> let l = compute_implicits_flags env f false t in
-	      prepare_implicits f l
-    | _ -> compute_manual_implicits env f t true manual
+  | [] -> 
+      let l = compute_implicits_flags env f false t in
+	if f.manual then List.map (const None) l
+	else prepare_implicits f l
+  | _ -> compute_manual_implicits env f t (not f.manual) manual
 	
 let compute_implicits env t = compute_implicits_auto env !implicit_args [] t
 
@@ -333,10 +342,6 @@ let maximal_insertion_of = function
   | Some (_,_,b) -> b
   | None -> anomaly "Not an implicit argument"
 
-let forced_implicit = function
-  | Some (_,Manual b,_) -> b
-  | _ -> false
-
 (* [in_ctx] means we know the expected type, [n] is the index of the argument *)
 let is_inferable_implicit in_ctx n = function
   | None -> false
@@ -346,7 +351,7 @@ let is_inferable_implicit in_ctx n = function
   | Some (_,DepRigid Conclusion,_) -> in_ctx
   | Some (_,DepFlex Conclusion,_) -> false
   | Some (_,DepFlexAndRigid (_,Conclusion),_) -> in_ctx
-  | Some (_,Manual _,_) -> true
+  | Some (_,Manual,_) -> true
 
 let positions_of_implicits =
   let rec aux n = function
@@ -417,9 +422,18 @@ let list_split_at index l =
     | [] -> failwith "list_split_at: Invalid argument"
   in aux 0 [] l
     
-let merge_impls oimpls impls =
-  let oimpls, _ = list_split_at (List.length oimpls - List.length impls) oimpls in
-    oimpls @ impls
+let merge_impls oldimpls newimpls =
+  let (before, news), olds = 
+    let len = List.length newimpls - List.length oldimpls in
+      if len >= 0 then list_split_at len newimpls, oldimpls
+      else 
+	let before, after = list_split_at (-len) oldimpls in
+	  (before, newimpls), after
+  in
+    before @ (List.map2 (fun orig ni ->
+      match orig with
+      | Some (_, Manual, _) -> orig
+      | _ -> ni) olds news)
 
 (* Caching implicits *)
 
@@ -453,34 +467,67 @@ let subst_implicits_decl subst (r,imps as o) =
 let subst_implicits (_,subst,(req,l)) =
   (ImplLocal,list_smartmap (subst_implicits_decl subst) l)
 
+let impls_of_context ctx =
+  List.rev_map (fun (id,impl,_,_) -> if impl = Lib.Implicit then Some (id, Manual, true) else None)
+    (List.filter (fun (_,_,b,_) -> b = None) ctx)
+
+let section_segment_of_reference = function
+  | ConstRef con -> section_segment_of_constant con
+  | IndRef (kn,_) | ConstructRef ((kn,_),_) ->
+      section_segment_of_mutual_inductive kn
+  | _ -> []
+
 let discharge_implicits (_,(req,l)) =
   match req with
   | ImplLocal -> None
   | ImplInteractive (ref,flags,exp) -> 
-      Some (ImplInteractive (pop_global_reference ref,flags,exp),l)
+      let vars = section_segment_of_reference ref in
+      let ref' = pop_global_reference ref in
+      let l' = [ref', impls_of_context vars @ snd (List.hd l)] in
+      Some (ImplInteractive (ref',flags,exp),l')
   | ImplConstant (con,flags) ->
-      Some (ImplConstant (pop_con con,flags),l)
+      let con' = pop_con con in
+      let l' = [ConstRef con',impls_of_context (section_segment_of_constant con) @ snd (List.hd l)] in
+	Some (ImplConstant (con',flags),l')
   | ImplMutualInductive (kn,flags) ->
-      Some (ImplMutualInductive (pop_kn kn,flags),l)
+      let l' = List.map (fun (gr, l) -> 
+	let vars = section_segment_of_reference gr in
+	  (pop_global_reference gr, impls_of_context vars @ l)) l 
+      in
+	Some (ImplMutualInductive (pop_kn kn,flags),l')
 
-let rebuild_implicits (info,(req,l)) =
-  let manual = List.fold_left (fun acc (id, impl, keep) -> 
-    if impl then (ExplByName id, (true, true)) :: acc else acc)
-    [] info
-  in
+let rebuild_implicits (req,l) =
   let l' = match req with
   | ImplLocal -> assert false
   | ImplConstant (con,flags) -> 
-      [ConstRef con, compute_constant_implicits flags manual con]
+      let oldimpls = snd (List.hd l) in
+      let newimpls = compute_constant_implicits flags [] con in
+      [ConstRef con, merge_impls oldimpls newimpls]
   | ImplMutualInductive (kn,flags) ->
-      compute_all_mib_implicits flags manual kn
+      let newimpls = compute_all_mib_implicits flags [] kn in
+      let rec aux olds news = 
+	match olds, news with
+	| (_, oldimpls) :: old, (gr, newimpls) :: tl ->
+	    (gr, merge_impls oldimpls newimpls) :: aux old tl
+	| [], [] -> []
+	| _, _ -> assert false
+      in aux l newimpls
+
   | ImplInteractive (ref,flags,o) ->
       match o with
-      | ImplAuto -> [ref,compute_global_implicits flags manual ref]
-      | ImplManual l -> 
-	  let auto = compute_global_implicits flags manual ref in
-(* 	  let auto = if flags.main then auto else List.map (fun _ -> None) auto in *)
-	  let l' = merge_impls auto l in [ref,l']
+      | ImplAuto -> 
+	  let oldimpls = snd (List.hd l) in
+	  let newimpls = compute_global_implicits flags [] ref in
+	    [ref,merge_impls oldimpls newimpls]
+      | ImplManual m -> 
+	  let oldimpls = snd (List.hd l) in
+	  let auto = 
+	    if flags.main then
+	      let newimpls = compute_global_implicits flags [] ref in
+		merge_impls oldimpls newimpls
+	    else oldimpls
+	  in
+	  let l' = merge_impls auto m in [ref,l']
   in (req,l')
 
 let export_implicits (req,_ as x) = 
@@ -545,6 +592,12 @@ let maybe_declare_manual_implicits local ref enriching l =
   if l = [] then ()
   else declare_manual_implicits local ref enriching l
 
+let lift_implicits n = 
+  List.map (fun x -> 
+    match fst x with 
+	ExplByPos (k, id) -> ExplByPos (k + n, id), snd x
+      | _ -> x)
+
 (*s Registration as global tables *)
 
 let init () = implicits_table := Refmap.empty
diff --git a/library/impargs.mli b/library/impargs.mli
index 5b55af82..705efd31 100644
--- a/library/impargs.mli
+++ b/library/impargs.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: impargs.mli 10741 2008-04-02 15:47:07Z msozeau $ i*)
+(*i $Id: impargs.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -20,6 +20,7 @@ open Nametab
     are outside the kernel, which knows nothing about implicit arguments. *)
 
 val make_implicit_args : bool -> unit
+val make_manual_implicit_args : bool -> unit
 val make_strict_implicit_args : bool -> unit
 val make_strongly_strict_implicit_args : bool -> unit
 val make_reversible_pattern_implicit_args : bool -> unit
@@ -27,6 +28,7 @@ val make_contextual_implicit_args : bool -> unit
 val make_maximal_implicit_args : bool -> unit
 
 val is_implicit_args : unit -> bool
+val is_manual_implicit_args : unit -> bool
 val is_strict_implicit_args : unit -> bool
 val is_strongly_strict_implicit_args : unit -> bool
 val is_reversible_pattern_implicit_args : unit -> bool
@@ -38,16 +40,25 @@ val with_implicits : implicits_flags -> ('a -> 'b) -> 'a -> 'b
 
 (*s An [implicits_list] is a list of positions telling which arguments
     of a reference can be automatically infered *)
-type implicit_status
-type implicits_list = implicit_status list
 
-type implicit_explanation
+
+type argument_position =
+  | Conclusion
+  | Hyp of int
+
+type implicit_explanation =
+  | DepRigid of argument_position
+  | DepFlex of argument_position
+  | DepFlexAndRigid of (*flex*) argument_position * (*rig*) argument_position
+  | Manual
+
+type implicit_status = (identifier * implicit_explanation * bool) option
+type implicits_list = implicit_status list
 
 val is_status_implicit : implicit_status -> bool
 val is_inferable_implicit : bool -> int -> implicit_status -> bool
 val name_of_implicit : implicit_status -> identifier
 val maximal_insertion_of : implicit_status -> bool
-val forced_implicit : implicit_status -> bool
 
 val positions_of_implicits : implicits_list -> int list
 
@@ -83,3 +94,30 @@ val maybe_declare_manual_implicits : bool -> global_reference -> bool ->
   manual_explicitation list -> unit
 
 val implicits_of_global : global_reference -> implicits_list
+
+val lift_implicits : int -> manual_explicitation list -> manual_explicitation list
+
+val merge_impls : implicits_list -> implicits_list -> implicits_list
+
+type implicit_interactive_request =
+  | ImplAuto
+  | ImplManual of implicit_status list
+
+type implicit_discharge_request =
+  | ImplLocal
+  | ImplConstant of constant * implicits_flags
+  | ImplMutualInductive of kernel_name * implicits_flags
+  | ImplInteractive of global_reference * implicits_flags * 
+      implicit_interactive_request
+
+val discharge_implicits :     'a *
+    (implicit_discharge_request *
+     (Libnames.global_reference *
+      (Names.identifier * implicit_explanation * bool) option list)
+     list) ->
+    (implicit_discharge_request *
+     (Libnames.global_reference *
+      (Names.identifier * implicit_explanation * bool) option list)
+     list)
+    option
+
diff --git a/library/lib.ml b/library/lib.ml
index ce3d2520..fa71bb2f 100644
--- a/library/lib.ml
+++ b/library/lib.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: lib.ml 10982 2008-05-24 14:32:25Z herbelin $ *)
+(* $Id: lib.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Pp
 open Util
@@ -214,9 +214,9 @@ let add_leaf id obj =
   add_entry oname (Leaf obj);
   oname
 
-let add_discharged_leaf id varinfo obj =
+let add_discharged_leaf id obj =
   let oname = make_oname id in
-  let newobj = rebuild_object (varinfo, obj) in
+  let newobj = rebuild_object obj in
   cache_object (oname,newobj);
   add_entry oname (Leaf newobj)
 
@@ -436,11 +436,14 @@ let what_is_opened () = find_entry_p is_something_opened
    - the list of variables on which each inductive depends in this section
    - the list of substitution to do at section closing 
 *)
+type binding_kind = Explicit | Implicit
 
-type abstr_list = Sign.named_context Cmap.t * Sign.named_context KNmap.t
+type variable_info = Names.identifier * binding_kind * Term.constr option * Term.types
+type variable_context = variable_info list
+type abstr_list = variable_context Names.Cmap.t * variable_context Names.KNmap.t
 
 let sectab =
-  ref ([] : ((identifier * bool * Term.types option) list * Cooking.work_list * abstr_list) list)
+  ref ([] : ((Names.identifier * binding_kind * Term.types option) list * Cooking.work_list * abstr_list) list)
 
 let add_section () =
   sectab := ([],(Cmap.empty,KNmap.empty),(Cmap.empty,KNmap.empty)) :: !sectab
@@ -451,25 +454,34 @@ let add_section_variable id impl keep =
     | (vars,repl,abs)::sl -> sectab := ((id,impl,keep)::vars,repl,abs)::sl
 
 let rec extract_hyps = function
-  | ((id,impl,keep)::idl,(id',_,_ as d)::hyps) when id=id' -> d :: extract_hyps (idl,hyps)
-  | ((id,impl,Some ty)::idl,hyps) -> (id,None,ty) :: extract_hyps (idl,hyps)
+  | ((id,impl,keep)::idl,(id',b,t)::hyps) when id=id' -> (id',impl,b,t) :: extract_hyps (idl,hyps)
+  | ((id,impl,Some ty)::idl,hyps) -> (id,impl,None,ty) :: extract_hyps (idl,hyps)
   | (id::idl,hyps) -> extract_hyps (idl,hyps)
   | [], _ -> []
 
+let instance_from_variable_context sign =
+  let rec inst_rec = function
+    | (id,b,None,_) :: sign -> id :: inst_rec sign
+    | _ :: sign -> inst_rec sign
+    | [] -> [] in
+  Array.of_list (inst_rec sign)
+
+let named_of_variable_context = List.map (fun (id,_,b,t) -> (id,b,t))
+
 let add_section_replacement f g hyps =
   match !sectab with
   | [] -> ()
   | (vars,exps,abs)::sl ->
     let sechyps = extract_hyps (vars,hyps) in
-    let args = Sign.instance_from_named_context (List.rev sechyps) in
-    sectab := (vars,f (Array.map Term.destVar args) exps,g sechyps abs)::sl
+    let args = instance_from_variable_context (List.rev sechyps) in
+    sectab := (vars,f args exps,g sechyps abs)::sl
 	
 let add_section_kn kn =
-  let f = (fun x (l1,l2) -> (l1,KNmap.add kn x l2)) in
+  let f x (l1,l2) = (l1,Names.KNmap.add kn x l2) in
   add_section_replacement f f
 
 let add_section_constant kn =
-  let f = (fun x (l1,l2) -> (Cmap.add kn x l1,l2)) in
+  let f x (l1,l2) = (Names.Cmap.add kn x l1,l2) in
   add_section_replacement f f
 
 let replacement_context () = pi2 (List.hd !sectab)
@@ -482,13 +494,22 @@ let section_segment_of_constant con =
 let section_segment_of_mutual_inductive kn =
   KNmap.find kn (snd (pi3 (List.hd !sectab)))
 
+let rec list_mem_assoc_in_triple x = function
+    [] -> raise Not_found
+  | (a,_,_)::l -> compare a x = 0 or list_mem_assoc_in_triple x l
+
 let section_instance = function
-  | VarRef id -> [||]
+  | VarRef id ->
+      if list_mem_assoc_in_triple id (pi1 (List.hd !sectab)) then [||]
+      else raise Not_found
   | ConstRef con ->
       Cmap.find con (fst (pi2 (List.hd !sectab)))
   | IndRef (kn,_) | ConstructRef ((kn,_),_) ->
       KNmap.find kn (snd (pi2 (List.hd !sectab)))
 
+let is_in_section ref =
+  try ignore (section_instance ref); true with Not_found -> false
+
 let init_sectab () = sectab := []
 let freeze_sectab () = !sectab
 let unfreeze_sectab s = sectab := s
@@ -551,10 +572,6 @@ let close_section id =
     with Not_found ->
       error "no opened section"
   in
-  let var_info = List.map
-    (fun (x, y, z) -> (x, y, match z with Some _ -> true | None -> false))
-    (variables_context ())
-  in
   let (secdecls,secopening,before) = split_lib oname in
   lib_stk := before;
   let full_olddir = fst !path_prefix in
@@ -563,7 +580,7 @@ let close_section id =
   if !Flags.xml_export then !xml_close_section id;
   let newdecls = List.map discharge_item secdecls in
   Summary.section_unfreeze_summaries fs;
-  List.iter (Option.iter (fun (id,o) -> add_discharged_leaf id var_info o)) newdecls;
+  List.iter (Option.iter (fun (id,o) -> add_discharged_leaf id o)) newdecls;
   Cooking.clear_cooking_sharing ();
   Nametab.push_dir (Nametab.Until 1) full_olddir (DirClosedSection full_olddir)
 
diff --git a/library/lib.mli b/library/lib.mli
index 64074cfd..d35fcc09 100644
--- a/library/lib.mli
+++ b/library/lib.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: lib.mli 11046 2008-06-03 22:48:06Z msozeau $ i*)
+(*i $Id: lib.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Util
@@ -171,17 +171,24 @@ val reset_initial : unit -> unit
 val set_xml_open_section : (identifier -> unit) -> unit
 val set_xml_close_section : (identifier -> unit) -> unit
 
+type binding_kind = Explicit | Implicit
 
 (*s Section management for discharge *)
+type variable_info = Names.identifier * binding_kind * Term.constr option * Term.types
+type variable_context = variable_info list
 
-val section_segment_of_constant : constant -> Sign.named_context
-val section_segment_of_mutual_inductive: mutual_inductive -> Sign.named_context
+val instance_from_variable_context : variable_context -> Names.identifier array
+val named_of_variable_context : variable_context -> Sign.named_context
 
-val section_instance : global_reference -> identifier array
+val section_segment_of_constant : Names.constant -> variable_context
+val section_segment_of_mutual_inductive: Names.mutual_inductive -> variable_context
 
-val add_section_variable : identifier -> bool -> Term.types option -> unit
-val add_section_constant : constant -> Sign.named_context -> unit
-val add_section_kn : kernel_name -> Sign.named_context -> unit
+val section_instance : Libnames.global_reference -> Names.identifier array
+val is_in_section : Libnames.global_reference -> bool
+
+val add_section_variable : Names.identifier -> binding_kind -> Term.types option -> unit
+val add_section_constant : Names.constant -> Sign.named_context -> unit
+val add_section_kn : Names.kernel_name -> Sign.named_context -> unit
 val replacement_context : unit ->
   (identifier array Cmap.t * identifier array KNmap.t)
 
diff --git a/library/libnames.ml b/library/libnames.ml
index 31822da4..d0c6e8b9 100644
--- a/library/libnames.ml
+++ b/library/libnames.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: libnames.ml 10580 2008-02-22 13:39:13Z lmamane $ i*)
+(*i $Id: libnames.ml 11209 2008-07-05 10:17:49Z herbelin $ i*)
 
 open Pp
 open Util
@@ -89,6 +89,8 @@ let drop_dirpath_prefix d1 d2 =
   let d = Util.list_drop_prefix (List.rev (repr_dirpath d1)) (List.rev (repr_dirpath d2)) in
     make_dirpath (List.rev d)
 
+let append_dirpath d1 d2 = make_dirpath (repr_dirpath d2 @ repr_dirpath d1)
+
 (* To know how qualified a name should be to be understood in the current env*)
 let add_dirpath_prefix id d = make_dirpath (repr_dirpath d @ [id])
 
diff --git a/library/libnames.mli b/library/libnames.mli
index d4942061..76c406db 100644
--- a/library/libnames.mli
+++ b/library/libnames.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: libnames.mli 10308 2007-11-09 09:40:21Z herbelin $ i*)
+(*i $Id: libnames.mli 11209 2008-07-05 10:17:49Z herbelin $ i*)
 
 (*i*)
 open Pp
@@ -59,6 +59,7 @@ val chop_dirpath : int -> dir_path -> dir_path * dir_path
 val drop_dirpath_prefix : dir_path -> dir_path -> dir_path
 val extract_dirpath_prefix : int -> dir_path -> dir_path
 val is_dirpath_prefix_of : dir_path -> dir_path -> bool
+val append_dirpath : dir_path -> dir_path -> dir_path
 
 module Dirset : Set.S with type elt = dir_path
 module Dirmap : Map.S with type key = dir_path
diff --git a/library/libobject.ml b/library/libobject.ml
index ff78f527..6b302447 100644
--- a/library/libobject.ml
+++ b/library/libobject.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: libobject.ml 10741 2008-04-02 15:47:07Z msozeau $ *)
+(* $Id: libobject.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Util
 open Names
@@ -28,8 +28,6 @@ let relax b = relax_flag := b;;
 type 'a substitutivity = 
     Dispose | Substitute of 'a | Keep of 'a | Anticipate of 'a
 
-type discharge_info = (identifier * bool * bool) list
-
 type 'a object_declaration = {
   object_name : string;
   cache_function : object_name * 'a -> unit;
@@ -38,7 +36,7 @@ type 'a object_declaration = {
   classify_function : object_name * 'a -> 'a substitutivity;
   subst_function : object_name * substitution * 'a -> 'a;
   discharge_function : object_name * 'a -> 'a option;
-  rebuild_function : discharge_info * 'a -> 'a;
+  rebuild_function : 'a -> 'a;
   export_function : 'a -> 'a option }
 
 let yell s = anomaly s
@@ -52,7 +50,7 @@ let default_object s = {
     yell ("The object "^s^" does not know how to substitute!"));
   classify_function = (fun (_,obj) -> Keep obj);
   discharge_function = (fun _ -> None);
-  rebuild_function = (fun (_,x) -> x);
+  rebuild_function = (fun x -> x);
   export_function = (fun _ -> None)} 
 
 
@@ -78,7 +76,7 @@ type dynamic_object_declaration = {
   dyn_subst_function : object_name * substitution * obj -> obj;
   dyn_classify_function : object_name * obj -> obj substitutivity;
   dyn_discharge_function : object_name * obj -> obj option;
-  dyn_rebuild_function : discharge_info * obj -> obj;
+  dyn_rebuild_function : obj -> obj;
   dyn_export_function : obj -> obj option }
 
 let object_tag lobj = Dyn.tag lobj
@@ -116,8 +114,8 @@ let declare_object odecl =
       Option.map infun (odecl.discharge_function (oname,outfun lobj))
     else 
       anomaly "somehow we got the wrong dynamic object in the dischargefun"
-  and rebuild (varinfo,lobj) = 
-    if Dyn.tag lobj = na then infun (odecl.rebuild_function (varinfo,outfun lobj))
+  and rebuild lobj = 
+    if Dyn.tag lobj = na then infun (odecl.rebuild_function (outfun lobj))
     else anomaly "somehow we got the wrong dynamic object in the rebuildfun"
   and exporter lobj = 
     if Dyn.tag lobj = na then 
@@ -174,7 +172,7 @@ let classify_object ((_,lobj) as node) =
 let discharge_object ((_,lobj) as node) = 
   apply_dyn_fun None (fun d -> d.dyn_discharge_function node) lobj
 
-let rebuild_object ((_,lobj) as node) =
+let rebuild_object (lobj as node) =
   apply_dyn_fun lobj (fun d -> d.dyn_rebuild_function node) lobj
 
 let export_object lobj =
diff --git a/library/libobject.mli b/library/libobject.mli
index 5f6cf13b..4ec5746b 100644
--- a/library/libobject.mli
+++ b/library/libobject.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: libobject.mli 10840 2008-04-23 21:29:34Z herbelin $ i*)
+(*i $Id: libobject.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -71,8 +71,6 @@ open Mod_subst
 type 'a substitutivity = 
     Dispose | Substitute of 'a | Keep of 'a | Anticipate of 'a
 
-type discharge_info = (identifier * bool * bool) list
-
 type 'a object_declaration = {
   object_name : string;
   cache_function : object_name * 'a -> unit;
@@ -81,7 +79,7 @@ type 'a object_declaration = {
   classify_function : object_name * 'a -> 'a substitutivity;
   subst_function : object_name * substitution * 'a -> 'a;
   discharge_function : object_name * 'a -> 'a option;
-  rebuild_function : discharge_info * 'a -> 'a;
+  rebuild_function : 'a -> 'a;
   export_function : 'a -> 'a option }
 
 (* The default object is a "Keep" object with empty methods. 
@@ -116,5 +114,5 @@ val subst_object : object_name * substitution * obj -> obj
 val classify_object : object_name * obj -> obj substitutivity
 val export_object : obj -> obj option
 val discharge_object : object_name * obj -> obj option
-val rebuild_object : discharge_info * obj -> obj
+val rebuild_object : obj -> obj
 val relax : bool -> unit
diff --git a/library/library.ml b/library/library.ml
index 2904edc2..73928a9b 100644
--- a/library/library.ml
+++ b/library/library.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: library.ml 11181 2008-06-27 07:35:45Z notin $ *)
+(* $Id: library.ml 11313 2008-08-07 11:15:03Z barras $ *)
 
 open Pp
 open Util
@@ -25,9 +25,9 @@ open Declaremods
 
 type logical_path = dir_path
 
-let load_paths = ref ([],[] : System.physical_path list * logical_path list)
+let load_paths = ref ([] : (System.physical_path * logical_path * bool) list)
 
-let get_load_paths () = fst !load_paths
+let get_load_paths () = List.map pi1 !load_paths
 
 (* Hints to partially detects if two paths refer to the same repertory *)
 let rec remove_path_dot p = 
@@ -57,12 +57,12 @@ let canonical_path_name p =
     (* We give up to find a canonical name and just simplify it... *)
     strip_path p
 
-let find_logical_path phys_dir = 
+let find_logical_path phys_dir =
   let phys_dir = canonical_path_name phys_dir in
-  match list_filter2 (fun p d -> p = phys_dir) !load_paths with
-  | _,[dir] -> dir
-  | _,[] -> Nameops.default_root_prefix
-  | _,l -> anomaly ("Two logical paths are associated to "^phys_dir)
+  match List.filter (fun (p,d,_) -> p = phys_dir) !load_paths with
+  | [_,dir,_] -> dir
+  | [] -> Nameops.default_root_prefix
+  | l -> anomaly ("Two logical paths are associated to "^phys_dir)
 
 let is_in_load_paths phys_dir =
   let dir = canonical_path_name phys_dir in
@@ -71,12 +71,12 @@ let is_in_load_paths phys_dir =
     List.exists check_p lp 
 
 let remove_load_path dir =
-  load_paths := list_filter2 (fun p d -> p <> dir) !load_paths
+  load_paths := List.filter (fun (p,d,_) -> p <> dir) !load_paths
 
-let add_load_path (phys_path,coq_path) =
+let add_load_path isroot (phys_path,coq_path) =
   let phys_path = canonical_path_name phys_path in
-    match list_filter2 (fun p d -> p = phys_path) !load_paths with
-      | _,[dir] ->
+    match List.filter (fun (p,d,_) -> p = phys_path) !load_paths with
+      | [_,dir,_] ->
 	  if coq_path <> dir 
             (* If this is not the default -I . to coqtop *)
             && not
@@ -91,18 +91,54 @@ let add_load_path (phys_path,coq_path) =
 		   pr_dirpath dir ++ strbrk "; it is remapped to " ++
 		   pr_dirpath coq_path);
 	      remove_load_path phys_path;
-	      load_paths := (phys_path::fst !load_paths, coq_path::snd !load_paths)
+	      load_paths := (phys_path,coq_path,isroot) :: !load_paths;
 	    end
-      | _,[] ->
-	  load_paths := (phys_path :: fst !load_paths, coq_path :: snd !load_paths)
+      | [] ->
+	  load_paths := (phys_path,coq_path,isroot) :: !load_paths;
       | _ -> anomaly ("Two logical paths are associated to "^phys_path)
 
 let physical_paths (dp,lp) = dp
 
-let load_paths_of_dir_path dir =
-  fst (list_filter2 (fun p d -> d = dir) !load_paths)
-    
-let get_full_load_paths () = List.combine (fst !load_paths) (snd !load_paths)
+let extend_path_with_dirpath p dir =
+  List.fold_left Filename.concat p 
+    (List.map string_of_id (List.rev (repr_dirpath dir)))
+
+let root_paths_matching_dir_path dir =
+  let rec aux = function
+  | [] -> []
+  | (p,d,true) :: l when is_dirpath_prefix_of d dir ->
+      let suffix = drop_dirpath_prefix d dir in
+      extend_path_with_dirpath p suffix :: aux l
+  | _ :: l -> aux l in
+  aux !load_paths
+
+(* Root p is bound to A.B.C.D and we require file C.D.E.F *)
+(* We may mean A.B.C.D.E.F, or A.B.C.D.C.D.E.F *)
+
+(* Root p is bound to A.B.C.C and we require file C.C.E.F *)
+(* We may mean A.B.C.C.E.F, or A.B.C.C.C.E.F, or A.B.C.C.C.C.E.F *)
+
+let intersections d1 d2 =
+  let rec aux d1 =
+    if d1 = empty_dirpath then [d2] else
+      let rest = aux (snd (chop_dirpath 1 d1)) in
+      if is_dirpath_prefix_of d1 d2 then drop_dirpath_prefix d1 d2 :: rest
+      else rest in
+  aux d1
+
+let loadpaths_matching_dir_path dir =
+  let rec aux = function
+  | [] -> []
+  | (p,d,true) :: l ->
+      let inters = intersections d dir in
+      List.map (fun tl -> (extend_path_with_dirpath p tl,append_dirpath d tl))
+	inters @
+	aux l
+  | (p,d,_) :: l ->
+      (extend_path_with_dirpath p dir,append_dirpath d dir) :: aux l in
+  aux !load_paths
+
+let get_full_load_paths () = List.map (fun (a,b,c) -> (a,b)) !load_paths
 
 (************************************************************************)
 (*s Modules on disk contain the following informations (after the magic 
@@ -197,6 +233,12 @@ let library_full_filename dir =
   try LibraryFilenameMap.find dir !libraries_filename_table
   with Not_found -> "<unavailable filename>"
 
+let overwrite_library_filenames f =
+  let f =
+    if Filename.is_relative f then Filename.concat (Sys.getcwd ()) f else f in
+  LibraryMap.iter (fun dir _ -> register_library_filename dir f)
+    !libraries_table
+
 let library_is_loaded dir =
   try let _ = find_library dir in true
   with Not_found -> false
@@ -312,10 +354,8 @@ let (in_import, out_import) =
 
 (*s Loading from disk to cache (preparation phase) *)
 
-let vo_magic_number = 08193 (* v8.2beta3 *)
-
 let (raw_extern_library, raw_intern_library) =
-  System.raw_extern_intern vo_magic_number ".vo"
+  System.raw_extern_intern Coq_config.vo_magic_number ".vo"
 
 let with_magic_number_check f a =
   try f a
@@ -335,11 +375,11 @@ type library_location = LibLoaded | LibInPath
 let locate_absolute_library dir =
   (* Search in loadpath *)
   let pref, base = split_dirpath dir in
-  let loadpath = load_paths_of_dir_path pref in
+  let loadpath = root_paths_matching_dir_path pref in
   if loadpath = [] then raise LibUnmappedDir;
   try
     let name = (string_of_id base)^".vo" in
-    let _, file = System.where_in_path loadpath name in
+    let _, file = System.where_in_path false loadpath name in
     (dir, file)
   with Not_found ->
   (* Last chance, removed from the file system but still in memory *)
@@ -348,20 +388,15 @@ let locate_absolute_library dir =
   else
     raise LibNotFound
 
-let locate_qualified_library qid =
+let locate_qualified_library warn qid =
   try
     (* Search library in loadpath *)
-    let dir, base = repr_qualid qid in 
-    let loadpath =
-      if repr_dirpath dir = [] then get_load_paths ()
-      else 
-        (* we assume dir is an absolute dirpath *)
-	load_paths_of_dir_path dir
-    in
+    let dir, base = repr_qualid qid in
+    let loadpath = loadpaths_matching_dir_path dir in
     if loadpath = [] then raise LibUnmappedDir;
-    let name =  (string_of_id base)^".vo" in
-    let path, file = System.where_in_path loadpath name in
-    let dir = extend_dirpath (find_logical_path path) base in
+    let name = string_of_id base ^ ".vo" in
+    let lpath, file = System.where_in_path warn (List.map fst loadpath) name in
+    let dir = extend_dirpath (List.assoc lpath loadpath) base in
     (* Look if loaded *)
     if library_is_loaded dir then (LibLoaded, dir, library_full_filename dir)
     (* Otherwise, look for it in the file system *)
@@ -387,7 +422,7 @@ let try_locate_absolute_library dir =
 
 let try_locate_qualified_library (loc,qid) =
   try
-    let (_,dir,f) = locate_qualified_library qid in
+    let (_,dir,f) = locate_qualified_library (Flags.is_verbose()) qid in
     dir,f
   with e -> 
     explain_locate_library_error qid e
@@ -590,8 +625,7 @@ let import_module export (loc,qid) =
 (*s Initializing the compilation of a library. *)
 
 let start_library f = 
-  let _,longf = 
-    System.find_file_in_path (get_load_paths ()) (f^".v") in
+  let _,longf = System.find_file_in_path (get_load_paths ()) (f^".v") in
   let ldir0 = find_logical_path (Filename.dirname longf) in
   let id = id_of_string (Filename.basename f) in
   let ldir = extend_dirpath ldir0 id in
@@ -609,9 +643,9 @@ let current_reexports () =
 
 let error_recursively_dependent_library dir =
   errorlabstrm ""
-    (str "Unable to use logical name" ++ spc() ++ pr_dirpath dir ++ spc() ++ 
-     str "to save current library" ++ spc() ++ str"because" ++ spc() ++ 
-     str "it already depends on a library of this name.")
+    (strbrk "Unable to use logical name " ++ pr_dirpath dir ++ 
+     strbrk " to save current library because" ++
+     strbrk " it already depends on a library of this name.")
 
 let save_library_to dir f =
   let cenv, seg = Declaremods.end_library dir in
diff --git a/library/library.mli b/library/library.mli
index 27ace544..a66a77bc 100644
--- a/library/library.mli
+++ b/library/library.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: library.mli 8877 2006-05-30 16:37:04Z notin $ i*)
+(*i $Id: library.mli 11209 2008-07-05 10:17:49Z herbelin $ i*)
 
 (*i*)
 open Util
@@ -52,6 +52,9 @@ val opened_libraries : unit -> dir_path list
   (* - Return the full filename of a loaded library. *)
 val library_full_filename : dir_path -> string
 
+  (* - Overwrite the filename of all libraries (used when restoring a state) *)
+val overwrite_library_filenames : string -> unit
+
 (*s Hook for the xml exportation of libraries *)
 val set_xml_require : (dir_path -> unit) -> unit
 
@@ -61,11 +64,10 @@ val set_xml_require : (dir_path -> unit) -> unit
 
 val get_load_paths : unit -> System.physical_path list
 val get_full_load_paths : unit -> (System.physical_path * dir_path) list
-val add_load_path : System.physical_path * dir_path -> unit
+val add_load_path : bool -> System.physical_path * dir_path -> unit
 val remove_load_path : System.physical_path -> unit
 val find_logical_path : System.physical_path -> dir_path
 val is_in_load_paths : System.physical_path -> bool
-val load_paths_of_dir_path : dir_path -> System.physical_path list
 
 (*s Locate a library in the load paths *)
 exception LibUnmappedDir
@@ -73,7 +75,7 @@ exception LibNotFound
 type library_location = LibLoaded | LibInPath
 
 val locate_qualified_library :
-  qualid -> library_location * dir_path * System.physical_path
+  bool -> qualid -> library_location * dir_path * System.physical_path
 
 (*s Statistics: display the memory use of a library. *)
 val mem : dir_path -> Pp.std_ppcmds
diff --git a/library/states.ml b/library/states.ml
index 169a3857..7f7fef47 100644
--- a/library/states.ml
+++ b/library/states.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: states.ml 9100 2006-08-31 18:04:26Z herbelin $ *)
+(* $Id: states.ml 11313 2008-08-07 11:15:03Z barras $ *)
 
 open System
 
@@ -19,12 +19,13 @@ let unfreeze (fl,fs) =
   Lib.unfreeze fl;
   Summary.unfreeze_summaries fs
 
-let state_magic_number = 19764
-
 let (extern_state,intern_state) =
-  let (raw_extern, raw_intern) = extern_intern state_magic_number ".coq" in
+  let (raw_extern, raw_intern) =
+    extern_intern Coq_config.state_magic_number ".coq" in
   (fun s -> raw_extern s (freeze())),
-  (fun s -> unfreeze (raw_intern (Library.get_load_paths ()) s))
+  (fun s ->
+    unfreeze (raw_intern (Library.get_load_paths ()) s);
+    Library.overwrite_library_filenames s)
 
 (* Rollback. *)
 
diff --git a/parsing/egrammar.ml b/parsing/egrammar.ml
index 9416bff2..825d1af0 100644
--- a/parsing/egrammar.ml
+++ b/parsing/egrammar.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: egrammar.ml 10987 2008-05-26 12:28:36Z herbelin $ *)
+(* $Id: egrammar.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -114,27 +114,33 @@ let make_constr_prod_item univ assoc from forpat = function
 let prepare_empty_levels entry (pos,p4assoc,name,reinit) =
   grammar_extend entry pos reinit [(name, p4assoc, [])]
 
-let extend_constr entry (n,assoc,pos,p4assoc,name,reinit) mkact (forpat,pt) =
+let pure_sublevels level symbs =
+  map_succeed (function
+  | Gramext.Snterml (_,n) when Some (int_of_string n) <> level ->
+      int_of_string n
+  | _ ->
+      failwith "") symbs
+
+let extend_constr (entry,level) (n,assoc) mkact forpat pt =
   let univ = get_univ "constr" in
   let pil = List.map (make_constr_prod_item univ assoc n forpat) pt in
   let (symbs,ntl) = List.split pil in
-  let needed_levels = register_empty_levels forpat symbs in
+  let pure_sublevels = pure_sublevels level symbs in
+  let needed_levels = register_empty_levels forpat pure_sublevels in
+  let pos,p4assoc,name,reinit = find_position forpat assoc level in
   List.iter (prepare_empty_levels entry) needed_levels;
   grammar_extend entry pos reinit [(name, p4assoc, [symbs, mkact ntl])]
 
 let extend_constr_notation (n,assoc,ntn,rule) =
   (* Add the notation in constr *)
   let mkact loc env = CNotation (loc,ntn,List.map snd env) in
-  let (e,level) = get_constr_entry false (ETConstr (n,())) in
-  let pos,p4assoc,name,reinit = find_position false assoc level in
-  extend_constr e (ETConstr(n,()),assoc,pos,p4assoc,name,reinit)
-    (make_constr_action mkact) (false,rule);
+  let e = get_constr_entry false (ETConstr (n,())) in
+  extend_constr e (ETConstr(n,()),assoc) (make_constr_action mkact) false rule;
   (* Add the notation in cases_pattern *)
   let mkact loc env = CPatNotation (loc,ntn,List.map snd env) in
-  let (e,level) = get_constr_entry true (ETConstr (n,())) in
-  let pos,p4assoc,name,reinit = find_position true assoc level in
-  extend_constr e (ETConstr (n,()),assoc,pos,p4assoc,name,reinit)
-    (make_cases_pattern_action mkact) (true,rule)
+  let e = get_constr_entry true (ETConstr (n,())) in
+  extend_constr e (ETConstr (n,()),assoc) (make_cases_pattern_action mkact)
+    true rule
 
 (**********************************************************************)
 (** Making generic actions in type generic_argument                   *)
@@ -228,7 +234,7 @@ let rec interp_entry_name up_level s =
       try get_entry (get_univ "prim") s
       with _ ->
       try get_entry (get_univ "constr") s
-      with _ -> error ("Unknown entry "^s)
+      with _ -> error ("Unknown entry "^s^".")
     in
     let o = object_of_typed_entry e in
     let t = type_of_typed_entry e in
@@ -248,7 +254,7 @@ let get_tactic_entry n =
   else if 1<=n && n<5 then
     weaken_entry Tactic.tactic_expr, Some (Gramext.Level (string_of_int n))
   else 
-    error ("Invalid Tactic Notation level: "^(string_of_int n))
+    error ("Invalid Tactic Notation level: "^(string_of_int n)^".")
 
 (* Declaration of the tactic grammar rule *)
 
@@ -261,7 +267,7 @@ let add_tactic_entry (key,lev,prods,tac) =
   let rules = 
     if lev = 0 then begin
       if not (head_is_ident prods) then
-	error "Notation for simple tactic must start with an identifier";
+	error "Notation for simple tactic must start with an identifier.";
       let mkact s tac loc l =
 	(TacAlias(loc,s,l,tac):raw_atomic_tactic_expr) in
       make_rule univ (mkact key tac) mkprod prods
diff --git a/parsing/g_ascii_syntax.ml b/parsing/g_ascii_syntax.ml
index b262b978..944e2338 100644
--- a/parsing/g_ascii_syntax.ml
+++ b/parsing/g_ascii_syntax.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1       *)
 (***********************************************************************)
 
-(*i $Id: g_ascii_syntax.ml 10744 2008-04-03 14:09:56Z herbelin $ i*)
+(*i $Id: g_ascii_syntax.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Pp
 open Util
@@ -53,7 +53,7 @@ let interp_ascii_string dloc s =
       then int_of_string s
       else
 	user_err_loc (dloc,"interp_ascii_string",
-	  str "Expects a single character or a three-digits ascii code") in
+	  str "Expects a single character or a three-digits ascii code.") in
   interp_ascii dloc p
 
 let uninterp_ascii r =
diff --git a/parsing/g_constr.ml4 b/parsing/g_constr.ml4
index ba61eb61..b93fdadd 100644
--- a/parsing/g_constr.ml4
+++ b/parsing/g_constr.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo" i*)
 
-(* $Id: g_constr.ml4 11024 2008-05-30 12:41:39Z msozeau $ *)
+(* $Id: g_constr.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pcoq
 open Constr
@@ -47,7 +47,7 @@ let rec index_and_rec_order_of_annot loc bl ann =
     | lids, (Some (loc, n), ro) ->
         if List.exists (fun (_, x) -> x = Name n) lids then
 	  Some (loc, n), ro
-        else user_err_loc(loc,"index_of_annot", Pp.str"no such fix variable")
+        else user_err_loc(loc,"index_of_annot", Pp.str"No such fix variable.")
     | _, (None, r) -> None, r
 
 let mk_fixb (id,bl,ann,body,(loc,tyc)) =
@@ -61,7 +61,7 @@ let mk_cofixb (id,bl,ann,body,(loc,tyc)) =
   let _ = Option.map (fun (aloc,_) ->
     Util.user_err_loc
       (aloc,"Constr:mk_cofixb",
-       Pp.str"Annotation forbidden in cofix expression")) (fst ann) in
+       Pp.str"Annotation forbidden in cofix expression.")) (fst ann) in
   let ty = match tyc with
       Some ty -> ty
     | None -> CHole (loc, None) in
@@ -326,7 +326,7 @@ GEXTEND Gram
           | CPatAtom (_, Some r) -> CPatCstr (loc, r, lp)
           | _ -> Util.user_err_loc 
               (cases_pattern_expr_loc p, "compound_pattern",
-               Pp.str "Constructor expected"))
+               Pp.str "Constructor expected."))
       | p = pattern; "as"; id = ident ->
 	  CPatAlias (loc, p, id) ]
     | "1" LEFTA
@@ -398,7 +398,12 @@ GEXTEND Gram
         [LocalRawAssum ([id],Default Implicit,c)]
     | "{"; id=name; idl=LIST1 name; "}" -> 
         List.map (fun id -> LocalRawAssum ([id],Default Implicit,CHole (loc, None))) (id::idl)
-    | "["; tc = LIST1 typeclass_constraint_binder SEP ","; "]" -> tc
+    | "("; "("; tc = LIST1 typeclass_constraint SEP "," ; ")"; ")" ->
+	List.map (fun (n, b, t) -> LocalRawAssum ([n], TypeClass (Explicit, b), t)) tc
+    | "{"; "{"; tc = LIST1 typeclass_constraint SEP "," ; "}"; "}" ->
+	List.map (fun (n, b, t) -> LocalRawAssum ([n], TypeClass (Implicit, b), t)) tc
+    | "["; tc = LIST1 typeclass_constraint SEP ","; "]" -> 
+	List.map (fun (n, b, t) -> LocalRawAssum ([n], TypeClass (Implicit, b), t)) tc
     ] ]
   ;
   binder:
@@ -407,19 +412,14 @@ GEXTEND Gram
       | "{"; idl=LIST1 name; ":"; c=lconstr; "}" -> (idl,Default Implicit,c) 
     ] ]
   ;
-  typeclass_constraint_binder:
-    [ [ tc = typeclass_constraint ->
-      let (n,bk,t) = tc in
-	LocalRawAssum ([n], TypeClass bk, t)
-    ] ]
-  ;
-
   typeclass_constraint:
     [ [ "!" ; c = operconstr LEVEL "200" -> (loc, Anonymous), Explicit, c
-    | iid=ident_colon ; expl = [ "!" -> Explicit | -> Implicit ] ; c = operconstr LEVEL "200" ->
-	(loc, Name iid), expl, c
-    | c = operconstr LEVEL "200" ->
-	(loc, Anonymous), Implicit, c
+      | "{"; id = name; "}"; ":" ; expl = [ "!" -> Explicit | -> Implicit ] ; c = operconstr LEVEL "200" ->
+	  id, expl, c
+      | iid=ident_colon ; expl = [ "!" -> Explicit | -> Implicit ] ; c = operconstr LEVEL "200" ->
+	  (loc, Name iid), expl, c
+      | c = operconstr LEVEL "200" ->
+	  (loc, Anonymous), Implicit, c
     ] ]
   ;
   
diff --git a/parsing/g_intsyntax.ml b/parsing/g_intsyntax.ml
index 6ab8f99c..a589ccf1 100644
--- a/parsing/g_intsyntax.ml
+++ b/parsing/g_intsyntax.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: g_intsyntax.ml 11087 2008-06-10 13:29:52Z letouzey $ i*)
+(*i $Id: g_intsyntax.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (* digit-based syntax for int31, bigN bigZ and bigQ *)
 
@@ -122,7 +122,7 @@ let int31_of_pos_bigint dloc n =
   RApp (dloc, ref_construct, List.rev (args 31 n))
 
 let error_negative dloc =
-  Util.user_err_loc (dloc, "interp_int31", Pp.str "int31 are only non-negative numbers")
+  Util.user_err_loc (dloc, "interp_int31", Pp.str "int31 are only non-negative numbers.")
 
 let interp_int31 dloc n = 
   if is_pos_or_zero n then
@@ -212,7 +212,7 @@ let bigN_of_pos_bigint dloc n =
   result hght (word_of_pos_bigint dloc hght n)
   
 let bigN_error_negative dloc =
-  Util.user_err_loc (dloc, "interp_bigN", Pp.str "bigN are only non-negative numbers")
+  Util.user_err_loc (dloc, "interp_bigN", Pp.str "bigN are only non-negative numbers.")
 
 let interp_bigN dloc n = 
   if is_pos_or_zero n then
diff --git a/parsing/g_ltac.ml4 b/parsing/g_ltac.ml4
index 78a9fbc7..dbd81e7f 100644
--- a/parsing/g_ltac.ml4
+++ b/parsing/g_ltac.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo" i*)
 
-(* $Id: g_ltac.ml4 10919 2008-05-11 22:04:26Z msozeau $ *)
+(* $Id: g_ltac.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -72,10 +72,10 @@ GEXTEND Gram
       | ta0 = tactic_expr; "||"; ta1 = tactic_expr -> TacOrelse (ta0,ta1) ]
     | "1" RIGHTA
       [ b = match_key; IDENT "goal"; "with"; mrl = match_context_list; "end" ->
-          TacMatchContext (b,false,mrl)
+          TacMatchGoal (b,false,mrl)
       | b = match_key; IDENT "reverse"; IDENT "goal"; "with";
         mrl = match_context_list; "end" ->
-          TacMatchContext (b,true,mrl)
+          TacMatchGoal (b,true,mrl)
       |	b = match_key; c = tactic_expr; "with"; mrl = match_list; "end" ->
           TacMatch (b,c,mrl)
       | IDENT "first" ; "["; l = LIST0 tactic_expr SEP "|"; "]" ->
diff --git a/parsing/g_minicoq.ml4 b/parsing/g_minicoq.ml4
deleted file mode 100644
index a9275cf9..00000000
--- a/parsing/g_minicoq.ml4
+++ /dev/null
@@ -1,177 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-
-(*i camlp4use: "pa_extend.cmo" i*)
-
-(* $Id: g_minicoq.ml4 10007 2007-07-16 09:18:44Z corbinea $ *)
-
-open Pp
-open Util
-open Names
-open Univ
-open Term
-open Environ
-
-let lexer =
-  {Token.func = Lexer.func; Token.using = Lexer.add_token;
-   Token.removing = (fun _ -> ()); Token.tparse = Lexer.tparse;
-   Token.text = Lexer.token_text}
-;;
-
-type command =
-  | Definition of identifier * constr option * constr
-  | Parameter of identifier * constr
-  | Variable of identifier * constr
-  | Inductive of 
-      (identifier * constr) list *
-      (identifier * constr * (identifier * constr) list) list
-  | Check of constr
-
-let gram = Grammar.create lexer
-
-let term = Grammar.Entry.create gram "term"
-let name = Grammar.Entry.create gram "name"
-let nametype = Grammar.Entry.create gram "nametype"
-let inductive = Grammar.Entry.create gram "inductive"
-let constructor = Grammar.Entry.create gram "constructor"
-let command = Grammar.Entry.create gram "command"
-
-let path_of_string s = make_path [] (id_of_string s)
-
-EXTEND
-  name: 
-  [ [ id = IDENT -> Name (id_of_string id)
-    | "_" -> Anonymous
-  ] ];
-  nametype: 
-  [ [ id = IDENT; ":"; t = term -> (id_of_string id, t) 
-  ] ];
-  term: 
-  [ [ id = IDENT -> 
-	mkVar (id_of_string id) 
-    | IDENT "Rel"; n = INT ->
-	mkRel (int_of_string n)
-    | "Set" ->
-	mkSet
-    | "Prop" ->
-	mkProp
-    | "Type" ->
-	mkType (new_univ())
-    | "Const"; id = IDENT ->
-	mkConst (path_of_string id, [||])
-    | "Ind"; id = IDENT; n = INT ->
-	let n = int_of_string n in
-	mkMutInd ((path_of_string id, n), [||])
-    | "Construct"; id = IDENT; n = INT; i = INT ->
-	let n = int_of_string n and i = int_of_string i in
-	mkMutConstruct (((path_of_string id, n), i), [||])
-    | "["; na = name; ":"; t = term; "]"; c = term ->
-	mkLambda (na,t,c)
-    | "("; na = name; ":"; t = term; ")"; c = term ->
-	mkProd (na,t,c)
-    | c1 = term; "->"; c2 = term ->
-	mkArrow c1 c2
-    | "("; id = IDENT; cl = LIST1 term; ")" ->
-	let c = mkVar (id_of_string id) in
-	mkApp (c, Array.of_list cl)
-    | "("; cl = LIST1 term; ")" ->
-	begin match cl with
-	  | [c] -> c
-	  | c::cl -> mkApp (c, Array.of_list cl)
-	end
-    | "("; c = term; "::"; t = term; ")" ->
-	mkCast (c, t)
-    | "<"; p = term; ">"; 
-	IDENT "Case"; c = term; ":"; "Ind"; id = IDENT; i = INT;
-	"of"; bl = LIST0 term; "end" ->
-	  let ind = (path_of_string id,int_of_string i) in
-	  let nc = List.length bl in
-	  let dummy_pats = Array.create nc RegularPat in
-	  let dummy_ci = [||],(ind,[||],nc,None,dummy_pats) in
-	  mkMutCase (dummy_ci, p, c, Array.of_list bl)
-  ] ];
-  command: 
-  [ [ "Definition"; id = IDENT; ":="; c = term; "." ->
-	Definition (id_of_string id, None, c)
-    | "Definition"; id = IDENT; ":"; t = term; ":="; c = term; "." ->
-	Definition (id_of_string id, Some t, c)
-    | "Parameter"; id = IDENT; ":"; t = term; "." ->
-	Parameter (id_of_string id, t)
-    | "Variable"; id = IDENT; ":"; t = term; "." ->
-	Variable (id_of_string id, t)
-    | "Inductive"; "["; params = LIST0 nametype SEP ";"; "]"; 
-      inds = LIST1 inductive SEP "with" ->
-	Inductive (params, inds)
-    | IDENT "Check"; c = term; "." ->
-	Check c
-    | EOI -> raise End_of_file
-  ] ];
-  inductive: 
-  [ [ id = IDENT; ":"; ar = term; ":="; constrs = LIST0 constructor SEP "|" ->
-        (id_of_string id,ar,constrs)
-  ] ];
-  constructor:
-  [ [ id = IDENT; ":"; c = term -> (id_of_string id,c) ] ];
-END
-
-(* Pretty-print. *)
-
-let print_univers = ref false
-let print_casts = ref false
-
-let print_type u =
-  if !print_univers then (str "Type" ++ pr_uni u)
-  else (str "Type")
-
-let print_name = function
-  | Anonymous -> (str "_")
-  | Name id -> pr_id id
-
-let print_rel bv n = print_name (List.nth bv (pred n))
-
-let rename bv = function
-  | Anonymous -> Anonymous
-  | Name id as na -> 
-      let idl = 
-	List.fold_left 
-	  (fun l n -> match n with Name x -> x::l | _ -> l) [] bv 
-      in
-      if List.mem na bv then Name (next_ident_away id idl) else na
-
-let rec pp bv t =
-  match kind_of_term t with
-  | Sort (Prop Pos) -> (str "Set")
-  | Sort (Prop Null) -> (str "Prop")
-  | Sort (Type u) -> print_type u
-  | Lambda (na, t, c) ->
-      (str"[" ++ print_name na ++ str":" ++ pp bv t ++ str"]" ++ pp (na::bv) c)
-  | Prod (Anonymous, t, c) ->
-      (pp bv t ++ str"->" ++ pp (Anonymous::bv) c)
-  | Prod (na, t, c) ->
-      (str"(" ++ print_name na ++ str":" ++ pp bv t ++ str")" ++ pp (na::bv) c)
-  | Cast (c, t) ->
-      if !print_casts then 
-	(str"(" ++ pp bv c ++ str"::" ++ pp bv t ++ str")")
-      else 
-	pp bv c
-  | App(h, v) ->
-      (str"(" ++ pp bv h ++ spc () ++
-         prvect_with_sep (fun () -> (spc ())) (pp bv) v ++ str")")
-  | Const (sp, _) ->
-      (str"Const " ++ pr_id (basename sp))
-  | Ind ((sp,i), _) ->
-      (str"Ind " ++ pr_id (basename sp) ++ str" " ++ int i)
-  | Construct (((sp,i),j), _) ->
-      (str"Construct " ++ pr_id (basename sp) ++ str" " ++ int i ++ 
-	 str" " ++ int j)
-  | Var id -> pr_id id
-  | Rel n -> print_rel bv n
-  | _ -> (str"<???>")
-
-let pr_term _ ctx = pp (fold_rel_context (fun _ (n,_,_) l -> n::l) ctx [])
-
diff --git a/parsing/g_prim.ml4 b/parsing/g_prim.ml4
index c3792d65..1e738384 100644
--- a/parsing/g_prim.ml4
+++ b/parsing/g_prim.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo" i*)
 
-(*i $Id: g_prim.ml4 10155 2007-09-28 22:36:35Z glondu $ i*)
+(*i $Id: g_prim.ml4 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Pcoq
 open Names
@@ -23,6 +23,16 @@ open Nametab
 
 let local_make_qualid l id = make_qualid (make_dirpath l) id
 
+let my_int_of_string loc s =
+  try
+    let n = int_of_string s in
+    (* To avoid Array.make errors (that e.g. Undo uses), we set a *)
+    (* more restricted limit than int_of_string does *)
+    if n > 1024 * 2048 then raise Exit;
+    n
+  with Failure _ | Exit ->
+    Util.user_err_loc (loc,"",Pp.str "Cannot support a so large number.")
+
 GEXTEND Gram
   GLOBAL: 
     bigint natural integer identref name ident var preident
@@ -79,7 +89,7 @@ GEXTEND Gram
   ;
   ne_string:
     [ [ s = STRING -> 
-        if s="" then Util.user_err_loc(loc,"",Pp.str"Empty string"); s
+        if s="" then Util.user_err_loc(loc,"",Pp.str"Empty string."); s
     ] ]
   ;
   dirpath:
@@ -90,11 +100,11 @@ GEXTEND Gram
     [ [ s = STRING -> s ] ]
   ;
   integer:
-    [ [ i = INT      -> int_of_string i
-      | "-"; i = INT -> - int_of_string i ] ]
+    [ [ i = INT      -> my_int_of_string loc i
+      | "-"; i = INT -> - my_int_of_string loc i ] ]
   ;
   natural:
-    [ [ i = INT -> int_of_string i ] ]
+    [ [ i = INT -> my_int_of_string loc i ] ]
   ;
   bigint: (* Negative numbers are dealt with specially *)
     [ [ i = INT -> (Bigint.of_string i) ] ]
diff --git a/parsing/g_tactic.ml4 b/parsing/g_tactic.ml4
index c0a4ba5b..49f00d40 100644
--- a/parsing/g_tactic.ml4
+++ b/parsing/g_tactic.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo" i*)
 
-(* $Id: g_tactic.ml4 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: g_tactic.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Pcoq
@@ -26,7 +26,7 @@ let _ = List.iter (fun s -> Lexer.add_token("",s)) tactic_kw
 
 (* Hack to parse "(x:=t)" as an explicit argument without conflicts with the *)
 (* admissible notation "(x t)" *)
-let lpar_id_coloneq =
+let test_lpar_id_coloneq =
   Gram.Entry.of_parser "lpar_id_coloneq"
     (fun strm ->
       match Stream.npeek 1 strm with
@@ -34,9 +34,7 @@ let lpar_id_coloneq =
             (match Stream.npeek 2 strm with
               | [_; ("IDENT",s)] ->
                   (match Stream.npeek 3 strm with
-	            | [_; _; ("", ":=")] ->
-                        Stream.junk strm; Stream.junk strm; Stream.junk strm;
-                        Names.id_of_string s
+	            | [_; _; ("", ":=")] -> ()
 	            | _ -> raise Stream.Failure)
 	      | _ -> raise Stream.Failure)
 	| _ -> raise Stream.Failure)
@@ -56,7 +54,7 @@ let test_lpar_idnum_coloneq =
         | _ -> raise Stream.Failure)
 
 (* idem for (x:t) *)
-let lpar_id_colon =
+let test_lpar_id_colon =
   Gram.Entry.of_parser "lpar_id_colon"
     (fun strm ->
       match Stream.npeek 1 strm with
@@ -64,9 +62,7 @@ let lpar_id_colon =
             (match Stream.npeek 2 strm with
               | [_; ("IDENT",id)] ->
                   (match Stream.npeek 3 strm with
-                    | [_; _; ("", ":")] ->
-                        Stream.junk strm; Stream.junk strm; Stream.junk strm;
-                        Names.id_of_string id
+                    | [_; _; ("", ":")] -> ()
                     | _ -> raise Stream.Failure)
               | _ -> raise Stream.Failure)
         | _ -> raise Stream.Failure)
@@ -131,15 +127,15 @@ let mk_fix_tac (loc,id,bl,ann,ty) =
       | _, Some x ->
           let ids = List.map snd (List.flatten (List.map pi1 bl)) in
           (try list_index (snd x) ids
-          with Not_found -> error "no such fix variable")
-      | _ -> error "cannot guess decreasing argument of fix" in
+          with Not_found -> error "No such fix variable.")
+      | _ -> error "Cannot guess decreasing argument of fix." in
   (id,n,CProdN(loc,bl,ty))
 
 let mk_cofix_tac (loc,id,bl,ann,ty) =
   let _ = Option.map (fun (aloc,_) ->
     Util.user_err_loc
       (aloc,"Constr:mk_cofix_tac",
-       Pp.str"Annotation forbidden in cofix expression")) ann in
+       Pp.str"Annotation forbidden in cofix expression.")) ann in
   (id,CProdN(loc,bl,ty))
 
 (* Functions overloaded by quotifier *)
@@ -162,6 +158,8 @@ let mkCLambdaN_simple bl c =
     let loc = join_loc (fst (List.hd (pi1 (List.hd bl)))) (constr_loc c) in
     mkCLambdaN_simple_loc loc bl c
 
+let loc_of_ne_list l = join_loc (fst (List.hd l)) (fst (list_last l))
+
 let map_int_or_var f = function
   | Rawterm.ArgArg x -> Rawterm.ArgArg (f x)
   | Rawterm.ArgVar _ as y -> y
@@ -237,27 +235,32 @@ GEXTEND Gram
   intropatterns:
     [ [ l = LIST0 simple_intropattern -> l ]]
   ;
-  simple_intropattern:
-    [ [ "["; tc = LIST1 intropatterns SEP "|" ; "]" -> IntroOrAndPattern tc
-      | "()" -> IntroOrAndPattern [[]]
-      | "("; si = simple_intropattern; ")" -> IntroOrAndPattern [[si]]
+  disjunctive_intropattern:
+    [ [ "["; tc = LIST1 intropatterns SEP "|"; "]" -> loc,IntroOrAndPattern tc
+      | "()" -> loc,IntroOrAndPattern [[]]
+      | "("; si = simple_intropattern; ")" -> loc,IntroOrAndPattern [[si]]
       | "("; si = simple_intropattern; ","; 
              tc = LIST1 simple_intropattern SEP "," ; ")" -> 
-	       IntroOrAndPattern [si::tc]
+	       loc,IntroOrAndPattern [si::tc]
       | "("; si = simple_intropattern; "&"; 
 	     tc = LIST1 simple_intropattern SEP "&" ; ")" -> 
 	  (* (A & B & C) is translated into (A,(B,C)) *)
 	  let rec pairify = function 
 	    | ([]|[_]|[_;_]) as l -> IntroOrAndPattern [l]
-	    | t::q -> IntroOrAndPattern [[t;pairify q]]
-	  in pairify (si::tc)
-      | "_" -> IntroWildcard
-      | prefix = pattern_ident -> IntroFresh prefix
-      | "?" -> IntroAnonymous
-      | id = ident -> IntroIdentifier id
-      | "->" -> IntroRewrite true
-      | "<-" -> IntroRewrite false
-      ] ]
+	    | t::q -> IntroOrAndPattern [[t;(loc_of_ne_list q,pairify q)]]
+	  in loc,pairify (si::tc) ] ]
+  ;
+  naming_intropattern:
+    [ [ prefix = pattern_ident -> loc, IntroFresh prefix
+      | "?" -> loc, IntroAnonymous
+      | id = ident -> loc, IntroIdentifier id ] ]
+  ;
+  simple_intropattern:
+    [ [ pat = disjunctive_intropattern -> pat
+      | pat = naming_intropattern -> pat
+      | "_" -> loc, IntroWildcard
+      | "->" -> loc, IntroRewrite true
+      | "<-" -> loc, IntroRewrite false ] ]
   ;
   simple_binding:
     [ [ "("; id = ident; ":="; c = lconstr; ")" -> (loc, NamedHyp id, c)
@@ -402,7 +405,18 @@ GEXTEND Gram
     [ [ "using"; el = constr_with_bindings -> el ] ]
   ;
   with_names:
-    [ [ "as"; ipat = simple_intropattern -> ipat | -> IntroAnonymous ] ]
+    [ [ "as"; ipat = simple_intropattern -> ipat
+      | -> dummy_loc,IntroAnonymous ] ]
+  ;
+  with_inversion_names:
+    [ [ "as"; ipat = disjunctive_intropattern -> Some ipat
+      | -> None ] ]
+  ;
+  with_induction_names:
+    [ [ "as"; eq = OPT naming_intropattern; ipat = disjunctive_intropattern
+        -> (eq,Some ipat)
+      | "as"; eq = naming_intropattern -> (Some eq,None)
+      | -> (None,None) ] ]
   ;
   as_name:
     [ [ "as"; id = ident -> Names.Name id | -> Names.Anonymous ] ]
@@ -439,30 +453,40 @@ GEXTEND Gram
   oriented_rewriter : 
     [ [ b = orient; p = rewriter -> let (m,c) = p in (b,m,c) ] ]
   ; 
+  induction_clause:
+    [ [ lc = LIST1 induction_arg; ipats = with_induction_names; 
+        el = OPT eliminator; cl = opt_clause -> (lc,el,ipats,cl) ] ]
+  ;
+  move_location:
+    [ [ IDENT "after"; id = id_or_meta -> MoveAfter id
+      | IDENT "before"; id = id_or_meta -> MoveBefore id
+      | "at"; IDENT "bottom" -> MoveToEnd true
+      | "at"; IDENT "top" -> MoveToEnd false ] ]
+  ;
   simple_tactic:
     [ [ 
       (* Basic tactics *)
         IDENT "intros"; IDENT "until"; id = quantified_hypothesis -> 
 	  TacIntrosUntil id
       | IDENT "intros"; pl = intropatterns -> TacIntroPattern pl
-      | IDENT "intro"; id = ident; IDENT "after"; id2 = identref ->
-	  TacIntroMove (Some id, Some id2)
-      | IDENT "intro"; IDENT "after"; id2 = identref ->
-	  TacIntroMove (None, Some id2)
-      | IDENT "intro"; id = ident -> TacIntroMove (Some id, None)
-      | IDENT "intro" -> TacIntroMove (None, None)
+      | IDENT "intro"; id = ident; hto = move_location ->
+	  TacIntroMove (Some id, hto)
+      | IDENT "intro"; hto = move_location -> TacIntroMove (None, hto)
+      | IDENT "intro"; id = ident -> TacIntroMove (Some id, no_move)
+      | IDENT "intro" -> TacIntroMove (None, no_move)
 
       | IDENT "assumption" -> TacAssumption
       | IDENT "exact"; c = constr -> TacExact c
       | IDENT "exact_no_check"; c = constr -> TacExactNoCheck c
       | IDENT "vm_cast_no_check"; c = constr -> TacVmCastNoCheck c
 
-      | IDENT "apply"; cl = constr_with_bindings -> TacApply (true,false,cl)
-      | IDENT "eapply"; cl = constr_with_bindings -> TacApply (true,true,cl)
-      | IDENT "simple"; IDENT "apply"; cl = constr_with_bindings -> 
-          TacApply (false,false,cl)
-      | IDENT "simple"; IDENT "eapply"; cl = constr_with_bindings -> 
-          TacApply (false, true,cl)
+      | IDENT "apply"; cl = LIST1 constr_with_bindings SEP "," ->
+	  TacApply (true,false,cl)
+      | IDENT "eapply"; cl = LIST1 constr_with_bindings SEP "," ->
+          TacApply (true,true,cl)
+      | IDENT "simple"; IDENT "apply"; cl = LIST1 constr_with_bindings SEP "," 
+          -> TacApply (false,false,cl)
+      | IDENT "simple"; IDENT "eapply"; cl = LIST1 constr_with_bindings SEP ","           -> TacApply (false,true,cl)
       | IDENT "elim"; cl = constr_with_bindings; el = OPT eliminator ->
           TacElim (false,cl,el)
       | IDENT "eelim"; cl = constr_with_bindings; el = OPT eliminator ->
@@ -492,10 +516,12 @@ GEXTEND Gram
           TacLetTac (na,c,p,false)
 
       (* Begin compatibility *)
-      | IDENT "assert"; id = lpar_id_coloneq; c = lconstr; ")" -> 
-	  TacAssert (None,IntroIdentifier id,c)
-      | IDENT "assert"; id = lpar_id_colon; c = lconstr; ")"; tac=by_tactic -> 
-	  TacAssert (Some tac,IntroIdentifier id,c)
+      | IDENT "assert"; test_lpar_id_coloneq; "("; (loc,id) = identref; ":="; 
+	  c = lconstr; ")" -> 
+	  TacAssert (None,(loc,IntroIdentifier id),c)
+      | IDENT "assert"; test_lpar_id_colon; "("; (loc,id) = identref; ":"; 
+	  c = lconstr; ")"; tac=by_tactic -> 
+	  TacAssert (Some tac,(loc,IntroIdentifier id),c)
       (* End compatibility *)
 
       | IDENT "assert"; c = constr; ipat = with_names; tac = by_tactic ->
@@ -521,23 +547,19 @@ GEXTEND Gram
 
       (* Derived basic tactics *)
       | IDENT "simple"; IDENT"induction"; h = quantified_hypothesis ->
-          TacSimpleInduction h
-      | IDENT "induction"; lc = LIST1 induction_arg; ids = with_names; 
-	  el = OPT eliminator; cl = opt_clause -> 
-	    TacNewInduction (false,lc,el,ids,cl)
-      | IDENT "einduction"; lc = LIST1 induction_arg; ids = with_names; 
-	  el = OPT eliminator; cl = opt_clause ->
-	    TacNewInduction (true,lc,el,ids,cl)
+          TacSimpleInductionDestruct (true,h)
+      | IDENT "induction"; ic = induction_clause ->
+	  TacInductionDestruct (true,false,[ic])
+      | IDENT "einduction"; ic = induction_clause ->
+	  TacInductionDestruct(true,true,[ic])
       | IDENT "double"; IDENT "induction"; h1 = quantified_hypothesis;
 	  h2 = quantified_hypothesis -> TacDoubleInduction (h1,h2)
       | IDENT "simple"; IDENT "destruct"; h = quantified_hypothesis ->
-          TacSimpleDestruct h
-      | IDENT "destruct"; lc = LIST1 induction_arg; ids = with_names; 
-	  el = OPT eliminator; cl = opt_clause ->
-	    TacNewDestruct (false,lc,el,ids,cl)
-      | IDENT "edestruct"; lc = LIST1 induction_arg; ids = with_names; 
-	  el = OPT eliminator; cl = opt_clause ->
-	    TacNewDestruct (true,lc,el,ids,cl)
+          TacSimpleInductionDestruct (false,h)
+      | IDENT "destruct"; ic = induction_clause ->
+	  TacInductionDestruct(false,false,[ic])
+      | IDENT "edestruct";  ic = induction_clause ->
+	  TacInductionDestruct(false,true,[ic])
       | IDENT "decompose"; IDENT "record" ; c = constr -> TacDecomposeAnd c
       | IDENT "decompose"; IDENT "sum"; c = constr -> TacDecomposeOr c
       | IDENT "decompose"; "["; l = LIST1 smart_global; "]"; c = constr
@@ -565,8 +587,8 @@ GEXTEND Gram
       | IDENT "clear"; "-"; l = LIST1 id_or_meta -> TacClear (true, l)
       | IDENT "clear"; l = LIST0 id_or_meta -> TacClear (l=[], l)
       | IDENT "clearbody"; l = LIST1 id_or_meta -> TacClearBody l
-      | IDENT "move"; id1 = id_or_meta; IDENT "after"; id2 = id_or_meta -> 
-	  TacMove (true,id1,id2)
+      | IDENT "move"; dep = [IDENT "dependent" -> true | -> false]; 
+	  hfrom = id_or_meta; hto = move_location -> TacMove (dep,hfrom,hto)
       | IDENT "rename"; l = LIST1 rename SEP "," -> TacRename l
       | IDENT "revert"; l = LIST1 id_or_meta -> TacRevert l
 
@@ -601,16 +623,19 @@ GEXTEND Gram
 	  | IDENT "inversion" -> FullInversion
 	  | IDENT "inversion_clear" -> FullInversionClear ];
 	  hyp = quantified_hypothesis; 
-	  ids = with_names; co = OPT ["with"; c = constr -> c] ->
+	  ids = with_inversion_names; co = OPT ["with"; c = constr -> c] ->
 	    TacInversion (DepInversion (k,co,ids),hyp)
       | IDENT "simple"; IDENT "inversion";
-	  hyp = quantified_hypothesis; ids = with_names; cl = simple_clause ->
+	  hyp = quantified_hypothesis; ids = with_inversion_names;
+	  cl = simple_clause ->
 	    TacInversion (NonDepInversion (SimpleInversion, cl, ids), hyp)
       | IDENT "inversion"; 
-	  hyp = quantified_hypothesis; ids = with_names; cl = simple_clause ->
+	  hyp = quantified_hypothesis; ids = with_inversion_names;
+	  cl = simple_clause ->
 	    TacInversion (NonDepInversion (FullInversion, cl, ids), hyp)
       | IDENT "inversion_clear"; 
-	  hyp = quantified_hypothesis; ids = with_names; cl = simple_clause ->
+	  hyp = quantified_hypothesis; ids = with_inversion_names; 
+	  cl = simple_clause ->
 	    TacInversion (NonDepInversion (FullInversionClear, cl, ids), hyp)
       | IDENT "inversion"; hyp = quantified_hypothesis; 
 	  "using"; c = constr; cl = simple_clause ->
diff --git a/parsing/g_vernac.ml4 b/parsing/g_vernac.ml4
index 00469ad5..87c11164 100644
--- a/parsing/g_vernac.ml4
+++ b/parsing/g_vernac.ml4
@@ -9,7 +9,7 @@
 (*i camlp4deps: "parsing/grammar.cma" i*)
 (*i camlp4use: "pa_extend.cmo" i*)
 
-(* $Id: g_vernac.ml4 11083 2008-06-09 22:08:14Z herbelin $ *)
+(* $Id: g_vernac.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 
 open Pp
@@ -113,7 +113,7 @@ let test_plurial_form = function
 
 let no_coercion loc (c,x) =
   if c then Util.user_err_loc
-    (loc,"no_coercion",Pp.str"no coercion allowed here");
+    (loc,"no_coercion",str"No coercion allowed here.");
   x
 
 (* Gallina declarations *)
@@ -271,7 +271,7 @@ GEXTEND Gram
 		    Some (loc, id)
 		    else Util.user_err_loc
                       (loc,"Fixpoint",
-                      Pp.str "No argument named " ++ Nameops.pr_id id))
+                       str "No argument named " ++ Nameops.pr_id id ++ str"."))
               | None -> 
 		  (* If there is only one argument, it is the recursive one, 
 		     otherwise, we search the recursive index later *)
@@ -311,7 +311,7 @@ GEXTEND Gram
           LocalRawAssum(l,ty) -> (l,ty)
         | LocalRawDef _ ->
             Util.user_err_loc
-              (loc,"fix_param",Pp.str"defined binder not allowed here")) ] ]
+              (loc,"fix_param",Pp.str"defined binder not allowed here.")) ] ]
   ;
 *)
   (* ... with coercions *)
@@ -491,7 +491,7 @@ GEXTEND Gram
 	 props = typeclass_field_types ->
 	   VernacClass (qid, pars, s, (match sup with None -> [] | Some l -> l), props)
 	     
-      | IDENT "Context"; c = typeclass_context -> 
+      | IDENT "Context"; c = binders_let -> 
 	  VernacContext c
 	    
       | global = [ IDENT "Global" -> true | -> false ];
diff --git a/parsing/g_xml.ml4 b/parsing/g_xml.ml4
index 5b2d8668..72d5d275 100644
--- a/parsing/g_xml.ml4
+++ b/parsing/g_xml.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo" i*)
 
-(* $Id: g_xml.ml4 10727 2008-03-28 20:22:43Z msozeau $ *)
+(* $Id: g_xml.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -31,7 +31,7 @@ type xml = XmlTag of loc * string * attribute list * xml list
 let check_tags loc otag ctag =
   if otag <> ctag then
     user_err_loc (loc,"",str "closing xml tag " ++ str ctag ++ 
-      str "does not match open xml tag " ++ str otag)
+      str "does not match open xml tag " ++ str otag ++ str ".")
 
 let xml_eoi = (Gram.Entry.create "xml_eoi" : xml Gram.Entry.e)
 
@@ -55,11 +55,19 @@ GEXTEND Gram
   ;
 END
 
+(* Errors *)
+
+let error_expect_one_argument loc =
+  user_err_loc (loc,"",str "wrong number of arguments (expect one).")
+
+let error_expect_no_argument loc =
+  user_err_loc (loc,"",str "wrong number of arguments (expect none).")
+
 (* Interpreting attributes *)
 
 let nmtoken (loc,a) =
   try int_of_string a
-  with Failure _ -> user_err_loc (loc,"",str "nmtoken expected")
+  with Failure _ -> user_err_loc (loc,"",str "nmtoken expected.")
   
 let interp_xml_attr_qualid = function
   | "uri", s -> qualid_of_string s
@@ -94,7 +102,7 @@ let sort_of_cdata (loc,a) = match a with
   | "Prop" -> RProp Null
   | "Set" -> RProp Pos
   | "Type" -> RType None
-  | _ -> user_err_loc (loc,"",str "sort expected")
+  | _ -> user_err_loc (loc,"",str "sort expected.")
 
 let get_xml_sort al = sort_of_cdata (get_xml_attr "value" al)
 
@@ -188,18 +196,18 @@ let rec interp_xml_constr = function
       RCast (loc, interp_xml_term x1, CastConv (DEFAULTcast, interp_xml_type x2))
   | XmlTag (loc,"SORT",al,[]) ->
       RSort (loc, get_xml_sort al)
-  | XmlTag (loc,s,_,_) -> user_err_loc (loc,"", str "Unexpected tag " ++ str s)
+  | XmlTag (loc,s,_,_) ->
+      user_err_loc (loc,"", str "Unexpected tag " ++ str s ++ str ".")
 
 and interp_xml_tag s = function
   | XmlTag (loc,tag,al,xl) when tag=s -> (loc,al,xl)
   | XmlTag (loc,tag,_,_) -> user_err_loc (loc, "", 
-    str "Expect tag " ++ str s ++ str " but find " ++ str s)
+    str "Expect tag " ++ str s ++ str " but find " ++ str s ++ str ".")
 
 and interp_xml_constr_alias s x =
   match interp_xml_tag s x with
     | (_,_,[x]) -> interp_xml_constr x
-    | (loc,_,_) -> 
-        user_err_loc (loc,"",str "wrong number of arguments (expect one)")
+    | (loc,_,_) -> error_expect_one_argument loc
 
 and interp_xml_term x = interp_xml_constr_alias "term" x
 and interp_xml_type x = interp_xml_constr_alias "type" x
@@ -215,8 +223,7 @@ and interp_xml_substitution x = interp_xml_constr_alias "substitution" x
 and interp_xml_decl_alias s x =
   match interp_xml_tag s x with
     | (_,al,[x]) -> (get_xml_binder al, interp_xml_constr x)
-    | (loc,_,_) -> 
-        user_err_loc (loc,"",str "wrong number of arguments (expect one)")
+    | (loc,_,_) -> error_expect_one_argument loc
 
 and interp_xml_def x = interp_xml_decl_alias "def" x
 and interp_xml_decl x = interp_xml_decl_alias "decl" x
@@ -227,17 +234,17 @@ and interp_xml_recursionOrder x =
     match s with
 	"Structural" -> 
 	  (match l with [] -> RStructRec
-	     | _ -> user_err_loc (loc, "", str "wrong number of arguments (expected none)"))
+	     | _ -> error_expect_no_argument loc)
       | "WellFounded" -> 
 	  (match l with
 	       [c] -> RWfRec (interp_xml_type c)
-	     | _ -> user_err_loc (loc, "", str "wrong number of arguments (expected one)"))
+	     | _ -> error_expect_one_argument loc)
       | "Measure" -> 
 	  (match l with
 	       [c] -> RMeasureRec (interp_xml_type c)
-	     | _ -> user_err_loc (loc, "", str "wrong number of arguments (expected one)"))
+	     | _ -> error_expect_one_argument loc)
       | _ ->
-          user_err_loc (locs,"",str "invalid recursion order")
+          user_err_loc (locs,"",str "Invalid recursion order.")
 
 and interp_xml_FixFunction x =
   match interp_xml_tag "FixFunction" x with
@@ -248,15 +255,15 @@ and interp_xml_FixFunction x =
   | (loc,al,[x1;x2]) ->
       ((Some (nmtoken (get_xml_attr "recIndex" al)), RStructRec),
        (get_xml_name al, interp_xml_type x1, interp_xml_body x2))
-  | (loc,_,_) -> 
-        user_err_loc (loc,"",str "wrong number of arguments (expect one)")
+  | (loc,_,_) ->
+      error_expect_one_argument loc
 
 and interp_xml_CoFixFunction x =
   match interp_xml_tag "CoFixFunction" x with
   | (loc,al,[x1;x2]) ->
       (get_xml_name al, interp_xml_type x1, interp_xml_body x2)
     | (loc,_,_) -> 
-        user_err_loc (loc,"",str "wrong number of arguments (expect one)")
+	error_expect_one_argument loc
 
 (* Interpreting tactic argument *)
 
@@ -266,7 +273,8 @@ let rec interp_xml_tactic_arg = function
   | XmlTag (loc,"CALL",al,xl) ->
       let ltacref = ltacref_of_cdata (get_xml_attr "uri" al) in
       TacCall(loc,ArgArg ltacref,List.map interp_xml_tactic_arg xl)
-  | XmlTag (loc,s,_,_) -> user_err_loc (loc,"", str "Unexpected tag " ++ str s)
+  | XmlTag (loc,s,_,_) ->
+      user_err_loc (loc,"", str "Unexpected tag " ++ str s ++ str ".")
 
 let parse_tactic_arg ch =
   interp_xml_tactic_arg
diff --git a/parsing/g_zsyntax.ml b/parsing/g_zsyntax.ml
index aab266c0..8b9c0d22 100644
--- a/parsing/g_zsyntax.ml
+++ b/parsing/g_zsyntax.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: g_zsyntax.ml 10806 2008-04-16 23:51:06Z letouzey $ *)
+(* $Id: g_zsyntax.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pcoq
 open Pp
@@ -57,7 +57,7 @@ let pos_of_bignat dloc x =
 
 let error_non_positive dloc = 
   user_err_loc (dloc, "interp_positive",
-    str "Only strictly positive numbers in type \"positive\"")
+    str "Only strictly positive numbers in type \"positive\".")
 
 let interp_positive dloc n =
   if is_strictly_pos n then pos_of_bignat dloc n
@@ -113,7 +113,7 @@ let n_of_binnat dloc pos_or_neg n =
     RRef (dloc, glob_N0)
 
 let error_negative dloc =
-  user_err_loc (dloc, "interp_N", str "No negative numbers in type \"N\"")
+  user_err_loc (dloc, "interp_N", str "No negative numbers in type \"N\".")
 
 let n_of_int dloc n =
   if is_pos_or_zero n then n_of_binnat dloc true n
diff --git a/parsing/lexer.ml4 b/parsing/lexer.ml4
index c1e4cfc6..1b0c24da 100644
--- a/parsing/lexer.ml4
+++ b/parsing/lexer.ml4
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: lexer.ml4 11059 2008-06-06 09:29:20Z herbelin $ i*)
+(*i $Id: lexer.ml4 11238 2008-07-19 09:34:03Z herbelin $ i*)
 
 
 (*i camlp4use: "pr_o.cmo" i*) 
@@ -324,43 +324,49 @@ let rec comment bp = parser bp2
 (* Parse a special token, using the [token_tree] *)
 
 (* Peek as much utf-8 lexemes as possible *)
-(* then look if a special token is obtained *)
-let rec special tt cs =
-  match Stream.peek cs with
-    | Some c -> progress_from_byte 0 tt cs c
-    | None -> tt.node
-
-  (* nr is the number of char peeked; n the number of char in utf8 block *)
-and progress_utf8 nr n c tt cs =
+(* and retain the longest valid special token obtained *)
+let rec progress_further last nj tt cs =
+  try progress_from_byte last nj tt cs (List.nth (Stream.npeek (nj+1) cs) nj)
+  with Failure _ -> last
+
+and update_longest_valid_token last nj tt cs =
+  match tt.node with
+  | Some _ as last' ->
+      for i=1 to nj do Stream.junk cs done; 
+      progress_further last' 0 tt cs
+  | None ->
+      progress_further last nj tt cs
+
+(* nr is the number of char peeked since last valid token *)
+(* n the number of char in utf8 block *)
+and progress_utf8 last nj n c tt cs =
   try
     let tt = CharMap.find c tt.branch in
-    let tt =
-      if n=1 then tt else
-	match Stream.npeek (n-nr) cs with
-	| l when List.length l = n-nr ->
-	    let l = Util.list_skipn (1-nr) l in
-	    List.iter (check_utf8_trailing_byte cs) l;
-	    List.fold_left (fun tt c -> CharMap.find c tt.branch) tt l
-	| _ -> 
-	    error_utf8 cs
-    in
-    for i=1 to n-nr do Stream.junk cs done;
-    special tt cs
+    if n=1 then
+      update_longest_valid_token last (nj+n) tt cs
+    else
+      match Util.list_skipn (nj+1) (Stream.npeek (nj+n) cs) with
+      | l when List.length l = n-1 ->
+	 List.iter (check_utf8_trailing_byte cs) l;
+	 let tt = List.fold_left (fun tt c -> CharMap.find c tt.branch) tt l in
+	 update_longest_valid_token last (nj+n) tt cs
+      | _ -> 
+	  error_utf8 cs
   with Not_found ->
-    tt.node
+    last
 
-and progress_from_byte nr tt cs = function
+and progress_from_byte last nj tt cs = function
   (* Utf8 leading byte *)
-  | '\x00'..'\x7F' as c -> progress_utf8 nr 1 c tt cs
-  | '\xC0'..'\xDF' as c -> progress_utf8 nr 2 c tt cs
-  | '\xE0'..'\xEF' as c -> progress_utf8 nr 3 c tt cs
-  | '\xF0'..'\xF7' as c -> progress_utf8 nr 4 c tt cs
+  | '\x00'..'\x7F' as c -> progress_utf8 last nj 1 c tt cs
+  | '\xC0'..'\xDF' as c -> progress_utf8 last nj 2 c tt cs
+  | '\xE0'..'\xEF' as c -> progress_utf8 last nj 3 c tt cs
+  | '\xF0'..'\xF7' as c -> progress_utf8 last nj 4 c tt cs
   | _ (* '\x80'..\xBF'|'\xF8'..'\xFF' *) ->
       error_utf8 cs
 
 (* Must be a special token *)
 let process_chars bp c cs =
-  let t = progress_from_byte 1 !token_tree cs c in
+  let t = progress_from_byte None (-1) !token_tree cs c in
   let ep = Stream.count cs in
   match t with
     | Some t -> (("", t), (bp, ep))
diff --git a/parsing/pcoq.ml4 b/parsing/pcoq.ml4
index 70a41ddc..2e55b656 100644
--- a/parsing/pcoq.ml4
+++ b/parsing/pcoq.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo pa_macro.cmo" i*)
 
-(*i $Id: pcoq.ml4 10987 2008-05-26 12:28:36Z herbelin $ i*)
+(*i $Id: pcoq.ml4 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Pp
 open Util
@@ -247,7 +247,7 @@ let get_entry (u, utab) s =
     Hashtbl.find utab s 
   with Not_found -> 
     errorlabstrm "Pcoq.get_entry"
-      (str "unknown grammar entry " ++ str u ++ str ":" ++ str s)
+      (str "Unknown grammar entry " ++ str u ++ str ":" ++ str s ++ str ".")
 
 let new_entry etyp (u, utab) s =
   let ename = u ^ ":" ^ s in
@@ -307,12 +307,12 @@ let get_generic_entry s =
   try
     object_of_typed_entry (Hashtbl.find utab s)
   with Not_found -> 
-    error ("unknown grammar entry "^u^":"^s)
+    error ("Unknown grammar entry "^u^":"^s^".")
 
 let get_generic_entry_type (u,utab) s =
   try type_of_typed_entry (Hashtbl.find utab s)
   with Not_found -> 
-    error ("unknown grammar entry "^u^":"^s)
+    error ("Unknown grammar entry "^u^":"^s^".")
 
 let force_entry_type (u, utab) s etyp =
   try
@@ -578,7 +578,7 @@ let error_level_assoc p current expected =
   errorlabstrm ""
     (str "Level " ++ int p ++ str " is already declared " ++
      pr_assoc current ++ str " associative while it is now expected to be " ++
-     pr_assoc expected ++ str " associative")
+     pr_assoc expected ++ str " associative.")
 
 let find_position_gen forpat ensure assoc lev =
   let ccurrent,pcurrent as current = List.hd !level_stack in
@@ -628,13 +628,13 @@ let rec list_mem_assoc_triple x = function
   | [] -> false
   | (a,b,c) :: l -> a = x or list_mem_assoc_triple x l
 
-let register_empty_levels forpat symbs =
-  map_succeed (function
-    | Gramext.Snterml (_,n) when
-	let levels = (if forpat then snd else fst) (List.hd !level_stack) in
-	not (list_mem_assoc_triple (int_of_string n) levels) ->
-	find_position_gen forpat true None (Some (int_of_string n))
-    | _ -> failwith "") symbs
+let register_empty_levels forpat levels =
+  map_succeed (fun n ->
+    let levels = (if forpat then snd else fst) (List.hd !level_stack) in
+    if not (list_mem_assoc_triple n levels) then
+      find_position_gen forpat true None (Some n)
+    else
+      failwith "") levels
 
 let find_position forpat assoc level =
   find_position_gen forpat false assoc level
@@ -695,7 +695,7 @@ let compute_entry allow_create adjust forpat = function
   | ETPattern -> weaken_entry Constr.pattern, None, false
   | ETOther ("constr","annot") -> 
       weaken_entry Constr.annot, None, false
-  | ETConstrList _ -> error "List of entries cannot be registered"
+  | ETConstrList _ -> error "List of entries cannot be registered."
   | ETOther (u,n) ->
       let u = get_univ u in
       let e =
@@ -762,6 +762,6 @@ let coerce_reference_to_id = function
   | Ident (_,id) -> id
   | Qualid (loc,_) ->
       user_err_loc (loc, "coerce_reference_to_id",
-        str "This expression should be a simple identifier")
+        str "This expression should be a simple identifier.")
 
 let coerce_global_to_id = coerce_reference_to_id
diff --git a/parsing/pcoq.mli b/parsing/pcoq.mli
index 44a3686e..525727ce 100644
--- a/parsing/pcoq.mli
+++ b/parsing/pcoq.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: pcoq.mli 10987 2008-05-26 12:28:36Z herbelin $ i*)
+(*i $Id: pcoq.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Util
 open Names
@@ -188,7 +188,7 @@ module Tactic :
     val int_or_var : int or_var Gram.Entry.e
     val red_expr : raw_red_expr Gram.Entry.e
     val simple_tactic : raw_atomic_tactic_expr Gram.Entry.e
-    val simple_intropattern : Genarg.intro_pattern_expr Gram.Entry.e
+    val simple_intropattern : Genarg.intro_pattern_expr located Gram.Entry.e
     val tactic_arg : raw_tactic_arg Gram.Entry.e
     val tactic_expr : raw_tactic_expr Gram.Entry.e
     val binder_tactic : raw_tactic_expr Gram.Entry.e
@@ -229,7 +229,7 @@ val find_position :
 
 val synchronize_level_positions : unit -> unit
 
-val register_empty_levels : bool -> Compat.token Gramext.g_symbol list ->
+val register_empty_levels : bool -> int list ->
     (Gramext.position option * Gramext.g_assoc option *
      string option * Gramext.g_assoc option) list
 
diff --git a/parsing/ppconstr.ml b/parsing/ppconstr.ml
index 985396f5..5f6ffe87 100644
--- a/parsing/ppconstr.ml
+++ b/parsing/ppconstr.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: ppconstr.ml 11094 2008-06-10 19:35:23Z herbelin $ *)      
+(* $Id: ppconstr.ml 11309 2008-08-06 10:30:35Z herbelin $ *)      
 
 (*i*)
 open Util
@@ -96,12 +96,6 @@ let pr_patnotation = pr_notation_gen decode_patlist_value
 let pr_delimiters key strm =
   strm ++ str ("%"^key)
 
-let pr_located pr (loc,x) =
-  if Flags.do_translate() && loc<>dummy_loc then
-    let (b,e) = unloc loc in
-    comment b ++ pr x ++ comment e
-  else pr x
-
 let pr_com_at n =
   if Flags.do_translate() && n <> 0 then comment n 
   else mt()
@@ -219,13 +213,13 @@ let surround_binder k p =
   match k with
       Default Explicit -> hov 1 (str"(" ++ p ++ str")")
     | Default Implicit -> hov 1 (str"{" ++ p ++ str"}")
-    | TypeClass b -> hov 1 (str"[" ++ p ++ str"]")
+    | TypeClass _ -> hov 1 (str"[" ++ p ++ str"]")
 
 let surround_implicit k p =
   match k with
       Default Explicit -> p
     | Default Implicit -> (str"{" ++ p ++ str"}")
-    | TypeClass b -> (str"[" ++ p ++ str"]")
+    | TypeClass _ -> (str"[" ++ p ++ str"]")
 
 let pr_binder many pr (nal,k,t) =
   match t with
@@ -719,7 +713,7 @@ let pr_red_expr (pr_constr,pr_lconstr,pr_ref) = function
       hov 1 (str "pattern" ++
         pr_arg (prlist_with_sep pr_coma (pr_with_occurrences pr_constr)) l)
         
-  | Red true -> error "Shouldn't be accessible from user"
+  | Red true -> error "Shouldn't be accessible from user."
   | ExtraRedExpr s -> str s
   | CbvVm -> str "vm_compute"
 
diff --git a/parsing/ppconstr.mli b/parsing/ppconstr.mli
index a0eb4ad9..8047e968 100644
--- a/parsing/ppconstr.mli
+++ b/parsing/ppconstr.mli
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
  
-(*i $Id: ppconstr.mli 11094 2008-06-10 19:35:23Z herbelin $ i*)
+(*i $Id: ppconstr.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Pp
 open Environ
@@ -35,7 +35,6 @@ val prec_less : int -> int * Ppextend.parenRelation -> bool
  
 val pr_tight_coma : unit -> std_ppcmds
 
-val pr_located : ('a -> std_ppcmds) -> 'a located -> std_ppcmds
 val pr_or_var : ('a -> std_ppcmds) -> 'a or_var -> std_ppcmds
 val pr_metaid : identifier -> std_ppcmds
 
diff --git a/parsing/pptactic.ml b/parsing/pptactic.ml
index f955d83b..6a7ae9bc 100644
--- a/parsing/pptactic.ml
+++ b/parsing/pptactic.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: pptactic.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: pptactic.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Names
@@ -58,7 +58,7 @@ let declare_extra_genarg_pprule (rawwit, f) (globwit, g) (wit, h) =
   let s = match unquote wit with
     | ExtraArgType s -> s 
     | _ -> error
-	"Can declare a pretty-printing rule only for extra argument types"
+	"Can declare a pretty-printing rule only for extra argument types."
   in
   let f prc prlc prtac x = f prc prlc prtac (out_gen rawwit x) in
   let g prc prlc prtac x = g prc prlc prtac (out_gen globwit x) in
@@ -142,41 +142,40 @@ let out_bindings = function
 
 let rec pr_raw_generic prc prlc prtac prref (x:Genarg.rlevel Genarg.generic_argument) =
   match Genarg.genarg_tag x with
-  | BoolArgType -> pr_arg str (if out_gen rawwit_bool x then "true" else "false")
-  | IntArgType -> pr_arg int (out_gen rawwit_int x)
-  | IntOrVarArgType -> pr_arg (pr_or_var pr_int) (out_gen rawwit_int_or_var x)
-  | StringArgType -> spc () ++ str "\"" ++ str (out_gen rawwit_string x) ++ str "\""
-  | PreIdentArgType -> pr_arg str (out_gen rawwit_pre_ident x)
-  | IntroPatternArgType -> pr_arg pr_intro_pattern 
-      (out_gen rawwit_intro_pattern x)
-  | IdentArgType -> pr_arg pr_id (out_gen rawwit_ident x)
-  | VarArgType -> pr_arg (pr_located pr_id) (out_gen rawwit_var x)
-  | RefArgType -> pr_arg prref (out_gen rawwit_ref x)
-  | SortArgType -> pr_arg pr_rawsort (out_gen rawwit_sort x)
-  | ConstrArgType -> pr_arg prc (out_gen rawwit_constr x)
+  | BoolArgType -> str (if out_gen rawwit_bool x then "true" else "false")
+  | IntArgType -> int (out_gen rawwit_int x)
+  | IntOrVarArgType -> pr_or_var pr_int (out_gen rawwit_int_or_var x)
+  | StringArgType -> str "\"" ++ str (out_gen rawwit_string x) ++ str "\""
+  | PreIdentArgType -> str (out_gen rawwit_pre_ident x)
+  | IntroPatternArgType -> pr_intro_pattern (out_gen rawwit_intro_pattern x)
+  | IdentArgType -> pr_id (out_gen rawwit_ident x)
+  | VarArgType -> pr_located pr_id (out_gen rawwit_var x)
+  | RefArgType -> prref (out_gen rawwit_ref x)
+  | SortArgType -> pr_rawsort (out_gen rawwit_sort x)
+  | ConstrArgType -> prc (out_gen rawwit_constr x)
   | ConstrMayEvalArgType ->
-      pr_arg (pr_may_eval prc prlc (pr_or_by_notation prref))
+      pr_may_eval prc prlc (pr_or_by_notation prref)
         (out_gen rawwit_constr_may_eval x)
-  | QuantHypArgType ->
-      pr_arg pr_quantified_hypothesis (out_gen rawwit_quant_hyp x)
+  | QuantHypArgType -> pr_quantified_hypothesis (out_gen rawwit_quant_hyp x)
   | RedExprArgType ->
-      pr_arg (pr_red_expr (prc,prlc,pr_or_by_notation prref))
+      pr_red_expr (prc,prlc,pr_or_by_notation prref)
         (out_gen rawwit_red_expr x)
-  | OpenConstrArgType b -> pr_arg prc (snd (out_gen (rawwit_open_constr_gen b) x))
+  | OpenConstrArgType b -> prc (snd (out_gen (rawwit_open_constr_gen b) x))
   | ConstrWithBindingsArgType -> 
-      pr_arg (pr_with_bindings prc prlc) (out_gen rawwit_constr_with_bindings x)
+      pr_with_bindings prc prlc (out_gen rawwit_constr_with_bindings x)
   | BindingsArgType -> 
-      pr_arg (pr_bindings_no_with prc prlc) (out_gen rawwit_bindings x)
+      pr_bindings_no_with prc prlc (out_gen rawwit_bindings x)
   | List0ArgType _ -> 
-      hov 0 (fold_list0 (fun x a -> pr_raw_generic prc prlc prtac prref x ++ a) x (mt()))
+      hov 0 (pr_sequence (pr_raw_generic prc prlc prtac prref)
+	(fold_list0 (fun a l -> a::l) x []))
   | List1ArgType _ ->
-      hov 0 (fold_list1 (fun x a -> pr_raw_generic prc prlc prtac prref x ++ a) x (mt()))
+      hov 0 (pr_sequence (pr_raw_generic prc prlc prtac prref)
+	(fold_list1 (fun a l -> a::l) x []))
   | OptArgType _ -> hov 0 (fold_opt (pr_raw_generic prc prlc prtac prref) (mt()) x)
   | PairArgType _ ->
       hov 0
         (fold_pair
-	  (fun a b -> pr_raw_generic prc prlc prtac prref a ++ spc () ++ 
-            pr_raw_generic prc prlc prtac prref b)
+	  (fun a b -> pr_sequence (pr_raw_generic prc prlc prtac prref) [a;b])
 	  x)
   | ExtraArgType s -> 
       try pi1 (Stringmap.find s !genarg_pprule) prc prlc prtac x
@@ -185,107 +184,105 @@ let rec pr_raw_generic prc prlc prtac prref (x:Genarg.rlevel Genarg.generic_argu
 
 let rec pr_glob_generic prc prlc prtac x =
   match Genarg.genarg_tag x with
-  | BoolArgType -> pr_arg str (if out_gen globwit_bool x then "true" else "false")
-  | IntArgType -> pr_arg int (out_gen globwit_int x)
-  | IntOrVarArgType -> pr_arg (pr_or_var pr_int) (out_gen globwit_int_or_var x)
-  | StringArgType -> spc () ++ str "\"" ++ str (out_gen globwit_string x) ++ str "\""
-  | PreIdentArgType -> pr_arg str (out_gen globwit_pre_ident x)
-  | IntroPatternArgType ->
-      pr_arg pr_intro_pattern (out_gen globwit_intro_pattern x)
-  | IdentArgType -> pr_arg pr_id (out_gen globwit_ident x)
-  | VarArgType -> pr_arg (pr_located pr_id) (out_gen globwit_var x)
-  | RefArgType -> pr_arg (pr_or_var (pr_located pr_global)) (out_gen globwit_ref x)
-  | SortArgType -> pr_arg pr_rawsort (out_gen globwit_sort x)
-  | ConstrArgType -> pr_arg prc (out_gen globwit_constr x)
+  | BoolArgType -> str (if out_gen globwit_bool x then "true" else "false")
+  | IntArgType -> int (out_gen globwit_int x)
+  | IntOrVarArgType -> pr_or_var pr_int (out_gen globwit_int_or_var x)
+  | StringArgType -> str "\"" ++ str (out_gen globwit_string x) ++ str "\""
+  | PreIdentArgType -> str (out_gen globwit_pre_ident x)
+  | IntroPatternArgType -> pr_intro_pattern (out_gen globwit_intro_pattern x)
+  | IdentArgType -> pr_id (out_gen globwit_ident x)
+  | VarArgType -> pr_located pr_id (out_gen globwit_var x)
+  | RefArgType -> pr_or_var (pr_located pr_global) (out_gen globwit_ref x)
+  | SortArgType -> pr_rawsort (out_gen globwit_sort x)
+  | ConstrArgType -> prc (out_gen globwit_constr x)
   | ConstrMayEvalArgType ->
-      pr_arg (pr_may_eval prc prlc
-        (pr_or_var (pr_and_short_name pr_evaluable_reference)))
+      pr_may_eval prc prlc
+        (pr_or_var (pr_and_short_name pr_evaluable_reference))
         (out_gen globwit_constr_may_eval x)
   | QuantHypArgType ->
-      pr_arg pr_quantified_hypothesis (out_gen globwit_quant_hyp x)
+      pr_quantified_hypothesis (out_gen globwit_quant_hyp x)
   | RedExprArgType ->
-      pr_arg (pr_red_expr 
-        (prc,prlc,pr_or_var (pr_and_short_name pr_evaluable_reference)))
+      pr_red_expr 
+        (prc,prlc,pr_or_var (pr_and_short_name pr_evaluable_reference))
         (out_gen globwit_red_expr x)
-  | OpenConstrArgType b -> pr_arg prc (snd (out_gen (globwit_open_constr_gen b) x))
+  | OpenConstrArgType b -> prc (snd (out_gen (globwit_open_constr_gen b) x))
   | ConstrWithBindingsArgType -> 
-      pr_arg (pr_with_bindings prc prlc) (out_gen globwit_constr_with_bindings x)
+      pr_with_bindings prc prlc (out_gen globwit_constr_with_bindings x)
   | BindingsArgType -> 
-      pr_arg (pr_bindings_no_with prc prlc) (out_gen globwit_bindings x)
+      pr_bindings_no_with prc prlc (out_gen globwit_bindings x)
   | List0ArgType _ -> 
-      hov 0 (fold_list0 (fun x a -> pr_glob_generic prc prlc prtac x ++ a) x (mt()))
+      hov 0 (pr_sequence (pr_glob_generic prc prlc prtac)
+	(fold_list0 (fun a l -> a::l) x []))
   | List1ArgType _ ->
-      hov 0 (fold_list1 (fun x a -> pr_glob_generic prc prlc prtac x ++ a) x (mt()))
+      hov 0 (pr_sequence (pr_glob_generic prc prlc prtac)
+	(fold_list1 (fun a l -> a::l) x []))
   | OptArgType _ -> hov 0 (fold_opt (pr_glob_generic prc prlc prtac) (mt()) x)
   | PairArgType _ ->
       hov 0
         (fold_pair
-	  (fun a b -> pr_glob_generic prc prlc prtac a ++ spc () ++ 
-            pr_glob_generic prc prlc prtac b)
+	  (fun a b -> pr_sequence (pr_glob_generic prc prlc prtac) [a;b])
 	  x)
   | ExtraArgType s -> 
       try pi2 (Stringmap.find s !genarg_pprule) prc prlc prtac x
-      with Not_found -> str " [no printer for " ++ str s ++ str "] "
+      with Not_found -> str "[no printer for " ++ str s ++ str "] "
 
 open Closure
 
 let rec pr_generic prc prlc prtac x =
   match Genarg.genarg_tag x with
-  | BoolArgType -> pr_arg str (if out_gen wit_bool x then "true" else "false")
-  | IntArgType -> pr_arg int (out_gen wit_int x)
-  | IntOrVarArgType -> pr_arg (pr_or_var pr_int) (out_gen wit_int_or_var x)
-  | StringArgType -> spc () ++ str "\"" ++ str (out_gen wit_string x) ++ str "\""
-  | PreIdentArgType -> pr_arg str (out_gen wit_pre_ident x)
-  | IntroPatternArgType -> 
-      pr_arg pr_intro_pattern (out_gen wit_intro_pattern x)
-  | IdentArgType -> pr_arg pr_id (out_gen wit_ident x)
-  | VarArgType -> pr_arg pr_id (out_gen wit_var x)
-  | RefArgType -> pr_arg pr_global (out_gen wit_ref x)
-  | SortArgType -> pr_arg pr_sort (out_gen wit_sort x)
-  | ConstrArgType -> pr_arg prc (out_gen wit_constr x)
-  | ConstrMayEvalArgType ->
-      pr_arg prc (out_gen wit_constr_may_eval x)
-  | QuantHypArgType ->
-      pr_arg pr_quantified_hypothesis (out_gen wit_quant_hyp x)
+  | BoolArgType -> str (if out_gen wit_bool x then "true" else "false")
+  | IntArgType -> int (out_gen wit_int x)
+  | IntOrVarArgType -> pr_or_var pr_int (out_gen wit_int_or_var x)
+  | StringArgType -> str "\"" ++ str (out_gen wit_string x) ++ str "\""
+  | PreIdentArgType -> str (out_gen wit_pre_ident x)
+  | IntroPatternArgType -> pr_intro_pattern (out_gen wit_intro_pattern x)
+  | IdentArgType -> pr_id (out_gen wit_ident x)
+  | VarArgType -> pr_id (out_gen wit_var x)
+  | RefArgType -> pr_global (out_gen wit_ref x)
+  | SortArgType -> pr_sort (out_gen wit_sort x)
+  | ConstrArgType -> prc (out_gen wit_constr x)
+  | ConstrMayEvalArgType -> prc (out_gen wit_constr_may_eval x)
+  | QuantHypArgType -> pr_quantified_hypothesis (out_gen wit_quant_hyp x)
   | RedExprArgType ->
-      pr_arg (pr_red_expr (prc,prlc,pr_evaluable_reference)) 
-        (out_gen wit_red_expr x)
-  | OpenConstrArgType b -> pr_arg prc (snd (out_gen (wit_open_constr_gen b) x))
+      pr_red_expr (prc,prlc,pr_evaluable_reference) (out_gen wit_red_expr x)
+  | OpenConstrArgType b -> prc (snd (out_gen (wit_open_constr_gen b) x))
   | ConstrWithBindingsArgType ->
       let (c,b) = out_gen wit_constr_with_bindings x in
-      pr_arg (pr_with_bindings prc prlc) (c,out_bindings b)
+      pr_with_bindings prc prlc (c,out_bindings b)
   | BindingsArgType -> 
-      pr_arg (pr_bindings_no_with prc prlc)
-        (out_bindings (out_gen wit_bindings x))
-  | List0ArgType _ -> 
-      hov 0 (fold_list0 (fun x a -> pr_generic prc prlc prtac x ++ a) x (mt()))
+      pr_bindings_no_with prc prlc (out_bindings (out_gen wit_bindings x))
+  | List0ArgType _ ->
+      hov 0 (pr_sequence (pr_generic prc prlc prtac)
+	(fold_list0 (fun a l -> a::l) x []))
   | List1ArgType _ ->
-      hov 0 (fold_list1 (fun x a -> pr_generic prc prlc prtac x ++ a) x (mt()))
+      hov 0 (pr_sequence (pr_generic prc prlc prtac)
+	(fold_list1 (fun a l -> a::l) x []))
   | OptArgType _ -> hov 0 (fold_opt (pr_generic prc prlc prtac) (mt()) x)
   | PairArgType _ ->
       hov 0
-        (fold_pair
-	  (fun a b -> pr_generic prc prlc prtac a ++ spc () ++ 
-            pr_generic prc prlc prtac b)
+        (fold_pair (fun a b -> pr_sequence (pr_generic prc prlc prtac) [a;b])
 	  x)
   | ExtraArgType s -> 
       try pi3 (Stringmap.find s !genarg_pprule) prc prlc prtac x
-      with Not_found -> str " [no printer for " ++ str s ++ str "]"
+      with Not_found -> str "[no printer for " ++ str s ++ str "]"
 
-let rec pr_tacarg_using_rule pr_gen = function
-  | Some s :: l, al -> spc () ++ str s ++ pr_tacarg_using_rule pr_gen (l,al)
-  | None :: l, a :: al -> pr_gen a ++ pr_tacarg_using_rule  pr_gen (l,al)
-  | [], [] -> mt ()
+let rec tacarg_using_rule_token pr_gen = function
+  | Some s :: l, al -> str s :: tacarg_using_rule_token pr_gen (l,al)
+  | None :: l, a :: al -> pr_gen a :: tacarg_using_rule_token pr_gen (l,al)
+  | [], [] -> []
   | _ -> failwith "Inconsistent arguments of extended tactic"
 
-let pr_extend_gen prgen lev s l =
+let pr_tacarg_using_rule pr_gen l=
+  pr_sequence (fun x -> x) (tacarg_using_rule_token pr_gen l)
+
+let pr_extend_gen pr_gen lev s l =
   try 
     let tags = List.map genarg_tag l in
     let (lev',pl) = Hashtbl.find prtac_tab (s,tags) in
-    let p = pr_tacarg_using_rule prgen (pl,l) in
+    let p = pr_tacarg_using_rule pr_gen (pl,l) in
     if lev' > lev then surround p else p
   with Not_found ->
-    str s ++ prlist prgen l ++ str " (* Generic printer *)"
+    str s ++ spc() ++ pr_sequence pr_gen l ++ str" (* Generic printer *)"
 
 let pr_raw_extend prc prlc prtac = 
   pr_extend_gen (pr_raw_generic prc prlc prtac pr_reference)
@@ -366,9 +363,22 @@ let pr_with_constr prc = function
   | None -> mt ()
   | Some c -> spc () ++ hov 1 (str "with" ++ spc () ++ prc c)
 
+let pr_with_induction_names = function
+  | None, None -> mt ()
+  | eqpat, ipat ->
+      spc () ++ hov 1 (str "as" ++ pr_opt pr_intro_pattern eqpat ++ 
+                       pr_opt pr_intro_pattern ipat)
+
+let pr_as_intro_pattern ipat =
+  spc () ++ hov 1 (str "as" ++ spc () ++ pr_intro_pattern ipat)
+
+let pr_with_inversion_names = function
+  | None -> mt ()
+  | Some ipat -> pr_as_intro_pattern ipat
+
 let pr_with_names = function
-  | IntroAnonymous -> mt ()
-  | ipat -> spc () ++ hov 1 (str "as" ++ spc () ++ pr_intro_pattern ipat)
+  | _,IntroAnonymous -> mt ()
+  | ipat -> pr_as_intro_pattern ipat
 
 let pr_as_name = function
   | Anonymous -> mt ()
@@ -454,7 +464,7 @@ let pr_induction_kind = function
   | FullInversion -> str "inversion"
   | FullInversionClear -> str "inversion_clear"
 
-let pr_lazy lz = if lz then str "lazy " else mt ()
+let pr_lazy lz = if lz then str "lazy" else mt ()
 
 let pr_match_pattern pr_pat = function
   | Term a -> pr_pat a
@@ -489,8 +499,9 @@ let pr_funvar = function
   | None -> spc () ++ str "_"
   | Some id -> spc () ++ pr_id id
 
-let pr_let_clause k pr (id,t) =
-  hov 0 (str k ++ pr_lident id ++ str " :=" ++ brk (1,1) ++ pr (TacArg t))
+let pr_let_clause k pr (id,(bl,t)) =
+  hov 0 (str k ++ pr_lident id ++ prlist pr_funvar bl ++ 
+         str " :=" ++ brk (1,1) ++ pr (TacArg t))
 
 let pr_let_clauses recflag pr = function
   | hd::tl ->
@@ -599,6 +610,10 @@ let pr_intarg n = spc () ++ int n in
 (* Some printing combinators *)
 let pr_eliminator cb = str "using" ++ pr_arg pr_with_bindings cb in
 
+let extract_binders = function
+  | Tacexp (TacFun (lvar,body)) -> (lvar,Tacexp body)
+  | body -> ([],body) in
+
 let pr_binder_fix (nal,t) =
 (*  match t with
   | CHole _ -> spc() ++ prlist_with_sep spc (pr_lname) nal
@@ -644,7 +659,7 @@ let pr_cofix_tac (id,c) =
   (* Printing tactics as arguments *)
 let rec pr_atom0 = function
   | TacIntroPattern [] -> str "intros"
-  | TacIntroMove (None,None) -> str "intro"
+  | TacIntroMove (None,hto) when hto = no_move -> str "intro"
   | TacAssumption -> str "assumption"
   | TacAnyConstructor (false,None) -> str "constructor"
   | TacAnyConstructor (true,None) -> str "econstructor"
@@ -672,12 +687,10 @@ and pr_atom1 = function
       hov 1 (str "intros" ++ spc () ++ prlist_with_sep spc pr_intro_pattern p)
   | TacIntrosUntil h ->
       hv 1 (str "intros until" ++ pr_arg pr_quantified_hypothesis h)
-  | TacIntroMove (None,None) as t -> pr_atom0 t
-  | TacIntroMove (Some id1,None) -> str "intro " ++ pr_id id1
-  | TacIntroMove (ido1,Some id2) ->
-      hov 1
-      (str "intro" ++ pr_opt pr_id ido1 ++ spc () ++ str "after " ++
-       pr_lident id2)
+  | TacIntroMove (None,hto) as t when hto = no_move -> pr_atom0 t
+  | TacIntroMove (Some id,hto) when hto = no_move -> str "intro " ++ pr_id id
+  | TacIntroMove (ido,hto) ->
+      hov 1 (str"intro" ++ pr_opt pr_id ido ++ pr_move_location pr_ident hto)
   | TacAssumption as t -> pr_atom0 t
   | TacExact c -> hov 1 (str "exact" ++ pr_constrarg c)
   | TacExactNoCheck c -> hov 1 (str "exact_no_check" ++ pr_constrarg c)
@@ -685,7 +698,7 @@ and pr_atom1 = function
   | TacApply (a,ev,cb) ->
       hov 1 ((if a then mt() else str "simple ") ++
              str (with_evars ev "apply") ++ spc () ++ 
-             pr_with_bindings cb)
+             prlist_with_sep pr_coma pr_with_bindings cb)
   | TacElim (ev,cb,cbo) ->
       hov 1 (str (with_evars ev "elim") ++ pr_arg pr_with_bindings cb ++ 
         pr_opt pr_eliminator cbo)
@@ -737,22 +750,17 @@ and pr_atom1 = function
 	     ++ str "in" ++ pr_hyp_location pr_ident (id,[],(hloc,ref None)))
 *)
   (* Derived basic tactics *)
-  | TacSimpleInduction h ->
-      hov 1 (str "simple induction" ++ pr_arg pr_quantified_hypothesis h)
-  | TacNewInduction (ev,h,e,ids,cl) ->
-      hov 1 (str (with_evars ev "induction") ++ spc () ++
-	     prlist_with_sep spc (pr_induction_arg pr_lconstr pr_constr) h ++
-	     pr_with_names ids ++
-             pr_opt pr_eliminator e ++
-             pr_opt_no_spc (pr_clauses pr_ident) cl)
-  | TacSimpleDestruct h ->
-      hov 1 (str "simple destruct" ++ pr_arg pr_quantified_hypothesis h)
-  | TacNewDestruct (ev,h,e,ids,cl) ->
-      hov 1 (str (with_evars ev "destruct") ++ spc () ++
-             prlist_with_sep spc (pr_induction_arg pr_lconstr pr_constr) h ++ 
-	     pr_with_names ids ++
-             pr_opt pr_eliminator e ++
-             pr_opt_no_spc (pr_clauses pr_ident) cl)
+  | TacSimpleInductionDestruct (isrec,h) ->
+      hov 1 (str "simple " ++ str (if isrec then "induction" else "destruct")
+             ++ pr_arg pr_quantified_hypothesis h)
+  | TacInductionDestruct (isrec,ev,l) ->
+      hov 1 (str (with_evars ev (if isrec then "induction" else "destruct")) ++
+             spc () ++
+             prlist_with_sep pr_coma (fun (h,e,ids,cl) ->
+	       prlist_with_sep spc (pr_induction_arg pr_lconstr pr_constr) h ++
+	       pr_with_induction_names ids ++
+               pr_opt pr_eliminator e ++
+               pr_opt_no_spc (pr_clauses pr_ident) cl) l)
   | TacDoubleInduction (h1,h2) ->
       hov 1
         (str "double induction" ++  
@@ -796,8 +804,8 @@ and pr_atom1 = function
       (* Rem: only b = true is available for users *)
       assert b;
       hov 1
-        (str "move" ++ brk (1,1) ++ pr_ident id1 ++ spc () ++ 
-	 str "after" ++ brk (1,1) ++ pr_ident id2)
+        (str "move" ++ brk (1,1) ++ pr_ident id1 ++ 
+	 pr_move_location pr_ident id2)
   | TacRename l ->
       hov 1
         (str "rename" ++ brk (1,1) ++
@@ -852,11 +860,11 @@ and pr_atom1 = function
   | TacInversion (DepInversion (k,c,ids),hyp) ->
       hov 1 (str "dependent " ++ pr_induction_kind k ++ spc () ++
       pr_quantified_hypothesis hyp ++
-      pr_with_names ids ++ pr_with_constr pr_constr c)
+      pr_with_inversion_names ids ++ pr_with_constr pr_constr c)
   | TacInversion (NonDepInversion (k,cl,ids),hyp) ->
       hov 1 (pr_induction_kind k ++ spc () ++
       pr_quantified_hypothesis hyp ++
-      pr_with_names ids ++ pr_simple_clause pr_ident cl)
+      pr_with_inversion_names ids ++ pr_simple_clause pr_ident cl)
   | TacInversion (InversionUsing (c,cl),hyp) ->
       hov 1 (str "inversion" ++ spc() ++ pr_quantified_hypothesis hyp ++ 
       spc () ++ str "using" ++ spc () ++ pr_constr c ++ 
@@ -874,6 +882,7 @@ let rec pr_tac inherited tac =
         str "using " ++ pr_id s),
       labstract
   | TacLetIn (recflag,llc,u) ->
+      let llc = List.map (fun (id,t) -> (id,extract_binders t)) llc in
       v 0
        (hv 0 (pr_let_clauses recflag (pr_tac ltop) llc ++ str " in") ++
        fnl () ++ pr_tac (llet,E) u),
@@ -886,7 +895,7 @@ let rec pr_tac inherited tac =
 	lrul
         ++ fnl() ++ str "end"),
       lmatch
-  | TacMatchContext (lz,lr,lrul) ->
+  | TacMatchGoal (lz,lr,lrul) ->
       hov 0 (pr_lazy lz ++ 
 	str (if lr then "match reverse goal with" else "match goal with")
 	++ prlist
diff --git a/parsing/pptactic.mli b/parsing/pptactic.mli
index e5162dae..e24f666f 100644
--- a/parsing/pptactic.mli
+++ b/parsing/pptactic.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: pptactic.mli 9842 2007-05-20 17:44:23Z herbelin $ i*)
+(*i $Id: pptactic.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Pp
 open Genarg
@@ -78,6 +78,8 @@ val pr_extend :
   (tolerability -> glob_tactic_expr -> std_ppcmds) -> int ->
     string -> typed_generic_argument list -> std_ppcmds
 
+val pr_ltac_constant : Nametab.ltac_constant -> std_ppcmds
+
 val pr_raw_tactic : env -> raw_tactic_expr -> std_ppcmds
 
 val pr_raw_tactic_level : env -> tolerability -> raw_tactic_expr -> std_ppcmds
diff --git a/parsing/ppvernac.ml b/parsing/ppvernac.ml
index ac2adde2..67cd6f72 100644
--- a/parsing/ppvernac.ml
+++ b/parsing/ppvernac.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: ppvernac.ml 11059 2008-06-06 09:29:20Z herbelin $ *)  
+(* $Id: ppvernac.ml 11309 2008-08-06 10:30:35Z herbelin $ *)  
 
 open Pp
 open Names
@@ -403,9 +403,6 @@ let pr_constrarg c = spc () ++ pr_constr c in
 let pr_lconstrarg c = spc () ++ pr_lconstr c in
 let pr_intarg n = spc () ++ int n in
 let pr_lident_constr sep (i,c) = pr_lident i ++ sep ++ pr_constrarg c in
-let pr_lname_lident_constr (oi,bk,a) = 
-  (match snd oi with Anonymous -> mt () | Name id -> pr_lident (fst oi, id) ++ spc () ++ str":" ++ spc ()) 
-  ++ pr_lconstr a in
 let pr_instance_def sep (i,l,c) = pr_lident i ++ prlist_with_sep spc pr_lident l 
   ++ sep ++ pr_constrarg c in
 
@@ -717,8 +714,7 @@ let rec pr_vernac = function
  | VernacContext l ->
      hov 1 (
        str"Context" ++ spc () ++ str"[" ++ spc () ++
-	 prlist_with_sep (fun () -> str"," ++ spc()) pr_lname_lident_constr l ++
-	 spc () ++ str "]")
+	 pr_and_type_binders_arg l ++ spc () ++ str "]")
 	      
 
  | VernacDeclareInstance id ->
@@ -808,10 +804,7 @@ let rec pr_vernac = function
 	  (Global.env())
 	  body in
       hov 1
-        (((*if !Flags.p1 then
-	  (if rc then str "Recursive " else mt()) ++
-	  str "Tactic Definition " else*)
-	    (* Rec by default *) str "Ltac ") ++
+        ((str "Ltac ") ++
         prlist_with_sep (fun () -> fnl() ++ str"with ") pr_tac_body l)
   | VernacHints (local,dbnames,h) ->
       pr_hints local dbnames h pr_constr pr_pattern_expr
diff --git a/parsing/prettyp.ml b/parsing/prettyp.ml
index 401ef7fe..3aa51c53 100644
--- a/parsing/prettyp.ml
+++ b/parsing/prettyp.ml
@@ -10,7 +10,7 @@
  * on May-June 2006 for implementation of abstraction of pretty-printing of objects.
  *)
 
-(* $Id: prettyp.ml 10971 2008-05-22 17:12:11Z barras $ *)
+(* $Id: prettyp.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -219,7 +219,7 @@ let pr_located_qualid = function
   | ModuleType (qid,_) ->
       str "Module Type" ++ spc () ++ pr_sp (Nametab.full_name_modtype qid)
   | Undefined qid ->    
-      pr_qualid qid ++ str " is not a defined object"
+      pr_qualid qid ++ spc () ++ str "not a defined object."
 
 let print_located_qualid ref =
   let (loc,qid) = qualid_of_reference ref in
@@ -303,7 +303,7 @@ let build_inductive sp tyi =
     | Polymorphic ar ->
 	it_mkProd_or_LetIn (mkSort (Type ar.poly_level)) mip.mind_arity_ctxt in
   let arity = hnf_prod_applist env fullarity args in
-  let cstrtypes = arities_of_constructors env (sp,tyi) in
+  let cstrtypes = type_of_constructors env (sp,tyi) in
   let cstrtypes =
     Array.map (fun c -> hnf_prod_applist env c args) cstrtypes in
   let cstrnames = mip.mind_consnames in
@@ -599,12 +599,12 @@ let read_sec_context r =
   let dir =
     try Nametab.locate_section qid
     with Not_found ->
-      user_err_loc (loc,"read_sec_context", str "Unknown section") in
+      user_err_loc (loc,"read_sec_context", str "Unknown section.") in
   let rec get_cxt in_cxt = function
     | (_,Lib.OpenedSection ((dir',_),_) as hd)::rest ->
         if dir = dir' then (hd::in_cxt) else get_cxt (hd::in_cxt) rest
     | (_,Lib.ClosedSection _)::rest ->
-        error "Cannot print the contents of a closed section"
+        error "Cannot print the contents of a closed section."
 	(* LEM: Actually, we could if we wanted to. *)
     | [] -> []
     | hd::rest -> get_cxt (hd::in_cxt) rest 
@@ -648,7 +648,7 @@ let print_name ref =
     print_leaf_entry true (oname,lobj)
   with Not_found ->
     errorlabstrm
-      "print_name" (pr_qualid qid ++ spc () ++ str "not a defined object")
+      "print_name" (pr_qualid qid ++ spc () ++ str "not a defined object.")
 
 let print_opaque_name qid = 
   let env = Global.env () in
@@ -658,7 +658,7 @@ let print_opaque_name qid =
         if cb.const_body <> None then
 	  print_constant_with_infos cst
         else 
-	  error "not a defined constant"
+	  error "Not a defined constant."
     | IndRef (sp,_) ->
         print_inductive sp
     | ConstructRef cstr -> 
@@ -736,7 +736,8 @@ let index_of_class cl =
   try 
     fst (class_info cl)
   with _ -> 
-    errorlabstrm "index_of_class" (pr_class cl ++ str" is not a defined class")
+    errorlabstrm "index_of_class"
+      (pr_class cl ++ spc() ++ str "not a defined class.")
 
 let print_path_between cls clt = 
   let i = index_of_class cls in
@@ -746,7 +747,8 @@ let print_path_between cls clt =
       lookup_path_between (i,j) 
     with _ -> 
       errorlabstrm "index_cl_of_id"
-        (str"No path between " ++ pr_class cls ++ str" and " ++ pr_class clt)
+        (str"No path between " ++ pr_class cls ++ str" and " ++ pr_class clt
+	 ++ str ".")
   in
   print_path ((i,j),p)
 
diff --git a/parsing/printer.ml b/parsing/printer.ml
index 6a19cb0a..b126cc9c 100644
--- a/parsing/printer.ml
+++ b/parsing/printer.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: printer.ml 11001 2008-05-27 16:56:07Z aspiwack $ *)
+(* $Id: printer.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -28,6 +28,7 @@ open Refiner
 open Pfedit
 open Ppconstr
 open Constrextern
+open Tacexpr
 
 let emacs_str s alts = 
   match !Flags.print_emacs, !Flags.print_emacs_safechar with
@@ -318,7 +319,7 @@ let rec pr_evars_int i = function
 
 let default_pr_subgoal n =
   let rec prrec p = function
-    | [] -> error "No such goal"
+    | [] -> error "No such goal."
     | g::rest ->
        	if p = 1 then
           let pg = default_pr_goal g in
@@ -421,14 +422,14 @@ let pr_prim_rule = function
   | Intro id -> 
       str"intro " ++ pr_id id
 	
-  | Intro_replacing id -> 
-      (str"intro replacing "  ++ pr_id id)
-	
-  | Cut (b,id,t) ->
-      if b then
-        (str"assert " ++ pr_constr t)
-      else
-        (str"cut " ++ pr_constr t ++ str ";[intro " ++ pr_id id ++ str "|idtac]")
+  | Cut (b,replace,id,t) ->
+     if b then
+       (* TODO: express "replace" *)
+       (str"assert " ++ str"(" ++ pr_id id ++ str":" ++ pr_lconstr t ++ str")")
+     else
+       let cl = if replace then str"clear " ++ pr_id id ++ str"; " else mt() in
+       (str"cut " ++ pr_constr t ++ 
+        str ";[" ++ cl ++ str"intro " ++ pr_id id ++ str"|idtac]")
 	
   | FixRule (f,n,[]) ->
       (str"fix " ++ pr_id f ++ str"/" ++ int n)
@@ -472,7 +473,7 @@ let pr_prim_rule = function
       
   | Move (withdep,id1,id2) ->
       (str (if withdep then "dependent " else "") ++
-	 str"move "  ++ pr_id id1 ++ str " after " ++ pr_id id2)
+	 str"move "  ++ pr_id id1 ++ pr_move_location pr_id id2)
 
   | Rename (id1,id2) ->
       (str "rename " ++ pr_id id1 ++ str " into " ++ pr_id id2)
@@ -527,3 +528,14 @@ let pr_assumptionset env s =
     in
     (Option.default (mt ()) vars) ++ (Option.default (mt ()) axioms)
 
+let cmap_to_list m = Cmap.fold (fun k v acc -> v :: acc) m []
+
+open Typeclasses
+
+let pr_instance i = 
+  pr_global (ConstRef (instance_impl i))
+    
+let pr_instance_gmap insts =
+  prlist_with_sep fnl (fun (gr, insts) ->
+    prlist_with_sep fnl pr_instance (cmap_to_list insts))
+    (Gmap.to_list insts)
diff --git a/parsing/printer.mli b/parsing/printer.mli
index 935fca12..40bb9122 100644
--- a/parsing/printer.mli
+++ b/parsing/printer.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: printer.mli 11001 2008-05-27 16:56:07Z aspiwack $ i*)
+(*i $Id: printer.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Pp
@@ -22,6 +22,7 @@ open Termops
 open Evd
 open Proof_type
 open Rawterm
+open Tacexpr
 (*i*)
 
 (* These are the entry points for printing terms, context, tac, ... *)
@@ -137,3 +138,5 @@ val set_printer_pr : printer_pr -> unit
 
 val default_printer_pr : printer_pr
 
+val pr_instance_gmap : (global_reference, Typeclasses.instance Names.Cmap.t) Gmap.t ->
+  Pp.std_ppcmds
diff --git a/parsing/q_coqast.ml4 b/parsing/q_coqast.ml4
index 24562459..a4cfe27a 100644
--- a/parsing/q_coqast.ml4
+++ b/parsing/q_coqast.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "q_MLast.cmo pa_macro.cmo" i*)
 
-(* $Id: q_coqast.ml4 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: q_coqast.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -62,6 +62,10 @@ let mlexpr_of_reference = function
   | Libnames.Qualid (loc,qid) -> <:expr< Libnames.Qualid $dloc$ $mlexpr_of_qualid qid$ >>
   | Libnames.Ident (loc,id) -> <:expr< Libnames.Ident $dloc$ $mlexpr_of_ident id$ >>
 
+let mlexpr_of_located f (loc,x) = <:expr< ($dloc$, $f x$) >>
+
+let mlexpr_of_loc loc = <:expr< $dloc$ >>
+
 let mlexpr_of_by_notation f = function
   | Genarg.AN x -> <:expr< Genarg.AN $f x$ >>
   | Genarg.ByNotation (loc,s) -> <:expr< Genarg.ByNotation $dloc$ $str:s$ >>
@@ -85,10 +89,6 @@ let mlexpr_of_quantified_hypothesis = function
   | Rawterm.AnonHyp n -> <:expr< Rawterm.AnonHyp $mlexpr_of_int n$ >>
   | Rawterm.NamedHyp id ->  <:expr< Rawterm.NamedHyp $mlexpr_of_ident id$ >>
 
-let mlexpr_of_located f (loc,x) = <:expr< ($dloc$, $f x$) >>
-
-let mlexpr_of_loc loc = <:expr< $dloc$ >>
-
 let mlexpr_of_or_var f = function
   | Rawterm.ArgArg x -> <:expr< Rawterm.ArgArg $f x$ >>
   | Rawterm.ArgVar id -> <:expr< Rawterm.ArgVar $mlexpr_of_located mlexpr_of_ident id$ >>
@@ -139,7 +139,7 @@ let mlexpr_of_binding_kind = function
 
 let mlexpr_of_binder_kind = function
   | Topconstr.Default b -> <:expr< Topconstr.Default $mlexpr_of_binding_kind b$ >>
-  | Topconstr.TypeClass b -> <:expr< Topconstr.TypeClass $mlexpr_of_binding_kind b$ >>
+  | Topconstr.TypeClass (b,b') -> <:expr< Topconstr.TypeClass $mlexpr_of_pair mlexpr_of_binding_kind mlexpr_of_binding_kind (b,b')$ >>
 
 let rec mlexpr_of_constr = function
   | Topconstr.CRef (Libnames.Ident (loc,id)) when is_meta (string_of_id id) ->
@@ -242,6 +242,11 @@ let mlexpr_of_binding = mlexpr_of_pair mlexpr_of_binding_kind mlexpr_of_constr
 let mlexpr_of_constr_with_binding =
   mlexpr_of_pair mlexpr_of_constr mlexpr_of_binding_kind
 
+let mlexpr_of_move_location f = function
+  | Tacexpr.MoveAfter id -> <:expr< Tacexpr.MoveAfter $f id$ >>
+  | Tacexpr.MoveBefore id -> <:expr< Tacexpr.MoveBefore $f id$ >>
+  | Tacexpr.MoveToEnd b -> <:expr< Tacexpr.MoveToEnd $mlexpr_of_bool b$ >>
+
 let mlexpr_of_induction_arg = function
   | Tacexpr.ElimOnConstr c ->
       <:expr< Tacexpr.ElimOnConstr $mlexpr_of_constr_with_binding c$ >>
@@ -279,13 +284,13 @@ let mlexpr_of_message_token = function
 let rec mlexpr_of_atomic_tactic = function
   (* Basic tactics *)
   | Tacexpr.TacIntroPattern pl ->
-      let pl = mlexpr_of_list mlexpr_of_intro_pattern pl in
+      let pl = mlexpr_of_list (mlexpr_of_located mlexpr_of_intro_pattern) pl in
       <:expr< Tacexpr.TacIntroPattern $pl$ >>
   | Tacexpr.TacIntrosUntil h ->
       <:expr< Tacexpr.TacIntrosUntil $mlexpr_of_quantified_hypothesis h$ >>
   | Tacexpr.TacIntroMove (idopt,idopt') ->
       let idopt = mlexpr_of_ident_option idopt in
-      let idopt'=mlexpr_of_option (mlexpr_of_located mlexpr_of_ident) idopt' in
+      let idopt'= mlexpr_of_move_location mlexpr_of_hyp idopt' in
       <:expr< Tacexpr.TacIntroMove $idopt$ $idopt'$ >>
   | Tacexpr.TacAssumption ->
       <:expr< Tacexpr.TacAssumption >>
@@ -296,7 +301,7 @@ let rec mlexpr_of_atomic_tactic = function
   | Tacexpr.TacVmCastNoCheck c ->
       <:expr< Tacexpr.TacVmCastNoCheck $mlexpr_of_constr c$ >>
   | Tacexpr.TacApply (b,false,cb) ->
-      <:expr< Tacexpr.TacApply $mlexpr_of_bool b$ False $mlexpr_of_constr_with_binding cb$ >>
+      <:expr< Tacexpr.TacApply $mlexpr_of_bool b$ False $mlexpr_of_list mlexpr_of_constr_with_binding cb$ >>
   | Tacexpr.TacElim (false,cb,cbo) ->
       let cb = mlexpr_of_constr_with_binding cb in
       let cbo = mlexpr_of_option mlexpr_of_constr_with_binding cbo in
@@ -332,7 +337,7 @@ let rec mlexpr_of_atomic_tactic = function
   | Tacexpr.TacCut c ->
       <:expr< Tacexpr.TacCut $mlexpr_of_constr c$ >>
   | Tacexpr.TacAssert (t,ipat,c) ->
-      let ipat = mlexpr_of_intro_pattern ipat in
+      let ipat = mlexpr_of_located mlexpr_of_intro_pattern ipat in
       <:expr< Tacexpr.TacAssert $mlexpr_of_option mlexpr_of_tactic t$ $ipat$ 
 	      $mlexpr_of_constr c$ >>
   | Tacexpr.TacGeneralize cl ->
@@ -348,18 +353,18 @@ let rec mlexpr_of_atomic_tactic = function
 	      $mlexpr_of_bool b$ >>
 
   (* Derived basic tactics *)
-  | Tacexpr.TacSimpleInduction h ->
-      <:expr< Tacexpr.TacSimpleInduction ($mlexpr_of_quantified_hypothesis h$) >>
-  | Tacexpr.TacNewInduction (false,cl,cbo,ids,cls) ->
-      let cbo = mlexpr_of_option mlexpr_of_constr_with_binding cbo in
-      let ids = mlexpr_of_intro_pattern ids in
-      <:expr< Tacexpr.TacNewInduction False $mlexpr_of_list mlexpr_of_induction_arg cl$ $cbo$ $ids$ $mlexpr_of_option mlexpr_of_clause cls$ >>
-  | Tacexpr.TacSimpleDestruct h ->
-      <:expr< Tacexpr.TacSimpleDestruct $mlexpr_of_quantified_hypothesis h$ >>
-  | Tacexpr.TacNewDestruct (false,c,cbo,ids,cls) ->
-      let cbo = mlexpr_of_option mlexpr_of_constr_with_binding cbo in
-      let ids = mlexpr_of_intro_pattern ids in
-      <:expr< Tacexpr.TacNewDestruct False $mlexpr_of_list mlexpr_of_induction_arg c$ $cbo$ $ids$ $mlexpr_of_option mlexpr_of_clause cls$ >>
+  | Tacexpr.TacSimpleInductionDestruct (isrec,h) ->
+      <:expr< Tacexpr.TacSimpleInductionDestruct $mlexpr_of_bool isrec$
+                  $mlexpr_of_quantified_hypothesis h$ >>
+  | Tacexpr.TacInductionDestruct (isrec,ev,l) ->
+      <:expr< Tacexpr.TacInductionDestruct $mlexpr_of_bool isrec$ $mlexpr_of_bool ev$ 
+	$mlexpr_of_list (mlexpr_of_quadruple 
+	  (mlexpr_of_list mlexpr_of_induction_arg)
+	  (mlexpr_of_option mlexpr_of_constr_with_binding)
+	  (mlexpr_of_pair
+	    (mlexpr_of_option (mlexpr_of_located mlexpr_of_intro_pattern))
+	    (mlexpr_of_option (mlexpr_of_located mlexpr_of_intro_pattern)))
+	  (mlexpr_of_option mlexpr_of_clause)) l$ >>
 
   (* Context management *)
   | Tacexpr.TacClear (b,l) ->
@@ -371,7 +376,7 @@ let rec mlexpr_of_atomic_tactic = function
   | Tacexpr.TacMove (dep,id1,id2) ->
       <:expr< Tacexpr.TacMove $mlexpr_of_bool dep$
               $mlexpr_of_hyp id1$
-              $mlexpr_of_hyp id2$ >>
+              $mlexpr_of_move_location mlexpr_of_hyp id2$ >>
 
   (* Constructors *)
   | Tacexpr.TacLeft (ev,l) ->
@@ -462,8 +467,8 @@ and mlexpr_of_tactic : (Tacexpr.raw_tactic_expr -> MLast.expr) = function
         $mlexpr_of_bool lz$
         $mlexpr_of_tactic t$
         $mlexpr_of_list (mlexpr_of_match_rule mlexpr_of_tactic) l$>>
-  | Tacexpr.TacMatchContext (lz,lr,l) ->
-      <:expr< Tacexpr.TacMatchContext 
+  | Tacexpr.TacMatchGoal (lz,lr,l) ->
+      <:expr< Tacexpr.TacMatchGoal 
         $mlexpr_of_bool lz$
         $mlexpr_of_bool lr$
         $mlexpr_of_list (mlexpr_of_match_rule mlexpr_of_tactic) l$>>
diff --git a/parsing/q_util.ml4 b/parsing/q_util.ml4
index da78e287..da4329bb 100644
--- a/parsing/q_util.ml4
+++ b/parsing/q_util.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "q_MLast.cmo" i*)
 
-(* $Id: q_util.ml4 10091 2007-08-24 10:57:37Z herbelin $ *)
+(* $Id: q_util.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (* This file defines standard combinators to build ml expressions *)
 
@@ -53,6 +53,11 @@ let mlexpr_of_triple m1 m2 m3 (a1,a2,a3)=
   let loc = join_loc (MLast.loc_of_expr e1) (MLast.loc_of_expr e3) in
   <:expr< ($e1$, $e2$, $e3$) >>
 
+let mlexpr_of_quadruple m1 m2 m3 m4 (a1,a2,a3,a4)=
+  let e1 = m1 a1 and e2 = m2 a2 and e3 = m3 a3 and e4 = m4 a4 in
+  let loc = join_loc (MLast.loc_of_expr e1) (MLast.loc_of_expr e4) in
+  <:expr< ($e1$, $e2$, $e3$, $e4$) >>
+
 (* We don't give location for tactic quotation! *)
 let loc = dummy_loc
 
diff --git a/parsing/q_util.mli b/parsing/q_util.mli
index 901f9198..b950e68f 100644
--- a/parsing/q_util.mli
+++ b/parsing/q_util.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: q_util.mli 9265 2006-10-24 08:35:38Z herbelin $ i*)
+(*i $Id: q_util.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 val patt_of_expr : MLast.expr -> MLast.patt
 
@@ -20,6 +20,10 @@ val mlexpr_of_triple :
   ('a -> MLast.expr) -> ('b -> MLast.expr) -> ('c -> MLast.expr)
     -> 'a * 'b * 'c -> MLast.expr
 
+val mlexpr_of_quadruple :
+  ('a -> MLast.expr) -> ('b -> MLast.expr) ->
+    ('c -> MLast.expr) -> ('d -> MLast.expr) -> 'a * 'b * 'c * 'd -> MLast.expr
+
 val mlexpr_of_bool : bool -> MLast.expr
 
 val mlexpr_of_int : int -> MLast.expr
diff --git a/parsing/search.ml b/parsing/search.ml
index c375826c..c6ff4c04 100644
--- a/parsing/search.ml
+++ b/parsing/search.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: search.ml 10840 2008-04-23 21:29:34Z herbelin $ *)
+(* $Id: search.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -150,7 +150,7 @@ let rec id_from_pattern = function
   | PVar id -> Nametab.locate (make_qualid [] (string_of_id id))
  *)
   | PApp (p,_) -> id_from_pattern p
-  | _ -> error "the pattern is not simple enough"
+  | _ -> error "The pattern is not simple enough."
 	
 let raw_pattern_search extra_filter display_function pat =
   let name = id_from_pattern pat in
diff --git a/parsing/tacextend.ml4 b/parsing/tacextend.ml4
index 3d71af84..695677a3 100644
--- a/parsing/tacextend.ml4
+++ b/parsing/tacextend.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo q_MLast.cmo" i*)
 
-(* $Id: tacextend.ml4 10091 2007-08-24 10:57:37Z herbelin $ *)
+(* $Id: tacextend.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Genarg
@@ -206,7 +206,7 @@ EXTEND
         let t, g = Q_util.interp_entry_name loc e sep in
         TacNonTerm (loc, t, g, Some s)
       | s = STRING ->
-	if s = "" then Util.user_err_loc (loc,"",Pp.str "Empty terminal");
+	if s = "" then Util.user_err_loc (loc,"",Pp.str "Empty terminal.");
         TacTerm s
     ] ]
   ;
diff --git a/parsing/tactic_printer.ml b/parsing/tactic_printer.ml
index c5b77774..e0836984 100644
--- a/parsing/tactic_printer.ml
+++ b/parsing/tactic_printer.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: tactic_printer.ml 11146 2008-06-19 08:26:38Z corbinea $ *)
+(* $Id: tactic_printer.ml 11313 2008-08-07 11:15:03Z barras $ *)
 
 open Pp
 open Util
@@ -90,7 +90,8 @@ let pr_change gl =
   str"change " ++
   pr_lconstr_env (Global.env_of_context gl.evar_hyps) gl.evar_concl ++ str"."
 
-let rec print_decl_script tac_printer nochange sigma pf =
+let print_decl_script tac_printer ?(nochange=true) sigma pf =
+  let rec print_prf pf =
   match pf.ref with
     | None ->
 	(if nochange then 
@@ -99,46 +100,38 @@ let rec print_decl_script tac_printer nochange sigma pf =
 	   pr_change pf.goal)
 	++ fnl ()
     | Some (Daimon,[]) -> str "(* Some proof has been skipped here *)"
-    | Some (Prim Change_evars,[subpf]) ->   
-	print_decl_script tac_printer nochange sigma subpf
+    | Some (Prim Change_evars,[subpf]) -> print_prf subpf
     | Some (Nested(Proof_instr (opened,instr),_) as rule,subprfs) ->
 	begin
 	  match instr.instr,subprfs with
 	    Pescape,[{ref=Some(_,subsubprfs)}] ->
 	      hov 7
 		(pr_rule_dot_fnl rule ++
-		   prlist_with_sep pr_fnl tac_printer subsubprfs) ++ fnl () ++
-		if opened then mt () else str "return."
+		  prlist_with_sep pr_fnl tac_printer subsubprfs) ++ fnl () ++
+	      if opened then mt () else str "return."
 	  | Pclaim _,[body;cont] ->
-	      hov 2
-		(pr_rule_dot_fnl rule ++
-		   print_decl_script tac_printer nochange sigma body) ++ 
-		fnl () ++
-		if opened then mt () else str "end claim." ++ fnl () ++
-		  print_decl_script tac_printer nochange sigma cont
+	      hov 2 (pr_rule_dot_fnl rule ++ print_prf body) ++ fnl () ++
+	      (if opened then mt () else str "end claim." ++ fnl ()) ++
+	      print_prf cont
 	  | Pfocus _,[body;cont] ->
-	      hov 2 
-		(pr_rule_dot_fnl rule ++
-		   print_decl_script tac_printer nochange sigma body) ++ 
-		fnl () ++
-		if opened then mt () else str "end focus." ++ fnl () ++
-		  print_decl_script tac_printer nochange sigma cont
+	      hov 2 (pr_rule_dot_fnl rule ++ print_prf body) ++ 
+	      fnl () ++
+	      (if opened then mt () else str "end focus." ++ fnl ()) ++
+	      print_prf cont
 	  | (Psuppose _ |Pcase (_,_,_)),[body;cont] ->
-	      hov 2 
-		(pr_rule_dot_fnl rule ++
-		   print_decl_script tac_printer nochange sigma body) ++ 
-		fnl () ++
-		print_decl_script tac_printer nochange sigma cont 
+	      hov 2 (pr_rule_dot_fnl rule ++ print_prf body) ++ fnl () ++
+	      print_prf cont 
 	  | _,[next] ->
-	      pr_rule_dot_fnl rule ++
-		print_decl_script tac_printer nochange sigma next
+	      pr_rule_dot_fnl rule ++ print_prf next
 	  | _,[] ->
 	      pr_rule_dot rule		
 	  | _,_ -> anomaly "unknown branching instruction"
 	end
-    | _ -> anomaly "Not Applicable"
+    | _ -> anomaly "Not Applicable" in
+  print_prf pf
 
-let rec print_script nochange sigma pf =
+let print_script ?(nochange=true) sigma pf =
+  let rec print_prf pf =
   match pf.ref with
     | None ->
         (if nochange then 
@@ -153,26 +146,25 @@ let rec print_script nochange sigma pf =
 	end ++
 	  begin
 	    hov 0 (str "proof." ++ fnl () ++ 
-		     print_decl_script (print_script nochange sigma) 
-		     nochange sigma (List.hd script))
+		     print_decl_script print_prf 
+		     ~nochange sigma (List.hd script))
 	  end ++ fnl () ++
 	  begin
 	    if opened then mt () else (str "end proof." ++ fnl ())
 	  end
     | Some(Daimon,spfl) ->
 	((if nochange then (mt ()) else (pr_change pf.goal ++ fnl ())) ++
-	   prlist_with_sep pr_fnl
-           (print_script nochange sigma) spfl )
+	   prlist_with_sep pr_fnl print_prf spfl )
     | Some(rule,spfl) ->
 	((if nochange then (mt ()) else (pr_change pf.goal ++ fnl ())) ++
 	   pr_rule_dot_fnl rule ++
-	   prlist_with_sep pr_fnl
-           (print_script nochange sigma) spfl )	
+	   prlist_with_sep pr_fnl print_prf spfl ) in
+  print_prf pf
 
 (* printed by Show Script command *)
 
-let print_treescript nochange sigma pf =
-  let rec aux pf =
+let print_treescript ?(nochange=true) sigma pf =
+  let rec print_prf pf =
     match pf.ref with
     | None ->
         if nochange then 
@@ -184,23 +176,21 @@ let print_treescript nochange sigma pf =
 	begin
 	  if nochange then mt () else pr_change pf.goal ++ fnl ()
 	end ++
-	  hov 0 
+	hov 0 
 	  begin str "proof." ++ fnl () ++
-	    print_decl_script aux
-	    nochange sigma (List.hd script) 
+	    print_decl_script print_prf ~nochange sigma (List.hd script) 
 	  end ++ fnl () ++ 
-	  begin
-	    if opened then mt () else (str "end proof." ++ fnl ())
-	  end
+	begin
+	  if opened then mt () else (str "end proof." ++ fnl ())
+	end
     | Some(Daimon,spfl) ->
-	((if nochange then (mt ()) else (pr_change pf.goal ++ fnl ())) ++
-	   prlist_with_sep pr_fnl
-           (print_script nochange sigma) spfl )
+	(if nochange then mt () else pr_change pf.goal ++ fnl ()) ++
+	prlist_with_sep pr_fnl (print_script ~nochange sigma) spfl
     | Some(r,spfl) ->
         let indent = if List.length spfl >= 2 then 1 else 0 in
-        (if nochange then mt () else (pr_change pf.goal ++ fnl ())) ++
-        hv indent (pr_rule_dot_fnl r ++ prlist_with_sep mt aux spfl)
-  in hov 0 (aux pf)
+        (if nochange then mt () else pr_change pf.goal ++ fnl ()) ++
+        hv indent (pr_rule_dot_fnl r ++ prlist_with_sep fnl print_prf spfl)
+  in hov 0 (print_prf pf)
 
 let rec print_info_script sigma osign pf =
   let {evar_hyps=sign; evar_concl=cl} = pf.goal in
diff --git a/parsing/tactic_printer.mli b/parsing/tactic_printer.mli
index 676dbdf2..affc5ec2 100644
--- a/parsing/tactic_printer.mli
+++ b/parsing/tactic_printer.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: tactic_printer.mli 10580 2008-02-22 13:39:13Z lmamane $ i*)
+(*i $Id: tactic_printer.mli 11313 2008-08-07 11:15:03Z barras $ i*)
 
 (*i*)
 open Pp
@@ -23,6 +23,6 @@ val pr_rule     : rule -> std_ppcmds
 val pr_tactic   : tactic_expr -> std_ppcmds
 val pr_proof_instr : Decl_expr.proof_instr -> Pp.std_ppcmds
 val print_script :
-  bool -> evar_map -> proof_tree -> std_ppcmds
+  ?nochange:bool -> evar_map -> proof_tree -> std_ppcmds
 val print_treescript :
-  bool -> evar_map -> proof_tree -> std_ppcmds
+  ?nochange:bool -> evar_map -> proof_tree -> std_ppcmds
diff --git a/parsing/vernacextend.ml4 b/parsing/vernacextend.ml4
index d12ca098..08feb17a 100644
--- a/parsing/vernacextend.ml4
+++ b/parsing/vernacextend.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4use: "pa_extend.cmo q_MLast.cmo" i*)
 
-(* $Id: vernacextend.ml4 10091 2007-08-24 10:57:37Z herbelin $ *)
+(* $Id: vernacextend.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Genarg
@@ -110,7 +110,7 @@ EXTEND
   rule:
     [ [ "["; s = STRING; l = LIST0 args; "]"; "->"; "["; e = Pcaml.expr; "]"
         -> 
-      if s = "" then Util.user_err_loc (loc,"",Pp.str "Command name is empty");
+      if s = "" then Util.user_err_loc (loc,"",Pp.str"Command name is empty.");
       (s,l,<:expr< fun () -> $e$ >>)
     ] ]
   ;
diff --git a/pretyping/cases.ml b/pretyping/cases.ml
index 1d7da3f3..9482bf92 100644
--- a/pretyping/cases.ml
+++ b/pretyping/cases.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: cases.ml 11085 2008-06-10 08:54:43Z herbelin $ *)
+(* $Id: cases.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -114,8 +114,8 @@ let force_name =
 
 open Pp
 
-let mssg_may_need_inversion () =
-  str "Found a matching with no clauses on a term unknown to have an empty inductive type"
+let msg_may_need_inversion () =
+  strbrk "Found a matching with no clauses on a term unknown to have an empty inductive type."
 
 (* Utils *)
 let make_anonymous_patvars n =
@@ -535,7 +535,7 @@ let set_used_pattern eqn = eqn.used := true
 
 let extract_rhs pb =
   match pb.mat with 
-    | [] -> errorlabstrm "build_leaf" (mssg_may_need_inversion())
+    | [] -> errorlabstrm "build_leaf" (msg_may_need_inversion())
     | eqn::_ ->
 	set_used_pattern eqn;
         eqn.rhs
@@ -1654,7 +1654,7 @@ let extract_arity_signature env0 tomatchl tmsign =
 	    | None -> [na,Option.map (lift n) bo,lift n typ]
 	    | Some (loc,_,_,_) -> 
  	    user_err_loc (loc,"",
-	    str "Unexpected type annotation for a term of non inductive type"))
+	    str"Unexpected type annotation for a term of non inductive type."))
       | IsInd (term,IndType(indf,realargs),_) ->
           let indf' = lift_inductive_family n indf in
 	  let (ind,params) = dest_ind_family indf' in
@@ -1663,7 +1663,7 @@ let extract_arity_signature env0 tomatchl tmsign =
 	    match t with
 	      | Some (loc,ind',nparams,realnal) ->
 		  if ind <> ind' then
-		    user_err_loc (loc,"",str "Wrong inductive type");
+		    user_err_loc (loc,"",str "Wrong inductive type.");
 		  if List.length params <> nparams
 		    or nrealargs <> List.length realnal then
 		      anomaly "Ill-formed 'in' clause in cases";
diff --git a/pretyping/classops.ml b/pretyping/classops.ml
index 83ba05bb..b5a5709e 100644
--- a/pretyping/classops.ml
+++ b/pretyping/classops.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: classops.ml 10840 2008-04-23 21:29:34Z herbelin $ *)
+(* $Id: classops.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -376,7 +376,7 @@ let coercion_of_reference r =
   let ref = Nametab.global r in
   if not (coercion_exists ref) then
     errorlabstrm "try_add_coercion" 
-      (Nametab.pr_global_env Idset.empty ref ++ str" is not a coercion");
+      (Nametab.pr_global_env Idset.empty ref ++ str" is not a coercion.");
   ref
 
 module CoercionPrinting =
diff --git a/pretyping/clenv.ml b/pretyping/clenv.ml
index 03f84809..8dfec2be 100644
--- a/pretyping/clenv.ml
+++ b/pretyping/clenv.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: clenv.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: clenv.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -377,11 +377,11 @@ let check_bindings bl =
     | NamedHyp s :: _ -> 
 	errorlabstrm ""
 	  (str "The variable " ++ pr_id s ++ 
-	   str " occurs more than once in binding list");
+	   str " occurs more than once in binding list.");
     | AnonHyp n :: _ ->
 	errorlabstrm ""
 	  (str "The position " ++ int n ++
-	   str " occurs more than once in binding list")
+	   str " occurs more than once in binding list.")
     | [] -> ()
 
 let meta_of_binder clause loc mvs = function
@@ -389,17 +389,17 @@ let meta_of_binder clause loc mvs = function
   | AnonHyp n ->
       try List.nth mvs (n-1)
       with (Failure _|Invalid_argument _) ->
-        errorlabstrm "" (str "No such binder")
+        errorlabstrm "" (str "No such binder.")
 
 let error_already_defined b =
   match b with
     | NamedHyp id ->
         errorlabstrm ""
           (str "Binder name \"" ++ pr_id id ++
-           str"\" already defined with incompatible value")
+           str"\" already defined with incompatible value.")
     | AnonHyp n ->
         anomalylabstrm ""
-          (str "Position " ++ int n ++ str" already defined")
+          (str "Position " ++ int n ++ str" already defined.")
 
 let clenv_unify_binding_type clenv c t u =
   if isMeta (fst (whd_stack u)) then
@@ -440,7 +440,7 @@ let clenv_constrain_last_binding c clenv =
   let all_mvs = collect_metas clenv.templval.rebus in
   let k =
     try list_last all_mvs 
-    with Failure _ -> error "clenv_constrain_with_bindings" in
+    with Failure _ -> anomaly "clenv_constrain_with_bindings" in
   clenv_assign_binding clenv k (Evd.empty,c)
 
 let clenv_constrain_dep_args hyps_only bl clenv =
@@ -451,8 +451,9 @@ let clenv_constrain_dep_args hyps_only bl clenv =
     if List.length occlist = List.length bl then
       List.fold_left2 clenv_assign_binding clenv occlist bl
     else 
-      error ("Not the right number of missing arguments (expected "
-	     ^(string_of_int (List.length occlist))^")")
+      errorlabstrm "" 
+	(strbrk "Not the right number of missing arguments (expected " ++
+	 int (List.length occlist) ++ str ").")
 
 (****************************************************************)
 (* Clausal environment for an application *)
diff --git a/pretyping/coercion.ml b/pretyping/coercion.ml
index 3c37a49f..3074c4c4 100644
--- a/pretyping/coercion.ml
+++ b/pretyping/coercion.ml
@@ -5,7 +5,7 @@
 (*    //   *      This file is distributed under the terms of the       *)
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
-(* $Id: coercion.ml 10883 2008-05-05 13:55:24Z herbelin $ *)
+(* $Id: coercion.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Util
 open Names
@@ -43,6 +43,10 @@ module type S = sig
   val inh_coerce_to_base : loc ->
     env -> evar_defs -> unsafe_judgment -> evar_defs * unsafe_judgment
     
+  (* [inh_coerce_to_prod env isevars t] coerces [t] to a product type *)
+  val inh_coerce_to_prod : loc ->
+    env -> evar_defs -> type_constraint_type -> evar_defs * type_constraint_type
+
   (* [inh_conv_coerce_to loc env evd j t] coerces [j] to an object of type 
      [t]; i.e. it inserts a coercion into [j], if needed, in such a way [t] and
      [j.uj_type] are convertible; it fails if no coercion is applicable *)
@@ -160,6 +164,8 @@ module Default = struct
 
   let inh_coerce_to_base loc env evd j = (evd, j)
 
+  let inh_coerce_to_prod loc env evd t = (evd, t)
+
   let inh_coerce_to_fail env evd rigidonly v t c1 =
     if rigidonly & not (Heads.is_rigid env c1 && Heads.is_rigid env t)
     then
diff --git a/pretyping/coercion.mli b/pretyping/coercion.mli
index b1c8e893..8705080f 100644
--- a/pretyping/coercion.mli
+++ b/pretyping/coercion.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: coercion.mli 10840 2008-04-23 21:29:34Z herbelin $ i*)
+(*i $Id: coercion.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Util
@@ -39,6 +39,10 @@ module type S = sig
      type its base type (the notion depends on the coercion system) *)
   val inh_coerce_to_base : loc ->
     env -> evar_defs -> unsafe_judgment -> evar_defs * unsafe_judgment
+
+  (* [inh_coerce_to_prod env isevars t] coerces [t] to a product type *)
+  val inh_coerce_to_prod : loc ->
+    env -> evar_defs -> type_constraint_type -> evar_defs * type_constraint_type
     
   (* [inh_conv_coerce_to loc env isevars j t] coerces [j] to an object of type 
      [t]; i.e. it inserts a coercion into [j], if needed, in such a way [t] and
diff --git a/pretyping/detyping.ml b/pretyping/detyping.ml
index 81bb41ef..73dc5d46 100644
--- a/pretyping/detyping.ml
+++ b/pretyping/detyping.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: detyping.ml 11073 2008-06-08 20:24:51Z herbelin $ *)
+(* $Id: detyping.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -49,14 +49,14 @@ let encode_bool r =
   let (_,lc as x) = encode_inductive r in
   if not (has_two_constructors lc) then
     user_err_loc (loc_of_reference r,"encode_if",
-      str "This type has not exactly two constructors");
+      str "This type has not exactly two constructors.");
   x
 
 let encode_tuple r =
   let (_,lc as x) = encode_inductive r in
   if not (isomorphic_to_tuple lc) then
     user_err_loc (loc_of_reference r,"encode_tuple",
-      str "This type cannot be seen as a tuple type");
+      str "This type cannot be seen as a tuple type.");
   x
 
 module PrintingCasesMake =
diff --git a/pretyping/evarconv.ml b/pretyping/evarconv.ml
index 58951302..323cd06f 100644
--- a/pretyping/evarconv.ml
+++ b/pretyping/evarconv.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: evarconv.ml 11157 2008-06-21 10:45:51Z herbelin $ *)
+(* $Id: evarconv.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -99,21 +99,21 @@ let check_conv_record (t1,l1) (t2,l2) =
 	      lookup_canonical_conversion 
 		(proji, Sort_cs (family_of_sort s)),[]
 	  | _ -> 
-	      let c2 = try global_of_constr t2 with _ -> raise Not_found in
+	      let c2 = global_of_constr t2 in
 		lookup_canonical_conversion (proji, Const_cs c2),l2
       with Not_found -> 
 	lookup_canonical_conversion (proji,Default_cs),[]
     in
-    let { o_DEF = c; o_INJ=n; o_TABS = bs; o_TPARAMS = params; o_TCOMPS = us } 
-	= canon_s in
+    let { o_DEF = c; o_INJ=n; o_TABS = bs; 
+          o_TPARAMS = params; o_NPARAMS = nparams; o_TCOMPS = us } = canon_s in
     let params1, c1, extra_args1 =
-      match list_chop (List.length params) l1 with 
+      match list_chop nparams l1 with 
 	| params1, c1::extra_args1 -> params1, c1, extra_args1
-	| _ -> assert false in
+	| _ -> raise Not_found in
     let us2,extra_args2 = list_chop (List.length us) l2_effective in
     c,bs,(params,params1),(us,us2),(extra_args1,extra_args2),c1,
     (n,applist(t2,l2))
-  with _ -> 
+  with Failure _ | Not_found -> 
     raise Not_found
 
 (* Precondition: one of the terms of the pb is an uninstantiated evar,
@@ -272,33 +272,42 @@ and evar_eqappr_x env evd pbty (term1,l1 as appr1) (term2,l2 as appr2) =
 	ise_try evd [f1; f4]
 
     | MaybeFlexible flex1, MaybeFlexible flex2 ->
-	let f2 i =
-          if flex1 = flex2 then
-            ise_list2 i (fun i -> evar_conv_x env i CONV) l1 l2
-          else (i,false)
-	and f3 i =
+	let f1 i =
+	  if flex1 = flex2 then
+	    ise_list2 i (fun i -> evar_conv_x env i CONV) l1 l2
+	  else
+	     (i,false)
+	and f2 i =
 	  (try conv_record env i
              (try check_conv_record appr1 appr2
 	      with Not_found -> check_conv_record appr2 appr1)
            with Not_found -> (i,false))
-	and f4 i =
+	and f3 i =
           (* heuristic: unfold second argument first, exception made
              if the first argument is a beta-redex (expand a constant
-             only if necessary) *)
-          let val2 =
-            match kind_of_term flex1 with
-                Lambda _ -> None
-              | _ -> eval_flexible_term env flex2 in
-	  match val2 with
+             only if necessary) or the second argument is potentially
+             usable as a canonical projection *)
+	  if isLambda flex1 or is_open_canonical_projection (evars_of i) appr2
+	  then
+	    match eval_flexible_term env flex1 with
+	    | Some v1 ->
+		evar_eqappr_x env i pbty (evar_apprec env i l1 v1) appr2
+	    | None ->
+		match eval_flexible_term env flex2 with
+		| Some v2 ->
+		    evar_eqappr_x env i pbty appr1 (evar_apprec env i l2 v2)
+		| None -> (i,false)
+	  else
+	    match eval_flexible_term env flex2 with
 	    | Some v2 ->
 		evar_eqappr_x env i pbty appr1 (evar_apprec env i l2 v2)
 	    | None ->
 		match eval_flexible_term env flex1 with
-		  | Some v1 ->
-		      evar_eqappr_x env i pbty (evar_apprec env i l1 v1) appr2
-		  | None -> (i,false)
+		| Some v1 ->
+		    evar_eqappr_x env i pbty (evar_apprec env i l1 v1) appr2
+		| None -> (i,false)
 	in 
-	ise_try evd [f2; f3; f4]
+	ise_try evd [f1; f2; f3]
 
     | Flexible ev1, Rigid _ ->
 	if 
@@ -496,7 +505,7 @@ let choose_less_dependent_instance evk evd term args =
   let evi = Evd.find (evars_of evd) evk in
   let subst = make_pure_subst evi args in
   let subst' = List.filter (fun (id,c) -> c = term) subst in
-  if subst' = [] then error "Too complex unification problem" else
+  if subst' = [] then error "Too complex unification problem." else
   Evd.evar_define evk (mkVar (fst (List.hd subst'))) evd
 
 let apply_conversion_problem_heuristic env evd pbty t1 t2 =
@@ -506,12 +515,12 @@ let apply_conversion_problem_heuristic env evd pbty t1 t2 =
   let (term2,l2 as appr2) = decompose_app t2 in
   match kind_of_term term1, kind_of_term term2 with
   | Evar (evk1,args1), (Rel _|Var _) when l1 = [] & l2 = [] ->
-      (* The typical kind of constraint coming from patter-matching return
+      (* The typical kind of constraint coming from pattern-matching return
          type inference *)
       assert (array_for_all (fun a -> a = term2 or isEvar a) args1);
       choose_less_dependent_instance evk1 evd term2 args1, true
   | (Rel _|Var _), Evar (evk2,args2) when l1 = [] & l2 = [] ->
-      (* The typical kind of constraint coming from patter-matching return
+      (* The typical kind of constraint coming from pattern-matching return
          type inference *)
       assert (array_for_all ((=) term1) args2);
       choose_less_dependent_instance evk2 evd term1 args2, true
diff --git a/pretyping/evarutil.ml b/pretyping/evarutil.ml
index fafce268..130e23b8 100644
--- a/pretyping/evarutil.ml
+++ b/pretyping/evarutil.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: evarutil.ml 11127 2008-06-14 15:39:46Z herbelin $ *)
+(* $Id: evarutil.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -374,42 +374,41 @@ let restrict_upon_filter evd evi evk p args =
   else
     evd,evk,args
 
-exception Dependency_error of identifier
+let collect_vars c =
+  let rec collrec acc c =
+    match kind_of_term c with
+    | Var id -> list_add_set id acc
+    | _      -> fold_constr collrec acc c
+  in
+  collrec [] c
 
-module EvkOrd = 
-struct
-  type t = Term.existential_key
-  let compare = Pervasives.compare
-end
+type clear_dependency_error =
+| OccurHypInSimpleClause of identifier option
+| EvarTypingBreak of existential
 
-module EvkSet = Set.Make(EvkOrd)
+exception ClearDependencyError of identifier * clear_dependency_error
 
-let rec check_and_clear_in_constr evdref c ids hist =
+let rec check_and_clear_in_constr evdref err ids c =
   (* returns a new constr where all the evars have been 'cleaned'
      (ie the hypotheses ids have been removed from the contexts of
-     evars *)
+     evars) *)
   let check id' = 
     if List.mem id' ids then
-      raise (Dependency_error id')
+      raise (ClearDependencyError (id',err))
   in 
     match kind_of_term c with
-      | ( Rel _ | Meta _ | Sort _ ) -> c
-
-      | ( Const _ | Ind _ | Construct _ ) -> 
-	  let vars = Environ.vars_of_global (Global.env()) c in
-	    List.iter check vars; c
+      | Var id' ->
+	  check id'; c
 
-      | Var id' ->  
-	  check id'; mkVar id'
+      | ( Const _ | Ind _ | Construct _ ) ->
+          let vars = Environ.vars_of_global (Global.env()) c in
+            List.iter check vars; c
 
       | Evar (evk,l as ev) -> 
 	  if Evd.is_defined_evar !evdref ev then
 	    (* If evk is already defined we replace it by its definition *)
-	    let nc = nf_evar (evars_of !evdref) c in 
-	      (check_and_clear_in_constr evdref nc ids hist)
-	  else if EvkSet.mem evk hist then
-	    (* Loop detection => do nothing *)
-	    c
+	    let nc = whd_evar (evars_of !evdref) c in 
+	      (check_and_clear_in_constr evdref err ids nc)
 	  else 
 	    (* We check for dependencies to elements of ids in the
 	       evar_info corresponding to e and in the instance of
@@ -418,16 +417,32 @@ let rec check_and_clear_in_constr evdref c ids hist =
 	       removed *)
 	    let evi = Evd.find (evars_of !evdref) evk in
 	    let ctxt = Evd.evar_filtered_context evi in
-	    let (nhyps,nargs,rids) = 
+	    let (nhyps,nargs,rids) =
 	      List.fold_right2 
 		(fun (rid,ob,c as h) a (hy,ar,ri) ->
-		  match kind_of_term a with
-		    | Var id -> if List.mem id ids then (hy,ar,id::ri) else (h::hy,a::ar,ri)
-		    | _ -> (h::hy,a::ar,ri)
-		) 	      
+		  (* Check if some id to clear occurs in the instance
+		     a of rid in ev and remember the dependency *)
+		  match 
+		    List.filter (fun id -> List.mem id ids) (collect_vars a)
+		  with
+		  | id :: _ -> (hy,ar,(rid,id)::ri)
+		  | _ ->
+		  (* Check if some rid to clear in the context of ev
+		     has dependencies in another hyp of the context of ev
+		     and transitively remember the dependency *)
+		  match List.filter (fun (id,_) -> occur_var_in_decl (Global.env()) id h) ri with
+		  | rid' :: _ -> (hy,ar,(rid,List.assoc rid ri)::ri)
+		  | _ ->
+		  (* No dependency at all, we can keep this ev's context hyp *)
+		      (h::hy,a::ar,ri))
 		ctxt (Array.to_list l) ([],[],[]) in
-	    (* nconcl must be computed ids (non instanciated hyps) *)
-	    let nconcl = check_and_clear_in_constr evdref (evar_concl evi) rids (EvkSet.add evk hist) in
+	    (* Check if some rid to clear in the context of ev has dependencies
+	       in the type of ev and adjust the source of the dependency *)
+	    let nconcl =
+	      try check_and_clear_in_constr evdref (EvarTypingBreak ev)
+		    (List.map fst rids) (evar_concl evi) 
+	      with ClearDependencyError (rid,err) -> 
+		raise (ClearDependencyError (List.assoc rid rids,err)) in
 
 	    let env = Sign.fold_named_context push_named nhyps ~init:(empty_env) in
 	    let ev'= e_new_evar evdref env ~src:(evar_source evk !evdref) nconcl in
@@ -435,24 +450,19 @@ let rec check_and_clear_in_constr evdref c ids hist =
 	      let (evk',_) = destEvar ev' in
 		mkEvar(evk', Array.of_list nargs)
 
-      | _ -> map_constr (fun c -> check_and_clear_in_constr evdref c ids hist) c
+      | _ -> map_constr (check_and_clear_in_constr evdref err ids) c
 
 let clear_hyps_in_evi evdref hyps concl ids =
-  (* clear_evar_hyps erases hypotheses ids in hyps, checking if some
+  (* clear_hyps_in_evi erases hypotheses ids in hyps, checking if some
      hypothesis does not depend on a element of ids, and erases ids in
      the contexts of the evars occuring in evi *)
-  let nconcl = try check_and_clear_in_constr evdref concl ids EvkSet.empty
-    with Dependency_error id' -> error (string_of_id id' ^ " is used in conclusion") in
-  let (nhyps,_) = 
-    let check_context (id,ob,c) = 
-      try
-	(id,
-	(match ob with 
-	    None -> None
-	  | Some b -> Some (check_and_clear_in_constr evdref b ids EvkSet.empty)),
-	check_and_clear_in_constr evdref c ids EvkSet.empty)
-      with Dependency_error id' -> error (string_of_id id' ^ " is used in hypothesis "
-					   ^ string_of_id id) 
+  let nconcl =
+    check_and_clear_in_constr evdref (OccurHypInSimpleClause None) ids concl in
+  let nhyps = 
+    let check_context (id,ob,c) =
+      let err = OccurHypInSimpleClause (Some id) in
+      (id, Option.map (check_and_clear_in_constr evdref err ids) ob,
+	check_and_clear_in_constr evdref err ids c)
     in
     let check_value vk =
       match !vk with
@@ -469,6 +479,7 @@ let clear_hyps_in_evi evdref hyps concl ids =
   in
   (nhyps,nconcl)
 
+
 (* Expand rels and vars that are bound to other rels or vars so that 
    dependencies in variables are canonically associated to the most ancient
    variable in its family of aliased variables *)
@@ -883,7 +894,7 @@ let rec invert_definition env evd (evk,argsv as ev) rhs =
 and evar_define env (evk,_ as ev) rhs evd =
   try
     let (evd',body) = invert_definition env evd ev rhs in
-    if occur_meta body then error "Meta cannot occur in evar body";
+    if occur_meta body then error "Meta cannot occur in evar body.";
     (* invert_definition may have instantiate some evars of rhs with evk *)
     (* so we recheck acyclicity *)
     if occur_evar evk body then error_occur_check env (evars_of evd) evk body;
@@ -1057,22 +1068,7 @@ let check_evars env initial_sigma evd c =
 	  if not (Evd.mem initial_sigma evk) then
             let (loc,k) = evar_source evk evd in
 	    let evi = nf_evar_info sigma (Evd.find sigma evk) in
-	    let explain =
-	      let f (_,_,t1,t2) =
-		(try head_evar t1 = evk with Failure _ -> false)
-		or (try head_evar t2 = evk with Failure _ -> false) in
-	      let check_several c inst =
-		let _,argsv = destEvar c in
-		let l = List.filter (eq_constr inst) (Array.to_list argsv) in
-		let n = List.length l in
-		(* Maybe should we select one instead of failing ... *)
-		if n >= 2 then Some (SeveralInstancesFound n) else None in
-	      match List.filter f (snd (extract_all_conv_pbs evd)) with
-	      | (_,_,t1,t2)::_ ->
-		  if isEvar t2 then check_several t2 t1 
-		  else check_several t1 t2
-	      | [] -> None
-	    in  error_unsolvable_implicit loc env sigma evi k explain
+	    error_unsolvable_implicit loc env sigma evi k None
       | _ -> iter_constr proc_rec c
   in proc_rec c
 
@@ -1183,11 +1179,12 @@ let split_tycon loc env evd tycon =
 		 if cur = 0 then 
 		   let evd', (x, dom, rng) = real_split c in
 		     evd, (Anonymous, 
-			       Some (Some (init, 0), dom), 
-			       Some (Some (init, 0), rng))
+			  Some (None, dom), 
+			  Some (None, rng))
 		 else
-		   evd, (Anonymous, None, Some (Some (init, pred cur), c)))
-
+		   evd, (Anonymous, None, 
+			Some (if cur = 1 then None,c else Some (init, pred cur), c)))
+	    
 let valcon_of_tycon x = 
   match x with
     | Some (None, t) -> Some t
diff --git a/pretyping/evarutil.mli b/pretyping/evarutil.mli
index c915d4b0..ca446c01 100644
--- a/pretyping/evarutil.mli
+++ b/pretyping/evarutil.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: evarutil.mli 11136 2008-06-18 10:41:34Z herbelin $ i*)
+(*i $Id: evarutil.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Util
@@ -172,7 +172,15 @@ val pr_tycon_type : env -> type_constraint_type -> Pp.std_ppcmds
 val pr_tycon : env -> type_constraint -> Pp.std_ppcmds
 
 
-(**********************************)
-(* Removing hyps in evars'context *)
+(*********************************************************************)
+(* Removing hyps in evars'context;                                   *)
+(* raise OccurHypInSimpleClause if the removal breaks dependencies   *)
+
+type clear_dependency_error =
+| OccurHypInSimpleClause of identifier option
+| EvarTypingBreak of existential
+
+exception ClearDependencyError of identifier * clear_dependency_error
+
 val clear_hyps_in_evi : evar_defs ref -> named_context_val -> types ->
   identifier list -> named_context_val * types
diff --git a/pretyping/evd.ml b/pretyping/evd.ml
index 76a5ff26..bf3cd623 100644
--- a/pretyping/evd.ml
+++ b/pretyping/evd.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: evd.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: evd.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -523,6 +523,8 @@ let pr_sort_constraints (_,sm) = pr_sort_cstrs sm
 
 let meta_list evd = metamap_to_list evd.metas
 
+let find_meta evd mv = Metamap.find mv evd.metas
+
 let undefined_metas evd =
   List.sort Pervasives.compare (map_succeed (function
     | (n,Clval(_,_,typ)) -> failwith ""
@@ -598,13 +600,13 @@ let meta_with_name evd id =
   match mvnodef, mvl with
     | _,[]  -> 
 	errorlabstrm "Evd.meta_with_name"
-          (str"No such bound variable " ++ pr_id id)
+          (str"No such bound variable " ++ pr_id id ++ str".")
     | ([n],_|_,[n]) -> 
 	n
     | _  -> 
 	errorlabstrm "Evd.meta_with_name"
           (str "Binder name \"" ++ pr_id id ++
-           str"\" occurs more than once in clause")
+           strbrk "\" occurs more than once in clause.")
 
 
 let meta_merge evd1 evd2 =
diff --git a/pretyping/evd.mli b/pretyping/evd.mli
index 1acc811b..5810f93d 100644
--- a/pretyping/evd.mli
+++ b/pretyping/evd.mli
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: evd.mli 10883 2008-05-05 13:55:24Z herbelin $ i*)
+(*i $Id: evd.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Util
@@ -100,6 +100,8 @@ val sig_sig : 'a sigma -> evar_map
 (*********************************************************************)
 (* Meta map *)
 
+module Metamap : Map.S with type key = metavariable
+
 module Metaset : Set.S with type elt = metavariable
 
 val meta_exists : (metavariable -> bool) -> Metaset.t -> bool
@@ -197,6 +199,7 @@ val extract_all_conv_pbs : evar_defs -> evar_defs * evar_constraint list
 
 
 (* Metas *)
+val find_meta : evar_defs -> metavariable -> clbinding
 val meta_list : evar_defs -> (metavariable * clbinding) list
 val meta_defined : evar_defs -> metavariable -> bool
 (* [meta_fvalue] raises [Not_found] if meta not in map or [Anomaly] if
diff --git a/pretyping/indrec.ml b/pretyping/indrec.ml
index 2325baec..b4b8f0b8 100644
--- a/pretyping/indrec.ml
+++ b/pretyping/indrec.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: indrec.ml 10410 2007-12-31 13:11:55Z msozeau $ *)
+(* $Id: indrec.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -591,12 +591,10 @@ let lookup_eliminator ind_sp s =
   try constr_of_global (Nametab.locate (make_short_qualid id))
   with Not_found ->
     errorlabstrm "default_elim"
-      (str "Cannot find the elimination combinator " ++
-       pr_id id ++ spc () ++
-       str "The elimination of the inductive definition " ++
-       pr_id id ++ spc () ++ str "on sort " ++ 
-       spc () ++ pr_sort_family s ++
-       str " is probably not allowed")
+      (strbrk "Cannot find the elimination combinator " ++
+       pr_id id ++ strbrk ", the elimination of the inductive definition " ++
+       pr_id id ++ strbrk " on sort " ++ pr_sort_family s ++
+       strbrk " is probably not allowed.")
 
 
 (*  let env = Global.env() in
diff --git a/pretyping/inductiveops.ml b/pretyping/inductiveops.ml
index 0daff713..127cd0f2 100644
--- a/pretyping/inductiveops.ml
+++ b/pretyping/inductiveops.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: inductiveops.ml 10114 2007-09-06 07:36:14Z herbelin $ *)
+(* $Id: inductiveops.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -31,6 +31,11 @@ let type_of_constructor env cstr =
   Inductive.lookup_mind_specif env (inductive_of_constructor cstr) in
  Inductive.type_of_constructor cstr specif
 
+(* Return constructor types in user form *)
+let type_of_constructors env ind =
+ let specif = Inductive.lookup_mind_specif env ind in
+  Inductive.type_of_constructors ind specif
+
 (* Return constructor types in normal form *)
 let arities_of_constructors env ind =
  let specif = Inductive.lookup_mind_specif env ind in
@@ -87,7 +92,7 @@ let mis_nf_constructor_type (ind,mib,mip) j =
   and ntypes = mib.mind_ntypes
   and nconstr = Array.length mip.mind_consnames in
   let make_Ik k = mkInd ((fst ind),ntypes-k-1) in 
-  if j > nconstr then error "Not enough constructors in the type";
+  if j > nconstr then error "Not enough constructors in the type.";
   substl (list_tabulate make_Ik ntypes) specif.(j-1)
 
 (* Arity of constructors excluding parameters and local defs *)
diff --git a/pretyping/inductiveops.mli b/pretyping/inductiveops.mli
index 9e370fec..1d24659c 100644
--- a/pretyping/inductiveops.mli
+++ b/pretyping/inductiveops.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: inductiveops.mli 9707 2007-03-15 16:36:15Z herbelin $ i*)
+(*i $Id: inductiveops.mli 11301 2008-08-04 19:41:18Z herbelin $ i*)
 
 open Names
 open Term
@@ -22,6 +22,7 @@ val type_of_inductive    : env -> inductive -> types
 
 (* Return type as quoted by the user *)
 val type_of_constructor  : env -> constructor -> types
+val type_of_constructors : env -> inductive -> types array
 
 (* Return constructor types in normal form *)
 val arities_of_constructors : env -> inductive -> types array
diff --git a/pretyping/matching.ml b/pretyping/matching.ml
index aaa4c3f0..d066a58d 100644
--- a/pretyping/matching.ml
+++ b/pretyping/matching.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: matching.ml 10451 2008-01-18 17:20:28Z barras $ *)
+(* $Id: matching.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (*i*)
 open Util
@@ -85,7 +85,7 @@ let matches_core convert allow_partial_app pat c =
 	    List.map
 	      (function
 		 | PRel n -> n
-		 | _ -> error "Only bound indices allowed in second order pattern matching")
+		 | _ -> error "Only bound indices allowed in second order pattern matching.")
 	      args in
 	  let frels = Intset.elements (free_rels cT) in
 	  if list_subset frels relargs then
@@ -185,7 +185,7 @@ let matches_core convert allow_partial_app pat c =
   in 
   Sort.list (fun (a,_) (b,_) -> a<b) (sorec [] [] pat c)
 
-let matches = matches_core None false
+let matches = matches_core None true
 
 let pmatches = matches_core None true
 
diff --git a/pretyping/pattern.ml b/pretyping/pattern.ml
index 5df5c9fb..057f9d1c 100644
--- a/pretyping/pattern.ml
+++ b/pretyping/pattern.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: pattern.ml 10785 2008-04-13 21:41:54Z herbelin $ *)
+(* $Id: pattern.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -133,7 +133,7 @@ let map_pattern f = map_pattern_with_binders (fun () -> ()) (fun () -> f) ()
 
 let rec instantiate_pattern lvar = function
   | PVar id as x -> (try Lazy.force(List.assoc id lvar) with Not_found -> x)
-  | (PFix _ | PCoFix _) -> error ("Not instantiable pattern")
+  | (PFix _ | PCoFix _) -> error ("Non instantiable pattern.")
   | c -> map_pattern (instantiate_pattern lvar) c
 
 let rec liftn_pattern k n = function
@@ -264,7 +264,7 @@ let rec pat_of_raw metas vars = function
              
   | r ->
       let loc = loc_of_rawconstr r in
-      user_err_loc (loc,"pattern_of_rawconstr", Pp.str "Pattern not supported")
+      user_err_loc (loc,"pattern_of_rawconstr", Pp.str"Non supported pattern.")
 
 and pat_of_raw_branch loc metas vars ind brs i =
   let bri = List.filter
@@ -272,23 +272,23 @@ and pat_of_raw_branch loc metas vars ind brs i =
         (_,_,[PatCstr(_,c,lv,Anonymous)],_) -> snd c = i+1
       | (loc,_,_,_) ->
           user_err_loc (loc,"pattern_of_rawconstr",
-                        Pp.str "Not supported pattern")) brs in
+                        Pp.str "Non supported pattern.")) brs in
   match bri with
     | [(_,_,[PatCstr(_,(indsp,_),lv,_)],br)] ->
 	if ind <> None & ind <> Some indsp then
           user_err_loc (loc,"pattern_of_rawconstr",
-            Pp.str "All constructors must be in the same inductive type");
+            Pp.str "All constructors must be in the same inductive type.");
         let lna =
           List.map
             (function PatVar(_,na) -> na
               | PatCstr(loc,_,_,_) ->
                   user_err_loc (loc,"pattern_of_rawconstr",
-                                Pp.str "Not supported pattern")) lv in
+                                Pp.str "Non supported pattern.")) lv in
         let vars' = List.rev lna @ vars in 
 	List.length lv, rev_it_mkPLambda lna (pat_of_raw metas vars' br)
     | _ -> user_err_loc (loc,"pattern_of_rawconstr",
                          str "No unique branch for " ++ int (i+1) ++
-                         str"-th constructor")
+                         str"-th constructor.")
 
 let pattern_of_rawconstr c =
   let metas = ref [] in
diff --git a/pretyping/pretyping.ml b/pretyping/pretyping.ml
index 5f0999cb..a3246bc8 100644
--- a/pretyping/pretyping.ml
+++ b/pretyping/pretyping.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: pretyping.ml 11047 2008-06-03 23:08:00Z msozeau $ *)
+(* $Id: pretyping.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -66,7 +66,7 @@ let search_guard loc env possible_indexes fixdefs =
 	    try check_fix env fix; raise (Found indexes) 
 	    with TypeError _ -> ())
 	 (list_combinations possible_indexes); 
-       let errmsg = "cannot guess decreasing argument of fix" in 
+       let errmsg = "Cannot guess decreasing argument of fix." in 
        if loc = dummy_loc then error errmsg else 
 	 user_err_loc (loc,"search_guard", Pp.str errmsg)
      with Found indexes -> indexes)
@@ -244,7 +244,7 @@ module Pretyping_F (Coercion : Coercion.S) = struct
     try (* To build a nicer ltac error message *)
       match List.assoc id unbndltacvars with
       | None -> user_err_loc (loc,"",
-	  str "variable " ++ pr_id id ++ str " should be bound to a term")
+	  str "Variable " ++ pr_id id ++ str " should be bound to a term.")
       | Some id0 -> Pretype_errors.error_var_not_found_loc loc id0
     with Not_found ->
       error_var_not_found_loc loc id
@@ -356,7 +356,9 @@ module Pretyping_F (Coercion : Coercion.S) = struct
 		   uj_type = it_mkProd_or_LetIn j.uj_type ctxt })
             ctxtv vdef in
 	evar_type_fixpoint loc env evdref names ftys vdefj;
-	let fixj = match fixkind with
+	let ftys = Array.map (nf_evar (evars_of !evdref)) ftys in
+	let fdefs = Array.map (fun x -> nf_evar (evars_of !evdref) (j_val x)) vdefj in
+ 	let fixj = match fixkind with
 	  | RFix (vn,i) ->
 	      (* First, let's find the guard indexes. *)
 	      (* If recursive argument was not given by user, we try all args.
@@ -370,11 +372,11 @@ module Pretyping_F (Coercion : Coercion.S) = struct
 		   | None -> list_map_i (fun i _ -> i) 0 ctxtv.(i))
 		vn)
 	      in 
-	      let fixdecls = (names,ftys,Array.map j_val vdefj) in 
+	      let fixdecls = (names,ftys,fdefs) in 
 	      let indexes = search_guard loc env possible_indexes fixdecls in 
 	      make_judge (mkFix ((indexes,i),fixdecls)) ftys.(i)
 	  | RCoFix i ->
-	      let cofix = (i,(names,ftys,Array.map j_val vdefj)) in
+	      let cofix = (i,(names,ftys,fdefs)) in
 	      (try check_cofix env cofix with e -> Stdpp.raise_with_loc loc e);
 	      make_judge (mkCoFix cofix) ftys.(i) in
 	inh_conv_coerce_to_tycon loc env evdref fixj tycon
@@ -459,10 +461,10 @@ module Pretyping_F (Coercion : Coercion.S) = struct
 	in
 	let cstrs = get_constructors env indf in
 	  if Array.length cstrs <> 1 then
-            user_err_loc (loc,"",str "Destructing let is only for inductive types with one constructor");
+            user_err_loc (loc,"",str "Destructing let is only for inductive types with one constructor.");
 	  let cs = cstrs.(0) in
 	    if List.length nal <> cs.cs_nargs then
-              user_err_loc (loc,"", str "Destructing let on this type expects " ++ int cs.cs_nargs ++ str " variables");
+              user_err_loc (loc,"", str "Destructing let on this type expects " ++ int cs.cs_nargs ++ str " variables.");
 	    let fsign = List.map2 (fun na (_,c,t) -> (na,c,t))
               (List.rev nal) cs.cs_args in
 	    let env_f = push_rels fsign env in
@@ -525,7 +527,7 @@ module Pretyping_F (Coercion : Coercion.S) = struct
 	let cstrs = get_constructors env indf in 
 	  if Array.length cstrs <> 2 then
             user_err_loc (loc,"",
-			  str "If is only for inductive types with two constructors");
+			  str "If is only for inductive types with two constructors.");
 
 	  let arsgn = 
 	    let arsgn,_ = get_arity env indf in
@@ -613,7 +615,7 @@ module Pretyping_F (Coercion : Coercion.S) = struct
 	    j
 	      (*inh_conv_coerce_to_tycon loc env evdref j tycon*)
 	else
-	  user_err_loc (loc,"pretype",(str "Not a constr tagged Dynamic"))
+	  user_err_loc (loc,"pretype",(str "Not a constr tagged Dynamic."))
 
   (* [pretype_type valcon env evdref lvar c] coerces [c] into a type *)
   and pretype_type valcon env evdref lvar = function
diff --git a/pretyping/rawterm.ml b/pretyping/rawterm.ml
index 62798a45..3726b8df 100644
--- a/pretyping/rawterm.ml
+++ b/pretyping/rawterm.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: rawterm.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: rawterm.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 (*i*)
 open Util
@@ -36,7 +36,7 @@ type rawsort = RProp of Term.contents | RType of Univ.universe option
 
 type binder_kind = BProd | BLambda | BLetIn
 
-type binding_kind = Explicit | Implicit
+type binding_kind = Lib.binding_kind = Explicit | Implicit
 
 type quantified_hypothesis = AnonHyp of int | NamedHyp of identifier
 
diff --git a/pretyping/rawterm.mli b/pretyping/rawterm.mli
index 2ba8022f..eecee8b0 100644
--- a/pretyping/rawterm.mli
+++ b/pretyping/rawterm.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: rawterm.mli 11094 2008-06-10 19:35:23Z herbelin $ i*)
+(*i $Id: rawterm.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Util
@@ -40,7 +40,7 @@ type rawsort = RProp of Term.contents | RType of Univ.universe option
 
 type binder_kind = BProd | BLambda | BLetIn
 
-type binding_kind = Explicit | Implicit
+type binding_kind = Lib.binding_kind = Explicit | Implicit
 
 type quantified_hypothesis = AnonHyp of int | NamedHyp of identifier
 
diff --git a/pretyping/recordops.ml b/pretyping/recordops.ml
index bd73740f..06289434 100644
--- a/pretyping/recordops.ml
+++ b/pretyping/recordops.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: recordops.ml 10577 2008-02-19 10:18:19Z corbinea $ *)
+(* $Id: recordops.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -109,6 +109,7 @@ that maps the pair (Li,ci) to the following data
     o_DEF = c
     o_TABS = B1...Bk
     o_PARAMS = a1...am
+    o_NARAMS = m
     o_TCOMP = ui1...uir
 
 *)
@@ -118,6 +119,7 @@ type obj_typ = {
   o_INJ : int;      (* position of trivial argument (negative= none) *)
   o_TABS : constr list;    (* ordered *)
   o_TPARAMS : constr list; (* ordered *)
+  o_NPARAMS : int;
   o_TCOMPS : constr list } (* ordered *)
 
 type cs_pattern =
@@ -126,10 +128,11 @@ type cs_pattern =
   | Sort_cs of sorts_family
   | Default_cs
 
-let object_table =
-  (ref [] : ((global_reference * cs_pattern) * obj_typ) list ref)
+let object_table = ref (Refmap.empty : (cs_pattern * obj_typ) list Refmap.t)
 
-let canonical_projections () = !object_table
+let canonical_projections () = 
+  Refmap.fold (fun x -> List.fold_right (fun (y,c) acc -> ((x,y),c)::acc))
+    !object_table []
 
 let keep_true_projections projs kinds =
   map_succeed (function (p,true) -> p | _ -> failwith "")
@@ -177,15 +180,18 @@ let compute_canonical_projections (con,ind) =
 	   | _ -> l)
       [] lps in
   List.map (fun (refi,c,inj,argj) ->
-    (refi,c),{o_DEF=v; o_INJ=inj; o_TABS=lt; o_TPARAMS=params; o_TCOMPS=argj})
+    (refi,c),
+    {o_DEF=v; o_INJ=inj; o_TABS=lt; 
+     o_TPARAMS=params; o_NPARAMS=List.length params; o_TCOMPS=argj})
     comp
 
 let open_canonical_structure i (_,o) =
   if i=1 then
     let lo = compute_canonical_projections o in
-    List.iter (fun (o,_ as x) ->
-      if not (List.mem_assoc o !object_table) then
-	object_table := x :: (!object_table)) lo
+    List.iter (fun ((proj,cs_pat),s) ->
+      let l = try Refmap.find proj !object_table with Not_found -> [] in
+      if not (List.mem_assoc cs_pat l) then
+        object_table := Refmap.add proj ((cs_pat,s)::l) !object_table) lo
 
 let cache_canonical_structure o =
   open_canonical_structure 1 o
@@ -215,7 +221,7 @@ let add_canonical_structure x = Lib.add_anonymous_leaf (inCanonStruc x)
 
 let error_not_structure ref =
   errorlabstrm "object_declare"
-    (Nameops.pr_id (id_of_global ref) ++ str" is not a structure object")
+    (Nameops.pr_id (id_of_global ref) ++ str" is not a structure object.")
 
 let check_and_decompose_canonical_structure ref =
   let sp = match ref with ConstRef sp -> sp | _ -> error_not_structure ref in
@@ -241,7 +247,15 @@ let declare_canonical_structure ref =
 
 let outCanonicalStructure x = fst (outCanonStruct x)
 
-let lookup_canonical_conversion o = List.assoc o !object_table
+let lookup_canonical_conversion (proj,pat) =
+  List.assoc pat (Refmap.find proj !object_table)
+
+let is_open_canonical_projection sigma (c,args) =
+  try 
+    let l = Refmap.find (global_of_constr c) !object_table in
+    let n = (snd (List.hd l)).o_NPARAMS in
+    try isEvar (whd_evar sigma (List.nth args n)) with Failure _ -> false
+  with Not_found -> false
 
 let freeze () =
   !structure_table, !projection_table, !object_table
@@ -251,7 +265,7 @@ let unfreeze (s,p,o) =
 
 let init () =
   structure_table := Indmap.empty; projection_table := Cmap.empty;
-  object_table:=[]
+  object_table := Refmap.empty
 
 let _ = init()
 
diff --git a/pretyping/recordops.mli b/pretyping/recordops.mli
index 7a7d941d..74f6a9ce 100755
--- a/pretyping/recordops.mli
+++ b/pretyping/recordops.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: recordops.mli 10577 2008-02-19 10:18:19Z corbinea $ i*)
+(*i $Id: recordops.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -47,11 +47,14 @@ type obj_typ = {
   o_INJ : int;      (* position of trivial argument *)
   o_TABS : constr list;    (* ordered *)
   o_TPARAMS : constr list; (* ordered *)
+  o_NPARAMS : int;
   o_TCOMPS : constr list } (* ordered *)
 
 val cs_pattern_of_constr : constr -> cs_pattern * int * constr list
  
 val lookup_canonical_conversion : (global_reference * cs_pattern) -> obj_typ
 val declare_canonical_structure : global_reference -> unit
+val is_open_canonical_projection :
+  Evd.evar_map -> (constr * constr list) -> bool
 val canonical_projections : unit -> 
   ((global_reference * cs_pattern) * obj_typ) list
diff --git a/pretyping/reductionops.ml b/pretyping/reductionops.ml
index 6fc30aae..2f507318 100644
--- a/pretyping/reductionops.ml
+++ b/pretyping/reductionops.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: reductionops.ml 11010 2008-05-28 15:25:19Z barras $ *)
+(* $Id: reductionops.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -518,9 +518,11 @@ let whd_eta c = app_stack (local_whd_state_gen eta (c,empty_stack))
 (* Replacing defined evars for error messages *)
 let rec whd_evar sigma c =
   match kind_of_term c with
-    | Evar (ev,args)
-        when Evd.mem sigma ev & Evd.is_defined sigma ev ->
-	whd_evar sigma (Evd.existential_value sigma (ev,args))
+    | Evar ev ->
+	let d = 
+	  try Some (Evd.existential_value sigma ev)
+	  with NotInstantiatedEvar | Not_found -> None in
+	(match d with Some c -> whd_evar sigma c | None -> c)
     | Sort s when is_sort_variable sigma s -> whd_sort_variable sigma c
     | _ -> collapse_appl c
 
@@ -773,7 +775,7 @@ let splay_arity env sigma c =
   let l, c = splay_prod env sigma c in
   match kind_of_term c with
     | Sort s -> l,s
-    | _ -> error "not an arity"
+    | _ -> invalid_arg "splay_arity"
 
 let sort_of_arity env c = snd (splay_arity env Evd.empty c)
 
@@ -783,7 +785,7 @@ let decomp_n_prod env sigma n =
       | Prod (n,a,c0) ->
 	  decrec (push_rel (n,None,a) env)
 	    (m-1) (Sign.add_rel_decl (n,None,a) ln) c0
-      | _                      -> error "decomp_n_prod: Not enough products"
+      | _                      -> invalid_arg "decomp_n_prod"
   in 
   decrec env n Sign.empty_rel_context
 
diff --git a/pretyping/reductionops.mli b/pretyping/reductionops.mli
index d48055cf..1ac36b2a 100644
--- a/pretyping/reductionops.mli
+++ b/pretyping/reductionops.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: reductionops.mli 11010 2008-05-28 15:25:19Z barras $ i*)
+(*i $Id: reductionops.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -111,7 +111,6 @@ val whd_betadeltaiota_nolet_stack :  contextual_stack_reduction_function
 val whd_betaetalet_stack : local_stack_reduction_function
 val whd_betalet_stack : local_stack_reduction_function
 
-val whd_state : local_state_reduction_function
 val whd_beta_state : local_state_reduction_function
 val whd_betaiota_state : local_state_reduction_function
 val whd_betaiotazeta_state : local_state_reduction_function
diff --git a/pretyping/tacred.ml b/pretyping/tacred.ml
index 50401502..57fdbb09 100644
--- a/pretyping/tacred.ml
+++ b/pretyping/tacred.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: tacred.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: tacred.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -543,7 +543,7 @@ let try_red_product env sigma c =
 
 let red_product env sigma c = 
   try try_red_product env sigma c
-  with Redelimination -> error "Not reducible"
+  with Redelimination -> error "Not reducible."
 
 (*
 (* This old version of hnf uses betadeltaiota instead of itself (resp 
@@ -698,7 +698,7 @@ let unfold env sigma name =
   if is_evaluable env name then
     clos_norm_flags (unfold_red name) env sigma
   else
-    error (string_of_evaluable_ref env name^" is opaque")
+    error (string_of_evaluable_ref env name^" is opaque.")
 
 (* [unfoldoccs : (readable_constraints -> (int list * section_path) -> constr -> constr)]
  * Unfolds the constant name in a term c following a list of occurrences occl.
@@ -709,7 +709,7 @@ let unfoldoccs env sigma ((nowhere_except_in,locs as plocs),name) c =
   else
     let (nbocc,uc) = substlin env name 1 plocs c in
     if nbocc = 1 then 
-      error ((string_of_evaluable_ref env name)^" does not occur");
+      error ((string_of_evaluable_ref env name)^" does not occur.");
     let rest = List.filter (fun o -> o >= nbocc) locs in
     if rest <> [] then error_invalid_occurrence rest;
     nf_betaiota uc
@@ -722,7 +722,7 @@ let unfoldn loccname env sigma c =
 let fold_one_com com env sigma c =
   let rcom =
     try red_product env sigma com
-    with Redelimination -> error "Not reducible" in
+    with Redelimination -> error "Not reducible." in
   (* Reason first on the beta-iota-zeta normal form of the constant as
      unfold produces it, so that the "unfold f; fold f" configuration works
      to refold fix expressions *)
@@ -757,7 +757,7 @@ let compute = cbv_betadeltaiota
 let abstract_scheme env sigma (locc,a) c =
   let ta = Retyping.get_type_of env sigma a in
   let na = named_hd env ta Anonymous in
-  if occur_meta ta then error "cannot find a type for the generalisation";
+  if occur_meta ta then error "Cannot find a type for the generalisation.";
   if occur_meta a then 
     mkLambda (na,ta,c)
   else 
@@ -785,14 +785,14 @@ let reduce_to_ind_gen allow_product env sigma t =
 	  if allow_product then
 	    elimrec (push_rel (n,None,ty) env) t' ((n,None,ty)::l)
 	  else
-	    errorlabstrm "" (str"Not an inductive definition")
+	    errorlabstrm "" (str"Not an inductive definition.")
       | _ ->
 	  (* Last chance: we allow to bypass the Opaque flag (as it
 	     was partially the case between V5.10 and V8.1 *)
 	  let t' = whd_betadeltaiota env sigma t in
 	  match kind_of_term (fst (decompose_app t')) with
 	    | Ind ind-> (ind, it_mkProd_or_LetIn t' l)
-	    | _ -> errorlabstrm "" (str"Not an inductive product")
+	    | _ -> errorlabstrm "" (str"Not an inductive product.")
   in
   elimrec env t []
 
@@ -843,7 +843,7 @@ let reduce_to_ref_gen allow_product env sigma ref t =
     let (mind,t) = reduce_to_ind_gen allow_product env sigma t in
     if IndRef mind <> ref then
       errorlabstrm "" (str "Cannot recognize a statement based on " ++ 
-        Nametab.pr_global_env Idset.empty ref)
+        Nametab.pr_global_env Idset.empty ref ++ str".")
     else
       t
   else
@@ -857,7 +857,7 @@ let reduce_to_ref_gen allow_product env sigma ref t =
 	  else 
 	     errorlabstrm "" 
 	       (str "Cannot recognize an atomic statement based on " ++ 
-	        Nametab.pr_global_env Idset.empty ref)
+	        Nametab.pr_global_env Idset.empty ref ++ str".")
       | _ ->
 	  try 
 	    if global_of_constr c = ref 
@@ -870,7 +870,7 @@ let reduce_to_ref_gen allow_product env sigma ref t =
           with NotStepReducible ->
 	    errorlabstrm ""
 	      (str "Cannot recognize a statement based on " ++ 
-	       Nametab.pr_global_env Idset.empty ref)
+	       Nametab.pr_global_env Idset.empty ref ++ str".")
   in
   elimrec env t []
 
diff --git a/pretyping/termops.ml b/pretyping/termops.ml
index e31024bb..1ce53e88 100644
--- a/pretyping/termops.ml
+++ b/pretyping/termops.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: termops.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: termops.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -639,7 +639,7 @@ let error_invalid_occurrence l =
   let l = list_uniquize (List.sort Pervasives.compare l) in
   errorlabstrm ""
     (str ("Invalid occurrence " ^ plural (List.length l) "number" ^": ") ++ 
-     prlist_with_sep spc int l)
+     prlist_with_sep spc int l ++ str ".")
 
 let subst_term_occ_gen (nowhere_except_in,locs) occ c t =
   let maxocc = List.fold_right max locs 0 in
@@ -817,21 +817,15 @@ let names_of_rel_context env =
 
 (**** Globality of identifiers *)
 
-(* TODO temporary hack!!! *)
 let rec is_imported_modpath = function
-  | MPfile dp -> dp <> (Lib.library_dp ())
-(*  | MPdot (mp,_) -> is_imported_modpath mp *)
-  | _ -> false
+  | MPfile dp -> true
+  | p -> false
 
 let is_imported_ref = function
   | VarRef _ -> false
   | IndRef (kn,_)
-  | ConstructRef ((kn,_),_) 
-(*  | ModTypeRef ln  *) -> 
+  | ConstructRef ((kn,_),_) ->
       let (mp,_,_) = repr_kn kn in is_imported_modpath mp
-(*  | ModRef mp ->
-      is_imported_modpath mp
-*)
   | ConstRef kn ->
       let (mp,_,_) = repr_con kn in is_imported_modpath mp
 
diff --git a/pretyping/termops.mli b/pretyping/termops.mli
index 94aff66f..645b7d72 100644
--- a/pretyping/termops.mli
+++ b/pretyping/termops.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: termops.mli 11166 2008-06-22 13:23:35Z herbelin $ i*)
+(*i $Id: termops.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 open Util
 open Pp
@@ -185,7 +185,7 @@ val mkLambda_or_LetIn_name : env -> constr -> rel_declaration -> constr
 val it_mkProd_or_LetIn_name   : env -> types -> rel_context -> types
 val it_mkLambda_or_LetIn_name : env -> constr -> rel_context -> constr
 
-(* Get the last arg of a constr intended to be nn application *)
+(* Get the last arg of a constr intended to be an application *)
 val last_arg : constr -> constr
 
 (* name contexts *)
diff --git a/pretyping/typeclasses.ml b/pretyping/typeclasses.ml
index a2392033..86168a1f 100644
--- a/pretyping/typeclasses.ml
+++ b/pretyping/typeclasses.ml
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: typeclasses.ml 11143 2008-06-18 15:52:42Z msozeau $ i*)
+(*i $Id: typeclasses.ml 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -35,12 +35,10 @@ type typeclass = {
   cl_impl : global_reference; 
 
   (* Context in which the definitions are typed. Includes both typeclass parameters and superclasses. *)
-  cl_context : ((global_reference * bool) option * named_declaration) list; 
-
-  cl_params: int;
+  cl_context : ((global_reference * bool) option * rel_declaration) list; 
 
   (* Context of definitions and properties on defs, will not be shared *)
-  cl_props : named_context;
+  cl_props : rel_context;
   
   (* The method implementaions as projections. *)
   cl_projs : (identifier * constant) list;
@@ -111,13 +109,13 @@ let gmap_cmap_merge old ne =
     Gmap.fold (fun cl insts acc -> 
       let oldinsts = try Gmap.find cl old with Not_found -> Cmap.empty in
 	Gmap.add cl (cmap_union oldinsts insts) acc)
-      Gmap.empty ne
+      ne Gmap.empty
   in
     Gmap.fold (fun cl insts acc -> 
       if Gmap.mem cl ne' then acc
       else Gmap.add cl insts acc)
-      ne' old
-      
+      old ne'
+
 let add_instance_hint_ref = ref (fun id pri -> assert false)
 let register_add_instance_hint =
   (:=) add_instance_hint_ref
@@ -154,7 +152,7 @@ let subst (_,subst,(cl,m,inst)) =
   let do_subst_projs projs = list_smartmap (fun (x, y) -> (x, do_subst_con y)) projs in
   let subst_class k cl classes = 
     let k = do_subst_gr k in
-    let cl' = { cl with cl_impl = k;
+    let cl' = { cl_impl = k;
 		cl_context = do_subst_ctx cl.cl_context;
 		cl_props = do_subst_named cl.cl_props;
 		cl_projs = do_subst_projs cl.cl_projs; }
@@ -176,8 +174,14 @@ let subst (_,subst,(cl,m,inst)) =
     (classes, m, instances)
 
 let discharge (_,(cl,m,inst)) =
-  let discharge_named (cl, r) =
-    Option.smartmap (fun (gr, b) -> Lib.discharge_global gr, b) cl, r
+  let discharge_context subst rel =
+    let ctx, _ =
+      List.fold_right
+	(fun (gr, (id, b, t)) (ctx, k) -> 
+	  let gr' = Option.map (fun (gr, b) -> Lib.discharge_global gr, b) gr in
+	    ((gr', (id, Option.map (substn_vars k subst) b, substn_vars k subst t)) :: ctx), succ k)
+	rel ([], 0)
+    in ctx
   in
   let abs_context cl =
     match cl.cl_impl with
@@ -190,10 +194,11 @@ let discharge (_,(cl,m,inst)) =
     let cl' =
       if cl_impl' == cl.cl_impl then cl
       else
+	let ctx = abs_context cl in
 	{ cl with cl_impl = cl_impl';
 	  cl_context = 
-	    List.map (fun x -> None, x) (abs_context cl) @	
-	      (list_smartmap discharge_named cl.cl_context);
+	    List.map (fun (na,impl,b,t) -> None, (Name na,b,t)) ctx @
+	      (discharge_context (List.map (fun (na, _, _, _) -> na) ctx) cl.cl_context);
 	  cl_projs = list_smartmap (fun (x, y) -> x, Lib.discharge_con y) cl.cl_projs }
     in Gmap.add cl_impl' cl' acc
   in
@@ -211,7 +216,7 @@ let discharge (_,(cl,m,inst)) =
   let instances = Gmap.fold subst_inst inst Gmap.empty in
     Some (classes, m, instances)
       
-let rebuild (_,(cl,m,inst)) =
+let rebuild (cl,m,inst) =
   let inst = 
     Gmap.map (fun insts -> 
       Cmap.fold (fun k is insts -> 
@@ -277,49 +282,14 @@ let add_instance i =
   add_instance_hint i.is_impl i.is_pri;
   update ()
 
+let all_instances () = 
+  Gmap.fold (fun k v acc -> 
+    Cmap.fold (fun k v acc -> v :: acc) v acc)
+    !instances []
+
 let instances r = 
   let cl = class_info r in instances_of cl
-
-let solve_instanciation_problem = ref (fun _ _ _ _ -> assert false)
-let solve_instanciations_problem = ref (fun _ _ _ _ _ -> assert false)
-
-let resolve_typeclass env ev evi (evd, defined as acc) =
-  try
-    assert(evi.evar_body = Evar_empty);
-    !solve_instanciation_problem env evd ev evi
-  with Exit -> acc
-
-let resolve_one_typeclass env types =
-  try
-    let evi = Evd.make_evar (Environ.named_context_val env) types in
-    let ev = 1 in
-    let evm = Evd.add Evd.empty ev evi in
-    let evd = Evd.create_evar_defs evm in
-    let evd', b = !solve_instanciation_problem env evd ev evi in
-      if b then 
-	let evm' = Evd.evars_of evd' in
-	  match Evd.evar_body (Evd.find evm' ev) with
-	      Evar_empty -> raise Not_found
-	    | Evar_defined c -> c
-      else raise Not_found
-  with Exit -> raise Not_found
-
-let resolve_one_typeclass_evd env evd types =
-  try
-    let ev = Evarutil.e_new_evar evd env types in
-    let (ev,_) = destEvar ev in
-    let evd', b =
-	!solve_instanciation_problem env !evd ev (Evd.find (Evd.evars_of !evd) ev)
-    in
-      evd := evd';
-      if b then 
-	let evm' = Evd.evars_of evd' in
-	  match Evd.evar_body (Evd.find evm' ev) with
-	      Evar_empty -> raise Not_found
-	    | Evar_defined c -> Evarutil.nf_evar evm' c
-      else raise Not_found
-  with Exit -> raise Not_found
-
+    
 let method_typeclass ref = 
   match ref with 
     | ConstRef c -> 
@@ -349,51 +319,6 @@ let is_implicit_arg k =
     | InternalHole -> true
     | _ -> false
 
-let destClassApp c = 
-  match kind_of_term c with
-    | App (ki, args) when isInd ki -> 
-	Some (destInd ki, args)
-    | _ when isInd c -> Some (destInd c, [||])
-    | _ -> None
-
-let is_independent evm ev = 
-  Evd.fold (fun ev' evi indep -> indep && 
-    (ev = ev' || 
-	evi.evar_body <> Evar_empty ||
-	not (Termops.occur_evar ev evi.evar_concl)))
-    evm true
-    
-
-(*   try !solve_instanciations_problem env (Evarutil.nf_evar_defs evd) *)
-(*   with _ -> *)
-(*   let evm = Evd.evars_of evd in *)
-(*   let tc_evars =  *)
-(*     let f ev evi acc = *)
-(*       let (l, k) = Evd.evar_source ev evd in *)
-(* 	if not check || is_implicit_arg k then *)
-(* 	  match destClassApp evi.evar_concl with *)
-(* 	    | Some (i, args) when is_class i ->  *)
-(* 		Evd.add acc ev evi *)
-(* 	    | _ -> acc *)
-(* 	else acc *)
-(*     in Evd.fold f evm Evd.empty *)
-(*   in *)
-(*   let rec sat evars = *)
-(*     let evm = Evd.evars_of evars in *)
-(*     let (evars', progress) =  *)
-(*       Evd.fold  *)
-(* 	(fun ev evi acc ->  *)
-(* 	  if (Evd.mem tc_evars ev || not (Evd.mem evm ev))  *)
-(* 	    && evi.evar_body = Evar_empty then *)
-(* 	    resolve_typeclass env ev evi acc  *)
-(* 	  else acc) *)
-(* 	evm (evars, false)  *)
-(*     in *)
-(*       if not progress then evars' *)
-(*       else *)
-(* 	sat (Evarutil.nf_evar_defs evars') *)
-(*   in sat (Evarutil.nf_evar_defs evd) *)
-  
 let class_of_constr c = 
   let extract_cl c =
     try Some (class_info (global_of_constr c)) with _ -> None
@@ -432,26 +357,26 @@ let mark_unresolvables sigma =
     Evd.add evs ev (mark_unresolvable evi))
     sigma Evd.empty
     
+let rec is_class_type c =
+  match kind_of_term c with
+  | Prod (_, _, t) -> is_class_type t
+  | _ -> class_of_constr c <> None
+
+let is_class_evar evi = 
+  is_class_type evi.Evd.evar_concl
+    
 let has_typeclasses evd =
   Evd.fold (fun ev evi has -> has || 
-    (evi.evar_body = Evar_empty && class_of_constr evi.evar_concl <> None 
-	&& is_resolvable evi))
+    (evi.evar_body = Evar_empty && is_class_evar evi && is_resolvable evi))
     evd false
 
+let solve_instanciations_problem = ref (fun _ _ _ _ _ -> assert false)
+let solve_instanciation_problem = ref (fun _ _ _ -> assert false)
+
 let resolve_typeclasses ?(onlyargs=false) ?(split=true) ?(fail=true) env evd =
   if not (has_typeclasses (Evd.evars_of evd)) then evd
   else
     !solve_instanciations_problem env (Evarutil.nf_evar_defs evd) onlyargs split fail
 
-type substitution = (identifier * constr) list
-
-let substitution_of_named_context isevars env id n subst l = 
-  List.fold_right
-    (fun (na, _, t) subst -> 
-      let t' = replace_vars subst t in
-      let b = Evarutil.e_new_evar isevars env ~src:(dummy_loc, ImplicitArg (VarRef id, (n, Some na))) t' in
-	(na, b) :: subst)
-    l subst
-
-let nf_substitution sigma subst = 
-  List.map (function (na, c) -> na, Reductionops.nf_evar sigma c) subst
+let resolve_one_typeclass env evm t =
+  !solve_instanciation_problem env evm t
diff --git a/pretyping/typeclasses.mli b/pretyping/typeclasses.mli
index a3118053..fdbb78a9 100644
--- a/pretyping/typeclasses.mli
+++ b/pretyping/typeclasses.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: typeclasses.mli 11161 2008-06-21 14:32:47Z msozeau $ i*)
+(*i $Id: typeclasses.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -30,12 +30,10 @@ type typeclass = {
 
   (* Context in which the definitions are typed. Includes both typeclass parameters and superclasses. 
      The boolean indicates if the typeclass argument is a direct superclass. *)
-  cl_context : ((global_reference * bool) option * named_declaration) list; 
-
-  cl_params : int; (* This is the length of the suffix of the context which should be considered explicit parameters. *)
+  cl_context : ((global_reference * bool) option * rel_declaration) list; 
 
   (* Context of definitions and properties on defs, will not be shared *)
-  cl_props : named_context;
+  cl_props : rel_context;
 
   (* The methods implementations of the typeclass as projections. *)
   cl_projs : (identifier * constant) list;
@@ -43,33 +41,32 @@ type typeclass = {
 
 type instance
 
-val instance_impl : instance -> constant
-
-val new_instance : typeclass -> int option -> bool -> constant -> instance
-  
 val instances : global_reference -> instance list
 val typeclasses : unit -> typeclass list
+val all_instances : unit -> instance list
+
 val add_class : typeclass -> unit
-val add_instance : instance -> unit
 
-val register_add_instance_hint : (constant -> int option -> unit) -> unit
-val add_instance_hint : constant -> int option -> unit
+val new_instance : typeclass -> int option -> bool -> constant -> instance
+val add_instance : instance -> unit
 
 val class_info : global_reference -> typeclass (* raises a UserError if not a class *)
-val is_class : global_reference -> bool
+
 val class_of_constr : constr -> typeclass option
 val dest_class_app : constr -> typeclass * constr array (* raises a UserError if not a class *)
 
+val instance_impl : instance -> constant
+
+val is_class : global_reference -> bool
 val is_instance : global_reference -> bool
 val is_method : constant -> bool
 
+val is_implicit_arg : hole_kind -> bool
+
 (* Returns the term and type for the given instance of the parameters and fields
    of the type class. *)
-val instance_constructor : typeclass -> constr list -> constr * types
 
-val resolve_one_typeclass : env -> types -> types (* Raises Not_found *)
-val resolve_one_typeclass_evd : env -> evar_defs ref -> types -> types (* Raises Not_found *)
-val resolve_typeclass : env -> evar -> evar_info -> evar_defs * bool -> evar_defs * bool
+val instance_constructor : typeclass -> constr list -> constr * types
 
 (* Use evar_extra for marking resolvable evars. *)
 val bool_in : bool -> Dyn.t
@@ -78,28 +75,15 @@ val bool_out : Dyn.t -> bool
 val is_resolvable : evar_info -> bool
 val mark_unresolvable : evar_info -> evar_info
 val mark_unresolvables : evar_map -> evar_map
+val is_class_evar : evar_info -> bool
 
-val resolve_typeclasses : ?onlyargs:bool -> ?split:bool -> ?fail:bool -> env -> evar_defs -> evar_defs
-
-val solve_instanciation_problem : (env -> evar_defs -> existential_key -> evar_info -> evar_defs * bool) ref
-val solve_instanciations_problem : (env -> evar_defs -> bool -> bool -> bool -> evar_defs) ref
-
-type substitution = (identifier * constr) list
+val resolve_typeclasses : ?onlyargs:bool -> ?split:bool -> ?fail:bool -> 
+  env -> evar_defs -> evar_defs
+val resolve_one_typeclass : env -> evar_map -> types -> constr
 
-val substitution_of_named_context : 
-  evar_defs ref -> env -> identifier -> int ->
-  substitution -> named_context -> substitution
-
-val nf_substitution : evar_map -> substitution -> substitution
-
-val is_implicit_arg : hole_kind -> bool
-
-(* debug *)
+val register_add_instance_hint : (constant -> int option -> unit) -> unit
+val add_instance_hint : constant -> int option -> unit
 
-(* val subst :  *)
-(*     'a * Mod_subst.substitution * *)
-(*     ((Libnames.global_reference, typeclass) Gmap.t * 'b * *)
-(*      ('c, instance list) Gmap.t) -> *)
-(*     (Libnames.global_reference, typeclass) Gmap.t * 'b * *)
-(*     ('c, instance list) Gmap.t *)
+val solve_instanciations_problem : (env -> evar_defs -> bool -> bool -> bool -> evar_defs) ref
+val solve_instanciation_problem : (env -> evar_map -> types -> constr) ref
 
diff --git a/pretyping/typeclasses_errors.ml b/pretyping/typeclasses_errors.ml
index 9faac94d..8844baab 100644
--- a/pretyping/typeclasses_errors.ml
+++ b/pretyping/typeclasses_errors.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: typeclasses_errors.ml 11150 2008-06-19 11:38:27Z msozeau $ i*)
+(*i $Id: typeclasses_errors.ml 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -29,7 +29,7 @@ type typeclass_error =
     | UnboundMethod of global_reference * identifier located (* Class name, method *)
     | NoInstance of identifier located * constr list
     | UnsatisfiableConstraints of evar_defs * (evar_info * hole_kind) option
-    | MismatchedContextInstance of contexts * constr_expr list * named_context (* found, expected *)
+    | MismatchedContextInstance of contexts * constr_expr list * rel_context (* found, expected *)
 
 exception TypeClassError of env * typeclass_error
 
diff --git a/pretyping/typeclasses_errors.mli b/pretyping/typeclasses_errors.mli
index 6491372f..a79307d0 100644
--- a/pretyping/typeclasses_errors.mli
+++ b/pretyping/typeclasses_errors.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: typeclasses_errors.mli 11105 2008-06-11 13:47:21Z msozeau $ i*)
+(*i $Id: typeclasses_errors.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -29,7 +29,7 @@ type typeclass_error =
     | UnboundMethod of global_reference * identifier located (* Class name, method *)
     | NoInstance of identifier located * constr list
     | UnsatisfiableConstraints of evar_defs * (evar_info * hole_kind) option
-    | MismatchedContextInstance of contexts * constr_expr list * named_context (* found, expected *)
+    | MismatchedContextInstance of contexts * constr_expr list * rel_context (* found, expected *)
 
 exception TypeClassError of env * typeclass_error
 
@@ -41,4 +41,4 @@ val no_instance : env -> identifier located -> constr list -> 'a
 
 val unsatisfiable_constraints : env -> evar_defs -> evar option -> 'a
 
-val mismatched_ctx_inst : env -> contexts -> constr_expr list -> named_context -> 'a
+val mismatched_ctx_inst : env -> contexts -> constr_expr list -> rel_context -> 'a
diff --git a/pretyping/unification.ml b/pretyping/unification.ml
index fc812594..b3c920a2 100644
--- a/pretyping/unification.ml
+++ b/pretyping/unification.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: unification.ml 11157 2008-06-21 10:45:51Z herbelin $ *)
+(* $Id: unification.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -239,9 +239,9 @@ let unify_0_with_initial_metas subst conv_at_top env sigma cv_pb flags m n =
       | Some c ->
 	  unirec_rec curenv pb b substn cM (whd_betaiotazeta (mkApp(c,l2)))
       | None ->
-      error_cannot_unify env sigma (cM,cN)
+      error_cannot_unify curenv sigma (cM,cN)
     else
-      error_cannot_unify env sigma (cM,cN)
+      error_cannot_unify curenv sigma (cM,cN)
 
   in
     if (not(occur_meta m)) &&
diff --git a/proofs/evar_refiner.ml b/proofs/evar_refiner.ml
index 99ab7ef1..d19d81e0 100644
--- a/proofs/evar_refiner.ml
+++ b/proofs/evar_refiner.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: evar_refiner.ml 11047 2008-06-03 23:08:00Z msozeau $ *)
+(* $Id: evar_refiner.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -22,25 +22,28 @@ open Refiner
 
 (* w_tactic pour instantiate *) 
 
-let w_refine ev rawc evd =
-  if Evd.is_defined (evars_of evd) ev then 
+let w_refine evk rawc evd =
+  if Evd.is_defined (evars_of evd) evk then 
     error "Instantiate called on already-defined evar";
-  let e_info = Evd.find (evars_of evd) ev in
+  let e_info = Evd.find (evars_of evd) evk in
   let env = Evd.evar_env e_info in
-  let sigma,typed_c = 
+  let sigma,typed_c =
     try Pretyping.Default.understand_tcc ~resolve_classes:false
       (evars_of evd) env ~expected_type:e_info.evar_concl rawc
-    with _ -> error ("The term is not well-typed in the environment of " ^
-			string_of_existential ev)
+    with _ ->
+      let loc = Rawterm.loc_of_rawconstr rawc in
+      user_err_loc 
+        (loc,"",Pp.str ("Instance is not well-typed in the environment of " ^
+			string_of_existential evk))
   in
-    evar_define ev typed_c (evars_reset_evd sigma evd)
+    evar_define evk typed_c (evars_reset_evd sigma evd)
 
 (* vernac command Existential *)
 
 let instantiate_pf_com n com pfts = 
   let gls = top_goal_of_pftreestate pfts in
   let sigma = gls.sigma in 
-  let (sp,evi) (* as evc *) = 
+  let (evk,evi) = 
     let evl = Evarutil.non_instantiated sigma in
       if (n <= 0) then
 	error "incorrect existential variable index"
@@ -52,5 +55,5 @@ let instantiate_pf_com n com pfts =
   let env = Evd.evar_env evi in
   let rawc = Constrintern.intern_constr sigma env com in 
   let evd = create_goal_evar_defs sigma in
-  let evd' = w_refine sp rawc evd in
+  let evd' = w_refine evk rawc evd in
     change_constraints_pftreestate (evars_of evd') pfts
diff --git a/proofs/logic.ml b/proofs/logic.ml
index 6e78f134..21ee9a9f 100644
--- a/proofs/logic.ml
+++ b/proofs/logic.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: logic.ml 10877 2008-04-30 21:58:41Z herbelin $ *)
+(* $Id: logic.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -27,6 +27,7 @@ open Typeops
 open Type_errors
 open Retyping
 open Evarutil
+open Tacexpr
  
 type refiner_error =
 
@@ -47,13 +48,15 @@ open Pretype_errors
 
 let rec catchable_exception = function
   | Stdpp.Exc_located(_,e) -> catchable_exception e
+  | LtacLocated(_,e) -> catchable_exception e
   | Util.UserError _ | TypeError _ 
   | RefinerError _ | Indrec.RecursionSchemeError _
   | Nametab.GlobalizationError _ | PretypeError (_,VarNotFound _)
   (* unification errors *)
   | PretypeError(_,(CannotUnify _|CannotUnifyLocal _|CannotGeneralize _
 		   |NoOccurrenceFound _|CannotUnifyBindingType _|NotClean _
-		   |CannotFindWellTypedAbstraction _)) -> true
+		   |CannotFindWellTypedAbstraction _
+		   |UnsolvableImplicit _)) -> true
   | _ -> false
 
 (* Tells if the refiner should check that the submitted rules do not
@@ -70,11 +73,10 @@ let with_check = Flags.with_option check
    (instead of iterating on the list of identifier to be removed, which
    forces the user to give them in order). *)
 
-let clear_hyps sigma ids gl =
+let clear_hyps sigma ids sign cl =
   let evdref = ref (Evd.create_goal_evar_defs sigma) in
-  let (hyps,concl) =
-    Evarutil.clear_hyps_in_evi evdref gl.evar_hyps gl.evar_concl ids in
-    (mk_goal hyps concl gl.evar_extra, evars_of !evdref)
+  let (hyps,concl) = Evarutil.clear_hyps_in_evi evdref sign cl ids in
+  (hyps,concl,evars_of !evdref)
 
 (* The ClearBody tactic *)
 
@@ -83,13 +85,13 @@ let clear_hyps sigma ids gl =
 let apply_to_hyp sign id f =
   try apply_to_hyp sign id f 
   with Hyp_not_found -> 
-    if !check then error "No such assumption"
+    if !check then error "No such assumption."
     else sign
 
 let apply_to_hyp_and_dependent_on sign id f g =
   try apply_to_hyp_and_dependent_on sign id f g 
   with Hyp_not_found -> 
-    if !check then error "No such assumption"
+    if !check then error "No such assumption."
     else sign
 
 let check_typability env sigma c =
@@ -109,7 +111,7 @@ let remove_hyp_body env sigma id =
     apply_to_hyp_and_dependent_on (named_context_val env) id
       (fun (_,c,t) _ ->
 	match c with
-	| None -> error ((string_of_id id)^" is not a local definition")
+	| None -> error ((string_of_id id)^" is not a local definition.")
 	| Some c ->(id,None,t))
       (fun (id',c,t as d) sign ->
 	(if !check then
@@ -126,24 +128,42 @@ let remove_hyp_body env sigma id =
 
 (* Auxiliary functions for primitive MOVE tactic
  *
- * [move_after with_dep toleft (left,(hfrom,typfrom),right) hto] moves
- * hyp [hfrom] just after the hyp [hto] which belongs to the hyps on the 
+ * [move_hyp with_dep toleft (left,(hfrom,typfrom),right) hto] moves
+ * hyp [hfrom] at location [hto] which belongs to the hyps on the 
  * left side [left] of the full signature if [toleft=true] or to the hyps 
  * on the right side [right] if [toleft=false].
  * If [with_dep] then dependent hypotheses are moved accordingly. *)
 
+let error_no_such_hypothesis id =
+  error ("No such hypothesis: " ^ string_of_id id ^ ".")
+
+let rec get_hyp_after h = function
+  | [] -> error_no_such_hypothesis h
+  | (hyp,_,_) :: right ->
+      if hyp = h then
+	match right with (id,_,_)::_ -> MoveBefore id | [] -> MoveToEnd false
+      else
+       get_hyp_after h right
+
 let split_sign hfrom hto l =
   let rec splitrec left toleft = function
-    | [] -> error ("No such hypothesis : " ^ (string_of_id hfrom))
+    | [] -> error_no_such_hypothesis hfrom
     | (hyp,c,typ) as d :: right ->
       	if hyp = hfrom then 
-	  (left,right,d,toleft) 
-      	else 
-	  splitrec (d::left) (toleft or (hyp = hto)) right
+	  (left,right,d, toleft or hto = MoveToEnd true)
+      	else
+	  splitrec (d::left) 
+	    (toleft or hto = MoveAfter hyp or hto = MoveBefore hyp)
+	    right
   in 
     splitrec [] false l
 
-let move_after with_dep toleft (left,(idfrom,_,_ as declfrom),right) hto =
+let hyp_of_move_location = function
+  | MoveAfter id -> id 
+  | MoveBefore id -> id
+  | _ -> assert false
+
+let move_hyp with_dep toleft (left,(idfrom,_,_ as declfrom),right) hto =
   let env = Global.env() in
   let test_dep (hyp,c,typ as d) (hyp2,c,typ2 as d2) =
     if toleft
@@ -151,23 +171,27 @@ let move_after with_dep toleft (left,(idfrom,_,_ as declfrom),right) hto =
     else occur_var_in_decl env hyp d2
   in
   let rec moverec first middle = function
-    | [] -> error ("No such hypothesis : " ^ (string_of_id hto))
+    | [] ->
+	if match hto with MoveToEnd _ -> false | _ -> true then
+	  error_no_such_hypothesis (hyp_of_move_location hto);
+	List.rev first @ List.rev middle
+    | (hyp,_,_) :: _ as right when hto = MoveBefore hyp ->
+	List.rev first @ List.rev middle @ right
     | (hyp,_,_) as d :: right ->
 	let (first',middle') =
       	  if List.exists (test_dep d) middle then 
-	    if with_dep & (hyp <> hto) then 
+	    if with_dep & hto <> MoveAfter hyp then 
 	      (first, d::middle)
             else 
-	      error 
-		("Cannot move "^(string_of_id idfrom)^" after "
-		 ^(string_of_id hto)
-		 ^(if toleft then ": it occurs in " else ": it depends on ")
-		 ^(string_of_id hyp))
-          else 
+	      errorlabstrm "" (str "Cannot move " ++ pr_id idfrom ++
+	        pr_move_location pr_id hto ++ 
+	        str (if toleft then ": it occurs in " else ": it depends on ")
+	        ++ pr_id hyp ++ str ".")
+          else
 	    (d::first, middle)
 	in
-      	if hyp = hto then 
-	  (List.rev first')@(List.rev middle')@right
+      	if hto = MoveAfter hyp then
+	  List.rev first' @ List.rev middle' @ right
       	else 
 	  moverec first' middle' right
   in
@@ -183,53 +207,11 @@ let move_after with_dep toleft (left,(idfrom,_,_ as declfrom),right) hto =
     List.fold_left (fun sign d -> push_named_context_val d sign)
       right left
 
-let check_backward_dependencies sign d =
-  if not (Idset.for_all
-	    (fun id -> mem_named_context id sign)
-	    (global_vars_set_of_decl (Global.env()) d))
-  then
-    error "Can't introduce at that location: free variable conflict"
-
-
-let check_forward_dependencies id tail =
-  let env = Global.env() in
-  List.iter
-    (function (id',_,_ as decl) ->
-       if occur_var_in_decl env id decl then
-	 error ((string_of_id id) ^ " is used in hypothesis " 
-		^ (string_of_id id')))
-    tail
-
-let check_goal_dependency id cl =
-  let env = Global.env() in
-    if Idset.mem id (global_vars_set env cl) then
-      error (string_of_id id^" is used in conclusion")
-
 let rename_hyp id1 id2 sign =
   apply_to_hyp_and_dependent_on sign id1
     (fun (_,b,t) _ -> (id2,b,t))
     (fun d _ -> map_named_declaration (replace_vars [id1,mkVar id2]) d)
 
-let replace_hyp sign id d cl =
-  if !check then
-    check_goal_dependency id cl;
-  apply_to_hyp sign id
-    (fun sign _ tail ->
-      if !check then
-	(check_backward_dependencies sign d;
-	 check_forward_dependencies id tail); 
-      d)
-
-(* why we dont check that id does not appear in tail ??? *)
-let insert_after_hyp sign id d =
-  try 
-    insert_after_hyp sign id d 
-      (fun sign ->
-	if !check then check_backward_dependencies sign d)
-  with Hyp_not_found ->
-    if !check then error "No such assumption"
-    else sign
-
 (************************************************************************)
 (************************************************************************)
 (* Implementation of the logical rules *)
@@ -375,19 +357,14 @@ and mk_casegoals sigma goal goalacc p c =
   (acc'',lbrty,conclty)
 
 
-let error_use_instantiate () =
-  errorlabstrm "Logic.prim_refiner"
-    (str"cannot intro when there are open metavars in the domain type" ++
-       spc () ++ str"- use Instantiate")
-
 let convert_hyp sign sigma (id,b,bt as d) =
   apply_to_hyp sign id
     (fun _ (_,c,ct) _ ->
        let env = Global.env_of_context sign in
        if !check && not (is_conv env sigma bt ct) then
-	 error ("Incorrect change of the type of "^(string_of_id id));
+	 error ("Incorrect change of the type of "^(string_of_id id)^".");
        if !check && not (Option.Misc.compare (is_conv env sigma) b c) then
-	 error ("Incorrect change of the body of "^(string_of_id id));
+	 error ("Incorrect change of the body of "^(string_of_id id)^".");
        d)
 
 (* Normalizing evars in a goal. Called by tactic Local_constraints
@@ -420,12 +397,10 @@ let prim_refiner r sigma goal =
 	  error "New variable is already declared";
         (match kind_of_term (strip_outer_cast cl) with
 	   | Prod (_,c1,b) ->
-	       if occur_meta c1 then error_use_instantiate();
 	       let sg = mk_goal (push_named_context_val (id,None,c1) sign)
 			  (subst1 (mkVar id) b) in
 	       ([sg], sigma)
 	   | LetIn (_,c1,t1,b) ->
-	       if occur_meta c1 or occur_meta t1 then error_use_instantiate();
 	       let sg =
 		 mk_goal (push_named_context_val (id,Some c1,t1) sign)
 		   (subst1 (mkVar id) b) in
@@ -433,28 +408,19 @@ let prim_refiner r sigma goal =
 	   | _ ->
 	       raise (RefinerError IntroNeedsProduct))
 	
-    | Intro_replacing id ->
-	(match kind_of_term (strip_outer_cast cl) with
-           | Prod (_,c1,b) ->
-	       if occur_meta c1 then error_use_instantiate();
-	       let sign' = replace_hyp sign id (id,None,c1) cl in
-	       let sg = mk_goal sign' (subst1 (mkVar id) b) in
-	       ([sg], sigma)
-           | LetIn (_,c1,t1,b) ->
-	       if occur_meta c1 then error_use_instantiate();
-	       let sign' = replace_hyp sign id (id,Some c1,t1) cl in
-	       let sg = mk_goal sign' (subst1 (mkVar id) b) in
-	       ([sg], sigma)
-	   | _ ->
-	       raise (RefinerError IntroNeedsProduct))
-	
-    | Cut (b,id,t) ->
-    	if !check && mem_named_context id (named_context_of_val sign) then
-	  error "New variable is already declared";
-        if occur_meta t then error_use_instantiate();
+    | Cut (b,replace,id,t) ->
         let sg1 = mk_goal sign (nf_betaiota t) in
-        let sg2 = mk_goal (push_named_context_val (id,None,t) sign) cl in
-        if b then ([sg1;sg2],sigma) else ([sg2;sg1], sigma)
+	let sign,cl,sigma =
+	  if replace then
+	    let nexthyp = get_hyp_after id (named_context_of_val sign) in
+	    let sign,cl,sigma = clear_hyps sigma [id] sign cl in
+	    move_hyp true false ([],(id,None,t),named_context_of_val sign)
+	      nexthyp,
+	      cl,sigma
+	  else
+	    (push_named_context_val (id,None,t) sign),cl,sigma in
+        let sg2 = mk_goal sign cl in
+        if b then ([sg1;sg2],sigma) else ([sg2;sg1],sigma)
 
     | FixRule (f,n,rest) ->
      	let rec check_ind env k cl = 
@@ -464,10 +430,10 @@ let prim_refiner r sigma goal =
 		  try 
 		    fst (find_inductive env sigma c1)
 		  with Not_found -> 
-		    error "cannot do a fixpoint on a non inductive type"
+		    error "Cannot do a fixpoint on a non inductive type."
             	else 
 		  check_ind (push_rel (na,None,c1) env) (k-1) b
-            | _ -> error "not enough products"
+            | _ -> error "Not enough products."
 	in
 	let (sp,_) = check_ind env n cl in
 	let all = (f,n,cl)::rest in
@@ -475,10 +441,10 @@ let prim_refiner r sigma goal =
 	  | (f,n,ar)::oth ->
 	      let (sp',_)  = check_ind env n ar in 
 	      if not (sp=sp') then 
-		error ("fixpoints should be on the same " ^ 
-		       "mutual inductive declaration");
+		error ("Fixpoints should be on the same " ^ 
+		       "mutual inductive declaration.");
 	      if !check && mem_named_context f (named_context_of_val sign) then
-		error "name already used in the environment";
+		error "Name already used in the environment";
 	      mk_sign (push_named_context_val (f,None,ar) sign) oth
 	  | [] -> 
 	      List.map (fun (_,_,c) -> mk_goal sign c) all
@@ -495,8 +461,7 @@ let prim_refiner r sigma goal =
 		  let _ = find_coinductive env sigma b in ()
                 with Not_found -> 
 		  error ("All methods must construct elements " ^
-			  "in coinductiv-> goal
-e types")
+			  "in coinductive types.")
 	in
 	let all = (f,cl)::others in
      	List.iter (fun (_,c) -> check_is_coind env c) all;
@@ -504,7 +469,7 @@ e types")
           | (f,ar)::oth ->
 	      (try
                 (let _ = lookup_named_val f sign in
-                error "name already used in the environment")
+                error "Name already used in the environment.")
               with
               |	Not_found ->
                   mk_sign (push_named_context_val (f,None,ar) sign) oth)
@@ -533,8 +498,8 @@ e types")
 
     (* And now the structural rules *)
     | Thin ids -> 
-	let (ngl, nsigma) = clear_hyps sigma ids goal in
-	  ([ngl], nsigma)
+	let (hyps,concl,nsigma) = clear_hyps sigma ids sign cl in
+	  ([mk_goal hyps concl], nsigma)
 	
     | ThinBody ids ->
 	let clear_aux env id =
@@ -550,13 +515,13 @@ e types")
   	let (left,right,declfrom,toleft) = 
 	  split_sign hfrom hto (named_context_of_val sign) in
   	let hyps' = 
-	  move_after withdep toleft (left,declfrom,right) hto in
+	  move_hyp withdep toleft (left,declfrom,right) hto in
   	  ([mk_goal hyps' cl], sigma)
 
     | Rename (id1,id2) ->
         if !check & id1 <> id2 &&
 	  List.mem id2 (ids_of_named_context (named_context_of_val sign)) then
-          error ((string_of_id id2)^" is already used");
+          error ((string_of_id id2)^" is already used.");
         let sign' = rename_hyp id1 id2 sign in
         let cl' = replace_vars [id1,mkVar id2] cl in
           ([mk_goal sign' cl'], sigma)
@@ -617,20 +582,9 @@ let prim_extractor subfun vl pft =
 		let cb = subst_proof_vars vl b in
 		let cty = subst_proof_vars vl ty in
 		  mkLetIn (Name id, cb, cty, subfun (add_proof_var id vl) spf)
-	    | _ -> error "incomplete proof!")
+	    | _ -> error "Incomplete proof!")
 	    
-      | Some (Prim (Intro_replacing id),[spf]) ->
-	  (match kind_of_term (strip_outer_cast cl) with
-	    | Prod (_,ty,_) ->
-		let cty = subst_proof_vars vl ty in
-		  mkLambda (Name id, cty, subfun (add_proof_var id vl) spf)
-	    | LetIn (_,b,ty,_) ->
-		let cb = subst_proof_vars vl b in
-		let cty = subst_proof_vars vl ty in
-		  mkLetIn (Name id, cb, cty, subfun (add_proof_var id vl) spf)
-	    | _ -> error "incomplete proof!")
-
-      | Some (Prim (Cut (b,id,t)),[spf1;spf2]) ->
+      | Some (Prim (Cut (b,_,id,t)),[spf1;spf2]) ->
           let spf1, spf2 = if b then spf1, spf2 else spf2, spf1 in
 	    mkLetIn (Name id,subfun vl spf1,subst_proof_vars vl t,
                     subfun (add_proof_var id vl) spf2)
diff --git a/proofs/proof_type.ml b/proofs/proof_type.ml
index dbe40780..41935c9c 100644
--- a/proofs/proof_type.ml
+++ b/proofs/proof_type.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: proof_type.ml 9842 2007-05-20 17:44:23Z herbelin $ *)
+(*i $Id: proof_type.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (*i*)
 open Environ
@@ -28,8 +28,7 @@ open Pattern
 
 type prim_rule =
   | Intro of identifier
-  | Intro_replacing of identifier
-  | Cut of bool * identifier * types
+  | Cut of bool * bool * identifier * types
   | FixRule of identifier * int * (identifier * int * constr) list
   | Cofix of identifier * (identifier * constr) list
   | Refine of constr
@@ -37,7 +36,7 @@ type prim_rule =
   | Convert_hyp of named_declaration
   | Thin of identifier list
   | ThinBody of identifier list
-  | Move of bool * identifier * identifier
+  | Move of bool * identifier * identifier move_location
   | Rename of identifier * identifier
   | Change_evars
 
@@ -94,3 +93,16 @@ and tactic_arg =
 
 type hyp_location = identifier Tacexpr.raw_hyp_location
 
+type ltac_call_kind = 
+  | LtacNotationCall of string
+  | LtacNameCall of ltac_constant
+  | LtacAtomCall of glob_atomic_tactic_expr * atomic_tactic_expr option ref
+  | LtacVarCall of identifier * glob_tactic_expr
+  | LtacConstrInterp of rawconstr *
+      ((identifier * constr) list * (identifier * identifier option) list)
+
+type ltac_trace = (loc * ltac_call_kind) list
+
+exception LtacLocated of (ltac_call_kind * ltac_trace * loc) * exn
+
+let abstract_tactic_box = ref (ref None)
diff --git a/proofs/proof_type.mli b/proofs/proof_type.mli
index 4fbcda4c..a7057a7d 100644
--- a/proofs/proof_type.mli
+++ b/proofs/proof_type.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: proof_type.mli 9842 2007-05-20 17:44:23Z herbelin $ i*)
+(*i $Id: proof_type.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Environ
@@ -28,8 +28,7 @@ open Pattern
 
 type prim_rule =
   | Intro of identifier
-  | Intro_replacing of identifier
-  | Cut of bool * identifier * types
+  | Cut of bool * bool * identifier * types
   | FixRule of identifier * int * (identifier * int * constr) list
   | Cofix of identifier * (identifier * constr) list
   | Refine of constr
@@ -37,7 +36,7 @@ type prim_rule =
   | Convert_hyp of named_declaration
   | Thin of identifier list
   | ThinBody of identifier list
-  | Move of bool * identifier * identifier
+  | Move of bool * identifier * identifier move_location
   | Rename of identifier * identifier
   | Change_evars
 
@@ -128,3 +127,17 @@ and tactic_arg =
      Tacexpr.gen_tactic_arg
 
 type hyp_location = identifier Tacexpr.raw_hyp_location
+
+type ltac_call_kind = 
+  | LtacNotationCall of string
+  | LtacNameCall of ltac_constant
+  | LtacAtomCall of glob_atomic_tactic_expr * atomic_tactic_expr option ref
+  | LtacVarCall of identifier * glob_tactic_expr
+  | LtacConstrInterp of rawconstr *
+      ((identifier * constr) list * (identifier * identifier option) list)
+
+type ltac_trace = (loc * ltac_call_kind) list
+
+exception LtacLocated of (ltac_call_kind * ltac_trace * loc) * exn
+
+val abstract_tactic_box : atomic_tactic_expr option ref ref
diff --git a/proofs/refiner.ml b/proofs/refiner.ml
index 172a7d70..6e08e741 100644
--- a/proofs/refiner.ml
+++ b/proofs/refiner.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: refiner.ml 11021 2008-05-29 16:48:18Z barras $ *)
+(* $Id: refiner.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -189,7 +189,6 @@ let leaf g =
 let check_subproof_connection gl spfl =
   list_for_all2eq (fun g pf -> Evd.eq_evar_info g pf.goal) gl spfl
 
-
 let abstract_operation syntax semantics gls =
   let (sgl_sigma,validation) = semantics gls in
   let hidden_proof = validation (List.map leaf sgl_sigma.it) in
@@ -204,6 +203,7 @@ let abstract_tactic_expr ?(dflt=false) te tacfun gls =
   abstract_operation (Tactic(te,dflt)) tacfun gls	
 
 let abstract_tactic ?(dflt=false) te =
+  !abstract_tactic_box := Some te;
   abstract_tactic_expr ~dflt (Tacexpr.TacAtom (dummy_loc,te))
 
 let abstract_extended_tactic ?(dflt=false) s args = 
@@ -491,13 +491,18 @@ let tclNOTSAMEGOAL (tac : tactic) goal =
       (str"Tactic generated a subgoal identical to the original goal.")
   else rslt
 
-let catch_failerror = function
-  | e when catchable_exception e -> check_for_interrupt ()
-  | FailError (0,_) | Stdpp.Exc_located(_, FailError (0,_)) ->
+let catch_failerror e =
+  if catchable_exception e then check_for_interrupt ()
+  else match e with
+  | FailError (0,_) | Stdpp.Exc_located(_, FailError (0,_)) 
+  | Stdpp.Exc_located(_, LtacLocated (_,FailError (0,_)))  ->
       check_for_interrupt ()
   | FailError (lvl,s) -> raise (FailError (lvl - 1, s))
-  | Stdpp.Exc_located (s,FailError (lvl,s')) ->
-      raise (Stdpp.Exc_located (s,FailError (lvl - 1, s')))
+  | Stdpp.Exc_located(s,FailError (lvl,s')) ->
+      raise (Stdpp.Exc_located(s,FailError (lvl - 1, s')))
+  | Stdpp.Exc_located(s,LtacLocated (s'',FailError (lvl,s')))  ->
+      raise
+       (Stdpp.Exc_located(s,LtacLocated (s'',FailError (lvl - 1,s'))))
   | e -> raise e
 
 (* ORELSE0 t1 t2 tries to apply t1 and if it fails, applies t2 *)
@@ -548,14 +553,8 @@ let ite_gen tcal tac_if continue tac_else gl=
     try 
       tcal tac_if0 continue gl
     with (* Breakpoint *)
-      | e when catchable_exception e ->
-	  check_for_interrupt (); tac_else0 e gl
-      | (FailError (0,_) | Stdpp.Exc_located(_, FailError (0,_))) as e ->
-	  check_for_interrupt (); tac_else0 e gl
-      | FailError (lvl,s) -> raise (FailError (lvl - 1, s))
-      | Stdpp.Exc_located (s,FailError (lvl,s')) ->
-	  raise (Stdpp.Exc_located (s,FailError (lvl - 1, s')))
-	
+      | e -> catch_failerror e; tac_else0 e gl
+
 (* Try the first tactic and, if it succeeds, continue with 
    the second one, and if it fails, use the third one *)
 
@@ -754,9 +753,7 @@ let extract_open_pftreestate pts =
 
 let extract_pftreestate pts =
   if pts.tstack <> [] then
-    errorlabstrm "extract_pftreestate"
-      (str"Cannot extract from a proof-tree in which we have descended;" ++
-         spc () ++ str"Please ascend to the root");
+    errorlabstrm "extract_pftreestate" (str"Proof blocks need to be closed");
   let pfterm,subgoals = extract_open_pftreestate pts in
   let exl = Evarutil.non_instantiated pts.tpfsigma in
   if subgoals <> [] or exl <> [] then
diff --git a/proofs/tacexpr.ml b/proofs/tacexpr.ml
index d0789980..8e51171f 100644
--- a/proofs/tacexpr.ml
+++ b/proofs/tacexpr.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: tacexpr.ml 11100 2008-06-11 11:10:31Z herbelin $ i*)
+(*i $Id: tacexpr.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Names
 open Topconstr
@@ -65,6 +65,20 @@ type hyp_location_flag = (* To distinguish body and type of local defs *)
 
 type 'a raw_hyp_location = 'a with_occurrences * hyp_location_flag
 
+type 'id move_location =
+  | MoveAfter of 'id
+  | MoveBefore of 'id
+  | MoveToEnd of bool
+
+let no_move = MoveToEnd true
+
+open Pp
+
+let pr_move_location pr_id = function
+  | MoveAfter id -> brk(1,1) ++ str "after " ++ pr_id id
+  | MoveBefore id -> brk(1,1) ++ str "before " ++ pr_id id
+  | MoveToEnd toleft -> str (if toleft then " at bottom" else " at top")
+
 type 'a induction_arg =
   | ElimOnConstr of 'a
   | ElimOnIdent of identifier located
@@ -76,8 +90,10 @@ type inversion_kind =
   | FullInversionClear
 
 type ('c,'id) inversion_strength =
-  | NonDepInversion of inversion_kind * 'id list * intro_pattern_expr
-  | DepInversion of inversion_kind * 'c option * intro_pattern_expr
+  | NonDepInversion of 
+      inversion_kind * 'id list * intro_pattern_expr located option
+  | DepInversion of
+      inversion_kind * 'c option * intro_pattern_expr located option
   | InversionUsing of 'c * 'id list
 
 type ('a,'b) location = HypLocation of 'a | ConclLocation of 'b
@@ -106,6 +122,11 @@ let simple_clause_of = function
 | _ ->
     error "not a simple clause (one hypothesis or conclusion)"
 
+type ('constr,'id) induction_clause = 
+    ('constr with_bindings induction_arg list * 'constr with_bindings option * 
+     (intro_pattern_expr located option * intro_pattern_expr located option) *
+     'id gclause option)
+
 type multi = 
   | Precisely of int
   | UpTo of int
@@ -130,14 +151,14 @@ type ('a,'t) match_rule =
 
 type ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_atomic_tactic_expr =
   (* Basic tactics *)
-  | TacIntroPattern of intro_pattern_expr list
+  | TacIntroPattern of intro_pattern_expr located list
   | TacIntrosUntil of quantified_hypothesis
-  | TacIntroMove of identifier option * identifier located option
+  | TacIntroMove of identifier option * 'id move_location
   | TacAssumption
   | TacExact of 'constr
   | TacExactNoCheck of 'constr
   | TacVmCastNoCheck of 'constr
-  | TacApply of advanced_flag * evars_flag * 'constr with_bindings
+  | TacApply of advanced_flag * evars_flag * 'constr with_bindings list
   | TacElim of evars_flag * 'constr with_bindings * 
       'constr with_bindings option
   | TacElimType of 'constr
@@ -149,19 +170,14 @@ type ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_atomic_tactic_expr =
   | TacCofix of identifier option
   | TacMutualCofix of hidden_flag * identifier * (identifier * 'constr) list
   | TacCut of 'constr
-  | TacAssert of 'tac option * intro_pattern_expr * 'constr
+  | TacAssert of 'tac option * intro_pattern_expr located * 'constr
   | TacGeneralize of ('constr with_occurrences * name) list
   | TacGeneralizeDep of 'constr
   | TacLetTac of name * 'constr * 'id gclause * letin_flag
 
   (* Derived basic tactics *)
-  | TacSimpleInduction of quantified_hypothesis
-  | TacNewInduction of evars_flag * 'constr with_bindings induction_arg list * 
-      'constr with_bindings option * intro_pattern_expr * 'id gclause option
-  | TacSimpleDestruct of quantified_hypothesis
-  | TacNewDestruct of evars_flag * 'constr with_bindings induction_arg list *
-      'constr with_bindings option * intro_pattern_expr * 'id gclause option
-
+  | TacSimpleInductionDestruct of rec_flag * quantified_hypothesis
+  | TacInductionDestruct of rec_flag * evars_flag * ('constr,'id) induction_clause list
   | TacDoubleInduction of quantified_hypothesis * quantified_hypothesis
   | TacDecomposeAnd of 'constr
   | TacDecomposeOr of 'constr
@@ -181,7 +197,7 @@ type ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_atomic_tactic_expr =
   (* Context management *)
   | TacClear of bool * 'id list
   | TacClearBody of 'id list
-  | TacMove of bool * 'id * 'id
+  | TacMove of bool * 'id * 'id move_location
   | TacRename of ('id *'id) list
   | TacRevert of 'id list
 
@@ -236,7 +252,7 @@ and ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr =
   | TacInfo of ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr
   | TacLetIn of rec_flag * (identifier located * ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_arg) list * ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr
   | TacMatch of lazy_flag * ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr * ('pat,('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr) match_rule list
-  | TacMatchContext of lazy_flag * direction_flag * ('pat,('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr) match_rule list
+  | TacMatchGoal of lazy_flag * direction_flag * ('pat,('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_expr) match_rule list
   | TacFun of ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_fun_ast
   | TacArg of ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_arg
 
@@ -249,7 +265,7 @@ and ('constr,'pat,'cst,'ind,'ref,'id,'tac) gen_tactic_arg =
   | TacVoid
   | MetaIdArg      of loc * bool * string
   | ConstrMayEval  of ('constr,'cst) may_eval
-  | IntroPattern   of intro_pattern_expr
+  | IntroPattern   of intro_pattern_expr located
   | Reference      of 'ref
   | Integer        of int
   | TacCall        of loc *
diff --git a/proofs/tacmach.ml b/proofs/tacmach.ml
index 213cc13f..6bbaff08 100644
--- a/proofs/tacmach.ml
+++ b/proofs/tacmach.ml
@@ -6,8 +6,9 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: tacmach.ml 10544 2008-02-09 11:31:35Z herbelin $ *)
+(* $Id: tacmach.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
+open Pp
 open Util
 open Names
 open Nameops
@@ -58,7 +59,7 @@ let pf_get_hyp gls id =
   try 
     Sign.lookup_named id (pf_hyps gls)
   with Not_found -> 
-    error ("No such hypothesis : " ^ (string_of_id id))
+    error ("No such hypothesis: " ^ (string_of_id id))
 
 let pf_get_hyp_typ gls id =
   let (_,_,ty)= (pf_get_hyp gls id) in
@@ -175,15 +176,11 @@ let refiner = refiner
 let introduction_no_check id =
   refiner (Prim (Intro id))
 
-(* This does not check that the dependencies are correct *)
-let intro_replacing_no_check whereid gl = 
-  refiner (Prim (Intro_replacing whereid)) gl
-
-let internal_cut_no_check id t gl = 
-  refiner (Prim (Cut (true,id,t))) gl
+let internal_cut_no_check replace id t gl = 
+  refiner (Prim (Cut (true,replace,id,t))) gl
 
-let internal_cut_rev_no_check id t gl = 
-  refiner (Prim (Cut (false,id,t))) gl
+let internal_cut_rev_no_check replace id t gl = 
+  refiner (Prim (Cut (false,replace,id,t))) gl
 
 let refine_no_check c gl = 
   refiner (Prim (Refine c)) gl
@@ -220,13 +217,12 @@ let mutual_cofix f others gl =
 (* Versions with consistency checks *)
 
 let introduction id    = with_check (introduction_no_check id) 
-let intro_replacing id = with_check (intro_replacing_no_check id)
-let internal_cut d t     = with_check (internal_cut_no_check d t)
-let internal_cut_rev d t = with_check (internal_cut_rev_no_check d t)
+let internal_cut b d t = with_check (internal_cut_no_check b d t)
+let internal_cut_rev b d t = with_check (internal_cut_rev_no_check b d t)
 let refine c           = with_check (refine_no_check c)
 let convert_concl d sty = with_check (convert_concl_no_check d sty)
 let convert_hyp d      = with_check (convert_hyp_no_check d)
-let thin l             = with_check (thin_no_check l)
+let thin c             = with_check (thin_no_check c)
 let thin_body c        = with_check (thin_body_no_check c)
 let move_hyp b id id'  = with_check (move_hyp_no_check b id id') 
 let rename_hyp l       = with_check (rename_hyp_no_check l)
diff --git a/proofs/tacmach.mli b/proofs/tacmach.mli
index 8b0053a4..2fc66e71 100644
--- a/proofs/tacmach.mli
+++ b/proofs/tacmach.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: tacmach.mli 11094 2008-06-10 19:35:23Z herbelin $ i*)
+(*i $Id: tacmach.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -123,15 +123,15 @@ val change_constraints_pftreestate :
 
 val refiner                   : rule -> tactic
 val introduction_no_check     : identifier -> tactic
-val intro_replacing_no_check  : identifier -> tactic
-val internal_cut_no_check     : identifier -> types -> tactic
-val internal_cut_rev_no_check : identifier -> types -> tactic
+val internal_cut_no_check     : bool -> identifier -> types -> tactic
+val internal_cut_rev_no_check : bool -> identifier -> types -> tactic
 val refine_no_check           : constr -> tactic
 val convert_concl_no_check    : types -> cast_kind -> tactic
 val convert_hyp_no_check      : named_declaration -> tactic
 val thin_no_check             : identifier list -> tactic
 val thin_body_no_check        : identifier list -> tactic
-val move_hyp_no_check         : bool -> identifier -> identifier -> tactic
+val move_hyp_no_check         :
+  bool -> identifier -> identifier move_location -> tactic
 val rename_hyp_no_check       : (identifier*identifier) list -> tactic
 val mutual_fix      :
   identifier -> int -> (identifier * int * constr) list -> tactic
@@ -140,15 +140,14 @@ val mutual_cofix    : identifier -> (identifier * constr) list -> tactic
 (*s The most primitive tactics with consistency and type checking *)
 
 val introduction     : identifier -> tactic
-val intro_replacing  : identifier -> tactic
-val internal_cut     : identifier -> types -> tactic
-val internal_cut_rev : identifier -> types -> tactic
+val internal_cut     : bool -> identifier -> types -> tactic
+val internal_cut_rev : bool -> identifier -> types -> tactic
 val refine           : constr -> tactic
 val convert_concl    : types -> cast_kind -> tactic
 val convert_hyp      : named_declaration -> tactic
 val thin             : identifier list -> tactic
 val thin_body        : identifier list -> tactic
-val move_hyp         : bool -> identifier -> identifier -> tactic
+val move_hyp         : bool -> identifier -> identifier move_location -> tactic
 val rename_hyp       : (identifier*identifier) list -> tactic
 
 (*s Tactics handling a list of goals. *)
diff --git a/scripts/coqmktop.ml b/scripts/coqmktop.ml
index 850cc961..e87a195f 100644
--- a/scripts/coqmktop.ml
+++ b/scripts/coqmktop.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coqmktop.ml 10947 2008-05-19 19:10:40Z herbelin $ *)
+(* $Id: coqmktop.ml 11260 2008-07-24 20:53:12Z letouzey $ *)
 
 (* coqmktop is a script to link Coq, analogous to ocamlmktop.
    The command line contains options specific to coqmktop, options for the
@@ -318,7 +318,6 @@ let main () =
 	   (string_of_int (String.length command)) ^ " characters)");
 	flush Pervasives.stdout 
       end;
-    print_string command;
     let retcode = Sys.command command in
     clean main_file;
     (* command gives the exit code in HSB, and signal in LSB !!! *)
diff --git a/tactics/auto.ml b/tactics/auto.ml
index 2a5bb95c..066ed786 100644
--- a/tactics/auto.ml
+++ b/tactics/auto.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: auto.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: auto.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -91,18 +91,20 @@ type search_entry = stored_data list * stored_data list * stored_data Btermdn.t
 
 let empty_se = ([],[],Btermdn.create ())
 
-let add_tac t (l,l',dn) =
-  match t.pat with
-      None -> if not (List.mem t l) then (insert t l, l', dn) else (l, l', dn)
-    | Some pat -> if not (List.mem t l') then (l, insert t l', Btermdn.add dn (pat,t)) else (l, l', dn)
+let add_tac pat t st (l,l',dn) =
+  match pat with
+  | None -> if not (List.mem t l) then (insert t l, l', dn) else (l, l', dn)
+  | Some pat -> if not (List.mem t l') then (l, insert t l', Btermdn.add st dn (pat,t)) else (l, l', dn)
 
-
-let lookup_tacs (hdc,c) (l,l',dn) =
-  let l'  = List.map snd (Btermdn.lookup dn c) in
+let rebuild_dn st (l,l',dn) =
+  (l, l', List.fold_left (fun dn t -> Btermdn.add (Some st) dn (Option.get t.pat, t))
+    (Btermdn.create ()) l')
+    
+let lookup_tacs (hdc,c) st (l,l',dn) =
+  let l'  = List.map snd (Btermdn.lookup st dn c) in
   let sl' = Sort.list pri_order l' in
     Sort.merge pri_order l sl'
 
-
 module Constr_map = Map.Make(struct 
 			       type t = global_reference
 			       let compare = Pervasives.compare 
@@ -110,12 +112,18 @@ module Constr_map = Map.Make(struct
 
 module Hint_db = struct
 
-  type t = search_entry Constr_map.t
-
-  let empty = Constr_map.empty
+  type t = { 
+    hintdb_state : Names.transparent_state;
+    use_dn : bool;
+    hintdb_map : search_entry Constr_map.t
+  }
 
+  let empty use_dn = { hintdb_state = empty_transparent_state;
+		       use_dn = use_dn;
+		       hintdb_map = Constr_map.empty }
+    
   let find key db =
-    try Constr_map.find key db
+    try Constr_map.find key db.hintdb_map
     with Not_found -> empty_se
 
   let map_all k db =
@@ -123,21 +131,49 @@ module Hint_db = struct
       Sort.merge pri_order l l'
    
   let map_auto (k,c) db =
-    lookup_tacs (k,c) (find k db)
+    let st = if db.use_dn then Some db.hintdb_state else None in
+      lookup_tacs (k,c) st (find k db)
 
-  let add_one (k,v) db =
-    let oval = find k db in 
-      Constr_map.add k (add_tac v oval) db
+  let is_exact = function 
+    | Give_exact _ -> true
+    | _ -> false
 
+  let add_one (k,v) db =
+    let st',rebuild =
+      match v.code with
+      | Unfold_nth egr ->
+	  let (ids,csts) = db.hintdb_state in
+	    (match egr with
+	    | EvalVarRef id -> (Idpred.add id ids, csts)
+	    | EvalConstRef cst -> (ids, Cpred.add cst csts)), true
+      | _ -> db.hintdb_state, false
+    in
+    let dnst, db = 
+      if db.use_dn then 
+	Some st', { db with hintdb_map = Constr_map.map (rebuild_dn st') db.hintdb_map }
+      else None, db
+    in
+    let oval = find k db in
+    let pat = if not db.use_dn && is_exact v.code then None else v.pat in
+      { db with hintdb_map = Constr_map.add k (add_tac pat v dnst oval) db.hintdb_map;
+	hintdb_state = st' }
+	
   let add_list l db = List.fold_right add_one l db
+    
+  let iter f db = Constr_map.iter (fun k (l,l',_) -> f k (l@l')) db.hintdb_map
+    
+  let transparent_state db = db.hintdb_state
 
-  let iter f db = Constr_map.iter (fun k (l,l',_) -> f k (l@l')) db
+  let set_transparent_state db st = { db with hintdb_state = st }
 
+  let set_rigid db cst = 
+    let (ids,csts) = db.hintdb_state in
+      { db with hintdb_state = (ids, Cpred.remove cst csts) }
 end
 
 module Hintdbmap = Gmap
 
-type hint_db = Names.transparent_state * Hint_db.t
+type hint_db = Hint_db.t
 
 type frozen_hint_db_table = (string,hint_db) Hintdbmap.t 
 
@@ -158,7 +194,9 @@ let current_db_names () =
 (*                       Definition of the summary                        *)
 (**************************************************************************)
 
-let init     () = searchtable := Hintdbmap.empty
+let auto_init : (unit -> unit) ref = ref (fun () -> ())
+  
+let init     () = searchtable := Hintdbmap.empty; !auto_init ()
 let freeze   () = !searchtable
 let unfreeze fs = searchtable := fs
 
@@ -182,7 +220,11 @@ let rec nb_hyp c = match kind_of_term c with
 
 let try_head_pattern c = 
   try head_pattern_bound c
-  with BoundPattern -> error "Bound head variable"
+  with BoundPattern -> error "Bound head variable."
+
+let dummy_goal = 
+  {it = make_evar empty_named_context_val mkProp;
+   sigma = empty}
 
 let make_exact_entry pri (c,cty) =
   let cty = strip_outer_cast cty in
@@ -190,12 +232,11 @@ let make_exact_entry pri (c,cty) =
     | Prod (_,_,_) -> 
 	failwith "make_exact_entry"
     | _ ->
+        let ce = mk_clenv_from dummy_goal (c,cty) in
+	let c' = clenv_type ce in
+	let pat = Pattern.pattern_of_constr c' in
 	(head_of_constr_reference (List.hd (head_constr cty)),
-	   { pri=(match pri with Some pri -> pri | None -> 0); pat=None; code=Give_exact c })
-
-let dummy_goal = 
-  {it = make_evar empty_named_context_val mkProp;
-   sigma = empty}
+	   { pri=(match pri with Some pri -> pri | None -> 0); pat=Some pat; code=Give_exact c })
 
 let make_apply_entry env sigma (eapply,verbose) pri (c,cty) =
   let cty = hnf_constr env sigma cty in
@@ -238,8 +279,8 @@ let make_resolves env sigma flags pri c =
   if ents = [] then
     errorlabstrm "Hint" 
       (pr_lconstr c ++ spc() ++ 
-        (if fst flags then str"cannot be used as a hint"
-	else str "can be used as a hint only for eauto"));
+        (if fst flags then str"cannot be used as a hint."
+	else str "can be used as a hint only for eauto."));
   ents
 
 (* used to add an hypothesis to the local hint database *)
@@ -279,32 +320,23 @@ open Vernacexpr
 (*               declaration of the AUTOHINT library object               *)
 (**************************************************************************)
 
-let add_hint_list hintlist (st,db) =
-  let db' = Hint_db.add_list hintlist db in
-  let st' = 
-    List.fold_left 
-      (fun (ids, csts as st) (_, hint) -> 
-	match hint.code with
-	  | Unfold_nth egr ->
-	      (match egr with
-		| EvalVarRef id -> (Idpred.add id ids, csts)
-		| EvalConstRef cst -> (ids, Cpred.add cst csts))
-	  | _ -> st)
-      st hintlist
-  in (st', db')
-
 (* If the database does not exist, it is created *)
 (* TODO: should a warning be printed in this case ?? *)
 let add_hint dbname hintlist = 
   try 
     let db = searchtable_map dbname in
-    let db' = add_hint_list hintlist db in
+    let db' = Hint_db.add_list hintlist db in
     searchtable_add (dbname,db')
   with Not_found -> 
-    let db = add_hint_list hintlist (empty_transparent_state, Hint_db.empty) in
+    let db = Hint_db.add_list hintlist (Hint_db.empty false) in
     searchtable_add (dbname,db)
 
-let cache_autohint (_,(local,name,hints)) = add_hint name hints
+type hint_action = CreateDB of bool | UpdateDB of (global_reference * pri_auto_tactic) list
+
+let cache_autohint (_,(local,name,hints)) = 
+  match hints with
+  | CreateDB b -> searchtable_add (name, Hint_db.empty b)
+  | UpdateDB hints -> add_hint name hints
 
 let forward_subst_tactic = 
   ref (fun _ -> failwith "subst_tactic is not installed for auto")
@@ -354,12 +386,15 @@ let subst_autohint (_,subst,(local,name,hintlist as obj)) =
       if lab' == lab && data' == data then hint else
 	(lab',data')
   in
-  let hintlist' = list_smartmap subst_hint hintlist in
-    if hintlist' == hintlist then obj else
-      (local,name,hintlist')
-
+    match hintlist with
+    | CreateDB _ -> obj
+    | UpdateDB hintlist ->
+	let hintlist' = list_smartmap subst_hint hintlist in
+	  if hintlist' == hintlist then obj else
+	    (local,name,UpdateDB hintlist')
+	      
 let classify_autohint (_,((local,name,hintlist) as obj)) =
-  if local or hintlist = [] then Dispose else Substitute obj
+  if local or hintlist = (UpdateDB []) then Dispose else Substitute obj
 
 let export_autohint ((local,name,hintlist) as obj) =
   if local then None else Some obj
@@ -373,6 +408,9 @@ let (inAutoHint,outAutoHint) =
                     export_function = export_autohint }
 
 
+let create_hint_db l n b = 
+  Lib.add_anonymous_leaf (inAutoHint (l,n,CreateDB b))
+      
 (**************************************************************************)
 (*                     The "Hint" vernacular command                      *)
 (**************************************************************************)
@@ -381,19 +419,18 @@ let add_resolves env sigma clist local dbnames =
     (fun dbname ->
        Lib.add_anonymous_leaf
 	 (inAutoHint
-	    (local,dbname,
-     	     List.flatten (List.map (fun (x, y) ->
-	       make_resolves env sigma (true,Flags.is_verbose()) x y) clist))))
+	    (local,dbname, UpdateDB
+     	      (List.flatten (List.map (fun (x, y) ->
+		make_resolves env sigma (true,Flags.is_verbose()) x y) clist)))))
     dbnames
 
 
 let add_unfolds l local dbnames =
   List.iter 
     (fun dbname -> Lib.add_anonymous_leaf 
-       (inAutoHint (local,dbname, List.map make_unfold l)))
+       (inAutoHint (local,dbname, UpdateDB (List.map make_unfold l))))
     dbnames
 
-
 let add_extern pri (patmetas,pat) tacast local dbname =
   (* We check that all metas that appear in tacast have at least
      one occurence in the left pattern pat *)
@@ -401,10 +438,10 @@ let add_extern pri (patmetas,pat) tacast local dbname =
   match (list_subtract tacmetas patmetas) with
     | i::_ ->
 	errorlabstrm "add_extern" 
-	  (str "The meta-variable ?" ++ pr_patvar i ++ str" is not bound")
+	  (str "The meta-variable ?" ++ pr_patvar i ++ str" is not bound.")
     | []  ->
 	Lib.add_anonymous_leaf
-	  (inAutoHint(local,dbname, [make_extern pri pat tacast]))
+	  (inAutoHint(local,dbname, UpdateDB [make_extern pri pat tacast]))
 
 let add_externs pri pat tacast local dbnames = 
   List.iter (add_extern pri pat tacast local) dbnames
@@ -413,7 +450,7 @@ let add_trivials env sigma l local dbnames =
   List.iter
     (fun dbname ->
        Lib.add_anonymous_leaf (
-	 inAutoHint(local,dbname, List.map (make_trivial env sigma) l)))
+	 inAutoHint(local,dbname, UpdateDB (List.map (make_trivial env sigma) l))))
     dbnames
 
 let forward_intern_tac = 
@@ -439,7 +476,7 @@ let add_hints local dbnames0 h =
          | _ -> 
            errorlabstrm "evalref_of_ref"
             (str "Cannot coerce" ++ spc () ++ pr_global gr ++ spc () ++
-             str "to an evaluable reference")
+             str "to an evaluable reference.")
         in
 	  if !Flags.dump then Constrintern.add_glob (loc_of_reference r) gr;
 	 (gr,r') in
@@ -493,7 +530,7 @@ let fmt_hint_list_for_head c =
   let dbs = Hintdbmap.to_list !searchtable in
   let valid_dbs = 
     map_succeed 
-      (fun (name,(_,db)) -> (name,db,Hint_db.map_all c db)) 
+      (fun (name,db) -> (name,db,Hint_db.map_all c db)) 
       dbs 
   in
   if valid_dbs = [] then 
@@ -519,11 +556,11 @@ let fmt_hint_term cl =
     let valid_dbs = 
       if occur_existential cl then 
 	map_succeed 
-	  (fun (name, (_, db)) -> (name, db, Hint_db.map_all hd db)) 
+	  (fun (name, db) -> (name, db, Hint_db.map_all hd db)) 
 	  dbs
       else 
 	map_succeed 
-	  (fun (name, (_, db)) -> 
+	  (fun (name, db) -> 
 	     (name, db, Hint_db.map_auto (hd,applist(hdc,args)) db)) 
 	  dbs
     in 
@@ -534,6 +571,9 @@ let fmt_hint_term cl =
 	 hov 0 (prlist fmt_hints_db valid_dbs))
   with Bound | Match_failure _ | Failure _ -> 
     (str "No hint applicable for current goal")
+
+let error_no_such_hint_database x =
+  error ("No such Hint database: "^x^".")
 	  
 let print_hint_term cl = ppnl (fmt_hint_term cl)
 
@@ -544,7 +584,8 @@ let print_applicable_hint () =
   print_hint_term (pf_concl gl)
     
 (* displays the whole hint database db *)
-let print_hint_db ((ids, csts),db) =
+let print_hint_db db =
+  let (ids, csts) = Hint_db.transparent_state db in
   msg (hov 0
 	  (str"Unfoldable variable definitions: " ++ pr_idpred ids ++ fnl () ++
 	   str"Unfoldable constant definitions: " ++ pr_cpred csts ++ fnl ()));
@@ -559,13 +600,13 @@ let print_hint_db_by_name dbname =
   try 
     let db = searchtable_map dbname in print_hint_db db
   with Not_found -> 
-    error (dbname^" : No such Hint database")
+    error_no_such_hint_database dbname
   
 (* displays all the hints of all databases *)
 let print_searchtable () =
   Hintdbmap.iter
     (fun name db ->
-       msg (str "In the database " ++ str name ++ fnl ());
+       msg (str "In the database " ++ str name ++ str ":" ++ fnl ());
        print_hint_db db)
     !searchtable
 
@@ -600,7 +641,7 @@ let unify_resolve_nodelta (c,clenv) gls =
 let unify_resolve flags (c,clenv) gls = 
   let clenv' = connect_clenv gls clenv in
   let _ = clenv_unique_resolver false ~flags clenv' gls in  
-  h_apply true false (c,NoBindings) gls
+  h_apply true false [c,NoBindings] gls
 
 
 (* builds a hint database from a constr signature *)
@@ -610,7 +651,7 @@ let make_local_hint_db eapply lems g =
   let sign = pf_hyps g in
   let hintlist = list_map_append (pf_apply make_resolve_hyp g) sign in
   let hintlist' = list_map_append (pf_apply make_resolves g (eapply,false) None) lems in
-    (empty_transparent_state, Hint_db.add_list hintlist' (Hint_db.add_list hintlist Hint_db.empty))
+    Hint_db.add_list hintlist' (Hint_db.add_list hintlist (Hint_db.empty false))
 
 (* Serait-ce possible de compiler d'abord la tactique puis de faire la
    substitution sans passer par bdize dont l'objectif est de préparer un
@@ -648,7 +689,7 @@ let rec trivial_fail_db mod_delta db_list local_db gl =
     tclTHEN intro 
       (fun g'->
 	 let hintl = make_resolve_hyp (pf_env g') (project g') (pf_last_hyp g')
-	 in trivial_fail_db mod_delta db_list (add_hint_list hintl local_db) g')
+	 in trivial_fail_db mod_delta db_list (Hint_db.add_list hintl local_db) g')
   in
   tclFIRST 
     (assumption::intro_tac::
@@ -658,12 +699,10 @@ let rec trivial_fail_db mod_delta db_list local_db gl =
 and my_find_search_nodelta db_list local_db hdc concl =
   let tacl = 
     if occur_existential concl then 
-      list_map_append
-	(fun (st, db) -> (Hint_db.map_all hdc db))
+      list_map_append (Hint_db.map_all hdc)
 	(local_db::db_list)
     else
-      list_map_append (fun (_, db) -> 
-	Hint_db.map_auto (hdc,concl) db)
+      list_map_append (Hint_db.map_auto (hdc,concl))
       	(local_db::db_list)
   in
     List.map 
@@ -691,12 +730,13 @@ and my_find_search_delta db_list local_db hdc concl =
   let tacl = 
     if occur_existential concl then 
       list_map_append
-	(fun (st, db) -> 
-	  let st = {flags with modulo_delta = st} in
+	(fun db -> 
+	  let st = {flags with modulo_delta = Hint_db.transparent_state db} in
 	    List.map (fun x -> (st,x)) (Hint_db.map_all hdc db))
 	(local_db::db_list)
     else
-      list_map_append (fun ((ids, csts as st), db) -> 
+      list_map_append (fun db -> 
+	let (ids, csts as st) = Hint_db.transparent_state db in
 	let st, l = 
 	  let l =
 	    if (Idpred.is_empty ids && Cpred.is_empty csts)
@@ -737,7 +777,7 @@ let trivial lems dbnames gl =
 	 try 
 	   searchtable_map x
 	 with Not_found -> 
-	   error ("trivial: "^x^": No such Hint database"))
+	   error_no_such_hint_database x)
       ("core"::dbnames) 
   in
   tclTRY (trivial_fail_db false db_list (make_local_hint_db false lems gl)) gl 
@@ -776,7 +816,7 @@ let decomp_unary_term c gls =
   if Hipattern.is_conjunction hd then 
     simplest_case c gls 
   else 
-    errorlabstrm "Auto.decomp_unary_term" (str "not a unary type") 
+    errorlabstrm "Auto.decomp_unary_term" (str "Not a unary type.")
 
 let decomp_empty_term c gls = 
   let typc = pf_type_of gls c in 
@@ -784,7 +824,7 @@ let decomp_empty_term c gls =
   if Hipattern.is_empty_type hd then 
     simplest_case c gls 
   else 
-    errorlabstrm "Auto.decomp_empty_term" (str "not an empty type") 
+    errorlabstrm "Auto.decomp_empty_term" (str "Not an empty type.")
 
 
 (* decomp is an natural number giving an indication on decomposition 
@@ -817,7 +857,7 @@ let rec search_gen decomp n mod_delta db_list local_db extra_sign goal =
 		(mkVar hid, htyp)]
 	   with Failure _ -> [] 
 	 in
-         search_gen decomp n mod_delta db_list (add_hint_list hintl local_db) [d] g') 
+         search_gen decomp n mod_delta db_list (Hint_db.add_list hintl local_db) [d] g') 
   in
   let rec_tacs = 
     List.map 
@@ -840,7 +880,7 @@ let delta_auto mod_delta n lems dbnames gl =
 	 try 
 	   searchtable_map x
 	 with Not_found -> 
-	   error ("auto: "^x^": No such Hint database"))
+	   error_no_such_hint_database x)
       ("core"::dbnames) 
   in
   let hyps = pf_hyps gl in
@@ -956,7 +996,7 @@ let rec super_search n db_list local_db argl goal =
      (tclTHEN intro 
         (fun g -> 
 	   let hintl = pf_apply make_resolve_any_hyp g (pf_last_hyp g) in
-	   super_search n db_list (add_hint_list hintl local_db)
+	   super_search n db_list (Hint_db.add_list hintl local_db)
 	     argl g))
      ::
      ((List.map 
@@ -974,7 +1014,7 @@ let search_superauto n to_add argl g =
       (fun (id,c) -> add_named_decl (id, None, pf_type_of g c))
       to_add empty_named_context in
   let db0 = list_map_append (make_resolve_hyp (pf_env g) (project g)) sigma in
-  let db = add_hint_list db0 (make_local_hint_db false [] g) in
+  let db = Hint_db.add_list db0 (make_local_hint_db false [] g) in
   super_search n [Hintdbmap.find "core" !searchtable] db argl g
 
 let superauto n to_add argl  = 
diff --git a/tactics/auto.mli b/tactics/auto.mli
index 37406a30..edaaa1c1 100644
--- a/tactics/auto.mli
+++ b/tactics/auto.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: auto.mli 10868 2008-04-29 12:30:25Z msozeau $ i*)
+(*i $Id: auto.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Util
@@ -47,24 +47,30 @@ type search_entry = stored_data list * stored_data list * stored_data Btermdn.t
 module Hint_db :
   sig
     type t
-    val empty : t
+    val empty : bool -> t
     val find : global_reference -> t -> search_entry
     val map_all : global_reference -> t -> pri_auto_tactic list
     val map_auto : global_reference * constr -> t -> pri_auto_tactic list
     val add_one : global_reference * pri_auto_tactic -> t -> t
     val add_list : (global_reference * pri_auto_tactic) list -> t -> t
     val iter : (global_reference -> stored_data list -> unit) -> t -> unit
+
+    val transparent_state : t -> transparent_state
+    val set_transparent_state : t -> transparent_state -> t
+    val set_rigid : t -> constant -> t
   end
 
 type hint_db_name = string
 
-type hint_db = transparent_state * Hint_db.t
+type hint_db = Hint_db.t
 
 val searchtable_map : hint_db_name -> hint_db
 
-val current_db_names : unit -> hint_db_name list
+val searchtable_add : (hint_db_name * hint_db) -> unit
 
-val add_hint_list : (global_reference * pri_auto_tactic) list -> hint_db -> hint_db
+val create_hint_db : bool -> hint_db_name -> bool -> unit
+
+val current_db_names : unit -> hint_db_name list
 
 val add_hints : locality_flag -> hint_db_name list -> hints -> unit
 
@@ -207,3 +213,5 @@ val superauto : int -> (identifier * constr) list -> autoArguments list -> tacti
 *)
 
 val h_superauto : int option -> reference list -> bool -> bool -> tactic
+
+val auto_init : (unit -> unit) ref
diff --git a/tactics/autorewrite.ml b/tactics/autorewrite.ml
index 1d096ec7..4759b6da 100644
--- a/tactics/autorewrite.ml
+++ b/tactics/autorewrite.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: autorewrite.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: autorewrite.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Equality
 open Hipattern
@@ -56,7 +56,7 @@ let print_rewrite_hintdb bas =
  with
   Not_found -> 
    errorlabstrm "AutoRewrite" 
-     (str ("Rewriting base "^(bas)^" does not exist"))
+     (str ("Rewriting base "^(bas)^" does not exist."))
 
 type raw_rew_rule = constr * bool * raw_tactic_expr
 
@@ -67,7 +67,7 @@ let one_base general_rewrite_maybe_in tac_main bas =
       Stringmap.find bas !rewtab
     with Not_found ->
       errorlabstrm "AutoRewrite"
-        (str ("Rewriting base "^(bas)^" does not exist"))
+        (str ("Rewriting base "^(bas)^" does not exist."))
   in
   let lrul = List.map (fun (c,_,b,t) -> (c,b,Tacinterp.eval_tactic t)) lrul in
     tclREPEAT_MAIN (tclPROGRESS (List.fold_left (fun tac (csr,dir,tc) ->
@@ -99,7 +99,7 @@ let autorewrite_multi_in idl tac_main lbas : tactic =
      match (Environ.named_context_of_val gl.Evd.it.Evd.evar_hyps) with
         (last_hyp_id,_,_)::_ -> last_hyp_id
       | _ -> (* even the hypothesis id is missing *)
-             error ("No such hypothesis : " ^ (string_of_id !id))
+             error ("No such hypothesis: " ^ (string_of_id !id) ^".")
     in
     let gl' = general_rewrite_in dir all_occurrences !id cstr false gl in
     let gls = (fst gl').Evd.it in
@@ -140,7 +140,7 @@ let gen_auto_multi_rewrite tac_main lbas cl =
   if cl.concl_occs <> all_occurrences_expr &
      cl.concl_occs <> no_occurrences_expr
   then 
-    error "The \"at\" syntax isn't available yet for the autorewrite tactic"
+    error "The \"at\" syntax isn't available yet for the autorewrite tactic."
   else 
     let compose_tac t1 t2 = 
       match cl.onhyps with 
@@ -170,8 +170,7 @@ let auto_multi_rewrite_with tac_main lbas cl gl =
 	gen_auto_multi_rewrite tac_main  lbas cl gl
     | _ -> 
 	    Util.errorlabstrm "autorewrite" 
-	      (str "autorewrite .. in .. using can only be used either with a unique hypothesis or" ++
-		 str " on the conclusion")
+	      (strbrk "autorewrite .. in .. using can only be used either with a unique hypothesis or on the conclusion.")
 
 
 (* Functions necessary to the library object declaration *)
diff --git a/tactics/btermdn.ml b/tactics/btermdn.ml
index f0b23b8d..a0aecbbc 100644
--- a/tactics/btermdn.ml
+++ b/tactics/btermdn.ml
@@ -6,9 +6,10 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: btermdn.ml 6427 2004-12-07 17:41:10Z sacerdot $ *)
+(* $Id: btermdn.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Term
+open Names
 open Termdn
 open Pattern
 open Libnames
@@ -19,6 +20,23 @@ open Libnames
 
 let dnet_depth = ref 8
 		   
+let bounded_constr_pat_discr_st st (t,depth) =
+  if depth = 0 then 
+    None 
+  else
+    match constr_pat_discr_st st t with
+      | None -> None
+      | Some (c,l) -> Some(c,List.map (fun c -> (c,depth-1)) l)
+	    
+let bounded_constr_val_discr_st st (t,depth) =
+  if depth = 0 then 
+    Dn.Nothing 
+  else
+    match constr_val_discr_st st t with
+      | Dn.Label (c,l) -> Dn.Label(c,List.map (fun c -> (c,depth-1)) l)
+      | Dn.Nothing -> Dn.Nothing
+      | Dn.Everything -> Dn.Everything
+
 let bounded_constr_pat_discr (t,depth) =
   if depth = 0 then 
     None 
@@ -29,24 +47,44 @@ let bounded_constr_pat_discr (t,depth) =
 	    
 let bounded_constr_val_discr (t,depth) =
   if depth = 0 then 
-    None 
+    Dn.Nothing 
   else
     match constr_val_discr t with
-      | None -> None
-      | Some (c,l) -> Some(c,List.map (fun c -> (c,depth-1)) l)
+      | Dn.Label (c,l) -> Dn.Label(c,List.map (fun c -> (c,depth-1)) l)
+      | Dn.Nothing -> Dn.Nothing
+      | Dn.Everything -> Dn.Everything
 
 type 'a t = (global_reference,constr_pattern * int,'a) Dn.t
-
+  
 let create = Dn.create
+  
+let add = function
+  | None -> 
+      (fun dn (c,v) -> 
+	Dn.add dn bounded_constr_pat_discr ((c,!dnet_depth),v))
+  | Some st -> 
+      (fun dn (c,v) -> 
+	Dn.add dn (bounded_constr_pat_discr_st st) ((c,!dnet_depth),v))
 
-let add dn (c,v) = Dn.add dn bounded_constr_pat_discr ((c,!dnet_depth),v)
-
-let rmv dn (c,v) = Dn.rmv dn bounded_constr_pat_discr ((c,!dnet_depth),v)
+let rmv = function
+  | None -> 
+      (fun dn (c,v) -> 
+	Dn.rmv dn bounded_constr_pat_discr ((c,!dnet_depth),v))
+  | Some st -> 
+      (fun dn (c,v) -> 
+	Dn.rmv dn (bounded_constr_pat_discr_st st) ((c,!dnet_depth),v))
 
-let lookup dn t =
-  List.map 
-    (fun ((c,_),v) -> (c,v)) 
-    (Dn.lookup dn bounded_constr_val_discr (t,!dnet_depth))
+let lookup = function
+  | None -> 
+      (fun dn t ->
+	List.map 
+	  (fun ((c,_),v) -> (c,v)) 
+	  (Dn.lookup dn bounded_constr_val_discr (t,!dnet_depth)))
+  | Some st -> 
+      (fun dn t ->
+	List.map 
+	  (fun ((c,_),v) -> (c,v)) 
+	  (Dn.lookup dn (bounded_constr_val_discr_st st) (t,!dnet_depth)))
 
 let app f dn = Dn.app (fun ((c,_),v) -> f(c,v)) dn
 
diff --git a/tactics/btermdn.mli b/tactics/btermdn.mli
index 1ac33557..959f7d10 100644
--- a/tactics/btermdn.mli
+++ b/tactics/btermdn.mli
@@ -6,11 +6,12 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: btermdn.mli 5920 2004-07-16 20:01:26Z herbelin $ i*)
+(*i $Id: btermdn.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Term
 open Pattern
+open Names
 (*i*)
 
 (* Discrimination nets with bounded depth. *)
@@ -19,10 +20,10 @@ type 'a t
 
 val create : unit -> 'a t
 
-val add : 'a t -> (constr_pattern * 'a) -> 'a t
-val rmv : 'a t -> (constr_pattern * 'a) -> 'a t
-
-val lookup : 'a t -> constr -> (constr_pattern * 'a) list
+val add : transparent_state option -> 'a t -> (constr_pattern * 'a) -> 'a t
+val rmv : transparent_state option -> 'a t -> (constr_pattern * 'a) -> 'a t
+  
+val lookup : transparent_state option -> 'a t -> constr -> (constr_pattern * 'a) list
 val app : ((constr_pattern * 'a) -> unit) -> 'a t -> unit
 
 val dnet_depth : int ref
diff --git a/tactics/class_tactics.ml4 b/tactics/class_tactics.ml4
index 9a1a3042..6eb5e359 100644
--- a/tactics/class_tactics.ml4
+++ b/tactics/class_tactics.ml4
@@ -9,7 +9,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: class_tactics.ml4 11150 2008-06-19 11:38:27Z msozeau $ *)
+(* $Id: class_tactics.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -43,11 +43,13 @@ open Evd
 let default_eauto_depth = 100
 let typeclasses_db = "typeclass_instances"
 
+let _ = Auto.auto_init := (fun () -> Auto.create_hint_db false typeclasses_db false)
+
 let check_imported_library d =
   let d' = List.map id_of_string d in
   let dir = make_dirpath (List.rev d') in
   if not (Library.library_is_loaded dir) then
-    error ("Library "^(list_last d)^" has to be imported first")
+    error ("Library "^(list_last d)^" has to be imported first.")
       
 let classes_dirpath =
   make_dirpath (List.map id_of_string ["Classes";"Coq"])
@@ -58,6 +60,17 @@ let init_setoid () =
 
 (** Typeclasses instance search tactic / eauto *)
 
+let evars_of_term init c = 
+  let rec evrec acc c =
+    match kind_of_term c with
+    | Evar (n, _) -> Intset.add n acc
+    | _ -> fold_constr evrec acc c
+  in 
+    evrec init c
+
+let intersects s t =
+  Intset.exists (fun el -> Intset.mem el t) s
+
 open Auto
 
 let e_give_exact c gl = 
@@ -98,7 +111,7 @@ let rec e_trivial_fail_db db_list local_db goal =
 	  let d = pf_last_hyp g' in
 	  let hintl = make_resolve_hyp (pf_env g') (project g') d in
           (e_trivial_fail_db db_list
-	     (add_hint_list hintl local_db) g'))) ::
+	      (Hint_db.add_list hintl local_db) g'))) ::
     (List.map pi1 (e_trivial_resolve db_list local_db (pf_concl goal)) )
   in 
   tclFIRST (List.map tclCOMPLETE tacl) goal 
@@ -108,11 +121,15 @@ and e_my_find_search db_list local_db hdc concl =
   let hintl =
     if occur_existential concl then
       list_map_append
-	(fun (st, db) -> List.map (fun x -> (st, x)) (Hint_db.map_all hdc db))
+	(fun db ->
+	  let st = Hint_db.transparent_state db in
+	    List.map (fun x -> (st, x)) (Hint_db.map_all hdc db))
 	(local_db::db_list)
     else
       list_map_append
-	(fun (st, db) -> List.map (fun x -> (st, x)) (Hint_db.map_auto (hdc,concl) db))
+	(fun db -> 
+	  let st = Hint_db.transparent_state db in
+	    List.map (fun x -> (st, x)) (Hint_db.map_auto (hdc,concl) db))
 	(local_db::db_list)
   in 
   let tac_of_hint = 
@@ -147,15 +164,14 @@ let e_possible_resolve db_list local_db gl =
 
 let find_first_goal gls = 
   try first_goal gls with UserError _ -> assert false
-
-
+    
 type search_state = { 
   depth : int; (*r depth of search before failing *)
   tacres : goal list sigma * validation;
   pri : int;
   last_tactic : std_ppcmds;
   dblist : Auto.hint_db list;
-  localdb :  Auto.hint_db list }
+  localdb : (bool ref * bool ref option * Auto.hint_db) list }
     
 let filter_hyp t = 
   match kind_of_term t with
@@ -167,13 +183,25 @@ let rec catchable = function
   | Stdpp.Exc_located (_, e) -> catchable e
   | e -> Logic.catchable_exception e
 
+let is_dep gl gls =
+  let evs = evars_of_term Intset.empty gl.evar_concl in
+    if evs = Intset.empty then false
+    else
+      List.fold_left
+	(fun b gl -> 
+	  if b then b 
+	  else
+	    let evs' = evars_of_term Intset.empty gl.evar_concl in
+	      intersects evs evs')
+	false gls
+
 module SearchProblem = struct
     
   type state = search_state
 
   let debug = ref false
 
-  let success s = (sig_it (fst s.tacres)) = []
+  let success s = sig_it (fst s.tacres) = []
 
   let pr_ev evs ev = Printer.pr_constr_env (Evd.evar_env ev) (Evarutil.nf_evar evs ev.Evd.evar_concl)
     
@@ -182,23 +210,14 @@ module SearchProblem = struct
       prlist (pr_ev evars) (sig_it gls)
 	
   let filter_tactics (glls,v) l =
-(*     if !debug then *)
-(*       (let _ = Proof_trees.db_pr_goal (List.hd (sig_it glls)) in *)
-(*       let evars = Evarutil.nf_evars (Refiner.project glls) in *)
-(*     	msg (str"Goal: " ++ pr_ev evars (List.hd (sig_it glls)) ++ str"\n")); *)
+    let glls,nv = apply_tac_list tclNORMEVAR glls in
+    let v p = v (nv p) in
     let rec aux = function
       | [] -> []
       | (tac,pri,pptac) :: tacl -> 
 	  try 
-(* 	    if !debug then msg (str"\nTrying tactic: " ++ pptac ++ str"\n"); *)
 	    let (lgls,ptl) = apply_tac_list tac glls in 
 	    let v' p = v (ptl p) in
-(* 	      	      if !debug then *)
-(* 	      		begin *)
-(* 	      		  let evars = Evarutil.nf_evars (Refiner.project glls) in *)
-(* 	      		    msg (str"\nOn goal: " ++ pr_ev evars (List.hd (sig_it glls)) ++ str"\n"); *)
-(* 	      		    msg (hov 1 (pptac ++ str" gives: \n" ++ pr_goals lgls ++ str"\n")) *)
-(* 	      		end; *)
 	      ((lgls,v'),pri,pptac) :: aux tacl
 	  with e when catchable e -> aux tacl
     in aux l
@@ -214,65 +233,83 @@ module SearchProblem = struct
       List.length (sig_it (fst s.tacres)) + 
 	nb_empty_evars (sig_sig (fst s.tacres))
     in
-      if d <> 0 && d <> 1 then d else
+      if d <> 0 then d else
 	let pri = s.pri - s'.pri in
 	  if pri <> 0 then pri
 	  else nbgoals s - nbgoals s'
-
+	  
   let branching s = 
     if s.depth = 0 then 
       []
     else      
-      let lg = fst s.tacres in
-      let nbgl = List.length (sig_it lg) in
-      assert (nbgl > 0);
-      let g = find_first_goal lg in
-      let assumption_tacs = 
-	let l = 
-	  filter_tactics s.tacres
-	    (List.map 
-		(fun id -> (Eauto.e_give_exact_constr (mkVar id), 0,
-			   (str "exact" ++ spc () ++ pr_id id)))
-		(List.filter (fun id -> filter_hyp (pf_get_hyp_typ g id))
-		    (pf_ids_of_hyps g)))
-	in
-	  List.map (fun (res,pri,pp) -> { s with tacres = res; pri = 0;
-	    last_tactic = pp; localdb = List.tl s.localdb }) l
-      in
-(*       let intro_tac =  *)
-(* 	List.map  *)
-(* 	  (fun ((lgls,_) as res,pri,pp) ->  *)
-(* 	     let g' = first_goal lgls in  *)
-(* 	     let hintl =  *)
-(* 	       make_resolve_hyp (pf_env g') (project g') (pf_last_hyp g') *)
-(* 	     in	        *)
-(*              let ldb = Hint_db.add_list hintl (match s.localdb with [] -> assert false | hd :: _ -> hd) in *)
-(* 	       { s with tacres = res;  *)
-(* 		 last_tactic = pp; *)
-(* 		 pri = pri; *)
-(* 		 localdb = ldb :: List.tl s.localdb }) *)
-(* 	  (filter_tactics s.tacres [Tactics.intro,1,(str "intro")]) *)
-(*       in *)
-      let possible_resolve ((lgls,_) as res, pri, pp) =
-	let nbgl' = List.length (sig_it lgls) in
-	  if nbgl' < nbgl then
-	    { s with tacres = res; last_tactic = pp; pri = pri;
-	      localdb = List.tl s.localdb }
-	  else 
-	    { s with 
-	      depth = pred s.depth; tacres = res; 
-	      last_tactic = pp; pri = pri;
-	      localdb = 
-		list_addn (nbgl'-nbgl) (List.hd s.localdb) s.localdb }
-      in
-      let rec_tacs = 
-	let l = 
-	  filter_tactics s.tacres (e_possible_resolve s.dblist (List.hd s.localdb) (pf_concl g))
-	in
-	List.map possible_resolve l
-      in
-      List.sort compare (assumption_tacs (* @intro_tac  @ custom_tac *) @ rec_tacs)
-
+      let (cut, do_cut, ldb as hdldb) = List.hd s.localdb in
+	if !cut then []
+	else begin
+	  Option.iter (fun r -> r := true) do_cut;
+	  let {it=gl; sigma=sigma} = fst s.tacres in 
+	  let nbgl = List.length gl in
+	  let g = { it = List.hd gl ; sigma = sigma } in
+	  let new_db, localdb = 
+	    let tl = List.tl s.localdb in
+	      match tl with
+	      | [] -> hdldb, tl
+	      | (cut', do', ldb') :: rest ->
+		  if not (is_dep (Evarutil.nf_evar_info sigma (List.hd gl)) (List.tl gl)) then
+		    let fresh = ref false in
+		      if do' = None then 
+			(fresh, None, ldb), (cut', Some fresh, ldb') :: rest
+		      else 
+			(cut', None, ldb), tl
+		  else hdldb, tl
+	  in let localdb = new_db :: localdb in
+	  let assumption_tacs = 
+	    let l = 
+	      filter_tactics s.tacres
+		(List.map 
+		    (fun id -> (Eauto.e_give_exact_constr (mkVar id), 0,
+			       (str "exact" ++ spc () ++ pr_id id)))
+		    (List.filter (fun id -> filter_hyp (pf_get_hyp_typ g id))
+			(pf_ids_of_hyps g)))
+	    in
+	      List.map (fun (res,pri,pp) -> { s with tacres = res; pri = 0;
+		last_tactic = pp; localdb = List.tl s.localdb }) l
+	  in
+	  let intro_tac =
+	    List.map
+	      (fun ((lgls,_) as res,pri,pp) ->
+		let g' = first_goal lgls in
+		let hintl =
+		  make_resolve_hyp (pf_env g') (project g') (pf_last_hyp g')
+		in
+		let ldb = Hint_db.add_list hintl ldb in
+		  { s with tacres = res;
+		    last_tactic = pp;
+		    pri = pri;
+		    localdb = (cut, None, ldb) :: List.tl s.localdb })
+	      (filter_tactics s.tacres [Tactics.intro,1,(str "intro")])
+	  in
+	  let possible_resolve ((lgls,_) as res, pri, pp) =
+	    let nbgl' = List.length (sig_it lgls) in
+	      if nbgl' < nbgl then
+		{ s with 
+		  depth = pred s.depth;
+		  tacres = res; last_tactic = pp; pri = pri;
+		  localdb = List.tl localdb }
+	      else 
+		{ s with depth = pred s.depth; tacres = res; 
+		  last_tactic = pp; pri = pri;
+		  localdb = list_tabulate (fun _ -> new_db) (nbgl'-nbgl) @ localdb }
+	  in
+	  let concl = Evarutil.nf_evar (project g) (pf_concl g) in
+	  let rec_tacs = 
+	    let l = 
+	      filter_tactics s.tacres (e_possible_resolve s.dblist ldb concl)
+	    in
+	      List.map possible_resolve l
+	  in
+	    List.sort compare (assumption_tacs @ intro_tac @ rec_tacs)
+	end
+	  
   let pp s = 
     msg (hov 0 (str " depth=" ++ int s.depth ++ spc () ++ 
 		  s.last_tactic ++ str "\n"))
@@ -340,11 +377,13 @@ let e_breadth_search debug s =
     let tac = 
       if debug then Search.debug_breadth_first else Search.breadth_first 
     in let s = tac s in s.tacres
-  with Not_found -> error "EAuto: breadth first search failed"
+  with Not_found -> error "eauto: breadth first search failed."
 
-let e_search_auto debug (in_depth,p) lems db_list gls = 
+let e_search_auto debug (in_depth,p) lems st db_list gls = 
   let sigma = Evd.sig_sig (fst gls) and gls' = Evd.sig_it (fst gls) in
-  let local_dbs = List.map (fun gl -> make_local_hint_db true lems ({it = gl; sigma = sigma})) gls' in
+  let local_dbs = List.map (fun gl -> 
+    let db = make_local_hint_db true lems ({it = gl; sigma = sigma}) in
+      (ref false, None, Hint_db.set_transparent_state db st)) gls' in
   let state = make_initial_state p gls db_list local_dbs in
   if in_depth then 
     e_depth_search debug state
@@ -355,20 +394,14 @@ let full_eauto debug n lems gls =
   let dbnames = current_db_names () in
   let dbnames =  list_subtract dbnames ["v62"] in
   let db_list = List.map searchtable_map dbnames in
-    e_search_auto debug n lems db_list gls
+    e_search_auto debug n lems empty_transparent_state db_list gls
 
 let nf_goal (gl, valid) =
   { gl with sigma = Evarutil.nf_evars gl.sigma }, valid
 
 let typeclasses_eauto debug n lems gls =
-  let dbnames = [typeclasses_db] in
-  let db_list = List.map
-    (fun x -> 
-      try searchtable_map x 
-      with Not_found -> (empty_transparent_state, Hint_db.empty))
-    dbnames 
-  in
-    e_search_auto debug n lems db_list gls
+  let db = searchtable_map typeclasses_db in
+    e_search_auto debug n lems (Hint_db.transparent_state db) [db] gls
 
 exception Found of evar_map
 
@@ -404,31 +437,23 @@ let resolve_all_evars_once debug (mode, depth) env p evd =
 
 exception FoundTerm of constr
 
-let resolve_one_typeclass env gl =
-  let gls = { it = [ Evd.make_evar (Environ.named_context_val env) gl ] ; sigma = Evd.empty } in
-  let valid x = raise (FoundTerm (fst (Refiner.extract_open_proof Evd.empty (List.hd x)))) in
+let resolve_one_typeclass env ?(sigma=Evd.empty) gl =
+  let gls = { it = [ Evd.make_evar (Environ.named_context_val env) gl ] ; sigma = sigma } in
+  let valid x = raise (FoundTerm (fst (Refiner.extract_open_proof sigma (List.hd x)))) in
   let gls', valid' = typeclasses_eauto false (true, default_eauto_depth) [] (gls, valid) in
     try ignore(valid' []); assert false with FoundTerm t -> 
       let term = Evarutil.nf_evar (sig_sig gls') t in
 	if occur_existential term then raise Not_found else term
 
+let _ = 
+  Typeclasses.solve_instanciation_problem := (fun x y z -> resolve_one_typeclass x ~sigma:y z)
+
 let has_undefined p oevd evd =
   Evd.fold (fun ev evi has -> has ||
     (evi.evar_body = Evar_empty && p ev evi && 
 	(try Typeclasses.is_resolvable (Evd.find oevd ev) with _ -> true)))
     (Evd.evars_of evd) false
 
-let evars_of_term init c = 
-  let rec evrec acc c =
-    match kind_of_term c with
-    | Evar (n, _) -> Intset.add n acc
-    | _ -> fold_constr evrec acc c
-  in 
-    evrec init c
-
-let intersects s t =
-  Intset.exists (fun el -> Intset.mem el t) s
-
 let rec merge_deps deps = function
   | [] -> [deps]
   | hd :: tl -> 
@@ -486,18 +511,21 @@ let resolve_all_evars debug m env p oevd do_split fail =
 	  | Some evd' -> docomp evd' comps
   in docomp oevd split
 
-(* let resolve_all_evars debug m env p oevd = *)
-(*   let oevm = Evd.evars_of oevd in *)
-(*   try *)
-(*     let rec aux n evd = *)
-(*       if has_undefined p oevm evd then *)
-(* 	if n > 0 then *)
-(* 	  let evd' = resolve_all_evars_once debug m env p evd in *)
-(* 	    aux (pred n) evd' *)
-(* 	else None *)
-(*       else Some evd *)
-(*     in aux 3 oevd *)
-(*   with Not_found -> None *)
+let resolve_typeclass_evars d p env evd onlyargs split fail =
+  let pred = 
+    if onlyargs then 
+      (fun ev evi -> Typeclasses.is_implicit_arg (snd (Evd.evar_source ev evd)) &&
+	Typeclasses.is_class_evar evi)
+    else (fun ev evi -> Typeclasses.is_class_evar evi)
+  in resolve_all_evars d p env pred evd split fail
+    
+let solve_inst debug mode depth env evd onlyargs split fail =
+  resolve_typeclass_evars debug (mode, depth) env evd onlyargs split fail
+
+let _ = 
+  Typeclasses.solve_instanciations_problem :=
+    solve_inst false true default_eauto_depth
+
     
 VERNAC COMMAND EXTEND Typeclasses_Unfold_Settings
 | [ "Typeclasses" "unfold" reference_list(cl) ] -> [
@@ -505,6 +533,20 @@ VERNAC COMMAND EXTEND Typeclasses_Unfold_Settings
   ]
 END
 
+VERNAC COMMAND EXTEND Typeclasses_Rigid_Settings
+| [ "Typeclasses" "rigid" reference_list(cl) ] -> [
+    let db = searchtable_map typeclasses_db in
+    let db' = 
+      List.fold_left (fun acc r -> 
+	let gr = Syntax_def.global_with_alias r in
+	  match gr with
+	  | ConstRef c -> Hint_db.set_rigid acc c 
+	  | _ -> acc) db cl
+    in
+      searchtable_add (typeclasses_db,db')
+ ]
+END
+
 (** Typeclass-based rewriting. *)
 
 let respect_proj = lazy (mkConst (snd (List.hd (Lazy.force morphism_class).cl_projs)))
@@ -518,6 +560,7 @@ let try_find_reference dir s =
 let gen_constant dir s = Coqlib.gen_constant "Class_setoid" dir s
 let coq_proj1 = lazy(gen_constant ["Init"; "Logic"] "proj1")
 let coq_proj2 = lazy(gen_constant ["Init"; "Logic"] "proj2")
+let coq_eq = lazy(gen_constant ["Init"; "Logic"] "eq")
 let iff = lazy (gen_constant ["Init"; "Logic"] "iff")
 let coq_all = lazy (gen_constant ["Init"; "Logic"] "all")
 let impl = lazy (gen_constant ["Program"; "Basics"] "impl")
@@ -539,7 +582,7 @@ let coq_inverse = lazy (gen_constant (* ["Classes"; "RelationClasses"] "inverse"
 let inverse car rel = mkApp (Lazy.force coq_inverse, [| car ; car; mkProp; rel |])
 
 let complement = lazy (gen_constant ["Classes"; "RelationClasses"] "complement")
-let pointwise_relation = lazy (gen_constant ["Classes"; "RelationClasses"] "pointwise_relation")
+let pointwise_relation = lazy (gen_constant ["Classes"; "Morphisms"] "pointwise_relation")
 
 let respectful_dep = lazy (gen_constant ["Classes"; "Morphisms"] "respectful_dep")
 let respectful = lazy (gen_constant ["Classes"; "Morphisms"] "respectful")
@@ -556,6 +599,8 @@ let setoid_refl_proj = lazy (gen_constant ["Classes"; "SetoidClass"] "Equivalenc
 let setoid_equiv = lazy (gen_constant ["Classes"; "SetoidClass"] "equiv")
 let setoid_morphism = lazy (gen_constant ["Classes"; "SetoidClass"] "setoid_morphism")
 let setoid_refl_proj = lazy (gen_constant ["Classes"; "SetoidClass"] "Equivalence_Reflexive")
+
+let setoid_relation = lazy (gen_constant ["Classes"; "SetoidTactics"] "SetoidRelation")
   
 let arrow_morphism a b = 
   if isprop a && isprop b then
@@ -570,12 +615,25 @@ let morphism_type = lazy (constr_of_global (Lazy.force morphism_class).cl_impl)
 
 let morphism_proxy_type = lazy (constr_of_global (Lazy.force morphism_proxy_class).cl_impl)
 
+let is_applied_setoid_relation t =
+  match kind_of_term t with
+  | App (c, args) when Array.length args >= 2 ->
+      let head = if isApp c then fst (destApp c) else c in 
+	if eq_constr (Lazy.force coq_eq) head then false
+	else (try      
+	    let evd, evar = Evarutil.new_evar (Evd.create_evar_defs Evd.empty) (Global.env()) (new_Type ()) in
+	    let inst = mkApp (Lazy.force setoid_relation, [| evar; c |]) in
+	      ignore(Typeclasses.resolve_one_typeclass (Global.env()) (Evd.evars_of evd) inst);
+	      true
+	  with _ -> false)
+  | _ -> false
+      
+let _ = 
+  Equality.register_is_applied_setoid_relation is_applied_setoid_relation
+
 exception Found of (constr * constr * (types * types) list * constr * constr array *
 		       (constr * (constr * constr * constr * constr)) option array)
 
-let is_equiv env sigma t = 
-  isConst t && Reductionops.is_conv env sigma (Lazy.force setoid_equiv) t
-
 let split_head = function
     hd :: tl -> hd, tl
   | [] -> assert(false)
@@ -703,13 +761,13 @@ let decompose_setoid_eqhyp env sigma c left2right =
     | [c1;c2] -> [],(c1, c2)
     | x::y::z ->
 	let l,res = split_last_two (y::z) in x::l, res
-    | _ -> error "The term provided is not an applied relation" in
+    | _ -> error "The term provided is not an applied relation." in
   let others,(c1,c2) = split_last_two args in
   let ty1, ty2 = 
     Typing.mtype_of env eqclause.evd c1, Typing.mtype_of env eqclause.evd c2
   in
     if not (evd_convertible env eqclause.evd ty1 ty2) then
-      error "The term does not end with an applied homogeneous relation"
+      error "The term does not end with an applied homogeneous relation."
     else
       { cl=eqclause; prf=(Clenv.clenv_value eqclause);
 	car=ty1; rel=mkApp (equiv, Array.of_list others);
@@ -736,11 +794,11 @@ let allowK = true
 
 let refresh_hypinfo env sigma hypinfo = 
   if !hypinfo.abs = None then
-    let {l2r=l2r; c = c} = !hypinfo in
+    let {l2r=l2r; c = c;cl=cl} = !hypinfo in
       match c with 
 	| Some c ->
 	    (* Refresh the clausenv to not get the same meta twice in the goal. *)
-	    hypinfo := decompose_setoid_eqhyp env sigma c l2r;
+	    hypinfo := decompose_setoid_eqhyp cl.env (Evd.evars_of cl.evd) c l2r;
 	| _ -> ()
   else ()
 
@@ -780,11 +838,12 @@ let unify_eqn env sigma hypinfo t =
 		let mvs = clenv_dependent false env' in
 		  clenv_pose_metas_as_evars env' mvs
 	      in
-	      let c1 = Clenv.clenv_nf_meta env' c1 
-	      and c2 = Clenv.clenv_nf_meta env' c2
-	      and car = Clenv.clenv_nf_meta env' car
-	      and rel = Clenv.clenv_nf_meta env' rel in
-	      let prf = Clenv.clenv_value env' in
+	      let evd' = Typeclasses.resolve_typeclasses env'.env env'.evd in
+	      let env' = { env' with evd = evd' } in
+	      let nf c = Evarutil.nf_evar (Evd.evars_of evd') (Clenv.clenv_nf_meta env' c) in
+	      let c1 = nf c1 and c2 = nf c2
+	      and car = nf car and rel = nf rel 
+	      and prf = nf (Clenv.clenv_value env') in
 	      let ty1 = Typing.mtype_of env'.env env'.evd c1 
 	      and ty2 = Typing.mtype_of env'.env env'.evd c2
 	      in
@@ -974,16 +1033,7 @@ let build_new gl env sigma flags loccs hypinfo concl cstr evars =
   let rest = List.filter (fun o -> o > nbocc_min_1) occs in
   if rest <> [] then error_invalid_occurrence rest;
   eq
-    
-let resolve_typeclass_evars d p env evd onlyargs split fail =
-  let pred = 
-    if onlyargs then 
-      (fun ev evi -> Typeclasses.is_implicit_arg (snd (Evd.evar_source ev evd)) &&
-	class_of_constr evi.Evd.evar_concl <> None)
-    else
-      (fun ev evi -> class_of_constr evi.Evd.evar_concl <> None)
-  in resolve_all_evars d p env pred evd split fail
-      
+          
 let cl_rewrite_clause_aux ?(flags=default_flags) hypinfo goal_meta occs clause gl =
   let concl, is_hyp = 
     match clause with
@@ -1025,7 +1075,7 @@ let cl_rewrite_clause_aux ?(flags=default_flags) hypinfo goal_meta occs clause g
 		| None -> 
 		    let name = next_name_away_with_default "H" Anonymous (pf_ids_of_hyps gl) in
 		      tclTHENLAST
-			(Tacmach.internal_cut_no_check name newt)
+			(Tacmach.internal_cut_no_check false name newt)
 			(tclTHEN (Tactics.revert [name]) (Tactics.refine p))
 		| Some (t, ty) -> 
 		    Tactics.refine
@@ -1057,11 +1107,17 @@ let cl_rewrite_clause_aux ?(flags=default_flags) hypinfo goal_meta occs clause g
   try cl_rewrite_clause_aux ~flags hypinfo goal_meta occs clause gl
   with DependentMorphism -> tclFAIL 0 (str " setoid rewrite failed: cannot handle dependent morphisms") gl
 
-let cl_rewrite_clause c left2right occs clause gl =
+let cl_rewrite_clause (evm,c) left2right occs clause gl =
   init_setoid ();
   let meta = Evarutil.new_meta() in
   let gl = { gl with sigma = Typeclasses.mark_unresolvables gl.sigma } in
-  let hypinfo = ref (decompose_setoid_eqhyp (pf_env gl) (project gl) c left2right) in
+  let env = pf_env gl in
+  let evars = Evd.merge (project gl) evm in
+(*   let c = *)
+(*     let j = Pretyping.Default.understand_judgment_tcc evars env c in *)
+(*       j.Environ.uj_val *)
+(*   in *)
+  let hypinfo = ref (decompose_setoid_eqhyp env evars c left2right) in
     cl_rewrite_clause_aux hypinfo meta occs clause gl
 
 open Genarg
@@ -1071,20 +1127,20 @@ let occurrences_of = function
   | n::_ as nl when n < 0 -> (false,List.map abs nl)
   | nl -> 
       if List.exists (fun n -> n < 0) nl then
-	error "Illegal negative occurrence number";
+	error "Illegal negative occurrence number.";
       (true,nl)
 
 TACTIC EXTEND class_rewrite
-| [ "clrewrite" orient(o) constr(c) "in" hyp(id) "at" occurrences(occ) ] -> [ cl_rewrite_clause c o (occurrences_of occ) (Some (([],id), [])) ]
-| [ "clrewrite" orient(o) constr(c) "at" occurrences(occ) "in" hyp(id) ] -> [ cl_rewrite_clause c o (occurrences_of occ) (Some (([],id), [])) ]
-| [ "clrewrite" orient(o) constr(c) "in" hyp(id) ] -> [ cl_rewrite_clause c o all_occurrences (Some (([],id), [])) ]
-| [ "clrewrite" orient(o) constr(c) "at" occurrences(occ) ] -> [ cl_rewrite_clause c o (occurrences_of occ) None ]
-| [ "clrewrite" orient(o) constr(c) ] -> [ cl_rewrite_clause c o all_occurrences None ]
+| [ "clrewrite" orient(o) open_constr(c) "in" hyp(id) "at" occurrences(occ) ] -> [ cl_rewrite_clause c o (occurrences_of occ) (Some (([],id), [])) ]
+| [ "clrewrite" orient(o) open_constr(c) "at" occurrences(occ) "in" hyp(id) ] -> [ cl_rewrite_clause c o (occurrences_of occ) (Some (([],id), [])) ]
+| [ "clrewrite" orient(o) open_constr(c) "in" hyp(id) ] -> [ cl_rewrite_clause c o all_occurrences (Some (([],id), [])) ]
+| [ "clrewrite" orient(o) open_constr(c) "at" occurrences(occ) ] -> [ cl_rewrite_clause c o (occurrences_of occ) None ]
+| [ "clrewrite" orient(o) open_constr(c) ] -> [ cl_rewrite_clause c o all_occurrences None ]
 END
 
 
 let clsubstitute o c =
-  let is_tac id = match kind_of_term c with Var id' when id' = id -> true | _ -> false in
+  let is_tac id = match kind_of_term (snd c) with Var id' when id' = id -> true | _ -> false in
     Tacticals.onAllClauses 
       (fun cl -> 
 	match cl with
@@ -1092,7 +1148,7 @@ let clsubstitute o c =
 	  | _ -> tclTRY (cl_rewrite_clause c o all_occurrences cl))
 
 TACTIC EXTEND substitute
-| [ "substitute" orient(o) constr(c) ] -> [ clsubstitute o c ]
+| [ "substitute" orient(o) open_constr(c) ] -> [ clsubstitute o c ]
 END
 
 let pr_debug _prc _prlc _prt b =
@@ -1122,13 +1178,6 @@ let pr_depth _prc _prlc _prt = function
 ARGUMENT EXTEND depth TYPED AS int option PRINTED BY pr_depth
 | [ int_or_var_opt(v) ] -> [ match v with Some (ArgArg i) -> Some i | _ -> None ]
 END
-	
-let solve_inst debug mode depth env evd onlyargs split fail =
-  resolve_typeclass_evars debug (mode, depth) env evd onlyargs split fail
-
-let _ = 
-  Typeclasses.solve_instanciations_problem :=
-    solve_inst false true default_eauto_depth
       
 VERNAC COMMAND EXTEND Typeclasses_Settings
  | [ "Typeclasses" "eauto" ":=" debug(d) search_mode(s) depth(depth) ] -> [ 
@@ -1146,7 +1195,8 @@ TACTIC EXTEND typeclasses_eauto
       fun gl -> 
 	let gls = {it = [sig_it gl]; sigma = project gl} in
 	let vals v = List.hd v in
-	  typeclasses_eauto d (mode, depth) [] (gls, vals) ]
+	  try typeclasses_eauto d (mode, depth) [] (gls, vals) 
+	  with Not_found -> tclFAIL 0 (str" typeclasses eauto failed") gl ]
 END
 
 
@@ -1172,15 +1222,15 @@ let _ =
 (* Compatibility with old Setoids *)
   
 TACTIC EXTEND setoid_rewrite
-   [ "setoid_rewrite" orient(o) constr(c) ]
+   [ "setoid_rewrite" orient(o) open_constr(c) ]
    -> [ cl_rewrite_clause c o all_occurrences None ]
- | [ "setoid_rewrite" orient(o) constr(c) "in" hyp(id) ] ->
+ | [ "setoid_rewrite" orient(o) open_constr(c) "in" hyp(id) ] ->
       [ cl_rewrite_clause c o all_occurrences (Some (([],id), []))]
- | [ "setoid_rewrite" orient(o) constr(c) "at" occurrences(occ) ] ->
+ | [ "setoid_rewrite" orient(o) open_constr(c) "at" occurrences(occ) ] ->
       [ cl_rewrite_clause c o (occurrences_of occ) None]
- | [ "setoid_rewrite" orient(o) constr(c) "at" occurrences(occ) "in" hyp(id)] ->
+ | [ "setoid_rewrite" orient(o) open_constr(c) "at" occurrences(occ) "in" hyp(id)] ->
       [ cl_rewrite_clause c o (occurrences_of occ) (Some (([],id), []))]
- | [ "setoid_rewrite" orient(o) constr(c) "in" hyp(id) "at" occurrences(occ)] ->
+ | [ "setoid_rewrite" orient(o) open_constr(c) "in" hyp(id) "at" occurrences(occ)] ->
       [ cl_rewrite_clause c o (occurrences_of occ) (Some (([],id), []))]
 END
 
@@ -1225,10 +1275,10 @@ let constr_tac = Tacinterp.interp (Tacexpr.TacAtom (dummy_loc, Tacexpr.TacAnyCon
 
 let declare_relation ?(binders=[]) a aeq n refl symm trans = 
   init_setoid ();
+  let instance = declare_instance a aeq (add_suffix n "_relation") "Coq.Classes.SetoidTactics.SetoidRelation"
+  in ignore(anew_instance binders instance []);
   match (refl,symm,trans) with 
-      (None, None, None) -> 
-	let instance = declare_instance a aeq n "Coq.Classes.SetoidTactics.DefaultRelation"
-	in ignore(anew_instance binders instance [])
+      (None, None, None) -> ()
     | (Some lemma1, None, None) -> 
 	ignore (declare_instance_refl binders a aeq n lemma1)
     | (None, Some lemma2, None) -> 
@@ -1577,7 +1627,7 @@ let relation_of_constr c =
     | App (f, args) when Array.length args >= 2 -> 
 	let relargs, args = array_chop (Array.length args - 2) args in
 	  mkApp (f, relargs), args
-    | _ -> error "Not an applied relation"
+    | _ -> error "Not an applied relation."
 
 let is_loaded d =
   let d' = List.map id_of_string d in
@@ -1624,7 +1674,7 @@ let setoid_symmetry_in id gl =
   let rec split_last_two = function
     | [c1;c2] -> [],(c1, c2)
     | x::y::z -> let l,res = split_last_two (y::z) in x::l, res
-    | _ -> error "The term provided is not an equivalence" 
+    | _ -> error "The term provided is not an equivalence."
   in
   let others,(c1,c2) = split_last_two args in
   let he,c1,c2 =  mkApp (equiv, Array.of_list others),c1,c2 in
@@ -1690,3 +1740,18 @@ TACTIC EXTEND apply_typeclasses
 	     Clenvtac.clenv_refine true {cl' with evd = evd'} gl) gl
    ]
 END
+
+let rec head_of_constr t =
+  let t = strip_outer_cast(collapse_appl t) in
+    match kind_of_term t with
+    | Prod (_,_,c2)  -> head_of_constr c2 
+    | LetIn (_,_,_,c2) -> head_of_constr c2
+    | App (f,args)  -> head_of_constr f
+    | _      -> t
+      
+TACTIC EXTEND head_of_constr
+  [ "head_of_constr" ident(h) constr(c) ] -> [
+    let c = head_of_constr c in
+      letin_tac None (Name h) c allHyps
+  ]
+END
diff --git a/tactics/contradiction.ml b/tactics/contradiction.ml
index a2c840a1..313d74a1 100644
--- a/tactics/contradiction.ml
+++ b/tactics/contradiction.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: contradiction.ml 10169 2007-10-03 12:31:45Z herbelin $ *)
+(* $Id: contradiction.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Term
@@ -85,7 +85,7 @@ let contradiction_term (c,lbind as cl) gl =
 	  (fun id -> simplest_elim (mkApp (mkVar id,[|c|]))) gl
       else
 	raise Not_found
-    with Not_found -> error "Not a contradiction"
+    with Not_found -> error "Not a contradiction."
 
 let contradiction = function
   | None -> tclTHEN intros contradiction_context
diff --git a/tactics/decl_interp.ml b/tactics/decl_interp.ml
index d96fa720..97225617 100644
--- a/tactics/decl_interp.ml
+++ b/tactics/decl_interp.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: decl_interp.ml 10739 2008-04-01 14:45:20Z herbelin $ i*)
+(*i $Id: decl_interp.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Util
 open Names
@@ -162,8 +162,8 @@ let decompose_eq env id =
 	App (f,args)->
 	  if eq_constr f _eq && (Array.length args)=3 
 	  then args.(0)
-	  else error "previous step is not an equality"
-      | _ -> error "previous step is not an equality"
+	  else error "Previous step is not an equality."
+      | _ -> error "Previous step is not an equality."
 
 let get_eq_typ info env =
   let typ = decompose_eq env (get_last env) in  
@@ -331,9 +331,9 @@ let interp_cases info sigma env params (pat:cases_pattern_expr) hyps =
     let expected = mib.Declarations.mind_nparams - num_params in
       if List.length params <> expected then
 	errorlabstrm "suppose it is" 
-	  (str "Wrong number of extra arguments : " ++ 
+	  (str "Wrong number of extra arguments: " ++ 
 	     (if expected = 0 then str "none" else int expected) ++ 
-	     str "expected") in
+	     str "expected.") in
   let app_ind =
     let rind = RRef (dummy_loc,Libnames.IndRef pinfo.per_ind) in
     let rparams = List.map detype_ground pinfo.per_params in 
@@ -400,7 +400,7 @@ let interp_suffices_clause sigma env (hyps,cot)=
 	  let nhyps,nc = interp_hyps_gen fst (fun x _ -> x) sigma env hyps c in
 	  nhyps,This nc
       | Thesis Plain as th  -> interp_hyps sigma env hyps,th
-      | Thesis (For n) -> error "\"thesis for\" is not applicable here" in
+      | Thesis (For n) -> error "\"thesis for\" is not applicable here." in
   let push_one hyp env0 =
     match hyp with
 	(Hprop st | Hvar st) ->
diff --git a/tactics/decl_proof_instr.ml b/tactics/decl_proof_instr.ml
index 895b97fe..5356868a 100644
--- a/tactics/decl_proof_instr.ml
+++ b/tactics/decl_proof_instr.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: decl_proof_instr.ml 11072 2008-06-08 16:13:37Z herbelin $ *)
+(* $Id: decl_proof_instr.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -106,6 +106,9 @@ let clean_tmp gls =
   in
     clean_all (tmp_ids gls) gls
 
+let assert_postpone id t =
+  assert_as true (dummy_loc, Genarg.IntroIdentifier id) t
+
 (* start a proof *)
 
 let start_proof_tac gls=
@@ -188,7 +191,7 @@ let close_tactic_mode pts =
     let pts1=  
       try goto_current_focus pts 
       with Not_found -> 
-	error "\"return\" cannot be used outside of Declarative Proof Mode" in
+	error "\"return\" cannot be used outside of Declarative Proof Mode." in
     let pts2 = daimon_subtree pts1 in
     let pts3 = mark_as_done pts2 in 
       goto_current_focus pts3 
@@ -207,18 +210,18 @@ let close_block bt pts =
 	B_claim, Claim::_ | B_focus, Focus_claim::_ | B_proof, [] -> 
 	  daimon_subtree (goto_current_focus pts)
       | _, Claim::_ -> 
-	  error "\"end claim\" expected" 
+	  error "\"end claim\" expected."
       | _, Focus_claim::_ -> 
-	  error "\"end focus\" expected" 
+	  error "\"end focus\" expected."
       | _, [] ->
- 	  error "\"end proof\" expected" 
+ 	  error "\"end proof\" expected."
       | _, (Per (et,_,_,_)::_|Suppose_case::Per (et,_,_,_)::_) ->
 	  begin
 	    match et with
-		ET_Case_analysis -> error "\"end cases\" expected"
-	      | ET_Induction ->  error "\"end induction\" expected"
+		ET_Case_analysis -> error "\"end cases\" expected."
+	      | ET_Induction ->  error "\"end induction\" expected."
 	  end
-      | _,_ -> anomaly "lonely suppose on stack"
+      | _,_ -> anomaly "Lonely suppose on stack."
 
 (* utility for suppose / suppose it is *)
 
@@ -284,10 +287,10 @@ let justification tac gls=
       (tclSOLVE [tclTHEN tac assumption]) 
       (fun gls -> 
 	 if get_strictness () then 
-	   error "insufficient justification" 
+	   error "Insufficient justification."
 	 else
 	   begin
-	     msg_warning (str "insufficient justification");  
+	     msg_warning (str "Insufficient justification.");
 	     daimon_tac gls
 	   end) gls
 
@@ -475,7 +478,7 @@ let thus_tac c ctyp submetas gls =
     try
       find_subsubgoal c ctyp 0 submetas gls
     with Not_found -> 
-      error "I could not relate this statement to the thesis" in
+      error "I could not relate this statement to the thesis." in
   if list = [] then
     exact_check proof gls 
   else
@@ -490,7 +493,7 @@ let anon_id_base = id_of_string "__"
 let mk_stat_or_thesis info gls = function  
     This c -> c
   | Thesis (For _ ) -> 
-      error "\"thesis for ...\" is not applicable here" 
+      error "\"thesis for ...\" is not applicable here."
   | Thesis Plain -> pf_concl gls
 
 let just_tac _then cut info gls0 =
@@ -524,7 +527,7 @@ let instr_cut mkstat _thus _then cut gls0 =
     if _thus then 
       thus_tac (mkVar c_id) c_stat [] gls
     else tclIDTAC gls in
-    tclTHENS (internal_cut c_id c_stat) 
+    tclTHENS (assert_postpone c_id c_stat) 
       [tclTHEN tcl_erase_info (just_tac _then cut info);
        thus_tac] gls0
 
@@ -542,12 +545,12 @@ let decompose_eq id gls =
 	  then (args.(0),
 		args.(1), 
 		args.(2)) 
-	  else error "previous step is not an equality"
-      | _ -> error "previous step is not an equality"
+	  else error "Previous step is not an equality."
+      | _ -> error "Previous step is not an equality."
 	  
 let instr_rew _thus rew_side cut gls0 = 
   let last_id = 
-    try get_last (pf_env gls0) with _ -> error "no previous equality" in
+    try get_last (pf_env gls0) with _ -> error "No previous equality." in
   let typ,lhs,rhs = decompose_eq last_id gls0 in  
   let items_tac gls =
     match cut.cut_by with
@@ -572,14 +575,14 @@ let instr_rew _thus rew_side cut gls0 =
     match rew_side with 
 	Lhs ->
 	  let new_eq = mkApp(_eq,[|typ;cut.cut_stat.st_it;rhs|]) in
-	    tclTHENS (internal_cut c_id new_eq) 
+	    tclTHENS (assert_postpone c_id new_eq) 
 	      [tclTHEN tcl_erase_info 
 		 (tclTHENS (transitivity lhs) 
 		    [just_tac;exact_check (mkVar last_id)]);
 	       thus_tac new_eq] gls0
       | Rhs ->
 	  let new_eq = mkApp(_eq,[|typ;lhs;cut.cut_stat.st_it|]) in
-	    tclTHENS (internal_cut c_id new_eq) 
+	    tclTHENS (assert_postpone c_id new_eq) 
 	      [tclTHEN tcl_erase_info 
 		 (tclTHENS (transitivity rhs) 
 		    [exact_check (mkVar last_id);just_tac]);
@@ -600,7 +603,7 @@ let instr_claim _thus st gls0 =
     else tclIDTAC gls in
   let ninfo1 = {pm_stack=
       (if _thus then Focus_claim else Claim)::info.pm_stack} in
-    tclTHENS (internal_cut id st.st_it) 
+    tclTHENS (assert_postpone id st.st_it) 
       [tcl_change_info ninfo1;
        thus_tac] gls0
 
@@ -691,7 +694,7 @@ let instr_suffices _then cut gls0 =
   let c_term = applist (mkVar c_id,List.map mkMeta metas) in  
   let thus_tac gls= 
     thus_tac c_term c_head c_ctx gls in
-   tclTHENS (internal_cut c_id c_stat) 
+   tclTHENS (assert_postpone c_id c_stat) 
      [tclTHENLIST 
 	 [ assume_tac ctx;   
 	   tcl_erase_info;
@@ -730,7 +733,7 @@ let rec consider_match may_intro introduced available expected gls =
   match available,expected with 
       [],[] ->
 	  tclIDTAC gls
-    | _,[] -> error "last statements do not match a complete hypothesis" 
+    | _,[] -> error "Last statements do not match a complete hypothesis."
 	(* should tell which ones *)
     | [],hyps -> 
 	if may_intro then
@@ -740,11 +743,11 @@ let rec consider_match may_intro introduced available expected gls =
 		(intro_mustbe_force id)
 		(consider_match true [] [id] hyps) 
 		(fun _ -> 
-		   error "not enough sub-hypotheses to match statements")
+		   error "Not enough sub-hypotheses to match statements.")
 		gls 
           end 
 	else
-	  error "not enough sub-hypotheses to match statements" 
+	  error "Not enough sub-hypotheses to match statements."
 	    (* should tell which ones *)
     | id::rest_ids,(Hvar st | Hprop st)::rest ->
 	tclIFTHENELSE (convert_hyp (id,None,st.st_it))
@@ -761,7 +764,7 @@ let rec consider_match may_intro introduced available expected gls =
 	    (fun gls -> 
 	       let nhyps =
 		 try conjunction_arity id gls with 
-		     Not_found -> error "matching hypothesis not found" in 
+		     Not_found -> error "Matching hypothesis not found." in 
 		 tclTHENLIST 
 		   [general_case_analysis false (mkVar id,NoBindings);
 		    intron_then nhyps []
@@ -777,7 +780,7 @@ let consider_tac c hyps gls =
     | _ -> 
 	let id = pf_get_new_id (id_of_string "_tmp") gls in
 	tclTHEN 
-	  (forward None (Genarg.IntroIdentifier id) c)
+	  (forward None (dummy_loc, Genarg.IntroIdentifier id) c)
  	  (consider_match false [] [id] hyps) gls 
 	  
 
@@ -818,7 +821,7 @@ let cast_tac id_or_thesis typ gls =
 	let (_,body,_) = pf_get_hyp gls id in
 	  convert_hyp (id,body,typ) gls
     | Thesis (For _ ) -> 
-	error "\"thesis for ...\" is not applicable here" 
+	error "\"thesis for ...\" is not applicable here."
     | Thesis Plain ->    
           convert_concl typ DEFAULTcast gls
       
@@ -884,7 +887,7 @@ let build_per_info etype casee gls =
     try
       destInd hd 
     with _ -> 
-      error "Case analysis must be done on an inductive object" in
+      error "Case analysis must be done on an inductive object." in
   let mind,oind = Global.lookup_inductive ind in
   let nparams,index =
     match etype with
@@ -955,7 +958,7 @@ let suppose_tac hyps gls0 =
   let ninfo1 = {pm_stack=Suppose_case::info.pm_stack} in
   let old_clauses,stack = register_nodep_subcase id info.pm_stack in
   let ninfo2 = {pm_stack=stack} in
-    tclTHENS (internal_cut id clause) 
+    tclTHENS (assert_postpone id clause) 
       [tclTHENLIST [tcl_change_info ninfo1;
 		    assume_tac hyps;
 		    clear old_clauses];
@@ -1042,7 +1045,7 @@ let rec add_branch ((id,_) as cpl) pats tree=
 		      | Split_patt (_,ind0,_) ->
 			  if (ind <> ind0) then error
 			    (* this can happen with coercions *)
-	                    "Case pattern belongs to wrong inductive type";
+	                    "Case pattern belongs to wrong inductive type.";
 			  let mapi i ati bri =
 			    if i = pred cnum then 
 			      let nargs = 
@@ -1083,12 +1086,12 @@ let thesis_for obj typ per_info env=
   let _ = if ind <> per_info.per_ind then
     errorlabstrm "thesis_for" 
       ((Printer.pr_constr_env env obj) ++ spc () ++ 
-	 str "cannot give an induction hypothesis (wrong inductive type)") in  
+	 str"cannot give an induction hypothesis (wrong inductive type).") in  
   let params,args = list_chop per_info.per_nparams all_args in
   let _ = if not (List.for_all2 eq_constr params per_info.per_params) then
     errorlabstrm "thesis_for" 
       ((Printer.pr_constr_env env obj) ++ spc () ++ 
-	 str "cannot give an induction hypothesis (wrong parameters)") in
+	 str "cannot give an induction hypothesis (wrong parameters).") in
   let hd2 = (applist ((lift (List.length rc) per_info.per_pred),args@[obj])) in
     compose_prod rc (whd_beta hd2)
 
@@ -1161,7 +1164,7 @@ let case_tac params pat_info hyps gls0 =
     register_dep_subcase (id,List.length hyps) (pf_env gls0) per_info 
       pat_info.pat_pat ek in  
   let ninfo2 = {pm_stack=Per(et,per_info,nek,id::old_clauses)::rest} in
-    tclTHENS (internal_cut id clause) 
+    tclTHENS (assert_postpone id clause) 
       [tclTHENLIST 
 	 [tcl_change_info ninfo1; 
 	  assume_st (params@pat_info.pat_vars);
diff --git a/tactics/dhyp.ml b/tactics/dhyp.ml
index 5dd7f5fd..14731b26 100644
--- a/tactics/dhyp.ml
+++ b/tactics/dhyp.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: dhyp.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: dhyp.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (* Chet's comments about this tactic :
  
@@ -246,7 +246,7 @@ let add_destructor_hint local na loc pat pri code =
       | ConclLocation _, _ -> (None, code)
       | _ ->
 	  errorlabstrm "add_destructor_hint"
-          (str "The tactic should be a function of the hypothesis name") end
+          (str "The tactic should be a function of the hypothesis name.") end
   in
   let (_,pat) = Constrintern.interp_constrpattern Evd.empty (Global.env()) pat
   in
@@ -279,13 +279,13 @@ let match_dpat dp cls gls =
               (is_matching concld.d_typ cl) &
               (is_matching concld.d_sort (pf_type_of gls cl)))
             hl)
-        then error "No match"
+        then error "No match."
     | ({onhyps=Some[]},ConclLocation concld) when onconcl ->
         let cl = pf_concl gls in
         if not
           ((is_matching concld.d_typ cl) &
            (is_matching concld.d_sort (pf_type_of gls cl)))
-        then error "No match"
+        then error "No match."
     | _ -> error "ApplyDestructor"
 
 let forward_interp_tactic = 
@@ -304,8 +304,8 @@ let applyDestructor cls discard dd gls =
               ConstrMayEval(ConstrTerm (RRef(dummy_loc,VarRef id),None)) in
             TacLetIn (false, [(dummy_loc, x), arg], tac)
         | None, (None, tac) -> tac
-        | _, (Some _,_) -> error "Destructor expects an hypothesis"
-        | _, (None,_) -> error "Destructor is for conclusion")
+        | _, (Some _,_) -> error "Destructor expects an hypothesis."
+        | _, (None,_) -> error "Destructor is for conclusion.")
       cll in
   let discard_0 =
     List.map (fun cl ->
diff --git a/tactics/dn.ml b/tactics/dn.ml
index ab908ff9..2a8166dc 100644
--- a/tactics/dn.ml
+++ b/tactics/dn.ml
@@ -1,3 +1,4 @@
+(* -*- compile-command: "make -C .. bin/coqtop.byte" -*- *)
 (************************************************************************)
 (*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
 (* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
@@ -6,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: dn.ml 5920 2004-07-16 20:01:26Z herbelin $ *)
+(* $Id: dn.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 (* This file implements the basic structure of what Chet called
    ``discrimination nets''. If my understanding is right, it serves
@@ -32,6 +33,10 @@
 
 type ('lbl,'pat) decompose_fun = 'pat -> ('lbl * 'pat list) option
 
+type 'res lookup_res = Label of 'res | Nothing | Everything
+    
+type ('lbl,'tree) lookup_fun = 'tree -> ('lbl * 'tree list) lookup_res
+
 type ('lbl,'pat,'inf) t = (('lbl * int) option,'pat * 'inf) Tlm.t
 
 let create () = Tlm.empty
@@ -46,29 +51,44 @@ let path_of dna =
 	    
   and pathrec deferred t =
     match dna t with
-      | None -> 
-	  None :: (path_of_deferred deferred)
-      | Some (lbl,[]) ->
-	  (Some (lbl,0))::(path_of_deferred deferred)
-      | Some (lbl,(h::def_subl as v)) ->
-	  (Some (lbl,List.length v))::(pathrec (def_subl@deferred) h)
+    | None -> 
+	None :: (path_of_deferred deferred)
+    | Some (lbl,[]) ->
+	(Some (lbl,0))::(path_of_deferred deferred)
+    | Some (lbl,(h::def_subl as v)) ->
+	(Some (lbl,List.length v))::(pathrec (def_subl@deferred) h)
   in 
   pathrec []
     
 let tm_of tm lbl =
-  try [Tlm.map tm lbl] with Not_found -> []
-
+  try [Tlm.map tm lbl, true] with Not_found -> []
+    
+let rec skip_arg n tm =
+  if n = 0 then [tm,true]
+  else
+    List.flatten 
+      (List.map 
+	  (fun a -> match a with
+	  | None -> skip_arg (pred n) (Tlm.map tm a)
+	  | Some (lbl,m) -> 
+	      skip_arg (pred n + m) (Tlm.map tm a)) 
+	  (Tlm.dom tm))
+      
 let lookup tm dna t =
   let rec lookrec t tm =
-    (tm_of tm None)@
-    (match dna t with
-       | None -> []
-       | Some(lbl,v) ->
-	   List.fold_left 
-	     (fun l c -> List.flatten(List.map (lookrec c) l))
-             (tm_of tm (Some(lbl,List.length v))) v)
+    match dna t with
+    | Nothing -> tm_of tm None
+    | Label(lbl,v) ->
+	tm_of tm None@
+	  (List.fold_left 
+	      (fun l c -> 
+		List.flatten(List.map (fun (tm, b) ->
+		  if b then lookrec c tm
+		  else [tm,b]) l))
+              (tm_of tm (Some(lbl,List.length v))) v)
+    | Everything -> skip_arg 1 tm
   in 
-  List.flatten(List.map Tlm.xtract (lookrec t tm))
+    List.flatten (List.map (fun (tm,b) -> Tlm.xtract tm) (lookrec t tm))
 
 let add tm dna (pat,inf) =
   let p = path_of dna pat in Tlm.add tm (p,(pat,inf))
diff --git a/tactics/dn.mli b/tactics/dn.mli
index f8efd053..62e37a73 100644
--- a/tactics/dn.mli
+++ b/tactics/dn.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: dn.mli 5920 2004-07-16 20:01:26Z herbelin $ i*)
+(*i $Id: dn.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (* Discrimination nets. *)
 
@@ -28,13 +28,19 @@ val add : ('lbl,'pat,'inf) t -> ('lbl,'pat) decompose_fun -> 'pat * 'inf
 val rmv : ('lbl,'pat,'inf) t -> ('lbl,'pat) decompose_fun -> 'pat * 'inf 
   -> ('lbl,'pat,'inf) t
 
+type 'res lookup_res = Label of 'res | Nothing | Everything
+    
+type ('lbl,'tree) lookup_fun = 'tree -> ('lbl * 'tree list) lookup_res
+
 (* [lookup t f tree] looks for trees (and their associated
    information) in table [t] such that the structured object [tree]
    matches against them; [f] is used to translated [tree] into its
    prefix decomposition: [f] must decompose any tree into a label
    characterizing its root node and the list of its subtree *)
 
-val lookup : ('lbl,'pat,'inf) t -> ('lbl,'term) decompose_fun -> 'term
+val lookup : ('lbl,'pat,'inf) t -> ('lbl,'term) lookup_fun -> 'term
   -> ('pat * 'inf) list
 
 val app : (('pat * 'inf) -> unit) -> ('lbl,'pat,'inf) t -> unit
+
+val skip_arg : int -> ('lbl,'pat,'inf) t -> (('lbl,'pat,'inf) t * bool) list
diff --git a/tactics/eauto.ml4 b/tactics/eauto.ml4
index 2effe103..1503ca9a 100644
--- a/tactics/eauto.ml4
+++ b/tactics/eauto.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: eauto.ml4 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: eauto.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -74,11 +74,11 @@ let prolog_tac l n gl =
   let n =
     match n with
       |  ArgArg n -> n
-      | _ -> error "Prolog called with a non closed argument"
+      | _ -> error "Prolog called with a non closed argument."
   in
   try (prolog l n gl)
   with UserError ("Refiner.tclFIRST",_) ->
-    errorlabstrm "Prolog.prolog" (str "Prolog failed")
+    errorlabstrm "Prolog.prolog" (str "Prolog failed.")
 
 TACTIC EXTEND prolog
 | [ "prolog" "[" constr_list(l) "]" int_or_var(n) ] -> [ prolog_tac l n ]
@@ -111,7 +111,7 @@ let rec e_trivial_fail_db mod_delta db_list local_db goal =
 	  let d = pf_last_hyp g' in
 	  let hintl = make_resolve_hyp (pf_env g') (project g') d in
           (e_trivial_fail_db mod_delta db_list
-	     (add_hint_list hintl local_db) g'))) ::
+	      (Hint_db.add_list hintl local_db) g'))) ::
     (List.map fst (e_trivial_resolve mod_delta db_list local_db (pf_concl goal)) )
   in 
   tclFIRST (List.map tclCOMPLETE tacl) goal 
@@ -124,10 +124,9 @@ and e_my_find_search_nodelta db_list local_db hdc concl =
   let hdc = head_of_constr_reference hdc in
   let hintl =
     if occur_existential concl then 
-      list_map_append (fun (st, db) -> Hint_db.map_all hdc db) (local_db::db_list)
+      list_map_append (Hint_db.map_all hdc) (local_db::db_list)
     else 
-      list_map_append (fun (st, db) -> 
-	Hint_db.map_auto (hdc,concl) db) (local_db::db_list)
+      list_map_append (Hint_db.map_auto (hdc,concl)) (local_db::db_list)
   in 
   let tac_of_hint = 
     fun {pri=b; pat = p; code=t} -> 
@@ -160,12 +159,12 @@ and e_my_find_search_delta db_list local_db hdc concl =
   let hdc = head_of_constr_reference hdc in
   let hintl =
     if occur_existential concl then 
-      list_map_append (fun (st, db) -> 
-	let flags = {auto_unif_flags with modulo_delta = st} in
+      list_map_append (fun db -> 
+	let flags = {auto_unif_flags with modulo_delta = Hint_db.transparent_state db} in
 	  List.map (fun x -> flags, x) (Hint_db.map_all hdc db)) (local_db::db_list)
     else 
-      list_map_append (fun (st, db) -> 
-	let flags = {auto_unif_flags with modulo_delta = st} in
+      list_map_append (fun db -> 
+	let flags = {auto_unif_flags with modulo_delta = Hint_db.transparent_state db} in
 	  List.map (fun x -> flags, x) (Hint_db.map_auto (hdc,concl) db)) (local_db::db_list)
   in 
   let tac_of_hint = 
@@ -285,8 +284,7 @@ module SearchProblem = struct
 	     let hintl = 
 	       make_resolve_hyp (pf_env g') (project g') (pf_last_hyp g')
 	     in
-	       
-             let ldb = add_hint_list hintl (List.hd s.localdb) in
+             let ldb = Hint_db.add_list hintl (List.hd s.localdb) in
 	     { depth = s.depth; tacres = res; 
 	       last_tactic = pp; dblist = s.dblist;
 	       localdb = ldb :: List.tl s.localdb })
@@ -333,7 +331,7 @@ let e_depth_search debug p db_list local_db gl =
     let tac = if debug then Search.debug_depth_first else Search.depth_first in
     let s = tac (make_initial_state p gl db_list local_db) in
     s.tacres
-  with Not_found -> error "EAuto: depth first search failed"
+  with Not_found -> error "eauto: depth first search failed."
 
 let e_breadth_search debug n db_list local_db gl =
   try
@@ -342,7 +340,7 @@ let e_breadth_search debug n db_list local_db gl =
     in
     let s = tac (make_initial_state n gl db_list local_db) in
     s.tacres
-  with Not_found -> error "EAuto: breadth first search failed"
+  with Not_found -> error "eauto: breadth first search failed."
 
 let e_search_auto debug (in_depth,p) lems db_list gl = 
   let local_db = make_local_hint_db true lems gl in 
@@ -361,7 +359,7 @@ let eauto debug np lems dbnames =
     List.map
       (fun x -> 
 	 try searchtable_map x
-	 with Not_found -> error ("EAuto: "^x^": No such Hint database"))
+	 with Not_found -> error ("No such Hint database: "^x^"."))
       ("core"::dbnames) 
   in
   tclTRY (e_search_auto debug np lems db_list)
@@ -379,12 +377,12 @@ let gen_eauto d np lems = function
 let make_depth = function
   | None -> !default_search_depth 
   | Some (ArgArg d) -> d
-  | _ -> error "EAuto called with a non closed argument"
+  | _ -> error "eauto called with a non closed argument."
 
 let make_dimension n = function
   | None -> (true,make_depth n)
   | Some (ArgArg d) -> (false,d)
-  | _ -> error "EAuto called with a non closed argument"
+  | _ -> error "eauto called with a non closed argument."
 
 open Genarg
 
@@ -452,7 +450,8 @@ let autosimpl db cl =
     else []
   in
   let unfolds = List.concat (List.map (fun dbname -> 
-    let ((ids, csts), _) = searchtable_map dbname in
+    let db = searchtable_map dbname in
+    let (ids, csts) = Hint_db.transparent_state db in
       unfold_of_elts (fun x -> EvalConstRef x) (Cpred.elements csts) @
       unfold_of_elts (fun x -> EvalVarRef x) (Idpred.elements ids)) db)
   in unfold_option unfolds cl
diff --git a/tactics/elim.ml b/tactics/elim.ml
index 889ead5e..55df0f0a 100644
--- a/tactics/elim.ml
+++ b/tactics/elim.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: elim.ml 9842 2007-05-20 17:44:23Z herbelin $ *)
+(* $Id: elim.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -49,8 +49,8 @@ let introCaseAssumsThen tac ba =
     else 
       (ba.branchnames, []),
        if n1 > n2 then snd (list_chop n2 case_thin_sign) else [] in
-  let introCaseAssums = tclTHEN (intros_pattern None l1) (intros_clearing l3)
-  in
+  let introCaseAssums =
+    tclTHEN (intros_pattern no_move l1) (intros_clearing l3) in
   (tclTHEN introCaseAssums (case_on_ba (tac l2) ba))
 
 (* The following tactic Decompose repeatedly applies the
@@ -115,7 +115,7 @@ let inductive_of = function
   | IndRef ity -> ity
   | r ->
       errorlabstrm "Decompose"
-        (Printer.pr_global r ++ str " is not an inductive type")
+        (Printer.pr_global r ++ str " is not an inductive type.")
 
 let decompose_these c l gls =
   let indl = (*List.map inductive_of*) l in 
@@ -182,7 +182,7 @@ let double_ind h1 h2 gls =
   let (abs_i,abs_j) =
     if abs_i < abs_j then (abs_i,abs_j) else
     if abs_i > abs_j then (abs_j,abs_i) else
-      error "Both hypotheses are the same" in
+      error "Both hypotheses are the same." in
   (tclTHEN (tclDO abs_i intro)
      (onLastHyp
        	(fun id ->
diff --git a/tactics/elim.mli b/tactics/elim.mli
index d01d3027..cbbf2f83 100644
--- a/tactics/elim.mli
+++ b/tactics/elim.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: elim.mli 5920 2004-07-16 20:01:26Z herbelin $ i*)
+(*i $Id: elim.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -23,7 +23,7 @@ val introElimAssumsThen :
   (branch_assumptions -> tactic) -> branch_args -> tactic
 
 val introCaseAssumsThen :
-  (intro_pattern_expr list -> branch_assumptions -> tactic) -> 
+  (intro_pattern_expr Util.located list -> branch_assumptions -> tactic) -> 
     branch_args -> tactic
 
 val general_decompose : (identifier * constr -> bool) -> constr -> tactic
diff --git a/tactics/eqdecide.ml4 b/tactics/eqdecide.ml4
index 8e0b2ca3..41f85fa3 100644
--- a/tactics/eqdecide.ml4
+++ b/tactics/eqdecide.ml4
@@ -14,7 +14,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: eqdecide.ml4 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: eqdecide.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Names
@@ -152,14 +152,14 @@ let decideGralEquality g =
     let rectype =
       match kind_of_term headtyp with
         | Ind mi -> mi
-	| _ -> error "This decision procedure only works for inductive objects"
+	| _ -> error"This decision procedure only works for inductive objects."
     in
     (tclTHEN
       (mkBranches c1 c2)
       (tclORELSE (h_solveNoteqBranch eqonleft) (solveEqBranch rectype)))
     g
   with PatternMatchingFailure ->
-    error "The goal must be of the form {x<>y}+{x=y} or {x=y}+{x<>y}"
+    error "The goal must be of the form {x<>y}+{x=y} or {x=y}+{x<>y}."
 
 let decideEqualityGoal = tclTHEN intros decideGralEquality
 
diff --git a/tactics/equality.ml b/tactics/equality.ml
index a475b392..7fb19423 100644
--- a/tactics/equality.ml
+++ b/tactics/equality.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: equality.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: equality.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -76,14 +76,9 @@ let elimination_sort_of_clause = function
 
 (* The next function decides in particular whether to try a regular 
   rewrite or a setoid rewrite. 
-
-  Old approach was: 
-   break everything, if [eq] appears in head position 
-   then regular rewrite else try setoid rewrite
- 
-  New approach is: 
-   if head position is a known setoid relation then setoid rewrite
-   else back to the old approach
+  Approach is to break everything, if [eq] appears in head position 
+  then regular rewrite else try setoid rewrite. 
+  If occurrences are set, use setoid_rewrite.
 *)
 
 let general_s_rewrite_clause = function
@@ -93,45 +88,55 @@ let general_s_rewrite_clause = function
 let general_setoid_rewrite_clause = ref general_s_rewrite_clause
 let register_general_setoid_rewrite_clause = (:=) general_setoid_rewrite_clause
 
+let is_applied_setoid_relation = ref (fun _ -> false)
+let register_is_applied_setoid_relation = (:=) is_applied_setoid_relation
+
+let is_applied_relation t =
+  match kind_of_term t with
+  | App (c, args) when Array.length args >= 2 -> true
+  | _ -> false
+
+let leibniz_rewrite_ebindings_clause cls lft2rgt (c,l) with_evars gl hdcncl =
+  let hdcncls = string_of_inductive hdcncl in 
+  let suffix = elimination_suffix (elimination_sort_of_clause cls gl) in
+  let dir = if cls=None then lft2rgt else not lft2rgt in
+  let rwr_thm = if dir then hdcncls^suffix^"_r" else hdcncls^suffix in
+  let elim =
+    try pf_global gl (id_of_string rwr_thm)
+    with Not_found ->
+      error ("Cannot find rewrite principle "^rwr_thm^".")
+  in general_elim_clause with_evars cls (c,l) (elim,NoBindings) gl
+
+let leibniz_eq = Lazy.lazy_from_fun build_coq_eq
+
 let general_rewrite_ebindings_clause cls lft2rgt occs (c,l) with_evars gl =
-  let ctype = pf_apply get_type_of gl c in 
-  (* A delta-reduction would be here too strong, since it would 
-     break search for a defined setoid relation in head position. *)
-  let t = snd (decompose_prod (whd_betaiotazeta ctype)) in 
-  let head = if isApp t then fst (destApp t) else t in 
-    if relation_table_mem head && l = NoBindings then 
-      !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl
-    else 
-      (* Original code. In particular, [splay_prod] performs delta-reduction. *)
-      let env = pf_env gl in
-      let sigma = project gl in 
-      let _,t = splay_prod env sigma ctype in
-	match match_with_equation t with
-	  | None -> 
-	      if l = NoBindings
-	      then !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl
-	      else error "The term provided does not end with an equation" 
-	  | Some (hdcncl,_) -> 
-	      if occs <> all_occurrences then (
-		!general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl)
-	      else
-		let hdcncls = string_of_inductive hdcncl in 
-		let suffix = elimination_suffix (elimination_sort_of_clause cls gl) in
-		let dir = if cls=None then lft2rgt else not lft2rgt in
-		let rwr_thm = if dir then hdcncls^suffix^"_r" else hdcncls^suffix in
-		let elim =
-		  try pf_global gl (id_of_string rwr_thm)
-		  with Not_found ->
-		    error ("Cannot find rewrite principle "^rwr_thm)
-		in 
-		  try general_elim_clause with_evars cls (c,l) (elim,NoBindings) gl
-		  with e -> 
-		    let eq = build_coq_eq () in
-		      if not (eq_constr eq head) then
-			try !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl
-			with _ -> raise e
-		      else raise e
-			
+  if occs <> all_occurrences then (
+    !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl)
+  else
+    let ctype = pf_apply get_type_of gl c in 
+    let env = pf_env gl in
+    let sigma = project gl in 
+    let rels, t = decompose_prod (whd_betaiotazeta ctype) in
+      match match_with_equation t with
+      | Some (hdcncl,_) -> (* Fast path: direct leibniz rewrite *)
+	  leibniz_rewrite_ebindings_clause cls lft2rgt (c,l) with_evars gl hdcncl
+      | None ->
+	  let env' = List.fold_left (fun env (n,t) -> push_rel (n, None, t) env) env rels in
+	  let _,t' = splay_prod env' sigma t in (* Search for underlying eq *)
+	    match match_with_equation t' with
+	    | Some (hdcncl,_) -> (* Maybe a setoid relation with eq inside *)
+		if l = NoBindings && !is_applied_setoid_relation t then
+		  !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl
+		else
+		  (try leibniz_rewrite_ebindings_clause cls lft2rgt (c,l) with_evars gl hdcncl
+		    with e -> 
+		      try !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl
+		      with _ -> raise e)
+	    | None -> (* Can't be leibniz, try setoid *)
+		if l = NoBindings
+		then !general_setoid_rewrite_clause cls lft2rgt occs c ~new_goals:[] gl
+		else error "The term provided does not end with an equation."
+
 let general_rewrite_ebindings = 
   general_rewrite_ebindings_clause None
 let general_rewrite_bindings l2r occs (c,bl) = 
@@ -269,7 +274,7 @@ let multi_replace clause c2 c1 unsafe try_prove_eq_opt gl =
 	 ]
       ] gl
   else
-    error "terms do not have convertible types"
+    error "Terms do not have convertible types."
   
 
 let replace c2 c1 gl = multi_replace onConcl c2 c1 false None gl
@@ -494,7 +499,7 @@ let construct_discriminator sigma env dirn c sort =
        *)
       errorlabstrm "Equality.construct_discriminator"
 	(str "Cannot discriminate on inductive constructors with 
-		 dependent types") in
+		 dependent types.") in
   let (ind,_) = dest_ind_family indf in
   let (mib,mip) = lookup_mind_specif env ind in
   let (true_0,false_0,sort_0) = build_coq_True(),build_coq_False(),Prop Null in
@@ -534,7 +539,7 @@ let gen_absurdity id gl =
     simplest_elim (mkVar id) gl
   else
     errorlabstrm "Equality.gen_absurdity" 
-      (str "Not the negation of an equality")
+      (str "Not the negation of an equality.")
 
 (* Precondition: eq is leibniz equality
  
@@ -559,7 +564,7 @@ let apply_on_clause (f,t) clause =
   let argmv = 
     (match kind_of_term (last_arg f_clause.templval.Evd.rebus) with
      | Meta mv -> mv
-     | _  -> errorlabstrm "" (str "Ill-formed clause applicator")) in
+     | _  -> errorlabstrm "" (str "Ill-formed clause applicator.")) in
   clenv_fchain argmv f_clause clause
 
 let discr_positions env sigma (lbeq,(t,t1,t2)) eq_clause cpath dirn sort =
@@ -580,7 +585,7 @@ let discrEq (lbeq,(t,t1,t2) as u) eq_clause gls =
   let env = pf_env gls in
   match find_positions env sigma t1 t2 with
     | Inr _ ->
-	errorlabstrm "discr" (str"Not a discriminable equality")
+	errorlabstrm "discr" (str"Not a discriminable equality.")
     | Inl (cpath, (_,dirn), _) ->
 	let sort = pf_apply get_type_of gls (pf_concl gls) in 
 	discr_positions env sigma u eq_clause cpath dirn sort gls
@@ -594,7 +599,7 @@ let onEquality with_evars tac (c,lbindc) gls =
   let eq =
     try find_eq_data_decompose eqn
     with PatternMatchingFailure ->
-      errorlabstrm "" (str"No primitive equality found") in
+      errorlabstrm "" (str"No primitive equality found.") in
   tclTHEN
     (Refiner.tclEVARS (Evd.evars_of eq_clause'.evd)) 
     (tac eq eq_clause') gls
@@ -607,7 +612,7 @@ let onNegatedEquality with_evars tac gls =
         (onLastHyp (fun id -> 
           onEquality with_evars tac (mkVar id,NoBindings))) gls
   | _ -> 
-      errorlabstrm "" (str "Not a negated primitive equality")
+      errorlabstrm "" (str "Not a negated primitive equality.")
 
 let discrSimpleClause with_evars = function
   | None -> onNegatedEquality with_evars discrEq
@@ -622,7 +627,7 @@ let discrEverywhere with_evars =
     (Tacticals.tryAllClauses
       (fun cl -> tclCOMPLETE (discrSimpleClause with_evars cl)))
     (fun gls -> 
-       errorlabstrm "DiscrEverywhere" (str"No discriminable equalities"))
+       errorlabstrm "DiscrEverywhere" (str"No discriminable equalities."))
 
 let discr_tac with_evars = function
   | None -> discrEverywhere with_evars
@@ -723,7 +728,7 @@ let sig_clausal_form env sigma sort_of_ty siglen ty dflt =
 	(* the_conv_x had a side-effect on evdref *)
 	dflt
       else
-	error "Cannot solve an unification problem"
+	error "Cannot solve an unification problem."
     else
       let (a,p_i_minus_1) = match whd_beta_stack p_i with
 	| (_sigS,[a;p]) -> (a,p)
@@ -865,7 +870,7 @@ let inject_at_positions env sigma (eq,(t,t1,t2)) eq_clause posns =
 	(pf,ty))
       posns in
   if injectors = [] then
-    errorlabstrm "Equality.inj" (str "Failed to decompose the equality");
+    errorlabstrm "Equality.inj" (str "Failed to decompose the equality.");
   tclMAP
     (fun (pf,ty) -> tclTHENS (cut ty) [tclIDTAC; refine pf])
     injectors
@@ -879,10 +884,10 @@ let injEq ipats (eq,(t,t1,t2)) eq_clause =
   match find_positions env sigma t1 t2 with
     | Inl _ ->
 	errorlabstrm "Inj"
-	  (str"Not a projectable equality but a discriminable one")
+	  (str"Not a projectable equality but a discriminable one.")
     | Inr [] ->
 	errorlabstrm "Equality.inj" 
-	   (str"Nothing to do, it is an equality between convertible terms")
+	   (str"Nothing to do, it is an equality between convertible terms.")
     | Inr posns ->
 (* Est-ce utile à partir du moment où les arguments projetés subissent "nf" ?
 	let t1 = try_delta_expand env sigma t1 in
@@ -923,7 +928,7 @@ let injEq ipats (eq,(t,t1,t2)) eq_clause =
         ) with _ ->
 	tclTHEN
 	  (inject_at_positions env sigma (eq,(t,t1,t2)) eq_clause posns)
-	  (intros_pattern None ipats)
+	  (intros_pattern no_move ipats)
 
 let inj ipats with_evars = onEquality with_evars (injEq ipats)
 
@@ -986,7 +991,7 @@ let find_elim sort_of_gl lbeq =
         (match lbeq.rect with
            | Some eq_rect -> eq_rect
            | None -> errorlabstrm "find_elim"
-		 (str "this type of substitution is not allowed"))
+		 (str "This type of substitution is not allowed."))
 
 (* Refine from [|- P e2] to [|- P e1] and [|- e1=e2:>t] (body is P (Rel 1)) *)
 
@@ -1086,11 +1091,10 @@ let try_rewrite tac gls =
     tac gls
   with 
     | PatternMatchingFailure ->
-	errorlabstrm "try_rewrite" (str "Not a primitive equality here")
+	errorlabstrm "try_rewrite" (str "Not a primitive equality here.")
     | e when catchable_exception e -> 
 	errorlabstrm "try_rewrite"
-          (str "Cannot find a well-typed generalization of the goal that" ++
-             str " makes the proof progress")
+          (strbrk "Cannot find a well-typed generalization of the goal that makes the proof progress.")
 
 let cutSubstClause l2r eqn cls gls =
   match cls with
@@ -1145,7 +1149,7 @@ let unfold_body x gl =
     match Sign.lookup_named x hyps with
         (_,Some xval,_) -> xval
       | _ -> errorlabstrm "unfold_body"
-          (pr_id x ++ str" is not a defined hypothesis") in
+          (pr_id x ++ str" is not a defined hypothesis.") in
   let aft = afterHyp x gl in
   let hl = List.fold_right 
     (fun (y,yval,_) cl -> ((all_occurrences_expr,y),InHyp) :: cl) aft [] in
@@ -1182,7 +1186,8 @@ let subst_one x gl =
       let test hyp _ = is_eq_x varx hyp in
       Sign.fold_named_context test ~init:() hyps;
       errorlabstrm "Subst"
-        (str "cannot find any non-recursive equality over " ++ pr_id x)
+        (str "Cannot find any non-recursive equality over " ++ pr_id x ++
+	 str".")
     with FoundHyp res -> res
   in
   (* The set of hypotheses using x *)
@@ -1263,7 +1268,7 @@ let cond_eq_term c t gl =
 
 let rewrite_multi_assumption_cond cond_eq_term cl gl = 
   let rec arec = function 
-    | [] -> error "No such assumption"
+    | [] -> error "No such assumption."
     | (id,_,t) ::rest -> 
 	begin 
 	  try 
@@ -1286,7 +1291,7 @@ let replace_multi_term dir_opt c  =
 (* JF. old version 
 let rewrite_assumption_cond faildir gl =
    let rec arec = function
-      | [] -> error "No such assumption"
+      | [] -> error "No such assumption."
       | (id,_,t)::rest ->
 	  (try let dir = faildir t gl in
 	       general_rewrite dir (mkVar id) gl
@@ -1296,7 +1301,7 @@ let rewrite_assumption_cond faildir gl =
 
 let rewrite_assumption_cond_in faildir hyp gl =
    let rec arec = function
-      | [] -> error "No such assumption"
+      | [] -> error "No such assumption."
       | (id,_,t)::rest ->
 	  (try let dir = faildir t gl in
 	       general_rewrite_in dir hyp (mkVar id) gl
diff --git a/tactics/equality.mli b/tactics/equality.mli
index 42c502be..f05ebc6c 100644
--- a/tactics/equality.mli
+++ b/tactics/equality.mli
@@ -6,9 +6,10 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: equality.mli 11166 2008-06-22 13:23:35Z herbelin $ i*)
+(*i $Id: equality.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
+open Util
 open Names
 open Term
 open Sign
@@ -45,6 +46,7 @@ val rewriteRL   : constr  -> tactic
 val register_general_setoid_rewrite_clause :
   (identifier option -> bool ->
     occurrences -> constr -> new_goals:constr list -> tactic) -> unit
+val register_is_applied_setoid_relation : (constr -> bool) -> unit
 
 val general_rewrite_bindings_in :
   bool -> occurrences -> identifier -> constr with_bindings -> evars_flag -> tactic
@@ -74,9 +76,9 @@ val discrHyp     : identifier -> tactic
 val discrEverywhere : evars_flag -> tactic
 val discr_tac    : evars_flag -> 
   constr with_ebindings induction_arg option -> tactic
-val inj          : intro_pattern_expr list -> evars_flag ->
+val inj          : intro_pattern_expr located list -> evars_flag ->
   constr with_ebindings -> tactic
-val injClause    : intro_pattern_expr list -> evars_flag -> 
+val injClause    : intro_pattern_expr located list -> evars_flag -> 
   constr with_ebindings induction_arg option -> tactic
 val injHyp       : identifier -> tactic
 val injConcl     : tactic
diff --git a/tactics/evar_tactics.ml b/tactics/evar_tactics.ml
index b4a39a24..3c266c51 100644
--- a/tactics/evar_tactics.ml
+++ b/tactics/evar_tactics.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: evar_tactics.ml 11072 2008-06-08 16:13:37Z herbelin $ *)
+(* $Id: evar_tactics.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Term
 open Util
@@ -41,16 +41,16 @@ let instantiate n rawc ido gl =
 		  (match decl with 
 		      (_,None,typ) -> evar_list sigma typ
 		    | _ -> error 
-			"please be more specific : in type or value ?")
+			"Please be more specific: in type or value?")
 	      | InHypTypeOnly ->
 		  let (_, _, typ) = decl in evar_list sigma typ
 	      | InHypValueOnly ->
 		  (match decl with 
 		      (_,Some body,_) -> evar_list sigma body
-		    | _ -> error "not a let .. in  hypothesis") in
+		    | _ -> error "Not a defined hypothesis.") in
     if List.length evl < n then
       error "not enough uninstantiated existential variables";
-    if n <= 0 then error "incorrect existential variable index";
+    if n <= 0 then error "Incorrect existential variable index.";
     let ev,_ =  destEvar (List.nth evl (n-1)) in
     let evd' = w_refine ev rawc (create_goal_evar_defs sigma) in
       tclTHEN
diff --git a/tactics/extratactics.ml4 b/tactics/extratactics.ml4
index 885138e4..66716acd 100644
--- a/tactics/extratactics.ml4
+++ b/tactics/extratactics.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: extratactics.ml4 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: extratactics.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Pcoq
@@ -486,21 +486,29 @@ END
 
 
 TACTIC EXTEND apply_in
-| ["apply" constr_with_bindings(c) "in" hyp(id) ] -> [ apply_in false id [c] ]
-| ["apply" constr_with_bindings(c) "," constr_with_bindings_list_sep(cl,",") 
-   "in" hyp(id) ] -> [ apply_in false id (c::cl) ]
+| ["apply" ne_constr_with_bindings_list_sep(cl,",") "in" hyp(id) ] -> 
+    [ apply_in false id cl ]
 END
 
 
 TACTIC EXTEND eapply_in
-| ["eapply" constr_with_bindings(c) "in" hyp(id) ] -> [ apply_in true id [c] ]
-| ["epply" constr_with_bindings(c) "," constr_with_bindings_list_sep(cl,",") 
-   "in" hyp(id) ] -> [ apply_in true id (c::cl) ]
+| ["eapply" ne_constr_with_bindings_list_sep(cl,",") "in" hyp(id) ] ->
+    [ apply_in true id cl ]
 END
 
 (* sozeau: abs/gen for induction on instantiated dependent inductives, using "Ford" induction as 
   defined by Conor McBride *)
 TACTIC EXTEND generalize_eqs
-| ["generalize_eqs" hyp(id) ] -> [ abstract_generalize id ]
+| ["generalize_eqs" hyp(id) ] -> [ abstract_generalize id ~generalize_vars:false ]
+END
+TACTIC EXTEND generalize_eqs_vars
+| ["generalize_eqs_vars" hyp(id) ] -> [ abstract_generalize id ~generalize_vars:true ]
+END
+
+TACTIC EXTEND conv
+| ["conv" constr(x) constr(y) ] -> [ conv x y ]
 END
 
+TACTIC EXTEND resolve_classes
+| ["resolve_classes" ] -> [ resolve_classes ]
+END
diff --git a/tactics/hiddentac.ml b/tactics/hiddentac.ml
index 190a7ba2..31c1b02f 100644
--- a/tactics/hiddentac.ml
+++ b/tactics/hiddentac.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: hiddentac.ml 11094 2008-06-10 19:35:23Z herbelin $ *)
+(* $Id: hiddentac.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Term
 open Proof_type
@@ -30,8 +30,8 @@ let inj_occ (occ,c) = (occ,inj_open c)
 
 (* Basic tactics *)
 let h_intro_move x y =
-  abstract_tactic (TacIntroMove (x, Option.map inj_id y)) (intro_move x y)
-let h_intro x        = h_intro_move (Some x) None
+  abstract_tactic (TacIntroMove (x, y)) (intro_move x y)
+let h_intro x        = h_intro_move (Some x) no_move
 let h_intros_until x = abstract_tactic (TacIntrosUntil x) (intros_until x)
 let h_assumption     = abstract_tactic TacAssumption assumption
 let h_exact c        = abstract_tactic (TacExact (inj_open c)) (exact_check c)
@@ -40,7 +40,7 @@ let h_exact_no_check c =
 let h_vm_cast_no_check c = 
   abstract_tactic (TacVmCastNoCheck (inj_open c)) (vm_cast_no_check c)
 let h_apply simple ev cb    =
-  abstract_tactic (TacApply (simple,ev,inj_open_wb cb))
+  abstract_tactic (TacApply (simple,ev,List.map inj_open_wb cb))
     (apply_with_ebindings_gen simple ev cb)
 let h_elim ev cb cbo    =
   abstract_tactic (TacElim (ev,inj_open_wb cb,Option.map inj_open_wb cbo))
@@ -70,7 +70,7 @@ let h_generalize cl =
 let h_generalize_dep c =
   abstract_tactic (TacGeneralizeDep (inj_open c))(generalize_dep c)
 let h_let_tac b na c cl =
-  let with_eq = if b then None else Some true in
+  let with_eq = if b then None else Some (true,(dummy_loc,IntroAnonymous)) in
   abstract_tactic (TacLetTac (na,inj_open c,cl,b)) (letin_tac with_eq na c cl)
 let h_instantiate n c ido = 
 (Evar_tactics.instantiate n c ido)
@@ -78,16 +78,19 @@ let h_instantiate n c ido =
     (Evar_refiner.instantiate n c (simple_clause_of cls)) *)
 
 (* Derived basic tactics *)
-let h_simple_induction h =
-  abstract_tactic (TacSimpleInduction h) (simple_induct h)
-let h_simple_destruct h  =
-  abstract_tactic (TacSimpleDestruct h) (simple_destruct h)
-let h_new_induction ev c e idl cl =
-  abstract_tactic (TacNewInduction (ev,List.map inj_ia c,Option.map inj_open_wb e,idl,cl))
-    (new_induct ev c e idl cl)
-let h_new_destruct ev c e idl cl =
-  abstract_tactic (TacNewDestruct (ev,List.map inj_ia c,Option.map inj_open_wb e,idl,cl))
-    (new_destruct ev c e idl cl)
+let h_simple_induction_destruct isrec h =
+  abstract_tactic (TacSimpleInductionDestruct (isrec,h)) 
+    (if isrec then (simple_induct h) else (simple_destruct h))
+let h_simple_induction = h_simple_induction_destruct true
+let h_simple_destruct = h_simple_induction_destruct false
+
+let h_induction_destruct isrec ev l =
+  abstract_tactic (TacInductionDestruct (isrec,ev,List.map (fun (c,e,idl,cl) -> 
+    List.map inj_ia c,Option.map inj_open_wb e,idl,cl) l))
+    (induction_destruct ev isrec l)
+let h_new_induction ev c e idl cl = h_induction_destruct ev true [c,e,idl,cl]
+let h_new_destruct ev c e idl cl = h_induction_destruct ev false [c,e,idl,cl]
+
 let h_specialize n d = abstract_tactic (TacSpecialize (n,inj_open_wb d)) (specialize n d)
 let h_lapply c = abstract_tactic (TacLApply (inj_open c)) (cut_and_apply c)
 
@@ -128,8 +131,8 @@ let h_symmetry c     = abstract_tactic (TacSymmetry c) (intros_symmetry c)
 let h_transitivity c =
   abstract_tactic (TacTransitivity (inj_open c)) (intros_transitivity c)
 
-let h_simplest_apply c  = h_apply false false (c,NoBindings)
-let h_simplest_eapply c = h_apply false true (c,NoBindings)
+let h_simplest_apply c  = h_apply false false [c,NoBindings]
+let h_simplest_eapply c = h_apply false true [c,NoBindings]
 let h_simplest_elim c   = h_elim false (c,NoBindings) None
 let h_simplest_case   c = h_case false (c,NoBindings)
 
diff --git a/tactics/hiddentac.mli b/tactics/hiddentac.mli
index eed3b1da..3e636668 100644
--- a/tactics/hiddentac.mli
+++ b/tactics/hiddentac.mli
@@ -6,10 +6,11 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: hiddentac.mli 11072 2008-06-08 16:13:37Z herbelin $ i*)
+(*i $Id: hiddentac.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
+open Util
 open Term
 open Proof_type
 open Tacmach
@@ -25,7 +26,7 @@ open Clenv
 
 (* Basic tactics *)
 
-val h_intro_move      : identifier option -> identifier option -> tactic
+val h_intro_move      : identifier option -> identifier move_location -> tactic
 val h_intro           : identifier -> tactic
 val h_intros_until    : quantified_hypothesis -> tactic
 
@@ -35,7 +36,7 @@ val h_exact_no_check  : constr -> tactic
 val h_vm_cast_no_check  : constr -> tactic
 
 val h_apply           : advanced_flag -> evars_flag -> 
-                        constr with_ebindings -> tactic
+                        constr with_ebindings list -> tactic
 
 val h_elim            : evars_flag -> constr with_ebindings ->
                         constr with_ebindings option -> tactic
@@ -63,14 +64,20 @@ val h_instantiate     : int -> Rawterm.rawconstr ->
 
 val h_simple_induction   : quantified_hypothesis -> tactic
 val h_simple_destruct    : quantified_hypothesis -> tactic
-val h_new_induction   :
-  evars_flag -> constr with_ebindings induction_arg list ->
-    constr with_ebindings option -> intro_pattern_expr ->
-      Tacticals.clause option -> tactic
-val h_new_destruct    :
-  evars_flag -> constr with_ebindings induction_arg list ->
-    constr with_ebindings option -> intro_pattern_expr ->
-      Tacticals.clause option -> tactic
+val h_simple_induction_destruct : rec_flag -> quantified_hypothesis -> tactic
+val h_new_induction   : evars_flag -> 
+  constr with_ebindings induction_arg list -> constr with_ebindings option ->
+  intro_pattern_expr located option * intro_pattern_expr located option ->
+  Tacticals.clause option -> tactic
+val h_new_destruct    : evars_flag -> 
+  constr with_ebindings induction_arg list -> constr with_ebindings option -> 
+  intro_pattern_expr located option * intro_pattern_expr located option ->
+  Tacticals.clause option -> tactic
+val h_induction_destruct : rec_flag -> evars_flag ->
+  (constr with_ebindings induction_arg list * constr with_ebindings option * 
+   (intro_pattern_expr located option * intro_pattern_expr located option) *
+   Tacticals.clause option) list -> tactic
+
 val h_specialize      : int option -> constr with_ebindings -> tactic
 val h_lapply          : constr -> tactic
 
@@ -80,7 +87,7 @@ val h_lapply          : constr -> tactic
 (* Context management *)
 val h_clear           : bool -> identifier list -> tactic
 val h_clear_body      : identifier list -> tactic
-val h_move            : bool -> identifier -> identifier -> tactic
+val h_move            : bool -> identifier -> identifier move_location -> tactic
 val h_rename          : (identifier*identifier) list -> tactic
 val h_revert          : identifier list -> tactic
 
@@ -110,4 +117,4 @@ val h_simplest_eapply : constr -> tactic
 val h_simplest_elim   : constr -> tactic
 val h_simplest_case   : constr -> tactic
 
-val h_intro_patterns  : intro_pattern_expr list -> tactic
+val h_intro_patterns  : intro_pattern_expr located list -> tactic
diff --git a/tactics/hipattern.ml4 b/tactics/hipattern.ml4
index fca84fd2..de500f89 100644
--- a/tactics/hipattern.ml4
+++ b/tactics/hipattern.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma parsing/q_constr.cmo" i*)
 
-(* $Id: hipattern.ml4 8866 2006-05-28 16:21:04Z herbelin $ *)
+(* $Id: hipattern.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -273,7 +273,7 @@ let dest_nf_eq gls eqn =
   try
     snd (first_match (match_eq_nf gls eqn) equalities)
   with PatternMatchingFailure ->
-    error "Not an equality"
+    error "Not an equality."
 
 (*** Sigma-types *)
 
diff --git a/tactics/inv.ml b/tactics/inv.ml
index 8bd10a4d..68ebfd3c 100644
--- a/tactics/inv.ml
+++ b/tactics/inv.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: inv.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: inv.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -101,7 +101,7 @@ let make_inv_predicate env sigma indf realargs id status concl =
       | Dep dflt_concl ->
 	  if not (occur_var env id concl) then
 	    errorlabstrm "make_inv_predicate"
-              (str "Current goal does not depend on " ++ pr_id id);
+              (str "Current goal does not depend on " ++ pr_id id ++ str".");
           (* We abstract the conclusion of goal with respect to
              realargs and c to * be concl in order to rewrite and have
              c also rewritten when the case * will be done *)
@@ -291,10 +291,10 @@ let generalizeRewriteIntros tac depids id gls =
 let rec tclMAP_i n tacfun = function
   | [] -> tclDO n (tacfun None)
   | a::l -> 
-      if n=0 then error "Too much names"
+      if n=0 then error "Too much names."
       else tclTHEN (tacfun (Some a)) (tclMAP_i (n-1) tacfun l)
 
-let remember_first_eq id x = if !x = None then x := Some id
+let remember_first_eq id x = if !x = no_move then x := MoveAfter id
 
 (* invariant: ProjectAndApply is responsible for erasing the clause
    which it is given as input
@@ -321,7 +321,7 @@ let projectAndApply thin id eqname names depids gls =
       [(if names <> [] then clear [id] else tclIDTAC);
        (tclMAP_i neqns (fun idopt ->
 	 tclTHEN
-	   (intro_move idopt None)
+	   (intro_move idopt no_move)
 	   (* try again to substitute and if still not a variable after *)
 	   (* decomposition, arbitrarily try to rewrite RL !? *)
 	   (tclTRY (onLastHyp (substHypIfVariable (subst_hyp false)))))
@@ -350,7 +350,7 @@ let rewrite_equations_gene othin neqns ba gl =
                         (onLastHyp
                            (fun id ->
                               tclTRY 
-			        (projectAndApply thin id (ref None)
+			        (projectAndApply thin id (ref no_move)
 				  [] depids))));
                  onHyps (compose List.rev (afterHyp last)) bring_hyps;
                  onHyps (afterHyp last)
@@ -375,24 +375,24 @@ let rewrite_equations_gene othin neqns ba gl =
      None: the equations are introduced, but not rewritten
      Some thin: the equations are rewritten, and cleared if thin is true *)
 
-let rec get_names allow_conj = function
+let rec get_names allow_conj (loc,pat) = match pat with
   | IntroWildcard ->
-      error "Discarding pattern not allowed for inversion equations"
+      error "Discarding pattern not allowed for inversion equations."
   | IntroAnonymous ->
-      error "Anonymous pattern not allowed for inversion equations"
-  | IntroFresh _->
-      error "Fresh pattern not allowed for inversion equations"
+      error "Anonymous pattern not allowed for inversion equations."
+  | IntroFresh _ ->
+      error "Fresh pattern not allowed for inversion equations."
   | IntroRewrite _->
-      error "Rewriting pattern not allowed for inversion equations"
+      error "Rewriting pattern not allowed for inversion equations."
   | IntroOrAndPattern [l] -> 
       if allow_conj then
 	if l = [] then (None,[]) else
 	  let l = List.map (fun id -> Option.get (fst (get_names false id))) l in
 	  (Some (List.hd l), l)
       else
-	error "Nested conjunctive patterns not allowed for inversion equations"
+	error"Nested conjunctive patterns not allowed for inversion equations."
   | IntroOrAndPattern l ->
-      error "Disjunctive patterns not allowed for inversion equations"
+      error "Disjunctive patterns not allowed for inversion equations."
   | IntroIdentifier id ->
       (Some id,[id])
 
@@ -404,7 +404,7 @@ let rewrite_equations othin neqns names ba gl =
   let names = List.map (get_names true) names in
   let (depids,nodepids) = split_dep_and_nodep ba.assums gl in
   let rewrite_eqns =
-    let first_eq = ref None in
+    let first_eq = ref no_move in
     match othin with
       | Some thin ->
           tclTHENSEQ
@@ -413,12 +413,12 @@ let rewrite_equations othin neqns names ba gl =
 	     tclMAP_i neqns (fun o ->
 	       let idopt,names = extract_eqn_names o in
                (tclTHEN
-		 (intro_move idopt None)
+		 (intro_move idopt no_move)
 		 (onLastHyp (fun id ->
 		   tclTRY (projectAndApply thin id first_eq names depids)))))
 	       names;
 	     tclMAP (fun (id,_,_) gl ->
-	       intro_move None (if thin then None else !first_eq) gl)
+	       intro_move None (if thin then no_move else !first_eq) gl)
 	       nodepids;
 	     tclMAP (fun (id,_,_) -> tclTRY (clear [id])) depids]
       | None -> tclIDTAC
@@ -453,7 +453,7 @@ let raw_inversion inv_kind id status names gl =
     try pf_reduce_to_atomic_ind gl (pf_type_of gl c)
     with UserError _ -> 
       errorlabstrm "raw_inversion"
-	(str ("The type of "^(string_of_id id)^" is not inductive")) in
+	(str ("The type of "^(string_of_id id)^" is not inductive.")) in
   let indclause = mk_clenv_from gl (c,t) in
   let ccl = clenv_type indclause in
   check_no_metas indclause ccl;
@@ -494,7 +494,7 @@ let not_found_message ids =
 let dep_prop_prop_message id =
   errorlabstrm "Inv"
     (str "Inversion on " ++ pr_id id ++
-       str " would needs dependent elimination Prop-Prop")
+       str " would need dependent elimination from Prop to Prop.")
  
 let not_inductive_here id =
   errorlabstrm "mind_specif_of_mind"
@@ -524,15 +524,15 @@ open Tacexpr
 
 let inv k = inv_gen false k NoDep
 
-let half_inv_tac id  = inv SimpleInversion IntroAnonymous (NamedHyp id)
-let inv_tac id       = inv FullInversion IntroAnonymous (NamedHyp id)
-let inv_clear_tac id = inv FullInversionClear IntroAnonymous (NamedHyp id)
+let half_inv_tac id  = inv SimpleInversion None (NamedHyp id)
+let inv_tac id       = inv FullInversion None (NamedHyp id)
+let inv_clear_tac id = inv FullInversionClear None (NamedHyp id)
 
 let dinv k c = inv_gen false k (Dep c)
 
-let half_dinv_tac id  = dinv SimpleInversion None IntroAnonymous (NamedHyp id)
-let dinv_tac id       = dinv FullInversion None IntroAnonymous (NamedHyp id)
-let dinv_clear_tac id = dinv FullInversionClear None IntroAnonymous (NamedHyp id)
+let half_dinv_tac id  = dinv SimpleInversion None None (NamedHyp id)
+let dinv_tac id       = dinv FullInversion None None (NamedHyp id)
+let dinv_clear_tac id = dinv FullInversionClear None None (NamedHyp id)
 
 (* InvIn will bring the specified clauses into the conclusion, and then
  * perform inversion on the named hypothesis.  After, it will intro them
diff --git a/tactics/inv.mli b/tactics/inv.mli
index bd38d08f..bbb2a322 100644
--- a/tactics/inv.mli
+++ b/tactics/inv.mli
@@ -6,9 +6,10 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: inv.mli 7880 2006-01-16 13:59:08Z herbelin $ i*)
+(*i $Id: inv.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
+open Util
 open Names
 open Term
 open Tacmach
@@ -21,20 +22,20 @@ type inversion_status = Dep of constr option | NoDep
 
 val inv_gen :
   bool -> inversion_kind -> inversion_status ->
-    intro_pattern_expr -> quantified_hypothesis -> tactic
+    intro_pattern_expr located option -> quantified_hypothesis -> tactic
 val invIn_gen :
-  inversion_kind -> intro_pattern_expr -> identifier list -> 
+  inversion_kind -> intro_pattern_expr located option -> identifier list -> 
     quantified_hypothesis -> tactic
 
 val inv_clause :
-  inversion_kind -> intro_pattern_expr -> identifier list ->
+  inversion_kind -> intro_pattern_expr located option -> identifier list ->
     quantified_hypothesis -> tactic
 
-val inv : inversion_kind -> intro_pattern_expr ->
+val inv : inversion_kind -> intro_pattern_expr located option ->
   quantified_hypothesis -> tactic
 
-val dinv : inversion_kind -> constr option -> intro_pattern_expr ->
-  quantified_hypothesis -> tactic
+val dinv : inversion_kind -> constr option ->
+  intro_pattern_expr located option -> quantified_hypothesis -> tactic
 
 val half_inv_tac : identifier -> tactic
 val inv_tac : identifier -> tactic
diff --git a/tactics/leminv.ml b/tactics/leminv.ml
index 70e8c375..5acc5197 100644
--- a/tactics/leminv.ml
+++ b/tactics/leminv.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: leminv.ml 10348 2007-12-06 17:36:14Z aspiwack $ *)
+(* $Id: leminv.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -214,7 +214,7 @@ let inversion_scheme env sigma t sort dep_option inv_op =
        (ids_of_named_context (named_context invEnv)));
   (*
     errorlabstrm "lemma_inversion"
-    (str"Computed inversion goal was not closed in initial signature");
+    (str"Computed inversion goal was not closed in initial signature.");
   *)
   let invSign = named_context_val invEnv in
   let pfs = mk_pftreestate (mk_goal invSign invGoal None) in
@@ -272,7 +272,7 @@ let inversion_lemma_from_goal n na (loc,id) sort dep_option inv_op =
     errorlabstrm "lemma_inversion"
       (str"Cannot compute lemma inversion when there are" ++ spc () ++
 	 str"free variables in the types of an inductive" ++ spc () ++
-	 str"which are not free in its instance"); *)
+	 str"which are not free in its instance."); *)
   add_inversion_lemma na env sigma t sort dep_option inv_op
    
 let add_inversion_lemma_exn na com comsort bool tac =
diff --git a/tactics/nbtermdn.ml b/tactics/nbtermdn.ml
index d9d0a799..b94ae2dd 100644
--- a/tactics/nbtermdn.ml
+++ b/tactics/nbtermdn.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: nbtermdn.ml 10346 2007-12-05 21:11:19Z aspiwack $ *)
+(* $Id: nbtermdn.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Util
 open Names
@@ -46,14 +46,14 @@ let add dn (na,(pat,valu)) =
   let hkey = Option.map fst (Termdn.constr_pat_discr pat) in 
   dn.table <- Gmap.add na (pat,valu) dn.table;
   let dnm = dn.patterns in
-  dn.patterns <- Gmap.add hkey (Btermdn.add (get_dn dnm hkey) (pat,valu)) dnm
+  dn.patterns <- Gmap.add hkey (Btermdn.add None (get_dn dnm hkey) (pat,valu)) dnm
     
 let rmv dn na =
   let (pat,valu) = Gmap.find na dn.table in
   let hkey = Option.map fst (Termdn.constr_pat_discr pat) in 
   dn.table <- Gmap.remove na dn.table;
   let dnm = dn.patterns in
-  dn.patterns <- Gmap.add hkey (Btermdn.rmv (get_dn dnm hkey) (pat,valu)) dnm
+  dn.patterns <- Gmap.add hkey (Btermdn.rmv None (get_dn dnm hkey) (pat,valu)) dnm
 
 let in_dn dn na = Gmap.mem na dn.table
 			  
@@ -62,8 +62,12 @@ let remap ndn na (pat,valu) =
   add ndn (na,(pat,valu))
 
 let lookup dn valu =
-  let hkey = Option.map fst (Termdn.constr_val_discr valu) in 
-  try Btermdn.lookup (Gmap.find hkey  dn.patterns) valu with Not_found -> []
+  let hkey = 
+    match (Termdn.constr_val_discr valu) with 
+    | Dn.Label(l,_) -> Some l
+    | _ -> None
+  in 
+  try Btermdn.lookup None (Gmap.find hkey dn.patterns) valu with Not_found -> []
 
 let app f dn = Gmap.iter f dn.table
 		       
diff --git a/tactics/refine.ml b/tactics/refine.ml
index 84e9dccc..7ed58f6f 100644
--- a/tactics/refine.ml
+++ b/tactics/refine.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: refine.ml 9841 2007-05-19 21:13:42Z herbelin $ *)
+(* $Id: refine.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 (* JCF -- 6 janvier 1998  EXPERIMENTAL *)
 
@@ -229,7 +229,7 @@ let rec compute_metamap env sigma c = match kind_of_term c with
   (* Produit. Est-ce bien exact ? *)
   | Prod (_,_,_) ->
       if occur_meta c then
-	error "Refine: proof term contains metas in a product"
+	error "refine: proof term contains metas in a product."
       else
       	TH (c,[],[])
 
@@ -330,7 +330,7 @@ let rec tcc_aux subst (TH (c,mm,sgp) as _th) gl =
     | Fix ((ni,_),(fi,ai,_)) , _ ->
 	let out_name = function
 	  | Name id -> id
-          | _ -> error "recursive functions must have names !"
+          | _ -> error "Recursive functions must have names."
 	in
 	let fixes = array_map3 (fun f n c -> (out_name f,succ n,c)) fi ni ai in
 	tclTHENS
@@ -345,7 +345,7 @@ let rec tcc_aux subst (TH (c,mm,sgp) as _th) gl =
     | CoFix (_,(fi,ai,_)) , _ ->
 	let out_name = function
 	  | Name id -> id
-          | _ -> error "recursive functions must have names !"
+          | _ -> error "Recursive functions must have names."
 	in
 	let cofixes = array_map2 (fun f c -> (out_name f,c)) fi ai in
 	tclTHENS
diff --git a/tactics/tacinterp.ml b/tactics/tacinterp.ml
index f4547930..3f8eb0ca 100644
--- a/tactics/tacinterp.ml
+++ b/tactics/tacinterp.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: tacinterp.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: tacinterp.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Constrintern
 open Closure
@@ -51,13 +51,13 @@ open Pcoq
 let safe_msgnl s =
     try msgnl s with e -> 
       msgnl 
-	(str "bug in the debugger : " ++
+	(str "bug in the debugger: " ++
          str "an exception is raised while printing debug information")
 
 let error_syntactic_metavariables_not_allowed loc =
   user_err_loc 
     (loc,"out_ident",
-     str "Syntactic metavariables allowed only in quotations")
+     str "Syntactic metavariables allowed only in quotations.")
 
 let error_global_not_found_loc (loc,qid) = error_global_not_found_loc loc qid
 
@@ -72,10 +72,10 @@ type ltac_type =
 
 (* Values for interpretation *)
 type value =
-  | VTactic of loc * tactic  (* For mixed ML/Ltac tactics (e.g. Tauto) *)
   | VRTactic of (goal list sigma * validation) (* For Match results *)
                                                (* Not a true value *)
-  | VFun of (identifier*value) list * identifier option list * glob_tactic_expr
+  | VFun of ltac_trace * (identifier*value) list * 
+      identifier option list * glob_tactic_expr
   | VVoid
   | VInteger of int
   | VIntroPattern of intro_pattern_expr (* includes idents which are not *)
@@ -86,20 +86,20 @@ type value =
   | VList of value list
   | VRec of (identifier*value) list ref * glob_tactic_expr
 
-let locate_tactic_call loc = function
-  | VTactic (_,t) -> VTactic (loc,t)
-  | v -> v
-
-let locate_error_in_file dir = function
-  | Stdpp.Exc_located (loc,e) -> Error_in_file ("",(true,dir,loc),e)
-  | e -> Error_in_file ("",(true,dir,dummy_loc),e)
+let dloc = dummy_loc
 
-let catch_error loc tac g =
-  try tac g
-  with e when loc <> dummy_loc ->
-    match e with
-      |	Stdpp.Exc_located (_,e) -> raise (Stdpp.Exc_located (loc,e))
-      |	e -> raise (Stdpp.Exc_located (loc,e))
+let catch_error call_trace tac g =
+  if call_trace = [] then tac g else try tac g with
+  | LtacLocated _ as e -> raise e
+  | Stdpp.Exc_located (_,LtacLocated _) as e -> raise e
+  | e ->
+    let (loc',c),tail = list_sep_last call_trace in
+    let loc,e' = match e with Stdpp.Exc_located(loc,e) -> loc,e | _ ->dloc,e in
+    if tail = [] then
+      let loc = if loc' = dloc then loc else loc' in
+      raise (Stdpp.Exc_located(loc,e'))
+    else
+      raise (Stdpp.Exc_located(loc',LtacLocated((c,tail,loc),e')))
 
 (* Signature for interpretation: val_interp and interpretation functions *)
 type interp_sign =
@@ -107,11 +107,11 @@ type interp_sign =
       avoid_ids : identifier list; (* ids inherited from the call context
 				      (needed to get fresh ids) *)
       debug : debug_info;
-      last_loc : loc }
+      trace : ltac_trace }
 
 let check_is_value = function
   | VRTactic _ -> (* These are goals produced by Match *)
-   error "Immediate match producing tactics not allowed in local definitions"
+   error "Immediate match producing tactics not allowed in local definitions."
   | _ -> ()
 
 (* For tactic_of_value *)
@@ -121,16 +121,16 @@ exception NotTactic
 let constr_of_VConstr_context = function
   | VConstr_context c -> c
   | _ ->
-    errorlabstrm "constr_of_VConstr_context" (str "not a context variable")
+    errorlabstrm "constr_of_VConstr_context" (str "Not a context variable.")
 
 (* Displays a value *)
 let rec pr_value env = function
   | VVoid -> str "()"
   | VInteger n -> int n
-  | VIntroPattern ipat -> pr_intro_pattern ipat
+  | VIntroPattern ipat -> pr_intro_pattern (dloc,ipat)
   | VConstr c | VConstr_context c ->
       (match env with Some env -> pr_lconstr_env env c | _ -> str "a term")
-  | (VTactic _ | VRTactic _ | VFun _ | VRec _) -> str "a tactic"
+  | (VRTactic _ | VFun _ | VRec _) -> str "a tactic"
   | VList [] -> str "an empty list"
   | VList (a::_) ->
       str "a list (first element is " ++ pr_value env a ++ str")"
@@ -143,24 +143,13 @@ let constr_of_id env id =
   construct_reference (Environ.named_context env) id
 
 (* To embed tactics *)
-let ((tactic_in : (interp_sign -> raw_tactic_expr) -> Dyn.t),
-     (tactic_out : Dyn.t -> (interp_sign -> raw_tactic_expr))) =
+let ((tactic_in : (interp_sign -> glob_tactic_expr) -> Dyn.t),
+     (tactic_out : Dyn.t -> (interp_sign -> glob_tactic_expr))) =
   create "tactic"
 
 let ((value_in : value -> Dyn.t),
      (value_out : Dyn.t -> value)) = create "value"
 
-let tacticIn t = TacArg (TacDynamic (dummy_loc,tactic_in t))
-let tacticOut = function
-  | TacArg (TacDynamic (_,d)) ->
-    if (tag d) = "tactic" then
-      tactic_out d
-    else
-      anomalylabstrm "tacticOut" (str "Dynamic tag should be tactic")
-  | ast ->
-    anomalylabstrm "tacticOut"
-      (str "Not a Dynamic ast: " (* ++ print_ast ast*) )
-
 let valueIn t = TacDynamic (dummy_loc,value_in t)
 let valueOut = function
   | TacDynamic (_,d) ->
@@ -182,8 +171,6 @@ let constrOut = function
   | ast ->
     anomalylabstrm "constrOut" (str "Not a Dynamic ast")
 
-let dloc = dummy_loc
-
 (* Globalizes the identifier *)
 let find_reference env qid =
   (* We first look for a variable of the current proof *)
@@ -195,7 +182,7 @@ let find_reference env qid =
 let error_not_evaluable s =
   errorlabstrm "evalref_of_ref" 
     (str "Cannot coerce" ++ spc ()  ++ s ++ spc () ++
-     str "to an evaluable reference")
+     str "to an evaluable reference.")
 
 (* Table of "pervasives" macros tactics (e.g. auto, simpl, etc.) *)
 let atomic_mactab = ref Idmap.empty
@@ -211,7 +198,7 @@ let _ =
         "hnf", TacReduce(Hnf,nocl);
         "simpl", TacReduce(Simpl None,nocl);
         "compute", TacReduce(Cbv all_flags,nocl);
-        "intro", TacIntroMove(None,None);
+        "intro", TacIntroMove(None,no_move);
         "intros", TacIntroPattern [];
         "assumption", TacAssumption;
         "cofix", TacCofix None;
@@ -263,7 +250,7 @@ let tac_tab = Hashtbl.create 17
 let add_tactic s t =
   if Hashtbl.mem tac_tab s then
     errorlabstrm ("Refiner.add_tactic: ") 
-      (str ("Cannot redeclare tactic "^s));
+      (str ("Cannot redeclare tactic "^s^"."));
   Hashtbl.add tac_tab s t
 
 let overwriting_add_tactic s t =
@@ -278,7 +265,7 @@ let lookup_tactic s =
     Hashtbl.find tac_tab s
   with Not_found -> 
     errorlabstrm "Refiner.lookup_tactic"
-      (str"The tactic " ++ str s ++ str" is not installed")
+      (str"The tactic " ++ str s ++ str" is not installed.")
 (*
 let vernac_tactic (s,args) =
   let tacfun = lookup_tactic s args in
@@ -311,11 +298,17 @@ let lookup_genarg_glob   id = let (f,_,_) = lookup_genarg id in f
 let lookup_interp_genarg id = let (_,f,_) = lookup_genarg id in f
 let lookup_genarg_subst  id = let (_,_,f) = lookup_genarg id in f
 
-(* Dynamically check that an argument is a tactic, possibly unboxing VRec *)
+let propagate_trace ist loc id = function
+  | VFun (_,lfun,it,b) ->
+      let t = if it=[] then b else TacFun (it,b) in
+      VFun ((loc,LtacVarCall (id,t))::ist.trace,lfun,it,b)
+  | x -> x
+
+(* Dynamically check that an argument is a tactic *)
 let coerce_to_tactic loc id = function
-  | VTactic _ | VFun _ | VRTactic _ as a -> a
+  | VFun _ | VRTactic _ as a -> a
   | _ -> user_err_loc 
-  (loc, "", str "variable " ++  pr_id id ++ str " should be bound to a tactic")
+  (loc, "", str "Variable " ++ pr_id id ++ str " should be bound to a tactic.")
 
 (*****************)
 (* Globalization *)
@@ -422,6 +415,11 @@ let intern_constr_reference strict ist = function
       let loc,_ as lqid = qualid_of_reference r in
       RRef (loc,locate_global_with_alias lqid), if strict then None else Some (CRef r)
 
+let intern_move_location ist = function
+  | MoveAfter id -> MoveAfter (intern_hyp_or_metaid ist id)
+  | MoveBefore id -> MoveBefore (intern_hyp_or_metaid ist id)
+  | MoveToEnd toleft as x -> x
+
 (* Internalize an isolated reference in position of tactic *)
 
 let intern_isolated_global_tactic_reference r =
@@ -432,7 +430,7 @@ let intern_isolated_global_tactic_reference r =
   | Ident (_,id) -> Tacexp (lookup_atomic id)
   | _ -> raise Not_found
 
-let intern_isolated_tactic_reference ist r =
+let intern_isolated_tactic_reference strict ist r =
   (* An ltac reference *)
   try Reference (intern_ltac_variable ist r)
   with Not_found ->
@@ -440,7 +438,7 @@ let intern_isolated_tactic_reference ist r =
   try intern_isolated_global_tactic_reference r
   with Not_found ->
   (* Tolerance for compatibility, allow not to use "constr:" *)
-  try ConstrMayEval (ConstrTerm (intern_constr_reference true ist r))
+  try ConstrMayEval (ConstrTerm (intern_constr_reference strict ist r))
   with Not_found ->
   (* Reference not found *)
   error_global_not_found_loc (qualid_of_reference r)
@@ -475,7 +473,7 @@ let intern_non_tactic_reference strict ist r =
   with Not_found ->
   (* By convention, use IntroIdentifier for unbound ident, when not in a def *)
   match r with
-  | Ident (_,id) when not strict -> IntroPattern (IntroIdentifier id)
+  | Ident (loc,id) when not strict -> IntroPattern (loc,IntroIdentifier id)
   | _ ->
   (* Reference not found *)
   error_global_not_found_loc (qualid_of_reference r)
@@ -487,13 +485,14 @@ let intern_message_token ist = function
 let intern_message ist = List.map (intern_message_token ist)
 
 let rec intern_intro_pattern lf ist = function
-  | IntroOrAndPattern l ->
-      IntroOrAndPattern (intern_case_intro_pattern lf ist l)
-  | IntroIdentifier id ->
-      IntroIdentifier (intern_ident lf ist id)
-  | IntroWildcard | IntroAnonymous | IntroFresh _ | IntroRewrite _ as x -> x
-
-and intern_case_intro_pattern lf ist =
+  | loc, IntroOrAndPattern l ->
+      loc, IntroOrAndPattern (intern_or_and_intro_pattern lf ist l)
+  | loc, IntroIdentifier id ->
+      loc, IntroIdentifier (intern_ident lf ist id)
+  | loc, (IntroWildcard | IntroAnonymous | IntroFresh _ | IntroRewrite _)
+      as x -> x
+
+and intern_or_and_intro_pattern lf ist =
   List.map (List.map (intern_intro_pattern lf ist))
 
 let intern_quantified_hypothesis ist = function
@@ -602,10 +601,10 @@ let intern_red_expr ist = function
 let intern_inversion_strength lf ist = function
   | NonDepInversion (k,idl,ids) ->
       NonDepInversion (k,List.map (intern_hyp_or_metaid ist) idl,
-      intern_intro_pattern lf ist ids)
+      Option.map (intern_intro_pattern lf ist) ids)
   | DepInversion (k,copt,ids) ->
       DepInversion (k, Option.map (intern_constr ist) copt,
-      intern_intro_pattern lf ist ids)
+      Option.map (intern_intro_pattern lf ist) ids)
   | InversionUsing (c,idl) ->
       InversionUsing (intern_constr ist c, List.map (intern_hyp_or_metaid ist) idl)
 
@@ -642,9 +641,9 @@ let internalise_tacarg ch = G_xml.parse_tactic_arg ch
 
 let extern_tacarg ch env sigma = function
   | VConstr c -> !print_xml_term ch env sigma c
-  | VTactic _ | VRTactic _ | VFun _ | VVoid | VInteger _ | VConstr_context _
+  | VRTactic _ | VFun _ | VVoid | VInteger _ | VConstr_context _
   | VIntroPattern _  | VRec _ | VList _ ->
-      error "Only externing of terms is implemented"
+      error "Only externing of terms is implemented."
 
 let extern_request ch req gl la =
   output_string ch "<REQUEST req=\""; output_string ch req;
@@ -652,11 +651,11 @@ let extern_request ch req gl la =
   List.iter (pf_apply (extern_tacarg ch) gl) la;
   output_string ch "</REQUEST>\n"
 
-(* Reads the hypotheses of a Match Context rule *)
-let rec intern_match_context_hyps sigma env lfun = function
+(* Reads the hypotheses of a "match goal" rule *)
+let rec intern_match_goal_hyps sigma env lfun = function
   | (Hyp ((_,na) as locna,mp))::tl ->
       let ido, metas1, pat = intern_pattern sigma env ~as_type:true lfun mp in
-      let lfun, metas2, hyps = intern_match_context_hyps sigma env lfun tl in
+      let lfun, metas2, hyps = intern_match_goal_hyps sigma env lfun tl in
       let lfun' = name_cons na (Option.List.cons ido lfun) in
       lfun', metas1@metas2, Hyp (locna,pat)::hyps
   | [] -> lfun, [], []
@@ -667,7 +666,7 @@ let extract_let_names lrc =
     (fun ((loc,name),_) l ->
       if List.mem name l then
 	user_err_loc
-	  (loc, "glob_tactic", str "This variable is bound several times");
+	  (loc, "glob_tactic", str "This variable is bound several times.");
       name::l)
     lrc []
 
@@ -684,14 +683,15 @@ let rec intern_atomic lf ist x =
   | TacIntroPattern l ->
       TacIntroPattern (List.map (intern_intro_pattern lf ist) l)
   | TacIntrosUntil hyp -> TacIntrosUntil (intern_quantified_hypothesis ist hyp)
-  | TacIntroMove (ido,ido') ->
+  | TacIntroMove (ido,hto) ->
       TacIntroMove (Option.map (intern_ident lf ist) ido,
-          Option.map (intern_hyp ist) ido')
+                    intern_move_location ist hto)
   | TacAssumption -> TacAssumption
   | TacExact c -> TacExact (intern_constr ist c)
   | TacExactNoCheck c -> TacExactNoCheck (intern_constr ist c)
   | TacVmCastNoCheck c -> TacVmCastNoCheck (intern_constr ist c)
-  | TacApply (a,ev,cb) -> TacApply (a,ev,intern_constr_with_bindings ist cb)
+  | TacApply (a,ev,cb) ->
+      TacApply (a,ev,List.map (intern_constr_with_bindings ist) cb)
   | TacElim (ev,cb,cbo) ->
       TacElim (ev,intern_constr_with_bindings ist cb,
                Option.map (intern_constr_with_bindings ist) cbo)
@@ -735,20 +735,15 @@ let rec intern_atomic lf ist x =
         List.map (intern_constr ist) lems)
 
   (* Derived basic tactics *)
-  | TacSimpleInduction h ->
-      TacSimpleInduction (intern_quantified_hypothesis ist h)
-  | TacNewInduction (ev,lc,cbo,ids,cls) ->
-      TacNewInduction (ev,List.map (intern_induction_arg ist) lc,
-               Option.map (intern_constr_with_bindings ist) cbo,
-               intern_intro_pattern lf ist ids,
-               Option.map (clause_app (intern_hyp_location ist)) cls)
-  | TacSimpleDestruct h ->
-      TacSimpleDestruct (intern_quantified_hypothesis ist h)
-  | TacNewDestruct (ev,c,cbo,ids,cls) ->
-      TacNewDestruct (ev,List.map (intern_induction_arg ist) c,
+  | TacSimpleInductionDestruct (isrec,h) ->
+      TacSimpleInductionDestruct (isrec,intern_quantified_hypothesis ist h)
+  | TacInductionDestruct (ev,isrec,l) ->
+      TacInductionDestruct (ev,isrec,List.map (fun (lc,cbo,(ipato,ipats),cls) ->
+	      (List.map (intern_induction_arg ist) lc,
                Option.map (intern_constr_with_bindings ist) cbo,
-	       intern_intro_pattern lf ist ids,
-               Option.map (clause_app (intern_hyp_location ist)) cls)
+               (Option.map (intern_intro_pattern lf ist) ipato,
+	        Option.map (intern_intro_pattern lf ist) ipats),
+               Option.map (clause_app (intern_hyp_location ist)) cls)) l)
   | TacDoubleInduction (h1,h2) ->
       let h1 = intern_quantified_hypothesis ist h1 in
       let h2 = intern_quantified_hypothesis ist h2 in
@@ -764,7 +759,7 @@ let rec intern_atomic lf ist x =
   | TacClear (b,l) -> TacClear (b,List.map (intern_hyp_or_metaid ist) l)
   | TacClearBody l -> TacClearBody (List.map (intern_hyp_or_metaid ist) l)
   | TacMove (dep,id1,id2) ->
-    TacMove (dep,intern_hyp_or_metaid ist id1,intern_hyp_or_metaid ist id2)
+    TacMove (dep,intern_hyp_or_metaid ist id1,intern_move_location ist id2)
   | TacRename l -> 
       TacRename (List.map (fun (id1,id2) -> 
 			     intern_hyp_or_metaid ist id1, 
@@ -812,8 +807,7 @@ let rec intern_atomic lf ist x =
       TacExtend (adjust_loc loc,opn,List.map (intern_genarg ist) l)
   | TacAlias (loc,s,l,(dir,body)) ->
       let l = List.map (fun (id,a) -> (id,intern_genarg ist a)) l in
-      try TacAlias (loc,s,l,(dir,body))
-      with e -> raise (locate_error_in_file (string_of_dirpath dir) e)
+      TacAlias (loc,s,l,(dir,body))
 
 and intern_tactic ist tac = (snd (intern_tactic_seq ist tac) : glob_tactic_expr)
 
@@ -829,8 +823,8 @@ and intern_tactic_seq ist = function
       let l = List.map (fun (n,b) -> 
 	  (n,intern_tacarg !strict_check (if isrec then ist' else ist) b)) l in
       ist.ltacvars, TacLetIn (isrec,l,intern_tactic ist' u)
-  | TacMatchContext (lz,lr,lmr) ->
-      ist.ltacvars, TacMatchContext(lz,lr, intern_match_rule ist lmr)
+  | TacMatchGoal (lz,lr,lmr) ->
+      ist.ltacvars, TacMatchGoal(lz,lr, intern_match_rule ist lmr)
   | TacMatch (lz,c,lmr) ->
       ist.ltacvars, TacMatch (lz,intern_tactic ist c,intern_match_rule ist lmr)
   | TacId l -> ist.ltacvars, TacId (intern_message ist l)
@@ -885,7 +879,7 @@ and intern_tacarg strict ist = function
 	if istac then Reference (ArgVar (adjust_loc loc,id))
 	else ConstrMayEval (ConstrTerm (RVar (adjust_loc loc,id), None))
       else error_syntactic_metavariables_not_allowed loc
-  | TacCall (loc,f,[]) -> intern_isolated_tactic_reference ist f
+  | TacCall (loc,f,[]) -> intern_isolated_tactic_reference strict ist f
   | TacCall (loc,f,l) ->
       TacCall (loc,
         intern_applied_tactic_reference ist f,
@@ -906,7 +900,7 @@ and intern_match_rule ist = function
       All (intern_tactic ist tc) :: (intern_match_rule ist tl)
   | (Pat (rl,mp,tc))::tl ->
       let {ltacvars=(lfun,l2); gsigma=sigma; genv=env} = ist in
-      let lfun',metas1,hyps = intern_match_context_hyps sigma env lfun rl in
+      let lfun',metas1,hyps = intern_match_goal_hyps sigma env lfun rl in
       let ido,metas2,pat = intern_pattern sigma env lfun mp in
       let metas = list_uniquize (metas1@metas2) in
       let ist' = { ist with ltacvars = (metas@(Option.List.cons ido lfun'),l2) } in
@@ -1006,23 +1000,23 @@ let read_pattern lfun = function
 (* Reads the hypotheses of a Match Context rule *)
 let cons_and_check_name id l =
   if List.mem id l then
-    user_err_loc (dloc,"read_match_context_hyps",
-      str ("Hypothesis pattern-matching variable "^(string_of_id id)^
-      " used twice in the same pattern"))
+    user_err_loc (dloc,"read_match_goal_hyps",
+      strbrk ("Hypothesis pattern-matching variable "^(string_of_id id)^
+      " used twice in the same pattern."))
   else id::l
 
-let rec read_match_context_hyps lfun lidh = function
+let rec read_match_goal_hyps lfun lidh = function
   | (Hyp ((loc,na) as locna,mp))::tl ->
       let lidh' = name_fold cons_and_check_name na lidh in
       Hyp (locna,read_pattern lfun mp)::
-	(read_match_context_hyps lfun lidh' tl)
+	(read_match_goal_hyps lfun lidh' tl)
   | [] -> []
 
 (* Reads the rules of a Match Context or a Match *)
 let rec read_match_rule lfun = function
   | (All tc)::tl -> (All tc)::(read_match_rule lfun tl)
   | (Pat (rl,mp,tc))::tl ->
-      Pat (read_match_context_hyps lfun [] rl, read_pattern lfun mp,tc)
+      Pat (read_match_goal_hyps lfun [] rl, read_pattern lfun mp,tc)
       :: read_match_rule lfun tl
   | [] -> []
 
@@ -1110,8 +1104,8 @@ let debugging_exception_step ist signal_anomaly e pp =
 
 let error_ltac_variable loc id env v s =
    user_err_loc (loc, "", str "Ltac variable " ++ pr_id id ++ 
-   str " is bound to" ++ spc () ++ pr_value env v ++ spc () ++ 
-   strbrk "which cannot be coerced to " ++ str s)
+   strbrk " is bound to" ++ spc () ++ pr_value env v ++ spc () ++ 
+   strbrk "which cannot be coerced to " ++ str s ++ str".")
 
 exception CannotCoerceTo of string
 
@@ -1153,8 +1147,8 @@ let coerce_to_intro_pattern env = function
       IntroIdentifier (destVar c)
   | v -> raise (CannotCoerceTo "an introduction pattern")
 
-let interp_intro_pattern_var ist env id =
-  try try_interp_ltac_var (coerce_to_intro_pattern env) ist (Some env)(dloc,id)
+let interp_intro_pattern_var loc ist env id =
+  try try_interp_ltac_var (coerce_to_intro_pattern env) ist (Some env) (loc,id)
   with Not_found -> IntroIdentifier id
 
 let coerce_to_hint_base = function
@@ -1171,8 +1165,9 @@ let coerce_to_int = function
 
 let interp_int ist locid =
   try try_interp_ltac_var coerce_to_int ist None locid
-  with Not_found -> user_err_loc(fst locid,"interp_int",
-				str "Unbound variable"  ++ pr_id (snd locid))
+  with Not_found ->
+    user_err_loc(fst locid,"interp_int",
+      str "Unbound variable "  ++ pr_id (snd locid) ++ str".")
 
 let interp_int_or_var ist = function
   | ArgVar locid -> interp_int ist locid
@@ -1209,7 +1204,7 @@ let interp_hyp ist gl (loc,id as locid) =
   with Not_found -> 
   (* Then look if bound in the proof context at calling time *)
   if is_variable env id then id
-  else user_err_loc (loc,"eval_variable",pr_id id ++ str " not found")
+  else user_err_loc (loc,"eval_variable",pr_id id ++ str " not found.")
 
 let hyp_list_of_VList env = function
   | VList l -> List.map (coerce_to_hyp env) l
@@ -1227,11 +1222,16 @@ let interp_clause_pattern ist gl (l,occl) =
     | (hyp,l) :: rest ->
 	let hyp = interp_hyp ist gl hyp in
 	if List.mem hyp acc then
-	  error ("Hypothesis "^(string_of_id hyp)^" occurs twice");
+	  error ("Hypothesis "^(string_of_id hyp)^" occurs twice.");
 	(hyp,l)::(check (hyp::acc) rest)
     | [] -> []
   in (l,check [] occl)
 
+let interp_move_location ist gl = function
+  | MoveAfter id -> MoveAfter (interp_hyp ist gl id)
+  | MoveBefore id -> MoveBefore (interp_hyp ist gl id)
+  | MoveToEnd toleft as x -> x
+
 (* Interprets a qualified name *)
 let coerce_to_reference env v =
   try match v with
@@ -1309,7 +1309,7 @@ let rec constr_list_aux env = function
 let constr_list ist env = constr_list_aux env ist.lfun
 
 (* Extract the identifier list from lfun: join all branches (what to do else?)*)
-let rec intropattern_ids = function
+let rec intropattern_ids (loc,pat) = match pat with
   | IntroIdentifier id -> [id]
   | IntroOrAndPattern ll -> 
       List.flatten (List.map intropattern_ids (List.flatten ll))
@@ -1317,7 +1317,7 @@ let rec intropattern_ids = function
 
 let rec extract_ids ids = function
   | (id,VIntroPattern ipat)::tl when not (List.mem id ids) ->
-      intropattern_ids ipat @ extract_ids ids tl
+      intropattern_ids (dloc,ipat) @ extract_ids ids tl
   | _::tl -> extract_ids ids tl
   | [] -> []
 
@@ -1388,7 +1388,7 @@ let solve_remaining_evars env initial_sigma evd c =
   proc_rec c
 
 let interp_gen kind ist sigma env (c,ce) =
-  let (ltacvars,unbndltacvars) = constr_list ist env in
+  let (ltacvars,unbndltacvars as vars) = constr_list ist env in
   let typs = retype_list sigma env ltacvars in
   let c = match ce with
   | None -> c
@@ -1398,7 +1398,8 @@ let interp_gen kind ist sigma env (c,ce) =
   | Some c ->
       let ltacdata = (List.map fst ltacvars,unbndltacvars) in
       intern_gen (kind = IsType) ~ltacvars:ltacdata sigma env c in
-  understand_ltac sigma env (typs,unbndltacvars) kind c
+  let trace = (dloc,LtacConstrInterp (c,vars))::ist.trace in
+  catch_error trace (understand_ltac sigma env (typs,unbndltacvars) kind) c
 
 (* Interprets a constr and solve remaining evars with default tactic *)
 let interp_econstr kind ist sigma env cc =
@@ -1532,7 +1533,7 @@ let interp_may_eval f ist gl = function
       with
 	| Not_found ->
 	    user_err_loc (loc, "interp_may_eval",
-	    str "Unbound context identifier" ++ pr_id s))
+	    str "Unbound context identifier" ++ pr_id s ++ str"."))
   | ConstrTypeOf c -> pf_type_of gl (f ist gl c)
   | ConstrTerm c -> 
      try 
@@ -1565,31 +1566,38 @@ let inj_may_eval = function
 let message_of_value = function
   | VVoid -> str "()"
   | VInteger n -> int n
-  | VIntroPattern ipat -> pr_intro_pattern ipat
+  | VIntroPattern ipat -> pr_intro_pattern (dloc,ipat)
   | VConstr_context c | VConstr c -> pr_constr c
-  | VRec _ | VTactic _ | VRTactic _ | VFun _ -> str "<tactic>"
+  | VRec _ | VRTactic _ | VFun _ -> str "<tactic>"
   | VList _ -> str "<list>"
 
-let rec interp_message ist = function
-  | [] -> mt()
-  | MsgString s :: l -> pr_arg str s ++ interp_message ist l
-  | MsgInt n :: l -> pr_arg int n ++ interp_message ist l
-  | MsgIdent (loc,id) :: l ->
+let rec interp_message_token ist = function
+  | MsgString s -> str s
+  | MsgInt n -> int n
+  | MsgIdent (loc,id) ->
       let v =
 	try List.assoc id ist.lfun
-	with Not_found -> user_err_loc (loc,"",pr_id id ++ str" not found") in
-      pr_arg message_of_value v ++ interp_message ist l
+	with Not_found -> user_err_loc (loc,"",pr_id id ++ str" not found.") in
+      message_of_value v
 
 let rec interp_message_nl ist = function
   | [] -> mt()
-  | l -> interp_message ist l ++ fnl()
+  | l -> prlist_with_sep spc (interp_message_token ist) l ++ fnl()
 
-let rec interp_intro_pattern ist gl = function
-  | IntroOrAndPattern l -> IntroOrAndPattern (interp_case_intro_pattern ist gl l)
-  | IntroIdentifier id -> interp_intro_pattern_var ist (pf_env gl) id
-  | IntroWildcard | IntroAnonymous | IntroFresh _ | IntroRewrite _ as x -> x
+let interp_message ist l =
+  (* Force evaluation of interp_message_token so that potential errors 
+     are raised now and not at printing time *)
+  prlist (fun x -> spc () ++ x) (List.map (interp_message_token ist) l)
 
-and interp_case_intro_pattern ist gl =
+let rec interp_intro_pattern ist gl = function
+  | loc, IntroOrAndPattern l ->
+      loc, IntroOrAndPattern (interp_or_and_intro_pattern ist gl l)
+  | loc, IntroIdentifier id ->
+      loc, interp_intro_pattern_var loc ist (pf_env gl) id
+  | loc, (IntroWildcard | IntroAnonymous | IntroFresh _ | IntroRewrite _)
+      as x -> x
+
+and interp_or_and_intro_pattern ist gl =
   List.map (List.map (interp_intro_pattern ist gl))
 
 (* Quantified named or numbered hypothesis or hypothesis in context *)
@@ -1663,14 +1671,14 @@ let rec val_interp ist gl (tac:glob_tactic_expr) =
 
   let value_interp ist = match tac with
   (* Immediate evaluation *)
-  | TacFun (it,body) -> VFun (ist.lfun,it,body)
+  | TacFun (it,body) -> VFun (ist.trace,ist.lfun,it,body)
   | TacLetIn (true,l,u) -> interp_letrec ist gl l u
   | TacLetIn (false,l,u) -> interp_letin ist gl l u
-  | TacMatchContext (lz,lr,lmr) -> interp_match_context ist gl lz lr lmr 
+  | TacMatchGoal (lz,lr,lmr) -> interp_match_goal ist gl lz lr lmr 
   | TacMatch (lz,c,lmr) -> interp_match ist gl lz c lmr
   | TacArg a -> interp_tacarg ist gl a
   (* Delayed evaluation *)
-  | t -> VTactic (ist.last_loc,eval_tactic ist t)
+  | t -> VFun (ist.trace,ist.lfun,[],t)
 
   in check_for_interrupt (); 
     match ist.debug with
@@ -1679,9 +1687,16 @@ let rec val_interp ist gl (tac:glob_tactic_expr) =
     | _ -> value_interp ist
 
 and eval_tactic ist = function
-  | TacAtom (loc,t) -> fun gl -> catch_error loc (interp_atomic ist gl t) gl
+  | TacAtom (loc,t) ->
+      fun gl ->
+	let box = ref None in abstract_tactic_box := box;
+	let call = LtacAtomCall (t,box) in
+	let tac = (* catch error in the interpretation *)
+	  catch_error ((dloc,call)::ist.trace) (interp_atomic ist gl) t	in
+	(* catch error in the evaluation *)
+	catch_error ((loc,call)::ist.trace) tac gl
   | TacFun _ | TacLetIn _ -> assert false
-  | TacMatchContext _ | TacMatch _ -> assert false
+  | TacMatchGoal _ | TacMatch _ -> assert false
   | TacId s -> tclIDTAC_MESSAGE (interp_message_nl ist s)
   | TacFail (n,s) -> tclFAIL (interp_int_or_var ist n) (interp_message ist s)
   | TacProgress tac -> tclPROGRESS (interp_tactic ist tac)
@@ -1714,31 +1729,33 @@ and force_vrec ist gl = function
   | VRec (lfun,body) -> val_interp {ist with lfun = !lfun} gl body
   | v -> v
 
-and interp_ltac_reference isapplied mustbetac ist gl = function
+and interp_ltac_reference loc' mustbetac ist gl = function
   | ArgVar (loc,id) ->
       let v = List.assoc id ist.lfun in
       let v = force_vrec ist gl v in
+      let v = propagate_trace ist loc id v in
       if mustbetac then coerce_to_tactic loc id v else v
   | ArgArg (loc,r) ->
       let ids = extract_ids [] ist.lfun in
+      let loc_info = ((if loc' = dloc then loc else loc'),LtacNameCall r) in
       let ist = 
         { lfun=[]; debug=ist.debug; avoid_ids=ids;
-          last_loc = if isapplied then ist.last_loc else loc } in
+          trace = loc_info::ist.trace } in
       val_interp ist gl (lookup r)
 
 and interp_tacarg ist gl = function
   | TacVoid -> VVoid
-  | Reference r -> interp_ltac_reference false false ist gl r
+  | Reference r -> interp_ltac_reference dloc false ist gl r
   | Integer n -> VInteger n
-  | IntroPattern ipat -> VIntroPattern (interp_intro_pattern ist gl ipat)
+  | IntroPattern ipat -> VIntroPattern (snd (interp_intro_pattern ist gl ipat))
   | ConstrMayEval c -> VConstr (interp_constr_may_eval ist gl c)
   | MetaIdArg (loc,_,id) -> assert false
-  | TacCall (loc,r,[]) -> interp_ltac_reference false true ist gl r
+  | TacCall (loc,r,[]) -> interp_ltac_reference loc true ist gl r
   | TacCall (loc,f,l) ->
-      let fv = interp_ltac_reference true true ist gl f
+      let fv = interp_ltac_reference loc true ist gl f
       and largs = List.map (interp_tacarg ist gl) l in
       List.iter check_is_value largs;
-      interp_app ist gl fv largs loc
+      interp_app loc ist gl fv largs
   | TacExternal (loc,com,req,la) ->
       interp_external loc ist gl com req (List.map (interp_tacarg ist gl) la)
   | TacFreshId l -> 
@@ -1748,12 +1765,7 @@ and interp_tacarg ist gl = function
   | TacDynamic(_,t) ->
       let tg = (tag t) in
       if tg = "tactic" then
-        let f = (tactic_out t) in 
-        val_interp ist gl
-          (intern_tactic {
-            ltacvars = (List.map fst ist.lfun,[]); ltacrecvars = [];
-            gsigma = project gl; genv = pf_env gl }
-            (f ist))
+        val_interp ist gl (tactic_out t ist)
       else if tg = "value" then
         value_out t
       else if tg = "constr" then
@@ -1763,48 +1775,54 @@ and interp_tacarg ist gl = function
           (str "Unknown dynamic: <" ++ str (Dyn.tag t) ++ str ">"))
 
 (* Interprets an application node *)
-and interp_app ist gl fv largs loc =
+and interp_app loc ist gl fv largs =
   match fv with
-    | VFun(olfun,var,body) ->
+    | VFun(trace,olfun,var,body) ->
       let (newlfun,lvar,lval)=head_with_value (var,largs) in
       if lvar=[] then
 	let v = 
 	  try
-            let lloc = if lval=[] then loc else ist.last_loc in
-	    val_interp { ist with lfun=newlfun@olfun; last_loc=lloc } gl body
+	    catch_error trace
+	      (val_interp { ist with lfun=newlfun@olfun; trace=trace } gl) body
 	  with e ->
             debugging_exception_step ist false e (fun () -> str "evaluation");
 	    raise e in
         debugging_step ist (fun () ->
 	  str "evaluation returns" ++ fnl() ++ pr_value (Some (pf_env gl)) v);
-        if lval=[] then v else interp_app ist gl v lval loc
+        if lval=[] then v else interp_app loc ist gl v lval
       else
-        VFun(newlfun@olfun,lvar,body)
+        VFun(trace,newlfun@olfun,lvar,body)
     | _ ->
 	user_err_loc (loc, "Tacinterp.interp_app",
-          (str"Illegal tactic application"))
+          (str"Illegal tactic application."))
 
 (* Gives the tactic corresponding to the tactic value *)
-and tactic_of_value vle g =
+and tactic_of_value ist vle g =
   match vle with
   | VRTactic res -> res
-  | VTactic (loc,tac) -> catch_error loc tac g
-  | VFun _ -> error "A fully applied tactic is expected"
+  | VFun (trace,lfun,[],t) ->
+      let tac = eval_tactic {ist with lfun=lfun; trace=trace} t in
+      catch_error trace tac g
+  | VFun _ -> error "A fully applied tactic is expected."
   | _ -> raise NotTactic
 
 (* Evaluation with FailError catching *)
 and eval_with_fail ist is_lazy goal tac =
   try
     (match val_interp ist goal tac with
-    | VTactic (loc,tac) when not is_lazy -> VRTactic (catch_error loc tac goal)
+    | VFun (trace,lfun,[],t) when not is_lazy ->
+	let tac = eval_tactic {ist with lfun=lfun; trace=trace} t in
+	VRTactic (catch_error trace tac goal)
     | a -> a)
   with
-    | Stdpp.Exc_located (_,FailError (0,s)) | FailError (0,s) ->
+    | FailError (0,s) | Stdpp.Exc_located(_, FailError (0,s)) 
+    | Stdpp.Exc_located(_,LtacLocated (_,FailError (0,s))) ->
 	raise (Eval_fail s)
-    | Stdpp.Exc_located (s',FailError (lvl,s)) ->
-	raise (Stdpp.Exc_located (s',FailError (lvl - 1, s)))
-    | FailError (lvl,s) ->
-	raise (FailError (lvl - 1, s))
+    | FailError (lvl,s) -> raise (FailError (lvl - 1, s))
+    | Stdpp.Exc_located(s,FailError (lvl,s')) ->
+	raise (Stdpp.Exc_located(s,FailError (lvl - 1, s')))
+    | Stdpp.Exc_located(s,LtacLocated (s'',FailError (lvl,s'))) ->
+	raise (Stdpp.Exc_located(s,LtacLocated (s'',FailError (lvl - 1, s'))))
 
 (* Interprets the clauses of a recursive LetIn *)
 and interp_letrec ist gl llc u =
@@ -1822,14 +1840,14 @@ and interp_letin ist gl llc u =
   val_interp ist gl u
 
 (* Interprets the Match Context expressions *)
-and interp_match_context ist g lz lr lmr =
+and interp_match_goal ist g lz lr lmr =
   let rec apply_goal_sub ist env goal nocc (id,c) csr mt mhyps hyps =
     let (lgoal,ctxt) = match_subterm nocc c csr in
     let lctxt = give_context ctxt id in
       try apply_hyps_context ist env lz goal mt lctxt lgoal mhyps hyps
       with e when is_match_catchable e ->
 	apply_goal_sub ist env goal (nocc + 1) (id,c) csr mt mhyps hyps in
-  let rec apply_match_context ist env goal nrs lex lpt = 
+  let rec apply_match_goal ist env goal nrs lex lpt = 
     begin
       if lex<>[] then db_pattern_rule ist.debug nrs (List.hd lex);
       match lpt with
@@ -1838,7 +1856,7 @@ and interp_match_context ist g lz lr lmr =
               db_mc_pattern_success ist.debug;
               try eval_with_fail ist lz goal t
               with e when is_match_catchable e ->
-		apply_match_context ist env goal (nrs+1) (List.tl lex) tl
+		apply_match_goal ist env goal (nrs+1) (List.tl lex) tl
 	    end
 	| (Pat (mhyps,mgoal,mt))::tl ->
 	    let hyps = make_hyps (pf_hyps goal) in
@@ -1856,21 +1874,21 @@ and interp_match_context ist g lz lr lmr =
 			   | PatternMatchingFailure -> db_matching_failure ist.debug
 			   | Eval_fail s -> db_eval_failure ist.debug s
 			   | _ -> db_logic_failure ist.debug e);
-			apply_match_context ist env goal (nrs+1) (List.tl lex) tl)
+			apply_match_goal ist env goal (nrs+1) (List.tl lex) tl)
 		 | Subterm (id,mg) ->
 		     (try apply_goal_sub ist env goal 0 (id,mg) concl mt mhyps hyps
 		      with
 			| PatternMatchingFailure ->
-			    apply_match_context ist env goal (nrs+1) (List.tl lex) tl))
+			    apply_match_goal ist env goal (nrs+1) (List.tl lex) tl))
 	| _ ->
-	    errorlabstrm "Tacinterp.apply_match_context"
+	    errorlabstrm "Tacinterp.apply_match_goal"
               (v 0 (str "No matching clauses for match goal" ++
 		      (if ist.debug=DebugOff then
 			 fnl() ++ str "(use \"Set Ltac Debug\" for more info)"
-		       else mt())))
+		       else mt()) ++ str"."))
     end in
   let env = pf_env g in
-    apply_match_context ist env g 0 lmr
+    apply_match_goal ist env g 0 lmr
       (read_match_rule (fst (constr_list ist env)) lmr)
 
 (* Tries to match the hypotheses in a Match Context *)
@@ -2023,7 +2041,7 @@ and interp_match ist g lz constr lmr =
          with PatternMatchingFailure -> apply_match ist csr tl)
     | _ ->
       errorlabstrm "Tacinterp.apply_match" (str
-        "No matching clauses for match") in
+        "No matching clauses for match.") in
   let csr = 
       try interp_ltac_constr ist g constr with e ->
         debugging_exception_step ist true e
@@ -2058,9 +2076,8 @@ and interp_ltac_constr ist gl e =
 	  str "offending expression: " ++ fnl() ++
           Pptactic.pr_glob_tactic (pf_env gl) e ++ fnl() ++ str "this is a " ++
           (match result with
-              VTactic _ -> str "VTactic"
             | VRTactic _ -> str "VRTactic"
-            | VFun (il,ul,b) ->
+            | VFun (_,il,ul,b) ->
                 (str "VFun with body " ++ fnl() ++
                     Pptactic.pr_glob_tactic (pf_env gl) b ++ fnl() ++
 		    str "instantiated arguments " ++ fnl() ++
@@ -2074,20 +2091,19 @@ and interp_ltac_constr ist gl e =
                       (match opt_id with
                           Some id -> str (string_of_id id)
                         | None -> str "_") ++ str ", " ++ s)
-                    ul (str ""))
+                    ul (mt()))
             | VVoid -> str "VVoid"
             | VInteger _ -> str "VInteger"
             | VConstr _ -> str "VConstr"
             | VIntroPattern _ -> str "VIntroPattern"
             | VConstr_context _ -> str "VConstrr_context"
             | VRec _ -> str "VRec"
-            | VList _ -> str "VList"))
+            | VList _ -> str "VList") ++ str".")
 
 (* Interprets tactic expressions : returns a "tactic" *)
 and interp_tactic ist tac gl =
-  try tactic_of_value (val_interp ist gl tac) gl
-  with NotTactic ->
-    errorlabstrm "" (str "Must be a command or must give a tactic value")
+  try tactic_of_value ist (val_interp ist gl tac) gl
+  with NotTactic -> errorlabstrm "" (str "Not a tactic.")
 
 (* Interprets a primitive tactic *)
 and interp_atomic ist gl = function
@@ -2096,14 +2112,15 @@ and interp_atomic ist gl = function
       h_intro_patterns (List.map (interp_intro_pattern ist gl) l)
   | TacIntrosUntil hyp ->
       h_intros_until (interp_quantified_hypothesis ist hyp)
-  | TacIntroMove (ido,ido') ->
+  | TacIntroMove (ido,hto) ->
       h_intro_move (Option.map (interp_fresh_ident ist gl) ido)
-      (Option.map (interp_hyp ist gl) ido')
+                   (interp_move_location ist gl hto)
   | TacAssumption -> h_assumption
   | TacExact c -> h_exact (pf_interp_casted_constr ist gl c)
   | TacExactNoCheck c -> h_exact_no_check (pf_interp_constr ist gl c)
   | TacVmCastNoCheck c -> h_vm_cast_no_check (pf_interp_constr ist gl c)
-  | TacApply (a,ev,cb) -> h_apply a ev (interp_constr_with_bindings ist gl cb)
+  | TacApply (a,ev,cb) ->
+      h_apply a ev (List.map (interp_constr_with_bindings ist gl) cb)
   | TacElim (ev,cb,cbo) ->
       h_elim ev (interp_constr_with_bindings ist gl cb)
                 (Option.map (interp_constr_with_bindings ist gl) cbo)
@@ -2149,20 +2166,16 @@ and interp_atomic ist gl = function
       (pf_interp_constr_list ist gl lems)
 
   (* Derived basic tactics *)
-  | TacSimpleInduction h ->
-      h_simple_induction (interp_quantified_hypothesis ist h)
-  | TacNewInduction (ev,lc,cbo,ids,cls) ->
-      h_new_induction ev (List.map (interp_induction_arg ist gl) lc)
-        (Option.map (interp_constr_with_bindings ist gl) cbo)
-        (interp_intro_pattern ist gl ids)
-        (Option.map (interp_clause ist gl) cls)
-  | TacSimpleDestruct h ->
-      h_simple_destruct (interp_quantified_hypothesis ist h)
-  | TacNewDestruct (ev,c,cbo,ids,cls) -> 
-      h_new_destruct ev (List.map (interp_induction_arg ist gl) c)
-        (Option.map (interp_constr_with_bindings ist gl) cbo)
-        (interp_intro_pattern ist gl ids)
-        (Option.map (interp_clause ist gl) cls)
+  | TacSimpleInductionDestruct (isrec,h) ->
+      h_simple_induction_destruct isrec (interp_quantified_hypothesis ist h)
+  | TacInductionDestruct (isrec,ev,l) ->
+      h_induction_destruct ev isrec
+      (List.map (fun (lc,cbo,(ipato,ipats),cls) ->
+	(List.map (interp_induction_arg ist gl) lc,
+         Option.map (interp_constr_with_bindings ist gl) cbo,
+         (Option.map (interp_intro_pattern ist gl) ipato,
+	  Option.map (interp_intro_pattern ist gl) ipats),
+         Option.map (interp_clause ist gl) cls)) l)
   | TacDoubleInduction (h1,h2) ->
       let h1 = interp_quantified_hypothesis ist h1 in
       let h2 = interp_quantified_hypothesis ist h2 in
@@ -2180,7 +2193,7 @@ and interp_atomic ist gl = function
   | TacClear (b,l) -> h_clear b (interp_hyp_list ist gl l)
   | TacClearBody l -> h_clear_body (interp_hyp_list ist gl l)
   | TacMove (dep,id1,id2) ->
-      h_move dep (interp_hyp ist gl id1) (interp_hyp ist gl id2)
+      h_move dep (interp_hyp ist gl id1) (interp_move_location ist gl id2)
   | TacRename l ->
       h_rename (List.map (fun (id1,id2) -> 
 			    interp_hyp ist gl id1, 
@@ -2222,11 +2235,11 @@ and interp_atomic ist gl = function
 	(Option.map (interp_tactic ist) by)
   | TacInversion (DepInversion (k,c,ids),hyp) ->
       Inv.dinv k (Option.map (pf_interp_constr ist gl) c)
-        (interp_intro_pattern ist gl ids)
+        (Option.map (interp_intro_pattern ist gl) ids)
         (interp_declared_or_quantified_hypothesis ist gl hyp)
   | TacInversion (NonDepInversion (k,idl,ids),hyp) ->
       Inv.inv_clause k 
-        (interp_intro_pattern ist gl ids)
+        (Option.map (interp_intro_pattern ist gl) ids)
         (interp_hyp_list ist gl idl)
         (interp_declared_or_quantified_hypothesis ist gl hyp)
   | TacInversion (InversionUsing (c,idl),hyp) ->
@@ -2237,10 +2250,9 @@ and interp_atomic ist gl = function
   (* For extensions *)
   | TacExtend (loc,opn,l) ->
       let tac = lookup_tactic opn in
-      fun gl ->
-        let args = List.map (interp_genarg ist gl) l in
-        abstract_extended_tactic opn args (tac args) gl
-  | TacAlias (loc,_,l,(_,body)) -> fun gl ->
+      let args = List.map (interp_genarg ist gl) l in
+      abstract_extended_tactic opn args (tac args)
+  | TacAlias (loc,s,l,(_,body)) -> fun gl ->
     let rec f x = match genarg_tag x with
     | IntArgType -> 
         VInteger (out_gen globwit_int x)
@@ -2250,7 +2262,7 @@ and interp_atomic ist gl = function
 	failwith "pre-identifiers cannot be bound"
     | IntroPatternArgType ->
 	VIntroPattern 
-	  (interp_intro_pattern ist gl (out_gen globwit_intro_pattern x))
+	  (snd (interp_intro_pattern ist gl (out_gen globwit_intro_pattern x)))
     | IdentArgType -> 
         VIntroPattern 
 	  (IntroIdentifier
@@ -2301,14 +2313,12 @@ and interp_atomic ist gl = function
     | ExtraArgType _ | BindingsArgType 
     | OptArgType _ | PairArgType _ 
     | List0ArgType _ | List1ArgType _ 
-	-> error "This generic type is not supported in alias"
+	-> error "This generic type is not supported in alias."
         
     in
     let lfun = (List.map (fun (x,c) -> (x,f c)) l)@ist.lfun in
-    let v = locate_tactic_call loc (val_interp { ist with lfun=lfun } gl body)
-    in 
-    try tactic_of_value v gl 
-    with NotTactic -> user_err_loc (loc,"",str "not a tactic")
+    let trace = (loc,LtacNotationCall s)::ist.trace in
+    interp_tactic { ist with lfun=lfun; trace=trace } body gl
 
 let make_empty_glob_sign () =
   { ltacvars = ([],[]); ltacrecvars = []; 
@@ -2316,20 +2326,20 @@ let make_empty_glob_sign () =
 
 (* Initial call for interpretation *)
 let interp_tac_gen lfun avoid_ids debug t gl = 
-  interp_tactic { lfun=lfun; avoid_ids=avoid_ids; debug=debug; last_loc=dloc } 
+  interp_tactic { lfun=lfun; avoid_ids=avoid_ids; debug=debug; trace=[] } 
     (intern_tactic {
       ltacvars = (List.map fst lfun, []); ltacrecvars = [];
       gsigma = project gl; genv = pf_env gl } t) gl
 
 let eval_tactic t gls =
-  interp_tactic { lfun=[]; avoid_ids=[]; debug=get_debug(); last_loc=dloc }
+  interp_tactic { lfun=[]; avoid_ids=[]; debug=get_debug(); trace=[] }
     t gls
 
 let interp t = interp_tac_gen [] [] (get_debug()) t
 
 let eval_ltac_constr gl t =
   interp_ltac_constr 
-    { lfun=[]; avoid_ids=[]; debug=get_debug(); last_loc=dloc } gl
+    { lfun=[]; avoid_ids=[]; debug=get_debug(); trace=[] } gl
     (intern_tactic (make_empty_glob_sign ()) t )
 
 (* Hides interpretation for pretty-print *)
@@ -2392,7 +2402,7 @@ let subst_global_reference subst =
  let subst_global ref =
   let ref',t' = subst_global subst ref in
    if not (eq_constr (constr_of_global ref') t') then
-    ppnl (str "Warning: the reference " ++ pr_global ref ++ str " is not " ++
+    ppnl (str "Warning: The reference " ++ pr_global ref ++ str " is not " ++
           str " expanded to \"" ++ pr_lconstr t' ++ str "\", but to " ++
           pr_global ref') ;
    ref'
@@ -2430,10 +2440,10 @@ let subst_match_pattern subst = function
   | Subterm (ido,pc) -> Subterm (ido,subst_pattern subst pc)
   | Term pc -> Term (subst_pattern subst pc)
 
-let rec subst_match_context_hyps subst = function
+let rec subst_match_goal_hyps subst = function
   | Hyp (locs,mp) :: tl ->
       Hyp (locs,subst_match_pattern subst mp)
-      :: subst_match_context_hyps subst tl
+      :: subst_match_goal_hyps subst tl
   | [] -> []
 
 let rec subst_atomic subst (t:glob_atomic_tactic_expr) = match t with
@@ -2443,7 +2453,8 @@ let rec subst_atomic subst (t:glob_atomic_tactic_expr) = match t with
   | TacExact c -> TacExact (subst_rawconstr subst c)
   | TacExactNoCheck c -> TacExactNoCheck (subst_rawconstr subst c)
   | TacVmCastNoCheck c -> TacVmCastNoCheck (subst_rawconstr subst c)
-  | TacApply (a,ev,cb) -> TacApply (a,ev,subst_raw_with_bindings subst cb)
+  | TacApply (a,ev,cb) ->
+      TacApply (a,ev,List.map (subst_raw_with_bindings subst) cb)
   | TacElim (ev,cb,cbo) ->
       TacElim (ev,subst_raw_with_bindings subst cb,
                Option.map (subst_raw_with_bindings subst) cbo)
@@ -2474,14 +2485,11 @@ let rec subst_atomic subst (t:glob_atomic_tactic_expr) = match t with
   | TacDAuto (n,p,lems) -> TacDAuto (n,p,List.map (subst_rawconstr subst) lems)
 
   (* Derived basic tactics *)
-  | TacSimpleInduction h as x -> x
-  | TacNewInduction (ev,lc,cbo,ids,cls) ->
-      TacNewInduction (ev,List.map (subst_induction_arg subst) lc,
-               Option.map (subst_raw_with_bindings subst) cbo, ids, cls)
-  | TacSimpleDestruct h as x -> x
-  | TacNewDestruct (ev,c,cbo,ids,cls) ->
-      TacNewDestruct (ev,List.map (subst_induction_arg subst) c,
-               Option.map (subst_raw_with_bindings subst) cbo, ids, cls)
+  | TacSimpleInductionDestruct (isrec,h) as x -> x
+  | TacInductionDestruct (isrec,ev,l) ->
+      TacInductionDestruct (isrec,ev,List.map (fun (lc,cbo,ids,cls) ->
+	List.map (subst_induction_arg subst) lc,
+        Option.map (subst_raw_with_bindings subst) cbo, ids, cls) l)
   | TacDoubleInduction (h1,h2) as x -> x
   | TacDecomposeAnd c -> TacDecomposeAnd (subst_rawconstr subst c)
   | TacDecomposeOr c -> TacDecomposeOr (subst_rawconstr subst c)
@@ -2540,8 +2548,8 @@ and subst_tactic subst (t:glob_tactic_expr) = match t with
   | TacLetIn (r,l,u) ->
       let l = List.map (fun (n,b) -> (n,subst_tacarg subst b)) l in
       TacLetIn (r,l,subst_tactic subst u)
-  | TacMatchContext (lz,lr,lmr) ->
-      TacMatchContext(lz,lr, subst_match_rule subst lmr)
+  | TacMatchGoal (lz,lr,lmr) ->
+      TacMatchGoal(lz,lr, subst_match_rule subst lmr)
   | TacMatch (lz,c,lmr) ->
       TacMatch (lz,subst_tactic subst c,subst_match_rule subst lmr)
   | TacId _ | TacFail _ as x -> x
@@ -2588,7 +2596,7 @@ and subst_match_rule subst = function
   | (All tc)::tl ->
       (All (subst_tactic subst tc))::(subst_match_rule subst tl)
   | (Pat (rl,mp,tc))::tl ->
-      let hyps = subst_match_context_hyps subst rl in
+      let hyps = subst_match_goal_hyps subst rl in
       let pat = subst_match_pattern subst mp in
       Pat (hyps,pat,subst_tactic subst tc)
       ::(subst_match_rule subst tl)
@@ -2707,12 +2715,12 @@ let print_ltac id =
  try
   let kn = Nametab.locate_tactic id in
   let t = lookup kn in
-   str "Ltac" ++ spc() ++ pr_qualid id ++ str ":=" ++ spc() ++
+   str "Ltac" ++ spc() ++ pr_qualid id ++ str " :=" ++ spc() ++
     Pptactic.pr_glob_tactic (Global.env ()) t
  with
   Not_found ->
    errorlabstrm "print_ltac"
-    (pr_qualid id ++ spc() ++ str "is not a user defined tactic")
+    (pr_qualid id ++ spc() ++ str "is not a user defined tactic.")
 
 open Libnames
 
@@ -2729,14 +2737,14 @@ let make_absolute_name ident repl =
 	if repl then id, kn
 	else
 	  user_err_loc (loc,"Tacinterp.add_tacdef",
-		       str "There is already an Ltac named " ++ pr_reference ident)
+		       str "There is already an Ltac named " ++ pr_reference ident ++ str".")
       else if is_atomic_kn kn then 
 	user_err_loc (loc,"Tacinterp.add_tacdef",
-		     str "Reserved Ltac name " ++ pr_reference ident)
+		     str "Reserved Ltac name " ++ pr_reference ident ++ str".")
       else id, kn
   with Not_found ->
     user_err_loc (loc,"Tacinterp.add_tacdef",
-		 str "There is no Ltac named " ++ pr_reference ident)
+		 str "There is no Ltac named " ++ pr_reference ident ++ str".")
 
 let rec filter_map f l = 
   let rec aux acc = function
@@ -2782,17 +2790,33 @@ let glob_tactic_env l env x =
     x
 
 let interp_redexp env sigma r = 
-  let ist = { lfun=[]; avoid_ids=[]; debug=get_debug (); last_loc=dloc } in
+  let ist = { lfun=[]; avoid_ids=[]; debug=get_debug (); trace=[] } in
   let gist = {(make_empty_glob_sign ()) with genv = env; gsigma = sigma } in
   interp_red_expr ist sigma env (intern_red_expr gist r)
 
 (***************************************************************************)
+(* Embed tactics in raw or glob tactic expr *)
+
+let globTacticIn t = TacArg (TacDynamic (dummy_loc,tactic_in t))
+let tacticIn t = globTacticIn (fun ist -> glob_tactic (t ist))
+
+let tacticOut = function
+  | TacArg (TacDynamic (_,d)) ->
+    if (tag d) = "tactic" then
+      tactic_out d
+    else
+      anomalylabstrm "tacticOut" (str "Dynamic tag should be tactic")
+  | ast ->
+    anomalylabstrm "tacticOut"
+      (str "Not a Dynamic ast: " (* ++ print_ast ast*) )
+
+(***************************************************************************)
 (* Backwarding recursive needs of tactic glob/interp/eval functions *)
 
 let _ = Auto.set_extern_interp
   (fun l -> 
     let l = List.map (fun (id,c) -> (id,VConstr c)) l in
-    interp_tactic {lfun=l;avoid_ids=[];debug=get_debug(); last_loc=dloc})
+    interp_tactic {lfun=l;avoid_ids=[];debug=get_debug(); trace=[]})
 let _ = Auto.set_extern_intern_tac 
   (fun l ->
     Flags.with_option strict_check
diff --git a/tactics/tacinterp.mli b/tactics/tacinterp.mli
index 87aa85dc..928e5914 100644
--- a/tactics/tacinterp.mli
+++ b/tactics/tacinterp.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: tacinterp.mli 10919 2008-05-11 22:04:26Z msozeau $ i*)
+(*i $Id: tacinterp.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Dyn
@@ -26,9 +26,9 @@ open Redexpr
 
 (* Values for interpretation *)
 type value =
-  | VTactic of Util.loc * tactic  (* For mixed ML/Ltac tactics (e.g. Tauto) *)
   | VRTactic of (goal list sigma * validation)
-  | VFun of (identifier * value) list * identifier option list * glob_tactic_expr
+  | VFun of ltac_trace * (identifier*value) list * 
+      identifier option list * glob_tactic_expr
   | VVoid
   | VInteger of int
   | VIntroPattern of intro_pattern_expr
@@ -42,18 +42,16 @@ and interp_sign =
   { lfun : (identifier * value) list;
     avoid_ids : identifier list;
     debug : debug_info;
-    last_loc : loc }
+    trace : ltac_trace }
 
 (* Transforms an id into a constr if possible *)
 val constr_of_id : Environ.env -> identifier -> constr
 
 (* To embed several objects in Coqast.t *)
 val tacticIn : (interp_sign -> raw_tactic_expr) -> raw_tactic_expr
-val tacticOut : raw_tactic_expr -> (interp_sign -> raw_tactic_expr)
+val globTacticIn : (interp_sign -> glob_tactic_expr) -> raw_tactic_expr
 val valueIn : value -> raw_tactic_arg
-val valueOut: raw_tactic_arg -> value
 val constrIn : constr -> constr_expr
-val constrOut : constr_expr -> constr
 
 (* Sets the debugger mode *)
 val set_debug : debug_info -> unit
diff --git a/tactics/tacticals.ml b/tactics/tacticals.ml
index eeca6301..3b13d1a0 100644
--- a/tactics/tacticals.ml
+++ b/tactics/tacticals.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: tacticals.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: tacticals.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -86,7 +86,7 @@ let tclMAP tacfun l =
 
 let tclNTH_HYP m (tac : constr->tactic) gl =
   tac (try mkVar(let (id,_,_) = List.nth (pf_hyps gl) (m-1) in id) 
-       with Failure _ -> error "No such assumption") gl
+       with Failure _ -> error "No such assumption.") gl
 
 (* apply a tactic to the last element of the signature  *)
 
@@ -94,11 +94,11 @@ let tclLAST_HYP = tclNTH_HYP 1
 
 let tclLAST_NHYPS n tac gl =
   tac (try list_firstn n (pf_ids_of_hyps gl)
-       with Failure _ -> error "No such assumptions") gl
+       with Failure _ -> error "No such assumptions.") gl
 
 let tclTRY_sign (tac : constr->tactic) sign gl =
   let rec arec = function
-    | []      -> tclFAIL 0 (str "no applicable hypothesis")
+    | []      -> tclFAIL 0 (str "No applicable hypothesis.")
     | [s]     -> tac (mkVar s) (*added in order to get useful error messages *)
     | (s::sl) -> tclORELSE (tac (mkVar s)) (arec sl) 
   in 
@@ -218,7 +218,7 @@ let lastHyp gl = List.hd (pf_ids_of_hyps gl)
 
 let nLastHyps n gl =
   try list_firstn n (pf_hyps gl)
-  with Failure "firstn" -> error "Not enough hypotheses in the goal"
+  with Failure "firstn" -> error "Not enough hypotheses in the goal."
 
 
 let onClause t cls gl  = t cls gl
@@ -270,19 +270,28 @@ type branch_args = {
   nassums    : int;         (* the number of assumptions to be introduced *)
   branchsign : bool list;   (* the signature of the branch.
                                true=recursive argument, false=constant *)
-  branchnames : intro_pattern_expr list}
+  branchnames : intro_pattern_expr located list}
 
 type branch_assumptions = {
   ba        : branch_args;     (* the branch args *)
   assums    : named_context}   (* the list of assumptions introduced *)
 
+let check_or_and_pattern_size loc names n =
+  if List.length names <> n then
+    if n = 1 then 
+      user_err_loc (loc,"",str "Expects a conjunctive pattern.")
+    else 
+      user_err_loc (loc,"",str "Expects a disjunctive pattern with " ++ int n 
+	++ str " branches.")
+
 let compute_induction_names n = function
-  | IntroAnonymous ->
+  | None ->
       Array.make n []
-  | IntroOrAndPattern names when List.length names = n ->
+  | Some (loc,IntroOrAndPattern names) ->
+      check_or_and_pattern_size loc names n;
       Array.of_list names
   | _ ->
-      errorlabstrm "" (str "Expects " ++ int n ++ str " lists of names")
+      error "Unexpected introduction pattern."
 
 let compute_construtor_signatures isrec (_,k as ity) =
   let rec analrec c recargs =
@@ -335,7 +344,7 @@ let general_elim_then_using mk_elim
   let indmv = 
     match kind_of_term (last_arg elimclause.templval.Evd.rebus) with
       | Meta mv -> mv
-      | _         -> error "elimination"
+      | _         -> anomaly "elimination"
   in
   let pmv =
     let p, _ = decompose_app elimclause.templtyp.Evd.rebus in
@@ -348,7 +357,7 @@ let general_elim_then_using mk_elim
 	      | Var id -> string_of_id id
 	      | _ -> "\b"
 	  in
-	  error ("The elimination combinator " ^ name_elim ^ " is not known") 
+	  error ("The elimination combinator " ^ name_elim ^ " is unknown.") 
   in
   let elimclause' = clenv_fchain indmv elimclause indclause' in
   let elimclause' = clenv_match_args elimbindings elimclause' in
@@ -393,7 +402,7 @@ let elimination_then_using tac predicate bindings c gl =
   let (ind,t) = pf_reduce_to_quantified_ind gl (pf_type_of gl c) in
   let indclause  = mk_clenv_from gl (c,t) in
   general_elim_then_using gl_make_elim
-    true IntroAnonymous tac predicate bindings ind indclause gl
+    true None tac predicate bindings ind indclause gl
 
 let case_then_using =
   general_elim_then_using gl_make_case_dep false
@@ -423,7 +432,7 @@ let make_elim_branch_assumptions ba gl =
 		   id::constargs,
 		   recargs,
 		   indargs) tl idtl
-      | (_, _) -> error "make_elim_branch_assumptions"
+      | (_, _) -> anomaly "make_elim_branch_assumptions"
   in 
   makerec ([],[],[],[],[]) ba.branchsign
     (try list_firstn ba.nassums (pf_hyps gl)
@@ -447,7 +456,7 @@ let make_case_branch_assumptions ba gl =
 		   id::cargs,
 		   recargs,
 		   id::constargs) tl idtl
-      | (_, _) -> error "make_case_branch_assumptions"
+      | (_, _) -> anomaly "make_case_branch_assumptions"
   in 
   makerec ([],[],[],[]) ba.branchsign
     (try list_firstn ba.nassums (pf_hyps gl)
diff --git a/tactics/tacticals.mli b/tactics/tacticals.mli
index e97abe9f..6826977b 100644
--- a/tactics/tacticals.mli
+++ b/tactics/tacticals.mli
@@ -6,10 +6,11 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: tacticals.mli 10785 2008-04-13 21:41:54Z herbelin $ i*)
+(*i $Id: tacticals.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Pp
+open Util
 open Names
 open Term
 open Sign
@@ -124,23 +125,30 @@ type branch_args = {
   nassums    : int;         (* the number of assumptions to be introduced *)
   branchsign : bool list;   (* the signature of the branch.
                                true=recursive argument, false=constant *)
-  branchnames : intro_pattern_expr list}
+  branchnames : intro_pattern_expr located list}
 
 type branch_assumptions = {
   ba        : branch_args;     (* the branch args *)
   assums    : named_context}   (* the list of assumptions introduced *)
 
+(* [check_disjunctive_pattern_size loc pats n] returns an appropriate *)
+(* error message if |pats| <> n *)
+val check_or_and_pattern_size :
+  Util.loc -> or_and_intro_pattern_expr -> int -> unit 
+
 (* Useful for [as intro_pattern] modifier *)
 val compute_induction_names : 
-  int -> intro_pattern_expr -> intro_pattern_expr list array
+  int -> intro_pattern_expr located option -> 
+    intro_pattern_expr located list array
 
 val elimination_sort_of_goal : goal sigma -> sorts_family
 val elimination_sort_of_hyp  : identifier -> goal sigma -> sorts_family
 
 val general_elim_then_using :
-  (inductive -> goal sigma -> constr) -> rec_flag -> intro_pattern_expr ->
-    (branch_args -> tactic) -> constr option -> 
-      (arg_bindings * arg_bindings) -> inductive -> clausenv -> tactic
+  (inductive -> goal sigma -> constr) -> rec_flag ->
+  intro_pattern_expr located option -> (branch_args -> tactic) -> 
+    constr option -> (arg_bindings * arg_bindings) -> inductive -> clausenv ->
+    tactic
 	  
 val elimination_then_using :
   (branch_args -> tactic) -> constr option -> 
@@ -151,12 +159,12 @@ val elimination_then :
     (arg_bindings * arg_bindings) -> constr -> tactic
 
 val case_then_using :
-  intro_pattern_expr -> (branch_args -> tactic) -> 
+  intro_pattern_expr located option -> (branch_args -> tactic) -> 
     constr option -> (arg_bindings * arg_bindings) ->
       inductive -> clausenv -> tactic
 
 val case_nodep_then_using :
-  intro_pattern_expr -> (branch_args -> tactic) -> 
+  intro_pattern_expr located option -> (branch_args -> tactic) -> 
     constr option -> (arg_bindings * arg_bindings) -> 
       inductive -> clausenv -> tactic
 
diff --git a/tactics/tactics.ml b/tactics/tactics.ml
index 88274ef6..b02e84e7 100644
--- a/tactics/tactics.ml
+++ b/tactics/tactics.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: tactics.ml 11166 2008-06-22 13:23:35Z herbelin $ *)
+(* $Id: tactics.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -75,6 +75,8 @@ let inj_ebindings = function
   | ExplicitBindings l -> 
       ExplicitBindings (List.map (fun (l,id,c) -> (l,id,inj_open c)) l)
 
+let dloc = dummy_loc
+
 (*********************************************)
 (*                 Tactics                   *)
 (*********************************************)
@@ -98,7 +100,7 @@ let string_of_inductive c =
       let (mib,mip) = Global.lookup_inductive ind_sp in 
       string_of_id mip.mind_typename
   | _ -> raise Bound
-  with Bound -> error "Bound head variable"
+  with Bound -> error "Bound head variable."
 
 let rec head_constr_bound t l =
   let t = strip_outer_cast(collapse_appl t) in
@@ -114,7 +116,7 @@ let rec head_constr_bound t l =
     | _                -> raise Bound
 
 let head_constr c = 
-  try head_constr_bound c [] with Bound -> error "Bound head variable"
+  try head_constr_bound c [] with Bound -> error "Bound head variable."
 
 (*
 let bad_tactic_args s l =
@@ -126,15 +128,44 @@ let bad_tactic_args s l =
 (******************************************)
 
 let introduction    = Tacmach.introduction 
-let intro_replacing = Tacmach.intro_replacing 
-let internal_cut    = Tacmach.internal_cut
-let internal_cut_rev = Tacmach.internal_cut_rev
 let refine          = Tacmach.refine
 let convert_concl   = Tacmach.convert_concl
 let convert_hyp     = Tacmach.convert_hyp
-let thin            = Tacmach.thin 
 let thin_body       = Tacmach.thin_body
 
+let error_clear_dependency env id = function
+  | Evarutil.OccurHypInSimpleClause None ->
+      errorlabstrm "" (pr_id id ++ str " is used in conclusion.")
+  | Evarutil.OccurHypInSimpleClause (Some id') -> 
+      errorlabstrm ""
+        (pr_id id ++ strbrk " is used in hypothesis " ++ pr_id id' ++ str".")
+  | Evarutil.EvarTypingBreak ev ->
+      errorlabstrm ""
+        (str "Cannot remove " ++ pr_id id ++ 
+	 strbrk " without breaking the typing of " ++ 
+	 Printer.pr_existential env ev ++ str".")
+
+let thin l gl = 
+  try thin l gl
+  with Evarutil.ClearDependencyError (id,err) ->
+    error_clear_dependency (pf_env gl) id err
+
+let internal_cut_gen b d t gl =
+  try internal_cut b d t gl
+  with Evarutil.ClearDependencyError (id,err) ->
+    error_clear_dependency (pf_env gl) id err
+
+let internal_cut = internal_cut_gen false
+let internal_cut_replace = internal_cut_gen true
+
+let internal_cut_rev_gen b d t gl =
+  try internal_cut_rev b d t gl
+  with Evarutil.ClearDependencyError (id,err) ->
+    error_clear_dependency (pf_env gl) id err
+
+let internal_cut_rev = internal_cut_rev_gen false
+let internal_cut_rev_replace = internal_cut_rev_gen true
+
 (* Moving hypotheses *)
 let move_hyp        = Tacmach.move_hyp 
 
@@ -174,7 +205,7 @@ let reduct_in_hyp redfun ((_,id),where) gl =
   match c with
   | None -> 
       if where = InHypValueOnly then
-	errorlabstrm "" (pr_id id ++ str "has no value");
+	errorlabstrm "" (pr_id id ++ str "has no value.");
       convert_hyp_no_check (id,None,redfun' ty) gl
   | Some b ->
       let b' = if where <> InHypTypeOnly then redfun' b else b in
@@ -197,7 +228,7 @@ let change_and_check cv_pb t env sigma c =
   if is_fconv cv_pb env sigma t c then 
     t
   else 
-    errorlabstrm "convert-check-hyp" (str "Not convertible")
+    errorlabstrm "convert-check-hyp" (str "Not convertible.")
 
 (* Use cumulutavity only if changing the conclusion not a subterm *)
 let change_on_subterm cv_pb t = function
@@ -219,7 +250,7 @@ let change occl c cls =
       ({onhyps=(Some(_::_::_)|None)}
       |{onhyps=Some(_::_);concl_occs=((false,_)|(true,_::_))}),
       Some _ ->
-	error "No occurrences expected when changing several hypotheses"
+	error "No occurrences expected when changing several hypotheses."
     | _ -> ());
   onClauses (change_option occl c) cls
 
@@ -273,15 +304,19 @@ let fresh_id_avoid avoid id =
 let fresh_id avoid id gl =
   fresh_id_avoid (avoid@(pf_ids_of_hyps gl)) id
 
-let id_of_name_with_default s = function
-  | Anonymous -> id_of_string s
+let id_of_name_with_default id = function
+  | Anonymous -> id
   | Name id   -> id
 
+let hid = id_of_string "H"
+let xid = id_of_string "X"
+
+let default_id_of_sort = function Prop _ -> hid | Type _ -> xid
+
 let default_id env sigma = function
   | (name,None,t) ->
-      (match Typing.sort_of env sigma t with
-	| Prop _ -> (id_of_name_with_default "H" name)
-	| Type _ -> (id_of_name_with_default "X" name))
+      let dft = default_id_of_sort (Typing.sort_of env sigma t) in
+      id_of_name_with_default dft name
   | (name,Some b,_) -> id_of_name_using_hdchar env b name
 
 (* Non primitive introduction tactics are treated by central_intro
@@ -293,14 +328,14 @@ type intro_name_flag =
   | IntroBasedOn of identifier * identifier list
   | IntroMustBe of identifier
 
-let find_name decl gl = function
+let find_name loc decl gl = function
   | IntroAvoid idl -> 
       (* this case must be compatible with [find_intro_names] below. *)
       let id = fresh_id idl (default_id (pf_env gl) gl.sigma decl) gl in id
   | IntroBasedOn (id,idl) -> fresh_id idl id gl
-  | IntroMustBe id        -> 
+  | IntroMustBe id -> 
       let id' = fresh_id [] id gl in
-      if id' <> id then error ((string_of_id id)^" is already used");
+      if id'<>id then user_err_loc (loc,"",pr_id id ++ str" is already used.");
       id'
 
 (* Returns the names that would be created by intros, without doing
@@ -319,65 +354,72 @@ let find_intro_names ctxt gl =
     ctxt (pf_env gl , []) in
   List.rev res 
 
-
 let build_intro_tac id = function
-  | None      -> introduction id
-  | Some dest -> tclTHEN (introduction id) (move_hyp true id dest)
+  | MoveToEnd true -> introduction id
+  | dest -> tclTHEN (introduction id) (move_hyp true id dest)
 
-let rec intro_gen name_flag move_flag force_flag gl =
+let rec intro_gen loc name_flag move_flag force_flag gl =
   match kind_of_term (pf_concl gl) with
     | Prod (name,t,_) -> 
-	build_intro_tac (find_name (name,None,t) gl name_flag) move_flag gl
+	build_intro_tac (find_name loc (name,None,t) gl name_flag) move_flag gl
     | LetIn (name,b,t,_) ->
-	build_intro_tac (find_name (name,Some b,t) gl name_flag) move_flag gl
+	build_intro_tac (find_name loc (name,Some b,t) gl name_flag) move_flag
+	  gl
     | _ -> 
 	if not force_flag then raise (RefinerError IntroNeedsProduct);
 	try
 	  tclTHEN
 	    (reduce (Red true) onConcl)
-	    (intro_gen name_flag move_flag force_flag) gl
+	    (intro_gen loc name_flag move_flag force_flag) gl
 	with Redelimination ->
-	  errorlabstrm "Intro" (str "No product even after head-reduction")
+	  user_err_loc(loc,"Intro",str "No product even after head-reduction.")
 
-let intro_mustbe_force id = intro_gen (IntroMustBe id) None true
-let intro_using id = intro_gen (IntroBasedOn (id,[])) None false
-let intro_force force_flag = intro_gen (IntroAvoid []) None force_flag
+let intro_mustbe_force id = intro_gen dloc (IntroMustBe id) no_move true
+let intro_using id = intro_gen dloc (IntroBasedOn (id,[])) no_move false
+let intro_force force_flag = intro_gen dloc (IntroAvoid []) no_move force_flag
 let intro = intro_force false
 let introf = intro_force true
 
-let intro_avoiding l = intro_gen (IntroAvoid l) None false 
-
-let introf_move_name destopt = intro_gen (IntroAvoid []) destopt true
+let intro_avoiding l = intro_gen dloc (IntroAvoid l) no_move false 
 
-(* For backwards compatibility *)
-let central_intro = intro_gen
+let introf_move_name destopt = intro_gen dloc (IntroAvoid []) destopt true
 
 (**** Multiple introduction tactics ****)
 
 let rec intros_using = function
-    []      -> tclIDTAC
-   | str::l  -> tclTHEN (intro_using str) (intros_using l)
+  | []     -> tclIDTAC
+  | str::l -> tclTHEN (intro_using str) (intros_using l)
 
 let intros = tclREPEAT (intro_force false)
 
 let intro_erasing id = tclTHEN (thin [id]) (introduction id)
 
+let rec get_next_hyp_position id = function
+  | [] -> error ("No such hypothesis: " ^ string_of_id id)
+  | (hyp,_,_) :: right ->
+      if hyp = id then
+	match right with (id,_,_)::_ -> MoveBefore id | [] -> MoveToEnd true
+      else
+	get_next_hyp_position id right
+
+let intro_replacing id gl =
+  let next_hyp = get_next_hyp_position id (pf_hyps gl) in
+  tclTHENLIST [thin [id]; introduction id; move_hyp true id next_hyp] gl
+
 let intros_replacing ids gl = 
   let rec introrec = function
     | [] -> tclIDTAC
     | id::tl ->
-	(tclTHEN (tclORELSE (intro_replacing id)
-		    (tclORELSE (intro_erasing id)   (* ?? *)
-                       (intro_using id)))
-           (introrec tl))
+	tclTHEN (tclORELSE (intro_replacing id) (intro_using id))
+           (introrec tl)
   in 
   introrec ids gl
 
 (* User-level introduction tactics *)
 
-let intro_move idopt idopt' = match idopt with
-  | None -> intro_gen (IntroAvoid []) idopt' true
-  | Some id -> intro_gen (IntroMustBe id) idopt' true
+let intro_move idopt hto = match idopt with
+  | None -> intro_gen dloc (IntroAvoid []) hto true
+  | Some id -> intro_gen dloc (IntroMustBe id) hto true
 
 let pf_lookup_hypothesis_as_renamed env ccl = function
   | AnonHyp n -> pf_lookup_index_as_renamed env ccl n
@@ -415,7 +457,8 @@ let depth_of_quantified_hypothesis red h gl =
         errorlabstrm "lookup_quantified_hypothesis" 
           (str "No " ++ msg_quantified_hypothesis h ++
 	  strbrk " in current goal" ++
-	  if red then strbrk " even after head-reduction" else mt ())
+	  (if red then strbrk " even after head-reduction" else mt ()) ++
+	  str".")
 
 let intros_until_gen red h g =
   tclDO (depth_of_quantified_hypothesis red h g) intro g
@@ -434,7 +477,7 @@ let try_intros_until tac = function
 let rec intros_move = function
   | [] -> tclIDTAC
   | (hyp,destopt) :: rest ->
-      tclTHEN (intro_gen (IntroMustBe hyp) destopt false)
+      tclTHEN (intro_gen dloc (IntroMustBe hyp) destopt false)
 	(intros_move rest)
 
 let dependent_in_decl a (_,c,t) =
@@ -442,33 +485,6 @@ let dependent_in_decl a (_,c,t) =
     | None -> dependent a t
     | Some body -> dependent a body || dependent a t
 
-let move_to_rhyp rhyp gl =
-  let rec get_lhyp lastfixed depdecls = function
-    | [] ->
-	(match rhyp with
-	   | None -> lastfixed
-      	   | Some h -> anomaly ("Hypothesis should occur: "^ (string_of_id h)))
-    | (hyp,c,typ) as ht :: rest ->
-	if Some hyp = rhyp then 
-	  lastfixed
-	else if List.exists (occur_var_in_decl (pf_env gl) hyp) depdecls then 
-	  get_lhyp lastfixed (ht::depdecls) rest
-        else
-	  get_lhyp (Some hyp) depdecls rest
-  in
-  let sign = pf_hyps gl in
-  let (hyp,c,typ as decl) = List.hd sign in
-  match get_lhyp None [decl] (List.tl sign) with
-    | None -> tclIDTAC gl
-    | Some hypto -> move_hyp true hyp hypto gl
-
-let rec intros_rmove = function
-  | [] -> tclIDTAC
-  | (hyp,destopt) :: rest ->
-      tclTHENLIST [ introduction hyp;
- 		    move_to_rhyp destopt;
-		    intros_rmove rest ]
-
 (* Apply a tactic on a quantified hypothesis, an hypothesis in context
    or a term with bindings *)
 
@@ -515,7 +531,7 @@ let cut c gl =
             (internal_cut_rev id c)
             (tclTHEN (apply_type t [mkVar id]) (thin [id]))
             gl
-    | _  -> error "Not a proposition or a type"
+    | _  -> error "Not a proposition or a type."
 
 let cut_intro t = tclTHENFIRST (cut t) intro
 
@@ -529,9 +545,7 @@ let cut_intro t = tclTHENFIRST (cut t) intro
 (* cut_replacing échoue si l'hypothèse à remplacer apparaît dans le
    but, ou dans une autre hypothèse *)
 let cut_replacing id t tac = 
-  tclTHENS (cut t) [
-      tclORELSE (intro_replacing id) (intro_erasing id); 
-      tac (refine_no_check (mkVar id)) ]
+  tclTHENS (cut t) [ intro_replacing id; tac (refine_no_check (mkVar id)) ]
 
 let cut_in_parallel l = 
   let rec prec = function
@@ -543,7 +557,7 @@ let cut_in_parallel l =
 let error_uninstantiated_metas t clenv =
   let na = meta_name clenv.evd (List.hd (Metaset.elements (metavars_of t))) in
   let id = match na with Name id -> id | _ -> anomaly "unnamed dependent meta"
-  in errorlabstrm "" (str "cannot find an instance for " ++ pr_id id)
+  in errorlabstrm "" (str "Cannot find an instance for " ++ pr_id id ++ str".")
 
 let clenv_refine_in with_evars id clenv gl =
   let clenv = clenv_pose_dependent_evars with_evars clenv in
@@ -577,7 +591,7 @@ let elimination_clause_scheme with_evars allow_K elimclause indclause gl =
     (match kind_of_term (last_arg elimclause.templval.rebus) with
        | Meta mv -> mv
        | _  -> errorlabstrm "elimination_clause"
-             (str "The type of elimination clause is not well-formed")) 
+             (str "The type of elimination clause is not well-formed.")) 
   in
   let elimclause' = clenv_fchain indmv elimclause indclause in 
   res_pf elimclause' ~with_evars:with_evars ~allow_K:allow_K ~flags:elim_flags
@@ -643,22 +657,28 @@ let simplest_elim c = default_elim false (c,NoBindings)
    (e.g. it could replace id:A->B->C by id:C, knowing A/\B)
 *)
 
+let clenv_fchain_in id elim_flags mv elimclause hypclause =
+  try clenv_fchain ~allow_K:false ~flags:elim_flags mv elimclause hypclause
+  with PretypeError (env,NoOccurrenceFound (op,_)) ->
+    (* Set the hypothesis name in the message *)
+    raise (PretypeError (env,NoOccurrenceFound (op,Some id)))
+
 let elimination_in_clause_scheme with_evars id elimclause indclause gl =
   let (hypmv,indmv) = 
     match clenv_independent elimclause with
         [k1;k2] -> (k1,k2)
       | _  -> errorlabstrm "elimination_clause"
-          (str "The type of elimination clause is not well-formed") in
+          (str "The type of elimination clause is not well-formed.") in
   let elimclause'  = clenv_fchain indmv elimclause indclause in 
   let hyp = mkVar id in
   let hyp_typ = pf_type_of gl hyp in
   let hypclause = mk_clenv_from_n gl (Some 0) (hyp, hyp_typ) in
-  let elimclause'' =
-    clenv_fchain ~allow_K:false ~flags:elim_flags hypmv elimclause' hypclause in
+  let elimclause'' = 
+    clenv_fchain_in id elim_flags hypmv elimclause' hypclause in
   let new_hyp_typ  = clenv_type elimclause'' in
   if eq_constr hyp_typ new_hyp_typ then
     errorlabstrm "general_rewrite_in" 
-      (str "Nothing to rewrite in " ++ pr_id id);
+      (str "Nothing to rewrite in " ++ pr_id id ++ str".");
   clenv_refine_in with_evars id elimclause'' gl
 
 let general_elim_in with_evars id =
@@ -688,6 +708,13 @@ let simplest_case c = general_case_analysis false (c,NoBindings)
 (*            Resolution tactics                    *)
 (****************************************************)
 
+let resolve_classes gl =
+  let env = pf_env gl and evd = project gl in
+    if evd = Evd.empty then tclIDTAC gl
+    else
+      let evd' = Typeclasses.resolve_typeclasses env (Evd.create_evar_defs evd) in
+	(tclTHEN (tclEVARS (Evd.evars_of evd')) tclNORMEVAR) gl
+
 (* Resolution with missing arguments *)
 
 let general_apply with_delta with_destruct with_evars (c,lbind) gl =
@@ -701,7 +728,7 @@ let general_apply with_delta with_destruct with_evars (c,lbind) gl =
   let thm_ty0 = nf_betaiota (pf_type_of gl c) in
   let try_apply thm_ty nprod =
     let n = nb_prod thm_ty - nprod in
-    if n<0 then error "Apply: theorem has not enough premisses.";
+    if n<0 then error "Applied theorem has not enough premisses.";
     let clause = make_clenv_binding_apply gl (Some n) (c,thm_ty) lbind in
     Clenvtac.res_pf clause ~with_evars:with_evars ~flags:flags gl in
   try try_apply thm_ty0 concl_nprod
@@ -744,16 +771,22 @@ let general_apply with_delta with_destruct with_evars (c,lbind) gl =
     try_red_apply thm_ty0 in
   try_main_apply c gl
 
-let apply_with_ebindings_gen b = general_apply b b
+let rec apply_with_ebindings_gen b e = function
+  | [] ->
+      tclIDTAC
+  | [cb] ->
+      general_apply b b e cb
+  | cb::cbl -> 
+      tclTHENLAST (general_apply b b e cb) (apply_with_ebindings_gen b e cbl)
 
-let apply_with_ebindings = apply_with_ebindings_gen false false
-let eapply_with_ebindings = apply_with_ebindings_gen false true
+let apply_with_ebindings cb = apply_with_ebindings_gen false false [cb]
+let eapply_with_ebindings cb = apply_with_ebindings_gen false true [cb]
 
 let apply_with_bindings (c,bl) =
   apply_with_ebindings (c,inj_ebindings bl)
 
 let eapply_with_bindings (c,bl) =
-  apply_with_ebindings_gen false true (c,inj_ebindings bl)
+  apply_with_ebindings_gen false true [c,inj_ebindings bl]
 
 let apply c =
   apply_with_ebindings (c,NoBindings)
@@ -788,10 +821,10 @@ let find_matching_clause unifier clause =
 
 let progress_with_clause innerclause clause =
   let ordered_metas = List.rev (clenv_independent clause) in
-  if ordered_metas = [] then error "Statement without assumptions";
+  if ordered_metas = [] then error "Statement without assumptions.";
   let f mv = find_matching_clause (clenv_fchain mv clause) innerclause in
   try list_try_find f ordered_metas
-  with Failure _ -> error "Unable to unify"
+  with Failure _ -> error "Unable to unify."
 
 let apply_in_once gl innerclause (d,lbind) =
   let thm = nf_betaiota (pf_type_of gl d) in
@@ -832,7 +865,7 @@ let cut_and_apply c gl =
 	  tclTHENLAST
 	    (apply_type (mkProd (Anonymous,c2,goal_constr)) [mkMeta(new_meta())])
 	    (apply_term c [mkMeta (new_meta())]) gl
-      | _ -> error "Imp_elim needs a non-dependent product"
+      | _ -> error "lapply needs a non-dependent product."
 
 (********************************************************************)
 (*               Exact tactics                                      *)
@@ -844,7 +877,7 @@ let exact_check c gl =
   if pf_conv_x_leq gl ct concl then  
     refine_no_check c gl 
   else 
-    error "Not an exact proof"
+    error "Not an exact proof."
 
 let exact_no_check = refine_no_check
 
@@ -863,7 +896,7 @@ let (assumption : tactic) = fun gl ->
   let hyps = pf_hyps gl in
   let rec arec only_eq = function
     | [] -> 
-        if only_eq then arec false hyps else error "No such assumption"
+        if only_eq then arec false hyps else error "No such assumption."
     | (id,c,t)::rest -> 
 	if (only_eq & eq_constr t concl) 
           or (not only_eq & pf_conv_x_leq gl t concl)
@@ -881,11 +914,20 @@ let (assumption : tactic) = fun gl ->
  * subsequently used in other hypotheses or in the conclusion of the  
  * goal. *)                                                               
 
-let clear ids gl = (* avant seul dyn_clear n'echouait pas en [] *)
-  if ids=[] then tclIDTAC gl else with_check (thin ids) gl
+let clear ids = (* avant seul dyn_clear n'echouait pas en [] *)
+  if ids=[] then tclIDTAC else thin ids
 
 let clear_body = thin_body
 
+let clear_wildcards ids =
+  tclMAP (fun (loc,id) gl ->
+    try with_check (Tacmach.thin_no_check [id]) gl
+    with ClearDependencyError (id,err) ->
+      (* Intercept standard [thin] error message *)
+      Stdpp.raise_with_loc loc
+        (error_clear_dependency (pf_env gl) (id_of_string "_") err))
+    ids
+
 (*   Takes a list of booleans, and introduces all the variables 
  *  quantified in the goal which are associated with a value
  *  true  in the boolean list. *)
@@ -919,17 +961,17 @@ let specialize mopt (c,lbind) g =
       let term = applist(thd,tstack) in 
       if occur_meta term then
 	errorlabstrm "" (str "Cannot infer an instance for " ++
-          pr_name (meta_name clause.evd (List.hd (collect_metas term))));
+          pr_name (meta_name clause.evd (List.hd (collect_metas term))) ++
+	  str ".");
       Some (evars_of clause.evd), term
   in
   tclTHEN 
     (match evars with Some e -> tclEVARS e | _ -> tclIDTAC)
-    (match kind_of_term (fst (decompose_app c)) with 
-       | Var id when List.exists (fun (i,_,_)-> i=id) (pf_hyps g) ->
-	   let id' = fresh_id [] id g in 
-	   tclTHENS (fun g -> internal_cut id' (pf_type_of g term) g)
-	     [ exact_no_check term; 
-	       tclTHEN (clear [id]) (rename_hyp [id',id]) ]
+    (match kind_of_term (fst(decompose_app (snd(decompose_lam_assum c)))) with
+       | Var id when List.mem id (pf_ids_of_hyps g) ->
+	     tclTHENFIRST
+	       (fun g -> internal_cut_replace id (pf_type_of g term) g)
+	       (exact_no_check term)
        | _ -> tclTHENLAST 
                  (fun g -> cut (pf_type_of g term) g)
                  (exact_no_check term))
@@ -955,14 +997,14 @@ let keep hyps gl =
 (************************)
 
 let check_number_of_constructors expctdnumopt i nconstr =
-  if i=0 then error "The constructors are numbered starting from 1";
+  if i=0 then error "The constructors are numbered starting from 1.";
   begin match expctdnumopt with 
     | Some n when n <> nconstr ->
 	error ("Not an inductive goal with "^
-	       string_of_int n^plural n " constructor")
+	       string_of_int n^plural n " constructor"^".")
     | _ -> ()
   end;
-  if i > nconstr then error "Not enough constructors"
+  if i > nconstr then error "Not enough constructors."
 
 let constructor_tac with_evars expctdnumopt i lbind gl =
   let cl = pf_concl gl in 
@@ -987,7 +1029,7 @@ let any_constructor with_evars tacopt gl =
   let mind = fst (pf_reduce_to_quantified_ind gl (pf_concl gl)) in
   let nconstr =
     Array.length (snd (Global.lookup_inductive mind)).mind_consnames in
-  if nconstr = 0 then error "The type has no constructors";
+  if nconstr = 0 then error "The type has no constructors.";
   tclFIRST
     (List.map
       (fun i -> tclTHEN (constructor_tac with_evars None i NoBindings) t) 
@@ -1025,22 +1067,33 @@ let fix_empty_case nv l =
      and "[ ]" for no clause at all; so we are a bit liberal here *)
   if Array.length nv = 0 & l = [[]] then [] else l
 
-let intro_or_and_pattern ll l' tac =
+let error_unexpected_extra_pattern loc nb pat =
+  let s1,s2,s3 = match pat with
+  | IntroIdentifier _ -> "name", (plural nb " introduction pattern"), "no"
+  | _ -> "introduction pattern", "", "none" in
+  user_err_loc (loc,"",str "Unexpected " ++ str s1 ++ str " (" ++
+    (if nb = 0 then (str s3 ++ str s2) else
+      (str "at most " ++ int nb ++ str s2)) ++ spc () ++
+       str (if nb = 1 then "was" else "were") ++
+      strbrk " expected in the branch).")
+
+let intro_or_and_pattern loc b ll l' tac =
   tclLAST_HYP (fun c gl ->
     let ind,_ = pf_reduce_to_quantified_ind gl (pf_type_of gl c) in
     let nv = mis_constr_nargs ind in
-    let rec adjust_names_length tail n = function
-      | [] when n = 0 or tail -> []
-      | [] -> IntroAnonymous :: adjust_names_length tail (n-1) []
-      | _ :: _ as l when n = 0 -> 
-	  if tail then l else error "Too many names in some branch"
-      | ip :: l -> ip :: adjust_names_length tail (n-1) l in
+    let bracketed = b or not (l'=[]) in
+    let rec adjust_names_length nb n = function
+      | [] when n = 0 or not bracketed -> []
+      | [] -> (dloc,IntroAnonymous) :: adjust_names_length nb (n-1) []
+      | (loc',pat) :: _ as l when n = 0 ->
+	  if bracketed then error_unexpected_extra_pattern loc' nb pat;
+	  l
+      | ip :: l -> ip :: adjust_names_length nb (n-1) l in
     let ll = fix_empty_case nv ll in
-    if List.length ll <> Array.length nv then
-      error "Not the right number of patterns";
+    check_or_and_pattern_size loc ll (Array.length nv);
     tclTHENLASTn
       (tclTHEN case_last clear_last)
-      (array_map2 (fun n l -> tac ((adjust_names_length (l'=[]) n l)@l'))
+      (array_map2 (fun n l -> tac ((adjust_names_length n n l)@l'))
 	nv (Array.of_list ll))
       gl)
 
@@ -1052,11 +1105,11 @@ let clear_if_atomic l2r id gl =
   else tclIDTAC gl
 
 let rec explicit_intro_names = function
-| IntroIdentifier id :: l ->
+| (_, IntroIdentifier id) :: l ->
     id :: explicit_intro_names l
-| (IntroWildcard | IntroAnonymous | IntroFresh _ | IntroRewrite _) :: l ->
+| (_, (IntroWildcard | IntroAnonymous | IntroFresh _ | IntroRewrite _)) :: l ->
     explicit_intro_names l
-| IntroOrAndPattern ll :: l' -> 
+| (_, IntroOrAndPattern ll) :: l' -> 
     List.flatten (List.map (fun l -> explicit_intro_names (l@l')) ll)
 | [] ->
     []
@@ -1065,84 +1118,90 @@ let rec explicit_intro_names = function
      to ensure that dependent hypotheses are cleared in the right
      dependency order (see bug #1000); we use fresh names, not used in
      the tactic, for the hyps to clear *)
-let rec intros_patterns avoid thin destopt = function
-  | IntroWildcard :: l ->
+let rec intros_patterns b avoid thin destopt = function
+  | (loc, IntroWildcard) :: l ->
       tclTHEN 
-        (intro_gen (IntroAvoid (avoid@explicit_intro_names l)) None true)
+        (intro_gen loc (IntroAvoid(avoid@explicit_intro_names l)) no_move true)
         (onLastHyp (fun id ->
 	  tclORELSE
-	    (tclTHEN (clear [id]) (intros_patterns avoid thin destopt l))
-	    (intros_patterns avoid (id::thin) destopt l)))
-  | IntroIdentifier id :: l ->
+	    (tclTHEN (clear [id]) (intros_patterns b avoid thin destopt l))
+	    (intros_patterns b avoid ((loc,id)::thin) destopt l)))
+  | (loc, IntroIdentifier id) :: l ->
       tclTHEN
-        (intro_gen (IntroMustBe id) destopt true)
-        (intros_patterns avoid thin destopt l)
-  | IntroAnonymous :: l ->
+        (intro_gen loc (IntroMustBe id) destopt true)
+        (intros_patterns b avoid thin destopt l)
+  | (loc, IntroAnonymous) :: l ->
       tclTHEN
-        (intro_gen (IntroAvoid (avoid@explicit_intro_names l)) destopt true)
-        (intros_patterns avoid thin destopt l)
-  | IntroFresh id :: l ->
+        (intro_gen loc (IntroAvoid (avoid@explicit_intro_names l))
+	  destopt true)
+        (intros_patterns b avoid thin destopt l)
+  | (loc, IntroFresh id) :: l ->
       tclTHEN
-        (intro_gen (IntroBasedOn (id, avoid@explicit_intro_names l)) destopt true)
-        (intros_patterns avoid thin destopt l)
-  | IntroOrAndPattern ll :: l' ->
+        (intro_gen loc (IntroBasedOn (id, avoid@explicit_intro_names l))
+	  destopt true)
+        (intros_patterns b avoid thin destopt l)
+  | (loc, IntroOrAndPattern ll) :: l' ->
       tclTHEN
         introf
-        (intro_or_and_pattern ll l' (intros_patterns avoid thin destopt))
-  | IntroRewrite l2r :: l ->
+        (intro_or_and_pattern loc b ll l'
+	  (intros_patterns b avoid thin destopt))
+  | (loc, IntroRewrite l2r) :: l ->
       tclTHEN 
-        (intro_gen (IntroAvoid (avoid@explicit_intro_names l)) None true)
+        (intro_gen loc (IntroAvoid(avoid@explicit_intro_names l)) no_move true)
         (onLastHyp (fun id ->
 	  tclTHENLIST [
 	    !forward_general_multi_rewrite l2r false (mkVar id,NoBindings) 
 	      allClauses;
 	    clear_if_atomic l2r id;
-	    intros_patterns avoid thin destopt l ]))
-  | [] -> clear thin
+	    intros_patterns b avoid thin destopt l ]))
+  | [] -> clear_wildcards thin
 
-let intros_pattern = intros_patterns [] []
+let intros_pattern = intros_patterns false [] []
 
-let intro_pattern destopt pat = intros_patterns [] [] destopt [pat]
+let intro_pattern destopt pat = intros_patterns false [] [] destopt [dloc,pat]
 
 let intro_patterns = function 
   | [] -> tclREPEAT intro
-  | l  -> intros_pattern None l
+  | l  -> intros_pattern no_move l
 
 (**************************)
 (*   Other cut tactics    *)
 (**************************)
 
-let hid = id_of_string "H"
-let xid = id_of_string "X"
+let make_id s = fresh_id [] (default_id_of_sort s)
 
-let make_id s = fresh_id [] (match s with Prop _ -> hid | Type _ -> xid)
-
-let prepare_intros s ipat gl = match ipat with
+let prepare_intros s (loc,ipat) gl = match ipat with
+  | IntroIdentifier id -> id, tclIDTAC
   | IntroAnonymous -> make_id s gl, tclIDTAC
   | IntroFresh id -> fresh_id [] id gl, tclIDTAC
-  | IntroWildcard -> let id = make_id s gl in id, thin [id]
-  | IntroIdentifier id -> id, tclIDTAC
+  | IntroWildcard -> let id = make_id s gl in id, clear_wildcards [dloc,id]
   | IntroRewrite l2r -> 
       let id = make_id s gl in
       id, !forward_general_multi_rewrite l2r false (mkVar id,NoBindings) allClauses
   | IntroOrAndPattern ll -> make_id s gl, 
-    (tclTHENS 
-      (tclTHEN case_last clear_last)
-      (List.map (intros_pattern None) ll))
+      intro_or_and_pattern loc true ll [] (intros_patterns true [] [] no_move)
 
 let ipat_of_name = function
   | Anonymous -> IntroAnonymous
   | Name id -> IntroIdentifier id
 
+let allow_replace c gl = function (* A rather arbitrary condition... *)
+  | _, IntroIdentifier id ->
+      fst (decompose_app (snd (decompose_lam_assum c))) = mkVar id
+  | _ ->
+      false
+
 let assert_as first ipat c gl =
   match kind_of_term (hnf_type_of gl c) with
   | Sort s ->
       let id,tac = prepare_intros s ipat gl in
-      tclTHENS ((if first then internal_cut else internal_cut_rev) id c)
+      let repl = allow_replace c gl ipat in
+      tclTHENS
+	((if first then internal_cut_gen else internal_cut_rev_gen) repl id c)
 	(if first then [tclIDTAC; tac] else [tac; tclIDTAC]) gl
-  | _  -> error "Not a proposition or a type"
+  | _  -> error "Not a proposition or a type."
 
-let assert_tac first na = assert_as first (ipat_of_name na)
+let assert_tac first na = assert_as first (dloc,ipat_of_name na)
 let true_cut = assert_tac true 
 
 (**************************)
@@ -1341,7 +1400,8 @@ let letin_abstract id c occs gl =
   let ccl = match occurrences_of_goal occs with
     | None -> pf_concl gl
     | Some occ -> subst1 (mkVar id) (subst_term_occ occ c (pf_concl gl)) in
-  let lastlhyp = if depdecls = [] then None else Some(pi1(list_last depdecls)) in
+  let lastlhyp =
+    if depdecls = [] then no_move else MoveAfter(pi1(list_last depdecls)) in
   (depdecls,lastlhyp,ccl)
 
 let letin_tac with_eq name c occs gl =
@@ -1349,23 +1409,29 @@ let letin_tac with_eq name c occs gl =
     let x = id_of_name_using_hdchar (Global.env()) (pf_type_of gl c) name in
     if name = Anonymous then fresh_id [] x gl else
       if not (mem_named_context x (pf_hyps gl)) then x else
-	error ("The variable "^(string_of_id x)^" is already declared") in
+	error ("The variable "^(string_of_id x)^" is already declared.") in
   let (depdecls,lastlhyp,ccl)= letin_abstract id c occs gl in 
   let t = pf_type_of gl c in
   let newcl,eq_tac = match with_eq with
-    | Some lr ->
-      let heq = fresh_id [] (add_prefix "Heq" id) gl in
+    | Some (lr,(loc,ido)) ->
+      let heq = match ido with
+        | IntroAnonymous -> fresh_id [id] (add_prefix "Heq" id) gl
+	| IntroFresh heq_base -> fresh_id [id] heq_base gl
+        | IntroIdentifier id -> id
+	| _ -> error"Expect an introduction pattern naming one hypothesis." in
       let eqdata = build_coq_eq_data () in
       let args = if lr then [t;mkVar id;c] else [t;c;mkVar id]in
       let eq = applist (eqdata.eq,args) in
       let refl = applist (eqdata.refl, [t;mkVar id]) in
       mkNamedLetIn id c t (mkLetIn (Name heq, refl, eq, ccl)),
-      tclTHEN (intro_gen (IntroMustBe heq) lastlhyp true) (thin_body [heq;id])
+      tclTHEN
+	(intro_gen loc (IntroMustBe heq) lastlhyp true)
+	(thin_body [heq;id])
     | None ->
 	mkNamedLetIn id c t ccl, tclIDTAC in
   tclTHENLIST
     [ convert_concl_no_check newcl DEFAULTcast;
-      intro_gen (IntroMustBe id) lastlhyp true;
+      intro_gen dloc (IntroMustBe id) lastlhyp true;
       eq_tac;
       tclMAP convert_hyp_no_check depdecls ] gl
   
@@ -1390,7 +1456,7 @@ let unfold_body x gl =
     match Sign.lookup_named x hyps with
         (_,Some xval,_) -> xval
       | _ -> errorlabstrm "unfold_body"
-          (pr_id x ++ str" is not a defined hypothesis") in
+          (pr_id x ++ str" is not a defined hypothesis.") in
   let aft = afterHyp x gl in
   let hl = List.fold_right (fun (y,yval,_) cl -> (([],y),InHyp) :: cl) aft [] in
   let xvar = mkVar x in
@@ -1445,76 +1511,85 @@ let unfold_all x gl =
 
 let check_unused_names names =
   if names <> [] & Flags.is_verbose () then
-    let s = if List.tl names = [] then " " else "s " in
     msg_warning 
-      (str"Unused introduction pattern" ++ str s ++ 
-       str": " ++ prlist_with_sep spc pr_intro_pattern names)
-
-let rec first_name_buggy = function
-  | IntroOrAndPattern [] -> None
-  | IntroOrAndPattern ([]::l) -> first_name_buggy (IntroOrAndPattern l)
-  | IntroOrAndPattern ((p::_)::_) -> first_name_buggy p
-  | IntroWildcard -> None
-  | IntroRewrite _ -> None
-  | IntroIdentifier id -> Some id
+      (str"Unused introduction " ++ str (plural (List.length names) "pattern")
+       ++ str": " ++ prlist_with_sep spc pr_intro_pattern names)
+
+let rec first_name_buggy avoid gl (loc,pat) = match pat with
+  | IntroOrAndPattern [] -> no_move
+  | IntroOrAndPattern ([]::l) -> 
+      first_name_buggy avoid gl (loc,IntroOrAndPattern l)
+  | IntroOrAndPattern ((p::_)::_) -> first_name_buggy avoid gl p
+  | IntroWildcard -> no_move
+  | IntroRewrite _ -> no_move
+  | IntroIdentifier id -> MoveAfter id
   | IntroAnonymous | IntroFresh _ -> assert false
 
 let consume_pattern avoid id gl = function
-  | [] -> (IntroIdentifier (fresh_id avoid id gl), [])
-  | IntroAnonymous::names ->
+  | [] -> ((dloc, IntroIdentifier (fresh_id avoid id gl)), [])
+  | (loc,IntroAnonymous)::names ->
+      let avoid = avoid@explicit_intro_names names in
+      ((loc,IntroIdentifier (fresh_id avoid id gl)), names)
+  | (loc,IntroFresh id')::names ->
       let avoid = avoid@explicit_intro_names names in
-      (IntroIdentifier (fresh_id avoid id gl), names)
+      ((loc,IntroIdentifier (fresh_id avoid id' gl)), names)
   | pat::names -> (pat,names)
 
 let re_intro_dependent_hypotheses tophyp (lstatus,rstatus) =
   let newlstatus = (* if some IH has taken place at the top of hyps *)
-    List.map (function (hyp,None) -> (hyp,tophyp) | x -> x) lstatus in
+    List.map (function (hyp,MoveToEnd true) -> (hyp,tophyp) | x -> x) lstatus
+  in
   tclTHEN
-    (intros_rmove rstatus)
+    (intros_move rstatus)
     (intros_move newlstatus)
 
+let update destopt tophyp = if destopt = no_move then tophyp else destopt
+
 type elim_arg_kind = RecArg | IndArg | OtherArg
 
 let induct_discharge statuslists destopt avoid' (avoid,ra) names gl =
   let avoid = avoid @ avoid' in
-  let rec peel_tac ra names tophyp gl = match ra with
+  let rec peel_tac ra names tophyp gl =
+    match ra with
     | (RecArg,recvarname) ::
         (IndArg,hyprecname) :: ra' ->
         let recpat,names = match names with
-          | [IntroIdentifier id as pat] ->
-              let id = next_ident_away (add_prefix "IH" id) avoid in
-	      (pat, [IntroIdentifier id])
+          | [loc,IntroIdentifier id as pat] ->
+              let id' = next_ident_away (add_prefix "IH" id) avoid in
+	      (pat, [dloc, IntroIdentifier id'])
           | _ -> consume_pattern avoid recvarname gl names in
         let hyprec,names = consume_pattern avoid hyprecname gl names in
         (* IH stays at top: we need to update tophyp *)
         (* This is buggy for intro-or-patterns with different first hypnames *)
         (* Would need to pass peel_tac as a continuation of intros_patterns *)
         (* (or to have hypotheses classified by blocks...) *)
-        let tophyp = if tophyp=None then first_name_buggy hyprec else tophyp in
+        let newtophyp =
+	  if tophyp=no_move then first_name_buggy avoid gl hyprec else tophyp
+	in
         tclTHENLIST
-	  [ intros_patterns avoid [] destopt [recpat];
-	    intros_patterns avoid [] None [hyprec];
-	    peel_tac ra' names tophyp] gl
+	  [ intros_patterns true avoid [] (update destopt tophyp) [recpat];
+	    intros_patterns true avoid [] no_move [hyprec];
+	    peel_tac ra' names newtophyp] gl
     | (IndArg,hyprecname) :: ra' ->
 	(* Rem: does not happen in Coq schemes, only in user-defined schemes *)
         let pat,names = consume_pattern avoid hyprecname gl names in
-	tclTHEN (intros_patterns avoid [] destopt [pat])
+	tclTHEN (intros_patterns true avoid [] (update destopt tophyp) [pat])
           (peel_tac ra' names tophyp) gl
     | (RecArg,recvarname) :: ra' ->
         let pat,names = consume_pattern avoid recvarname gl names in
-	tclTHEN (intros_patterns avoid [] destopt [pat]) 
+	tclTHEN (intros_patterns true avoid [] (update destopt tophyp) [pat]) 
           (peel_tac ra' names tophyp) gl
     | (OtherArg,_) :: ra' ->
         let pat,names = match names with
-          | [] -> IntroAnonymous, []
+          | [] -> (dloc, IntroAnonymous), []
           | pat::names -> pat,names in
-	tclTHEN (intros_patterns avoid [] destopt [pat])
+	tclTHEN (intros_patterns true avoid [] (update destopt tophyp) [pat])
           (peel_tac ra' names tophyp) gl
     | [] ->
         check_unused_names names;
         re_intro_dependent_hypotheses tophyp statuslists gl
   in
-  peel_tac ra names None gl
+  peel_tac ra names no_move gl
 
 (* - le recalcul de indtyp à chaque itération de atomize_one est pour ne pas
      s'embêter à regarder si un letin_tac ne fait pas des
@@ -1572,7 +1647,7 @@ let find_atomic_param_of_ind nparams indtyp =
   Idset.elements !indvars;
   
 
-   (* [cook_sign] builds the lists [indhyps] of hyps that must be
+(* [cook_sign] builds the lists [indhyps] of hyps that must be
    erased, the lists of hyps to be generalize [(hdeps,tdeps)] on the
    goal together with the places [(lstatus,rstatus)] where to re-intro
    them after induction. To know where to re-intro the dep hyp, we
@@ -1583,7 +1658,7 @@ let find_atomic_param_of_ind nparams indtyp =
    more ancient (on the right) to more recent hyp (on the left) but
    the computation of [lhyp] progresses from the other way, [cook_hyp]
    is in two passes (an alternative would have been to write an
-   higher-order algorithm). We strongly use references to reduce
+   higher-order algorithm). We use references to reduce
    the accumulation of arguments.
 
    To summarize, the situation looks like this
@@ -1635,7 +1710,7 @@ let find_atomic_param_of_ind nparams indtyp =
 
 *)
 
-exception Shunt of identifier option
+exception Shunt of identifier move_location
 
 let cook_sign hyp0_opt indvars_init env =
   let hyp0,indvars = 
@@ -1657,7 +1732,7 @@ let cook_sign hyp0_opt indvars_init env =
       (* If there was no main induction hypotheses, then hyp is one of
          indvars too, so add it to indhyps. *)
       (if hyp0_opt=None then indhyps := hyp::!indhyps); 
-      None (* fake value *)
+      MoveToEnd false (* fake value *)
     end else if List.mem hyp indvars then begin
       (* warning: hyp can still occur after induction *)
       (* e.g. if the goal (t hyp hyp0) with other occs of hyp in t *)
@@ -1673,11 +1748,11 @@ let cook_sign hyp0_opt indvars_init env =
 	  rstatus := (hyp,rhyp)::!rstatus
 	else 
 	  ldeps := hyp::!ldeps; (* status computed in 2nd phase *)
-	Some hyp end
+	MoveBefore hyp end
       else
-	Some hyp
+	MoveBefore hyp
   in
-  let _ = fold_named_context seek_deps env ~init:None in
+  let _ = fold_named_context seek_deps env ~init:(MoveToEnd false) in
   (* 2nd phase from R to L: get left hyp of [hyp0] and [lhyps] *)
   let compute_lstatus lhyp (hyp,_,_) =
     if hyp = hyp0 then raise (Shunt lhyp);
@@ -1685,15 +1760,16 @@ let cook_sign hyp0_opt indvars_init env =
       lstatus := (hyp,lhyp)::!lstatus;
       lhyp
     end else
-      if List.mem hyp !indhyps then lhyp else (Some hyp) 
+      if List.mem hyp !indhyps then lhyp else MoveAfter hyp
   in
   try 
-    let _ = fold_named_context_reverse compute_lstatus ~init:None env in
-(*     anomaly "hyp0 not found" *)
-    raise (Shunt (None)) (* ?? FIXME *)
+    let _ = 
+      fold_named_context_reverse compute_lstatus ~init:(MoveToEnd true) env in
+    raise (Shunt (MoveToEnd true)) (* ?? FIXME *)
   with Shunt lhyp0 ->
     let statuslists = (!lstatus,List.rev !rstatus) in
-    (statuslists, (if hyp0_opt=None then None else lhyp0) , !indhyps, !decldeps)
+    (statuslists, (if hyp0_opt=None then MoveToEnd true else lhyp0),
+     !indhyps, !decldeps)
 
 
 (*
@@ -1764,7 +1840,7 @@ let empty_scheme =
    hypothesis on which the induction is made *)
 let induction_tac with_evars (varname,lbind) typ scheme gl =
   let elimc,lbindelimc = 
-    match scheme.elimc with | Some x -> x | None -> error "No definition of the principle" in
+    match scheme.elimc with | Some x -> x | None -> error "No definition of the principle." in
   let elimt = scheme.elimt in
   let indclause = make_clenv_binding gl (mkVar varname,typ) lbind  in
   let elimclause =
@@ -1779,9 +1855,9 @@ let make_base n id =
     (* digits *)
     id_of_string (atompart_of_id (make_ident (string_of_id id) (Some 0)))
 
-(* Builds tw different names from an optional inductive type and a
+(* Builds two different names from an optional inductive type and a
    number, also deals with a list of names to avoid. If the inductive
-   type is None, then hyprecname is HIi where i is a number. *)
+   type is None, then hyprecname is IHi where i is a number. *)
 let make_up_names n ind_opt cname = 
   let is_hyp = atompart_of_id cname = "H" in
   let base = string_of_id (make_base n cname) in
@@ -1825,7 +1901,7 @@ let chop_context n l =
 
 let error_ind_scheme s =
   let s = if s <> "" then s^" " else s in
-  error ("Cannot recognise "^s^"an induction schema")
+  error ("Cannot recognize "^s^"an induction scheme.")
 
 let mkEq t x y = 
   mkApp (build_coq_eq (), [| t; x; y |])
@@ -1950,29 +2026,23 @@ let abstract_args gl id =
 	       dep, succ (List.length ctx), vars)
     | _ -> None
 
-let abstract_generalize id gl =
+let abstract_generalize id ?(generalize_vars=true) gl =
   Coqlib.check_required_library ["Coq";"Logic";"JMeq"];
-(*   let qualid = (dummy_loc, qualid_of_dirpath (dirpath_of_string "Coq.Logic.JMeq")) in *)
-(*   Library.require_library [qualid] None; *)
   let oldid = pf_get_new_id id gl in
   let newc = abstract_args gl id in
     match newc with
       | None -> tclIDTAC gl
       | Some (newc, dep, n, vars) -> 
-	  if dep then
-	    tclTHENLIST [refine newc;
-			 rename_hyp [(id, oldid)];
-			 tclDO n intro; 
-			 generalize_dep (mkVar oldid);
-			 tclMAP (fun id -> tclTRY (generalize_dep (mkVar id))) vars]
-	      gl
-	  else
-	    tclTHENLIST [refine newc;
-			 clear [id];
-			 tclDO n intro; 
-			 tclMAP (fun id -> tclTRY (generalize_dep (mkVar id))) vars]
-	      gl
-
+	  let tac =
+	    if dep then
+	      tclTHENLIST [refine newc; rename_hyp [(id, oldid)]; tclDO n intro; 
+			   generalize_dep (mkVar oldid)]	      
+	    else
+	      tclTHENLIST [refine newc; clear [id]; tclDO n intro]
+	  in 
+	    if generalize_vars then
+	      tclTHEN tac (tclMAP (fun id -> tclTRY (generalize_dep (mkVar id))) vars) gl
+	    else tac gl
 
 let occur_rel n c = 
   let res = not (noccurn n c) in
@@ -2016,11 +2086,11 @@ let cut_list n l =
   res
 
 
-(* This functions splits the products of the induction scheme [elimt] in three
+(* This function splits the products of the induction scheme [elimt] into four
    parts: 
-    - branches, easily detectable (they are not referred by rels in the subterm)
-    - what was found before branches (acc1) that is: parameters and predicates
-    - what was found after branches (acc3) that is: args and indarg if any
+   - branches, easily detectable (they are not referred by rels in the subterm)
+   - what was found before branches (acc1) that is: parameters and predicates
+   - what was found after branches (acc3) that is: args and indarg if any
    if there is no branch, we try to fill in acc3 with args/indargs.
    We also return the conclusion.
 *)
@@ -2033,13 +2103,13 @@ let decompose_paramspred_branch_args elimt =
 	  then cut_noccur elimt' ((nme,None,tpe)::acc2)
 	  else let acc3,ccl = decompose_prod_assum elimt in acc2 , acc3 , ccl
       | App(_, _) | Rel _ -> acc2 , [] , elimt
-      | _ -> error "cannot recognise an induction schema" in
+      | _ -> error_ind_scheme "" in
   let rec cut_occur elimt acc1 : rel_context * rel_context * rel_context * types =
     match kind_of_term elimt with
       | Prod(nme,tpe,c) when occur_rel 1 c -> cut_occur c ((nme,None,tpe)::acc1)
       | Prod(nme,tpe,c) -> let acc2,acc3,ccl = cut_noccur elimt [] in acc1,acc2,acc3,ccl
       | App(_, _) | Rel _ -> acc1,[],[],elimt
-      | _ -> error "cannot recognise an induction schema" in
+      | _ -> error_ind_scheme "" in
   let acc1, acc2 , acc3, ccl = cut_occur elimt [] in
   (* Particular treatment when dealing with a dependent empty type elim scheme:
      if there is no branch, then acc1 contains all hyps which is wrong (acc1
@@ -2053,8 +2123,7 @@ let decompose_paramspred_branch_args elimt =
     let hd_ccl_pred,_ = decompose_app ccl in
     match kind_of_term hd_ccl_pred with
       | Rel i  -> let acc3,acc1 = cut_list (i-1) hyps in acc1 , [] , acc3 , ccl
-      | _ -> error "cannot recognize an induction schema"
-
+      | _ -> error_ind_scheme ""
 
 
 let exchange_hd_app subst_hd t =
@@ -2064,7 +2133,7 @@ let exchange_hd_app subst_hd t =
 
 (* [rebuild_elimtype_from_scheme scheme] rebuilds the type of an
    eliminator from its [scheme_info]. The idea is to build variants of
-   eliminator by modifying there scheme_info, then rebuild the
+   eliminator by modifying their scheme_info, then rebuild the
    eliminator type, then prove it (with tactics). *)
 let rebuild_elimtype_from_scheme (scheme:elim_scheme): types =
   let hiconcl = 
@@ -2081,7 +2150,7 @@ let rebuild_elimtype_from_scheme (scheme:elim_scheme): types =
 exception NoLastArg
 exception NoLastArgCcl
 
-(* Builds an elim_scheme frome its type and calling form (const+binding) We
+(* Builds an elim_scheme from its type and calling form (const+binding). We
    first separate branches.  We obtain branches, hyps before (params + preds),
    hyps after (args <+ indarg if present>) and conclusion.  Then we proceed as
    follows:
@@ -2131,7 +2200,7 @@ let compute_elim_sig ?elimc elimt =
     (* 3- Look at last arg: is it the indarg? *)
     ignore (
       match List.hd args_indargs with
-	| hiname,Some _,hi -> error "cannot recognize an induction schema"
+	| hiname,Some _,hi -> error_ind_scheme ""
 	| hiname,None,hi -> 
 	    let hi_ind, hi_args = decompose_app hi in
 	    let hi_is_ind = (* hi est d'un type globalisable *)
@@ -2156,11 +2225,11 @@ let compute_elim_sig ?elimc elimt =
   with Exit -> (* Ending by computing indrev: *)
     match !res.indarg with
       | None -> !res (* No indref *)
-      | Some ( _,Some _,_) -> error "Cannot recognise an induction scheme"
+      | Some ( _,Some _,_) -> error_ind_scheme ""
       | Some ( _,None,ind) -> 
 	  let indhd,indargs = decompose_app ind in
 	  try {!res with indref = Some (global_of_constr indhd) }
-	  with _ -> error "Cannot find the inductive type of the inductive schema";;
+	  with _ -> error "Cannot find the inductive type of the inductive scheme.";;
 
 (* Check that the elimination scheme has a form similar to the 
    elimination schemes built by Coq. Schemes may have the standard
@@ -2169,17 +2238,17 @@ let compute_elim_sig ?elimc elimt =
    extra final argument of the form (f x y ...) in the conclusion. In
    the non standard case, naming of generated hypos is slightly
    different. *)
-let compute_elim_signature elimc elimt names_info =
+let compute_elim_signature elimc elimt names_info ind_type_guess =
   let scheme = compute_elim_sig ~elimc:elimc elimt in
   let f,l = decompose_app scheme.concl in
   (* Vérifier que les arguments de Qi sont bien les xi. *)
   match scheme.indarg with
-    | Some (_,Some _,_) -> error "strange letin, cannot recognize an induction schema"
+    | Some (_,Some _,_) -> error "Strange letin, cannot recognize an induction scheme."
     | None -> (* Non standard scheme *)
-	let npred = List.length scheme.predicates in 
 	let is_pred n c = 
 	  let hd = fst (decompose_app c) in match kind_of_term hd with
-	    | Rel q when n < q & q <= n+npred -> IndArg
+	    | Rel q when n < q & q <= n+scheme.npredicates -> IndArg
+	    | _ when hd = ind_type_guess & not scheme.farg_in_concl -> RecArg
 	    | _ -> OtherArg in 
 	let rec check_branch p c = 
 	  match kind_of_term c with
@@ -2208,10 +2277,9 @@ let compute_elim_signature elimc elimt names_info =
 	
     | Some ( _,None,ind) -> (* Standard scheme from an inductive type *)
 	let indhd,indargs = decompose_app ind in
-	let npred = List.length scheme.predicates in
 	let is_pred n c = 
 	  let hd = fst (decompose_app c) in match kind_of_term hd with
-	    | Rel q when n < q & q <= n+npred -> IndArg
+	    | Rel q when n < q & q <= n+scheme.npredicates -> IndArg
 	    | _ when hd = indhd -> RecArg
 	    | _ -> OtherArg in
 	let rec check_branch p c = match kind_of_term c with
@@ -2242,7 +2310,7 @@ let compute_elim_signature elimc elimt names_info =
 		  list_lastn scheme.nargs indargs 
 		  = extended_rel_list 0 scheme.args in
 		if not (ccl_arg_ok & ind_is_ok) then
-		  error "Cannot recognize the conclusion of an induction schema";
+		  error_ind_scheme "the conclusion of";
 		[] 
 	in
 	let indsign = Array.of_list (find_branches 0 (List.rev scheme.branches)) in
@@ -2251,7 +2319,7 @@ let compute_elim_signature elimc elimt names_info =
 
 let find_elim_signature isrec elim hyp0 gl =
   let tmptyp0 =	pf_get_hyp_typ gl hyp0 in
-  let (elimc,elimt) = match elim with
+  let (elimc,elimt),ind = match elim with
     | None ->
 	let mind,_ = pf_reduce_to_quantified_ind gl tmptyp0 in
 	let s = elimination_sort_of_goal gl in
@@ -2259,21 +2327,15 @@ let find_elim_signature isrec elim hyp0 gl =
 	  if isrec then lookup_eliminator mind s
 	  else pf_apply make_case_gen gl mind s in
 	let elimt = pf_type_of gl elimc in
-	((elimc, NoBindings), elimt)
-    | Some (elimc,lbind as e) -> 
-	(e, pf_type_of gl elimc) in
-  let indsign,elim_scheme = compute_elim_signature elimc elimt hyp0 in
+	((elimc, NoBindings), elimt), mkInd mind
+    | Some (elimc,lbind as e) ->
+	let ind_type_guess,_ = decompose_app (snd (decompose_prod tmptyp0)) in
+	(e, pf_type_of gl elimc), ind_type_guess in
+  let indsign,elim_scheme =
+    compute_elim_signature elimc elimt hyp0 ind in
   (indsign,elim_scheme)
 
 
-let mapi f l =
-  let rec mapi_aux f i l =   
-    match l with
-      | [] -> []
-      | e::l' -> f e i :: mapi_aux f (i+1) l' in
-  mapi_aux f 0 l
-
-
 (* Instantiate all meta variables of elimclause using lid, some elts
    of lid are parameters (first ones), the other are
    arguments. Returns the clause obtained.  *)
@@ -2285,19 +2347,20 @@ let recolle_clenv scheme lid elimclause gl =
 	match kind_of_term x with
 	  | Meta mv -> mv
 	  | _  -> errorlabstrm "elimination_clause"
-              (str "The type of elimination clause is not well-formed"))
+              (str "The type of the elimination clause is not well-formed."))
       arr in
   let nmv = Array.length lindmv in
   let lidparams,lidargs = cut_list (scheme.nparams) lid in
   let nidargs = List.length lidargs in
   (* parameters correspond to first elts of lid. *)
   let clauses_params = 
-    mapi (fun id i -> mkVar id , pf_get_hyp_typ gl id , lindmv.(i)) lidparams in
+    list_map_i (fun i id -> mkVar id , pf_get_hyp_typ gl id , lindmv.(i))
+      0 lidparams in
   (* arguments correspond to last elts of lid. *)
   let clauses_args = 
-    mapi 
-      (fun id i -> mkVar id , pf_get_hyp_typ gl id , lindmv.(nmv-nidargs+i))
-      lidargs in
+    list_map_i 
+      (fun i id -> mkVar id , pf_get_hyp_typ gl id , lindmv.(nmv-nidargs+i))
+      0 lidargs in
   let clause_indarg = 
     match scheme.indarg with
       | None -> []
@@ -2321,10 +2384,10 @@ let recolle_clenv scheme lid elimclause gl =
    (elimc ?i ?j ?k...?l). This solves partly meta variables (and may
     produce new ones). Then refine with the resulting term with holes.
 *)
-let induction_tac_felim with_evars indvars (* (elimc,lbindelimc) elimt *) scheme gl = 
+let induction_tac_felim with_evars indvars scheme gl = 
   let elimt = scheme.elimt in
   let elimc,lbindelimc = 
-    match scheme.elimc with | Some x -> x | None -> error "No definition of the principle" in
+    match scheme.elimc with | Some x -> x | None -> error "No definition of the principle." in
   (* elimclause contains this: (elimc ?i ?j ?k...?l) *)
   let elimclause =
     make_clenv_binding gl (mkCast (elimc,DEFAULTcast, elimt),elimt) lbindelimc in
@@ -2334,6 +2397,29 @@ let induction_tac_felim with_evars indvars (* (elimc,lbindelimc) elimt *) scheme
   let resolved = clenv_unique_resolver true elimclause' gl in
   clenv_refine with_evars resolved gl
 
+let apply_induction_in_context isrec hyp0 indsign indvars names induct_tac gl =
+  let env = pf_env gl in
+  let statlists,lhyp0,indhyps,deps = cook_sign hyp0 indvars env in
+  let tmpcl = it_mkNamedProd_or_LetIn (pf_concl gl) deps in
+  let names = compute_induction_names (Array.length indsign) names in
+  let dephyps = List.map (fun (id,_,_) -> id) deps in
+  let deps_cstr =
+    List.fold_left
+      (fun a (id,b,_) -> if b = None then (mkVar id)::a else a) [] deps in
+  tclTHENLIST
+    [ 
+      (* Generalize dependent hyps (but not args) *)
+      if deps = [] then tclIDTAC else apply_type tmpcl deps_cstr;
+      (* clear dependent hyps *)
+      thin dephyps;
+      (* side-conditions in elim (resp case) schemes come last (resp first) *)
+      (if isrec then tclTHENFIRSTn else tclTHENLASTn)
+        (tclTHEN induct_tac (tclTRY (thin (List.rev indhyps))))
+	(array_map2 
+	  (induct_discharge statlists lhyp0 (List.rev dephyps)) indsign names)
+    ]
+    gl
+
 (* Induction with several induction arguments, main differences with
    induction_from_context is that there is no main induction argument,
    so we chose one to be the positioning reference. On the other hand,
@@ -2348,8 +2434,7 @@ let induction_from_context_l isrec with_evars elim_info lid names gl =
     + (if scheme.indarg <> None then 1 else 0) in
   (* Number of given induction args must be exact. *)
   if List.length lid <> nargs_indarg_farg + scheme.nparams then 
-      error "not the right number of arguments given to induction scheme";  
-  let env = pf_env gl in
+      error "Not the right number of arguments given to induction scheme.";
   (* hyp0 is used for re-introducing hyps at the right place afterward.
      We chose the first element of the list of variables on which to
      induct. It is probably the first of them appearing in the
@@ -2361,12 +2446,6 @@ let induction_from_context_l isrec with_evars elim_info lid names gl =
 	  let nargs_without_first = nargs_indarg_farg - 1 in
 	  let ivs,lp = cut_list nargs_without_first l in
 	  e, ivs, lp in
-  let statlists,lhyp0,indhyps,deps = cook_sign None (hyp0::indvars) env in
-  let tmpcl = it_mkNamedProd_or_LetIn (pf_concl gl) deps in
-  let names = compute_induction_names (Array.length indsign) names in
-  let dephyps = List.map (fun (id,_,_) -> id) deps in
-  let deps_cstr =
-    List.fold_left (fun a (id,b,_) -> if b = None then (mkVar id)::a else a) [] deps in
   (* terms to patternify we must patternify indarg or farg if present in concl *)
   let lid_in_pattern = 
     if scheme.indarg <> None & not scheme.indarg_in_concl then List.rev indvars
@@ -2375,68 +2454,32 @@ let induction_from_context_l isrec with_evars elim_info lid names gl =
   let realindvars = (* hyp0 is a real induction arg if it is not the
 		       farg in the conclusion of the induction scheme *)
     List.rev ((if scheme.farg_in_concl then indvars else hyp0::indvars) @ lid_params) in
-  (* Magistral effet de bord: comme dans induction_from_context. *)
-  tclTHENLIST
-    [ 
-      (* Generalize dependent hyps (but not args) *)
-      if deps = [] then tclIDTAC else apply_type tmpcl deps_cstr;
-      thin dephyps; (* clear dependent hyps *)
-      (* pattern to make the predicate appear. *)
-      reduce (Pattern (List.map inj_with_occurrences lidcstr)) onConcl;
-      (* FIXME: Tester ca avec un principe dependant et non-dependant *)
-      (if isrec then tclTHENFIRSTn else tclTHENLASTn)
-       	(tclTHENLIST [ 
-	  (* Induction by "refine (indscheme ?i ?j ?k...)" + resolution of all
-	     possible holes using arguments given by the user (but the
-	     functional one). *)
-	  induction_tac_felim with_evars realindvars scheme;
-          tclTRY (thin (List.rev (indhyps)));
-	])
-	(array_map2 
-	  (induct_discharge statlists lhyp0 (List.rev dephyps)) indsign names)
-    ]
-    gl
-
-
+  let induct_tac = tclTHENLIST [
+    (* pattern to make the predicate appear. *)
+    reduce (Pattern (List.map inj_with_occurrences lidcstr)) onConcl;
+    (* Induction by "refine (indscheme ?i ?j ?k...)" + resolution of all
+       possible holes using arguments given by the user (but the
+       functional one). *)
+    (* FIXME: Tester ca avec un principe dependant et non-dependant *)
+    induction_tac_felim with_evars realindvars scheme
+  ] in
+  apply_induction_in_context isrec
+    None indsign (hyp0::indvars) names induct_tac gl
 
 let induction_from_context isrec with_evars elim_info (hyp0,lbind) names gl =
   let indsign,scheme = elim_info in
   let indref = match scheme.indref with | None -> assert false | Some x -> x in
   let tmptyp0 =	pf_get_hyp_typ gl hyp0 in
   let typ0 = pf_apply reduce_to_quantified_ref gl indref tmptyp0 in
-
-  let env = pf_env gl in
-  let indvars = find_atomic_param_of_ind scheme.nparams (snd (decompose_prod typ0)) in
-  (* induction_from_context_l isrec elim_info (hyp0::List.rev indvars) names gl  *)
-  let statlists,lhyp0,indhyps,deps = cook_sign (Some hyp0) indvars env in
-  let tmpcl = it_mkNamedProd_or_LetIn (pf_concl gl) deps in
-  let names = compute_induction_names (Array.length indsign) names in
-  let dephyps = List.map (fun (id,_,_) -> id) deps in
-  let deps_cstr =
-    List.fold_left
-      (fun a (id,b,_) -> if b = None then (mkVar id)::a else a) [] deps in
-
-  (* Magistral effet de bord: si hyp0 a des arguments, ceux d'entre
-     eux qui ouvrent de nouveaux buts arrivent en premier dans la
-     liste des sous-buts du fait qu'ils sont le plus à gauche dans le
-     combinateur engendré par make_case_gen (un "Cases (hyp0 ?) of
-     ...")  et il faut alors appliquer tclTHENLASTn; en revanche,
-     comme lookup_eliminator renvoie un combinateur de la forme
-     "ind_rec ... (hyp0 ?)", les buts correspondant à des arguments de
-     hyp0 sont maintenant à la fin et c'est tclTHENFIRSTn qui marche !!! *)
-  tclTHENLIST
-    [ if deps = [] then tclIDTAC else apply_type tmpcl deps_cstr;
-      thin dephyps;
-      (if isrec then tclTHENFIRSTn else tclTHENLASTn)
-       	(tclTHENLIST
-	  [ induction_tac with_evars (hyp0,lbind) typ0 scheme;
-	    tclTHEN (tclTRY (unfold_body hyp0)) (thin [hyp0]);
-            tclTRY (thin indhyps) ])
-       	(array_map2
-	   (induct_discharge statlists lhyp0 (List.rev dephyps)) indsign names)
-    ]
-    gl
-
+  let indvars =
+    find_atomic_param_of_ind scheme.nparams (snd (decompose_prod typ0)) in
+  let induct_tac = tclTHENLIST [
+    induction_tac with_evars (hyp0,lbind) typ0 scheme;
+    tclTRY (unfold_body hyp0);
+    thin [hyp0]
+  ] in
+  apply_induction_in_context isrec
+    (Some hyp0) indsign indvars names induct_tac gl
 
 
 exception TryNewInduct of exn
@@ -2466,20 +2509,25 @@ let induction_without_atomization isrec with_evars elim names lid gl =
   in
   let nlid = List.length lid in
   if nlid <> awaited_nargs
-  then error "Not the right number of induction arguments"
+  then error "Not the right number of induction arguments."
   else induction_from_context_l isrec with_evars elim_info lid names gl
 
-let new_induct_gen isrec with_evars elim names (c,lbind) cls gl =
+let new_induct_gen isrec with_evars elim (eqname,names) (c,lbind) cls gl =
   match kind_of_term c with
     | Var id when not (mem_named_context id (Global.named_context()))
-	        & lbind = NoBindings & not with_evars & cls = None ->
+	        & lbind = NoBindings & not with_evars & cls = None
+	        & eqname = None ->
 	induction_with_atomization_of_ind_arg
 	  isrec with_evars elim names (id,lbind) gl
     | _        ->
 	let x = id_of_name_using_hdchar (Global.env()) (pf_type_of gl c) 
 		  Anonymous in
 	let id = fresh_id [] x gl in
-	let with_eq = if cls <> None then Some (not (isVar c)) else None in
+	let with_eq = 
+	  match eqname with
+	  | Some eq -> Some (false,eq)
+	  | _ ->
+	    if cls <> None then Some (false,(dloc,IntroAnonymous)) else None in
 	tclTHEN
 	  (letin_tac with_eq (Name id) c (Option.default allClauses cls))
 	  (induction_with_atomization_of_ind_arg
@@ -2490,7 +2538,10 @@ let new_induct_gen isrec with_evars elim names (c,lbind) cls gl =
    that all arguments and parameters of the scheme are given
    (mandatory for the moment), so we don't need to deal with
     parameters of the inductive type as in new_induct_gen. *)
-let new_induct_gen_l isrec with_evars elim names lc gl =
+let new_induct_gen_l isrec with_evars elim (eqname,names) lc gl =
+  if eqname <> None then
+    errorlabstrm "" (str "Do not know what to do with " ++
+      pr_intro_pattern (Option.get eqname));
   let newlc = ref [] in
   let letids = ref [] in
   let rec atomize_list l gl =
@@ -2532,18 +2583,18 @@ let induct_destruct_l isrec with_evars lc elim names cls =
   let _ = 
     if elim = None
     then 
-      error ("Induction scheme must be given when several induction hypothesis.\n"
-      ^ "Example: induction x1 x2 x3 using my_scheme.") in
+      errorlabstrm "" (strbrk "Induction scheme must be given when several induction hypothesis are given.\n" ++ 
+      str "Example: induction x1 x2 x3 using my_scheme.") in
   let newlc = 
     List.map
       (fun x -> 
 	match x with (* FIXME: should we deal with ElimOnIdent? *)
 	  | ElimOnConstr (x,NoBindings) -> x
-	  | _ -> error "don't know where to find some argument")
+	  | _ -> error "Don't know where to find some argument.")
       lc in
   if cls <> None then
     error
-      "'in' clause not supported when several induction hypothesis are given";
+      "'in' clause not supported when several induction hypothesis are given.";
   new_induct_gen_l isrec with_evars elim names newlc
 
 (* Induction either over a term, over a quantified premisse, or over
@@ -2551,7 +2602,7 @@ let induct_destruct_l isrec with_evars lc elim names cls =
    principles). 
    TODO: really unify induction with one and induction with several
    args *)
-let induct_destruct isrec with_evars lc elim names cls =
+let induct_destruct isrec with_evars (lc,elim,names,cls) =
   assert (List.length lc > 0); (* ensured by syntax, but if called inside caml? *)
   if List.length lc = 1 then (* induction on one arg: use old mechanism *)
     try
@@ -2565,11 +2616,16 @@ let induct_destruct isrec with_evars lc elim names cls =
 	   with _  -> raise x)
   else induct_destruct_l isrec with_evars lc elim names cls
 
+let induction_destruct isrec with_evars = function
+  | [] -> tclIDTAC
+  | [a] -> induct_destruct isrec with_evars a
+  | a::l ->
+      tclTHEN
+        (induct_destruct isrec with_evars a)
+        (tclMAP (induct_destruct false with_evars) l)
 
-      
-
-let new_induct = induct_destruct true
-let new_destruct = induct_destruct false
+let new_induct ev lc e idl cls = induct_destruct true ev (lc,e,idl,cls)
+let new_destruct ev lc e idl cls = induct_destruct false ev (lc,e,idl,cls)
 
 (* The registered tactic, which calls the default elimination
  * if no elimination constant is provided. *)
@@ -2858,7 +2914,7 @@ let abstract_subproof name tac gl =
   let na = next_global_ident_away false name (pf_ids_of_hyps gl) in
   let concl = it_mkNamedProd_or_LetIn (pf_concl gl) sign in
     if occur_existential concl then
-      error "\"abstract\" cannot handle existentials";
+      error "\"abstract\" cannot handle existentials.";
     let lemme =
       start_proof na (Global, Proof Lemma) secsign concl (fun _ _ -> ());
       let _,(const,kind,_) =
@@ -2901,7 +2957,7 @@ let admit_as_an_axiom gl =
   let name = add_suffix (get_current_proof_name ()) "_admitted" in
   let na = next_global_ident_away false name (pf_ids_of_hyps gl) in
   let concl = it_mkNamedProd_or_LetIn (pf_concl gl) sign in
-  if occur_existential concl then error "\"admit\" cannot handle existentials";
+  if occur_existential concl then error"\"admit\" cannot handle existentials.";
   let axiom =
     let cd = Entries.ParameterEntry (concl,false) in
     let con = Declare.declare_internal_constant na (cd,IsAssumption Logical) in
@@ -2911,3 +2967,8 @@ let admit_as_an_axiom gl =
     (applist (axiom, 
               List.rev (Array.to_list (instance_from_named_context sign))))
     gl
+
+let conv x y gl =
+  try let evd = Evarconv.the_conv_x_leq (pf_env gl) x y (Evd.create_evar_defs (project gl)) in
+	tclEVARS (Evd.evars_of evd) gl
+  with _ -> tclFAIL 0 (str"Not convertible") gl
diff --git a/tactics/tactics.mli b/tactics/tactics.mli
index b7ab31c4..d39433d0 100644
--- a/tactics/tactics.mli
+++ b/tactics/tactics.mli
@@ -6,9 +6,10 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: tactics.mli 11166 2008-06-22 13:23:35Z herbelin $ i*)
+(*i $Id: tactics.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
+open Util
 open Names
 open Term
 open Environ
@@ -68,7 +69,8 @@ val find_intro_names : rel_context -> goal sigma -> identifier list
 val intro                : tactic
 val introf               : tactic
 val intro_force          : bool -> tactic
-val intro_move           : identifier option -> identifier option -> tactic
+val intro_move        : identifier option -> identifier move_location -> tactic
+
   (* [intro_avoiding idl] acts as intro but prevents the new identifier
      to belong to [idl] *)
 val intro_avoiding       : identifier list -> tactic
@@ -110,9 +112,10 @@ val onInductionArg :
 
 (*s Introduction tactics with eliminations. *)
 
-val intro_pattern     : identifier option -> intro_pattern_expr      -> tactic
-val intro_patterns    : intro_pattern_expr list -> tactic
-val intros_pattern    : identifier option -> intro_pattern_expr list -> tactic
+val intro_pattern  : identifier move_location -> intro_pattern_expr -> tactic
+val intro_patterns : intro_pattern_expr located list -> tactic
+val intros_pattern :
+  identifier move_location -> intro_pattern_expr located list -> tactic
 
 (*s Exact tactics. *)
 
@@ -167,7 +170,7 @@ val keep          : identifier list -> tactic
 
 val specialize    : int option -> constr with_ebindings -> tactic
 
-val move_hyp      : bool -> identifier -> identifier -> tactic
+val move_hyp      : bool -> identifier -> identifier move_location -> tactic
 val rename_hyp    : (identifier * identifier) list -> tactic
 
 val revert        : identifier list -> tactic
@@ -183,7 +186,7 @@ val apply_without_reduce  : constr      -> tactic
 val apply_list            : constr list -> tactic
 
 val apply_with_ebindings_gen : 
-  advanced_flag -> evars_flag -> constr with_ebindings -> tactic
+  advanced_flag -> evars_flag -> constr with_ebindings list -> tactic
 
 val apply_with_bindings   : constr with_bindings -> tactic
 val eapply_with_bindings  : constr with_bindings -> tactic
@@ -260,7 +263,9 @@ val elim :
 val simple_induct : quantified_hypothesis -> tactic
 
 val new_induct : evars_flag -> constr with_ebindings induction_arg list -> 
-  constr with_ebindings option -> intro_pattern_expr -> clause option -> tactic
+  constr with_ebindings option -> 
+  intro_pattern_expr located option * intro_pattern_expr located option ->
+  clause option -> tactic
 
 (*s Case analysis tactics. *)
 
@@ -269,7 +274,18 @@ val simplest_case         : constr -> tactic
 
 val simple_destruct          : quantified_hypothesis -> tactic
 val new_destruct : evars_flag -> constr with_ebindings induction_arg list -> 
-  constr with_ebindings option -> intro_pattern_expr -> clause option -> tactic
+  constr with_ebindings option -> 
+  intro_pattern_expr located option * intro_pattern_expr located option ->
+  clause option -> tactic
+
+(*s Generic case analysis / induction tactics. *)
+
+val induction_destruct : evars_flag -> rec_flag -> 
+  (constr with_ebindings induction_arg list *
+   constr with_ebindings option *
+   (intro_pattern_expr located option * intro_pattern_expr located option) *
+   clause option) list ->
+    tactic
 
 (*s Eliminations giving the type instead of the proof. *)
 
@@ -330,20 +346,24 @@ val cut_replacing               :
   identifier -> constr -> (tactic -> tactic) -> tactic
 val cut_in_parallel             : constr list -> tactic
 
-val assert_as : bool -> intro_pattern_expr -> constr -> tactic
-val forward   : tactic option -> intro_pattern_expr -> constr -> tactic
-val letin_tac : bool option -> name -> constr -> clause -> tactic
+val assert_as : bool -> intro_pattern_expr located -> constr -> tactic
+val forward   : tactic option -> intro_pattern_expr located -> constr -> tactic
+val letin_tac : (bool * intro_pattern_expr located) option -> name -> 
+  constr -> clause -> tactic
 val true_cut                    : name -> constr -> tactic
 val assert_tac                  : bool -> name -> constr -> tactic
 val generalize      : constr list -> tactic
 val generalize_gen  : ((occurrences * constr) * name) list -> tactic
 val generalize_dep  : constr  -> tactic
 
+val conv            : constr -> constr -> tactic
+val resolve_classes : tactic
+
 val tclABSTRACT : identifier option -> tactic -> tactic
 
 val admit_as_an_axiom : tactic
 
-val abstract_generalize : identifier -> tactic
+val abstract_generalize : identifier -> ?generalize_vars:bool -> tactic
 
 val register_general_multi_rewrite : 
   (bool -> evars_flag -> constr with_ebindings -> clause -> tactic) -> unit
diff --git a/tactics/tauto.ml4 b/tactics/tauto.ml4
index 54094d99..17ea121f 100644
--- a/tactics/tauto.ml4
+++ b/tactics/tauto.ml4
@@ -8,8 +8,9 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(*i $Id: tauto.ml4 10731 2008-03-30 22:30:44Z herbelin $ i*)
+(*i $Id: tauto.ml4 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
+open Term
 open Hipattern
 open Names
 open Libnames
@@ -36,16 +37,35 @@ let is_unit ist =
     <:tactic<idtac>>
   else
     <:tactic<fail>>
-    
+
+let is_record t =
+  let (hdapp,args) = decompose_app t in
+    match (kind_of_term hdapp) with
+      | Ind ind  -> 
+          let (mib,mip) = Global.lookup_inductive ind in
+	    mib.Declarations.mind_record
+      | _ -> false
+
+let is_binary t =
+  let (hdapp,args) = decompose_app t in
+    match (kind_of_term hdapp) with
+    | Ind ind  -> 
+        let (mib,mip) = Global.lookup_inductive ind in
+	  mib.Declarations.mind_nparams = 2
+    | _ -> false
+	
 let is_conj ist =
   let ind = assoc_last ist in
-    if (is_conjunction ind) && (is_nodep_ind ind) then
+    if (is_conjunction ind) && (is_nodep_ind ind) (* && not (is_record ind)  *)
+      && is_binary ind (* for compatibility, as (?X _ _) matches 
+			  applications with 2 or more arguments. *)
+    then
       <:tactic<idtac>>
     else
       <:tactic<fail>>
 
 let is_disj ist =
-  if is_disjunction (assoc_last ist) then
+  if is_disjunction (assoc_last ist) && is_binary (assoc_last ist) then
     <:tactic<idtac>>
   else
     <:tactic<fail>>
@@ -122,7 +142,7 @@ let rec tauto_intuit t_reduce solver ist =
   and t_simplif = tacticIn simplif
   and t_is_disj = tacticIn is_disj
   and t_tauto_intuit = tacticIn (tauto_intuit t_reduce solver) in
-  let t_solver = Tacexpr.TacArg (valueIn (VTactic (dummy_loc,solver))) in
+  let t_solver = globTacticIn (fun _ist -> solver) in
   <:tactic<
    ($t_simplif;$t_axioms
    || match reverse goal with
@@ -145,16 +165,14 @@ let rec tauto_intuit t_reduce solver ist =
     $t_solver
    ) >>
     
-let reduction_not_iff=interp
+let reduction_not_iff _ist =
  <:tactic<repeat 
   match goal with 
   | |- _     => progress unfold Coq.Init.Logic.not, Coq.Init.Logic.iff 
   | H:_ |- _ => progress unfold Coq.Init.Logic.not, Coq.Init.Logic.iff in H
   end >>
 
-
-let t_reduction_not_iff =
-  Tacexpr.TacArg (valueIn (VTactic (dummy_loc,reduction_not_iff)))
+let t_reduction_not_iff = tacticIn reduction_not_iff
 
 let intuition_gen tac =
   interp (tacticIn (tauto_intuit t_reduction_not_iff tac))
@@ -162,12 +180,12 @@ let intuition_gen tac =
 let simplif_gen = interp (tacticIn simplif)
 
 let tauto g =
-  try intuition_gen (interp <:tactic<fail>>) g
+  try intuition_gen <:tactic<fail>> g
   with
     Refiner.FailError _ | UserError _ ->
-      errorlabstrm "tauto" [< str "tauto failed" >]
+      errorlabstrm "tauto" (str "tauto failed.")
 
-let default_intuition_tac = interp <:tactic< auto with * >>
+let default_intuition_tac = <:tactic< auto with * >>
 
 TACTIC EXTEND tauto
 | [ "tauto" ] -> [ tauto ]
@@ -175,5 +193,5 @@ END
 
 TACTIC EXTEND intuition
 | [ "intuition" ] -> [ intuition_gen default_intuition_tac ]
-| [ "intuition" tactic(t) ] -> [ intuition_gen (snd t) ]
+| [ "intuition" tactic(t) ] -> [ intuition_gen (fst t) ]
 END
diff --git a/tactics/termdn.ml b/tactics/termdn.ml
index 65ad1dee..bd439fb4 100644
--- a/tactics/termdn.ml
+++ b/tactics/termdn.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: termdn.ml 7639 2005-12-02 10:01:15Z gregoire $ *)
+(* $Id: termdn.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Util
 open Names
@@ -41,43 +41,54 @@ let decomp_pat =
   decrec []   
 
 let constr_pat_discr t =
-  if not (occur_meta_pattern t) then 
+  if not (occur_meta_pattern t) then
     None
   else
     match decomp_pat t with
-      | PRef ((IndRef _) as ref), args
-      | PRef ((ConstructRef _ ) as ref), args
-      | PRef ((VarRef _) as ref), args -> Some(ref,args)
-      | _ -> None
-
-let constr_val_discr t =
-  let c, l = decomp t in
-  match kind_of_term c with
-    (* Const _,_) -> Some(TERM c,l) *)
-    | Ind ind_sp -> Some(IndRef ind_sp,l)
-    | Construct cstr_sp -> Some(ConstructRef cstr_sp,l)
-    | Var id -> Some(VarRef id,l)
+    | PRef ((IndRef _) as ref), args
+    | PRef ((ConstructRef _ ) as ref), args -> Some (ref,args)
+    | PRef ((VarRef v) as ref), args -> Some(ref,args)
     | _ -> None
 
-(* Les deux fonctions suivantes ecrasaient les precedentes, 
-   ajout d'un suffixe _nil CP 16/08 *) 
-
-let constr_pat_discr_nil t =
-  match constr_pat_discr t with
-    | None -> None
-    | Some (c,_) -> Some(c,[])
-
-let constr_val_discr_nil t =
-  match constr_val_discr t with
-    | None -> None
-    | Some (c,_) -> Some(c,[])
+let constr_pat_discr_st (idpred,cpred) t =
+  match decomp_pat t with
+  | PRef ((IndRef _) as ref), args
+  | PRef ((ConstructRef _ ) as ref), args -> Some (ref,args)
+  | PRef ((VarRef v) as ref), args when not (Idpred.mem v idpred) -> 
+      Some(ref,args)
+  | PVar v, args when not (Idpred.mem v idpred) ->
+      Some(VarRef v,args)
+  | PRef ((ConstRef c) as ref), args when not (Cpred.mem c cpred) ->
+      Some (ref, args)
+  | _ -> None
+
+open Dn
+
+let constr_val_discr t =  
+  let c, l = decomp t in
+    match kind_of_term c with
+    | Ind ind_sp -> Label(IndRef ind_sp,l)
+    | Construct cstr_sp -> Label((ConstructRef cstr_sp),l)
+    | Var id -> Label(VarRef id,l)
+    | Const _ -> Everything
+    | _ -> Nothing
+	
+let constr_val_discr_st (idpred,cpred) t =  
+  let c, l = decomp t in
+    match kind_of_term c with
+    | Const c -> if Cpred.mem c cpred then Everything else Label(ConstRef c,l)
+    | Ind ind_sp -> Label(IndRef ind_sp,l)
+    | Construct cstr_sp -> Label((ConstructRef cstr_sp),l)
+    | Var id when not (Idpred.mem id idpred) -> Label(VarRef id,l)
+    | Evar _ -> Everything
+    | _ -> Nothing
 
 let create = Dn.create 
 
-let add dn = Dn.add dn constr_pat_discr
-
-let rmv dn = Dn.rmv dn constr_pat_discr
+let add dn st = Dn.add dn (constr_pat_discr_st st)
 
-let lookup dn t = Dn.lookup dn constr_val_discr t
+let rmv dn st = Dn.rmv dn (constr_pat_discr_st st)
 
+let lookup dn st t = Dn.lookup dn (constr_val_discr_st st) t
+  
 let app f dn = Dn.app f dn
diff --git a/tactics/termdn.mli b/tactics/termdn.mli
index b65c0eeb..79efd8eb 100644
--- a/tactics/termdn.mli
+++ b/tactics/termdn.mli
@@ -6,12 +6,13 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: termdn.mli 6427 2004-12-07 17:41:10Z sacerdot $ i*)
+(*i $Id: termdn.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Term
 open Pattern
 open Libnames
+open Names
 (*i*)
   
 (* Discrimination nets of terms. *)
@@ -22,7 +23,10 @@ open Libnames
 order in such a way patterns having the same prefix have this common
 prefix shared and the seek for the action associated to the patterns
 that a term matches are found in time proportional to the maximal
-number of nodes of the patterns matching the term *)
+number of nodes of the patterns matching the term. The [transparent_state] 
+indicates which constants and variables can be considered as rigid.
+These dnets are able to cope with existential variables as well, which match
+[Everything]. *)
 
 type 'a t
 
@@ -30,13 +34,13 @@ val create : unit -> 'a t
 
 (* [add t (c,a)] adds to table [t] pattern [c] associated to action [act] *)
 
-val add : 'a t -> (constr_pattern * 'a) -> 'a t
+val add : 'a t -> transparent_state -> (constr_pattern * 'a) -> 'a t
 
-val rmv : 'a t -> (constr_pattern * 'a) -> 'a t
+val rmv : 'a t -> transparent_state -> (constr_pattern * 'a) -> 'a t
 
 (* [lookup t c] looks for patterns (with their action) matching term [c] *)
 
-val lookup : 'a t -> constr -> (constr_pattern * 'a) list
+val lookup : 'a t -> transparent_state -> constr -> (constr_pattern * 'a) list
 
 val app : ((constr_pattern * 'a) -> unit) -> 'a t -> unit
 
@@ -44,9 +48,12 @@ val app : ((constr_pattern * 'a) -> unit) -> 'a t -> unit
 (*i*)
 (* These are for Nbtermdn *)
 
-val constr_pat_discr : 
+val constr_pat_discr_st : transparent_state ->
   constr_pattern -> (global_reference * constr_pattern list) option
-val constr_val_discr :
-  constr -> (global_reference * constr list) option
+val constr_val_discr_st : transparent_state ->
+  constr -> (global_reference * constr list) Dn.lookup_res
+
+val constr_pat_discr : constr_pattern -> (global_reference * constr_pattern list) option
+val constr_val_discr : constr -> (global_reference * constr list) Dn.lookup_res
 
 (*i*)
diff --git a/test-suite/bugs/closed/shouldfail/1915.v b/test-suite/bugs/closed/shouldfail/1915.v
new file mode 100644
index 00000000..a96a482c
--- /dev/null
+++ b/test-suite/bugs/closed/shouldfail/1915.v
@@ -0,0 +1,6 @@
+
+Require Import Setoid.
+
+Goal forall x, impl True (x = 0) -> x = 0 -> False.
+intros x H E.
+rewrite H in E.
\ No newline at end of file
diff --git a/test-suite/bugs/closed/shouldsucceed/1784.v b/test-suite/bugs/closed/shouldsucceed/1784.v
index 616dd26f..5855b168 100644
--- a/test-suite/bugs/closed/shouldsucceed/1784.v
+++ b/test-suite/bugs/closed/shouldsucceed/1784.v
@@ -85,17 +85,17 @@ Program Fixpoint lt_dec (x y:sv) { struct x } : {slt x y}+{~slt x y} :=
       end
   end.
 
-Next Obligation. apply H; inversion H0; subst; trivial. Defined.
-Next Obligation. inversion H. Defined.
-Next Obligation. inversion H. Defined.
-Next Obligation. inversion H; subst. Defined.
+Next Obligation. intro H0. apply H; inversion H0; subst; trivial. Defined.
+Next Obligation. intro H; inversion H. Defined.
+Next Obligation. intro H; inversion H. Defined.
+Next Obligation. intro H; inversion H; subst. Defined.
 Next Obligation.
-  contradict H. inversion H1; subst. assumption. 
+  intro H1; contradict H. inversion H1; subst. assumption. 
   contradict H0; assumption. Defined.
 Next Obligation.
-  contradict H0. inversion H1; subst. assumption. Defined.
+  intro H1; contradict H0. inversion H1; subst. assumption. Defined.
 Next Obligation.
-  contradict H. inversion H0; subst. assumption. Defined.
+  intro H0; contradict H. inversion H0; subst. assumption. Defined.
 Next Obligation.
-  contradict H. inversion H0; subst; auto. Defined.
+  intro H0; contradict H. inversion H0; subst; auto. Defined.
 
diff --git a/test-suite/bugs/closed/shouldsucceed/1905.v b/test-suite/bugs/closed/shouldsucceed/1905.v
new file mode 100644
index 00000000..bd7fd796
--- /dev/null
+++ b/test-suite/bugs/closed/shouldsucceed/1905.v
@@ -0,0 +1,13 @@
+
+Require Import Setoid.
+
+Axiom t : Set.
+Axiom In : nat -> t -> Prop.
+Axiom InE : forall (x : nat) (s:t), impl (In x s) True.
+
+Goal forall a s, 
+ In a s -> False.
+Proof.
+ intros a s Ia.
+ rewrite InE in Ia.
+Admitted.
\ No newline at end of file
diff --git a/test-suite/bugs/opened/shouldnotfail/1671.v b/test-suite/bugs/opened/shouldnotfail/1671.v
new file mode 100644
index 00000000..800c431e
--- /dev/null
+++ b/test-suite/bugs/opened/shouldnotfail/1671.v
@@ -0,0 +1,12 @@
+(* Exemple soumis par Pierre Corbineau (bug #1671) *)
+
+CoInductive hdlist : unit -> Type :=
+| cons : hdlist tt -> hdlist tt.
+
+Variable P : forall bo, hdlist bo -> Prop.
+Variable all : forall bo l, P bo l.
+
+Definition F (l:hdlist tt) : P tt l := 
+match l in hdlist u return P u l with
+| cons (cons l') => all tt _
+end.
diff --git a/test-suite/check b/test-suite/check
index f2307d40..571e7a67 100755
--- a/test-suite/check
+++ b/test-suite/check
@@ -54,7 +54,7 @@ test_output() {
         tmpoutput=`mktemp /tmp/coqcheck.XXXXXX`
 	$command $f 2>&1 | grep -v "Welcome to Coq" | grep -v "Skipping rcfile loading" > $tmpoutput
         foutput=`dirname $f`/`basename $f .v`.out
-        diff $tmpoutput $foutput >& /dev/null
+        diff $tmpoutput $foutput > /dev/null 2>&1
 	if [ $? = 0 ]; then 
 	    echo "Ok"
 	    nbtestsok=`expr $nbtestsok + 1`
diff --git a/test-suite/complexity/ring2.v b/test-suite/complexity/ring2.v
index 9f9685dd..e1a799f0 100644
--- a/test-suite/complexity/ring2.v
+++ b/test-suite/complexity/ring2.v
@@ -1,7 +1,7 @@
 (* This example, checks the efficiency of the abstract machine used by ring *)
 (* Expected time < 1.00s *)
 
-Require Import BinInt.
+Require Import BinInt Zbool.
 
 Definition Zplus x y :=
 match x with
@@ -42,7 +42,7 @@ Ltac Zcst t :=
   end.
 
 Add Ring Zr : Zth
-  (decidable Zeqb_ok, constants [Zcst]).
+  (decidable Zeq_bool_eq, constants [Zcst]).
 
 Open Scope Z_scope.
 Infix "+" := Zplus : Z_scope.
diff --git a/test-suite/csdp.cache b/test-suite/csdp.cache
index 59ff450c..6620e52c 100644
--- a/test-suite/csdp.cache
+++ b/test-suite/csdp.cache
@@ -1,94198 +1,5 @@
 *** REQUEST ***
 ""
-3
-3
-4 1 1
-0.10485760000000000000e7 -0.52428800000000000000e6 0.52428800000000000000e6
-0 1 1 2 -0.52428800000000000000e6
-0 1 1 4 0.52428800000000000000e6
-0 1 2 2 -0.10485760000000000000e7
-0 1 4 4 0.10485760000000000000e7
-0 2 1 1 -0.10485760000000000000e7
-1 1 1 1 0.10485760000000000000e7
-1 1 1 2 0.52428800000000000000e6
-1 1 1 4 -0.52428800000000000000e6
-1 1 2 2 0.10485760000000000000e7
-1 1 4 4 -0.10485760000000000000e7
-1 2 1 1 0.10485760000000000000e7
-2 1 1 3 0.10485760000000000000e7
-2 1 1 4 -0.52428800000000000000e6
-2 1 4 4 -0.10485760000000000000e7
-3 1 1 2 -0.52428800000000000000e6
-3 1 1 4 0.52428800000000000000e6
-3 3 1 1 0.10485760000000000000e7
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-8
-4
-4 1 4 1
--0.52428800000000000000e6 0.10485760000000000000e7 -0.52428800000000000000e6 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.10485760000000000000e7
-0 1 1 2 -0.26214400000000000000e6
-0 1 1 4 0.26214400000000000000e6
-0 2 1 1 -0.52428800000000000000e6
-0 3 1 2 -0.26214400000000000000e6
-0 3 1 4 -0.26214400000000000000e6
-1 1 2 3 0.52428800000000000000e6
-1 1 3 4 -0.52428800000000000000e6
-1 3 1 4 -0.26214400000000000000e6
-1 3 4 4 -0.52428800000000000000e6
-2 1 1 1 0.52428800000000000000e6
-2 1 1 2 0.26214400000000000000e6
-2 1 1 4 -0.26214400000000000000e6
-2 2 1 1 0.52428800000000000000e6
-2 3 1 2 0.26214400000000000000e6
-2 3 1 4 0.26214400000000000000e6
-3 1 1 3 0.52428800000000000000e6
-3 1 1 4 -0.26214400000000000000e6
-3 1 4 4 -0.52428800000000000000e6
-4 1 2 2 0.52428800000000000000e6
-4 1 4 4 -0.52428800000000000000e6
-4 3 1 2 -0.26214400000000000000e6
-4 3 1 4 -0.26214400000000000000e6
-5 1 2 4 0.52428800000000000000e6
-5 1 4 4 -0.10485760000000000000e7
-5 3 1 4 -0.52428800000000000000e6
-6 1 1 2 -0.26214400000000000000e6
-6 1 1 4 0.26214400000000000000e6
-6 3 1 1 0.52428800000000000000e6
-7 1 2 3 -0.52428800000000000000e6
-7 1 3 4 0.52428800000000000000e6
-7 3 1 3 0.52428800000000000000e6
-8 1 1 2 0.26214400000000000000e6
-8 1 1 4 -0.26214400000000000000e6
-8 1 2 3 -0.52428800000000000000e6
-8 1 3 4 0.52428800000000000000e6
-8 3 1 2 0.26214400000000000000e6
-8 3 2 2 0.52428800000000000000e6
-8 4 1 1 0.52428800000000000000e6
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-51
-4
-10 4 4 1
-0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.0 -0.10485760000000000000e7 0.0 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.0 0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 -0.10485760000000000000e7 0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.10485760000000000000e7 0.0 0.10485760000000000000e7 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6
-0 1 1 2 -0.13107200000000000000e6
-0 1 1 4 0.26214400000000000000e6
-0 1 1 8 -0.13107200000000000000e6
-0 2 1 1 -0.26214400000000000000e6
-0 3 1 2 -0.13107200000000000000e6
-1 1 2 9 -0.26214400000000000000e6
-1 1 7 10 0.13107200000000000000e6
-1 1 10 10 0.26214400000000000000e6
-1 3 3 4 0.26214400000000000000e6
-2 1 2 9 0.13107200000000000000e6
-2 1 6 7 -0.26214400000000000000e6
-2 1 9 10 0.13107200000000000000e6
-2 3 3 4 -0.13107200000000000000e6
-3 1 2 9 -0.26214400000000000000e6
-3 1 7 8 0.13107200000000000000e6
-3 1 8 10 0.13107200000000000000e6
-4 1 2 9 0.26214400000000000000e6
-4 1 3 10 -0.13107200000000000000e6
-4 1 4 7 -0.26214400000000000000e6
-4 1 7 8 -0.13107200000000000000e6
-4 1 7 10 0.13107200000000000000e6
-4 2 4 4 -0.26214400000000000000e6
-4 3 3 4 -0.26214400000000000000e6
-5 1 1 6 -0.13107200000000000000e6
-5 1 3 6 -0.13107200000000000000e6
-5 1 4 5 -0.13107200000000000000e6
-5 1 6 7 0.13107200000000000000e6
-5 1 9 9 0.26214400000000000000e6
-5 2 3 3 -0.26214400000000000000e6
-6 1 2 9 0.13107200000000000000e6
-6 1 4 5 -0.26214400000000000000e6
-6 1 8 9 0.13107200000000000000e6
-7 1 1 6 -0.26214400000000000000e6
-7 1 2 9 0.13107200000000000000e6
-7 1 4 7 0.13107200000000000000e6
-7 3 3 4 -0.13107200000000000000e6
-8 1 1 8 -0.13107200000000000000e6
-8 1 2 5 -0.26214400000000000000e6
-8 1 2 9 0.26214400000000000000e6
-8 1 3 8 -0.13107200000000000000e6
-8 1 3 10 0.13107200000000000000e6
-8 2 2 4 -0.13107200000000000000e6
-9 1 1 4 0.26214400000000000000e6
-9 1 1 6 -0.52428800000000000000e6
-9 1 1 8 0.13107200000000000000e6
-9 1 2 5 0.26214400000000000000e6
-9 1 7 8 0.13107200000000000000e6
-9 2 1 3 0.26214400000000000000e6
-10 1 1 2 0.13107200000000000000e6
-10 1 1 6 -0.52428800000000000000e6
-10 1 1 8 0.13107200000000000000e6
-10 1 2 3 0.13107200000000000000e6
-10 1 2 5 0.26214400000000000000e6
-10 1 3 8 0.13107200000000000000e6
-10 1 3 10 -0.13107200000000000000e6
-10 1 4 7 0.26214400000000000000e6
-10 1 7 8 -0.13107200000000000000e6
-10 2 1 3 0.26214400000000000000e6
-10 2 2 4 0.13107200000000000000e6
-10 2 4 4 -0.26214400000000000000e6
-10 3 1 2 0.13107200000000000000e6
-10 3 3 4 -0.26214400000000000000e6
-10 4 1 1 0.26214400000000000000e6
-11 1 1 1 0.26214400000000000000e6
-11 1 1 2 0.13107200000000000000e6
-11 1 1 4 -0.26214400000000000000e6
-11 1 1 8 0.13107200000000000000e6
-11 2 1 1 0.26214400000000000000e6
-11 3 1 2 0.13107200000000000000e6
-12 1 1 3 0.26214400000000000000e6
-12 1 1 8 -0.26214400000000000000e6
-12 3 1 2 -0.26214400000000000000e6
-13 1 1 4 0.26214400000000000000e6
-13 1 1 5 0.26214400000000000000e6
-13 1 1 6 -0.52428800000000000000e6
-13 1 2 5 0.26214400000000000000e6
-13 2 1 3 0.26214400000000000000e6
-14 1 1 2 -0.26214400000000000000e6
-14 1 1 4 -0.52428800000000000000e6
-14 1 1 6 0.10485760000000000000e7
-14 1 1 7 0.26214400000000000000e6
-14 1 1 8 -0.26214400000000000000e6
-14 1 2 3 -0.26214400000000000000e6
-14 1 2 5 -0.52428800000000000000e6
-14 1 2 9 0.52428800000000000000e6
-14 1 3 8 -0.26214400000000000000e6
-14 1 4 7 -0.52428800000000000000e6
-14 2 1 3 -0.52428800000000000000e6
-14 2 2 4 -0.26214400000000000000e6
-14 3 1 2 -0.26214400000000000000e6
-14 4 1 1 -0.52428800000000000000e6
-15 1 1 9 0.26214400000000000000e6
-15 1 4 7 -0.26214400000000000000e6
-16 1 1 10 0.26214400000000000000e6
-16 1 2 9 -0.52428800000000000000e6
-16 1 3 10 0.26214400000000000000e6
-16 1 7 8 0.26214400000000000000e6
-16 2 4 4 0.52428800000000000000e6
-16 3 3 4 0.52428800000000000000e6
-17 1 1 8 -0.13107200000000000000e6
-17 1 2 2 0.26214400000000000000e6
-17 3 1 2 -0.13107200000000000000e6
-18 1 1 4 0.26214400000000000000e6
-18 1 1 6 -0.52428800000000000000e6
-18 1 2 4 0.26214400000000000000e6
-18 1 2 5 0.26214400000000000000e6
-18 2 1 3 0.26214400000000000000e6
-19 1 2 6 0.26214400000000000000e6
-19 1 4 5 -0.26214400000000000000e6
-20 1 1 8 -0.26214400000000000000e6
-20 1 2 7 0.26214400000000000000e6
-21 1 1 8 0.26214400000000000000e6
-21 1 2 8 0.26214400000000000000e6
-21 1 2 9 -0.52428800000000000000e6
-21 1 3 8 0.26214400000000000000e6
-21 2 2 4 0.26214400000000000000e6
-22 1 2 10 0.26214400000000000000e6
-22 1 7 8 -0.26214400000000000000e6
-23 1 1 8 0.13107200000000000000e6
-23 1 2 3 0.13107200000000000000e6
-23 1 2 5 -0.26214400000000000000e6
-23 1 3 3 0.26214400000000000000e6
-23 2 2 2 0.26214400000000000000e6
-23 3 1 2 0.13107200000000000000e6
-24 1 2 5 -0.26214400000000000000e6
-24 1 3 4 0.26214400000000000000e6
-25 1 1 4 -0.26214400000000000000e6
-25 1 1 6 0.52428800000000000000e6
-25 1 3 5 0.26214400000000000000e6
-25 1 4 5 -0.52428800000000000000e6
-25 2 1 3 -0.26214400000000000000e6
-25 2 2 3 0.26214400000000000000e6
-26 1 1 8 0.26214400000000000000e6
-26 1 2 9 -0.52428800000000000000e6
-26 1 3 7 0.26214400000000000000e6
-26 1 3 8 0.26214400000000000000e6
-26 2 2 4 0.26214400000000000000e6
-27 1 3 9 0.26214400000000000000e6
-27 1 5 8 -0.26214400000000000000e6
-28 1 1 6 -0.13107200000000000000e6
-28 1 4 4 0.26214400000000000000e6
-29 1 1 6 -0.13107200000000000000e6
-29 1 3 6 -0.13107200000000000000e6
-29 1 4 5 -0.13107200000000000000e6
-29 1 4 6 0.26214400000000000000e6
-29 2 3 3 -0.26214400000000000000e6
-30 1 2 9 -0.26214400000000000000e6
-30 1 4 8 0.26214400000000000000e6
-31 1 4 9 0.26214400000000000000e6
-31 1 6 7 -0.26214400000000000000e6
-32 1 2 9 -0.26214400000000000000e6
-32 1 4 10 0.26214400000000000000e6
-32 3 3 4 0.26214400000000000000e6
-33 1 3 6 -0.13107200000000000000e6
-33 1 5 5 0.26214400000000000000e6
-34 1 2 9 -0.26214400000000000000e6
-34 1 5 7 0.26214400000000000000e6
-35 1 5 10 0.26214400000000000000e6
-35 1 8 9 -0.26214400000000000000e6
-36 1 5 9 -0.26214400000000000000e6
-36 1 6 8 0.26214400000000000000e6
-37 1 6 10 0.26214400000000000000e6
-37 1 9 9 -0.52428800000000000000e6
-38 1 2 9 -0.26214400000000000000e6
-38 1 3 10 0.13107200000000000000e6
-38 1 7 7 0.26214400000000000000e6
-38 1 7 8 0.13107200000000000000e6
-38 2 4 4 0.26214400000000000000e6
-38 3 3 4 0.26214400000000000000e6
-39 1 2 9 -0.26214400000000000000e6
-39 1 7 9 0.26214400000000000000e6
-39 3 3 4 0.26214400000000000000e6
-40 1 3 10 -0.13107200000000000000e6
-40 1 8 8 0.26214400000000000000e6
-41 1 1 2 0.26214400000000000000e6
-41 1 1 4 0.52428800000000000000e6
-41 1 1 6 -0.10485760000000000000e7
-41 1 1 8 0.26214400000000000000e6
-41 1 2 3 0.26214400000000000000e6
-41 1 2 5 0.52428800000000000000e6
-41 2 1 2 0.26214400000000000000e6
-41 2 1 3 0.52428800000000000000e6
-41 3 1 2 0.26214400000000000000e6
-42 1 1 2 0.26214400000000000000e6
-42 1 1 4 0.52428800000000000000e6
-42 1 1 6 -0.10485760000000000000e7
-42 1 1 8 0.26214400000000000000e6
-42 1 2 3 0.26214400000000000000e6
-42 1 2 5 0.52428800000000000000e6
-42 2 1 3 0.52428800000000000000e6
-42 2 1 4 0.26214400000000000000e6
-42 3 1 2 0.26214400000000000000e6
-42 4 1 1 0.52428800000000000000e6
-43 1 2 9 0.26214400000000000000e6
-43 1 4 7 0.26214400000000000000e6
-43 1 5 8 0.26214400000000000000e6
-43 1 6 7 -0.52428800000000000000e6
-43 2 3 4 0.26214400000000000000e6
-44 1 1 4 0.26214400000000000000e6
-44 1 1 6 -0.52428800000000000000e6
-44 1 1 8 0.13107200000000000000e6
-44 1 2 3 0.13107200000000000000e6
-44 1 2 5 0.26214400000000000000e6
-44 1 2 9 -0.26214400000000000000e6
-44 1 3 8 0.13107200000000000000e6
-44 1 4 7 0.26214400000000000000e6
-44 2 1 3 0.26214400000000000000e6
-44 2 2 4 0.13107200000000000000e6
-44 3 1 1 0.26214400000000000000e6
-44 3 1 2 0.13107200000000000000e6
-44 4 1 1 0.26214400000000000000e6
-45 1 1 4 0.26214400000000000000e6
-45 1 1 6 -0.52428800000000000000e6
-45 1 2 5 0.26214400000000000000e6
-45 1 4 7 0.26214400000000000000e6
-45 2 1 3 0.26214400000000000000e6
-45 3 1 3 0.26214400000000000000e6
-46 1 1 8 -0.26214400000000000000e6
-46 1 2 9 0.52428800000000000000e6
-46 1 3 10 -0.26214400000000000000e6
-46 1 7 8 -0.26214400000000000000e6
-46 2 4 4 -0.52428800000000000000e6
-46 3 1 4 0.26214400000000000000e6
-46 3 3 4 -0.52428800000000000000e6
-47 1 1 8 -0.13107200000000000000e6
-47 1 2 3 -0.13107200000000000000e6
-47 1 2 9 0.26214400000000000000e6
-47 1 3 8 -0.13107200000000000000e6
-47 2 2 4 -0.13107200000000000000e6
-47 3 2 2 0.26214400000000000000e6
-48 1 2 5 -0.26214400000000000000e6
-48 1 2 9 0.26214400000000000000e6
-48 3 2 3 0.26214400000000000000e6
-49 1 1 8 0.26214400000000000000e6
-49 1 2 9 -0.52428800000000000000e6
-49 1 3 8 0.26214400000000000000e6
-49 1 7 8 0.26214400000000000000e6
-49 2 2 4 0.26214400000000000000e6
-49 3 2 4 0.26214400000000000000e6
-50 1 4 5 -0.13107200000000000000e6
-50 1 6 7 0.13107200000000000000e6
-50 3 3 3 0.26214400000000000000e6
-51 1 7 8 -0.13107200000000000000e6
-51 1 7 10 0.13107200000000000000e6
-51 3 4 4 0.26214400000000000000e6
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-96
-4
-10 4 10 4
--0.52428800000000000000e6 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.10485760000000000000e7 0.0 0.0 0.0 -0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.10485760000000000000e7 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.10485760000000000000e7 0.0 -0.52428800000000000000e6
-0 1 1 2 -0.26214400000000000000e6
-0 1 1 4 0.52428800000000000000e6
-0 1 1 8 -0.26214400000000000000e6
-0 2 1 1 -0.52428800000000000000e6
-0 3 1 2 -0.26214400000000000000e6
-1 1 5 8 0.52428800000000000000e6
-1 1 9 10 -0.52428800000000000000e6
-1 3 7 8 -0.26214400000000000000e6
-1 3 7 10 -0.26214400000000000000e6
-1 3 8 10 -0.26214400000000000000e6
-1 3 10 10 -0.52428800000000000000e6
-2 1 5 8 0.52428800000000000000e6
-2 1 8 9 -0.52428800000000000000e6
-2 3 7 8 -0.26214400000000000000e6
-2 3 8 10 -0.26214400000000000000e6
-3 1 1 10 -0.26214400000000000000e6
-3 2 4 4 -0.52428800000000000000e6
-3 3 1 10 -0.26214400000000000000e6
-3 3 7 8 -0.26214400000000000000e6
-3 3 7 10 -0.26214400000000000000e6
-4 1 5 6 0.52428800000000000000e6
-4 1 6 9 -0.52428800000000000000e6
-4 3 4 9 -0.26214400000000000000e6
-4 3 9 9 -0.52428800000000000000e6
-5 1 8 9 0.26214400000000000000e6
-5 1 9 10 -0.26214400000000000000e6
-5 3 4 9 -0.52428800000000000000e6
-5 3 9 10 0.26214400000000000000e6
-6 1 1 10 0.13107200000000000000e6
-6 1 3 10 0.13107200000000000000e6
-6 1 6 7 -0.52428800000000000000e6
-6 1 7 10 0.13107200000000000000e6
-6 1 9 10 0.26214400000000000000e6
-6 2 4 4 0.26214400000000000000e6
-6 3 1 10 0.13107200000000000000e6
-7 1 2 9 -0.52428800000000000000e6
-7 1 3 10 0.26214400000000000000e6
-7 1 7 10 0.26214400000000000000e6
-7 3 1 10 0.26214400000000000000e6
-7 3 7 8 -0.26214400000000000000e6
-8 1 1 10 0.26214400000000000000e6
-8 1 4 7 -0.52428800000000000000e6
-8 1 7 10 0.26214400000000000000e6
-9 1 1 4 -0.13107200000000000000e6
-9 1 2 5 -0.13107200000000000000e6
-9 1 4 7 -0.13107200000000000000e6
-9 2 1 3 -0.13107200000000000000e6
-9 2 3 3 -0.52428800000000000000e6
-9 3 1 4 -0.13107200000000000000e6
-9 3 1 6 -0.26214400000000000000e6
-9 3 4 5 -0.26214400000000000000e6
-9 3 4 9 -0.26214400000000000000e6
-10 1 5 8 0.26214400000000000000e6
-10 1 9 10 -0.26214400000000000000e6
-10 3 4 5 -0.52428800000000000000e6
-10 3 4 9 -0.52428800000000000000e6
-10 3 5 10 0.26214400000000000000e6
-10 3 9 10 0.26214400000000000000e6
-11 1 2 9 0.26214400000000000000e6
-11 1 6 7 -0.52428800000000000000e6
-11 1 8 9 0.26214400000000000000e6
-11 3 1 6 -0.52428800000000000000e6
-12 1 1 4 -0.26214400000000000000e6
-12 1 1 10 0.13107200000000000000e6
-12 1 2 5 -0.26214400000000000000e6
-12 1 3 10 0.13107200000000000000e6
-12 1 7 10 0.13107200000000000000e6
-12 2 1 3 -0.26214400000000000000e6
-12 2 4 4 0.26214400000000000000e6
-12 3 1 4 -0.26214400000000000000e6
-12 3 1 10 0.13107200000000000000e6
-13 1 1 8 -0.26214400000000000000e6
-13 1 2 9 0.52428800000000000000e6
-13 1 3 10 -0.26214400000000000000e6
-13 1 7 10 -0.26214400000000000000e6
-13 1 8 9 0.52428800000000000000e6
-13 1 9 10 -0.52428800000000000000e6
-13 2 2 4 -0.26214400000000000000e6
-13 3 1 10 -0.52428800000000000000e6
-13 3 2 7 -0.26214400000000000000e6
-13 3 3 4 -0.52428800000000000000e6
-13 3 7 8 -0.26214400000000000000e6
-13 4 4 4 -0.52428800000000000000e6
-14 1 2 5 -0.52428800000000000000e6
-14 1 3 10 0.26214400000000000000e6
-14 1 7 10 0.26214400000000000000e6
-14 3 1 10 0.26214400000000000000e6
-14 3 2 7 0.26214400000000000000e6
-15 1 1 8 0.26214400000000000000e6
-15 1 4 7 -0.52428800000000000000e6
-15 1 7 10 0.26214400000000000000e6
-15 3 1 4 -0.52428800000000000000e6
-15 3 1 10 0.26214400000000000000e6
-16 1 1 2 0.26214400000000000000e6
-16 1 1 4 -0.52428800000000000000e6
-16 1 1 10 0.26214400000000000000e6
-16 1 2 3 0.26214400000000000000e6
-16 1 7 10 -0.26214400000000000000e6
-16 3 1 2 0.26214400000000000000e6
-16 3 1 4 -0.52428800000000000000e6
-16 3 1 10 -0.26214400000000000000e6
-16 3 2 7 -0.26214400000000000000e6
-16 4 1 1 0.52428800000000000000e6
-17 1 1 1 0.52428800000000000000e6
-17 1 1 2 0.26214400000000000000e6
-17 1 1 4 -0.52428800000000000000e6
-17 1 1 8 0.26214400000000000000e6
-17 2 1 1 0.52428800000000000000e6
-17 3 1 2 0.26214400000000000000e6
-18 1 1 3 0.52428800000000000000e6
-18 1 1 8 -0.52428800000000000000e6
-18 3 1 2 -0.52428800000000000000e6
-19 1 1 5 0.52428800000000000000e6
-19 1 4 7 -0.52428800000000000000e6
-19 3 1 4 -0.52428800000000000000e6
-20 1 1 4 -0.26214400000000000000e6
-20 1 1 6 0.52428800000000000000e6
-20 1 2 5 -0.26214400000000000000e6
-20 1 4 7 -0.26214400000000000000e6
-20 2 1 3 -0.26214400000000000000e6
-20 3 1 4 -0.26214400000000000000e6
-21 1 1 2 -0.52428800000000000000e6
-21 1 1 7 0.52428800000000000000e6
-21 1 2 3 -0.52428800000000000000e6
-21 1 7 10 0.52428800000000000000e6
-21 3 1 2 -0.52428800000000000000e6
-21 3 1 4 0.10485760000000000000e7
-21 3 1 10 0.52428800000000000000e6
-21 3 2 7 0.52428800000000000000e6
-21 4 1 1 -0.10485760000000000000e7
-22 1 1 9 0.52428800000000000000e6
-22 1 4 7 -0.52428800000000000000e6
-23 1 1 8 -0.26214400000000000000e6
-23 1 2 2 0.52428800000000000000e6
-23 3 1 2 -0.26214400000000000000e6
-24 1 2 4 0.52428800000000000000e6
-24 1 4 7 -0.52428800000000000000e6
-24 3 1 4 -0.52428800000000000000e6
-25 1 2 6 0.52428800000000000000e6
-25 1 6 7 -0.52428800000000000000e6
-25 3 1 6 -0.52428800000000000000e6
-26 1 1 8 -0.52428800000000000000e6
-26 1 2 7 0.52428800000000000000e6
-27 1 2 8 0.52428800000000000000e6
-27 1 7 10 -0.52428800000000000000e6
-27 3 1 10 -0.52428800000000000000e6
-27 3 2 7 -0.52428800000000000000e6
-28 1 2 10 0.52428800000000000000e6
-28 1 7 10 -0.52428800000000000000e6
-28 3 1 10 -0.52428800000000000000e6
-29 1 1 8 0.26214400000000000000e6
-29 1 2 9 -0.52428800000000000000e6
-29 1 3 3 0.52428800000000000000e6
-29 1 7 10 0.26214400000000000000e6
-29 2 2 4 0.26214400000000000000e6
-29 3 1 10 0.26214400000000000000e6
-29 3 2 3 -0.26214400000000000000e6
-29 3 2 7 0.26214400000000000000e6
-30 1 2 5 -0.52428800000000000000e6
-30 1 3 4 0.52428800000000000000e6
-31 1 3 5 0.52428800000000000000e6
-31 1 5 8 -0.52428800000000000000e6
-31 3 3 4 -0.52428800000000000000e6
-32 1 3 7 0.52428800000000000000e6
-32 1 7 10 -0.52428800000000000000e6
-32 3 1 10 -0.52428800000000000000e6
-32 3 2 7 -0.52428800000000000000e6
-33 1 1 8 0.52428800000000000000e6
-33 1 2 9 -0.10485760000000000000e7
-33 1 3 8 0.52428800000000000000e6
-33 1 7 10 0.52428800000000000000e6
-33 2 2 4 0.52428800000000000000e6
-33 3 1 10 0.52428800000000000000e6
-33 3 2 7 0.52428800000000000000e6
-34 1 3 9 0.52428800000000000000e6
-34 1 5 8 -0.52428800000000000000e6
-35 1 1 4 -0.13107200000000000000e6
-35 1 2 5 -0.13107200000000000000e6
-35 1 4 4 0.52428800000000000000e6
-35 1 4 7 -0.13107200000000000000e6
-35 2 1 3 -0.13107200000000000000e6
-35 3 1 4 -0.13107200000000000000e6
-36 1 4 5 0.52428800000000000000e6
-36 1 6 7 -0.52428800000000000000e6
-36 3 1 6 -0.52428800000000000000e6
-37 1 1 4 -0.13107200000000000000e6
-37 1 2 5 -0.13107200000000000000e6
-37 1 3 6 -0.26214400000000000000e6
-37 1 4 6 0.52428800000000000000e6
-37 1 4 7 -0.13107200000000000000e6
-37 1 6 7 -0.26214400000000000000e6
-37 2 1 3 -0.13107200000000000000e6
-37 2 3 3 -0.52428800000000000000e6
-37 3 1 4 -0.13107200000000000000e6
-37 3 1 6 -0.26214400000000000000e6
-38 1 2 9 -0.52428800000000000000e6
-38 1 4 8 0.52428800000000000000e6
-39 1 4 9 0.52428800000000000000e6
-39 1 6 7 -0.52428800000000000000e6
-40 1 1 10 -0.26214400000000000000e6
-40 1 3 10 -0.26214400000000000000e6
-40 1 4 10 0.52428800000000000000e6
-40 1 7 10 -0.26214400000000000000e6
-40 2 4 4 -0.52428800000000000000e6
-40 3 1 10 -0.26214400000000000000e6
-41 1 3 6 -0.26214400000000000000e6
-41 1 5 5 0.52428800000000000000e6
-42 1 2 9 -0.52428800000000000000e6
-42 1 5 7 0.52428800000000000000e6
-43 1 3 6 -0.52428800000000000000e6
-43 1 5 9 0.52428800000000000000e6
-43 3 4 5 0.52428800000000000000e6
-44 1 5 10 0.52428800000000000000e6
-44 1 8 9 -0.52428800000000000000e6
-45 1 3 6 -0.52428800000000000000e6
-45 1 6 8 0.52428800000000000000e6
-45 3 4 5 0.52428800000000000000e6
-46 1 3 6 -0.52428800000000000000e6
-46 1 6 10 0.52428800000000000000e6
-46 3 4 5 0.52428800000000000000e6
-46 3 4 9 0.52428800000000000000e6
-47 1 1 10 -0.26214400000000000000e6
-47 1 7 7 0.52428800000000000000e6
-48 1 7 8 0.52428800000000000000e6
-48 1 7 10 -0.52428800000000000000e6
-48 3 1 10 -0.52428800000000000000e6
-49 1 1 10 -0.26214400000000000000e6
-49 1 3 10 -0.26214400000000000000e6
-49 1 7 9 0.52428800000000000000e6
-49 1 7 10 -0.26214400000000000000e6
-49 2 4 4 -0.52428800000000000000e6
-49 3 1 10 -0.26214400000000000000e6
-50 1 3 10 -0.26214400000000000000e6
-50 1 8 8 0.52428800000000000000e6
-51 1 3 10 -0.52428800000000000000e6
-51 1 8 10 0.52428800000000000000e6
-51 3 7 8 0.52428800000000000000e6
-52 1 3 6 -0.26214400000000000000e6
-52 1 9 9 0.52428800000000000000e6
-52 3 4 5 0.26214400000000000000e6
-52 3 4 9 0.26214400000000000000e6
-53 1 3 10 -0.26214400000000000000e6
-53 1 10 10 0.52428800000000000000e6
-53 3 7 8 0.26214400000000000000e6
-53 3 7 10 0.26214400000000000000e6
-54 1 1 2 0.52428800000000000000e6
-54 1 1 8 0.52428800000000000000e6
-54 1 2 3 0.52428800000000000000e6
-54 1 4 7 -0.10485760000000000000e7
-54 2 1 2 0.52428800000000000000e6
-54 3 1 2 0.52428800000000000000e6
-54 3 1 4 -0.10485760000000000000e7
-55 1 1 2 0.52428800000000000000e6
-55 1 1 8 0.52428800000000000000e6
-55 1 2 3 0.52428800000000000000e6
-55 1 4 7 -0.10485760000000000000e7
-55 2 1 4 0.52428800000000000000e6
-55 3 1 2 0.52428800000000000000e6
-55 3 1 4 -0.10485760000000000000e7
-55 4 1 1 0.10485760000000000000e7
-56 1 2 3 0.26214400000000000000e6
-56 1 2 5 -0.52428800000000000000e6
-56 1 2 9 0.52428800000000000000e6
-56 1 7 10 -0.26214400000000000000e6
-56 2 2 2 0.52428800000000000000e6
-56 2 2 4 -0.26214400000000000000e6
-56 3 1 2 0.26214400000000000000e6
-56 3 1 10 -0.26214400000000000000e6
-56 3 2 3 0.26214400000000000000e6
-56 3 2 7 -0.26214400000000000000e6
-57 1 2 5 0.52428800000000000000e6
-57 1 4 7 0.52428800000000000000e6
-57 1 5 8 0.52428800000000000000e6
-57 1 6 7 -0.10485760000000000000e7
-57 2 2 3 0.52428800000000000000e6
-57 3 1 4 0.52428800000000000000e6
-57 3 1 6 -0.10485760000000000000e7
-57 3 3 4 0.52428800000000000000e6
-58 1 2 9 0.52428800000000000000e6
-58 1 4 7 0.52428800000000000000e6
-58 1 5 8 0.52428800000000000000e6
-58 1 6 7 -0.10485760000000000000e7
-58 2 3 4 0.52428800000000000000e6
-59 1 2 3 0.26214400000000000000e6
-59 1 7 10 -0.26214400000000000000e6
-59 3 1 1 0.52428800000000000000e6
-59 3 1 2 0.26214400000000000000e6
-59 3 1 4 -0.52428800000000000000e6
-59 3 1 10 -0.26214400000000000000e6
-59 3 2 7 -0.26214400000000000000e6
-59 4 1 1 0.52428800000000000000e6
-60 1 2 3 -0.52428800000000000000e6
-60 1 7 10 0.52428800000000000000e6
-60 3 1 3 0.52428800000000000000e6
-60 3 1 10 0.52428800000000000000e6
-60 3 2 7 0.52428800000000000000e6
-61 1 2 5 -0.52428800000000000000e6
-61 1 2 9 0.52428800000000000000e6
-61 3 1 5 0.52428800000000000000e6
-62 1 1 8 -0.52428800000000000000e6
-62 1 1 10 0.52428800000000000000e6
-62 3 1 7 0.52428800000000000000e6
-63 3 1 8 0.52428800000000000000e6
-63 3 2 7 -0.52428800000000000000e6
-64 1 1 10 0.26214400000000000000e6
-64 1 2 9 -0.52428800000000000000e6
-64 1 3 10 0.26214400000000000000e6
-64 1 7 10 0.26214400000000000000e6
-64 2 4 4 0.52428800000000000000e6
-64 3 1 9 0.52428800000000000000e6
-64 3 1 10 0.26214400000000000000e6
-65 1 2 3 -0.26214400000000000000e6
-65 1 7 10 0.26214400000000000000e6
-65 3 1 10 0.26214400000000000000e6
-65 3 2 2 0.52428800000000000000e6
-65 3 2 7 0.26214400000000000000e6
-66 1 2 5 -0.52428800000000000000e6
-66 1 2 9 0.52428800000000000000e6
-66 3 2 4 0.52428800000000000000e6
-67 3 2 5 0.52428800000000000000e6
-67 3 3 4 -0.52428800000000000000e6
-68 3 2 6 0.52428800000000000000e6
-68 3 4 5 -0.52428800000000000000e6
-69 1 1 8 0.52428800000000000000e6
-69 1 2 9 -0.10485760000000000000e7
-69 1 3 10 0.52428800000000000000e6
-69 1 7 10 0.52428800000000000000e6
-69 2 2 4 0.52428800000000000000e6
-69 3 1 10 0.52428800000000000000e6
-69 3 2 7 0.52428800000000000000e6
-69 3 2 8 0.52428800000000000000e6
-70 1 5 8 -0.52428800000000000000e6
-70 1 8 9 0.52428800000000000000e6
-70 3 2 9 0.52428800000000000000e6
-71 3 2 10 0.52428800000000000000e6
-71 3 7 8 -0.52428800000000000000e6
-72 1 2 3 0.26214400000000000000e6
-72 1 7 10 -0.26214400000000000000e6
-72 3 1 10 -0.26214400000000000000e6
-72 3 2 3 0.26214400000000000000e6
-72 3 2 7 -0.26214400000000000000e6
-72 3 3 3 0.52428800000000000000e6
-72 3 3 4 -0.52428800000000000000e6
-72 4 2 2 0.52428800000000000000e6
-73 1 2 5 0.52428800000000000000e6
-73 1 2 9 -0.52428800000000000000e6
-73 3 3 4 0.52428800000000000000e6
-73 3 3 5 0.52428800000000000000e6
-73 3 4 5 -0.10485760000000000000e7
-73 4 2 3 0.52428800000000000000e6
-74 1 5 6 -0.10485760000000000000e7
-74 1 6 9 0.10485760000000000000e7
-74 3 1 6 0.52428800000000000000e6
-74 3 3 6 0.52428800000000000000e6
-74 3 4 5 0.52428800000000000000e6
-74 4 3 3 0.10485760000000000000e7
-75 1 1 8 0.52428800000000000000e6
-75 1 2 9 -0.10485760000000000000e7
-75 1 3 10 0.52428800000000000000e6
-75 1 7 10 0.52428800000000000000e6
-75 2 2 4 0.52428800000000000000e6
-75 3 1 10 0.52428800000000000000e6
-75 3 2 7 0.52428800000000000000e6
-75 3 3 7 0.52428800000000000000e6
-76 3 3 9 0.52428800000000000000e6
-76 3 5 8 -0.52428800000000000000e6
-77 1 8 9 -0.10485760000000000000e7
-77 1 9 10 0.10485760000000000000e7
-77 3 1 10 0.52428800000000000000e6
-77 3 3 10 0.52428800000000000000e6
-77 3 7 8 0.52428800000000000000e6
-77 4 4 4 0.10485760000000000000e7
-78 3 1 6 -0.26214400000000000000e6
-78 3 4 4 0.52428800000000000000e6
-79 1 5 6 -0.52428800000000000000e6
-79 1 6 9 0.52428800000000000000e6
-79 3 4 6 0.52428800000000000000e6
-80 1 1 10 0.26214400000000000000e6
-80 1 2 9 -0.52428800000000000000e6
-80 1 3 10 0.26214400000000000000e6
-80 1 7 10 0.26214400000000000000e6
-80 2 4 4 0.52428800000000000000e6
-80 3 1 10 0.26214400000000000000e6
-80 3 4 7 0.52428800000000000000e6
-81 1 5 8 -0.52428800000000000000e6
-81 1 8 9 0.52428800000000000000e6
-81 3 4 8 0.52428800000000000000e6
-82 1 8 9 -0.52428800000000000000e6
-82 1 9 10 0.52428800000000000000e6
-82 3 4 10 0.52428800000000000000e6
-83 1 5 6 -0.52428800000000000000e6
-83 1 6 9 0.52428800000000000000e6
-83 3 1 6 0.26214400000000000000e6
-83 3 4 5 0.26214400000000000000e6
-83 3 5 5 0.52428800000000000000e6
-83 4 3 3 0.52428800000000000000e6
-84 1 5 8 -0.52428800000000000000e6
-84 1 8 9 0.52428800000000000000e6
-84 3 5 7 0.52428800000000000000e6
-85 3 5 9 0.52428800000000000000e6
-85 3 6 8 -0.52428800000000000000e6
-86 3 4 9 -0.52428800000000000000e6
-86 3 6 7 0.52428800000000000000e6
-87 3 6 10 0.52428800000000000000e6
-87 3 9 9 -0.10485760000000000000e7
-88 3 1 10 -0.26214400000000000000e6
-88 3 7 7 0.52428800000000000000e6
-89 1 8 9 -0.52428800000000000000e6
-89 1 9 10 0.52428800000000000000e6
-89 3 7 9 0.52428800000000000000e6
-90 1 8 9 -0.52428800000000000000e6
-90 1 9 10 0.52428800000000000000e6
-90 3 1 10 0.26214400000000000000e6
-90 3 7 8 0.26214400000000000000e6
-90 3 8 8 0.52428800000000000000e6
-90 4 4 4 0.52428800000000000000e6
-91 3 5 10 -0.52428800000000000000e6
-91 3 8 9 0.52428800000000000000e6
-92 1 2 3 0.52428800000000000000e6
-92 1 2 5 -0.10485760000000000000e7
-92 1 2 9 0.10485760000000000000e7
-92 1 7 10 -0.52428800000000000000e6
-92 3 1 2 0.52428800000000000000e6
-92 3 1 10 -0.52428800000000000000e6
-92 3 2 3 0.52428800000000000000e6
-92 3 2 7 -0.52428800000000000000e6
-92 4 1 2 0.52428800000000000000e6
-93 1 2 5 0.52428800000000000000e6
-93 1 2 9 -0.52428800000000000000e6
-93 3 1 4 0.52428800000000000000e6
-93 3 1 6 -0.10485760000000000000e7
-93 3 3 4 0.52428800000000000000e6
-93 4 1 3 0.52428800000000000000e6
-94 2 2 4 -0.52428800000000000000e6
-94 2 4 4 0.10485760000000000000e7
-94 4 1 4 0.52428800000000000000e6
-95 1 1 8 -0.52428800000000000000e6
-95 1 2 9 0.10485760000000000000e7
-95 1 3 10 -0.52428800000000000000e6
-95 1 5 8 -0.10485760000000000000e7
-95 1 7 10 -0.52428800000000000000e6
-95 1 8 9 0.10485760000000000000e7
-95 2 2 4 -0.52428800000000000000e6
-95 3 1 10 -0.52428800000000000000e6
-95 3 3 8 0.52428800000000000000e6
-95 4 2 4 0.52428800000000000000e6
-96 1 1 10 -0.26214400000000000000e6
-96 1 2 9 0.52428800000000000000e6
-96 1 3 10 -0.26214400000000000000e6
-96 1 5 8 0.52428800000000000000e6
-96 1 7 10 -0.26214400000000000000e6
-96 1 8 9 -0.52428800000000000000e6
-96 2 4 4 -0.52428800000000000000e6
-96 3 1 10 -0.26214400000000000000e6
-96 3 4 9 -0.10485760000000000000e7
-96 3 5 8 0.52428800000000000000e6
-96 4 3 4 0.52428800000000000000e6
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-281
-4
-20 10 10 4
-0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 -0.65536000000000000000e6 0.0 -0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.10485760000000000000e7 0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.10485760000000000000e7 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.39321600000000000000e6 -0.65536000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 0.0 0.10485760000000000000e7 0.0 0.0 -0.10485760000000000000e7 0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 -0.10485760000000000000e7 0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 -0.10485760000000000000e7 -0.52428800000000000000e6 0.0 0.0 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 -0.10485760000000000000e7 0.0 -0.10485760000000000000e7 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 0.0 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 -0.10485760000000000000e7 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.10485760000000000000e7 0.0 0.0 0.0 -0.10485760000000000000e7 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 -0.10485760000000000000e7 0.10485760000000000000e7 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0
-0 1 1 4 0.26214400000000000000e6
-0 1 2 17 -0.26214400000000000000e6
-0 1 4 11 0.13107200000000000000e6
-0 1 5 12 -0.26214400000000000000e6
-0 1 11 14 0.26214400000000000000e6
-0 1 11 18 -0.13107200000000000000e6
-0 2 1 1 -0.26214400000000000000e6
-0 2 1 3 0.13107200000000000000e6
-0 2 1 9 -0.26214400000000000000e6
-0 2 2 4 0.26214400000000000000e6
-0 2 7 7 -0.26214400000000000000e6
-0 3 1 2 0.13107200000000000000e6
-0 3 1 6 -0.52428800000000000000e6
-0 3 2 3 0.13107200000000000000e6
-0 3 2 7 -0.13107200000000000000e6
-0 3 3 4 0.26214400000000000000e6
-0 3 7 8 -0.13107200000000000000e6
-0 4 1 1 0.26214400000000000000e6
-1 1 12 19 -0.26214400000000000000e6
-1 1 17 20 0.13107200000000000000e6
-1 1 20 20 0.26214400000000000000e6
-1 3 9 10 0.26214400000000000000e6
-2 1 12 19 0.13107200000000000000e6
-2 1 16 17 -0.26214400000000000000e6
-2 1 19 20 0.13107200000000000000e6
-2 3 9 10 -0.13107200000000000000e6
-3 1 5 20 -0.26214400000000000000e6
-3 1 12 19 0.26214400000000000000e6
-3 1 13 20 -0.13107200000000000000e6
-3 1 17 18 -0.13107200000000000000e6
-3 1 17 20 0.13107200000000000000e6
-3 2 10 10 -0.26214400000000000000e6
-3 3 9 10 -0.26214400000000000000e6
-4 1 10 17 -0.26214400000000000000e6
-4 1 16 17 0.13107200000000000000e6
-4 1 19 19 0.26214400000000000000e6
-5 1 12 19 0.13107200000000000000e6
-5 1 14 15 -0.26214400000000000000e6
-5 1 18 19 0.13107200000000000000e6
-6 1 2 9 -0.26214400000000000000e6
-6 1 5 20 0.13107200000000000000e6
-6 1 12 19 0.13107200000000000000e6
-6 3 4 5 0.26214400000000000000e6
-6 3 4 9 0.26214400000000000000e6
-6 3 9 10 -0.13107200000000000000e6
-7 1 1 20 -0.13107200000000000000e6
-7 1 2 9 -0.52428800000000000000e6
-7 1 2 17 0.13107200000000000000e6
-7 1 3 18 0.13107200000000000000e6
-7 1 5 20 0.26214400000000000000e6
-7 1 11 14 0.26214400000000000000e6
-7 1 13 20 0.13107200000000000000e6
-7 2 4 10 0.26214400000000000000e6
-7 3 4 5 0.52428800000000000000e6
-7 3 4 9 0.52428800000000000000e6
-7 3 7 8 0.13107200000000000000e6
-7 4 4 4 0.26214400000000000000e6
-8 1 2 9 -0.52428800000000000000e6
-8 1 11 14 0.26214400000000000000e6
-8 1 11 18 0.13107200000000000000e6
-8 1 12 19 0.26214400000000000000e6
-8 1 17 18 0.13107200000000000000e6
-8 2 4 10 0.26214400000000000000e6
-8 3 4 5 0.52428800000000000000e6
-8 3 4 9 0.52428800000000000000e6
-8 3 5 10 0.26214400000000000000e6
-9 1 1 20 0.13107200000000000000e6
-9 1 11 14 -0.26214400000000000000e6
-9 1 12 19 0.26214400000000000000e6
-9 1 13 20 -0.13107200000000000000e6
-9 1 17 18 -0.13107200000000000000e6
-9 2 10 10 -0.26214400000000000000e6
-9 3 9 10 -0.26214400000000000000e6
-10 1 8 15 -0.26214400000000000000e6
-10 1 9 20 0.13107200000000000000e6
-10 1 14 15 0.13107200000000000000e6
-11 1 2 9 0.13107200000000000000e6
-11 1 5 16 -0.26214400000000000000e6
-11 1 16 17 0.13107200000000000000e6
-11 3 4 5 -0.13107200000000000000e6
-11 3 4 9 -0.13107200000000000000e6
-12 1 7 14 -0.26214400000000000000e6
-12 1 12 19 0.13107200000000000000e6
-12 1 15 18 0.13107200000000000000e6
-12 3 5 10 0.13107200000000000000e6
-13 1 11 14 -0.13107200000000000000e6
-13 2 4 10 -0.13107200000000000000e6
-13 3 4 9 -0.26214400000000000000e6
-13 3 5 10 -0.13107200000000000000e6
-14 1 1 16 -0.26214400000000000000e6
-14 1 5 20 0.13107200000000000000e6
-14 1 11 14 0.13107200000000000000e6
-15 1 1 20 0.13107200000000000000e6
-15 1 2 9 0.52428800000000000000e6
-15 1 2 17 -0.13107200000000000000e6
-15 1 5 20 -0.26214400000000000000e6
-15 1 6 13 -0.26214400000000000000e6
-15 1 11 14 -0.26214400000000000000e6
-15 1 11 18 -0.13107200000000000000e6
-15 2 4 10 -0.26214400000000000000e6
-15 2 8 10 -0.13107200000000000000e6
-15 3 4 5 -0.52428800000000000000e6
-15 3 4 9 -0.52428800000000000000e6
-15 3 5 10 -0.26214400000000000000e6
-15 3 7 8 -0.13107200000000000000e6
-15 4 4 4 -0.26214400000000000000e6
-16 1 1 20 -0.13107200000000000000e6
-16 1 2 9 -0.52428800000000000000e6
-16 1 4 11 -0.13107200000000000000e6
-16 1 5 20 0.26214400000000000000e6
-16 1 11 14 0.26214400000000000000e6
-16 1 11 18 0.13107200000000000000e6
-16 1 12 19 0.26214400000000000000e6
-16 2 2 8 -0.13107200000000000000e6
-16 2 4 10 0.26214400000000000000e6
-16 3 2 7 -0.13107200000000000000e6
-16 3 3 8 -0.13107200000000000000e6
-16 3 4 5 0.52428800000000000000e6
-16 3 4 9 0.52428800000000000000e6
-16 3 5 10 0.26214400000000000000e6
-16 3 7 8 0.26214400000000000000e6
-16 4 4 4 0.26214400000000000000e6
-17 1 2 17 0.13107200000000000000e6
-17 1 5 12 -0.26214400000000000000e6
-17 1 11 18 0.13107200000000000000e6
-18 1 1 16 -0.52428800000000000000e6
-18 1 1 20 0.13107200000000000000e6
-18 1 3 18 0.13107200000000000000e6
-18 1 4 11 0.13107200000000000000e6
-18 1 5 12 0.26214400000000000000e6
-18 1 11 14 0.26214400000000000000e6
-18 1 11 18 -0.13107200000000000000e6
-18 2 1 9 0.26214400000000000000e6
-18 2 2 8 0.13107200000000000000e6
-18 2 7 7 -0.26214400000000000000e6
-18 3 2 7 0.13107200000000000000e6
-18 3 3 8 0.13107200000000000000e6
-18 3 7 8 -0.13107200000000000000e6
-19 1 3 10 -0.65536000000000000000e5
-19 1 5 8 -0.65536000000000000000e5
-19 1 5 16 -0.65536000000000000000e5
-19 1 6 7 -0.32768000000000000000e5
-19 1 7 10 -0.13107200000000000000e6
-19 1 7 14 0.32768000000000000000e5
-19 1 8 9 -0.13107200000000000000e6
-19 1 10 17 0.65536000000000000000e5
-19 1 10 19 0.13107200000000000000e6
-19 1 16 19 0.65536000000000000000e5
-19 2 4 6 -0.65536000000000000000e5
-19 2 6 6 -0.26214400000000000000e6
-19 3 1 6 -0.32768000000000000000e5
-19 3 4 5 -0.32768000000000000000e5
-19 4 3 3 -0.65536000000000000000e5
-20 1 8 9 -0.26214400000000000000e6
-20 1 8 15 0.13107200000000000000e6
-20 1 15 16 0.13107200000000000000e6
-21 1 3 10 -0.13107200000000000000e6
-21 1 5 8 -0.13107200000000000000e6
-21 1 6 7 -0.65536000000000000000e5
-21 1 7 14 0.65536000000000000000e5
-21 1 10 17 0.13107200000000000000e6
-21 2 4 6 -0.13107200000000000000e6
-21 3 1 6 -0.65536000000000000000e5
-21 3 4 5 -0.65536000000000000000e5
-21 4 3 3 -0.13107200000000000000e6
-22 1 3 10 -0.26214400000000000000e6
-22 1 7 14 0.13107200000000000000e6
-22 1 13 16 0.13107200000000000000e6
-23 1 2 9 0.13107200000000000000e6
-23 1 5 16 -0.26214400000000000000e6
-23 1 6 7 -0.13107200000000000000e6
-23 1 7 14 0.13107200000000000000e6
-23 1 14 15 0.13107200000000000000e6
-23 3 1 6 -0.13107200000000000000e6
-23 3 4 5 -0.26214400000000000000e6
-23 4 3 3 -0.26214400000000000000e6
-24 1 1 16 0.13107200000000000000e6
-24 1 2 9 0.13107200000000000000e6
-24 1 5 8 -0.26214400000000000000e6
-24 3 4 5 -0.13107200000000000000e6
-24 3 4 9 -0.13107200000000000000e6
-25 1 4 19 0.13107200000000000000e6
-25 1 6 7 -0.26214400000000000000e6
-25 1 6 13 0.13107200000000000000e6
-26 1 2 9 -0.26214400000000000000e6
-26 1 2 17 0.65536000000000000000e5
-26 1 3 18 0.65536000000000000000e5
-26 1 4 11 0.65536000000000000000e5
-26 1 12 19 0.13107200000000000000e6
-26 2 2 8 0.65536000000000000000e5
-26 3 2 7 0.65536000000000000000e5
-26 3 3 8 0.65536000000000000000e5
-26 3 5 10 0.13107200000000000000e6
-27 1 1 16 -0.26214400000000000000e6
-27 1 2 9 0.26214400000000000000e6
-27 1 5 12 0.13107200000000000000e6
-27 1 11 14 -0.13107200000000000000e6
-27 1 12 19 -0.13107200000000000000e6
-27 2 4 10 -0.13107200000000000000e6
-27 3 1 6 -0.26214400000000000000e6
-27 3 4 5 -0.26214400000000000000e6
-27 3 4 9 -0.26214400000000000000e6
-27 3 5 10 -0.13107200000000000000e6
-28 1 1 8 -0.26214400000000000000e6
-28 1 1 16 0.26214400000000000000e6
-28 1 2 17 -0.65536000000000000000e5
-28 1 3 18 -0.65536000000000000000e5
-28 1 4 11 -0.65536000000000000000e5
-28 1 5 12 -0.13107200000000000000e6
-28 1 11 14 0.13107200000000000000e6
-28 2 1 9 -0.13107200000000000000e6
-28 2 2 8 -0.65536000000000000000e5
-28 3 2 7 -0.65536000000000000000e5
-28 3 3 8 -0.65536000000000000000e5
-29 1 2 17 0.13107200000000000000e6
-29 1 3 18 0.13107200000000000000e6
-29 1 4 7 0.26214400000000000000e6
-29 1 4 11 0.13107200000000000000e6
-29 1 6 7 -0.52428800000000000000e6
-29 1 11 18 -0.13107200000000000000e6
-29 1 12 19 0.26214400000000000000e6
-29 2 2 8 0.13107200000000000000e6
-29 2 3 5 0.26214400000000000000e6
-29 2 8 8 -0.26214400000000000000e6
-29 3 2 7 0.13107200000000000000e6
-29 3 3 4 0.26214400000000000000e6
-29 3 3 8 0.26214400000000000000e6
-29 3 5 10 0.26214400000000000000e6
-29 3 7 8 -0.13107200000000000000e6
-30 1 2 17 -0.13107200000000000000e6
-30 2 2 8 -0.13107200000000000000e6
-30 3 2 7 -0.13107200000000000000e6
-30 3 3 4 -0.26214400000000000000e6
-30 3 3 8 -0.13107200000000000000e6
-31 1 1 16 -0.52428800000000000000e6
-31 1 2 5 0.26214400000000000000e6
-31 1 2 17 0.26214400000000000000e6
-31 1 3 18 0.13107200000000000000e6
-31 1 4 11 0.13107200000000000000e6
-31 1 11 18 0.13107200000000000000e6
-31 2 2 4 0.26214400000000000000e6
-31 2 2 8 0.13107200000000000000e6
-31 3 1 6 -0.52428800000000000000e6
-31 3 2 7 0.26214400000000000000e6
-31 3 3 4 0.26214400000000000000e6
-31 3 3 8 0.13107200000000000000e6
-31 3 7 8 0.13107200000000000000e6
-32 1 1 4 -0.13107200000000000000e6
-32 1 1 16 0.52428800000000000000e6
-32 1 2 5 -0.52428800000000000000e6
-32 1 3 18 -0.13107200000000000000e6
-32 1 4 11 -0.26214400000000000000e6
-32 2 1 3 -0.13107200000000000000e6
-32 2 2 4 -0.26214400000000000000e6
-32 2 2 8 -0.13107200000000000000e6
-32 3 1 2 -0.13107200000000000000e6
-32 3 1 6 0.52428800000000000000e6
-32 3 2 3 -0.13107200000000000000e6
-32 3 2 7 -0.13107200000000000000e6
-32 3 3 4 -0.26214400000000000000e6
-32 3 3 8 -0.13107200000000000000e6
-33 1 1 1 0.26214400000000000000e6
-33 1 1 4 -0.26214400000000000000e6
-33 1 2 17 0.26214400000000000000e6
-33 1 4 11 -0.13107200000000000000e6
-33 1 5 12 0.26214400000000000000e6
-33 1 11 14 -0.26214400000000000000e6
-33 1 11 18 0.13107200000000000000e6
-33 2 1 1 0.26214400000000000000e6
-33 2 1 3 -0.13107200000000000000e6
-33 2 1 9 0.26214400000000000000e6
-33 2 2 4 -0.26214400000000000000e6
-33 2 7 7 0.26214400000000000000e6
-33 3 1 2 -0.13107200000000000000e6
-33 3 1 6 0.52428800000000000000e6
-33 3 2 3 -0.13107200000000000000e6
-33 3 2 7 0.13107200000000000000e6
-33 3 3 4 -0.26214400000000000000e6
-33 3 7 8 0.13107200000000000000e6
-33 4 1 1 -0.26214400000000000000e6
-34 1 1 2 0.26214400000000000000e6
-34 1 1 16 0.10485760000000000000e7
-34 1 2 5 -0.10485760000000000000e7
-34 1 2 17 -0.26214400000000000000e6
-34 1 3 18 -0.26214400000000000000e6
-34 1 4 11 -0.52428800000000000000e6
-34 2 1 3 -0.26214400000000000000e6
-34 2 1 7 0.26214400000000000000e6
-34 2 2 4 -0.52428800000000000000e6
-34 2 2 8 -0.26214400000000000000e6
-34 3 1 6 0.10485760000000000000e7
-34 3 2 3 -0.26214400000000000000e6
-34 3 2 7 -0.26214400000000000000e6
-34 3 3 4 -0.52428800000000000000e6
-34 3 3 8 -0.26214400000000000000e6
-34 4 1 1 0.52428800000000000000e6
-35 1 1 3 0.26214400000000000000e6
-35 1 1 4 0.26214400000000000000e6
-35 1 1 16 -0.10485760000000000000e7
-35 1 2 5 0.52428800000000000000e6
-35 1 2 17 0.26214400000000000000e6
-35 1 3 18 0.26214400000000000000e6
-35 1 4 11 0.52428800000000000000e6
-35 2 1 3 0.26214400000000000000e6
-35 2 2 4 0.52428800000000000000e6
-35 2 2 8 0.26214400000000000000e6
-35 3 1 6 -0.10485760000000000000e7
-35 3 2 3 0.26214400000000000000e6
-35 3 2 7 0.26214400000000000000e6
-35 3 3 4 0.52428800000000000000e6
-35 3 3 8 0.26214400000000000000e6
-36 1 1 4 -0.13107200000000000000e6
-36 1 1 5 0.26214400000000000000e6
-36 1 2 5 -0.26214400000000000000e6
-36 1 2 17 0.26214400000000000000e6
-36 1 4 11 -0.13107200000000000000e6
-36 1 5 12 0.26214400000000000000e6
-36 1 11 14 -0.26214400000000000000e6
-36 1 11 18 0.13107200000000000000e6
-36 2 1 3 -0.13107200000000000000e6
-36 2 1 7 0.13107200000000000000e6
-36 2 1 9 0.26214400000000000000e6
-36 2 2 4 -0.26214400000000000000e6
-36 2 7 7 0.26214400000000000000e6
-36 3 1 2 -0.13107200000000000000e6
-36 3 1 6 0.52428800000000000000e6
-36 3 2 3 -0.13107200000000000000e6
-36 3 2 7 0.13107200000000000000e6
-36 3 3 4 -0.26214400000000000000e6
-36 3 7 8 0.13107200000000000000e6
-37 1 1 6 0.26214400000000000000e6
-37 1 2 5 -0.26214400000000000000e6
-38 1 1 7 0.26214400000000000000e6
-38 1 1 16 -0.52428800000000000000e6
-38 1 2 5 0.26214400000000000000e6
-38 1 2 17 0.13107200000000000000e6
-38 1 3 18 0.13107200000000000000e6
-38 1 4 11 0.13107200000000000000e6
-38 2 2 4 0.26214400000000000000e6
-38 2 2 8 0.13107200000000000000e6
-38 3 1 6 -0.52428800000000000000e6
-38 3 2 7 0.13107200000000000000e6
-38 3 3 4 0.26214400000000000000e6
-38 3 3 8 0.13107200000000000000e6
-39 1 1 9 0.26214400000000000000e6
-39 1 1 16 -0.26214400000000000000e6
-39 3 1 6 -0.26214400000000000000e6
-40 1 1 10 0.26214400000000000000e6
-40 1 5 8 -0.26214400000000000000e6
-41 1 1 4 -0.26214400000000000000e6
-41 1 1 11 0.26214400000000000000e6
-41 1 2 5 -0.52428800000000000000e6
-41 1 2 17 0.26214400000000000000e6
-41 1 4 11 -0.26214400000000000000e6
-41 1 5 12 0.52428800000000000000e6
-41 2 1 3 -0.26214400000000000000e6
-41 2 1 7 0.26214400000000000000e6
-41 2 1 9 0.52428800000000000000e6
-41 2 2 4 -0.52428800000000000000e6
-41 3 1 2 -0.26214400000000000000e6
-41 3 1 6 0.10485760000000000000e7
-41 3 2 3 -0.26214400000000000000e6
-41 3 2 7 0.26214400000000000000e6
-41 3 3 4 -0.52428800000000000000e6
-42 1 1 4 0.26214400000000000000e6
-42 1 1 12 0.26214400000000000000e6
-42 1 1 16 -0.10485760000000000000e7
-42 1 2 5 0.52428800000000000000e6
-42 1 2 17 0.26214400000000000000e6
-42 1 3 18 0.26214400000000000000e6
-42 1 4 11 0.52428800000000000000e6
-42 2 1 3 0.26214400000000000000e6
-42 2 2 4 0.52428800000000000000e6
-42 2 2 8 0.26214400000000000000e6
-42 3 1 2 0.26214400000000000000e6
-42 3 1 6 -0.10485760000000000000e7
-42 3 2 3 0.26214400000000000000e6
-42 3 2 7 0.26214400000000000000e6
-42 3 3 4 0.52428800000000000000e6
-42 3 3 8 0.26214400000000000000e6
-43 1 1 13 0.26214400000000000000e6
-43 1 2 17 -0.26214400000000000000e6
-43 3 2 7 -0.26214400000000000000e6
-44 1 1 14 0.26214400000000000000e6
-44 1 1 16 -0.52428800000000000000e6
-44 1 2 17 0.13107200000000000000e6
-44 1 3 18 0.13107200000000000000e6
-44 1 4 11 0.13107200000000000000e6
-44 1 5 12 0.26214400000000000000e6
-44 2 1 9 0.26214400000000000000e6
-44 2 2 8 0.13107200000000000000e6
-44 3 2 7 0.13107200000000000000e6
-44 3 3 8 0.13107200000000000000e6
-45 1 1 15 0.26214400000000000000e6
-45 1 5 12 -0.26214400000000000000e6
-46 1 1 17 0.26214400000000000000e6
-46 1 2 17 0.26214400000000000000e6
-46 1 11 14 -0.52428800000000000000e6
-46 1 11 18 0.26214400000000000000e6
-46 2 7 7 0.52428800000000000000e6
-46 3 7 8 0.26214400000000000000e6
-47 1 1 18 0.26214400000000000000e6
-47 1 2 17 -0.26214400000000000000e6
-48 1 1 19 0.26214400000000000000e6
-48 1 11 14 -0.26214400000000000000e6
-49 1 1 4 0.13107200000000000000e6
-49 1 1 16 -0.52428800000000000000e6
-49 1 2 2 0.26214400000000000000e6
-49 1 2 5 0.26214400000000000000e6
-49 1 2 17 0.13107200000000000000e6
-49 1 3 18 0.13107200000000000000e6
-49 1 4 11 0.26214400000000000000e6
-49 2 1 3 0.13107200000000000000e6
-49 2 2 4 0.26214400000000000000e6
-49 2 2 8 0.13107200000000000000e6
-49 3 1 6 -0.52428800000000000000e6
-49 3 2 3 0.13107200000000000000e6
-49 3 2 7 0.13107200000000000000e6
-49 3 3 4 0.26214400000000000000e6
-49 3 3 8 0.13107200000000000000e6
-50 1 1 4 -0.26214400000000000000e6
-50 1 2 3 0.26214400000000000000e6
-51 1 2 4 0.26214400000000000000e6
-51 1 4 11 -0.26214400000000000000e6
-51 3 2 3 -0.26214400000000000000e6
-52 1 1 16 -0.52428800000000000000e6
-52 1 2 5 0.26214400000000000000e6
-52 1 2 6 0.26214400000000000000e6
-52 1 2 17 0.13107200000000000000e6
-52 1 3 18 0.13107200000000000000e6
-52 1 4 11 0.13107200000000000000e6
-52 2 2 4 0.26214400000000000000e6
-52 2 2 8 0.13107200000000000000e6
-52 3 1 6 -0.52428800000000000000e6
-52 3 2 7 0.13107200000000000000e6
-52 3 3 4 0.26214400000000000000e6
-52 3 3 8 0.13107200000000000000e6
-53 1 2 7 0.26214400000000000000e6
-53 1 2 17 -0.13107200000000000000e6
-53 1 3 18 -0.13107200000000000000e6
-53 1 4 11 -0.13107200000000000000e6
-53 2 2 8 -0.13107200000000000000e6
-53 3 2 7 -0.13107200000000000000e6
-53 3 3 4 -0.26214400000000000000e6
-53 3 3 8 -0.13107200000000000000e6
-54 1 1 16 -0.26214400000000000000e6
-54 1 2 8 0.26214400000000000000e6
-54 3 1 6 -0.26214400000000000000e6
-55 1 2 10 0.26214400000000000000e6
-55 1 5 16 -0.26214400000000000000e6
-55 1 6 7 -0.13107200000000000000e6
-55 1 7 14 0.13107200000000000000e6
-55 3 1 6 -0.13107200000000000000e6
-55 3 4 5 -0.13107200000000000000e6
-55 4 3 3 -0.26214400000000000000e6
-56 1 1 4 0.26214400000000000000e6
-56 1 1 16 -0.10485760000000000000e7
-56 1 2 5 0.52428800000000000000e6
-56 1 2 11 0.26214400000000000000e6
-56 1 2 17 0.26214400000000000000e6
-56 1 3 18 0.26214400000000000000e6
-56 1 4 11 0.52428800000000000000e6
-56 2 1 3 0.26214400000000000000e6
-56 2 2 4 0.52428800000000000000e6
-56 2 2 8 0.26214400000000000000e6
-56 3 1 2 0.26214400000000000000e6
-56 3 1 6 -0.10485760000000000000e7
-56 3 2 3 0.26214400000000000000e6
-56 3 2 7 0.26214400000000000000e6
-56 3 3 4 0.52428800000000000000e6
-56 3 3 8 0.26214400000000000000e6
-57 1 2 12 0.26214400000000000000e6
-57 1 2 17 -0.26214400000000000000e6
-57 3 2 7 -0.26214400000000000000e6
-58 1 2 13 0.26214400000000000000e6
-58 1 4 11 -0.26214400000000000000e6
-59 1 2 14 0.26214400000000000000e6
-59 1 5 12 -0.26214400000000000000e6
-60 1 2 15 0.26214400000000000000e6
-60 1 2 17 -0.13107200000000000000e6
-60 1 3 18 -0.13107200000000000000e6
-60 1 4 11 -0.13107200000000000000e6
-60 2 2 8 -0.13107200000000000000e6
-60 3 2 7 -0.13107200000000000000e6
-60 3 3 8 -0.13107200000000000000e6
-61 1 2 9 -0.26214400000000000000e6
-61 1 2 16 0.26214400000000000000e6
-61 3 4 5 0.26214400000000000000e6
-62 1 2 18 0.26214400000000000000e6
-62 1 11 18 -0.26214400000000000000e6
-62 3 7 8 -0.26214400000000000000e6
-63 1 2 9 -0.52428800000000000000e6
-63 1 2 19 0.26214400000000000000e6
-63 1 11 14 0.26214400000000000000e6
-63 1 12 19 0.26214400000000000000e6
-63 2 4 10 0.26214400000000000000e6
-63 3 4 5 0.52428800000000000000e6
-63 3 4 9 0.52428800000000000000e6
-63 3 5 10 0.26214400000000000000e6
-64 1 2 20 0.26214400000000000000e6
-64 1 11 18 -0.26214400000000000000e6
-65 1 3 3 0.26214400000000000000e6
-65 1 4 11 -0.13107200000000000000e6
-65 3 2 3 -0.13107200000000000000e6
-66 1 1 4 0.26214400000000000000e6
-66 1 2 17 -0.26214400000000000000e6
-66 1 3 4 0.26214400000000000000e6
-66 1 3 18 -0.26214400000000000000e6
-66 3 2 3 0.26214400000000000000e6
-66 3 2 7 -0.26214400000000000000e6
-66 3 3 4 -0.52428800000000000000e6
-66 3 3 8 -0.26214400000000000000e6
-66 4 2 2 0.52428800000000000000e6
-67 1 1 16 -0.52428800000000000000e6
-67 1 2 5 0.26214400000000000000e6
-67 1 2 17 0.13107200000000000000e6
-67 1 3 5 0.26214400000000000000e6
-67 1 3 18 0.13107200000000000000e6
-67 1 4 11 0.13107200000000000000e6
-67 2 2 4 0.26214400000000000000e6
-67 2 2 8 0.13107200000000000000e6
-67 3 1 6 -0.52428800000000000000e6
-67 3 2 7 0.13107200000000000000e6
-67 3 3 4 0.26214400000000000000e6
-67 3 3 8 0.13107200000000000000e6
-68 1 2 17 -0.13107200000000000000e6
-68 1 3 6 0.26214400000000000000e6
-68 1 3 18 -0.13107200000000000000e6
-68 1 4 11 -0.13107200000000000000e6
-68 2 2 8 -0.13107200000000000000e6
-68 3 2 7 -0.13107200000000000000e6
-68 3 3 4 -0.26214400000000000000e6
-68 3 3 8 -0.13107200000000000000e6
-69 1 2 17 0.13107200000000000000e6
-69 1 3 7 0.26214400000000000000e6
-69 1 3 18 0.13107200000000000000e6
-69 1 4 7 0.26214400000000000000e6
-69 1 4 11 0.13107200000000000000e6
-69 1 6 7 -0.52428800000000000000e6
-69 2 2 8 0.13107200000000000000e6
-69 2 3 5 0.26214400000000000000e6
-69 3 2 7 0.13107200000000000000e6
-69 3 3 4 0.26214400000000000000e6
-69 3 3 8 0.13107200000000000000e6
-70 1 2 9 -0.26214400000000000000e6
-70 1 3 8 0.26214400000000000000e6
-71 1 3 9 0.26214400000000000000e6
-71 1 6 7 -0.26214400000000000000e6
-72 1 2 17 -0.26214400000000000000e6
-72 1 3 11 0.26214400000000000000e6
-72 3 2 7 -0.26214400000000000000e6
-73 1 3 12 0.26214400000000000000e6
-73 1 4 11 -0.26214400000000000000e6
-74 1 3 13 0.26214400000000000000e6
-74 1 3 18 -0.26214400000000000000e6
-74 3 3 8 -0.26214400000000000000e6
-75 1 2 17 -0.13107200000000000000e6
-75 1 3 14 0.26214400000000000000e6
-75 1 3 18 -0.13107200000000000000e6
-75 1 4 11 -0.13107200000000000000e6
-75 2 2 8 -0.13107200000000000000e6
-75 3 2 7 -0.13107200000000000000e6
-75 3 3 8 -0.13107200000000000000e6
-76 1 3 15 0.26214400000000000000e6
-76 1 6 13 -0.26214400000000000000e6
-77 1 3 16 0.26214400000000000000e6
-77 1 7 14 -0.26214400000000000000e6
-78 1 3 17 0.26214400000000000000e6
-78 1 11 18 -0.26214400000000000000e6
-78 3 7 8 -0.26214400000000000000e6
-79 1 3 19 0.26214400000000000000e6
-79 1 12 19 -0.26214400000000000000e6
-79 3 5 10 -0.26214400000000000000e6
-80 1 1 20 0.26214400000000000000e6
-80 1 2 9 0.10485760000000000000e7
-80 1 2 17 -0.26214400000000000000e6
-80 1 3 18 -0.26214400000000000000e6
-80 1 3 20 0.26214400000000000000e6
-80 1 5 20 -0.52428800000000000000e6
-80 1 11 14 -0.52428800000000000000e6
-80 1 12 19 -0.52428800000000000000e6
-80 2 4 10 -0.52428800000000000000e6
-80 3 4 5 -0.10485760000000000000e7
-80 3 4 9 -0.10485760000000000000e7
-80 3 5 10 -0.52428800000000000000e6
-80 3 7 8 -0.26214400000000000000e6
-80 4 4 4 -0.52428800000000000000e6
-81 1 1 4 -0.13107200000000000000e6
-81 1 2 17 0.26214400000000000000e6
-81 1 3 18 0.26214400000000000000e6
-81 1 4 4 0.26214400000000000000e6
-81 1 4 7 0.26214400000000000000e6
-81 1 4 11 0.26214400000000000000e6
-81 1 6 7 -0.52428800000000000000e6
-81 2 2 8 0.13107200000000000000e6
-81 2 3 3 0.26214400000000000000e6
-81 2 3 5 0.26214400000000000000e6
-81 3 2 7 0.26214400000000000000e6
-81 3 3 4 0.52428800000000000000e6
-81 3 3 8 0.26214400000000000000e6
-81 4 2 2 -0.26214400000000000000e6
-82 1 2 17 -0.13107200000000000000e6
-82 1 3 18 -0.13107200000000000000e6
-82 1 4 5 0.26214400000000000000e6
-82 1 4 11 -0.13107200000000000000e6
-82 2 2 8 -0.13107200000000000000e6
-82 3 2 7 -0.13107200000000000000e6
-82 3 3 4 -0.26214400000000000000e6
-82 3 3 8 -0.13107200000000000000e6
-83 1 2 17 0.13107200000000000000e6
-83 1 3 18 0.13107200000000000000e6
-83 1 4 6 0.26214400000000000000e6
-83 1 4 7 0.26214400000000000000e6
-83 1 4 11 0.13107200000000000000e6
-83 1 6 7 -0.52428800000000000000e6
-83 2 2 8 0.13107200000000000000e6
-83 2 3 5 0.26214400000000000000e6
-83 3 2 7 0.13107200000000000000e6
-83 3 3 4 0.26214400000000000000e6
-83 3 3 8 0.13107200000000000000e6
-84 1 4 8 0.26214400000000000000e6
-84 1 6 7 -0.26214400000000000000e6
-85 1 2 9 0.26214400000000000000e6
-85 1 3 10 -0.52428800000000000000e6
-85 1 4 9 0.26214400000000000000e6
-85 1 6 7 0.26214400000000000000e6
-85 2 5 5 0.52428800000000000000e6
-86 1 3 10 0.26214400000000000000e6
-86 1 4 10 0.26214400000000000000e6
-86 1 5 16 0.26214400000000000000e6
-86 1 6 7 0.13107200000000000000e6
-86 1 7 14 -0.13107200000000000000e6
-86 1 8 9 -0.52428800000000000000e6
-86 2 5 6 0.26214400000000000000e6
-86 3 1 6 0.13107200000000000000e6
-86 3 4 5 0.13107200000000000000e6
-86 4 3 3 0.26214400000000000000e6
-87 1 3 18 -0.26214400000000000000e6
-87 1 4 12 0.26214400000000000000e6
-87 3 3 8 -0.26214400000000000000e6
-88 1 4 14 0.26214400000000000000e6
-88 1 6 13 -0.26214400000000000000e6
-89 1 2 17 0.13107200000000000000e6
-89 1 3 18 0.13107200000000000000e6
-89 1 4 11 0.13107200000000000000e6
-89 1 4 15 0.26214400000000000000e6
-89 1 6 13 0.26214400000000000000e6
-89 1 7 14 -0.52428800000000000000e6
-89 2 2 8 0.13107200000000000000e6
-89 2 3 9 0.26214400000000000000e6
-89 3 2 7 0.13107200000000000000e6
-89 3 3 8 0.13107200000000000000e6
-90 1 2 9 0.26214400000000000000e6
-90 1 4 16 0.26214400000000000000e6
-90 1 7 14 0.26214400000000000000e6
-90 1 8 15 -0.52428800000000000000e6
-90 2 6 8 0.26214400000000000000e6
-90 3 4 5 -0.26214400000000000000e6
-91 1 3 18 -0.26214400000000000000e6
-91 1 4 17 0.26214400000000000000e6
-92 1 3 18 0.26214400000000000000e6
-92 1 4 18 0.26214400000000000000e6
-92 1 11 18 0.26214400000000000000e6
-92 1 12 19 -0.52428800000000000000e6
-92 2 8 8 0.52428800000000000000e6
-92 3 5 10 -0.52428800000000000000e6
-92 3 7 8 0.26214400000000000000e6
-93 1 1 20 -0.26214400000000000000e6
-93 1 2 9 -0.10485760000000000000e7
-93 1 2 17 0.26214400000000000000e6
-93 1 3 18 0.26214400000000000000e6
-93 1 4 20 0.26214400000000000000e6
-93 1 5 20 0.52428800000000000000e6
-93 1 11 14 0.52428800000000000000e6
-93 1 11 18 0.26214400000000000000e6
-93 2 4 10 0.52428800000000000000e6
-93 2 8 10 0.26214400000000000000e6
-93 3 4 5 0.10485760000000000000e7
-93 3 4 9 0.10485760000000000000e7
-93 3 5 10 0.52428800000000000000e6
-93 3 7 8 0.26214400000000000000e6
-93 4 4 4 0.52428800000000000000e6
-94 1 1 8 -0.13107200000000000000e6
-94 1 5 5 0.26214400000000000000e6
-95 1 1 16 -0.26214400000000000000e6
-95 1 5 6 0.26214400000000000000e6
-95 3 1 6 -0.26214400000000000000e6
-96 1 2 9 -0.26214400000000000000e6
-96 1 5 7 0.26214400000000000000e6
-97 1 5 9 0.26214400000000000000e6
-97 1 5 16 -0.26214400000000000000e6
-97 1 6 7 -0.13107200000000000000e6
-97 1 7 14 0.13107200000000000000e6
-97 3 1 6 -0.13107200000000000000e6
-97 3 4 5 -0.13107200000000000000e6
-97 4 3 3 -0.26214400000000000000e6
-98 1 3 10 -0.13107200000000000000e6
-98 1 5 8 -0.13107200000000000000e6
-98 1 5 10 0.26214400000000000000e6
-98 1 5 16 -0.13107200000000000000e6
-98 1 6 7 -0.65536000000000000000e5
-98 1 7 14 0.65536000000000000000e5
-98 2 4 6 -0.13107200000000000000e6
-98 3 1 6 -0.65536000000000000000e5
-98 3 4 5 -0.65536000000000000000e5
-98 4 3 3 -0.13107200000000000000e6
-99 1 1 16 -0.52428800000000000000e6
-99 1 2 17 0.13107200000000000000e6
-99 1 3 18 0.13107200000000000000e6
-99 1 4 11 0.13107200000000000000e6
-99 1 5 11 0.26214400000000000000e6
-99 1 5 12 0.26214400000000000000e6
-99 2 1 9 0.26214400000000000000e6
-99 2 2 8 0.13107200000000000000e6
-99 3 2 7 0.13107200000000000000e6
-99 3 3 8 0.13107200000000000000e6
-100 1 2 17 -0.13107200000000000000e6
-100 1 3 18 -0.13107200000000000000e6
-100 1 4 11 -0.13107200000000000000e6
-100 1 5 13 0.26214400000000000000e6
-100 2 2 8 -0.13107200000000000000e6
-100 3 2 7 -0.13107200000000000000e6
-100 3 3 8 -0.13107200000000000000e6
-101 1 1 16 -0.26214400000000000000e6
-101 1 5 14 0.26214400000000000000e6
-102 1 2 9 -0.26214400000000000000e6
-102 1 5 15 0.26214400000000000000e6
-102 3 4 5 0.26214400000000000000e6
-103 1 5 17 0.26214400000000000000e6
-103 1 11 14 -0.26214400000000000000e6
-104 1 2 9 -0.52428800000000000000e6
-104 1 5 18 0.26214400000000000000e6
-104 1 11 14 0.26214400000000000000e6
-104 1 12 19 0.26214400000000000000e6
-104 2 4 10 0.26214400000000000000e6
-104 3 4 5 0.52428800000000000000e6
-104 3 4 9 0.52428800000000000000e6
-104 3 5 10 0.26214400000000000000e6
-105 1 2 9 -0.26214400000000000000e6
-105 1 5 19 0.26214400000000000000e6
-105 3 4 5 0.26214400000000000000e6
-105 3 4 9 0.26214400000000000000e6
-106 1 2 9 -0.13107200000000000000e6
-106 1 6 6 0.26214400000000000000e6
-107 1 5 16 -0.26214400000000000000e6
-107 1 6 7 -0.13107200000000000000e6
-107 1 6 8 0.26214400000000000000e6
-107 1 7 14 0.13107200000000000000e6
-107 3 1 6 -0.13107200000000000000e6
-107 3 4 5 -0.13107200000000000000e6
-107 4 3 3 -0.26214400000000000000e6
-108 1 3 10 -0.26214400000000000000e6
-108 1 6 9 0.26214400000000000000e6
-109 1 6 10 0.26214400000000000000e6
-109 1 8 9 -0.26214400000000000000e6
-110 1 5 12 -0.26214400000000000000e6
-110 1 6 11 0.26214400000000000000e6
-111 1 2 17 -0.13107200000000000000e6
-111 1 3 18 -0.13107200000000000000e6
-111 1 4 11 -0.13107200000000000000e6
-111 1 6 12 0.26214400000000000000e6
-111 2 2 8 -0.13107200000000000000e6
-111 3 2 7 -0.13107200000000000000e6
-111 3 3 8 -0.13107200000000000000e6
-112 1 2 9 -0.26214400000000000000e6
-112 1 6 14 0.26214400000000000000e6
-112 3 4 5 0.26214400000000000000e6
-113 1 6 15 0.26214400000000000000e6
-113 1 7 14 -0.26214400000000000000e6
-114 1 6 16 0.26214400000000000000e6
-114 1 8 15 -0.26214400000000000000e6
-115 1 2 9 -0.52428800000000000000e6
-115 1 6 17 0.26214400000000000000e6
-115 1 11 14 0.26214400000000000000e6
-115 1 12 19 0.26214400000000000000e6
-115 2 4 10 0.26214400000000000000e6
-115 3 4 5 0.52428800000000000000e6
-115 3 4 9 0.52428800000000000000e6
-115 3 5 10 0.26214400000000000000e6
-116 1 6 18 0.26214400000000000000e6
-116 1 12 19 -0.26214400000000000000e6
-116 3 5 10 -0.26214400000000000000e6
-117 1 6 19 0.26214400000000000000e6
-117 1 14 15 -0.26214400000000000000e6
-118 1 6 20 0.26214400000000000000e6
-118 1 12 19 -0.26214400000000000000e6
-119 1 2 9 0.13107200000000000000e6
-119 1 3 10 -0.26214400000000000000e6
-119 1 6 7 0.13107200000000000000e6
-119 1 7 7 0.26214400000000000000e6
-119 2 5 5 0.26214400000000000000e6
-120 1 3 10 -0.26214400000000000000e6
-120 1 7 8 0.26214400000000000000e6
-121 1 3 10 0.26214400000000000000e6
-121 1 5 16 0.26214400000000000000e6
-121 1 6 7 0.13107200000000000000e6
-121 1 7 9 0.26214400000000000000e6
-121 1 7 14 -0.13107200000000000000e6
-121 1 8 9 -0.52428800000000000000e6
-121 2 5 6 0.26214400000000000000e6
-121 3 1 6 0.13107200000000000000e6
-121 3 4 5 0.13107200000000000000e6
-121 4 3 3 0.26214400000000000000e6
-122 1 2 17 -0.13107200000000000000e6
-122 1 3 18 -0.13107200000000000000e6
-122 1 4 11 -0.13107200000000000000e6
-122 1 7 11 0.26214400000000000000e6
-122 2 2 8 -0.13107200000000000000e6
-122 3 2 7 -0.13107200000000000000e6
-122 3 3 8 -0.13107200000000000000e6
-123 1 6 13 -0.26214400000000000000e6
-123 1 7 12 0.26214400000000000000e6
-124 1 2 17 0.13107200000000000000e6
-124 1 3 18 0.13107200000000000000e6
-124 1 4 11 0.13107200000000000000e6
-124 1 6 13 0.26214400000000000000e6
-124 1 7 13 0.26214400000000000000e6
-124 1 7 14 -0.52428800000000000000e6
-124 2 2 8 0.13107200000000000000e6
-124 2 3 9 0.26214400000000000000e6
-124 3 2 7 0.13107200000000000000e6
-124 3 3 8 0.13107200000000000000e6
-125 1 2 9 0.26214400000000000000e6
-125 1 7 14 0.26214400000000000000e6
-125 1 7 15 0.26214400000000000000e6
-125 1 8 15 -0.52428800000000000000e6
-125 2 6 8 0.26214400000000000000e6
-125 3 4 5 -0.26214400000000000000e6
-126 1 7 16 0.26214400000000000000e6
-126 1 10 13 -0.26214400000000000000e6
-127 1 7 17 0.26214400000000000000e6
-127 1 12 19 -0.26214400000000000000e6
-127 3 5 10 -0.26214400000000000000e6
-128 1 4 19 -0.26214400000000000000e6
-128 1 7 18 0.26214400000000000000e6
-129 1 7 19 0.26214400000000000000e6
-129 1 13 16 -0.26214400000000000000e6
-130 1 7 20 0.26214400000000000000e6
-130 1 15 18 -0.26214400000000000000e6
-131 1 3 10 -0.65536000000000000000e5
-131 1 5 8 -0.65536000000000000000e5
-131 1 5 16 -0.65536000000000000000e5
-131 1 6 7 -0.32768000000000000000e5
-131 1 7 14 0.32768000000000000000e5
-131 1 8 8 0.26214400000000000000e6
-131 2 4 6 -0.65536000000000000000e5
-131 3 1 6 -0.32768000000000000000e5
-131 3 4 5 -0.32768000000000000000e5
-131 4 3 3 -0.65536000000000000000e5
-132 1 3 10 -0.65536000000000000000e5
-132 1 5 8 -0.65536000000000000000e5
-132 1 5 16 -0.65536000000000000000e5
-132 1 6 7 -0.32768000000000000000e5
-132 1 7 10 -0.13107200000000000000e6
-132 1 7 14 0.32768000000000000000e5
-132 1 8 9 -0.13107200000000000000e6
-132 1 8 10 0.26214400000000000000e6
-132 2 4 6 -0.65536000000000000000e5
-132 2 6 6 -0.26214400000000000000e6
-132 3 1 6 -0.32768000000000000000e5
-132 3 4 5 -0.32768000000000000000e5
-132 4 3 3 -0.65536000000000000000e5
-133 1 1 16 -0.26214400000000000000e6
-133 1 8 11 0.26214400000000000000e6
-134 1 2 9 -0.26214400000000000000e6
-134 1 8 12 0.26214400000000000000e6
-134 3 4 5 0.26214400000000000000e6
-135 1 7 14 -0.26214400000000000000e6
-135 1 8 13 0.26214400000000000000e6
-136 1 5 16 -0.26214400000000000000e6
-136 1 8 14 0.26214400000000000000e6
-137 1 8 16 0.26214400000000000000e6
-137 1 10 17 -0.13107200000000000000e6
-137 1 16 19 -0.13107200000000000000e6
-138 1 2 9 -0.26214400000000000000e6
-138 1 8 17 0.26214400000000000000e6
-138 3 4 5 0.26214400000000000000e6
-138 3 4 9 0.26214400000000000000e6
-139 1 8 18 0.26214400000000000000e6
-139 1 14 15 -0.26214400000000000000e6
-140 1 8 19 0.26214400000000000000e6
-140 1 10 17 -0.26214400000000000000e6
-141 1 8 20 0.26214400000000000000e6
-141 1 16 17 -0.26214400000000000000e6
-142 1 7 10 -0.13107200000000000000e6
-142 1 9 9 0.26214400000000000000e6
-143 1 2 9 -0.26214400000000000000e6
-143 1 9 11 0.26214400000000000000e6
-143 3 4 5 0.26214400000000000000e6
-144 1 7 14 -0.26214400000000000000e6
-144 1 9 12 0.26214400000000000000e6
-145 1 2 9 0.26214400000000000000e6
-145 1 7 14 0.26214400000000000000e6
-145 1 8 15 -0.52428800000000000000e6
-145 1 9 13 0.26214400000000000000e6
-145 2 6 8 0.26214400000000000000e6
-145 3 4 5 -0.26214400000000000000e6
-146 1 8 15 -0.26214400000000000000e6
-146 1 9 14 0.26214400000000000000e6
-147 1 9 15 0.26214400000000000000e6
-147 1 10 13 -0.26214400000000000000e6
-148 1 9 17 0.26214400000000000000e6
-148 1 14 15 -0.26214400000000000000e6
-149 1 9 18 0.26214400000000000000e6
-149 1 13 16 -0.26214400000000000000e6
-150 1 9 19 0.26214400000000000000e6
-150 1 15 16 -0.26214400000000000000e6
-151 1 5 16 -0.26214400000000000000e6
-151 1 10 11 0.26214400000000000000e6
-152 1 8 15 -0.26214400000000000000e6
-152 1 10 12 0.26214400000000000000e6
-153 1 10 14 0.26214400000000000000e6
-153 1 10 17 -0.13107200000000000000e6
-153 1 16 19 -0.13107200000000000000e6
-154 1 9 16 -0.26214400000000000000e6
-154 1 10 15 0.26214400000000000000e6
-155 1 10 18 0.26214400000000000000e6
-155 1 15 16 -0.26214400000000000000e6
-156 1 10 20 0.26214400000000000000e6
-156 1 16 19 -0.26214400000000000000e6
-157 1 2 17 0.13107200000000000000e6
-157 1 11 11 0.26214400000000000000e6
-157 1 11 14 -0.26214400000000000000e6
-157 1 11 18 0.13107200000000000000e6
-157 2 7 7 0.26214400000000000000e6
-157 3 7 8 0.13107200000000000000e6
-158 1 2 17 -0.26214400000000000000e6
-158 1 11 12 0.26214400000000000000e6
-159 1 11 13 0.26214400000000000000e6
-159 1 11 18 -0.26214400000000000000e6
-159 3 7 8 -0.26214400000000000000e6
-160 1 2 9 -0.52428800000000000000e6
-160 1 11 14 0.26214400000000000000e6
-160 1 11 15 0.26214400000000000000e6
-160 1 12 19 0.26214400000000000000e6
-160 2 4 10 0.26214400000000000000e6
-160 3 4 5 0.52428800000000000000e6
-160 3 4 9 0.52428800000000000000e6
-160 3 5 10 0.26214400000000000000e6
-161 1 2 9 -0.26214400000000000000e6
-161 1 11 16 0.26214400000000000000e6
-161 3 4 5 0.26214400000000000000e6
-161 3 4 9 0.26214400000000000000e6
-162 1 1 20 -0.26214400000000000000e6
-162 1 11 17 0.26214400000000000000e6
-163 1 5 20 -0.26214400000000000000e6
-163 1 11 19 0.26214400000000000000e6
-164 1 11 20 0.26214400000000000000e6
-164 1 12 19 -0.52428800000000000000e6
-164 1 13 20 0.26214400000000000000e6
-164 1 17 18 0.26214400000000000000e6
-164 2 10 10 0.52428800000000000000e6
-164 3 9 10 0.52428800000000000000e6
-165 1 11 18 -0.13107200000000000000e6
-165 1 12 12 0.26214400000000000000e6
-165 3 7 8 -0.13107200000000000000e6
-166 1 3 18 -0.26214400000000000000e6
-166 1 12 13 0.26214400000000000000e6
-167 1 2 9 -0.52428800000000000000e6
-167 1 11 14 0.26214400000000000000e6
-167 1 12 14 0.26214400000000000000e6
-167 1 12 19 0.26214400000000000000e6
-167 2 4 10 0.26214400000000000000e6
-167 3 4 5 0.52428800000000000000e6
-167 3 4 9 0.52428800000000000000e6
-167 3 5 10 0.26214400000000000000e6
-168 1 12 15 0.26214400000000000000e6
-168 1 12 19 -0.26214400000000000000e6
-168 3 5 10 -0.26214400000000000000e6
-169 1 12 16 0.26214400000000000000e6
-169 1 14 15 -0.26214400000000000000e6
-170 1 11 18 -0.26214400000000000000e6
-170 1 12 17 0.26214400000000000000e6
-171 1 1 20 0.26214400000000000000e6
-171 1 2 9 0.10485760000000000000e7
-171 1 2 17 -0.26214400000000000000e6
-171 1 3 18 -0.26214400000000000000e6
-171 1 5 20 -0.52428800000000000000e6
-171 1 11 14 -0.52428800000000000000e6
-171 1 12 18 0.26214400000000000000e6
-171 1 12 19 -0.52428800000000000000e6
-171 2 4 10 -0.52428800000000000000e6
-171 3 4 5 -0.10485760000000000000e7
-171 3 4 9 -0.10485760000000000000e7
-171 3 5 10 -0.52428800000000000000e6
-171 3 7 8 -0.26214400000000000000e6
-171 4 4 4 -0.52428800000000000000e6
-172 1 12 20 0.26214400000000000000e6
-172 1 17 18 -0.26214400000000000000e6
-173 1 3 18 0.13107200000000000000e6
-173 1 11 18 0.13107200000000000000e6
-173 1 12 19 -0.26214400000000000000e6
-173 1 13 13 0.26214400000000000000e6
-173 2 8 8 0.26214400000000000000e6
-173 3 5 10 -0.26214400000000000000e6
-173 3 7 8 0.13107200000000000000e6
-174 1 12 19 -0.26214400000000000000e6
-174 1 13 14 0.26214400000000000000e6
-174 3 5 10 -0.26214400000000000000e6
-175 1 4 19 -0.26214400000000000000e6
-175 1 13 15 0.26214400000000000000e6
-176 1 1 20 0.26214400000000000000e6
-176 1 2 9 0.10485760000000000000e7
-176 1 2 17 -0.26214400000000000000e6
-176 1 3 18 -0.26214400000000000000e6
-176 1 5 20 -0.52428800000000000000e6
-176 1 11 14 -0.52428800000000000000e6
-176 1 12 19 -0.52428800000000000000e6
-176 1 13 17 0.26214400000000000000e6
-176 2 4 10 -0.52428800000000000000e6
-176 3 4 5 -0.10485760000000000000e7
-176 3 4 9 -0.10485760000000000000e7
-176 3 5 10 -0.52428800000000000000e6
-176 3 7 8 -0.26214400000000000000e6
-176 4 4 4 -0.52428800000000000000e6
-177 1 1 20 -0.26214400000000000000e6
-177 1 2 9 -0.10485760000000000000e7
-177 1 2 17 0.26214400000000000000e6
-177 1 3 18 0.26214400000000000000e6
-177 1 5 20 0.52428800000000000000e6
-177 1 11 14 0.52428800000000000000e6
-177 1 11 18 0.26214400000000000000e6
-177 1 13 18 0.26214400000000000000e6
-177 2 4 10 0.52428800000000000000e6
-177 2 8 10 0.26214400000000000000e6
-177 3 4 5 0.10485760000000000000e7
-177 3 4 9 0.10485760000000000000e7
-177 3 5 10 0.52428800000000000000e6
-177 3 7 8 0.26214400000000000000e6
-177 4 4 4 0.52428800000000000000e6
-178 1 13 19 0.26214400000000000000e6
-178 1 15 18 -0.26214400000000000000e6
-179 1 2 9 -0.13107200000000000000e6
-179 1 14 14 0.26214400000000000000e6
-179 3 4 5 0.13107200000000000000e6
-179 3 4 9 0.13107200000000000000e6
-180 1 10 17 -0.26214400000000000000e6
-180 1 14 16 0.26214400000000000000e6
-181 1 5 20 -0.26214400000000000000e6
-181 1 14 17 0.26214400000000000000e6
-182 1 12 19 -0.26214400000000000000e6
-182 1 14 18 0.26214400000000000000e6
-183 1 14 19 0.26214400000000000000e6
-183 1 16 17 -0.26214400000000000000e6
-184 1 12 19 -0.26214400000000000000e6
-184 1 14 20 0.26214400000000000000e6
-184 3 9 10 0.26214400000000000000e6
-185 1 13 16 -0.13107200000000000000e6
-185 1 15 15 0.26214400000000000000e6
-186 1 12 19 -0.26214400000000000000e6
-186 1 15 17 0.26214400000000000000e6
-187 1 9 20 -0.26214400000000000000e6
-187 1 15 19 0.26214400000000000000e6
-188 1 15 20 0.26214400000000000000e6
-188 1 18 19 -0.26214400000000000000e6
-189 1 10 19 -0.13107200000000000000e6
-189 1 16 16 0.26214400000000000000e6
-190 1 9 20 -0.26214400000000000000e6
-190 1 16 18 0.26214400000000000000e6
-191 1 16 20 0.26214400000000000000e6
-191 1 19 19 -0.52428800000000000000e6
-192 1 12 19 -0.26214400000000000000e6
-192 1 13 20 0.13107200000000000000e6
-192 1 17 17 0.26214400000000000000e6
-192 1 17 18 0.13107200000000000000e6
-192 2 10 10 0.26214400000000000000e6
-192 3 9 10 0.26214400000000000000e6
-193 1 12 19 -0.26214400000000000000e6
-193 1 17 19 0.26214400000000000000e6
-193 3 9 10 0.26214400000000000000e6
-194 1 13 20 -0.13107200000000000000e6
-194 1 18 18 0.26214400000000000000e6
-195 1 12 19 -0.52428800000000000000e6
-195 1 17 18 0.26214400000000000000e6
-195 1 18 20 0.26214400000000000000e6
-196 2 1 2 0.26214400000000000000e6
-196 2 1 7 -0.26214400000000000000e6
-196 4 1 1 -0.52428800000000000000e6
-197 1 1 4 0.13107200000000000000e6
-197 1 1 8 -0.52428800000000000000e6
-197 1 1 16 0.52428800000000000000e6
-197 1 2 5 0.26214400000000000000e6
-197 1 2 17 -0.39321600000000000000e6
-197 1 3 18 -0.13107200000000000000e6
-197 1 5 12 -0.26214400000000000000e6
-197 1 11 14 0.26214400000000000000e6
-197 1 11 18 -0.13107200000000000000e6
-197 2 1 3 0.13107200000000000000e6
-197 2 1 4 0.26214400000000000000e6
-197 2 1 7 -0.13107200000000000000e6
-197 2 1 9 -0.26214400000000000000e6
-197 2 2 8 -0.13107200000000000000e6
-197 2 7 7 -0.26214400000000000000e6
-197 3 1 2 0.13107200000000000000e6
-197 3 2 3 0.13107200000000000000e6
-197 3 2 7 -0.26214400000000000000e6
-197 3 3 8 -0.13107200000000000000e6
-197 3 7 8 -0.13107200000000000000e6
-198 2 1 5 0.26214400000000000000e6
-198 2 2 4 -0.26214400000000000000e6
-199 1 1 8 0.26214400000000000000e6
-199 1 1 16 0.26214400000000000000e6
-199 1 2 9 0.26214400000000000000e6
-199 1 5 8 -0.52428800000000000000e6
-199 2 1 6 0.26214400000000000000e6
-199 3 1 6 0.26214400000000000000e6
-200 1 1 4 -0.26214400000000000000e6
-200 1 1 16 0.10485760000000000000e7
-200 1 2 5 -0.52428800000000000000e6
-200 1 3 18 -0.26214400000000000000e6
-200 1 4 11 -0.26214400000000000000e6
-200 1 5 12 -0.52428800000000000000e6
-200 2 1 3 -0.26214400000000000000e6
-200 2 1 8 0.26214400000000000000e6
-200 2 2 4 -0.52428800000000000000e6
-200 2 2 8 -0.26214400000000000000e6
-200 3 1 2 -0.26214400000000000000e6
-200 3 1 6 0.10485760000000000000e7
-200 3 2 3 -0.26214400000000000000e6
-200 3 3 4 -0.52428800000000000000e6
-200 3 3 8 -0.26214400000000000000e6
-201 2 1 10 0.26214400000000000000e6
-201 2 7 7 -0.52428800000000000000e6
-202 2 1 3 -0.13107200000000000000e6
-202 2 2 2 0.26214400000000000000e6
-203 2 2 3 0.26214400000000000000e6
-203 2 2 8 -0.26214400000000000000e6
-203 4 2 2 -0.52428800000000000000e6
-204 1 1 16 0.52428800000000000000e6
-204 1 2 5 -0.26214400000000000000e6
-204 1 2 9 -0.52428800000000000000e6
-204 1 2 17 -0.13107200000000000000e6
-204 1 3 18 -0.13107200000000000000e6
-204 1 4 7 -0.26214400000000000000e6
-204 1 4 11 -0.13107200000000000000e6
-204 1 6 7 0.52428800000000000000e6
-204 2 2 4 -0.26214400000000000000e6
-204 2 2 5 0.26214400000000000000e6
-204 2 2 8 -0.13107200000000000000e6
-204 2 3 5 -0.26214400000000000000e6
-204 3 1 6 0.52428800000000000000e6
-204 3 2 7 -0.13107200000000000000e6
-204 3 3 4 -0.26214400000000000000e6
-204 3 3 8 -0.13107200000000000000e6
-205 1 1 16 0.26214400000000000000e6
-205 1 2 9 0.26214400000000000000e6
-205 1 5 16 -0.52428800000000000000e6
-205 1 7 14 0.26214400000000000000e6
-205 2 2 6 0.26214400000000000000e6
-205 3 4 5 -0.26214400000000000000e6
-205 4 3 3 -0.52428800000000000000e6
-206 1 1 4 -0.26214400000000000000e6
-206 1 1 16 0.10485760000000000000e7
-206 1 2 5 -0.52428800000000000000e6
-206 1 3 18 -0.26214400000000000000e6
-206 1 4 11 -0.26214400000000000000e6
-206 1 5 12 -0.52428800000000000000e6
-206 2 1 3 -0.26214400000000000000e6
-206 2 2 4 -0.52428800000000000000e6
-206 2 2 7 0.26214400000000000000e6
-206 2 2 8 -0.26214400000000000000e6
-206 3 1 2 -0.26214400000000000000e6
-206 3 1 6 0.10485760000000000000e7
-206 3 2 3 -0.26214400000000000000e6
-206 3 3 4 -0.52428800000000000000e6
-206 3 3 8 -0.26214400000000000000e6
-207 1 2 9 -0.52428800000000000000e6
-207 1 2 17 0.13107200000000000000e6
-207 1 3 18 0.13107200000000000000e6
-207 1 4 11 0.13107200000000000000e6
-207 1 5 12 0.26214400000000000000e6
-207 1 6 13 0.26214400000000000000e6
-207 2 2 8 0.13107200000000000000e6
-207 2 2 9 0.26214400000000000000e6
-207 3 2 7 0.13107200000000000000e6
-207 3 3 8 0.13107200000000000000e6
-207 3 4 5 0.52428800000000000000e6
-208 1 2 9 -0.10485760000000000000e7
-208 1 2 17 0.26214400000000000000e6
-208 1 3 18 0.26214400000000000000e6
-208 1 11 14 0.52428800000000000000e6
-208 1 11 18 0.26214400000000000000e6
-208 1 12 19 0.52428800000000000000e6
-208 2 2 10 0.26214400000000000000e6
-208 2 4 10 0.52428800000000000000e6
-208 3 4 5 0.10485760000000000000e7
-208 3 4 9 0.10485760000000000000e7
-208 3 5 10 0.52428800000000000000e6
-208 3 7 8 0.26214400000000000000e6
-209 1 1 16 0.52428800000000000000e6
-209 1 2 5 -0.26214400000000000000e6
-209 1 2 9 -0.52428800000000000000e6
-209 1 2 17 -0.13107200000000000000e6
-209 1 3 18 -0.13107200000000000000e6
-209 1 4 7 -0.26214400000000000000e6
-209 1 4 11 -0.13107200000000000000e6
-209 1 6 7 0.52428800000000000000e6
-209 2 2 4 -0.26214400000000000000e6
-209 2 2 8 -0.13107200000000000000e6
-209 2 3 4 0.26214400000000000000e6
-209 2 3 5 -0.26214400000000000000e6
-209 3 1 6 0.52428800000000000000e6
-209 3 2 7 -0.13107200000000000000e6
-209 3 3 4 -0.26214400000000000000e6
-209 3 3 8 -0.13107200000000000000e6
-210 2 3 6 0.26214400000000000000e6
-210 2 5 5 -0.52428800000000000000e6
-211 2 2 8 -0.26214400000000000000e6
-211 2 3 7 0.26214400000000000000e6
-212 1 3 18 0.26214400000000000000e6
-212 1 4 11 0.26214400000000000000e6
-212 1 4 13 0.26214400000000000000e6
-212 1 6 13 -0.52428800000000000000e6
-212 2 3 8 0.26214400000000000000e6
-212 3 3 8 0.26214400000000000000e6
-213 2 3 10 0.26214400000000000000e6
-213 2 8 8 -0.52428800000000000000e6
-214 1 1 8 0.13107200000000000000e6
-214 1 1 16 0.13107200000000000000e6
-214 1 2 9 0.13107200000000000000e6
-214 1 5 8 -0.26214400000000000000e6
-214 2 4 4 0.26214400000000000000e6
-214 3 1 6 0.13107200000000000000e6
-215 1 1 16 0.26214400000000000000e6
-215 1 2 9 0.26214400000000000000e6
-215 1 5 16 -0.52428800000000000000e6
-215 1 7 14 0.26214400000000000000e6
-215 2 4 5 0.26214400000000000000e6
-215 3 4 5 -0.26214400000000000000e6
-215 4 3 3 -0.52428800000000000000e6
-216 2 1 9 -0.26214400000000000000e6
-216 2 4 7 0.26214400000000000000e6
-217 1 2 9 -0.52428800000000000000e6
-217 1 2 17 0.13107200000000000000e6
-217 1 3 18 0.13107200000000000000e6
-217 1 4 11 0.13107200000000000000e6
-217 1 5 12 0.26214400000000000000e6
-217 1 6 13 0.26214400000000000000e6
-217 2 2 8 0.13107200000000000000e6
-217 2 4 8 0.26214400000000000000e6
-217 3 2 7 0.13107200000000000000e6
-217 3 3 8 0.13107200000000000000e6
-217 3 4 5 0.52428800000000000000e6
-218 1 1 16 0.26214400000000000000e6
-218 1 2 9 0.26214400000000000000e6
-218 1 5 16 -0.52428800000000000000e6
-218 1 7 14 0.26214400000000000000e6
-218 2 4 9 0.26214400000000000000e6
-218 3 4 5 -0.26214400000000000000e6
-219 1 2 9 -0.52428800000000000000e6
-219 1 2 17 0.13107200000000000000e6
-219 1 3 18 0.13107200000000000000e6
-219 1 4 11 0.13107200000000000000e6
-219 1 5 12 0.26214400000000000000e6
-219 1 6 13 0.26214400000000000000e6
-219 2 2 8 0.13107200000000000000e6
-219 2 5 7 0.26214400000000000000e6
-219 3 2 7 0.13107200000000000000e6
-219 3 3 8 0.13107200000000000000e6
-219 3 4 5 0.52428800000000000000e6
-220 2 3 9 -0.26214400000000000000e6
-220 2 5 8 0.26214400000000000000e6
-221 2 5 9 0.26214400000000000000e6
-221 2 6 8 -0.26214400000000000000e6
-222 1 2 9 0.52428800000000000000e6
-222 1 4 19 0.26214400000000000000e6
-222 1 11 14 -0.26214400000000000000e6
-222 1 14 15 -0.52428800000000000000e6
-222 2 4 10 -0.26214400000000000000e6
-222 2 5 10 0.26214400000000000000e6
-222 3 4 5 -0.52428800000000000000e6
-222 3 4 9 -0.52428800000000000000e6
-223 1 1 16 0.26214400000000000000e6
-223 1 2 9 0.26214400000000000000e6
-223 1 5 16 -0.52428800000000000000e6
-223 1 7 14 0.26214400000000000000e6
-223 2 6 7 0.26214400000000000000e6
-223 3 4 5 -0.26214400000000000000e6
-224 1 5 16 0.26214400000000000000e6
-224 1 8 15 0.26214400000000000000e6
-224 1 10 13 0.26214400000000000000e6
-224 1 10 17 -0.26214400000000000000e6
-224 1 16 19 -0.26214400000000000000e6
-224 2 6 9 0.26214400000000000000e6
-225 1 2 9 0.26214400000000000000e6
-225 1 10 17 -0.52428800000000000000e6
-225 1 13 16 0.26214400000000000000e6
-225 1 14 15 0.26214400000000000000e6
-225 2 6 10 0.26214400000000000000e6
-225 3 4 5 -0.26214400000000000000e6
-225 3 4 9 -0.26214400000000000000e6
-226 1 2 9 -0.10485760000000000000e7
-226 1 2 17 0.26214400000000000000e6
-226 1 3 18 0.26214400000000000000e6
-226 1 11 14 0.52428800000000000000e6
-226 1 11 18 0.26214400000000000000e6
-226 1 12 19 0.52428800000000000000e6
-226 2 4 10 0.52428800000000000000e6
-226 2 7 8 0.26214400000000000000e6
-226 3 4 5 0.10485760000000000000e7
-226 3 4 9 0.10485760000000000000e7
-226 3 5 10 0.52428800000000000000e6
-226 3 7 8 0.26214400000000000000e6
-227 2 4 10 -0.26214400000000000000e6
-227 2 7 9 0.26214400000000000000e6
-228 1 2 9 -0.10485760000000000000e7
-228 1 2 17 0.26214400000000000000e6
-228 1 3 18 0.26214400000000000000e6
-228 1 11 14 0.52428800000000000000e6
-228 1 11 18 0.26214400000000000000e6
-228 1 12 19 0.52428800000000000000e6
-228 2 4 10 0.52428800000000000000e6
-228 2 7 10 0.26214400000000000000e6
-228 3 4 5 0.10485760000000000000e7
-228 3 4 9 0.10485760000000000000e7
-228 3 5 10 0.52428800000000000000e6
-228 3 7 8 0.26214400000000000000e6
-228 4 4 4 0.52428800000000000000e6
-229 1 2 9 0.52428800000000000000e6
-229 1 4 19 0.26214400000000000000e6
-229 1 11 14 -0.26214400000000000000e6
-229 1 14 15 -0.52428800000000000000e6
-229 2 4 10 -0.26214400000000000000e6
-229 2 8 9 0.26214400000000000000e6
-229 3 4 5 -0.52428800000000000000e6
-229 3 4 9 -0.52428800000000000000e6
-230 1 2 9 0.13107200000000000000e6
-230 1 10 17 -0.26214400000000000000e6
-230 1 13 16 0.13107200000000000000e6
-230 1 14 15 0.13107200000000000000e6
-230 2 9 9 0.26214400000000000000e6
-230 3 4 5 -0.13107200000000000000e6
-230 3 4 9 -0.13107200000000000000e6
-231 1 5 20 0.26214400000000000000e6
-231 1 12 19 0.26214400000000000000e6
-231 1 15 18 0.26214400000000000000e6
-231 1 16 17 -0.52428800000000000000e6
-231 2 9 10 0.26214400000000000000e6
-232 1 1 4 0.13107200000000000000e6
-232 1 1 16 0.52428800000000000000e6
-232 1 2 5 -0.26214400000000000000e6
-232 1 2 17 -0.26214400000000000000e6
-232 1 3 18 -0.13107200000000000000e6
-232 1 4 11 -0.13107200000000000000e6
-232 1 5 12 -0.26214400000000000000e6
-232 2 1 9 -0.26214400000000000000e6
-232 2 2 8 -0.13107200000000000000e6
-232 3 1 1 0.26214400000000000000e6
-232 3 1 2 0.13107200000000000000e6
-232 3 2 7 -0.26214400000000000000e6
-232 3 3 8 -0.13107200000000000000e6
-232 4 1 1 0.26214400000000000000e6
-233 1 1 4 -0.26214400000000000000e6
-233 1 2 17 0.26214400000000000000e6
-233 3 1 3 0.26214400000000000000e6
-233 3 2 7 0.26214400000000000000e6
-234 1 1 16 0.52428800000000000000e6
-234 1 2 5 -0.26214400000000000000e6
-234 1 2 17 -0.13107200000000000000e6
-234 1 3 18 -0.13107200000000000000e6
-234 1 4 11 -0.13107200000000000000e6
-234 1 5 12 -0.26214400000000000000e6
-234 2 1 9 -0.26214400000000000000e6
-234 2 2 8 -0.13107200000000000000e6
-234 3 1 4 0.26214400000000000000e6
-234 3 2 7 -0.13107200000000000000e6
-234 3 3 8 -0.13107200000000000000e6
-235 1 1 16 -0.52428800000000000000e6
-235 1 2 5 0.26214400000000000000e6
-235 1 2 17 0.13107200000000000000e6
-235 1 3 18 0.13107200000000000000e6
-235 1 4 11 0.13107200000000000000e6
-235 1 5 12 0.26214400000000000000e6
-235 2 2 4 0.26214400000000000000e6
-235 2 2 8 0.13107200000000000000e6
-235 3 1 5 0.26214400000000000000e6
-235 3 1 6 -0.52428800000000000000e6
-235 3 2 7 0.13107200000000000000e6
-235 3 3 4 0.26214400000000000000e6
-235 3 3 8 0.13107200000000000000e6
-236 1 1 4 0.26214400000000000000e6
-236 1 1 16 -0.10485760000000000000e7
-236 1 2 5 0.52428800000000000000e6
-236 1 3 18 0.26214400000000000000e6
-236 1 4 11 0.52428800000000000000e6
-236 1 11 14 0.52428800000000000000e6
-236 1 11 18 -0.26214400000000000000e6
-236 2 1 3 0.26214400000000000000e6
-236 2 2 4 0.52428800000000000000e6
-236 2 2 8 0.26214400000000000000e6
-236 2 7 7 -0.52428800000000000000e6
-236 3 1 2 0.26214400000000000000e6
-236 3 1 6 -0.10485760000000000000e7
-236 3 1 7 0.26214400000000000000e6
-236 3 2 3 0.26214400000000000000e6
-236 3 2 7 0.26214400000000000000e6
-236 3 3 4 0.52428800000000000000e6
-236 3 3 8 0.26214400000000000000e6
-236 3 7 8 -0.26214400000000000000e6
-237 3 1 8 0.26214400000000000000e6
-237 3 2 7 -0.26214400000000000000e6
-238 1 5 12 -0.26214400000000000000e6
-238 1 11 14 0.26214400000000000000e6
-238 3 1 9 0.26214400000000000000e6
-239 1 1 20 0.26214400000000000000e6
-239 1 2 17 -0.26214400000000000000e6
-239 3 1 10 0.26214400000000000000e6
-240 1 1 4 -0.13107200000000000000e6
-240 1 2 17 0.13107200000000000000e6
-240 3 2 2 0.26214400000000000000e6
-240 3 2 7 0.13107200000000000000e6
-241 1 1 16 -0.52428800000000000000e6
-241 1 2 5 0.26214400000000000000e6
-241 1 2 17 0.13107200000000000000e6
-241 1 3 18 0.13107200000000000000e6
-241 1 4 11 0.13107200000000000000e6
-241 1 5 12 0.26214400000000000000e6
-241 2 2 4 0.26214400000000000000e6
-241 2 2 8 0.13107200000000000000e6
-241 3 1 6 -0.52428800000000000000e6
-241 3 2 4 0.26214400000000000000e6
-241 3 2 7 0.13107200000000000000e6
-241 3 3 4 0.26214400000000000000e6
-241 3 3 8 0.13107200000000000000e6
-242 3 2 5 0.26214400000000000000e6
-242 3 3 4 -0.26214400000000000000e6
-243 3 2 6 0.26214400000000000000e6
-243 3 4 5 -0.26214400000000000000e6
-244 1 4 11 -0.26214400000000000000e6
-244 1 11 18 0.26214400000000000000e6
-244 3 2 8 0.26214400000000000000e6
-244 3 7 8 0.26214400000000000000e6
-245 1 2 9 0.52428800000000000000e6
-245 1 2 17 -0.13107200000000000000e6
-245 1 3 18 -0.13107200000000000000e6
-245 1 4 11 -0.13107200000000000000e6
-245 1 11 14 -0.26214400000000000000e6
-245 1 12 19 -0.26214400000000000000e6
-245 2 2 8 -0.13107200000000000000e6
-245 2 4 10 -0.26214400000000000000e6
-245 3 2 7 -0.13107200000000000000e6
-245 3 2 9 0.26214400000000000000e6
-245 3 3 8 -0.13107200000000000000e6
-245 3 4 5 -0.52428800000000000000e6
-245 3 4 9 -0.52428800000000000000e6
-245 3 5 10 -0.26214400000000000000e6
-246 3 2 10 0.26214400000000000000e6
-246 3 7 8 -0.26214400000000000000e6
-247 1 1 4 0.13107200000000000000e6
-247 1 2 17 -0.13107200000000000000e6
-247 3 2 3 0.13107200000000000000e6
-247 3 2 7 -0.13107200000000000000e6
-247 3 3 3 0.26214400000000000000e6
-247 3 3 4 -0.26214400000000000000e6
-247 4 2 2 0.26214400000000000000e6
-248 1 2 17 0.13107200000000000000e6
-248 1 3 18 0.13107200000000000000e6
-248 1 4 7 0.26214400000000000000e6
-248 1 4 11 0.13107200000000000000e6
-248 1 6 7 -0.52428800000000000000e6
-248 1 6 13 0.26214400000000000000e6
-248 2 2 8 0.13107200000000000000e6
-248 2 3 5 0.26214400000000000000e6
-248 3 2 7 0.13107200000000000000e6
-248 3 3 4 0.26214400000000000000e6
-248 3 3 5 0.26214400000000000000e6
-248 3 3 8 0.13107200000000000000e6
-249 1 6 7 -0.26214400000000000000e6
-249 1 7 14 0.26214400000000000000e6
-249 3 3 6 0.26214400000000000000e6
-250 1 4 11 -0.26214400000000000000e6
-250 1 11 18 0.26214400000000000000e6
-250 3 3 7 0.26214400000000000000e6
-250 3 7 8 0.26214400000000000000e6
-251 1 6 13 -0.26214400000000000000e6
-251 1 12 19 0.26214400000000000000e6
-251 3 3 9 0.26214400000000000000e6
-251 3 5 10 0.26214400000000000000e6
-252 1 1 20 -0.26214400000000000000e6
-252 1 2 9 -0.10485760000000000000e7
-252 1 2 17 0.26214400000000000000e6
-252 1 5 20 0.52428800000000000000e6
-252 1 11 14 0.52428800000000000000e6
-252 1 12 19 0.52428800000000000000e6
-252 2 4 10 0.52428800000000000000e6
-252 3 3 10 0.26214400000000000000e6
-252 3 4 5 0.10485760000000000000e7
-252 3 4 9 0.10485760000000000000e7
-252 3 5 10 0.52428800000000000000e6
-252 3 7 8 0.26214400000000000000e6
-252 4 4 4 0.52428800000000000000e6
-253 3 1 6 -0.13107200000000000000e6
-253 3 4 4 0.26214400000000000000e6
-254 1 6 7 -0.13107200000000000000e6
-254 1 7 14 0.13107200000000000000e6
-254 3 1 6 -0.13107200000000000000e6
-254 3 4 5 -0.13107200000000000000e6
-254 3 4 6 0.26214400000000000000e6
-254 4 3 3 -0.26214400000000000000e6
-255 1 5 12 -0.26214400000000000000e6
-255 1 11 14 0.26214400000000000000e6
-255 3 4 7 0.26214400000000000000e6
-256 1 2 9 0.52428800000000000000e6
-256 1 2 17 -0.13107200000000000000e6
-256 1 3 18 -0.13107200000000000000e6
-256 1 4 11 -0.13107200000000000000e6
-256 1 11 14 -0.26214400000000000000e6
-256 1 12 19 -0.26214400000000000000e6
-256 2 2 8 -0.13107200000000000000e6
-256 2 4 10 -0.26214400000000000000e6
-256 3 2 7 -0.13107200000000000000e6
-256 3 3 8 -0.13107200000000000000e6
-256 3 4 5 -0.52428800000000000000e6
-256 3 4 8 0.26214400000000000000e6
-256 3 4 9 -0.52428800000000000000e6
-256 3 5 10 -0.26214400000000000000e6
-257 1 2 9 -0.52428800000000000000e6
-257 1 5 20 0.26214400000000000000e6
-257 1 11 14 0.26214400000000000000e6
-257 1 12 19 0.26214400000000000000e6
-257 2 4 10 0.26214400000000000000e6
-257 3 4 5 0.52428800000000000000e6
-257 3 4 9 0.52428800000000000000e6
-257 3 4 10 0.26214400000000000000e6
-257 3 5 10 0.26214400000000000000e6
-258 1 6 7 -0.13107200000000000000e6
-258 1 7 14 0.13107200000000000000e6
-258 3 5 5 0.26214400000000000000e6
-259 1 3 10 -0.26214400000000000000e6
-259 1 8 15 0.26214400000000000000e6
-259 3 5 6 0.26214400000000000000e6
-260 1 2 9 0.52428800000000000000e6
-260 1 2 17 -0.13107200000000000000e6
-260 1 3 18 -0.13107200000000000000e6
-260 1 4 11 -0.13107200000000000000e6
-260 1 11 14 -0.26214400000000000000e6
-260 1 12 19 -0.26214400000000000000e6
-260 2 2 8 -0.13107200000000000000e6
-260 2 4 10 -0.26214400000000000000e6
-260 3 2 7 -0.13107200000000000000e6
-260 3 3 8 -0.13107200000000000000e6
-260 3 4 5 -0.52428800000000000000e6
-260 3 4 9 -0.52428800000000000000e6
-260 3 5 7 0.26214400000000000000e6
-260 3 5 10 -0.26214400000000000000e6
-261 1 6 13 -0.26214400000000000000e6
-261 1 12 19 0.26214400000000000000e6
-261 3 5 8 0.26214400000000000000e6
-261 3 5 10 0.26214400000000000000e6
-262 1 7 14 -0.26214400000000000000e6
-262 1 14 15 0.26214400000000000000e6
-262 3 5 9 0.26214400000000000000e6
-263 1 8 9 -0.13107200000000000000e6
-263 1 10 17 0.65536000000000000000e5
-263 1 16 19 0.65536000000000000000e5
-263 3 6 6 0.26214400000000000000e6
-264 3 4 9 -0.26214400000000000000e6
-264 3 6 7 0.26214400000000000000e6
-265 1 7 14 -0.26214400000000000000e6
-265 1 14 15 0.26214400000000000000e6
-265 3 6 8 0.26214400000000000000e6
-266 1 8 15 -0.26214400000000000000e6
-266 1 10 17 0.26214400000000000000e6
-266 3 6 9 0.26214400000000000000e6
-267 1 14 15 -0.26214400000000000000e6
-267 1 16 17 0.26214400000000000000e6
-267 3 6 10 0.26214400000000000000e6
-268 1 1 20 0.13107200000000000000e6
-268 1 2 17 -0.13107200000000000000e6
-268 3 7 7 0.26214400000000000000e6
-269 1 2 9 -0.52428800000000000000e6
-269 1 5 20 0.26214400000000000000e6
-269 1 11 14 0.26214400000000000000e6
-269 1 12 19 0.26214400000000000000e6
-269 2 4 10 0.26214400000000000000e6
-269 3 4 5 0.52428800000000000000e6
-269 3 4 9 0.52428800000000000000e6
-269 3 5 10 0.26214400000000000000e6
-269 3 7 9 0.26214400000000000000e6
-270 1 11 18 -0.26214400000000000000e6
-270 1 12 19 0.52428800000000000000e6
-270 1 13 20 -0.26214400000000000000e6
-270 1 17 18 -0.26214400000000000000e6
-270 2 10 10 -0.52428800000000000000e6
-270 3 7 10 0.26214400000000000000e6
-270 3 9 10 -0.52428800000000000000e6
-271 1 1 20 -0.13107200000000000000e6
-271 1 2 9 -0.52428800000000000000e6
-271 1 2 17 0.13107200000000000000e6
-271 1 5 20 0.26214400000000000000e6
-271 1 11 14 0.26214400000000000000e6
-271 1 12 19 0.26214400000000000000e6
-271 2 4 10 0.26214400000000000000e6
-271 3 4 5 0.52428800000000000000e6
-271 3 4 9 0.52428800000000000000e6
-271 3 5 10 0.26214400000000000000e6
-271 3 7 8 0.13107200000000000000e6
-271 3 8 8 0.26214400000000000000e6
-271 4 4 4 0.26214400000000000000e6
-272 3 5 10 -0.26214400000000000000e6
-272 3 8 9 0.26214400000000000000e6
-273 1 1 20 0.26214400000000000000e6
-273 1 2 9 0.10485760000000000000e7
-273 1 2 17 -0.26214400000000000000e6
-273 1 3 18 -0.26214400000000000000e6
-273 1 5 20 -0.52428800000000000000e6
-273 1 11 14 -0.52428800000000000000e6
-273 1 12 19 -0.52428800000000000000e6
-273 1 17 18 0.26214400000000000000e6
-273 2 4 10 -0.52428800000000000000e6
-273 3 4 5 -0.10485760000000000000e7
-273 3 4 9 -0.10485760000000000000e7
-273 3 5 10 -0.52428800000000000000e6
-273 3 7 8 -0.26214400000000000000e6
-273 3 8 10 0.26214400000000000000e6
-273 4 4 4 -0.52428800000000000000e6
-274 1 14 15 -0.13107200000000000000e6
-274 1 16 17 0.13107200000000000000e6
-274 3 9 9 0.26214400000000000000e6
-275 1 17 18 -0.13107200000000000000e6
-275 1 17 20 0.13107200000000000000e6
-275 3 10 10 0.26214400000000000000e6
-276 1 1 4 0.26214400000000000000e6
-276 1 1 16 -0.10485760000000000000e7
-276 1 2 5 0.52428800000000000000e6
-276 1 3 18 0.26214400000000000000e6
-276 1 4 11 0.26214400000000000000e6
-276 1 5 12 0.52428800000000000000e6
-276 2 2 4 0.52428800000000000000e6
-276 2 2 8 0.26214400000000000000e6
-276 3 1 2 0.26214400000000000000e6
-276 3 1 6 -0.10485760000000000000e7
-276 3 2 3 0.26214400000000000000e6
-276 3 3 4 0.52428800000000000000e6
-276 3 3 8 0.26214400000000000000e6
-276 4 1 2 0.26214400000000000000e6
-277 2 1 9 0.26214400000000000000e6
-277 2 2 4 -0.26214400000000000000e6
-277 4 1 3 0.26214400000000000000e6
-278 1 1 4 -0.26214400000000000000e6
-278 1 1 16 0.10485760000000000000e7
-278 1 2 5 -0.52428800000000000000e6
-278 1 3 18 -0.26214400000000000000e6
-278 1 4 11 -0.26214400000000000000e6
-278 1 5 12 -0.52428800000000000000e6
-278 2 1 3 -0.26214400000000000000e6
-278 2 2 4 -0.52428800000000000000e6
-278 2 2 8 -0.26214400000000000000e6
-278 2 7 7 0.52428800000000000000e6
-278 3 1 2 -0.26214400000000000000e6
-278 3 1 6 0.10485760000000000000e7
-278 3 2 3 -0.26214400000000000000e6
-278 3 3 4 -0.52428800000000000000e6
-278 3 3 8 -0.26214400000000000000e6
-278 4 1 4 0.26214400000000000000e6
-279 1 1 16 0.52428800000000000000e6
-279 1 2 5 -0.26214400000000000000e6
-279 1 2 17 -0.26214400000000000000e6
-279 1 3 18 -0.26214400000000000000e6
-279 1 4 7 -0.26214400000000000000e6
-279 1 4 11 -0.26214400000000000000e6
-279 1 5 12 -0.26214400000000000000e6
-279 1 6 7 0.52428800000000000000e6
-279 1 6 13 -0.26214400000000000000e6
-279 2 2 4 -0.26214400000000000000e6
-279 2 2 8 -0.26214400000000000000e6
-279 2 3 5 -0.26214400000000000000e6
-279 3 1 6 0.52428800000000000000e6
-279 3 2 7 -0.26214400000000000000e6
-279 3 3 4 -0.26214400000000000000e6
-279 3 3 8 -0.26214400000000000000e6
-279 3 4 5 -0.52428800000000000000e6
-279 4 2 3 0.26214400000000000000e6
-280 1 2 9 0.10485760000000000000e7
-280 1 2 17 -0.26214400000000000000e6
-280 1 3 18 -0.26214400000000000000e6
-280 1 11 14 -0.52428800000000000000e6
-280 1 11 18 -0.26214400000000000000e6
-280 1 12 19 -0.52428800000000000000e6
-280 2 2 8 -0.26214400000000000000e6
-280 2 4 10 -0.52428800000000000000e6
-280 3 4 5 -0.10485760000000000000e7
-280 3 4 9 -0.10485760000000000000e7
-280 3 5 10 -0.52428800000000000000e6
-280 3 7 8 -0.26214400000000000000e6
-280 4 2 4 0.26214400000000000000e6
-281 1 2 9 -0.52428800000000000000e6
-281 1 2 17 0.13107200000000000000e6
-281 1 3 18 0.13107200000000000000e6
-281 1 4 11 0.13107200000000000000e6
-281 1 5 12 0.26214400000000000000e6
-281 1 6 13 0.26214400000000000000e6
-281 2 2 8 0.13107200000000000000e6
-281 2 4 10 0.26214400000000000000e6
-281 3 2 7 0.13107200000000000000e6
-281 3 3 8 0.13107200000000000000e6
-281 3 4 5 0.52428800000000000000e6
-281 4 3 4 0.26214400000000000000e6
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-468
-4
-20 10 20 10
--0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.78643200000000000000e6 0.26214400000000000000e6 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.78643200000000000000e6 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 -0.26214400000000000000e6 -0.32768000000000000000e6 0.0 0.0 -0.13107200000000000000e6 -0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.78643200000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.19660800000000000000e6 -0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.78643200000000000000e6 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.26214400000000000000e6 -0.52428800000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 -0.10485760000000000000e7 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.10485760000000000000e7 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.78643200000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0
-0 1 1 4 0.13107200000000000000e6
-0 1 1 16 0.26214400000000000000e6
-0 1 2 5 -0.13107200000000000000e6
-0 1 2 17 -0.13107200000000000000e6
-0 1 4 11 0.65536000000000000000e5
-0 1 4 19 0.13107200000000000000e6
-0 1 5 12 -0.13107200000000000000e6
-0 1 6 13 0.13107200000000000000e6
-0 1 7 14 -0.26214400000000000000e6
-0 1 11 18 -0.65536000000000000000e5
-0 2 1 1 -0.13107200000000000000e6
-0 2 1 3 0.65536000000000000000e5
-0 2 1 9 -0.13107200000000000000e6
-0 2 3 9 0.13107200000000000000e6
-0 2 7 7 -0.13107200000000000000e6
-0 3 1 2 0.65536000000000000000e5
-0 3 1 6 -0.13107200000000000000e6
-0 3 1 14 -0.13107200000000000000e6
-0 3 2 3 0.65536000000000000000e5
-0 3 2 11 -0.65536000000000000000e5
-0 3 7 12 0.13107200000000000000e6
-0 3 11 12 -0.65536000000000000000e5
-0 4 1 1 0.13107200000000000000e6
-1 1 4 19 0.13107200000000000000e6
-1 1 19 20 -0.13107200000000000000e6
-1 3 13 14 -0.13107200000000000000e6
-1 3 17 18 -0.65536000000000000000e5
-1 3 17 20 -0.65536000000000000000e5
-1 3 18 20 -0.65536000000000000000e5
-1 3 20 20 -0.13107200000000000000e6
-2 1 18 19 -0.65536000000000000000e5
-2 1 19 20 0.65536000000000000000e5
-2 3 14 19 0.13107200000000000000e6
-2 3 19 20 -0.65536000000000000000e5
-3 1 4 19 0.13107200000000000000e6
-3 1 18 19 -0.13107200000000000000e6
-3 3 13 14 -0.13107200000000000000e6
-3 3 17 18 -0.65536000000000000000e5
-3 3 18 20 -0.65536000000000000000e5
-4 1 6 13 -0.13107200000000000000e6
-4 1 13 20 0.65536000000000000000e5
-4 1 17 20 0.65536000000000000000e5
-4 3 2 15 0.13107200000000000000e6
-4 3 5 18 0.13107200000000000000e6
-4 3 5 20 0.13107200000000000000e6
-4 3 17 18 -0.65536000000000000000e5
-4 3 17 20 -0.65536000000000000000e5
-5 1 10 13 0.13107200000000000000e6
-5 1 16 19 -0.13107200000000000000e6
-5 3 6 19 -0.65536000000000000000e5
-5 3 9 20 -0.65536000000000000000e5
-5 3 14 19 -0.65536000000000000000e5
-5 3 19 19 -0.13107200000000000000e6
-6 1 6 13 0.65536000000000000000e5
-6 1 7 14 -0.13107200000000000000e6
-6 1 19 20 0.65536000000000000000e5
-6 3 5 18 -0.65536000000000000000e5
-6 3 5 20 -0.65536000000000000000e5
-6 3 6 11 0.65536000000000000000e5
-6 3 7 12 0.65536000000000000000e5
-6 3 11 16 0.13107200000000000000e6
-6 4 4 8 0.65536000000000000000e5
-7 1 1 20 -0.65536000000000000000e5
-7 1 2 17 0.65536000000000000000e5
-7 1 3 18 0.65536000000000000000e5
-7 1 4 19 0.13107200000000000000e6
-7 1 5 20 0.13107200000000000000e6
-7 1 7 14 -0.26214400000000000000e6
-7 1 13 20 0.65536000000000000000e5
-7 2 3 9 0.13107200000000000000e6
-7 3 2 15 0.13107200000000000000e6
-7 3 5 18 0.13107200000000000000e6
-7 3 6 11 0.13107200000000000000e6
-7 3 7 12 0.13107200000000000000e6
-7 3 11 12 0.65536000000000000000e5
-7 3 12 17 -0.65536000000000000000e5
-7 3 17 18 -0.65536000000000000000e5
-7 4 7 7 0.13107200000000000000e6
-8 1 1 20 0.65536000000000000000e5
-8 1 2 17 -0.65536000000000000000e5
-8 1 3 18 -0.65536000000000000000e5
-8 1 4 19 -0.13107200000000000000e6
-8 1 5 20 -0.26214400000000000000e6
-8 1 7 14 0.26214400000000000000e6
-8 1 13 20 -0.65536000000000000000e5
-8 1 17 20 0.65536000000000000000e5
-8 2 3 9 -0.13107200000000000000e6
-8 2 10 10 -0.13107200000000000000e6
-8 3 2 15 -0.13107200000000000000e6
-8 3 5 18 -0.13107200000000000000e6
-8 3 5 20 -0.13107200000000000000e6
-8 3 6 11 -0.13107200000000000000e6
-8 3 7 12 -0.13107200000000000000e6
-8 3 11 12 -0.65536000000000000000e5
-8 3 12 17 0.65536000000000000000e5
-8 4 7 7 -0.13107200000000000000e6
-9 1 9 16 0.13107200000000000000e6
-9 1 10 13 -0.65536000000000000000e5
-9 1 10 19 -0.13107200000000000000e6
-9 1 16 19 0.65536000000000000000e5
-9 3 9 14 0.65536000000000000000e5
-9 3 16 19 -0.65536000000000000000e5
-10 3 6 19 -0.65536000000000000000e5
-10 3 9 14 0.13107200000000000000e6
-10 3 9 20 -0.65536000000000000000e5
-11 1 2 9 -0.65536000000000000000e5
-11 1 3 10 0.13107200000000000000e6
-11 1 10 17 -0.13107200000000000000e6
-11 2 6 8 -0.65536000000000000000e5
-11 3 2 15 -0.32768000000000000000e5
-11 3 3 8 -0.65536000000000000000e5
-11 3 3 16 -0.65536000000000000000e5
-11 3 6 7 -0.65536000000000000000e5
-11 3 6 11 -0.32768000000000000000e5
-11 3 6 19 -0.65536000000000000000e5
-11 3 7 12 -0.32768000000000000000e5
-11 3 11 16 -0.65536000000000000000e5
-11 3 14 19 -0.65536000000000000000e5
-11 4 2 6 -0.65536000000000000000e5
-11 4 4 8 -0.32768000000000000000e5
-12 1 4 19 0.65536000000000000000e5
-12 1 18 19 -0.65536000000000000000e5
-12 3 6 19 -0.13107200000000000000e6
-12 3 13 14 -0.65536000000000000000e5
-12 3 15 20 0.65536000000000000000e5
-13 1 6 13 0.65536000000000000000e5
-13 1 7 14 -0.13107200000000000000e6
-13 1 18 19 0.65536000000000000000e5
-13 3 5 18 -0.65536000000000000000e5
-13 3 6 11 0.65536000000000000000e5
-13 3 7 12 0.65536000000000000000e5
-13 4 4 8 0.65536000000000000000e5
-14 1 4 19 0.65536000000000000000e5
-14 1 5 12 -0.65536000000000000000e5
-14 1 5 20 0.65536000000000000000e5
-14 1 6 13 0.65536000000000000000e5
-14 1 7 14 -0.13107200000000000000e6
-14 2 3 9 0.65536000000000000000e5
-14 2 4 10 -0.65536000000000000000e5
-14 3 1 14 0.65536000000000000000e5
-14 3 5 18 -0.65536000000000000000e5
-14 3 5 20 -0.65536000000000000000e5
-14 3 6 11 0.65536000000000000000e5
-14 3 7 12 0.65536000000000000000e5
-15 1 1 20 0.13107200000000000000e6
-15 1 2 17 -0.13107200000000000000e6
-15 1 3 18 -0.13107200000000000000e6
-15 1 4 19 -0.26214400000000000000e6
-15 1 5 20 -0.26214400000000000000e6
-15 1 6 13 -0.13107200000000000000e6
-15 1 7 14 0.52428800000000000000e6
-15 1 11 18 -0.65536000000000000000e5
-15 1 13 20 -0.65536000000000000000e5
-15 1 17 20 0.65536000000000000000e5
-15 1 18 19 0.13107200000000000000e6
-15 1 19 20 -0.13107200000000000000e6
-15 2 3 9 -0.26214400000000000000e6
-15 2 8 10 -0.65536000000000000000e5
-15 3 2 15 -0.13107200000000000000e6
-15 3 5 18 -0.13107200000000000000e6
-15 3 6 11 -0.26214400000000000000e6
-15 3 7 12 -0.26214400000000000000e6
-15 3 11 12 -0.13107200000000000000e6
-15 3 12 17 0.65536000000000000000e5
-15 3 13 14 -0.13107200000000000000e6
-15 3 17 18 -0.65536000000000000000e5
-15 4 7 7 -0.26214400000000000000e6
-15 4 10 10 -0.13107200000000000000e6
-16 1 1 20 -0.65536000000000000000e5
-16 1 2 17 0.65536000000000000000e5
-16 1 3 18 0.65536000000000000000e5
-16 1 4 19 0.13107200000000000000e6
-16 1 5 20 0.13107200000000000000e6
-16 1 7 14 -0.26214400000000000000e6
-16 1 13 20 0.65536000000000000000e5
-16 2 3 9 0.13107200000000000000e6
-16 3 2 15 0.13107200000000000000e6
-16 3 6 11 0.13107200000000000000e6
-16 3 7 12 0.13107200000000000000e6
-16 3 11 12 0.65536000000000000000e5
-16 4 7 7 0.13107200000000000000e6
-17 1 1 20 -0.65536000000000000000e5
-17 1 2 17 0.65536000000000000000e5
-17 1 3 18 0.65536000000000000000e5
-17 1 4 19 0.26214400000000000000e6
-17 1 5 20 0.13107200000000000000e6
-17 1 6 13 0.26214400000000000000e6
-17 1 7 14 -0.52428800000000000000e6
-17 1 11 18 0.65536000000000000000e5
-17 2 3 9 0.26214400000000000000e6
-17 3 6 11 0.26214400000000000000e6
-17 3 7 12 0.26214400000000000000e6
-17 3 11 12 0.65536000000000000000e5
-17 3 12 17 -0.65536000000000000000e5
-17 4 7 7 0.13107200000000000000e6
-18 1 1 20 0.13107200000000000000e6
-18 1 2 17 -0.65536000000000000000e5
-18 1 3 18 -0.65536000000000000000e5
-18 1 4 19 -0.13107200000000000000e6
-18 1 5 12 -0.13107200000000000000e6
-18 1 5 20 -0.13107200000000000000e6
-18 1 7 14 0.26214400000000000000e6
-18 1 13 20 -0.65536000000000000000e5
-18 2 3 9 -0.13107200000000000000e6
-18 2 10 10 -0.13107200000000000000e6
-18 3 1 14 0.13107200000000000000e6
-18 3 2 15 -0.13107200000000000000e6
-18 3 5 18 -0.13107200000000000000e6
-18 3 5 20 -0.13107200000000000000e6
-18 3 6 11 -0.13107200000000000000e6
-18 3 7 12 -0.13107200000000000000e6
-18 3 11 12 -0.65536000000000000000e5
-18 3 12 17 0.65536000000000000000e5
-18 4 7 7 -0.13107200000000000000e6
-19 1 8 9 -0.13107200000000000000e6
-19 1 10 17 0.65536000000000000000e5
-19 1 16 19 0.65536000000000000000e5
-19 3 5 10 0.13107200000000000000e6
-20 1 2 9 -0.65536000000000000000e5
-20 1 3 10 0.13107200000000000000e6
-20 1 8 15 -0.13107200000000000000e6
-20 2 6 8 -0.65536000000000000000e5
-20 3 2 15 -0.32768000000000000000e5
-20 3 3 8 -0.65536000000000000000e5
-20 3 3 16 -0.65536000000000000000e5
-20 3 6 7 -0.65536000000000000000e5
-20 3 6 11 -0.32768000000000000000e5
-20 3 6 19 -0.65536000000000000000e5
-20 3 7 12 -0.32768000000000000000e5
-20 4 2 6 -0.65536000000000000000e5
-20 4 4 8 -0.32768000000000000000e5
-21 1 4 19 -0.32768000000000000000e5
-21 1 5 12 0.32768000000000000000e5
-21 1 5 16 -0.13107200000000000000e6
-21 1 7 14 0.13107200000000000000e6
-21 2 3 9 -0.32768000000000000000e5
-21 2 4 10 0.32768000000000000000e5
-21 3 1 14 -0.32768000000000000000e5
-21 3 2 15 -0.65536000000000000000e5
-21 3 6 11 -0.65536000000000000000e5
-21 3 7 12 -0.65536000000000000000e5
-21 3 11 16 -0.65536000000000000000e5
-21 4 4 8 -0.32768000000000000000e5
-22 1 4 19 0.65536000000000000000e5
-22 1 18 19 -0.65536000000000000000e5
-22 3 3 16 -0.13107200000000000000e6
-22 3 6 19 -0.13107200000000000000e6
-22 3 7 20 0.65536000000000000000e5
-22 3 15 20 0.65536000000000000000e5
-23 1 4 19 0.65536000000000000000e5
-23 1 6 13 0.65536000000000000000e5
-23 1 7 14 -0.13107200000000000000e6
-23 3 2 15 -0.65536000000000000000e5
-23 3 13 14 -0.65536000000000000000e5
-24 1 2 9 -0.13107200000000000000e6
-24 1 3 10 0.26214400000000000000e6
-24 1 4 19 -0.65536000000000000000e5
-24 1 7 14 0.13107200000000000000e6
-24 1 8 15 -0.26214400000000000000e6
-24 2 3 9 -0.65536000000000000000e5
-24 3 2 15 -0.65536000000000000000e5
-24 3 3 8 -0.13107200000000000000e6
-24 3 5 18 -0.65536000000000000000e5
-24 3 6 7 -0.13107200000000000000e6
-24 3 6 11 -0.65536000000000000000e5
-24 3 7 12 -0.65536000000000000000e5
-24 4 2 6 -0.13107200000000000000e6
-25 1 1 16 -0.13107200000000000000e6
-25 1 5 12 0.65536000000000000000e5
-25 1 5 20 0.65536000000000000000e5
-25 3 1 14 -0.65536000000000000000e5
-26 1 1 20 0.13107200000000000000e6
-26 1 2 17 -0.13107200000000000000e6
-26 1 3 18 -0.13107200000000000000e6
-26 1 4 19 -0.26214400000000000000e6
-26 1 5 20 -0.26214400000000000000e6
-26 1 6 13 -0.13107200000000000000e6
-26 1 7 14 0.52428800000000000000e6
-26 1 11 18 -0.65536000000000000000e5
-26 1 13 20 -0.65536000000000000000e5
-26 1 17 20 0.65536000000000000000e5
-26 1 18 19 0.13107200000000000000e6
-26 1 19 20 -0.13107200000000000000e6
-26 2 3 9 -0.26214400000000000000e6
-26 2 8 10 -0.65536000000000000000e5
-26 3 2 15 -0.13107200000000000000e6
-26 3 4 17 0.65536000000000000000e5
-26 3 5 18 -0.13107200000000000000e6
-26 3 6 11 -0.26214400000000000000e6
-26 3 7 12 -0.39321600000000000000e6
-26 3 11 12 -0.13107200000000000000e6
-26 3 12 17 0.65536000000000000000e5
-26 3 13 14 -0.13107200000000000000e6
-26 3 13 18 0.65536000000000000000e5
-26 3 17 18 -0.65536000000000000000e5
-26 4 7 7 -0.26214400000000000000e6
-26 4 10 10 -0.13107200000000000000e6
-27 1 1 20 0.65536000000000000000e5
-27 1 2 17 -0.65536000000000000000e5
-27 1 4 19 -0.13107200000000000000e6
-27 1 5 20 -0.13107200000000000000e6
-27 1 6 13 -0.13107200000000000000e6
-27 1 7 14 0.26214400000000000000e6
-27 1 11 18 -0.65536000000000000000e5
-27 2 3 9 -0.13107200000000000000e6
-27 2 8 10 -0.65536000000000000000e5
-27 3 2 15 -0.13107200000000000000e6
-27 3 5 18 -0.13107200000000000000e6
-27 3 6 11 -0.13107200000000000000e6
-27 3 7 12 -0.13107200000000000000e6
-27 3 11 12 -0.65536000000000000000e5
-27 4 7 7 -0.13107200000000000000e6
-28 1 1 20 -0.65536000000000000000e5
-28 1 2 17 0.65536000000000000000e5
-28 1 3 18 0.65536000000000000000e5
-28 1 4 19 0.26214400000000000000e6
-28 1 5 20 0.13107200000000000000e6
-28 1 6 13 0.26214400000000000000e6
-28 1 7 14 -0.52428800000000000000e6
-28 1 11 18 0.65536000000000000000e5
-28 2 3 9 0.26214400000000000000e6
-28 3 6 11 0.13107200000000000000e6
-28 3 7 12 0.26214400000000000000e6
-28 3 11 12 0.13107200000000000000e6
-28 4 7 7 0.13107200000000000000e6
-29 1 2 17 0.65536000000000000000e5
-29 1 5 12 -0.13107200000000000000e6
-29 1 11 18 0.65536000000000000000e5
-30 1 1 16 -0.26214400000000000000e6
-30 1 1 20 0.65536000000000000000e5
-30 1 2 17 -0.65536000000000000000e5
-30 1 4 19 -0.13107200000000000000e6
-30 1 5 12 0.26214400000000000000e6
-30 1 6 13 -0.13107200000000000000e6
-30 1 7 14 0.26214400000000000000e6
-30 1 11 18 -0.65536000000000000000e5
-30 2 1 9 0.13107200000000000000e6
-30 2 3 9 -0.13107200000000000000e6
-30 2 7 7 -0.13107200000000000000e6
-30 3 1 14 -0.13107200000000000000e6
-30 3 7 12 -0.13107200000000000000e6
-30 3 11 12 -0.65536000000000000000e5
-31 1 9 16 0.65536000000000000000e5
-31 1 10 19 -0.65536000000000000000e5
-31 3 5 10 -0.65536000000000000000e5
-31 3 7 10 -0.65536000000000000000e5
-31 3 8 9 -0.65536000000000000000e5
-31 3 10 19 0.65536000000000000000e5
-31 4 6 6 -0.13107200000000000000e6
-32 1 1 16 0.16384000000000000000e5
-32 1 2 5 -0.81920000000000000000e4
-32 1 3 10 -0.98304000000000000000e5
-32 1 4 19 0.81920000000000000000e4
-32 1 5 8 -0.32768000000000000000e5
-32 1 5 12 -0.81920000000000000000e4
-32 1 5 16 -0.32768000000000000000e5
-32 1 6 13 0.81920000000000000000e4
-32 1 7 14 -0.16384000000000000000e5
-32 1 8 15 0.65536000000000000000e5
-32 1 9 16 -0.65536000000000000000e5
-32 1 10 19 0.65536000000000000000e5
-32 2 2 4 -0.81920000000000000000e4
-32 2 3 9 0.81920000000000000000e4
-32 2 4 6 -0.32768000000000000000e5
-32 2 6 6 -0.13107200000000000000e6
-32 3 2 7 0.81920000000000000000e4
-32 3 3 8 0.16384000000000000000e5
-32 3 5 10 -0.65536000000000000000e5
-32 3 6 7 0.32768000000000000000e5
-32 3 7 12 0.81920000000000000000e4
-32 3 8 9 -0.65536000000000000000e5
-32 4 1 5 0.81920000000000000000e4
-32 4 2 6 0.32768000000000000000e5
-32 4 4 4 -0.32768000000000000000e5
-33 3 8 9 -0.13107200000000000000e6
-33 3 9 14 0.65536000000000000000e5
-33 3 15 16 0.65536000000000000000e5
-34 1 8 9 -0.13107200000000000000e6
-34 1 8 15 0.65536000000000000000e5
-34 1 10 13 0.65536000000000000000e5
-34 3 9 14 -0.65536000000000000000e5
-35 1 1 16 0.32768000000000000000e5
-35 1 2 5 -0.16384000000000000000e5
-35 1 3 10 -0.19660800000000000000e6
-35 1 4 19 0.16384000000000000000e5
-35 1 5 8 -0.65536000000000000000e5
-35 1 5 12 -0.16384000000000000000e5
-35 1 6 13 0.16384000000000000000e5
-35 1 7 14 -0.32768000000000000000e5
-35 1 8 15 0.13107200000000000000e6
-35 1 10 17 0.65536000000000000000e5
-35 2 2 4 -0.16384000000000000000e5
-35 2 3 9 0.16384000000000000000e5
-35 2 4 6 -0.65536000000000000000e5
-35 3 2 7 0.16384000000000000000e5
-35 3 3 8 0.32768000000000000000e5
-35 3 6 7 0.65536000000000000000e5
-35 3 7 12 0.16384000000000000000e5
-35 4 1 5 0.16384000000000000000e5
-35 4 2 6 0.65536000000000000000e5
-35 4 4 4 -0.65536000000000000000e5
-36 1 10 13 0.13107200000000000000e6
-36 1 16 19 -0.13107200000000000000e6
-36 3 3 8 -0.65536000000000000000e5
-36 3 3 16 0.65536000000000000000e5
-36 3 4 9 -0.65536000000000000000e5
-36 3 6 7 -0.65536000000000000000e5
-36 3 6 19 -0.65536000000000000000e5
-36 3 9 14 -0.13107200000000000000e6
-36 3 11 16 -0.65536000000000000000e5
-36 4 5 5 -0.13107200000000000000e6
-36 4 6 10 -0.65536000000000000000e5
-37 1 2 9 -0.65536000000000000000e5
-37 2 6 8 -0.65536000000000000000e5
-37 3 3 8 -0.65536000000000000000e5
-37 3 3 16 -0.65536000000000000000e5
-37 3 6 7 -0.65536000000000000000e5
-37 4 2 6 -0.65536000000000000000e5
-38 1 1 16 0.65536000000000000000e5
-38 1 2 5 -0.32768000000000000000e5
-38 1 2 9 0.65536000000000000000e5
-38 1 3 10 -0.39321600000000000000e6
-38 1 4 19 0.32768000000000000000e5
-38 1 5 12 -0.32768000000000000000e5
-38 1 5 16 -0.13107200000000000000e6
-38 1 6 13 0.32768000000000000000e5
-38 1 8 15 0.39321600000000000000e6
-38 2 2 4 -0.32768000000000000000e5
-38 2 3 9 0.32768000000000000000e5
-38 3 2 7 0.32768000000000000000e5
-38 3 2 15 -0.32768000000000000000e5
-38 3 3 8 0.13107200000000000000e6
-38 3 6 7 0.19660800000000000000e6
-38 3 6 11 -0.32768000000000000000e5
-38 4 1 5 0.32768000000000000000e5
-38 4 2 6 0.19660800000000000000e6
-38 4 4 4 -0.13107200000000000000e6
-38 4 4 8 -0.32768000000000000000e5
-39 1 1 16 0.65536000000000000000e5
-39 1 4 19 -0.32768000000000000000e5
-39 1 5 8 -0.13107200000000000000e6
-39 1 5 12 0.32768000000000000000e5
-39 1 7 14 0.65536000000000000000e5
-39 2 3 9 -0.32768000000000000000e5
-39 2 4 10 0.32768000000000000000e5
-39 3 1 14 -0.32768000000000000000e5
-39 3 2 15 -0.32768000000000000000e5
-39 3 6 11 -0.32768000000000000000e5
-39 3 7 12 -0.32768000000000000000e5
-40 1 4 19 0.65536000000000000000e5
-40 1 18 19 -0.65536000000000000000e5
-40 3 3 16 -0.13107200000000000000e6
-40 3 4 19 0.65536000000000000000e5
-40 3 6 7 -0.13107200000000000000e6
-40 3 6 19 -0.13107200000000000000e6
-40 3 7 12 0.65536000000000000000e5
-40 3 7 20 0.65536000000000000000e5
-40 3 15 20 0.65536000000000000000e5
-41 1 4 19 0.65536000000000000000e5
-41 1 6 13 0.65536000000000000000e5
-41 1 7 14 -0.13107200000000000000e6
-41 3 3 8 -0.13107200000000000000e6
-42 1 2 9 -0.13107200000000000000e6
-42 1 4 19 -0.65536000000000000000e5
-42 1 7 14 0.13107200000000000000e6
-42 2 3 9 -0.65536000000000000000e5
-42 3 2 15 -0.65536000000000000000e5
-42 3 7 12 -0.65536000000000000000e5
-43 1 2 5 -0.65536000000000000000e5
-43 1 3 10 -0.26214400000000000000e6
-43 1 8 15 0.26214400000000000000e6
-43 2 2 4 -0.65536000000000000000e5
-43 3 2 7 0.65536000000000000000e5
-43 3 3 8 0.13107200000000000000e6
-43 3 6 7 0.13107200000000000000e6
-43 3 6 11 -0.65536000000000000000e5
-43 4 1 5 0.65536000000000000000e5
-43 4 2 6 0.13107200000000000000e6
-44 1 1 8 -0.13107200000000000000e6
-44 1 1 16 0.13107200000000000000e6
-44 1 4 19 0.65536000000000000000e5
-44 1 6 13 0.65536000000000000000e5
-44 1 7 14 -0.13107200000000000000e6
-44 2 1 9 -0.65536000000000000000e5
-44 2 3 9 0.65536000000000000000e5
-44 3 1 14 -0.65536000000000000000e5
-44 3 7 12 0.65536000000000000000e5
-45 1 1 20 0.65536000000000000000e5
-45 1 3 18 -0.65536000000000000000e5
-45 1 4 7 -0.13107200000000000000e6
-45 1 4 19 0.13107200000000000000e6
-45 1 5 20 -0.13107200000000000000e6
-45 1 6 13 0.13107200000000000000e6
-45 1 13 20 -0.65536000000000000000e5
-45 1 17 20 0.65536000000000000000e5
-45 1 18 19 0.13107200000000000000e6
-45 1 19 20 -0.13107200000000000000e6
-45 2 2 8 0.65536000000000000000e5
-45 2 8 10 -0.65536000000000000000e5
-45 3 2 11 0.65536000000000000000e5
-45 3 5 18 -0.13107200000000000000e6
-45 3 6 11 -0.13107200000000000000e6
-45 3 12 17 0.65536000000000000000e5
-45 3 13 18 0.65536000000000000000e5
-45 3 17 18 -0.65536000000000000000e5
-45 4 3 7 -0.65536000000000000000e5
-45 4 7 7 -0.13107200000000000000e6
-45 4 8 8 -0.13107200000000000000e6
-45 4 10 10 -0.13107200000000000000e6
-46 1 1 20 0.65536000000000000000e5
-46 1 2 17 -0.13107200000000000000e6
-46 1 3 18 -0.65536000000000000000e5
-46 1 4 11 -0.65536000000000000000e5
-46 1 4 19 -0.26214400000000000000e6
-46 1 5 20 -0.13107200000000000000e6
-46 1 6 13 -0.26214400000000000000e6
-46 1 7 14 0.52428800000000000000e6
-46 1 11 18 -0.65536000000000000000e5
-46 2 2 8 -0.65536000000000000000e5
-46 2 3 9 -0.26214400000000000000e6
-46 2 8 10 -0.65536000000000000000e5
-46 3 2 7 -0.13107200000000000000e6
-46 3 2 11 -0.65536000000000000000e5
-46 3 2 15 -0.13107200000000000000e6
-46 3 4 17 0.65536000000000000000e5
-46 3 5 18 -0.13107200000000000000e6
-46 3 6 11 -0.13107200000000000000e6
-46 3 7 12 -0.26214400000000000000e6
-46 3 11 12 -0.65536000000000000000e5
-46 4 7 7 -0.13107200000000000000e6
-47 1 3 10 -0.52428800000000000000e6
-47 1 3 18 0.65536000000000000000e5
-47 1 4 11 0.65536000000000000000e5
-47 1 4 19 0.13107200000000000000e6
-47 1 6 13 0.13107200000000000000e6
-47 1 7 14 -0.26214400000000000000e6
-47 1 8 15 0.52428800000000000000e6
-47 2 3 9 0.13107200000000000000e6
-47 3 1 6 0.13107200000000000000e6
-47 3 2 7 0.13107200000000000000e6
-47 3 3 8 0.26214400000000000000e6
-47 3 6 7 0.26214400000000000000e6
-47 3 7 12 0.13107200000000000000e6
-47 4 1 5 0.13107200000000000000e6
-47 4 2 6 0.26214400000000000000e6
-48 1 2 17 0.65536000000000000000e5
-48 1 5 12 -0.13107200000000000000e6
-48 1 11 18 0.65536000000000000000e5
-48 3 1 6 -0.13107200000000000000e6
-48 3 2 11 0.65536000000000000000e5
-48 3 11 12 0.65536000000000000000e5
-49 1 1 4 -0.65536000000000000000e5
-49 1 2 5 -0.13107200000000000000e6
-49 1 2 17 0.65536000000000000000e5
-49 1 4 11 -0.65536000000000000000e5
-49 1 5 12 0.13107200000000000000e6
-49 2 1 3 -0.65536000000000000000e5
-49 3 1 2 -0.65536000000000000000e5
-49 3 1 6 0.13107200000000000000e6
-49 3 2 3 -0.65536000000000000000e5
-50 1 1 1 0.13107200000000000000e6
-50 1 1 4 -0.13107200000000000000e6
-50 1 1 16 -0.26214400000000000000e6
-50 1 2 5 0.13107200000000000000e6
-50 1 2 17 0.13107200000000000000e6
-50 1 4 11 -0.65536000000000000000e5
-50 1 4 19 -0.13107200000000000000e6
-50 1 5 12 0.13107200000000000000e6
-50 1 6 13 -0.13107200000000000000e6
-50 1 7 14 0.26214400000000000000e6
-50 1 11 18 0.65536000000000000000e5
-50 2 1 1 0.13107200000000000000e6
-50 2 1 3 -0.65536000000000000000e5
-50 2 1 9 0.13107200000000000000e6
-50 2 3 9 -0.13107200000000000000e6
-50 2 7 7 0.13107200000000000000e6
-50 3 1 2 -0.65536000000000000000e5
-50 3 1 6 0.13107200000000000000e6
-50 3 1 14 0.13107200000000000000e6
-50 3 2 3 -0.65536000000000000000e5
-50 3 2 11 0.65536000000000000000e5
-50 3 7 12 -0.13107200000000000000e6
-50 3 11 12 0.65536000000000000000e5
-50 4 1 1 -0.13107200000000000000e6
-51 1 1 2 0.13107200000000000000e6
-51 1 2 5 -0.26214400000000000000e6
-51 1 4 11 -0.13107200000000000000e6
-51 1 5 12 0.26214400000000000000e6
-51 2 1 3 -0.13107200000000000000e6
-51 2 1 7 0.13107200000000000000e6
-51 3 1 6 0.26214400000000000000e6
-51 3 2 3 -0.13107200000000000000e6
-51 4 1 1 0.26214400000000000000e6
-52 1 1 3 0.13107200000000000000e6
-52 1 1 4 0.13107200000000000000e6
-52 1 4 11 0.13107200000000000000e6
-52 1 5 12 -0.26214400000000000000e6
-52 2 1 3 0.13107200000000000000e6
-52 3 1 6 -0.26214400000000000000e6
-52 3 2 3 0.13107200000000000000e6
-53 1 1 4 -0.65536000000000000000e5
-53 1 1 5 0.13107200000000000000e6
-53 1 1 16 -0.26214400000000000000e6
-53 1 2 17 0.13107200000000000000e6
-53 1 4 11 -0.65536000000000000000e5
-53 1 4 19 -0.13107200000000000000e6
-53 1 5 12 0.13107200000000000000e6
-53 1 6 13 -0.13107200000000000000e6
-53 1 7 14 0.26214400000000000000e6
-53 1 11 18 0.65536000000000000000e5
-53 2 1 3 -0.65536000000000000000e5
-53 2 1 7 0.65536000000000000000e5
-53 2 1 9 0.13107200000000000000e6
-53 2 3 9 -0.13107200000000000000e6
-53 2 7 7 0.13107200000000000000e6
-53 3 1 2 -0.65536000000000000000e5
-53 3 1 6 0.13107200000000000000e6
-53 3 1 14 0.13107200000000000000e6
-53 3 2 3 -0.65536000000000000000e5
-53 3 2 11 0.65536000000000000000e5
-53 3 7 12 -0.13107200000000000000e6
-53 3 11 12 0.65536000000000000000e5
-54 1 1 6 0.13107200000000000000e6
-54 1 2 5 -0.13107200000000000000e6
-55 1 1 7 0.13107200000000000000e6
-55 1 5 12 -0.13107200000000000000e6
-55 3 1 6 -0.13107200000000000000e6
-56 1 1 9 0.13107200000000000000e6
-56 1 2 5 -0.65536000000000000000e5
-56 1 3 10 -0.26214400000000000000e6
-56 1 4 19 0.65536000000000000000e5
-56 1 5 12 -0.65536000000000000000e5
-56 1 6 13 0.65536000000000000000e5
-56 1 7 14 -0.13107200000000000000e6
-56 1 8 15 0.26214400000000000000e6
-56 2 2 4 -0.65536000000000000000e5
-56 2 3 9 0.65536000000000000000e5
-56 3 2 7 0.65536000000000000000e5
-56 3 3 8 0.13107200000000000000e6
-56 3 6 7 0.13107200000000000000e6
-56 3 7 12 0.65536000000000000000e5
-56 4 1 5 0.65536000000000000000e5
-56 4 2 6 0.13107200000000000000e6
-57 1 1 10 0.13107200000000000000e6
-57 1 5 8 -0.13107200000000000000e6
-58 1 1 4 -0.13107200000000000000e6
-58 1 1 11 0.13107200000000000000e6
-58 1 1 16 -0.52428800000000000000e6
-58 1 2 17 0.13107200000000000000e6
-58 1 4 11 -0.13107200000000000000e6
-58 1 4 19 -0.26214400000000000000e6
-58 1 5 12 0.52428800000000000000e6
-58 1 6 13 -0.26214400000000000000e6
-58 1 7 14 0.52428800000000000000e6
-58 2 1 3 -0.13107200000000000000e6
-58 2 1 7 0.13107200000000000000e6
-58 2 1 9 0.26214400000000000000e6
-58 2 3 9 -0.26214400000000000000e6
-58 3 1 2 -0.13107200000000000000e6
-58 3 1 6 0.26214400000000000000e6
-58 3 2 3 -0.13107200000000000000e6
-58 3 2 11 0.13107200000000000000e6
-58 3 7 12 -0.26214400000000000000e6
-59 1 1 4 0.13107200000000000000e6
-59 1 1 12 0.13107200000000000000e6
-59 1 4 11 0.13107200000000000000e6
-59 1 5 12 -0.26214400000000000000e6
-59 2 1 3 0.13107200000000000000e6
-59 3 1 2 0.13107200000000000000e6
-59 3 1 6 -0.26214400000000000000e6
-59 3 2 3 0.13107200000000000000e6
-60 1 1 13 0.13107200000000000000e6
-60 1 2 17 -0.13107200000000000000e6
-60 3 2 11 -0.13107200000000000000e6
-61 1 1 14 0.13107200000000000000e6
-61 1 1 16 -0.26214400000000000000e6
-61 1 4 19 -0.13107200000000000000e6
-61 1 5 12 0.13107200000000000000e6
-61 1 6 13 -0.13107200000000000000e6
-61 1 7 14 0.26214400000000000000e6
-61 2 1 9 0.13107200000000000000e6
-61 2 3 9 -0.13107200000000000000e6
-61 3 7 12 -0.13107200000000000000e6
-62 1 1 15 0.13107200000000000000e6
-62 1 5 12 -0.13107200000000000000e6
-63 1 1 17 0.13107200000000000000e6
-63 1 2 17 0.13107200000000000000e6
-63 1 5 12 -0.26214400000000000000e6
-63 1 11 18 0.13107200000000000000e6
-63 2 7 7 0.26214400000000000000e6
-63 3 1 14 0.26214400000000000000e6
-63 3 11 12 0.13107200000000000000e6
-64 1 1 18 0.13107200000000000000e6
-64 1 2 17 -0.13107200000000000000e6
-65 1 1 19 0.13107200000000000000e6
-65 1 5 12 -0.13107200000000000000e6
-65 3 1 14 0.13107200000000000000e6
-66 1 1 4 0.65536000000000000000e5
-66 1 2 2 0.13107200000000000000e6
-66 1 4 11 0.65536000000000000000e5
-66 1 5 12 -0.13107200000000000000e6
-66 2 1 3 0.65536000000000000000e5
-66 3 1 6 -0.13107200000000000000e6
-66 3 2 3 0.65536000000000000000e5
-67 1 1 4 -0.13107200000000000000e6
-67 1 2 3 0.13107200000000000000e6
-68 1 2 4 0.13107200000000000000e6
-68 1 4 11 -0.13107200000000000000e6
-68 3 2 3 -0.13107200000000000000e6
-69 1 2 6 0.13107200000000000000e6
-69 1 5 12 -0.13107200000000000000e6
-69 3 1 6 -0.13107200000000000000e6
-70 1 2 7 0.13107200000000000000e6
-70 1 3 10 -0.52428800000000000000e6
-70 1 4 19 0.13107200000000000000e6
-70 1 6 13 0.13107200000000000000e6
-70 1 7 14 -0.26214400000000000000e6
-70 1 8 15 0.52428800000000000000e6
-70 2 3 9 0.13107200000000000000e6
-70 3 1 6 0.13107200000000000000e6
-70 3 2 7 0.13107200000000000000e6
-70 3 3 8 0.26214400000000000000e6
-70 3 6 7 0.26214400000000000000e6
-70 3 7 12 0.13107200000000000000e6
-70 4 1 5 0.13107200000000000000e6
-70 4 2 6 0.26214400000000000000e6
-71 1 2 5 -0.65536000000000000000e5
-71 1 2 8 0.13107200000000000000e6
-71 1 3 10 -0.26214400000000000000e6
-71 1 4 19 0.65536000000000000000e5
-71 1 5 12 -0.65536000000000000000e5
-71 1 6 13 0.65536000000000000000e5
-71 1 7 14 -0.13107200000000000000e6
-71 1 8 15 0.26214400000000000000e6
-71 2 2 4 -0.65536000000000000000e5
-71 2 3 9 0.65536000000000000000e5
-71 3 2 7 0.65536000000000000000e5
-71 3 3 8 0.13107200000000000000e6
-71 3 6 7 0.13107200000000000000e6
-71 3 7 12 0.65536000000000000000e5
-71 4 1 5 0.65536000000000000000e5
-71 4 2 6 0.13107200000000000000e6
-72 1 1 16 0.65536000000000000000e5
-72 1 2 5 -0.32768000000000000000e5
-72 1 2 10 0.13107200000000000000e6
-72 1 3 10 -0.26214400000000000000e6
-72 1 4 19 0.32768000000000000000e5
-72 1 5 12 -0.32768000000000000000e5
-72 1 5 16 -0.13107200000000000000e6
-72 1 6 13 0.32768000000000000000e5
-72 1 7 14 -0.65536000000000000000e5
-72 1 8 15 0.26214400000000000000e6
-72 2 2 4 -0.32768000000000000000e5
-72 2 3 9 0.32768000000000000000e5
-72 3 2 7 0.32768000000000000000e5
-72 3 3 8 0.65536000000000000000e5
-72 3 6 7 0.13107200000000000000e6
-72 3 7 12 0.32768000000000000000e5
-72 4 1 5 0.32768000000000000000e5
-72 4 2 6 0.13107200000000000000e6
-72 4 4 4 -0.13107200000000000000e6
-73 1 1 4 0.13107200000000000000e6
-73 1 2 11 0.13107200000000000000e6
-73 1 4 11 0.13107200000000000000e6
-73 1 5 12 -0.26214400000000000000e6
-73 2 1 3 0.13107200000000000000e6
-73 3 1 2 0.13107200000000000000e6
-73 3 1 6 -0.26214400000000000000e6
-73 3 2 3 0.13107200000000000000e6
-74 1 2 12 0.13107200000000000000e6
-74 1 2 17 -0.13107200000000000000e6
-74 3 2 11 -0.13107200000000000000e6
-75 1 2 13 0.13107200000000000000e6
-75 1 4 11 -0.13107200000000000000e6
-76 1 2 14 0.13107200000000000000e6
-76 1 5 12 -0.13107200000000000000e6
-77 1 2 15 0.13107200000000000000e6
-77 1 4 19 0.13107200000000000000e6
-77 1 6 13 0.13107200000000000000e6
-77 1 7 14 -0.26214400000000000000e6
-77 2 3 9 0.13107200000000000000e6
-77 3 7 12 0.13107200000000000000e6
-78 1 2 9 -0.13107200000000000000e6
-78 1 2 16 0.13107200000000000000e6
-78 1 3 10 0.26214400000000000000e6
-78 1 8 15 -0.26214400000000000000e6
-78 3 3 8 -0.13107200000000000000e6
-78 3 6 7 -0.13107200000000000000e6
-78 4 2 6 -0.13107200000000000000e6
-79 1 2 18 0.13107200000000000000e6
-79 1 11 18 -0.13107200000000000000e6
-79 3 11 12 -0.13107200000000000000e6
-80 1 2 19 0.13107200000000000000e6
-80 1 4 19 0.13107200000000000000e6
-80 1 6 13 0.13107200000000000000e6
-80 1 7 14 -0.26214400000000000000e6
-80 2 3 9 0.13107200000000000000e6
-80 3 6 11 0.13107200000000000000e6
-80 3 7 12 0.13107200000000000000e6
-81 1 2 20 0.13107200000000000000e6
-81 1 11 18 -0.13107200000000000000e6
-82 1 3 3 0.13107200000000000000e6
-82 1 4 11 -0.65536000000000000000e5
-82 3 2 3 -0.65536000000000000000e5
-83 1 1 4 0.13107200000000000000e6
-83 1 3 4 0.13107200000000000000e6
-83 1 3 10 -0.10485760000000000000e7
-83 1 4 11 0.13107200000000000000e6
-83 1 4 19 0.26214400000000000000e6
-83 1 6 13 0.26214400000000000000e6
-83 1 7 14 -0.52428800000000000000e6
-83 1 8 15 0.10485760000000000000e7
-83 2 2 8 0.13107200000000000000e6
-83 2 3 9 0.26214400000000000000e6
-83 3 1 6 0.26214400000000000000e6
-83 3 2 3 0.13107200000000000000e6
-83 3 2 7 0.26214400000000000000e6
-83 3 3 8 0.52428800000000000000e6
-83 3 6 7 0.52428800000000000000e6
-83 3 7 12 0.26214400000000000000e6
-83 4 1 5 0.26214400000000000000e6
-83 4 2 2 0.26214400000000000000e6
-83 4 2 6 0.52428800000000000000e6
-84 1 3 5 0.13107200000000000000e6
-84 1 5 12 -0.13107200000000000000e6
-84 3 1 6 -0.13107200000000000000e6
-85 1 3 6 0.13107200000000000000e6
-85 1 3 10 -0.52428800000000000000e6
-85 1 4 19 0.13107200000000000000e6
-85 1 6 13 0.13107200000000000000e6
-85 1 7 14 -0.26214400000000000000e6
-85 1 8 15 0.52428800000000000000e6
-85 2 3 9 0.13107200000000000000e6
-85 3 1 6 0.13107200000000000000e6
-85 3 2 7 0.13107200000000000000e6
-85 3 3 8 0.26214400000000000000e6
-85 3 6 7 0.26214400000000000000e6
-85 3 7 12 0.13107200000000000000e6
-85 4 1 5 0.13107200000000000000e6
-85 4 2 6 0.26214400000000000000e6
-86 1 3 7 0.13107200000000000000e6
-86 1 6 13 -0.13107200000000000000e6
-86 3 2 7 -0.13107200000000000000e6
-87 1 2 9 -0.13107200000000000000e6
-87 1 3 8 0.13107200000000000000e6
-88 1 3 9 0.13107200000000000000e6
-88 1 7 14 -0.13107200000000000000e6
-88 3 3 8 -0.13107200000000000000e6
-89 1 2 17 -0.13107200000000000000e6
-89 1 3 11 0.13107200000000000000e6
-89 3 2 11 -0.13107200000000000000e6
-90 1 3 12 0.13107200000000000000e6
-90 1 4 11 -0.13107200000000000000e6
-91 1 2 17 0.13107200000000000000e6
-91 1 3 13 0.13107200000000000000e6
-91 1 4 11 0.13107200000000000000e6
-91 1 4 19 0.26214400000000000000e6
-91 1 6 13 0.26214400000000000000e6
-91 1 7 14 -0.52428800000000000000e6
-91 2 2 8 0.13107200000000000000e6
-91 2 3 9 0.26214400000000000000e6
-91 3 2 11 0.13107200000000000000e6
-91 3 7 12 0.26214400000000000000e6
-92 1 3 14 0.13107200000000000000e6
-92 1 4 19 0.13107200000000000000e6
-92 1 6 13 0.13107200000000000000e6
-92 1 7 14 -0.26214400000000000000e6
-92 2 3 9 0.13107200000000000000e6
-92 3 7 12 0.13107200000000000000e6
-93 1 3 15 0.13107200000000000000e6
-93 1 6 13 -0.13107200000000000000e6
-94 1 3 16 0.13107200000000000000e6
-94 1 7 14 -0.13107200000000000000e6
-95 1 3 17 0.13107200000000000000e6
-95 1 11 18 -0.13107200000000000000e6
-95 3 11 12 -0.13107200000000000000e6
-96 1 3 19 0.13107200000000000000e6
-96 1 6 13 -0.13107200000000000000e6
-96 3 2 15 0.13107200000000000000e6
-97 1 1 20 0.13107200000000000000e6
-97 1 2 17 -0.13107200000000000000e6
-97 1 3 18 -0.13107200000000000000e6
-97 1 3 20 0.13107200000000000000e6
-97 1 4 19 -0.26214400000000000000e6
-97 1 5 20 -0.26214400000000000000e6
-97 1 6 13 -0.26214400000000000000e6
-97 1 7 14 0.52428800000000000000e6
-97 2 3 9 -0.26214400000000000000e6
-97 3 6 11 -0.26214400000000000000e6
-97 3 7 12 -0.26214400000000000000e6
-97 3 11 12 -0.13107200000000000000e6
-97 4 7 7 -0.26214400000000000000e6
-98 1 1 20 -0.65536000000000000000e5
-98 1 4 4 0.13107200000000000000e6
-98 1 5 20 0.13107200000000000000e6
-98 1 6 13 -0.13107200000000000000e6
-98 2 2 8 -0.65536000000000000000e5
-98 2 8 10 0.65536000000000000000e5
-98 3 2 11 -0.65536000000000000000e5
-98 3 3 4 -0.65536000000000000000e5
-98 3 4 17 -0.65536000000000000000e5
-98 3 5 18 0.13107200000000000000e6
-98 3 6 11 0.13107200000000000000e6
-98 4 3 7 0.65536000000000000000e5
-98 4 7 7 0.13107200000000000000e6
-99 1 3 10 -0.52428800000000000000e6
-99 1 4 5 0.13107200000000000000e6
-99 1 4 19 0.13107200000000000000e6
-99 1 6 13 0.13107200000000000000e6
-99 1 7 14 -0.26214400000000000000e6
-99 1 8 15 0.52428800000000000000e6
-99 2 3 9 0.13107200000000000000e6
-99 3 1 6 0.13107200000000000000e6
-99 3 2 7 0.13107200000000000000e6
-99 3 3 8 0.26214400000000000000e6
-99 3 6 7 0.26214400000000000000e6
-99 3 7 12 0.13107200000000000000e6
-99 4 1 5 0.13107200000000000000e6
-99 4 2 6 0.26214400000000000000e6
-100 1 4 6 0.13107200000000000000e6
-100 1 6 13 -0.13107200000000000000e6
-100 3 2 7 -0.13107200000000000000e6
-101 1 4 8 0.13107200000000000000e6
-101 1 7 14 -0.13107200000000000000e6
-101 3 3 8 -0.13107200000000000000e6
-102 1 2 9 0.13107200000000000000e6
-102 1 3 10 -0.26214400000000000000e6
-102 1 4 9 0.13107200000000000000e6
-102 1 7 14 0.13107200000000000000e6
-102 2 6 8 0.13107200000000000000e6
-102 3 3 8 0.13107200000000000000e6
-102 4 2 6 0.13107200000000000000e6
-103 1 4 10 0.13107200000000000000e6
-103 1 10 13 -0.13107200000000000000e6
-103 3 3 8 -0.65536000000000000000e5
-103 3 4 9 -0.65536000000000000000e5
-103 3 6 7 -0.65536000000000000000e5
-103 4 5 5 -0.13107200000000000000e6
-104 1 2 17 0.13107200000000000000e6
-104 1 4 11 0.13107200000000000000e6
-104 1 4 12 0.13107200000000000000e6
-104 1 4 19 0.26214400000000000000e6
-104 1 6 13 0.26214400000000000000e6
-104 1 7 14 -0.52428800000000000000e6
-104 2 2 8 0.13107200000000000000e6
-104 2 3 9 0.26214400000000000000e6
-104 3 2 11 0.13107200000000000000e6
-104 3 7 12 0.26214400000000000000e6
-105 1 1 20 -0.13107200000000000000e6
-105 1 4 13 0.13107200000000000000e6
-105 1 5 20 0.26214400000000000000e6
-105 1 6 13 -0.26214400000000000000e6
-105 2 2 8 -0.13107200000000000000e6
-105 2 8 10 0.13107200000000000000e6
-105 3 2 11 -0.13107200000000000000e6
-105 3 4 17 -0.13107200000000000000e6
-105 3 5 18 0.26214400000000000000e6
-105 3 6 11 0.26214400000000000000e6
-105 4 3 7 0.13107200000000000000e6
-105 4 7 7 0.26214400000000000000e6
-106 1 4 14 0.13107200000000000000e6
-106 1 6 13 -0.13107200000000000000e6
-107 1 4 15 0.13107200000000000000e6
-107 1 4 19 -0.13107200000000000000e6
-107 3 7 12 -0.13107200000000000000e6
-108 1 2 9 0.13107200000000000000e6
-108 1 3 10 -0.26214400000000000000e6
-108 1 4 16 0.13107200000000000000e6
-108 1 7 14 0.13107200000000000000e6
-108 2 6 8 0.13107200000000000000e6
-108 3 3 8 0.13107200000000000000e6
-108 3 6 7 0.13107200000000000000e6
-108 4 2 6 0.13107200000000000000e6
-109 1 3 18 -0.13107200000000000000e6
-109 1 4 17 0.13107200000000000000e6
-110 1 1 20 -0.13107200000000000000e6
-110 1 2 17 0.13107200000000000000e6
-110 1 3 18 0.13107200000000000000e6
-110 1 4 18 0.13107200000000000000e6
-110 1 4 19 0.26214400000000000000e6
-110 1 5 20 0.26214400000000000000e6
-110 1 7 14 -0.52428800000000000000e6
-110 1 11 18 0.13107200000000000000e6
-110 2 3 9 0.26214400000000000000e6
-110 2 8 10 0.13107200000000000000e6
-110 3 2 15 0.26214400000000000000e6
-110 3 4 17 -0.13107200000000000000e6
-110 3 5 18 0.26214400000000000000e6
-110 3 6 11 0.26214400000000000000e6
-110 3 7 12 0.26214400000000000000e6
-110 3 11 12 0.13107200000000000000e6
-110 4 7 7 0.26214400000000000000e6
-111 1 1 20 -0.13107200000000000000e6
-111 1 2 17 0.13107200000000000000e6
-111 1 3 18 0.13107200000000000000e6
-111 1 4 19 0.26214400000000000000e6
-111 1 4 20 0.13107200000000000000e6
-111 1 5 20 0.26214400000000000000e6
-111 1 7 14 -0.52428800000000000000e6
-111 1 11 18 0.13107200000000000000e6
-111 2 3 9 0.26214400000000000000e6
-111 2 8 10 0.13107200000000000000e6
-111 3 2 15 0.26214400000000000000e6
-111 3 5 18 0.26214400000000000000e6
-111 3 6 11 0.26214400000000000000e6
-111 3 7 12 0.26214400000000000000e6
-111 3 11 12 0.13107200000000000000e6
-111 4 7 7 0.26214400000000000000e6
-112 1 1 8 -0.65536000000000000000e5
-112 1 5 5 0.13107200000000000000e6
-113 1 2 5 -0.65536000000000000000e5
-113 1 3 10 -0.26214400000000000000e6
-113 1 4 19 0.65536000000000000000e5
-113 1 5 6 0.13107200000000000000e6
-113 1 5 12 -0.65536000000000000000e5
-113 1 6 13 0.65536000000000000000e5
-113 1 7 14 -0.13107200000000000000e6
-113 1 8 15 0.26214400000000000000e6
-113 2 2 4 -0.65536000000000000000e5
-113 2 3 9 0.65536000000000000000e5
-113 3 2 7 0.65536000000000000000e5
-113 3 3 8 0.13107200000000000000e6
-113 3 6 7 0.13107200000000000000e6
-113 3 7 12 0.65536000000000000000e5
-113 4 1 5 0.65536000000000000000e5
-113 4 2 6 0.13107200000000000000e6
-114 1 2 9 -0.13107200000000000000e6
-114 1 5 7 0.13107200000000000000e6
-115 1 1 16 0.65536000000000000000e5
-115 1 2 5 -0.32768000000000000000e5
-115 1 3 10 -0.26214400000000000000e6
-115 1 4 19 0.32768000000000000000e5
-115 1 5 9 0.13107200000000000000e6
-115 1 5 12 -0.32768000000000000000e5
-115 1 5 16 -0.13107200000000000000e6
-115 1 6 13 0.32768000000000000000e5
-115 1 7 14 -0.65536000000000000000e5
-115 1 8 15 0.26214400000000000000e6
-115 2 2 4 -0.32768000000000000000e5
-115 2 3 9 0.32768000000000000000e5
-115 3 2 7 0.32768000000000000000e5
-115 3 3 8 0.65536000000000000000e5
-115 3 6 7 0.13107200000000000000e6
-115 3 7 12 0.32768000000000000000e5
-115 4 1 5 0.32768000000000000000e5
-115 4 2 6 0.13107200000000000000e6
-115 4 4 4 -0.13107200000000000000e6
-116 1 1 16 0.32768000000000000000e5
-116 1 2 5 -0.16384000000000000000e5
-116 1 3 10 -0.19660800000000000000e6
-116 1 4 19 0.16384000000000000000e5
-116 1 5 8 -0.65536000000000000000e5
-116 1 5 10 0.13107200000000000000e6
-116 1 5 12 -0.16384000000000000000e5
-116 1 5 16 -0.65536000000000000000e5
-116 1 6 13 0.16384000000000000000e5
-116 1 7 14 -0.32768000000000000000e5
-116 1 8 15 0.13107200000000000000e6
-116 2 2 4 -0.16384000000000000000e5
-116 2 3 9 0.16384000000000000000e5
-116 2 4 6 -0.65536000000000000000e5
-116 3 2 7 0.16384000000000000000e5
-116 3 3 8 0.32768000000000000000e5
-116 3 6 7 0.65536000000000000000e5
-116 3 7 12 0.16384000000000000000e5
-116 4 1 5 0.16384000000000000000e5
-116 4 2 6 0.65536000000000000000e5
-116 4 4 4 -0.65536000000000000000e5
-117 1 1 16 -0.26214400000000000000e6
-117 1 4 19 -0.13107200000000000000e6
-117 1 5 11 0.13107200000000000000e6
-117 1 5 12 0.13107200000000000000e6
-117 1 6 13 -0.13107200000000000000e6
-117 1 7 14 0.26214400000000000000e6
-117 2 1 9 0.13107200000000000000e6
-117 2 3 9 -0.13107200000000000000e6
-117 3 7 12 -0.13107200000000000000e6
-118 1 4 19 0.13107200000000000000e6
-118 1 5 13 0.13107200000000000000e6
-118 1 6 13 0.13107200000000000000e6
-118 1 7 14 -0.26214400000000000000e6
-118 2 3 9 0.13107200000000000000e6
-118 3 7 12 0.13107200000000000000e6
-119 1 1 16 -0.13107200000000000000e6
-119 1 5 14 0.13107200000000000000e6
-120 1 2 9 -0.13107200000000000000e6
-120 1 3 10 0.26214400000000000000e6
-120 1 5 15 0.13107200000000000000e6
-120 1 8 15 -0.26214400000000000000e6
-120 3 3 8 -0.13107200000000000000e6
-120 3 6 7 -0.13107200000000000000e6
-120 4 2 6 -0.13107200000000000000e6
-121 1 5 12 -0.13107200000000000000e6
-121 1 5 17 0.13107200000000000000e6
-121 3 1 14 0.13107200000000000000e6
-122 1 4 19 0.13107200000000000000e6
-122 1 5 18 0.13107200000000000000e6
-122 1 6 13 0.13107200000000000000e6
-122 1 7 14 -0.26214400000000000000e6
-122 2 3 9 0.13107200000000000000e6
-122 3 6 11 0.13107200000000000000e6
-122 3 7 12 0.13107200000000000000e6
-123 1 4 19 0.65536000000000000000e5
-123 1 5 12 -0.65536000000000000000e5
-123 1 5 19 0.13107200000000000000e6
-123 1 7 14 -0.13107200000000000000e6
-123 2 3 9 0.65536000000000000000e5
-123 2 4 10 -0.65536000000000000000e5
-123 3 1 14 0.65536000000000000000e5
-123 3 2 15 0.65536000000000000000e5
-123 3 6 11 0.65536000000000000000e5
-123 3 7 12 0.65536000000000000000e5
-124 1 2 9 -0.65536000000000000000e5
-124 1 6 6 0.13107200000000000000e6
-125 1 6 7 0.13107200000000000000e6
-125 1 7 14 -0.13107200000000000000e6
-125 3 3 8 -0.13107200000000000000e6
-126 1 1 16 0.65536000000000000000e5
-126 1 2 5 -0.32768000000000000000e5
-126 1 3 10 -0.26214400000000000000e6
-126 1 4 19 0.32768000000000000000e5
-126 1 5 12 -0.32768000000000000000e5
-126 1 5 16 -0.13107200000000000000e6
-126 1 6 8 0.13107200000000000000e6
-126 1 6 13 0.32768000000000000000e5
-126 1 7 14 -0.65536000000000000000e5
-126 1 8 15 0.26214400000000000000e6
-126 2 2 4 -0.32768000000000000000e5
-126 2 3 9 0.32768000000000000000e5
-126 3 2 7 0.32768000000000000000e5
-126 3 3 8 0.65536000000000000000e5
-126 3 6 7 0.13107200000000000000e6
-126 3 7 12 0.32768000000000000000e5
-126 4 1 5 0.32768000000000000000e5
-126 4 2 6 0.13107200000000000000e6
-126 4 4 4 -0.13107200000000000000e6
-127 1 3 10 -0.13107200000000000000e6
-127 1 6 9 0.13107200000000000000e6
-128 1 6 10 0.13107200000000000000e6
-128 1 8 9 -0.13107200000000000000e6
-129 1 5 12 -0.13107200000000000000e6
-129 1 6 11 0.13107200000000000000e6
-130 1 4 19 0.13107200000000000000e6
-130 1 6 12 0.13107200000000000000e6
-130 1 6 13 0.13107200000000000000e6
-130 1 7 14 -0.26214400000000000000e6
-130 2 3 9 0.13107200000000000000e6
-130 3 7 12 0.13107200000000000000e6
-131 1 2 9 -0.13107200000000000000e6
-131 1 3 10 0.26214400000000000000e6
-131 1 6 14 0.13107200000000000000e6
-131 1 8 15 -0.26214400000000000000e6
-131 3 3 8 -0.13107200000000000000e6
-131 3 6 7 -0.13107200000000000000e6
-131 4 2 6 -0.13107200000000000000e6
-132 1 6 15 0.13107200000000000000e6
-132 1 7 14 -0.13107200000000000000e6
-133 1 6 16 0.13107200000000000000e6
-133 1 8 15 -0.13107200000000000000e6
-134 1 4 19 0.13107200000000000000e6
-134 1 6 13 0.13107200000000000000e6
-134 1 6 17 0.13107200000000000000e6
-134 1 7 14 -0.26214400000000000000e6
-134 2 3 9 0.13107200000000000000e6
-134 3 6 11 0.13107200000000000000e6
-134 3 7 12 0.13107200000000000000e6
-135 1 6 13 -0.13107200000000000000e6
-135 1 6 18 0.13107200000000000000e6
-135 3 2 15 0.13107200000000000000e6
-136 1 6 19 0.13107200000000000000e6
-136 1 7 14 -0.13107200000000000000e6
-136 3 2 15 0.65536000000000000000e5
-136 3 6 11 0.65536000000000000000e5
-136 3 7 12 0.65536000000000000000e5
-136 4 4 8 0.65536000000000000000e5
-137 1 6 13 -0.13107200000000000000e6
-137 1 6 20 0.13107200000000000000e6
-137 3 2 15 0.13107200000000000000e6
-137 3 5 18 0.13107200000000000000e6
-138 1 2 9 0.65536000000000000000e5
-138 1 3 10 -0.13107200000000000000e6
-138 1 7 7 0.13107200000000000000e6
-138 1 7 14 0.65536000000000000000e5
-138 2 6 8 0.65536000000000000000e5
-138 3 3 8 0.65536000000000000000e5
-138 4 2 6 0.65536000000000000000e5
-139 1 3 10 -0.13107200000000000000e6
-139 1 7 8 0.13107200000000000000e6
-140 1 7 9 0.13107200000000000000e6
-140 1 10 13 -0.13107200000000000000e6
-140 3 3 8 -0.65536000000000000000e5
-140 3 4 9 -0.65536000000000000000e5
-140 3 6 7 -0.65536000000000000000e5
-140 4 5 5 -0.13107200000000000000e6
-141 1 7 10 0.13107200000000000000e6
-141 1 9 16 -0.13107200000000000000e6
-141 3 8 9 -0.13107200000000000000e6
-142 1 4 19 0.13107200000000000000e6
-142 1 6 13 0.13107200000000000000e6
-142 1 7 11 0.13107200000000000000e6
-142 1 7 14 -0.26214400000000000000e6
-142 2 3 9 0.13107200000000000000e6
-142 3 7 12 0.13107200000000000000e6
-143 1 6 13 -0.13107200000000000000e6
-143 1 7 12 0.13107200000000000000e6
-144 1 4 19 -0.13107200000000000000e6
-144 1 7 13 0.13107200000000000000e6
-144 3 7 12 -0.13107200000000000000e6
-145 1 2 9 0.13107200000000000000e6
-145 1 3 10 -0.26214400000000000000e6
-145 1 7 14 0.13107200000000000000e6
-145 1 7 15 0.13107200000000000000e6
-145 2 6 8 0.13107200000000000000e6
-145 3 3 8 0.13107200000000000000e6
-145 3 6 7 0.13107200000000000000e6
-145 4 2 6 0.13107200000000000000e6
-146 1 7 16 0.13107200000000000000e6
-146 1 10 13 -0.13107200000000000000e6
-147 1 6 13 -0.13107200000000000000e6
-147 1 7 17 0.13107200000000000000e6
-147 3 2 15 0.13107200000000000000e6
-148 1 4 19 -0.13107200000000000000e6
-148 1 7 18 0.13107200000000000000e6
-149 1 2 9 0.13107200000000000000e6
-149 1 3 10 -0.26214400000000000000e6
-149 1 7 14 0.13107200000000000000e6
-149 1 7 19 0.13107200000000000000e6
-149 2 6 8 0.13107200000000000000e6
-149 3 3 8 0.13107200000000000000e6
-149 3 3 16 0.13107200000000000000e6
-149 3 6 7 0.13107200000000000000e6
-149 4 2 6 0.13107200000000000000e6
-150 1 4 19 -0.13107200000000000000e6
-150 1 7 20 0.13107200000000000000e6
-150 3 13 14 0.13107200000000000000e6
-151 1 1 16 0.16384000000000000000e5
-151 1 2 5 -0.81920000000000000000e4
-151 1 3 10 -0.98304000000000000000e5
-151 1 4 19 0.81920000000000000000e4
-151 1 5 8 -0.32768000000000000000e5
-151 1 5 12 -0.81920000000000000000e4
-151 1 5 16 -0.32768000000000000000e5
-151 1 6 13 0.81920000000000000000e4
-151 1 7 14 -0.16384000000000000000e5
-151 1 8 8 0.13107200000000000000e6
-151 1 8 15 0.65536000000000000000e5
-151 2 2 4 -0.81920000000000000000e4
-151 2 3 9 0.81920000000000000000e4
-151 2 4 6 -0.32768000000000000000e5
-151 3 2 7 0.81920000000000000000e4
-151 3 3 8 0.16384000000000000000e5
-151 3 6 7 0.32768000000000000000e5
-151 3 7 12 0.81920000000000000000e4
-151 4 1 5 0.81920000000000000000e4
-151 4 2 6 0.32768000000000000000e5
-151 4 4 4 -0.32768000000000000000e5
-152 1 1 16 0.16384000000000000000e5
-152 1 2 5 -0.81920000000000000000e4
-152 1 3 10 -0.98304000000000000000e5
-152 1 4 19 0.81920000000000000000e4
-152 1 5 8 -0.32768000000000000000e5
-152 1 5 12 -0.81920000000000000000e4
-152 1 5 16 -0.32768000000000000000e5
-152 1 6 13 0.81920000000000000000e4
-152 1 7 14 -0.16384000000000000000e5
-152 1 8 9 -0.65536000000000000000e5
-152 1 8 10 0.13107200000000000000e6
-152 1 8 15 0.65536000000000000000e5
-152 1 9 16 -0.65536000000000000000e5
-152 2 2 4 -0.81920000000000000000e4
-152 2 3 9 0.81920000000000000000e4
-152 2 4 6 -0.32768000000000000000e5
-152 2 6 6 -0.13107200000000000000e6
-152 3 2 7 0.81920000000000000000e4
-152 3 3 8 0.16384000000000000000e5
-152 3 6 7 0.32768000000000000000e5
-152 3 7 12 0.81920000000000000000e4
-152 3 8 9 -0.65536000000000000000e5
-152 4 1 5 0.81920000000000000000e4
-152 4 2 6 0.32768000000000000000e5
-152 4 4 4 -0.32768000000000000000e5
-153 1 1 16 -0.13107200000000000000e6
-153 1 8 11 0.13107200000000000000e6
-154 1 2 9 -0.13107200000000000000e6
-154 1 3 10 0.26214400000000000000e6
-154 1 8 12 0.13107200000000000000e6
-154 1 8 15 -0.26214400000000000000e6
-154 3 3 8 -0.13107200000000000000e6
-154 3 6 7 -0.13107200000000000000e6
-154 4 2 6 -0.13107200000000000000e6
-155 1 7 14 -0.13107200000000000000e6
-155 1 8 13 0.13107200000000000000e6
-156 1 5 16 -0.13107200000000000000e6
-156 1 8 14 0.13107200000000000000e6
-157 1 8 9 -0.13107200000000000000e6
-157 1 8 16 0.13107200000000000000e6
-157 3 5 10 0.13107200000000000000e6
-158 1 4 19 0.65536000000000000000e5
-158 1 5 12 -0.65536000000000000000e5
-158 1 7 14 -0.13107200000000000000e6
-158 1 8 17 0.13107200000000000000e6
-158 2 3 9 0.65536000000000000000e5
-158 2 4 10 -0.65536000000000000000e5
-158 3 1 14 0.65536000000000000000e5
-158 3 2 15 0.65536000000000000000e5
-158 3 6 11 0.65536000000000000000e5
-158 3 7 12 0.65536000000000000000e5
-159 1 7 14 -0.13107200000000000000e6
-159 1 8 18 0.13107200000000000000e6
-159 3 2 15 0.65536000000000000000e5
-159 3 6 11 0.65536000000000000000e5
-159 3 7 12 0.65536000000000000000e5
-159 4 4 8 0.65536000000000000000e5
-160 1 8 19 0.13107200000000000000e6
-160 1 10 17 -0.13107200000000000000e6
-161 1 7 14 -0.13107200000000000000e6
-161 1 8 20 0.13107200000000000000e6
-161 3 2 15 0.65536000000000000000e5
-161 3 6 11 0.65536000000000000000e5
-161 3 7 12 0.65536000000000000000e5
-161 3 11 16 0.13107200000000000000e6
-161 4 4 8 0.65536000000000000000e5
-162 1 9 9 0.13107200000000000000e6
-162 1 9 16 -0.65536000000000000000e5
-162 3 8 9 -0.65536000000000000000e5
-163 1 2 9 -0.13107200000000000000e6
-163 1 3 10 0.26214400000000000000e6
-163 1 8 15 -0.26214400000000000000e6
-163 1 9 11 0.13107200000000000000e6
-163 3 3 8 -0.13107200000000000000e6
-163 3 6 7 -0.13107200000000000000e6
-163 4 2 6 -0.13107200000000000000e6
-164 1 7 14 -0.13107200000000000000e6
-164 1 9 12 0.13107200000000000000e6
-165 1 2 9 0.13107200000000000000e6
-165 1 3 10 -0.26214400000000000000e6
-165 1 7 14 0.13107200000000000000e6
-165 1 9 13 0.13107200000000000000e6
-165 2 6 8 0.13107200000000000000e6
-165 3 3 8 0.13107200000000000000e6
-165 3 6 7 0.13107200000000000000e6
-165 4 2 6 0.13107200000000000000e6
-166 1 8 15 -0.13107200000000000000e6
-166 1 9 14 0.13107200000000000000e6
-167 1 9 15 0.13107200000000000000e6
-167 1 10 13 -0.13107200000000000000e6
-168 1 7 14 -0.13107200000000000000e6
-168 1 9 17 0.13107200000000000000e6
-168 3 2 15 0.65536000000000000000e5
-168 3 6 11 0.65536000000000000000e5
-168 3 7 12 0.65536000000000000000e5
-168 4 4 8 0.65536000000000000000e5
-169 1 2 9 0.13107200000000000000e6
-169 1 3 10 -0.26214400000000000000e6
-169 1 7 14 0.13107200000000000000e6
-169 1 9 18 0.13107200000000000000e6
-169 2 6 8 0.13107200000000000000e6
-169 3 3 8 0.13107200000000000000e6
-169 3 3 16 0.13107200000000000000e6
-169 3 6 7 0.13107200000000000000e6
-169 4 2 6 0.13107200000000000000e6
-170 1 9 19 0.13107200000000000000e6
-170 1 10 13 -0.13107200000000000000e6
-170 3 9 14 0.13107200000000000000e6
-171 1 2 9 0.13107200000000000000e6
-171 1 3 10 -0.26214400000000000000e6
-171 1 7 14 0.13107200000000000000e6
-171 1 9 20 0.13107200000000000000e6
-171 2 6 8 0.13107200000000000000e6
-171 3 3 8 0.13107200000000000000e6
-171 3 3 16 0.13107200000000000000e6
-171 3 6 7 0.13107200000000000000e6
-171 3 6 19 0.13107200000000000000e6
-171 4 2 6 0.13107200000000000000e6
-172 1 5 16 -0.13107200000000000000e6
-172 1 10 11 0.13107200000000000000e6
-173 1 8 15 -0.13107200000000000000e6
-173 1 10 12 0.13107200000000000000e6
-174 1 8 9 -0.13107200000000000000e6
-174 1 10 14 0.13107200000000000000e6
-174 3 5 10 0.13107200000000000000e6
-175 1 9 16 -0.13107200000000000000e6
-175 1 10 15 0.13107200000000000000e6
-176 1 9 10 -0.13107200000000000000e6
-176 1 10 16 0.13107200000000000000e6
-176 3 5 10 0.65536000000000000000e5
-176 3 7 10 0.65536000000000000000e5
-176 3 8 9 0.65536000000000000000e5
-176 4 6 6 0.13107200000000000000e6
-177 1 10 13 -0.13107200000000000000e6
-177 1 10 18 0.13107200000000000000e6
-177 3 9 14 0.13107200000000000000e6
-178 1 10 20 0.13107200000000000000e6
-178 1 16 19 -0.13107200000000000000e6
-179 1 2 17 0.65536000000000000000e5
-179 1 5 12 -0.13107200000000000000e6
-179 1 11 11 0.13107200000000000000e6
-179 1 11 18 0.65536000000000000000e5
-179 2 7 7 0.13107200000000000000e6
-179 3 1 14 0.13107200000000000000e6
-179 3 11 12 0.65536000000000000000e5
-180 1 2 17 -0.13107200000000000000e6
-180 1 11 12 0.13107200000000000000e6
-181 1 11 13 0.13107200000000000000e6
-181 1 11 18 -0.13107200000000000000e6
-181 3 11 12 -0.13107200000000000000e6
-182 1 5 12 -0.13107200000000000000e6
-182 1 11 14 0.13107200000000000000e6
-182 3 1 14 0.13107200000000000000e6
-183 1 4 19 0.13107200000000000000e6
-183 1 6 13 0.13107200000000000000e6
-183 1 7 14 -0.26214400000000000000e6
-183 1 11 15 0.13107200000000000000e6
-183 2 3 9 0.13107200000000000000e6
-183 3 6 11 0.13107200000000000000e6
-183 3 7 12 0.13107200000000000000e6
-184 1 4 19 0.65536000000000000000e5
-184 1 5 12 -0.65536000000000000000e5
-184 1 7 14 -0.13107200000000000000e6
-184 1 11 16 0.13107200000000000000e6
-184 2 3 9 0.65536000000000000000e5
-184 2 4 10 -0.65536000000000000000e5
-184 3 1 14 0.65536000000000000000e5
-184 3 2 15 0.65536000000000000000e5
-184 3 6 11 0.65536000000000000000e5
-184 3 7 12 0.65536000000000000000e5
-185 1 1 20 -0.13107200000000000000e6
-185 1 11 17 0.13107200000000000000e6
-186 1 5 20 -0.13107200000000000000e6
-186 1 11 19 0.13107200000000000000e6
-187 1 1 20 -0.13107200000000000000e6
-187 1 2 17 0.13107200000000000000e6
-187 1 3 18 0.13107200000000000000e6
-187 1 4 19 0.26214400000000000000e6
-187 1 5 20 0.26214400000000000000e6
-187 1 7 14 -0.52428800000000000000e6
-187 1 11 20 0.13107200000000000000e6
-187 1 13 20 0.13107200000000000000e6
-187 2 3 9 0.26214400000000000000e6
-187 2 10 10 0.26214400000000000000e6
-187 3 2 15 0.26214400000000000000e6
-187 3 5 18 0.26214400000000000000e6
-187 3 5 20 0.26214400000000000000e6
-187 3 6 11 0.26214400000000000000e6
-187 3 7 12 0.26214400000000000000e6
-187 3 11 12 0.13107200000000000000e6
-187 3 12 17 -0.13107200000000000000e6
-187 4 7 7 0.26214400000000000000e6
-188 1 11 18 -0.65536000000000000000e5
-188 1 12 12 0.13107200000000000000e6
-188 3 11 12 -0.65536000000000000000e5
-189 1 3 18 -0.13107200000000000000e6
-189 1 12 13 0.13107200000000000000e6
-190 1 4 19 0.13107200000000000000e6
-190 1 6 13 0.13107200000000000000e6
-190 1 7 14 -0.26214400000000000000e6
-190 1 12 14 0.13107200000000000000e6
-190 2 3 9 0.13107200000000000000e6
-190 3 6 11 0.13107200000000000000e6
-190 3 7 12 0.13107200000000000000e6
-191 1 6 13 -0.13107200000000000000e6
-191 1 12 15 0.13107200000000000000e6
-191 3 2 15 0.13107200000000000000e6
-192 1 7 14 -0.13107200000000000000e6
-192 1 12 16 0.13107200000000000000e6
-192 3 2 15 0.65536000000000000000e5
-192 3 6 11 0.65536000000000000000e5
-192 3 7 12 0.65536000000000000000e5
-192 4 4 8 0.65536000000000000000e5
-193 1 11 18 -0.13107200000000000000e6
-193 1 12 17 0.13107200000000000000e6
-194 1 1 20 0.13107200000000000000e6
-194 1 2 17 -0.13107200000000000000e6
-194 1 3 18 -0.13107200000000000000e6
-194 1 4 19 -0.26214400000000000000e6
-194 1 5 20 -0.26214400000000000000e6
-194 1 6 13 -0.26214400000000000000e6
-194 1 7 14 0.52428800000000000000e6
-194 1 12 18 0.13107200000000000000e6
-194 2 3 9 -0.26214400000000000000e6
-194 3 6 11 -0.26214400000000000000e6
-194 3 7 12 -0.26214400000000000000e6
-194 3 11 12 -0.13107200000000000000e6
-194 4 7 7 -0.26214400000000000000e6
-195 1 6 13 -0.13107200000000000000e6
-195 1 12 19 0.13107200000000000000e6
-195 3 2 15 0.13107200000000000000e6
-195 3 5 18 0.13107200000000000000e6
-196 1 1 20 0.13107200000000000000e6
-196 1 2 17 -0.13107200000000000000e6
-196 1 3 18 -0.13107200000000000000e6
-196 1 4 19 -0.26214400000000000000e6
-196 1 5 20 -0.26214400000000000000e6
-196 1 6 13 -0.26214400000000000000e6
-196 1 7 14 0.52428800000000000000e6
-196 1 12 20 0.13107200000000000000e6
-196 2 3 9 -0.26214400000000000000e6
-196 3 6 11 -0.26214400000000000000e6
-196 3 7 12 -0.26214400000000000000e6
-196 3 11 12 -0.13107200000000000000e6
-196 3 12 17 0.13107200000000000000e6
-196 4 7 7 -0.26214400000000000000e6
-197 1 1 20 -0.65536000000000000000e5
-197 1 2 17 0.65536000000000000000e5
-197 1 3 18 0.65536000000000000000e5
-197 1 4 19 0.13107200000000000000e6
-197 1 5 20 0.13107200000000000000e6
-197 1 7 14 -0.26214400000000000000e6
-197 1 11 18 0.65536000000000000000e5
-197 1 13 13 0.13107200000000000000e6
-197 2 3 9 0.13107200000000000000e6
-197 2 8 10 0.65536000000000000000e5
-197 3 2 15 0.13107200000000000000e6
-197 3 4 17 -0.65536000000000000000e5
-197 3 5 18 0.13107200000000000000e6
-197 3 6 11 0.13107200000000000000e6
-197 3 7 12 0.13107200000000000000e6
-197 3 11 12 0.65536000000000000000e5
-197 4 7 7 0.13107200000000000000e6
-198 1 6 13 -0.13107200000000000000e6
-198 1 13 14 0.13107200000000000000e6
-198 3 2 15 0.13107200000000000000e6
-199 1 4 19 -0.13107200000000000000e6
-199 1 13 15 0.13107200000000000000e6
-200 1 2 9 0.13107200000000000000e6
-200 1 3 10 -0.26214400000000000000e6
-200 1 7 14 0.13107200000000000000e6
-200 1 13 16 0.13107200000000000000e6
-200 2 6 8 0.13107200000000000000e6
-200 3 3 8 0.13107200000000000000e6
-200 3 3 16 0.13107200000000000000e6
-200 3 6 7 0.13107200000000000000e6
-200 4 2 6 0.13107200000000000000e6
-201 1 1 20 0.13107200000000000000e6
-201 1 2 17 -0.13107200000000000000e6
-201 1 3 18 -0.13107200000000000000e6
-201 1 4 19 -0.26214400000000000000e6
-201 1 5 20 -0.26214400000000000000e6
-201 1 6 13 -0.26214400000000000000e6
-201 1 7 14 0.52428800000000000000e6
-201 1 13 17 0.13107200000000000000e6
-201 2 3 9 -0.26214400000000000000e6
-201 3 6 11 -0.26214400000000000000e6
-201 3 7 12 -0.26214400000000000000e6
-201 3 11 12 -0.13107200000000000000e6
-201 4 7 7 -0.26214400000000000000e6
-202 1 1 20 -0.13107200000000000000e6
-202 1 2 17 0.13107200000000000000e6
-202 1 3 18 0.13107200000000000000e6
-202 1 4 19 0.26214400000000000000e6
-202 1 5 20 0.26214400000000000000e6
-202 1 7 14 -0.52428800000000000000e6
-202 1 11 18 0.13107200000000000000e6
-202 1 13 18 0.13107200000000000000e6
-202 2 3 9 0.26214400000000000000e6
-202 2 8 10 0.13107200000000000000e6
-202 3 2 15 0.26214400000000000000e6
-202 3 5 18 0.26214400000000000000e6
-202 3 6 11 0.26214400000000000000e6
-202 3 7 12 0.26214400000000000000e6
-202 3 11 12 0.13107200000000000000e6
-202 4 7 7 0.26214400000000000000e6
-203 1 4 19 -0.13107200000000000000e6
-203 1 13 19 0.13107200000000000000e6
-203 3 13 14 0.13107200000000000000e6
-204 1 4 19 0.32768000000000000000e5
-204 1 5 12 -0.32768000000000000000e5
-204 1 7 14 -0.65536000000000000000e5
-204 1 14 14 0.13107200000000000000e6
-204 2 3 9 0.32768000000000000000e5
-204 2 4 10 -0.32768000000000000000e5
-204 3 1 14 0.32768000000000000000e5
-204 3 2 15 0.32768000000000000000e5
-204 3 6 11 0.32768000000000000000e5
-204 3 7 12 0.32768000000000000000e5
-205 1 7 14 -0.13107200000000000000e6
-205 1 14 15 0.13107200000000000000e6
-205 3 2 15 0.65536000000000000000e5
-205 3 6 11 0.65536000000000000000e5
-205 3 7 12 0.65536000000000000000e5
-205 4 4 8 0.65536000000000000000e5
-206 1 10 17 -0.13107200000000000000e6
-206 1 14 16 0.13107200000000000000e6
-207 1 5 20 -0.13107200000000000000e6
-207 1 14 17 0.13107200000000000000e6
-208 1 6 13 -0.13107200000000000000e6
-208 1 14 18 0.13107200000000000000e6
-208 3 2 15 0.13107200000000000000e6
-208 3 5 18 0.13107200000000000000e6
-209 1 7 14 -0.13107200000000000000e6
-209 1 14 19 0.13107200000000000000e6
-209 3 2 15 0.65536000000000000000e5
-209 3 6 11 0.65536000000000000000e5
-209 3 7 12 0.65536000000000000000e5
-209 3 11 16 0.13107200000000000000e6
-209 4 4 8 0.65536000000000000000e5
-210 1 6 13 -0.13107200000000000000e6
-210 1 14 20 0.13107200000000000000e6
-210 3 2 15 0.13107200000000000000e6
-210 3 5 18 0.13107200000000000000e6
-210 3 5 20 0.13107200000000000000e6
-211 1 2 9 0.65536000000000000000e5
-211 1 3 10 -0.13107200000000000000e6
-211 1 7 14 0.65536000000000000000e5
-211 1 15 15 0.13107200000000000000e6
-211 2 6 8 0.65536000000000000000e5
-211 3 3 8 0.65536000000000000000e5
-211 3 3 16 0.65536000000000000000e5
-211 3 6 7 0.65536000000000000000e5
-211 4 2 6 0.65536000000000000000e5
-212 1 10 13 -0.13107200000000000000e6
-212 1 15 16 0.13107200000000000000e6
-212 3 9 14 0.13107200000000000000e6
-213 1 6 13 -0.13107200000000000000e6
-213 1 15 17 0.13107200000000000000e6
-213 3 2 15 0.13107200000000000000e6
-213 3 5 18 0.13107200000000000000e6
-214 1 4 19 -0.13107200000000000000e6
-214 1 15 18 0.13107200000000000000e6
-214 3 13 14 0.13107200000000000000e6
-215 1 2 9 0.13107200000000000000e6
-215 1 3 10 -0.26214400000000000000e6
-215 1 7 14 0.13107200000000000000e6
-215 1 15 19 0.13107200000000000000e6
-215 2 6 8 0.13107200000000000000e6
-215 3 3 8 0.13107200000000000000e6
-215 3 3 16 0.13107200000000000000e6
-215 3 6 7 0.13107200000000000000e6
-215 3 6 19 0.13107200000000000000e6
-215 4 2 6 0.13107200000000000000e6
-216 1 15 20 0.13107200000000000000e6
-216 1 18 19 -0.13107200000000000000e6
-217 1 10 19 -0.65536000000000000000e5
-217 1 16 16 0.13107200000000000000e6
-218 1 7 14 -0.13107200000000000000e6
-218 1 16 17 0.13107200000000000000e6
-218 3 2 15 0.65536000000000000000e5
-218 3 6 11 0.65536000000000000000e5
-218 3 7 12 0.65536000000000000000e5
-218 3 11 16 0.13107200000000000000e6
-218 4 4 8 0.65536000000000000000e5
-219 1 2 9 0.13107200000000000000e6
-219 1 3 10 -0.26214400000000000000e6
-219 1 7 14 0.13107200000000000000e6
-219 1 16 18 0.13107200000000000000e6
-219 2 6 8 0.13107200000000000000e6
-219 3 3 8 0.13107200000000000000e6
-219 3 3 16 0.13107200000000000000e6
-219 3 6 7 0.13107200000000000000e6
-219 3 6 19 0.13107200000000000000e6
-219 4 2 6 0.13107200000000000000e6
-220 1 2 9 0.13107200000000000000e6
-220 1 3 10 -0.26214400000000000000e6
-220 1 7 14 0.13107200000000000000e6
-220 1 16 20 0.13107200000000000000e6
-220 2 6 8 0.13107200000000000000e6
-220 3 3 8 0.13107200000000000000e6
-220 3 3 16 0.13107200000000000000e6
-220 3 6 7 0.13107200000000000000e6
-220 3 6 19 0.13107200000000000000e6
-220 3 14 19 0.13107200000000000000e6
-220 4 2 6 0.13107200000000000000e6
-221 1 1 20 -0.65536000000000000000e5
-221 1 2 17 0.65536000000000000000e5
-221 1 3 18 0.65536000000000000000e5
-221 1 4 19 0.13107200000000000000e6
-221 1 5 20 0.13107200000000000000e6
-221 1 7 14 -0.26214400000000000000e6
-221 1 13 20 0.65536000000000000000e5
-221 1 17 17 0.13107200000000000000e6
-221 2 3 9 0.13107200000000000000e6
-221 2 10 10 0.13107200000000000000e6
-221 3 2 15 0.13107200000000000000e6
-221 3 5 18 0.13107200000000000000e6
-221 3 5 20 0.13107200000000000000e6
-221 3 6 11 0.13107200000000000000e6
-221 3 7 12 0.13107200000000000000e6
-221 3 11 12 0.65536000000000000000e5
-221 3 12 17 -0.65536000000000000000e5
-221 4 7 7 0.13107200000000000000e6
-222 1 1 20 0.13107200000000000000e6
-222 1 2 17 -0.13107200000000000000e6
-222 1 3 18 -0.13107200000000000000e6
-222 1 4 19 -0.26214400000000000000e6
-222 1 5 20 -0.26214400000000000000e6
-222 1 6 13 -0.26214400000000000000e6
-222 1 7 14 0.52428800000000000000e6
-222 1 17 18 0.13107200000000000000e6
-222 2 3 9 -0.26214400000000000000e6
-222 3 6 11 -0.26214400000000000000e6
-222 3 7 12 -0.26214400000000000000e6
-222 3 11 12 -0.13107200000000000000e6
-222 3 12 17 0.13107200000000000000e6
-222 4 7 7 -0.26214400000000000000e6
-223 1 6 13 -0.13107200000000000000e6
-223 1 17 19 0.13107200000000000000e6
-223 3 2 15 0.13107200000000000000e6
-223 3 5 18 0.13107200000000000000e6
-223 3 5 20 0.13107200000000000000e6
-224 1 13 20 -0.65536000000000000000e5
-224 1 18 18 0.13107200000000000000e6
-225 1 13 20 -0.13107200000000000000e6
-225 1 18 20 0.13107200000000000000e6
-225 3 17 18 0.13107200000000000000e6
-226 1 2 9 0.65536000000000000000e5
-226 1 3 10 -0.13107200000000000000e6
-226 1 7 14 0.65536000000000000000e5
-226 1 19 19 0.13107200000000000000e6
-226 2 6 8 0.65536000000000000000e5
-226 3 3 8 0.65536000000000000000e5
-226 3 3 16 0.65536000000000000000e5
-226 3 6 7 0.65536000000000000000e5
-226 3 6 19 0.65536000000000000000e5
-226 3 14 19 0.65536000000000000000e5
-226 4 2 6 0.65536000000000000000e5
-227 1 13 20 -0.65536000000000000000e5
-227 1 20 20 0.13107200000000000000e6
-227 3 17 18 0.65536000000000000000e5
-227 3 17 20 0.65536000000000000000e5
-228 2 1 2 0.13107200000000000000e6
-228 2 1 7 -0.13107200000000000000e6
-228 4 1 1 -0.26214400000000000000e6
-229 1 1 4 0.65536000000000000000e5
-229 1 1 8 -0.26214400000000000000e6
-229 1 1 16 0.26214400000000000000e6
-229 1 2 5 0.13107200000000000000e6
-229 1 2 17 -0.13107200000000000000e6
-229 1 4 11 0.65536000000000000000e5
-229 1 4 19 0.13107200000000000000e6
-229 1 6 13 0.13107200000000000000e6
-229 1 7 14 -0.26214400000000000000e6
-229 1 11 18 -0.65536000000000000000e5
-229 2 1 3 0.65536000000000000000e5
-229 2 1 4 0.13107200000000000000e6
-229 2 1 7 -0.65536000000000000000e5
-229 2 1 9 -0.13107200000000000000e6
-229 2 3 9 0.13107200000000000000e6
-229 2 7 7 -0.13107200000000000000e6
-229 3 1 2 0.65536000000000000000e5
-229 3 1 14 -0.13107200000000000000e6
-229 3 2 3 0.65536000000000000000e5
-229 3 2 11 -0.65536000000000000000e5
-229 3 7 12 0.13107200000000000000e6
-229 3 11 12 -0.65536000000000000000e5
-230 2 1 5 0.13107200000000000000e6
-230 2 2 4 -0.13107200000000000000e6
-231 1 1 8 0.13107200000000000000e6
-231 1 2 5 0.65536000000000000000e5
-231 1 2 9 0.13107200000000000000e6
-231 1 3 10 0.26214400000000000000e6
-231 1 4 19 -0.65536000000000000000e5
-231 1 5 8 -0.26214400000000000000e6
-231 1 5 12 0.65536000000000000000e5
-231 1 6 13 -0.65536000000000000000e5
-231 1 7 14 0.13107200000000000000e6
-231 1 8 15 -0.26214400000000000000e6
-231 2 1 6 0.13107200000000000000e6
-231 2 2 4 0.65536000000000000000e5
-231 2 3 9 -0.65536000000000000000e5
-231 3 2 7 -0.65536000000000000000e5
-231 3 3 8 -0.13107200000000000000e6
-231 3 6 7 -0.13107200000000000000e6
-231 3 7 12 -0.65536000000000000000e5
-231 4 1 5 -0.65536000000000000000e5
-231 4 2 6 -0.13107200000000000000e6
-232 1 1 4 -0.13107200000000000000e6
-232 1 2 17 0.13107200000000000000e6
-232 2 1 3 -0.13107200000000000000e6
-232 2 1 8 0.13107200000000000000e6
-232 3 1 2 -0.13107200000000000000e6
-232 3 1 6 0.26214400000000000000e6
-232 3 2 3 -0.13107200000000000000e6
-232 3 2 11 0.13107200000000000000e6
-233 2 1 10 0.13107200000000000000e6
-233 2 7 7 -0.26214400000000000000e6
-234 2 1 3 -0.65536000000000000000e5
-234 2 2 2 0.13107200000000000000e6
-235 2 2 3 0.13107200000000000000e6
-235 2 2 8 -0.13107200000000000000e6
-235 4 2 2 -0.26214400000000000000e6
-236 1 2 9 -0.26214400000000000000e6
-236 1 3 10 0.52428800000000000000e6
-236 1 4 19 -0.13107200000000000000e6
-236 1 5 12 0.13107200000000000000e6
-236 1 7 14 0.26214400000000000000e6
-236 1 8 15 -0.52428800000000000000e6
-236 2 2 5 0.13107200000000000000e6
-236 2 3 9 -0.13107200000000000000e6
-236 3 3 8 -0.26214400000000000000e6
-236 3 6 7 -0.26214400000000000000e6
-236 3 7 12 -0.13107200000000000000e6
-236 4 1 5 -0.13107200000000000000e6
-236 4 2 6 -0.26214400000000000000e6
-237 1 1 16 0.13107200000000000000e6
-237 1 2 9 0.13107200000000000000e6
-237 1 3 10 -0.26214400000000000000e6
-237 1 5 16 -0.26214400000000000000e6
-237 1 7 14 0.13107200000000000000e6
-237 1 8 15 0.26214400000000000000e6
-237 2 2 6 0.13107200000000000000e6
-237 3 3 8 0.13107200000000000000e6
-237 3 6 7 0.13107200000000000000e6
-237 4 2 6 0.13107200000000000000e6
-237 4 4 4 -0.26214400000000000000e6
-238 1 1 4 -0.13107200000000000000e6
-238 1 2 17 0.13107200000000000000e6
-238 2 1 3 -0.13107200000000000000e6
-238 2 2 7 0.13107200000000000000e6
-238 3 1 2 -0.13107200000000000000e6
-238 3 1 6 0.26214400000000000000e6
-238 3 2 3 -0.13107200000000000000e6
-238 3 2 11 0.13107200000000000000e6
-239 1 2 9 -0.26214400000000000000e6
-239 1 3 10 0.52428800000000000000e6
-239 1 4 19 -0.13107200000000000000e6
-239 1 5 12 0.13107200000000000000e6
-239 1 7 14 0.26214400000000000000e6
-239 1 8 15 -0.52428800000000000000e6
-239 2 2 9 0.13107200000000000000e6
-239 2 3 9 -0.13107200000000000000e6
-239 3 3 8 -0.26214400000000000000e6
-239 3 6 7 -0.26214400000000000000e6
-239 3 7 12 -0.13107200000000000000e6
-239 4 2 6 -0.26214400000000000000e6
-240 1 2 17 0.13107200000000000000e6
-240 1 3 18 0.13107200000000000000e6
-240 1 4 19 0.26214400000000000000e6
-240 1 6 13 0.26214400000000000000e6
-240 1 7 14 -0.52428800000000000000e6
-240 1 11 18 0.13107200000000000000e6
-240 2 2 10 0.13107200000000000000e6
-240 2 3 9 0.26214400000000000000e6
-240 3 6 11 0.26214400000000000000e6
-240 3 7 12 0.26214400000000000000e6
-240 3 11 12 0.13107200000000000000e6
-241 1 1 4 -0.65536000000000000000e5
-241 1 1 20 0.65536000000000000000e5
-241 1 3 10 0.52428800000000000000e6
-241 1 4 19 -0.13107200000000000000e6
-241 1 5 20 -0.13107200000000000000e6
-241 1 6 13 -0.13107200000000000000e6
-241 1 7 14 0.26214400000000000000e6
-241 1 8 15 -0.52428800000000000000e6
-241 2 3 3 0.13107200000000000000e6
-241 2 3 9 -0.13107200000000000000e6
-241 2 8 10 -0.65536000000000000000e5
-241 3 1 6 -0.13107200000000000000e6
-241 3 2 7 -0.26214400000000000000e6
-241 3 2 11 0.65536000000000000000e5
-241 3 3 4 0.65536000000000000000e5
-241 3 3 8 -0.26214400000000000000e6
-241 3 4 17 0.65536000000000000000e5
-241 3 5 18 -0.13107200000000000000e6
-241 3 6 7 -0.26214400000000000000e6
-241 3 6 11 -0.13107200000000000000e6
-241 3 7 12 -0.13107200000000000000e6
-241 4 1 5 -0.13107200000000000000e6
-241 4 2 2 -0.13107200000000000000e6
-241 4 2 6 -0.26214400000000000000e6
-241 4 3 7 -0.65536000000000000000e5
-241 4 7 7 -0.13107200000000000000e6
-242 1 2 9 -0.26214400000000000000e6
-242 1 3 10 0.52428800000000000000e6
-242 1 4 19 -0.13107200000000000000e6
-242 1 5 12 0.13107200000000000000e6
-242 1 7 14 0.26214400000000000000e6
-242 1 8 15 -0.52428800000000000000e6
-242 2 3 4 0.13107200000000000000e6
-242 2 3 9 -0.13107200000000000000e6
-242 3 3 8 -0.26214400000000000000e6
-242 3 6 7 -0.26214400000000000000e6
-242 3 7 12 -0.13107200000000000000e6
-242 4 1 5 -0.13107200000000000000e6
-242 4 2 6 -0.26214400000000000000e6
-243 1 3 10 0.52428800000000000000e6
-243 1 4 7 0.13107200000000000000e6
-243 1 4 19 -0.13107200000000000000e6
-243 1 8 15 -0.52428800000000000000e6
-243 2 3 5 0.13107200000000000000e6
-243 2 3 9 -0.13107200000000000000e6
-243 3 1 6 -0.13107200000000000000e6
-243 3 3 8 -0.52428800000000000000e6
-243 3 6 7 -0.26214400000000000000e6
-243 3 7 12 -0.13107200000000000000e6
-243 4 1 5 -0.13107200000000000000e6
-243 4 2 6 -0.26214400000000000000e6
-244 2 3 6 0.13107200000000000000e6
-244 2 6 8 -0.13107200000000000000e6
-244 4 2 6 -0.13107200000000000000e6
-245 2 2 8 -0.13107200000000000000e6
-245 2 3 7 0.13107200000000000000e6
-246 1 1 20 0.13107200000000000000e6
-246 1 2 17 -0.13107200000000000000e6
-246 1 4 19 -0.26214400000000000000e6
-246 1 5 20 -0.26214400000000000000e6
-246 1 6 13 -0.26214400000000000000e6
-246 1 7 14 0.52428800000000000000e6
-246 2 3 8 0.13107200000000000000e6
-246 2 3 9 -0.26214400000000000000e6
-246 2 8 10 -0.13107200000000000000e6
-246 3 4 17 0.13107200000000000000e6
-246 3 5 18 -0.26214400000000000000e6
-246 3 6 11 -0.26214400000000000000e6
-246 3 7 12 -0.26214400000000000000e6
-246 4 3 7 -0.13107200000000000000e6
-246 4 7 7 -0.26214400000000000000e6
-247 1 1 20 0.13107200000000000000e6
-247 1 2 17 -0.13107200000000000000e6
-247 1 4 19 -0.26214400000000000000e6
-247 1 5 20 -0.26214400000000000000e6
-247 1 6 13 -0.26214400000000000000e6
-247 1 7 14 0.52428800000000000000e6
-247 2 3 9 -0.26214400000000000000e6
-247 2 3 10 0.13107200000000000000e6
-247 2 8 10 -0.13107200000000000000e6
-247 3 4 17 0.13107200000000000000e6
-247 3 5 18 -0.26214400000000000000e6
-247 3 6 11 -0.26214400000000000000e6
-247 3 7 12 -0.26214400000000000000e6
-247 4 7 7 -0.26214400000000000000e6
-248 1 1 8 0.65536000000000000000e5
-248 1 2 5 0.32768000000000000000e5
-248 1 2 9 0.65536000000000000000e5
-248 1 3 10 0.13107200000000000000e6
-248 1 4 19 -0.32768000000000000000e5
-248 1 5 8 -0.13107200000000000000e6
-248 1 5 12 0.32768000000000000000e5
-248 1 6 13 -0.32768000000000000000e5
-248 1 7 14 0.65536000000000000000e5
-248 1 8 15 -0.13107200000000000000e6
-248 2 2 4 0.32768000000000000000e5
-248 2 3 9 -0.32768000000000000000e5
-248 2 4 4 0.13107200000000000000e6
-248 3 2 7 -0.32768000000000000000e5
-248 3 3 8 -0.65536000000000000000e5
-248 3 6 7 -0.65536000000000000000e5
-248 3 7 12 -0.32768000000000000000e5
-248 4 1 5 -0.32768000000000000000e5
-248 4 2 6 -0.65536000000000000000e5
-249 1 1 16 0.13107200000000000000e6
-249 1 2 9 0.13107200000000000000e6
-249 1 3 10 -0.26214400000000000000e6
-249 1 5 16 -0.26214400000000000000e6
-249 1 7 14 0.13107200000000000000e6
-249 1 8 15 0.26214400000000000000e6
-249 2 4 5 0.13107200000000000000e6
-249 3 3 8 0.13107200000000000000e6
-249 3 6 7 0.13107200000000000000e6
-249 4 2 6 0.13107200000000000000e6
-249 4 4 4 -0.26214400000000000000e6
-250 2 1 9 -0.13107200000000000000e6
-250 2 4 7 0.13107200000000000000e6
-251 1 2 9 -0.26214400000000000000e6
-251 1 3 10 0.52428800000000000000e6
-251 1 4 19 -0.13107200000000000000e6
-251 1 5 12 0.13107200000000000000e6
-251 1 7 14 0.26214400000000000000e6
-251 1 8 15 -0.52428800000000000000e6
-251 2 3 9 -0.13107200000000000000e6
-251 2 4 8 0.13107200000000000000e6
-251 3 3 8 -0.26214400000000000000e6
-251 3 6 7 -0.26214400000000000000e6
-251 3 7 12 -0.13107200000000000000e6
-251 4 2 6 -0.26214400000000000000e6
-252 1 1 16 0.13107200000000000000e6
-252 1 2 9 0.13107200000000000000e6
-252 1 3 10 -0.26214400000000000000e6
-252 1 5 16 -0.26214400000000000000e6
-252 1 7 14 0.13107200000000000000e6
-252 1 8 15 0.26214400000000000000e6
-252 2 4 9 0.13107200000000000000e6
-252 3 3 8 0.13107200000000000000e6
-252 3 6 7 0.13107200000000000000e6
-252 4 2 6 0.13107200000000000000e6
-253 2 5 5 0.13107200000000000000e6
-253 2 6 8 -0.65536000000000000000e5
-253 4 2 6 -0.65536000000000000000e5
-254 1 1 16 -0.65536000000000000000e5
-254 1 2 5 0.32768000000000000000e5
-254 1 3 10 0.39321600000000000000e6
-254 1 4 19 -0.32768000000000000000e5
-254 1 5 12 0.32768000000000000000e5
-254 1 5 16 0.13107200000000000000e6
-254 1 6 13 -0.32768000000000000000e5
-254 1 7 14 0.65536000000000000000e5
-254 1 8 9 -0.26214400000000000000e6
-254 1 8 15 -0.26214400000000000000e6
-254 1 10 13 0.13107200000000000000e6
-254 2 2 4 0.32768000000000000000e5
-254 2 3 9 -0.32768000000000000000e5
-254 2 5 6 0.13107200000000000000e6
-254 3 2 7 -0.32768000000000000000e5
-254 3 4 9 0.65536000000000000000e5
-254 3 6 7 -0.65536000000000000000e5
-254 3 7 12 -0.32768000000000000000e5
-254 4 1 5 -0.32768000000000000000e5
-254 4 2 6 -0.13107200000000000000e6
-254 4 4 4 0.13107200000000000000e6
-254 4 5 5 0.13107200000000000000e6
-255 1 2 9 -0.26214400000000000000e6
-255 1 3 10 0.52428800000000000000e6
-255 1 4 19 -0.13107200000000000000e6
-255 1 5 12 0.13107200000000000000e6
-255 1 7 14 0.26214400000000000000e6
-255 1 8 15 -0.52428800000000000000e6
-255 2 3 9 -0.13107200000000000000e6
-255 2 5 7 0.13107200000000000000e6
-255 3 3 8 -0.26214400000000000000e6
-255 3 6 7 -0.26214400000000000000e6
-255 3 7 12 -0.13107200000000000000e6
-255 4 2 6 -0.26214400000000000000e6
-256 2 3 9 -0.13107200000000000000e6
-256 2 5 8 0.13107200000000000000e6
-257 2 5 9 0.13107200000000000000e6
-257 2 6 8 -0.13107200000000000000e6
-258 2 3 9 -0.13107200000000000000e6
-258 2 5 10 0.13107200000000000000e6
-258 4 4 8 0.13107200000000000000e6
-259 1 1 16 0.13107200000000000000e6
-259 1 2 9 0.13107200000000000000e6
-259 1 3 10 -0.26214400000000000000e6
-259 1 5 16 -0.26214400000000000000e6
-259 1 7 14 0.13107200000000000000e6
-259 1 8 15 0.26214400000000000000e6
-259 2 6 7 0.13107200000000000000e6
-259 3 3 8 0.13107200000000000000e6
-259 3 6 7 0.13107200000000000000e6
-259 4 2 6 0.13107200000000000000e6
-260 1 5 16 0.13107200000000000000e6
-260 1 8 9 -0.26214400000000000000e6
-260 1 8 15 0.13107200000000000000e6
-260 1 10 13 0.13107200000000000000e6
-260 2 6 9 0.13107200000000000000e6
-260 3 5 10 0.26214400000000000000e6
-261 1 2 9 -0.13107200000000000000e6
-261 1 3 10 0.26214400000000000000e6
-261 1 4 19 -0.65536000000000000000e5
-261 1 5 12 0.65536000000000000000e5
-261 1 7 14 0.13107200000000000000e6
-261 1 10 17 -0.26214400000000000000e6
-261 2 3 9 -0.65536000000000000000e5
-261 2 4 10 0.65536000000000000000e5
-261 2 6 8 -0.13107200000000000000e6
-261 2 6 10 0.13107200000000000000e6
-261 3 1 14 -0.65536000000000000000e5
-261 3 2 15 -0.13107200000000000000e6
-261 3 3 8 -0.13107200000000000000e6
-261 3 3 16 -0.13107200000000000000e6
-261 3 6 7 -0.13107200000000000000e6
-261 3 6 11 -0.13107200000000000000e6
-261 3 7 12 -0.13107200000000000000e6
-261 4 2 6 -0.13107200000000000000e6
-261 4 4 8 -0.65536000000000000000e5
-262 1 2 17 0.13107200000000000000e6
-262 1 3 18 0.13107200000000000000e6
-262 1 4 19 0.26214400000000000000e6
-262 1 6 13 0.26214400000000000000e6
-262 1 7 14 -0.52428800000000000000e6
-262 1 11 18 0.13107200000000000000e6
-262 2 3 9 0.26214400000000000000e6
-262 2 7 8 0.13107200000000000000e6
-262 3 6 11 0.26214400000000000000e6
-262 3 7 12 0.26214400000000000000e6
-262 3 11 12 0.13107200000000000000e6
-263 2 4 10 -0.13107200000000000000e6
-263 2 7 9 0.13107200000000000000e6
-264 1 2 17 0.13107200000000000000e6
-264 1 3 18 0.13107200000000000000e6
-264 1 4 19 0.26214400000000000000e6
-264 1 6 13 0.26214400000000000000e6
-264 1 7 14 -0.52428800000000000000e6
-264 1 11 18 0.13107200000000000000e6
-264 2 3 9 0.26214400000000000000e6
-264 2 7 10 0.13107200000000000000e6
-264 3 6 11 0.26214400000000000000e6
-264 3 7 12 0.26214400000000000000e6
-264 3 11 12 0.13107200000000000000e6
-264 4 7 7 0.26214400000000000000e6
-265 1 1 20 0.65536000000000000000e5
-265 1 2 17 -0.65536000000000000000e5
-265 1 4 19 -0.13107200000000000000e6
-265 1 5 20 -0.13107200000000000000e6
-265 1 6 13 -0.13107200000000000000e6
-265 1 7 14 0.26214400000000000000e6
-265 2 3 9 -0.13107200000000000000e6
-265 2 8 8 0.13107200000000000000e6
-265 2 8 10 -0.65536000000000000000e5
-265 3 4 17 0.65536000000000000000e5
-265 3 5 18 -0.13107200000000000000e6
-265 3 6 11 -0.13107200000000000000e6
-265 3 7 12 -0.13107200000000000000e6
-265 4 7 7 -0.13107200000000000000e6
-266 2 3 9 -0.13107200000000000000e6
-266 2 8 9 0.13107200000000000000e6
-266 4 4 8 0.13107200000000000000e6
-267 1 2 9 -0.65536000000000000000e5
-267 1 3 10 0.13107200000000000000e6
-267 1 4 19 -0.32768000000000000000e5
-267 1 5 12 0.32768000000000000000e5
-267 1 7 14 0.65536000000000000000e5
-267 1 10 17 -0.13107200000000000000e6
-267 2 3 9 -0.32768000000000000000e5
-267 2 4 10 0.32768000000000000000e5
-267 2 6 8 -0.65536000000000000000e5
-267 2 9 9 0.13107200000000000000e6
-267 3 1 14 -0.32768000000000000000e5
-267 3 2 15 -0.65536000000000000000e5
-267 3 3 8 -0.65536000000000000000e5
-267 3 3 16 -0.65536000000000000000e5
-267 3 6 7 -0.65536000000000000000e5
-267 3 6 11 -0.65536000000000000000e5
-267 3 7 12 -0.65536000000000000000e5
-267 4 2 6 -0.65536000000000000000e5
-267 4 4 8 -0.32768000000000000000e5
-268 1 4 19 0.13107200000000000000e6
-268 1 5 20 0.13107200000000000000e6
-268 1 6 13 0.13107200000000000000e6
-268 1 7 14 -0.26214400000000000000e6
-268 2 9 10 0.13107200000000000000e6
-268 3 5 18 -0.13107200000000000000e6
-268 3 6 11 0.13107200000000000000e6
-268 3 7 12 0.13107200000000000000e6
-268 3 11 16 0.26214400000000000000e6
-268 3 13 14 -0.13107200000000000000e6
-268 4 4 8 0.13107200000000000000e6
-269 1 1 4 0.65536000000000000000e5
-269 1 1 16 0.26214400000000000000e6
-269 1 2 5 -0.13107200000000000000e6
-269 1 2 17 -0.65536000000000000000e5
-269 1 4 19 0.13107200000000000000e6
-269 1 5 12 -0.13107200000000000000e6
-269 1 6 13 0.13107200000000000000e6
-269 1 7 14 -0.26214400000000000000e6
-269 2 1 9 -0.13107200000000000000e6
-269 2 3 9 0.13107200000000000000e6
-269 3 1 1 0.13107200000000000000e6
-269 3 1 2 0.65536000000000000000e5
-269 3 2 11 -0.65536000000000000000e5
-269 3 7 12 0.13107200000000000000e6
-269 4 1 1 0.13107200000000000000e6
-270 1 1 4 -0.13107200000000000000e6
-270 1 2 17 0.13107200000000000000e6
-270 3 1 3 0.13107200000000000000e6
-270 3 2 11 0.13107200000000000000e6
-271 3 1 4 0.13107200000000000000e6
-271 3 2 3 -0.13107200000000000000e6
-272 1 1 16 0.26214400000000000000e6
-272 1 2 5 -0.13107200000000000000e6
-272 1 4 19 0.13107200000000000000e6
-272 1 5 12 -0.13107200000000000000e6
-272 1 6 13 0.13107200000000000000e6
-272 1 7 14 -0.26214400000000000000e6
-272 2 1 9 -0.13107200000000000000e6
-272 2 3 9 0.13107200000000000000e6
-272 3 1 5 0.13107200000000000000e6
-272 3 7 12 0.13107200000000000000e6
-273 1 3 10 -0.52428800000000000000e6
-273 1 8 15 0.52428800000000000000e6
-273 3 1 6 0.13107200000000000000e6
-273 3 1 7 0.13107200000000000000e6
-273 3 2 7 0.13107200000000000000e6
-273 3 3 8 0.26214400000000000000e6
-273 3 6 7 0.26214400000000000000e6
-273 4 1 5 0.13107200000000000000e6
-273 4 2 6 0.26214400000000000000e6
-274 1 1 16 0.13107200000000000000e6
-274 1 2 5 -0.65536000000000000000e5
-274 1 3 10 -0.26214400000000000000e6
-274 1 4 19 0.65536000000000000000e5
-274 1 5 12 -0.65536000000000000000e5
-274 1 6 13 0.65536000000000000000e5
-274 1 7 14 -0.13107200000000000000e6
-274 1 8 15 0.26214400000000000000e6
-274 2 2 4 -0.65536000000000000000e5
-274 2 3 9 0.65536000000000000000e5
-274 3 1 8 0.13107200000000000000e6
-274 3 2 7 0.65536000000000000000e5
-274 3 3 8 0.13107200000000000000e6
-274 3 6 7 0.13107200000000000000e6
-274 3 7 12 0.65536000000000000000e5
-274 4 1 5 0.65536000000000000000e5
-274 4 2 6 0.13107200000000000000e6
-275 1 3 10 -0.26214400000000000000e6
-275 1 8 15 0.26214400000000000000e6
-275 3 1 9 0.13107200000000000000e6
-275 3 3 8 0.13107200000000000000e6
-275 3 6 7 0.13107200000000000000e6
-275 4 2 6 0.13107200000000000000e6
-276 1 1 16 0.65536000000000000000e5
-276 1 2 5 -0.32768000000000000000e5
-276 1 3 10 -0.26214400000000000000e6
-276 1 4 19 0.32768000000000000000e5
-276 1 5 12 -0.32768000000000000000e5
-276 1 6 13 0.32768000000000000000e5
-276 1 7 14 -0.65536000000000000000e5
-276 1 8 15 0.26214400000000000000e6
-276 2 2 4 -0.32768000000000000000e5
-276 2 3 9 0.32768000000000000000e5
-276 3 1 10 0.13107200000000000000e6
-276 3 2 7 0.32768000000000000000e5
-276 3 3 8 0.65536000000000000000e5
-276 3 6 7 0.13107200000000000000e6
-276 3 7 12 0.32768000000000000000e5
-276 4 1 5 0.32768000000000000000e5
-276 4 2 6 0.13107200000000000000e6
-276 4 4 4 -0.13107200000000000000e6
-277 1 1 4 0.13107200000000000000e6
-277 1 2 17 -0.13107200000000000000e6
-277 1 4 11 0.13107200000000000000e6
-277 1 11 18 -0.13107200000000000000e6
-277 2 1 3 0.13107200000000000000e6
-277 2 7 7 -0.26214400000000000000e6
-277 3 1 2 0.13107200000000000000e6
-277 3 1 6 -0.26214400000000000000e6
-277 3 1 11 0.13107200000000000000e6
-277 3 1 14 -0.26214400000000000000e6
-277 3 2 3 0.13107200000000000000e6
-277 3 11 12 -0.13107200000000000000e6
-278 3 1 12 0.13107200000000000000e6
-278 3 2 11 -0.13107200000000000000e6
-279 1 4 11 -0.13107200000000000000e6
-279 1 11 18 0.13107200000000000000e6
-279 3 1 13 0.13107200000000000000e6
-279 3 11 12 0.13107200000000000000e6
-280 3 1 15 0.13107200000000000000e6
-280 3 6 11 -0.13107200000000000000e6
-281 1 2 9 -0.13107200000000000000e6
-281 1 3 10 0.26214400000000000000e6
-281 1 4 19 -0.65536000000000000000e5
-281 1 5 12 0.65536000000000000000e5
-281 1 7 14 0.13107200000000000000e6
-281 1 8 15 -0.26214400000000000000e6
-281 2 3 9 -0.65536000000000000000e5
-281 2 4 10 0.65536000000000000000e5
-281 3 1 14 -0.65536000000000000000e5
-281 3 1 16 0.13107200000000000000e6
-281 3 2 15 -0.65536000000000000000e5
-281 3 3 8 -0.13107200000000000000e6
-281 3 6 7 -0.13107200000000000000e6
-281 3 6 11 -0.65536000000000000000e5
-281 3 7 12 -0.65536000000000000000e5
-281 4 2 6 -0.13107200000000000000e6
-282 1 1 20 0.13107200000000000000e6
-282 1 2 17 -0.13107200000000000000e6
-282 3 1 17 0.13107200000000000000e6
-283 3 1 18 0.13107200000000000000e6
-283 3 11 12 -0.13107200000000000000e6
-284 1 4 19 0.13107200000000000000e6
-284 1 5 20 0.13107200000000000000e6
-284 1 6 13 0.13107200000000000000e6
-284 1 7 14 -0.26214400000000000000e6
-284 2 3 9 0.13107200000000000000e6
-284 3 1 19 0.13107200000000000000e6
-284 3 6 11 0.13107200000000000000e6
-284 3 7 12 0.13107200000000000000e6
-285 1 1 20 0.13107200000000000000e6
-285 1 2 17 -0.13107200000000000000e6
-285 1 3 18 -0.13107200000000000000e6
-285 1 4 19 -0.26214400000000000000e6
-285 1 5 20 -0.26214400000000000000e6
-285 1 7 14 0.52428800000000000000e6
-285 1 11 18 -0.13107200000000000000e6
-285 1 13 20 -0.13107200000000000000e6
-285 2 3 9 -0.26214400000000000000e6
-285 2 10 10 -0.26214400000000000000e6
-285 3 1 20 0.13107200000000000000e6
-285 3 2 15 -0.26214400000000000000e6
-285 3 5 18 -0.26214400000000000000e6
-285 3 5 20 -0.26214400000000000000e6
-285 3 6 11 -0.26214400000000000000e6
-285 3 7 12 -0.26214400000000000000e6
-285 3 11 12 -0.13107200000000000000e6
-285 3 12 17 0.13107200000000000000e6
-285 4 7 7 -0.26214400000000000000e6
-286 1 1 4 -0.65536000000000000000e5
-286 1 2 17 0.65536000000000000000e5
-286 3 2 2 0.13107200000000000000e6
-286 3 2 11 0.65536000000000000000e5
-287 1 1 4 0.13107200000000000000e6
-287 1 2 17 -0.13107200000000000000e6
-287 1 3 10 -0.10485760000000000000e7
-287 1 8 15 0.10485760000000000000e7
-287 3 1 6 0.26214400000000000000e6
-287 3 2 3 0.13107200000000000000e6
-287 3 2 4 0.13107200000000000000e6
-287 3 2 7 0.26214400000000000000e6
-287 3 2 11 -0.13107200000000000000e6
-287 3 3 8 0.52428800000000000000e6
-287 3 6 7 0.52428800000000000000e6
-287 4 1 5 0.26214400000000000000e6
-287 4 2 2 0.26214400000000000000e6
-287 4 2 6 0.52428800000000000000e6
-288 3 1 6 -0.13107200000000000000e6
-288 3 2 5 0.13107200000000000000e6
-289 1 3 10 -0.52428800000000000000e6
-289 1 8 15 0.52428800000000000000e6
-289 3 1 6 0.13107200000000000000e6
-289 3 2 6 0.13107200000000000000e6
-289 3 2 7 0.13107200000000000000e6
-289 3 3 8 0.26214400000000000000e6
-289 3 6 7 0.26214400000000000000e6
-289 4 1 5 0.13107200000000000000e6
-289 4 2 6 0.26214400000000000000e6
-290 1 3 10 -0.26214400000000000000e6
-290 1 8 15 0.26214400000000000000e6
-290 3 2 8 0.13107200000000000000e6
-290 3 3 8 0.13107200000000000000e6
-290 3 6 7 0.13107200000000000000e6
-290 4 2 6 0.13107200000000000000e6
-291 3 2 9 0.13107200000000000000e6
-291 3 3 8 -0.13107200000000000000e6
-292 1 3 10 -0.13107200000000000000e6
-292 1 8 15 0.13107200000000000000e6
-292 3 2 10 0.13107200000000000000e6
-293 1 4 11 -0.13107200000000000000e6
-293 1 11 18 0.13107200000000000000e6
-293 3 2 12 0.13107200000000000000e6
-293 3 11 12 0.13107200000000000000e6
-294 1 2 17 0.13107200000000000000e6
-294 1 3 18 0.13107200000000000000e6
-294 1 4 11 0.13107200000000000000e6
-294 1 4 19 0.26214400000000000000e6
-294 1 6 13 0.26214400000000000000e6
-294 1 7 14 -0.52428800000000000000e6
-294 2 2 8 0.13107200000000000000e6
-294 2 3 9 0.26214400000000000000e6
-294 3 2 11 0.13107200000000000000e6
-294 3 2 13 0.13107200000000000000e6
-294 3 7 12 0.26214400000000000000e6
-295 3 2 14 0.13107200000000000000e6
-295 3 6 11 -0.13107200000000000000e6
-296 3 2 15 -0.65536000000000000000e5
-296 3 2 16 0.13107200000000000000e6
-296 3 6 11 -0.65536000000000000000e5
-296 3 7 12 -0.65536000000000000000e5
-296 4 4 8 -0.65536000000000000000e5
-297 3 2 17 0.13107200000000000000e6
-297 3 11 12 -0.13107200000000000000e6
-298 1 1 20 -0.13107200000000000000e6
-298 1 2 17 0.13107200000000000000e6
-298 1 4 19 0.26214400000000000000e6
-298 1 5 20 0.26214400000000000000e6
-298 1 6 13 0.26214400000000000000e6
-298 1 7 14 -0.52428800000000000000e6
-298 2 3 9 0.26214400000000000000e6
-298 3 2 18 0.13107200000000000000e6
-298 3 6 11 0.26214400000000000000e6
-298 3 7 12 0.26214400000000000000e6
-298 3 11 12 0.13107200000000000000e6
-298 4 7 7 0.26214400000000000000e6
-299 3 2 19 0.13107200000000000000e6
-299 3 5 18 -0.13107200000000000000e6
-300 3 2 20 0.13107200000000000000e6
-300 3 12 17 -0.13107200000000000000e6
-301 1 1 4 0.65536000000000000000e5
-301 1 2 17 -0.65536000000000000000e5
-301 1 3 10 -0.52428800000000000000e6
-301 1 8 15 0.52428800000000000000e6
-301 3 1 6 0.13107200000000000000e6
-301 3 2 3 0.65536000000000000000e5
-301 3 2 7 0.13107200000000000000e6
-301 3 2 11 -0.65536000000000000000e5
-301 3 3 3 0.13107200000000000000e6
-301 3 3 8 0.26214400000000000000e6
-301 3 6 7 0.26214400000000000000e6
-301 4 1 5 0.13107200000000000000e6
-301 4 2 2 0.13107200000000000000e6
-301 4 2 6 0.26214400000000000000e6
-302 1 3 10 -0.52428800000000000000e6
-302 1 8 15 0.52428800000000000000e6
-302 3 1 6 0.13107200000000000000e6
-302 3 2 7 0.13107200000000000000e6
-302 3 3 5 0.13107200000000000000e6
-302 3 3 8 0.26214400000000000000e6
-302 3 6 7 0.26214400000000000000e6
-302 4 1 5 0.13107200000000000000e6
-302 4 2 6 0.26214400000000000000e6
-303 3 2 7 -0.13107200000000000000e6
-303 3 3 6 0.13107200000000000000e6
-304 1 4 7 -0.13107200000000000000e6
-304 1 4 19 0.13107200000000000000e6
-304 3 3 7 0.13107200000000000000e6
-304 3 7 12 0.13107200000000000000e6
-305 3 3 9 0.13107200000000000000e6
-305 3 6 7 -0.13107200000000000000e6
-306 3 3 8 -0.65536000000000000000e5
-306 3 3 10 0.13107200000000000000e6
-306 3 4 9 -0.65536000000000000000e5
-306 3 6 7 -0.65536000000000000000e5
-306 4 5 5 -0.13107200000000000000e6
-307 1 4 11 -0.13107200000000000000e6
-307 1 11 18 0.13107200000000000000e6
-307 3 3 11 0.13107200000000000000e6
-307 3 11 12 0.13107200000000000000e6
-308 1 2 17 0.13107200000000000000e6
-308 1 3 18 0.13107200000000000000e6
-308 1 4 11 0.13107200000000000000e6
-308 1 4 19 0.26214400000000000000e6
-308 1 6 13 0.26214400000000000000e6
-308 1 7 14 -0.52428800000000000000e6
-308 2 2 8 0.13107200000000000000e6
-308 2 3 9 0.26214400000000000000e6
-308 3 2 11 0.13107200000000000000e6
-308 3 3 12 0.13107200000000000000e6
-308 3 7 12 0.26214400000000000000e6
-309 1 2 17 -0.13107200000000000000e6
-309 1 3 18 -0.13107200000000000000e6
-309 1 4 19 -0.26214400000000000000e6
-309 1 6 13 -0.26214400000000000000e6
-309 1 7 14 0.52428800000000000000e6
-309 1 11 18 -0.13107200000000000000e6
-309 2 2 8 -0.13107200000000000000e6
-309 2 3 9 -0.26214400000000000000e6
-309 3 2 11 -0.13107200000000000000e6
-309 3 2 15 -0.26214400000000000000e6
-309 3 3 13 0.13107200000000000000e6
-309 3 7 12 -0.26214400000000000000e6
-309 3 11 12 -0.13107200000000000000e6
-309 4 3 7 0.13107200000000000000e6
-310 3 2 15 -0.13107200000000000000e6
-310 3 3 14 0.13107200000000000000e6
-311 3 3 15 0.13107200000000000000e6
-311 3 7 12 -0.13107200000000000000e6
-312 1 1 20 -0.13107200000000000000e6
-312 1 2 17 0.13107200000000000000e6
-312 1 4 19 0.26214400000000000000e6
-312 1 5 20 0.26214400000000000000e6
-312 1 6 13 0.26214400000000000000e6
-312 1 7 14 -0.52428800000000000000e6
-312 2 3 9 0.26214400000000000000e6
-312 3 3 17 0.13107200000000000000e6
-312 3 6 11 0.26214400000000000000e6
-312 3 7 12 0.26214400000000000000e6
-312 3 11 12 0.13107200000000000000e6
-312 4 7 7 0.26214400000000000000e6
-313 3 3 18 0.13107200000000000000e6
-313 3 4 17 -0.13107200000000000000e6
-314 3 3 19 0.13107200000000000000e6
-314 3 13 14 -0.13107200000000000000e6
-315 1 1 20 -0.13107200000000000000e6
-315 1 2 17 0.13107200000000000000e6
-315 1 3 18 0.13107200000000000000e6
-315 1 4 19 0.26214400000000000000e6
-315 1 5 20 0.26214400000000000000e6
-315 1 7 14 -0.52428800000000000000e6
-315 1 11 18 0.13107200000000000000e6
-315 1 13 20 0.13107200000000000000e6
-315 2 3 9 0.26214400000000000000e6
-315 2 8 10 0.13107200000000000000e6
-315 3 2 15 0.26214400000000000000e6
-315 3 3 20 0.13107200000000000000e6
-315 3 5 18 0.26214400000000000000e6
-315 3 6 11 0.26214400000000000000e6
-315 3 7 12 0.26214400000000000000e6
-315 3 11 12 0.13107200000000000000e6
-315 4 7 7 0.26214400000000000000e6
-316 1 1 4 -0.65536000000000000000e5
-316 1 2 17 0.65536000000000000000e5
-316 1 3 10 0.52428800000000000000e6
-316 1 4 7 -0.13107200000000000000e6
-316 1 4 19 0.13107200000000000000e6
-316 1 8 15 -0.52428800000000000000e6
-316 3 1 6 -0.13107200000000000000e6
-316 3 2 3 -0.65536000000000000000e5
-316 3 2 7 -0.13107200000000000000e6
-316 3 2 11 0.65536000000000000000e5
-316 3 3 4 0.65536000000000000000e5
-316 3 3 8 -0.26214400000000000000e6
-316 3 4 4 0.13107200000000000000e6
-316 3 6 7 -0.26214400000000000000e6
-316 3 7 12 0.13107200000000000000e6
-316 4 1 5 -0.13107200000000000000e6
-316 4 2 2 -0.13107200000000000000e6
-316 4 2 6 -0.26214400000000000000e6
-316 4 3 3 0.13107200000000000000e6
-317 3 2 7 -0.13107200000000000000e6
-317 3 4 5 0.13107200000000000000e6
-318 1 4 7 -0.13107200000000000000e6
-318 1 4 19 0.13107200000000000000e6
-318 3 4 6 0.13107200000000000000e6
-318 3 7 12 0.13107200000000000000e6
-319 3 4 8 0.13107200000000000000e6
-319 3 6 7 -0.13107200000000000000e6
-320 1 2 17 0.13107200000000000000e6
-320 1 3 18 0.13107200000000000000e6
-320 1 4 11 0.13107200000000000000e6
-320 1 4 19 0.26214400000000000000e6
-320 1 6 13 0.26214400000000000000e6
-320 1 7 14 -0.52428800000000000000e6
-320 2 2 8 0.13107200000000000000e6
-320 2 3 9 0.26214400000000000000e6
-320 3 2 11 0.13107200000000000000e6
-320 3 4 11 0.13107200000000000000e6
-320 3 7 12 0.26214400000000000000e6
-321 1 2 17 -0.13107200000000000000e6
-321 1 3 18 -0.13107200000000000000e6
-321 1 4 19 -0.26214400000000000000e6
-321 1 6 13 -0.26214400000000000000e6
-321 1 7 14 0.52428800000000000000e6
-321 1 11 18 -0.13107200000000000000e6
-321 2 2 8 -0.13107200000000000000e6
-321 2 3 9 -0.26214400000000000000e6
-321 3 2 11 -0.13107200000000000000e6
-321 3 2 15 -0.26214400000000000000e6
-321 3 4 12 0.13107200000000000000e6
-321 3 7 12 -0.26214400000000000000e6
-321 3 11 12 -0.13107200000000000000e6
-321 4 3 7 0.13107200000000000000e6
-322 3 4 14 0.13107200000000000000e6
-322 3 7 12 -0.13107200000000000000e6
-323 3 2 15 0.13107200000000000000e6
-323 3 3 16 -0.26214400000000000000e6
-323 3 4 15 0.13107200000000000000e6
-323 3 7 12 0.13107200000000000000e6
-323 4 3 9 0.13107200000000000000e6
-324 3 2 15 0.65536000000000000000e5
-324 3 3 16 0.13107200000000000000e6
-324 3 4 16 0.13107200000000000000e6
-324 3 6 11 0.65536000000000000000e5
-324 3 7 12 0.65536000000000000000e5
-324 3 9 14 -0.26214400000000000000e6
-324 4 4 8 0.65536000000000000000e5
-324 4 5 9 0.13107200000000000000e6
-325 1 1 20 0.13107200000000000000e6
-325 1 2 17 -0.13107200000000000000e6
-325 1 4 19 -0.26214400000000000000e6
-325 1 5 20 -0.26214400000000000000e6
-325 1 6 13 -0.26214400000000000000e6
-325 1 7 14 0.52428800000000000000e6
-325 2 3 9 -0.26214400000000000000e6
-325 3 4 17 0.13107200000000000000e6
-325 3 4 18 0.13107200000000000000e6
-325 3 6 11 -0.26214400000000000000e6
-325 3 7 12 -0.26214400000000000000e6
-325 3 11 12 -0.13107200000000000000e6
-325 3 13 14 -0.26214400000000000000e6
-325 4 7 7 -0.26214400000000000000e6
-325 4 8 8 0.26214400000000000000e6
-326 3 4 20 0.13107200000000000000e6
-326 3 13 18 -0.13107200000000000000e6
-327 1 1 16 0.65536000000000000000e5
-327 1 2 5 -0.32768000000000000000e5
-327 1 3 10 -0.13107200000000000000e6
-327 1 4 19 0.32768000000000000000e5
-327 1 5 12 -0.32768000000000000000e5
-327 1 6 13 0.32768000000000000000e5
-327 1 7 14 -0.65536000000000000000e5
-327 1 8 15 0.13107200000000000000e6
-327 2 2 4 -0.32768000000000000000e5
-327 2 3 9 0.32768000000000000000e5
-327 3 2 7 0.32768000000000000000e5
-327 3 3 8 0.65536000000000000000e5
-327 3 5 5 0.13107200000000000000e6
-327 3 6 7 0.65536000000000000000e5
-327 3 7 12 0.32768000000000000000e5
-327 4 1 5 0.32768000000000000000e5
-327 4 2 6 0.65536000000000000000e5
-328 1 3 10 -0.26214400000000000000e6
-328 1 8 15 0.26214400000000000000e6
-328 3 3 8 0.13107200000000000000e6
-328 3 5 6 0.13107200000000000000e6
-328 3 6 7 0.13107200000000000000e6
-328 4 2 6 0.13107200000000000000e6
-329 3 3 8 -0.13107200000000000000e6
-329 3 5 7 0.13107200000000000000e6
-330 1 1 16 0.65536000000000000000e5
-330 1 2 5 -0.32768000000000000000e5
-330 1 3 10 -0.26214400000000000000e6
-330 1 4 19 0.32768000000000000000e5
-330 1 5 12 -0.32768000000000000000e5
-330 1 6 13 0.32768000000000000000e5
-330 1 7 14 -0.65536000000000000000e5
-330 1 8 15 0.26214400000000000000e6
-330 2 2 4 -0.32768000000000000000e5
-330 2 3 9 0.32768000000000000000e5
-330 3 2 7 0.32768000000000000000e5
-330 3 3 8 0.65536000000000000000e5
-330 3 5 8 0.13107200000000000000e6
-330 3 6 7 0.13107200000000000000e6
-330 3 7 12 0.32768000000000000000e5
-330 4 1 5 0.32768000000000000000e5
-330 4 2 6 0.13107200000000000000e6
-330 4 4 4 -0.13107200000000000000e6
-331 1 3 10 -0.13107200000000000000e6
-331 1 8 15 0.13107200000000000000e6
-331 3 5 9 0.13107200000000000000e6
-332 3 1 14 -0.13107200000000000000e6
-332 3 5 11 0.13107200000000000000e6
-333 3 5 12 0.13107200000000000000e6
-333 3 6 11 -0.13107200000000000000e6
-334 3 2 15 -0.13107200000000000000e6
-334 3 5 13 0.13107200000000000000e6
-335 1 2 9 -0.13107200000000000000e6
-335 1 3 10 0.26214400000000000000e6
-335 1 4 19 -0.65536000000000000000e5
-335 1 5 12 0.65536000000000000000e5
-335 1 7 14 0.13107200000000000000e6
-335 1 8 15 -0.26214400000000000000e6
-335 2 3 9 -0.65536000000000000000e5
-335 2 4 10 0.65536000000000000000e5
-335 3 1 14 -0.65536000000000000000e5
-335 3 2 15 -0.65536000000000000000e5
-335 3 3 8 -0.13107200000000000000e6
-335 3 5 14 0.13107200000000000000e6
-335 3 6 7 -0.13107200000000000000e6
-335 3 6 11 -0.65536000000000000000e5
-335 3 7 12 -0.65536000000000000000e5
-335 4 2 6 -0.13107200000000000000e6
-336 3 2 15 -0.65536000000000000000e5
-336 3 5 15 0.13107200000000000000e6
-336 3 6 11 -0.65536000000000000000e5
-336 3 7 12 -0.65536000000000000000e5
-336 4 4 8 -0.65536000000000000000e5
-337 1 8 15 -0.13107200000000000000e6
-337 1 10 17 0.13107200000000000000e6
-337 3 5 16 0.13107200000000000000e6
-338 1 4 19 0.13107200000000000000e6
-338 1 5 20 0.13107200000000000000e6
-338 1 6 13 0.13107200000000000000e6
-338 1 7 14 -0.26214400000000000000e6
-338 2 3 9 0.13107200000000000000e6
-338 3 5 17 0.13107200000000000000e6
-338 3 6 11 0.13107200000000000000e6
-338 3 7 12 0.13107200000000000000e6
-339 3 5 19 0.13107200000000000000e6
-339 3 11 16 -0.13107200000000000000e6
-340 3 3 8 -0.65536000000000000000e5
-340 3 6 6 0.13107200000000000000e6
-341 1 3 10 -0.13107200000000000000e6
-341 1 8 15 0.13107200000000000000e6
-341 3 6 8 0.13107200000000000000e6
-342 3 3 8 -0.65536000000000000000e5
-342 3 4 9 -0.65536000000000000000e5
-342 3 6 7 -0.65536000000000000000e5
-342 3 6 9 0.13107200000000000000e6
-342 4 5 5 -0.13107200000000000000e6
-343 3 6 10 0.13107200000000000000e6
-343 3 8 9 -0.13107200000000000000e6
-344 3 2 15 -0.13107200000000000000e6
-344 3 6 12 0.13107200000000000000e6
-345 3 6 13 0.13107200000000000000e6
-345 3 7 12 -0.13107200000000000000e6
-346 3 2 15 -0.65536000000000000000e5
-346 3 6 11 -0.65536000000000000000e5
-346 3 6 14 0.13107200000000000000e6
-346 3 7 12 -0.65536000000000000000e5
-346 4 4 8 -0.65536000000000000000e5
-347 3 3 16 -0.13107200000000000000e6
-347 3 6 15 0.13107200000000000000e6
-348 3 6 16 0.13107200000000000000e6
-348 3 9 14 -0.13107200000000000000e6
-349 3 5 18 -0.13107200000000000000e6
-349 3 6 17 0.13107200000000000000e6
-350 3 6 18 0.13107200000000000000e6
-350 3 13 14 -0.13107200000000000000e6
-351 1 4 19 -0.13107200000000000000e6
-351 1 18 19 0.13107200000000000000e6
-351 3 6 20 0.13107200000000000000e6
-351 3 13 14 0.13107200000000000000e6
-352 3 4 9 -0.65536000000000000000e5
-352 3 7 7 0.13107200000000000000e6
-353 3 3 8 -0.65536000000000000000e5
-353 3 4 9 -0.65536000000000000000e5
-353 3 6 7 -0.65536000000000000000e5
-353 3 7 8 0.13107200000000000000e6
-353 4 5 5 -0.13107200000000000000e6
-354 3 4 10 -0.13107200000000000000e6
-354 3 7 9 0.13107200000000000000e6
-355 3 2 15 -0.13107200000000000000e6
-355 3 7 11 0.13107200000000000000e6
-356 3 2 15 0.13107200000000000000e6
-356 3 3 16 -0.26214400000000000000e6
-356 3 7 12 0.13107200000000000000e6
-356 3 7 13 0.13107200000000000000e6
-356 4 3 9 0.13107200000000000000e6
-357 3 3 16 -0.13107200000000000000e6
-357 3 7 14 0.13107200000000000000e6
-358 3 2 15 0.65536000000000000000e5
-358 3 3 16 0.13107200000000000000e6
-358 3 6 11 0.65536000000000000000e5
-358 3 7 12 0.65536000000000000000e5
-358 3 7 15 0.13107200000000000000e6
-358 3 9 14 -0.26214400000000000000e6
-358 4 4 8 0.65536000000000000000e5
-358 4 5 9 0.13107200000000000000e6
-359 3 7 17 0.13107200000000000000e6
-359 3 13 14 -0.13107200000000000000e6
-360 3 4 19 -0.13107200000000000000e6
-360 3 7 18 0.13107200000000000000e6
-361 1 10 13 -0.26214400000000000000e6
-361 1 16 19 0.26214400000000000000e6
-361 3 6 19 0.13107200000000000000e6
-361 3 7 19 0.13107200000000000000e6
-361 3 9 14 0.26214400000000000000e6
-361 3 11 16 0.13107200000000000000e6
-361 4 6 10 0.13107200000000000000e6
-362 3 5 10 -0.65536000000000000000e5
-362 3 8 8 0.13107200000000000000e6
-363 3 5 10 -0.65536000000000000000e5
-363 3 7 10 -0.65536000000000000000e5
-363 3 8 9 -0.65536000000000000000e5
-363 3 8 10 0.13107200000000000000e6
-363 4 6 6 -0.13107200000000000000e6
-364 1 2 9 -0.13107200000000000000e6
-364 1 3 10 0.26214400000000000000e6
-364 1 4 19 -0.65536000000000000000e5
-364 1 5 12 0.65536000000000000000e5
-364 1 7 14 0.13107200000000000000e6
-364 1 8 15 -0.26214400000000000000e6
-364 2 3 9 -0.65536000000000000000e5
-364 2 4 10 0.65536000000000000000e5
-364 3 1 14 -0.65536000000000000000e5
-364 3 2 15 -0.65536000000000000000e5
-364 3 3 8 -0.13107200000000000000e6
-364 3 6 7 -0.13107200000000000000e6
-364 3 6 11 -0.65536000000000000000e5
-364 3 7 12 -0.65536000000000000000e5
-364 3 8 11 0.13107200000000000000e6
-364 4 2 6 -0.13107200000000000000e6
-365 3 2 15 -0.65536000000000000000e5
-365 3 6 11 -0.65536000000000000000e5
-365 3 7 12 -0.65536000000000000000e5
-365 3 8 12 0.13107200000000000000e6
-365 4 4 8 -0.65536000000000000000e5
-366 3 3 16 -0.13107200000000000000e6
-366 3 8 13 0.13107200000000000000e6
-367 1 8 15 -0.13107200000000000000e6
-367 1 10 17 0.13107200000000000000e6
-367 3 8 14 0.13107200000000000000e6
-368 3 8 15 0.13107200000000000000e6
-368 3 9 14 -0.13107200000000000000e6
-369 1 9 16 -0.13107200000000000000e6
-369 1 10 19 0.13107200000000000000e6
-369 3 8 16 0.13107200000000000000e6
-370 3 8 17 0.13107200000000000000e6
-370 3 11 16 -0.13107200000000000000e6
-371 3 6 19 -0.13107200000000000000e6
-371 3 8 18 0.13107200000000000000e6
-372 1 10 13 -0.13107200000000000000e6
-372 1 16 19 0.13107200000000000000e6
-372 3 8 19 0.13107200000000000000e6
-372 3 9 14 0.13107200000000000000e6
-373 3 8 20 0.13107200000000000000e6
-373 3 14 19 -0.13107200000000000000e6
-374 3 7 10 -0.65536000000000000000e5
-374 3 9 9 0.13107200000000000000e6
-375 3 2 15 -0.65536000000000000000e5
-375 3 6 11 -0.65536000000000000000e5
-375 3 7 12 -0.65536000000000000000e5
-375 3 9 11 0.13107200000000000000e6
-375 4 4 8 -0.65536000000000000000e5
-376 3 3 16 -0.13107200000000000000e6
-376 3 9 12 0.13107200000000000000e6
-377 3 2 15 0.65536000000000000000e5
-377 3 3 16 0.13107200000000000000e6
-377 3 6 11 0.65536000000000000000e5
-377 3 7 12 0.65536000000000000000e5
-377 3 9 13 0.13107200000000000000e6
-377 3 9 14 -0.26214400000000000000e6
-377 4 4 8 0.65536000000000000000e5
-377 4 5 9 0.13107200000000000000e6
-378 3 7 16 -0.13107200000000000000e6
-378 3 9 15 0.13107200000000000000e6
-379 3 9 16 0.13107200000000000000e6
-379 3 10 15 -0.13107200000000000000e6
-380 3 6 19 -0.13107200000000000000e6
-380 3 9 17 0.13107200000000000000e6
-381 1 10 13 -0.26214400000000000000e6
-381 1 16 19 0.26214400000000000000e6
-381 3 6 19 0.13107200000000000000e6
-381 3 9 14 0.26214400000000000000e6
-381 3 9 18 0.13107200000000000000e6
-381 3 11 16 0.13107200000000000000e6
-381 4 6 10 0.13107200000000000000e6
-382 3 9 19 0.13107200000000000000e6
-382 3 15 16 -0.13107200000000000000e6
-383 1 8 15 -0.13107200000000000000e6
-383 1 10 17 0.13107200000000000000e6
-383 3 10 11 0.13107200000000000000e6
-384 3 9 14 -0.13107200000000000000e6
-384 3 10 12 0.13107200000000000000e6
-385 3 7 16 -0.13107200000000000000e6
-385 3 10 13 0.13107200000000000000e6
-386 1 9 16 -0.13107200000000000000e6
-386 1 10 19 0.13107200000000000000e6
-386 3 10 14 0.13107200000000000000e6
-387 1 10 13 -0.13107200000000000000e6
-387 1 16 19 0.13107200000000000000e6
-387 3 9 14 0.13107200000000000000e6
-387 3 10 17 0.13107200000000000000e6
-388 3 10 18 0.13107200000000000000e6
-388 3 15 16 -0.13107200000000000000e6
-389 3 10 20 0.13107200000000000000e6
-389 3 16 19 -0.13107200000000000000e6
-390 1 1 20 0.65536000000000000000e5
-390 1 2 17 -0.65536000000000000000e5
-390 3 11 11 0.13107200000000000000e6
-391 1 1 20 -0.13107200000000000000e6
-391 1 2 17 0.13107200000000000000e6
-391 1 4 19 0.26214400000000000000e6
-391 1 5 20 0.26214400000000000000e6
-391 1 6 13 0.26214400000000000000e6
-391 1 7 14 -0.52428800000000000000e6
-391 2 3 9 0.26214400000000000000e6
-391 3 6 11 0.26214400000000000000e6
-391 3 7 12 0.26214400000000000000e6
-391 3 11 12 0.13107200000000000000e6
-391 3 11 13 0.13107200000000000000e6
-391 4 7 7 0.26214400000000000000e6
-392 1 4 19 0.13107200000000000000e6
-392 1 5 20 0.13107200000000000000e6
-392 1 6 13 0.13107200000000000000e6
-392 1 7 14 -0.26214400000000000000e6
-392 2 3 9 0.13107200000000000000e6
-392 3 6 11 0.13107200000000000000e6
-392 3 7 12 0.13107200000000000000e6
-392 3 11 14 0.13107200000000000000e6
-393 3 5 18 -0.13107200000000000000e6
-393 3 11 15 0.13107200000000000000e6
-394 1 1 20 0.13107200000000000000e6
-394 1 2 17 -0.13107200000000000000e6
-394 1 3 18 -0.13107200000000000000e6
-394 1 4 19 -0.26214400000000000000e6
-394 1 5 20 -0.26214400000000000000e6
-394 1 7 14 0.52428800000000000000e6
-394 1 11 18 -0.13107200000000000000e6
-394 1 13 20 -0.13107200000000000000e6
-394 2 3 9 -0.26214400000000000000e6
-394 2 10 10 -0.26214400000000000000e6
-394 3 2 15 -0.26214400000000000000e6
-394 3 5 18 -0.26214400000000000000e6
-394 3 5 20 -0.26214400000000000000e6
-394 3 6 11 -0.26214400000000000000e6
-394 3 7 12 -0.26214400000000000000e6
-394 3 11 12 -0.13107200000000000000e6
-394 3 11 17 0.13107200000000000000e6
-394 3 12 17 0.13107200000000000000e6
-394 4 7 7 -0.26214400000000000000e6
-395 3 11 18 0.13107200000000000000e6
-395 3 12 17 -0.13107200000000000000e6
-396 3 5 20 -0.13107200000000000000e6
-396 3 11 19 0.13107200000000000000e6
-397 1 1 20 0.13107200000000000000e6
-397 1 2 17 -0.13107200000000000000e6
-397 1 3 18 -0.13107200000000000000e6
-397 1 4 19 -0.26214400000000000000e6
-397 1 5 20 -0.26214400000000000000e6
-397 1 6 13 -0.26214400000000000000e6
-397 1 7 14 0.52428800000000000000e6
-397 1 17 20 0.13107200000000000000e6
-397 2 3 9 -0.26214400000000000000e6
-397 3 6 11 -0.26214400000000000000e6
-397 3 7 12 -0.26214400000000000000e6
-397 3 11 12 -0.13107200000000000000e6
-397 3 11 20 0.13107200000000000000e6
-397 3 12 17 0.13107200000000000000e6
-397 4 7 7 -0.26214400000000000000e6
-398 1 1 20 -0.65536000000000000000e5
-398 1 2 17 0.65536000000000000000e5
-398 1 4 19 0.13107200000000000000e6
-398 1 5 20 0.13107200000000000000e6
-398 1 6 13 0.13107200000000000000e6
-398 1 7 14 -0.26214400000000000000e6
-398 2 3 9 0.13107200000000000000e6
-398 3 6 11 0.13107200000000000000e6
-398 3 7 12 0.13107200000000000000e6
-398 3 11 12 0.65536000000000000000e5
-398 3 12 12 0.13107200000000000000e6
-398 4 7 7 0.13107200000000000000e6
-399 3 4 17 -0.13107200000000000000e6
-399 3 12 13 0.13107200000000000000e6
-400 3 5 18 -0.13107200000000000000e6
-400 3 12 14 0.13107200000000000000e6
-401 3 12 15 0.13107200000000000000e6
-401 3 13 14 -0.13107200000000000000e6
-402 3 6 19 -0.13107200000000000000e6
-402 3 12 16 0.13107200000000000000e6
-403 1 1 20 -0.13107200000000000000e6
-403 1 2 17 0.13107200000000000000e6
-403 1 3 18 0.13107200000000000000e6
-403 1 4 19 0.26214400000000000000e6
-403 1 5 20 0.26214400000000000000e6
-403 1 7 14 -0.52428800000000000000e6
-403 1 11 18 0.13107200000000000000e6
-403 1 13 20 0.13107200000000000000e6
-403 2 3 9 0.26214400000000000000e6
-403 2 8 10 0.13107200000000000000e6
-403 3 2 15 0.26214400000000000000e6
-403 3 5 18 0.26214400000000000000e6
-403 3 6 11 0.26214400000000000000e6
-403 3 7 12 0.26214400000000000000e6
-403 3 11 12 0.13107200000000000000e6
-403 3 12 18 0.13107200000000000000e6
-403 4 7 7 0.26214400000000000000e6
-404 1 4 19 -0.13107200000000000000e6
-404 1 18 19 0.13107200000000000000e6
-404 3 12 19 0.13107200000000000000e6
-404 3 13 14 0.13107200000000000000e6
-405 3 12 20 0.13107200000000000000e6
-405 3 17 18 -0.13107200000000000000e6
-406 1 1 20 0.65536000000000000000e5
-406 1 2 17 -0.65536000000000000000e5
-406 1 4 19 -0.13107200000000000000e6
-406 1 5 20 -0.13107200000000000000e6
-406 1 6 13 -0.13107200000000000000e6
-406 1 7 14 0.26214400000000000000e6
-406 2 3 9 -0.13107200000000000000e6
-406 3 4 17 0.65536000000000000000e5
-406 3 6 11 -0.13107200000000000000e6
-406 3 7 12 -0.13107200000000000000e6
-406 3 11 12 -0.65536000000000000000e5
-406 3 13 13 0.13107200000000000000e6
-406 3 13 14 -0.13107200000000000000e6
-406 4 7 7 -0.13107200000000000000e6
-406 4 8 8 0.13107200000000000000e6
-407 3 4 19 -0.13107200000000000000e6
-407 3 13 15 0.13107200000000000000e6
-408 1 10 13 -0.26214400000000000000e6
-408 1 16 19 0.26214400000000000000e6
-408 3 6 19 0.13107200000000000000e6
-408 3 9 14 0.26214400000000000000e6
-408 3 11 16 0.13107200000000000000e6
-408 3 13 16 0.13107200000000000000e6
-408 4 6 10 0.13107200000000000000e6
-409 1 1 20 -0.13107200000000000000e6
-409 1 2 17 0.13107200000000000000e6
-409 1 3 18 0.13107200000000000000e6
-409 1 4 19 0.26214400000000000000e6
-409 1 5 20 0.26214400000000000000e6
-409 1 7 14 -0.52428800000000000000e6
-409 1 11 18 0.13107200000000000000e6
-409 1 13 20 0.13107200000000000000e6
-409 2 3 9 0.26214400000000000000e6
-409 2 8 10 0.13107200000000000000e6
-409 3 2 15 0.26214400000000000000e6
-409 3 5 18 0.26214400000000000000e6
-409 3 6 11 0.26214400000000000000e6
-409 3 7 12 0.26214400000000000000e6
-409 3 11 12 0.13107200000000000000e6
-409 3 13 17 0.13107200000000000000e6
-409 4 7 7 0.26214400000000000000e6
-410 3 7 20 -0.13107200000000000000e6
-410 3 13 19 0.13107200000000000000e6
-411 1 1 20 -0.13107200000000000000e6
-411 1 2 17 0.13107200000000000000e6
-411 1 3 18 0.13107200000000000000e6
-411 1 4 19 0.26214400000000000000e6
-411 1 5 20 0.26214400000000000000e6
-411 1 6 13 0.26214400000000000000e6
-411 1 7 14 -0.52428800000000000000e6
-411 1 17 20 -0.13107200000000000000e6
-411 1 18 19 -0.26214400000000000000e6
-411 1 19 20 0.26214400000000000000e6
-411 2 3 9 0.26214400000000000000e6
-411 3 6 11 0.26214400000000000000e6
-411 3 7 12 0.26214400000000000000e6
-411 3 11 12 0.13107200000000000000e6
-411 3 12 17 -0.13107200000000000000e6
-411 3 13 20 0.13107200000000000000e6
-411 3 17 18 0.13107200000000000000e6
-411 4 7 7 0.26214400000000000000e6
-411 4 10 10 0.26214400000000000000e6
-412 3 11 16 -0.65536000000000000000e5
-412 3 14 14 0.13107200000000000000e6
-413 3 6 19 -0.13107200000000000000e6
-413 3 14 15 0.13107200000000000000e6
-414 1 10 13 -0.13107200000000000000e6
-414 1 16 19 0.13107200000000000000e6
-414 3 9 14 0.13107200000000000000e6
-414 3 14 16 0.13107200000000000000e6
-415 3 5 20 -0.13107200000000000000e6
-415 3 14 17 0.13107200000000000000e6
-416 1 4 19 -0.13107200000000000000e6
-416 1 18 19 0.13107200000000000000e6
-416 3 13 14 0.13107200000000000000e6
-416 3 14 18 0.13107200000000000000e6
-417 1 18 19 -0.13107200000000000000e6
-417 1 19 20 0.13107200000000000000e6
-417 3 14 20 0.13107200000000000000e6
-418 1 10 13 -0.13107200000000000000e6
-418 1 16 19 0.13107200000000000000e6
-418 3 6 19 0.65536000000000000000e5
-418 3 9 14 0.13107200000000000000e6
-418 3 11 16 0.65536000000000000000e5
-418 3 15 15 0.13107200000000000000e6
-418 4 6 10 0.65536000000000000000e5
-419 1 4 19 -0.13107200000000000000e6
-419 1 18 19 0.13107200000000000000e6
-419 3 13 14 0.13107200000000000000e6
-419 3 15 17 0.13107200000000000000e6
-420 3 7 20 -0.13107200000000000000e6
-420 3 15 18 0.13107200000000000000e6
-421 3 9 20 -0.13107200000000000000e6
-421 3 15 19 0.13107200000000000000e6
-422 3 10 19 -0.65536000000000000000e5
-422 3 16 16 0.13107200000000000000e6
-423 3 14 19 -0.13107200000000000000e6
-423 3 16 17 0.13107200000000000000e6
-424 3 9 20 -0.13107200000000000000e6
-424 3 16 18 0.13107200000000000000e6
-425 3 16 20 0.13107200000000000000e6
-425 3 19 19 -0.26214400000000000000e6
-426 1 1 20 0.65536000000000000000e5
-426 1 2 17 -0.65536000000000000000e5
-426 1 3 18 -0.65536000000000000000e5
-426 1 4 19 -0.13107200000000000000e6
-426 1 5 20 -0.13107200000000000000e6
-426 1 6 13 -0.13107200000000000000e6
-426 1 7 14 0.26214400000000000000e6
-426 1 17 20 0.65536000000000000000e5
-426 2 3 9 -0.13107200000000000000e6
-426 3 6 11 -0.13107200000000000000e6
-426 3 7 12 -0.13107200000000000000e6
-426 3 11 12 -0.65536000000000000000e5
-426 3 12 17 0.65536000000000000000e5
-426 3 17 17 0.13107200000000000000e6
-426 4 7 7 -0.13107200000000000000e6
-427 1 18 19 -0.13107200000000000000e6
-427 1 19 20 0.13107200000000000000e6
-427 3 17 19 0.13107200000000000000e6
-428 1 1 20 -0.65536000000000000000e5
-428 1 2 17 0.65536000000000000000e5
-428 1 3 18 0.65536000000000000000e5
-428 1 4 19 0.13107200000000000000e6
-428 1 5 20 0.13107200000000000000e6
-428 1 6 13 0.13107200000000000000e6
-428 1 7 14 -0.26214400000000000000e6
-428 1 17 20 -0.65536000000000000000e5
-428 1 18 19 -0.13107200000000000000e6
-428 1 19 20 0.13107200000000000000e6
-428 2 3 9 0.13107200000000000000e6
-428 3 6 11 0.13107200000000000000e6
-428 3 7 12 0.13107200000000000000e6
-428 3 11 12 0.65536000000000000000e5
-428 3 12 17 -0.65536000000000000000e5
-428 3 17 18 0.65536000000000000000e5
-428 3 18 18 0.13107200000000000000e6
-428 4 7 7 0.13107200000000000000e6
-428 4 10 10 0.13107200000000000000e6
-429 3 15 20 -0.13107200000000000000e6
-429 3 18 19 0.13107200000000000000e6
-430 1 1 4 0.13107200000000000000e6
-430 1 2 17 -0.13107200000000000000e6
-430 3 1 2 0.13107200000000000000e6
-430 3 1 6 -0.26214400000000000000e6
-430 3 2 3 0.13107200000000000000e6
-430 3 2 11 -0.13107200000000000000e6
-430 4 1 2 0.13107200000000000000e6
-431 4 1 3 0.13107200000000000000e6
-431 4 2 2 -0.26214400000000000000e6
-432 2 1 9 0.13107200000000000000e6
-432 2 2 4 -0.13107200000000000000e6
-432 4 1 4 0.13107200000000000000e6
-433 4 1 6 0.13107200000000000000e6
-433 4 4 4 -0.26214400000000000000e6
-434 1 1 4 -0.13107200000000000000e6
-434 1 2 17 0.13107200000000000000e6
-434 2 1 3 -0.13107200000000000000e6
-434 2 7 7 0.26214400000000000000e6
-434 3 1 2 -0.13107200000000000000e6
-434 3 1 6 0.26214400000000000000e6
-434 3 2 3 -0.13107200000000000000e6
-434 3 2 11 0.13107200000000000000e6
-434 4 1 7 0.13107200000000000000e6
-435 1 2 17 -0.13107200000000000000e6
-435 1 3 18 -0.13107200000000000000e6
-435 1 4 19 -0.26214400000000000000e6
-435 1 6 13 -0.26214400000000000000e6
-435 1 7 14 0.52428800000000000000e6
-435 1 11 18 -0.13107200000000000000e6
-435 2 2 8 -0.13107200000000000000e6
-435 2 3 9 -0.26214400000000000000e6
-435 3 6 11 -0.26214400000000000000e6
-435 3 7 12 -0.26214400000000000000e6
-435 3 11 12 -0.13107200000000000000e6
-435 4 1 8 0.13107200000000000000e6
-436 1 2 9 -0.26214400000000000000e6
-436 1 3 10 0.52428800000000000000e6
-436 1 4 19 -0.13107200000000000000e6
-436 1 5 12 0.13107200000000000000e6
-436 1 7 14 0.26214400000000000000e6
-436 1 8 15 -0.52428800000000000000e6
-436 2 3 9 -0.13107200000000000000e6
-436 2 4 10 0.13107200000000000000e6
-436 3 3 8 -0.26214400000000000000e6
-436 3 6 7 -0.26214400000000000000e6
-436 3 7 12 -0.13107200000000000000e6
-436 4 1 9 0.13107200000000000000e6
-436 4 2 6 -0.26214400000000000000e6
-437 4 1 10 0.13107200000000000000e6
-437 4 7 7 -0.26214400000000000000e6
-438 1 1 4 -0.13107200000000000000e6
-438 1 2 17 0.13107200000000000000e6
-438 1 3 10 0.10485760000000000000e7
-438 1 8 15 -0.10485760000000000000e7
-438 3 1 6 -0.26214400000000000000e6
-438 3 2 7 -0.52428800000000000000e6
-438 3 2 11 0.13107200000000000000e6
-438 3 3 4 0.13107200000000000000e6
-438 3 3 8 -0.52428800000000000000e6
-438 3 6 7 -0.52428800000000000000e6
-438 4 1 5 -0.26214400000000000000e6
-438 4 2 2 -0.26214400000000000000e6
-438 4 2 3 0.13107200000000000000e6
-438 4 2 6 -0.52428800000000000000e6
-439 4 1 5 -0.13107200000000000000e6
-439 4 2 4 0.13107200000000000000e6
-440 1 3 10 0.52428800000000000000e6
-440 1 4 7 0.13107200000000000000e6
-440 1 4 19 -0.13107200000000000000e6
-440 1 8 15 -0.52428800000000000000e6
-440 3 1 6 -0.13107200000000000000e6
-440 3 3 8 -0.52428800000000000000e6
-440 3 6 7 -0.26214400000000000000e6
-440 3 7 12 -0.13107200000000000000e6
-440 4 1 5 -0.13107200000000000000e6
-440 4 2 5 0.13107200000000000000e6
-440 4 2 6 -0.26214400000000000000e6
-441 1 2 17 -0.13107200000000000000e6
-441 1 3 18 -0.13107200000000000000e6
-441 1 4 19 -0.26214400000000000000e6
-441 1 6 13 -0.26214400000000000000e6
-441 1 7 14 0.52428800000000000000e6
-441 1 11 18 -0.13107200000000000000e6
-441 2 2 8 -0.13107200000000000000e6
-441 2 3 9 -0.26214400000000000000e6
-441 3 6 11 -0.26214400000000000000e6
-441 3 7 12 -0.26214400000000000000e6
-441 3 11 12 -0.13107200000000000000e6
-441 4 2 7 0.13107200000000000000e6
-442 4 2 8 0.13107200000000000000e6
-442 4 3 7 -0.13107200000000000000e6
-443 4 2 9 0.13107200000000000000e6
-443 4 4 8 -0.13107200000000000000e6
-444 1 1 20 0.13107200000000000000e6
-444 1 2 17 -0.13107200000000000000e6
-444 1 4 19 -0.26214400000000000000e6
-444 1 5 20 -0.26214400000000000000e6
-444 1 6 13 -0.26214400000000000000e6
-444 1 7 14 0.52428800000000000000e6
-444 2 3 9 -0.26214400000000000000e6
-444 3 4 17 0.13107200000000000000e6
-444 3 5 18 -0.26214400000000000000e6
-444 3 6 11 -0.26214400000000000000e6
-444 3 7 12 -0.26214400000000000000e6
-444 4 2 10 0.13107200000000000000e6
-444 4 7 7 -0.26214400000000000000e6
-445 1 3 10 0.52428800000000000000e6
-445 1 4 7 0.13107200000000000000e6
-445 1 4 19 -0.13107200000000000000e6
-445 1 8 15 -0.52428800000000000000e6
-445 3 1 6 -0.13107200000000000000e6
-445 3 3 8 -0.52428800000000000000e6
-445 3 6 7 -0.26214400000000000000e6
-445 3 7 12 -0.13107200000000000000e6
-445 4 1 5 -0.13107200000000000000e6
-445 4 2 6 -0.26214400000000000000e6
-445 4 3 4 0.13107200000000000000e6
-446 1 4 7 0.13107200000000000000e6
-446 1 4 19 -0.13107200000000000000e6
-446 3 2 7 0.13107200000000000000e6
-446 3 4 7 0.13107200000000000000e6
-446 3 6 7 -0.26214400000000000000e6
-446 3 7 12 -0.13107200000000000000e6
-446 4 3 5 0.13107200000000000000e6
-447 4 3 6 0.13107200000000000000e6
-447 4 5 5 -0.26214400000000000000e6
-448 1 4 11 -0.13107200000000000000e6
-448 1 11 18 0.13107200000000000000e6
-448 3 2 15 0.26214400000000000000e6
-448 3 4 13 0.13107200000000000000e6
-448 3 7 12 -0.26214400000000000000e6
-448 3 11 12 0.13107200000000000000e6
-448 4 3 7 -0.13107200000000000000e6
-448 4 3 8 0.13107200000000000000e6
-449 4 3 10 0.13107200000000000000e6
-449 4 8 8 -0.26214400000000000000e6
-450 4 2 6 -0.13107200000000000000e6
-450 4 4 5 0.13107200000000000000e6
-451 1 1 16 -0.65536000000000000000e5
-451 1 2 5 0.32768000000000000000e5
-451 1 3 10 0.39321600000000000000e6
-451 1 4 19 -0.32768000000000000000e5
-451 1 5 12 0.32768000000000000000e5
-451 1 6 13 -0.32768000000000000000e5
-451 1 7 14 0.65536000000000000000e5
-451 1 8 15 -0.39321600000000000000e6
-451 2 2 4 0.32768000000000000000e5
-451 2 3 9 -0.32768000000000000000e5
-451 3 2 7 -0.32768000000000000000e5
-451 3 4 9 0.65536000000000000000e5
-451 3 5 10 -0.26214400000000000000e6
-451 3 6 7 -0.65536000000000000000e5
-451 3 7 12 -0.32768000000000000000e5
-451 4 1 5 -0.32768000000000000000e5
-451 4 2 6 -0.13107200000000000000e6
-451 4 4 4 0.13107200000000000000e6
-451 4 4 6 0.13107200000000000000e6
-451 4 5 5 0.13107200000000000000e6
-452 1 2 9 -0.26214400000000000000e6
-452 1 3 10 0.52428800000000000000e6
-452 1 4 19 -0.13107200000000000000e6
-452 1 5 12 0.13107200000000000000e6
-452 1 7 14 0.26214400000000000000e6
-452 1 8 15 -0.52428800000000000000e6
-452 2 3 9 -0.13107200000000000000e6
-452 2 4 10 0.13107200000000000000e6
-452 3 3 8 -0.26214400000000000000e6
-452 3 6 7 -0.26214400000000000000e6
-452 3 7 12 -0.13107200000000000000e6
-452 4 2 6 -0.26214400000000000000e6
-452 4 4 7 0.13107200000000000000e6
-453 1 2 9 0.13107200000000000000e6
-453 1 3 10 -0.26214400000000000000e6
-453 1 4 19 0.65536000000000000000e5
-453 1 5 12 -0.65536000000000000000e5
-453 1 7 14 -0.13107200000000000000e6
-453 1 10 17 0.26214400000000000000e6
-453 2 3 9 0.65536000000000000000e5
-453 2 4 10 -0.65536000000000000000e5
-453 3 1 14 0.65536000000000000000e5
-453 3 2 15 0.13107200000000000000e6
-453 3 3 8 0.13107200000000000000e6
-453 3 3 16 0.13107200000000000000e6
-453 3 6 7 0.13107200000000000000e6
-453 3 6 11 0.13107200000000000000e6
-453 3 7 12 0.13107200000000000000e6
-453 4 2 6 0.13107200000000000000e6
-453 4 4 8 0.65536000000000000000e5
-453 4 4 9 0.13107200000000000000e6
-454 1 4 19 -0.13107200000000000000e6
-454 1 5 20 -0.13107200000000000000e6
-454 1 6 13 -0.13107200000000000000e6
-454 1 7 14 0.26214400000000000000e6
-454 2 3 9 -0.13107200000000000000e6
-454 3 5 18 0.13107200000000000000e6
-454 3 6 11 -0.13107200000000000000e6
-454 3 7 12 -0.13107200000000000000e6
-454 3 11 16 -0.26214400000000000000e6
-454 3 13 14 0.13107200000000000000e6
-454 4 4 10 0.13107200000000000000e6
-455 1 3 10 0.13107200000000000000e6
-455 1 8 15 -0.13107200000000000000e6
-455 3 3 8 0.65536000000000000000e5
-455 3 4 9 0.65536000000000000000e5
-455 3 4 10 0.13107200000000000000e6
-455 3 6 7 0.65536000000000000000e5
-455 3 8 9 -0.26214400000000000000e6
-455 4 5 5 0.13107200000000000000e6
-455 4 5 6 0.13107200000000000000e6
-456 4 4 8 -0.13107200000000000000e6
-456 4 5 7 0.13107200000000000000e6
-457 4 3 9 -0.13107200000000000000e6
-457 4 5 8 0.13107200000000000000e6
-458 3 4 19 0.13107200000000000000e6
-458 3 5 18 0.13107200000000000000e6
-458 3 6 19 -0.26214400000000000000e6
-458 3 13 14 0.13107200000000000000e6
-458 4 5 10 0.13107200000000000000e6
-459 1 2 9 0.13107200000000000000e6
-459 1 3 10 -0.26214400000000000000e6
-459 1 4 19 0.65536000000000000000e5
-459 1 5 12 -0.65536000000000000000e5
-459 1 7 14 -0.13107200000000000000e6
-459 1 10 17 0.26214400000000000000e6
-459 2 3 9 0.65536000000000000000e5
-459 2 4 10 -0.65536000000000000000e5
-459 3 1 14 0.65536000000000000000e5
-459 3 2 15 0.13107200000000000000e6
-459 3 3 8 0.13107200000000000000e6
-459 3 3 16 0.13107200000000000000e6
-459 3 6 7 0.13107200000000000000e6
-459 3 6 11 0.13107200000000000000e6
-459 3 7 12 0.13107200000000000000e6
-459 4 2 6 0.13107200000000000000e6
-459 4 4 8 0.65536000000000000000e5
-459 4 6 7 0.13107200000000000000e6
-460 4 5 9 -0.13107200000000000000e6
-460 4 6 8 0.13107200000000000000e6
-461 1 8 15 0.13107200000000000000e6
-461 1 9 16 -0.26214400000000000000e6
-461 1 10 17 -0.13107200000000000000e6
-461 1 10 19 0.26214400000000000000e6
-461 3 7 16 0.13107200000000000000e6
-461 3 9 14 0.13107200000000000000e6
-461 4 6 9 0.13107200000000000000e6
-462 1 1 20 0.13107200000000000000e6
-462 1 2 17 -0.13107200000000000000e6
-462 1 4 19 -0.26214400000000000000e6
-462 1 5 20 -0.26214400000000000000e6
-462 1 6 13 -0.26214400000000000000e6
-462 1 7 14 0.52428800000000000000e6
-462 2 3 9 -0.26214400000000000000e6
-462 3 4 17 0.13107200000000000000e6
-462 3 5 18 -0.26214400000000000000e6
-462 3 6 11 -0.26214400000000000000e6
-462 3 7 12 -0.26214400000000000000e6
-462 4 7 7 -0.26214400000000000000e6
-462 4 7 8 0.13107200000000000000e6
-463 1 4 19 -0.13107200000000000000e6
-463 1 5 20 -0.13107200000000000000e6
-463 1 6 13 -0.13107200000000000000e6
-463 1 7 14 0.26214400000000000000e6
-463 2 3 9 -0.13107200000000000000e6
-463 3 5 18 0.13107200000000000000e6
-463 3 6 11 -0.13107200000000000000e6
-463 3 7 12 -0.13107200000000000000e6
-463 3 11 16 -0.26214400000000000000e6
-463 3 13 14 0.13107200000000000000e6
-463 4 7 9 0.13107200000000000000e6
-464 2 8 10 -0.13107200000000000000e6
-464 2 10 10 0.26214400000000000000e6
-464 4 7 10 0.13107200000000000000e6
-465 3 4 19 0.13107200000000000000e6
-465 3 5 18 0.13107200000000000000e6
-465 3 6 19 -0.26214400000000000000e6
-465 3 13 14 0.13107200000000000000e6
-465 4 8 9 0.13107200000000000000e6
-466 1 1 20 0.13107200000000000000e6
-466 1 2 17 -0.13107200000000000000e6
-466 1 3 18 -0.13107200000000000000e6
-466 1 4 19 -0.52428800000000000000e6
-466 1 5 20 -0.26214400000000000000e6
-466 1 7 14 0.52428800000000000000e6
-466 1 11 18 -0.13107200000000000000e6
-466 1 13 20 -0.13107200000000000000e6
-466 1 18 19 0.26214400000000000000e6
-466 2 3 9 -0.26214400000000000000e6
-466 2 8 10 -0.13107200000000000000e6
-466 3 2 15 -0.26214400000000000000e6
-466 3 5 18 -0.26214400000000000000e6
-466 3 6 11 -0.26214400000000000000e6
-466 3 7 12 -0.26214400000000000000e6
-466 3 11 12 -0.13107200000000000000e6
-466 3 12 17 0.13107200000000000000e6
-466 3 13 14 0.26214400000000000000e6
-466 3 13 18 0.13107200000000000000e6
-466 4 7 7 -0.26214400000000000000e6
-466 4 8 10 0.13107200000000000000e6
-467 4 6 10 -0.65536000000000000000e5
-467 4 9 9 0.13107200000000000000e6
-468 1 4 19 0.13107200000000000000e6
-468 1 18 19 -0.13107200000000000000e6
-468 3 5 20 0.13107200000000000000e6
-468 3 7 20 0.13107200000000000000e6
-468 3 13 14 -0.13107200000000000000e6
-468 3 14 19 -0.26214400000000000000e6
-468 4 9 10 0.13107200000000000000e6
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-1024
-4
-35 20 20 10
-0.13107200000000000000e6 0.0 0.0 -0.13107200000000000000e6 0.13107200000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.13107200000000000000e6 0.0 -0.13107200000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 -0.13107200000000000000e6 -0.52428800000000000000e6 -0.32768000000000000000e5 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.39321600000000000000e6 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.13107200000000000000e6 -0.65536000000000000000e5 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.98304000000000000000e5 -0.16384000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.13107200000000000000e6 -0.10485760000000000000e7 -0.26214400000000000000e6 0.52428800000000000000e6 0.52428800000000000000e6 -0.26214400000000000000e6 0.0 0.13107200000000000000e6 -0.78643200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.26214400000000000000e6 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 -0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 -0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.13107200000000000000e6 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.13107200000000000000e6 -0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.13107200000000000000e6 -0.26214400000000000000e6 -0.26214400000000000000e6 0.52428800000000000000e6 0.0 -0.26214400000000000000e6 0.52428800000000000000e6 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.13107200000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.0
-0 1 1 2 -0.32768000000000000000e5
-0 1 1 6 0.65536000000000000000e5
-0 1 1 8 -0.13107200000000000000e6
-0 1 2 5 -0.32768000000000000000e5
-0 1 2 9 -0.65536000000000000000e5
-0 1 3 10 0.13107200000000000000e6
-0 2 1 1 -0.65536000000000000000e5
-0 2 1 3 0.32768000000000000000e5
-0 2 1 7 -0.65536000000000000000e5
-0 2 2 12 -0.32768000000000000000e5
-0 4 2 2 -0.65536000000000000000e5
-1 1 2 9 0.65536000000000000000e5
-1 1 3 34 0.65536000000000000000e5
-1 1 7 22 -0.13107200000000000000e6
-1 1 32 35 0.32768000000000000000e5
-1 1 35 35 0.65536000000000000000e5
-1 2 6 20 0.65536000000000000000e5
-1 3 2 7 -0.65536000000000000000e5
-1 3 2 15 -0.65536000000000000000e5
-1 3 3 16 0.13107200000000000000e6
-1 3 5 18 -0.65536000000000000000e5
-1 3 6 19 0.13107200000000000000e6
-1 3 7 20 0.65536000000000000000e5
-1 3 15 20 0.65536000000000000000e5
-1 3 19 20 0.65536000000000000000e5
-2 1 2 9 -0.32768000000000000000e5
-2 1 3 34 -0.32768000000000000000e5
-2 1 7 22 0.65536000000000000000e5
-2 1 31 32 -0.65536000000000000000e5
-2 1 34 35 0.32768000000000000000e5
-2 2 6 20 -0.32768000000000000000e5
-2 3 2 7 0.32768000000000000000e5
-2 3 2 15 0.32768000000000000000e5
-2 3 3 16 -0.65536000000000000000e5
-2 3 5 18 0.32768000000000000000e5
-2 3 6 19 -0.65536000000000000000e5
-2 3 7 20 -0.32768000000000000000e5
-2 3 15 20 -0.32768000000000000000e5
-2 3 19 20 -0.32768000000000000000e5
-3 1 2 9 0.65536000000000000000e5
-3 1 3 34 0.65536000000000000000e5
-3 1 7 22 -0.13107200000000000000e6
-3 1 32 33 0.32768000000000000000e5
-3 1 33 35 0.32768000000000000000e5
-3 2 6 20 0.65536000000000000000e5
-3 3 2 7 -0.65536000000000000000e5
-3 3 2 15 -0.65536000000000000000e5
-3 3 3 16 0.13107200000000000000e6
-3 3 5 18 -0.65536000000000000000e5
-3 3 6 19 0.13107200000000000000e6
-3 3 7 20 0.65536000000000000000e5
-3 3 15 20 0.65536000000000000000e5
-4 1 2 9 -0.65536000000000000000e5
-4 1 3 34 -0.65536000000000000000e5
-4 1 7 22 0.13107200000000000000e6
-4 1 20 35 -0.65536000000000000000e5
-4 1 28 35 -0.32768000000000000000e5
-4 1 32 33 -0.32768000000000000000e5
-4 1 32 35 0.32768000000000000000e5
-4 2 6 20 -0.65536000000000000000e5
-4 2 20 20 -0.65536000000000000000e5
-4 3 2 7 0.65536000000000000000e5
-4 3 2 15 0.65536000000000000000e5
-4 3 3 16 -0.13107200000000000000e6
-4 3 5 18 0.65536000000000000000e5
-4 3 6 19 -0.13107200000000000000e6
-4 3 7 20 -0.65536000000000000000e5
-4 3 15 20 -0.65536000000000000000e5
-4 3 19 20 -0.65536000000000000000e5
-5 1 25 32 -0.65536000000000000000e5
-5 1 31 32 0.32768000000000000000e5
-5 1 34 34 0.65536000000000000000e5
-6 1 2 9 -0.32768000000000000000e5
-6 1 3 34 -0.32768000000000000000e5
-6 1 7 22 0.65536000000000000000e5
-6 1 29 30 -0.65536000000000000000e5
-6 1 33 34 0.32768000000000000000e5
-6 2 6 20 -0.32768000000000000000e5
-6 3 2 7 0.32768000000000000000e5
-6 3 2 15 0.32768000000000000000e5
-6 3 3 16 -0.65536000000000000000e5
-6 3 5 18 0.32768000000000000000e5
-6 3 6 19 -0.65536000000000000000e5
-6 3 7 20 -0.32768000000000000000e5
-6 3 15 20 -0.32768000000000000000e5
-7 1 2 9 -0.32768000000000000000e5
-7 1 3 34 -0.32768000000000000000e5
-7 1 20 35 0.32768000000000000000e5
-7 2 6 20 -0.32768000000000000000e5
-7 3 2 7 0.32768000000000000000e5
-7 3 2 15 0.32768000000000000000e5
-7 3 5 18 0.32768000000000000000e5
-7 3 7 20 -0.32768000000000000000e5
-7 3 14 19 0.65536000000000000000e5
-7 3 15 20 -0.32768000000000000000e5
-7 3 19 20 -0.32768000000000000000e5
-8 1 4 35 0.32768000000000000000e5
-8 1 7 22 -0.13107200000000000000e6
-8 1 16 35 -0.32768000000000000000e5
-8 1 17 32 0.32768000000000000000e5
-8 1 20 35 0.65536000000000000000e5
-8 1 26 29 0.65536000000000000000e5
-8 1 28 35 0.32768000000000000000e5
-8 2 14 20 0.65536000000000000000e5
-8 3 3 16 0.13107200000000000000e6
-8 3 6 19 0.13107200000000000000e6
-8 3 14 19 0.13107200000000000000e6
-8 3 17 18 0.32768000000000000000e5
-8 4 10 10 0.65536000000000000000e5
-9 1 2 9 -0.65536000000000000000e5
-9 1 3 34 -0.65536000000000000000e5
-9 1 26 29 0.65536000000000000000e5
-9 1 26 33 0.32768000000000000000e5
-9 1 32 33 0.32768000000000000000e5
-9 2 6 20 -0.65536000000000000000e5
-9 2 14 20 0.65536000000000000000e5
-9 3 2 7 0.65536000000000000000e5
-9 3 2 15 0.65536000000000000000e5
-9 3 5 18 0.65536000000000000000e5
-9 3 7 20 -0.65536000000000000000e5
-9 3 14 19 0.13107200000000000000e6
-10 1 2 9 -0.65536000000000000000e5
-10 1 3 34 -0.65536000000000000000e5
-10 1 7 22 0.13107200000000000000e6
-10 1 16 35 0.32768000000000000000e5
-10 1 26 29 -0.65536000000000000000e5
-10 1 28 35 -0.32768000000000000000e5
-10 1 32 33 -0.32768000000000000000e5
-10 2 6 20 -0.65536000000000000000e5
-10 2 20 20 -0.65536000000000000000e5
-10 3 2 7 0.65536000000000000000e5
-10 3 2 15 0.65536000000000000000e5
-10 3 3 16 -0.13107200000000000000e6
-10 3 5 18 0.65536000000000000000e5
-10 3 6 19 -0.13107200000000000000e6
-10 3 7 20 -0.65536000000000000000e5
-10 3 15 20 -0.65536000000000000000e5
-10 3 19 20 -0.65536000000000000000e5
-11 1 14 29 -0.65536000000000000000e5
-11 1 25 32 0.32768000000000000000e5
-11 1 31 34 0.32768000000000000000e5
-11 3 10 19 0.65536000000000000000e5
-12 1 23 30 -0.65536000000000000000e5
-12 1 24 35 0.32768000000000000000e5
-12 1 29 30 0.32768000000000000000e5
-13 1 7 22 0.32768000000000000000e5
-13 1 8 23 -0.65536000000000000000e5
-13 1 11 26 0.32768000000000000000e5
-13 1 12 27 0.32768000000000000000e5
-13 1 16 31 -0.32768000000000000000e5
-13 1 22 29 -0.32768000000000000000e5
-13 1 31 32 0.32768000000000000000e5
-13 3 3 16 -0.32768000000000000000e5
-13 3 9 14 0.65536000000000000000e5
-13 3 14 19 -0.32768000000000000000e5
-13 4 6 10 0.32768000000000000000e5
-14 1 2 9 -0.32768000000000000000e5
-14 1 3 34 -0.32768000000000000000e5
-14 1 7 22 0.65536000000000000000e5
-14 1 22 29 -0.65536000000000000000e5
-14 1 30 33 0.32768000000000000000e5
-14 2 6 20 -0.32768000000000000000e5
-14 3 2 7 0.32768000000000000000e5
-14 3 2 15 0.32768000000000000000e5
-14 3 3 16 -0.65536000000000000000e5
-14 3 5 18 0.32768000000000000000e5
-14 3 6 19 -0.65536000000000000000e5
-14 3 7 20 -0.32768000000000000000e5
-15 1 26 29 -0.32768000000000000000e5
-15 2 14 20 -0.32768000000000000000e5
-15 3 14 19 -0.65536000000000000000e5
-15 3 15 20 -0.32768000000000000000e5
-16 1 16 31 -0.65536000000000000000e5
-16 1 20 35 0.32768000000000000000e5
-16 1 26 29 0.32768000000000000000e5
-17 1 2 9 0.65536000000000000000e5
-17 1 3 34 0.65536000000000000000e5
-17 1 16 35 0.32768000000000000000e5
-17 1 17 32 -0.32768000000000000000e5
-17 1 20 35 -0.65536000000000000000e5
-17 1 26 29 -0.65536000000000000000e5
-17 1 26 33 -0.32768000000000000000e5
-17 2 6 20 0.65536000000000000000e5
-17 2 14 20 -0.65536000000000000000e5
-17 2 18 20 -0.32768000000000000000e5
-17 3 2 7 -0.65536000000000000000e5
-17 3 2 15 -0.65536000000000000000e5
-17 3 5 18 -0.65536000000000000000e5
-17 3 14 19 -0.13107200000000000000e6
-17 3 15 20 -0.65536000000000000000e5
-17 3 17 18 -0.32768000000000000000e5
-17 4 10 10 -0.65536000000000000000e5
-18 1 2 9 -0.65536000000000000000e5
-18 1 3 34 -0.13107200000000000000e6
-18 1 4 35 0.32768000000000000000e5
-18 1 16 35 -0.32768000000000000000e5
-18 1 17 32 0.32768000000000000000e5
-18 1 20 35 0.65536000000000000000e5
-18 1 26 29 0.65536000000000000000e5
-18 1 26 33 0.32768000000000000000e5
-18 2 6 20 -0.65536000000000000000e5
-18 2 14 20 0.65536000000000000000e5
-18 3 2 7 0.65536000000000000000e5
-18 3 2 15 0.65536000000000000000e5
-18 3 5 18 0.65536000000000000000e5
-18 3 7 20 -0.65536000000000000000e5
-18 3 14 19 0.13107200000000000000e6
-18 3 17 18 0.65536000000000000000e5
-18 4 10 10 0.65536000000000000000e5
-19 1 2 9 -0.65536000000000000000e5
-19 1 17 32 0.32768000000000000000e5
-19 1 26 33 0.32768000000000000000e5
-19 3 2 7 0.65536000000000000000e5
-19 3 2 15 0.65536000000000000000e5
-19 3 5 18 0.65536000000000000000e5
-20 1 1 32 -0.32768000000000000000e5
-20 1 2 33 -0.32768000000000000000e5
-20 1 3 26 -0.32768000000000000000e5
-20 1 16 35 0.32768000000000000000e5
-20 1 17 32 -0.32768000000000000000e5
-20 1 26 29 0.65536000000000000000e5
-20 1 26 33 -0.32768000000000000000e5
-20 2 11 17 -0.32768000000000000000e5
-20 2 17 17 -0.65536000000000000000e5
-20 3 11 12 0.32768000000000000000e5
-20 3 17 18 -0.32768000000000000000e5
-21 1 7 22 -0.81920000000000000000e4
-21 1 8 23 -0.16384000000000000000e5
-21 1 11 26 -0.81920000000000000000e4
-21 1 13 28 -0.16384000000000000000e5
-21 1 16 23 -0.81920000000000000000e4
-21 1 22 25 -0.32768000000000000000e5
-21 1 25 34 0.32768000000000000000e5
-21 2 5 19 -0.81920000000000000000e4
-21 2 14 16 -0.16384000000000000000e5
-21 2 16 16 -0.65536000000000000000e5
-21 3 3 16 0.81920000000000000000e4
-21 3 9 14 0.16384000000000000000e5
-21 3 10 19 -0.32768000000000000000e5
-22 1 14 29 -0.65536000000000000000e5
-22 1 23 30 0.32768000000000000000e5
-22 1 30 31 0.32768000000000000000e5
-23 1 7 22 -0.16384000000000000000e5
-23 1 11 26 -0.32768000000000000000e5
-23 1 12 27 -0.16384000000000000000e5
-23 1 13 28 -0.32768000000000000000e5
-23 1 16 23 -0.16384000000000000000e5
-23 1 16 31 0.16384000000000000000e5
-23 1 22 29 0.16384000000000000000e5
-23 1 25 32 0.32768000000000000000e5
-23 2 5 19 -0.16384000000000000000e5
-23 2 14 16 -0.32768000000000000000e5
-23 3 3 16 0.16384000000000000000e5
-23 3 6 19 -0.16384000000000000000e5
-23 4 6 10 -0.16384000000000000000e5
-24 1 12 35 0.32768000000000000000e5
-24 1 13 28 -0.65536000000000000000e5
-24 1 22 29 0.32768000000000000000e5
-25 1 7 22 0.32768000000000000000e5
-25 1 8 23 -0.65536000000000000000e5
-25 1 29 30 0.32768000000000000000e5
-25 3 3 16 -0.32768000000000000000e5
-25 3 6 19 -0.32768000000000000000e5
-25 3 9 14 0.65536000000000000000e5
-26 1 11 26 -0.32768000000000000000e5
-26 1 16 23 -0.32768000000000000000e5
-26 1 16 31 0.32768000000000000000e5
-26 2 5 19 -0.32768000000000000000e5
-26 3 6 19 -0.32768000000000000000e5
-26 3 14 19 -0.32768000000000000000e5
-27 1 2 9 -0.32768000000000000000e5
-27 1 3 34 -0.32768000000000000000e5
-27 1 7 22 0.65536000000000000000e5
-27 1 12 27 -0.65536000000000000000e5
-27 1 19 34 0.32768000000000000000e5
-27 2 6 20 -0.32768000000000000000e5
-27 3 2 7 0.32768000000000000000e5
-27 3 2 15 0.32768000000000000000e5
-27 3 3 16 -0.65536000000000000000e5
-27 3 5 18 0.32768000000000000000e5
-27 3 6 19 -0.65536000000000000000e5
-28 1 2 9 -0.32768000000000000000e5
-28 2 6 20 -0.32768000000000000000e5
-28 3 2 7 0.32768000000000000000e5
-28 3 2 15 0.32768000000000000000e5
-28 3 5 18 0.32768000000000000000e5
-28 3 6 19 -0.65536000000000000000e5
-28 3 7 20 -0.32768000000000000000e5
-29 1 2 9 0.65536000000000000000e5
-29 1 3 34 0.32768000000000000000e5
-29 1 11 26 -0.65536000000000000000e5
-29 1 26 29 -0.32768000000000000000e5
-29 2 6 20 0.32768000000000000000e5
-29 2 14 20 -0.32768000000000000000e5
-29 3 2 7 -0.65536000000000000000e5
-29 3 2 15 -0.65536000000000000000e5
-29 3 5 18 -0.65536000000000000000e5
-29 3 7 20 0.32768000000000000000e5
-29 3 14 19 -0.65536000000000000000e5
-30 1 1 32 0.16384000000000000000e5
-30 1 2 33 0.16384000000000000000e5
-30 1 3 26 0.16384000000000000000e5
-30 1 16 23 -0.65536000000000000000e5
-30 1 26 29 0.32768000000000000000e5
-30 2 11 17 0.16384000000000000000e5
-30 3 11 12 -0.16384000000000000000e5
-31 1 1 8 -0.65536000000000000000e5
-31 1 2 33 0.32768000000000000000e5
-31 1 3 26 -0.32768000000000000000e5
-31 1 3 34 -0.13107200000000000000e6
-31 1 4 35 0.32768000000000000000e5
-31 1 5 28 -0.32768000000000000000e5
-31 1 6 21 0.13107200000000000000e6
-31 1 7 22 0.13107200000000000000e6
-31 1 11 26 -0.13107200000000000000e6
-31 1 26 33 -0.32768000000000000000e5
-31 2 1 15 -0.65536000000000000000e5
-31 2 3 17 -0.32768000000000000000e5
-31 2 4 18 -0.32768000000000000000e5
-31 2 6 12 0.65536000000000000000e5
-31 2 6 20 -0.65536000000000000000e5
-31 2 12 18 0.65536000000000000000e5
-31 2 18 18 -0.65536000000000000000e5
-31 3 1 6 0.65536000000000000000e5
-31 3 2 15 -0.65536000000000000000e5
-31 3 3 16 -0.13107200000000000000e6
-31 3 4 17 -0.32768000000000000000e5
-31 3 5 18 0.65536000000000000000e5
-31 3 6 11 -0.65536000000000000000e5
-31 3 6 19 -0.13107200000000000000e6
-31 3 7 20 -0.65536000000000000000e5
-31 3 13 18 0.65536000000000000000e5
-31 3 17 18 -0.32768000000000000000e5
-31 4 4 8 -0.65536000000000000000e5
-31 4 8 8 0.65536000000000000000e5
-32 1 1 8 -0.65536000000000000000e5
-32 1 2 33 -0.32768000000000000000e5
-32 1 3 34 0.65536000000000000000e5
-32 1 6 21 0.13107200000000000000e6
-32 1 11 26 -0.13107200000000000000e6
-32 2 1 15 -0.65536000000000000000e5
-32 2 6 12 0.65536000000000000000e5
-32 2 12 18 -0.32768000000000000000e5
-32 3 1 6 0.65536000000000000000e5
-32 3 2 15 -0.65536000000000000000e5
-32 3 6 11 -0.65536000000000000000e5
-32 3 13 18 -0.32768000000000000000e5
-32 4 4 8 -0.65536000000000000000e5
-33 1 2 9 -0.65536000000000000000e5
-33 1 2 33 0.32768000000000000000e5
-33 1 26 33 0.32768000000000000000e5
-33 3 2 7 0.65536000000000000000e5
-33 3 2 15 0.65536000000000000000e5
-33 3 17 18 0.32768000000000000000e5
-34 1 1 8 0.65536000000000000000e5
-34 1 2 9 0.65536000000000000000e5
-34 1 3 26 0.32768000000000000000e5
-34 1 6 21 -0.13107200000000000000e6
-34 1 17 32 0.32768000000000000000e5
-34 2 1 15 0.65536000000000000000e5
-34 3 1 6 -0.65536000000000000000e5
-34 3 2 7 -0.65536000000000000000e5
-34 3 6 11 0.65536000000000000000e5
-34 3 11 12 -0.32768000000000000000e5
-35 1 1 8 -0.65536000000000000000e5
-35 1 1 32 0.32768000000000000000e5
-35 1 17 32 -0.32768000000000000000e5
-35 1 26 29 0.65536000000000000000e5
-35 1 26 33 -0.32768000000000000000e5
-35 2 17 17 -0.65536000000000000000e5
-35 3 1 6 0.65536000000000000000e5
-35 3 1 14 0.65536000000000000000e5
-35 3 17 18 -0.32768000000000000000e5
-36 1 7 22 0.40960000000000000000e4
-36 1 8 15 -0.32768000000000000000e5
-36 1 8 23 0.81920000000000000000e4
-36 1 10 25 -0.32768000000000000000e5
-36 1 11 26 0.40960000000000000000e4
-36 1 13 28 0.81920000000000000000e4
-36 1 14 29 0.16384000000000000000e5
-36 1 15 22 -0.32768000000000000000e5
-36 1 15 34 0.32768000000000000000e5
-36 1 16 23 0.40960000000000000000e4
-36 1 22 25 0.16384000000000000000e5
-36 2 5 19 0.40960000000000000000e4
-36 2 10 16 -0.32768000000000000000e5
-36 2 14 16 0.81920000000000000000e4
-36 2 16 16 0.32768000000000000000e5
-36 3 3 16 -0.40960000000000000000e4
-36 3 9 10 0.32768000000000000000e5
-36 3 9 14 -0.81920000000000000000e4
-37 1 8 15 -0.65536000000000000000e5
-37 1 14 29 0.32768000000000000000e5
-37 1 24 31 0.32768000000000000000e5
-37 3 9 10 0.65536000000000000000e5
-38 1 7 22 0.81920000000000000000e4
-38 1 8 23 0.16384000000000000000e5
-38 1 10 25 -0.65536000000000000000e5
-38 1 11 26 0.81920000000000000000e4
-38 1 13 28 0.16384000000000000000e5
-38 1 14 29 0.32768000000000000000e5
-38 1 16 23 0.81920000000000000000e4
-38 2 5 19 0.81920000000000000000e4
-38 2 14 16 0.16384000000000000000e5
-38 3 3 16 -0.81920000000000000000e4
-38 3 9 14 -0.16384000000000000000e5
-38 3 10 19 -0.32768000000000000000e5
-39 1 13 28 0.32768000000000000000e5
-39 1 14 21 -0.65536000000000000000e5
-39 1 25 28 0.32768000000000000000e5
-40 1 1 8 0.81920000000000000000e4
-40 1 5 20 -0.81920000000000000000e4
-40 1 6 21 -0.32768000000000000000e5
-40 1 7 22 -0.16384000000000000000e5
-40 1 8 23 0.32768000000000000000e5
-40 1 9 24 0.32768000000000000000e5
-40 1 14 21 -0.65536000000000000000e5
-40 1 23 30 0.32768000000000000000e5
-40 2 1 15 0.81920000000000000000e4
-40 2 2 16 -0.16384000000000000000e5
-40 2 6 12 -0.81920000000000000000e4
-40 2 9 15 0.32768000000000000000e5
-40 2 10 12 -0.32768000000000000000e5
-40 3 1 6 -0.81920000000000000000e4
-40 3 9 14 -0.32768000000000000000e5
-41 1 7 22 0.16384000000000000000e5
-41 1 8 23 0.32768000000000000000e5
-41 1 12 27 -0.16384000000000000000e5
-41 1 13 20 -0.65536000000000000000e5
-41 1 16 23 0.16384000000000000000e5
-41 1 16 31 0.16384000000000000000e5
-41 1 22 29 0.16384000000000000000e5
-41 2 5 19 0.16384000000000000000e5
-41 3 3 16 -0.16384000000000000000e5
-41 3 6 19 -0.16384000000000000000e5
-41 3 9 14 -0.32768000000000000000e5
-41 4 6 10 -0.16384000000000000000e5
-42 1 7 22 -0.32768000000000000000e5
-42 1 8 23 0.65536000000000000000e5
-42 1 9 24 0.65536000000000000000e5
-42 1 12 27 0.32768000000000000000e5
-42 1 14 21 -0.13107200000000000000e6
-42 1 22 29 -0.32768000000000000000e5
-42 1 23 30 0.65536000000000000000e5
-42 2 9 15 0.65536000000000000000e5
-42 2 16 18 -0.32768000000000000000e5
-42 3 3 16 0.32768000000000000000e5
-42 3 6 19 0.32768000000000000000e5
-43 1 7 22 0.32768000000000000000e5
-43 1 8 23 -0.65536000000000000000e5
-43 1 22 29 0.32768000000000000000e5
-43 3 3 16 -0.32768000000000000000e5
-44 1 1 8 0.16384000000000000000e5
-44 1 5 20 -0.16384000000000000000e5
-44 1 6 21 -0.65536000000000000000e5
-44 1 11 26 0.32768000000000000000e5
-44 2 1 15 0.16384000000000000000e5
-44 2 2 16 -0.32768000000000000000e5
-44 2 6 12 -0.16384000000000000000e5
-44 3 1 6 -0.16384000000000000000e5
-44 3 3 16 -0.32768000000000000000e5
-44 3 6 19 -0.32768000000000000000e5
-45 1 1 8 -0.16384000000000000000e5
-45 1 5 20 0.16384000000000000000e5
-45 1 6 21 0.65536000000000000000e5
-45 1 7 22 0.32768000000000000000e5
-45 1 8 23 0.65536000000000000000e5
-45 1 13 20 -0.13107200000000000000e6
-45 1 16 23 0.32768000000000000000e5
-45 1 16 31 0.32768000000000000000e5
-45 2 1 15 -0.16384000000000000000e5
-45 2 2 16 0.32768000000000000000e5
-45 2 6 12 0.16384000000000000000e5
-45 2 8 14 0.65536000000000000000e5
-45 3 1 6 0.16384000000000000000e5
-46 1 2 33 -0.16384000000000000000e5
-46 1 3 26 0.16384000000000000000e5
-46 1 3 34 0.32768000000000000000e5
-46 1 4 35 -0.16384000000000000000e5
-46 1 5 20 0.32768000000000000000e5
-46 1 5 28 0.16384000000000000000e5
-46 1 7 22 -0.65536000000000000000e5
-46 1 12 27 -0.65536000000000000000e5
-46 1 22 29 0.65536000000000000000e5
-46 2 3 17 0.16384000000000000000e5
-46 2 4 18 0.16384000000000000000e5
-46 2 6 20 0.32768000000000000000e5
-46 2 12 18 -0.32768000000000000000e5
-46 2 13 19 -0.32768000000000000000e5
-46 3 2 15 0.32768000000000000000e5
-46 3 3 16 0.13107200000000000000e6
-46 3 4 17 0.16384000000000000000e5
-46 3 5 18 -0.32768000000000000000e5
-46 3 6 11 0.32768000000000000000e5
-46 3 6 19 0.65536000000000000000e5
-46 3 9 14 -0.13107200000000000000e6
-46 3 13 18 -0.16384000000000000000e5
-46 4 4 8 0.32768000000000000000e5
-46 4 5 9 0.65536000000000000000e5
-46 4 8 8 -0.32768000000000000000e5
-47 1 1 8 0.32768000000000000000e5
-47 1 2 9 -0.32768000000000000000e5
-47 1 3 34 -0.32768000000000000000e5
-47 1 6 21 -0.65536000000000000000e5
-47 1 11 26 0.65536000000000000000e5
-47 2 1 15 0.32768000000000000000e5
-47 2 6 12 -0.32768000000000000000e5
-47 2 6 20 -0.32768000000000000000e5
-47 3 1 6 -0.32768000000000000000e5
-47 3 2 7 0.32768000000000000000e5
-47 3 2 15 0.65536000000000000000e5
-47 3 3 16 -0.65536000000000000000e5
-47 3 5 18 0.32768000000000000000e5
-47 3 6 11 0.32768000000000000000e5
-47 3 6 19 -0.65536000000000000000e5
-47 4 4 8 0.32768000000000000000e5
-48 1 1 8 0.32768000000000000000e5
-48 1 2 9 0.32768000000000000000e5
-48 1 3 34 0.32768000000000000000e5
-48 1 5 20 -0.32768000000000000000e5
-48 1 6 21 -0.65536000000000000000e5
-48 2 1 15 0.32768000000000000000e5
-48 2 6 12 -0.32768000000000000000e5
-48 3 1 6 -0.32768000000000000000e5
-48 3 2 7 -0.32768000000000000000e5
-48 3 2 15 -0.32768000000000000000e5
-49 1 1 8 -0.32768000000000000000e5
-49 2 1 15 -0.32768000000000000000e5
-49 3 1 6 0.32768000000000000000e5
-49 3 2 15 -0.32768000000000000000e5
-49 3 5 18 -0.32768000000000000000e5
-49 3 6 11 -0.32768000000000000000e5
-50 1 1 8 -0.32768000000000000000e5
-50 1 1 32 0.16384000000000000000e5
-50 1 2 33 0.16384000000000000000e5
-50 1 3 26 0.16384000000000000000e5
-50 1 5 20 0.65536000000000000000e5
-50 1 6 21 0.26214400000000000000e6
-50 1 7 22 0.65536000000000000000e5
-50 1 8 23 0.13107200000000000000e6
-50 1 13 20 -0.26214400000000000000e6
-50 2 1 15 -0.65536000000000000000e5
-50 2 2 8 0.65536000000000000000e5
-50 2 2 16 0.65536000000000000000e5
-50 2 6 12 0.65536000000000000000e5
-50 2 8 14 0.13107200000000000000e6
-50 2 11 17 0.16384000000000000000e5
-50 3 1 6 0.32768000000000000000e5
-50 3 1 14 -0.32768000000000000000e5
-50 3 11 12 -0.16384000000000000000e5
-50 4 4 4 -0.13107200000000000000e6
-51 1 1 8 0.65536000000000000000e5
-51 1 2 9 -0.65536000000000000000e5
-51 1 2 33 0.32768000000000000000e5
-51 1 3 26 0.32768000000000000000e5
-51 1 3 34 -0.13107200000000000000e6
-51 1 5 20 0.65536000000000000000e5
-51 1 6 21 -0.13107200000000000000e6
-51 1 11 26 0.13107200000000000000e6
-51 2 1 15 0.65536000000000000000e5
-51 2 3 17 0.32768000000000000000e5
-51 2 4 14 0.65536000000000000000e5
-51 2 4 20 -0.32768000000000000000e5
-51 2 6 12 -0.65536000000000000000e5
-51 2 6 20 -0.65536000000000000000e5
-51 3 1 6 -0.65536000000000000000e5
-51 3 2 7 0.65536000000000000000e5
-51 3 2 15 0.19660800000000000000e6
-51 3 3 16 -0.13107200000000000000e6
-51 3 5 18 0.65536000000000000000e5
-51 3 6 11 0.65536000000000000000e5
-51 3 6 19 -0.13107200000000000000e6
-51 4 4 8 0.65536000000000000000e5
-51 4 8 8 -0.65536000000000000000e5
-52 1 2 33 -0.32768000000000000000e5
-52 1 3 34 0.65536000000000000000e5
-52 1 5 20 -0.65536000000000000000e5
-52 2 12 18 -0.32768000000000000000e5
-52 3 4 17 0.32768000000000000000e5
-53 1 3 26 -0.32768000000000000000e5
-53 2 3 17 -0.32768000000000000000e5
-53 3 2 15 -0.65536000000000000000e5
-53 3 4 17 -0.32768000000000000000e5
-54 1 1 8 0.65536000000000000000e5
-54 1 2 9 0.65536000000000000000e5
-54 1 2 33 0.32768000000000000000e5
-54 1 3 26 0.32768000000000000000e5
-54 1 6 21 -0.13107200000000000000e6
-54 2 1 15 0.65536000000000000000e5
-54 3 1 6 -0.65536000000000000000e5
-54 3 2 7 -0.65536000000000000000e5
-55 1 1 8 -0.13107200000000000000e6
-55 1 2 9 -0.13107200000000000000e6
-55 1 2 33 -0.32768000000000000000e5
-55 1 3 26 0.32768000000000000000e5
-55 1 3 34 0.65536000000000000000e5
-55 1 4 35 -0.32768000000000000000e5
-55 1 6 21 0.13107200000000000000e6
-55 2 1 15 -0.65536000000000000000e5
-55 2 3 17 0.32768000000000000000e5
-55 2 11 17 -0.32768000000000000000e5
-55 2 12 18 -0.32768000000000000000e5
-55 3 1 6 0.13107200000000000000e6
-55 3 2 7 0.13107200000000000000e6
-55 3 2 15 0.65536000000000000000e5
-55 3 4 17 0.32768000000000000000e5
-55 3 6 11 -0.65536000000000000000e5
-55 3 11 12 -0.32768000000000000000e5
-55 3 13 18 -0.32768000000000000000e5
-55 4 7 7 -0.65536000000000000000e5
-56 1 1 32 0.32768000000000000000e5
-56 1 2 9 0.65536000000000000000e5
-56 1 2 33 0.32768000000000000000e5
-56 1 3 26 -0.32768000000000000000e5
-56 1 3 34 -0.65536000000000000000e5
-56 1 4 35 0.32768000000000000000e5
-56 1 5 20 0.13107200000000000000e6
-56 1 6 21 0.52428800000000000000e6
-56 1 7 22 0.13107200000000000000e6
-56 1 8 23 0.26214400000000000000e6
-56 1 13 20 -0.52428800000000000000e6
-56 2 1 15 -0.13107200000000000000e6
-56 2 2 8 0.13107200000000000000e6
-56 2 2 16 0.13107200000000000000e6
-56 2 3 17 -0.32768000000000000000e5
-56 2 5 11 0.65536000000000000000e5
-56 2 6 12 0.13107200000000000000e6
-56 2 8 14 0.26214400000000000000e6
-56 2 11 11 -0.65536000000000000000e5
-56 2 11 17 0.32768000000000000000e5
-56 2 12 18 0.32768000000000000000e5
-56 3 1 14 -0.65536000000000000000e5
-56 3 2 7 -0.65536000000000000000e5
-56 3 2 15 -0.65536000000000000000e5
-56 3 4 17 -0.32768000000000000000e5
-56 3 6 11 0.65536000000000000000e5
-56 3 13 18 0.32768000000000000000e5
-56 4 4 4 -0.26214400000000000000e6
-56 4 7 7 0.65536000000000000000e5
-57 1 1 8 -0.10240000000000000000e4
-57 1 4 15 -0.81920000000000000000e4
-57 1 5 20 0.10240000000000000000e4
-57 1 6 21 0.40960000000000000000e4
-57 1 7 14 -0.81920000000000000000e4
-57 1 7 22 0.20480000000000000000e4
-57 1 9 24 -0.40960000000000000000e4
-57 1 10 13 -0.16384000000000000000e5
-57 1 12 15 -0.32768000000000000000e5
-57 1 13 14 -0.32768000000000000000e5
-57 1 14 21 0.16384000000000000000e5
-57 1 15 22 0.16384000000000000000e5
-57 1 25 25 0.65536000000000000000e5
-57 2 1 15 -0.10240000000000000000e4
-57 2 2 16 0.20480000000000000000e4
-57 2 6 12 0.10240000000000000000e4
-57 2 8 10 -0.16384000000000000000e5
-57 2 9 15 -0.40960000000000000000e4
-57 2 10 10 -0.65536000000000000000e5
-57 2 10 12 0.40960000000000000000e4
-57 2 10 16 0.16384000000000000000e5
-57 3 1 6 0.10240000000000000000e4
-57 3 5 10 -0.81920000000000000000e4
-57 3 9 10 -0.16384000000000000000e5
-57 4 6 6 -0.16384000000000000000e5
-58 1 8 15 0.32768000000000000000e5
-58 1 13 14 -0.65536000000000000000e5
-58 1 15 30 0.32768000000000000000e5
-58 3 9 10 -0.32768000000000000000e5
-59 1 1 8 -0.20480000000000000000e4
-59 1 4 15 -0.16384000000000000000e5
-59 1 5 20 0.20480000000000000000e4
-59 1 6 21 0.81920000000000000000e4
-59 1 7 14 -0.16384000000000000000e5
-59 1 7 22 0.81920000000000000000e4
-59 1 8 15 -0.32768000000000000000e5
-59 1 8 23 0.81920000000000000000e4
-59 1 9 24 -0.81920000000000000000e4
-59 1 10 13 -0.32768000000000000000e5
-59 1 11 26 0.40960000000000000000e4
-59 1 13 28 0.81920000000000000000e4
-59 1 14 21 0.32768000000000000000e5
-59 1 14 29 0.16384000000000000000e5
-59 1 16 23 0.40960000000000000000e4
-59 1 22 25 0.16384000000000000000e5
-59 2 1 15 -0.20480000000000000000e4
-59 2 2 16 0.40960000000000000000e4
-59 2 5 19 0.40960000000000000000e4
-59 2 6 12 0.20480000000000000000e4
-59 2 8 10 -0.32768000000000000000e5
-59 2 9 15 -0.81920000000000000000e4
-59 2 10 12 0.81920000000000000000e4
-59 2 14 16 0.81920000000000000000e4
-59 2 16 16 0.32768000000000000000e5
-59 3 1 6 0.20480000000000000000e4
-59 3 3 16 -0.40960000000000000000e4
-59 3 5 10 -0.16384000000000000000e5
-59 3 9 14 -0.81920000000000000000e4
-59 4 6 6 -0.32768000000000000000e5
-60 1 8 15 -0.65536000000000000000e5
-60 1 14 21 0.32768000000000000000e5
-60 1 22 25 0.32768000000000000000e5
-61 1 1 8 -0.81920000000000000000e4
-61 1 4 15 -0.32768000000000000000e5
-61 1 5 20 0.81920000000000000000e4
-61 1 6 21 0.32768000000000000000e5
-61 1 7 14 -0.32768000000000000000e5
-61 1 7 22 0.16384000000000000000e5
-61 1 9 24 -0.32768000000000000000e5
-61 1 10 25 -0.65536000000000000000e5
-61 1 14 21 0.98304000000000000000e5
-61 1 14 29 0.32768000000000000000e5
-61 2 1 15 -0.81920000000000000000e4
-61 2 2 16 0.16384000000000000000e5
-61 2 6 12 0.81920000000000000000e4
-61 2 9 15 -0.32768000000000000000e5
-61 2 10 12 0.32768000000000000000e5
-61 3 1 6 0.81920000000000000000e4
-61 3 5 10 -0.32768000000000000000e5
-61 4 6 6 -0.65536000000000000000e5
-62 1 7 22 0.81920000000000000000e4
-62 1 8 23 0.16384000000000000000e5
-62 1 10 13 -0.65536000000000000000e5
-62 1 11 26 0.81920000000000000000e4
-62 1 13 20 0.32768000000000000000e5
-62 1 13 28 0.16384000000000000000e5
-62 1 16 23 0.81920000000000000000e4
-62 2 5 19 0.81920000000000000000e4
-62 2 14 16 0.16384000000000000000e5
-62 3 3 16 -0.81920000000000000000e4
-62 3 9 14 -0.16384000000000000000e5
-63 1 4 15 -0.65536000000000000000e5
-63 1 8 23 -0.65536000000000000000e5
-63 1 9 24 -0.32768000000000000000e5
-63 1 13 28 -0.32768000000000000000e5
-63 1 14 21 0.65536000000000000000e5
-63 1 14 29 0.65536000000000000000e5
-63 2 9 15 -0.32768000000000000000e5
-63 2 9 19 -0.32768000000000000000e5
-63 3 9 14 0.32768000000000000000e5
-64 1 7 14 -0.65536000000000000000e5
-64 1 8 23 0.32768000000000000000e5
-64 1 13 28 0.32768000000000000000e5
-65 1 1 8 -0.81920000000000000000e4
-65 1 5 20 0.81920000000000000000e4
-65 1 6 21 0.32768000000000000000e5
-65 1 7 22 0.16384000000000000000e5
-65 1 8 23 0.32768000000000000000e5
-65 1 13 20 -0.65536000000000000000e5
-65 2 1 15 -0.81920000000000000000e4
-65 2 2 16 0.16384000000000000000e5
-65 2 6 12 0.81920000000000000000e4
-65 3 1 6 0.81920000000000000000e4
-65 3 5 10 -0.65536000000000000000e5
-65 3 9 14 -0.32768000000000000000e5
-66 1 1 8 0.81920000000000000000e4
-66 1 5 20 -0.81920000000000000000e4
-66 1 6 13 -0.65536000000000000000e5
-66 1 6 21 -0.32768000000000000000e5
-66 1 8 23 -0.32768000000000000000e5
-66 1 11 26 0.16384000000000000000e5
-66 1 13 20 0.65536000000000000000e5
-66 1 16 23 0.16384000000000000000e5
-66 2 1 15 0.81920000000000000000e4
-66 2 2 16 -0.16384000000000000000e5
-66 2 5 19 0.16384000000000000000e5
-66 2 6 12 -0.81920000000000000000e4
-66 2 8 14 -0.32768000000000000000e5
-66 3 1 6 -0.81920000000000000000e4
-66 3 3 16 -0.16384000000000000000e5
-67 1 1 8 0.16384000000000000000e5
-67 1 4 11 0.32768000000000000000e5
-67 1 4 15 -0.13107200000000000000e6
-67 1 5 20 -0.16384000000000000000e5
-67 1 6 21 -0.32768000000000000000e5
-67 1 7 22 -0.32768000000000000000e5
-67 1 9 12 0.65536000000000000000e5
-67 1 11 26 0.65536000000000000000e5
-67 1 12 27 0.32768000000000000000e5
-67 1 13 28 0.65536000000000000000e5
-67 2 1 15 0.16384000000000000000e5
-67 2 3 9 0.32768000000000000000e5
-67 2 4 10 0.65536000000000000000e5
-67 2 6 12 -0.16384000000000000000e5
-67 2 15 15 -0.65536000000000000000e5
-67 3 1 6 -0.16384000000000000000e5
-67 3 3 8 0.32768000000000000000e5
-67 3 3 16 -0.32768000000000000000e5
-67 3 4 9 0.32768000000000000000e5
-67 3 9 14 0.13107200000000000000e6
-67 4 5 9 -0.65536000000000000000e5
-68 1 4 11 -0.32768000000000000000e5
-68 1 7 22 0.32768000000000000000e5
-68 1 11 26 -0.32768000000000000000e5
-68 2 3 9 -0.32768000000000000000e5
-68 3 3 8 -0.32768000000000000000e5
-68 3 3 16 0.32768000000000000000e5
-68 3 4 9 -0.32768000000000000000e5
-68 3 9 14 -0.65536000000000000000e5
-68 4 5 9 0.32768000000000000000e5
-69 1 3 10 -0.32768000000000000000e5
-69 1 4 11 -0.32768000000000000000e5
-69 1 7 22 0.32768000000000000000e5
-69 2 2 16 -0.32768000000000000000e5
-69 3 3 8 -0.32768000000000000000e5
-69 3 3 16 -0.32768000000000000000e5
-69 4 2 6 -0.32768000000000000000e5
-70 1 1 8 -0.16384000000000000000e5
-70 1 3 10 0.32768000000000000000e5
-70 1 4 11 0.65536000000000000000e5
-70 1 5 20 0.16384000000000000000e5
-70 1 6 21 0.65536000000000000000e5
-70 1 11 26 0.65536000000000000000e5
-70 1 12 27 0.32768000000000000000e5
-70 1 13 20 -0.13107200000000000000e6
-70 2 1 15 -0.16384000000000000000e5
-70 2 2 16 0.32768000000000000000e5
-70 2 3 9 0.32768000000000000000e5
-70 2 6 8 0.65536000000000000000e5
-70 2 6 12 0.16384000000000000000e5
-70 3 1 6 0.16384000000000000000e5
-70 3 3 8 0.65536000000000000000e5
-70 3 3 16 -0.32768000000000000000e5
-70 3 4 9 0.32768000000000000000e5
-70 3 5 10 -0.13107200000000000000e6
-70 3 9 14 0.65536000000000000000e5
-70 4 2 6 0.32768000000000000000e5
-70 4 5 9 -0.32768000000000000000e5
-71 1 1 10 -0.32768000000000000000e5
-71 1 3 10 0.32768000000000000000e5
-71 1 4 11 0.65536000000000000000e5
-71 1 6 21 -0.65536000000000000000e5
-71 1 7 22 -0.32768000000000000000e5
-71 1 8 23 -0.65536000000000000000e5
-71 1 11 26 0.32768000000000000000e5
-71 1 12 27 0.32768000000000000000e5
-71 1 16 23 0.32768000000000000000e5
-71 2 3 9 0.32768000000000000000e5
-71 2 5 5 -0.65536000000000000000e5
-71 2 6 8 0.65536000000000000000e5
-71 2 8 14 -0.65536000000000000000e5
-71 3 3 8 0.98304000000000000000e5
-71 3 3 16 -0.32768000000000000000e5
-71 3 4 9 0.32768000000000000000e5
-71 3 5 10 -0.13107200000000000000e6
-71 3 9 14 0.65536000000000000000e5
-71 4 2 6 0.32768000000000000000e5
-71 4 4 4 0.65536000000000000000e5
-71 4 5 9 -0.32768000000000000000e5
-72 1 1 8 -0.32768000000000000000e5
-72 1 2 9 -0.32768000000000000000e5
-72 1 6 21 0.65536000000000000000e5
-72 1 7 22 0.65536000000000000000e5
-72 1 11 26 -0.65536000000000000000e5
-72 1 12 27 -0.65536000000000000000e5
-72 1 19 22 0.32768000000000000000e5
-72 2 1 15 -0.32768000000000000000e5
-72 2 4 14 -0.32768000000000000000e5
-72 2 6 12 0.32768000000000000000e5
-72 3 1 6 0.32768000000000000000e5
-72 3 2 7 0.32768000000000000000e5
-72 3 3 16 0.65536000000000000000e5
-72 3 4 9 -0.65536000000000000000e5
-72 3 9 14 -0.13107200000000000000e6
-72 4 5 9 0.65536000000000000000e5
-73 1 1 8 0.32768000000000000000e5
-73 1 2 9 -0.32768000000000000000e5
-73 1 2 33 -0.16384000000000000000e5
-73 1 3 26 0.16384000000000000000e5
-73 1 3 34 0.32768000000000000000e5
-73 1 4 11 -0.65536000000000000000e5
-73 1 4 35 -0.16384000000000000000e5
-73 1 5 20 0.32768000000000000000e5
-73 1 5 28 0.16384000000000000000e5
-73 1 6 21 -0.65536000000000000000e5
-73 1 11 26 0.65536000000000000000e5
-73 2 1 15 0.32768000000000000000e5
-73 2 3 17 0.16384000000000000000e5
-73 2 4 18 0.16384000000000000000e5
-73 2 6 12 -0.32768000000000000000e5
-73 2 12 18 -0.32768000000000000000e5
-73 3 1 6 -0.32768000000000000000e5
-73 3 2 7 0.32768000000000000000e5
-73 3 2 15 0.65536000000000000000e5
-73 3 4 17 0.16384000000000000000e5
-73 3 6 11 0.32768000000000000000e5
-73 3 13 18 -0.16384000000000000000e5
-73 4 4 8 0.32768000000000000000e5
-73 4 8 8 -0.32768000000000000000e5
-74 1 1 8 0.65536000000000000000e5
-74 1 2 9 0.32768000000000000000e5
-74 1 5 20 -0.32768000000000000000e5
-74 1 6 21 -0.13107200000000000000e6
-74 1 11 26 0.65536000000000000000e5
-74 2 1 15 0.65536000000000000000e5
-74 2 6 12 -0.65536000000000000000e5
-74 3 1 6 -0.65536000000000000000e5
-74 3 2 7 -0.32768000000000000000e5
-74 3 2 15 0.32768000000000000000e5
-74 3 3 8 -0.65536000000000000000e5
-74 3 6 11 0.32768000000000000000e5
-74 4 4 8 0.32768000000000000000e5
-75 1 1 8 -0.32768000000000000000e5
-75 1 3 10 -0.65536000000000000000e5
-75 1 6 21 0.65536000000000000000e5
-75 2 1 15 -0.32768000000000000000e5
-75 3 1 6 0.32768000000000000000e5
-75 3 2 15 -0.32768000000000000000e5
-76 1 1 8 -0.65536000000000000000e5
-76 1 2 9 -0.32768000000000000000e5
-76 1 3 10 0.13107200000000000000e6
-76 1 4 11 0.13107200000000000000e6
-76 1 5 20 0.65536000000000000000e5
-76 1 6 21 0.19660800000000000000e6
-76 1 11 26 0.65536000000000000000e5
-76 1 12 27 0.65536000000000000000e5
-76 1 13 20 -0.26214400000000000000e6
-76 2 1 15 -0.98304000000000000000e5
-76 2 2 8 0.65536000000000000000e5
-76 2 2 16 0.65536000000000000000e5
-76 2 3 9 0.65536000000000000000e5
-76 2 6 8 0.13107200000000000000e6
-76 2 6 12 0.65536000000000000000e5
-76 3 1 6 0.65536000000000000000e5
-76 3 2 7 0.32768000000000000000e5
-76 3 3 8 0.19660800000000000000e6
-76 3 3 16 -0.65536000000000000000e5
-76 3 4 9 0.65536000000000000000e5
-76 3 5 10 -0.26214400000000000000e6
-76 3 6 11 -0.32768000000000000000e5
-76 3 9 14 0.13107200000000000000e6
-76 4 2 6 0.65536000000000000000e5
-76 4 5 9 -0.65536000000000000000e5
-77 1 1 8 0.98304000000000000000e5
-77 1 1 10 -0.65536000000000000000e5
-77 1 2 9 0.32768000000000000000e5
-77 1 5 20 -0.65536000000000000000e5
-77 1 6 21 -0.32768000000000000000e6
-77 1 7 22 -0.65536000000000000000e5
-77 1 8 23 -0.13107200000000000000e6
-77 1 13 20 0.26214400000000000000e6
-77 2 1 15 0.98304000000000000000e5
-77 2 2 8 -0.65536000000000000000e5
-77 2 2 16 -0.65536000000000000000e5
-77 2 5 11 -0.32768000000000000000e5
-77 2 6 12 -0.65536000000000000000e5
-77 2 8 14 -0.13107200000000000000e6
-77 3 1 6 -0.98304000000000000000e5
-77 3 1 14 -0.32768000000000000000e5
-77 3 2 7 -0.32768000000000000000e5
-77 4 4 4 0.13107200000000000000e6
-78 1 4 19 0.32768000000000000000e5
-78 1 5 8 -0.65536000000000000000e5
-78 1 5 28 0.32768000000000000000e5
-79 1 1 8 0.13107200000000000000e6
-79 1 2 9 0.13107200000000000000e6
-79 1 2 17 0.32768000000000000000e5
-79 1 3 26 0.32768000000000000000e5
-79 1 4 11 -0.13107200000000000000e6
-79 1 5 8 0.65536000000000000000e5
-79 1 6 21 -0.26214400000000000000e6
-79 1 11 26 0.13107200000000000000e6
-79 2 1 15 0.13107200000000000000e6
-79 2 2 12 0.32768000000000000000e5
-79 2 4 6 0.65536000000000000000e5
-79 2 6 12 -0.65536000000000000000e5
-79 2 12 18 -0.32768000000000000000e5
-79 3 1 6 -0.13107200000000000000e6
-79 3 2 7 -0.65536000000000000000e5
-79 3 2 15 0.13107200000000000000e6
-79 3 6 11 0.65536000000000000000e5
-79 4 3 7 -0.32768000000000000000e5
-79 4 4 8 0.65536000000000000000e5
-79 4 8 8 -0.65536000000000000000e5
-80 1 2 9 -0.65536000000000000000e5
-80 1 2 33 -0.32768000000000000000e5
-80 1 3 18 0.32768000000000000000e5
-80 1 3 34 0.65536000000000000000e5
-80 1 4 35 -0.32768000000000000000e5
-80 2 12 18 -0.32768000000000000000e5
-80 3 4 17 0.32768000000000000000e5
-80 3 13 18 -0.32768000000000000000e5
-81 1 2 9 0.65536000000000000000e5
-81 1 2 17 -0.32768000000000000000e5
-81 1 2 33 0.32768000000000000000e5
-81 1 3 10 -0.13107200000000000000e6
-81 1 3 18 -0.32768000000000000000e5
-81 1 3 26 -0.32768000000000000000e5
-81 1 3 34 -0.65536000000000000000e5
-81 1 4 35 0.32768000000000000000e5
-81 1 6 21 0.13107200000000000000e6
-81 2 1 7 0.65536000000000000000e5
-81 2 1 15 -0.65536000000000000000e5
-81 2 2 12 -0.32768000000000000000e5
-81 2 3 17 -0.32768000000000000000e5
-81 2 12 18 0.32768000000000000000e5
-81 3 1 6 0.65536000000000000000e5
-81 3 2 15 -0.65536000000000000000e5
-81 3 4 17 -0.32768000000000000000e5
-81 3 13 18 0.32768000000000000000e5
-82 1 1 8 -0.65536000000000000000e5
-82 1 2 17 0.32768000000000000000e5
-82 1 3 26 0.32768000000000000000e5
-83 1 1 2 -0.32768000000000000000e5
-83 1 1 8 -0.65536000000000000000e5
-83 1 1 16 0.32768000000000000000e5
-83 1 2 5 0.65536000000000000000e5
-83 1 2 9 -0.13107200000000000000e6
-83 1 2 33 -0.32768000000000000000e5
-83 1 3 10 -0.26214400000000000000e6
-83 1 3 18 -0.32768000000000000000e5
-83 1 3 34 0.65536000000000000000e5
-83 1 4 35 -0.32768000000000000000e5
-83 1 5 20 0.13107200000000000000e6
-83 1 6 21 0.91750400000000000000e6
-83 1 7 22 0.13107200000000000000e6
-83 1 8 23 0.26214400000000000000e6
-83 1 13 20 -0.52428800000000000000e6
-83 2 1 3 -0.32768000000000000000e5
-83 2 1 7 0.13107200000000000000e6
-83 2 1 15 -0.32768000000000000000e6
-83 2 2 8 0.13107200000000000000e6
-83 2 2 12 0.32768000000000000000e5
-83 2 2 16 0.13107200000000000000e6
-83 2 3 17 0.32768000000000000000e5
-83 2 5 11 0.65536000000000000000e5
-83 2 6 12 0.13107200000000000000e6
-83 2 8 14 0.26214400000000000000e6
-83 2 11 17 -0.32768000000000000000e5
-83 2 12 18 -0.32768000000000000000e5
-83 3 1 2 -0.65536000000000000000e5
-83 3 1 6 0.26214400000000000000e6
-83 3 2 3 0.32768000000000000000e5
-83 3 2 7 0.26214400000000000000e6
-83 3 2 15 0.65536000000000000000e5
-83 3 4 17 0.32768000000000000000e5
-83 3 6 11 -0.65536000000000000000e5
-83 3 13 18 -0.32768000000000000000e5
-83 4 1 1 -0.65536000000000000000e5
-83 4 2 2 0.13107200000000000000e6
-83 4 4 4 -0.26214400000000000000e6
-83 4 7 7 -0.65536000000000000000e5
-84 1 1 6 -0.65536000000000000000e5
-84 1 1 8 0.13107200000000000000e6
-84 1 1 16 0.32768000000000000000e5
-84 1 2 9 0.13107200000000000000e6
-84 1 2 33 0.32768000000000000000e5
-84 1 3 26 -0.32768000000000000000e5
-84 1 3 34 -0.65536000000000000000e5
-84 1 4 35 0.32768000000000000000e5
-84 1 6 21 -0.13107200000000000000e6
-84 2 1 15 0.65536000000000000000e5
-84 2 3 17 -0.32768000000000000000e5
-84 2 11 11 -0.65536000000000000000e5
-84 2 11 17 0.32768000000000000000e5
-84 2 12 18 0.32768000000000000000e5
-84 3 1 6 -0.13107200000000000000e6
-84 3 1 14 -0.65536000000000000000e5
-84 3 2 7 -0.13107200000000000000e6
-84 3 2 15 -0.65536000000000000000e5
-84 3 4 17 -0.32768000000000000000e5
-84 3 6 11 0.65536000000000000000e5
-84 3 13 18 0.32768000000000000000e5
-84 4 7 7 0.65536000000000000000e5
-85 1 1 1 0.65536000000000000000e5
-85 1 1 2 0.32768000000000000000e5
-85 1 1 6 -0.65536000000000000000e5
-85 1 1 8 0.13107200000000000000e6
-85 1 2 5 0.32768000000000000000e5
-85 1 2 9 0.65536000000000000000e5
-85 1 3 10 -0.13107200000000000000e6
-85 2 1 1 0.65536000000000000000e5
-85 2 1 3 -0.32768000000000000000e5
-85 2 1 7 0.65536000000000000000e5
-85 2 2 12 0.32768000000000000000e5
-85 4 2 2 0.65536000000000000000e5
-86 1 1 3 0.65536000000000000000e5
-86 1 1 8 -0.26214400000000000000e6
-86 1 2 5 -0.65536000000000000000e5
-86 1 2 9 -0.13107200000000000000e6
-86 1 3 10 0.26214400000000000000e6
-86 2 1 3 0.65536000000000000000e5
-86 2 1 7 -0.13107200000000000000e6
-86 2 2 12 -0.65536000000000000000e5
-86 4 2 2 -0.13107200000000000000e6
-87 1 1 4 0.65536000000000000000e5
-87 1 2 5 0.65536000000000000000e5
-87 1 2 17 -0.65536000000000000000e5
-87 1 3 10 -0.26214400000000000000e6
-87 1 3 18 -0.65536000000000000000e5
-87 1 6 21 0.26214400000000000000e6
-87 2 1 7 0.13107200000000000000e6
-87 2 1 15 -0.13107200000000000000e6
-87 3 1 6 0.13107200000000000000e6
-87 3 2 3 0.65536000000000000000e5
-87 3 2 7 0.13107200000000000000e6
-87 4 2 2 0.13107200000000000000e6
-88 1 1 5 0.65536000000000000000e5
-88 1 1 8 0.13107200000000000000e6
-88 1 2 9 0.13107200000000000000e6
-88 1 2 17 0.65536000000000000000e5
-88 1 3 18 0.65536000000000000000e5
-88 1 6 21 -0.26214400000000000000e6
-88 2 1 15 0.13107200000000000000e6
-88 2 2 12 0.65536000000000000000e5
-88 3 1 6 -0.13107200000000000000e6
-88 3 2 3 -0.65536000000000000000e5
-88 3 2 7 -0.13107200000000000000e6
-89 1 1 2 -0.32768000000000000000e5
-89 1 1 7 0.65536000000000000000e5
-89 1 1 8 -0.13107200000000000000e6
-89 1 1 16 0.32768000000000000000e5
-89 1 2 5 0.32768000000000000000e5
-89 1 2 9 -0.65536000000000000000e5
-89 1 3 10 -0.13107200000000000000e6
-89 1 3 18 -0.32768000000000000000e5
-89 1 5 20 0.13107200000000000000e6
-89 1 6 21 0.78643200000000000000e6
-89 1 7 22 0.13107200000000000000e6
-89 1 8 23 0.26214400000000000000e6
-89 1 13 20 -0.52428800000000000000e6
-89 2 1 7 0.65536000000000000000e5
-89 2 1 15 -0.26214400000000000000e6
-89 2 2 8 0.13107200000000000000e6
-89 2 2 16 0.13107200000000000000e6
-89 2 5 11 0.65536000000000000000e5
-89 2 6 12 0.13107200000000000000e6
-89 2 8 14 0.26214400000000000000e6
-89 3 1 2 -0.32768000000000000000e5
-89 3 1 6 0.19660800000000000000e6
-89 3 2 3 0.32768000000000000000e5
-89 3 2 7 0.13107200000000000000e6
-89 4 1 1 -0.65536000000000000000e5
-89 4 2 2 0.65536000000000000000e5
-89 4 4 4 -0.26214400000000000000e6
-90 1 1 8 0.65536000000000000000e5
-90 1 1 9 0.65536000000000000000e5
-90 1 2 9 0.65536000000000000000e5
-90 1 3 10 -0.13107200000000000000e6
-90 2 1 7 0.65536000000000000000e5
-91 1 1 8 -0.65536000000000000000e5
-91 1 1 11 0.65536000000000000000e5
-91 1 3 10 0.13107200000000000000e6
-91 1 4 11 0.13107200000000000000e6
-91 1 5 20 0.65536000000000000000e5
-91 1 6 21 0.13107200000000000000e6
-91 1 11 26 0.65536000000000000000e5
-91 1 12 27 0.65536000000000000000e5
-91 1 13 20 -0.26214400000000000000e6
-91 2 1 15 -0.65536000000000000000e5
-91 2 2 8 0.65536000000000000000e5
-91 2 2 16 0.65536000000000000000e5
-91 2 3 9 0.65536000000000000000e5
-91 2 6 8 0.13107200000000000000e6
-91 2 6 12 0.65536000000000000000e5
-91 3 1 6 0.65536000000000000000e5
-91 3 3 8 0.19660800000000000000e6
-91 3 3 16 -0.65536000000000000000e5
-91 3 4 9 0.65536000000000000000e5
-91 3 5 10 -0.26214400000000000000e6
-91 3 9 14 0.13107200000000000000e6
-91 4 2 6 0.65536000000000000000e5
-91 4 5 9 -0.65536000000000000000e5
-92 1 1 12 0.65536000000000000000e5
-92 1 3 10 -0.65536000000000000000e5
-93 1 1 8 -0.32768000000000000000e5
-93 1 1 10 -0.32768000000000000000e5
-93 1 1 13 0.65536000000000000000e5
-93 1 3 10 0.32768000000000000000e5
-93 1 4 11 0.65536000000000000000e5
-93 1 5 20 0.32768000000000000000e5
-93 1 6 21 0.65536000000000000000e5
-93 1 11 26 0.32768000000000000000e5
-93 1 12 27 0.32768000000000000000e5
-93 1 13 20 -0.13107200000000000000e6
-93 2 1 15 -0.32768000000000000000e5
-93 2 2 8 0.32768000000000000000e5
-93 2 2 16 0.32768000000000000000e5
-93 2 3 9 0.32768000000000000000e5
-93 2 5 5 -0.65536000000000000000e5
-93 2 6 8 0.65536000000000000000e5
-93 2 6 12 0.32768000000000000000e5
-93 3 1 6 0.32768000000000000000e5
-93 3 3 8 0.98304000000000000000e5
-93 3 3 16 -0.32768000000000000000e5
-93 3 4 9 0.32768000000000000000e5
-93 3 5 10 -0.13107200000000000000e6
-93 3 9 14 0.65536000000000000000e5
-93 4 2 6 0.32768000000000000000e5
-93 4 5 9 -0.32768000000000000000e5
-94 1 1 8 -0.16384000000000000000e5
-94 1 1 14 0.65536000000000000000e5
-94 1 3 10 0.32768000000000000000e5
-94 1 4 11 0.65536000000000000000e5
-94 1 5 20 0.16384000000000000000e5
-94 1 6 21 0.32768000000000000000e5
-94 1 11 26 0.32768000000000000000e5
-94 1 12 27 0.32768000000000000000e5
-94 1 13 20 -0.13107200000000000000e6
-94 2 1 15 -0.16384000000000000000e5
-94 2 2 16 0.32768000000000000000e5
-94 2 3 9 0.32768000000000000000e5
-94 2 6 8 0.65536000000000000000e5
-94 2 6 12 0.16384000000000000000e5
-94 3 1 6 0.16384000000000000000e5
-94 3 3 8 0.65536000000000000000e5
-94 3 3 16 -0.32768000000000000000e5
-94 3 4 9 0.32768000000000000000e5
-94 3 5 10 -0.13107200000000000000e6
-94 3 9 14 0.65536000000000000000e5
-94 4 2 6 0.32768000000000000000e5
-94 4 5 9 -0.32768000000000000000e5
-95 1 1 15 0.65536000000000000000e5
-95 1 6 13 -0.65536000000000000000e5
-96 1 1 8 -0.26214400000000000000e6
-96 1 1 17 0.65536000000000000000e5
-96 1 2 5 -0.65536000000000000000e5
-96 1 2 9 -0.13107200000000000000e6
-96 1 3 10 0.26214400000000000000e6
-96 2 1 3 0.65536000000000000000e5
-96 2 1 7 -0.13107200000000000000e6
-96 2 2 12 -0.65536000000000000000e5
-96 3 1 2 0.65536000000000000000e5
-96 4 2 2 -0.13107200000000000000e6
-97 1 1 18 0.65536000000000000000e5
-97 1 2 17 -0.65536000000000000000e5
-98 1 1 8 0.13107200000000000000e6
-98 1 1 19 0.65536000000000000000e5
-98 1 2 9 0.13107200000000000000e6
-98 1 2 17 0.65536000000000000000e5
-98 1 3 18 0.65536000000000000000e5
-98 1 6 21 -0.26214400000000000000e6
-98 2 1 15 0.13107200000000000000e6
-98 2 2 12 0.65536000000000000000e5
-98 3 1 6 -0.13107200000000000000e6
-98 3 2 7 -0.13107200000000000000e6
-99 1 1 8 -0.13107200000000000000e6
-99 1 1 20 0.65536000000000000000e5
-99 1 2 9 -0.65536000000000000000e5
-99 1 5 20 0.13107200000000000000e6
-99 1 6 21 0.65536000000000000000e6
-99 1 7 22 0.13107200000000000000e6
-99 1 8 23 0.26214400000000000000e6
-99 1 13 20 -0.52428800000000000000e6
-99 2 1 15 -0.19660800000000000000e6
-99 2 2 8 0.13107200000000000000e6
-99 2 2 16 0.13107200000000000000e6
-99 2 5 11 0.65536000000000000000e5
-99 2 6 12 0.13107200000000000000e6
-99 2 8 14 0.26214400000000000000e6
-99 3 1 6 0.13107200000000000000e6
-99 3 2 7 0.65536000000000000000e5
-99 4 4 4 -0.26214400000000000000e6
-100 1 1 8 -0.65536000000000000000e5
-100 1 1 21 0.65536000000000000000e5
-100 3 1 6 0.65536000000000000000e5
-101 1 1 8 0.65536000000000000000e5
-101 1 1 22 0.65536000000000000000e5
-101 1 2 9 0.65536000000000000000e5
-101 1 6 21 -0.13107200000000000000e6
-101 2 1 15 0.65536000000000000000e5
-101 3 1 6 -0.65536000000000000000e5
-101 3 2 7 -0.65536000000000000000e5
-102 1 1 8 -0.65536000000000000000e5
-102 1 1 23 0.65536000000000000000e5
-102 1 5 20 0.65536000000000000000e5
-102 1 6 21 0.26214400000000000000e6
-102 1 7 22 0.65536000000000000000e5
-102 1 8 23 0.13107200000000000000e6
-102 1 13 20 -0.26214400000000000000e6
-102 2 1 15 -0.65536000000000000000e5
-102 2 2 8 0.65536000000000000000e5
-102 2 2 16 0.65536000000000000000e5
-102 2 6 12 0.65536000000000000000e5
-102 2 8 14 0.13107200000000000000e6
-102 3 1 6 0.65536000000000000000e5
-102 4 4 4 -0.13107200000000000000e6
-103 1 1 24 0.65536000000000000000e5
-103 1 6 21 -0.65536000000000000000e5
-104 1 1 8 -0.16384000000000000000e5
-104 1 1 25 0.65536000000000000000e5
-104 1 5 20 0.16384000000000000000e5
-104 1 6 21 0.65536000000000000000e5
-104 1 7 22 0.32768000000000000000e5
-104 1 8 23 0.65536000000000000000e5
-104 1 13 20 -0.13107200000000000000e6
-104 2 1 15 -0.16384000000000000000e5
-104 2 2 16 0.32768000000000000000e5
-104 2 6 12 0.16384000000000000000e5
-104 2 8 14 0.65536000000000000000e5
-104 3 1 6 0.16384000000000000000e5
-105 1 1 8 -0.26214400000000000000e6
-105 1 1 26 0.65536000000000000000e5
-105 1 2 9 -0.26214400000000000000e6
-105 1 2 33 -0.65536000000000000000e5
-105 1 3 26 0.65536000000000000000e5
-105 1 3 34 0.13107200000000000000e6
-105 1 4 35 -0.65536000000000000000e5
-105 1 6 21 0.26214400000000000000e6
-105 2 1 15 -0.13107200000000000000e6
-105 2 3 17 0.65536000000000000000e5
-105 2 11 11 0.13107200000000000000e6
-105 2 11 17 -0.65536000000000000000e5
-105 2 12 18 -0.65536000000000000000e5
-105 3 1 6 0.26214400000000000000e6
-105 3 1 14 0.13107200000000000000e6
-105 3 2 7 0.26214400000000000000e6
-105 3 2 15 0.13107200000000000000e6
-105 3 4 17 0.65536000000000000000e5
-105 3 6 11 -0.13107200000000000000e6
-105 3 13 18 -0.65536000000000000000e5
-105 4 7 7 -0.13107200000000000000e6
-106 1 1 8 0.13107200000000000000e6
-106 1 1 27 0.65536000000000000000e5
-106 1 2 9 0.26214400000000000000e6
-106 1 2 33 0.65536000000000000000e5
-106 1 3 34 -0.13107200000000000000e6
-106 1 4 35 0.65536000000000000000e5
-106 1 6 21 -0.26214400000000000000e6
-106 2 1 15 0.13107200000000000000e6
-106 2 3 17 -0.65536000000000000000e5
-106 2 11 17 0.65536000000000000000e5
-106 2 12 18 0.65536000000000000000e5
-106 3 1 6 -0.13107200000000000000e6
-106 3 2 7 -0.26214400000000000000e6
-106 3 2 15 -0.13107200000000000000e6
-106 3 4 17 -0.65536000000000000000e5
-106 3 6 11 0.13107200000000000000e6
-106 3 13 18 0.65536000000000000000e5
-106 4 7 7 0.13107200000000000000e6
-107 1 1 28 0.65536000000000000000e5
-107 1 3 26 -0.65536000000000000000e5
-108 1 1 8 -0.65536000000000000000e5
-108 1 1 29 0.65536000000000000000e5
-108 3 1 6 0.65536000000000000000e5
-108 3 1 14 0.65536000000000000000e5
-109 1 1 8 0.65536000000000000000e5
-109 1 1 30 0.65536000000000000000e5
-109 1 2 9 0.65536000000000000000e5
-109 1 6 21 -0.13107200000000000000e6
-109 2 1 15 0.65536000000000000000e5
-109 3 1 6 -0.65536000000000000000e5
-109 3 2 7 -0.65536000000000000000e5
-109 3 6 11 0.65536000000000000000e5
-110 1 1 31 0.65536000000000000000e5
-110 1 16 23 -0.65536000000000000000e5
-111 1 1 33 0.65536000000000000000e5
-111 1 3 26 -0.65536000000000000000e5
-111 3 11 12 0.65536000000000000000e5
-112 1 1 32 -0.32768000000000000000e5
-112 1 1 34 0.65536000000000000000e5
-112 1 2 33 -0.32768000000000000000e5
-112 1 3 26 -0.32768000000000000000e5
-112 2 11 17 -0.32768000000000000000e5
-112 3 11 12 0.32768000000000000000e5
-113 1 1 35 0.65536000000000000000e5
-113 1 17 32 0.65536000000000000000e5
-113 1 26 29 -0.13107200000000000000e6
-113 1 26 33 0.65536000000000000000e5
-113 2 17 17 0.13107200000000000000e6
-113 3 17 18 0.65536000000000000000e5
-114 1 1 8 -0.13107200000000000000e6
-114 1 2 2 0.65536000000000000000e5
-114 1 2 5 -0.32768000000000000000e5
-114 1 2 9 -0.65536000000000000000e5
-114 1 3 10 0.13107200000000000000e6
-114 2 1 3 0.32768000000000000000e5
-114 2 1 7 -0.65536000000000000000e5
-114 2 2 12 -0.32768000000000000000e5
-114 4 2 2 -0.65536000000000000000e5
-115 1 2 3 0.65536000000000000000e5
-115 1 2 5 0.65536000000000000000e5
-115 1 2 17 -0.65536000000000000000e5
-115 1 3 10 -0.26214400000000000000e6
-115 1 3 18 -0.65536000000000000000e5
-115 1 6 21 0.26214400000000000000e6
-115 2 1 7 0.13107200000000000000e6
-115 2 1 15 -0.13107200000000000000e6
-115 3 1 6 0.13107200000000000000e6
-115 3 2 3 0.65536000000000000000e5
-115 3 2 7 0.13107200000000000000e6
-115 4 2 2 0.13107200000000000000e6
-116 1 1 8 0.13107200000000000000e6
-116 1 2 4 0.65536000000000000000e5
-116 1 2 9 0.13107200000000000000e6
-116 1 2 17 0.65536000000000000000e5
-116 1 3 18 0.65536000000000000000e5
-116 1 6 21 -0.26214400000000000000e6
-116 2 1 15 0.13107200000000000000e6
-116 2 2 12 0.65536000000000000000e5
-116 3 1 6 -0.13107200000000000000e6
-116 3 2 3 -0.65536000000000000000e5
-116 3 2 7 -0.13107200000000000000e6
-117 1 1 2 -0.32768000000000000000e5
-117 1 1 8 -0.13107200000000000000e6
-117 1 1 16 0.32768000000000000000e5
-117 1 2 5 0.32768000000000000000e5
-117 1 2 6 0.65536000000000000000e5
-117 1 2 9 -0.65536000000000000000e5
-117 1 3 10 -0.13107200000000000000e6
-117 1 3 18 -0.32768000000000000000e5
-117 1 5 20 0.13107200000000000000e6
-117 1 6 21 0.78643200000000000000e6
-117 1 7 22 0.13107200000000000000e6
-117 1 8 23 0.26214400000000000000e6
-117 1 13 20 -0.52428800000000000000e6
-117 2 1 7 0.65536000000000000000e5
-117 2 1 15 -0.26214400000000000000e6
-117 2 2 8 0.13107200000000000000e6
-117 2 2 16 0.13107200000000000000e6
-117 2 5 11 0.65536000000000000000e5
-117 2 6 12 0.13107200000000000000e6
-117 2 8 14 0.26214400000000000000e6
-117 3 1 2 -0.32768000000000000000e5
-117 3 1 6 0.19660800000000000000e6
-117 3 2 3 0.32768000000000000000e5
-117 3 2 7 0.13107200000000000000e6
-117 4 1 1 -0.65536000000000000000e5
-117 4 2 2 0.65536000000000000000e5
-117 4 4 4 -0.26214400000000000000e6
-118 1 1 8 -0.65536000000000000000e5
-118 1 2 7 0.65536000000000000000e5
-119 1 1 8 0.65536000000000000000e5
-119 1 2 8 0.65536000000000000000e5
-119 1 2 9 0.65536000000000000000e5
-119 1 3 10 -0.13107200000000000000e6
-119 2 1 7 0.65536000000000000000e5
-120 1 1 8 -0.65536000000000000000e5
-120 1 2 10 0.65536000000000000000e5
-120 1 3 10 0.13107200000000000000e6
-120 1 4 11 0.13107200000000000000e6
-120 1 5 20 0.65536000000000000000e5
-120 1 6 21 0.13107200000000000000e6
-120 1 11 26 0.65536000000000000000e5
-120 1 12 27 0.65536000000000000000e5
-120 1 13 20 -0.26214400000000000000e6
-120 2 1 15 -0.65536000000000000000e5
-120 2 2 8 0.65536000000000000000e5
-120 2 2 16 0.65536000000000000000e5
-120 2 3 9 0.65536000000000000000e5
-120 2 6 8 0.13107200000000000000e6
-120 2 6 12 0.65536000000000000000e5
-120 3 1 6 0.65536000000000000000e5
-120 3 3 8 0.19660800000000000000e6
-120 3 3 16 -0.65536000000000000000e5
-120 3 4 9 0.65536000000000000000e5
-120 3 5 10 -0.26214400000000000000e6
-120 3 9 14 0.13107200000000000000e6
-120 4 2 6 0.65536000000000000000e5
-120 4 5 9 -0.65536000000000000000e5
-121 1 2 11 0.65536000000000000000e5
-121 1 3 10 -0.65536000000000000000e5
-122 1 1 8 0.32768000000000000000e5
-122 1 2 12 0.65536000000000000000e5
-122 1 5 20 -0.32768000000000000000e5
-122 1 6 21 -0.65536000000000000000e5
-122 2 1 15 0.32768000000000000000e5
-122 2 6 12 -0.32768000000000000000e5
-122 3 1 6 -0.32768000000000000000e5
-122 3 3 8 -0.65536000000000000000e5
-123 1 1 8 -0.16384000000000000000e5
-123 1 2 13 0.65536000000000000000e5
-123 1 3 10 0.32768000000000000000e5
-123 1 4 11 0.65536000000000000000e5
-123 1 5 20 0.16384000000000000000e5
-123 1 6 21 0.32768000000000000000e5
-123 1 11 26 0.32768000000000000000e5
-123 1 12 27 0.32768000000000000000e5
-123 1 13 20 -0.13107200000000000000e6
-123 2 1 15 -0.16384000000000000000e5
-123 2 2 16 0.32768000000000000000e5
-123 2 3 9 0.32768000000000000000e5
-123 2 6 8 0.65536000000000000000e5
-123 2 6 12 0.16384000000000000000e5
-123 3 1 6 0.16384000000000000000e5
-123 3 3 8 0.65536000000000000000e5
-123 3 3 16 -0.32768000000000000000e5
-123 3 4 9 0.32768000000000000000e5
-123 3 5 10 -0.13107200000000000000e6
-123 3 9 14 0.65536000000000000000e5
-123 4 2 6 0.32768000000000000000e5
-123 4 5 9 -0.32768000000000000000e5
-124 1 1 8 0.16384000000000000000e5
-124 1 2 14 0.65536000000000000000e5
-124 1 3 10 -0.32768000000000000000e5
-124 1 4 11 -0.32768000000000000000e5
-124 1 5 20 -0.16384000000000000000e5
-124 1 6 21 -0.32768000000000000000e5
-124 2 1 15 0.16384000000000000000e5
-124 2 2 16 -0.32768000000000000000e5
-124 2 6 12 -0.16384000000000000000e5
-124 3 1 6 -0.16384000000000000000e5
-124 3 3 8 -0.32768000000000000000e5
-124 4 2 6 -0.32768000000000000000e5
-125 1 2 15 0.65536000000000000000e5
-125 1 13 20 -0.65536000000000000000e5
-125 3 5 10 -0.65536000000000000000e5
-126 1 1 8 -0.26214400000000000000e6
-126 1 2 5 -0.65536000000000000000e5
-126 1 2 9 -0.13107200000000000000e6
-126 1 2 16 0.65536000000000000000e5
-126 1 3 10 0.26214400000000000000e6
-126 2 1 3 0.65536000000000000000e5
-126 2 1 7 -0.13107200000000000000e6
-126 2 2 12 -0.65536000000000000000e5
-126 3 1 2 0.65536000000000000000e5
-126 4 2 2 -0.13107200000000000000e6
-127 1 1 8 0.13107200000000000000e6
-127 1 2 9 0.13107200000000000000e6
-127 1 2 17 0.65536000000000000000e5
-127 1 2 18 0.65536000000000000000e5
-127 1 3 18 0.65536000000000000000e5
-127 1 6 21 -0.26214400000000000000e6
-127 2 1 15 0.13107200000000000000e6
-127 2 2 12 0.65536000000000000000e5
-127 3 1 6 -0.13107200000000000000e6
-127 3 2 7 -0.13107200000000000000e6
-128 1 2 19 0.65536000000000000000e5
-128 1 3 18 -0.65536000000000000000e5
-129 1 1 8 -0.65536000000000000000e5
-129 1 2 20 0.65536000000000000000e5
-129 3 1 6 0.65536000000000000000e5
-130 1 1 8 0.65536000000000000000e5
-130 1 2 9 0.65536000000000000000e5
-130 1 2 21 0.65536000000000000000e5
-130 1 6 21 -0.13107200000000000000e6
-130 2 1 15 0.65536000000000000000e5
-130 3 1 6 -0.65536000000000000000e5
-130 3 2 7 -0.65536000000000000000e5
-131 1 2 9 -0.65536000000000000000e5
-131 1 2 22 0.65536000000000000000e5
-131 3 2 7 0.65536000000000000000e5
-132 1 2 23 0.65536000000000000000e5
-132 1 6 21 -0.65536000000000000000e5
-133 1 1 8 0.32768000000000000000e5
-133 1 2 24 0.65536000000000000000e5
-133 1 5 20 -0.32768000000000000000e5
-133 1 6 21 -0.65536000000000000000e5
-133 2 1 15 0.32768000000000000000e5
-133 2 6 12 -0.32768000000000000000e5
-133 3 1 6 -0.32768000000000000000e5
-134 1 1 8 0.16384000000000000000e5
-134 1 2 25 0.65536000000000000000e5
-134 1 5 20 -0.16384000000000000000e5
-134 1 6 21 -0.65536000000000000000e5
-134 1 7 22 -0.32768000000000000000e5
-134 2 1 15 0.16384000000000000000e5
-134 2 2 16 -0.32768000000000000000e5
-134 2 6 12 -0.16384000000000000000e5
-134 3 1 6 -0.16384000000000000000e5
-135 1 1 8 0.13107200000000000000e6
-135 1 2 9 0.26214400000000000000e6
-135 1 2 26 0.65536000000000000000e5
-135 1 2 33 0.65536000000000000000e5
-135 1 3 34 -0.13107200000000000000e6
-135 1 4 35 0.65536000000000000000e5
-135 1 6 21 -0.26214400000000000000e6
-135 2 1 15 0.13107200000000000000e6
-135 2 3 17 -0.65536000000000000000e5
-135 2 11 17 0.65536000000000000000e5
-135 2 12 18 0.65536000000000000000e5
-135 3 1 6 -0.13107200000000000000e6
-135 3 2 7 -0.26214400000000000000e6
-135 3 2 15 -0.13107200000000000000e6
-135 3 4 17 -0.65536000000000000000e5
-135 3 6 11 0.13107200000000000000e6
-135 3 13 18 0.65536000000000000000e5
-135 4 7 7 0.13107200000000000000e6
-136 1 2 27 0.65536000000000000000e5
-136 1 3 26 -0.65536000000000000000e5
-137 1 2 9 -0.13107200000000000000e6
-137 1 2 28 0.65536000000000000000e5
-137 1 2 33 -0.65536000000000000000e5
-137 1 3 26 0.65536000000000000000e5
-137 1 3 34 0.13107200000000000000e6
-137 1 4 35 -0.65536000000000000000e5
-137 2 3 17 0.65536000000000000000e5
-137 2 12 18 -0.65536000000000000000e5
-137 3 2 7 0.13107200000000000000e6
-137 3 2 15 0.13107200000000000000e6
-137 3 4 17 0.65536000000000000000e5
-137 3 13 18 -0.65536000000000000000e5
-138 1 1 8 0.65536000000000000000e5
-138 1 2 9 0.65536000000000000000e5
-138 1 2 29 0.65536000000000000000e5
-138 1 6 21 -0.13107200000000000000e6
-138 2 1 15 0.65536000000000000000e5
-138 3 1 6 -0.65536000000000000000e5
-138 3 2 7 -0.65536000000000000000e5
-138 3 6 11 0.65536000000000000000e5
-139 1 2 9 -0.65536000000000000000e5
-139 1 2 30 0.65536000000000000000e5
-139 3 2 7 0.65536000000000000000e5
-139 3 2 15 0.65536000000000000000e5
-140 1 2 31 0.65536000000000000000e5
-140 1 11 26 -0.65536000000000000000e5
-141 1 2 32 0.65536000000000000000e5
-141 1 3 26 -0.65536000000000000000e5
-141 3 11 12 0.65536000000000000000e5
-142 1 2 9 -0.65536000000000000000e5
-142 1 2 34 0.65536000000000000000e5
-142 3 2 7 0.65536000000000000000e5
-142 3 2 15 0.65536000000000000000e5
-142 3 5 18 0.65536000000000000000e5
-143 1 2 35 0.65536000000000000000e5
-143 1 17 32 -0.65536000000000000000e5
-144 1 1 8 0.65536000000000000000e5
-144 1 2 9 0.65536000000000000000e5
-144 1 2 17 0.32768000000000000000e5
-144 1 3 3 0.65536000000000000000e5
-144 1 3 18 0.32768000000000000000e5
-144 1 6 21 -0.13107200000000000000e6
-144 2 1 15 0.65536000000000000000e5
-144 2 2 12 0.32768000000000000000e5
-144 3 1 6 -0.65536000000000000000e5
-144 3 2 3 -0.32768000000000000000e5
-144 3 2 7 -0.65536000000000000000e5
-145 1 2 5 -0.65536000000000000000e5
-145 1 3 4 0.65536000000000000000e5
-146 1 1 8 -0.13107200000000000000e6
-146 1 2 5 0.65536000000000000000e5
-146 1 2 9 -0.26214400000000000000e6
-146 1 2 17 -0.65536000000000000000e5
-146 1 3 5 0.65536000000000000000e5
-146 1 3 18 -0.65536000000000000000e5
-146 1 6 21 0.26214400000000000000e6
-146 2 1 15 -0.13107200000000000000e6
-146 2 2 4 0.65536000000000000000e5
-146 2 2 12 -0.65536000000000000000e5
-146 3 1 6 0.13107200000000000000e6
-146 3 2 3 0.65536000000000000000e5
-146 3 2 7 0.13107200000000000000e6
-147 1 1 8 -0.65536000000000000000e5
-147 1 3 6 0.65536000000000000000e5
-148 1 1 8 0.65536000000000000000e5
-148 1 2 9 0.65536000000000000000e5
-148 1 3 7 0.65536000000000000000e5
-148 1 3 10 -0.13107200000000000000e6
-148 2 1 7 0.65536000000000000000e5
-149 1 2 9 -0.65536000000000000000e5
-149 1 3 8 0.65536000000000000000e5
-150 1 2 9 0.65536000000000000000e5
-150 1 3 9 0.65536000000000000000e5
-150 1 4 11 -0.13107200000000000000e6
-150 1 5 8 0.65536000000000000000e5
-150 2 4 6 0.65536000000000000000e5
-151 1 1 8 0.32768000000000000000e5
-151 1 3 11 0.65536000000000000000e5
-151 1 5 20 -0.32768000000000000000e5
-151 1 6 21 -0.65536000000000000000e5
-151 2 1 15 0.32768000000000000000e5
-151 2 6 12 -0.32768000000000000000e5
-151 3 1 6 -0.32768000000000000000e5
-151 3 3 8 -0.65536000000000000000e5
-152 1 3 12 0.65536000000000000000e5
-152 1 4 11 -0.65536000000000000000e5
-153 1 1 8 0.16384000000000000000e5
-153 1 3 10 -0.32768000000000000000e5
-153 1 3 13 0.65536000000000000000e5
-153 1 4 11 -0.32768000000000000000e5
-153 1 5 20 -0.16384000000000000000e5
-153 1 6 21 -0.32768000000000000000e5
-153 2 1 15 0.16384000000000000000e5
-153 2 2 16 -0.32768000000000000000e5
-153 2 6 12 -0.16384000000000000000e5
-153 3 1 6 -0.16384000000000000000e5
-153 3 3 8 -0.32768000000000000000e5
-153 4 2 6 -0.32768000000000000000e5
-154 1 3 14 0.65536000000000000000e5
-154 1 4 11 -0.32768000000000000000e5
-154 1 11 26 -0.32768000000000000000e5
-154 1 12 27 -0.32768000000000000000e5
-154 2 3 9 -0.32768000000000000000e5
-154 3 3 8 -0.32768000000000000000e5
-154 3 3 16 0.32768000000000000000e5
-154 3 4 9 -0.32768000000000000000e5
-154 3 9 14 -0.65536000000000000000e5
-154 4 5 9 0.32768000000000000000e5
-155 1 3 15 0.65536000000000000000e5
-155 1 7 14 -0.65536000000000000000e5
-156 1 2 17 -0.65536000000000000000e5
-156 1 3 16 0.65536000000000000000e5
-157 1 1 8 0.13107200000000000000e6
-157 1 2 9 0.13107200000000000000e6
-157 1 2 17 0.65536000000000000000e5
-157 1 3 17 0.65536000000000000000e5
-157 1 3 18 0.65536000000000000000e5
-157 1 6 21 -0.26214400000000000000e6
-157 2 1 15 0.13107200000000000000e6
-157 2 2 12 0.65536000000000000000e5
-157 3 1 6 -0.13107200000000000000e6
-157 3 2 7 -0.13107200000000000000e6
-158 1 1 8 -0.13107200000000000000e6
-158 1 2 9 -0.26214400000000000000e6
-158 1 2 17 -0.65536000000000000000e5
-158 1 3 19 0.65536000000000000000e5
-158 1 6 21 0.26214400000000000000e6
-158 2 1 15 -0.13107200000000000000e6
-158 2 2 12 -0.65536000000000000000e5
-158 2 3 17 0.65536000000000000000e5
-158 3 1 6 0.13107200000000000000e6
-158 3 2 7 0.26214400000000000000e6
-158 4 3 7 0.65536000000000000000e5
-159 1 1 8 0.65536000000000000000e5
-159 1 2 9 0.65536000000000000000e5
-159 1 3 20 0.65536000000000000000e5
-159 1 6 21 -0.13107200000000000000e6
-159 2 1 15 0.65536000000000000000e5
-159 3 1 6 -0.65536000000000000000e5
-159 3 2 7 -0.65536000000000000000e5
-160 1 2 9 -0.65536000000000000000e5
-160 1 3 21 0.65536000000000000000e5
-160 3 2 7 0.65536000000000000000e5
-161 1 3 22 0.65536000000000000000e5
-161 1 5 20 -0.65536000000000000000e5
-162 1 1 8 0.32768000000000000000e5
-162 1 3 23 0.65536000000000000000e5
-162 1 5 20 -0.32768000000000000000e5
-162 1 6 21 -0.65536000000000000000e5
-162 2 1 15 0.32768000000000000000e5
-162 2 6 12 -0.32768000000000000000e5
-162 3 1 6 -0.32768000000000000000e5
-163 1 3 24 0.65536000000000000000e5
-163 1 7 22 -0.65536000000000000000e5
-164 1 3 25 0.65536000000000000000e5
-164 1 8 23 -0.65536000000000000000e5
-165 1 2 9 -0.13107200000000000000e6
-165 1 2 33 -0.65536000000000000000e5
-165 1 3 26 0.65536000000000000000e5
-165 1 3 27 0.65536000000000000000e5
-165 1 3 34 0.13107200000000000000e6
-165 1 4 35 -0.65536000000000000000e5
-165 2 3 17 0.65536000000000000000e5
-165 2 12 18 -0.65536000000000000000e5
-165 3 2 7 0.13107200000000000000e6
-165 3 2 15 0.13107200000000000000e6
-165 3 4 17 0.65536000000000000000e5
-165 3 13 18 -0.65536000000000000000e5
-166 1 2 33 0.65536000000000000000e5
-166 1 3 28 0.65536000000000000000e5
-166 1 3 34 -0.13107200000000000000e6
-166 1 4 35 0.65536000000000000000e5
-166 2 12 18 0.65536000000000000000e5
-166 3 4 17 -0.65536000000000000000e5
-166 3 13 18 0.65536000000000000000e5
-167 1 2 9 -0.65536000000000000000e5
-167 1 3 29 0.65536000000000000000e5
-167 3 2 7 0.65536000000000000000e5
-167 3 2 15 0.65536000000000000000e5
-168 1 1 8 -0.65536000000000000000e5
-168 1 3 30 0.65536000000000000000e5
-168 1 6 21 0.13107200000000000000e6
-168 1 11 26 -0.13107200000000000000e6
-168 2 1 15 -0.65536000000000000000e5
-168 2 6 12 0.65536000000000000000e5
-168 3 1 6 0.65536000000000000000e5
-168 3 2 15 -0.65536000000000000000e5
-168 3 6 11 -0.65536000000000000000e5
-168 4 4 8 -0.65536000000000000000e5
-169 1 3 31 0.65536000000000000000e5
-169 1 7 22 -0.65536000000000000000e5
-169 3 3 16 0.65536000000000000000e5
-170 1 2 33 -0.65536000000000000000e5
-170 1 3 32 0.65536000000000000000e5
-171 1 2 33 0.65536000000000000000e5
-171 1 3 33 0.65536000000000000000e5
-171 1 3 34 -0.13107200000000000000e6
-171 1 4 35 0.65536000000000000000e5
-171 2 12 18 0.65536000000000000000e5
-171 3 13 18 0.65536000000000000000e5
-172 1 3 35 0.65536000000000000000e5
-172 1 26 33 -0.65536000000000000000e5
-172 3 17 18 -0.65536000000000000000e5
-173 1 1 8 -0.65536000000000000000e5
-173 1 2 5 0.32768000000000000000e5
-173 1 2 9 -0.13107200000000000000e6
-173 1 2 17 -0.32768000000000000000e5
-173 1 3 18 -0.32768000000000000000e5
-173 1 4 4 0.65536000000000000000e5
-173 1 6 21 0.13107200000000000000e6
-173 2 1 15 -0.65536000000000000000e5
-173 2 2 4 0.32768000000000000000e5
-173 2 2 12 -0.32768000000000000000e5
-173 3 1 6 0.65536000000000000000e5
-173 3 2 3 0.32768000000000000000e5
-173 3 2 7 0.65536000000000000000e5
-174 1 2 9 0.13107200000000000000e6
-174 1 4 5 0.65536000000000000000e5
-174 1 4 11 -0.26214400000000000000e6
-174 1 4 19 -0.65536000000000000000e5
-174 1 5 8 0.13107200000000000000e6
-174 1 5 20 0.13107200000000000000e6
-174 2 2 4 -0.65536000000000000000e5
-174 2 3 17 0.65536000000000000000e5
-174 2 4 6 0.13107200000000000000e6
-174 3 2 3 -0.65536000000000000000e5
-174 3 2 7 0.13107200000000000000e6
-174 4 3 3 0.13107200000000000000e6
-174 4 3 7 0.65536000000000000000e5
-175 1 1 8 0.65536000000000000000e5
-175 1 2 9 0.65536000000000000000e5
-175 1 3 10 -0.13107200000000000000e6
-175 1 4 6 0.65536000000000000000e5
-175 2 1 7 0.65536000000000000000e5
-176 1 2 9 -0.65536000000000000000e5
-176 1 4 7 0.65536000000000000000e5
-177 1 2 9 0.65536000000000000000e5
-177 1 4 8 0.65536000000000000000e5
-177 1 4 11 -0.13107200000000000000e6
-177 1 5 8 0.65536000000000000000e5
-177 2 4 6 0.65536000000000000000e5
-178 1 4 9 0.65536000000000000000e5
-178 1 5 8 -0.65536000000000000000e5
-179 1 1 8 0.32768000000000000000e5
-179 1 4 10 0.65536000000000000000e5
-179 1 5 20 -0.32768000000000000000e5
-179 1 6 21 -0.65536000000000000000e5
-179 2 1 15 0.32768000000000000000e5
-179 2 6 12 -0.32768000000000000000e5
-179 3 1 6 -0.32768000000000000000e5
-179 3 3 8 -0.65536000000000000000e5
-180 1 1 8 -0.32768000000000000000e5
-180 1 4 12 0.65536000000000000000e5
-180 1 5 20 0.32768000000000000000e5
-180 1 6 21 0.65536000000000000000e5
-180 1 11 26 -0.65536000000000000000e5
-180 1 12 27 -0.65536000000000000000e5
-180 2 1 15 -0.32768000000000000000e5
-180 2 6 12 0.32768000000000000000e5
-180 3 1 6 0.32768000000000000000e5
-180 3 3 16 0.65536000000000000000e5
-180 3 4 9 -0.65536000000000000000e5
-180 3 9 14 -0.13107200000000000000e6
-180 4 5 9 0.65536000000000000000e5
-181 1 4 11 -0.32768000000000000000e5
-181 1 4 13 0.65536000000000000000e5
-181 1 11 26 -0.32768000000000000000e5
-181 1 12 27 -0.32768000000000000000e5
-181 2 3 9 -0.32768000000000000000e5
-181 3 3 8 -0.32768000000000000000e5
-181 3 3 16 0.32768000000000000000e5
-181 3 4 9 -0.32768000000000000000e5
-181 3 9 14 -0.65536000000000000000e5
-181 4 5 9 0.32768000000000000000e5
-182 1 4 11 0.32768000000000000000e5
-182 1 4 14 0.65536000000000000000e5
-182 1 4 15 -0.13107200000000000000e6
-182 1 9 12 0.65536000000000000000e5
-182 1 11 26 0.32768000000000000000e5
-182 1 12 27 0.32768000000000000000e5
-182 2 3 9 0.32768000000000000000e5
-182 2 4 10 0.65536000000000000000e5
-182 3 3 8 0.32768000000000000000e5
-182 3 3 16 -0.32768000000000000000e5
-182 3 4 9 0.32768000000000000000e5
-182 3 9 14 0.65536000000000000000e5
-182 4 5 9 -0.32768000000000000000e5
-183 1 1 8 0.13107200000000000000e6
-183 1 2 9 0.13107200000000000000e6
-183 1 2 17 0.65536000000000000000e5
-183 1 3 18 0.65536000000000000000e5
-183 1 4 16 0.65536000000000000000e5
-183 1 6 21 -0.26214400000000000000e6
-183 2 1 15 0.13107200000000000000e6
-183 2 2 12 0.65536000000000000000e5
-183 3 1 6 -0.13107200000000000000e6
-183 3 2 7 -0.13107200000000000000e6
-184 1 3 18 -0.65536000000000000000e5
-184 1 4 17 0.65536000000000000000e5
-185 1 1 8 -0.13107200000000000000e6
-185 1 2 9 -0.26214400000000000000e6
-185 1 2 17 -0.65536000000000000000e5
-185 1 4 18 0.65536000000000000000e5
-185 1 6 21 0.26214400000000000000e6
-185 2 1 15 -0.13107200000000000000e6
-185 2 2 12 -0.65536000000000000000e5
-185 2 3 17 0.65536000000000000000e5
-185 3 1 6 0.13107200000000000000e6
-185 3 2 7 0.26214400000000000000e6
-185 4 3 7 0.65536000000000000000e5
-186 1 2 9 -0.65536000000000000000e5
-186 1 4 20 0.65536000000000000000e5
-186 3 2 7 0.65536000000000000000e5
-187 1 4 21 0.65536000000000000000e5
-187 1 5 20 -0.65536000000000000000e5
-188 1 2 9 0.65536000000000000000e5
-188 1 4 22 0.65536000000000000000e5
-188 1 5 20 0.65536000000000000000e5
-188 1 7 22 -0.13107200000000000000e6
-188 2 4 14 0.65536000000000000000e5
-188 3 2 7 -0.65536000000000000000e5
-189 1 4 23 0.65536000000000000000e5
-189 1 7 22 -0.65536000000000000000e5
-190 1 1 8 -0.32768000000000000000e5
-190 1 4 24 0.65536000000000000000e5
-190 1 5 20 0.32768000000000000000e5
-190 1 6 21 0.65536000000000000000e5
-190 1 11 26 -0.65536000000000000000e5
-190 1 12 27 -0.65536000000000000000e5
-190 2 1 15 -0.32768000000000000000e5
-190 2 6 12 0.32768000000000000000e5
-190 3 1 6 0.32768000000000000000e5
-190 3 3 16 0.65536000000000000000e5
-190 3 9 14 -0.13107200000000000000e6
-190 4 5 9 0.65536000000000000000e5
-191 1 4 25 0.65536000000000000000e5
-191 1 8 23 0.65536000000000000000e5
-191 1 9 24 0.65536000000000000000e5
-191 1 14 21 -0.13107200000000000000e6
-191 2 9 15 0.65536000000000000000e5
-192 1 2 9 -0.13107200000000000000e6
-192 1 2 33 -0.65536000000000000000e5
-192 1 3 26 0.65536000000000000000e5
-192 1 3 34 0.13107200000000000000e6
-192 1 4 26 0.65536000000000000000e5
-192 1 4 35 -0.65536000000000000000e5
-192 2 3 17 0.65536000000000000000e5
-192 2 12 18 -0.65536000000000000000e5
-192 3 2 7 0.13107200000000000000e6
-192 3 2 15 0.13107200000000000000e6
-192 3 4 17 0.65536000000000000000e5
-192 3 13 18 -0.65536000000000000000e5
-193 1 2 33 0.65536000000000000000e5
-193 1 3 34 -0.13107200000000000000e6
-193 1 4 27 0.65536000000000000000e5
-193 1 4 35 0.65536000000000000000e5
-193 2 12 18 0.65536000000000000000e5
-193 3 4 17 -0.65536000000000000000e5
-193 3 13 18 0.65536000000000000000e5
-194 1 1 8 -0.13107200000000000000e6
-194 1 2 9 0.13107200000000000000e6
-194 1 3 26 -0.65536000000000000000e5
-194 1 4 28 0.65536000000000000000e5
-194 1 6 21 0.26214400000000000000e6
-194 1 11 26 -0.26214400000000000000e6
-194 2 1 15 -0.13107200000000000000e6
-194 2 3 17 -0.65536000000000000000e5
-194 2 6 12 0.13107200000000000000e6
-194 2 12 18 0.65536000000000000000e5
-194 3 1 6 0.13107200000000000000e6
-194 3 2 7 -0.13107200000000000000e6
-194 3 2 15 -0.26214400000000000000e6
-194 3 6 11 -0.13107200000000000000e6
-194 4 4 8 -0.13107200000000000000e6
-194 4 8 8 0.13107200000000000000e6
-195 1 1 8 -0.65536000000000000000e5
-195 1 4 29 0.65536000000000000000e5
-195 1 6 21 0.13107200000000000000e6
-195 1 11 26 -0.13107200000000000000e6
-195 2 1 15 -0.65536000000000000000e5
-195 2 6 12 0.65536000000000000000e5
-195 3 1 6 0.65536000000000000000e5
-195 3 2 15 -0.65536000000000000000e5
-195 3 6 11 -0.65536000000000000000e5
-195 4 4 8 -0.65536000000000000000e5
-196 1 1 8 -0.65536000000000000000e5
-196 1 2 9 0.65536000000000000000e5
-196 1 2 33 0.32768000000000000000e5
-196 1 3 26 -0.32768000000000000000e5
-196 1 3 34 -0.65536000000000000000e5
-196 1 4 30 0.65536000000000000000e5
-196 1 4 35 0.32768000000000000000e5
-196 1 5 28 -0.32768000000000000000e5
-196 1 6 21 0.13107200000000000000e6
-196 1 11 26 -0.13107200000000000000e6
-196 2 1 15 -0.65536000000000000000e5
-196 2 3 17 -0.32768000000000000000e5
-196 2 4 18 -0.32768000000000000000e5
-196 2 6 12 0.65536000000000000000e5
-196 2 12 18 0.65536000000000000000e5
-196 3 1 6 0.65536000000000000000e5
-196 3 2 7 -0.65536000000000000000e5
-196 3 2 15 -0.13107200000000000000e6
-196 3 4 17 -0.32768000000000000000e5
-196 3 6 11 -0.65536000000000000000e5
-196 3 13 18 0.32768000000000000000e5
-196 4 4 8 -0.65536000000000000000e5
-196 4 8 8 0.65536000000000000000e5
-197 1 4 31 0.65536000000000000000e5
-197 1 12 27 -0.65536000000000000000e5
-198 1 2 33 0.65536000000000000000e5
-198 1 3 34 -0.13107200000000000000e6
-198 1 4 32 0.65536000000000000000e5
-198 1 4 35 0.65536000000000000000e5
-198 2 12 18 0.65536000000000000000e5
-198 3 13 18 0.65536000000000000000e5
-199 1 4 33 0.65536000000000000000e5
-199 1 4 35 -0.65536000000000000000e5
-199 3 13 18 -0.65536000000000000000e5
-200 1 2 9 0.65536000000000000000e5
-200 1 3 34 0.65536000000000000000e5
-200 1 4 34 0.65536000000000000000e5
-200 1 7 22 -0.13107200000000000000e6
-200 2 6 20 0.65536000000000000000e5
-200 3 2 7 -0.65536000000000000000e5
-200 3 2 15 -0.65536000000000000000e5
-200 3 3 16 0.13107200000000000000e6
-200 3 5 18 -0.65536000000000000000e5
-200 3 6 19 0.13107200000000000000e6
-201 1 1 8 0.65536000000000000000e5
-201 1 2 5 -0.32768000000000000000e5
-201 1 2 9 0.65536000000000000000e5
-201 1 2 17 0.32768000000000000000e5
-201 1 3 18 0.32768000000000000000e5
-201 1 4 11 0.13107200000000000000e6
-201 1 4 19 0.32768000000000000000e5
-201 1 5 5 0.65536000000000000000e5
-201 1 5 8 -0.13107200000000000000e6
-201 1 5 20 -0.65536000000000000000e5
-201 1 6 21 -0.13107200000000000000e6
-201 2 1 15 0.65536000000000000000e5
-201 2 2 12 0.32768000000000000000e5
-201 2 3 17 -0.32768000000000000000e5
-201 2 4 4 0.65536000000000000000e5
-201 2 4 6 -0.65536000000000000000e5
-201 3 1 6 -0.65536000000000000000e5
-201 3 2 7 -0.13107200000000000000e6
-201 4 3 3 -0.65536000000000000000e5
-201 4 3 7 -0.32768000000000000000e5
-202 1 2 9 -0.65536000000000000000e5
-202 1 5 6 0.65536000000000000000e5
-203 1 2 9 0.65536000000000000000e5
-203 1 4 11 -0.13107200000000000000e6
-203 1 5 7 0.65536000000000000000e5
-203 1 5 8 0.65536000000000000000e5
-203 2 4 6 0.65536000000000000000e5
-204 1 1 8 -0.65536000000000000000e5
-204 1 2 9 -0.65536000000000000000e5
-204 1 4 11 0.13107200000000000000e6
-204 1 5 9 0.65536000000000000000e5
-204 1 5 20 0.65536000000000000000e5
-204 1 6 21 0.13107200000000000000e6
-204 1 11 26 -0.13107200000000000000e6
-204 1 12 27 -0.13107200000000000000e6
-204 2 1 15 -0.65536000000000000000e5
-204 2 4 6 -0.65536000000000000000e5
-204 2 4 7 0.65536000000000000000e5
-204 2 6 12 0.65536000000000000000e5
-204 3 1 6 0.65536000000000000000e5
-204 3 3 16 0.13107200000000000000e6
-204 3 4 9 -0.13107200000000000000e6
-204 3 9 14 -0.26214400000000000000e6
-204 4 5 9 0.13107200000000000000e6
-205 1 4 11 -0.65536000000000000000e5
-205 1 5 10 0.65536000000000000000e5
-206 1 1 8 -0.32768000000000000000e5
-206 1 5 11 0.65536000000000000000e5
-206 1 5 20 0.32768000000000000000e5
-206 1 6 21 0.65536000000000000000e5
-206 1 11 26 -0.65536000000000000000e5
-206 1 12 27 -0.65536000000000000000e5
-206 2 1 15 -0.32768000000000000000e5
-206 2 6 12 0.32768000000000000000e5
-206 3 1 6 0.32768000000000000000e5
-206 3 3 16 0.65536000000000000000e5
-206 3 4 9 -0.65536000000000000000e5
-206 3 9 14 -0.13107200000000000000e6
-206 4 5 9 0.65536000000000000000e5
-207 1 4 11 0.32768000000000000000e5
-207 1 4 15 -0.13107200000000000000e6
-207 1 5 13 0.65536000000000000000e5
-207 1 9 12 0.65536000000000000000e5
-207 1 11 26 0.32768000000000000000e5
-207 1 12 27 0.32768000000000000000e5
-207 2 3 9 0.32768000000000000000e5
-207 2 4 10 0.65536000000000000000e5
-207 3 3 8 0.32768000000000000000e5
-207 3 3 16 -0.32768000000000000000e5
-207 3 4 9 0.32768000000000000000e5
-207 3 9 14 0.65536000000000000000e5
-207 4 5 9 -0.32768000000000000000e5
-208 1 5 14 0.65536000000000000000e5
-208 1 9 12 -0.65536000000000000000e5
-209 1 4 15 0.65536000000000000000e5
-209 1 5 15 0.65536000000000000000e5
-209 1 7 14 0.65536000000000000000e5
-209 1 8 15 -0.13107200000000000000e6
-209 2 9 9 0.13107200000000000000e6
-210 1 3 18 -0.65536000000000000000e5
-210 1 5 16 0.65536000000000000000e5
-211 1 1 8 -0.13107200000000000000e6
-211 1 2 9 -0.26214400000000000000e6
-211 1 2 17 -0.65536000000000000000e5
-211 1 5 17 0.65536000000000000000e5
-211 1 6 21 0.26214400000000000000e6
-211 2 1 15 -0.13107200000000000000e6
-211 2 2 12 -0.65536000000000000000e5
-211 2 3 17 0.65536000000000000000e5
-211 3 1 6 0.13107200000000000000e6
-211 3 2 7 0.26214400000000000000e6
-211 4 3 7 0.65536000000000000000e5
-212 1 4 19 -0.65536000000000000000e5
-212 1 5 18 0.65536000000000000000e5
-213 1 1 8 0.13107200000000000000e6
-213 1 2 9 0.39321600000000000000e6
-213 1 2 17 0.65536000000000000000e5
-213 1 4 19 0.65536000000000000000e5
-213 1 5 19 0.65536000000000000000e5
-213 1 5 20 0.13107200000000000000e6
-213 1 6 21 -0.26214400000000000000e6
-213 1 7 22 -0.26214400000000000000e6
-213 2 1 15 0.13107200000000000000e6
-213 2 2 12 0.65536000000000000000e5
-213 2 3 17 -0.65536000000000000000e5
-213 2 4 13 0.65536000000000000000e5
-213 2 4 14 0.13107200000000000000e6
-213 3 1 6 -0.13107200000000000000e6
-213 3 2 7 -0.39321600000000000000e6
-213 4 3 7 -0.65536000000000000000e5
-214 1 2 9 0.65536000000000000000e5
-214 1 5 20 0.65536000000000000000e5
-214 1 5 21 0.65536000000000000000e5
-214 1 7 22 -0.13107200000000000000e6
-214 2 4 14 0.65536000000000000000e5
-214 3 2 7 -0.65536000000000000000e5
-215 1 1 8 -0.65536000000000000000e5
-215 1 2 9 -0.65536000000000000000e5
-215 1 5 20 0.65536000000000000000e5
-215 1 5 22 0.65536000000000000000e5
-215 1 6 21 0.13107200000000000000e6
-215 1 7 22 0.13107200000000000000e6
-215 1 11 26 -0.13107200000000000000e6
-215 1 12 27 -0.13107200000000000000e6
-215 2 1 15 -0.65536000000000000000e5
-215 2 4 14 -0.65536000000000000000e5
-215 2 6 12 0.65536000000000000000e5
-215 2 7 13 0.65536000000000000000e5
-215 3 1 6 0.65536000000000000000e5
-215 3 2 7 0.65536000000000000000e5
-215 3 3 16 0.13107200000000000000e6
-215 3 9 14 -0.26214400000000000000e6
-215 4 5 9 0.13107200000000000000e6
-216 1 1 8 -0.32768000000000000000e5
-216 1 5 20 0.32768000000000000000e5
-216 1 5 23 0.65536000000000000000e5
-216 1 6 21 0.65536000000000000000e5
-216 1 11 26 -0.65536000000000000000e5
-216 1 12 27 -0.65536000000000000000e5
-216 2 1 15 -0.32768000000000000000e5
-216 2 6 12 0.32768000000000000000e5
-216 3 1 6 0.32768000000000000000e5
-216 3 3 16 0.65536000000000000000e5
-216 3 9 14 -0.13107200000000000000e6
-216 4 5 9 0.65536000000000000000e5
-217 1 5 24 0.65536000000000000000e5
-217 1 12 19 -0.65536000000000000000e5
-218 1 5 25 0.65536000000000000000e5
-218 1 9 24 -0.65536000000000000000e5
-219 1 2 33 0.65536000000000000000e5
-219 1 3 34 -0.13107200000000000000e6
-219 1 4 35 0.65536000000000000000e5
-219 1 5 26 0.65536000000000000000e5
-219 2 12 18 0.65536000000000000000e5
-219 3 4 17 -0.65536000000000000000e5
-219 3 13 18 0.65536000000000000000e5
-220 1 1 8 -0.13107200000000000000e6
-220 1 2 9 0.13107200000000000000e6
-220 1 3 26 -0.65536000000000000000e5
-220 1 5 27 0.65536000000000000000e5
-220 1 6 21 0.26214400000000000000e6
-220 1 11 26 -0.26214400000000000000e6
-220 2 1 15 -0.13107200000000000000e6
-220 2 3 17 -0.65536000000000000000e5
-220 2 6 12 0.13107200000000000000e6
-220 2 12 18 0.65536000000000000000e5
-220 3 1 6 0.13107200000000000000e6
-220 3 2 7 -0.13107200000000000000e6
-220 3 2 15 -0.26214400000000000000e6
-220 3 6 11 -0.13107200000000000000e6
-220 4 4 8 -0.13107200000000000000e6
-220 4 8 8 0.13107200000000000000e6
-221 1 1 8 -0.65536000000000000000e5
-221 1 2 9 0.65536000000000000000e5
-221 1 2 33 0.32768000000000000000e5
-221 1 3 26 -0.32768000000000000000e5
-221 1 3 34 -0.65536000000000000000e5
-221 1 4 35 0.32768000000000000000e5
-221 1 5 28 -0.32768000000000000000e5
-221 1 5 29 0.65536000000000000000e5
-221 1 6 21 0.13107200000000000000e6
-221 1 11 26 -0.13107200000000000000e6
-221 2 1 15 -0.65536000000000000000e5
-221 2 3 17 -0.32768000000000000000e5
-221 2 4 18 -0.32768000000000000000e5
-221 2 6 12 0.65536000000000000000e5
-221 2 12 18 0.65536000000000000000e5
-221 3 1 6 0.65536000000000000000e5
-221 3 2 7 -0.65536000000000000000e5
-221 3 2 15 -0.13107200000000000000e6
-221 3 4 17 -0.32768000000000000000e5
-221 3 6 11 -0.65536000000000000000e5
-221 3 13 18 0.32768000000000000000e5
-221 4 4 8 -0.65536000000000000000e5
-221 4 8 8 0.65536000000000000000e5
-222 1 5 30 0.65536000000000000000e5
-222 1 19 22 -0.65536000000000000000e5
-223 1 5 31 0.65536000000000000000e5
-223 1 7 22 0.65536000000000000000e5
-223 1 12 27 0.65536000000000000000e5
-223 1 13 28 -0.13107200000000000000e6
-223 2 15 15 0.13107200000000000000e6
-223 3 3 16 -0.65536000000000000000e5
-224 1 4 35 -0.65536000000000000000e5
-224 1 5 32 0.65536000000000000000e5
-224 3 13 18 -0.65536000000000000000e5
-225 1 2 9 0.13107200000000000000e6
-225 1 2 33 -0.65536000000000000000e5
-225 1 3 34 0.26214400000000000000e6
-225 1 5 33 0.65536000000000000000e5
-225 1 7 22 -0.26214400000000000000e6
-225 2 4 20 0.65536000000000000000e5
-225 2 6 20 0.13107200000000000000e6
-225 2 12 18 -0.65536000000000000000e5
-225 3 2 7 -0.13107200000000000000e6
-225 3 2 15 -0.13107200000000000000e6
-225 3 3 16 0.26214400000000000000e6
-225 3 5 18 -0.13107200000000000000e6
-225 3 6 19 0.26214400000000000000e6
-226 1 2 9 -0.65536000000000000000e5
-226 1 5 34 0.65536000000000000000e5
-226 1 7 22 0.13107200000000000000e6
-226 1 22 29 -0.13107200000000000000e6
-226 2 6 20 -0.65536000000000000000e5
-226 2 13 19 0.65536000000000000000e5
-226 3 2 7 0.65536000000000000000e5
-226 3 2 15 0.65536000000000000000e5
-226 3 3 16 -0.13107200000000000000e6
-226 3 5 18 0.65536000000000000000e5
-226 3 6 19 -0.13107200000000000000e6
-227 1 2 9 0.13107200000000000000e6
-227 1 3 34 0.13107200000000000000e6
-227 1 4 35 0.65536000000000000000e5
-227 1 5 35 0.65536000000000000000e5
-227 1 7 22 -0.26214400000000000000e6
-227 1 26 33 0.65536000000000000000e5
-227 2 6 20 0.13107200000000000000e6
-227 2 18 18 0.13107200000000000000e6
-227 3 2 7 -0.13107200000000000000e6
-227 3 2 15 -0.13107200000000000000e6
-227 3 3 16 0.26214400000000000000e6
-227 3 5 18 -0.13107200000000000000e6
-227 3 6 19 0.26214400000000000000e6
-227 3 7 20 0.13107200000000000000e6
-227 3 17 18 0.65536000000000000000e5
-228 1 1 10 -0.32768000000000000000e5
-228 1 6 6 0.65536000000000000000e5
-229 1 1 8 -0.65536000000000000000e5
-229 1 3 10 0.13107200000000000000e6
-229 1 4 11 0.13107200000000000000e6
-229 1 5 20 0.65536000000000000000e5
-229 1 6 7 0.65536000000000000000e5
-229 1 6 21 0.13107200000000000000e6
-229 1 11 26 0.65536000000000000000e5
-229 1 12 27 0.65536000000000000000e5
-229 1 13 20 -0.26214400000000000000e6
-229 2 1 15 -0.65536000000000000000e5
-229 2 2 8 0.65536000000000000000e5
-229 2 2 16 0.65536000000000000000e5
-229 2 3 9 0.65536000000000000000e5
-229 2 6 8 0.13107200000000000000e6
-229 2 6 12 0.65536000000000000000e5
-229 3 1 6 0.65536000000000000000e5
-229 3 3 8 0.19660800000000000000e6
-229 3 3 16 -0.65536000000000000000e5
-229 3 4 9 0.65536000000000000000e5
-229 3 5 10 -0.26214400000000000000e6
-229 3 9 14 0.13107200000000000000e6
-229 4 2 6 0.65536000000000000000e5
-229 4 5 9 -0.65536000000000000000e5
-230 1 3 10 -0.65536000000000000000e5
-230 1 6 8 0.65536000000000000000e5
-231 1 1 8 0.32768000000000000000e5
-231 1 5 20 -0.32768000000000000000e5
-231 1 6 9 0.65536000000000000000e5
-231 1 6 21 -0.65536000000000000000e5
-231 2 1 15 0.32768000000000000000e5
-231 2 6 12 -0.32768000000000000000e5
-231 3 1 6 -0.32768000000000000000e5
-231 3 3 8 -0.65536000000000000000e5
-232 1 1 8 -0.32768000000000000000e5
-232 1 1 10 -0.32768000000000000000e5
-232 1 3 10 0.32768000000000000000e5
-232 1 4 11 0.65536000000000000000e5
-232 1 5 20 0.32768000000000000000e5
-232 1 6 10 0.65536000000000000000e5
-232 1 6 21 0.65536000000000000000e5
-232 1 11 26 0.32768000000000000000e5
-232 1 12 27 0.32768000000000000000e5
-232 1 13 20 -0.13107200000000000000e6
-232 2 1 15 -0.32768000000000000000e5
-232 2 2 8 0.32768000000000000000e5
-232 2 2 16 0.32768000000000000000e5
-232 2 3 9 0.32768000000000000000e5
-232 2 5 5 -0.65536000000000000000e5
-232 2 6 8 0.65536000000000000000e5
-232 2 6 12 0.32768000000000000000e5
-232 3 1 6 0.32768000000000000000e5
-232 3 3 8 0.98304000000000000000e5
-232 3 3 16 -0.32768000000000000000e5
-232 3 4 9 0.32768000000000000000e5
-232 3 5 10 -0.13107200000000000000e6
-232 3 9 14 0.65536000000000000000e5
-232 4 2 6 0.32768000000000000000e5
-232 4 5 9 -0.32768000000000000000e5
-233 1 1 8 -0.16384000000000000000e5
-233 1 3 10 0.32768000000000000000e5
-233 1 4 11 0.65536000000000000000e5
-233 1 5 20 0.16384000000000000000e5
-233 1 6 11 0.65536000000000000000e5
-233 1 6 21 0.32768000000000000000e5
-233 1 11 26 0.32768000000000000000e5
-233 1 12 27 0.32768000000000000000e5
-233 1 13 20 -0.13107200000000000000e6
-233 2 1 15 -0.16384000000000000000e5
-233 2 2 16 0.32768000000000000000e5
-233 2 3 9 0.32768000000000000000e5
-233 2 6 8 0.65536000000000000000e5
-233 2 6 12 0.16384000000000000000e5
-233 3 1 6 0.16384000000000000000e5
-233 3 3 8 0.65536000000000000000e5
-233 3 3 16 -0.32768000000000000000e5
-233 3 4 9 0.32768000000000000000e5
-233 3 5 10 -0.13107200000000000000e6
-233 3 9 14 0.65536000000000000000e5
-233 4 2 6 0.32768000000000000000e5
-233 4 5 9 -0.32768000000000000000e5
-234 1 1 8 0.16384000000000000000e5
-234 1 3 10 -0.32768000000000000000e5
-234 1 4 11 -0.32768000000000000000e5
-234 1 5 20 -0.16384000000000000000e5
-234 1 6 12 0.65536000000000000000e5
-234 1 6 21 -0.32768000000000000000e5
-234 2 1 15 0.16384000000000000000e5
-234 2 2 16 -0.32768000000000000000e5
-234 2 6 12 -0.16384000000000000000e5
-234 3 1 6 -0.16384000000000000000e5
-234 3 3 8 -0.32768000000000000000e5
-234 4 2 6 -0.32768000000000000000e5
-235 1 6 14 0.65536000000000000000e5
-235 1 13 20 -0.65536000000000000000e5
-235 3 5 10 -0.65536000000000000000e5
-236 1 6 15 0.65536000000000000000e5
-236 1 10 13 -0.65536000000000000000e5
-237 1 1 8 -0.13107200000000000000e6
-237 1 2 9 -0.65536000000000000000e5
-237 1 5 20 0.13107200000000000000e6
-237 1 6 16 0.65536000000000000000e5
-237 1 6 21 0.65536000000000000000e6
-237 1 7 22 0.13107200000000000000e6
-237 1 8 23 0.26214400000000000000e6
-237 1 13 20 -0.52428800000000000000e6
-237 2 1 15 -0.19660800000000000000e6
-237 2 2 8 0.13107200000000000000e6
-237 2 2 16 0.13107200000000000000e6
-237 2 5 11 0.65536000000000000000e5
-237 2 6 12 0.13107200000000000000e6
-237 2 8 14 0.26214400000000000000e6
-237 3 1 6 0.13107200000000000000e6
-237 3 2 7 0.65536000000000000000e5
-237 4 4 4 -0.26214400000000000000e6
-238 1 1 8 -0.65536000000000000000e5
-238 1 6 17 0.65536000000000000000e5
-238 3 1 6 0.65536000000000000000e5
-239 1 1 8 0.65536000000000000000e5
-239 1 2 9 0.65536000000000000000e5
-239 1 6 18 0.65536000000000000000e5
-239 1 6 21 -0.13107200000000000000e6
-239 2 1 15 0.65536000000000000000e5
-239 3 1 6 -0.65536000000000000000e5
-239 3 2 7 -0.65536000000000000000e5
-240 1 2 9 -0.65536000000000000000e5
-240 1 6 19 0.65536000000000000000e5
-240 3 2 7 0.65536000000000000000e5
-241 1 1 8 -0.65536000000000000000e5
-241 1 5 20 0.65536000000000000000e5
-241 1 6 20 0.65536000000000000000e5
-241 1 6 21 0.26214400000000000000e6
-241 1 7 22 0.65536000000000000000e5
-241 1 8 23 0.13107200000000000000e6
-241 1 13 20 -0.26214400000000000000e6
-241 2 1 15 -0.65536000000000000000e5
-241 2 2 8 0.65536000000000000000e5
-241 2 2 16 0.65536000000000000000e5
-241 2 6 12 0.65536000000000000000e5
-241 2 8 14 0.13107200000000000000e6
-241 3 1 6 0.65536000000000000000e5
-241 4 4 4 -0.13107200000000000000e6
-242 1 1 8 0.32768000000000000000e5
-242 1 5 20 -0.32768000000000000000e5
-242 1 6 21 -0.65536000000000000000e5
-242 1 6 22 0.65536000000000000000e5
-242 2 1 15 0.32768000000000000000e5
-242 2 6 12 -0.32768000000000000000e5
-242 3 1 6 -0.32768000000000000000e5
-243 1 1 8 -0.16384000000000000000e5
-243 1 5 20 0.16384000000000000000e5
-243 1 6 21 0.65536000000000000000e5
-243 1 6 23 0.65536000000000000000e5
-243 1 7 22 0.32768000000000000000e5
-243 1 8 23 0.65536000000000000000e5
-243 1 13 20 -0.13107200000000000000e6
-243 2 1 15 -0.16384000000000000000e5
-243 2 2 16 0.32768000000000000000e5
-243 2 6 12 0.16384000000000000000e5
-243 2 8 14 0.65536000000000000000e5
-243 3 1 6 0.16384000000000000000e5
-244 1 1 8 0.16384000000000000000e5
-244 1 5 20 -0.16384000000000000000e5
-244 1 6 21 -0.65536000000000000000e5
-244 1 6 24 0.65536000000000000000e5
-244 1 7 22 -0.32768000000000000000e5
-244 2 1 15 0.16384000000000000000e5
-244 2 2 16 -0.32768000000000000000e5
-244 2 6 12 -0.16384000000000000000e5
-244 3 1 6 -0.16384000000000000000e5
-245 1 6 25 0.65536000000000000000e5
-245 1 13 20 -0.65536000000000000000e5
-246 1 1 8 -0.65536000000000000000e5
-246 1 6 26 0.65536000000000000000e5
-246 3 1 6 0.65536000000000000000e5
-246 3 1 14 0.65536000000000000000e5
-247 1 1 8 0.65536000000000000000e5
-247 1 2 9 0.65536000000000000000e5
-247 1 6 21 -0.13107200000000000000e6
-247 1 6 27 0.65536000000000000000e5
-247 2 1 15 0.65536000000000000000e5
-247 3 1 6 -0.65536000000000000000e5
-247 3 2 7 -0.65536000000000000000e5
-247 3 6 11 0.65536000000000000000e5
-248 1 2 9 -0.65536000000000000000e5
-248 1 6 28 0.65536000000000000000e5
-248 3 2 7 0.65536000000000000000e5
-248 3 2 15 0.65536000000000000000e5
-249 1 6 29 0.65536000000000000000e5
-249 1 16 23 -0.65536000000000000000e5
-250 1 6 30 0.65536000000000000000e5
-250 1 11 26 -0.65536000000000000000e5
-251 1 6 31 0.65536000000000000000e5
-251 1 7 22 -0.32768000000000000000e5
-251 1 11 26 -0.32768000000000000000e5
-251 1 16 23 -0.32768000000000000000e5
-251 2 5 19 -0.32768000000000000000e5
-251 3 3 16 0.32768000000000000000e5
-252 1 1 32 -0.32768000000000000000e5
-252 1 2 33 -0.32768000000000000000e5
-252 1 3 26 -0.32768000000000000000e5
-252 1 6 32 0.65536000000000000000e5
-252 2 11 17 -0.32768000000000000000e5
-252 3 11 12 0.32768000000000000000e5
-253 1 2 9 -0.65536000000000000000e5
-253 1 6 33 0.65536000000000000000e5
-253 3 2 7 0.65536000000000000000e5
-253 3 2 15 0.65536000000000000000e5
-253 3 5 18 0.65536000000000000000e5
-254 1 6 34 0.65536000000000000000e5
-254 1 16 31 -0.65536000000000000000e5
-255 1 6 35 0.65536000000000000000e5
-255 1 26 29 -0.65536000000000000000e5
-256 1 3 10 -0.32768000000000000000e5
-256 1 7 7 0.65536000000000000000e5
-257 1 1 8 0.32768000000000000000e5
-257 1 5 20 -0.32768000000000000000e5
-257 1 6 21 -0.65536000000000000000e5
-257 1 7 8 0.65536000000000000000e5
-257 2 1 15 0.32768000000000000000e5
-257 2 6 12 -0.32768000000000000000e5
-257 3 1 6 -0.32768000000000000000e5
-257 3 3 8 -0.65536000000000000000e5
-258 1 4 11 -0.65536000000000000000e5
-258 1 7 9 0.65536000000000000000e5
-259 1 1 8 -0.16384000000000000000e5
-259 1 3 10 0.32768000000000000000e5
-259 1 4 11 0.65536000000000000000e5
-259 1 5 20 0.16384000000000000000e5
-259 1 6 21 0.32768000000000000000e5
-259 1 7 10 0.65536000000000000000e5
-259 1 11 26 0.32768000000000000000e5
-259 1 12 27 0.32768000000000000000e5
-259 1 13 20 -0.13107200000000000000e6
-259 2 1 15 -0.16384000000000000000e5
-259 2 2 16 0.32768000000000000000e5
-259 2 3 9 0.32768000000000000000e5
-259 2 6 8 0.65536000000000000000e5
-259 2 6 12 0.16384000000000000000e5
-259 3 1 6 0.16384000000000000000e5
-259 3 3 8 0.65536000000000000000e5
-259 3 3 16 -0.32768000000000000000e5
-259 3 4 9 0.32768000000000000000e5
-259 3 5 10 -0.13107200000000000000e6
-259 3 9 14 0.65536000000000000000e5
-259 4 2 6 0.32768000000000000000e5
-259 4 5 9 -0.32768000000000000000e5
-260 1 1 8 0.16384000000000000000e5
-260 1 3 10 -0.32768000000000000000e5
-260 1 4 11 -0.32768000000000000000e5
-260 1 5 20 -0.16384000000000000000e5
-260 1 6 21 -0.32768000000000000000e5
-260 1 7 11 0.65536000000000000000e5
-260 2 1 15 0.16384000000000000000e5
-260 2 2 16 -0.32768000000000000000e5
-260 2 6 12 -0.16384000000000000000e5
-260 3 1 6 -0.16384000000000000000e5
-260 3 3 8 -0.32768000000000000000e5
-260 4 2 6 -0.32768000000000000000e5
-261 1 4 11 -0.32768000000000000000e5
-261 1 7 12 0.65536000000000000000e5
-261 1 11 26 -0.32768000000000000000e5
-261 1 12 27 -0.32768000000000000000e5
-261 2 3 9 -0.32768000000000000000e5
-261 3 3 8 -0.32768000000000000000e5
-261 3 3 16 0.32768000000000000000e5
-261 3 4 9 -0.32768000000000000000e5
-261 3 9 14 -0.65536000000000000000e5
-261 4 5 9 0.32768000000000000000e5
-262 1 7 13 0.65536000000000000000e5
-262 1 13 20 -0.65536000000000000000e5
-262 3 5 10 -0.65536000000000000000e5
-263 1 1 8 -0.40960000000000000000e4
-263 1 4 15 -0.32768000000000000000e5
-263 1 5 20 0.40960000000000000000e4
-263 1 6 21 0.16384000000000000000e5
-263 1 7 14 -0.32768000000000000000e5
-263 1 7 15 0.65536000000000000000e5
-263 1 7 22 0.81920000000000000000e4
-263 1 9 24 -0.16384000000000000000e5
-263 1 10 25 -0.65536000000000000000e5
-263 1 14 21 0.65536000000000000000e5
-263 2 1 15 -0.40960000000000000000e4
-263 2 2 16 0.81920000000000000000e4
-263 2 6 12 0.40960000000000000000e4
-263 2 9 15 -0.16384000000000000000e5
-263 2 10 12 0.16384000000000000000e5
-263 3 1 6 0.40960000000000000000e4
-263 3 5 10 -0.32768000000000000000e5
-263 4 6 6 -0.65536000000000000000e5
-264 1 1 8 -0.65536000000000000000e5
-264 1 7 16 0.65536000000000000000e5
-264 3 1 6 0.65536000000000000000e5
-265 1 1 8 0.65536000000000000000e5
-265 1 2 9 0.65536000000000000000e5
-265 1 6 21 -0.13107200000000000000e6
-265 1 7 17 0.65536000000000000000e5
-265 2 1 15 0.65536000000000000000e5
-265 3 1 6 -0.65536000000000000000e5
-265 3 2 7 -0.65536000000000000000e5
-266 1 2 9 -0.65536000000000000000e5
-266 1 7 18 0.65536000000000000000e5
-266 3 2 7 0.65536000000000000000e5
-267 1 5 20 -0.65536000000000000000e5
-267 1 7 19 0.65536000000000000000e5
-268 1 6 21 -0.65536000000000000000e5
-268 1 7 20 0.65536000000000000000e5
-269 1 1 8 0.32768000000000000000e5
-269 1 5 20 -0.32768000000000000000e5
-269 1 6 21 -0.65536000000000000000e5
-269 1 7 21 0.65536000000000000000e5
-269 2 1 15 0.32768000000000000000e5
-269 2 6 12 -0.32768000000000000000e5
-269 3 1 6 -0.32768000000000000000e5
-270 1 1 8 0.16384000000000000000e5
-270 1 5 20 -0.16384000000000000000e5
-270 1 6 21 -0.65536000000000000000e5
-270 1 7 22 -0.32768000000000000000e5
-270 1 7 23 0.65536000000000000000e5
-270 2 1 15 0.16384000000000000000e5
-270 2 2 16 -0.32768000000000000000e5
-270 2 6 12 -0.16384000000000000000e5
-270 3 1 6 -0.16384000000000000000e5
-271 1 7 24 0.65536000000000000000e5
-271 1 8 23 -0.65536000000000000000e5
-272 1 1 8 0.81920000000000000000e4
-272 1 5 20 -0.81920000000000000000e4
-272 1 6 21 -0.32768000000000000000e5
-272 1 7 22 -0.16384000000000000000e5
-272 1 7 25 0.65536000000000000000e5
-272 1 9 24 0.32768000000000000000e5
-272 1 14 21 -0.65536000000000000000e5
-272 2 1 15 0.81920000000000000000e4
-272 2 2 16 -0.16384000000000000000e5
-272 2 6 12 -0.81920000000000000000e4
-272 2 9 15 0.32768000000000000000e5
-272 2 10 12 -0.32768000000000000000e5
-272 3 1 6 -0.81920000000000000000e4
-273 1 1 8 0.65536000000000000000e5
-273 1 2 9 0.65536000000000000000e5
-273 1 6 21 -0.13107200000000000000e6
-273 1 7 26 0.65536000000000000000e5
-273 2 1 15 0.65536000000000000000e5
-273 3 1 6 -0.65536000000000000000e5
-273 3 2 7 -0.65536000000000000000e5
-273 3 6 11 0.65536000000000000000e5
-274 1 2 9 -0.65536000000000000000e5
-274 1 7 27 0.65536000000000000000e5
-274 3 2 7 0.65536000000000000000e5
-274 3 2 15 0.65536000000000000000e5
-275 1 1 8 -0.65536000000000000000e5
-275 1 6 21 0.13107200000000000000e6
-275 1 7 28 0.65536000000000000000e5
-275 1 11 26 -0.13107200000000000000e6
-275 2 1 15 -0.65536000000000000000e5
-275 2 6 12 0.65536000000000000000e5
-275 3 1 6 0.65536000000000000000e5
-275 3 2 15 -0.65536000000000000000e5
-275 3 6 11 -0.65536000000000000000e5
-275 4 4 8 -0.65536000000000000000e5
-276 1 7 29 0.65536000000000000000e5
-276 1 11 26 -0.65536000000000000000e5
-277 1 7 22 -0.65536000000000000000e5
-277 1 7 30 0.65536000000000000000e5
-277 3 3 16 0.65536000000000000000e5
-278 1 7 31 0.65536000000000000000e5
-278 1 8 23 -0.65536000000000000000e5
-278 3 9 14 0.65536000000000000000e5
-279 1 2 9 -0.65536000000000000000e5
-279 1 7 32 0.65536000000000000000e5
-279 3 2 7 0.65536000000000000000e5
-279 3 2 15 0.65536000000000000000e5
-279 3 5 18 0.65536000000000000000e5
-280 1 3 34 -0.65536000000000000000e5
-280 1 7 33 0.65536000000000000000e5
-281 1 7 22 -0.65536000000000000000e5
-281 1 7 34 0.65536000000000000000e5
-281 3 3 16 0.65536000000000000000e5
-281 3 6 19 0.65536000000000000000e5
-282 1 2 9 -0.65536000000000000000e5
-282 1 3 34 -0.65536000000000000000e5
-282 1 7 35 0.65536000000000000000e5
-282 1 26 29 0.65536000000000000000e5
-282 2 6 20 -0.65536000000000000000e5
-282 2 14 20 0.65536000000000000000e5
-282 3 2 7 0.65536000000000000000e5
-282 3 2 15 0.65536000000000000000e5
-282 3 5 18 0.65536000000000000000e5
-282 3 7 20 -0.65536000000000000000e5
-282 3 14 19 0.13107200000000000000e6
-283 1 4 11 -0.32768000000000000000e5
-283 1 8 8 0.65536000000000000000e5
-284 1 1 8 -0.32768000000000000000e5
-284 1 5 20 0.32768000000000000000e5
-284 1 6 21 0.65536000000000000000e5
-284 1 8 9 0.65536000000000000000e5
-284 1 11 26 -0.65536000000000000000e5
-284 1 12 27 -0.65536000000000000000e5
-284 2 1 15 -0.32768000000000000000e5
-284 2 6 12 0.32768000000000000000e5
-284 3 1 6 0.32768000000000000000e5
-284 3 3 16 0.65536000000000000000e5
-284 3 4 9 -0.65536000000000000000e5
-284 3 9 14 -0.13107200000000000000e6
-284 4 5 9 0.65536000000000000000e5
-285 1 1 8 0.16384000000000000000e5
-285 1 3 10 -0.32768000000000000000e5
-285 1 4 11 -0.32768000000000000000e5
-285 1 5 20 -0.16384000000000000000e5
-285 1 6 21 -0.32768000000000000000e5
-285 1 8 10 0.65536000000000000000e5
-285 2 1 15 0.16384000000000000000e5
-285 2 2 16 -0.32768000000000000000e5
-285 2 6 12 -0.16384000000000000000e5
-285 3 1 6 -0.16384000000000000000e5
-285 3 3 8 -0.32768000000000000000e5
-285 4 2 6 -0.32768000000000000000e5
-286 1 4 11 -0.32768000000000000000e5
-286 1 8 11 0.65536000000000000000e5
-286 1 11 26 -0.32768000000000000000e5
-286 1 12 27 -0.32768000000000000000e5
-286 2 3 9 -0.32768000000000000000e5
-286 3 3 8 -0.32768000000000000000e5
-286 3 3 16 0.32768000000000000000e5
-286 3 4 9 -0.32768000000000000000e5
-286 3 9 14 -0.65536000000000000000e5
-286 4 5 9 0.32768000000000000000e5
-287 1 4 11 0.32768000000000000000e5
-287 1 4 15 -0.13107200000000000000e6
-287 1 8 12 0.65536000000000000000e5
-287 1 9 12 0.65536000000000000000e5
-287 1 11 26 0.32768000000000000000e5
-287 1 12 27 0.32768000000000000000e5
-287 2 3 9 0.32768000000000000000e5
-287 2 4 10 0.65536000000000000000e5
-287 3 3 8 0.32768000000000000000e5
-287 3 3 16 -0.32768000000000000000e5
-287 3 4 9 0.32768000000000000000e5
-287 3 9 14 0.65536000000000000000e5
-287 4 5 9 -0.32768000000000000000e5
-288 1 7 14 -0.65536000000000000000e5
-288 1 8 13 0.65536000000000000000e5
-289 1 4 15 -0.65536000000000000000e5
-289 1 8 14 0.65536000000000000000e5
-290 1 1 8 0.65536000000000000000e5
-290 1 2 9 0.65536000000000000000e5
-290 1 6 21 -0.13107200000000000000e6
-290 1 8 16 0.65536000000000000000e5
-290 2 1 15 0.65536000000000000000e5
-290 3 1 6 -0.65536000000000000000e5
-290 3 2 7 -0.65536000000000000000e5
-291 1 2 9 -0.65536000000000000000e5
-291 1 8 17 0.65536000000000000000e5
-291 3 2 7 0.65536000000000000000e5
-292 1 5 20 -0.65536000000000000000e5
-292 1 8 18 0.65536000000000000000e5
-293 1 2 9 0.65536000000000000000e5
-293 1 5 20 0.65536000000000000000e5
-293 1 7 22 -0.13107200000000000000e6
-293 1 8 19 0.65536000000000000000e5
-293 2 4 14 0.65536000000000000000e5
-293 3 2 7 -0.65536000000000000000e5
-294 1 1 8 0.32768000000000000000e5
-294 1 5 20 -0.32768000000000000000e5
-294 1 6 21 -0.65536000000000000000e5
-294 1 8 20 0.65536000000000000000e5
-294 2 1 15 0.32768000000000000000e5
-294 2 6 12 -0.32768000000000000000e5
-294 3 1 6 -0.32768000000000000000e5
-295 1 7 22 -0.65536000000000000000e5
-295 1 8 21 0.65536000000000000000e5
-296 1 1 8 -0.32768000000000000000e5
-296 1 5 20 0.32768000000000000000e5
-296 1 6 21 0.65536000000000000000e5
-296 1 8 22 0.65536000000000000000e5
-296 1 11 26 -0.65536000000000000000e5
-296 1 12 27 -0.65536000000000000000e5
-296 2 1 15 -0.32768000000000000000e5
-296 2 6 12 0.32768000000000000000e5
-296 3 1 6 0.32768000000000000000e5
-296 3 3 16 0.65536000000000000000e5
-296 3 9 14 -0.13107200000000000000e6
-296 4 5 9 0.65536000000000000000e5
-297 1 8 23 0.65536000000000000000e5
-297 1 8 24 0.65536000000000000000e5
-297 1 9 24 0.65536000000000000000e5
-297 1 14 21 -0.13107200000000000000e6
-297 2 9 15 0.65536000000000000000e5
-298 1 8 25 0.65536000000000000000e5
-298 1 14 21 -0.65536000000000000000e5
-299 1 2 9 -0.65536000000000000000e5
-299 1 8 26 0.65536000000000000000e5
-299 3 2 7 0.65536000000000000000e5
-299 3 2 15 0.65536000000000000000e5
-300 1 1 8 -0.65536000000000000000e5
-300 1 6 21 0.13107200000000000000e6
-300 1 8 27 0.65536000000000000000e5
-300 1 11 26 -0.13107200000000000000e6
-300 2 1 15 -0.65536000000000000000e5
-300 2 6 12 0.65536000000000000000e5
-300 3 1 6 0.65536000000000000000e5
-300 3 2 15 -0.65536000000000000000e5
-300 3 6 11 -0.65536000000000000000e5
-300 4 4 8 -0.65536000000000000000e5
-301 1 1 8 -0.65536000000000000000e5
-301 1 2 9 0.65536000000000000000e5
-301 1 2 33 0.32768000000000000000e5
-301 1 3 26 -0.32768000000000000000e5
-301 1 3 34 -0.65536000000000000000e5
-301 1 4 35 0.32768000000000000000e5
-301 1 5 28 -0.32768000000000000000e5
-301 1 6 21 0.13107200000000000000e6
-301 1 8 28 0.65536000000000000000e5
-301 1 11 26 -0.13107200000000000000e6
-301 2 1 15 -0.65536000000000000000e5
-301 2 3 17 -0.32768000000000000000e5
-301 2 4 18 -0.32768000000000000000e5
-301 2 6 12 0.65536000000000000000e5
-301 2 12 18 0.65536000000000000000e5
-301 3 1 6 0.65536000000000000000e5
-301 3 2 7 -0.65536000000000000000e5
-301 3 2 15 -0.13107200000000000000e6
-301 3 4 17 -0.32768000000000000000e5
-301 3 6 11 -0.65536000000000000000e5
-301 3 13 18 0.32768000000000000000e5
-301 4 4 8 -0.65536000000000000000e5
-301 4 8 8 0.65536000000000000000e5
-302 1 7 22 -0.65536000000000000000e5
-302 1 8 29 0.65536000000000000000e5
-302 3 3 16 0.65536000000000000000e5
-303 1 8 30 0.65536000000000000000e5
-303 1 12 27 -0.65536000000000000000e5
-304 1 8 31 0.65536000000000000000e5
-304 1 13 28 -0.65536000000000000000e5
-305 1 3 34 -0.65536000000000000000e5
-305 1 8 32 0.65536000000000000000e5
-306 1 2 9 0.65536000000000000000e5
-306 1 3 34 0.65536000000000000000e5
-306 1 7 22 -0.13107200000000000000e6
-306 1 8 33 0.65536000000000000000e5
-306 2 6 20 0.65536000000000000000e5
-306 3 2 7 -0.65536000000000000000e5
-306 3 2 15 -0.65536000000000000000e5
-306 3 3 16 0.13107200000000000000e6
-306 3 5 18 -0.65536000000000000000e5
-306 3 6 19 0.13107200000000000000e6
-307 1 8 34 0.65536000000000000000e5
-307 1 22 29 -0.65536000000000000000e5
-308 1 2 9 0.65536000000000000000e5
-308 1 3 34 0.65536000000000000000e5
-308 1 7 22 -0.13107200000000000000e6
-308 1 8 35 0.65536000000000000000e5
-308 2 6 20 0.65536000000000000000e5
-308 3 2 7 -0.65536000000000000000e5
-308 3 2 15 -0.65536000000000000000e5
-308 3 3 16 0.13107200000000000000e6
-308 3 5 18 -0.65536000000000000000e5
-308 3 6 19 0.13107200000000000000e6
-308 3 7 20 0.65536000000000000000e5
-309 1 5 12 -0.32768000000000000000e5
-309 1 9 9 0.65536000000000000000e5
-310 1 4 11 -0.32768000000000000000e5
-310 1 9 10 0.65536000000000000000e5
-310 1 11 26 -0.32768000000000000000e5
-310 1 12 27 -0.32768000000000000000e5
-310 2 3 9 -0.32768000000000000000e5
-310 3 3 8 -0.32768000000000000000e5
-310 3 3 16 0.32768000000000000000e5
-310 3 4 9 -0.32768000000000000000e5
-310 3 9 14 -0.65536000000000000000e5
-310 4 5 9 0.32768000000000000000e5
-311 1 4 11 0.32768000000000000000e5
-311 1 4 15 -0.13107200000000000000e6
-311 1 9 11 0.65536000000000000000e5
-311 1 9 12 0.65536000000000000000e5
-311 1 11 26 0.32768000000000000000e5
-311 1 12 27 0.32768000000000000000e5
-311 2 3 9 0.32768000000000000000e5
-311 2 4 10 0.65536000000000000000e5
-311 3 3 8 0.32768000000000000000e5
-311 3 3 16 -0.32768000000000000000e5
-311 3 4 9 0.32768000000000000000e5
-311 3 9 14 0.65536000000000000000e5
-311 4 5 9 -0.32768000000000000000e5
-312 1 4 15 -0.65536000000000000000e5
-312 1 9 13 0.65536000000000000000e5
-313 1 4 15 0.65536000000000000000e5
-313 1 7 14 0.65536000000000000000e5
-313 1 8 15 -0.13107200000000000000e6
-313 1 9 14 0.65536000000000000000e5
-313 2 9 9 0.13107200000000000000e6
-314 1 9 15 0.65536000000000000000e5
-314 1 12 14 -0.65536000000000000000e5
-315 1 2 9 -0.65536000000000000000e5
-315 1 9 16 0.65536000000000000000e5
-315 3 2 7 0.65536000000000000000e5
-316 1 5 20 -0.65536000000000000000e5
-316 1 9 17 0.65536000000000000000e5
-317 1 2 9 0.65536000000000000000e5
-317 1 5 20 0.65536000000000000000e5
-317 1 7 22 -0.13107200000000000000e6
-317 1 9 18 0.65536000000000000000e5
-317 2 4 14 0.65536000000000000000e5
-317 3 2 7 -0.65536000000000000000e5
-318 1 1 8 -0.65536000000000000000e5
-318 1 2 9 -0.65536000000000000000e5
-318 1 5 20 0.65536000000000000000e5
-318 1 6 21 0.13107200000000000000e6
-318 1 7 22 0.13107200000000000000e6
-318 1 9 19 0.65536000000000000000e5
-318 1 11 26 -0.13107200000000000000e6
-318 1 12 27 -0.13107200000000000000e6
-318 2 1 15 -0.65536000000000000000e5
-318 2 4 14 -0.65536000000000000000e5
-318 2 6 12 0.65536000000000000000e5
-318 2 7 13 0.65536000000000000000e5
-318 3 1 6 0.65536000000000000000e5
-318 3 2 7 0.65536000000000000000e5
-318 3 3 16 0.13107200000000000000e6
-318 3 9 14 -0.26214400000000000000e6
-318 4 5 9 0.13107200000000000000e6
-319 1 7 22 -0.65536000000000000000e5
-319 1 9 20 0.65536000000000000000e5
-320 1 1 8 -0.32768000000000000000e5
-320 1 5 20 0.32768000000000000000e5
-320 1 6 21 0.65536000000000000000e5
-320 1 9 21 0.65536000000000000000e5
-320 1 11 26 -0.65536000000000000000e5
-320 1 12 27 -0.65536000000000000000e5
-320 2 1 15 -0.32768000000000000000e5
-320 2 6 12 0.32768000000000000000e5
-320 3 1 6 0.32768000000000000000e5
-320 3 3 16 0.65536000000000000000e5
-320 3 9 14 -0.13107200000000000000e6
-320 4 5 9 0.65536000000000000000e5
-321 1 9 22 0.65536000000000000000e5
-321 1 12 19 -0.65536000000000000000e5
-322 1 8 23 0.65536000000000000000e5
-322 1 9 23 0.65536000000000000000e5
-322 1 9 24 0.65536000000000000000e5
-322 1 14 21 -0.13107200000000000000e6
-322 2 9 15 0.65536000000000000000e5
-323 1 1 8 -0.65536000000000000000e5
-323 1 6 21 0.13107200000000000000e6
-323 1 9 26 0.65536000000000000000e5
-323 1 11 26 -0.13107200000000000000e6
-323 2 1 15 -0.65536000000000000000e5
-323 2 6 12 0.65536000000000000000e5
-323 3 1 6 0.65536000000000000000e5
-323 3 2 15 -0.65536000000000000000e5
-323 3 6 11 -0.65536000000000000000e5
-323 4 4 8 -0.65536000000000000000e5
-324 1 1 8 -0.65536000000000000000e5
-324 1 2 9 0.65536000000000000000e5
-324 1 2 33 0.32768000000000000000e5
-324 1 3 26 -0.32768000000000000000e5
-324 1 3 34 -0.65536000000000000000e5
-324 1 4 35 0.32768000000000000000e5
-324 1 5 28 -0.32768000000000000000e5
-324 1 6 21 0.13107200000000000000e6
-324 1 9 27 0.65536000000000000000e5
-324 1 11 26 -0.13107200000000000000e6
-324 2 1 15 -0.65536000000000000000e5
-324 2 3 17 -0.32768000000000000000e5
-324 2 4 18 -0.32768000000000000000e5
-324 2 6 12 0.65536000000000000000e5
-324 2 12 18 0.65536000000000000000e5
-324 3 1 6 0.65536000000000000000e5
-324 3 2 7 -0.65536000000000000000e5
-324 3 2 15 -0.13107200000000000000e6
-324 3 4 17 -0.32768000000000000000e5
-324 3 6 11 -0.65536000000000000000e5
-324 3 13 18 0.32768000000000000000e5
-324 4 4 8 -0.65536000000000000000e5
-324 4 8 8 0.65536000000000000000e5
-325 1 9 28 0.65536000000000000000e5
-325 1 19 22 -0.65536000000000000000e5
-326 1 9 29 0.65536000000000000000e5
-326 1 12 27 -0.65536000000000000000e5
-327 1 7 22 0.65536000000000000000e5
-327 1 9 30 0.65536000000000000000e5
-327 1 12 27 0.65536000000000000000e5
-327 1 13 28 -0.13107200000000000000e6
-327 2 15 15 0.13107200000000000000e6
-327 3 3 16 -0.65536000000000000000e5
-328 1 8 23 0.65536000000000000000e5
-328 1 9 31 0.65536000000000000000e5
-328 1 13 28 0.65536000000000000000e5
-328 1 14 29 -0.13107200000000000000e6
-328 2 9 19 0.65536000000000000000e5
-328 3 9 14 -0.65536000000000000000e5
-329 1 2 9 0.65536000000000000000e5
-329 1 3 34 0.65536000000000000000e5
-329 1 7 22 -0.13107200000000000000e6
-329 1 9 32 0.65536000000000000000e5
-329 2 6 20 0.65536000000000000000e5
-329 3 2 7 -0.65536000000000000000e5
-329 3 2 15 -0.65536000000000000000e5
-329 3 3 16 0.13107200000000000000e6
-329 3 5 18 -0.65536000000000000000e5
-329 3 6 19 0.13107200000000000000e6
-330 1 2 9 -0.65536000000000000000e5
-330 1 7 22 0.13107200000000000000e6
-330 1 9 33 0.65536000000000000000e5
-330 1 22 29 -0.13107200000000000000e6
-330 2 6 20 -0.65536000000000000000e5
-330 2 13 19 0.65536000000000000000e5
-330 3 2 7 0.65536000000000000000e5
-330 3 2 15 0.65536000000000000000e5
-330 3 3 16 -0.13107200000000000000e6
-330 3 5 18 0.65536000000000000000e5
-330 3 6 19 -0.13107200000000000000e6
-331 1 7 22 0.65536000000000000000e5
-331 1 9 34 0.65536000000000000000e5
-331 1 22 29 0.65536000000000000000e5
-331 1 23 30 -0.13107200000000000000e6
-331 2 16 18 0.65536000000000000000e5
-331 3 3 16 -0.65536000000000000000e5
-331 3 6 19 -0.65536000000000000000e5
-332 1 9 35 0.65536000000000000000e5
-332 1 19 34 -0.65536000000000000000e5
-333 1 6 13 -0.32768000000000000000e5
-333 1 10 10 0.65536000000000000000e5
-334 1 10 11 0.65536000000000000000e5
-334 1 13 20 -0.65536000000000000000e5
-334 3 5 10 -0.65536000000000000000e5
-335 1 7 14 -0.65536000000000000000e5
-335 1 10 12 0.65536000000000000000e5
-336 1 1 8 -0.40960000000000000000e4
-336 1 4 15 -0.32768000000000000000e5
-336 1 5 20 0.40960000000000000000e4
-336 1 6 21 0.16384000000000000000e5
-336 1 7 14 -0.32768000000000000000e5
-336 1 7 22 0.81920000000000000000e4
-336 1 9 24 -0.16384000000000000000e5
-336 1 10 14 0.65536000000000000000e5
-336 1 10 25 -0.65536000000000000000e5
-336 1 14 21 0.65536000000000000000e5
-336 2 1 15 -0.40960000000000000000e4
-336 2 2 16 0.81920000000000000000e4
-336 2 6 12 0.40960000000000000000e4
-336 2 9 15 -0.16384000000000000000e5
-336 2 10 12 0.16384000000000000000e5
-336 3 1 6 0.40960000000000000000e4
-336 3 5 10 -0.32768000000000000000e5
-336 4 6 6 -0.65536000000000000000e5
-337 1 1 8 -0.20480000000000000000e4
-337 1 4 15 -0.16384000000000000000e5
-337 1 5 20 0.20480000000000000000e4
-337 1 6 21 0.81920000000000000000e4
-337 1 7 14 -0.16384000000000000000e5
-337 1 7 22 0.40960000000000000000e4
-337 1 8 15 -0.32768000000000000000e5
-337 1 9 24 -0.81920000000000000000e4
-337 1 10 13 -0.32768000000000000000e5
-337 1 10 15 0.65536000000000000000e5
-337 1 10 25 -0.32768000000000000000e5
-337 1 14 21 0.32768000000000000000e5
-337 2 1 15 -0.20480000000000000000e4
-337 2 2 16 0.40960000000000000000e4
-337 2 6 12 0.20480000000000000000e4
-337 2 8 10 -0.32768000000000000000e5
-337 2 9 15 -0.81920000000000000000e4
-337 2 10 12 0.81920000000000000000e4
-337 3 1 6 0.20480000000000000000e4
-337 3 5 10 -0.16384000000000000000e5
-337 4 6 6 -0.32768000000000000000e5
-338 1 1 8 -0.65536000000000000000e5
-338 1 5 20 0.65536000000000000000e5
-338 1 6 21 0.26214400000000000000e6
-338 1 7 22 0.65536000000000000000e5
-338 1 8 23 0.13107200000000000000e6
-338 1 10 16 0.65536000000000000000e5
-338 1 13 20 -0.26214400000000000000e6
-338 2 1 15 -0.65536000000000000000e5
-338 2 2 8 0.65536000000000000000e5
-338 2 2 16 0.65536000000000000000e5
-338 2 6 12 0.65536000000000000000e5
-338 2 8 14 0.13107200000000000000e6
-338 3 1 6 0.65536000000000000000e5
-338 4 4 4 -0.13107200000000000000e6
-339 1 6 21 -0.65536000000000000000e5
-339 1 10 17 0.65536000000000000000e5
-340 1 1 8 0.32768000000000000000e5
-340 1 5 20 -0.32768000000000000000e5
-340 1 6 21 -0.65536000000000000000e5
-340 1 10 18 0.65536000000000000000e5
-340 2 1 15 0.32768000000000000000e5
-340 2 6 12 -0.32768000000000000000e5
-340 3 1 6 -0.32768000000000000000e5
-341 1 7 22 -0.65536000000000000000e5
-341 1 10 19 0.65536000000000000000e5
-342 1 1 8 -0.16384000000000000000e5
-342 1 5 20 0.16384000000000000000e5
-342 1 6 21 0.65536000000000000000e5
-342 1 7 22 0.32768000000000000000e5
-342 1 8 23 0.65536000000000000000e5
-342 1 10 20 0.65536000000000000000e5
-342 1 13 20 -0.13107200000000000000e6
-342 2 1 15 -0.16384000000000000000e5
-342 2 2 16 0.32768000000000000000e5
-342 2 6 12 0.16384000000000000000e5
-342 2 8 14 0.65536000000000000000e5
-342 3 1 6 0.16384000000000000000e5
-343 1 1 8 0.16384000000000000000e5
-343 1 5 20 -0.16384000000000000000e5
-343 1 6 21 -0.65536000000000000000e5
-343 1 7 22 -0.32768000000000000000e5
-343 1 10 21 0.65536000000000000000e5
-343 2 1 15 0.16384000000000000000e5
-343 2 2 16 -0.32768000000000000000e5
-343 2 6 12 -0.16384000000000000000e5
-343 3 1 6 -0.16384000000000000000e5
-344 1 8 23 -0.65536000000000000000e5
-344 1 10 22 0.65536000000000000000e5
-345 1 10 23 0.65536000000000000000e5
-345 1 13 20 -0.65536000000000000000e5
-346 1 1 8 0.81920000000000000000e4
-346 1 5 20 -0.81920000000000000000e4
-346 1 6 21 -0.32768000000000000000e5
-346 1 7 22 -0.16384000000000000000e5
-346 1 9 24 0.32768000000000000000e5
-346 1 10 24 0.65536000000000000000e5
-346 1 14 21 -0.65536000000000000000e5
-346 2 1 15 0.81920000000000000000e4
-346 2 2 16 -0.16384000000000000000e5
-346 2 6 12 -0.81920000000000000000e4
-346 2 9 15 0.32768000000000000000e5
-346 2 10 12 -0.32768000000000000000e5
-346 3 1 6 -0.81920000000000000000e4
-347 1 10 26 0.65536000000000000000e5
-347 1 16 23 -0.65536000000000000000e5
-348 1 10 27 0.65536000000000000000e5
-348 1 11 26 -0.65536000000000000000e5
-349 1 7 22 -0.65536000000000000000e5
-349 1 10 28 0.65536000000000000000e5
-349 3 3 16 0.65536000000000000000e5
-350 1 7 22 -0.32768000000000000000e5
-350 1 10 29 0.65536000000000000000e5
-350 1 11 26 -0.32768000000000000000e5
-350 1 16 23 -0.32768000000000000000e5
-350 2 5 19 -0.32768000000000000000e5
-350 3 3 16 0.32768000000000000000e5
-351 1 8 23 -0.65536000000000000000e5
-351 1 10 30 0.65536000000000000000e5
-351 3 9 14 0.65536000000000000000e5
-352 1 7 22 -0.16384000000000000000e5
-352 1 8 23 -0.32768000000000000000e5
-352 1 10 31 0.65536000000000000000e5
-352 1 11 26 -0.16384000000000000000e5
-352 1 13 28 -0.32768000000000000000e5
-352 1 16 23 -0.16384000000000000000e5
-352 2 5 19 -0.16384000000000000000e5
-352 2 14 16 -0.32768000000000000000e5
-352 3 3 16 0.16384000000000000000e5
-352 3 9 14 0.32768000000000000000e5
-353 1 10 32 0.65536000000000000000e5
-353 1 16 31 -0.65536000000000000000e5
-354 1 7 22 -0.65536000000000000000e5
-354 1 10 33 0.65536000000000000000e5
-354 3 3 16 0.65536000000000000000e5
-354 3 6 19 0.65536000000000000000e5
-355 1 8 23 -0.65536000000000000000e5
-355 1 10 34 0.65536000000000000000e5
-355 1 11 26 0.32768000000000000000e5
-355 1 12 27 0.32768000000000000000e5
-355 1 16 31 -0.32768000000000000000e5
-355 1 22 29 -0.32768000000000000000e5
-355 3 6 19 0.32768000000000000000e5
-355 3 9 14 0.65536000000000000000e5
-355 4 6 10 0.32768000000000000000e5
-356 1 7 22 -0.65536000000000000000e5
-356 1 10 35 0.65536000000000000000e5
-356 3 3 16 0.65536000000000000000e5
-356 3 6 19 0.65536000000000000000e5
-356 3 14 19 0.65536000000000000000e5
-357 1 7 14 -0.32768000000000000000e5
-357 1 11 11 0.65536000000000000000e5
-358 1 4 15 -0.65536000000000000000e5
-358 1 11 12 0.65536000000000000000e5
-359 1 1 8 -0.40960000000000000000e4
-359 1 4 15 -0.32768000000000000000e5
-359 1 5 20 0.40960000000000000000e4
-359 1 6 21 0.16384000000000000000e5
-359 1 7 14 -0.32768000000000000000e5
-359 1 7 22 0.81920000000000000000e4
-359 1 9 24 -0.16384000000000000000e5
-359 1 10 25 -0.65536000000000000000e5
-359 1 11 13 0.65536000000000000000e5
-359 1 14 21 0.65536000000000000000e5
-359 2 1 15 -0.40960000000000000000e4
-359 2 2 16 0.81920000000000000000e4
-359 2 6 12 0.40960000000000000000e4
-359 2 9 15 -0.16384000000000000000e5
-359 2 10 12 0.16384000000000000000e5
-359 3 1 6 0.40960000000000000000e4
-359 3 5 10 -0.32768000000000000000e5
-359 4 6 6 -0.65536000000000000000e5
-360 1 8 15 -0.65536000000000000000e5
-360 1 11 14 0.65536000000000000000e5
-361 1 11 15 0.65536000000000000000e5
-361 1 13 14 -0.65536000000000000000e5
-362 1 6 21 -0.65536000000000000000e5
-362 1 11 16 0.65536000000000000000e5
-363 1 1 8 0.32768000000000000000e5
-363 1 5 20 -0.32768000000000000000e5
-363 1 6 21 -0.65536000000000000000e5
-363 1 11 17 0.65536000000000000000e5
-363 2 1 15 0.32768000000000000000e5
-363 2 6 12 -0.32768000000000000000e5
-363 3 1 6 -0.32768000000000000000e5
-364 1 7 22 -0.65536000000000000000e5
-364 1 11 18 0.65536000000000000000e5
-365 1 1 8 -0.32768000000000000000e5
-365 1 5 20 0.32768000000000000000e5
-365 1 6 21 0.65536000000000000000e5
-365 1 11 19 0.65536000000000000000e5
-365 1 11 26 -0.65536000000000000000e5
-365 1 12 27 -0.65536000000000000000e5
-365 2 1 15 -0.32768000000000000000e5
-365 2 6 12 0.32768000000000000000e5
-365 3 1 6 0.32768000000000000000e5
-365 3 3 16 0.65536000000000000000e5
-365 3 9 14 -0.13107200000000000000e6
-365 4 5 9 0.65536000000000000000e5
-366 1 1 8 0.16384000000000000000e5
-366 1 5 20 -0.16384000000000000000e5
-366 1 6 21 -0.65536000000000000000e5
-366 1 7 22 -0.32768000000000000000e5
-366 1 11 20 0.65536000000000000000e5
-366 2 1 15 0.16384000000000000000e5
-366 2 2 16 -0.32768000000000000000e5
-366 2 6 12 -0.16384000000000000000e5
-366 3 1 6 -0.16384000000000000000e5
-367 1 8 23 -0.65536000000000000000e5
-367 1 11 21 0.65536000000000000000e5
-368 1 8 23 0.65536000000000000000e5
-368 1 9 24 0.65536000000000000000e5
-368 1 11 22 0.65536000000000000000e5
-368 1 14 21 -0.13107200000000000000e6
-368 2 9 15 0.65536000000000000000e5
-369 1 1 8 0.81920000000000000000e4
-369 1 5 20 -0.81920000000000000000e4
-369 1 6 21 -0.32768000000000000000e5
-369 1 7 22 -0.16384000000000000000e5
-369 1 9 24 0.32768000000000000000e5
-369 1 11 23 0.65536000000000000000e5
-369 1 14 21 -0.65536000000000000000e5
-369 2 1 15 0.81920000000000000000e4
-369 2 2 16 -0.16384000000000000000e5
-369 2 6 12 -0.81920000000000000000e4
-369 2 9 15 0.32768000000000000000e5
-369 2 10 12 -0.32768000000000000000e5
-369 3 1 6 -0.81920000000000000000e4
-370 1 11 24 0.65536000000000000000e5
-370 1 14 21 -0.65536000000000000000e5
-371 1 8 15 -0.65536000000000000000e5
-371 1 11 25 0.65536000000000000000e5
-371 3 9 10 0.65536000000000000000e5
-372 1 7 22 -0.65536000000000000000e5
-372 1 11 27 0.65536000000000000000e5
-372 3 3 16 0.65536000000000000000e5
-373 1 11 28 0.65536000000000000000e5
-373 1 12 27 -0.65536000000000000000e5
-374 1 8 23 -0.65536000000000000000e5
-374 1 11 29 0.65536000000000000000e5
-374 3 9 14 0.65536000000000000000e5
-375 1 11 30 0.65536000000000000000e5
-375 1 13 28 -0.65536000000000000000e5
-376 1 11 31 0.65536000000000000000e5
-376 1 14 29 -0.65536000000000000000e5
-377 1 7 22 -0.65536000000000000000e5
-377 1 11 32 0.65536000000000000000e5
-377 3 3 16 0.65536000000000000000e5
-377 3 6 19 0.65536000000000000000e5
-378 1 11 33 0.65536000000000000000e5
-378 1 22 29 -0.65536000000000000000e5
-379 1 11 34 0.65536000000000000000e5
-379 1 23 30 -0.65536000000000000000e5
-380 1 11 35 0.65536000000000000000e5
-380 1 29 30 -0.65536000000000000000e5
-381 1 4 15 0.32768000000000000000e5
-381 1 7 14 0.32768000000000000000e5
-381 1 8 15 -0.65536000000000000000e5
-381 1 12 12 0.65536000000000000000e5
-381 2 9 9 0.65536000000000000000e5
-382 1 8 15 -0.65536000000000000000e5
-382 1 12 13 0.65536000000000000000e5
-383 1 1 8 0.32768000000000000000e5
-383 1 5 20 -0.32768000000000000000e5
-383 1 6 21 -0.65536000000000000000e5
-383 1 12 16 0.65536000000000000000e5
-383 2 1 15 0.32768000000000000000e5
-383 2 6 12 -0.32768000000000000000e5
-383 3 1 6 -0.32768000000000000000e5
-384 1 7 22 -0.65536000000000000000e5
-384 1 12 17 0.65536000000000000000e5
-385 1 1 8 -0.32768000000000000000e5
-385 1 5 20 0.32768000000000000000e5
-385 1 6 21 0.65536000000000000000e5
-385 1 11 26 -0.65536000000000000000e5
-385 1 12 18 0.65536000000000000000e5
-385 1 12 27 -0.65536000000000000000e5
-385 2 1 15 -0.32768000000000000000e5
-385 2 6 12 0.32768000000000000000e5
-385 3 1 6 0.32768000000000000000e5
-385 3 3 16 0.65536000000000000000e5
-385 3 9 14 -0.13107200000000000000e6
-385 4 5 9 0.65536000000000000000e5
-386 1 8 23 -0.65536000000000000000e5
-386 1 12 20 0.65536000000000000000e5
-387 1 8 23 0.65536000000000000000e5
-387 1 9 24 0.65536000000000000000e5
-387 1 12 21 0.65536000000000000000e5
-387 1 14 21 -0.13107200000000000000e6
-387 2 9 15 0.65536000000000000000e5
-388 1 9 24 -0.65536000000000000000e5
-388 1 12 22 0.65536000000000000000e5
-389 1 12 23 0.65536000000000000000e5
-389 1 14 21 -0.65536000000000000000e5
-390 1 9 25 -0.65536000000000000000e5
-390 1 12 24 0.65536000000000000000e5
-391 1 12 25 0.65536000000000000000e5
-391 1 15 22 -0.65536000000000000000e5
-392 1 7 22 -0.65536000000000000000e5
-392 1 12 26 0.65536000000000000000e5
-392 3 3 16 0.65536000000000000000e5
-393 1 7 22 0.65536000000000000000e5
-393 1 12 27 0.65536000000000000000e5
-393 1 12 28 0.65536000000000000000e5
-393 1 13 28 -0.13107200000000000000e6
-393 2 15 15 0.13107200000000000000e6
-393 3 3 16 -0.65536000000000000000e5
-394 1 12 29 0.65536000000000000000e5
-394 1 13 28 -0.65536000000000000000e5
-395 1 8 23 0.65536000000000000000e5
-395 1 12 30 0.65536000000000000000e5
-395 1 13 28 0.65536000000000000000e5
-395 1 14 29 -0.13107200000000000000e6
-395 2 9 19 0.65536000000000000000e5
-395 3 9 14 -0.65536000000000000000e5
-396 1 12 31 0.65536000000000000000e5
-396 1 22 25 -0.65536000000000000000e5
-397 1 12 32 0.65536000000000000000e5
-397 1 22 29 -0.65536000000000000000e5
-398 1 7 22 0.65536000000000000000e5
-398 1 12 33 0.65536000000000000000e5
-398 1 22 29 0.65536000000000000000e5
-398 1 23 30 -0.13107200000000000000e6
-398 2 16 18 0.65536000000000000000e5
-398 3 3 16 -0.65536000000000000000e5
-398 3 6 19 -0.65536000000000000000e5
-399 1 12 34 0.65536000000000000000e5
-399 1 25 28 -0.65536000000000000000e5
-400 1 1 8 -0.10240000000000000000e4
-400 1 4 15 -0.81920000000000000000e4
-400 1 5 20 0.10240000000000000000e4
-400 1 6 21 0.40960000000000000000e4
-400 1 7 14 -0.81920000000000000000e4
-400 1 7 22 0.20480000000000000000e4
-400 1 8 15 -0.16384000000000000000e5
-400 1 9 24 -0.40960000000000000000e4
-400 1 10 13 -0.16384000000000000000e5
-400 1 10 25 -0.16384000000000000000e5
-400 1 13 13 0.65536000000000000000e5
-400 1 14 21 0.16384000000000000000e5
-400 2 1 15 -0.10240000000000000000e4
-400 2 2 16 0.20480000000000000000e4
-400 2 6 12 0.10240000000000000000e4
-400 2 8 10 -0.16384000000000000000e5
-400 2 9 15 -0.40960000000000000000e4
-400 2 10 12 0.40960000000000000000e4
-400 3 1 6 0.10240000000000000000e4
-400 3 5 10 -0.81920000000000000000e4
-400 4 6 6 -0.16384000000000000000e5
-401 1 1 8 -0.10240000000000000000e4
-401 1 4 15 -0.81920000000000000000e4
-401 1 5 20 0.10240000000000000000e4
-401 1 6 21 0.40960000000000000000e4
-401 1 7 14 -0.81920000000000000000e4
-401 1 7 22 0.20480000000000000000e4
-401 1 8 15 -0.16384000000000000000e5
-401 1 9 24 -0.40960000000000000000e4
-401 1 10 13 -0.16384000000000000000e5
-401 1 10 25 -0.16384000000000000000e5
-401 1 12 15 -0.32768000000000000000e5
-401 1 13 14 -0.32768000000000000000e5
-401 1 13 15 0.65536000000000000000e5
-401 1 14 21 0.16384000000000000000e5
-401 2 1 15 -0.10240000000000000000e4
-401 2 2 16 0.20480000000000000000e4
-401 2 6 12 0.10240000000000000000e4
-401 2 8 10 -0.16384000000000000000e5
-401 2 9 15 -0.40960000000000000000e4
-401 2 10 10 -0.65536000000000000000e5
-401 2 10 12 0.40960000000000000000e4
-401 3 1 6 0.10240000000000000000e4
-401 3 5 10 -0.81920000000000000000e4
-401 4 6 6 -0.16384000000000000000e5
-402 1 1 8 -0.16384000000000000000e5
-402 1 5 20 0.16384000000000000000e5
-402 1 6 21 0.65536000000000000000e5
-402 1 7 22 0.32768000000000000000e5
-402 1 8 23 0.65536000000000000000e5
-402 1 13 16 0.65536000000000000000e5
-402 1 13 20 -0.13107200000000000000e6
-402 2 1 15 -0.16384000000000000000e5
-402 2 2 16 0.32768000000000000000e5
-402 2 6 12 0.16384000000000000000e5
-402 2 8 14 0.65536000000000000000e5
-402 3 1 6 0.16384000000000000000e5
-403 1 1 8 0.16384000000000000000e5
-403 1 5 20 -0.16384000000000000000e5
-403 1 6 21 -0.65536000000000000000e5
-403 1 7 22 -0.32768000000000000000e5
-403 1 13 17 0.65536000000000000000e5
-403 2 1 15 0.16384000000000000000e5
-403 2 2 16 -0.32768000000000000000e5
-403 2 6 12 -0.16384000000000000000e5
-403 3 1 6 -0.16384000000000000000e5
-404 1 8 23 -0.65536000000000000000e5
-404 1 13 18 0.65536000000000000000e5
-405 1 8 23 0.65536000000000000000e5
-405 1 9 24 0.65536000000000000000e5
-405 1 13 19 0.65536000000000000000e5
-405 1 14 21 -0.13107200000000000000e6
-405 2 9 15 0.65536000000000000000e5
-406 1 1 8 0.81920000000000000000e4
-406 1 5 20 -0.81920000000000000000e4
-406 1 6 21 -0.32768000000000000000e5
-406 1 7 22 -0.16384000000000000000e5
-406 1 9 24 0.32768000000000000000e5
-406 1 13 21 0.65536000000000000000e5
-406 1 14 21 -0.65536000000000000000e5
-406 2 1 15 0.81920000000000000000e4
-406 2 2 16 -0.16384000000000000000e5
-406 2 6 12 -0.81920000000000000000e4
-406 2 9 15 0.32768000000000000000e5
-406 2 10 12 -0.32768000000000000000e5
-406 3 1 6 -0.81920000000000000000e4
-407 1 13 22 0.65536000000000000000e5
-407 1 14 21 -0.65536000000000000000e5
-408 1 10 25 -0.65536000000000000000e5
-408 1 13 23 0.65536000000000000000e5
-409 1 8 15 -0.65536000000000000000e5
-409 1 13 24 0.65536000000000000000e5
-409 3 9 10 0.65536000000000000000e5
-410 1 8 15 -0.32768000000000000000e5
-410 1 10 25 -0.32768000000000000000e5
-410 1 13 25 0.65536000000000000000e5
-410 1 15 22 -0.32768000000000000000e5
-410 2 10 16 -0.32768000000000000000e5
-410 3 9 10 0.32768000000000000000e5
-411 1 7 22 -0.32768000000000000000e5
-411 1 11 26 -0.32768000000000000000e5
-411 1 13 26 0.65536000000000000000e5
-411 1 16 23 -0.32768000000000000000e5
-411 2 5 19 -0.32768000000000000000e5
-411 3 3 16 0.32768000000000000000e5
-412 1 8 23 -0.65536000000000000000e5
-412 1 13 27 0.65536000000000000000e5
-412 3 9 14 0.65536000000000000000e5
-413 1 7 22 -0.16384000000000000000e5
-413 1 8 23 -0.32768000000000000000e5
-413 1 11 26 -0.16384000000000000000e5
-413 1 13 28 -0.32768000000000000000e5
-413 1 13 29 0.65536000000000000000e5
-413 1 16 23 -0.16384000000000000000e5
-413 2 5 19 -0.16384000000000000000e5
-413 2 14 16 -0.32768000000000000000e5
-413 3 3 16 0.16384000000000000000e5
-413 3 9 14 0.32768000000000000000e5
-414 1 13 30 0.65536000000000000000e5
-414 1 14 29 -0.65536000000000000000e5
-415 1 7 22 -0.81920000000000000000e4
-415 1 8 23 -0.16384000000000000000e5
-415 1 11 26 -0.81920000000000000000e4
-415 1 13 28 -0.16384000000000000000e5
-415 1 13 31 0.65536000000000000000e5
-415 1 14 29 -0.32768000000000000000e5
-415 1 16 23 -0.81920000000000000000e4
-415 1 22 25 -0.32768000000000000000e5
-415 2 5 19 -0.81920000000000000000e4
-415 2 14 16 -0.16384000000000000000e5
-415 2 16 16 -0.65536000000000000000e5
-415 3 3 16 0.81920000000000000000e4
-415 3 9 14 0.16384000000000000000e5
-416 1 8 23 -0.65536000000000000000e5
-416 1 11 26 0.32768000000000000000e5
-416 1 12 27 0.32768000000000000000e5
-416 1 13 32 0.65536000000000000000e5
-416 1 16 31 -0.32768000000000000000e5
-416 1 22 29 -0.32768000000000000000e5
-416 3 6 19 0.32768000000000000000e5
-416 3 9 14 0.65536000000000000000e5
-416 4 6 10 0.32768000000000000000e5
-417 1 13 33 0.65536000000000000000e5
-417 1 23 30 -0.65536000000000000000e5
-418 1 13 34 0.65536000000000000000e5
-418 1 14 29 -0.65536000000000000000e5
-418 3 10 19 0.65536000000000000000e5
-419 1 13 35 0.65536000000000000000e5
-419 1 25 32 -0.65536000000000000000e5
-420 1 12 15 -0.32768000000000000000e5
-420 1 14 14 0.65536000000000000000e5
-421 1 1 8 0.16384000000000000000e5
-421 1 5 20 -0.16384000000000000000e5
-421 1 6 21 -0.65536000000000000000e5
-421 1 7 22 -0.32768000000000000000e5
-421 1 14 16 0.65536000000000000000e5
-421 2 1 15 0.16384000000000000000e5
-421 2 2 16 -0.32768000000000000000e5
-421 2 6 12 -0.16384000000000000000e5
-421 3 1 6 -0.16384000000000000000e5
-422 1 8 23 -0.65536000000000000000e5
-422 1 14 17 0.65536000000000000000e5
-423 1 8 23 0.65536000000000000000e5
-423 1 9 24 0.65536000000000000000e5
-423 1 14 18 0.65536000000000000000e5
-423 1 14 21 -0.13107200000000000000e6
-423 2 9 15 0.65536000000000000000e5
-424 1 9 24 -0.65536000000000000000e5
-424 1 14 19 0.65536000000000000000e5
-425 1 1 8 0.81920000000000000000e4
-425 1 5 20 -0.81920000000000000000e4
-425 1 6 21 -0.32768000000000000000e5
-425 1 7 22 -0.16384000000000000000e5
-425 1 9 24 0.32768000000000000000e5
-425 1 14 20 0.65536000000000000000e5
-425 1 14 21 -0.65536000000000000000e5
-425 2 1 15 0.81920000000000000000e4
-425 2 2 16 -0.16384000000000000000e5
-425 2 6 12 -0.81920000000000000000e4
-425 2 9 15 0.32768000000000000000e5
-425 2 10 12 -0.32768000000000000000e5
-425 3 1 6 -0.81920000000000000000e4
-426 1 9 25 -0.65536000000000000000e5
-426 1 14 22 0.65536000000000000000e5
-427 1 8 15 -0.65536000000000000000e5
-427 1 14 23 0.65536000000000000000e5
-427 3 9 10 0.65536000000000000000e5
-428 1 14 24 0.65536000000000000000e5
-428 1 15 22 -0.65536000000000000000e5
-429 1 8 23 -0.65536000000000000000e5
-429 1 14 26 0.65536000000000000000e5
-429 3 9 14 0.65536000000000000000e5
-430 1 13 28 -0.65536000000000000000e5
-430 1 14 27 0.65536000000000000000e5
-431 1 8 23 0.65536000000000000000e5
-431 1 13 28 0.65536000000000000000e5
-431 1 14 28 0.65536000000000000000e5
-431 1 14 29 -0.13107200000000000000e6
-431 2 9 19 0.65536000000000000000e5
-431 3 9 14 -0.65536000000000000000e5
-432 1 14 30 0.65536000000000000000e5
-432 1 22 25 -0.65536000000000000000e5
-433 1 14 31 0.65536000000000000000e5
-433 1 15 30 -0.65536000000000000000e5
-434 1 14 32 0.65536000000000000000e5
-434 1 23 30 -0.65536000000000000000e5
-435 1 14 33 0.65536000000000000000e5
-435 1 25 28 -0.65536000000000000000e5
-436 1 14 34 0.65536000000000000000e5
-436 1 24 31 -0.65536000000000000000e5
-437 1 14 35 0.65536000000000000000e5
-437 1 30 31 -0.65536000000000000000e5
-438 1 13 20 -0.65536000000000000000e5
-438 1 15 16 0.65536000000000000000e5
-439 1 1 8 0.81920000000000000000e4
-439 1 5 20 -0.81920000000000000000e4
-439 1 6 21 -0.32768000000000000000e5
-439 1 7 22 -0.16384000000000000000e5
-439 1 9 24 0.32768000000000000000e5
-439 1 14 21 -0.65536000000000000000e5
-439 1 15 17 0.65536000000000000000e5
-439 2 1 15 0.81920000000000000000e4
-439 2 2 16 -0.16384000000000000000e5
-439 2 6 12 -0.81920000000000000000e4
-439 2 9 15 0.32768000000000000000e5
-439 2 10 12 -0.32768000000000000000e5
-439 3 1 6 -0.81920000000000000000e4
-440 1 14 21 -0.65536000000000000000e5
-440 1 15 18 0.65536000000000000000e5
-441 1 9 25 -0.65536000000000000000e5
-441 1 15 19 0.65536000000000000000e5
-442 1 10 25 -0.65536000000000000000e5
-442 1 15 20 0.65536000000000000000e5
-443 1 8 15 -0.65536000000000000000e5
-443 1 15 21 0.65536000000000000000e5
-443 3 9 10 0.65536000000000000000e5
-444 1 8 15 -0.32768000000000000000e5
-444 1 10 25 -0.32768000000000000000e5
-444 1 15 22 -0.32768000000000000000e5
-444 1 15 23 0.65536000000000000000e5
-444 2 10 16 -0.32768000000000000000e5
-444 3 9 10 0.32768000000000000000e5
-445 1 14 25 -0.65536000000000000000e5
-445 1 15 24 0.65536000000000000000e5
-446 1 7 22 -0.16384000000000000000e5
-446 1 8 23 -0.32768000000000000000e5
-446 1 11 26 -0.16384000000000000000e5
-446 1 13 28 -0.32768000000000000000e5
-446 1 15 26 0.65536000000000000000e5
-446 1 16 23 -0.16384000000000000000e5
-446 2 5 19 -0.16384000000000000000e5
-446 2 14 16 -0.32768000000000000000e5
-446 3 3 16 0.16384000000000000000e5
-446 3 9 14 0.32768000000000000000e5
-447 1 14 29 -0.65536000000000000000e5
-447 1 15 27 0.65536000000000000000e5
-448 1 15 28 0.65536000000000000000e5
-448 1 22 25 -0.65536000000000000000e5
-449 1 7 22 -0.81920000000000000000e4
-449 1 8 23 -0.16384000000000000000e5
-449 1 11 26 -0.81920000000000000000e4
-449 1 13 28 -0.16384000000000000000e5
-449 1 14 29 -0.32768000000000000000e5
-449 1 15 29 0.65536000000000000000e5
-449 1 16 23 -0.81920000000000000000e4
-449 1 22 25 -0.32768000000000000000e5
-449 2 5 19 -0.81920000000000000000e4
-449 2 14 16 -0.16384000000000000000e5
-449 2 16 16 -0.65536000000000000000e5
-449 3 3 16 0.81920000000000000000e4
-449 3 9 14 0.16384000000000000000e5
-450 1 15 31 0.65536000000000000000e5
-450 1 25 25 -0.13107200000000000000e6
-451 1 14 29 -0.65536000000000000000e5
-451 1 15 32 0.65536000000000000000e5
-451 3 10 19 0.65536000000000000000e5
-452 1 15 33 0.65536000000000000000e5
-452 1 24 31 -0.65536000000000000000e5
-453 1 15 35 0.65536000000000000000e5
-453 1 25 34 -0.65536000000000000000e5
-454 1 1 8 -0.13107200000000000000e6
-454 1 2 9 -0.13107200000000000000e6
-454 1 2 33 -0.32768000000000000000e5
-454 1 3 26 0.32768000000000000000e5
-454 1 3 34 0.65536000000000000000e5
-454 1 4 35 -0.32768000000000000000e5
-454 1 6 21 0.13107200000000000000e6
-454 1 16 16 0.65536000000000000000e5
-454 2 1 15 -0.65536000000000000000e5
-454 2 3 17 0.32768000000000000000e5
-454 2 11 11 0.65536000000000000000e5
-454 2 11 17 -0.32768000000000000000e5
-454 2 12 18 -0.32768000000000000000e5
-454 3 1 6 0.13107200000000000000e6
-454 3 1 14 0.65536000000000000000e5
-454 3 2 7 0.13107200000000000000e6
-454 3 2 15 0.65536000000000000000e5
-454 3 4 17 0.32768000000000000000e5
-454 3 6 11 -0.65536000000000000000e5
-454 3 13 18 -0.32768000000000000000e5
-454 4 7 7 -0.65536000000000000000e5
-455 1 1 8 0.13107200000000000000e6
-455 1 2 9 0.26214400000000000000e6
-455 1 2 33 0.65536000000000000000e5
-455 1 3 34 -0.13107200000000000000e6
-455 1 4 35 0.65536000000000000000e5
-455 1 6 21 -0.26214400000000000000e6
-455 1 16 17 0.65536000000000000000e5
-455 2 1 15 0.13107200000000000000e6
-455 2 3 17 -0.65536000000000000000e5
-455 2 11 17 0.65536000000000000000e5
-455 2 12 18 0.65536000000000000000e5
-455 3 1 6 -0.13107200000000000000e6
-455 3 2 7 -0.26214400000000000000e6
-455 3 2 15 -0.13107200000000000000e6
-455 3 4 17 -0.65536000000000000000e5
-455 3 6 11 0.13107200000000000000e6
-455 3 13 18 0.65536000000000000000e5
-455 4 7 7 0.13107200000000000000e6
-456 1 3 26 -0.65536000000000000000e5
-456 1 16 18 0.65536000000000000000e5
-457 1 2 9 -0.13107200000000000000e6
-457 1 2 33 -0.65536000000000000000e5
-457 1 3 26 0.65536000000000000000e5
-457 1 3 34 0.13107200000000000000e6
-457 1 4 35 -0.65536000000000000000e5
-457 1 16 19 0.65536000000000000000e5
-457 2 3 17 0.65536000000000000000e5
-457 2 12 18 -0.65536000000000000000e5
-457 3 2 7 0.13107200000000000000e6
-457 3 2 15 0.13107200000000000000e6
-457 3 4 17 0.65536000000000000000e5
-457 3 13 18 -0.65536000000000000000e5
-458 1 1 8 -0.65536000000000000000e5
-458 1 16 20 0.65536000000000000000e5
-458 3 1 6 0.65536000000000000000e5
-458 3 1 14 0.65536000000000000000e5
-459 1 1 8 0.65536000000000000000e5
-459 1 2 9 0.65536000000000000000e5
-459 1 6 21 -0.13107200000000000000e6
-459 1 16 21 0.65536000000000000000e5
-459 2 1 15 0.65536000000000000000e5
-459 3 1 6 -0.65536000000000000000e5
-459 3 2 7 -0.65536000000000000000e5
-459 3 6 11 0.65536000000000000000e5
-460 1 2 9 -0.65536000000000000000e5
-460 1 16 22 0.65536000000000000000e5
-460 3 2 7 0.65536000000000000000e5
-460 3 2 15 0.65536000000000000000e5
-461 1 11 26 -0.65536000000000000000e5
-461 1 16 24 0.65536000000000000000e5
-462 1 7 22 -0.32768000000000000000e5
-462 1 11 26 -0.32768000000000000000e5
-462 1 16 23 -0.32768000000000000000e5
-462 1 16 25 0.65536000000000000000e5
-462 2 5 19 -0.32768000000000000000e5
-462 3 3 16 0.32768000000000000000e5
-463 1 1 32 -0.65536000000000000000e5
-463 1 16 26 0.65536000000000000000e5
-464 1 3 26 -0.65536000000000000000e5
-464 1 16 27 0.65536000000000000000e5
-464 3 11 12 0.65536000000000000000e5
-465 1 2 33 -0.65536000000000000000e5
-465 1 16 28 0.65536000000000000000e5
-466 1 1 32 -0.32768000000000000000e5
-466 1 2 33 -0.32768000000000000000e5
-466 1 3 26 -0.32768000000000000000e5
-466 1 16 29 0.65536000000000000000e5
-466 2 11 17 -0.32768000000000000000e5
-466 3 11 12 0.32768000000000000000e5
-467 1 2 9 -0.65536000000000000000e5
-467 1 16 30 0.65536000000000000000e5
-467 3 2 7 0.65536000000000000000e5
-467 3 2 15 0.65536000000000000000e5
-467 3 5 18 0.65536000000000000000e5
-468 1 16 32 0.65536000000000000000e5
-468 1 17 32 0.65536000000000000000e5
-468 1 26 29 -0.13107200000000000000e6
-468 1 26 33 0.65536000000000000000e5
-468 2 17 17 0.13107200000000000000e6
-468 3 17 18 0.65536000000000000000e5
-469 1 16 33 0.65536000000000000000e5
-469 1 17 32 -0.65536000000000000000e5
-470 1 16 34 0.65536000000000000000e5
-470 1 26 29 -0.65536000000000000000e5
-471 1 3 26 -0.32768000000000000000e5
-471 1 17 17 0.65536000000000000000e5
-472 1 2 9 -0.13107200000000000000e6
-472 1 2 33 -0.65536000000000000000e5
-472 1 3 26 0.65536000000000000000e5
-472 1 3 34 0.13107200000000000000e6
-472 1 4 35 -0.65536000000000000000e5
-472 1 17 18 0.65536000000000000000e5
-472 2 3 17 0.65536000000000000000e5
-472 2 12 18 -0.65536000000000000000e5
-472 3 2 7 0.13107200000000000000e6
-472 3 2 15 0.13107200000000000000e6
-472 3 4 17 0.65536000000000000000e5
-472 3 13 18 -0.65536000000000000000e5
-473 1 2 33 0.65536000000000000000e5
-473 1 3 34 -0.13107200000000000000e6
-473 1 4 35 0.65536000000000000000e5
-473 1 17 19 0.65536000000000000000e5
-473 2 12 18 0.65536000000000000000e5
-473 3 4 17 -0.65536000000000000000e5
-473 3 13 18 0.65536000000000000000e5
-474 1 1 8 0.65536000000000000000e5
-474 1 2 9 0.65536000000000000000e5
-474 1 6 21 -0.13107200000000000000e6
-474 1 17 20 0.65536000000000000000e5
-474 2 1 15 0.65536000000000000000e5
-474 3 1 6 -0.65536000000000000000e5
-474 3 2 7 -0.65536000000000000000e5
-474 3 6 11 0.65536000000000000000e5
-475 1 2 9 -0.65536000000000000000e5
-475 1 17 21 0.65536000000000000000e5
-475 3 2 7 0.65536000000000000000e5
-475 3 2 15 0.65536000000000000000e5
-476 1 1 8 -0.65536000000000000000e5
-476 1 6 21 0.13107200000000000000e6
-476 1 11 26 -0.13107200000000000000e6
-476 1 17 22 0.65536000000000000000e5
-476 2 1 15 -0.65536000000000000000e5
-476 2 6 12 0.65536000000000000000e5
-476 3 1 6 0.65536000000000000000e5
-476 3 2 15 -0.65536000000000000000e5
-476 3 6 11 -0.65536000000000000000e5
-476 4 4 8 -0.65536000000000000000e5
-477 1 11 26 -0.65536000000000000000e5
-477 1 17 23 0.65536000000000000000e5
-478 1 7 22 -0.65536000000000000000e5
-478 1 17 24 0.65536000000000000000e5
-478 3 3 16 0.65536000000000000000e5
-479 1 8 23 -0.65536000000000000000e5
-479 1 17 25 0.65536000000000000000e5
-479 3 9 14 0.65536000000000000000e5
-480 1 3 26 -0.65536000000000000000e5
-480 1 17 26 0.65536000000000000000e5
-480 3 11 12 0.65536000000000000000e5
-481 1 2 33 -0.65536000000000000000e5
-481 1 17 27 0.65536000000000000000e5
-482 1 2 33 0.65536000000000000000e5
-482 1 3 34 -0.13107200000000000000e6
-482 1 4 35 0.65536000000000000000e5
-482 1 17 28 0.65536000000000000000e5
-482 2 12 18 0.65536000000000000000e5
-482 3 13 18 0.65536000000000000000e5
-483 1 2 9 -0.65536000000000000000e5
-483 1 17 29 0.65536000000000000000e5
-483 3 2 7 0.65536000000000000000e5
-483 3 2 15 0.65536000000000000000e5
-483 3 5 18 0.65536000000000000000e5
-484 1 3 34 -0.65536000000000000000e5
-484 1 17 30 0.65536000000000000000e5
-485 1 7 22 -0.65536000000000000000e5
-485 1 17 31 0.65536000000000000000e5
-485 3 3 16 0.65536000000000000000e5
-485 3 6 19 0.65536000000000000000e5
-486 1 17 33 0.65536000000000000000e5
-486 1 26 33 -0.65536000000000000000e5
-486 3 17 18 -0.65536000000000000000e5
-487 1 2 9 -0.65536000000000000000e5
-487 1 3 34 -0.65536000000000000000e5
-487 1 17 34 0.65536000000000000000e5
-487 1 26 29 0.65536000000000000000e5
-487 2 6 20 -0.65536000000000000000e5
-487 2 14 20 0.65536000000000000000e5
-487 3 2 7 0.65536000000000000000e5
-487 3 2 15 0.65536000000000000000e5
-487 3 5 18 0.65536000000000000000e5
-487 3 7 20 -0.65536000000000000000e5
-487 3 14 19 0.13107200000000000000e6
-488 1 17 35 0.65536000000000000000e5
-488 1 26 33 -0.65536000000000000000e5
-489 1 2 33 0.32768000000000000000e5
-489 1 3 34 -0.65536000000000000000e5
-489 1 4 35 0.32768000000000000000e5
-489 1 18 18 0.65536000000000000000e5
-489 2 12 18 0.32768000000000000000e5
-489 3 4 17 -0.32768000000000000000e5
-489 3 13 18 0.32768000000000000000e5
-490 1 1 8 -0.13107200000000000000e6
-490 1 2 9 0.13107200000000000000e6
-490 1 3 26 -0.65536000000000000000e5
-490 1 6 21 0.26214400000000000000e6
-490 1 11 26 -0.26214400000000000000e6
-490 1 18 19 0.65536000000000000000e5
-490 2 1 15 -0.13107200000000000000e6
-490 2 3 17 -0.65536000000000000000e5
-490 2 6 12 0.13107200000000000000e6
-490 2 12 18 0.65536000000000000000e5
-490 3 1 6 0.13107200000000000000e6
-490 3 2 7 -0.13107200000000000000e6
-490 3 2 15 -0.26214400000000000000e6
-490 3 6 11 -0.13107200000000000000e6
-490 4 4 8 -0.13107200000000000000e6
-490 4 8 8 0.13107200000000000000e6
-491 1 2 9 -0.65536000000000000000e5
-491 1 18 20 0.65536000000000000000e5
-491 3 2 7 0.65536000000000000000e5
-491 3 2 15 0.65536000000000000000e5
-492 1 1 8 -0.65536000000000000000e5
-492 1 6 21 0.13107200000000000000e6
-492 1 11 26 -0.13107200000000000000e6
-492 1 18 21 0.65536000000000000000e5
-492 2 1 15 -0.65536000000000000000e5
-492 2 6 12 0.65536000000000000000e5
-492 3 1 6 0.65536000000000000000e5
-492 3 2 15 -0.65536000000000000000e5
-492 3 6 11 -0.65536000000000000000e5
-492 4 4 8 -0.65536000000000000000e5
-493 1 1 8 -0.65536000000000000000e5
-493 1 2 9 0.65536000000000000000e5
-493 1 2 33 0.32768000000000000000e5
-493 1 3 26 -0.32768000000000000000e5
-493 1 3 34 -0.65536000000000000000e5
-493 1 4 35 0.32768000000000000000e5
-493 1 5 28 -0.32768000000000000000e5
-493 1 6 21 0.13107200000000000000e6
-493 1 11 26 -0.13107200000000000000e6
-493 1 18 22 0.65536000000000000000e5
-493 2 1 15 -0.65536000000000000000e5
-493 2 3 17 -0.32768000000000000000e5
-493 2 4 18 -0.32768000000000000000e5
-493 2 6 12 0.65536000000000000000e5
-493 2 12 18 0.65536000000000000000e5
-493 3 1 6 0.65536000000000000000e5
-493 3 2 7 -0.65536000000000000000e5
-493 3 2 15 -0.13107200000000000000e6
-493 3 4 17 -0.32768000000000000000e5
-493 3 6 11 -0.65536000000000000000e5
-493 3 13 18 0.32768000000000000000e5
-493 4 4 8 -0.65536000000000000000e5
-493 4 8 8 0.65536000000000000000e5
-494 1 7 22 -0.65536000000000000000e5
-494 1 18 23 0.65536000000000000000e5
-494 3 3 16 0.65536000000000000000e5
-495 1 12 27 -0.65536000000000000000e5
-495 1 18 24 0.65536000000000000000e5
-496 1 13 28 -0.65536000000000000000e5
-496 1 18 25 0.65536000000000000000e5
-497 1 2 33 -0.65536000000000000000e5
-497 1 18 26 0.65536000000000000000e5
-498 1 2 33 0.65536000000000000000e5
-498 1 3 34 -0.13107200000000000000e6
-498 1 4 35 0.65536000000000000000e5
-498 1 18 27 0.65536000000000000000e5
-498 2 12 18 0.65536000000000000000e5
-498 3 13 18 0.65536000000000000000e5
-499 1 4 35 -0.65536000000000000000e5
-499 1 18 28 0.65536000000000000000e5
-499 3 13 18 -0.65536000000000000000e5
-500 1 3 34 -0.65536000000000000000e5
-500 1 18 29 0.65536000000000000000e5
-501 1 2 9 0.65536000000000000000e5
-501 1 3 34 0.65536000000000000000e5
-501 1 7 22 -0.13107200000000000000e6
-501 1 18 30 0.65536000000000000000e5
-501 2 6 20 0.65536000000000000000e5
-501 3 2 7 -0.65536000000000000000e5
-501 3 2 15 -0.65536000000000000000e5
-501 3 3 16 0.13107200000000000000e6
-501 3 5 18 -0.65536000000000000000e5
-501 3 6 19 0.13107200000000000000e6
-502 1 18 31 0.65536000000000000000e5
-502 1 22 29 -0.65536000000000000000e5
-503 1 18 32 0.65536000000000000000e5
-503 1 26 33 -0.65536000000000000000e5
-503 3 17 18 -0.65536000000000000000e5
-504 1 4 35 -0.65536000000000000000e5
-504 1 18 33 0.65536000000000000000e5
-505 1 2 9 0.65536000000000000000e5
-505 1 3 34 0.65536000000000000000e5
-505 1 7 22 -0.13107200000000000000e6
-505 1 18 34 0.65536000000000000000e5
-505 2 6 20 0.65536000000000000000e5
-505 3 2 7 -0.65536000000000000000e5
-505 3 2 15 -0.65536000000000000000e5
-505 3 3 16 0.13107200000000000000e6
-505 3 5 18 -0.65536000000000000000e5
-505 3 6 19 0.13107200000000000000e6
-505 3 7 20 0.65536000000000000000e5
-506 1 2 9 0.13107200000000000000e6
-506 1 3 34 0.13107200000000000000e6
-506 1 4 35 -0.65536000000000000000e5
-506 1 16 35 0.65536000000000000000e5
-506 1 17 32 -0.65536000000000000000e5
-506 1 18 35 0.65536000000000000000e5
-506 1 20 35 -0.13107200000000000000e6
-506 1 26 29 -0.13107200000000000000e6
-506 2 6 20 0.13107200000000000000e6
-506 2 14 20 -0.13107200000000000000e6
-506 3 2 7 -0.13107200000000000000e6
-506 3 2 15 -0.13107200000000000000e6
-506 3 5 18 -0.13107200000000000000e6
-506 3 7 20 0.13107200000000000000e6
-506 3 14 19 -0.26214400000000000000e6
-506 3 17 18 -0.65536000000000000000e5
-506 4 10 10 -0.13107200000000000000e6
-507 1 5 28 -0.32768000000000000000e5
-507 1 19 19 0.65536000000000000000e5
-508 1 1 8 -0.65536000000000000000e5
-508 1 6 21 0.13107200000000000000e6
-508 1 11 26 -0.13107200000000000000e6
-508 1 19 20 0.65536000000000000000e5
-508 2 1 15 -0.65536000000000000000e5
-508 2 6 12 0.65536000000000000000e5
-508 3 1 6 0.65536000000000000000e5
-508 3 2 15 -0.65536000000000000000e5
-508 3 6 11 -0.65536000000000000000e5
-508 4 4 8 -0.65536000000000000000e5
-509 1 1 8 -0.65536000000000000000e5
-509 1 2 9 0.65536000000000000000e5
-509 1 2 33 0.32768000000000000000e5
-509 1 3 26 -0.32768000000000000000e5
-509 1 3 34 -0.65536000000000000000e5
-509 1 4 35 0.32768000000000000000e5
-509 1 5 28 -0.32768000000000000000e5
-509 1 6 21 0.13107200000000000000e6
-509 1 11 26 -0.13107200000000000000e6
-509 1 19 21 0.65536000000000000000e5
-509 2 1 15 -0.65536000000000000000e5
-509 2 3 17 -0.32768000000000000000e5
-509 2 4 18 -0.32768000000000000000e5
-509 2 6 12 0.65536000000000000000e5
-509 2 12 18 0.65536000000000000000e5
-509 3 1 6 0.65536000000000000000e5
-509 3 2 7 -0.65536000000000000000e5
-509 3 2 15 -0.13107200000000000000e6
-509 3 4 17 -0.32768000000000000000e5
-509 3 6 11 -0.65536000000000000000e5
-509 3 13 18 0.32768000000000000000e5
-509 4 4 8 -0.65536000000000000000e5
-509 4 8 8 0.65536000000000000000e5
-510 1 12 27 -0.65536000000000000000e5
-510 1 19 23 0.65536000000000000000e5
-511 1 7 22 0.65536000000000000000e5
-511 1 12 27 0.65536000000000000000e5
-511 1 13 28 -0.13107200000000000000e6
-511 1 19 24 0.65536000000000000000e5
-511 2 15 15 0.13107200000000000000e6
-511 3 3 16 -0.65536000000000000000e5
-512 1 8 23 0.65536000000000000000e5
-512 1 13 28 0.65536000000000000000e5
-512 1 14 29 -0.13107200000000000000e6
-512 1 19 25 0.65536000000000000000e5
-512 2 9 19 0.65536000000000000000e5
-512 3 9 14 -0.65536000000000000000e5
-513 1 2 33 0.65536000000000000000e5
-513 1 3 34 -0.13107200000000000000e6
-513 1 4 35 0.65536000000000000000e5
-513 1 19 26 0.65536000000000000000e5
-513 2 12 18 0.65536000000000000000e5
-513 3 13 18 0.65536000000000000000e5
-514 1 4 35 -0.65536000000000000000e5
-514 1 19 27 0.65536000000000000000e5
-514 3 13 18 -0.65536000000000000000e5
-515 1 2 9 0.13107200000000000000e6
-515 1 2 33 -0.65536000000000000000e5
-515 1 3 34 0.26214400000000000000e6
-515 1 7 22 -0.26214400000000000000e6
-515 1 19 28 0.65536000000000000000e5
-515 2 4 20 0.65536000000000000000e5
-515 2 6 20 0.13107200000000000000e6
-515 2 12 18 -0.65536000000000000000e5
-515 3 2 7 -0.13107200000000000000e6
-515 3 2 15 -0.13107200000000000000e6
-515 3 3 16 0.26214400000000000000e6
-515 3 5 18 -0.13107200000000000000e6
-515 3 6 19 0.26214400000000000000e6
-516 1 2 9 0.65536000000000000000e5
-516 1 3 34 0.65536000000000000000e5
-516 1 7 22 -0.13107200000000000000e6
-516 1 19 29 0.65536000000000000000e5
-516 2 6 20 0.65536000000000000000e5
-516 3 2 7 -0.65536000000000000000e5
-516 3 2 15 -0.65536000000000000000e5
-516 3 3 16 0.13107200000000000000e6
-516 3 5 18 -0.65536000000000000000e5
-516 3 6 19 0.13107200000000000000e6
-517 1 2 9 -0.65536000000000000000e5
-517 1 7 22 0.13107200000000000000e6
-517 1 19 30 0.65536000000000000000e5
-517 1 22 29 -0.13107200000000000000e6
-517 2 6 20 -0.65536000000000000000e5
-517 2 13 19 0.65536000000000000000e5
-517 3 2 7 0.65536000000000000000e5
-517 3 2 15 0.65536000000000000000e5
-517 3 3 16 -0.13107200000000000000e6
-517 3 5 18 0.65536000000000000000e5
-517 3 6 19 -0.13107200000000000000e6
-518 1 7 22 0.65536000000000000000e5
-518 1 19 31 0.65536000000000000000e5
-518 1 22 29 0.65536000000000000000e5
-518 1 23 30 -0.13107200000000000000e6
-518 2 16 18 0.65536000000000000000e5
-518 3 3 16 -0.65536000000000000000e5
-518 3 6 19 -0.65536000000000000000e5
-519 1 4 35 -0.65536000000000000000e5
-519 1 19 32 0.65536000000000000000e5
-520 1 2 9 0.13107200000000000000e6
-520 1 3 34 0.13107200000000000000e6
-520 1 4 35 0.65536000000000000000e5
-520 1 7 22 -0.26214400000000000000e6
-520 1 19 33 0.65536000000000000000e5
-520 1 26 33 0.65536000000000000000e5
-520 2 6 20 0.13107200000000000000e6
-520 2 18 18 0.13107200000000000000e6
-520 3 2 7 -0.13107200000000000000e6
-520 3 2 15 -0.13107200000000000000e6
-520 3 3 16 0.26214400000000000000e6
-520 3 5 18 -0.13107200000000000000e6
-520 3 6 19 0.26214400000000000000e6
-520 3 7 20 0.13107200000000000000e6
-520 3 17 18 0.65536000000000000000e5
-521 1 4 35 0.65536000000000000000e5
-521 1 7 22 -0.26214400000000000000e6
-521 1 16 35 -0.65536000000000000000e5
-521 1 17 32 0.65536000000000000000e5
-521 1 19 35 0.65536000000000000000e5
-521 1 20 35 0.13107200000000000000e6
-521 1 26 29 0.13107200000000000000e6
-521 1 26 33 0.65536000000000000000e5
-521 2 14 20 0.13107200000000000000e6
-521 2 18 20 0.65536000000000000000e5
-521 3 3 16 0.26214400000000000000e6
-521 3 6 19 0.26214400000000000000e6
-521 3 14 19 0.26214400000000000000e6
-521 3 15 20 0.13107200000000000000e6
-521 3 17 18 0.65536000000000000000e5
-521 4 10 10 0.13107200000000000000e6
-522 1 16 23 -0.32768000000000000000e5
-522 1 20 20 0.65536000000000000000e5
-523 1 11 26 -0.65536000000000000000e5
-523 1 20 21 0.65536000000000000000e5
-524 1 7 22 -0.65536000000000000000e5
-524 1 20 22 0.65536000000000000000e5
-524 3 3 16 0.65536000000000000000e5
-525 1 7 22 -0.32768000000000000000e5
-525 1 11 26 -0.32768000000000000000e5
-525 1 16 23 -0.32768000000000000000e5
-525 1 20 23 0.65536000000000000000e5
-525 2 5 19 -0.32768000000000000000e5
-525 3 3 16 0.32768000000000000000e5
-526 1 8 23 -0.65536000000000000000e5
-526 1 20 24 0.65536000000000000000e5
-526 3 9 14 0.65536000000000000000e5
-527 1 7 22 -0.16384000000000000000e5
-527 1 8 23 -0.32768000000000000000e5
-527 1 11 26 -0.16384000000000000000e5
-527 1 13 28 -0.32768000000000000000e5
-527 1 16 23 -0.16384000000000000000e5
-527 1 20 25 0.65536000000000000000e5
-527 2 5 19 -0.16384000000000000000e5
-527 2 14 16 -0.32768000000000000000e5
-527 3 3 16 0.16384000000000000000e5
-527 3 9 14 0.32768000000000000000e5
-528 1 1 32 -0.32768000000000000000e5
-528 1 2 33 -0.32768000000000000000e5
-528 1 3 26 -0.32768000000000000000e5
-528 1 20 26 0.65536000000000000000e5
-528 2 11 17 -0.32768000000000000000e5
-528 3 11 12 0.32768000000000000000e5
-529 1 2 9 -0.65536000000000000000e5
-529 1 20 27 0.65536000000000000000e5
-529 3 2 7 0.65536000000000000000e5
-529 3 2 15 0.65536000000000000000e5
-529 3 5 18 0.65536000000000000000e5
-530 1 3 34 -0.65536000000000000000e5
-530 1 20 28 0.65536000000000000000e5
-531 1 16 31 -0.65536000000000000000e5
-531 1 20 29 0.65536000000000000000e5
-532 1 7 22 -0.65536000000000000000e5
-532 1 20 30 0.65536000000000000000e5
-532 3 3 16 0.65536000000000000000e5
-532 3 6 19 0.65536000000000000000e5
-533 1 8 23 -0.65536000000000000000e5
-533 1 11 26 0.32768000000000000000e5
-533 1 12 27 0.32768000000000000000e5
-533 1 16 31 -0.32768000000000000000e5
-533 1 20 31 0.65536000000000000000e5
-533 1 22 29 -0.32768000000000000000e5
-533 3 6 19 0.32768000000000000000e5
-533 3 9 14 0.65536000000000000000e5
-533 4 6 10 0.32768000000000000000e5
-534 1 20 32 0.65536000000000000000e5
-534 1 26 29 -0.65536000000000000000e5
-535 1 2 9 -0.65536000000000000000e5
-535 1 3 34 -0.65536000000000000000e5
-535 1 20 33 0.65536000000000000000e5
-535 1 26 29 0.65536000000000000000e5
-535 2 6 20 -0.65536000000000000000e5
-535 2 14 20 0.65536000000000000000e5
-535 3 2 7 0.65536000000000000000e5
-535 3 2 15 0.65536000000000000000e5
-535 3 5 18 0.65536000000000000000e5
-535 3 7 20 -0.65536000000000000000e5
-535 3 14 19 0.13107200000000000000e6
-536 1 7 22 -0.65536000000000000000e5
-536 1 20 34 0.65536000000000000000e5
-536 3 3 16 0.65536000000000000000e5
-536 3 6 19 0.65536000000000000000e5
-536 3 14 19 0.65536000000000000000e5
-537 1 7 22 -0.32768000000000000000e5
-537 1 21 21 0.65536000000000000000e5
-537 3 3 16 0.32768000000000000000e5
-538 1 12 27 -0.65536000000000000000e5
-538 1 21 22 0.65536000000000000000e5
-539 1 8 23 -0.65536000000000000000e5
-539 1 21 23 0.65536000000000000000e5
-539 3 9 14 0.65536000000000000000e5
-540 1 13 28 -0.65536000000000000000e5
-540 1 21 24 0.65536000000000000000e5
-541 1 14 29 -0.65536000000000000000e5
-541 1 21 25 0.65536000000000000000e5
-542 1 2 9 -0.65536000000000000000e5
-542 1 21 26 0.65536000000000000000e5
-542 3 2 7 0.65536000000000000000e5
-542 3 2 15 0.65536000000000000000e5
-542 3 5 18 0.65536000000000000000e5
-543 1 3 34 -0.65536000000000000000e5
-543 1 21 27 0.65536000000000000000e5
-544 1 2 9 0.65536000000000000000e5
-544 1 3 34 0.65536000000000000000e5
-544 1 7 22 -0.13107200000000000000e6
-544 1 21 28 0.65536000000000000000e5
-544 2 6 20 0.65536000000000000000e5
-544 3 2 7 -0.65536000000000000000e5
-544 3 2 15 -0.65536000000000000000e5
-544 3 3 16 0.13107200000000000000e6
-544 3 5 18 -0.65536000000000000000e5
-544 3 6 19 0.13107200000000000000e6
-545 1 7 22 -0.65536000000000000000e5
-545 1 21 29 0.65536000000000000000e5
-545 3 3 16 0.65536000000000000000e5
-545 3 6 19 0.65536000000000000000e5
-546 1 21 30 0.65536000000000000000e5
-546 1 22 29 -0.65536000000000000000e5
-547 1 21 31 0.65536000000000000000e5
-547 1 23 30 -0.65536000000000000000e5
-548 1 2 9 -0.65536000000000000000e5
-548 1 3 34 -0.65536000000000000000e5
-548 1 21 32 0.65536000000000000000e5
-548 1 26 29 0.65536000000000000000e5
-548 2 6 20 -0.65536000000000000000e5
-548 2 14 20 0.65536000000000000000e5
-548 3 2 7 0.65536000000000000000e5
-548 3 2 15 0.65536000000000000000e5
-548 3 5 18 0.65536000000000000000e5
-548 3 7 20 -0.65536000000000000000e5
-548 3 14 19 0.13107200000000000000e6
-549 1 2 9 0.65536000000000000000e5
-549 1 3 34 0.65536000000000000000e5
-549 1 7 22 -0.13107200000000000000e6
-549 1 21 33 0.65536000000000000000e5
-549 2 6 20 0.65536000000000000000e5
-549 3 2 7 -0.65536000000000000000e5
-549 3 2 15 -0.65536000000000000000e5
-549 3 3 16 0.13107200000000000000e6
-549 3 5 18 -0.65536000000000000000e5
-549 3 6 19 0.13107200000000000000e6
-549 3 7 20 0.65536000000000000000e5
-550 1 21 34 0.65536000000000000000e5
-550 1 29 30 -0.65536000000000000000e5
-551 1 2 9 0.65536000000000000000e5
-551 1 3 34 0.65536000000000000000e5
-551 1 7 22 -0.13107200000000000000e6
-551 1 21 35 0.65536000000000000000e5
-551 2 6 20 0.65536000000000000000e5
-551 3 2 7 -0.65536000000000000000e5
-551 3 2 15 -0.65536000000000000000e5
-551 3 3 16 0.13107200000000000000e6
-551 3 5 18 -0.65536000000000000000e5
-551 3 6 19 0.13107200000000000000e6
-551 3 7 20 0.65536000000000000000e5
-551 3 15 20 0.65536000000000000000e5
-552 1 7 22 0.32768000000000000000e5
-552 1 12 27 0.32768000000000000000e5
-552 1 13 28 -0.65536000000000000000e5
-552 1 22 22 0.65536000000000000000e5
-552 2 15 15 0.65536000000000000000e5
-552 3 3 16 -0.32768000000000000000e5
-553 1 13 28 -0.65536000000000000000e5
-553 1 22 23 0.65536000000000000000e5
-554 1 8 23 0.65536000000000000000e5
-554 1 13 28 0.65536000000000000000e5
-554 1 14 29 -0.13107200000000000000e6
-554 1 22 24 0.65536000000000000000e5
-554 2 9 19 0.65536000000000000000e5
-554 3 9 14 -0.65536000000000000000e5
-555 1 3 34 -0.65536000000000000000e5
-555 1 22 26 0.65536000000000000000e5
-556 1 2 9 0.65536000000000000000e5
-556 1 3 34 0.65536000000000000000e5
-556 1 7 22 -0.13107200000000000000e6
-556 1 22 27 0.65536000000000000000e5
-556 2 6 20 0.65536000000000000000e5
-556 3 2 7 -0.65536000000000000000e5
-556 3 2 15 -0.65536000000000000000e5
-556 3 3 16 0.13107200000000000000e6
-556 3 5 18 -0.65536000000000000000e5
-556 3 6 19 0.13107200000000000000e6
-557 1 2 9 -0.65536000000000000000e5
-557 1 7 22 0.13107200000000000000e6
-557 1 22 28 0.65536000000000000000e5
-557 1 22 29 -0.13107200000000000000e6
-557 2 6 20 -0.65536000000000000000e5
-557 2 13 19 0.65536000000000000000e5
-557 3 2 7 0.65536000000000000000e5
-557 3 2 15 0.65536000000000000000e5
-557 3 3 16 -0.13107200000000000000e6
-557 3 5 18 0.65536000000000000000e5
-557 3 6 19 -0.13107200000000000000e6
-558 1 7 22 0.65536000000000000000e5
-558 1 22 29 0.65536000000000000000e5
-558 1 22 30 0.65536000000000000000e5
-558 1 23 30 -0.13107200000000000000e6
-558 2 16 18 0.65536000000000000000e5
-558 3 3 16 -0.65536000000000000000e5
-558 3 6 19 -0.65536000000000000000e5
-559 1 22 31 0.65536000000000000000e5
-559 1 25 28 -0.65536000000000000000e5
-560 1 2 9 0.65536000000000000000e5
-560 1 3 34 0.65536000000000000000e5
-560 1 7 22 -0.13107200000000000000e6
-560 1 22 32 0.65536000000000000000e5
-560 2 6 20 0.65536000000000000000e5
-560 3 2 7 -0.65536000000000000000e5
-560 3 2 15 -0.65536000000000000000e5
-560 3 3 16 0.13107200000000000000e6
-560 3 5 18 -0.65536000000000000000e5
-560 3 6 19 0.13107200000000000000e6
-560 3 7 20 0.65536000000000000000e5
-561 1 19 34 -0.65536000000000000000e5
-561 1 22 33 0.65536000000000000000e5
-562 1 12 35 -0.65536000000000000000e5
-562 1 22 34 0.65536000000000000000e5
-563 1 22 35 0.65536000000000000000e5
-563 1 30 33 -0.65536000000000000000e5
-564 1 7 22 -0.81920000000000000000e4
-564 1 8 23 -0.16384000000000000000e5
-564 1 11 26 -0.81920000000000000000e4
-564 1 13 28 -0.16384000000000000000e5
-564 1 16 23 -0.81920000000000000000e4
-564 1 23 23 0.65536000000000000000e5
-564 2 5 19 -0.81920000000000000000e4
-564 2 14 16 -0.16384000000000000000e5
-564 3 3 16 0.81920000000000000000e4
-564 3 9 14 0.16384000000000000000e5
-565 1 14 29 -0.65536000000000000000e5
-565 1 23 24 0.65536000000000000000e5
-566 1 7 22 -0.81920000000000000000e4
-566 1 8 23 -0.16384000000000000000e5
-566 1 11 26 -0.81920000000000000000e4
-566 1 13 28 -0.16384000000000000000e5
-566 1 14 29 -0.32768000000000000000e5
-566 1 16 23 -0.81920000000000000000e4
-566 1 22 25 -0.32768000000000000000e5
-566 1 23 25 0.65536000000000000000e5
-566 2 5 19 -0.81920000000000000000e4
-566 2 14 16 -0.16384000000000000000e5
-566 2 16 16 -0.65536000000000000000e5
-566 3 3 16 0.81920000000000000000e4
-566 3 9 14 0.16384000000000000000e5
-567 1 16 31 -0.65536000000000000000e5
-567 1 23 26 0.65536000000000000000e5
-568 1 7 22 -0.65536000000000000000e5
-568 1 23 27 0.65536000000000000000e5
-568 3 3 16 0.65536000000000000000e5
-568 3 6 19 0.65536000000000000000e5
-569 1 22 29 -0.65536000000000000000e5
-569 1 23 28 0.65536000000000000000e5
-570 1 8 23 -0.65536000000000000000e5
-570 1 11 26 0.32768000000000000000e5
-570 1 12 27 0.32768000000000000000e5
-570 1 16 31 -0.32768000000000000000e5
-570 1 22 29 -0.32768000000000000000e5
-570 1 23 29 0.65536000000000000000e5
-570 3 6 19 0.32768000000000000000e5
-570 3 9 14 0.65536000000000000000e5
-570 4 6 10 0.32768000000000000000e5
-571 1 14 29 -0.65536000000000000000e5
-571 1 23 31 0.65536000000000000000e5
-571 3 10 19 0.65536000000000000000e5
-572 1 7 22 -0.65536000000000000000e5
-572 1 23 32 0.65536000000000000000e5
-572 3 3 16 0.65536000000000000000e5
-572 3 6 19 0.65536000000000000000e5
-572 3 14 19 0.65536000000000000000e5
-573 1 23 33 0.65536000000000000000e5
-573 1 29 30 -0.65536000000000000000e5
-574 1 23 34 0.65536000000000000000e5
-574 1 25 32 -0.65536000000000000000e5
-575 1 23 35 0.65536000000000000000e5
-575 1 31 32 -0.65536000000000000000e5
-576 1 22 25 -0.32768000000000000000e5
-576 1 24 24 0.65536000000000000000e5
-577 1 15 30 -0.65536000000000000000e5
-577 1 24 25 0.65536000000000000000e5
-578 1 7 22 -0.65536000000000000000e5
-578 1 24 26 0.65536000000000000000e5
-578 3 3 16 0.65536000000000000000e5
-578 3 6 19 0.65536000000000000000e5
-579 1 22 29 -0.65536000000000000000e5
-579 1 24 27 0.65536000000000000000e5
-580 1 7 22 0.65536000000000000000e5
-580 1 22 29 0.65536000000000000000e5
-580 1 23 30 -0.13107200000000000000e6
-580 1 24 28 0.65536000000000000000e5
-580 2 16 18 0.65536000000000000000e5
-580 3 3 16 -0.65536000000000000000e5
-580 3 6 19 -0.65536000000000000000e5
-581 1 23 30 -0.65536000000000000000e5
-581 1 24 29 0.65536000000000000000e5
-582 1 24 30 0.65536000000000000000e5
-582 1 25 28 -0.65536000000000000000e5
-583 1 24 32 0.65536000000000000000e5
-583 1 29 30 -0.65536000000000000000e5
-584 1 12 35 -0.65536000000000000000e5
-584 1 24 33 0.65536000000000000000e5
-585 1 24 34 0.65536000000000000000e5
-585 1 30 31 -0.65536000000000000000e5
-586 1 8 23 -0.65536000000000000000e5
-586 1 11 26 0.32768000000000000000e5
-586 1 12 27 0.32768000000000000000e5
-586 1 16 31 -0.32768000000000000000e5
-586 1 22 29 -0.32768000000000000000e5
-586 1 25 26 0.65536000000000000000e5
-586 3 6 19 0.32768000000000000000e5
-586 3 9 14 0.65536000000000000000e5
-586 4 6 10 0.32768000000000000000e5
-587 1 23 30 -0.65536000000000000000e5
-587 1 25 27 0.65536000000000000000e5
-588 1 14 29 -0.65536000000000000000e5
-588 1 25 29 0.65536000000000000000e5
-588 3 10 19 0.65536000000000000000e5
-589 1 24 31 -0.65536000000000000000e5
-589 1 25 30 0.65536000000000000000e5
-590 1 15 34 -0.65536000000000000000e5
-590 1 25 31 0.65536000000000000000e5
-591 1 25 33 0.65536000000000000000e5
-591 1 30 31 -0.65536000000000000000e5
-592 1 25 35 0.65536000000000000000e5
-592 1 31 34 -0.65536000000000000000e5
-593 1 17 32 0.32768000000000000000e5
-593 1 26 26 0.65536000000000000000e5
-593 1 26 29 -0.65536000000000000000e5
-593 1 26 33 0.32768000000000000000e5
-593 2 17 17 0.65536000000000000000e5
-593 3 17 18 0.32768000000000000000e5
-594 1 17 32 -0.65536000000000000000e5
-594 1 26 27 0.65536000000000000000e5
-595 1 26 28 0.65536000000000000000e5
-595 1 26 33 -0.65536000000000000000e5
-595 3 17 18 -0.65536000000000000000e5
-596 1 2 9 -0.65536000000000000000e5
-596 1 3 34 -0.65536000000000000000e5
-596 1 26 29 0.65536000000000000000e5
-596 1 26 30 0.65536000000000000000e5
-596 2 6 20 -0.65536000000000000000e5
-596 2 14 20 0.65536000000000000000e5
-596 3 2 7 0.65536000000000000000e5
-596 3 2 15 0.65536000000000000000e5
-596 3 5 18 0.65536000000000000000e5
-596 3 7 20 -0.65536000000000000000e5
-596 3 14 19 0.13107200000000000000e6
-597 1 7 22 -0.65536000000000000000e5
-597 1 26 31 0.65536000000000000000e5
-597 3 3 16 0.65536000000000000000e5
-597 3 6 19 0.65536000000000000000e5
-597 3 14 19 0.65536000000000000000e5
-598 1 16 35 -0.65536000000000000000e5
-598 1 26 32 0.65536000000000000000e5
-599 1 20 35 -0.65536000000000000000e5
-599 1 26 34 0.65536000000000000000e5
-600 1 2 9 0.13107200000000000000e6
-600 1 3 34 0.13107200000000000000e6
-600 1 7 22 -0.26214400000000000000e6
-600 1 26 35 0.65536000000000000000e5
-600 1 28 35 0.65536000000000000000e5
-600 1 32 33 0.65536000000000000000e5
-600 2 6 20 0.13107200000000000000e6
-600 2 20 20 0.13107200000000000000e6
-600 3 2 7 -0.13107200000000000000e6
-600 3 2 15 -0.13107200000000000000e6
-600 3 3 16 0.26214400000000000000e6
-600 3 5 18 -0.13107200000000000000e6
-600 3 6 19 0.26214400000000000000e6
-600 3 7 20 0.13107200000000000000e6
-600 3 15 20 0.13107200000000000000e6
-600 3 19 20 0.13107200000000000000e6
-601 1 26 33 -0.32768000000000000000e5
-601 1 27 27 0.65536000000000000000e5
-601 3 17 18 -0.32768000000000000000e5
-602 1 4 35 -0.65536000000000000000e5
-602 1 27 28 0.65536000000000000000e5
-603 1 2 9 -0.65536000000000000000e5
-603 1 3 34 -0.65536000000000000000e5
-603 1 26 29 0.65536000000000000000e5
-603 1 27 29 0.65536000000000000000e5
-603 2 6 20 -0.65536000000000000000e5
-603 2 14 20 0.65536000000000000000e5
-603 3 2 7 0.65536000000000000000e5
-603 3 2 15 0.65536000000000000000e5
-603 3 5 18 0.65536000000000000000e5
-603 3 7 20 -0.65536000000000000000e5
-603 3 14 19 0.13107200000000000000e6
-604 1 2 9 0.65536000000000000000e5
-604 1 3 34 0.65536000000000000000e5
-604 1 7 22 -0.13107200000000000000e6
-604 1 27 30 0.65536000000000000000e5
-604 2 6 20 0.65536000000000000000e5
-604 3 2 7 -0.65536000000000000000e5
-604 3 2 15 -0.65536000000000000000e5
-604 3 3 16 0.13107200000000000000e6
-604 3 5 18 -0.65536000000000000000e5
-604 3 6 19 0.13107200000000000000e6
-604 3 7 20 0.65536000000000000000e5
-605 1 27 31 0.65536000000000000000e5
-605 1 29 30 -0.65536000000000000000e5
-606 1 26 33 -0.65536000000000000000e5
-606 1 27 32 0.65536000000000000000e5
-607 1 2 9 0.13107200000000000000e6
-607 1 3 34 0.13107200000000000000e6
-607 1 4 35 -0.65536000000000000000e5
-607 1 16 35 0.65536000000000000000e5
-607 1 17 32 -0.65536000000000000000e5
-607 1 20 35 -0.13107200000000000000e6
-607 1 26 29 -0.13107200000000000000e6
-607 1 27 33 0.65536000000000000000e5
-607 2 6 20 0.13107200000000000000e6
-607 2 14 20 -0.13107200000000000000e6
-607 3 2 7 -0.13107200000000000000e6
-607 3 2 15 -0.13107200000000000000e6
-607 3 5 18 -0.13107200000000000000e6
-607 3 7 20 0.13107200000000000000e6
-607 3 14 19 -0.26214400000000000000e6
-607 3 17 18 -0.65536000000000000000e5
-607 4 10 10 -0.13107200000000000000e6
-608 1 2 9 0.65536000000000000000e5
-608 1 3 34 0.65536000000000000000e5
-608 1 7 22 -0.13107200000000000000e6
-608 1 27 34 0.65536000000000000000e5
-608 2 6 20 0.65536000000000000000e5
-608 3 2 7 -0.65536000000000000000e5
-608 3 2 15 -0.65536000000000000000e5
-608 3 3 16 0.13107200000000000000e6
-608 3 5 18 -0.65536000000000000000e5
-608 3 6 19 0.13107200000000000000e6
-608 3 7 20 0.65536000000000000000e5
-608 3 15 20 0.65536000000000000000e5
-609 1 27 35 0.65536000000000000000e5
-609 1 32 33 -0.65536000000000000000e5
-610 1 2 9 0.65536000000000000000e5
-610 1 3 34 0.65536000000000000000e5
-610 1 4 35 0.32768000000000000000e5
-610 1 7 22 -0.13107200000000000000e6
-610 1 26 33 0.32768000000000000000e5
-610 1 28 28 0.65536000000000000000e5
-610 2 6 20 0.65536000000000000000e5
-610 2 18 18 0.65536000000000000000e5
-610 3 2 7 -0.65536000000000000000e5
-610 3 2 15 -0.65536000000000000000e5
-610 3 3 16 0.13107200000000000000e6
-610 3 5 18 -0.65536000000000000000e5
-610 3 6 19 0.13107200000000000000e6
-610 3 7 20 0.65536000000000000000e5
-610 3 17 18 0.32768000000000000000e5
-611 1 2 9 0.65536000000000000000e5
-611 1 3 34 0.65536000000000000000e5
-611 1 7 22 -0.13107200000000000000e6
-611 1 28 29 0.65536000000000000000e5
-611 2 6 20 0.65536000000000000000e5
-611 3 2 7 -0.65536000000000000000e5
-611 3 2 15 -0.65536000000000000000e5
-611 3 3 16 0.13107200000000000000e6
-611 3 5 18 -0.65536000000000000000e5
-611 3 6 19 0.13107200000000000000e6
-611 3 7 20 0.65536000000000000000e5
-612 1 19 34 -0.65536000000000000000e5
-612 1 28 30 0.65536000000000000000e5
-613 1 12 35 -0.65536000000000000000e5
-613 1 28 31 0.65536000000000000000e5
-614 1 2 9 0.13107200000000000000e6
-614 1 3 34 0.13107200000000000000e6
-614 1 4 35 -0.65536000000000000000e5
-614 1 16 35 0.65536000000000000000e5
-614 1 17 32 -0.65536000000000000000e5
-614 1 20 35 -0.13107200000000000000e6
-614 1 26 29 -0.13107200000000000000e6
-614 1 28 32 0.65536000000000000000e5
-614 2 6 20 0.13107200000000000000e6
-614 2 14 20 -0.13107200000000000000e6
-614 3 2 7 -0.13107200000000000000e6
-614 3 2 15 -0.13107200000000000000e6
-614 3 5 18 -0.13107200000000000000e6
-614 3 7 20 0.13107200000000000000e6
-614 3 14 19 -0.26214400000000000000e6
-614 3 17 18 -0.65536000000000000000e5
-614 4 10 10 -0.13107200000000000000e6
-615 1 4 35 0.65536000000000000000e5
-615 1 7 22 -0.26214400000000000000e6
-615 1 16 35 -0.65536000000000000000e5
-615 1 17 32 0.65536000000000000000e5
-615 1 20 35 0.13107200000000000000e6
-615 1 26 29 0.13107200000000000000e6
-615 1 26 33 0.65536000000000000000e5
-615 1 28 33 0.65536000000000000000e5
-615 2 14 20 0.13107200000000000000e6
-615 2 18 20 0.65536000000000000000e5
-615 3 3 16 0.26214400000000000000e6
-615 3 6 19 0.26214400000000000000e6
-615 3 14 19 0.26214400000000000000e6
-615 3 15 20 0.13107200000000000000e6
-615 3 17 18 0.65536000000000000000e5
-615 4 10 10 0.13107200000000000000e6
-616 1 28 34 0.65536000000000000000e5
-616 1 30 33 -0.65536000000000000000e5
-617 1 7 22 -0.32768000000000000000e5
-617 1 29 29 0.65536000000000000000e5
-617 3 3 16 0.32768000000000000000e5
-617 3 6 19 0.32768000000000000000e5
-617 3 14 19 0.32768000000000000000e5
-618 1 25 32 -0.65536000000000000000e5
-618 1 29 31 0.65536000000000000000e5
-619 1 20 35 -0.65536000000000000000e5
-619 1 29 32 0.65536000000000000000e5
-620 1 2 9 0.65536000000000000000e5
-620 1 3 34 0.65536000000000000000e5
-620 1 7 22 -0.13107200000000000000e6
-620 1 29 33 0.65536000000000000000e5
-620 2 6 20 0.65536000000000000000e5
-620 3 2 7 -0.65536000000000000000e5
-620 3 2 15 -0.65536000000000000000e5
-620 3 3 16 0.13107200000000000000e6
-620 3 5 18 -0.65536000000000000000e5
-620 3 6 19 0.13107200000000000000e6
-620 3 7 20 0.65536000000000000000e5
-620 3 15 20 0.65536000000000000000e5
-621 1 29 34 0.65536000000000000000e5
-621 1 31 32 -0.65536000000000000000e5
-622 1 2 9 0.65536000000000000000e5
-622 1 3 34 0.65536000000000000000e5
-622 1 7 22 -0.13107200000000000000e6
-622 1 29 35 0.65536000000000000000e5
-622 2 6 20 0.65536000000000000000e5
-622 3 2 7 -0.65536000000000000000e5
-622 3 2 15 -0.65536000000000000000e5
-622 3 3 16 0.13107200000000000000e6
-622 3 5 18 -0.65536000000000000000e5
-622 3 6 19 0.13107200000000000000e6
-622 3 7 20 0.65536000000000000000e5
-622 3 15 20 0.65536000000000000000e5
-622 3 19 20 0.65536000000000000000e5
-623 1 12 35 -0.32768000000000000000e5
-623 1 30 30 0.65536000000000000000e5
-624 1 2 9 0.65536000000000000000e5
-624 1 3 34 0.65536000000000000000e5
-624 1 7 22 -0.13107200000000000000e6
-624 1 30 32 0.65536000000000000000e5
-624 2 6 20 0.65536000000000000000e5
-624 3 2 7 -0.65536000000000000000e5
-624 3 2 15 -0.65536000000000000000e5
-624 3 3 16 0.13107200000000000000e6
-624 3 5 18 -0.65536000000000000000e5
-624 3 6 19 0.13107200000000000000e6
-624 3 7 20 0.65536000000000000000e5
-624 3 15 20 0.65536000000000000000e5
-625 1 24 35 -0.65536000000000000000e5
-625 1 30 34 0.65536000000000000000e5
-626 1 30 35 0.65536000000000000000e5
-626 1 33 34 -0.65536000000000000000e5
-627 1 25 34 -0.32768000000000000000e5
-627 1 31 31 0.65536000000000000000e5
-628 1 24 35 -0.65536000000000000000e5
-628 1 31 33 0.65536000000000000000e5
-629 1 31 35 0.65536000000000000000e5
-629 1 34 34 -0.13107200000000000000e6
-630 1 2 9 0.65536000000000000000e5
-630 1 3 34 0.65536000000000000000e5
-630 1 7 22 -0.13107200000000000000e6
-630 1 28 35 0.32768000000000000000e5
-630 1 32 32 0.65536000000000000000e5
-630 1 32 33 0.32768000000000000000e5
-630 2 6 20 0.65536000000000000000e5
-630 2 20 20 0.65536000000000000000e5
-630 3 2 7 -0.65536000000000000000e5
-630 3 2 15 -0.65536000000000000000e5
-630 3 3 16 0.13107200000000000000e6
-630 3 5 18 -0.65536000000000000000e5
-630 3 6 19 0.13107200000000000000e6
-630 3 7 20 0.65536000000000000000e5
-630 3 15 20 0.65536000000000000000e5
-630 3 19 20 0.65536000000000000000e5
-631 1 2 9 0.65536000000000000000e5
-631 1 3 34 0.65536000000000000000e5
-631 1 7 22 -0.13107200000000000000e6
-631 1 32 34 0.65536000000000000000e5
-631 2 6 20 0.65536000000000000000e5
-631 3 2 7 -0.65536000000000000000e5
-631 3 2 15 -0.65536000000000000000e5
-631 3 3 16 0.13107200000000000000e6
-631 3 5 18 -0.65536000000000000000e5
-631 3 6 19 0.13107200000000000000e6
-631 3 7 20 0.65536000000000000000e5
-631 3 15 20 0.65536000000000000000e5
-631 3 19 20 0.65536000000000000000e5
-632 1 28 35 -0.32768000000000000000e5
-632 1 33 33 0.65536000000000000000e5
-633 1 1 16 0.65536000000000000000e5
-633 1 2 5 0.65536000000000000000e5
-633 1 2 17 0.65536000000000000000e5
-633 1 3 10 -0.26214400000000000000e6
-633 1 5 20 0.26214400000000000000e6
-633 1 6 21 0.13107200000000000000e7
-633 1 7 22 0.26214400000000000000e6
-633 1 8 23 0.52428800000000000000e6
-633 1 13 20 -0.10485760000000000000e7
-633 2 1 2 0.65536000000000000000e5
-633 2 1 3 -0.65536000000000000000e5
-633 2 1 7 0.13107200000000000000e6
-633 2 1 15 -0.39321600000000000000e6
-633 2 2 8 0.26214400000000000000e6
-633 2 2 12 0.65536000000000000000e5
-633 2 2 16 0.26214400000000000000e6
-633 2 5 11 0.13107200000000000000e6
-633 2 6 12 0.26214400000000000000e6
-633 2 8 14 0.52428800000000000000e6
-633 3 1 2 -0.65536000000000000000e5
-633 3 1 6 0.26214400000000000000e6
-633 3 2 7 0.13107200000000000000e6
-633 4 1 1 -0.13107200000000000000e6
-633 4 2 2 0.13107200000000000000e6
-633 4 4 4 -0.52428800000000000000e6
-634 2 1 4 0.65536000000000000000e5
-634 2 2 12 -0.65536000000000000000e5
-634 4 2 2 -0.13107200000000000000e6
-635 1 1 2 0.32768000000000000000e5
-635 1 1 6 0.65536000000000000000e5
-635 1 1 8 0.19660800000000000000e6
-635 1 1 10 -0.13107200000000000000e6
-635 1 1 16 -0.32768000000000000000e5
-635 1 2 5 -0.32768000000000000000e5
-635 1 2 9 0.65536000000000000000e5
-635 1 3 10 0.13107200000000000000e6
-635 1 3 18 0.32768000000000000000e5
-635 1 5 20 -0.13107200000000000000e6
-635 1 6 21 -0.78643200000000000000e6
-635 1 7 22 -0.13107200000000000000e6
-635 1 8 23 -0.26214400000000000000e6
-635 1 13 20 0.52428800000000000000e6
-635 2 1 5 0.65536000000000000000e5
-635 2 1 7 -0.65536000000000000000e5
-635 2 1 15 0.26214400000000000000e6
-635 2 2 8 -0.13107200000000000000e6
-635 2 2 16 -0.13107200000000000000e6
-635 2 5 11 -0.65536000000000000000e5
-635 2 6 12 -0.13107200000000000000e6
-635 2 8 14 -0.26214400000000000000e6
-635 3 1 2 0.32768000000000000000e5
-635 3 1 6 -0.19660800000000000000e6
-635 3 2 3 -0.32768000000000000000e5
-635 3 2 7 -0.13107200000000000000e6
-635 4 1 1 0.65536000000000000000e5
-635 4 2 2 -0.65536000000000000000e5
-635 4 4 4 0.26214400000000000000e6
-636 1 1 2 0.32768000000000000000e5
-636 1 1 16 -0.32768000000000000000e5
-636 1 2 5 -0.32768000000000000000e5
-636 1 3 10 0.52428800000000000000e6
-636 1 3 18 0.32768000000000000000e5
-636 1 4 11 0.26214400000000000000e6
-636 1 6 21 -0.52428800000000000000e6
-636 1 7 22 -0.13107200000000000000e6
-636 1 8 23 -0.26214400000000000000e6
-636 1 11 26 0.13107200000000000000e6
-636 1 12 27 0.13107200000000000000e6
-636 2 1 6 0.65536000000000000000e5
-636 2 1 7 -0.13107200000000000000e6
-636 2 1 15 0.13107200000000000000e6
-636 2 3 9 0.13107200000000000000e6
-636 2 5 11 -0.65536000000000000000e5
-636 2 6 8 0.26214400000000000000e6
-636 2 8 14 -0.26214400000000000000e6
-636 3 1 2 0.32768000000000000000e5
-636 3 1 6 -0.65536000000000000000e5
-636 3 2 3 -0.32768000000000000000e5
-636 3 2 7 -0.13107200000000000000e6
-636 3 3 8 0.39321600000000000000e6
-636 3 3 16 -0.13107200000000000000e6
-636 3 4 9 0.13107200000000000000e6
-636 3 5 10 -0.52428800000000000000e6
-636 3 9 14 0.26214400000000000000e6
-636 4 1 1 0.65536000000000000000e5
-636 4 2 2 -0.65536000000000000000e5
-636 4 2 6 0.13107200000000000000e6
-636 4 4 4 0.26214400000000000000e6
-636 4 5 9 -0.13107200000000000000e6
-637 2 1 8 0.65536000000000000000e5
-637 2 5 5 -0.13107200000000000000e6
-638 2 1 9 0.65536000000000000000e5
-638 2 2 8 -0.65536000000000000000e5
-639 1 1 8 0.32768000000000000000e5
-639 1 1 10 0.32768000000000000000e5
-639 1 3 10 -0.32768000000000000000e5
-639 1 4 11 -0.98304000000000000000e5
-639 1 5 20 -0.32768000000000000000e5
-639 1 6 13 -0.13107200000000000000e6
-639 1 6 21 -0.65536000000000000000e5
-639 1 11 26 -0.65536000000000000000e5
-639 1 12 27 -0.65536000000000000000e5
-639 1 13 20 0.26214400000000000000e6
-639 2 1 10 0.65536000000000000000e5
-639 2 1 15 0.32768000000000000000e5
-639 2 2 8 -0.32768000000000000000e5
-639 2 2 16 -0.32768000000000000000e5
-639 2 3 9 -0.65536000000000000000e5
-639 2 5 5 0.65536000000000000000e5
-639 2 6 8 -0.13107200000000000000e6
-639 2 6 12 -0.32768000000000000000e5
-639 3 1 6 -0.32768000000000000000e5
-639 3 3 8 -0.13107200000000000000e6
-639 3 3 16 0.65536000000000000000e5
-639 3 4 9 -0.65536000000000000000e5
-639 3 5 10 0.26214400000000000000e6
-639 3 9 14 -0.13107200000000000000e6
-639 4 2 6 -0.32768000000000000000e5
-639 4 5 9 0.65536000000000000000e5
-640 1 1 16 0.65536000000000000000e5
-640 1 2 5 0.65536000000000000000e5
-640 1 2 17 0.65536000000000000000e5
-640 1 3 10 -0.26214400000000000000e6
-640 1 5 20 0.26214400000000000000e6
-640 1 6 21 0.13107200000000000000e7
-640 1 7 22 0.26214400000000000000e6
-640 1 8 23 0.52428800000000000000e6
-640 1 13 20 -0.10485760000000000000e7
-640 2 1 3 -0.65536000000000000000e5
-640 2 1 7 0.13107200000000000000e6
-640 2 1 11 0.65536000000000000000e5
-640 2 1 15 -0.39321600000000000000e6
-640 2 2 8 0.26214400000000000000e6
-640 2 2 12 0.65536000000000000000e5
-640 2 2 16 0.26214400000000000000e6
-640 2 5 11 0.13107200000000000000e6
-640 2 6 12 0.26214400000000000000e6
-640 2 8 14 0.52428800000000000000e6
-640 3 1 2 -0.65536000000000000000e5
-640 3 1 6 0.26214400000000000000e6
-640 3 2 7 0.13107200000000000000e6
-640 4 2 2 0.13107200000000000000e6
-640 4 4 4 -0.52428800000000000000e6
-641 1 2 5 0.65536000000000000000e5
-641 1 3 10 -0.26214400000000000000e6
-641 1 3 18 -0.65536000000000000000e5
-641 1 6 21 0.26214400000000000000e6
-641 2 1 3 -0.65536000000000000000e5
-641 2 1 7 0.13107200000000000000e6
-641 2 1 12 0.65536000000000000000e5
-641 2 1 15 -0.13107200000000000000e6
-641 3 1 2 -0.65536000000000000000e5
-641 3 1 6 0.26214400000000000000e6
-641 3 2 7 0.13107200000000000000e6
-641 4 2 2 0.13107200000000000000e6
-642 2 1 13 0.65536000000000000000e5
-642 2 2 12 -0.65536000000000000000e5
-643 2 1 14 0.65536000000000000000e5
-643 2 5 11 -0.65536000000000000000e5
-644 2 1 16 0.65536000000000000000e5
-644 2 2 8 -0.65536000000000000000e5
-644 4 4 4 0.13107200000000000000e6
-645 2 1 17 0.65536000000000000000e5
-645 2 11 11 -0.13107200000000000000e6
-646 2 1 18 0.65536000000000000000e5
-646 2 11 17 -0.65536000000000000000e5
-646 4 7 7 -0.13107200000000000000e6
-647 1 6 21 0.13107200000000000000e6
-647 1 16 23 -0.13107200000000000000e6
-647 2 1 15 -0.65536000000000000000e5
-647 2 1 19 0.65536000000000000000e5
-647 3 1 14 -0.65536000000000000000e5
-647 3 2 15 -0.65536000000000000000e5
-647 3 6 11 -0.65536000000000000000e5
-648 2 1 20 0.65536000000000000000e5
-648 2 11 17 -0.65536000000000000000e5
-649 2 1 3 -0.32768000000000000000e5
-649 2 2 2 0.65536000000000000000e5
-650 2 2 3 0.65536000000000000000e5
-650 2 2 12 -0.65536000000000000000e5
-650 4 2 2 -0.13107200000000000000e6
-651 1 1 2 0.32768000000000000000e5
-651 1 1 16 -0.32768000000000000000e5
-651 1 2 5 -0.32768000000000000000e5
-651 1 3 10 0.52428800000000000000e6
-651 1 3 18 0.32768000000000000000e5
-651 1 4 11 0.26214400000000000000e6
-651 1 6 21 -0.52428800000000000000e6
-651 1 7 22 -0.13107200000000000000e6
-651 1 8 23 -0.26214400000000000000e6
-651 1 11 26 0.13107200000000000000e6
-651 1 12 27 0.13107200000000000000e6
-651 2 1 7 -0.13107200000000000000e6
-651 2 1 15 0.13107200000000000000e6
-651 2 2 5 0.65536000000000000000e5
-651 2 3 9 0.13107200000000000000e6
-651 2 5 11 -0.65536000000000000000e5
-651 2 6 8 0.26214400000000000000e6
-651 2 8 14 -0.26214400000000000000e6
-651 3 1 2 0.32768000000000000000e5
-651 3 1 6 -0.65536000000000000000e5
-651 3 2 3 -0.32768000000000000000e5
-651 3 2 7 -0.13107200000000000000e6
-651 3 3 8 0.39321600000000000000e6
-651 3 3 16 -0.13107200000000000000e6
-651 3 4 9 0.13107200000000000000e6
-651 3 5 10 -0.52428800000000000000e6
-651 3 9 14 0.26214400000000000000e6
-651 4 1 1 0.65536000000000000000e5
-651 4 2 2 -0.65536000000000000000e5
-651 4 2 6 0.13107200000000000000e6
-651 4 4 4 0.26214400000000000000e6
-651 4 5 9 -0.13107200000000000000e6
-652 2 1 7 -0.65536000000000000000e5
-652 2 2 6 0.65536000000000000000e5
-653 1 2 9 -0.65536000000000000000e5
-653 1 3 10 0.13107200000000000000e6
-653 1 4 11 0.13107200000000000000e6
-653 1 5 8 -0.65536000000000000000e5
-653 1 5 20 -0.65536000000000000000e5
-653 1 6 21 -0.13107200000000000000e6
-653 2 1 7 -0.65536000000000000000e5
-653 2 1 15 0.65536000000000000000e5
-653 2 2 7 0.65536000000000000000e5
-653 2 4 6 -0.65536000000000000000e5
-653 2 6 12 -0.65536000000000000000e5
-653 3 1 6 -0.65536000000000000000e5
-653 3 3 8 -0.13107200000000000000e6
-654 2 2 9 0.65536000000000000000e5
-654 2 2 16 -0.65536000000000000000e5
-654 4 2 6 -0.65536000000000000000e5
-655 2 2 10 0.65536000000000000000e5
-655 2 6 8 -0.65536000000000000000e5
-656 1 2 5 0.65536000000000000000e5
-656 1 3 10 -0.26214400000000000000e6
-656 1 3 18 -0.65536000000000000000e5
-656 1 6 21 0.26214400000000000000e6
-656 2 1 3 -0.65536000000000000000e5
-656 2 1 7 0.13107200000000000000e6
-656 2 1 15 -0.13107200000000000000e6
-656 2 2 11 0.65536000000000000000e5
-656 3 1 2 -0.65536000000000000000e5
-656 3 1 6 0.26214400000000000000e6
-656 3 2 7 0.13107200000000000000e6
-656 4 2 2 0.13107200000000000000e6
-657 2 2 13 0.65536000000000000000e5
-657 2 3 17 -0.65536000000000000000e5
-657 4 3 7 -0.65536000000000000000e5
-658 2 1 15 -0.65536000000000000000e5
-658 2 2 14 0.65536000000000000000e5
-659 2 2 15 0.65536000000000000000e5
-659 2 6 12 -0.65536000000000000000e5
-660 2 2 17 0.65536000000000000000e5
-660 2 11 17 -0.65536000000000000000e5
-660 4 7 7 -0.13107200000000000000e6
-661 2 2 18 0.65536000000000000000e5
-661 2 3 17 -0.65536000000000000000e5
-662 2 2 19 0.65536000000000000000e5
-662 2 6 12 -0.65536000000000000000e5
-662 4 4 8 0.65536000000000000000e5
-663 1 2 9 -0.13107200000000000000e6
-663 1 3 26 0.65536000000000000000e5
-663 1 3 34 0.13107200000000000000e6
-663 1 4 35 -0.65536000000000000000e5
-663 2 2 20 0.65536000000000000000e5
-663 2 12 18 -0.65536000000000000000e5
-663 3 2 7 0.13107200000000000000e6
-663 3 2 15 0.13107200000000000000e6
-663 3 5 18 0.13107200000000000000e6
-663 3 11 12 -0.65536000000000000000e5
-663 3 13 18 -0.65536000000000000000e5
-664 2 2 4 -0.32768000000000000000e5
-664 2 3 3 0.65536000000000000000e5
-665 1 1 8 0.13107200000000000000e6
-665 1 2 9 0.26214400000000000000e6
-665 1 2 17 0.65536000000000000000e5
-665 1 3 18 0.65536000000000000000e5
-665 1 4 19 0.65536000000000000000e5
-665 1 5 20 -0.13107200000000000000e6
-665 1 6 21 -0.26214400000000000000e6
-665 2 1 15 0.13107200000000000000e6
-665 2 2 12 0.65536000000000000000e5
-665 2 3 4 0.65536000000000000000e5
-665 2 3 17 -0.65536000000000000000e5
-665 3 1 6 -0.13107200000000000000e6
-665 3 2 7 -0.26214400000000000000e6
-665 4 3 3 -0.13107200000000000000e6
-665 4 3 7 -0.65536000000000000000e5
-666 2 1 7 -0.65536000000000000000e5
-666 2 3 5 0.65536000000000000000e5
-667 1 2 9 -0.65536000000000000000e5
-667 1 3 10 0.13107200000000000000e6
-667 1 4 11 0.13107200000000000000e6
-667 1 5 8 -0.65536000000000000000e5
-667 1 5 20 -0.65536000000000000000e5
-667 1 6 21 -0.13107200000000000000e6
-667 2 1 7 -0.65536000000000000000e5
-667 2 1 15 0.65536000000000000000e5
-667 2 3 6 0.65536000000000000000e5
-667 2 4 6 -0.65536000000000000000e5
-667 2 6 12 -0.65536000000000000000e5
-667 3 1 6 -0.65536000000000000000e5
-667 3 3 8 -0.13107200000000000000e6
-668 2 3 7 0.65536000000000000000e5
-668 2 4 6 -0.65536000000000000000e5
-669 2 2 16 -0.65536000000000000000e5
-669 2 3 8 0.65536000000000000000e5
-669 4 2 6 -0.65536000000000000000e5
-670 1 1 8 -0.16384000000000000000e5
-670 1 3 10 0.32768000000000000000e5
-670 1 4 11 0.32768000000000000000e5
-670 1 4 15 0.13107200000000000000e6
-670 1 5 20 0.16384000000000000000e5
-670 1 6 21 0.32768000000000000000e5
-670 1 7 14 -0.13107200000000000000e6
-670 1 9 12 -0.65536000000000000000e5
-670 2 1 15 -0.16384000000000000000e5
-670 2 2 16 0.32768000000000000000e5
-670 2 3 10 0.65536000000000000000e5
-670 2 4 10 -0.65536000000000000000e5
-670 2 6 12 0.16384000000000000000e5
-670 3 1 6 0.16384000000000000000e5
-670 3 3 8 0.32768000000000000000e5
-670 4 2 6 0.32768000000000000000e5
-671 2 2 12 -0.65536000000000000000e5
-671 2 3 11 0.65536000000000000000e5
-672 2 3 12 0.65536000000000000000e5
-672 2 3 17 -0.65536000000000000000e5
-672 4 3 7 -0.65536000000000000000e5
-673 1 1 8 0.13107200000000000000e6
-673 1 2 9 0.26214400000000000000e6
-673 1 2 17 0.65536000000000000000e5
-673 1 3 18 0.65536000000000000000e5
-673 1 4 19 0.65536000000000000000e5
-673 1 5 20 -0.13107200000000000000e6
-673 1 6 21 -0.26214400000000000000e6
-673 2 1 15 0.13107200000000000000e6
-673 2 2 12 0.65536000000000000000e5
-673 2 3 13 0.65536000000000000000e5
-673 2 3 17 -0.65536000000000000000e5
-673 3 1 6 -0.13107200000000000000e6
-673 3 2 7 -0.26214400000000000000e6
-673 4 3 7 -0.65536000000000000000e5
-674 2 3 14 0.65536000000000000000e5
-674 2 6 12 -0.65536000000000000000e5
-675 2 3 15 0.65536000000000000000e5
-675 2 4 14 -0.65536000000000000000e5
-676 1 7 22 0.65536000000000000000e5
-676 1 8 23 -0.13107200000000000000e6
-676 1 11 26 0.65536000000000000000e5
-676 1 12 27 0.65536000000000000000e5
-676 2 3 16 0.65536000000000000000e5
-676 3 3 16 -0.65536000000000000000e5
-676 3 9 14 0.13107200000000000000e6
-676 4 5 9 -0.65536000000000000000e5
-677 2 3 18 0.65536000000000000000e5
-677 2 12 18 -0.65536000000000000000e5
-677 4 8 8 -0.13107200000000000000e6
-678 1 1 8 0.13107200000000000000e6
-678 1 2 33 -0.32768000000000000000e5
-678 1 3 26 0.32768000000000000000e5
-678 1 3 34 0.65536000000000000000e5
-678 1 4 35 -0.32768000000000000000e5
-678 1 5 28 0.32768000000000000000e5
-678 1 6 21 -0.26214400000000000000e6
-678 1 7 22 -0.13107200000000000000e6
-678 1 11 26 0.26214400000000000000e6
-678 2 1 15 0.13107200000000000000e6
-678 2 3 17 0.32768000000000000000e5
-678 2 3 19 0.65536000000000000000e5
-678 2 4 18 0.32768000000000000000e5
-678 2 6 12 -0.13107200000000000000e6
-678 2 12 18 -0.65536000000000000000e5
-678 3 1 6 -0.13107200000000000000e6
-678 3 2 15 0.13107200000000000000e6
-678 3 3 16 0.13107200000000000000e6
-678 3 4 17 0.32768000000000000000e5
-678 3 6 11 0.13107200000000000000e6
-678 3 13 18 -0.32768000000000000000e5
-678 4 4 8 0.13107200000000000000e6
-678 4 8 8 -0.65536000000000000000e5
-679 2 3 20 0.65536000000000000000e5
-679 2 12 18 -0.65536000000000000000e5
-680 1 2 9 -0.65536000000000000000e5
-680 1 3 10 0.13107200000000000000e6
-680 1 4 11 0.13107200000000000000e6
-680 1 5 8 -0.65536000000000000000e5
-680 1 5 20 -0.65536000000000000000e5
-680 1 6 21 -0.13107200000000000000e6
-680 2 1 7 -0.65536000000000000000e5
-680 2 1 15 0.65536000000000000000e5
-680 2 4 5 0.65536000000000000000e5
-680 2 4 6 -0.65536000000000000000e5
-680 2 6 12 -0.65536000000000000000e5
-680 3 1 6 -0.65536000000000000000e5
-680 3 3 8 -0.13107200000000000000e6
-681 2 3 9 -0.65536000000000000000e5
-681 2 4 8 0.65536000000000000000e5
-682 1 1 8 0.32768000000000000000e5
-682 1 4 11 0.13107200000000000000e6
-682 1 4 15 -0.26214400000000000000e6
-682 1 5 12 0.65536000000000000000e5
-682 1 5 20 -0.32768000000000000000e5
-682 1 6 21 -0.65536000000000000000e5
-682 1 9 12 0.13107200000000000000e6
-682 1 11 26 0.13107200000000000000e6
-682 1 12 27 0.13107200000000000000e6
-682 2 1 15 0.32768000000000000000e5
-682 2 3 9 0.65536000000000000000e5
-682 2 4 9 0.65536000000000000000e5
-682 2 4 10 0.13107200000000000000e6
-682 2 6 12 -0.32768000000000000000e5
-682 3 1 6 -0.32768000000000000000e5
-682 3 3 8 0.65536000000000000000e5
-682 3 3 16 -0.13107200000000000000e6
-682 3 4 9 0.13107200000000000000e6
-682 3 9 14 0.26214400000000000000e6
-682 4 5 9 -0.13107200000000000000e6
-683 2 3 17 -0.65536000000000000000e5
-683 2 4 11 0.65536000000000000000e5
-683 4 3 7 -0.65536000000000000000e5
-684 1 1 8 0.13107200000000000000e6
-684 1 2 9 0.26214400000000000000e6
-684 1 2 17 0.65536000000000000000e5
-684 1 3 18 0.65536000000000000000e5
-684 1 4 19 0.65536000000000000000e5
-684 1 5 20 -0.13107200000000000000e6
-684 1 6 21 -0.26214400000000000000e6
-684 2 1 15 0.13107200000000000000e6
-684 2 2 12 0.65536000000000000000e5
-684 2 3 17 -0.65536000000000000000e5
-684 2 4 12 0.65536000000000000000e5
-684 3 1 6 -0.13107200000000000000e6
-684 3 2 7 -0.26214400000000000000e6
-684 4 3 7 -0.65536000000000000000e5
-685 2 4 15 0.65536000000000000000e5
-685 2 7 13 -0.65536000000000000000e5
-686 1 1 8 0.32768000000000000000e5
-686 1 5 20 -0.32768000000000000000e5
-686 1 6 21 -0.65536000000000000000e5
-686 1 7 22 0.65536000000000000000e5
-686 1 8 23 0.13107200000000000000e6
-686 1 9 24 0.13107200000000000000e6
-686 1 11 26 0.65536000000000000000e5
-686 1 12 19 0.65536000000000000000e5
-686 1 12 27 0.65536000000000000000e5
-686 1 14 21 -0.26214400000000000000e6
-686 2 1 15 0.32768000000000000000e5
-686 2 4 16 0.65536000000000000000e5
-686 2 6 12 -0.32768000000000000000e5
-686 2 9 15 0.13107200000000000000e6
-686 3 1 6 -0.32768000000000000000e5
-686 3 3 16 -0.65536000000000000000e5
-686 3 9 14 0.13107200000000000000e6
-686 4 5 9 -0.65536000000000000000e5
-687 2 4 17 0.65536000000000000000e5
-687 2 12 18 -0.65536000000000000000e5
-687 4 8 8 -0.13107200000000000000e6
-688 1 1 8 0.13107200000000000000e6
-688 1 2 9 -0.65536000000000000000e5
-688 1 2 33 -0.32768000000000000000e5
-688 1 3 26 0.32768000000000000000e5
-688 1 3 34 0.65536000000000000000e5
-688 1 4 35 -0.32768000000000000000e5
-688 1 5 28 0.32768000000000000000e5
-688 1 6 21 -0.26214400000000000000e6
-688 1 11 26 0.26214400000000000000e6
-688 1 12 27 -0.13107200000000000000e6
-688 1 19 22 0.65536000000000000000e5
-688 2 1 15 0.13107200000000000000e6
-688 2 3 17 0.32768000000000000000e5
-688 2 4 18 0.32768000000000000000e5
-688 2 4 19 0.65536000000000000000e5
-688 2 6 12 -0.13107200000000000000e6
-688 2 12 18 -0.65536000000000000000e5
-688 3 1 6 -0.13107200000000000000e6
-688 3 2 7 0.65536000000000000000e5
-688 3 2 15 0.19660800000000000000e6
-688 3 4 17 0.32768000000000000000e5
-688 3 6 11 0.13107200000000000000e6
-688 3 13 18 -0.32768000000000000000e5
-688 4 4 8 0.13107200000000000000e6
-688 4 8 8 -0.65536000000000000000e5
-689 2 2 8 -0.65536000000000000000e5
-689 2 5 6 0.65536000000000000000e5
-690 2 2 16 -0.65536000000000000000e5
-690 2 5 7 0.65536000000000000000e5
-690 4 2 6 -0.65536000000000000000e5
-691 1 1 8 0.32768000000000000000e5
-691 1 1 10 0.32768000000000000000e5
-691 1 3 10 -0.32768000000000000000e5
-691 1 4 11 -0.98304000000000000000e5
-691 1 5 20 -0.32768000000000000000e5
-691 1 6 13 -0.13107200000000000000e6
-691 1 6 21 -0.65536000000000000000e5
-691 1 11 26 -0.65536000000000000000e5
-691 1 12 27 -0.65536000000000000000e5
-691 1 13 20 0.26214400000000000000e6
-691 2 1 15 0.32768000000000000000e5
-691 2 2 8 -0.32768000000000000000e5
-691 2 2 16 -0.32768000000000000000e5
-691 2 3 9 -0.65536000000000000000e5
-691 2 5 5 0.65536000000000000000e5
-691 2 5 8 0.65536000000000000000e5
-691 2 6 8 -0.13107200000000000000e6
-691 2 6 12 -0.32768000000000000000e5
-691 3 1 6 -0.32768000000000000000e5
-691 3 3 8 -0.13107200000000000000e6
-691 3 3 16 0.65536000000000000000e5
-691 3 4 9 -0.65536000000000000000e5
-691 3 5 10 0.26214400000000000000e6
-691 3 9 14 -0.13107200000000000000e6
-691 4 2 6 -0.32768000000000000000e5
-691 4 5 9 0.65536000000000000000e5
-692 2 5 9 0.65536000000000000000e5
-692 2 6 8 -0.65536000000000000000e5
-693 1 6 13 0.65536000000000000000e5
-693 1 7 14 0.65536000000000000000e5
-693 1 10 13 -0.13107200000000000000e6
-693 1 13 20 0.65536000000000000000e5
-693 2 5 10 0.65536000000000000000e5
-693 3 5 10 0.65536000000000000000e5
-694 2 1 15 -0.65536000000000000000e5
-694 2 5 12 0.65536000000000000000e5
-695 2 5 13 0.65536000000000000000e5
-695 2 6 12 -0.65536000000000000000e5
-696 2 2 8 -0.65536000000000000000e5
-696 2 5 14 0.65536000000000000000e5
-696 4 4 4 0.13107200000000000000e6
-697 2 2 16 -0.65536000000000000000e5
-697 2 5 15 0.65536000000000000000e5
-698 2 5 16 0.65536000000000000000e5
-698 2 8 14 -0.65536000000000000000e5
-699 1 6 21 0.13107200000000000000e6
-699 1 16 23 -0.13107200000000000000e6
-699 2 1 15 -0.65536000000000000000e5
-699 2 5 17 0.65536000000000000000e5
-699 3 1 14 -0.65536000000000000000e5
-699 3 2 15 -0.65536000000000000000e5
-699 3 6 11 -0.65536000000000000000e5
-700 2 5 18 0.65536000000000000000e5
-700 2 6 12 -0.65536000000000000000e5
-700 4 4 8 0.65536000000000000000e5
-701 1 1 32 0.32768000000000000000e5
-701 1 2 9 0.65536000000000000000e5
-701 1 2 33 0.32768000000000000000e5
-701 1 3 26 0.32768000000000000000e5
-701 1 3 34 0.65536000000000000000e5
-701 1 16 31 -0.13107200000000000000e6
-701 2 5 20 0.65536000000000000000e5
-701 2 11 17 0.32768000000000000000e5
-701 3 2 7 -0.65536000000000000000e5
-701 3 2 15 -0.65536000000000000000e5
-701 3 5 18 -0.65536000000000000000e5
-701 3 11 12 -0.32768000000000000000e5
-702 2 2 16 -0.32768000000000000000e5
-702 2 6 6 0.65536000000000000000e5
-702 4 2 6 -0.32768000000000000000e5
-703 2 3 9 -0.65536000000000000000e5
-703 2 6 7 0.65536000000000000000e5
-704 1 1 8 -0.16384000000000000000e5
-704 1 3 10 0.32768000000000000000e5
-704 1 4 11 0.32768000000000000000e5
-704 1 4 15 0.13107200000000000000e6
-704 1 5 20 0.16384000000000000000e5
-704 1 6 21 0.32768000000000000000e5
-704 1 7 14 -0.13107200000000000000e6
-704 1 9 12 -0.65536000000000000000e5
-704 2 1 15 -0.16384000000000000000e5
-704 2 2 16 0.32768000000000000000e5
-704 2 4 10 -0.65536000000000000000e5
-704 2 6 9 0.65536000000000000000e5
-704 2 6 12 0.16384000000000000000e5
-704 3 1 6 0.16384000000000000000e5
-704 3 3 8 0.32768000000000000000e5
-704 4 2 6 0.32768000000000000000e5
-705 1 1 8 -0.81920000000000000000e4
-705 1 5 20 0.81920000000000000000e4
-705 1 6 21 0.32768000000000000000e5
-705 1 7 22 0.16384000000000000000e5
-705 1 9 24 -0.32768000000000000000e5
-705 1 10 25 -0.13107200000000000000e6
-705 1 13 20 0.65536000000000000000e5
-705 1 14 21 0.13107200000000000000e6
-705 2 1 15 -0.81920000000000000000e4
-705 2 2 16 0.16384000000000000000e5
-705 2 6 10 0.65536000000000000000e5
-705 2 6 12 0.81920000000000000000e4
-705 2 9 15 -0.32768000000000000000e5
-705 2 10 12 0.32768000000000000000e5
-705 3 1 6 0.81920000000000000000e4
-705 4 6 6 -0.13107200000000000000e6
-706 2 1 15 -0.65536000000000000000e5
-706 2 6 11 0.65536000000000000000e5
-707 2 4 14 -0.65536000000000000000e5
-707 2 6 13 0.65536000000000000000e5
-708 2 2 16 -0.65536000000000000000e5
-708 2 6 14 0.65536000000000000000e5
-709 1 7 22 0.65536000000000000000e5
-709 1 8 23 -0.13107200000000000000e6
-709 1 11 26 0.65536000000000000000e5
-709 1 12 27 0.65536000000000000000e5
-709 2 6 15 0.65536000000000000000e5
-709 3 3 16 -0.65536000000000000000e5
-709 3 9 14 0.13107200000000000000e6
-709 4 5 9 -0.65536000000000000000e5
-710 2 6 16 0.65536000000000000000e5
-710 2 10 12 -0.65536000000000000000e5
-711 2 6 12 -0.65536000000000000000e5
-711 2 6 17 0.65536000000000000000e5
-711 4 4 8 0.65536000000000000000e5
-712 1 1 8 0.13107200000000000000e6
-712 1 2 33 -0.32768000000000000000e5
-712 1 3 26 0.32768000000000000000e5
-712 1 3 34 0.65536000000000000000e5
-712 1 4 35 -0.32768000000000000000e5
-712 1 5 28 0.32768000000000000000e5
-712 1 6 21 -0.26214400000000000000e6
-712 1 7 22 -0.13107200000000000000e6
-712 1 11 26 0.26214400000000000000e6
-712 2 1 15 0.13107200000000000000e6
-712 2 3 17 0.32768000000000000000e5
-712 2 4 18 0.32768000000000000000e5
-712 2 6 12 -0.13107200000000000000e6
-712 2 6 18 0.65536000000000000000e5
-712 2 12 18 -0.65536000000000000000e5
-712 3 1 6 -0.13107200000000000000e6
-712 3 2 15 0.13107200000000000000e6
-712 3 3 16 0.13107200000000000000e6
-712 3 4 17 0.32768000000000000000e5
-712 3 6 11 0.13107200000000000000e6
-712 3 13 18 -0.32768000000000000000e5
-712 4 4 8 0.13107200000000000000e6
-712 4 8 8 -0.65536000000000000000e5
-713 1 7 22 0.65536000000000000000e5
-713 1 8 23 -0.13107200000000000000e6
-713 1 11 26 0.65536000000000000000e5
-713 1 12 27 0.65536000000000000000e5
-713 2 6 19 0.65536000000000000000e5
-713 3 3 16 -0.65536000000000000000e5
-713 3 9 14 0.13107200000000000000e6
-714 1 1 8 0.16384000000000000000e5
-714 1 4 11 0.65536000000000000000e5
-714 1 4 15 -0.13107200000000000000e6
-714 1 5 12 0.32768000000000000000e5
-714 1 5 20 -0.16384000000000000000e5
-714 1 6 21 -0.32768000000000000000e5
-714 1 9 12 0.65536000000000000000e5
-714 1 11 26 0.65536000000000000000e5
-714 1 12 27 0.65536000000000000000e5
-714 2 1 15 0.16384000000000000000e5
-714 2 3 9 0.32768000000000000000e5
-714 2 4 10 0.65536000000000000000e5
-714 2 6 12 -0.16384000000000000000e5
-714 2 7 7 0.65536000000000000000e5
-714 3 1 6 -0.16384000000000000000e5
-714 3 3 8 0.32768000000000000000e5
-714 3 3 16 -0.65536000000000000000e5
-714 3 4 9 0.65536000000000000000e5
-714 3 9 14 0.13107200000000000000e6
-714 4 5 9 -0.65536000000000000000e5
-715 1 1 8 -0.16384000000000000000e5
-715 1 3 10 0.32768000000000000000e5
-715 1 4 11 0.32768000000000000000e5
-715 1 4 15 0.13107200000000000000e6
-715 1 5 20 0.16384000000000000000e5
-715 1 6 21 0.32768000000000000000e5
-715 1 7 14 -0.13107200000000000000e6
-715 1 9 12 -0.65536000000000000000e5
-715 2 1 15 -0.16384000000000000000e5
-715 2 2 16 0.32768000000000000000e5
-715 2 4 10 -0.65536000000000000000e5
-715 2 6 12 0.16384000000000000000e5
-715 2 7 8 0.65536000000000000000e5
-715 3 1 6 0.16384000000000000000e5
-715 3 3 8 0.32768000000000000000e5
-715 4 2 6 0.32768000000000000000e5
-716 2 4 10 -0.65536000000000000000e5
-716 2 7 9 0.65536000000000000000e5
-717 2 7 10 0.65536000000000000000e5
-717 2 9 9 -0.13107200000000000000e6
-718 2 6 12 -0.65536000000000000000e5
-718 2 7 11 0.65536000000000000000e5
-719 2 4 14 -0.65536000000000000000e5
-719 2 7 12 0.65536000000000000000e5
-720 1 7 22 0.65536000000000000000e5
-720 1 8 23 -0.13107200000000000000e6
-720 1 11 26 0.65536000000000000000e5
-720 1 12 27 0.65536000000000000000e5
-720 2 7 14 0.65536000000000000000e5
-720 3 3 16 -0.65536000000000000000e5
-720 3 9 14 0.13107200000000000000e6
-720 4 5 9 -0.65536000000000000000e5
-721 1 1 8 0.32768000000000000000e5
-721 1 5 20 -0.32768000000000000000e5
-721 1 6 21 -0.65536000000000000000e5
-721 1 7 22 0.65536000000000000000e5
-721 1 8 23 0.13107200000000000000e6
-721 1 9 24 0.13107200000000000000e6
-721 1 11 26 0.65536000000000000000e5
-721 1 12 19 0.65536000000000000000e5
-721 1 12 27 0.65536000000000000000e5
-721 1 14 21 -0.26214400000000000000e6
-721 2 1 15 0.32768000000000000000e5
-721 2 6 12 -0.32768000000000000000e5
-721 2 7 15 0.65536000000000000000e5
-721 2 9 15 0.13107200000000000000e6
-721 3 1 6 -0.32768000000000000000e5
-721 3 3 16 -0.65536000000000000000e5
-721 3 9 14 0.13107200000000000000e6
-721 4 5 9 -0.65536000000000000000e5
-722 2 7 16 0.65536000000000000000e5
-722 2 9 15 -0.65536000000000000000e5
-723 1 1 8 0.13107200000000000000e6
-723 1 2 33 -0.32768000000000000000e5
-723 1 3 26 0.32768000000000000000e5
-723 1 3 34 0.65536000000000000000e5
-723 1 4 35 -0.32768000000000000000e5
-723 1 5 28 0.32768000000000000000e5
-723 1 6 21 -0.26214400000000000000e6
-723 1 7 22 -0.13107200000000000000e6
-723 1 11 26 0.26214400000000000000e6
-723 2 1 15 0.13107200000000000000e6
-723 2 3 17 0.32768000000000000000e5
-723 2 4 18 0.32768000000000000000e5
-723 2 6 12 -0.13107200000000000000e6
-723 2 7 17 0.65536000000000000000e5
-723 2 12 18 -0.65536000000000000000e5
-723 3 1 6 -0.13107200000000000000e6
-723 3 2 15 0.13107200000000000000e6
-723 3 3 16 0.13107200000000000000e6
-723 3 4 17 0.32768000000000000000e5
-723 3 6 11 0.13107200000000000000e6
-723 3 13 18 -0.32768000000000000000e5
-723 4 4 8 0.13107200000000000000e6
-723 4 8 8 -0.65536000000000000000e5
-724 1 1 8 0.13107200000000000000e6
-724 1 2 9 -0.65536000000000000000e5
-724 1 2 33 -0.32768000000000000000e5
-724 1 3 26 0.32768000000000000000e5
-724 1 3 34 0.65536000000000000000e5
-724 1 4 35 -0.32768000000000000000e5
-724 1 5 28 0.32768000000000000000e5
-724 1 6 21 -0.26214400000000000000e6
-724 1 11 26 0.26214400000000000000e6
-724 1 12 27 -0.13107200000000000000e6
-724 1 19 22 0.65536000000000000000e5
-724 2 1 15 0.13107200000000000000e6
-724 2 3 17 0.32768000000000000000e5
-724 2 4 18 0.32768000000000000000e5
-724 2 6 12 -0.13107200000000000000e6
-724 2 7 18 0.65536000000000000000e5
-724 2 12 18 -0.65536000000000000000e5
-724 3 1 6 -0.13107200000000000000e6
-724 3 2 7 0.65536000000000000000e5
-724 3 2 15 0.19660800000000000000e6
-724 3 4 17 0.32768000000000000000e5
-724 3 6 11 0.13107200000000000000e6
-724 3 13 18 -0.32768000000000000000e5
-724 4 4 8 0.13107200000000000000e6
-724 4 8 8 -0.65536000000000000000e5
-725 2 7 19 0.65536000000000000000e5
-725 2 15 15 -0.13107200000000000000e6
-726 2 7 20 0.65536000000000000000e5
-726 2 13 19 -0.65536000000000000000e5
-727 1 6 13 0.32768000000000000000e5
-727 1 7 14 0.32768000000000000000e5
-727 1 10 13 -0.65536000000000000000e5
-727 1 13 20 0.32768000000000000000e5
-727 2 8 8 0.65536000000000000000e5
-727 3 5 10 0.32768000000000000000e5
-728 1 1 8 -0.81920000000000000000e4
-728 1 5 20 0.81920000000000000000e4
-728 1 6 21 0.32768000000000000000e5
-728 1 7 22 0.16384000000000000000e5
-728 1 9 24 -0.32768000000000000000e5
-728 1 10 25 -0.13107200000000000000e6
-728 1 13 20 0.65536000000000000000e5
-728 1 14 21 0.13107200000000000000e6
-728 2 1 15 -0.81920000000000000000e4
-728 2 2 16 0.16384000000000000000e5
-728 2 6 12 0.81920000000000000000e4
-728 2 8 9 0.65536000000000000000e5
-728 2 9 15 -0.32768000000000000000e5
-728 2 10 12 0.32768000000000000000e5
-728 3 1 6 0.81920000000000000000e4
-728 4 6 6 -0.13107200000000000000e6
-729 2 2 8 -0.65536000000000000000e5
-729 2 8 11 0.65536000000000000000e5
-729 4 4 4 0.13107200000000000000e6
-730 2 2 16 -0.65536000000000000000e5
-730 2 8 12 0.65536000000000000000e5
-731 1 7 22 0.65536000000000000000e5
-731 1 8 23 -0.13107200000000000000e6
-731 1 11 26 0.65536000000000000000e5
-731 1 12 27 0.65536000000000000000e5
-731 2 8 13 0.65536000000000000000e5
-731 3 3 16 -0.65536000000000000000e5
-731 3 9 14 0.13107200000000000000e6
-731 4 5 9 -0.65536000000000000000e5
-732 2 8 15 0.65536000000000000000e5
-732 2 10 12 -0.65536000000000000000e5
-733 1 1 8 -0.81920000000000000000e4
-733 1 5 20 0.81920000000000000000e4
-733 1 6 21 0.32768000000000000000e5
-733 1 7 22 0.16384000000000000000e5
-733 1 9 24 -0.32768000000000000000e5
-733 1 10 25 -0.13107200000000000000e6
-733 1 13 20 0.65536000000000000000e5
-733 1 14 21 0.13107200000000000000e6
-733 2 1 15 -0.81920000000000000000e4
-733 2 2 16 0.16384000000000000000e5
-733 2 6 12 0.81920000000000000000e4
-733 2 8 16 0.65536000000000000000e5
-733 2 9 15 -0.32768000000000000000e5
-733 2 10 12 0.32768000000000000000e5
-733 3 1 6 0.81920000000000000000e4
-734 2 5 19 -0.65536000000000000000e5
-734 2 8 17 0.65536000000000000000e5
-735 1 7 22 0.65536000000000000000e5
-735 1 8 23 -0.13107200000000000000e6
-735 1 11 26 0.65536000000000000000e5
-735 1 12 27 0.65536000000000000000e5
-735 2 8 18 0.65536000000000000000e5
-735 3 3 16 -0.65536000000000000000e5
-735 3 9 14 0.13107200000000000000e6
-736 2 8 19 0.65536000000000000000e5
-736 2 14 16 -0.65536000000000000000e5
-737 1 7 22 0.65536000000000000000e5
-737 1 8 23 -0.13107200000000000000e6
-737 1 11 26 0.65536000000000000000e5
-737 1 12 27 0.65536000000000000000e5
-737 2 8 20 0.65536000000000000000e5
-737 3 3 16 -0.65536000000000000000e5
-737 3 9 14 0.13107200000000000000e6
-737 4 6 10 0.65536000000000000000e5
-738 1 1 8 0.40960000000000000000e4
-738 1 4 15 0.32768000000000000000e5
-738 1 5 20 -0.40960000000000000000e4
-738 1 6 21 -0.16384000000000000000e5
-738 1 7 14 0.32768000000000000000e5
-738 1 7 22 -0.81920000000000000000e4
-738 1 8 15 0.65536000000000000000e5
-738 1 9 24 0.16384000000000000000e5
-738 1 10 25 0.65536000000000000000e5
-738 1 12 14 0.65536000000000000000e5
-738 1 13 14 -0.13107200000000000000e6
-738 1 14 21 -0.65536000000000000000e5
-738 2 1 15 0.40960000000000000000e4
-738 2 2 16 -0.81920000000000000000e4
-738 2 6 12 -0.40960000000000000000e4
-738 2 9 10 0.65536000000000000000e5
-738 2 9 15 0.16384000000000000000e5
-738 2 10 12 -0.16384000000000000000e5
-738 3 1 6 -0.40960000000000000000e4
-738 3 5 10 0.32768000000000000000e5
-738 4 6 6 0.65536000000000000000e5
-739 2 2 16 -0.65536000000000000000e5
-739 2 9 11 0.65536000000000000000e5
-740 1 7 22 0.65536000000000000000e5
-740 1 8 23 -0.13107200000000000000e6
-740 1 11 26 0.65536000000000000000e5
-740 1 12 27 0.65536000000000000000e5
-740 2 9 12 0.65536000000000000000e5
-740 3 3 16 -0.65536000000000000000e5
-740 3 9 14 0.13107200000000000000e6
-740 4 5 9 -0.65536000000000000000e5
-741 1 1 8 0.32768000000000000000e5
-741 1 5 20 -0.32768000000000000000e5
-741 1 6 21 -0.65536000000000000000e5
-741 1 7 22 0.65536000000000000000e5
-741 1 8 23 0.13107200000000000000e6
-741 1 9 24 0.13107200000000000000e6
-741 1 11 26 0.65536000000000000000e5
-741 1 12 19 0.65536000000000000000e5
-741 1 12 27 0.65536000000000000000e5
-741 1 14 21 -0.26214400000000000000e6
-741 2 1 15 0.32768000000000000000e5
-741 2 6 12 -0.32768000000000000000e5
-741 2 9 13 0.65536000000000000000e5
-741 2 9 15 0.13107200000000000000e6
-741 3 1 6 -0.32768000000000000000e5
-741 3 3 16 -0.65536000000000000000e5
-741 3 9 14 0.13107200000000000000e6
-741 4 5 9 -0.65536000000000000000e5
-742 2 9 14 0.65536000000000000000e5
-742 2 10 12 -0.65536000000000000000e5
-743 1 1 8 -0.81920000000000000000e4
-743 1 5 20 0.81920000000000000000e4
-743 1 6 21 0.32768000000000000000e5
-743 1 7 22 0.16384000000000000000e5
-743 1 8 15 -0.13107200000000000000e6
-743 1 9 24 -0.32768000000000000000e5
-743 1 9 25 0.65536000000000000000e5
-743 1 14 21 0.13107200000000000000e6
-743 2 1 15 -0.81920000000000000000e4
-743 2 2 16 0.16384000000000000000e5
-743 2 6 12 0.81920000000000000000e4
-743 2 9 15 -0.32768000000000000000e5
-743 2 9 16 0.65536000000000000000e5
-743 2 10 12 0.32768000000000000000e5
-743 3 1 6 0.81920000000000000000e4
-743 3 9 10 0.13107200000000000000e6
-744 1 7 22 0.65536000000000000000e5
-744 1 8 23 -0.13107200000000000000e6
-744 1 11 26 0.65536000000000000000e5
-744 1 12 27 0.65536000000000000000e5
-744 2 9 17 0.65536000000000000000e5
-744 3 3 16 -0.65536000000000000000e5
-744 3 9 14 0.13107200000000000000e6
-745 2 9 18 0.65536000000000000000e5
-745 2 15 15 -0.13107200000000000000e6
-746 2 9 20 0.65536000000000000000e5
-746 2 16 18 -0.65536000000000000000e5
-747 2 8 14 -0.65536000000000000000e5
-747 2 10 11 0.65536000000000000000e5
-748 2 9 15 -0.65536000000000000000e5
-748 2 10 13 0.65536000000000000000e5
-749 1 1 8 -0.81920000000000000000e4
-749 1 5 20 0.81920000000000000000e4
-749 1 6 21 0.32768000000000000000e5
-749 1 7 22 0.16384000000000000000e5
-749 1 9 24 -0.32768000000000000000e5
-749 1 10 25 -0.13107200000000000000e6
-749 1 13 20 0.65536000000000000000e5
-749 1 14 21 0.13107200000000000000e6
-749 2 1 15 -0.81920000000000000000e4
-749 2 2 16 0.16384000000000000000e5
-749 2 6 12 0.81920000000000000000e4
-749 2 9 15 -0.32768000000000000000e5
-749 2 10 12 0.32768000000000000000e5
-749 2 10 14 0.65536000000000000000e5
-749 3 1 6 0.81920000000000000000e4
-750 1 1 8 -0.81920000000000000000e4
-750 1 5 20 0.81920000000000000000e4
-750 1 6 21 0.32768000000000000000e5
-750 1 7 22 0.16384000000000000000e5
-750 1 8 15 -0.13107200000000000000e6
-750 1 9 24 -0.32768000000000000000e5
-750 1 9 25 0.65536000000000000000e5
-750 1 14 21 0.13107200000000000000e6
-750 2 1 15 -0.81920000000000000000e4
-750 2 2 16 0.16384000000000000000e5
-750 2 6 12 0.81920000000000000000e4
-750 2 9 15 -0.32768000000000000000e5
-750 2 10 12 0.32768000000000000000e5
-750 2 10 15 0.65536000000000000000e5
-750 3 1 6 0.81920000000000000000e4
-750 3 9 10 0.13107200000000000000e6
-751 2 10 17 0.65536000000000000000e5
-751 2 14 16 -0.65536000000000000000e5
-752 2 9 19 -0.65536000000000000000e5
-752 2 10 18 0.65536000000000000000e5
-753 2 10 19 0.65536000000000000000e5
-753 2 16 16 -0.13107200000000000000e6
-754 1 8 23 0.65536000000000000000e5
-754 1 11 26 -0.32768000000000000000e5
-754 1 12 27 -0.32768000000000000000e5
-754 1 14 29 -0.13107200000000000000e6
-754 1 16 31 0.32768000000000000000e5
-754 1 22 29 0.32768000000000000000e5
-754 1 23 30 0.65536000000000000000e5
-754 1 25 28 0.65536000000000000000e5
-754 2 10 20 0.65536000000000000000e5
-754 3 6 19 -0.32768000000000000000e5
-754 3 9 14 -0.65536000000000000000e5
-754 3 10 19 0.13107200000000000000e6
-754 4 6 10 -0.32768000000000000000e5
-755 2 11 12 0.65536000000000000000e5
-755 2 11 17 -0.65536000000000000000e5
-755 4 7 7 -0.13107200000000000000e6
-756 2 3 17 -0.65536000000000000000e5
-756 2 11 13 0.65536000000000000000e5
-757 1 6 21 0.13107200000000000000e6
-757 1 16 23 -0.13107200000000000000e6
-757 2 1 15 -0.65536000000000000000e5
-757 2 11 14 0.65536000000000000000e5
-757 3 1 14 -0.65536000000000000000e5
-757 3 2 15 -0.65536000000000000000e5
-757 3 6 11 -0.65536000000000000000e5
-758 2 6 12 -0.65536000000000000000e5
-758 2 11 15 0.65536000000000000000e5
-758 4 4 8 0.65536000000000000000e5
-759 2 5 19 -0.65536000000000000000e5
-759 2 11 16 0.65536000000000000000e5
-760 1 2 9 -0.13107200000000000000e6
-760 1 3 26 0.65536000000000000000e5
-760 1 3 34 0.13107200000000000000e6
-760 1 4 35 -0.65536000000000000000e5
-760 2 11 18 0.65536000000000000000e5
-760 2 12 18 -0.65536000000000000000e5
-760 3 2 7 0.13107200000000000000e6
-760 3 2 15 0.13107200000000000000e6
-760 3 5 18 0.13107200000000000000e6
-760 3 11 12 -0.65536000000000000000e5
-760 3 13 18 -0.65536000000000000000e5
-761 1 1 32 0.32768000000000000000e5
-761 1 2 9 0.65536000000000000000e5
-761 1 2 33 0.32768000000000000000e5
-761 1 3 26 0.32768000000000000000e5
-761 1 3 34 0.65536000000000000000e5
-761 1 16 31 -0.13107200000000000000e6
-761 2 11 17 0.32768000000000000000e5
-761 2 11 19 0.65536000000000000000e5
-761 3 2 7 -0.65536000000000000000e5
-761 3 2 15 -0.65536000000000000000e5
-761 3 5 18 -0.65536000000000000000e5
-761 3 11 12 -0.32768000000000000000e5
-762 2 11 20 0.65536000000000000000e5
-762 2 17 17 -0.13107200000000000000e6
-763 2 3 17 -0.32768000000000000000e5
-763 2 12 12 0.65536000000000000000e5
-764 2 12 13 0.65536000000000000000e5
-764 2 12 18 -0.65536000000000000000e5
-764 4 8 8 -0.13107200000000000000e6
-765 2 6 12 -0.65536000000000000000e5
-765 2 12 14 0.65536000000000000000e5
-765 4 4 8 0.65536000000000000000e5
-766 1 1 8 0.13107200000000000000e6
-766 1 2 33 -0.32768000000000000000e5
-766 1 3 26 0.32768000000000000000e5
-766 1 3 34 0.65536000000000000000e5
-766 1 4 35 -0.32768000000000000000e5
-766 1 5 28 0.32768000000000000000e5
-766 1 6 21 -0.26214400000000000000e6
-766 1 7 22 -0.13107200000000000000e6
-766 1 11 26 0.26214400000000000000e6
-766 2 1 15 0.13107200000000000000e6
-766 2 3 17 0.32768000000000000000e5
-766 2 4 18 0.32768000000000000000e5
-766 2 6 12 -0.13107200000000000000e6
-766 2 12 15 0.65536000000000000000e5
-766 2 12 18 -0.65536000000000000000e5
-766 3 1 6 -0.13107200000000000000e6
-766 3 2 15 0.13107200000000000000e6
-766 3 3 16 0.13107200000000000000e6
-766 3 4 17 0.32768000000000000000e5
-766 3 6 11 0.13107200000000000000e6
-766 3 13 18 -0.32768000000000000000e5
-766 4 4 8 0.13107200000000000000e6
-766 4 8 8 -0.65536000000000000000e5
-767 1 7 22 0.65536000000000000000e5
-767 1 8 23 -0.13107200000000000000e6
-767 1 11 26 0.65536000000000000000e5
-767 1 12 27 0.65536000000000000000e5
-767 2 12 16 0.65536000000000000000e5
-767 3 3 16 -0.65536000000000000000e5
-767 3 9 14 0.13107200000000000000e6
-768 1 2 9 -0.13107200000000000000e6
-768 1 3 26 0.65536000000000000000e5
-768 1 3 34 0.13107200000000000000e6
-768 1 4 35 -0.65536000000000000000e5
-768 2 12 17 0.65536000000000000000e5
-768 2 12 18 -0.65536000000000000000e5
-768 3 2 7 0.13107200000000000000e6
-768 3 2 15 0.13107200000000000000e6
-768 3 5 18 0.13107200000000000000e6
-768 3 11 12 -0.65536000000000000000e5
-768 3 13 18 -0.65536000000000000000e5
-769 2 6 20 -0.65536000000000000000e5
-769 2 12 19 0.65536000000000000000e5
-770 1 2 9 -0.13107200000000000000e6
-770 1 3 34 -0.13107200000000000000e6
-770 1 4 35 0.65536000000000000000e5
-770 1 17 32 0.65536000000000000000e5
-770 1 26 29 0.13107200000000000000e6
-770 1 26 33 0.65536000000000000000e5
-770 2 6 20 -0.13107200000000000000e6
-770 2 12 20 0.65536000000000000000e5
-770 2 14 20 0.13107200000000000000e6
-770 3 2 7 0.13107200000000000000e6
-770 3 2 15 0.13107200000000000000e6
-770 3 5 18 0.13107200000000000000e6
-770 3 7 20 -0.13107200000000000000e6
-770 3 14 19 0.26214400000000000000e6
-770 3 17 18 0.65536000000000000000e5
-771 2 4 18 -0.32768000000000000000e5
-771 2 13 13 0.65536000000000000000e5
-772 1 1 8 0.13107200000000000000e6
-772 1 2 33 -0.32768000000000000000e5
-772 1 3 26 0.32768000000000000000e5
-772 1 3 34 0.65536000000000000000e5
-772 1 4 35 -0.32768000000000000000e5
-772 1 5 28 0.32768000000000000000e5
-772 1 6 21 -0.26214400000000000000e6
-772 1 7 22 -0.13107200000000000000e6
-772 1 11 26 0.26214400000000000000e6
-772 2 1 15 0.13107200000000000000e6
-772 2 3 17 0.32768000000000000000e5
-772 2 4 18 0.32768000000000000000e5
-772 2 6 12 -0.13107200000000000000e6
-772 2 12 18 -0.65536000000000000000e5
-772 2 13 14 0.65536000000000000000e5
-772 3 1 6 -0.13107200000000000000e6
-772 3 2 15 0.13107200000000000000e6
-772 3 3 16 0.13107200000000000000e6
-772 3 4 17 0.32768000000000000000e5
-772 3 6 11 0.13107200000000000000e6
-772 3 13 18 -0.32768000000000000000e5
-772 4 4 8 0.13107200000000000000e6
-772 4 8 8 -0.65536000000000000000e5
-773 1 1 8 0.13107200000000000000e6
-773 1 2 9 -0.65536000000000000000e5
-773 1 2 33 -0.32768000000000000000e5
-773 1 3 26 0.32768000000000000000e5
-773 1 3 34 0.65536000000000000000e5
-773 1 4 35 -0.32768000000000000000e5
-773 1 5 28 0.32768000000000000000e5
-773 1 6 21 -0.26214400000000000000e6
-773 1 11 26 0.26214400000000000000e6
-773 1 12 27 -0.13107200000000000000e6
-773 1 19 22 0.65536000000000000000e5
-773 2 1 15 0.13107200000000000000e6
-773 2 3 17 0.32768000000000000000e5
-773 2 4 18 0.32768000000000000000e5
-773 2 6 12 -0.13107200000000000000e6
-773 2 12 18 -0.65536000000000000000e5
-773 2 13 15 0.65536000000000000000e5
-773 3 1 6 -0.13107200000000000000e6
-773 3 2 7 0.65536000000000000000e5
-773 3 2 15 0.19660800000000000000e6
-773 3 4 17 0.32768000000000000000e5
-773 3 6 11 0.13107200000000000000e6
-773 3 13 18 -0.32768000000000000000e5
-773 4 4 8 0.13107200000000000000e6
-773 4 8 8 -0.65536000000000000000e5
-774 2 13 16 0.65536000000000000000e5
-774 2 15 15 -0.13107200000000000000e6
-775 2 12 18 -0.65536000000000000000e5
-775 2 13 17 0.65536000000000000000e5
-776 2 4 20 -0.65536000000000000000e5
-776 2 13 18 0.65536000000000000000e5
-777 2 13 20 0.65536000000000000000e5
-777 2 18 18 -0.13107200000000000000e6
-778 2 5 19 -0.32768000000000000000e5
-778 2 14 14 0.65536000000000000000e5
-779 1 7 22 0.65536000000000000000e5
-779 1 8 23 -0.13107200000000000000e6
-779 1 11 26 0.65536000000000000000e5
-779 1 12 27 0.65536000000000000000e5
-779 2 14 15 0.65536000000000000000e5
-779 3 3 16 -0.65536000000000000000e5
-779 3 9 14 0.13107200000000000000e6
-780 1 1 32 0.32768000000000000000e5
-780 1 2 9 0.65536000000000000000e5
-780 1 2 33 0.32768000000000000000e5
-780 1 3 26 0.32768000000000000000e5
-780 1 3 34 0.65536000000000000000e5
-780 1 16 31 -0.13107200000000000000e6
-780 2 11 17 0.32768000000000000000e5
-780 2 14 17 0.65536000000000000000e5
-780 3 2 7 -0.65536000000000000000e5
-780 3 2 15 -0.65536000000000000000e5
-780 3 5 18 -0.65536000000000000000e5
-780 3 11 12 -0.32768000000000000000e5
-781 2 6 20 -0.65536000000000000000e5
-781 2 14 18 0.65536000000000000000e5
-782 1 7 22 0.65536000000000000000e5
-782 1 8 23 -0.13107200000000000000e6
-782 1 11 26 0.65536000000000000000e5
-782 1 12 27 0.65536000000000000000e5
-782 2 14 19 0.65536000000000000000e5
-782 3 3 16 -0.65536000000000000000e5
-782 3 9 14 0.13107200000000000000e6
-782 4 6 10 0.65536000000000000000e5
-783 2 9 19 -0.65536000000000000000e5
-783 2 15 16 0.65536000000000000000e5
-784 2 6 20 -0.65536000000000000000e5
-784 2 15 17 0.65536000000000000000e5
-785 2 13 19 -0.65536000000000000000e5
-785 2 15 18 0.65536000000000000000e5
-786 2 15 19 0.65536000000000000000e5
-786 2 16 18 -0.65536000000000000000e5
-787 1 7 22 0.13107200000000000000e6
-787 1 19 34 0.65536000000000000000e5
-787 1 26 29 -0.65536000000000000000e5
-787 1 29 30 -0.13107200000000000000e6
-787 2 14 20 -0.65536000000000000000e5
-787 2 15 20 0.65536000000000000000e5
-787 3 3 16 -0.13107200000000000000e6
-787 3 6 19 -0.13107200000000000000e6
-787 3 14 19 -0.13107200000000000000e6
-788 1 7 22 0.65536000000000000000e5
-788 1 8 23 -0.13107200000000000000e6
-788 1 11 26 0.65536000000000000000e5
-788 1 12 27 0.65536000000000000000e5
-788 2 16 17 0.65536000000000000000e5
-788 3 3 16 -0.65536000000000000000e5
-788 3 9 14 0.13107200000000000000e6
-788 4 6 10 0.65536000000000000000e5
-789 1 8 23 0.65536000000000000000e5
-789 1 11 26 -0.32768000000000000000e5
-789 1 12 27 -0.32768000000000000000e5
-789 1 14 29 -0.13107200000000000000e6
-789 1 16 31 0.32768000000000000000e5
-789 1 22 29 0.32768000000000000000e5
-789 1 23 30 0.65536000000000000000e5
-789 1 25 28 0.65536000000000000000e5
-789 2 16 19 0.65536000000000000000e5
-789 3 6 19 -0.32768000000000000000e5
-789 3 9 14 -0.65536000000000000000e5
-789 3 10 19 0.13107200000000000000e6
-789 4 6 10 -0.32768000000000000000e5
-790 1 7 22 0.65536000000000000000e5
-790 1 12 35 0.65536000000000000000e5
-790 1 25 32 -0.13107200000000000000e6
-790 1 29 30 0.65536000000000000000e5
-790 2 16 20 0.65536000000000000000e5
-790 3 3 16 -0.65536000000000000000e5
-790 3 6 19 -0.65536000000000000000e5
-790 3 14 19 -0.65536000000000000000e5
-791 1 2 9 -0.13107200000000000000e6
-791 1 3 34 -0.13107200000000000000e6
-791 1 4 35 0.65536000000000000000e5
-791 1 17 32 0.65536000000000000000e5
-791 1 26 29 0.13107200000000000000e6
-791 1 26 33 0.65536000000000000000e5
-791 2 6 20 -0.13107200000000000000e6
-791 2 14 20 0.13107200000000000000e6
-791 2 17 18 0.65536000000000000000e5
-791 3 2 7 0.13107200000000000000e6
-791 3 2 15 0.13107200000000000000e6
-791 3 5 18 0.13107200000000000000e6
-791 3 7 20 -0.13107200000000000000e6
-791 3 14 19 0.26214400000000000000e6
-791 3 17 18 0.65536000000000000000e5
-792 2 14 20 -0.65536000000000000000e5
-792 2 17 19 0.65536000000000000000e5
-793 1 2 9 -0.13107200000000000000e6
-793 1 3 34 -0.13107200000000000000e6
-793 1 4 35 0.65536000000000000000e5
-793 1 17 32 0.65536000000000000000e5
-793 1 26 29 0.13107200000000000000e6
-793 1 26 33 0.65536000000000000000e5
-793 2 6 20 -0.13107200000000000000e6
-793 2 14 20 0.13107200000000000000e6
-793 2 17 20 0.65536000000000000000e5
-793 3 2 7 0.13107200000000000000e6
-793 3 2 15 0.13107200000000000000e6
-793 3 5 18 0.13107200000000000000e6
-793 3 7 20 -0.13107200000000000000e6
-793 3 14 19 0.26214400000000000000e6
-793 3 17 18 0.65536000000000000000e5
-793 4 10 10 0.13107200000000000000e6
-794 1 7 22 0.13107200000000000000e6
-794 1 19 34 0.65536000000000000000e5
-794 1 26 29 -0.65536000000000000000e5
-794 1 29 30 -0.13107200000000000000e6
-794 2 14 20 -0.65536000000000000000e5
-794 2 18 19 0.65536000000000000000e5
-794 3 3 16 -0.13107200000000000000e6
-794 3 6 19 -0.13107200000000000000e6
-794 3 14 19 -0.13107200000000000000e6
-795 1 7 22 0.32768000000000000000e5
-795 1 12 35 0.32768000000000000000e5
-795 1 25 32 -0.65536000000000000000e5
-795 1 29 30 0.32768000000000000000e5
-795 2 19 19 0.65536000000000000000e5
-795 3 3 16 -0.32768000000000000000e5
-795 3 6 19 -0.32768000000000000000e5
-795 3 14 19 -0.32768000000000000000e5
-796 1 2 9 -0.65536000000000000000e5
-796 1 3 34 -0.65536000000000000000e5
-796 1 7 22 0.13107200000000000000e6
-796 1 20 35 0.65536000000000000000e5
-796 1 30 33 0.65536000000000000000e5
-796 1 31 32 -0.13107200000000000000e6
-796 2 6 20 -0.65536000000000000000e5
-796 2 19 20 0.65536000000000000000e5
-796 3 2 7 0.65536000000000000000e5
-796 3 2 15 0.65536000000000000000e5
-796 3 3 16 -0.13107200000000000000e6
-796 3 5 18 0.65536000000000000000e5
-796 3 6 19 -0.13107200000000000000e6
-796 3 7 20 -0.65536000000000000000e5
-796 3 15 20 -0.65536000000000000000e5
-797 1 1 2 -0.32768000000000000000e5
-797 1 1 16 0.32768000000000000000e5
-797 3 1 1 0.65536000000000000000e5
-798 1 2 5 0.65536000000000000000e5
-798 1 3 10 -0.26214400000000000000e6
-798 1 3 18 -0.65536000000000000000e5
-798 1 6 21 0.26214400000000000000e6
-798 2 1 7 0.13107200000000000000e6
-798 2 1 15 -0.13107200000000000000e6
-798 3 1 3 0.65536000000000000000e5
-798 3 1 6 0.13107200000000000000e6
-798 3 2 3 0.65536000000000000000e5
-798 3 2 7 0.13107200000000000000e6
-798 4 2 2 0.13107200000000000000e6
-799 3 1 4 0.65536000000000000000e5
-799 3 2 3 -0.65536000000000000000e5
-800 1 1 2 -0.32768000000000000000e5
-800 1 1 16 0.32768000000000000000e5
-800 1 2 5 0.32768000000000000000e5
-800 1 3 10 -0.13107200000000000000e6
-800 1 3 18 -0.32768000000000000000e5
-800 1 6 21 0.13107200000000000000e6
-800 2 1 7 0.65536000000000000000e5
-800 2 1 15 -0.65536000000000000000e5
-800 3 1 2 -0.32768000000000000000e5
-800 3 1 5 0.65536000000000000000e5
-800 3 1 6 0.65536000000000000000e5
-800 3 2 3 0.32768000000000000000e5
-800 3 2 7 0.65536000000000000000e5
-800 4 1 1 -0.65536000000000000000e5
-800 4 2 2 0.65536000000000000000e5
-801 1 3 10 -0.13107200000000000000e6
-801 1 6 21 0.13107200000000000000e6
-801 2 1 7 0.65536000000000000000e5
-801 2 1 15 -0.65536000000000000000e5
-801 3 1 6 0.65536000000000000000e5
-801 3 1 7 0.65536000000000000000e5
-801 3 2 7 0.65536000000000000000e5
-802 1 3 10 0.13107200000000000000e6
-802 1 4 11 0.13107200000000000000e6
-802 1 6 21 -0.13107200000000000000e6
-802 1 7 22 -0.65536000000000000000e5
-802 1 8 23 -0.13107200000000000000e6
-802 1 11 26 0.65536000000000000000e5
-802 1 12 27 0.65536000000000000000e5
-802 2 3 9 0.65536000000000000000e5
-802 2 6 8 0.13107200000000000000e6
-802 2 8 14 -0.13107200000000000000e6
-802 3 1 8 0.65536000000000000000e5
-802 3 3 8 0.19660800000000000000e6
-802 3 3 16 -0.65536000000000000000e5
-802 3 4 9 0.65536000000000000000e5
-802 3 5 10 -0.26214400000000000000e6
-802 3 9 14 0.13107200000000000000e6
-802 4 2 6 0.65536000000000000000e5
-802 4 4 4 0.13107200000000000000e6
-802 4 5 9 -0.65536000000000000000e5
-803 1 3 10 -0.65536000000000000000e5
-803 1 6 21 0.65536000000000000000e5
-803 3 1 9 0.65536000000000000000e5
-804 1 3 10 0.32768000000000000000e5
-804 1 4 11 0.65536000000000000000e5
-804 1 6 21 -0.32768000000000000000e5
-804 1 7 22 -0.32768000000000000000e5
-804 1 8 23 -0.65536000000000000000e5
-804 1 11 26 0.32768000000000000000e5
-804 1 12 27 0.32768000000000000000e5
-804 2 3 9 0.32768000000000000000e5
-804 2 6 8 0.65536000000000000000e5
-804 2 8 14 -0.65536000000000000000e5
-804 3 1 10 0.65536000000000000000e5
-804 3 3 8 0.65536000000000000000e5
-804 3 3 16 -0.32768000000000000000e5
-804 3 4 9 0.32768000000000000000e5
-804 3 5 10 -0.13107200000000000000e6
-804 3 9 14 0.65536000000000000000e5
-804 4 2 6 0.32768000000000000000e5
-804 4 5 9 -0.32768000000000000000e5
-805 1 2 5 -0.65536000000000000000e5
-805 1 2 9 0.13107200000000000000e6
-805 1 2 33 0.65536000000000000000e5
-805 1 3 10 0.26214400000000000000e6
-805 1 3 26 -0.65536000000000000000e5
-805 1 3 34 -0.13107200000000000000e6
-805 1 4 35 0.65536000000000000000e5
-805 1 6 21 -0.26214400000000000000e6
-805 2 1 3 0.65536000000000000000e5
-805 2 1 7 -0.13107200000000000000e6
-805 2 1 15 0.13107200000000000000e6
-805 2 2 12 -0.65536000000000000000e5
-805 2 3 17 -0.65536000000000000000e5
-805 2 11 11 -0.13107200000000000000e6
-805 2 11 17 0.65536000000000000000e5
-805 2 12 18 0.65536000000000000000e5
-805 3 1 2 0.65536000000000000000e5
-805 3 1 6 -0.26214400000000000000e6
-805 3 1 11 0.65536000000000000000e5
-805 3 1 14 -0.13107200000000000000e6
-805 3 2 7 -0.26214400000000000000e6
-805 3 2 15 -0.13107200000000000000e6
-805 3 4 17 -0.65536000000000000000e5
-805 3 6 11 0.13107200000000000000e6
-805 3 13 18 0.65536000000000000000e5
-805 4 2 2 -0.13107200000000000000e6
-805 4 7 7 0.13107200000000000000e6
-806 1 1 8 -0.13107200000000000000e6
-806 1 2 9 -0.26214400000000000000e6
-806 1 2 17 -0.65536000000000000000e5
-806 1 2 33 -0.65536000000000000000e5
-806 1 3 34 0.13107200000000000000e6
-806 1 4 35 -0.65536000000000000000e5
-806 1 6 21 0.26214400000000000000e6
-806 2 1 15 -0.13107200000000000000e6
-806 2 3 17 0.65536000000000000000e5
-806 2 11 17 -0.65536000000000000000e5
-806 2 12 18 -0.65536000000000000000e5
-806 3 1 6 0.13107200000000000000e6
-806 3 1 12 0.65536000000000000000e5
-806 3 2 7 0.26214400000000000000e6
-806 3 2 15 0.13107200000000000000e6
-806 3 4 17 0.65536000000000000000e5
-806 3 6 11 -0.13107200000000000000e6
-806 3 13 18 -0.65536000000000000000e5
-806 4 7 7 -0.13107200000000000000e6
-807 1 1 8 0.13107200000000000000e6
-807 1 2 9 0.13107200000000000000e6
-807 1 2 17 0.65536000000000000000e5
-807 1 3 18 0.65536000000000000000e5
-807 1 3 26 0.65536000000000000000e5
-807 1 6 21 -0.26214400000000000000e6
-807 2 1 15 0.13107200000000000000e6
-807 2 2 12 0.65536000000000000000e5
-807 3 1 6 -0.13107200000000000000e6
-807 3 1 13 0.65536000000000000000e5
-807 3 2 7 -0.13107200000000000000e6
-808 3 1 15 0.65536000000000000000e5
-808 3 6 11 -0.65536000000000000000e5
-809 1 6 21 -0.65536000000000000000e5
-809 1 16 23 0.65536000000000000000e5
-809 3 1 16 0.65536000000000000000e5
-810 1 1 8 0.13107200000000000000e6
-810 1 1 32 0.65536000000000000000e5
-810 1 2 9 0.26214400000000000000e6
-810 1 2 33 0.65536000000000000000e5
-810 1 3 34 -0.13107200000000000000e6
-810 1 4 35 0.65536000000000000000e5
-810 1 6 21 -0.26214400000000000000e6
-810 2 1 15 0.13107200000000000000e6
-810 2 3 17 -0.65536000000000000000e5
-810 2 11 17 0.65536000000000000000e5
-810 2 12 18 0.65536000000000000000e5
-810 3 1 6 -0.13107200000000000000e6
-810 3 1 17 0.65536000000000000000e5
-810 3 2 7 -0.26214400000000000000e6
-810 3 2 15 -0.13107200000000000000e6
-810 3 4 17 -0.65536000000000000000e5
-810 3 6 11 0.13107200000000000000e6
-810 3 13 18 0.65536000000000000000e5
-810 4 7 7 0.13107200000000000000e6
-811 3 1 18 0.65536000000000000000e5
-811 3 11 12 -0.65536000000000000000e5
-812 1 1 8 0.65536000000000000000e5
-812 1 1 32 0.32768000000000000000e5
-812 1 2 9 0.65536000000000000000e5
-812 1 2 33 0.32768000000000000000e5
-812 1 3 26 0.32768000000000000000e5
-812 1 6 21 -0.13107200000000000000e6
-812 2 1 15 0.65536000000000000000e5
-812 2 11 17 0.32768000000000000000e5
-812 3 1 6 -0.65536000000000000000e5
-812 3 1 19 0.65536000000000000000e5
-812 3 2 7 -0.65536000000000000000e5
-812 3 6 11 0.65536000000000000000e5
-812 3 11 12 -0.32768000000000000000e5
-813 1 3 26 -0.65536000000000000000e5
-813 1 17 32 -0.65536000000000000000e5
-813 1 26 29 0.13107200000000000000e6
-813 1 26 33 -0.65536000000000000000e5
-813 2 17 17 -0.13107200000000000000e6
-813 3 1 20 0.65536000000000000000e5
-813 3 11 12 0.65536000000000000000e5
-813 3 17 18 -0.65536000000000000000e5
-814 1 2 5 0.32768000000000000000e5
-814 1 3 10 -0.13107200000000000000e6
-814 1 3 18 -0.32768000000000000000e5
-814 1 6 21 0.13107200000000000000e6
-814 2 1 7 0.65536000000000000000e5
-814 2 1 15 -0.65536000000000000000e5
-814 3 1 6 0.65536000000000000000e5
-814 3 2 2 0.65536000000000000000e5
-814 3 2 3 0.32768000000000000000e5
-814 3 2 7 0.65536000000000000000e5
-814 4 2 2 0.65536000000000000000e5
-815 1 2 5 -0.65536000000000000000e5
-815 1 3 18 0.65536000000000000000e5
-815 3 2 4 0.65536000000000000000e5
-816 3 1 6 -0.65536000000000000000e5
-816 3 2 5 0.65536000000000000000e5
-817 1 3 10 -0.13107200000000000000e6
-817 1 6 21 0.13107200000000000000e6
-817 2 1 7 0.65536000000000000000e5
-817 2 1 15 -0.65536000000000000000e5
-817 3 1 6 0.65536000000000000000e5
-817 3 2 6 0.65536000000000000000e5
-817 3 2 7 0.65536000000000000000e5
-818 1 3 10 -0.65536000000000000000e5
-818 1 6 21 0.65536000000000000000e5
-818 3 2 8 0.65536000000000000000e5
-819 3 2 9 0.65536000000000000000e5
-819 3 3 8 -0.65536000000000000000e5
-820 1 3 10 -0.32768000000000000000e5
-820 1 4 11 -0.32768000000000000000e5
-820 1 6 21 0.32768000000000000000e5
-820 1 7 22 0.32768000000000000000e5
-820 3 2 10 0.65536000000000000000e5
-820 3 3 8 -0.32768000000000000000e5
-820 4 2 6 -0.32768000000000000000e5
-821 1 1 8 -0.13107200000000000000e6
-821 1 2 9 -0.26214400000000000000e6
-821 1 2 17 -0.65536000000000000000e5
-821 1 2 33 -0.65536000000000000000e5
-821 1 3 34 0.13107200000000000000e6
-821 1 4 35 -0.65536000000000000000e5
-821 1 6 21 0.26214400000000000000e6
-821 2 1 15 -0.13107200000000000000e6
-821 2 3 17 0.65536000000000000000e5
-821 2 11 17 -0.65536000000000000000e5
-821 2 12 18 -0.65536000000000000000e5
-821 3 1 6 0.13107200000000000000e6
-821 3 2 7 0.26214400000000000000e6
-821 3 2 11 0.65536000000000000000e5
-821 3 2 15 0.13107200000000000000e6
-821 3 4 17 0.65536000000000000000e5
-821 3 6 11 -0.13107200000000000000e6
-821 3 13 18 -0.65536000000000000000e5
-821 4 7 7 -0.13107200000000000000e6
-822 1 1 8 0.13107200000000000000e6
-822 1 2 9 0.13107200000000000000e6
-822 1 2 17 0.65536000000000000000e5
-822 1 3 18 0.65536000000000000000e5
-822 1 3 26 0.65536000000000000000e5
-822 1 6 21 -0.26214400000000000000e6
-822 2 1 15 0.13107200000000000000e6
-822 2 2 12 0.65536000000000000000e5
-822 3 1 6 -0.13107200000000000000e6
-822 3 2 7 -0.13107200000000000000e6
-822 3 2 12 0.65536000000000000000e5
-823 1 2 9 0.13107200000000000000e6
-823 1 2 33 0.65536000000000000000e5
-823 1 3 18 -0.65536000000000000000e5
-823 1 3 26 -0.65536000000000000000e5
-823 1 3 34 -0.13107200000000000000e6
-823 1 4 35 0.65536000000000000000e5
-823 2 3 17 -0.65536000000000000000e5
-823 2 12 18 0.65536000000000000000e5
-823 3 2 7 -0.13107200000000000000e6
-823 3 2 13 0.65536000000000000000e5
-823 3 2 15 -0.13107200000000000000e6
-823 3 4 17 -0.65536000000000000000e5
-823 3 13 18 0.65536000000000000000e5
-824 3 2 14 0.65536000000000000000e5
-824 3 6 11 -0.65536000000000000000e5
-825 1 1 8 0.32768000000000000000e5
-825 1 5 20 -0.32768000000000000000e5
-825 1 6 21 -0.65536000000000000000e5
-825 1 11 26 0.65536000000000000000e5
-825 2 1 15 0.32768000000000000000e5
-825 2 6 12 -0.32768000000000000000e5
-825 3 1 6 -0.32768000000000000000e5
-825 3 2 16 0.65536000000000000000e5
-826 3 2 17 0.65536000000000000000e5
-826 3 11 12 -0.65536000000000000000e5
-827 1 2 9 -0.13107200000000000000e6
-827 1 3 26 0.65536000000000000000e5
-827 1 3 34 0.13107200000000000000e6
-827 1 4 35 -0.65536000000000000000e5
-827 2 3 17 0.65536000000000000000e5
-827 2 12 18 -0.65536000000000000000e5
-827 3 2 7 0.13107200000000000000e6
-827 3 2 15 0.13107200000000000000e6
-827 3 2 18 0.65536000000000000000e5
-827 3 4 17 0.65536000000000000000e5
-827 3 13 18 -0.65536000000000000000e5
-828 3 2 19 0.65536000000000000000e5
-828 3 5 18 -0.65536000000000000000e5
-829 1 2 33 -0.65536000000000000000e5
-829 1 17 32 0.65536000000000000000e5
-829 3 2 20 0.65536000000000000000e5
-830 1 2 5 -0.32768000000000000000e5
-830 1 3 18 0.32768000000000000000e5
-830 3 3 3 0.65536000000000000000e5
-831 1 2 5 0.65536000000000000000e5
-831 1 3 18 -0.65536000000000000000e5
-831 2 2 4 0.65536000000000000000e5
-831 2 3 17 -0.65536000000000000000e5
-831 3 2 3 0.65536000000000000000e5
-831 3 2 7 -0.13107200000000000000e6
-831 3 3 4 0.65536000000000000000e5
-831 4 3 7 -0.65536000000000000000e5
-832 1 3 10 -0.13107200000000000000e6
-832 1 6 21 0.13107200000000000000e6
-832 2 1 7 0.65536000000000000000e5
-832 2 1 15 -0.65536000000000000000e5
-832 3 1 6 0.65536000000000000000e5
-832 3 2 7 0.65536000000000000000e5
-832 3 3 5 0.65536000000000000000e5
-833 3 2 7 -0.65536000000000000000e5
-833 3 3 6 0.65536000000000000000e5
-834 1 2 9 0.65536000000000000000e5
-834 1 4 11 -0.13107200000000000000e6
-834 1 5 8 0.65536000000000000000e5
-834 1 5 20 0.65536000000000000000e5
-834 2 4 6 0.65536000000000000000e5
-834 3 3 7 0.65536000000000000000e5
-835 1 4 11 -0.65536000000000000000e5
-835 1 7 22 0.65536000000000000000e5
-835 3 3 9 0.65536000000000000000e5
-836 1 4 11 -0.32768000000000000000e5
-836 1 8 23 0.65536000000000000000e5
-836 1 11 26 -0.32768000000000000000e5
-836 1 12 27 -0.32768000000000000000e5
-836 2 3 9 -0.32768000000000000000e5
-836 3 3 8 -0.32768000000000000000e5
-836 3 3 10 0.65536000000000000000e5
-836 3 3 16 0.32768000000000000000e5
-836 3 4 9 -0.32768000000000000000e5
-836 3 9 14 -0.65536000000000000000e5
-836 4 5 9 0.32768000000000000000e5
-837 1 1 8 0.13107200000000000000e6
-837 1 2 9 0.13107200000000000000e6
-837 1 2 17 0.65536000000000000000e5
-837 1 3 18 0.65536000000000000000e5
-837 1 3 26 0.65536000000000000000e5
-837 1 6 21 -0.26214400000000000000e6
-837 2 1 15 0.13107200000000000000e6
-837 2 2 12 0.65536000000000000000e5
-837 3 1 6 -0.13107200000000000000e6
-837 3 2 7 -0.13107200000000000000e6
-837 3 3 11 0.65536000000000000000e5
-838 1 2 9 0.13107200000000000000e6
-838 1 2 33 0.65536000000000000000e5
-838 1 3 18 -0.65536000000000000000e5
-838 1 3 26 -0.65536000000000000000e5
-838 1 3 34 -0.13107200000000000000e6
-838 1 4 35 0.65536000000000000000e5
-838 2 3 17 -0.65536000000000000000e5
-838 2 12 18 0.65536000000000000000e5
-838 3 2 7 -0.13107200000000000000e6
-838 3 2 15 -0.13107200000000000000e6
-838 3 3 12 0.65536000000000000000e5
-838 3 4 17 -0.65536000000000000000e5
-838 3 13 18 0.65536000000000000000e5
-839 1 1 8 -0.13107200000000000000e6
-839 1 2 9 -0.26214400000000000000e6
-839 1 2 17 -0.65536000000000000000e5
-839 1 2 33 -0.65536000000000000000e5
-839 1 3 34 0.13107200000000000000e6
-839 1 4 35 -0.65536000000000000000e5
-839 1 6 21 0.26214400000000000000e6
-839 2 1 15 -0.13107200000000000000e6
-839 2 2 12 -0.65536000000000000000e5
-839 2 3 17 0.65536000000000000000e5
-839 2 12 18 -0.65536000000000000000e5
-839 3 1 6 0.13107200000000000000e6
-839 3 2 7 0.26214400000000000000e6
-839 3 3 13 0.65536000000000000000e5
-839 3 4 17 0.65536000000000000000e5
-839 3 13 18 -0.65536000000000000000e5
-839 4 3 7 0.65536000000000000000e5
-840 3 2 15 -0.65536000000000000000e5
-840 3 3 14 0.65536000000000000000e5
-841 1 1 8 0.65536000000000000000e5
-841 1 5 20 -0.65536000000000000000e5
-841 1 6 21 -0.13107200000000000000e6
-841 1 11 26 0.13107200000000000000e6
-841 2 1 15 0.65536000000000000000e5
-841 2 6 12 -0.65536000000000000000e5
-841 3 1 6 -0.65536000000000000000e5
-841 3 2 15 0.65536000000000000000e5
-841 3 3 15 0.65536000000000000000e5
-841 3 6 11 0.65536000000000000000e5
-841 4 4 8 0.65536000000000000000e5
-842 1 2 9 -0.13107200000000000000e6
-842 1 3 26 0.65536000000000000000e5
-842 1 3 34 0.13107200000000000000e6
-842 1 4 35 -0.65536000000000000000e5
-842 2 3 17 0.65536000000000000000e5
-842 2 12 18 -0.65536000000000000000e5
-842 3 2 7 0.13107200000000000000e6
-842 3 2 15 0.13107200000000000000e6
-842 3 3 17 0.65536000000000000000e5
-842 3 4 17 0.65536000000000000000e5
-842 3 13 18 -0.65536000000000000000e5
-843 3 3 18 0.65536000000000000000e5
-843 3 4 17 -0.65536000000000000000e5
-844 1 1 8 -0.65536000000000000000e5
-844 1 3 34 0.65536000000000000000e5
-844 1 6 21 0.13107200000000000000e6
-844 1 11 26 -0.13107200000000000000e6
-844 2 1 15 -0.65536000000000000000e5
-844 2 6 12 0.65536000000000000000e5
-844 3 1 6 0.65536000000000000000e5
-844 3 2 15 -0.65536000000000000000e5
-844 3 3 19 0.65536000000000000000e5
-844 3 6 11 -0.65536000000000000000e5
-844 4 4 8 -0.65536000000000000000e5
-845 1 2 33 0.65536000000000000000e5
-845 1 3 34 -0.13107200000000000000e6
-845 1 4 35 0.65536000000000000000e5
-845 1 26 33 0.65536000000000000000e5
-845 2 12 18 0.65536000000000000000e5
-845 3 3 20 0.65536000000000000000e5
-845 3 13 18 0.65536000000000000000e5
-845 3 17 18 0.65536000000000000000e5
-846 1 2 9 0.65536000000000000000e5
-846 1 4 11 -0.13107200000000000000e6
-846 1 5 8 0.65536000000000000000e5
-846 1 5 20 0.65536000000000000000e5
-846 2 2 4 -0.32768000000000000000e5
-846 2 3 17 0.32768000000000000000e5
-846 2 4 6 0.65536000000000000000e5
-846 3 2 3 -0.32768000000000000000e5
-846 3 2 7 0.65536000000000000000e5
-846 3 4 4 0.65536000000000000000e5
-846 4 3 3 0.65536000000000000000e5
-846 4 3 7 0.32768000000000000000e5
-847 3 2 7 -0.65536000000000000000e5
-847 3 4 5 0.65536000000000000000e5
-848 1 2 9 0.65536000000000000000e5
-848 1 4 11 -0.13107200000000000000e6
-848 1 5 8 0.65536000000000000000e5
-848 1 5 20 0.65536000000000000000e5
-848 2 4 6 0.65536000000000000000e5
-848 3 4 6 0.65536000000000000000e5
-849 1 2 9 -0.65536000000000000000e5
-849 1 5 8 -0.65536000000000000000e5
-849 1 5 20 -0.65536000000000000000e5
-849 1 7 22 0.13107200000000000000e6
-849 2 4 14 -0.65536000000000000000e5
-849 3 2 7 0.65536000000000000000e5
-849 3 4 7 0.65536000000000000000e5
-850 1 4 11 -0.65536000000000000000e5
-850 1 7 22 0.65536000000000000000e5
-850 3 4 8 0.65536000000000000000e5
-851 1 4 11 0.32768000000000000000e5
-851 1 4 15 -0.13107200000000000000e6
-851 1 8 23 -0.65536000000000000000e5
-851 1 9 12 0.65536000000000000000e5
-851 1 9 24 -0.65536000000000000000e5
-851 1 11 26 0.32768000000000000000e5
-851 1 12 27 0.32768000000000000000e5
-851 1 14 21 0.13107200000000000000e6
-851 2 3 9 0.32768000000000000000e5
-851 2 4 10 0.65536000000000000000e5
-851 2 9 15 -0.65536000000000000000e5
-851 3 3 8 0.32768000000000000000e5
-851 3 3 16 -0.32768000000000000000e5
-851 3 4 9 0.32768000000000000000e5
-851 3 4 10 0.65536000000000000000e5
-851 3 9 14 0.65536000000000000000e5
-851 4 5 9 -0.32768000000000000000e5
-852 1 2 9 0.13107200000000000000e6
-852 1 2 33 0.65536000000000000000e5
-852 1 3 18 -0.65536000000000000000e5
-852 1 3 26 -0.65536000000000000000e5
-852 1 3 34 -0.13107200000000000000e6
-852 1 4 35 0.65536000000000000000e5
-852 2 3 17 -0.65536000000000000000e5
-852 2 12 18 0.65536000000000000000e5
-852 3 2 7 -0.13107200000000000000e6
-852 3 2 15 -0.13107200000000000000e6
-852 3 4 11 0.65536000000000000000e5
-852 3 4 17 -0.65536000000000000000e5
-852 3 13 18 0.65536000000000000000e5
-853 1 1 8 -0.13107200000000000000e6
-853 1 2 9 -0.26214400000000000000e6
-853 1 2 17 -0.65536000000000000000e5
-853 1 2 33 -0.65536000000000000000e5
-853 1 3 34 0.13107200000000000000e6
-853 1 4 35 -0.65536000000000000000e5
-853 1 6 21 0.26214400000000000000e6
-853 2 1 15 -0.13107200000000000000e6
-853 2 2 12 -0.65536000000000000000e5
-853 2 3 17 0.65536000000000000000e5
-853 2 12 18 -0.65536000000000000000e5
-853 3 1 6 0.13107200000000000000e6
-853 3 2 7 0.26214400000000000000e6
-853 3 4 12 0.65536000000000000000e5
-853 3 4 17 0.65536000000000000000e5
-853 3 13 18 -0.65536000000000000000e5
-853 4 3 7 0.65536000000000000000e5
-854 1 1 8 0.13107200000000000000e6
-854 1 2 9 -0.13107200000000000000e6
-854 1 3 26 0.65536000000000000000e5
-854 1 4 19 -0.65536000000000000000e5
-854 1 6 21 -0.26214400000000000000e6
-854 1 11 26 0.26214400000000000000e6
-854 2 1 15 0.13107200000000000000e6
-854 2 3 17 0.65536000000000000000e5
-854 2 6 12 -0.13107200000000000000e6
-854 2 12 18 -0.65536000000000000000e5
-854 3 1 6 -0.13107200000000000000e6
-854 3 2 7 0.13107200000000000000e6
-854 3 2 15 0.26214400000000000000e6
-854 3 4 13 0.65536000000000000000e5
-854 3 6 11 0.13107200000000000000e6
-854 4 4 8 0.13107200000000000000e6
-854 4 8 8 -0.13107200000000000000e6
-855 1 1 8 0.65536000000000000000e5
-855 1 5 20 -0.65536000000000000000e5
-855 1 6 21 -0.13107200000000000000e6
-855 1 11 26 0.13107200000000000000e6
-855 2 1 15 0.65536000000000000000e5
-855 2 6 12 -0.65536000000000000000e5
-855 3 1 6 -0.65536000000000000000e5
-855 3 2 15 0.65536000000000000000e5
-855 3 4 14 0.65536000000000000000e5
-855 3 6 11 0.65536000000000000000e5
-855 4 4 8 0.65536000000000000000e5
-856 1 1 8 0.65536000000000000000e5
-856 1 2 33 -0.32768000000000000000e5
-856 1 3 26 0.32768000000000000000e5
-856 1 3 34 0.65536000000000000000e5
-856 1 4 35 -0.32768000000000000000e5
-856 1 5 20 0.65536000000000000000e5
-856 1 5 28 0.32768000000000000000e5
-856 1 6 21 -0.13107200000000000000e6
-856 1 7 22 -0.13107200000000000000e6
-856 1 11 26 0.13107200000000000000e6
-856 2 1 15 0.65536000000000000000e5
-856 2 3 17 0.32768000000000000000e5
-856 2 4 14 0.65536000000000000000e5
-856 2 4 18 0.32768000000000000000e5
-856 2 6 12 -0.65536000000000000000e5
-856 2 12 18 -0.65536000000000000000e5
-856 3 1 6 -0.65536000000000000000e5
-856 3 2 15 0.13107200000000000000e6
-856 3 4 15 0.65536000000000000000e5
-856 3 4 17 0.32768000000000000000e5
-856 3 6 11 0.65536000000000000000e5
-856 3 13 18 -0.32768000000000000000e5
-856 4 4 8 0.65536000000000000000e5
-856 4 8 8 -0.65536000000000000000e5
-857 1 1 8 -0.32768000000000000000e5
-857 1 5 20 0.32768000000000000000e5
-857 1 6 21 0.65536000000000000000e5
-857 1 11 26 -0.65536000000000000000e5
-857 2 1 15 -0.32768000000000000000e5
-857 2 6 12 0.32768000000000000000e5
-857 3 1 6 0.32768000000000000000e5
-857 3 3 16 0.65536000000000000000e5
-857 3 4 16 0.65536000000000000000e5
-857 3 9 14 -0.13107200000000000000e6
-857 4 5 9 0.65536000000000000000e5
-858 1 1 8 -0.13107200000000000000e6
-858 1 2 9 0.13107200000000000000e6
-858 1 3 26 -0.65536000000000000000e5
-858 1 4 35 0.65536000000000000000e5
-858 1 6 21 0.26214400000000000000e6
-858 1 11 26 -0.26214400000000000000e6
-858 2 1 15 -0.13107200000000000000e6
-858 2 3 17 -0.65536000000000000000e5
-858 2 6 12 0.13107200000000000000e6
-858 2 12 18 0.65536000000000000000e5
-858 3 1 6 0.13107200000000000000e6
-858 3 2 7 -0.13107200000000000000e6
-858 3 2 15 -0.26214400000000000000e6
-858 3 4 18 0.65536000000000000000e5
-858 3 6 11 -0.13107200000000000000e6
-858 3 13 18 0.65536000000000000000e5
-858 4 4 8 -0.13107200000000000000e6
-858 4 8 8 0.13107200000000000000e6
-859 1 1 8 -0.65536000000000000000e5
-859 1 2 33 0.32768000000000000000e5
-859 1 3 26 -0.32768000000000000000e5
-859 1 3 34 -0.13107200000000000000e6
-859 1 4 35 0.32768000000000000000e5
-859 1 5 28 -0.32768000000000000000e5
-859 1 6 21 0.13107200000000000000e6
-859 1 7 22 0.13107200000000000000e6
-859 1 11 26 -0.13107200000000000000e6
-859 2 1 15 -0.65536000000000000000e5
-859 2 3 17 -0.32768000000000000000e5
-859 2 4 18 -0.32768000000000000000e5
-859 2 6 12 0.65536000000000000000e5
-859 2 6 20 -0.65536000000000000000e5
-859 2 12 18 0.65536000000000000000e5
-859 3 1 6 0.65536000000000000000e5
-859 3 2 15 -0.65536000000000000000e5
-859 3 3 16 -0.13107200000000000000e6
-859 3 4 17 -0.32768000000000000000e5
-859 3 4 19 0.65536000000000000000e5
-859 3 5 18 0.65536000000000000000e5
-859 3 6 11 -0.65536000000000000000e5
-859 3 6 19 -0.13107200000000000000e6
-859 3 13 18 0.32768000000000000000e5
-859 4 4 8 -0.65536000000000000000e5
-859 4 8 8 0.65536000000000000000e5
-860 3 4 20 0.65536000000000000000e5
-860 3 13 18 -0.65536000000000000000e5
-861 1 3 10 0.65536000000000000000e5
-861 1 4 11 0.65536000000000000000e5
-861 1 6 21 -0.65536000000000000000e5
-861 1 7 22 -0.32768000000000000000e5
-861 1 8 23 -0.65536000000000000000e5
-861 1 11 26 0.32768000000000000000e5
-861 1 12 27 0.32768000000000000000e5
-861 2 3 9 0.32768000000000000000e5
-861 2 6 8 0.65536000000000000000e5
-861 2 8 14 -0.65536000000000000000e5
-861 3 3 8 0.98304000000000000000e5
-861 3 3 16 -0.32768000000000000000e5
-861 3 4 9 0.32768000000000000000e5
-861 3 5 5 0.65536000000000000000e5
-861 3 5 10 -0.13107200000000000000e6
-861 3 9 14 0.65536000000000000000e5
-861 4 2 6 0.32768000000000000000e5
-861 4 4 4 0.65536000000000000000e5
-861 4 5 9 -0.32768000000000000000e5
-862 1 3 10 -0.65536000000000000000e5
-862 1 6 21 0.65536000000000000000e5
-862 3 5 6 0.65536000000000000000e5
-863 3 3 8 -0.65536000000000000000e5
-863 3 5 7 0.65536000000000000000e5
-864 1 3 10 0.32768000000000000000e5
-864 1 4 11 0.65536000000000000000e5
-864 1 6 21 -0.32768000000000000000e5
-864 1 7 22 -0.32768000000000000000e5
-864 1 8 23 -0.65536000000000000000e5
-864 1 11 26 0.32768000000000000000e5
-864 1 12 27 0.32768000000000000000e5
-864 2 3 9 0.32768000000000000000e5
-864 2 6 8 0.65536000000000000000e5
-864 2 8 14 -0.65536000000000000000e5
-864 3 3 8 0.65536000000000000000e5
-864 3 3 16 -0.32768000000000000000e5
-864 3 4 9 0.32768000000000000000e5
-864 3 5 8 0.65536000000000000000e5
-864 3 5 10 -0.13107200000000000000e6
-864 3 9 14 0.65536000000000000000e5
-864 4 2 6 0.32768000000000000000e5
-864 4 5 9 -0.32768000000000000000e5
-865 1 3 10 -0.32768000000000000000e5
-865 1 4 11 -0.32768000000000000000e5
-865 1 6 21 0.32768000000000000000e5
-865 1 7 22 0.32768000000000000000e5
-865 3 3 8 -0.32768000000000000000e5
-865 3 5 9 0.65536000000000000000e5
-865 4 2 6 -0.32768000000000000000e5
-866 3 1 14 -0.65536000000000000000e5
-866 3 5 11 0.65536000000000000000e5
-867 3 5 12 0.65536000000000000000e5
-867 3 6 11 -0.65536000000000000000e5
-868 3 2 15 -0.65536000000000000000e5
-868 3 5 13 0.65536000000000000000e5
-869 1 6 21 -0.65536000000000000000e5
-869 1 16 23 0.65536000000000000000e5
-869 3 5 14 0.65536000000000000000e5
-870 1 1 8 0.32768000000000000000e5
-870 1 5 20 -0.32768000000000000000e5
-870 1 6 21 -0.65536000000000000000e5
-870 1 11 26 0.65536000000000000000e5
-870 2 1 15 0.32768000000000000000e5
-870 2 6 12 -0.32768000000000000000e5
-870 3 1 6 -0.32768000000000000000e5
-870 3 5 15 0.65536000000000000000e5
-871 1 1 8 0.16384000000000000000e5
-871 1 5 20 -0.16384000000000000000e5
-871 1 6 21 -0.65536000000000000000e5
-871 1 11 26 0.32768000000000000000e5
-871 1 16 23 0.32768000000000000000e5
-871 2 1 15 0.16384000000000000000e5
-871 2 2 16 -0.32768000000000000000e5
-871 2 5 19 0.32768000000000000000e5
-871 2 6 12 -0.16384000000000000000e5
-871 3 1 6 -0.16384000000000000000e5
-871 3 3 16 -0.32768000000000000000e5
-871 3 5 16 0.65536000000000000000e5
-872 1 1 8 0.65536000000000000000e5
-872 1 1 32 0.32768000000000000000e5
-872 1 2 9 0.65536000000000000000e5
-872 1 2 33 0.32768000000000000000e5
-872 1 3 26 0.32768000000000000000e5
-872 1 6 21 -0.13107200000000000000e6
-872 2 1 15 0.65536000000000000000e5
-872 2 11 17 0.32768000000000000000e5
-872 3 1 6 -0.65536000000000000000e5
-872 3 2 7 -0.65536000000000000000e5
-872 3 5 17 0.65536000000000000000e5
-872 3 6 11 0.65536000000000000000e5
-872 3 11 12 -0.32768000000000000000e5
-873 1 11 26 -0.65536000000000000000e5
-873 1 16 31 0.65536000000000000000e5
-873 3 5 19 0.65536000000000000000e5
-874 1 2 9 -0.65536000000000000000e5
-874 1 26 29 0.65536000000000000000e5
-874 3 2 7 0.65536000000000000000e5
-874 3 2 15 0.65536000000000000000e5
-874 3 5 18 0.65536000000000000000e5
-874 3 5 20 0.65536000000000000000e5
-875 3 3 8 -0.32768000000000000000e5
-875 3 6 6 0.65536000000000000000e5
-876 1 4 11 -0.65536000000000000000e5
-876 1 7 22 0.65536000000000000000e5
-876 3 6 7 0.65536000000000000000e5
-877 1 3 10 -0.32768000000000000000e5
-877 1 4 11 -0.32768000000000000000e5
-877 1 6 21 0.32768000000000000000e5
-877 1 7 22 0.32768000000000000000e5
-877 3 3 8 -0.32768000000000000000e5
-877 3 6 8 0.65536000000000000000e5
-877 4 2 6 -0.32768000000000000000e5
-878 1 4 11 -0.32768000000000000000e5
-878 1 8 23 0.65536000000000000000e5
-878 1 11 26 -0.32768000000000000000e5
-878 1 12 27 -0.32768000000000000000e5
-878 2 3 9 -0.32768000000000000000e5
-878 3 3 8 -0.32768000000000000000e5
-878 3 3 16 0.32768000000000000000e5
-878 3 4 9 -0.32768000000000000000e5
-878 3 6 9 0.65536000000000000000e5
-878 3 9 14 -0.65536000000000000000e5
-878 4 5 9 0.32768000000000000000e5
-879 1 1 8 -0.81920000000000000000e4
-879 1 5 20 0.81920000000000000000e4
-879 1 6 21 0.32768000000000000000e5
-879 1 7 14 -0.65536000000000000000e5
-879 1 7 22 0.16384000000000000000e5
-879 1 9 24 -0.32768000000000000000e5
-879 1 14 21 0.65536000000000000000e5
-879 2 1 15 -0.81920000000000000000e4
-879 2 2 16 0.16384000000000000000e5
-879 2 6 12 0.81920000000000000000e4
-879 2 9 15 -0.32768000000000000000e5
-879 2 10 12 0.32768000000000000000e5
-879 3 1 6 0.81920000000000000000e4
-879 3 6 10 0.65536000000000000000e5
-880 3 2 15 -0.65536000000000000000e5
-880 3 6 12 0.65536000000000000000e5
-881 1 1 8 0.65536000000000000000e5
-881 1 5 20 -0.65536000000000000000e5
-881 1 6 21 -0.13107200000000000000e6
-881 1 11 26 0.13107200000000000000e6
-881 2 1 15 0.65536000000000000000e5
-881 2 6 12 -0.65536000000000000000e5
-881 3 1 6 -0.65536000000000000000e5
-881 3 2 15 0.65536000000000000000e5
-881 3 6 11 0.65536000000000000000e5
-881 3 6 13 0.65536000000000000000e5
-881 4 4 8 0.65536000000000000000e5
-882 1 1 8 0.32768000000000000000e5
-882 1 5 20 -0.32768000000000000000e5
-882 1 6 21 -0.65536000000000000000e5
-882 1 11 26 0.65536000000000000000e5
-882 2 1 15 0.32768000000000000000e5
-882 2 6 12 -0.32768000000000000000e5
-882 3 1 6 -0.32768000000000000000e5
-882 3 6 14 0.65536000000000000000e5
-883 3 3 16 -0.65536000000000000000e5
-883 3 6 15 0.65536000000000000000e5
-884 3 6 16 0.65536000000000000000e5
-884 3 9 14 -0.65536000000000000000e5
-885 3 5 18 -0.65536000000000000000e5
-885 3 6 17 0.65536000000000000000e5
-886 1 1 8 -0.65536000000000000000e5
-886 1 3 34 0.65536000000000000000e5
-886 1 6 21 0.13107200000000000000e6
-886 1 11 26 -0.13107200000000000000e6
-886 2 1 15 -0.65536000000000000000e5
-886 2 6 12 0.65536000000000000000e5
-886 3 1 6 0.65536000000000000000e5
-886 3 2 15 -0.65536000000000000000e5
-886 3 6 11 -0.65536000000000000000e5
-886 3 6 18 0.65536000000000000000e5
-886 4 4 8 -0.65536000000000000000e5
-887 1 2 9 0.65536000000000000000e5
-887 1 26 29 -0.65536000000000000000e5
-887 2 6 20 0.65536000000000000000e5
-887 2 14 20 -0.65536000000000000000e5
-887 3 2 7 -0.65536000000000000000e5
-887 3 2 15 -0.65536000000000000000e5
-887 3 5 18 -0.65536000000000000000e5
-887 3 6 20 0.65536000000000000000e5
-887 3 7 20 0.65536000000000000000e5
-887 3 14 19 -0.13107200000000000000e6
-888 3 4 9 -0.32768000000000000000e5
-888 3 7 7 0.65536000000000000000e5
-889 1 4 11 -0.32768000000000000000e5
-889 1 8 23 0.65536000000000000000e5
-889 1 11 26 -0.32768000000000000000e5
-889 1 12 27 -0.32768000000000000000e5
-889 2 3 9 -0.32768000000000000000e5
-889 3 3 8 -0.32768000000000000000e5
-889 3 3 16 0.32768000000000000000e5
-889 3 4 9 -0.32768000000000000000e5
-889 3 7 8 0.65536000000000000000e5
-889 3 9 14 -0.65536000000000000000e5
-889 4 5 9 0.32768000000000000000e5
-890 1 4 11 0.32768000000000000000e5
-890 1 4 15 -0.13107200000000000000e6
-890 1 8 23 -0.65536000000000000000e5
-890 1 9 12 0.65536000000000000000e5
-890 1 9 24 -0.65536000000000000000e5
-890 1 11 26 0.32768000000000000000e5
-890 1 12 27 0.32768000000000000000e5
-890 1 14 21 0.13107200000000000000e6
-890 2 3 9 0.32768000000000000000e5
-890 2 4 10 0.65536000000000000000e5
-890 2 9 15 -0.65536000000000000000e5
-890 3 3 8 0.32768000000000000000e5
-890 3 3 16 -0.32768000000000000000e5
-890 3 4 9 0.32768000000000000000e5
-890 3 7 9 0.65536000000000000000e5
-890 3 9 14 0.65536000000000000000e5
-890 4 5 9 -0.32768000000000000000e5
-891 1 4 15 -0.65536000000000000000e5
-891 1 14 21 0.65536000000000000000e5
-891 3 7 10 0.65536000000000000000e5
-892 3 2 15 -0.65536000000000000000e5
-892 3 7 11 0.65536000000000000000e5
-893 1 1 8 0.65536000000000000000e5
-893 1 5 20 -0.65536000000000000000e5
-893 1 6 21 -0.13107200000000000000e6
-893 1 11 26 0.13107200000000000000e6
-893 2 1 15 0.65536000000000000000e5
-893 2 6 12 -0.65536000000000000000e5
-893 3 1 6 -0.65536000000000000000e5
-893 3 2 15 0.65536000000000000000e5
-893 3 6 11 0.65536000000000000000e5
-893 3 7 12 0.65536000000000000000e5
-893 4 4 8 0.65536000000000000000e5
-894 1 1 8 0.65536000000000000000e5
-894 1 2 33 -0.32768000000000000000e5
-894 1 3 26 0.32768000000000000000e5
-894 1 3 34 0.65536000000000000000e5
-894 1 4 35 -0.32768000000000000000e5
-894 1 5 20 0.65536000000000000000e5
-894 1 5 28 0.32768000000000000000e5
-894 1 6 21 -0.13107200000000000000e6
-894 1 7 22 -0.13107200000000000000e6
-894 1 11 26 0.13107200000000000000e6
-894 2 1 15 0.65536000000000000000e5
-894 2 3 17 0.32768000000000000000e5
-894 2 4 14 0.65536000000000000000e5
-894 2 4 18 0.32768000000000000000e5
-894 2 6 12 -0.65536000000000000000e5
-894 2 12 18 -0.65536000000000000000e5
-894 3 1 6 -0.65536000000000000000e5
-894 3 2 15 0.13107200000000000000e6
-894 3 4 17 0.32768000000000000000e5
-894 3 6 11 0.65536000000000000000e5
-894 3 7 13 0.65536000000000000000e5
-894 3 13 18 -0.32768000000000000000e5
-894 4 4 8 0.65536000000000000000e5
-894 4 8 8 -0.65536000000000000000e5
-895 3 3 16 -0.65536000000000000000e5
-895 3 7 14 0.65536000000000000000e5
-896 1 1 8 -0.32768000000000000000e5
-896 1 5 20 0.32768000000000000000e5
-896 1 6 21 0.65536000000000000000e5
-896 1 11 26 -0.65536000000000000000e5
-896 2 1 15 -0.32768000000000000000e5
-896 2 6 12 0.32768000000000000000e5
-896 3 1 6 0.32768000000000000000e5
-896 3 3 16 0.65536000000000000000e5
-896 3 7 15 0.65536000000000000000e5
-896 3 9 14 -0.13107200000000000000e6
-896 4 5 9 0.65536000000000000000e5
-897 1 8 23 0.65536000000000000000e5
-897 1 9 24 0.65536000000000000000e5
-897 1 13 28 0.65536000000000000000e5
-897 1 14 21 -0.13107200000000000000e6
-897 2 9 15 0.65536000000000000000e5
-897 3 7 16 0.65536000000000000000e5
-898 1 1 8 -0.65536000000000000000e5
-898 1 3 34 0.65536000000000000000e5
-898 1 6 21 0.13107200000000000000e6
-898 1 11 26 -0.13107200000000000000e6
-898 2 1 15 -0.65536000000000000000e5
-898 2 6 12 0.65536000000000000000e5
-898 3 1 6 0.65536000000000000000e5
-898 3 2 15 -0.65536000000000000000e5
-898 3 6 11 -0.65536000000000000000e5
-898 3 7 17 0.65536000000000000000e5
-898 4 4 8 -0.65536000000000000000e5
-899 1 1 8 -0.65536000000000000000e5
-899 1 2 33 0.32768000000000000000e5
-899 1 3 26 -0.32768000000000000000e5
-899 1 3 34 -0.13107200000000000000e6
-899 1 4 35 0.32768000000000000000e5
-899 1 5 28 -0.32768000000000000000e5
-899 1 6 21 0.13107200000000000000e6
-899 1 7 22 0.13107200000000000000e6
-899 1 11 26 -0.13107200000000000000e6
-899 2 1 15 -0.65536000000000000000e5
-899 2 3 17 -0.32768000000000000000e5
-899 2 4 18 -0.32768000000000000000e5
-899 2 6 12 0.65536000000000000000e5
-899 2 6 20 -0.65536000000000000000e5
-899 2 12 18 0.65536000000000000000e5
-899 3 1 6 0.65536000000000000000e5
-899 3 2 15 -0.65536000000000000000e5
-899 3 3 16 -0.13107200000000000000e6
-899 3 4 17 -0.32768000000000000000e5
-899 3 5 18 0.65536000000000000000e5
-899 3 6 11 -0.65536000000000000000e5
-899 3 6 19 -0.13107200000000000000e6
-899 3 7 18 0.65536000000000000000e5
-899 3 13 18 0.32768000000000000000e5
-899 4 4 8 -0.65536000000000000000e5
-899 4 8 8 0.65536000000000000000e5
-900 1 12 27 -0.65536000000000000000e5
-900 1 22 29 0.65536000000000000000e5
-900 3 7 19 0.65536000000000000000e5
-901 3 5 10 -0.32768000000000000000e5
-901 3 8 8 0.65536000000000000000e5
-902 1 1 8 -0.81920000000000000000e4
-902 1 5 20 0.81920000000000000000e4
-902 1 6 21 0.32768000000000000000e5
-902 1 7 14 -0.65536000000000000000e5
-902 1 7 22 0.16384000000000000000e5
-902 1 9 24 -0.32768000000000000000e5
-902 1 14 21 0.65536000000000000000e5
-902 2 1 15 -0.81920000000000000000e4
-902 2 2 16 0.16384000000000000000e5
-902 2 6 12 0.81920000000000000000e4
-902 2 9 15 -0.32768000000000000000e5
-902 2 10 12 0.32768000000000000000e5
-902 3 1 6 0.81920000000000000000e4
-902 3 8 9 0.65536000000000000000e5
-903 1 1 8 -0.40960000000000000000e4
-903 1 4 15 -0.32768000000000000000e5
-903 1 5 20 0.40960000000000000000e4
-903 1 6 21 0.16384000000000000000e5
-903 1 7 14 -0.32768000000000000000e5
-903 1 7 22 0.81920000000000000000e4
-903 1 9 24 -0.16384000000000000000e5
-903 1 14 21 0.65536000000000000000e5
-903 2 1 15 -0.40960000000000000000e4
-903 2 2 16 0.81920000000000000000e4
-903 2 6 12 0.40960000000000000000e4
-903 2 9 15 -0.16384000000000000000e5
-903 2 10 12 0.16384000000000000000e5
-903 3 1 6 0.40960000000000000000e4
-903 3 5 10 -0.32768000000000000000e5
-903 3 8 10 0.65536000000000000000e5
-903 4 6 6 -0.65536000000000000000e5
-904 1 6 21 -0.65536000000000000000e5
-904 1 16 23 0.65536000000000000000e5
-904 3 8 11 0.65536000000000000000e5
-905 1 1 8 0.32768000000000000000e5
-905 1 5 20 -0.32768000000000000000e5
-905 1 6 21 -0.65536000000000000000e5
-905 1 11 26 0.65536000000000000000e5
-905 2 1 15 0.32768000000000000000e5
-905 2 6 12 -0.32768000000000000000e5
-905 3 1 6 -0.32768000000000000000e5
-905 3 8 12 0.65536000000000000000e5
-906 3 3 16 -0.65536000000000000000e5
-906 3 8 13 0.65536000000000000000e5
-907 1 1 8 0.16384000000000000000e5
-907 1 5 20 -0.16384000000000000000e5
-907 1 6 21 -0.65536000000000000000e5
-907 1 11 26 0.32768000000000000000e5
-907 1 16 23 0.32768000000000000000e5
-907 2 1 15 0.16384000000000000000e5
-907 2 2 16 -0.32768000000000000000e5
-907 2 5 19 0.32768000000000000000e5
-907 2 6 12 -0.16384000000000000000e5
-907 3 1 6 -0.16384000000000000000e5
-907 3 3 16 -0.32768000000000000000e5
-907 3 8 14 0.65536000000000000000e5
-908 3 8 15 0.65536000000000000000e5
-908 3 9 14 -0.65536000000000000000e5
-909 1 1 8 0.81920000000000000000e4
-909 1 5 20 -0.81920000000000000000e4
-909 1 6 21 -0.32768000000000000000e5
-909 1 8 23 0.32768000000000000000e5
-909 1 9 24 0.32768000000000000000e5
-909 1 11 26 0.16384000000000000000e5
-909 1 13 28 0.32768000000000000000e5
-909 1 14 21 -0.65536000000000000000e5
-909 1 16 23 0.16384000000000000000e5
-909 2 1 15 0.81920000000000000000e4
-909 2 2 16 -0.16384000000000000000e5
-909 2 5 19 0.16384000000000000000e5
-909 2 6 12 -0.81920000000000000000e4
-909 2 9 15 0.32768000000000000000e5
-909 2 10 12 -0.32768000000000000000e5
-909 2 14 16 0.32768000000000000000e5
-909 3 1 6 -0.81920000000000000000e4
-909 3 3 16 -0.16384000000000000000e5
-909 3 8 16 0.65536000000000000000e5
-909 3 9 14 -0.32768000000000000000e5
-910 1 11 26 -0.65536000000000000000e5
-910 1 16 31 0.65536000000000000000e5
-910 3 8 17 0.65536000000000000000e5
-911 3 6 19 -0.65536000000000000000e5
-911 3 8 18 0.65536000000000000000e5
-912 1 11 26 -0.32768000000000000000e5
-912 1 12 27 -0.32768000000000000000e5
-912 1 16 31 0.32768000000000000000e5
-912 1 22 29 0.32768000000000000000e5
-912 3 6 19 -0.32768000000000000000e5
-912 3 8 19 0.65536000000000000000e5
-912 4 6 10 -0.32768000000000000000e5
-913 3 8 20 0.65536000000000000000e5
-913 3 14 19 -0.65536000000000000000e5
-914 1 4 15 -0.32768000000000000000e5
-914 1 14 21 0.32768000000000000000e5
-914 3 9 9 0.65536000000000000000e5
-915 1 1 8 0.32768000000000000000e5
-915 1 5 20 -0.32768000000000000000e5
-915 1 6 21 -0.65536000000000000000e5
-915 1 11 26 0.65536000000000000000e5
-915 2 1 15 0.32768000000000000000e5
-915 2 6 12 -0.32768000000000000000e5
-915 3 1 6 -0.32768000000000000000e5
-915 3 9 11 0.65536000000000000000e5
-916 3 3 16 -0.65536000000000000000e5
-916 3 9 12 0.65536000000000000000e5
-917 1 1 8 -0.32768000000000000000e5
-917 1 5 20 0.32768000000000000000e5
-917 1 6 21 0.65536000000000000000e5
-917 1 11 26 -0.65536000000000000000e5
-917 2 1 15 -0.32768000000000000000e5
-917 2 6 12 0.32768000000000000000e5
-917 3 1 6 0.32768000000000000000e5
-917 3 3 16 0.65536000000000000000e5
-917 3 9 13 0.65536000000000000000e5
-917 3 9 14 -0.13107200000000000000e6
-917 4 5 9 0.65536000000000000000e5
-918 1 8 23 0.65536000000000000000e5
-918 1 9 24 0.65536000000000000000e5
-918 1 13 28 0.65536000000000000000e5
-918 1 14 21 -0.13107200000000000000e6
-918 2 9 15 0.65536000000000000000e5
-918 3 9 15 0.65536000000000000000e5
-919 1 14 21 -0.65536000000000000000e5
-919 1 14 29 0.65536000000000000000e5
-919 3 9 16 0.65536000000000000000e5
-920 3 6 19 -0.65536000000000000000e5
-920 3 9 17 0.65536000000000000000e5
-921 1 12 27 -0.65536000000000000000e5
-921 1 22 29 0.65536000000000000000e5
-921 3 9 18 0.65536000000000000000e5
-922 1 13 28 -0.65536000000000000000e5
-922 1 23 30 0.65536000000000000000e5
-922 3 9 19 0.65536000000000000000e5
-923 1 22 29 -0.65536000000000000000e5
-923 1 29 30 0.65536000000000000000e5
-923 3 9 20 0.65536000000000000000e5
-924 1 8 15 0.16384000000000000000e5
-924 1 10 25 0.16384000000000000000e5
-924 1 13 14 -0.32768000000000000000e5
-924 1 15 22 0.16384000000000000000e5
-924 2 10 16 0.16384000000000000000e5
-924 3 9 10 -0.16384000000000000000e5
-924 3 10 10 0.65536000000000000000e5
-925 1 1 8 0.16384000000000000000e5
-925 1 5 20 -0.16384000000000000000e5
-925 1 6 21 -0.65536000000000000000e5
-925 1 11 26 0.32768000000000000000e5
-925 1 16 23 0.32768000000000000000e5
-925 2 1 15 0.16384000000000000000e5
-925 2 2 16 -0.32768000000000000000e5
-925 2 5 19 0.32768000000000000000e5
-925 2 6 12 -0.16384000000000000000e5
-925 3 1 6 -0.16384000000000000000e5
-925 3 3 16 -0.32768000000000000000e5
-925 3 10 11 0.65536000000000000000e5
-926 3 9 14 -0.65536000000000000000e5
-926 3 10 12 0.65536000000000000000e5
-927 1 8 23 0.65536000000000000000e5
-927 1 9 24 0.65536000000000000000e5
-927 1 13 28 0.65536000000000000000e5
-927 1 14 21 -0.13107200000000000000e6
-927 2 9 15 0.65536000000000000000e5
-927 3 10 13 0.65536000000000000000e5
-928 1 1 8 0.81920000000000000000e4
-928 1 5 20 -0.81920000000000000000e4
-928 1 6 21 -0.32768000000000000000e5
-928 1 8 23 0.32768000000000000000e5
-928 1 9 24 0.32768000000000000000e5
-928 1 11 26 0.16384000000000000000e5
-928 1 13 28 0.32768000000000000000e5
-928 1 14 21 -0.65536000000000000000e5
-928 1 16 23 0.16384000000000000000e5
-928 2 1 15 0.81920000000000000000e4
-928 2 2 16 -0.16384000000000000000e5
-928 2 5 19 0.16384000000000000000e5
-928 2 6 12 -0.81920000000000000000e4
-928 2 9 15 0.32768000000000000000e5
-928 2 10 12 -0.32768000000000000000e5
-928 2 14 16 0.32768000000000000000e5
-928 3 1 6 -0.81920000000000000000e4
-928 3 3 16 -0.16384000000000000000e5
-928 3 9 14 -0.32768000000000000000e5
-928 3 10 14 0.65536000000000000000e5
-929 1 14 21 -0.65536000000000000000e5
-929 1 14 29 0.65536000000000000000e5
-929 3 10 15 0.65536000000000000000e5
-930 1 7 22 0.81920000000000000000e4
-930 1 8 15 -0.65536000000000000000e5
-930 1 8 23 0.16384000000000000000e5
-930 1 11 26 0.81920000000000000000e4
-930 1 13 28 0.16384000000000000000e5
-930 1 14 29 0.32768000000000000000e5
-930 1 16 23 0.81920000000000000000e4
-930 1 22 25 0.32768000000000000000e5
-930 2 5 19 0.81920000000000000000e4
-930 2 14 16 0.16384000000000000000e5
-930 2 16 16 0.65536000000000000000e5
-930 3 3 16 -0.81920000000000000000e4
-930 3 9 10 0.65536000000000000000e5
-930 3 9 14 -0.16384000000000000000e5
-930 3 10 16 0.65536000000000000000e5
-931 1 11 26 -0.32768000000000000000e5
-931 1 12 27 -0.32768000000000000000e5
-931 1 16 31 0.32768000000000000000e5
-931 1 22 29 0.32768000000000000000e5
-931 3 6 19 -0.32768000000000000000e5
-931 3 10 17 0.65536000000000000000e5
-931 4 6 10 -0.32768000000000000000e5
-932 1 13 28 -0.65536000000000000000e5
-932 1 23 30 0.65536000000000000000e5
-932 3 10 18 0.65536000000000000000e5
-933 1 23 30 -0.65536000000000000000e5
-933 1 25 32 0.65536000000000000000e5
-933 3 10 20 0.65536000000000000000e5
-934 1 1 8 0.65536000000000000000e5
-934 1 1 32 0.32768000000000000000e5
-934 1 2 9 0.13107200000000000000e6
-934 1 2 33 0.32768000000000000000e5
-934 1 3 34 -0.65536000000000000000e5
-934 1 4 35 0.32768000000000000000e5
-934 1 6 21 -0.13107200000000000000e6
-934 2 1 15 0.65536000000000000000e5
-934 2 3 17 -0.32768000000000000000e5
-934 2 11 17 0.32768000000000000000e5
-934 2 12 18 0.32768000000000000000e5
-934 3 1 6 -0.65536000000000000000e5
-934 3 2 7 -0.13107200000000000000e6
-934 3 2 15 -0.65536000000000000000e5
-934 3 4 17 -0.32768000000000000000e5
-934 3 6 11 0.65536000000000000000e5
-934 3 11 11 0.65536000000000000000e5
-934 3 13 18 0.32768000000000000000e5
-934 4 7 7 0.65536000000000000000e5
-935 1 2 9 -0.13107200000000000000e6
-935 1 3 26 0.65536000000000000000e5
-935 1 3 34 0.13107200000000000000e6
-935 1 4 35 -0.65536000000000000000e5
-935 2 3 17 0.65536000000000000000e5
-935 2 12 18 -0.65536000000000000000e5
-935 3 2 7 0.13107200000000000000e6
-935 3 2 15 0.13107200000000000000e6
-935 3 4 17 0.65536000000000000000e5
-935 3 11 13 0.65536000000000000000e5
-935 3 13 18 -0.65536000000000000000e5
-936 1 1 8 0.65536000000000000000e5
-936 1 1 32 0.32768000000000000000e5
-936 1 2 9 0.65536000000000000000e5
-936 1 2 33 0.32768000000000000000e5
-936 1 3 26 0.32768000000000000000e5
-936 1 6 21 -0.13107200000000000000e6
-936 2 1 15 0.65536000000000000000e5
-936 2 11 17 0.32768000000000000000e5
-936 3 1 6 -0.65536000000000000000e5
-936 3 2 7 -0.65536000000000000000e5
-936 3 6 11 0.65536000000000000000e5
-936 3 11 12 -0.32768000000000000000e5
-936 3 11 14 0.65536000000000000000e5
-937 3 5 18 -0.65536000000000000000e5
-937 3 11 15 0.65536000000000000000e5
-938 1 11 26 -0.65536000000000000000e5
-938 1 16 31 0.65536000000000000000e5
-938 3 11 16 0.65536000000000000000e5
-939 1 3 26 -0.65536000000000000000e5
-939 1 17 32 -0.65536000000000000000e5
-939 1 26 29 0.13107200000000000000e6
-939 1 26 33 -0.65536000000000000000e5
-939 2 17 17 -0.13107200000000000000e6
-939 3 11 12 0.65536000000000000000e5
-939 3 11 17 0.65536000000000000000e5
-939 3 17 18 -0.65536000000000000000e5
-940 1 2 33 -0.65536000000000000000e5
-940 1 17 32 0.65536000000000000000e5
-940 3 11 18 0.65536000000000000000e5
-941 1 2 9 -0.65536000000000000000e5
-941 1 26 29 0.65536000000000000000e5
-941 3 2 7 0.65536000000000000000e5
-941 3 2 15 0.65536000000000000000e5
-941 3 5 18 0.65536000000000000000e5
-941 3 11 19 0.65536000000000000000e5
-942 1 16 35 0.65536000000000000000e5
-942 1 17 32 -0.65536000000000000000e5
-942 3 11 20 0.65536000000000000000e5
-943 1 2 9 -0.65536000000000000000e5
-943 1 3 26 0.32768000000000000000e5
-943 1 3 34 0.65536000000000000000e5
-943 1 4 35 -0.32768000000000000000e5
-943 2 3 17 0.32768000000000000000e5
-943 2 12 18 -0.32768000000000000000e5
-943 3 2 7 0.65536000000000000000e5
-943 3 2 15 0.65536000000000000000e5
-943 3 4 17 0.32768000000000000000e5
-943 3 12 12 0.65536000000000000000e5
-943 3 13 18 -0.32768000000000000000e5
-944 3 4 17 -0.65536000000000000000e5
-944 3 12 13 0.65536000000000000000e5
-945 3 5 18 -0.65536000000000000000e5
-945 3 12 14 0.65536000000000000000e5
-946 1 1 8 -0.65536000000000000000e5
-946 1 3 34 0.65536000000000000000e5
-946 1 6 21 0.13107200000000000000e6
-946 1 11 26 -0.13107200000000000000e6
-946 2 1 15 -0.65536000000000000000e5
-946 2 6 12 0.65536000000000000000e5
-946 3 1 6 0.65536000000000000000e5
-946 3 2 15 -0.65536000000000000000e5
-946 3 6 11 -0.65536000000000000000e5
-946 3 12 15 0.65536000000000000000e5
-946 4 4 8 -0.65536000000000000000e5
-947 3 6 19 -0.65536000000000000000e5
-947 3 12 16 0.65536000000000000000e5
-948 1 2 33 -0.65536000000000000000e5
-948 1 17 32 0.65536000000000000000e5
-948 3 12 17 0.65536000000000000000e5
-949 1 2 33 0.65536000000000000000e5
-949 1 3 34 -0.13107200000000000000e6
-949 1 4 35 0.65536000000000000000e5
-949 1 26 33 0.65536000000000000000e5
-949 2 12 18 0.65536000000000000000e5
-949 3 12 18 0.65536000000000000000e5
-949 3 13 18 0.65536000000000000000e5
-949 3 17 18 0.65536000000000000000e5
-950 1 2 9 0.65536000000000000000e5
-950 1 26 29 -0.65536000000000000000e5
-950 2 6 20 0.65536000000000000000e5
-950 2 14 20 -0.65536000000000000000e5
-950 3 2 7 -0.65536000000000000000e5
-950 3 2 15 -0.65536000000000000000e5
-950 3 5 18 -0.65536000000000000000e5
-950 3 7 20 0.65536000000000000000e5
-950 3 12 19 0.65536000000000000000e5
-950 3 14 19 -0.13107200000000000000e6
-951 3 12 20 0.65536000000000000000e5
-951 3 17 18 -0.65536000000000000000e5
-952 1 1 8 -0.65536000000000000000e5
-952 1 2 9 0.65536000000000000000e5
-952 1 3 26 -0.32768000000000000000e5
-952 1 4 35 0.32768000000000000000e5
-952 1 6 21 0.13107200000000000000e6
-952 1 11 26 -0.13107200000000000000e6
-952 2 1 15 -0.65536000000000000000e5
-952 2 3 17 -0.32768000000000000000e5
-952 2 6 12 0.65536000000000000000e5
-952 2 12 18 0.32768000000000000000e5
-952 3 1 6 0.65536000000000000000e5
-952 3 2 7 -0.65536000000000000000e5
-952 3 2 15 -0.13107200000000000000e6
-952 3 6 11 -0.65536000000000000000e5
-952 3 13 13 0.65536000000000000000e5
-952 3 13 18 0.32768000000000000000e5
-952 4 4 8 -0.65536000000000000000e5
-952 4 8 8 0.65536000000000000000e5
-953 1 1 8 -0.65536000000000000000e5
-953 1 3 34 0.65536000000000000000e5
-953 1 6 21 0.13107200000000000000e6
-953 1 11 26 -0.13107200000000000000e6
-953 2 1 15 -0.65536000000000000000e5
-953 2 6 12 0.65536000000000000000e5
-953 3 1 6 0.65536000000000000000e5
-953 3 2 15 -0.65536000000000000000e5
-953 3 6 11 -0.65536000000000000000e5
-953 3 13 14 0.65536000000000000000e5
-953 4 4 8 -0.65536000000000000000e5
-954 1 1 8 -0.65536000000000000000e5
-954 1 2 33 0.32768000000000000000e5
-954 1 3 26 -0.32768000000000000000e5
-954 1 3 34 -0.13107200000000000000e6
-954 1 4 35 0.32768000000000000000e5
-954 1 5 28 -0.32768000000000000000e5
-954 1 6 21 0.13107200000000000000e6
-954 1 7 22 0.13107200000000000000e6
-954 1 11 26 -0.13107200000000000000e6
-954 2 1 15 -0.65536000000000000000e5
-954 2 3 17 -0.32768000000000000000e5
-954 2 4 18 -0.32768000000000000000e5
-954 2 6 12 0.65536000000000000000e5
-954 2 6 20 -0.65536000000000000000e5
-954 2 12 18 0.65536000000000000000e5
-954 3 1 6 0.65536000000000000000e5
-954 3 2 15 -0.65536000000000000000e5
-954 3 3 16 -0.13107200000000000000e6
-954 3 4 17 -0.32768000000000000000e5
-954 3 5 18 0.65536000000000000000e5
-954 3 6 11 -0.65536000000000000000e5
-954 3 6 19 -0.13107200000000000000e6
-954 3 13 15 0.65536000000000000000e5
-954 3 13 18 0.32768000000000000000e5
-954 4 4 8 -0.65536000000000000000e5
-954 4 8 8 0.65536000000000000000e5
-955 1 12 27 -0.65536000000000000000e5
-955 1 22 29 0.65536000000000000000e5
-955 3 13 16 0.65536000000000000000e5
-956 1 2 33 0.65536000000000000000e5
-956 1 3 34 -0.13107200000000000000e6
-956 1 4 35 0.65536000000000000000e5
-956 1 26 33 0.65536000000000000000e5
-956 2 12 18 0.65536000000000000000e5
-956 3 13 17 0.65536000000000000000e5
-956 3 13 18 0.65536000000000000000e5
-956 3 17 18 0.65536000000000000000e5
-957 3 7 20 -0.65536000000000000000e5
-957 3 13 19 0.65536000000000000000e5
-958 1 2 9 -0.13107200000000000000e6
-958 1 3 34 -0.13107200000000000000e6
-958 1 16 35 -0.65536000000000000000e5
-958 1 17 32 0.65536000000000000000e5
-958 1 20 35 0.13107200000000000000e6
-958 1 26 29 0.13107200000000000000e6
-958 2 6 20 -0.13107200000000000000e6
-958 2 14 20 0.13107200000000000000e6
-958 3 2 7 0.13107200000000000000e6
-958 3 2 15 0.13107200000000000000e6
-958 3 5 18 0.13107200000000000000e6
-958 3 7 20 -0.13107200000000000000e6
-958 3 13 20 0.65536000000000000000e5
-958 3 14 19 0.26214400000000000000e6
-958 3 17 18 0.65536000000000000000e5
-958 4 10 10 0.13107200000000000000e6
-959 1 11 26 -0.32768000000000000000e5
-959 1 16 31 0.32768000000000000000e5
-959 3 14 14 0.65536000000000000000e5
-960 3 6 19 -0.65536000000000000000e5
-960 3 14 15 0.65536000000000000000e5
-961 1 11 26 -0.32768000000000000000e5
-961 1 12 27 -0.32768000000000000000e5
-961 1 16 31 0.32768000000000000000e5
-961 1 22 29 0.32768000000000000000e5
-961 3 6 19 -0.32768000000000000000e5
-961 3 14 16 0.65536000000000000000e5
-961 4 6 10 -0.32768000000000000000e5
-962 1 2 9 -0.65536000000000000000e5
-962 1 26 29 0.65536000000000000000e5
-962 3 2 7 0.65536000000000000000e5
-962 3 2 15 0.65536000000000000000e5
-962 3 5 18 0.65536000000000000000e5
-962 3 14 17 0.65536000000000000000e5
-963 1 2 9 0.65536000000000000000e5
-963 1 26 29 -0.65536000000000000000e5
-963 2 6 20 0.65536000000000000000e5
-963 2 14 20 -0.65536000000000000000e5
-963 3 2 7 -0.65536000000000000000e5
-963 3 2 15 -0.65536000000000000000e5
-963 3 5 18 -0.65536000000000000000e5
-963 3 7 20 0.65536000000000000000e5
-963 3 14 18 0.65536000000000000000e5
-963 3 14 19 -0.13107200000000000000e6
-964 1 2 9 -0.65536000000000000000e5
-964 1 3 34 -0.65536000000000000000e5
-964 1 20 35 0.65536000000000000000e5
-964 1 26 29 0.65536000000000000000e5
-964 2 6 20 -0.65536000000000000000e5
-964 2 14 20 0.65536000000000000000e5
-964 3 2 7 0.65536000000000000000e5
-964 3 2 15 0.65536000000000000000e5
-964 3 5 18 0.65536000000000000000e5
-964 3 7 20 -0.65536000000000000000e5
-964 3 14 19 0.13107200000000000000e6
-964 3 14 20 0.65536000000000000000e5
-965 1 12 27 -0.32768000000000000000e5
-965 1 22 29 0.32768000000000000000e5
-965 3 15 15 0.65536000000000000000e5
-966 1 13 28 -0.65536000000000000000e5
-966 1 23 30 0.65536000000000000000e5
-966 3 15 16 0.65536000000000000000e5
-967 1 2 9 0.65536000000000000000e5
-967 1 26 29 -0.65536000000000000000e5
-967 2 6 20 0.65536000000000000000e5
-967 2 14 20 -0.65536000000000000000e5
-967 3 2 7 -0.65536000000000000000e5
-967 3 2 15 -0.65536000000000000000e5
-967 3 5 18 -0.65536000000000000000e5
-967 3 7 20 0.65536000000000000000e5
-967 3 14 19 -0.13107200000000000000e6
-967 3 15 17 0.65536000000000000000e5
-968 3 7 20 -0.65536000000000000000e5
-968 3 15 18 0.65536000000000000000e5
-969 1 22 29 -0.65536000000000000000e5
-969 1 29 30 0.65536000000000000000e5
-969 3 15 19 0.65536000000000000000e5
-970 3 10 19 -0.32768000000000000000e5
-970 3 16 16 0.65536000000000000000e5
-971 3 14 19 -0.65536000000000000000e5
-971 3 16 17 0.65536000000000000000e5
-972 1 22 29 -0.65536000000000000000e5
-972 1 29 30 0.65536000000000000000e5
-972 3 16 18 0.65536000000000000000e5
-973 1 23 30 -0.65536000000000000000e5
-973 1 25 32 0.65536000000000000000e5
-973 3 16 19 0.65536000000000000000e5
-974 1 29 30 -0.65536000000000000000e5
-974 1 31 32 0.65536000000000000000e5
-974 3 16 20 0.65536000000000000000e5
-975 1 16 35 0.32768000000000000000e5
-975 1 17 32 -0.32768000000000000000e5
-975 3 17 17 0.65536000000000000000e5
-976 1 2 9 -0.65536000000000000000e5
-976 1 3 34 -0.65536000000000000000e5
-976 1 20 35 0.65536000000000000000e5
-976 1 26 29 0.65536000000000000000e5
-976 2 6 20 -0.65536000000000000000e5
-976 2 14 20 0.65536000000000000000e5
-976 3 2 7 0.65536000000000000000e5
-976 3 2 15 0.65536000000000000000e5
-976 3 5 18 0.65536000000000000000e5
-976 3 7 20 -0.65536000000000000000e5
-976 3 14 19 0.13107200000000000000e6
-976 3 17 19 0.65536000000000000000e5
-977 1 2 9 -0.13107200000000000000e6
-977 1 3 34 -0.13107200000000000000e6
-977 1 7 22 0.26214400000000000000e6
-977 1 26 33 -0.65536000000000000000e5
-977 1 28 35 -0.65536000000000000000e5
-977 1 32 33 -0.65536000000000000000e5
-977 2 6 20 -0.13107200000000000000e6
-977 2 20 20 -0.13107200000000000000e6
-977 3 2 7 0.13107200000000000000e6
-977 3 2 15 0.13107200000000000000e6
-977 3 3 16 -0.26214400000000000000e6
-977 3 5 18 0.13107200000000000000e6
-977 3 6 19 -0.26214400000000000000e6
-977 3 7 20 -0.13107200000000000000e6
-977 3 15 20 -0.13107200000000000000e6
-977 3 17 20 0.65536000000000000000e5
-977 3 19 20 -0.13107200000000000000e6
-978 1 2 9 -0.65536000000000000000e5
-978 1 3 34 -0.65536000000000000000e5
-978 1 16 35 -0.32768000000000000000e5
-978 1 17 32 0.32768000000000000000e5
-978 1 20 35 0.65536000000000000000e5
-978 1 26 29 0.65536000000000000000e5
-978 2 6 20 -0.65536000000000000000e5
-978 2 14 20 0.65536000000000000000e5
-978 3 2 7 0.65536000000000000000e5
-978 3 2 15 0.65536000000000000000e5
-978 3 5 18 0.65536000000000000000e5
-978 3 7 20 -0.65536000000000000000e5
-978 3 14 19 0.13107200000000000000e6
-978 3 17 18 0.32768000000000000000e5
-978 3 18 18 0.65536000000000000000e5
-978 4 10 10 0.65536000000000000000e5
-979 3 15 20 -0.65536000000000000000e5
-979 3 18 19 0.65536000000000000000e5
-980 1 2 9 0.13107200000000000000e6
-980 1 3 34 0.13107200000000000000e6
-980 1 4 35 -0.65536000000000000000e5
-980 1 16 35 0.65536000000000000000e5
-980 1 17 32 -0.65536000000000000000e5
-980 1 20 35 -0.13107200000000000000e6
-980 1 26 29 -0.13107200000000000000e6
-980 1 32 33 0.65536000000000000000e5
-980 2 6 20 0.13107200000000000000e6
-980 2 14 20 -0.13107200000000000000e6
-980 3 2 7 -0.13107200000000000000e6
-980 3 2 15 -0.13107200000000000000e6
-980 3 5 18 -0.13107200000000000000e6
-980 3 7 20 0.13107200000000000000e6
-980 3 14 19 -0.26214400000000000000e6
-980 3 17 18 -0.65536000000000000000e5
-980 3 18 20 0.65536000000000000000e5
-980 4 10 10 -0.13107200000000000000e6
-981 1 29 30 -0.32768000000000000000e5
-981 1 31 32 0.32768000000000000000e5
-981 3 19 19 0.65536000000000000000e5
-982 1 32 33 -0.32768000000000000000e5
-982 1 32 35 0.32768000000000000000e5
-982 3 20 20 0.65536000000000000000e5
-983 1 2 5 -0.65536000000000000000e5
-983 1 3 10 0.26214400000000000000e6
-983 1 3 18 0.65536000000000000000e5
-983 1 6 21 -0.26214400000000000000e6
-983 2 1 7 -0.13107200000000000000e6
-983 2 1 15 0.13107200000000000000e6
-983 3 1 2 0.65536000000000000000e5
-983 3 1 6 -0.26214400000000000000e6
-983 3 2 7 -0.13107200000000000000e6
-983 4 1 2 0.65536000000000000000e5
-983 4 2 2 -0.13107200000000000000e6
-984 4 1 3 0.65536000000000000000e5
-984 4 2 2 -0.13107200000000000000e6
-985 1 1 2 0.32768000000000000000e5
-985 1 1 16 -0.32768000000000000000e5
-985 1 2 5 -0.32768000000000000000e5
-985 1 3 10 0.52428800000000000000e6
-985 1 3 18 0.32768000000000000000e5
-985 1 4 11 0.26214400000000000000e6
-985 1 6 21 -0.52428800000000000000e6
-985 1 7 22 -0.13107200000000000000e6
-985 1 8 23 -0.26214400000000000000e6
-985 1 11 26 0.13107200000000000000e6
-985 1 12 27 0.13107200000000000000e6
-985 2 1 7 -0.13107200000000000000e6
-985 2 1 15 0.13107200000000000000e6
-985 2 3 9 0.13107200000000000000e6
-985 2 6 8 0.26214400000000000000e6
-985 2 8 14 -0.26214400000000000000e6
-985 3 1 2 0.32768000000000000000e5
-985 3 1 6 -0.65536000000000000000e5
-985 3 2 3 -0.32768000000000000000e5
-985 3 2 7 -0.13107200000000000000e6
-985 3 3 8 0.39321600000000000000e6
-985 3 3 16 -0.13107200000000000000e6
-985 3 4 9 0.13107200000000000000e6
-985 3 5 10 -0.52428800000000000000e6
-985 3 9 14 0.26214400000000000000e6
-985 4 1 1 0.65536000000000000000e5
-985 4 1 4 0.65536000000000000000e5
-985 4 2 2 -0.65536000000000000000e5
-985 4 2 6 0.13107200000000000000e6
-985 4 4 4 0.26214400000000000000e6
-985 4 5 9 -0.13107200000000000000e6
-986 2 1 7 -0.65536000000000000000e5
-986 2 1 15 0.65536000000000000000e5
-986 4 1 5 0.65536000000000000000e5
-987 4 1 6 0.65536000000000000000e5
-987 4 4 4 -0.13107200000000000000e6
-988 1 2 5 0.65536000000000000000e5
-988 1 3 10 -0.26214400000000000000e6
-988 1 3 18 -0.65536000000000000000e5
-988 1 6 21 0.26214400000000000000e6
-988 2 1 3 -0.65536000000000000000e5
-988 2 1 7 0.13107200000000000000e6
-988 2 1 15 -0.13107200000000000000e6
-988 2 11 11 0.13107200000000000000e6
-988 3 1 2 -0.65536000000000000000e5
-988 3 1 6 0.26214400000000000000e6
-988 3 2 7 0.13107200000000000000e6
-988 4 1 7 0.65536000000000000000e5
-988 4 2 2 0.13107200000000000000e6
-989 2 2 12 -0.65536000000000000000e5
-989 2 11 17 0.65536000000000000000e5
-989 4 1 8 0.65536000000000000000e5
-989 4 7 7 0.13107200000000000000e6
-990 1 6 21 -0.13107200000000000000e6
-990 1 16 23 0.13107200000000000000e6
-990 3 1 14 0.65536000000000000000e5
-990 3 2 15 0.65536000000000000000e5
-990 3 6 11 0.65536000000000000000e5
-990 4 1 9 0.65536000000000000000e5
-991 4 1 10 0.65536000000000000000e5
-991 4 7 7 -0.13107200000000000000e6
-992 2 2 4 -0.65536000000000000000e5
-992 2 3 17 0.65536000000000000000e5
-992 4 2 3 0.65536000000000000000e5
-992 4 3 7 0.65536000000000000000e5
-993 2 1 7 -0.65536000000000000000e5
-993 2 1 15 0.65536000000000000000e5
-993 4 2 4 0.65536000000000000000e5
-994 1 2 9 -0.65536000000000000000e5
-994 1 3 10 0.13107200000000000000e6
-994 1 4 11 0.13107200000000000000e6
-994 1 5 8 -0.65536000000000000000e5
-994 1 5 20 -0.65536000000000000000e5
-994 1 6 21 -0.13107200000000000000e6
-994 2 1 7 -0.65536000000000000000e5
-994 2 1 15 0.65536000000000000000e5
-994 2 4 6 -0.65536000000000000000e5
-994 3 1 6 -0.65536000000000000000e5
-994 3 3 8 -0.13107200000000000000e6
-994 4 2 5 0.65536000000000000000e5
-995 2 2 12 -0.65536000000000000000e5
-995 2 11 17 0.65536000000000000000e5
-995 4 2 7 0.65536000000000000000e5
-995 4 7 7 0.13107200000000000000e6
-996 4 2 8 0.65536000000000000000e5
-996 4 3 7 -0.65536000000000000000e5
-997 4 2 9 0.65536000000000000000e5
-997 4 4 8 -0.65536000000000000000e5
-998 1 2 9 0.13107200000000000000e6
-998 1 3 26 -0.65536000000000000000e5
-998 1 3 34 -0.13107200000000000000e6
-998 1 4 35 0.65536000000000000000e5
-998 2 3 17 -0.65536000000000000000e5
-998 2 12 18 0.65536000000000000000e5
-998 3 2 7 -0.13107200000000000000e6
-998 3 2 15 -0.13107200000000000000e6
-998 3 5 18 -0.13107200000000000000e6
-998 3 11 12 0.65536000000000000000e5
-998 3 13 18 0.65536000000000000000e5
-998 4 2 10 0.65536000000000000000e5
-999 1 2 9 -0.65536000000000000000e5
-999 1 3 10 0.13107200000000000000e6
-999 1 4 11 0.13107200000000000000e6
-999 1 5 8 -0.65536000000000000000e5
-999 1 5 20 -0.65536000000000000000e5
-999 1 6 21 -0.13107200000000000000e6
-999 2 1 7 -0.65536000000000000000e5
-999 2 1 15 0.65536000000000000000e5
-999 2 4 6 -0.65536000000000000000e5
-999 3 1 6 -0.65536000000000000000e5
-999 3 3 8 -0.13107200000000000000e6
-999 4 3 4 0.65536000000000000000e5
-1000 2 4 6 -0.65536000000000000000e5
-1000 2 4 14 0.65536000000000000000e5
-1000 4 3 5 0.65536000000000000000e5
-1001 1 7 22 -0.65536000000000000000e5
-1001 1 8 23 0.13107200000000000000e6
-1001 1 11 26 -0.65536000000000000000e5
-1001 1 12 27 -0.65536000000000000000e5
-1001 2 3 9 -0.65536000000000000000e5
-1001 3 3 16 0.65536000000000000000e5
-1001 3 9 14 -0.13107200000000000000e6
-1001 4 3 6 0.65536000000000000000e5
-1001 4 5 9 0.65536000000000000000e5
-1002 1 1 8 0.13107200000000000000e6
-1002 1 2 9 0.26214400000000000000e6
-1002 1 2 17 0.65536000000000000000e5
-1002 1 3 18 0.65536000000000000000e5
-1002 1 4 19 0.65536000000000000000e5
-1002 1 5 20 -0.13107200000000000000e6
-1002 1 6 21 -0.26214400000000000000e6
-1002 2 1 15 0.13107200000000000000e6
-1002 2 2 12 0.65536000000000000000e5
-1002 2 3 17 -0.65536000000000000000e5
-1002 2 12 18 0.65536000000000000000e5
-1002 3 1 6 -0.13107200000000000000e6
-1002 3 2 7 -0.26214400000000000000e6
-1002 4 3 7 -0.65536000000000000000e5
-1002 4 3 8 0.65536000000000000000e5
-1002 4 8 8 0.13107200000000000000e6
-1003 1 1 8 -0.13107200000000000000e6
-1003 1 2 33 0.32768000000000000000e5
-1003 1 3 26 -0.32768000000000000000e5
-1003 1 3 34 -0.65536000000000000000e5
-1003 1 4 35 0.32768000000000000000e5
-1003 1 5 28 -0.32768000000000000000e5
-1003 1 6 21 0.26214400000000000000e6
-1003 1 7 22 0.13107200000000000000e6
-1003 1 11 26 -0.26214400000000000000e6
-1003 2 1 15 -0.13107200000000000000e6
-1003 2 3 17 -0.32768000000000000000e5
-1003 2 4 14 -0.65536000000000000000e5
-1003 2 4 18 -0.32768000000000000000e5
-1003 2 6 12 0.13107200000000000000e6
-1003 2 12 18 0.65536000000000000000e5
-1003 3 1 6 0.13107200000000000000e6
-1003 3 2 15 -0.13107200000000000000e6
-1003 3 3 16 -0.13107200000000000000e6
-1003 3 4 17 -0.32768000000000000000e5
-1003 3 6 11 -0.13107200000000000000e6
-1003 3 13 18 0.32768000000000000000e5
-1003 4 3 9 0.65536000000000000000e5
-1003 4 4 8 -0.13107200000000000000e6
-1003 4 8 8 0.65536000000000000000e5
-1004 4 3 10 0.65536000000000000000e5
-1004 4 8 8 -0.13107200000000000000e6
-1005 4 2 6 -0.65536000000000000000e5
-1005 4 4 5 0.65536000000000000000e5
-1006 2 6 8 -0.65536000000000000000e5
-1006 2 8 14 0.65536000000000000000e5
-1006 4 4 6 0.65536000000000000000e5
-1007 1 6 21 -0.13107200000000000000e6
-1007 1 16 23 0.13107200000000000000e6
-1007 3 1 14 0.65536000000000000000e5
-1007 3 2 15 0.65536000000000000000e5
-1007 3 6 11 0.65536000000000000000e5
-1007 4 4 7 0.65536000000000000000e5
-1008 2 2 16 -0.65536000000000000000e5
-1008 2 5 19 0.65536000000000000000e5
-1008 4 4 9 0.65536000000000000000e5
-1009 1 1 32 -0.32768000000000000000e5
-1009 1 2 9 -0.65536000000000000000e5
-1009 1 2 33 -0.32768000000000000000e5
-1009 1 3 26 -0.32768000000000000000e5
-1009 1 3 34 -0.65536000000000000000e5
-1009 1 16 31 0.13107200000000000000e6
-1009 2 6 12 -0.65536000000000000000e5
-1009 2 11 17 -0.32768000000000000000e5
-1009 3 2 7 0.65536000000000000000e5
-1009 3 2 15 0.65536000000000000000e5
-1009 3 5 18 0.65536000000000000000e5
-1009 3 11 12 0.32768000000000000000e5
-1009 4 4 8 0.65536000000000000000e5
-1009 4 4 10 0.65536000000000000000e5
-1010 1 7 22 -0.32768000000000000000e5
-1010 1 8 23 0.65536000000000000000e5
-1010 1 11 26 -0.32768000000000000000e5
-1010 1 12 27 -0.32768000000000000000e5
-1010 2 3 9 -0.32768000000000000000e5
-1010 3 3 16 0.32768000000000000000e5
-1010 3 9 14 -0.65536000000000000000e5
-1010 4 5 5 0.65536000000000000000e5
-1010 4 5 9 0.32768000000000000000e5
-1011 1 1 8 -0.16384000000000000000e5
-1011 1 3 10 0.32768000000000000000e5
-1011 1 4 11 0.32768000000000000000e5
-1011 1 4 15 0.13107200000000000000e6
-1011 1 5 20 0.16384000000000000000e5
-1011 1 6 21 0.32768000000000000000e5
-1011 1 7 14 -0.13107200000000000000e6
-1011 1 9 12 -0.65536000000000000000e5
-1011 2 1 15 -0.16384000000000000000e5
-1011 2 2 16 0.32768000000000000000e5
-1011 2 4 10 -0.65536000000000000000e5
-1011 2 6 12 0.16384000000000000000e5
-1011 2 10 12 0.65536000000000000000e5
-1011 3 1 6 0.16384000000000000000e5
-1011 3 3 8 0.32768000000000000000e5
-1011 4 2 6 0.32768000000000000000e5
-1011 4 5 6 0.65536000000000000000e5
-1012 4 4 8 -0.65536000000000000000e5
-1012 4 5 7 0.65536000000000000000e5
-1013 1 1 8 -0.13107200000000000000e6
-1013 1 2 33 0.32768000000000000000e5
-1013 1 3 26 -0.32768000000000000000e5
-1013 1 3 34 -0.65536000000000000000e5
-1013 1 4 35 0.32768000000000000000e5
-1013 1 5 28 -0.32768000000000000000e5
-1013 1 6 21 0.26214400000000000000e6
-1013 1 7 22 0.13107200000000000000e6
-1013 1 11 26 -0.26214400000000000000e6
-1013 2 1 15 -0.13107200000000000000e6
-1013 2 3 17 -0.32768000000000000000e5
-1013 2 4 14 -0.65536000000000000000e5
-1013 2 4 18 -0.32768000000000000000e5
-1013 2 6 12 0.13107200000000000000e6
-1013 2 12 18 0.65536000000000000000e5
-1013 3 1 6 0.13107200000000000000e6
-1013 3 2 15 -0.13107200000000000000e6
-1013 3 3 16 -0.13107200000000000000e6
-1013 3 4 17 -0.32768000000000000000e5
-1013 3 6 11 -0.13107200000000000000e6
-1013 3 13 18 0.32768000000000000000e5
-1013 4 4 8 -0.13107200000000000000e6
-1013 4 5 8 0.65536000000000000000e5
-1013 4 8 8 0.65536000000000000000e5
-1014 1 1 8 0.13107200000000000000e6
-1014 1 2 33 -0.32768000000000000000e5
-1014 1 3 26 0.32768000000000000000e5
-1014 1 3 34 0.65536000000000000000e5
-1014 1 4 35 -0.32768000000000000000e5
-1014 1 5 28 0.32768000000000000000e5
-1014 1 6 21 -0.26214400000000000000e6
-1014 1 7 22 -0.13107200000000000000e6
-1014 1 11 26 0.26214400000000000000e6
-1014 2 1 15 0.13107200000000000000e6
-1014 2 3 17 0.32768000000000000000e5
-1014 2 4 18 0.32768000000000000000e5
-1014 2 6 12 -0.13107200000000000000e6
-1014 2 6 20 0.65536000000000000000e5
-1014 2 12 18 -0.65536000000000000000e5
-1014 3 1 6 -0.13107200000000000000e6
-1014 3 2 15 0.13107200000000000000e6
-1014 3 3 16 0.13107200000000000000e6
-1014 3 4 17 0.32768000000000000000e5
-1014 3 6 11 0.13107200000000000000e6
-1014 3 13 18 -0.32768000000000000000e5
-1014 4 4 8 0.13107200000000000000e6
-1014 4 5 10 0.65536000000000000000e5
-1014 4 8 8 -0.65536000000000000000e5
-1015 2 2 16 -0.65536000000000000000e5
-1015 2 5 19 0.65536000000000000000e5
-1015 4 6 7 0.65536000000000000000e5
-1016 4 5 9 -0.65536000000000000000e5
-1016 4 6 8 0.65536000000000000000e5
-1017 2 10 12 -0.65536000000000000000e5
-1017 2 14 16 0.65536000000000000000e5
-1017 4 6 9 0.65536000000000000000e5
-1018 1 2 9 0.13107200000000000000e6
-1018 1 3 26 -0.65536000000000000000e5
-1018 1 3 34 -0.13107200000000000000e6
-1018 1 4 35 0.65536000000000000000e5
-1018 2 3 17 -0.65536000000000000000e5
-1018 2 12 18 0.65536000000000000000e5
-1018 3 2 7 -0.13107200000000000000e6
-1018 3 2 15 -0.13107200000000000000e6
-1018 3 5 18 -0.13107200000000000000e6
-1018 3 11 12 0.65536000000000000000e5
-1018 3 13 18 0.65536000000000000000e5
-1018 4 7 8 0.65536000000000000000e5
-1019 1 1 32 -0.32768000000000000000e5
-1019 1 2 9 -0.65536000000000000000e5
-1019 1 2 33 -0.32768000000000000000e5
-1019 1 3 26 -0.32768000000000000000e5
-1019 1 3 34 -0.65536000000000000000e5
-1019 1 16 31 0.13107200000000000000e6
-1019 2 6 12 -0.65536000000000000000e5
-1019 2 11 17 -0.32768000000000000000e5
-1019 3 2 7 0.65536000000000000000e5
-1019 3 2 15 0.65536000000000000000e5
-1019 3 5 18 0.65536000000000000000e5
-1019 3 11 12 0.32768000000000000000e5
-1019 4 4 8 0.65536000000000000000e5
-1019 4 7 9 0.65536000000000000000e5
-1020 1 2 9 -0.13107200000000000000e6
-1020 1 3 26 0.65536000000000000000e5
-1020 1 3 34 0.13107200000000000000e6
-1020 1 4 35 -0.65536000000000000000e5
-1020 2 12 18 -0.65536000000000000000e5
-1020 2 17 17 0.13107200000000000000e6
-1020 3 2 7 0.13107200000000000000e6
-1020 3 2 15 0.13107200000000000000e6
-1020 3 5 18 0.13107200000000000000e6
-1020 3 11 12 -0.65536000000000000000e5
-1020 3 13 18 -0.65536000000000000000e5
-1020 4 7 10 0.65536000000000000000e5
-1021 1 1 8 0.13107200000000000000e6
-1021 1 2 33 -0.32768000000000000000e5
-1021 1 3 26 0.32768000000000000000e5
-1021 1 3 34 0.65536000000000000000e5
-1021 1 4 35 -0.32768000000000000000e5
-1021 1 5 28 0.32768000000000000000e5
-1021 1 6 21 -0.26214400000000000000e6
-1021 1 7 22 -0.13107200000000000000e6
-1021 1 11 26 0.26214400000000000000e6
-1021 2 1 15 0.13107200000000000000e6
-1021 2 3 17 0.32768000000000000000e5
-1021 2 4 18 0.32768000000000000000e5
-1021 2 6 12 -0.13107200000000000000e6
-1021 2 6 20 0.65536000000000000000e5
-1021 2 12 18 -0.65536000000000000000e5
-1021 3 1 6 -0.13107200000000000000e6
-1021 3 2 15 0.13107200000000000000e6
-1021 3 3 16 0.13107200000000000000e6
-1021 3 4 17 0.32768000000000000000e5
-1021 3 6 11 0.13107200000000000000e6
-1021 3 13 18 -0.32768000000000000000e5
-1021 4 4 8 0.13107200000000000000e6
-1021 4 8 8 -0.65536000000000000000e5
-1021 4 8 9 0.65536000000000000000e5
-1022 1 2 9 0.13107200000000000000e6
-1022 1 3 34 0.13107200000000000000e6
-1022 1 4 35 -0.65536000000000000000e5
-1022 1 17 32 -0.65536000000000000000e5
-1022 1 26 29 -0.13107200000000000000e6
-1022 1 26 33 -0.65536000000000000000e5
-1022 2 6 20 0.13107200000000000000e6
-1022 2 12 18 -0.65536000000000000000e5
-1022 2 14 20 -0.13107200000000000000e6
-1022 3 2 7 -0.13107200000000000000e6
-1022 3 2 15 -0.13107200000000000000e6
-1022 3 5 18 -0.13107200000000000000e6
-1022 3 7 20 0.13107200000000000000e6
-1022 3 14 19 -0.26214400000000000000e6
-1022 3 17 18 -0.65536000000000000000e5
-1022 4 8 10 0.65536000000000000000e5
-1023 4 6 10 -0.32768000000000000000e5
-1023 4 9 9 0.65536000000000000000e5
-1024 2 6 20 -0.65536000000000000000e5
-1024 2 14 20 0.65536000000000000000e5
-1024 4 9 10 0.65536000000000000000e5
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-1582
-4
-35 20 35 20
--0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.32768000000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.78643200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.78643200000000000000e6 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.19660800000000000000e6 0.0 -0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0
-0 1 1 6 0.32768000000000000000e5
-0 1 1 8 -0.32768000000000000000e5
-0 1 1 16 -0.16384000000000000000e5
-0 1 2 5 -0.32768000000000000000e5
-0 1 2 17 0.16384000000000000000e5
-0 1 3 18 0.16384000000000000000e5
-0 1 4 27 -0.16384000000000000000e5
-0 1 9 16 0.32768000000000000000e5
-0 2 1 1 -0.32768000000000000000e5
-0 2 1 3 0.16384000000000000000e5
-0 2 3 17 -0.16384000000000000000e5
-0 3 1 2 0.16384000000000000000e5
-0 3 1 6 -0.32768000000000000000e5
-0 3 2 3 -0.16384000000000000000e5
-0 3 2 7 0.65536000000000000000e5
-0 3 4 17 -0.16384000000000000000e5
-0 4 1 1 0.32768000000000000000e5
-0 4 1 13 -0.16384000000000000000e5
-0 4 2 2 -0.65536000000000000000e5
-1 1 30 33 0.32768000000000000000e5
-1 1 34 35 -0.32768000000000000000e5
-1 3 32 33 -0.16384000000000000000e5
-1 3 32 35 -0.16384000000000000000e5
-1 3 33 35 -0.16384000000000000000e5
-1 3 35 35 -0.32768000000000000000e5
-2 1 3 34 -0.49152000000000000000e5
-2 1 5 20 0.16384000000000000000e5
-2 1 13 28 0.65536000000000000000e5
-2 1 19 34 -0.16384000000000000000e5
-2 1 20 35 0.32768000000000000000e5
-2 1 25 32 -0.65536000000000000000e5
-2 1 34 35 0.16384000000000000000e5
-2 2 6 20 -0.16384000000000000000e5
-2 2 14 20 0.16384000000000000000e5
-2 3 2 31 -0.32768000000000000000e5
-2 3 4 25 0.65536000000000000000e5
-2 3 5 34 -0.16384000000000000000e5
-2 3 6 19 -0.16384000000000000000e5
-2 3 6 35 0.32768000000000000000e5
-2 3 8 21 -0.32768000000000000000e5
-2 3 9 22 -0.32768000000000000000e5
-2 3 16 29 -0.16384000000000000000e5
-2 3 17 22 0.16384000000000000000e5
-2 3 17 30 -0.32768000000000000000e5
-2 3 18 23 -0.65536000000000000000e5
-2 3 19 34 -0.16384000000000000000e5
-2 3 21 34 0.32768000000000000000e5
-2 3 22 27 -0.32768000000000000000e5
-2 3 22 35 -0.16384000000000000000e5
-2 3 29 34 0.32768000000000000000e5
-2 3 30 35 -0.16384000000000000000e5
-2 3 34 35 -0.16384000000000000000e5
-2 4 4 16 -0.32768000000000000000e5
-2 4 6 18 0.16384000000000000000e5
-2 4 8 20 -0.32768000000000000000e5
-2 4 12 16 -0.32768000000000000000e5
-2 4 14 18 -0.16384000000000000000e5
-3 1 30 33 0.32768000000000000000e5
-3 1 33 34 -0.32768000000000000000e5
-3 3 32 33 -0.16384000000000000000e5
-3 3 33 35 -0.16384000000000000000e5
-4 1 3 34 0.32768000000000000000e5
-4 1 17 24 -0.65536000000000000000e5
-4 1 20 27 0.32768000000000000000e5
-4 1 28 35 0.16384000000000000000e5
-4 1 32 35 0.16384000000000000000e5
-4 2 6 20 0.32768000000000000000e5
-4 3 2 31 0.65536000000000000000e5
-4 3 17 30 0.32768000000000000000e5
-4 3 20 33 0.32768000000000000000e5
-4 3 20 35 0.32768000000000000000e5
-4 3 32 33 -0.16384000000000000000e5
-4 3 32 35 -0.16384000000000000000e5
-5 1 9 24 0.32768000000000000000e5
-5 1 31 34 -0.32768000000000000000e5
-5 3 4 25 -0.32768000000000000000e5
-5 3 14 27 -0.32768000000000000000e5
-5 3 21 34 -0.16384000000000000000e5
-5 3 24 35 -0.16384000000000000000e5
-5 3 29 34 -0.16384000000000000000e5
-5 3 34 34 -0.32768000000000000000e5
-6 1 3 34 -0.49152000000000000000e5
-6 1 5 20 0.16384000000000000000e5
-6 1 13 28 0.65536000000000000000e5
-6 1 19 34 -0.16384000000000000000e5
-6 1 20 35 0.32768000000000000000e5
-6 1 25 32 -0.65536000000000000000e5
-6 1 33 34 0.16384000000000000000e5
-6 2 6 20 -0.16384000000000000000e5
-6 2 14 20 0.16384000000000000000e5
-6 3 2 31 -0.32768000000000000000e5
-6 3 4 25 0.65536000000000000000e5
-6 3 5 34 -0.16384000000000000000e5
-6 3 6 19 -0.16384000000000000000e5
-6 3 6 35 0.32768000000000000000e5
-6 3 8 21 -0.32768000000000000000e5
-6 3 9 22 -0.32768000000000000000e5
-6 3 16 29 -0.16384000000000000000e5
-6 3 17 22 0.16384000000000000000e5
-6 3 17 30 -0.32768000000000000000e5
-6 3 18 23 -0.65536000000000000000e5
-6 3 19 34 -0.16384000000000000000e5
-6 3 21 34 0.32768000000000000000e5
-6 3 22 27 -0.32768000000000000000e5
-6 3 22 35 -0.16384000000000000000e5
-6 3 30 35 -0.16384000000000000000e5
-6 4 4 16 -0.32768000000000000000e5
-6 4 6 18 0.16384000000000000000e5
-6 4 8 20 -0.32768000000000000000e5
-6 4 12 16 -0.32768000000000000000e5
-6 4 14 18 -0.16384000000000000000e5
-7 1 12 27 -0.32768000000000000000e5
-7 1 17 24 0.32768000000000000000e5
-7 1 20 27 -0.16384000000000000000e5
-7 1 20 35 -0.16384000000000000000e5
-7 1 34 35 0.16384000000000000000e5
-7 2 6 20 -0.16384000000000000000e5
-7 3 2 31 -0.32768000000000000000e5
-7 3 6 35 -0.16384000000000000000e5
-7 3 18 23 0.32768000000000000000e5
-7 3 20 33 -0.16384000000000000000e5
-7 3 20 35 -0.16384000000000000000e5
-7 3 22 27 0.16384000000000000000e5
-7 3 26 31 0.32768000000000000000e5
-7 4 14 18 0.16384000000000000000e5
-8 1 3 34 0.32768000000000000000e5
-8 1 4 27 0.16384000000000000000e5
-8 1 4 35 0.16384000000000000000e5
-8 1 17 24 -0.65536000000000000000e5
-8 1 20 27 0.32768000000000000000e5
-8 1 26 33 -0.16384000000000000000e5
-8 1 28 35 0.16384000000000000000e5
-8 2 4 18 0.16384000000000000000e5
-8 2 6 20 0.32768000000000000000e5
-8 2 18 20 -0.16384000000000000000e5
-8 3 2 31 0.65536000000000000000e5
-8 3 3 32 -0.16384000000000000000e5
-8 3 5 26 0.16384000000000000000e5
-8 3 17 22 -0.32768000000000000000e5
-8 3 17 30 0.32768000000000000000e5
-8 3 18 19 0.16384000000000000000e5
-8 3 19 32 0.16384000000000000000e5
-8 3 27 32 -0.16384000000000000000e5
-8 3 32 33 -0.16384000000000000000e5
-8 4 13 17 -0.16384000000000000000e5
-9 1 3 34 -0.32768000000000000000e5
-9 1 4 27 -0.16384000000000000000e5
-9 1 4 35 -0.16384000000000000000e5
-9 1 17 24 0.65536000000000000000e5
-9 1 20 27 -0.32768000000000000000e5
-9 1 20 35 -0.32768000000000000000e5
-9 1 26 33 0.16384000000000000000e5
-9 1 28 35 -0.16384000000000000000e5
-9 1 32 35 0.16384000000000000000e5
-9 2 4 18 -0.16384000000000000000e5
-9 2 6 20 -0.32768000000000000000e5
-9 2 18 20 0.16384000000000000000e5
-9 2 20 20 -0.32768000000000000000e5
-9 3 2 31 -0.65536000000000000000e5
-9 3 3 32 0.16384000000000000000e5
-9 3 5 26 -0.16384000000000000000e5
-9 3 17 22 0.32768000000000000000e5
-9 3 17 30 -0.32768000000000000000e5
-9 3 18 19 -0.16384000000000000000e5
-9 3 19 32 -0.16384000000000000000e5
-9 3 20 35 -0.32768000000000000000e5
-9 3 27 32 0.16384000000000000000e5
-9 4 13 17 0.16384000000000000000e5
-10 1 9 24 -0.16384000000000000000e5
-10 1 31 34 0.16384000000000000000e5
-10 3 4 25 0.16384000000000000000e5
-10 3 13 34 0.32768000000000000000e5
-10 3 14 27 0.16384000000000000000e5
-10 3 24 29 0.16384000000000000000e5
-10 3 31 34 -0.16384000000000000000e5
-11 3 21 34 -0.16384000000000000000e5
-11 3 24 29 0.32768000000000000000e5
-11 3 24 35 -0.16384000000000000000e5
-12 1 3 34 0.81920000000000000000e4
-12 1 12 19 0.16384000000000000000e5
-12 1 12 27 0.16384000000000000000e5
-12 1 13 28 -0.32768000000000000000e5
-12 1 20 35 -0.81920000000000000000e4
-12 2 6 20 0.81920000000000000000e4
-12 2 14 20 -0.81920000000000000000e4
-12 3 2 31 0.16384000000000000000e5
-12 3 4 25 -0.32768000000000000000e5
-12 3 6 35 -0.81920000000000000000e4
-12 3 8 21 0.16384000000000000000e5
-12 3 9 22 0.16384000000000000000e5
-12 3 16 29 0.81920000000000000000e4
-12 3 17 30 0.81920000000000000000e4
-12 3 21 34 -0.16384000000000000000e5
-12 3 26 31 -0.16384000000000000000e5
-12 3 29 34 -0.16384000000000000000e5
-12 4 4 16 0.16384000000000000000e5
-12 4 8 20 0.16384000000000000000e5
-12 4 12 16 0.16384000000000000000e5
-13 1 3 34 -0.49152000000000000000e5
-13 1 5 20 0.16384000000000000000e5
-13 1 13 28 0.65536000000000000000e5
-13 1 19 34 -0.16384000000000000000e5
-13 1 20 35 0.32768000000000000000e5
-13 1 25 32 -0.65536000000000000000e5
-13 1 30 33 0.16384000000000000000e5
-13 2 6 20 -0.16384000000000000000e5
-13 2 14 20 0.16384000000000000000e5
-13 3 2 31 -0.32768000000000000000e5
-13 3 4 25 0.65536000000000000000e5
-13 3 5 34 -0.16384000000000000000e5
-13 3 6 19 -0.16384000000000000000e5
-13 3 6 35 0.32768000000000000000e5
-13 3 8 21 -0.32768000000000000000e5
-13 3 9 22 -0.32768000000000000000e5
-13 3 16 29 -0.16384000000000000000e5
-13 3 17 22 0.16384000000000000000e5
-13 3 17 30 -0.32768000000000000000e5
-13 3 18 23 -0.65536000000000000000e5
-13 3 19 34 -0.16384000000000000000e5
-13 3 22 27 -0.32768000000000000000e5
-13 3 22 35 -0.16384000000000000000e5
-13 4 4 16 -0.32768000000000000000e5
-13 4 6 18 0.16384000000000000000e5
-13 4 8 20 -0.32768000000000000000e5
-13 4 12 16 -0.32768000000000000000e5
-13 4 14 18 -0.16384000000000000000e5
-14 1 12 27 -0.32768000000000000000e5
-14 1 17 24 0.32768000000000000000e5
-14 1 20 27 -0.16384000000000000000e5
-14 1 20 35 -0.16384000000000000000e5
-14 1 33 34 0.16384000000000000000e5
-14 2 6 20 -0.16384000000000000000e5
-14 3 2 31 -0.32768000000000000000e5
-14 3 6 35 -0.16384000000000000000e5
-14 3 18 23 0.32768000000000000000e5
-14 3 20 33 -0.16384000000000000000e5
-14 3 22 27 0.16384000000000000000e5
-14 4 14 18 0.16384000000000000000e5
-15 1 20 27 -0.16384000000000000000e5
-15 2 14 20 -0.16384000000000000000e5
-15 3 6 35 -0.16384000000000000000e5
-15 3 16 29 0.16384000000000000000e5
-15 3 20 33 -0.16384000000000000000e5
-15 3 20 35 -0.16384000000000000000e5
-16 1 3 34 -0.32768000000000000000e5
-16 1 4 27 -0.32768000000000000000e5
-16 1 4 35 -0.32768000000000000000e5
-16 1 17 24 0.65536000000000000000e5
-16 1 19 34 -0.32768000000000000000e5
-16 1 20 27 -0.32768000000000000000e5
-16 1 26 33 0.16384000000000000000e5
-16 1 28 35 -0.16384000000000000000e5
-16 1 30 33 0.32768000000000000000e5
-16 1 32 35 0.16384000000000000000e5
-16 1 33 34 0.32768000000000000000e5
-16 1 34 35 -0.32768000000000000000e5
-16 2 4 18 -0.32768000000000000000e5
-16 2 6 20 -0.32768000000000000000e5
-16 2 18 20 0.16384000000000000000e5
-16 3 2 31 -0.65536000000000000000e5
-16 3 3 32 0.32768000000000000000e5
-16 3 5 26 -0.32768000000000000000e5
-16 3 17 22 0.65536000000000000000e5
-16 3 17 30 -0.32768000000000000000e5
-16 3 18 19 -0.32768000000000000000e5
-16 3 19 32 -0.32768000000000000000e5
-16 3 20 33 0.32768000000000000000e5
-16 3 27 32 0.16384000000000000000e5
-16 3 32 33 -0.16384000000000000000e5
-16 4 13 17 0.32768000000000000000e5
-16 4 20 20 -0.32768000000000000000e5
-17 1 3 34 0.32768000000000000000e5
-17 1 4 27 0.16384000000000000000e5
-17 1 4 35 0.16384000000000000000e5
-17 1 17 24 -0.65536000000000000000e5
-17 1 20 27 0.32768000000000000000e5
-17 1 26 33 -0.16384000000000000000e5
-17 1 28 35 0.16384000000000000000e5
-17 2 4 18 0.16384000000000000000e5
-17 2 6 20 0.32768000000000000000e5
-17 2 18 20 -0.16384000000000000000e5
-17 3 2 31 0.65536000000000000000e5
-17 3 3 32 -0.16384000000000000000e5
-17 3 5 26 0.16384000000000000000e5
-17 3 17 22 -0.32768000000000000000e5
-17 3 17 30 0.32768000000000000000e5
-17 3 18 19 0.16384000000000000000e5
-17 3 19 32 0.16384000000000000000e5
-17 3 20 33 -0.32768000000000000000e5
-17 4 13 17 -0.16384000000000000000e5
-18 1 4 27 0.16384000000000000000e5
-18 1 4 35 0.16384000000000000000e5
-18 1 20 35 -0.32768000000000000000e5
-18 2 4 18 0.16384000000000000000e5
-18 2 18 20 -0.16384000000000000000e5
-18 3 3 32 -0.16384000000000000000e5
-18 3 5 26 0.16384000000000000000e5
-18 3 6 35 -0.32768000000000000000e5
-18 3 17 22 -0.32768000000000000000e5
-18 3 18 19 0.16384000000000000000e5
-18 3 19 32 0.16384000000000000000e5
-18 3 20 33 -0.32768000000000000000e5
-18 3 27 32 -0.16384000000000000000e5
-18 4 13 17 -0.16384000000000000000e5
-19 1 2 33 -0.16384000000000000000e5
-19 1 4 27 -0.32768000000000000000e5
-19 1 4 35 -0.32768000000000000000e5
-19 1 17 24 0.65536000000000000000e5
-19 1 17 32 0.16384000000000000000e5
-19 1 20 27 -0.65536000000000000000e5
-19 1 26 33 0.16384000000000000000e5
-19 1 28 35 -0.16384000000000000000e5
-19 2 4 18 -0.32768000000000000000e5
-19 2 6 20 -0.32768000000000000000e5
-19 2 12 18 -0.16384000000000000000e5
-19 2 18 20 0.32768000000000000000e5
-19 2 20 20 -0.32768000000000000000e5
-19 3 2 31 -0.65536000000000000000e5
-19 3 3 32 0.32768000000000000000e5
-19 3 4 33 0.16384000000000000000e5
-19 3 5 26 -0.32768000000000000000e5
-19 3 6 35 -0.32768000000000000000e5
-19 3 16 29 0.32768000000000000000e5
-19 3 17 22 0.65536000000000000000e5
-19 3 17 30 -0.65536000000000000000e5
-19 3 18 19 -0.32768000000000000000e5
-19 3 19 32 -0.32768000000000000000e5
-19 3 20 33 0.32768000000000000000e5
-19 3 20 35 -0.32768000000000000000e5
-19 3 27 32 0.16384000000000000000e5
-19 4 13 17 0.49152000000000000000e5
-19 4 17 17 0.32768000000000000000e5
-20 1 15 22 0.32768000000000000000e5
-20 1 15 30 -0.32768000000000000000e5
-20 3 13 34 -0.16384000000000000000e5
-20 3 15 28 0.16384000000000000000e5
-20 3 20 25 0.16384000000000000000e5
-20 3 25 30 -0.16384000000000000000e5
-20 3 25 34 -0.16384000000000000000e5
-20 4 16 16 0.32768000000000000000e5
-21 1 14 29 -0.32768000000000000000e5
-21 1 25 32 0.16384000000000000000e5
-21 1 31 34 0.16384000000000000000e5
-21 3 20 25 0.32768000000000000000e5
-22 1 3 34 -0.81920000000000000000e4
-22 1 12 19 0.16384000000000000000e5
-22 1 12 27 0.16384000000000000000e5
-22 1 13 28 -0.32768000000000000000e5
-22 1 20 35 0.81920000000000000000e4
-22 3 2 31 0.16384000000000000000e5
-22 3 4 25 -0.32768000000000000000e5
-22 3 6 35 0.81920000000000000000e4
-22 3 8 21 0.16384000000000000000e5
-22 3 9 22 0.16384000000000000000e5
-22 3 17 30 -0.81920000000000000000e4
-22 3 18 31 -0.16384000000000000000e5
-22 3 21 34 -0.16384000000000000000e5
-22 3 22 27 -0.81920000000000000000e4
-22 4 4 16 0.16384000000000000000e5
-22 4 12 16 0.16384000000000000000e5
-22 4 14 18 -0.81920000000000000000e4
-23 1 3 34 -0.16384000000000000000e5
-23 1 7 22 0.16384000000000000000e5
-23 1 8 23 -0.32768000000000000000e5
-23 1 12 27 0.16384000000000000000e5
-23 1 20 35 0.16384000000000000000e5
-23 2 6 20 -0.81920000000000000000e4
-23 2 14 20 0.81920000000000000000e4
-23 3 2 31 -0.16384000000000000000e5
-23 3 6 35 0.16384000000000000000e5
-23 3 7 20 0.16384000000000000000e5
-23 3 8 21 0.16384000000000000000e5
-23 3 13 26 0.32768000000000000000e5
-23 3 16 29 -0.81920000000000000000e4
-23 3 17 30 -0.16384000000000000000e5
-23 3 18 23 -0.16384000000000000000e5
-23 3 22 27 -0.81920000000000000000e4
-23 3 26 31 -0.16384000000000000000e5
-23 4 8 12 0.16384000000000000000e5
-23 4 14 18 -0.81920000000000000000e4
-24 1 3 34 -0.49152000000000000000e5
-24 1 5 20 0.16384000000000000000e5
-24 1 13 28 0.65536000000000000000e5
-24 1 20 35 0.32768000000000000000e5
-24 1 25 32 -0.65536000000000000000e5
-24 2 6 20 -0.16384000000000000000e5
-24 2 14 20 0.16384000000000000000e5
-24 3 2 31 -0.32768000000000000000e5
-24 3 4 25 0.65536000000000000000e5
-24 3 5 34 -0.16384000000000000000e5
-24 3 6 19 -0.16384000000000000000e5
-24 3 6 35 0.32768000000000000000e5
-24 3 8 21 -0.32768000000000000000e5
-24 3 9 22 -0.32768000000000000000e5
-24 3 16 29 -0.16384000000000000000e5
-24 3 17 22 0.16384000000000000000e5
-24 3 17 30 -0.32768000000000000000e5
-24 3 18 23 -0.65536000000000000000e5
-24 3 18 31 -0.32768000000000000000e5
-24 3 19 34 -0.16384000000000000000e5
-24 3 22 27 -0.32768000000000000000e5
-24 4 4 16 -0.32768000000000000000e5
-24 4 6 18 0.16384000000000000000e5
-24 4 8 20 -0.32768000000000000000e5
-24 4 12 16 -0.32768000000000000000e5
-24 4 14 18 -0.16384000000000000000e5
-25 1 3 34 -0.16384000000000000000e5
-25 1 12 27 -0.32768000000000000000e5
-25 1 17 24 0.32768000000000000000e5
-25 1 20 27 -0.16384000000000000000e5
-25 1 30 33 0.16384000000000000000e5
-25 2 6 20 -0.16384000000000000000e5
-25 3 2 31 -0.32768000000000000000e5
-25 3 17 30 -0.16384000000000000000e5
-25 3 18 23 0.32768000000000000000e5
-26 1 3 34 -0.16384000000000000000e5
-26 1 20 27 -0.16384000000000000000e5
-26 1 20 35 0.16384000000000000000e5
-26 2 6 20 -0.16384000000000000000e5
-26 3 6 35 0.16384000000000000000e5
-26 3 17 30 -0.16384000000000000000e5
-26 3 20 33 -0.16384000000000000000e5
-27 1 16 31 -0.32768000000000000000e5
-27 1 20 27 0.16384000000000000000e5
-27 1 20 35 0.16384000000000000000e5
-27 3 16 29 -0.16384000000000000000e5
-28 1 3 34 -0.32768000000000000000e5
-28 1 4 27 -0.32768000000000000000e5
-28 1 4 35 -0.32768000000000000000e5
-28 1 17 24 0.65536000000000000000e5
-28 1 19 34 -0.32768000000000000000e5
-28 1 20 27 -0.32768000000000000000e5
-28 1 26 33 0.16384000000000000000e5
-28 1 28 35 -0.16384000000000000000e5
-28 1 30 33 0.32768000000000000000e5
-28 1 32 35 0.16384000000000000000e5
-28 1 33 34 0.32768000000000000000e5
-28 1 34 35 -0.32768000000000000000e5
-28 2 4 18 -0.32768000000000000000e5
-28 2 6 20 -0.32768000000000000000e5
-28 2 18 20 0.16384000000000000000e5
-28 3 2 31 -0.65536000000000000000e5
-28 3 3 32 0.32768000000000000000e5
-28 3 5 26 -0.32768000000000000000e5
-28 3 17 22 0.65536000000000000000e5
-28 3 17 30 -0.32768000000000000000e5
-28 3 18 19 -0.32768000000000000000e5
-28 3 19 32 -0.16384000000000000000e5
-28 3 20 33 0.32768000000000000000e5
-28 3 22 27 -0.32768000000000000000e5
-28 3 27 32 0.16384000000000000000e5
-28 3 28 33 0.16384000000000000000e5
-28 3 32 33 -0.16384000000000000000e5
-28 4 13 17 0.32768000000000000000e5
-28 4 20 20 -0.32768000000000000000e5
-29 1 4 27 -0.16384000000000000000e5
-29 2 4 18 -0.16384000000000000000e5
-29 3 3 32 0.16384000000000000000e5
-29 3 5 26 -0.16384000000000000000e5
-29 3 17 22 0.32768000000000000000e5
-29 3 17 30 -0.32768000000000000000e5
-29 3 18 19 -0.16384000000000000000e5
-29 3 19 32 -0.16384000000000000000e5
-29 4 13 17 0.16384000000000000000e5
-30 1 2 33 -0.16384000000000000000e5
-30 1 4 27 0.16384000000000000000e5
-30 1 26 33 -0.16384000000000000000e5
-30 2 4 18 0.16384000000000000000e5
-30 2 12 18 -0.16384000000000000000e5
-30 2 18 20 -0.16384000000000000000e5
-30 3 3 32 -0.16384000000000000000e5
-30 3 4 33 0.16384000000000000000e5
-30 3 5 26 0.16384000000000000000e5
-30 3 17 22 -0.32768000000000000000e5
-30 3 17 30 -0.32768000000000000000e5
-30 3 18 19 0.16384000000000000000e5
-30 3 19 32 0.16384000000000000000e5
-30 3 20 33 -0.32768000000000000000e5
-31 1 17 32 0.16384000000000000000e5
-31 1 20 27 -0.32768000000000000000e5
-31 1 26 33 0.16384000000000000000e5
-32 1 3 34 0.32768000000000000000e5
-32 1 4 27 -0.16384000000000000000e5
-32 1 16 31 -0.65536000000000000000e5
-32 1 20 27 0.65536000000000000000e5
-32 2 4 18 -0.16384000000000000000e5
-32 2 6 12 0.32768000000000000000e5
-32 2 17 17 -0.32768000000000000000e5
-32 2 18 20 0.16384000000000000000e5
-32 3 3 32 0.16384000000000000000e5
-32 3 5 26 -0.16384000000000000000e5
-32 3 6 35 -0.32768000000000000000e5
-32 3 16 29 -0.32768000000000000000e5
-32 3 17 22 0.32768000000000000000e5
-32 3 18 19 -0.16384000000000000000e5
-32 3 19 32 -0.16384000000000000000e5
-32 3 20 33 0.32768000000000000000e5
-32 4 2 14 -0.32768000000000000000e5
-32 4 5 17 -0.32768000000000000000e5
-32 4 13 17 0.16384000000000000000e5
-32 4 17 17 0.32768000000000000000e5
-33 1 14 21 0.81920000000000000000e4
-33 1 14 29 -0.81920000000000000000e4
-33 1 22 25 -0.81920000000000000000e4
-33 1 24 31 0.81920000000000000000e4
-33 3 10 23 0.81920000000000000000e4
-33 3 11 24 0.81920000000000000000e4
-33 3 12 25 0.16384000000000000000e5
-33 3 13 14 0.32768000000000000000e5
-33 3 15 28 -0.81920000000000000000e4
-33 3 15 34 -0.16384000000000000000e5
-33 3 20 25 -0.81920000000000000000e4
-33 3 24 25 -0.16384000000000000000e5
-33 4 10 14 0.81920000000000000000e4
-33 4 10 16 0.16384000000000000000e5
-33 4 16 16 -0.16384000000000000000e5
-34 1 15 22 0.32768000000000000000e5
-34 1 15 30 -0.32768000000000000000e5
-34 1 22 25 -0.16384000000000000000e5
-34 1 24 31 0.16384000000000000000e5
-34 3 25 30 -0.16384000000000000000e5
-35 1 8 15 -0.32768000000000000000e5
-35 1 14 21 0.16384000000000000000e5
-35 1 24 31 0.16384000000000000000e5
-35 3 2 15 0.16384000000000000000e5
-35 3 8 13 0.16384000000000000000e5
-35 3 10 23 0.16384000000000000000e5
-35 3 11 12 0.16384000000000000000e5
-35 3 11 24 0.16384000000000000000e5
-35 3 13 34 -0.16384000000000000000e5
-35 3 20 25 -0.16384000000000000000e5
-35 4 6 10 0.16384000000000000000e5
-35 4 10 14 0.16384000000000000000e5
-36 1 22 25 -0.32768000000000000000e5
-36 1 24 31 0.32768000000000000000e5
-36 3 14 35 0.16384000000000000000e5
-36 3 24 29 0.16384000000000000000e5
-37 1 3 34 0.81920000000000000000e4
-37 1 9 24 0.16384000000000000000e5
-37 1 14 29 -0.32768000000000000000e5
-37 1 20 35 -0.81920000000000000000e4
-37 1 25 32 0.16384000000000000000e5
-37 2 6 20 0.40960000000000000000e4
-37 2 14 20 -0.40960000000000000000e4
-37 3 4 25 -0.16384000000000000000e5
-37 3 6 35 -0.81920000000000000000e4
-37 3 14 27 -0.16384000000000000000e5
-37 3 16 29 0.40960000000000000000e4
-37 3 17 30 0.81920000000000000000e4
-37 3 18 31 0.81920000000000000000e4
-37 3 22 27 0.40960000000000000000e4
-37 3 24 29 -0.16384000000000000000e5
-37 4 8 20 0.81920000000000000000e4
-37 4 14 18 0.40960000000000000000e4
-38 1 7 14 -0.32768000000000000000e5
-38 1 7 22 -0.81920000000000000000e4
-38 1 8 23 0.16384000000000000000e5
-38 1 17 24 0.81920000000000000000e4
-38 1 25 32 0.16384000000000000000e5
-38 3 2 15 0.32768000000000000000e5
-38 3 7 20 -0.81920000000000000000e4
-38 3 8 21 -0.81920000000000000000e4
-38 3 10 23 0.32768000000000000000e5
-38 3 13 26 -0.16384000000000000000e5
-38 4 8 12 -0.81920000000000000000e4
-39 1 9 24 0.32768000000000000000e5
-39 1 31 34 -0.32768000000000000000e5
-39 3 4 25 -0.32768000000000000000e5
-39 3 14 27 -0.65536000000000000000e5
-39 3 18 31 0.16384000000000000000e5
-39 3 21 34 -0.16384000000000000000e5
-39 3 24 29 -0.32768000000000000000e5
-39 3 26 31 -0.16384000000000000000e5
-39 4 16 20 -0.16384000000000000000e5
-40 1 3 34 0.16384000000000000000e5
-40 1 12 19 0.16384000000000000000e5
-40 1 12 27 0.16384000000000000000e5
-40 1 13 28 -0.65536000000000000000e5
-40 1 20 35 -0.16384000000000000000e5
-40 1 25 32 0.32768000000000000000e5
-40 2 6 20 0.81920000000000000000e4
-40 2 14 20 -0.81920000000000000000e4
-40 3 2 31 0.16384000000000000000e5
-40 3 4 25 -0.32768000000000000000e5
-40 3 6 35 -0.16384000000000000000e5
-40 3 8 21 0.16384000000000000000e5
-40 3 9 22 0.16384000000000000000e5
-40 3 16 29 0.81920000000000000000e4
-40 3 17 30 0.16384000000000000000e5
-40 3 22 27 0.81920000000000000000e4
-40 4 4 16 0.16384000000000000000e5
-40 4 8 20 0.16384000000000000000e5
-40 4 12 16 0.16384000000000000000e5
-40 4 14 18 0.81920000000000000000e4
-41 1 3 34 -0.81920000000000000000e4
-41 1 7 22 0.16384000000000000000e5
-41 1 8 23 -0.32768000000000000000e5
-41 1 12 27 0.16384000000000000000e5
-41 1 20 35 0.81920000000000000000e4
-41 3 2 31 -0.16384000000000000000e5
-41 3 6 35 0.81920000000000000000e4
-41 3 7 20 0.16384000000000000000e5
-41 3 8 21 0.16384000000000000000e5
-41 3 17 30 -0.81920000000000000000e4
-41 3 18 23 -0.16384000000000000000e5
-41 3 22 27 -0.81920000000000000000e4
-41 4 8 12 0.16384000000000000000e5
-41 4 14 18 -0.81920000000000000000e4
-42 1 3 34 -0.81920000000000000000e4
-42 1 11 26 -0.16384000000000000000e5
-42 1 16 23 -0.16384000000000000000e5
-42 1 16 31 0.16384000000000000000e5
-42 1 20 35 0.81920000000000000000e4
-42 2 5 19 -0.16384000000000000000e5
-42 2 6 20 -0.81920000000000000000e4
-42 2 14 20 0.81920000000000000000e4
-42 3 2 31 -0.16384000000000000000e5
-42 3 6 35 0.81920000000000000000e4
-42 3 16 29 -0.81920000000000000000e4
-42 3 17 30 -0.81920000000000000000e4
-43 1 3 34 -0.16384000000000000000e5
-43 1 5 20 0.16384000000000000000e5
-43 3 4 25 0.65536000000000000000e5
-43 3 5 34 -0.16384000000000000000e5
-43 3 6 19 -0.16384000000000000000e5
-43 3 8 21 -0.32768000000000000000e5
-43 3 9 22 -0.32768000000000000000e5
-43 3 17 22 0.16384000000000000000e5
-43 3 18 23 -0.32768000000000000000e5
-43 4 4 16 -0.32768000000000000000e5
-43 4 6 18 0.16384000000000000000e5
-44 1 3 34 -0.16384000000000000000e5
-44 1 12 27 -0.32768000000000000000e5
-44 1 17 24 0.32768000000000000000e5
-44 1 19 34 0.16384000000000000000e5
-44 1 20 27 -0.16384000000000000000e5
-44 2 6 20 -0.16384000000000000000e5
-44 3 2 31 -0.32768000000000000000e5
-45 1 20 27 -0.16384000000000000000e5
-45 2 6 20 -0.16384000000000000000e5
-45 3 2 31 -0.32768000000000000000e5
-45 3 17 30 -0.16384000000000000000e5
-46 1 11 26 -0.32768000000000000000e5
-46 1 20 27 0.16384000000000000000e5
-46 1 20 35 0.16384000000000000000e5
-46 3 6 35 0.16384000000000000000e5
-47 1 3 34 -0.16384000000000000000e5
-47 1 16 23 -0.32768000000000000000e5
-47 1 16 31 0.32768000000000000000e5
-47 2 6 12 -0.16384000000000000000e5
-47 3 16 29 -0.16384000000000000000e5
-47 4 2 14 0.16384000000000000000e5
-47 4 5 17 0.16384000000000000000e5
-48 1 3 34 -0.65536000000000000000e5
-48 1 4 27 -0.16384000000000000000e5
-48 1 4 35 -0.32768000000000000000e5
-48 1 5 20 0.32768000000000000000e5
-48 1 17 24 0.65536000000000000000e5
-48 1 20 27 -0.32768000000000000000e5
-48 1 28 35 -0.16384000000000000000e5
-48 1 32 35 0.16384000000000000000e5
-48 1 33 34 0.32768000000000000000e5
-48 1 34 35 -0.32768000000000000000e5
-48 2 4 18 -0.16384000000000000000e5
-48 2 6 20 -0.32768000000000000000e5
-48 3 2 31 -0.65536000000000000000e5
-48 3 3 32 0.16384000000000000000e5
-48 3 4 33 0.16384000000000000000e5
-48 3 5 26 -0.16384000000000000000e5
-48 3 6 19 -0.32768000000000000000e5
-48 3 17 22 0.65536000000000000000e5
-48 3 17 30 -0.32768000000000000000e5
-48 3 18 19 -0.16384000000000000000e5
-48 3 18 23 -0.65536000000000000000e5
-48 3 19 32 -0.16384000000000000000e5
-48 3 22 27 -0.32768000000000000000e5
-48 3 27 32 0.16384000000000000000e5
-48 3 28 33 0.16384000000000000000e5
-48 3 32 33 -0.16384000000000000000e5
-48 4 6 18 0.32768000000000000000e5
-48 4 13 17 0.16384000000000000000e5
-48 4 18 18 -0.32768000000000000000e5
-48 4 20 20 -0.32768000000000000000e5
-49 1 4 27 -0.16384000000000000000e5
-49 2 4 18 -0.16384000000000000000e5
-49 3 4 33 -0.16384000000000000000e5
-49 3 5 26 -0.16384000000000000000e5
-49 3 18 19 -0.16384000000000000000e5
-50 1 2 33 -0.16384000000000000000e5
-50 1 3 34 0.32768000000000000000e5
-50 1 5 20 -0.32768000000000000000e5
-50 2 12 18 -0.16384000000000000000e5
-50 3 3 32 0.16384000000000000000e5
-50 3 4 33 0.16384000000000000000e5
-50 3 6 19 0.32768000000000000000e5
-50 3 17 30 -0.32768000000000000000e5
-50 4 13 17 0.16384000000000000000e5
-51 1 3 34 0.32768000000000000000e5
-51 1 4 35 -0.16384000000000000000e5
-51 1 20 27 -0.32768000000000000000e5
-51 2 12 18 -0.16384000000000000000e5
-51 3 1 30 -0.32768000000000000000e5
-51 3 4 33 0.16384000000000000000e5
-51 3 17 30 -0.32768000000000000000e5
-51 4 13 17 0.16384000000000000000e5
-52 1 1 32 -0.16384000000000000000e5
-52 1 2 33 -0.16384000000000000000e5
-52 1 3 34 -0.32768000000000000000e5
-52 1 5 20 0.32768000000000000000e5
-52 1 11 26 -0.65536000000000000000e5
-52 1 16 31 0.65536000000000000000e5
-52 1 17 32 0.16384000000000000000e5
-52 2 11 17 -0.16384000000000000000e5
-52 3 1 30 0.32768000000000000000e5
-52 3 6 19 -0.32768000000000000000e5
-52 4 5 17 0.32768000000000000000e5
-53 1 1 32 0.16384000000000000000e5
-53 1 2 33 0.16384000000000000000e5
-53 1 3 34 -0.32768000000000000000e5
-53 1 4 35 0.16384000000000000000e5
-53 1 5 20 -0.32768000000000000000e5
-53 1 11 26 0.65536000000000000000e5
-53 1 16 23 -0.65536000000000000000e5
-53 1 17 32 -0.16384000000000000000e5
-53 1 20 27 0.32768000000000000000e5
-53 2 1 19 0.32768000000000000000e5
-53 2 6 12 -0.32768000000000000000e5
-53 2 12 18 0.16384000000000000000e5
-53 2 17 17 -0.32768000000000000000e5
-53 3 4 33 -0.16384000000000000000e5
-53 3 6 19 0.32768000000000000000e5
-53 3 16 29 -0.32768000000000000000e5
-53 3 17 30 0.32768000000000000000e5
-53 4 2 14 0.32768000000000000000e5
-53 4 13 17 -0.16384000000000000000e5
-54 1 14 21 -0.40960000000000000000e4
-54 1 14 29 0.40960000000000000000e4
-54 1 15 22 -0.81920000000000000000e4
-54 1 15 30 0.81920000000000000000e4
-54 3 10 15 0.16384000000000000000e5
-54 3 10 23 -0.40960000000000000000e4
-54 3 11 24 -0.40960000000000000000e4
-54 3 12 15 0.16384000000000000000e5
-54 3 12 25 -0.81920000000000000000e4
-54 3 13 14 0.16384000000000000000e5
-54 3 25 25 -0.32768000000000000000e5
-54 4 10 10 0.32768000000000000000e5
-54 4 10 14 -0.40960000000000000000e4
-54 4 10 16 -0.81920000000000000000e4
-55 1 15 22 -0.16384000000000000000e5
-55 1 15 30 0.16384000000000000000e5
-55 3 13 14 0.32768000000000000000e5
-55 3 24 25 -0.16384000000000000000e5
-56 1 10 25 -0.16384000000000000000e5
-56 1 14 21 -0.81920000000000000000e4
-56 1 14 29 0.81920000000000000000e4
-56 1 15 22 -0.16384000000000000000e5
-56 1 15 30 0.16384000000000000000e5
-56 1 22 25 -0.81920000000000000000e4
-56 1 24 31 0.81920000000000000000e4
-56 2 10 16 -0.16384000000000000000e5
-56 3 10 23 -0.81920000000000000000e4
-56 3 11 24 -0.81920000000000000000e4
-56 3 15 28 -0.81920000000000000000e4
-56 3 20 25 -0.81920000000000000000e4
-56 4 10 14 -0.81920000000000000000e4
-56 4 16 16 -0.16384000000000000000e5
-57 1 8 15 -0.32768000000000000000e5
-57 1 14 29 0.16384000000000000000e5
-57 1 24 31 0.16384000000000000000e5
-57 3 2 15 0.16384000000000000000e5
-57 3 8 13 0.16384000000000000000e5
-57 3 11 12 0.16384000000000000000e5
-57 4 6 10 0.16384000000000000000e5
-58 1 7 14 0.16384000000000000000e5
-58 1 10 25 -0.32768000000000000000e5
-58 1 14 29 0.16384000000000000000e5
-58 3 2 15 -0.16384000000000000000e5
-58 3 10 23 -0.16384000000000000000e5
-58 3 20 25 -0.16384000000000000000e5
-59 1 22 25 -0.32768000000000000000e5
-59 1 24 31 0.32768000000000000000e5
-59 3 11 24 -0.32768000000000000000e5
-59 3 14 27 0.16384000000000000000e5
-59 3 14 35 0.16384000000000000000e5
-59 3 22 31 0.16384000000000000000e5
-59 3 24 29 0.16384000000000000000e5
-60 1 9 24 0.16384000000000000000e5
-60 1 13 28 0.16384000000000000000e5
-60 1 14 21 -0.32768000000000000000e5
-60 3 4 25 -0.16384000000000000000e5
-60 3 14 27 -0.16384000000000000000e5
-61 1 3 34 0.81920000000000000000e4
-61 1 7 14 -0.32768000000000000000e5
-61 1 7 22 -0.81920000000000000000e4
-61 1 8 23 0.16384000000000000000e5
-61 1 17 24 0.81920000000000000000e4
-61 1 20 35 -0.81920000000000000000e4
-61 1 25 32 0.16384000000000000000e5
-61 2 6 20 0.40960000000000000000e4
-61 2 14 20 -0.40960000000000000000e4
-61 3 2 15 0.32768000000000000000e5
-61 3 6 35 -0.81920000000000000000e4
-61 3 7 20 -0.81920000000000000000e4
-61 3 8 21 -0.81920000000000000000e4
-61 3 16 29 0.40960000000000000000e4
-61 3 17 30 0.81920000000000000000e4
-61 3 18 31 0.81920000000000000000e4
-61 3 22 27 0.40960000000000000000e4
-61 4 8 12 -0.81920000000000000000e4
-61 4 8 20 0.81920000000000000000e4
-61 4 14 18 0.40960000000000000000e4
-62 1 7 22 -0.81920000000000000000e4
-62 1 8 23 0.16384000000000000000e5
-62 1 11 26 0.81920000000000000000e4
-62 1 13 20 -0.32768000000000000000e5
-62 1 16 23 0.81920000000000000000e4
-62 1 17 24 0.16384000000000000000e5
-62 2 5 19 0.81920000000000000000e4
-62 3 7 20 -0.81920000000000000000e4
-62 3 8 21 -0.81920000000000000000e4
-62 3 13 26 -0.16384000000000000000e5
-62 4 8 12 -0.81920000000000000000e4
-63 1 3 34 -0.24576000000000000000e5
-63 1 9 24 0.32768000000000000000e5
-63 1 13 28 0.32768000000000000000e5
-63 1 20 35 0.24576000000000000000e5
-63 1 25 32 -0.32768000000000000000e5
-63 1 31 34 -0.32768000000000000000e5
-63 2 6 20 -0.81920000000000000000e4
-63 2 14 20 0.81920000000000000000e4
-63 3 2 31 -0.16384000000000000000e5
-63 3 4 25 -0.65536000000000000000e5
-63 3 6 35 0.24576000000000000000e5
-63 3 14 27 -0.65536000000000000000e5
-63 3 16 29 -0.81920000000000000000e4
-63 3 17 30 -0.24576000000000000000e5
-63 3 18 23 -0.16384000000000000000e5
-63 3 18 31 -0.16384000000000000000e5
-63 3 21 34 -0.16384000000000000000e5
-63 3 22 27 -0.16384000000000000000e5
-63 3 26 31 -0.16384000000000000000e5
-63 4 8 20 -0.16384000000000000000e5
-63 4 12 16 -0.16384000000000000000e5
-63 4 14 18 -0.16384000000000000000e5
-63 4 15 19 -0.16384000000000000000e5
-63 4 16 20 -0.16384000000000000000e5
-64 1 3 34 0.16384000000000000000e5
-64 1 12 19 0.16384000000000000000e5
-64 1 12 27 0.16384000000000000000e5
-64 1 13 28 -0.65536000000000000000e5
-64 1 20 35 -0.16384000000000000000e5
-64 1 25 32 0.32768000000000000000e5
-64 2 6 20 0.81920000000000000000e4
-64 2 14 20 -0.81920000000000000000e4
-64 3 2 31 0.16384000000000000000e5
-64 3 4 25 -0.32768000000000000000e5
-64 3 6 35 -0.16384000000000000000e5
-64 3 8 21 0.16384000000000000000e5
-64 3 9 22 0.16384000000000000000e5
-64 3 13 18 -0.32768000000000000000e5
-64 3 16 29 0.81920000000000000000e4
-64 3 17 30 0.16384000000000000000e5
-64 3 18 23 0.16384000000000000000e5
-64 3 18 31 0.16384000000000000000e5
-64 3 22 27 0.81920000000000000000e4
-64 4 4 16 0.16384000000000000000e5
-64 4 8 20 0.16384000000000000000e5
-64 4 12 16 0.16384000000000000000e5
-64 4 14 18 0.81920000000000000000e4
-65 1 8 23 -0.32768000000000000000e5
-65 1 12 27 0.16384000000000000000e5
-65 1 17 24 0.16384000000000000000e5
-65 3 18 23 -0.16384000000000000000e5
-66 1 6 21 -0.16384000000000000000e5
-66 1 7 22 -0.16384000000000000000e5
-66 1 17 24 0.16384000000000000000e5
-66 2 2 16 -0.16384000000000000000e5
-66 3 2 31 -0.16384000000000000000e5
-66 3 7 20 -0.16384000000000000000e5
-67 1 6 21 0.16384000000000000000e5
-67 1 7 22 0.16384000000000000000e5
-67 1 8 23 0.32768000000000000000e5
-67 1 11 26 0.16384000000000000000e5
-67 1 13 20 -0.65536000000000000000e5
-67 1 16 23 0.16384000000000000000e5
-67 1 16 31 0.16384000000000000000e5
-67 2 2 16 0.16384000000000000000e5
-67 2 8 14 0.32768000000000000000e5
-67 3 7 20 0.16384000000000000000e5
-68 1 3 34 -0.16384000000000000000e5
-68 1 12 27 -0.32768000000000000000e5
-68 1 17 24 0.32768000000000000000e5
-68 1 19 34 0.16384000000000000000e5
-68 1 20 27 -0.16384000000000000000e5
-68 2 6 20 -0.16384000000000000000e5
-68 3 2 31 -0.32768000000000000000e5
-68 3 8 21 -0.32768000000000000000e5
-68 3 17 22 0.16384000000000000000e5
-68 3 22 27 0.16384000000000000000e5
-69 1 3 34 -0.16384000000000000000e5
-69 1 5 20 0.16384000000000000000e5
-69 1 7 22 -0.32768000000000000000e5
-69 1 17 24 0.32768000000000000000e5
-69 1 20 27 -0.16384000000000000000e5
-69 2 6 20 -0.16384000000000000000e5
-69 3 2 31 -0.32768000000000000000e5
-69 3 6 19 -0.16384000000000000000e5
-70 1 3 34 0.16384000000000000000e5
-70 1 11 26 -0.32768000000000000000e5
-70 1 20 27 0.16384000000000000000e5
-70 3 1 30 0.16384000000000000000e5
-70 3 7 20 -0.32768000000000000000e5
-71 1 5 20 -0.16384000000000000000e5
-71 1 6 21 -0.32768000000000000000e5
-71 1 11 26 0.32768000000000000000e5
-71 2 6 12 -0.16384000000000000000e5
-71 3 1 30 -0.16384000000000000000e5
-71 3 6 19 0.16384000000000000000e5
-71 4 2 14 0.16384000000000000000e5
-72 1 1 8 0.32768000000000000000e5
-72 1 2 9 0.16384000000000000000e5
-72 1 3 34 -0.16384000000000000000e5
-72 1 4 11 -0.65536000000000000000e5
-72 1 5 12 -0.32768000000000000000e5
-72 1 5 20 -0.16384000000000000000e5
-72 1 6 21 -0.32768000000000000000e5
-72 1 7 10 -0.65536000000000000000e5
-72 1 7 22 0.32768000000000000000e5
-72 1 8 23 0.65536000000000000000e5
-72 1 9 16 -0.16384000000000000000e5
-72 1 11 26 0.32768000000000000000e5
-72 1 12 19 0.32768000000000000000e5
-72 1 12 27 -0.32768000000000000000e5
-72 1 16 23 0.32768000000000000000e5
-72 1 16 31 0.32768000000000000000e5
-72 1 20 27 -0.16384000000000000000e5
-72 2 1 7 0.16384000000000000000e5
-72 2 1 15 0.16384000000000000000e5
-72 2 1 19 -0.16384000000000000000e5
-72 2 2 8 0.32768000000000000000e5
-72 2 3 9 -0.32768000000000000000e5
-72 2 6 12 -0.32768000000000000000e5
-72 3 1 6 0.16384000000000000000e5
-72 3 1 14 -0.65536000000000000000e5
-72 3 2 7 0.32768000000000000000e5
-72 3 2 15 0.13107200000000000000e6
-72 3 5 10 -0.65536000000000000000e5
-72 3 6 19 -0.16384000000000000000e5
-72 3 7 20 0.65536000000000000000e5
-72 3 8 21 -0.32768000000000000000e5
-72 4 1 5 0.16384000000000000000e5
-72 4 4 8 -0.32768000000000000000e5
-72 4 5 9 -0.65536000000000000000e5
-72 4 5 17 0.16384000000000000000e5
-73 1 3 34 -0.65536000000000000000e5
-73 1 4 27 -0.16384000000000000000e5
-73 1 4 35 -0.32768000000000000000e5
-73 1 5 20 0.32768000000000000000e5
-73 1 7 22 0.65536000000000000000e5
-73 1 9 16 -0.32768000000000000000e5
-73 1 28 35 -0.16384000000000000000e5
-73 1 32 35 0.16384000000000000000e5
-73 1 33 34 0.32768000000000000000e5
-73 1 34 35 -0.32768000000000000000e5
-73 2 4 18 -0.16384000000000000000e5
-73 2 6 20 -0.32768000000000000000e5
-73 3 1 30 0.32768000000000000000e5
-73 3 2 31 -0.65536000000000000000e5
-73 3 3 32 0.32768000000000000000e5
-73 3 4 33 0.16384000000000000000e5
-73 3 5 26 -0.16384000000000000000e5
-73 3 6 19 -0.32768000000000000000e5
-73 3 8 21 -0.65536000000000000000e5
-73 3 17 22 0.65536000000000000000e5
-73 3 17 30 -0.65536000000000000000e5
-73 3 18 23 -0.65536000000000000000e5
-73 3 19 32 -0.16384000000000000000e5
-73 3 27 32 0.16384000000000000000e5
-73 3 28 33 0.16384000000000000000e5
-73 3 32 33 -0.16384000000000000000e5
-73 4 3 15 0.32768000000000000000e5
-73 4 4 20 -0.16384000000000000000e5
-73 4 6 18 0.32768000000000000000e5
-73 4 7 11 -0.32768000000000000000e5
-73 4 13 17 0.32768000000000000000e5
-73 4 18 18 -0.32768000000000000000e5
-73 4 20 20 -0.32768000000000000000e5
-74 1 4 27 -0.16384000000000000000e5
-74 1 7 22 -0.65536000000000000000e5
-74 1 9 16 0.32768000000000000000e5
-74 1 17 24 0.65536000000000000000e5
-74 1 20 27 -0.32768000000000000000e5
-74 2 4 18 -0.16384000000000000000e5
-74 3 1 30 -0.32768000000000000000e5
-74 3 6 19 0.32768000000000000000e5
-74 3 18 19 -0.16384000000000000000e5
-74 4 7 11 0.32768000000000000000e5
-75 1 4 27 0.16384000000000000000e5
-75 1 4 35 0.16384000000000000000e5
-75 1 5 20 -0.32768000000000000000e5
-75 3 3 32 -0.16384000000000000000e5
-75 3 4 33 -0.16384000000000000000e5
-75 3 17 30 0.32768000000000000000e5
-75 4 13 17 -0.16384000000000000000e5
-76 1 2 33 -0.16384000000000000000e5
-76 1 3 18 0.16384000000000000000e5
-76 1 3 34 0.32768000000000000000e5
-76 1 4 35 -0.16384000000000000000e5
-76 1 9 16 -0.65536000000000000000e5
-76 1 20 27 0.32768000000000000000e5
-76 2 12 18 -0.16384000000000000000e5
-76 3 1 30 0.32768000000000000000e5
-76 3 3 16 0.16384000000000000000e5
-76 3 3 32 0.16384000000000000000e5
-76 3 4 17 0.16384000000000000000e5
-76 3 4 33 0.16384000000000000000e5
-76 3 17 30 -0.32768000000000000000e5
-76 4 1 13 0.16384000000000000000e5
-76 4 13 17 0.16384000000000000000e5
-77 1 2 33 0.16384000000000000000e5
-77 1 3 18 -0.16384000000000000000e5
-77 1 4 27 -0.16384000000000000000e5
-77 1 5 20 0.32768000000000000000e5
-77 1 9 16 0.65536000000000000000e5
-77 1 11 26 -0.65536000000000000000e5
-77 2 3 17 -0.16384000000000000000e5
-77 2 6 12 0.32768000000000000000e5
-77 3 3 16 -0.16384000000000000000e5
-77 3 4 17 -0.16384000000000000000e5
-77 3 7 20 -0.65536000000000000000e5
-77 4 1 13 -0.16384000000000000000e5
-78 1 1 32 -0.16384000000000000000e5
-78 1 2 33 -0.16384000000000000000e5
-78 1 3 34 -0.32768000000000000000e5
-78 1 4 27 0.16384000000000000000e5
-78 1 5 20 -0.65536000000000000000e5
-78 1 6 21 -0.65536000000000000000e5
-78 1 11 26 0.13107200000000000000e6
-78 1 16 31 0.65536000000000000000e5
-78 1 20 27 -0.98304000000000000000e5
-78 2 1 15 0.32768000000000000000e5
-78 2 3 17 0.16384000000000000000e5
-78 2 6 12 -0.98304000000000000000e5
-78 2 11 17 -0.32768000000000000000e5
-78 3 1 30 -0.65536000000000000000e5
-78 3 6 19 0.32768000000000000000e5
-78 3 7 20 0.65536000000000000000e5
-78 4 2 14 0.65536000000000000000e5
-78 4 5 17 0.32768000000000000000e5
-78 4 11 11 -0.32768000000000000000e5
-79 1 1 8 0.65536000000000000000e5
-79 1 1 32 0.16384000000000000000e5
-79 1 2 9 0.32768000000000000000e5
-79 1 3 18 0.16384000000000000000e5
-79 1 4 11 -0.13107200000000000000e6
-79 1 5 12 -0.65536000000000000000e5
-79 1 7 10 -0.13107200000000000000e6
-79 1 7 22 0.65536000000000000000e5
-79 1 8 23 0.13107200000000000000e6
-79 1 9 16 -0.98304000000000000000e5
-79 1 12 19 0.65536000000000000000e5
-79 1 12 27 -0.65536000000000000000e5
-79 1 16 23 0.65536000000000000000e5
-79 1 20 27 0.65536000000000000000e5
-79 2 1 7 0.32768000000000000000e5
-79 2 1 19 -0.32768000000000000000e5
-79 2 2 8 0.65536000000000000000e5
-79 2 3 9 -0.65536000000000000000e5
-79 2 5 11 0.32768000000000000000e5
-79 2 11 11 -0.32768000000000000000e5
-79 2 11 17 0.16384000000000000000e5
-79 3 1 6 0.32768000000000000000e5
-79 3 1 14 -0.13107200000000000000e6
-79 3 1 30 0.65536000000000000000e5
-79 3 2 7 0.65536000000000000000e5
-79 3 2 15 0.26214400000000000000e6
-79 3 3 16 0.16384000000000000000e5
-79 3 4 17 0.16384000000000000000e5
-79 3 5 10 -0.13107200000000000000e6
-79 3 6 19 -0.65536000000000000000e5
-79 3 7 20 0.13107200000000000000e6
-79 3 8 21 -0.65536000000000000000e5
-79 4 1 5 0.32768000000000000000e5
-79 4 1 13 0.16384000000000000000e5
-79 4 2 14 -0.65536000000000000000e5
-79 4 4 8 -0.65536000000000000000e5
-79 4 5 9 -0.13107200000000000000e6
-79 4 11 11 0.32768000000000000000e5
-80 1 4 11 0.10240000000000000000e4
-80 1 5 12 0.10240000000000000000e4
-80 1 6 21 -0.10240000000000000000e4
-80 1 7 10 -0.20480000000000000000e4
-80 1 7 22 -0.20480000000000000000e4
-80 1 8 15 -0.81920000000000000000e4
-80 1 8 23 -0.20480000000000000000e4
-80 1 10 13 -0.81920000000000000000e4
-80 1 10 25 -0.81920000000000000000e4
-80 1 11 26 -0.10240000000000000000e4
-80 1 12 19 -0.10240000000000000000e4
-80 1 13 20 0.40960000000000000000e4
-80 1 14 21 -0.40960000000000000000e4
-80 1 14 29 0.40960000000000000000e4
-80 1 15 22 -0.81920000000000000000e4
-80 1 15 30 0.81920000000000000000e4
-80 2 2 16 -0.10240000000000000000e4
-80 2 6 8 -0.20480000000000000000e4
-80 2 8 10 -0.81920000000000000000e4
-80 2 10 10 -0.32768000000000000000e5
-80 3 2 15 -0.81920000000000000000e4
-80 3 5 10 0.10240000000000000000e4
-80 3 7 20 -0.10240000000000000000e4
-80 3 8 13 -0.40960000000000000000e4
-80 3 10 15 -0.16384000000000000000e5
-80 3 10 23 -0.40960000000000000000e4
-80 3 11 24 -0.40960000000000000000e4
-80 3 12 25 -0.81920000000000000000e4
-80 3 13 14 -0.16384000000000000000e5
-80 4 4 8 0.10240000000000000000e4
-80 4 5 9 0.20480000000000000000e4
-80 4 8 8 -0.81920000000000000000e4
-80 4 10 14 -0.40960000000000000000e4
-80 4 10 16 -0.81920000000000000000e4
-81 1 10 25 -0.16384000000000000000e5
-81 1 15 22 -0.16384000000000000000e5
-81 1 15 30 0.16384000000000000000e5
-81 2 10 16 -0.16384000000000000000e5
-81 3 10 15 -0.32768000000000000000e5
-82 1 4 11 0.20480000000000000000e4
-82 1 5 12 0.20480000000000000000e4
-82 1 6 21 -0.20480000000000000000e4
-82 1 7 10 -0.40960000000000000000e4
-82 1 7 22 -0.40960000000000000000e4
-82 1 8 23 -0.40960000000000000000e4
-82 1 10 13 -0.16384000000000000000e5
-82 1 11 26 -0.20480000000000000000e4
-82 1 12 19 -0.20480000000000000000e4
-82 1 13 20 0.81920000000000000000e4
-82 1 14 21 -0.81920000000000000000e4
-82 1 14 29 0.81920000000000000000e4
-82 2 2 16 -0.20480000000000000000e4
-82 2 6 8 -0.40960000000000000000e4
-82 2 8 10 -0.16384000000000000000e5
-82 3 2 15 -0.24576000000000000000e5
-82 3 5 10 0.20480000000000000000e4
-82 3 7 20 -0.20480000000000000000e4
-82 3 8 13 -0.16384000000000000000e5
-82 3 10 23 -0.81920000000000000000e4
-82 3 11 12 -0.81920000000000000000e4
-82 3 11 24 -0.81920000000000000000e4
-82 4 4 8 0.20480000000000000000e4
-82 4 5 9 0.40960000000000000000e4
-82 4 6 10 -0.81920000000000000000e4
-82 4 8 8 -0.16384000000000000000e5
-82 4 10 14 -0.81920000000000000000e4
-83 3 11 24 0.16384000000000000000e5
-83 3 12 13 -0.32768000000000000000e5
-83 3 15 28 0.16384000000000000000e5
-84 1 8 15 -0.32768000000000000000e5
-84 1 14 21 0.16384000000000000000e5
-84 1 22 25 0.16384000000000000000e5
-85 1 4 11 0.40960000000000000000e4
-85 1 5 12 0.40960000000000000000e4
-85 1 6 21 -0.40960000000000000000e4
-85 1 7 10 -0.81920000000000000000e4
-85 1 7 14 0.16384000000000000000e5
-85 1 7 22 -0.81920000000000000000e4
-85 1 8 23 -0.81920000000000000000e4
-85 1 10 25 -0.32768000000000000000e5
-85 1 11 26 -0.40960000000000000000e4
-85 1 12 19 -0.40960000000000000000e4
-85 1 13 20 0.16384000000000000000e5
-85 1 14 29 0.16384000000000000000e5
-85 2 2 16 -0.40960000000000000000e4
-85 2 6 8 -0.81920000000000000000e4
-85 3 2 15 -0.49152000000000000000e5
-85 3 5 10 0.40960000000000000000e4
-85 3 7 20 -0.40960000000000000000e4
-85 3 8 13 -0.16384000000000000000e5
-85 4 4 8 0.40960000000000000000e4
-85 4 5 9 0.81920000000000000000e4
-85 4 8 8 -0.32768000000000000000e5
-86 1 7 14 0.16384000000000000000e5
-86 1 10 13 -0.32768000000000000000e5
-86 1 13 20 0.16384000000000000000e5
-86 3 2 15 -0.16384000000000000000e5
-86 3 10 23 -0.16384000000000000000e5
-87 1 3 34 0.81920000000000000000e4
-87 1 13 28 -0.16384000000000000000e5
-87 1 20 35 -0.81920000000000000000e4
-87 1 25 32 0.16384000000000000000e5
-87 2 6 20 0.40960000000000000000e4
-87 2 14 20 -0.40960000000000000000e4
-87 3 4 25 0.16384000000000000000e5
-87 3 6 35 -0.81920000000000000000e4
-87 3 11 12 -0.32768000000000000000e5
-87 3 11 24 -0.32768000000000000000e5
-87 3 14 35 0.16384000000000000000e5
-87 3 16 29 0.40960000000000000000e4
-87 3 17 30 0.81920000000000000000e4
-87 3 18 31 0.81920000000000000000e4
-87 3 22 27 0.40960000000000000000e4
-87 3 22 31 0.16384000000000000000e5
-87 3 24 29 0.16384000000000000000e5
-87 4 8 20 0.81920000000000000000e4
-87 4 10 18 -0.16384000000000000000e5
-87 4 14 18 0.40960000000000000000e4
-88 1 9 24 0.16384000000000000000e5
-88 1 13 28 0.16384000000000000000e5
-88 1 14 21 -0.32768000000000000000e5
-88 3 4 25 -0.16384000000000000000e5
-88 3 8 13 -0.32768000000000000000e5
-88 3 13 18 0.16384000000000000000e5
-89 1 7 14 -0.32768000000000000000e5
-89 1 8 23 0.16384000000000000000e5
-89 1 13 28 0.16384000000000000000e5
-90 1 4 11 0.81920000000000000000e4
-90 1 5 12 0.81920000000000000000e4
-90 1 7 10 -0.16384000000000000000e5
-90 1 7 22 -0.16384000000000000000e5
-90 1 12 19 -0.81920000000000000000e4
-90 1 17 24 0.81920000000000000000e4
-90 2 6 8 -0.16384000000000000000e5
-90 3 2 15 -0.32768000000000000000e5
-90 3 5 10 0.81920000000000000000e4
-90 3 7 20 -0.81920000000000000000e4
-90 3 8 21 -0.81920000000000000000e4
-90 4 4 8 0.81920000000000000000e4
-90 4 5 9 0.16384000000000000000e5
-90 4 8 12 -0.81920000000000000000e4
-91 1 6 13 -0.32768000000000000000e5
-91 1 6 21 -0.81920000000000000000e4
-91 1 7 22 -0.81920000000000000000e4
-91 1 8 23 -0.16384000000000000000e5
-91 1 13 20 0.32768000000000000000e5
-91 1 16 23 0.81920000000000000000e4
-91 1 17 24 0.81920000000000000000e4
-91 2 2 16 -0.81920000000000000000e4
-91 2 5 19 0.81920000000000000000e4
-91 2 8 14 -0.16384000000000000000e5
-91 3 7 20 -0.81920000000000000000e4
-92 1 3 34 -0.81920000000000000000e4
-92 1 8 23 0.32768000000000000000e5
-92 1 9 24 0.65536000000000000000e5
-92 1 13 28 0.32768000000000000000e5
-92 1 14 21 -0.65536000000000000000e5
-92 1 20 35 0.81920000000000000000e4
-92 1 31 34 -0.32768000000000000000e5
-92 2 4 10 0.32768000000000000000e5
-92 3 1 14 -0.32768000000000000000e5
-92 3 2 15 0.65536000000000000000e5
-92 3 4 25 -0.32768000000000000000e5
-92 3 6 35 0.81920000000000000000e4
-92 3 8 13 -0.65536000000000000000e5
-92 3 8 21 -0.16384000000000000000e5
-92 3 9 22 -0.16384000000000000000e5
-92 3 13 18 0.32768000000000000000e5
-92 3 14 27 -0.32768000000000000000e5
-92 3 17 30 -0.81920000000000000000e4
-92 3 18 23 -0.16384000000000000000e5
-92 3 21 34 -0.16384000000000000000e5
-92 3 22 27 -0.81920000000000000000e4
-92 3 26 31 -0.16384000000000000000e5
-92 4 4 16 -0.16384000000000000000e5
-92 4 5 9 -0.32768000000000000000e5
-92 4 7 19 -0.16384000000000000000e5
-92 4 14 18 -0.81920000000000000000e4
-92 4 15 19 -0.16384000000000000000e5
-92 4 16 20 -0.16384000000000000000e5
-93 1 4 11 -0.16384000000000000000e5
-93 1 5 12 -0.16384000000000000000e5
-93 1 7 22 0.16384000000000000000e5
-93 1 12 19 0.32768000000000000000e5
-93 1 12 27 0.16384000000000000000e5
-93 1 13 28 -0.32768000000000000000e5
-93 3 4 25 -0.32768000000000000000e5
-93 3 5 10 -0.16384000000000000000e5
-93 3 8 21 0.32768000000000000000e5
-93 3 9 22 0.16384000000000000000e5
-93 3 13 18 -0.32768000000000000000e5
-93 4 4 8 -0.16384000000000000000e5
-93 4 4 16 0.16384000000000000000e5
-94 1 4 11 0.16384000000000000000e5
-94 1 5 12 0.16384000000000000000e5
-94 1 8 23 -0.32768000000000000000e5
-94 1 12 19 -0.16384000000000000000e5
-94 1 12 27 0.16384000000000000000e5
-94 3 1 14 0.32768000000000000000e5
-94 3 2 15 -0.65536000000000000000e5
-94 3 5 10 0.16384000000000000000e5
-94 4 4 8 0.16384000000000000000e5
-94 4 5 9 0.32768000000000000000e5
-95 1 6 21 -0.16384000000000000000e5
-95 1 7 22 -0.16384000000000000000e5
-95 1 17 24 0.16384000000000000000e5
-95 2 2 16 -0.16384000000000000000e5
-95 3 1 14 -0.32768000000000000000e5
-96 1 6 21 0.16384000000000000000e5
-96 1 7 10 -0.32768000000000000000e5
-96 1 11 26 0.16384000000000000000e5
-97 1 1 8 -0.16384000000000000000e5
-97 1 1 10 -0.16384000000000000000e5
-97 1 2 9 -0.81920000000000000000e4
-97 1 5 20 0.16384000000000000000e5
-97 1 6 21 0.16384000000000000000e5
-97 1 9 16 0.81920000000000000000e4
-97 1 11 26 -0.32768000000000000000e5
-97 1 16 23 0.16384000000000000000e5
-97 2 1 7 -0.81920000000000000000e4
-97 2 1 15 -0.81920000000000000000e4
-97 2 5 5 -0.32768000000000000000e5
-97 2 6 12 0.16384000000000000000e5
-97 3 1 6 -0.81920000000000000000e4
-97 3 2 7 -0.16384000000000000000e5
-97 3 7 20 -0.32768000000000000000e5
-97 4 1 5 -0.81920000000000000000e4
-98 1 5 12 -0.32768000000000000000e5
-98 1 7 22 -0.32768000000000000000e5
-98 1 9 16 0.16384000000000000000e5
-98 1 12 19 0.32768000000000000000e5
-98 1 17 24 0.32768000000000000000e5
-98 1 20 27 -0.16384000000000000000e5
-98 3 1 30 -0.16384000000000000000e5
-98 3 5 30 0.16384000000000000000e5
-98 3 8 21 0.32768000000000000000e5
-98 4 3 15 -0.16384000000000000000e5
-98 4 7 11 0.16384000000000000000e5
-99 1 5 20 -0.16384000000000000000e5
-99 1 7 22 0.32768000000000000000e5
-99 1 9 16 -0.16384000000000000000e5
-99 1 12 27 -0.32768000000000000000e5
-99 1 19 34 0.16384000000000000000e5
-99 2 6 20 -0.16384000000000000000e5
-99 3 1 30 0.16384000000000000000e5
-99 3 2 31 -0.32768000000000000000e5
-99 3 5 10 -0.32768000000000000000e5
-99 3 8 21 -0.32768000000000000000e5
-99 3 18 23 0.32768000000000000000e5
-99 3 22 27 0.16384000000000000000e5
-99 4 6 18 -0.16384000000000000000e5
-99 4 7 11 -0.16384000000000000000e5
-100 1 3 34 -0.16384000000000000000e5
-100 1 4 11 -0.32768000000000000000e5
-100 1 5 20 0.16384000000000000000e5
-100 1 17 24 0.32768000000000000000e5
-100 1 20 27 -0.16384000000000000000e5
-100 2 6 20 -0.16384000000000000000e5
-100 3 2 31 -0.32768000000000000000e5
-100 3 17 22 0.16384000000000000000e5
-101 1 4 11 0.65536000000000000000e5
-101 1 5 12 0.32768000000000000000e5
-101 1 5 20 0.16384000000000000000e5
-101 1 7 22 -0.32768000000000000000e5
-101 1 8 23 -0.65536000000000000000e5
-101 1 9 16 0.16384000000000000000e5
-101 1 12 19 -0.32768000000000000000e5
-101 1 12 27 0.32768000000000000000e5
-101 2 3 9 0.32768000000000000000e5
-101 3 1 14 0.65536000000000000000e5
-101 3 2 15 -0.13107200000000000000e6
-101 3 5 10 0.65536000000000000000e5
-101 3 6 19 -0.16384000000000000000e5
-101 3 8 21 0.32768000000000000000e5
-101 4 4 8 0.32768000000000000000e5
-101 4 5 9 0.65536000000000000000e5
-102 1 1 8 -0.16384000000000000000e5
-102 1 2 9 -0.16384000000000000000e5
-102 1 20 27 0.16384000000000000000e5
-102 2 1 7 -0.16384000000000000000e5
-102 3 1 30 0.16384000000000000000e5
-102 3 2 7 -0.16384000000000000000e5
-103 1 1 8 0.16384000000000000000e5
-103 1 2 9 0.16384000000000000000e5
-103 1 4 11 -0.65536000000000000000e5
-103 1 5 12 -0.32768000000000000000e5
-103 1 5 20 -0.16384000000000000000e5
-103 1 6 21 0.32768000000000000000e5
-103 1 7 10 -0.65536000000000000000e5
-103 1 7 22 0.32768000000000000000e5
-103 1 8 23 0.65536000000000000000e5
-103 1 9 16 -0.16384000000000000000e5
-103 1 11 26 0.32768000000000000000e5
-103 1 12 19 0.32768000000000000000e5
-103 1 12 27 -0.32768000000000000000e5
-103 1 20 27 -0.16384000000000000000e5
-103 2 1 7 0.16384000000000000000e5
-103 2 1 15 -0.16384000000000000000e5
-103 2 2 8 0.32768000000000000000e5
-103 2 3 9 -0.32768000000000000000e5
-103 2 6 12 -0.16384000000000000000e5
-103 3 1 14 -0.65536000000000000000e5
-103 3 1 30 -0.16384000000000000000e5
-103 3 2 7 0.16384000000000000000e5
-103 3 2 15 0.13107200000000000000e6
-103 3 5 10 -0.65536000000000000000e5
-103 3 6 19 0.16384000000000000000e5
-103 3 8 21 -0.32768000000000000000e5
-103 4 2 14 0.16384000000000000000e5
-103 4 4 8 -0.32768000000000000000e5
-103 4 5 9 -0.65536000000000000000e5
-104 1 1 8 -0.32768000000000000000e5
-104 1 1 10 -0.32768000000000000000e5
-104 1 2 9 -0.16384000000000000000e5
-104 1 4 11 0.65536000000000000000e5
-104 1 5 12 0.32768000000000000000e5
-104 1 5 20 0.49152000000000000000e5
-104 1 7 10 0.65536000000000000000e5
-104 1 7 22 -0.32768000000000000000e5
-104 1 8 23 -0.65536000000000000000e5
-104 1 9 16 0.32768000000000000000e5
-104 1 11 26 -0.98304000000000000000e5
-104 1 12 19 -0.32768000000000000000e5
-104 1 12 27 0.32768000000000000000e5
-104 1 16 23 0.32768000000000000000e5
-104 2 1 7 -0.16384000000000000000e5
-104 2 1 19 -0.16384000000000000000e5
-104 2 2 8 -0.32768000000000000000e5
-104 2 3 9 0.32768000000000000000e5
-104 2 5 11 -0.16384000000000000000e5
-104 2 6 12 0.49152000000000000000e5
-104 3 1 6 -0.16384000000000000000e5
-104 3 1 14 0.65536000000000000000e5
-104 3 2 7 -0.32768000000000000000e5
-104 3 2 15 -0.13107200000000000000e6
-104 3 5 10 0.65536000000000000000e5
-104 3 6 19 -0.16384000000000000000e5
-104 3 7 20 -0.65536000000000000000e5
-104 3 8 21 0.32768000000000000000e5
-104 4 1 5 -0.16384000000000000000e5
-104 4 2 14 -0.16384000000000000000e5
-104 4 4 8 0.32768000000000000000e5
-104 4 5 9 0.65536000000000000000e5
-105 1 3 34 -0.32768000000000000000e5
-105 1 4 27 -0.16384000000000000000e5
-105 1 4 35 -0.32768000000000000000e5
-105 1 7 22 0.65536000000000000000e5
-105 1 9 16 -0.32768000000000000000e5
-105 1 28 35 -0.16384000000000000000e5
-105 1 32 35 0.16384000000000000000e5
-105 1 33 34 0.32768000000000000000e5
-105 1 34 35 -0.32768000000000000000e5
-105 2 4 18 -0.16384000000000000000e5
-105 2 6 20 -0.32768000000000000000e5
-105 3 1 30 0.32768000000000000000e5
-105 3 2 31 -0.65536000000000000000e5
-105 3 3 32 0.32768000000000000000e5
-105 3 4 9 -0.32768000000000000000e5
-105 3 4 33 0.16384000000000000000e5
-105 3 5 18 0.16384000000000000000e5
-105 3 5 26 -0.32768000000000000000e5
-105 3 8 21 -0.65536000000000000000e5
-105 3 17 22 0.32768000000000000000e5
-105 3 17 30 -0.65536000000000000000e5
-105 3 18 19 -0.16384000000000000000e5
-105 3 19 32 -0.16384000000000000000e5
-105 3 27 32 0.16384000000000000000e5
-105 3 28 33 0.16384000000000000000e5
-105 3 32 33 -0.16384000000000000000e5
-105 4 3 15 0.32768000000000000000e5
-105 4 4 20 -0.16384000000000000000e5
-105 4 7 11 -0.32768000000000000000e5
-105 4 13 13 -0.32768000000000000000e5
-105 4 13 17 0.32768000000000000000e5
-105 4 18 18 -0.32768000000000000000e5
-105 4 20 20 -0.32768000000000000000e5
-106 1 2 9 -0.32768000000000000000e5
-106 1 4 11 -0.13107200000000000000e6
-106 1 4 19 0.16384000000000000000e5
-106 1 4 27 -0.16384000000000000000e5
-106 1 4 35 -0.16384000000000000000e5
-106 1 5 12 -0.65536000000000000000e5
-106 1 8 23 0.13107200000000000000e6
-106 1 9 16 0.65536000000000000000e5
-106 1 11 26 -0.65536000000000000000e5
-106 1 12 19 0.65536000000000000000e5
-106 1 12 27 -0.65536000000000000000e5
-106 1 17 24 0.65536000000000000000e5
-106 1 20 27 -0.32768000000000000000e5
-106 2 3 9 -0.65536000000000000000e5
-106 2 4 18 -0.16384000000000000000e5
-106 3 1 14 -0.13107200000000000000e6
-106 3 1 30 -0.32768000000000000000e5
-106 3 2 7 -0.32768000000000000000e5
-106 3 2 15 0.26214400000000000000e6
-106 3 3 32 0.16384000000000000000e5
-106 3 4 9 0.32768000000000000000e5
-106 3 4 33 0.16384000000000000000e5
-106 3 5 10 -0.19660800000000000000e6
-106 3 5 26 -0.16384000000000000000e5
-106 3 6 19 0.32768000000000000000e5
-106 3 7 20 -0.65536000000000000000e5
-106 3 8 21 -0.65536000000000000000e5
-106 3 17 30 -0.32768000000000000000e5
-106 4 2 6 -0.32768000000000000000e5
-106 4 3 7 0.32768000000000000000e5
-106 4 4 8 -0.65536000000000000000e5
-106 4 5 9 -0.13107200000000000000e6
-106 4 7 11 0.32768000000000000000e5
-106 4 13 17 0.16384000000000000000e5
-107 1 2 9 0.32768000000000000000e5
-107 1 4 11 0.13107200000000000000e6
-107 1 4 27 0.16384000000000000000e5
-107 1 4 35 0.16384000000000000000e5
-107 1 5 12 0.65536000000000000000e5
-107 1 5 20 -0.32768000000000000000e5
-107 1 7 22 -0.65536000000000000000e5
-107 1 8 23 -0.13107200000000000000e6
-107 1 9 16 -0.32768000000000000000e5
-107 1 11 26 0.65536000000000000000e5
-107 1 12 19 -0.65536000000000000000e5
-107 1 12 27 0.65536000000000000000e5
-107 2 3 9 0.65536000000000000000e5
-107 3 1 14 0.13107200000000000000e6
-107 3 2 7 0.32768000000000000000e5
-107 3 2 15 -0.26214400000000000000e6
-107 3 3 32 -0.16384000000000000000e5
-107 3 4 17 0.16384000000000000000e5
-107 3 4 33 -0.16384000000000000000e5
-107 3 5 10 0.13107200000000000000e6
-107 3 5 26 0.16384000000000000000e5
-107 3 7 20 0.65536000000000000000e5
-107 3 8 21 0.65536000000000000000e5
-107 3 17 30 0.32768000000000000000e5
-107 4 2 6 0.32768000000000000000e5
-107 4 4 8 0.65536000000000000000e5
-107 4 5 9 0.13107200000000000000e6
-107 4 13 17 -0.16384000000000000000e5
-108 1 2 9 -0.32768000000000000000e5
-108 1 3 18 0.16384000000000000000e5
-108 1 4 27 0.16384000000000000000e5
-109 1 4 27 -0.16384000000000000000e5
-109 1 5 20 0.32768000000000000000e5
-109 1 9 16 0.32768000000000000000e5
-109 1 11 26 -0.65536000000000000000e5
-109 1 20 27 0.32768000000000000000e5
-109 2 3 17 -0.16384000000000000000e5
-109 2 6 12 0.32768000000000000000e5
-109 3 1 30 0.32768000000000000000e5
-109 3 2 7 -0.32768000000000000000e5
-109 3 3 16 0.16384000000000000000e5
-109 3 7 20 -0.65536000000000000000e5
-110 1 1 8 -0.32768000000000000000e5
-110 1 2 17 0.16384000000000000000e5
-110 1 3 18 -0.16384000000000000000e5
-110 1 4 27 -0.16384000000000000000e5
-110 1 9 16 0.32768000000000000000e5
-110 2 3 17 -0.16384000000000000000e5
-110 3 3 16 -0.16384000000000000000e5
-110 3 4 17 -0.16384000000000000000e5
-110 4 1 13 -0.16384000000000000000e5
-111 1 1 8 0.98304000000000000000e5
-111 1 2 5 0.16384000000000000000e5
-111 1 2 9 0.32768000000000000000e5
-111 1 2 17 -0.16384000000000000000e5
-111 1 4 11 -0.13107200000000000000e6
-111 1 4 27 0.32768000000000000000e5
-111 1 5 12 -0.65536000000000000000e5
-111 1 5 20 -0.98304000000000000000e5
-111 1 7 10 -0.13107200000000000000e6
-111 1 7 22 0.65536000000000000000e5
-111 1 8 23 0.13107200000000000000e6
-111 1 9 16 -0.98304000000000000000e5
-111 1 11 26 0.19660800000000000000e6
-111 1 12 19 0.65536000000000000000e5
-111 1 12 27 -0.65536000000000000000e5
-111 1 20 27 -0.65536000000000000000e5
-111 2 1 3 -0.16384000000000000000e5
-111 2 1 7 0.32768000000000000000e5
-111 2 2 8 0.65536000000000000000e5
-111 2 3 9 -0.65536000000000000000e5
-111 2 3 17 0.32768000000000000000e5
-111 2 5 11 0.32768000000000000000e5
-111 2 6 12 -0.98304000000000000000e5
-111 2 11 17 -0.16384000000000000000e5
-111 3 1 2 -0.16384000000000000000e5
-111 3 1 14 -0.13107200000000000000e6
-111 3 1 30 -0.65536000000000000000e5
-111 3 2 7 0.32768000000000000000e5
-111 3 2 15 0.26214400000000000000e6
-111 3 4 17 0.16384000000000000000e5
-111 3 5 10 -0.13107200000000000000e6
-111 3 6 19 0.32768000000000000000e5
-111 3 7 20 0.13107200000000000000e6
-111 3 8 21 -0.65536000000000000000e5
-111 4 1 5 0.32768000000000000000e5
-111 4 1 13 0.16384000000000000000e5
-111 4 2 2 0.32768000000000000000e5
-111 4 2 14 0.32768000000000000000e5
-111 4 4 8 -0.65536000000000000000e5
-111 4 5 9 -0.13107200000000000000e6
-111 4 11 11 -0.32768000000000000000e5
-112 1 1 6 -0.32768000000000000000e5
-112 1 1 16 0.16384000000000000000e5
-112 1 3 18 0.16384000000000000000e5
-112 1 5 20 0.65536000000000000000e5
-112 1 9 16 -0.32768000000000000000e5
-112 1 11 26 -0.13107200000000000000e6
-112 1 16 23 0.65536000000000000000e5
-112 1 20 27 0.65536000000000000000e5
-112 2 1 19 -0.32768000000000000000e5
-112 2 6 12 0.65536000000000000000e5
-112 2 11 11 -0.32768000000000000000e5
-112 2 11 17 0.16384000000000000000e5
-112 3 1 30 0.65536000000000000000e5
-112 3 3 16 0.16384000000000000000e5
-112 3 4 17 0.16384000000000000000e5
-112 3 6 19 -0.65536000000000000000e5
-112 4 1 13 0.16384000000000000000e5
-112 4 2 14 -0.65536000000000000000e5
-112 4 11 11 0.32768000000000000000e5
-113 1 1 1 0.32768000000000000000e5
-113 1 1 6 -0.32768000000000000000e5
-113 1 1 8 0.32768000000000000000e5
-113 1 1 16 0.16384000000000000000e5
-113 1 2 5 0.32768000000000000000e5
-113 1 2 17 -0.16384000000000000000e5
-113 1 3 18 -0.16384000000000000000e5
-113 1 4 27 0.16384000000000000000e5
-113 1 9 16 -0.32768000000000000000e5
-113 2 1 1 0.32768000000000000000e5
-113 2 1 3 -0.16384000000000000000e5
-113 2 3 17 0.16384000000000000000e5
-113 3 1 2 -0.16384000000000000000e5
-113 3 1 6 0.32768000000000000000e5
-113 3 2 3 0.16384000000000000000e5
-113 3 2 7 -0.65536000000000000000e5
-113 3 4 17 0.16384000000000000000e5
-113 4 1 1 -0.32768000000000000000e5
-113 4 1 13 0.16384000000000000000e5
-113 4 2 2 0.65536000000000000000e5
-114 1 1 2 0.32768000000000000000e5
-114 1 1 16 -0.32768000000000000000e5
-114 1 2 5 -0.32768000000000000000e5
-114 1 3 18 0.32768000000000000000e5
-114 3 1 2 0.32768000000000000000e5
-114 3 1 6 -0.65536000000000000000e5
-114 3 2 3 -0.32768000000000000000e5
-114 3 2 7 0.65536000000000000000e5
-114 4 1 1 0.65536000000000000000e5
-114 4 2 2 -0.65536000000000000000e5
-115 1 1 3 0.32768000000000000000e5
-115 1 1 8 -0.65536000000000000000e5
-115 1 2 5 -0.32768000000000000000e5
-115 1 2 17 0.32768000000000000000e5
-115 1 4 27 -0.32768000000000000000e5
-115 1 9 16 0.65536000000000000000e5
-115 2 1 3 0.32768000000000000000e5
-115 2 3 17 -0.32768000000000000000e5
-115 3 2 7 0.65536000000000000000e5
-115 3 4 17 -0.32768000000000000000e5
-115 4 1 13 -0.32768000000000000000e5
-115 4 2 2 -0.65536000000000000000e5
-116 1 1 4 0.32768000000000000000e5
-116 1 2 5 0.32768000000000000000e5
-116 1 2 17 -0.32768000000000000000e5
-116 1 3 18 -0.32768000000000000000e5
-116 3 2 3 0.32768000000000000000e5
-116 3 2 7 -0.65536000000000000000e5
-116 4 2 2 0.65536000000000000000e5
-117 1 1 5 0.32768000000000000000e5
-117 1 3 18 0.32768000000000000000e5
-117 1 4 27 0.32768000000000000000e5
-117 1 9 16 -0.65536000000000000000e5
-117 2 3 17 0.32768000000000000000e5
-117 3 2 3 -0.32768000000000000000e5
-117 3 4 17 0.32768000000000000000e5
-117 4 1 13 0.32768000000000000000e5
-118 1 1 7 0.32768000000000000000e5
-118 1 1 8 0.65536000000000000000e5
-118 1 2 9 0.32768000000000000000e5
-118 1 4 11 -0.13107200000000000000e6
-118 1 5 12 -0.65536000000000000000e5
-118 1 5 20 -0.65536000000000000000e5
-118 1 7 10 -0.13107200000000000000e6
-118 1 7 22 0.65536000000000000000e5
-118 1 8 23 0.13107200000000000000e6
-118 1 9 16 -0.65536000000000000000e5
-118 1 11 26 0.13107200000000000000e6
-118 1 12 19 0.65536000000000000000e5
-118 1 12 27 -0.65536000000000000000e5
-118 2 1 7 0.32768000000000000000e5
-118 2 2 8 0.65536000000000000000e5
-118 2 3 9 -0.65536000000000000000e5
-118 2 5 11 0.32768000000000000000e5
-118 2 6 12 -0.65536000000000000000e5
-118 3 1 14 -0.13107200000000000000e6
-118 3 2 7 0.65536000000000000000e5
-118 3 2 15 0.26214400000000000000e6
-118 3 5 10 -0.13107200000000000000e6
-118 3 7 20 0.13107200000000000000e6
-118 3 8 21 -0.65536000000000000000e5
-118 4 1 5 0.32768000000000000000e5
-118 4 4 8 -0.65536000000000000000e5
-118 4 5 9 -0.13107200000000000000e6
-119 1 1 9 0.32768000000000000000e5
-119 1 5 20 0.32768000000000000000e5
-119 1 9 16 0.32768000000000000000e5
-119 1 11 26 -0.65536000000000000000e5
-119 2 6 12 0.32768000000000000000e5
-119 3 2 7 -0.32768000000000000000e5
-119 3 7 20 -0.65536000000000000000e5
-120 1 1 8 0.16384000000000000000e5
-120 1 1 11 0.32768000000000000000e5
-120 1 2 9 0.16384000000000000000e5
-120 1 4 11 -0.65536000000000000000e5
-120 1 5 12 -0.32768000000000000000e5
-120 1 5 20 -0.16384000000000000000e5
-120 1 7 10 -0.65536000000000000000e5
-120 1 7 22 0.32768000000000000000e5
-120 1 8 23 0.65536000000000000000e5
-120 1 9 16 -0.16384000000000000000e5
-120 1 11 26 0.32768000000000000000e5
-120 1 12 19 0.32768000000000000000e5
-120 1 12 27 -0.32768000000000000000e5
-120 2 1 7 0.16384000000000000000e5
-120 2 2 8 0.32768000000000000000e5
-120 2 3 9 -0.32768000000000000000e5
-120 2 6 12 -0.16384000000000000000e5
-120 3 1 14 -0.65536000000000000000e5
-120 3 2 7 0.16384000000000000000e5
-120 3 2 15 0.13107200000000000000e6
-120 3 5 10 -0.65536000000000000000e5
-120 3 7 20 0.32768000000000000000e5
-120 3 8 21 -0.32768000000000000000e5
-120 4 4 8 -0.32768000000000000000e5
-120 4 5 9 -0.65536000000000000000e5
-121 1 1 8 -0.16384000000000000000e5
-121 1 1 12 0.32768000000000000000e5
-121 1 2 9 -0.16384000000000000000e5
-121 1 5 20 0.16384000000000000000e5
-121 1 9 16 0.16384000000000000000e5
-121 1 11 26 -0.32768000000000000000e5
-121 2 1 7 -0.16384000000000000000e5
-121 2 6 12 0.16384000000000000000e5
-121 3 2 7 -0.16384000000000000000e5
-121 3 7 20 -0.32768000000000000000e5
-122 1 1 10 -0.16384000000000000000e5
-122 1 1 13 0.32768000000000000000e5
-122 1 4 11 -0.32768000000000000000e5
-122 1 5 12 -0.16384000000000000000e5
-122 1 7 10 -0.32768000000000000000e5
-122 1 7 22 0.16384000000000000000e5
-122 1 8 23 0.32768000000000000000e5
-122 1 12 19 0.16384000000000000000e5
-122 1 12 27 -0.16384000000000000000e5
-122 2 2 8 0.16384000000000000000e5
-122 2 3 9 -0.16384000000000000000e5
-122 2 5 5 -0.32768000000000000000e5
-122 3 1 14 -0.32768000000000000000e5
-122 3 2 15 0.65536000000000000000e5
-122 3 5 10 -0.32768000000000000000e5
-122 3 8 21 -0.16384000000000000000e5
-122 4 4 8 -0.16384000000000000000e5
-122 4 5 9 -0.32768000000000000000e5
-123 1 1 14 0.32768000000000000000e5
-123 1 7 10 -0.32768000000000000000e5
-124 1 1 15 0.32768000000000000000e5
-124 1 6 13 -0.32768000000000000000e5
-125 1 1 8 -0.65536000000000000000e5
-125 1 1 17 0.32768000000000000000e5
-125 1 2 5 -0.32768000000000000000e5
-125 1 2 17 0.32768000000000000000e5
-125 1 4 27 -0.32768000000000000000e5
-125 1 9 16 0.65536000000000000000e5
-125 2 1 3 0.32768000000000000000e5
-125 2 3 17 -0.32768000000000000000e5
-125 3 1 2 0.32768000000000000000e5
-125 3 2 7 0.65536000000000000000e5
-125 3 4 17 -0.32768000000000000000e5
-125 4 1 13 -0.32768000000000000000e5
-125 4 2 2 -0.65536000000000000000e5
-126 1 1 18 0.32768000000000000000e5
-126 1 2 17 -0.32768000000000000000e5
-127 1 1 19 0.32768000000000000000e5
-127 1 3 18 0.32768000000000000000e5
-127 1 4 27 0.32768000000000000000e5
-127 1 9 16 -0.65536000000000000000e5
-127 2 3 17 0.32768000000000000000e5
-127 3 4 17 0.32768000000000000000e5
-127 4 1 13 0.32768000000000000000e5
-128 1 1 8 0.65536000000000000000e5
-128 1 1 20 0.32768000000000000000e5
-128 1 2 9 0.32768000000000000000e5
-128 1 4 11 -0.13107200000000000000e6
-128 1 5 12 -0.65536000000000000000e5
-128 1 5 20 -0.65536000000000000000e5
-128 1 7 10 -0.13107200000000000000e6
-128 1 7 22 0.65536000000000000000e5
-128 1 8 23 0.13107200000000000000e6
-128 1 9 16 -0.65536000000000000000e5
-128 1 11 26 0.13107200000000000000e6
-128 1 12 19 0.65536000000000000000e5
-128 1 12 27 -0.65536000000000000000e5
-128 2 1 7 0.32768000000000000000e5
-128 2 2 8 0.65536000000000000000e5
-128 2 3 9 -0.65536000000000000000e5
-128 2 5 11 0.32768000000000000000e5
-128 2 6 12 -0.65536000000000000000e5
-128 3 1 6 0.32768000000000000000e5
-128 3 1 14 -0.13107200000000000000e6
-128 3 2 7 0.65536000000000000000e5
-128 3 2 15 0.26214400000000000000e6
-128 3 5 10 -0.13107200000000000000e6
-128 3 7 20 0.13107200000000000000e6
-128 3 8 21 -0.65536000000000000000e5
-128 4 1 5 0.32768000000000000000e5
-128 4 4 8 -0.65536000000000000000e5
-128 4 5 9 -0.13107200000000000000e6
-129 1 1 21 0.32768000000000000000e5
-129 1 5 20 -0.32768000000000000000e5
-129 1 6 21 -0.65536000000000000000e5
-129 1 11 26 0.65536000000000000000e5
-129 2 1 15 0.32768000000000000000e5
-129 2 6 12 -0.32768000000000000000e5
-129 3 7 20 0.65536000000000000000e5
-130 1 1 22 0.32768000000000000000e5
-130 1 5 20 0.32768000000000000000e5
-130 1 9 16 0.32768000000000000000e5
-130 1 11 26 -0.65536000000000000000e5
-130 2 6 12 0.32768000000000000000e5
-130 3 7 20 -0.65536000000000000000e5
-131 1 1 8 0.32768000000000000000e5
-131 1 1 23 0.32768000000000000000e5
-131 1 2 9 0.16384000000000000000e5
-131 1 4 11 -0.65536000000000000000e5
-131 1 5 12 -0.32768000000000000000e5
-131 1 5 20 -0.32768000000000000000e5
-131 1 6 21 -0.32768000000000000000e5
-131 1 7 10 -0.65536000000000000000e5
-131 1 7 22 0.32768000000000000000e5
-131 1 8 23 0.65536000000000000000e5
-131 1 9 16 -0.16384000000000000000e5
-131 1 11 26 0.65536000000000000000e5
-131 1 12 19 0.32768000000000000000e5
-131 1 12 27 -0.32768000000000000000e5
-131 2 1 7 0.16384000000000000000e5
-131 2 1 15 0.16384000000000000000e5
-131 2 2 8 0.32768000000000000000e5
-131 2 3 9 -0.32768000000000000000e5
-131 2 6 12 -0.32768000000000000000e5
-131 3 1 6 0.16384000000000000000e5
-131 3 1 14 -0.65536000000000000000e5
-131 3 2 7 0.32768000000000000000e5
-131 3 2 15 0.13107200000000000000e6
-131 3 5 10 -0.65536000000000000000e5
-131 3 7 20 0.65536000000000000000e5
-131 3 8 21 -0.32768000000000000000e5
-131 4 1 5 0.16384000000000000000e5
-131 4 4 8 -0.32768000000000000000e5
-131 4 5 9 -0.65536000000000000000e5
-132 1 1 24 0.32768000000000000000e5
-132 1 6 21 -0.32768000000000000000e5
-133 1 1 25 0.32768000000000000000e5
-133 1 6 21 0.16384000000000000000e5
-133 1 7 22 0.16384000000000000000e5
-133 1 8 23 0.32768000000000000000e5
-133 1 11 26 0.16384000000000000000e5
-133 1 13 20 -0.65536000000000000000e5
-133 2 2 16 0.16384000000000000000e5
-133 2 8 14 0.32768000000000000000e5
-133 3 7 20 0.16384000000000000000e5
-134 1 1 26 0.32768000000000000000e5
-134 1 3 18 -0.32768000000000000000e5
-134 1 5 20 -0.13107200000000000000e6
-134 1 9 16 0.65536000000000000000e5
-134 1 11 26 0.26214400000000000000e6
-134 1 16 23 -0.13107200000000000000e6
-134 1 20 27 -0.13107200000000000000e6
-134 2 1 19 0.65536000000000000000e5
-134 2 6 12 -0.13107200000000000000e6
-134 2 11 11 0.65536000000000000000e5
-134 2 11 17 -0.32768000000000000000e5
-134 3 1 30 -0.13107200000000000000e6
-134 3 3 16 -0.32768000000000000000e5
-134 3 4 17 -0.32768000000000000000e5
-134 3 6 19 0.13107200000000000000e6
-134 4 1 13 -0.32768000000000000000e5
-134 4 2 14 0.13107200000000000000e6
-134 4 11 11 -0.65536000000000000000e5
-135 1 1 27 0.32768000000000000000e5
-135 1 4 27 -0.32768000000000000000e5
-135 1 5 20 0.65536000000000000000e5
-135 1 11 26 -0.13107200000000000000e6
-135 1 20 27 0.13107200000000000000e6
-135 2 3 17 -0.32768000000000000000e5
-135 2 6 12 0.65536000000000000000e5
-135 2 11 17 0.32768000000000000000e5
-135 3 1 30 0.13107200000000000000e6
-135 3 6 19 -0.65536000000000000000e5
-135 4 2 14 -0.65536000000000000000e5
-135 4 11 11 0.65536000000000000000e5
-136 1 1 28 0.32768000000000000000e5
-136 1 3 18 0.32768000000000000000e5
-136 1 4 27 0.32768000000000000000e5
-136 1 9 16 -0.65536000000000000000e5
-136 2 3 17 0.32768000000000000000e5
-136 3 3 16 0.32768000000000000000e5
-136 3 4 17 0.32768000000000000000e5
-136 4 1 13 0.32768000000000000000e5
-137 1 1 29 0.32768000000000000000e5
-137 1 5 20 -0.32768000000000000000e5
-137 1 11 26 0.65536000000000000000e5
-137 1 16 23 -0.65536000000000000000e5
-137 2 1 19 0.32768000000000000000e5
-137 2 6 12 -0.32768000000000000000e5
-137 3 6 19 0.32768000000000000000e5
-137 4 2 14 0.32768000000000000000e5
-138 1 1 30 0.32768000000000000000e5
-138 1 5 20 0.32768000000000000000e5
-138 1 11 26 -0.65536000000000000000e5
-138 1 20 27 0.32768000000000000000e5
-138 2 6 12 0.32768000000000000000e5
-138 3 1 30 0.32768000000000000000e5
-138 3 6 19 -0.32768000000000000000e5
-138 4 2 14 -0.32768000000000000000e5
-139 1 1 31 0.32768000000000000000e5
-139 1 16 23 -0.32768000000000000000e5
-140 1 1 32 0.32768000000000000000e5
-140 1 1 33 0.32768000000000000000e5
-140 1 2 33 0.32768000000000000000e5
-140 1 3 34 0.65536000000000000000e5
-140 1 16 31 -0.13107200000000000000e6
-140 1 20 27 0.65536000000000000000e5
-140 2 6 12 0.65536000000000000000e5
-140 2 11 17 0.32768000000000000000e5
-140 4 2 14 -0.65536000000000000000e5
-140 4 5 17 -0.65536000000000000000e5
-141 1 1 34 0.32768000000000000000e5
-141 1 3 34 0.32768000000000000000e5
-141 1 16 31 -0.65536000000000000000e5
-141 1 20 27 0.32768000000000000000e5
-141 2 6 12 0.32768000000000000000e5
-141 4 2 14 -0.32768000000000000000e5
-141 4 5 17 -0.32768000000000000000e5
-142 1 1 35 0.32768000000000000000e5
-142 1 2 33 -0.32768000000000000000e5
-142 1 3 34 0.65536000000000000000e5
-142 1 4 35 -0.32768000000000000000e5
-142 1 17 32 0.32768000000000000000e5
-142 1 20 27 -0.65536000000000000000e5
-142 2 12 18 -0.32768000000000000000e5
-142 2 17 17 0.65536000000000000000e5
-142 3 4 33 0.32768000000000000000e5
-142 3 16 29 0.65536000000000000000e5
-142 3 17 30 -0.65536000000000000000e5
-142 4 13 17 0.32768000000000000000e5
-143 1 1 8 -0.32768000000000000000e5
-143 1 2 2 0.32768000000000000000e5
-143 1 2 5 -0.16384000000000000000e5
-143 1 2 17 0.16384000000000000000e5
-143 1 4 27 -0.16384000000000000000e5
-143 1 9 16 0.32768000000000000000e5
-143 2 1 3 0.16384000000000000000e5
-143 2 3 17 -0.16384000000000000000e5
-143 3 2 7 0.32768000000000000000e5
-143 3 4 17 -0.16384000000000000000e5
-143 4 1 13 -0.16384000000000000000e5
-143 4 2 2 -0.32768000000000000000e5
-144 1 2 3 0.32768000000000000000e5
-144 1 2 5 0.32768000000000000000e5
-144 1 2 17 -0.32768000000000000000e5
-144 1 3 18 -0.32768000000000000000e5
-144 3 2 3 0.32768000000000000000e5
-144 3 2 7 -0.65536000000000000000e5
-144 4 2 2 0.65536000000000000000e5
-145 1 2 4 0.32768000000000000000e5
-145 1 3 18 0.32768000000000000000e5
-145 1 4 27 0.32768000000000000000e5
-145 1 9 16 -0.65536000000000000000e5
-145 2 3 17 0.32768000000000000000e5
-145 3 2 3 -0.32768000000000000000e5
-145 3 4 17 0.32768000000000000000e5
-145 4 1 13 0.32768000000000000000e5
-146 1 1 8 0.65536000000000000000e5
-146 1 2 6 0.32768000000000000000e5
-146 1 2 9 0.32768000000000000000e5
-146 1 4 11 -0.13107200000000000000e6
-146 1 5 12 -0.65536000000000000000e5
-146 1 5 20 -0.65536000000000000000e5
-146 1 7 10 -0.13107200000000000000e6
-146 1 7 22 0.65536000000000000000e5
-146 1 8 23 0.13107200000000000000e6
-146 1 9 16 -0.65536000000000000000e5
-146 1 11 26 0.13107200000000000000e6
-146 1 12 19 0.65536000000000000000e5
-146 1 12 27 -0.65536000000000000000e5
-146 2 1 7 0.32768000000000000000e5
-146 2 2 8 0.65536000000000000000e5
-146 2 3 9 -0.65536000000000000000e5
-146 2 5 11 0.32768000000000000000e5
-146 2 6 12 -0.65536000000000000000e5
-146 3 1 14 -0.13107200000000000000e6
-146 3 2 7 0.65536000000000000000e5
-146 3 2 15 0.26214400000000000000e6
-146 3 5 10 -0.13107200000000000000e6
-146 3 7 20 0.13107200000000000000e6
-146 3 8 21 -0.65536000000000000000e5
-146 4 1 5 0.32768000000000000000e5
-146 4 4 8 -0.65536000000000000000e5
-146 4 5 9 -0.13107200000000000000e6
-147 1 1 8 -0.32768000000000000000e5
-147 1 2 7 0.32768000000000000000e5
-148 1 2 8 0.32768000000000000000e5
-148 1 5 20 0.32768000000000000000e5
-148 1 9 16 0.32768000000000000000e5
-148 1 11 26 -0.65536000000000000000e5
-148 2 6 12 0.32768000000000000000e5
-148 3 2 7 -0.32768000000000000000e5
-148 3 7 20 -0.65536000000000000000e5
-149 1 1 8 0.16384000000000000000e5
-149 1 2 9 0.16384000000000000000e5
-149 1 2 10 0.32768000000000000000e5
-149 1 4 11 -0.65536000000000000000e5
-149 1 5 12 -0.32768000000000000000e5
-149 1 5 20 -0.16384000000000000000e5
-149 1 7 10 -0.65536000000000000000e5
-149 1 7 22 0.32768000000000000000e5
-149 1 8 23 0.65536000000000000000e5
-149 1 9 16 -0.16384000000000000000e5
-149 1 11 26 0.32768000000000000000e5
-149 1 12 19 0.32768000000000000000e5
-149 1 12 27 -0.32768000000000000000e5
-149 2 1 7 0.16384000000000000000e5
-149 2 2 8 0.32768000000000000000e5
-149 2 3 9 -0.32768000000000000000e5
-149 2 6 12 -0.16384000000000000000e5
-149 3 1 14 -0.65536000000000000000e5
-149 3 2 7 0.16384000000000000000e5
-149 3 2 15 0.13107200000000000000e6
-149 3 5 10 -0.65536000000000000000e5
-149 3 7 20 0.32768000000000000000e5
-149 3 8 21 -0.32768000000000000000e5
-149 4 4 8 -0.32768000000000000000e5
-149 4 5 9 -0.65536000000000000000e5
-150 1 1 8 -0.16384000000000000000e5
-150 1 2 9 -0.16384000000000000000e5
-150 1 2 11 0.32768000000000000000e5
-150 1 5 20 0.16384000000000000000e5
-150 1 9 16 0.16384000000000000000e5
-150 1 11 26 -0.32768000000000000000e5
-150 2 1 7 -0.16384000000000000000e5
-150 2 6 12 0.16384000000000000000e5
-150 3 2 7 -0.16384000000000000000e5
-150 3 7 20 -0.32768000000000000000e5
-151 1 2 12 0.32768000000000000000e5
-151 1 4 11 0.65536000000000000000e5
-151 1 5 12 0.32768000000000000000e5
-151 1 7 22 -0.32768000000000000000e5
-151 1 8 23 -0.65536000000000000000e5
-151 1 12 19 -0.32768000000000000000e5
-151 1 12 27 0.32768000000000000000e5
-151 2 3 9 0.32768000000000000000e5
-151 3 1 14 0.65536000000000000000e5
-151 3 2 15 -0.13107200000000000000e6
-151 3 5 10 0.65536000000000000000e5
-151 3 8 21 0.32768000000000000000e5
-151 4 4 8 0.32768000000000000000e5
-151 4 5 9 0.65536000000000000000e5
-152 1 2 13 0.32768000000000000000e5
-152 1 7 10 -0.32768000000000000000e5
-153 1 2 14 0.32768000000000000000e5
-153 1 6 21 -0.16384000000000000000e5
-153 1 7 22 -0.16384000000000000000e5
-153 1 11 26 -0.16384000000000000000e5
-153 2 2 16 -0.16384000000000000000e5
-153 3 1 14 -0.32768000000000000000e5
-153 3 7 20 -0.16384000000000000000e5
-154 1 2 15 0.32768000000000000000e5
-154 1 4 11 0.81920000000000000000e4
-154 1 5 12 0.81920000000000000000e4
-154 1 6 21 -0.81920000000000000000e4
-154 1 7 10 -0.16384000000000000000e5
-154 1 7 22 -0.16384000000000000000e5
-154 1 8 23 -0.16384000000000000000e5
-154 1 11 26 -0.81920000000000000000e4
-154 1 12 19 -0.81920000000000000000e4
-154 2 2 16 -0.81920000000000000000e4
-154 2 6 8 -0.16384000000000000000e5
-154 3 2 15 -0.32768000000000000000e5
-154 3 5 10 0.81920000000000000000e4
-154 3 7 20 -0.81920000000000000000e4
-154 4 4 8 0.81920000000000000000e4
-154 4 5 9 0.16384000000000000000e5
-155 1 1 8 -0.65536000000000000000e5
-155 1 2 5 -0.32768000000000000000e5
-155 1 2 16 0.32768000000000000000e5
-155 1 2 17 0.32768000000000000000e5
-155 1 4 27 -0.32768000000000000000e5
-155 1 9 16 0.65536000000000000000e5
-155 2 1 3 0.32768000000000000000e5
-155 2 3 17 -0.32768000000000000000e5
-155 3 1 2 0.32768000000000000000e5
-155 3 2 7 0.65536000000000000000e5
-155 3 4 17 -0.32768000000000000000e5
-155 4 1 13 -0.32768000000000000000e5
-155 4 2 2 -0.65536000000000000000e5
-156 1 2 18 0.32768000000000000000e5
-156 1 3 18 0.32768000000000000000e5
-156 1 4 27 0.32768000000000000000e5
-156 1 9 16 -0.65536000000000000000e5
-156 2 3 17 0.32768000000000000000e5
-156 3 4 17 0.32768000000000000000e5
-156 4 1 13 0.32768000000000000000e5
-157 1 2 19 0.32768000000000000000e5
-157 1 3 18 -0.32768000000000000000e5
-158 1 2 20 0.32768000000000000000e5
-158 1 5 20 -0.32768000000000000000e5
-158 1 6 21 -0.65536000000000000000e5
-158 1 11 26 0.65536000000000000000e5
-158 2 1 15 0.32768000000000000000e5
-158 2 6 12 -0.32768000000000000000e5
-158 3 7 20 0.65536000000000000000e5
-159 1 2 21 0.32768000000000000000e5
-159 1 5 20 0.32768000000000000000e5
-159 1 9 16 0.32768000000000000000e5
-159 1 11 26 -0.65536000000000000000e5
-159 2 6 12 0.32768000000000000000e5
-159 3 7 20 -0.65536000000000000000e5
-160 1 2 22 0.32768000000000000000e5
-160 1 9 16 -0.32768000000000000000e5
-161 1 2 23 0.32768000000000000000e5
-161 1 6 21 -0.32768000000000000000e5
-162 1 2 24 0.32768000000000000000e5
-162 1 11 26 -0.32768000000000000000e5
-162 3 7 20 -0.32768000000000000000e5
-163 1 2 25 0.32768000000000000000e5
-163 1 6 21 -0.16384000000000000000e5
-163 1 7 22 -0.16384000000000000000e5
-163 1 11 26 -0.16384000000000000000e5
-163 2 2 16 -0.16384000000000000000e5
-163 3 7 20 -0.16384000000000000000e5
-164 1 2 26 0.32768000000000000000e5
-164 1 4 27 -0.32768000000000000000e5
-164 1 5 20 0.65536000000000000000e5
-164 1 11 26 -0.13107200000000000000e6
-164 1 20 27 0.13107200000000000000e6
-164 2 3 17 -0.32768000000000000000e5
-164 2 6 12 0.65536000000000000000e5
-164 2 11 17 0.32768000000000000000e5
-164 3 1 30 0.13107200000000000000e6
-164 3 6 19 -0.65536000000000000000e5
-164 4 2 14 -0.65536000000000000000e5
-164 4 11 11 0.65536000000000000000e5
-165 1 2 27 0.32768000000000000000e5
-165 1 3 18 0.32768000000000000000e5
-165 1 4 27 0.32768000000000000000e5
-165 1 9 16 -0.65536000000000000000e5
-165 2 3 17 0.32768000000000000000e5
-165 3 3 16 0.32768000000000000000e5
-165 3 4 17 0.32768000000000000000e5
-165 4 1 13 0.32768000000000000000e5
-166 1 2 28 0.32768000000000000000e5
-166 1 3 18 -0.32768000000000000000e5
-166 1 9 16 0.65536000000000000000e5
-166 1 20 27 -0.65536000000000000000e5
-166 3 1 30 -0.65536000000000000000e5
-166 3 3 16 -0.32768000000000000000e5
-166 3 4 17 -0.32768000000000000000e5
-166 4 1 13 -0.32768000000000000000e5
-167 1 2 29 0.32768000000000000000e5
-167 1 5 20 0.32768000000000000000e5
-167 1 11 26 -0.65536000000000000000e5
-167 1 20 27 0.32768000000000000000e5
-167 2 6 12 0.32768000000000000000e5
-167 3 1 30 0.32768000000000000000e5
-167 3 6 19 -0.32768000000000000000e5
-167 4 2 14 -0.32768000000000000000e5
-168 1 2 30 0.32768000000000000000e5
-168 1 20 27 -0.32768000000000000000e5
-168 3 1 30 -0.32768000000000000000e5
-169 1 2 31 0.32768000000000000000e5
-169 1 11 26 -0.32768000000000000000e5
-170 1 1 32 0.32768000000000000000e5
-170 1 2 32 0.32768000000000000000e5
-170 1 2 33 0.32768000000000000000e5
-170 1 3 34 0.65536000000000000000e5
-170 1 16 31 -0.13107200000000000000e6
-170 1 20 27 0.65536000000000000000e5
-170 2 6 12 0.65536000000000000000e5
-170 2 11 17 0.32768000000000000000e5
-170 4 2 14 -0.65536000000000000000e5
-170 4 5 17 -0.65536000000000000000e5
-171 1 2 34 0.32768000000000000000e5
-171 1 20 27 -0.32768000000000000000e5
-172 1 2 35 0.32768000000000000000e5
-172 1 17 32 -0.32768000000000000000e5
-173 1 3 3 0.32768000000000000000e5
-173 1 3 18 0.16384000000000000000e5
-173 1 4 27 0.16384000000000000000e5
-173 1 9 16 -0.32768000000000000000e5
-173 2 3 17 0.16384000000000000000e5
-173 3 2 3 -0.16384000000000000000e5
-173 3 4 17 0.16384000000000000000e5
-173 4 1 13 0.16384000000000000000e5
-174 1 2 5 -0.32768000000000000000e5
-174 1 3 4 0.32768000000000000000e5
-175 1 2 5 0.32768000000000000000e5
-175 1 2 9 -0.65536000000000000000e5
-175 1 3 5 0.32768000000000000000e5
-175 1 3 18 -0.32768000000000000000e5
-175 1 4 27 -0.32768000000000000000e5
-175 1 9 16 0.65536000000000000000e5
-175 2 2 4 0.32768000000000000000e5
-175 2 3 17 -0.32768000000000000000e5
-175 3 2 3 0.32768000000000000000e5
-175 3 4 17 -0.32768000000000000000e5
-175 4 1 13 -0.32768000000000000000e5
-176 1 1 8 -0.32768000000000000000e5
-176 1 3 6 0.32768000000000000000e5
-177 1 3 7 0.32768000000000000000e5
-177 1 5 20 0.32768000000000000000e5
-177 1 9 16 0.32768000000000000000e5
-177 1 11 26 -0.65536000000000000000e5
-177 2 6 12 0.32768000000000000000e5
-177 3 2 7 -0.32768000000000000000e5
-177 3 7 20 -0.65536000000000000000e5
-178 1 2 9 -0.32768000000000000000e5
-178 1 3 8 0.32768000000000000000e5
-179 1 2 9 0.32768000000000000000e5
-179 1 3 9 0.32768000000000000000e5
-179 1 4 11 0.13107200000000000000e6
-179 1 5 12 0.65536000000000000000e5
-179 1 5 20 -0.32768000000000000000e5
-179 1 7 22 -0.65536000000000000000e5
-179 1 8 23 -0.13107200000000000000e6
-179 1 9 16 -0.32768000000000000000e5
-179 1 11 26 0.65536000000000000000e5
-179 1 12 19 -0.65536000000000000000e5
-179 1 12 27 0.65536000000000000000e5
-179 2 3 9 0.65536000000000000000e5
-179 3 1 14 0.13107200000000000000e6
-179 3 2 7 0.32768000000000000000e5
-179 3 2 15 -0.26214400000000000000e6
-179 3 5 10 0.13107200000000000000e6
-179 3 7 20 0.65536000000000000000e5
-179 3 8 21 0.65536000000000000000e5
-179 4 2 6 0.32768000000000000000e5
-179 4 4 8 0.65536000000000000000e5
-179 4 5 9 0.13107200000000000000e6
-180 1 1 8 -0.16384000000000000000e5
-180 1 2 9 -0.16384000000000000000e5
-180 1 3 10 0.32768000000000000000e5
-180 1 5 20 0.16384000000000000000e5
-180 1 9 16 0.16384000000000000000e5
-180 1 11 26 -0.32768000000000000000e5
-180 2 1 7 -0.16384000000000000000e5
-180 2 6 12 0.16384000000000000000e5
-180 3 2 7 -0.16384000000000000000e5
-180 3 7 20 -0.32768000000000000000e5
-181 1 3 11 0.32768000000000000000e5
-181 1 4 11 0.65536000000000000000e5
-181 1 5 12 0.32768000000000000000e5
-181 1 7 22 -0.32768000000000000000e5
-181 1 8 23 -0.65536000000000000000e5
-181 1 12 19 -0.32768000000000000000e5
-181 1 12 27 0.32768000000000000000e5
-181 2 3 9 0.32768000000000000000e5
-181 3 1 14 0.65536000000000000000e5
-181 3 2 15 -0.13107200000000000000e6
-181 3 5 10 0.65536000000000000000e5
-181 3 8 21 0.32768000000000000000e5
-181 4 4 8 0.32768000000000000000e5
-181 4 5 9 0.65536000000000000000e5
-182 1 3 12 0.32768000000000000000e5
-182 1 4 11 -0.32768000000000000000e5
-183 1 3 13 0.32768000000000000000e5
-183 1 6 21 -0.16384000000000000000e5
-183 1 7 22 -0.16384000000000000000e5
-183 1 11 26 -0.16384000000000000000e5
-183 2 2 16 -0.16384000000000000000e5
-183 3 1 14 -0.32768000000000000000e5
-183 3 7 20 -0.16384000000000000000e5
-184 1 3 14 0.32768000000000000000e5
-184 1 4 11 0.16384000000000000000e5
-184 1 5 12 0.16384000000000000000e5
-184 1 7 22 -0.16384000000000000000e5
-184 1 8 23 -0.32768000000000000000e5
-184 1 12 19 -0.16384000000000000000e5
-184 3 1 14 0.32768000000000000000e5
-184 3 2 15 -0.65536000000000000000e5
-184 3 5 10 0.16384000000000000000e5
-184 4 4 8 0.16384000000000000000e5
-184 4 5 9 0.32768000000000000000e5
-185 1 3 15 0.32768000000000000000e5
-185 1 7 14 -0.32768000000000000000e5
-186 1 2 17 -0.32768000000000000000e5
-186 1 3 16 0.32768000000000000000e5
-187 1 3 17 0.32768000000000000000e5
-187 1 3 18 0.32768000000000000000e5
-187 1 4 27 0.32768000000000000000e5
-187 1 9 16 -0.65536000000000000000e5
-187 2 3 17 0.32768000000000000000e5
-187 3 4 17 0.32768000000000000000e5
-187 4 1 13 0.32768000000000000000e5
-188 1 3 19 0.32768000000000000000e5
-188 1 4 27 -0.32768000000000000000e5
-188 3 4 17 -0.32768000000000000000e5
-189 1 3 20 0.32768000000000000000e5
-189 1 5 20 0.32768000000000000000e5
-189 1 9 16 0.32768000000000000000e5
-189 1 11 26 -0.65536000000000000000e5
-189 2 6 12 0.32768000000000000000e5
-189 3 7 20 -0.65536000000000000000e5
-190 1 3 21 0.32768000000000000000e5
-190 1 9 16 -0.32768000000000000000e5
-191 1 3 22 0.32768000000000000000e5
-191 1 5 20 -0.32768000000000000000e5
-192 1 3 23 0.32768000000000000000e5
-192 1 11 26 -0.32768000000000000000e5
-192 3 7 20 -0.32768000000000000000e5
-193 1 3 24 0.32768000000000000000e5
-193 1 7 22 -0.32768000000000000000e5
-194 1 3 25 0.32768000000000000000e5
-194 1 8 23 -0.32768000000000000000e5
-195 1 3 18 0.32768000000000000000e5
-195 1 3 26 0.32768000000000000000e5
-195 1 4 27 0.32768000000000000000e5
-195 1 9 16 -0.65536000000000000000e5
-195 2 3 17 0.32768000000000000000e5
-195 3 3 16 0.32768000000000000000e5
-195 3 4 17 0.32768000000000000000e5
-195 4 1 13 0.32768000000000000000e5
-196 1 3 18 -0.32768000000000000000e5
-196 1 3 27 0.32768000000000000000e5
-196 1 9 16 0.65536000000000000000e5
-196 1 20 27 -0.65536000000000000000e5
-196 3 1 30 -0.65536000000000000000e5
-196 3 3 16 -0.32768000000000000000e5
-196 3 4 17 -0.32768000000000000000e5
-196 4 1 13 -0.32768000000000000000e5
-197 1 3 28 0.32768000000000000000e5
-197 1 4 27 -0.32768000000000000000e5
-198 1 3 29 0.32768000000000000000e5
-198 1 20 27 -0.32768000000000000000e5
-198 3 1 30 -0.32768000000000000000e5
-199 1 3 30 0.32768000000000000000e5
-199 1 5 20 -0.32768000000000000000e5
-199 3 6 19 0.32768000000000000000e5
-200 1 3 31 0.32768000000000000000e5
-200 1 17 24 -0.32768000000000000000e5
-201 1 2 33 -0.32768000000000000000e5
-201 1 3 32 0.32768000000000000000e5
-202 1 2 33 0.32768000000000000000e5
-202 1 3 33 0.32768000000000000000e5
-202 1 3 34 -0.65536000000000000000e5
-202 1 4 35 0.32768000000000000000e5
-202 2 12 18 0.32768000000000000000e5
-202 3 3 32 -0.32768000000000000000e5
-202 3 4 33 -0.32768000000000000000e5
-202 3 17 30 0.65536000000000000000e5
-202 4 13 17 -0.32768000000000000000e5
-203 1 2 33 0.32768000000000000000e5
-203 1 3 34 -0.65536000000000000000e5
-203 1 3 35 0.32768000000000000000e5
-203 1 4 35 0.32768000000000000000e5
-203 2 12 18 0.32768000000000000000e5
-203 3 4 33 -0.32768000000000000000e5
-203 3 17 30 0.65536000000000000000e5
-203 4 13 17 -0.32768000000000000000e5
-204 1 2 5 0.16384000000000000000e5
-204 1 2 9 -0.32768000000000000000e5
-204 1 3 18 -0.16384000000000000000e5
-204 1 4 4 0.32768000000000000000e5
-204 1 4 27 -0.16384000000000000000e5
-204 1 9 16 0.32768000000000000000e5
-204 2 2 4 0.16384000000000000000e5
-204 2 3 17 -0.16384000000000000000e5
-204 3 2 3 0.16384000000000000000e5
-204 3 4 17 -0.16384000000000000000e5
-204 4 1 13 -0.16384000000000000000e5
-205 1 2 9 0.13107200000000000000e6
-205 1 4 5 0.32768000000000000000e5
-205 1 4 11 0.26214400000000000000e6
-205 1 4 19 -0.32768000000000000000e5
-205 1 5 12 0.13107200000000000000e6
-205 1 7 22 -0.13107200000000000000e6
-205 1 8 23 -0.26214400000000000000e6
-205 1 9 16 -0.13107200000000000000e6
-205 1 11 26 0.13107200000000000000e6
-205 1 12 19 -0.13107200000000000000e6
-205 1 12 27 0.13107200000000000000e6
-205 2 2 4 -0.32768000000000000000e5
-205 2 3 9 0.13107200000000000000e6
-205 2 3 17 0.32768000000000000000e5
-205 3 1 14 0.26214400000000000000e6
-205 3 2 3 -0.32768000000000000000e5
-205 3 2 7 0.65536000000000000000e5
-205 3 2 15 -0.52428800000000000000e6
-205 3 5 10 0.26214400000000000000e6
-205 3 7 20 0.13107200000000000000e6
-205 3 8 21 0.13107200000000000000e6
-205 4 1 13 0.32768000000000000000e5
-205 4 2 6 0.65536000000000000000e5
-205 4 3 3 0.65536000000000000000e5
-205 4 4 8 0.13107200000000000000e6
-205 4 5 9 0.26214400000000000000e6
-206 1 4 6 0.32768000000000000000e5
-206 1 5 20 0.32768000000000000000e5
-206 1 9 16 0.32768000000000000000e5
-206 1 11 26 -0.65536000000000000000e5
-206 2 6 12 0.32768000000000000000e5
-206 3 2 7 -0.32768000000000000000e5
-206 3 7 20 -0.65536000000000000000e5
-207 1 2 9 -0.32768000000000000000e5
-207 1 4 7 0.32768000000000000000e5
-208 1 2 9 0.32768000000000000000e5
-208 1 4 8 0.32768000000000000000e5
-208 1 4 11 0.13107200000000000000e6
-208 1 5 12 0.65536000000000000000e5
-208 1 5 20 -0.32768000000000000000e5
-208 1 7 22 -0.65536000000000000000e5
-208 1 8 23 -0.13107200000000000000e6
-208 1 9 16 -0.32768000000000000000e5
-208 1 11 26 0.65536000000000000000e5
-208 1 12 19 -0.65536000000000000000e5
-208 1 12 27 0.65536000000000000000e5
-208 2 3 9 0.65536000000000000000e5
-208 3 1 14 0.13107200000000000000e6
-208 3 2 7 0.32768000000000000000e5
-208 3 2 15 -0.26214400000000000000e6
-208 3 5 10 0.13107200000000000000e6
-208 3 7 20 0.65536000000000000000e5
-208 3 8 21 0.65536000000000000000e5
-208 4 2 6 0.32768000000000000000e5
-208 4 4 8 0.65536000000000000000e5
-208 4 5 9 0.13107200000000000000e6
-209 1 2 9 -0.32768000000000000000e5
-209 1 3 34 0.32768000000000000000e5
-209 1 4 9 0.32768000000000000000e5
-209 1 4 11 -0.13107200000000000000e6
-209 1 5 12 -0.65536000000000000000e5
-209 1 8 23 0.13107200000000000000e6
-209 1 9 16 0.65536000000000000000e5
-209 1 11 26 -0.65536000000000000000e5
-209 1 12 19 0.65536000000000000000e5
-209 1 12 27 -0.65536000000000000000e5
-209 2 3 9 -0.65536000000000000000e5
-209 2 6 20 0.32768000000000000000e5
-209 3 1 14 -0.13107200000000000000e6
-209 3 1 30 -0.32768000000000000000e5
-209 3 2 7 -0.32768000000000000000e5
-209 3 2 15 0.26214400000000000000e6
-209 3 2 31 0.65536000000000000000e5
-209 3 4 9 0.32768000000000000000e5
-209 3 5 10 -0.19660800000000000000e6
-209 3 6 19 0.32768000000000000000e5
-209 3 7 20 -0.65536000000000000000e5
-209 3 8 21 -0.65536000000000000000e5
-209 3 17 22 -0.32768000000000000000e5
-209 4 2 6 -0.32768000000000000000e5
-209 4 3 7 0.32768000000000000000e5
-209 4 4 8 -0.65536000000000000000e5
-209 4 5 9 -0.13107200000000000000e6
-209 4 7 11 0.32768000000000000000e5
-210 1 4 10 0.32768000000000000000e5
-210 1 4 11 0.65536000000000000000e5
-210 1 5 12 0.32768000000000000000e5
-210 1 7 22 -0.32768000000000000000e5
-210 1 8 23 -0.65536000000000000000e5
-210 1 12 19 -0.32768000000000000000e5
-210 1 12 27 0.32768000000000000000e5
-210 2 3 9 0.32768000000000000000e5
-210 3 1 14 0.65536000000000000000e5
-210 3 2 15 -0.13107200000000000000e6
-210 3 5 10 0.65536000000000000000e5
-210 3 8 21 0.32768000000000000000e5
-210 4 4 8 0.32768000000000000000e5
-210 4 5 9 0.65536000000000000000e5
-211 1 4 12 0.32768000000000000000e5
-211 1 12 27 -0.32768000000000000000e5
-211 3 5 10 -0.32768000000000000000e5
-211 3 8 21 -0.32768000000000000000e5
-212 1 4 11 0.16384000000000000000e5
-212 1 4 13 0.32768000000000000000e5
-212 1 5 12 0.16384000000000000000e5
-212 1 7 22 -0.16384000000000000000e5
-212 1 8 23 -0.32768000000000000000e5
-212 1 12 19 -0.16384000000000000000e5
-212 3 1 14 0.32768000000000000000e5
-212 3 2 15 -0.65536000000000000000e5
-212 3 5 10 0.16384000000000000000e5
-212 4 4 8 0.16384000000000000000e5
-212 4 5 9 0.32768000000000000000e5
-213 1 4 11 -0.16384000000000000000e5
-213 1 4 14 0.32768000000000000000e5
-213 1 5 12 -0.16384000000000000000e5
-213 1 7 22 0.16384000000000000000e5
-213 1 12 19 0.16384000000000000000e5
-213 1 13 28 -0.32768000000000000000e5
-213 3 5 10 -0.16384000000000000000e5
-213 3 13 18 -0.32768000000000000000e5
-213 4 4 8 -0.16384000000000000000e5
-214 1 4 15 0.32768000000000000000e5
-214 1 14 21 -0.32768000000000000000e5
-214 3 8 13 -0.32768000000000000000e5
-215 1 3 18 0.32768000000000000000e5
-215 1 4 16 0.32768000000000000000e5
-215 1 4 27 0.32768000000000000000e5
-215 1 9 16 -0.65536000000000000000e5
-215 2 3 17 0.32768000000000000000e5
-215 3 4 17 0.32768000000000000000e5
-215 4 1 13 0.32768000000000000000e5
-216 1 3 18 -0.32768000000000000000e5
-216 1 4 17 0.32768000000000000000e5
-217 1 4 18 0.32768000000000000000e5
-217 1 4 27 -0.32768000000000000000e5
-217 3 4 17 -0.32768000000000000000e5
-218 1 4 20 0.32768000000000000000e5
-218 1 9 16 -0.32768000000000000000e5
-219 1 4 21 0.32768000000000000000e5
-219 1 5 20 -0.32768000000000000000e5
-220 1 3 34 0.32768000000000000000e5
-220 1 4 22 0.32768000000000000000e5
-220 1 7 22 -0.65536000000000000000e5
-220 1 9 16 0.32768000000000000000e5
-220 2 6 20 0.32768000000000000000e5
-220 3 1 30 -0.32768000000000000000e5
-220 3 2 31 0.65536000000000000000e5
-220 3 6 19 0.32768000000000000000e5
-220 3 17 22 -0.32768000000000000000e5
-220 4 7 11 0.32768000000000000000e5
-221 1 4 23 0.32768000000000000000e5
-221 1 7 22 -0.32768000000000000000e5
-222 1 4 24 0.32768000000000000000e5
-222 1 12 27 -0.32768000000000000000e5
-222 3 8 21 -0.32768000000000000000e5
-223 1 4 25 0.32768000000000000000e5
-223 1 13 28 -0.32768000000000000000e5
-223 3 13 18 -0.32768000000000000000e5
-224 1 3 18 -0.32768000000000000000e5
-224 1 4 26 0.32768000000000000000e5
-224 1 9 16 0.65536000000000000000e5
-224 1 20 27 -0.65536000000000000000e5
-224 3 1 30 -0.65536000000000000000e5
-224 3 3 16 -0.32768000000000000000e5
-224 3 4 17 -0.32768000000000000000e5
-224 4 1 13 -0.32768000000000000000e5
-225 1 4 28 0.32768000000000000000e5
-225 1 4 35 -0.32768000000000000000e5
-225 3 3 32 0.32768000000000000000e5
-225 3 4 33 0.32768000000000000000e5
-225 3 5 26 -0.32768000000000000000e5
-225 3 17 30 -0.65536000000000000000e5
-225 4 13 17 0.32768000000000000000e5
-226 1 4 29 0.32768000000000000000e5
-226 1 5 20 -0.32768000000000000000e5
-226 3 6 19 0.32768000000000000000e5
-227 1 3 34 0.32768000000000000000e5
-227 1 4 30 0.32768000000000000000e5
-227 1 17 24 -0.65536000000000000000e5
-227 1 20 27 0.32768000000000000000e5
-227 2 6 20 0.32768000000000000000e5
-227 3 2 31 0.65536000000000000000e5
-227 3 17 22 -0.32768000000000000000e5
-228 1 4 31 0.32768000000000000000e5
-228 1 12 27 -0.32768000000000000000e5
-229 1 2 33 0.32768000000000000000e5
-229 1 3 34 -0.65536000000000000000e5
-229 1 4 32 0.32768000000000000000e5
-229 1 4 35 0.32768000000000000000e5
-229 2 12 18 0.32768000000000000000e5
-229 3 3 32 -0.32768000000000000000e5
-229 3 4 33 -0.32768000000000000000e5
-229 3 17 30 0.65536000000000000000e5
-229 4 13 17 -0.32768000000000000000e5
-230 1 4 33 0.32768000000000000000e5
-230 1 4 35 -0.32768000000000000000e5
-230 3 3 32 0.32768000000000000000e5
-230 3 4 33 0.32768000000000000000e5
-230 3 17 30 -0.65536000000000000000e5
-230 4 13 17 0.32768000000000000000e5
-231 1 3 34 0.32768000000000000000e5
-231 1 4 34 0.32768000000000000000e5
-231 1 17 24 -0.65536000000000000000e5
-231 1 20 27 0.32768000000000000000e5
-231 2 6 20 0.32768000000000000000e5
-231 3 2 31 0.65536000000000000000e5
-232 1 3 34 0.32768000000000000000e5
-232 1 4 27 0.16384000000000000000e5
-232 1 4 35 0.16384000000000000000e5
-232 1 5 5 0.32768000000000000000e5
-232 1 17 24 -0.65536000000000000000e5
-232 1 20 27 0.32768000000000000000e5
-232 2 4 18 0.16384000000000000000e5
-232 2 6 20 0.32768000000000000000e5
-232 3 2 31 0.65536000000000000000e5
-232 3 3 32 -0.16384000000000000000e5
-232 3 4 5 -0.16384000000000000000e5
-232 3 4 33 -0.16384000000000000000e5
-232 3 5 18 -0.16384000000000000000e5
-232 3 5 26 0.16384000000000000000e5
-232 3 17 22 -0.32768000000000000000e5
-232 3 17 30 0.32768000000000000000e5
-232 4 13 17 -0.16384000000000000000e5
-233 1 2 9 -0.32768000000000000000e5
-233 1 5 6 0.32768000000000000000e5
-234 1 2 9 0.32768000000000000000e5
-234 1 4 11 0.13107200000000000000e6
-234 1 5 7 0.32768000000000000000e5
-234 1 5 12 0.65536000000000000000e5
-234 1 5 20 -0.32768000000000000000e5
-234 1 7 22 -0.65536000000000000000e5
-234 1 8 23 -0.13107200000000000000e6
-234 1 9 16 -0.32768000000000000000e5
-234 1 11 26 0.65536000000000000000e5
-234 1 12 19 -0.65536000000000000000e5
-234 1 12 27 0.65536000000000000000e5
-234 2 3 9 0.65536000000000000000e5
-234 3 1 14 0.13107200000000000000e6
-234 3 2 7 0.32768000000000000000e5
-234 3 2 15 -0.26214400000000000000e6
-234 3 5 10 0.13107200000000000000e6
-234 3 7 20 0.65536000000000000000e5
-234 3 8 21 0.65536000000000000000e5
-234 4 2 6 0.32768000000000000000e5
-234 4 4 8 0.65536000000000000000e5
-234 4 5 9 0.13107200000000000000e6
-235 1 2 9 -0.32768000000000000000e5
-235 1 3 34 0.32768000000000000000e5
-235 1 4 11 -0.13107200000000000000e6
-235 1 5 8 0.32768000000000000000e5
-235 1 5 12 -0.65536000000000000000e5
-235 1 8 23 0.13107200000000000000e6
-235 1 9 16 0.65536000000000000000e5
-235 1 11 26 -0.65536000000000000000e5
-235 1 12 19 0.65536000000000000000e5
-235 1 12 27 -0.65536000000000000000e5
-235 2 3 9 -0.65536000000000000000e5
-235 2 6 20 0.32768000000000000000e5
-235 3 1 14 -0.13107200000000000000e6
-235 3 1 30 -0.32768000000000000000e5
-235 3 2 7 -0.32768000000000000000e5
-235 3 2 15 0.26214400000000000000e6
-235 3 2 31 0.65536000000000000000e5
-235 3 4 9 0.32768000000000000000e5
-235 3 5 10 -0.19660800000000000000e6
-235 3 6 19 0.32768000000000000000e5
-235 3 7 20 -0.65536000000000000000e5
-235 3 8 21 -0.65536000000000000000e5
-235 3 17 22 -0.32768000000000000000e5
-235 4 2 6 -0.32768000000000000000e5
-235 4 3 7 0.32768000000000000000e5
-235 4 4 8 -0.65536000000000000000e5
-235 4 5 9 -0.13107200000000000000e6
-235 4 7 11 0.32768000000000000000e5
-236 1 3 34 -0.32768000000000000000e5
-236 1 5 9 0.32768000000000000000e5
-236 1 5 20 0.32768000000000000000e5
-236 1 7 22 0.65536000000000000000e5
-236 1 9 16 -0.32768000000000000000e5
-236 1 17 24 -0.65536000000000000000e5
-236 1 19 34 -0.32768000000000000000e5
-236 1 20 27 0.32768000000000000000e5
-236 3 1 30 0.32768000000000000000e5
-236 3 4 9 -0.32768000000000000000e5
-236 3 6 19 -0.32768000000000000000e5
-236 3 8 21 -0.65536000000000000000e5
-236 3 17 22 0.32768000000000000000e5
-236 3 18 23 -0.65536000000000000000e5
-236 3 22 27 -0.32768000000000000000e5
-236 4 3 15 0.32768000000000000000e5
-236 4 6 18 0.32768000000000000000e5
-236 4 7 11 -0.32768000000000000000e5
-237 1 4 11 -0.32768000000000000000e5
-237 1 5 10 0.32768000000000000000e5
-238 1 5 11 0.32768000000000000000e5
-238 1 12 27 -0.32768000000000000000e5
-238 3 5 10 -0.32768000000000000000e5
-238 3 8 21 -0.32768000000000000000e5
-239 1 4 11 -0.16384000000000000000e5
-239 1 5 12 -0.16384000000000000000e5
-239 1 5 13 0.32768000000000000000e5
-239 1 7 22 0.16384000000000000000e5
-239 1 12 19 0.16384000000000000000e5
-239 1 13 28 -0.32768000000000000000e5
-239 3 5 10 -0.16384000000000000000e5
-239 3 13 18 -0.32768000000000000000e5
-239 4 4 8 -0.16384000000000000000e5
-240 1 5 14 0.32768000000000000000e5
-240 1 8 23 0.32768000000000000000e5
-240 1 13 28 0.32768000000000000000e5
-240 1 14 21 -0.65536000000000000000e5
-240 2 4 10 0.32768000000000000000e5
-240 3 1 14 -0.32768000000000000000e5
-240 3 2 15 0.65536000000000000000e5
-240 3 8 13 -0.65536000000000000000e5
-240 3 13 18 0.32768000000000000000e5
-240 4 5 9 -0.32768000000000000000e5
-241 1 5 15 0.32768000000000000000e5
-241 1 22 25 -0.32768000000000000000e5
-241 3 11 12 -0.32768000000000000000e5
-241 3 11 24 -0.32768000000000000000e5
-242 1 3 18 -0.32768000000000000000e5
-242 1 5 16 0.32768000000000000000e5
-243 1 4 27 -0.32768000000000000000e5
-243 1 5 17 0.32768000000000000000e5
-243 3 4 17 -0.32768000000000000000e5
-244 1 4 19 -0.32768000000000000000e5
-244 1 5 18 0.32768000000000000000e5
-245 1 3 34 0.65536000000000000000e5
-245 1 4 27 0.32768000000000000000e5
-245 1 4 35 0.32768000000000000000e5
-245 1 5 19 0.32768000000000000000e5
-245 1 17 24 -0.13107200000000000000e6
-245 1 20 27 0.65536000000000000000e5
-245 2 4 18 0.32768000000000000000e5
-245 2 6 20 0.65536000000000000000e5
-245 3 2 31 0.13107200000000000000e6
-245 3 3 32 -0.32768000000000000000e5
-245 3 4 33 -0.32768000000000000000e5
-245 3 5 18 -0.32768000000000000000e5
-245 3 5 26 0.32768000000000000000e5
-245 3 17 22 -0.65536000000000000000e5
-245 3 17 30 0.65536000000000000000e5
-245 4 13 17 -0.32768000000000000000e5
-246 1 3 34 0.32768000000000000000e5
-246 1 5 21 0.32768000000000000000e5
-246 1 7 22 -0.65536000000000000000e5
-246 1 9 16 0.32768000000000000000e5
-246 2 6 20 0.32768000000000000000e5
-246 3 1 30 -0.32768000000000000000e5
-246 3 2 31 0.65536000000000000000e5
-246 3 6 19 0.32768000000000000000e5
-246 3 17 22 -0.32768000000000000000e5
-246 4 7 11 0.32768000000000000000e5
-247 1 3 34 -0.32768000000000000000e5
-247 1 5 20 0.32768000000000000000e5
-247 1 5 22 0.32768000000000000000e5
-247 1 7 22 0.65536000000000000000e5
-247 1 9 16 -0.32768000000000000000e5
-247 1 17 24 -0.65536000000000000000e5
-247 1 19 34 -0.32768000000000000000e5
-247 1 20 27 0.32768000000000000000e5
-247 3 1 30 0.32768000000000000000e5
-247 3 6 19 -0.32768000000000000000e5
-247 3 8 21 -0.65536000000000000000e5
-247 3 17 22 0.32768000000000000000e5
-247 3 18 23 -0.65536000000000000000e5
-247 3 22 27 -0.32768000000000000000e5
-247 4 3 15 0.32768000000000000000e5
-247 4 6 18 0.32768000000000000000e5
-247 4 7 11 -0.32768000000000000000e5
-248 1 5 23 0.32768000000000000000e5
-248 1 12 27 -0.32768000000000000000e5
-248 3 8 21 -0.32768000000000000000e5
-249 1 5 24 0.32768000000000000000e5
-249 1 12 19 -0.32768000000000000000e5
-250 1 5 25 0.32768000000000000000e5
-250 1 9 24 -0.32768000000000000000e5
-251 1 4 27 -0.32768000000000000000e5
-251 1 5 26 0.32768000000000000000e5
-252 1 4 35 -0.32768000000000000000e5
-252 1 5 27 0.32768000000000000000e5
-252 3 3 32 0.32768000000000000000e5
-252 3 4 33 0.32768000000000000000e5
-252 3 5 26 -0.32768000000000000000e5
-252 3 17 30 -0.65536000000000000000e5
-252 4 13 17 0.32768000000000000000e5
-253 1 3 34 0.65536000000000000000e5
-253 1 4 27 0.32768000000000000000e5
-253 1 4 35 0.32768000000000000000e5
-253 1 5 28 0.32768000000000000000e5
-253 1 17 24 -0.13107200000000000000e6
-253 1 20 27 0.65536000000000000000e5
-253 2 4 18 0.32768000000000000000e5
-253 2 6 20 0.65536000000000000000e5
-253 3 2 31 0.13107200000000000000e6
-253 3 3 32 -0.32768000000000000000e5
-253 3 4 33 -0.32768000000000000000e5
-253 3 5 26 0.32768000000000000000e5
-253 3 17 22 -0.65536000000000000000e5
-253 3 17 30 0.65536000000000000000e5
-253 4 13 17 -0.32768000000000000000e5
-254 1 3 34 0.32768000000000000000e5
-254 1 5 29 0.32768000000000000000e5
-254 1 17 24 -0.65536000000000000000e5
-254 1 20 27 0.32768000000000000000e5
-254 2 6 20 0.32768000000000000000e5
-254 3 2 31 0.65536000000000000000e5
-254 3 17 22 -0.32768000000000000000e5
-255 1 3 34 -0.32768000000000000000e5
-255 1 5 20 0.32768000000000000000e5
-255 1 5 30 0.32768000000000000000e5
-255 1 19 34 -0.32768000000000000000e5
-255 3 6 19 -0.32768000000000000000e5
-255 3 17 22 0.32768000000000000000e5
-255 3 18 23 -0.65536000000000000000e5
-255 3 22 27 -0.32768000000000000000e5
-255 4 6 18 0.32768000000000000000e5
-256 1 5 31 0.32768000000000000000e5
-256 1 12 19 -0.32768000000000000000e5
-256 3 4 25 0.65536000000000000000e5
-256 3 8 21 -0.32768000000000000000e5
-256 3 9 22 -0.32768000000000000000e5
-256 4 4 16 -0.32768000000000000000e5
-257 1 4 35 -0.32768000000000000000e5
-257 1 5 32 0.32768000000000000000e5
-257 3 3 32 0.32768000000000000000e5
-257 3 4 33 0.32768000000000000000e5
-257 3 17 30 -0.65536000000000000000e5
-257 4 13 17 0.32768000000000000000e5
-258 1 3 34 0.65536000000000000000e5
-258 1 4 27 0.32768000000000000000e5
-258 1 4 35 0.32768000000000000000e5
-258 1 5 33 0.32768000000000000000e5
-258 1 17 24 -0.13107200000000000000e6
-258 1 20 27 0.65536000000000000000e5
-258 2 4 18 0.32768000000000000000e5
-258 2 6 20 0.65536000000000000000e5
-258 3 2 31 0.13107200000000000000e6
-258 3 3 32 -0.32768000000000000000e5
-258 3 4 33 -0.32768000000000000000e5
-258 3 5 26 0.32768000000000000000e5
-258 3 17 22 -0.65536000000000000000e5
-258 3 17 30 0.65536000000000000000e5
-258 3 18 19 0.32768000000000000000e5
-258 4 13 17 -0.32768000000000000000e5
-259 1 5 34 0.32768000000000000000e5
-259 1 19 34 -0.32768000000000000000e5
-259 3 22 27 -0.32768000000000000000e5
-260 1 3 34 0.65536000000000000000e5
-260 1 4 27 0.32768000000000000000e5
-260 1 4 35 0.32768000000000000000e5
-260 1 5 35 0.32768000000000000000e5
-260 1 17 24 -0.13107200000000000000e6
-260 1 20 27 0.65536000000000000000e5
-260 2 4 18 0.32768000000000000000e5
-260 2 6 20 0.65536000000000000000e5
-260 3 2 31 0.13107200000000000000e6
-260 3 3 32 -0.32768000000000000000e5
-260 3 5 26 0.32768000000000000000e5
-260 3 17 22 -0.65536000000000000000e5
-260 3 17 30 0.65536000000000000000e5
-260 3 18 19 0.32768000000000000000e5
-260 4 13 17 -0.32768000000000000000e5
-261 1 1 10 -0.16384000000000000000e5
-261 1 6 6 0.32768000000000000000e5
-262 1 1 8 0.16384000000000000000e5
-262 1 2 9 0.16384000000000000000e5
-262 1 4 11 -0.65536000000000000000e5
-262 1 5 12 -0.32768000000000000000e5
-262 1 5 20 -0.16384000000000000000e5
-262 1 6 7 0.32768000000000000000e5
-262 1 7 10 -0.65536000000000000000e5
-262 1 7 22 0.32768000000000000000e5
-262 1 8 23 0.65536000000000000000e5
-262 1 9 16 -0.16384000000000000000e5
-262 1 11 26 0.32768000000000000000e5
-262 1 12 19 0.32768000000000000000e5
-262 1 12 27 -0.32768000000000000000e5
-262 2 1 7 0.16384000000000000000e5
-262 2 2 8 0.32768000000000000000e5
-262 2 3 9 -0.32768000000000000000e5
-262 2 6 12 -0.16384000000000000000e5
-262 3 1 14 -0.65536000000000000000e5
-262 3 2 7 0.16384000000000000000e5
-262 3 2 15 0.13107200000000000000e6
-262 3 5 10 -0.65536000000000000000e5
-262 3 7 20 0.32768000000000000000e5
-262 3 8 21 -0.32768000000000000000e5
-262 4 4 8 -0.32768000000000000000e5
-262 4 5 9 -0.65536000000000000000e5
-263 1 1 8 -0.16384000000000000000e5
-263 1 2 9 -0.16384000000000000000e5
-263 1 5 20 0.16384000000000000000e5
-263 1 6 8 0.32768000000000000000e5
-263 1 9 16 0.16384000000000000000e5
-263 1 11 26 -0.32768000000000000000e5
-263 2 1 7 -0.16384000000000000000e5
-263 2 6 12 0.16384000000000000000e5
-263 3 2 7 -0.16384000000000000000e5
-263 3 7 20 -0.32768000000000000000e5
-264 1 4 11 0.65536000000000000000e5
-264 1 5 12 0.32768000000000000000e5
-264 1 6 9 0.32768000000000000000e5
-264 1 7 22 -0.32768000000000000000e5
-264 1 8 23 -0.65536000000000000000e5
-264 1 12 19 -0.32768000000000000000e5
-264 1 12 27 0.32768000000000000000e5
-264 2 3 9 0.32768000000000000000e5
-264 3 1 14 0.65536000000000000000e5
-264 3 2 15 -0.13107200000000000000e6
-264 3 5 10 0.65536000000000000000e5
-264 3 8 21 0.32768000000000000000e5
-264 4 4 8 0.32768000000000000000e5
-264 4 5 9 0.65536000000000000000e5
-265 1 1 10 -0.16384000000000000000e5
-265 1 4 11 -0.32768000000000000000e5
-265 1 5 12 -0.16384000000000000000e5
-265 1 6 10 0.32768000000000000000e5
-265 1 7 10 -0.32768000000000000000e5
-265 1 7 22 0.16384000000000000000e5
-265 1 8 23 0.32768000000000000000e5
-265 1 12 19 0.16384000000000000000e5
-265 1 12 27 -0.16384000000000000000e5
-265 2 2 8 0.16384000000000000000e5
-265 2 3 9 -0.16384000000000000000e5
-265 2 5 5 -0.32768000000000000000e5
-265 3 1 14 -0.32768000000000000000e5
-265 3 2 15 0.65536000000000000000e5
-265 3 5 10 -0.32768000000000000000e5
-265 3 8 21 -0.16384000000000000000e5
-265 4 4 8 -0.16384000000000000000e5
-265 4 5 9 -0.32768000000000000000e5
-266 1 6 11 0.32768000000000000000e5
-266 1 7 10 -0.32768000000000000000e5
-267 1 6 12 0.32768000000000000000e5
-267 1 6 21 -0.16384000000000000000e5
-267 1 7 22 -0.16384000000000000000e5
-267 1 11 26 -0.16384000000000000000e5
-267 2 2 16 -0.16384000000000000000e5
-267 3 1 14 -0.32768000000000000000e5
-267 3 7 20 -0.16384000000000000000e5
-268 1 4 11 0.81920000000000000000e4
-268 1 5 12 0.81920000000000000000e4
-268 1 6 14 0.32768000000000000000e5
-268 1 6 21 -0.81920000000000000000e4
-268 1 7 10 -0.16384000000000000000e5
-268 1 7 22 -0.16384000000000000000e5
-268 1 8 23 -0.16384000000000000000e5
-268 1 11 26 -0.81920000000000000000e4
-268 1 12 19 -0.81920000000000000000e4
-268 2 2 16 -0.81920000000000000000e4
-268 2 6 8 -0.16384000000000000000e5
-268 3 2 15 -0.32768000000000000000e5
-268 3 5 10 0.81920000000000000000e4
-268 3 7 20 -0.81920000000000000000e4
-268 4 4 8 0.81920000000000000000e4
-268 4 5 9 0.16384000000000000000e5
-269 1 6 15 0.32768000000000000000e5
-269 1 10 13 -0.32768000000000000000e5
-270 1 1 8 0.65536000000000000000e5
-270 1 2 9 0.32768000000000000000e5
-270 1 4 11 -0.13107200000000000000e6
-270 1 5 12 -0.65536000000000000000e5
-270 1 5 20 -0.65536000000000000000e5
-270 1 6 16 0.32768000000000000000e5
-270 1 7 10 -0.13107200000000000000e6
-270 1 7 22 0.65536000000000000000e5
-270 1 8 23 0.13107200000000000000e6
-270 1 9 16 -0.65536000000000000000e5
-270 1 11 26 0.13107200000000000000e6
-270 1 12 19 0.65536000000000000000e5
-270 1 12 27 -0.65536000000000000000e5
-270 2 1 7 0.32768000000000000000e5
-270 2 2 8 0.65536000000000000000e5
-270 2 3 9 -0.65536000000000000000e5
-270 2 5 11 0.32768000000000000000e5
-270 2 6 12 -0.65536000000000000000e5
-270 3 1 6 0.32768000000000000000e5
-270 3 1 14 -0.13107200000000000000e6
-270 3 2 7 0.65536000000000000000e5
-270 3 2 15 0.26214400000000000000e6
-270 3 5 10 -0.13107200000000000000e6
-270 3 7 20 0.13107200000000000000e6
-270 3 8 21 -0.65536000000000000000e5
-270 4 1 5 0.32768000000000000000e5
-270 4 4 8 -0.65536000000000000000e5
-270 4 5 9 -0.13107200000000000000e6
-271 1 5 20 -0.32768000000000000000e5
-271 1 6 17 0.32768000000000000000e5
-271 1 6 21 -0.65536000000000000000e5
-271 1 11 26 0.65536000000000000000e5
-271 2 1 15 0.32768000000000000000e5
-271 2 6 12 -0.32768000000000000000e5
-271 3 7 20 0.65536000000000000000e5
-272 1 5 20 0.32768000000000000000e5
-272 1 6 18 0.32768000000000000000e5
-272 1 9 16 0.32768000000000000000e5
-272 1 11 26 -0.65536000000000000000e5
-272 2 6 12 0.32768000000000000000e5
-272 3 7 20 -0.65536000000000000000e5
-273 1 6 19 0.32768000000000000000e5
-273 1 9 16 -0.32768000000000000000e5
-274 1 1 8 0.32768000000000000000e5
-274 1 2 9 0.16384000000000000000e5
-274 1 4 11 -0.65536000000000000000e5
-274 1 5 12 -0.32768000000000000000e5
-274 1 5 20 -0.32768000000000000000e5
-274 1 6 20 0.32768000000000000000e5
-274 1 6 21 -0.32768000000000000000e5
-274 1 7 10 -0.65536000000000000000e5
-274 1 7 22 0.32768000000000000000e5
-274 1 8 23 0.65536000000000000000e5
-274 1 9 16 -0.16384000000000000000e5
-274 1 11 26 0.65536000000000000000e5
-274 1 12 19 0.32768000000000000000e5
-274 1 12 27 -0.32768000000000000000e5
-274 2 1 7 0.16384000000000000000e5
-274 2 1 15 0.16384000000000000000e5
-274 2 2 8 0.32768000000000000000e5
-274 2 3 9 -0.32768000000000000000e5
-274 2 6 12 -0.32768000000000000000e5
-274 3 1 6 0.16384000000000000000e5
-274 3 1 14 -0.65536000000000000000e5
-274 3 2 7 0.32768000000000000000e5
-274 3 2 15 0.13107200000000000000e6
-274 3 5 10 -0.65536000000000000000e5
-274 3 7 20 0.65536000000000000000e5
-274 3 8 21 -0.32768000000000000000e5
-274 4 1 5 0.16384000000000000000e5
-274 4 4 8 -0.32768000000000000000e5
-274 4 5 9 -0.65536000000000000000e5
-275 1 6 22 0.32768000000000000000e5
-275 1 11 26 -0.32768000000000000000e5
-275 3 7 20 -0.32768000000000000000e5
-276 1 6 21 0.16384000000000000000e5
-276 1 6 23 0.32768000000000000000e5
-276 1 7 22 0.16384000000000000000e5
-276 1 8 23 0.32768000000000000000e5
-276 1 11 26 0.16384000000000000000e5
-276 1 13 20 -0.65536000000000000000e5
-276 2 2 16 0.16384000000000000000e5
-276 2 8 14 0.32768000000000000000e5
-276 3 7 20 0.16384000000000000000e5
-277 1 6 21 -0.16384000000000000000e5
-277 1 6 24 0.32768000000000000000e5
-277 1 7 22 -0.16384000000000000000e5
-277 1 11 26 -0.16384000000000000000e5
-277 2 2 16 -0.16384000000000000000e5
-277 3 7 20 -0.16384000000000000000e5
-278 1 6 25 0.32768000000000000000e5
-278 1 13 20 -0.32768000000000000000e5
-279 1 5 20 -0.32768000000000000000e5
-279 1 6 26 0.32768000000000000000e5
-279 1 11 26 0.65536000000000000000e5
-279 1 16 23 -0.65536000000000000000e5
-279 2 1 19 0.32768000000000000000e5
-279 2 6 12 -0.32768000000000000000e5
-279 3 6 19 0.32768000000000000000e5
-279 4 2 14 0.32768000000000000000e5
-280 1 5 20 0.32768000000000000000e5
-280 1 6 27 0.32768000000000000000e5
-280 1 11 26 -0.65536000000000000000e5
-280 1 20 27 0.32768000000000000000e5
-280 2 6 12 0.32768000000000000000e5
-280 3 1 30 0.32768000000000000000e5
-280 3 6 19 -0.32768000000000000000e5
-280 4 2 14 -0.32768000000000000000e5
-281 1 6 28 0.32768000000000000000e5
-281 1 20 27 -0.32768000000000000000e5
-281 3 1 30 -0.32768000000000000000e5
-282 1 6 29 0.32768000000000000000e5
-282 1 16 23 -0.32768000000000000000e5
-283 1 6 30 0.32768000000000000000e5
-283 1 11 26 -0.32768000000000000000e5
-284 1 6 31 0.32768000000000000000e5
-284 1 11 26 -0.16384000000000000000e5
-284 1 16 23 -0.16384000000000000000e5
-284 1 17 24 -0.16384000000000000000e5
-284 2 5 19 -0.16384000000000000000e5
-285 1 3 34 0.32768000000000000000e5
-285 1 6 32 0.32768000000000000000e5
-285 1 16 31 -0.65536000000000000000e5
-285 1 20 27 0.32768000000000000000e5
-285 2 6 12 0.32768000000000000000e5
-285 4 2 14 -0.32768000000000000000e5
-285 4 5 17 -0.32768000000000000000e5
-286 1 6 33 0.32768000000000000000e5
-286 1 20 27 -0.32768000000000000000e5
-287 1 6 34 0.32768000000000000000e5
-287 1 16 31 -0.32768000000000000000e5
-288 1 6 35 0.32768000000000000000e5
-288 1 20 27 -0.32768000000000000000e5
-288 3 16 29 0.32768000000000000000e5
-289 1 1 8 -0.81920000000000000000e4
-289 1 2 9 -0.81920000000000000000e4
-289 1 5 20 0.81920000000000000000e4
-289 1 7 7 0.32768000000000000000e5
-289 1 9 16 0.81920000000000000000e4
-289 1 11 26 -0.16384000000000000000e5
-289 2 1 7 -0.81920000000000000000e4
-289 2 6 12 0.81920000000000000000e4
-289 3 2 7 -0.81920000000000000000e4
-289 3 7 20 -0.16384000000000000000e5
-290 1 4 11 0.65536000000000000000e5
-290 1 5 12 0.32768000000000000000e5
-290 1 7 8 0.32768000000000000000e5
-290 1 7 22 -0.32768000000000000000e5
-290 1 8 23 -0.65536000000000000000e5
-290 1 12 19 -0.32768000000000000000e5
-290 1 12 27 0.32768000000000000000e5
-290 2 3 9 0.32768000000000000000e5
-290 3 1 14 0.65536000000000000000e5
-290 3 2 15 -0.13107200000000000000e6
-290 3 5 10 0.65536000000000000000e5
-290 3 8 21 0.32768000000000000000e5
-290 4 4 8 0.32768000000000000000e5
-290 4 5 9 0.65536000000000000000e5
-291 1 4 11 -0.32768000000000000000e5
-291 1 7 9 0.32768000000000000000e5
-292 1 6 21 -0.16384000000000000000e5
-292 1 7 11 0.32768000000000000000e5
-292 1 7 22 -0.16384000000000000000e5
-292 1 11 26 -0.16384000000000000000e5
-292 2 2 16 -0.16384000000000000000e5
-292 3 1 14 -0.32768000000000000000e5
-292 3 7 20 -0.16384000000000000000e5
-293 1 4 11 0.16384000000000000000e5
-293 1 5 12 0.16384000000000000000e5
-293 1 7 12 0.32768000000000000000e5
-293 1 7 22 -0.16384000000000000000e5
-293 1 8 23 -0.32768000000000000000e5
-293 1 12 19 -0.16384000000000000000e5
-293 3 1 14 0.32768000000000000000e5
-293 3 2 15 -0.65536000000000000000e5
-293 3 5 10 0.16384000000000000000e5
-293 4 4 8 0.16384000000000000000e5
-293 4 5 9 0.32768000000000000000e5
-294 1 4 11 0.81920000000000000000e4
-294 1 5 12 0.81920000000000000000e4
-294 1 6 21 -0.81920000000000000000e4
-294 1 7 10 -0.16384000000000000000e5
-294 1 7 13 0.32768000000000000000e5
-294 1 7 22 -0.16384000000000000000e5
-294 1 8 23 -0.16384000000000000000e5
-294 1 11 26 -0.81920000000000000000e4
-294 1 12 19 -0.81920000000000000000e4
-294 2 2 16 -0.81920000000000000000e4
-294 2 6 8 -0.16384000000000000000e5
-294 3 2 15 -0.32768000000000000000e5
-294 3 5 10 0.81920000000000000000e4
-294 3 7 20 -0.81920000000000000000e4
-294 4 4 8 0.81920000000000000000e4
-294 4 5 9 0.16384000000000000000e5
-295 1 4 11 0.40960000000000000000e4
-295 1 5 12 0.40960000000000000000e4
-295 1 6 21 -0.40960000000000000000e4
-295 1 7 10 -0.81920000000000000000e4
-295 1 7 15 0.32768000000000000000e5
-295 1 7 22 -0.81920000000000000000e4
-295 1 8 23 -0.81920000000000000000e4
-295 1 10 25 -0.32768000000000000000e5
-295 1 11 26 -0.40960000000000000000e4
-295 1 12 19 -0.40960000000000000000e4
-295 1 13 20 0.16384000000000000000e5
-295 2 2 16 -0.40960000000000000000e4
-295 2 6 8 -0.81920000000000000000e4
-295 3 2 15 -0.32768000000000000000e5
-295 3 5 10 0.40960000000000000000e4
-295 3 7 20 -0.40960000000000000000e4
-295 3 8 13 -0.16384000000000000000e5
-295 4 4 8 0.40960000000000000000e4
-295 4 5 9 0.81920000000000000000e4
-295 4 8 8 -0.32768000000000000000e5
-296 1 5 20 -0.32768000000000000000e5
-296 1 6 21 -0.65536000000000000000e5
-296 1 7 16 0.32768000000000000000e5
-296 1 11 26 0.65536000000000000000e5
-296 2 1 15 0.32768000000000000000e5
-296 2 6 12 -0.32768000000000000000e5
-296 3 7 20 0.65536000000000000000e5
-297 1 5 20 0.32768000000000000000e5
-297 1 7 17 0.32768000000000000000e5
-297 1 9 16 0.32768000000000000000e5
-297 1 11 26 -0.65536000000000000000e5
-297 2 6 12 0.32768000000000000000e5
-297 3 7 20 -0.65536000000000000000e5
-298 1 7 18 0.32768000000000000000e5
-298 1 9 16 -0.32768000000000000000e5
-299 1 5 20 -0.32768000000000000000e5
-299 1 7 19 0.32768000000000000000e5
-300 1 6 21 -0.32768000000000000000e5
-300 1 7 20 0.32768000000000000000e5
-301 1 7 21 0.32768000000000000000e5
-301 1 11 26 -0.32768000000000000000e5
-301 3 7 20 -0.32768000000000000000e5
-302 1 6 21 -0.16384000000000000000e5
-302 1 7 22 -0.16384000000000000000e5
-302 1 7 23 0.32768000000000000000e5
-302 1 11 26 -0.16384000000000000000e5
-302 2 2 16 -0.16384000000000000000e5
-302 3 7 20 -0.16384000000000000000e5
-303 1 7 24 0.32768000000000000000e5
-303 1 8 23 -0.32768000000000000000e5
-304 1 7 14 -0.32768000000000000000e5
-304 1 7 25 0.32768000000000000000e5
-304 3 2 15 0.32768000000000000000e5
-305 1 5 20 0.32768000000000000000e5
-305 1 7 26 0.32768000000000000000e5
-305 1 11 26 -0.65536000000000000000e5
-305 1 20 27 0.32768000000000000000e5
-305 2 6 12 0.32768000000000000000e5
-305 3 1 30 0.32768000000000000000e5
-305 3 6 19 -0.32768000000000000000e5
-305 4 2 14 -0.32768000000000000000e5
-306 1 7 27 0.32768000000000000000e5
-306 1 20 27 -0.32768000000000000000e5
-306 3 1 30 -0.32768000000000000000e5
-307 1 5 20 -0.32768000000000000000e5
-307 1 7 28 0.32768000000000000000e5
-307 3 6 19 0.32768000000000000000e5
-308 1 7 29 0.32768000000000000000e5
-308 1 11 26 -0.32768000000000000000e5
-309 1 7 30 0.32768000000000000000e5
-309 1 17 24 -0.32768000000000000000e5
-310 1 7 22 0.16384000000000000000e5
-310 1 7 31 0.32768000000000000000e5
-310 1 8 23 -0.32768000000000000000e5
-310 1 17 24 -0.16384000000000000000e5
-310 3 7 20 0.16384000000000000000e5
-310 3 8 21 0.16384000000000000000e5
-310 4 8 12 0.16384000000000000000e5
-311 1 7 32 0.32768000000000000000e5
-311 1 20 27 -0.32768000000000000000e5
-312 1 3 34 -0.32768000000000000000e5
-312 1 7 33 0.32768000000000000000e5
-313 1 7 34 0.32768000000000000000e5
-313 1 17 24 -0.32768000000000000000e5
-313 3 2 31 0.32768000000000000000e5
-314 1 7 35 0.32768000000000000000e5
-314 1 20 35 -0.32768000000000000000e5
-314 3 6 35 -0.32768000000000000000e5
-315 1 4 11 -0.16384000000000000000e5
-315 1 8 8 0.32768000000000000000e5
-316 1 8 9 0.32768000000000000000e5
-316 1 12 27 -0.32768000000000000000e5
-316 3 5 10 -0.32768000000000000000e5
-316 3 8 21 -0.32768000000000000000e5
-317 1 6 21 -0.16384000000000000000e5
-317 1 7 22 -0.16384000000000000000e5
-317 1 8 10 0.32768000000000000000e5
-317 1 11 26 -0.16384000000000000000e5
-317 2 2 16 -0.16384000000000000000e5
-317 3 1 14 -0.32768000000000000000e5
-317 3 7 20 -0.16384000000000000000e5
-318 1 4 11 0.16384000000000000000e5
-318 1 5 12 0.16384000000000000000e5
-318 1 7 22 -0.16384000000000000000e5
-318 1 8 11 0.32768000000000000000e5
-318 1 8 23 -0.32768000000000000000e5
-318 1 12 19 -0.16384000000000000000e5
-318 3 1 14 0.32768000000000000000e5
-318 3 2 15 -0.65536000000000000000e5
-318 3 5 10 0.16384000000000000000e5
-318 4 4 8 0.16384000000000000000e5
-318 4 5 9 0.32768000000000000000e5
-319 1 4 11 -0.16384000000000000000e5
-319 1 5 12 -0.16384000000000000000e5
-319 1 7 22 0.16384000000000000000e5
-319 1 8 12 0.32768000000000000000e5
-319 1 12 19 0.16384000000000000000e5
-319 1 13 28 -0.32768000000000000000e5
-319 3 5 10 -0.16384000000000000000e5
-319 3 13 18 -0.32768000000000000000e5
-319 4 4 8 -0.16384000000000000000e5
-320 1 7 14 -0.32768000000000000000e5
-320 1 8 13 0.32768000000000000000e5
-321 1 8 14 0.32768000000000000000e5
-321 1 14 21 -0.32768000000000000000e5
-321 3 8 13 -0.32768000000000000000e5
-322 1 5 20 0.32768000000000000000e5
-322 1 8 16 0.32768000000000000000e5
-322 1 9 16 0.32768000000000000000e5
-322 1 11 26 -0.65536000000000000000e5
-322 2 6 12 0.32768000000000000000e5
-322 3 7 20 -0.65536000000000000000e5
-323 1 8 17 0.32768000000000000000e5
-323 1 9 16 -0.32768000000000000000e5
-324 1 5 20 -0.32768000000000000000e5
-324 1 8 18 0.32768000000000000000e5
-325 1 3 34 0.32768000000000000000e5
-325 1 7 22 -0.65536000000000000000e5
-325 1 8 19 0.32768000000000000000e5
-325 1 9 16 0.32768000000000000000e5
-325 2 6 20 0.32768000000000000000e5
-325 3 1 30 -0.32768000000000000000e5
-325 3 2 31 0.65536000000000000000e5
-325 3 6 19 0.32768000000000000000e5
-325 3 17 22 -0.32768000000000000000e5
-325 4 7 11 0.32768000000000000000e5
-326 1 8 20 0.32768000000000000000e5
-326 1 11 26 -0.32768000000000000000e5
-326 3 7 20 -0.32768000000000000000e5
-327 1 7 22 -0.32768000000000000000e5
-327 1 8 21 0.32768000000000000000e5
-328 1 8 22 0.32768000000000000000e5
-328 1 12 27 -0.32768000000000000000e5
-328 3 8 21 -0.32768000000000000000e5
-329 1 8 24 0.32768000000000000000e5
-329 1 13 28 -0.32768000000000000000e5
-329 3 13 18 -0.32768000000000000000e5
-330 1 8 25 0.32768000000000000000e5
-330 1 14 21 -0.32768000000000000000e5
-331 1 8 26 0.32768000000000000000e5
-331 1 20 27 -0.32768000000000000000e5
-331 3 1 30 -0.32768000000000000000e5
-332 1 5 20 -0.32768000000000000000e5
-332 1 8 27 0.32768000000000000000e5
-332 3 6 19 0.32768000000000000000e5
-333 1 3 34 0.32768000000000000000e5
-333 1 8 28 0.32768000000000000000e5
-333 1 17 24 -0.65536000000000000000e5
-333 1 20 27 0.32768000000000000000e5
-333 2 6 20 0.32768000000000000000e5
-333 3 2 31 0.65536000000000000000e5
-333 3 17 22 -0.32768000000000000000e5
-334 1 8 29 0.32768000000000000000e5
-334 1 17 24 -0.32768000000000000000e5
-335 1 8 30 0.32768000000000000000e5
-335 1 12 27 -0.32768000000000000000e5
-336 1 8 31 0.32768000000000000000e5
-336 1 13 28 -0.32768000000000000000e5
-337 1 3 34 -0.32768000000000000000e5
-337 1 8 32 0.32768000000000000000e5
-338 1 3 34 0.32768000000000000000e5
-338 1 8 33 0.32768000000000000000e5
-338 1 17 24 -0.65536000000000000000e5
-338 1 20 27 0.32768000000000000000e5
-338 2 6 20 0.32768000000000000000e5
-338 3 2 31 0.65536000000000000000e5
-339 1 8 34 0.32768000000000000000e5
-339 1 12 27 -0.32768000000000000000e5
-339 3 18 23 0.32768000000000000000e5
-340 1 3 34 0.32768000000000000000e5
-340 1 8 35 0.32768000000000000000e5
-340 1 17 24 -0.65536000000000000000e5
-340 1 20 27 0.32768000000000000000e5
-340 2 6 20 0.32768000000000000000e5
-340 3 2 31 0.65536000000000000000e5
-340 3 17 30 0.32768000000000000000e5
-341 1 5 12 -0.16384000000000000000e5
-341 1 9 9 0.32768000000000000000e5
-342 1 4 11 0.16384000000000000000e5
-342 1 5 12 0.16384000000000000000e5
-342 1 7 22 -0.16384000000000000000e5
-342 1 8 23 -0.32768000000000000000e5
-342 1 9 10 0.32768000000000000000e5
-342 1 12 19 -0.16384000000000000000e5
-342 3 1 14 0.32768000000000000000e5
-342 3 2 15 -0.65536000000000000000e5
-342 3 5 10 0.16384000000000000000e5
-342 4 4 8 0.16384000000000000000e5
-342 4 5 9 0.32768000000000000000e5
-343 1 4 11 -0.16384000000000000000e5
-343 1 5 12 -0.16384000000000000000e5
-343 1 7 22 0.16384000000000000000e5
-343 1 9 11 0.32768000000000000000e5
-343 1 12 19 0.16384000000000000000e5
-343 1 13 28 -0.32768000000000000000e5
-343 3 5 10 -0.16384000000000000000e5
-343 3 13 18 -0.32768000000000000000e5
-343 4 4 8 -0.16384000000000000000e5
-344 1 8 23 0.32768000000000000000e5
-344 1 9 12 0.32768000000000000000e5
-344 1 13 28 0.32768000000000000000e5
-344 1 14 21 -0.65536000000000000000e5
-344 2 4 10 0.32768000000000000000e5
-344 3 1 14 -0.32768000000000000000e5
-344 3 2 15 0.65536000000000000000e5
-344 3 8 13 -0.65536000000000000000e5
-344 3 13 18 0.32768000000000000000e5
-344 4 5 9 -0.32768000000000000000e5
-345 1 9 13 0.32768000000000000000e5
-345 1 14 21 -0.32768000000000000000e5
-345 3 8 13 -0.32768000000000000000e5
-346 1 9 14 0.32768000000000000000e5
-346 1 22 25 -0.32768000000000000000e5
-346 3 11 12 -0.32768000000000000000e5
-346 3 11 24 -0.32768000000000000000e5
-347 1 9 15 0.32768000000000000000e5
-347 1 15 22 -0.32768000000000000000e5
-347 3 12 13 -0.32768000000000000000e5
-348 1 5 20 -0.32768000000000000000e5
-348 1 9 17 0.32768000000000000000e5
-349 1 3 34 0.32768000000000000000e5
-349 1 7 22 -0.65536000000000000000e5
-349 1 9 16 0.32768000000000000000e5
-349 1 9 18 0.32768000000000000000e5
-349 2 6 20 0.32768000000000000000e5
-349 3 1 30 -0.32768000000000000000e5
-349 3 2 31 0.65536000000000000000e5
-349 3 6 19 0.32768000000000000000e5
-349 3 17 22 -0.32768000000000000000e5
-349 4 7 11 0.32768000000000000000e5
-350 1 3 34 -0.32768000000000000000e5
-350 1 5 20 0.32768000000000000000e5
-350 1 7 22 0.65536000000000000000e5
-350 1 9 16 -0.32768000000000000000e5
-350 1 9 19 0.32768000000000000000e5
-350 1 17 24 -0.65536000000000000000e5
-350 1 19 34 -0.32768000000000000000e5
-350 1 20 27 0.32768000000000000000e5
-350 3 1 30 0.32768000000000000000e5
-350 3 6 19 -0.32768000000000000000e5
-350 3 8 21 -0.65536000000000000000e5
-350 3 17 22 0.32768000000000000000e5
-350 3 18 23 -0.65536000000000000000e5
-350 3 22 27 -0.32768000000000000000e5
-350 4 3 15 0.32768000000000000000e5
-350 4 6 18 0.32768000000000000000e5
-350 4 7 11 -0.32768000000000000000e5
-351 1 7 22 -0.32768000000000000000e5
-351 1 9 20 0.32768000000000000000e5
-352 1 9 21 0.32768000000000000000e5
-352 1 12 27 -0.32768000000000000000e5
-352 3 8 21 -0.32768000000000000000e5
-353 1 9 22 0.32768000000000000000e5
-353 1 12 19 -0.32768000000000000000e5
-354 1 9 23 0.32768000000000000000e5
-354 1 13 28 -0.32768000000000000000e5
-354 3 13 18 -0.32768000000000000000e5
-355 1 9 25 0.32768000000000000000e5
-355 1 22 25 -0.32768000000000000000e5
-355 3 11 24 -0.32768000000000000000e5
-356 1 5 20 -0.32768000000000000000e5
-356 1 9 26 0.32768000000000000000e5
-356 3 6 19 0.32768000000000000000e5
-357 1 3 34 0.32768000000000000000e5
-357 1 9 27 0.32768000000000000000e5
-357 1 17 24 -0.65536000000000000000e5
-357 1 20 27 0.32768000000000000000e5
-357 2 6 20 0.32768000000000000000e5
-357 3 2 31 0.65536000000000000000e5
-357 3 17 22 -0.32768000000000000000e5
-358 1 3 34 -0.32768000000000000000e5
-358 1 5 20 0.32768000000000000000e5
-358 1 9 28 0.32768000000000000000e5
-358 1 19 34 -0.32768000000000000000e5
-358 3 6 19 -0.32768000000000000000e5
-358 3 17 22 0.32768000000000000000e5
-358 3 18 23 -0.65536000000000000000e5
-358 3 22 27 -0.32768000000000000000e5
-358 4 6 18 0.32768000000000000000e5
-359 1 9 29 0.32768000000000000000e5
-359 1 12 27 -0.32768000000000000000e5
-360 1 9 30 0.32768000000000000000e5
-360 1 12 19 -0.32768000000000000000e5
-360 3 4 25 0.65536000000000000000e5
-360 3 8 21 -0.32768000000000000000e5
-360 3 9 22 -0.32768000000000000000e5
-360 4 4 16 -0.32768000000000000000e5
-361 1 9 24 -0.32768000000000000000e5
-361 1 9 31 0.32768000000000000000e5
-361 3 4 25 0.32768000000000000000e5
-362 1 3 34 0.32768000000000000000e5
-362 1 9 32 0.32768000000000000000e5
-362 1 17 24 -0.65536000000000000000e5
-362 1 20 27 0.32768000000000000000e5
-362 2 6 20 0.32768000000000000000e5
-362 3 2 31 0.65536000000000000000e5
-363 1 9 33 0.32768000000000000000e5
-363 1 19 34 -0.32768000000000000000e5
-363 3 22 27 -0.32768000000000000000e5
-364 1 3 34 -0.32768000000000000000e5
-364 1 9 34 0.32768000000000000000e5
-364 1 12 19 -0.32768000000000000000e5
-364 1 13 28 0.65536000000000000000e5
-364 1 20 35 0.32768000000000000000e5
-364 1 25 32 -0.65536000000000000000e5
-364 2 6 20 -0.16384000000000000000e5
-364 2 14 20 0.16384000000000000000e5
-364 3 2 31 -0.32768000000000000000e5
-364 3 4 25 0.65536000000000000000e5
-364 3 6 35 0.32768000000000000000e5
-364 3 8 21 -0.32768000000000000000e5
-364 3 9 22 -0.32768000000000000000e5
-364 3 16 29 -0.16384000000000000000e5
-364 3 17 30 -0.32768000000000000000e5
-364 3 18 23 -0.32768000000000000000e5
-364 3 18 31 -0.32768000000000000000e5
-364 3 22 27 -0.16384000000000000000e5
-364 4 4 16 -0.32768000000000000000e5
-364 4 8 20 -0.32768000000000000000e5
-364 4 12 16 -0.32768000000000000000e5
-364 4 14 18 -0.16384000000000000000e5
-365 1 9 35 0.32768000000000000000e5
-365 1 19 34 -0.32768000000000000000e5
-366 1 6 13 -0.16384000000000000000e5
-366 1 10 10 0.32768000000000000000e5
-367 1 4 11 0.81920000000000000000e4
-367 1 5 12 0.81920000000000000000e4
-367 1 6 21 -0.81920000000000000000e4
-367 1 7 10 -0.16384000000000000000e5
-367 1 7 22 -0.16384000000000000000e5
-367 1 8 23 -0.16384000000000000000e5
-367 1 10 11 0.32768000000000000000e5
-367 1 11 26 -0.81920000000000000000e4
-367 1 12 19 -0.81920000000000000000e4
-367 2 2 16 -0.81920000000000000000e4
-367 2 6 8 -0.16384000000000000000e5
-367 3 2 15 -0.32768000000000000000e5
-367 3 5 10 0.81920000000000000000e4
-367 3 7 20 -0.81920000000000000000e4
-367 4 4 8 0.81920000000000000000e4
-367 4 5 9 0.16384000000000000000e5
-368 1 7 14 -0.32768000000000000000e5
-368 1 10 12 0.32768000000000000000e5
-369 1 4 11 0.40960000000000000000e4
-369 1 5 12 0.40960000000000000000e4
-369 1 6 21 -0.40960000000000000000e4
-369 1 7 10 -0.81920000000000000000e4
-369 1 7 22 -0.81920000000000000000e4
-369 1 8 23 -0.81920000000000000000e4
-369 1 10 14 0.32768000000000000000e5
-369 1 10 25 -0.32768000000000000000e5
-369 1 11 26 -0.40960000000000000000e4
-369 1 12 19 -0.40960000000000000000e4
-369 1 13 20 0.16384000000000000000e5
-369 2 2 16 -0.40960000000000000000e4
-369 2 6 8 -0.81920000000000000000e4
-369 3 2 15 -0.32768000000000000000e5
-369 3 5 10 0.40960000000000000000e4
-369 3 7 20 -0.40960000000000000000e4
-369 3 8 13 -0.16384000000000000000e5
-369 4 4 8 0.40960000000000000000e4
-369 4 5 9 0.81920000000000000000e4
-369 4 8 8 -0.32768000000000000000e5
-370 1 4 11 0.20480000000000000000e4
-370 1 5 12 0.20480000000000000000e4
-370 1 6 21 -0.20480000000000000000e4
-370 1 7 10 -0.40960000000000000000e4
-370 1 7 22 -0.40960000000000000000e4
-370 1 8 15 -0.16384000000000000000e5
-370 1 8 23 -0.40960000000000000000e4
-370 1 10 13 -0.16384000000000000000e5
-370 1 10 15 0.32768000000000000000e5
-370 1 10 25 -0.16384000000000000000e5
-370 1 11 26 -0.20480000000000000000e4
-370 1 12 19 -0.20480000000000000000e4
-370 1 13 20 0.81920000000000000000e4
-370 2 2 16 -0.20480000000000000000e4
-370 2 6 8 -0.40960000000000000000e4
-370 2 8 10 -0.16384000000000000000e5
-370 3 2 15 -0.16384000000000000000e5
-370 3 5 10 0.20480000000000000000e4
-370 3 7 20 -0.20480000000000000000e4
-370 3 8 13 -0.81920000000000000000e4
-370 4 4 8 0.20480000000000000000e4
-370 4 5 9 0.40960000000000000000e4
-370 4 8 8 -0.16384000000000000000e5
-371 1 1 8 0.32768000000000000000e5
-371 1 2 9 0.16384000000000000000e5
-371 1 4 11 -0.65536000000000000000e5
-371 1 5 12 -0.32768000000000000000e5
-371 1 5 20 -0.32768000000000000000e5
-371 1 6 21 -0.32768000000000000000e5
-371 1 7 10 -0.65536000000000000000e5
-371 1 7 22 0.32768000000000000000e5
-371 1 8 23 0.65536000000000000000e5
-371 1 9 16 -0.16384000000000000000e5
-371 1 10 16 0.32768000000000000000e5
-371 1 11 26 0.65536000000000000000e5
-371 1 12 19 0.32768000000000000000e5
-371 1 12 27 -0.32768000000000000000e5
-371 2 1 7 0.16384000000000000000e5
-371 2 1 15 0.16384000000000000000e5
-371 2 2 8 0.32768000000000000000e5
-371 2 3 9 -0.32768000000000000000e5
-371 2 6 12 -0.32768000000000000000e5
-371 3 1 6 0.16384000000000000000e5
-371 3 1 14 -0.65536000000000000000e5
-371 3 2 7 0.32768000000000000000e5
-371 3 2 15 0.13107200000000000000e6
-371 3 5 10 -0.65536000000000000000e5
-371 3 7 20 0.65536000000000000000e5
-371 3 8 21 -0.32768000000000000000e5
-371 4 1 5 0.16384000000000000000e5
-371 4 4 8 -0.32768000000000000000e5
-371 4 5 9 -0.65536000000000000000e5
-372 1 6 21 -0.32768000000000000000e5
-372 1 10 17 0.32768000000000000000e5
-373 1 10 18 0.32768000000000000000e5
-373 1 11 26 -0.32768000000000000000e5
-373 3 7 20 -0.32768000000000000000e5
-374 1 7 22 -0.32768000000000000000e5
-374 1 10 19 0.32768000000000000000e5
-375 1 6 21 0.16384000000000000000e5
-375 1 7 22 0.16384000000000000000e5
-375 1 8 23 0.32768000000000000000e5
-375 1 10 20 0.32768000000000000000e5
-375 1 11 26 0.16384000000000000000e5
-375 1 13 20 -0.65536000000000000000e5
-375 2 2 16 0.16384000000000000000e5
-375 2 8 14 0.32768000000000000000e5
-375 3 7 20 0.16384000000000000000e5
-376 1 6 21 -0.16384000000000000000e5
-376 1 7 22 -0.16384000000000000000e5
-376 1 10 21 0.32768000000000000000e5
-376 1 11 26 -0.16384000000000000000e5
-376 2 2 16 -0.16384000000000000000e5
-376 3 7 20 -0.16384000000000000000e5
-377 1 8 23 -0.32768000000000000000e5
-377 1 10 22 0.32768000000000000000e5
-378 1 10 23 0.32768000000000000000e5
-378 1 13 20 -0.32768000000000000000e5
-379 1 7 14 -0.32768000000000000000e5
-379 1 10 24 0.32768000000000000000e5
-379 3 2 15 0.32768000000000000000e5
-380 1 10 26 0.32768000000000000000e5
-380 1 16 23 -0.32768000000000000000e5
-381 1 10 27 0.32768000000000000000e5
-381 1 11 26 -0.32768000000000000000e5
-382 1 10 28 0.32768000000000000000e5
-382 1 17 24 -0.32768000000000000000e5
-383 1 10 29 0.32768000000000000000e5
-383 1 11 26 -0.16384000000000000000e5
-383 1 16 23 -0.16384000000000000000e5
-383 1 17 24 -0.16384000000000000000e5
-383 2 5 19 -0.16384000000000000000e5
-384 1 7 22 0.16384000000000000000e5
-384 1 8 23 -0.32768000000000000000e5
-384 1 10 30 0.32768000000000000000e5
-384 1 17 24 -0.16384000000000000000e5
-384 3 7 20 0.16384000000000000000e5
-384 3 8 21 0.16384000000000000000e5
-384 4 8 12 0.16384000000000000000e5
-385 1 7 14 -0.32768000000000000000e5
-385 1 10 31 0.32768000000000000000e5
-385 3 2 15 0.32768000000000000000e5
-385 3 10 23 0.32768000000000000000e5
-386 1 10 32 0.32768000000000000000e5
-386 1 16 31 -0.32768000000000000000e5
-387 1 10 33 0.32768000000000000000e5
-387 1 17 24 -0.32768000000000000000e5
-387 3 2 31 0.32768000000000000000e5
-388 1 7 22 0.16384000000000000000e5
-388 1 8 23 -0.32768000000000000000e5
-388 1 10 34 0.32768000000000000000e5
-388 1 17 24 -0.16384000000000000000e5
-388 3 7 20 0.16384000000000000000e5
-388 3 8 21 0.16384000000000000000e5
-388 3 13 26 0.32768000000000000000e5
-388 4 8 12 0.16384000000000000000e5
-389 1 3 34 0.16384000000000000000e5
-389 1 10 35 0.32768000000000000000e5
-389 1 17 24 -0.32768000000000000000e5
-389 1 20 35 -0.16384000000000000000e5
-389 2 6 20 0.16384000000000000000e5
-389 2 14 20 -0.16384000000000000000e5
-389 3 2 31 0.32768000000000000000e5
-389 3 6 35 -0.16384000000000000000e5
-389 3 16 29 0.16384000000000000000e5
-389 3 17 30 0.16384000000000000000e5
-390 1 7 14 -0.16384000000000000000e5
-390 1 11 11 0.32768000000000000000e5
-391 1 11 12 0.32768000000000000000e5
-391 1 14 21 -0.32768000000000000000e5
-391 3 8 13 -0.32768000000000000000e5
-392 1 4 11 0.40960000000000000000e4
-392 1 5 12 0.40960000000000000000e4
-392 1 6 21 -0.40960000000000000000e4
-392 1 7 10 -0.81920000000000000000e4
-392 1 7 22 -0.81920000000000000000e4
-392 1 8 23 -0.81920000000000000000e4
-392 1 10 25 -0.32768000000000000000e5
-392 1 11 13 0.32768000000000000000e5
-392 1 11 26 -0.40960000000000000000e4
-392 1 12 19 -0.40960000000000000000e4
-392 1 13 20 0.16384000000000000000e5
-392 2 2 16 -0.40960000000000000000e4
-392 2 6 8 -0.81920000000000000000e4
-392 3 2 15 -0.32768000000000000000e5
-392 3 5 10 0.40960000000000000000e4
-392 3 7 20 -0.40960000000000000000e4
-392 3 8 13 -0.16384000000000000000e5
-392 4 4 8 0.40960000000000000000e4
-392 4 5 9 0.81920000000000000000e4
-392 4 8 8 -0.32768000000000000000e5
-393 1 8 15 -0.32768000000000000000e5
-393 1 11 14 0.32768000000000000000e5
-394 1 8 15 -0.16384000000000000000e5
-394 1 10 25 -0.16384000000000000000e5
-394 1 11 15 0.32768000000000000000e5
-394 1 15 22 -0.16384000000000000000e5
-394 2 10 16 -0.16384000000000000000e5
-394 3 2 15 0.81920000000000000000e4
-394 3 8 13 0.81920000000000000000e4
-394 3 10 15 -0.32768000000000000000e5
-394 3 11 12 0.81920000000000000000e4
-394 4 6 10 0.81920000000000000000e4
-395 1 6 21 -0.32768000000000000000e5
-395 1 11 16 0.32768000000000000000e5
-396 1 11 17 0.32768000000000000000e5
-396 1 11 26 -0.32768000000000000000e5
-396 3 7 20 -0.32768000000000000000e5
-397 1 7 22 -0.32768000000000000000e5
-397 1 11 18 0.32768000000000000000e5
-398 1 11 19 0.32768000000000000000e5
-398 1 12 27 -0.32768000000000000000e5
-398 3 8 21 -0.32768000000000000000e5
-399 1 6 21 -0.16384000000000000000e5
-399 1 7 22 -0.16384000000000000000e5
-399 1 11 20 0.32768000000000000000e5
-399 1 11 26 -0.16384000000000000000e5
-399 2 2 16 -0.16384000000000000000e5
-399 3 7 20 -0.16384000000000000000e5
-400 1 8 23 -0.32768000000000000000e5
-400 1 11 21 0.32768000000000000000e5
-401 1 11 22 0.32768000000000000000e5
-401 1 13 28 -0.32768000000000000000e5
-401 3 13 18 -0.32768000000000000000e5
-402 1 7 14 -0.32768000000000000000e5
-402 1 11 23 0.32768000000000000000e5
-402 3 2 15 0.32768000000000000000e5
-403 1 11 24 0.32768000000000000000e5
-403 1 14 21 -0.32768000000000000000e5
-404 1 8 15 -0.32768000000000000000e5
-404 1 11 25 0.32768000000000000000e5
-404 3 2 15 0.16384000000000000000e5
-404 3 8 13 0.16384000000000000000e5
-404 3 11 12 0.16384000000000000000e5
-404 4 6 10 0.16384000000000000000e5
-405 1 11 27 0.32768000000000000000e5
-405 1 17 24 -0.32768000000000000000e5
-406 1 11 28 0.32768000000000000000e5
-406 1 12 27 -0.32768000000000000000e5
-407 1 7 22 0.16384000000000000000e5
-407 1 8 23 -0.32768000000000000000e5
-407 1 11 29 0.32768000000000000000e5
-407 1 17 24 -0.16384000000000000000e5
-407 3 7 20 0.16384000000000000000e5
-407 3 8 21 0.16384000000000000000e5
-407 4 8 12 0.16384000000000000000e5
-408 1 11 30 0.32768000000000000000e5
-408 1 13 28 -0.32768000000000000000e5
-409 1 11 31 0.32768000000000000000e5
-409 1 14 29 -0.32768000000000000000e5
-410 1 11 32 0.32768000000000000000e5
-410 1 17 24 -0.32768000000000000000e5
-410 3 2 31 0.32768000000000000000e5
-411 1 11 33 0.32768000000000000000e5
-411 1 12 27 -0.32768000000000000000e5
-411 3 18 23 0.32768000000000000000e5
-412 1 3 34 -0.16384000000000000000e5
-412 1 11 34 0.32768000000000000000e5
-412 1 20 35 0.16384000000000000000e5
-412 1 25 32 -0.32768000000000000000e5
-412 2 6 20 -0.81920000000000000000e4
-412 2 14 20 0.81920000000000000000e4
-412 3 6 35 0.16384000000000000000e5
-412 3 16 29 -0.81920000000000000000e4
-412 3 17 30 -0.16384000000000000000e5
-412 3 18 31 -0.16384000000000000000e5
-412 3 22 27 -0.81920000000000000000e4
-412 4 8 20 -0.16384000000000000000e5
-412 4 14 18 -0.81920000000000000000e4
-413 1 3 34 0.16384000000000000000e5
-413 1 11 35 0.32768000000000000000e5
-413 1 12 27 -0.32768000000000000000e5
-413 1 20 35 -0.16384000000000000000e5
-413 3 6 35 -0.16384000000000000000e5
-413 3 17 30 0.16384000000000000000e5
-413 3 18 23 0.32768000000000000000e5
-413 3 22 27 0.16384000000000000000e5
-413 4 14 18 0.16384000000000000000e5
-414 1 12 12 0.32768000000000000000e5
-414 1 22 25 -0.16384000000000000000e5
-414 3 11 12 -0.16384000000000000000e5
-414 3 11 24 -0.16384000000000000000e5
-415 1 8 15 -0.32768000000000000000e5
-415 1 12 13 0.32768000000000000000e5
-416 1 12 14 0.32768000000000000000e5
-416 1 15 22 -0.32768000000000000000e5
-416 3 12 13 -0.32768000000000000000e5
-417 1 11 26 -0.32768000000000000000e5
-417 1 12 16 0.32768000000000000000e5
-417 3 7 20 -0.32768000000000000000e5
-418 1 7 22 -0.32768000000000000000e5
-418 1 12 17 0.32768000000000000000e5
-419 1 12 18 0.32768000000000000000e5
-419 1 12 27 -0.32768000000000000000e5
-419 3 8 21 -0.32768000000000000000e5
-420 1 8 23 -0.32768000000000000000e5
-420 1 12 20 0.32768000000000000000e5
-421 1 12 21 0.32768000000000000000e5
-421 1 13 28 -0.32768000000000000000e5
-421 3 13 18 -0.32768000000000000000e5
-422 1 9 24 -0.32768000000000000000e5
-422 1 12 22 0.32768000000000000000e5
-423 1 12 23 0.32768000000000000000e5
-423 1 14 21 -0.32768000000000000000e5
-424 1 12 24 0.32768000000000000000e5
-424 1 22 25 -0.32768000000000000000e5
-424 3 11 24 -0.32768000000000000000e5
-425 1 12 25 0.32768000000000000000e5
-425 1 15 22 -0.32768000000000000000e5
-426 1 12 26 0.32768000000000000000e5
-426 1 17 24 -0.32768000000000000000e5
-427 1 12 19 -0.32768000000000000000e5
-427 1 12 28 0.32768000000000000000e5
-427 3 4 25 0.65536000000000000000e5
-427 3 8 21 -0.32768000000000000000e5
-427 3 9 22 -0.32768000000000000000e5
-427 4 4 16 -0.32768000000000000000e5
-428 1 12 29 0.32768000000000000000e5
-428 1 13 28 -0.32768000000000000000e5
-429 1 9 24 -0.32768000000000000000e5
-429 1 12 30 0.32768000000000000000e5
-429 3 4 25 0.32768000000000000000e5
-430 1 12 31 0.32768000000000000000e5
-430 1 22 25 -0.32768000000000000000e5
-431 1 12 27 -0.32768000000000000000e5
-431 1 12 32 0.32768000000000000000e5
-431 3 18 23 0.32768000000000000000e5
-432 1 3 34 -0.32768000000000000000e5
-432 1 12 19 -0.32768000000000000000e5
-432 1 12 33 0.32768000000000000000e5
-432 1 13 28 0.65536000000000000000e5
-432 1 20 35 0.32768000000000000000e5
-432 1 25 32 -0.65536000000000000000e5
-432 2 6 20 -0.16384000000000000000e5
-432 2 14 20 0.16384000000000000000e5
-432 3 2 31 -0.32768000000000000000e5
-432 3 4 25 0.65536000000000000000e5
-432 3 6 35 0.32768000000000000000e5
-432 3 8 21 -0.32768000000000000000e5
-432 3 9 22 -0.32768000000000000000e5
-432 3 16 29 -0.16384000000000000000e5
-432 3 17 30 -0.32768000000000000000e5
-432 3 18 23 -0.32768000000000000000e5
-432 3 18 31 -0.32768000000000000000e5
-432 3 22 27 -0.16384000000000000000e5
-432 4 4 16 -0.32768000000000000000e5
-432 4 8 20 -0.32768000000000000000e5
-432 4 12 16 -0.32768000000000000000e5
-432 4 14 18 -0.16384000000000000000e5
-433 1 9 24 -0.32768000000000000000e5
-433 1 12 34 0.32768000000000000000e5
-433 3 4 25 0.32768000000000000000e5
-433 3 14 27 0.32768000000000000000e5
-434 1 3 34 -0.32768000000000000000e5
-434 1 12 19 -0.32768000000000000000e5
-434 1 12 35 0.32768000000000000000e5
-434 1 13 28 0.65536000000000000000e5
-434 1 20 35 0.32768000000000000000e5
-434 1 25 32 -0.65536000000000000000e5
-434 2 6 20 -0.16384000000000000000e5
-434 2 14 20 0.16384000000000000000e5
-434 3 2 31 -0.32768000000000000000e5
-434 3 4 25 0.65536000000000000000e5
-434 3 6 35 0.32768000000000000000e5
-434 3 8 21 -0.32768000000000000000e5
-434 3 9 22 -0.32768000000000000000e5
-434 3 16 29 -0.16384000000000000000e5
-434 3 17 30 -0.32768000000000000000e5
-434 3 18 23 -0.32768000000000000000e5
-434 3 22 27 -0.16384000000000000000e5
-434 4 4 16 -0.32768000000000000000e5
-434 4 8 20 -0.32768000000000000000e5
-434 4 12 16 -0.32768000000000000000e5
-434 4 14 18 -0.16384000000000000000e5
-435 1 4 11 0.10240000000000000000e4
-435 1 5 12 0.10240000000000000000e4
-435 1 6 21 -0.10240000000000000000e4
-435 1 7 10 -0.20480000000000000000e4
-435 1 7 22 -0.20480000000000000000e4
-435 1 8 15 -0.81920000000000000000e4
-435 1 8 23 -0.20480000000000000000e4
-435 1 10 13 -0.81920000000000000000e4
-435 1 10 25 -0.81920000000000000000e4
-435 1 11 26 -0.10240000000000000000e4
-435 1 12 19 -0.10240000000000000000e4
-435 1 13 13 0.32768000000000000000e5
-435 1 13 20 0.40960000000000000000e4
-435 2 2 16 -0.10240000000000000000e4
-435 2 6 8 -0.20480000000000000000e4
-435 2 8 10 -0.81920000000000000000e4
-435 3 2 15 -0.81920000000000000000e4
-435 3 5 10 0.10240000000000000000e4
-435 3 7 20 -0.10240000000000000000e4
-435 3 8 13 -0.40960000000000000000e4
-435 4 4 8 0.10240000000000000000e4
-435 4 5 9 0.20480000000000000000e4
-435 4 8 8 -0.81920000000000000000e4
-436 1 8 15 -0.16384000000000000000e5
-436 1 10 25 -0.16384000000000000000e5
-436 1 13 14 0.32768000000000000000e5
-436 1 15 22 -0.16384000000000000000e5
-436 2 10 16 -0.16384000000000000000e5
-436 3 2 15 0.81920000000000000000e4
-436 3 8 13 0.81920000000000000000e4
-436 3 10 15 -0.32768000000000000000e5
-436 3 11 12 0.81920000000000000000e4
-436 4 6 10 0.81920000000000000000e4
-437 1 4 11 0.10240000000000000000e4
-437 1 5 12 0.10240000000000000000e4
-437 1 6 21 -0.10240000000000000000e4
-437 1 7 10 -0.20480000000000000000e4
-437 1 7 22 -0.20480000000000000000e4
-437 1 8 15 -0.16384000000000000000e5
-437 1 8 23 -0.20480000000000000000e4
-437 1 10 13 -0.81920000000000000000e4
-437 1 10 25 -0.16384000000000000000e5
-437 1 11 26 -0.10240000000000000000e4
-437 1 12 15 -0.16384000000000000000e5
-437 1 12 19 -0.10240000000000000000e4
-437 1 13 15 0.32768000000000000000e5
-437 1 13 20 0.40960000000000000000e4
-437 1 15 22 -0.81920000000000000000e4
-437 2 2 16 -0.10240000000000000000e4
-437 2 6 8 -0.20480000000000000000e4
-437 2 8 10 -0.81920000000000000000e4
-437 2 10 10 -0.32768000000000000000e5
-437 2 10 16 -0.81920000000000000000e4
-437 3 2 15 -0.40960000000000000000e4
-437 3 5 10 0.10240000000000000000e4
-437 3 7 20 -0.10240000000000000000e4
-437 3 10 15 -0.16384000000000000000e5
-437 3 11 12 0.40960000000000000000e4
-437 4 4 8 0.10240000000000000000e4
-437 4 5 9 0.20480000000000000000e4
-437 4 6 10 0.40960000000000000000e4
-437 4 8 8 -0.81920000000000000000e4
-438 1 6 21 0.16384000000000000000e5
-438 1 7 22 0.16384000000000000000e5
-438 1 8 23 0.32768000000000000000e5
-438 1 11 26 0.16384000000000000000e5
-438 1 13 16 0.32768000000000000000e5
-438 1 13 20 -0.65536000000000000000e5
-438 2 2 16 0.16384000000000000000e5
-438 2 8 14 0.32768000000000000000e5
-438 3 7 20 0.16384000000000000000e5
-439 1 6 21 -0.16384000000000000000e5
-439 1 7 22 -0.16384000000000000000e5
-439 1 11 26 -0.16384000000000000000e5
-439 1 13 17 0.32768000000000000000e5
-439 2 2 16 -0.16384000000000000000e5
-439 3 7 20 -0.16384000000000000000e5
-440 1 8 23 -0.32768000000000000000e5
-440 1 13 18 0.32768000000000000000e5
-441 1 13 19 0.32768000000000000000e5
-441 1 13 28 -0.32768000000000000000e5
-441 3 13 18 -0.32768000000000000000e5
-442 1 7 14 -0.32768000000000000000e5
-442 1 13 21 0.32768000000000000000e5
-442 3 2 15 0.32768000000000000000e5
-443 1 13 22 0.32768000000000000000e5
-443 1 14 21 -0.32768000000000000000e5
-444 1 10 25 -0.32768000000000000000e5
-444 1 13 23 0.32768000000000000000e5
-445 1 8 15 -0.32768000000000000000e5
-445 1 13 24 0.32768000000000000000e5
-445 3 2 15 0.16384000000000000000e5
-445 3 8 13 0.16384000000000000000e5
-445 3 11 12 0.16384000000000000000e5
-445 4 6 10 0.16384000000000000000e5
-446 1 8 15 -0.16384000000000000000e5
-446 1 10 25 -0.16384000000000000000e5
-446 1 13 25 0.32768000000000000000e5
-446 1 15 22 -0.16384000000000000000e5
-446 2 10 16 -0.16384000000000000000e5
-446 3 2 15 0.81920000000000000000e4
-446 3 8 13 0.81920000000000000000e4
-446 3 11 12 0.81920000000000000000e4
-446 4 6 10 0.81920000000000000000e4
-447 1 11 26 -0.16384000000000000000e5
-447 1 13 26 0.32768000000000000000e5
-447 1 16 23 -0.16384000000000000000e5
-447 1 17 24 -0.16384000000000000000e5
-447 2 5 19 -0.16384000000000000000e5
-448 1 7 22 0.16384000000000000000e5
-448 1 8 23 -0.32768000000000000000e5
-448 1 13 27 0.32768000000000000000e5
-448 1 17 24 -0.16384000000000000000e5
-448 3 7 20 0.16384000000000000000e5
-448 3 8 21 0.16384000000000000000e5
-448 4 8 12 0.16384000000000000000e5
-449 1 7 14 -0.32768000000000000000e5
-449 1 13 29 0.32768000000000000000e5
-449 3 2 15 0.32768000000000000000e5
-449 3 10 23 0.32768000000000000000e5
-450 1 13 30 0.32768000000000000000e5
-450 1 14 29 -0.32768000000000000000e5
-451 1 8 15 -0.32768000000000000000e5
-451 1 13 31 0.32768000000000000000e5
-451 1 14 21 0.16384000000000000000e5
-451 1 14 29 -0.16384000000000000000e5
-451 3 2 15 0.16384000000000000000e5
-451 3 8 13 0.16384000000000000000e5
-451 3 10 23 0.16384000000000000000e5
-451 3 11 12 0.16384000000000000000e5
-451 3 11 24 0.16384000000000000000e5
-451 4 6 10 0.16384000000000000000e5
-451 4 10 14 0.16384000000000000000e5
-452 1 7 22 0.16384000000000000000e5
-452 1 8 23 -0.32768000000000000000e5
-452 1 13 32 0.32768000000000000000e5
-452 1 17 24 -0.16384000000000000000e5
-452 3 7 20 0.16384000000000000000e5
-452 3 8 21 0.16384000000000000000e5
-452 3 13 26 0.32768000000000000000e5
-452 4 8 12 0.16384000000000000000e5
-453 1 3 34 -0.16384000000000000000e5
-453 1 13 33 0.32768000000000000000e5
-453 1 20 35 0.16384000000000000000e5
-453 1 25 32 -0.32768000000000000000e5
-453 2 6 20 -0.81920000000000000000e4
-453 2 14 20 0.81920000000000000000e4
-453 3 6 35 0.16384000000000000000e5
-453 3 16 29 -0.81920000000000000000e4
-453 3 17 30 -0.16384000000000000000e5
-453 3 18 31 -0.16384000000000000000e5
-453 3 22 27 -0.81920000000000000000e4
-453 4 8 20 -0.16384000000000000000e5
-453 4 14 18 -0.81920000000000000000e4
-454 1 13 34 0.32768000000000000000e5
-454 1 14 29 -0.32768000000000000000e5
-454 3 20 25 0.32768000000000000000e5
-455 1 13 35 0.32768000000000000000e5
-455 1 25 32 -0.32768000000000000000e5
-456 1 12 15 -0.16384000000000000000e5
-456 1 14 14 0.32768000000000000000e5
-457 1 6 21 -0.16384000000000000000e5
-457 1 7 22 -0.16384000000000000000e5
-457 1 11 26 -0.16384000000000000000e5
-457 1 14 16 0.32768000000000000000e5
-457 2 2 16 -0.16384000000000000000e5
-457 3 7 20 -0.16384000000000000000e5
-458 1 8 23 -0.32768000000000000000e5
-458 1 14 17 0.32768000000000000000e5
-459 1 13 28 -0.32768000000000000000e5
-459 1 14 18 0.32768000000000000000e5
-459 3 13 18 -0.32768000000000000000e5
-460 1 9 24 -0.32768000000000000000e5
-460 1 14 19 0.32768000000000000000e5
-461 1 7 14 -0.32768000000000000000e5
-461 1 14 20 0.32768000000000000000e5
-461 3 2 15 0.32768000000000000000e5
-462 1 14 22 0.32768000000000000000e5
-462 1 22 25 -0.32768000000000000000e5
-462 3 11 24 -0.32768000000000000000e5
-463 1 8 15 -0.32768000000000000000e5
-463 1 14 23 0.32768000000000000000e5
-463 3 2 15 0.16384000000000000000e5
-463 3 8 13 0.16384000000000000000e5
-463 3 11 12 0.16384000000000000000e5
-463 4 6 10 0.16384000000000000000e5
-464 1 14 24 0.32768000000000000000e5
-464 1 15 22 -0.32768000000000000000e5
-465 1 12 15 -0.32768000000000000000e5
-465 1 14 25 0.32768000000000000000e5
-465 3 13 14 0.32768000000000000000e5
-466 1 7 22 0.16384000000000000000e5
-466 1 8 23 -0.32768000000000000000e5
-466 1 14 26 0.32768000000000000000e5
-466 1 17 24 -0.16384000000000000000e5
-466 3 7 20 0.16384000000000000000e5
-466 3 8 21 0.16384000000000000000e5
-466 4 8 12 0.16384000000000000000e5
-467 1 13 28 -0.32768000000000000000e5
-467 1 14 27 0.32768000000000000000e5
-468 1 9 24 -0.32768000000000000000e5
-468 1 14 28 0.32768000000000000000e5
-468 3 4 25 0.32768000000000000000e5
-469 1 14 30 0.32768000000000000000e5
-469 1 22 25 -0.32768000000000000000e5
-470 1 14 31 0.32768000000000000000e5
-470 1 15 30 -0.32768000000000000000e5
-471 1 3 34 -0.16384000000000000000e5
-471 1 14 32 0.32768000000000000000e5
-471 1 20 35 0.16384000000000000000e5
-471 1 25 32 -0.32768000000000000000e5
-471 2 6 20 -0.81920000000000000000e4
-471 2 14 20 0.81920000000000000000e4
-471 3 6 35 0.16384000000000000000e5
-471 3 16 29 -0.81920000000000000000e4
-471 3 17 30 -0.16384000000000000000e5
-471 3 18 31 -0.16384000000000000000e5
-471 3 22 27 -0.81920000000000000000e4
-471 4 8 20 -0.16384000000000000000e5
-471 4 14 18 -0.81920000000000000000e4
-472 1 9 24 -0.32768000000000000000e5
-472 1 14 33 0.32768000000000000000e5
-472 3 4 25 0.32768000000000000000e5
-472 3 14 27 0.32768000000000000000e5
-473 1 14 34 0.32768000000000000000e5
-473 1 24 31 -0.32768000000000000000e5
-474 1 9 24 -0.32768000000000000000e5
-474 1 14 35 0.32768000000000000000e5
-474 3 4 25 0.32768000000000000000e5
-474 3 14 27 0.32768000000000000000e5
-474 3 24 29 0.32768000000000000000e5
-475 1 13 20 -0.32768000000000000000e5
-475 1 15 16 0.32768000000000000000e5
-476 1 7 14 -0.32768000000000000000e5
-476 1 15 17 0.32768000000000000000e5
-476 3 2 15 0.32768000000000000000e5
-477 1 14 21 -0.32768000000000000000e5
-477 1 15 18 0.32768000000000000000e5
-478 1 15 19 0.32768000000000000000e5
-478 1 22 25 -0.32768000000000000000e5
-478 3 11 24 -0.32768000000000000000e5
-479 1 10 25 -0.32768000000000000000e5
-479 1 15 20 0.32768000000000000000e5
-480 1 8 15 -0.32768000000000000000e5
-480 1 15 21 0.32768000000000000000e5
-480 3 2 15 0.16384000000000000000e5
-480 3 8 13 0.16384000000000000000e5
-480 3 11 12 0.16384000000000000000e5
-480 4 6 10 0.16384000000000000000e5
-481 1 8 15 -0.16384000000000000000e5
-481 1 10 25 -0.16384000000000000000e5
-481 1 15 22 -0.16384000000000000000e5
-481 1 15 23 0.32768000000000000000e5
-481 2 10 16 -0.16384000000000000000e5
-481 3 2 15 0.81920000000000000000e4
-481 3 8 13 0.81920000000000000000e4
-481 3 11 12 0.81920000000000000000e4
-481 4 6 10 0.81920000000000000000e4
-482 1 12 15 -0.32768000000000000000e5
-482 1 15 24 0.32768000000000000000e5
-482 3 13 14 0.32768000000000000000e5
-483 1 14 15 -0.32768000000000000000e5
-483 1 15 25 0.32768000000000000000e5
-483 3 10 15 0.16384000000000000000e5
-483 3 12 15 0.16384000000000000000e5
-483 3 13 14 0.16384000000000000000e5
-483 4 10 10 0.32768000000000000000e5
-484 1 7 14 -0.32768000000000000000e5
-484 1 15 26 0.32768000000000000000e5
-484 3 2 15 0.32768000000000000000e5
-484 3 10 23 0.32768000000000000000e5
-485 1 14 29 -0.32768000000000000000e5
-485 1 15 27 0.32768000000000000000e5
-486 1 15 28 0.32768000000000000000e5
-486 1 22 25 -0.32768000000000000000e5
-487 1 8 15 -0.32768000000000000000e5
-487 1 14 21 0.16384000000000000000e5
-487 1 14 29 -0.16384000000000000000e5
-487 1 15 29 0.32768000000000000000e5
-487 3 2 15 0.16384000000000000000e5
-487 3 8 13 0.16384000000000000000e5
-487 3 10 23 0.16384000000000000000e5
-487 3 11 12 0.16384000000000000000e5
-487 3 11 24 0.16384000000000000000e5
-487 4 6 10 0.16384000000000000000e5
-487 4 10 14 0.16384000000000000000e5
-488 1 12 15 -0.32768000000000000000e5
-488 1 14 21 0.81920000000000000000e4
-488 1 14 29 -0.81920000000000000000e4
-488 1 15 22 0.16384000000000000000e5
-488 1 15 30 -0.16384000000000000000e5
-488 1 15 31 0.32768000000000000000e5
-488 3 10 23 0.81920000000000000000e4
-488 3 11 24 0.81920000000000000000e4
-488 3 12 25 0.16384000000000000000e5
-488 3 13 14 0.32768000000000000000e5
-488 4 10 14 0.81920000000000000000e4
-488 4 10 16 0.16384000000000000000e5
-489 1 14 29 -0.32768000000000000000e5
-489 1 15 32 0.32768000000000000000e5
-489 3 20 25 0.32768000000000000000e5
-490 1 15 33 0.32768000000000000000e5
-490 1 24 31 -0.32768000000000000000e5
-491 1 15 30 -0.32768000000000000000e5
-491 1 15 34 0.32768000000000000000e5
-491 1 22 25 0.16384000000000000000e5
-491 1 24 31 -0.16384000000000000000e5
-491 3 15 28 0.16384000000000000000e5
-491 3 20 25 0.16384000000000000000e5
-491 4 16 16 0.32768000000000000000e5
-492 1 15 35 0.32768000000000000000e5
-492 1 24 31 -0.32768000000000000000e5
-492 3 13 34 0.32768000000000000000e5
-493 1 3 18 -0.16384000000000000000e5
-493 1 5 20 -0.65536000000000000000e5
-493 1 9 16 0.32768000000000000000e5
-493 1 11 26 0.13107200000000000000e6
-493 1 16 16 0.32768000000000000000e5
-493 1 16 23 -0.65536000000000000000e5
-493 1 20 27 -0.65536000000000000000e5
-493 2 1 19 0.32768000000000000000e5
-493 2 6 12 -0.65536000000000000000e5
-493 2 11 11 0.32768000000000000000e5
-493 2 11 17 -0.16384000000000000000e5
-493 3 1 30 -0.65536000000000000000e5
-493 3 3 16 -0.16384000000000000000e5
-493 3 4 17 -0.16384000000000000000e5
-493 3 6 19 0.65536000000000000000e5
-493 4 1 13 -0.16384000000000000000e5
-493 4 2 14 0.65536000000000000000e5
-493 4 11 11 -0.32768000000000000000e5
-494 1 4 27 -0.32768000000000000000e5
-494 1 5 20 0.65536000000000000000e5
-494 1 11 26 -0.13107200000000000000e6
-494 1 16 17 0.32768000000000000000e5
-494 1 20 27 0.13107200000000000000e6
-494 2 3 17 -0.32768000000000000000e5
-494 2 6 12 0.65536000000000000000e5
-494 2 11 17 0.32768000000000000000e5
-494 3 1 30 0.13107200000000000000e6
-494 3 6 19 -0.65536000000000000000e5
-494 4 2 14 -0.65536000000000000000e5
-494 4 11 11 0.65536000000000000000e5
-495 1 3 18 0.32768000000000000000e5
-495 1 4 27 0.32768000000000000000e5
-495 1 9 16 -0.65536000000000000000e5
-495 1 16 18 0.32768000000000000000e5
-495 2 3 17 0.32768000000000000000e5
-495 3 3 16 0.32768000000000000000e5
-495 3 4 17 0.32768000000000000000e5
-495 4 1 13 0.32768000000000000000e5
-496 1 3 18 -0.32768000000000000000e5
-496 1 9 16 0.65536000000000000000e5
-496 1 16 19 0.32768000000000000000e5
-496 1 20 27 -0.65536000000000000000e5
-496 3 1 30 -0.65536000000000000000e5
-496 3 3 16 -0.32768000000000000000e5
-496 3 4 17 -0.32768000000000000000e5
-496 4 1 13 -0.32768000000000000000e5
-497 1 5 20 -0.32768000000000000000e5
-497 1 11 26 0.65536000000000000000e5
-497 1 16 20 0.32768000000000000000e5
-497 1 16 23 -0.65536000000000000000e5
-497 2 1 19 0.32768000000000000000e5
-497 2 6 12 -0.32768000000000000000e5
-497 3 6 19 0.32768000000000000000e5
-497 4 2 14 0.32768000000000000000e5
-498 1 5 20 0.32768000000000000000e5
-498 1 11 26 -0.65536000000000000000e5
-498 1 16 21 0.32768000000000000000e5
-498 1 20 27 0.32768000000000000000e5
-498 2 6 12 0.32768000000000000000e5
-498 3 1 30 0.32768000000000000000e5
-498 3 6 19 -0.32768000000000000000e5
-498 4 2 14 -0.32768000000000000000e5
-499 1 16 22 0.32768000000000000000e5
-499 1 20 27 -0.32768000000000000000e5
-499 3 1 30 -0.32768000000000000000e5
-500 1 11 26 -0.32768000000000000000e5
-500 1 16 24 0.32768000000000000000e5
-501 1 11 26 -0.16384000000000000000e5
-501 1 16 23 -0.16384000000000000000e5
-501 1 16 25 0.32768000000000000000e5
-501 1 17 24 -0.16384000000000000000e5
-501 2 5 19 -0.16384000000000000000e5
-502 1 1 32 -0.32768000000000000000e5
-502 1 16 26 0.32768000000000000000e5
-503 1 1 32 0.32768000000000000000e5
-503 1 2 33 0.32768000000000000000e5
-503 1 3 34 0.65536000000000000000e5
-503 1 16 27 0.32768000000000000000e5
-503 1 16 31 -0.13107200000000000000e6
-503 1 20 27 0.65536000000000000000e5
-503 2 6 12 0.65536000000000000000e5
-503 2 11 17 0.32768000000000000000e5
-503 4 2 14 -0.65536000000000000000e5
-503 4 5 17 -0.65536000000000000000e5
-504 1 2 33 -0.32768000000000000000e5
-504 1 16 28 0.32768000000000000000e5
-505 1 3 34 0.32768000000000000000e5
-505 1 16 29 0.32768000000000000000e5
-505 1 16 31 -0.65536000000000000000e5
-505 1 20 27 0.32768000000000000000e5
-505 2 6 12 0.32768000000000000000e5
-505 4 2 14 -0.32768000000000000000e5
-505 4 5 17 -0.32768000000000000000e5
-506 1 16 30 0.32768000000000000000e5
-506 1 20 27 -0.32768000000000000000e5
-507 1 2 33 -0.32768000000000000000e5
-507 1 3 34 0.65536000000000000000e5
-507 1 4 35 -0.32768000000000000000e5
-507 1 16 32 0.32768000000000000000e5
-507 1 17 32 0.32768000000000000000e5
-507 1 20 27 -0.65536000000000000000e5
-507 2 12 18 -0.32768000000000000000e5
-507 2 17 17 0.65536000000000000000e5
-507 3 4 33 0.32768000000000000000e5
-507 3 16 29 0.65536000000000000000e5
-507 3 17 30 -0.65536000000000000000e5
-507 4 13 17 0.32768000000000000000e5
-508 1 16 33 0.32768000000000000000e5
-508 1 17 32 -0.32768000000000000000e5
-509 1 16 34 0.32768000000000000000e5
-509 1 20 27 -0.32768000000000000000e5
-509 3 16 29 0.32768000000000000000e5
-510 1 2 33 0.32768000000000000000e5
-510 1 3 34 -0.65536000000000000000e5
-510 1 4 27 0.32768000000000000000e5
-510 1 4 35 0.32768000000000000000e5
-510 1 16 35 0.32768000000000000000e5
-510 1 17 32 -0.32768000000000000000e5
-510 2 4 18 0.32768000000000000000e5
-510 2 12 18 0.32768000000000000000e5
-510 2 18 20 -0.32768000000000000000e5
-510 3 3 32 -0.32768000000000000000e5
-510 3 4 33 -0.32768000000000000000e5
-510 3 5 26 0.32768000000000000000e5
-510 3 6 35 0.65536000000000000000e5
-510 3 17 22 -0.65536000000000000000e5
-510 3 17 30 0.65536000000000000000e5
-510 3 18 19 0.32768000000000000000e5
-510 3 19 32 0.32768000000000000000e5
-510 3 20 33 -0.65536000000000000000e5
-510 4 13 17 -0.65536000000000000000e5
-510 4 17 17 -0.65536000000000000000e5
-511 1 3 18 0.16384000000000000000e5
-511 1 4 27 0.16384000000000000000e5
-511 1 9 16 -0.32768000000000000000e5
-511 1 17 17 0.32768000000000000000e5
-511 2 3 17 0.16384000000000000000e5
-511 3 3 16 0.16384000000000000000e5
-511 3 4 17 0.16384000000000000000e5
-511 4 1 13 0.16384000000000000000e5
-512 1 3 18 -0.32768000000000000000e5
-512 1 9 16 0.65536000000000000000e5
-512 1 17 18 0.32768000000000000000e5
-512 1 20 27 -0.65536000000000000000e5
-512 3 1 30 -0.65536000000000000000e5
-512 3 3 16 -0.32768000000000000000e5
-512 3 4 17 -0.32768000000000000000e5
-512 4 1 13 -0.32768000000000000000e5
-513 1 4 27 -0.32768000000000000000e5
-513 1 17 19 0.32768000000000000000e5
-514 1 5 20 0.32768000000000000000e5
-514 1 11 26 -0.65536000000000000000e5
-514 1 17 20 0.32768000000000000000e5
-514 1 20 27 0.32768000000000000000e5
-514 2 6 12 0.32768000000000000000e5
-514 3 1 30 0.32768000000000000000e5
-514 3 6 19 -0.32768000000000000000e5
-514 4 2 14 -0.32768000000000000000e5
-515 1 17 21 0.32768000000000000000e5
-515 1 20 27 -0.32768000000000000000e5
-515 3 1 30 -0.32768000000000000000e5
-516 1 5 20 -0.32768000000000000000e5
-516 1 17 22 0.32768000000000000000e5
-516 3 6 19 0.32768000000000000000e5
-517 1 11 26 -0.32768000000000000000e5
-517 1 17 23 0.32768000000000000000e5
-518 1 7 22 0.16384000000000000000e5
-518 1 8 23 -0.32768000000000000000e5
-518 1 17 24 -0.16384000000000000000e5
-518 1 17 25 0.32768000000000000000e5
-518 3 7 20 0.16384000000000000000e5
-518 3 8 21 0.16384000000000000000e5
-518 4 8 12 0.16384000000000000000e5
-519 1 1 32 0.32768000000000000000e5
-519 1 2 33 0.32768000000000000000e5
-519 1 3 34 0.65536000000000000000e5
-519 1 16 31 -0.13107200000000000000e6
-519 1 17 26 0.32768000000000000000e5
-519 1 20 27 0.65536000000000000000e5
-519 2 6 12 0.65536000000000000000e5
-519 2 11 17 0.32768000000000000000e5
-519 4 2 14 -0.65536000000000000000e5
-519 4 5 17 -0.65536000000000000000e5
-520 1 2 33 -0.32768000000000000000e5
-520 1 17 27 0.32768000000000000000e5
-521 1 2 33 0.32768000000000000000e5
-521 1 3 34 -0.65536000000000000000e5
-521 1 4 35 0.32768000000000000000e5
-521 1 17 28 0.32768000000000000000e5
-521 2 12 18 0.32768000000000000000e5
-521 3 3 32 -0.32768000000000000000e5
-521 3 4 33 -0.32768000000000000000e5
-521 3 17 30 0.65536000000000000000e5
-521 4 13 17 -0.32768000000000000000e5
-522 1 17 29 0.32768000000000000000e5
-522 1 20 27 -0.32768000000000000000e5
-523 1 3 34 -0.32768000000000000000e5
-523 1 17 30 0.32768000000000000000e5
-524 1 17 24 -0.32768000000000000000e5
-524 1 17 31 0.32768000000000000000e5
-524 3 2 31 0.32768000000000000000e5
-525 1 2 33 0.32768000000000000000e5
-525 1 3 34 -0.65536000000000000000e5
-525 1 4 35 0.32768000000000000000e5
-525 1 17 33 0.32768000000000000000e5
-525 2 12 18 0.32768000000000000000e5
-525 3 4 33 -0.32768000000000000000e5
-525 3 17 30 0.65536000000000000000e5
-525 4 13 17 -0.32768000000000000000e5
-526 1 17 34 0.32768000000000000000e5
-526 1 20 35 -0.32768000000000000000e5
-526 3 6 35 -0.32768000000000000000e5
-527 1 17 35 0.32768000000000000000e5
-527 1 26 33 -0.32768000000000000000e5
-528 1 4 27 -0.16384000000000000000e5
-528 1 18 18 0.32768000000000000000e5
-529 1 4 35 -0.32768000000000000000e5
-529 1 18 19 0.32768000000000000000e5
-529 3 3 32 0.32768000000000000000e5
-529 3 4 33 0.32768000000000000000e5
-529 3 5 26 -0.32768000000000000000e5
-529 3 17 30 -0.65536000000000000000e5
-529 4 13 17 0.32768000000000000000e5
-530 1 18 20 0.32768000000000000000e5
-530 1 20 27 -0.32768000000000000000e5
-530 3 1 30 -0.32768000000000000000e5
-531 1 5 20 -0.32768000000000000000e5
-531 1 18 21 0.32768000000000000000e5
-531 3 6 19 0.32768000000000000000e5
-532 1 3 34 0.32768000000000000000e5
-532 1 17 24 -0.65536000000000000000e5
-532 1 18 22 0.32768000000000000000e5
-532 1 20 27 0.32768000000000000000e5
-532 2 6 20 0.32768000000000000000e5
-532 3 2 31 0.65536000000000000000e5
-532 3 17 22 -0.32768000000000000000e5
-533 1 17 24 -0.32768000000000000000e5
-533 1 18 23 0.32768000000000000000e5
-534 1 12 27 -0.32768000000000000000e5
-534 1 18 24 0.32768000000000000000e5
-535 1 13 28 -0.32768000000000000000e5
-535 1 18 25 0.32768000000000000000e5
-536 1 2 33 -0.32768000000000000000e5
-536 1 18 26 0.32768000000000000000e5
-537 1 2 33 0.32768000000000000000e5
-537 1 3 34 -0.65536000000000000000e5
-537 1 4 35 0.32768000000000000000e5
-537 1 18 27 0.32768000000000000000e5
-537 2 12 18 0.32768000000000000000e5
-537 3 3 32 -0.32768000000000000000e5
-537 3 4 33 -0.32768000000000000000e5
-537 3 17 30 0.65536000000000000000e5
-537 4 13 17 -0.32768000000000000000e5
-538 1 4 35 -0.32768000000000000000e5
-538 1 18 28 0.32768000000000000000e5
-538 3 3 32 0.32768000000000000000e5
-538 3 4 33 0.32768000000000000000e5
-538 3 17 30 -0.65536000000000000000e5
-538 4 13 17 0.32768000000000000000e5
-539 1 3 34 -0.32768000000000000000e5
-539 1 18 29 0.32768000000000000000e5
-540 1 3 34 0.32768000000000000000e5
-540 1 17 24 -0.65536000000000000000e5
-540 1 18 30 0.32768000000000000000e5
-540 1 20 27 0.32768000000000000000e5
-540 2 6 20 0.32768000000000000000e5
-540 3 2 31 0.65536000000000000000e5
-541 1 12 27 -0.32768000000000000000e5
-541 1 18 31 0.32768000000000000000e5
-541 3 18 23 0.32768000000000000000e5
-542 1 2 33 0.32768000000000000000e5
-542 1 3 34 -0.65536000000000000000e5
-542 1 4 35 0.32768000000000000000e5
-542 1 18 32 0.32768000000000000000e5
-542 2 12 18 0.32768000000000000000e5
-542 3 4 33 -0.32768000000000000000e5
-542 3 17 30 0.65536000000000000000e5
-542 4 13 17 -0.32768000000000000000e5
-543 1 4 35 -0.32768000000000000000e5
-543 1 18 33 0.32768000000000000000e5
-544 1 3 34 0.32768000000000000000e5
-544 1 17 24 -0.65536000000000000000e5
-544 1 18 34 0.32768000000000000000e5
-544 1 20 27 0.32768000000000000000e5
-544 2 6 20 0.32768000000000000000e5
-544 3 2 31 0.65536000000000000000e5
-544 3 17 30 0.32768000000000000000e5
-545 1 4 27 -0.32768000000000000000e5
-545 1 4 35 -0.32768000000000000000e5
-545 1 18 35 0.32768000000000000000e5
-545 1 26 33 0.32768000000000000000e5
-545 2 4 18 -0.32768000000000000000e5
-545 2 18 20 0.32768000000000000000e5
-545 3 3 32 0.32768000000000000000e5
-545 3 5 26 -0.32768000000000000000e5
-545 3 17 22 0.65536000000000000000e5
-545 3 18 19 -0.32768000000000000000e5
-545 3 19 32 -0.32768000000000000000e5
-545 3 20 33 0.65536000000000000000e5
-545 4 13 17 0.32768000000000000000e5
-546 1 3 34 0.32768000000000000000e5
-546 1 4 27 0.16384000000000000000e5
-546 1 4 35 0.16384000000000000000e5
-546 1 17 24 -0.65536000000000000000e5
-546 1 19 19 0.32768000000000000000e5
-546 1 20 27 0.32768000000000000000e5
-546 2 4 18 0.16384000000000000000e5
-546 2 6 20 0.32768000000000000000e5
-546 3 2 31 0.65536000000000000000e5
-546 3 3 32 -0.16384000000000000000e5
-546 3 4 33 -0.16384000000000000000e5
-546 3 5 26 0.16384000000000000000e5
-546 3 17 22 -0.32768000000000000000e5
-546 3 17 30 0.32768000000000000000e5
-546 4 13 17 -0.16384000000000000000e5
-547 1 5 20 -0.32768000000000000000e5
-547 1 19 20 0.32768000000000000000e5
-547 3 6 19 0.32768000000000000000e5
-548 1 3 34 0.32768000000000000000e5
-548 1 17 24 -0.65536000000000000000e5
-548 1 19 21 0.32768000000000000000e5
-548 1 20 27 0.32768000000000000000e5
-548 2 6 20 0.32768000000000000000e5
-548 3 2 31 0.65536000000000000000e5
-548 3 17 22 -0.32768000000000000000e5
-549 1 3 34 -0.32768000000000000000e5
-549 1 5 20 0.32768000000000000000e5
-549 1 19 22 0.32768000000000000000e5
-549 1 19 34 -0.32768000000000000000e5
-549 3 6 19 -0.32768000000000000000e5
-549 3 17 22 0.32768000000000000000e5
-549 3 18 23 -0.65536000000000000000e5
-549 3 22 27 -0.32768000000000000000e5
-549 4 6 18 0.32768000000000000000e5
-550 1 12 27 -0.32768000000000000000e5
-550 1 19 23 0.32768000000000000000e5
-551 1 12 19 -0.32768000000000000000e5
-551 1 19 24 0.32768000000000000000e5
-551 3 4 25 0.65536000000000000000e5
-551 3 8 21 -0.32768000000000000000e5
-551 3 9 22 -0.32768000000000000000e5
-551 4 4 16 -0.32768000000000000000e5
-552 1 9 24 -0.32768000000000000000e5
-552 1 19 25 0.32768000000000000000e5
-552 3 4 25 0.32768000000000000000e5
-553 1 2 33 0.32768000000000000000e5
-553 1 3 34 -0.65536000000000000000e5
-553 1 4 35 0.32768000000000000000e5
-553 1 19 26 0.32768000000000000000e5
-553 2 12 18 0.32768000000000000000e5
-553 3 3 32 -0.32768000000000000000e5
-553 3 4 33 -0.32768000000000000000e5
-553 3 17 30 0.65536000000000000000e5
-553 4 13 17 -0.32768000000000000000e5
-554 1 4 35 -0.32768000000000000000e5
-554 1 19 27 0.32768000000000000000e5
-554 3 3 32 0.32768000000000000000e5
-554 3 4 33 0.32768000000000000000e5
-554 3 17 30 -0.65536000000000000000e5
-554 4 13 17 0.32768000000000000000e5
-555 1 3 34 0.65536000000000000000e5
-555 1 4 27 0.32768000000000000000e5
-555 1 4 35 0.32768000000000000000e5
-555 1 17 24 -0.13107200000000000000e6
-555 1 19 28 0.32768000000000000000e5
-555 1 20 27 0.65536000000000000000e5
-555 2 4 18 0.32768000000000000000e5
-555 2 6 20 0.65536000000000000000e5
-555 3 2 31 0.13107200000000000000e6
-555 3 3 32 -0.32768000000000000000e5
-555 3 4 33 -0.32768000000000000000e5
-555 3 5 26 0.32768000000000000000e5
-555 3 17 22 -0.65536000000000000000e5
-555 3 17 30 0.65536000000000000000e5
-555 3 18 19 0.32768000000000000000e5
-555 4 13 17 -0.32768000000000000000e5
-556 1 3 34 0.32768000000000000000e5
-556 1 17 24 -0.65536000000000000000e5
-556 1 19 29 0.32768000000000000000e5
-556 1 20 27 0.32768000000000000000e5
-556 2 6 20 0.32768000000000000000e5
-556 3 2 31 0.65536000000000000000e5
-557 1 19 30 0.32768000000000000000e5
-557 1 19 34 -0.32768000000000000000e5
-557 3 22 27 -0.32768000000000000000e5
-558 1 3 34 -0.32768000000000000000e5
-558 1 12 19 -0.32768000000000000000e5
-558 1 13 28 0.65536000000000000000e5
-558 1 19 31 0.32768000000000000000e5
-558 1 20 35 0.32768000000000000000e5
-558 1 25 32 -0.65536000000000000000e5
-558 2 6 20 -0.16384000000000000000e5
-558 2 14 20 0.16384000000000000000e5
-558 3 2 31 -0.32768000000000000000e5
-558 3 4 25 0.65536000000000000000e5
-558 3 6 35 0.32768000000000000000e5
-558 3 8 21 -0.32768000000000000000e5
-558 3 9 22 -0.32768000000000000000e5
-558 3 16 29 -0.16384000000000000000e5
-558 3 17 30 -0.32768000000000000000e5
-558 3 18 23 -0.32768000000000000000e5
-558 3 18 31 -0.32768000000000000000e5
-558 3 22 27 -0.16384000000000000000e5
-558 4 4 16 -0.32768000000000000000e5
-558 4 8 20 -0.32768000000000000000e5
-558 4 12 16 -0.32768000000000000000e5
-558 4 14 18 -0.16384000000000000000e5
-559 1 4 35 -0.32768000000000000000e5
-559 1 19 32 0.32768000000000000000e5
-560 1 3 34 0.65536000000000000000e5
-560 1 4 27 0.32768000000000000000e5
-560 1 4 35 0.32768000000000000000e5
-560 1 17 24 -0.13107200000000000000e6
-560 1 19 33 0.32768000000000000000e5
-560 1 20 27 0.65536000000000000000e5
-560 2 4 18 0.32768000000000000000e5
-560 2 6 20 0.65536000000000000000e5
-560 3 2 31 0.13107200000000000000e6
-560 3 3 32 -0.32768000000000000000e5
-560 3 5 26 0.32768000000000000000e5
-560 3 17 22 -0.65536000000000000000e5
-560 3 17 30 0.65536000000000000000e5
-560 3 18 19 0.32768000000000000000e5
-560 4 13 17 -0.32768000000000000000e5
-561 1 3 34 0.65536000000000000000e5
-561 1 4 27 0.32768000000000000000e5
-561 1 4 35 0.32768000000000000000e5
-561 1 17 24 -0.13107200000000000000e6
-561 1 19 35 0.32768000000000000000e5
-561 1 20 27 0.65536000000000000000e5
-561 2 4 18 0.32768000000000000000e5
-561 2 6 20 0.65536000000000000000e5
-561 3 2 31 0.13107200000000000000e6
-561 3 3 32 -0.32768000000000000000e5
-561 3 5 26 0.32768000000000000000e5
-561 3 17 22 -0.65536000000000000000e5
-561 3 17 30 0.65536000000000000000e5
-561 3 18 19 0.32768000000000000000e5
-561 3 19 32 0.32768000000000000000e5
-561 4 13 17 -0.32768000000000000000e5
-562 1 16 23 -0.16384000000000000000e5
-562 1 20 20 0.32768000000000000000e5
-563 1 11 26 -0.32768000000000000000e5
-563 1 20 21 0.32768000000000000000e5
-564 1 17 24 -0.32768000000000000000e5
-564 1 20 22 0.32768000000000000000e5
-565 1 11 26 -0.16384000000000000000e5
-565 1 16 23 -0.16384000000000000000e5
-565 1 17 24 -0.16384000000000000000e5
-565 1 20 23 0.32768000000000000000e5
-565 2 5 19 -0.16384000000000000000e5
-566 1 7 22 0.16384000000000000000e5
-566 1 8 23 -0.32768000000000000000e5
-566 1 17 24 -0.16384000000000000000e5
-566 1 20 24 0.32768000000000000000e5
-566 3 7 20 0.16384000000000000000e5
-566 3 8 21 0.16384000000000000000e5
-566 4 8 12 0.16384000000000000000e5
-567 1 7 14 -0.32768000000000000000e5
-567 1 20 25 0.32768000000000000000e5
-567 3 2 15 0.32768000000000000000e5
-567 3 10 23 0.32768000000000000000e5
-568 1 3 34 0.32768000000000000000e5
-568 1 16 31 -0.65536000000000000000e5
-568 1 20 26 0.32768000000000000000e5
-568 1 20 27 0.32768000000000000000e5
-568 2 6 12 0.32768000000000000000e5
-568 4 2 14 -0.32768000000000000000e5
-568 4 5 17 -0.32768000000000000000e5
-569 1 3 34 -0.32768000000000000000e5
-569 1 20 28 0.32768000000000000000e5
-570 1 16 31 -0.32768000000000000000e5
-570 1 20 29 0.32768000000000000000e5
-571 1 17 24 -0.32768000000000000000e5
-571 1 20 30 0.32768000000000000000e5
-571 3 2 31 0.32768000000000000000e5
-572 1 7 22 0.16384000000000000000e5
-572 1 8 23 -0.32768000000000000000e5
-572 1 17 24 -0.16384000000000000000e5
-572 1 20 31 0.32768000000000000000e5
-572 3 7 20 0.16384000000000000000e5
-572 3 8 21 0.16384000000000000000e5
-572 3 13 26 0.32768000000000000000e5
-572 4 8 12 0.16384000000000000000e5
-573 1 20 27 -0.32768000000000000000e5
-573 1 20 32 0.32768000000000000000e5
-573 3 16 29 0.32768000000000000000e5
-574 1 20 33 0.32768000000000000000e5
-574 1 20 35 -0.32768000000000000000e5
-574 3 6 35 -0.32768000000000000000e5
-575 1 3 34 0.16384000000000000000e5
-575 1 17 24 -0.32768000000000000000e5
-575 1 20 34 0.32768000000000000000e5
-575 1 20 35 -0.16384000000000000000e5
-575 2 6 20 0.16384000000000000000e5
-575 2 14 20 -0.16384000000000000000e5
-575 3 2 31 0.32768000000000000000e5
-575 3 6 35 -0.16384000000000000000e5
-575 3 16 29 0.16384000000000000000e5
-575 3 17 30 0.16384000000000000000e5
-576 1 17 24 -0.16384000000000000000e5
-576 1 21 21 0.32768000000000000000e5
-577 1 12 27 -0.32768000000000000000e5
-577 1 21 22 0.32768000000000000000e5
-578 1 7 22 0.16384000000000000000e5
-578 1 8 23 -0.32768000000000000000e5
-578 1 17 24 -0.16384000000000000000e5
-578 1 21 23 0.32768000000000000000e5
-578 3 7 20 0.16384000000000000000e5
-578 3 8 21 0.16384000000000000000e5
-578 4 8 12 0.16384000000000000000e5
-579 1 13 28 -0.32768000000000000000e5
-579 1 21 24 0.32768000000000000000e5
-580 1 14 29 -0.32768000000000000000e5
-580 1 21 25 0.32768000000000000000e5
-581 1 20 27 -0.32768000000000000000e5
-581 1 21 26 0.32768000000000000000e5
-582 1 3 34 -0.32768000000000000000e5
-582 1 21 27 0.32768000000000000000e5
-583 1 3 34 0.32768000000000000000e5
-583 1 17 24 -0.65536000000000000000e5
-583 1 20 27 0.32768000000000000000e5
-583 1 21 28 0.32768000000000000000e5
-583 2 6 20 0.32768000000000000000e5
-583 3 2 31 0.65536000000000000000e5
-584 1 17 24 -0.32768000000000000000e5
-584 1 21 29 0.32768000000000000000e5
-584 3 2 31 0.32768000000000000000e5
-585 1 12 27 -0.32768000000000000000e5
-585 1 21 30 0.32768000000000000000e5
-585 3 18 23 0.32768000000000000000e5
-586 1 3 34 -0.16384000000000000000e5
-586 1 20 35 0.16384000000000000000e5
-586 1 21 31 0.32768000000000000000e5
-586 1 25 32 -0.32768000000000000000e5
-586 2 6 20 -0.81920000000000000000e4
-586 2 14 20 0.81920000000000000000e4
-586 3 6 35 0.16384000000000000000e5
-586 3 16 29 -0.81920000000000000000e4
-586 3 17 30 -0.16384000000000000000e5
-586 3 18 31 -0.16384000000000000000e5
-586 3 22 27 -0.81920000000000000000e4
-586 4 8 20 -0.16384000000000000000e5
-586 4 14 18 -0.81920000000000000000e4
-587 1 20 35 -0.32768000000000000000e5
-587 1 21 32 0.32768000000000000000e5
-587 3 6 35 -0.32768000000000000000e5
-588 1 3 34 0.32768000000000000000e5
-588 1 17 24 -0.65536000000000000000e5
-588 1 20 27 0.32768000000000000000e5
-588 1 21 33 0.32768000000000000000e5
-588 2 6 20 0.32768000000000000000e5
-588 3 2 31 0.65536000000000000000e5
-588 3 17 30 0.32768000000000000000e5
-589 1 3 34 0.16384000000000000000e5
-589 1 12 27 -0.32768000000000000000e5
-589 1 20 35 -0.16384000000000000000e5
-589 1 21 34 0.32768000000000000000e5
-589 3 6 35 -0.16384000000000000000e5
-589 3 17 30 0.16384000000000000000e5
-589 3 18 23 0.32768000000000000000e5
-589 3 22 27 0.16384000000000000000e5
-589 4 14 18 0.16384000000000000000e5
-590 1 3 34 0.32768000000000000000e5
-590 1 17 24 -0.65536000000000000000e5
-590 1 20 27 0.32768000000000000000e5
-590 1 21 35 0.32768000000000000000e5
-590 2 6 20 0.32768000000000000000e5
-590 3 2 31 0.65536000000000000000e5
-590 3 17 30 0.32768000000000000000e5
-590 3 20 33 0.32768000000000000000e5
-591 1 12 19 -0.16384000000000000000e5
-591 1 22 22 0.32768000000000000000e5
-591 3 4 25 0.32768000000000000000e5
-591 3 8 21 -0.16384000000000000000e5
-591 3 9 22 -0.16384000000000000000e5
-591 4 4 16 -0.16384000000000000000e5
-592 1 13 28 -0.32768000000000000000e5
-592 1 22 23 0.32768000000000000000e5
-593 1 9 24 -0.32768000000000000000e5
-593 1 22 24 0.32768000000000000000e5
-593 3 4 25 0.32768000000000000000e5
-594 1 3 34 -0.32768000000000000000e5
-594 1 22 26 0.32768000000000000000e5
-595 1 3 34 0.32768000000000000000e5
-595 1 17 24 -0.65536000000000000000e5
-595 1 20 27 0.32768000000000000000e5
-595 1 22 27 0.32768000000000000000e5
-595 2 6 20 0.32768000000000000000e5
-595 3 2 31 0.65536000000000000000e5
-596 1 19 34 -0.32768000000000000000e5
-596 1 22 28 0.32768000000000000000e5
-596 3 22 27 -0.32768000000000000000e5
-597 1 12 27 -0.32768000000000000000e5
-597 1 22 29 0.32768000000000000000e5
-597 3 18 23 0.32768000000000000000e5
-598 1 3 34 -0.32768000000000000000e5
-598 1 12 19 -0.32768000000000000000e5
-598 1 13 28 0.65536000000000000000e5
-598 1 20 35 0.32768000000000000000e5
-598 1 22 30 0.32768000000000000000e5
-598 1 25 32 -0.65536000000000000000e5
-598 2 6 20 -0.16384000000000000000e5
-598 2 14 20 0.16384000000000000000e5
-598 3 2 31 -0.32768000000000000000e5
-598 3 4 25 0.65536000000000000000e5
-598 3 6 35 0.32768000000000000000e5
-598 3 8 21 -0.32768000000000000000e5
-598 3 9 22 -0.32768000000000000000e5
-598 3 16 29 -0.16384000000000000000e5
-598 3 17 30 -0.32768000000000000000e5
-598 3 18 23 -0.32768000000000000000e5
-598 3 18 31 -0.32768000000000000000e5
-598 3 22 27 -0.16384000000000000000e5
-598 4 4 16 -0.32768000000000000000e5
-598 4 8 20 -0.32768000000000000000e5
-598 4 12 16 -0.32768000000000000000e5
-598 4 14 18 -0.16384000000000000000e5
-599 1 9 24 -0.32768000000000000000e5
-599 1 22 31 0.32768000000000000000e5
-599 3 4 25 0.32768000000000000000e5
-599 3 14 27 0.32768000000000000000e5
-600 1 3 34 0.32768000000000000000e5
-600 1 17 24 -0.65536000000000000000e5
-600 1 20 27 0.32768000000000000000e5
-600 1 22 32 0.32768000000000000000e5
-600 2 6 20 0.32768000000000000000e5
-600 3 2 31 0.65536000000000000000e5
-600 3 17 30 0.32768000000000000000e5
-601 1 19 34 -0.32768000000000000000e5
-601 1 22 33 0.32768000000000000000e5
-602 1 3 34 -0.32768000000000000000e5
-602 1 12 19 -0.32768000000000000000e5
-602 1 13 28 0.65536000000000000000e5
-602 1 20 35 0.32768000000000000000e5
-602 1 22 34 0.32768000000000000000e5
-602 1 25 32 -0.65536000000000000000e5
-602 2 6 20 -0.16384000000000000000e5
-602 2 14 20 0.16384000000000000000e5
-602 3 2 31 -0.32768000000000000000e5
-602 3 4 25 0.65536000000000000000e5
-602 3 6 35 0.32768000000000000000e5
-602 3 8 21 -0.32768000000000000000e5
-602 3 9 22 -0.32768000000000000000e5
-602 3 16 29 -0.16384000000000000000e5
-602 3 17 30 -0.32768000000000000000e5
-602 3 18 23 -0.32768000000000000000e5
-602 3 22 27 -0.16384000000000000000e5
-602 4 4 16 -0.32768000000000000000e5
-602 4 8 20 -0.32768000000000000000e5
-602 4 12 16 -0.32768000000000000000e5
-602 4 14 18 -0.16384000000000000000e5
-603 1 22 35 0.32768000000000000000e5
-603 1 30 33 -0.32768000000000000000e5
-604 1 7 14 -0.16384000000000000000e5
-604 1 23 23 0.32768000000000000000e5
-604 3 2 15 0.16384000000000000000e5
-604 3 10 23 0.16384000000000000000e5
-605 1 14 29 -0.32768000000000000000e5
-605 1 23 24 0.32768000000000000000e5
-606 1 8 15 -0.32768000000000000000e5
-606 1 14 21 0.16384000000000000000e5
-606 1 14 29 -0.16384000000000000000e5
-606 1 23 25 0.32768000000000000000e5
-606 3 2 15 0.16384000000000000000e5
-606 3 8 13 0.16384000000000000000e5
-606 3 10 23 0.16384000000000000000e5
-606 3 11 12 0.16384000000000000000e5
-606 3 11 24 0.16384000000000000000e5
-606 4 6 10 0.16384000000000000000e5
-606 4 10 14 0.16384000000000000000e5
-607 1 16 31 -0.32768000000000000000e5
-607 1 23 26 0.32768000000000000000e5
-608 1 17 24 -0.32768000000000000000e5
-608 1 23 27 0.32768000000000000000e5
-608 3 2 31 0.32768000000000000000e5
-609 1 12 27 -0.32768000000000000000e5
-609 1 23 28 0.32768000000000000000e5
-609 3 18 23 0.32768000000000000000e5
-610 1 7 22 0.16384000000000000000e5
-610 1 8 23 -0.32768000000000000000e5
-610 1 17 24 -0.16384000000000000000e5
-610 1 23 29 0.32768000000000000000e5
-610 3 7 20 0.16384000000000000000e5
-610 3 8 21 0.16384000000000000000e5
-610 3 13 26 0.32768000000000000000e5
-610 4 8 12 0.16384000000000000000e5
-611 1 3 34 -0.16384000000000000000e5
-611 1 20 35 0.16384000000000000000e5
-611 1 23 30 0.32768000000000000000e5
-611 1 25 32 -0.32768000000000000000e5
-611 2 6 20 -0.81920000000000000000e4
-611 2 14 20 0.81920000000000000000e4
-611 3 6 35 0.16384000000000000000e5
-611 3 16 29 -0.81920000000000000000e4
-611 3 17 30 -0.16384000000000000000e5
-611 3 18 31 -0.16384000000000000000e5
-611 3 22 27 -0.81920000000000000000e4
-611 4 8 20 -0.16384000000000000000e5
-611 4 14 18 -0.81920000000000000000e4
-612 1 14 29 -0.32768000000000000000e5
-612 1 23 31 0.32768000000000000000e5
-612 3 20 25 0.32768000000000000000e5
-613 1 3 34 0.16384000000000000000e5
-613 1 17 24 -0.32768000000000000000e5
-613 1 20 35 -0.16384000000000000000e5
-613 1 23 32 0.32768000000000000000e5
-613 2 6 20 0.16384000000000000000e5
-613 2 14 20 -0.16384000000000000000e5
-613 3 2 31 0.32768000000000000000e5
-613 3 6 35 -0.16384000000000000000e5
-613 3 16 29 0.16384000000000000000e5
-613 3 17 30 0.16384000000000000000e5
-614 1 3 34 0.16384000000000000000e5
-614 1 12 27 -0.32768000000000000000e5
-614 1 20 35 -0.16384000000000000000e5
-614 1 23 33 0.32768000000000000000e5
-614 3 6 35 -0.16384000000000000000e5
-614 3 17 30 0.16384000000000000000e5
-614 3 18 23 0.32768000000000000000e5
-614 3 22 27 0.16384000000000000000e5
-614 4 14 18 0.16384000000000000000e5
-615 1 23 34 0.32768000000000000000e5
-615 1 25 32 -0.32768000000000000000e5
-616 1 3 34 0.16384000000000000000e5
-616 1 12 27 -0.32768000000000000000e5
-616 1 20 35 -0.16384000000000000000e5
-616 1 23 35 0.32768000000000000000e5
-616 3 6 35 -0.16384000000000000000e5
-616 3 17 30 0.16384000000000000000e5
-616 3 18 23 0.32768000000000000000e5
-616 3 22 27 0.16384000000000000000e5
-616 3 26 31 0.32768000000000000000e5
-616 4 14 18 0.16384000000000000000e5
-617 1 22 25 -0.16384000000000000000e5
-617 1 24 24 0.32768000000000000000e5
-618 1 15 30 -0.32768000000000000000e5
-618 1 24 25 0.32768000000000000000e5
-619 1 17 24 -0.32768000000000000000e5
-619 1 24 26 0.32768000000000000000e5
-619 3 2 31 0.32768000000000000000e5
-620 1 12 27 -0.32768000000000000000e5
-620 1 24 27 0.32768000000000000000e5
-620 3 18 23 0.32768000000000000000e5
-621 1 3 34 -0.32768000000000000000e5
-621 1 12 19 -0.32768000000000000000e5
-621 1 13 28 0.65536000000000000000e5
-621 1 20 35 0.32768000000000000000e5
-621 1 24 28 0.32768000000000000000e5
-621 1 25 32 -0.65536000000000000000e5
-621 2 6 20 -0.16384000000000000000e5
-621 2 14 20 0.16384000000000000000e5
-621 3 2 31 -0.32768000000000000000e5
-621 3 4 25 0.65536000000000000000e5
-621 3 6 35 0.32768000000000000000e5
-621 3 8 21 -0.32768000000000000000e5
-621 3 9 22 -0.32768000000000000000e5
-621 3 16 29 -0.16384000000000000000e5
-621 3 17 30 -0.32768000000000000000e5
-621 3 18 23 -0.32768000000000000000e5
-621 3 18 31 -0.32768000000000000000e5
-621 3 22 27 -0.16384000000000000000e5
-621 4 4 16 -0.32768000000000000000e5
-621 4 8 20 -0.32768000000000000000e5
-621 4 12 16 -0.32768000000000000000e5
-621 4 14 18 -0.16384000000000000000e5
-622 1 3 34 -0.16384000000000000000e5
-622 1 20 35 0.16384000000000000000e5
-622 1 24 29 0.32768000000000000000e5
-622 1 25 32 -0.32768000000000000000e5
-622 2 6 20 -0.81920000000000000000e4
-622 2 14 20 0.81920000000000000000e4
-622 3 6 35 0.16384000000000000000e5
-622 3 16 29 -0.81920000000000000000e4
-622 3 17 30 -0.16384000000000000000e5
-622 3 18 31 -0.16384000000000000000e5
-622 3 22 27 -0.81920000000000000000e4
-622 4 8 20 -0.16384000000000000000e5
-622 4 14 18 -0.81920000000000000000e4
-623 1 9 24 -0.32768000000000000000e5
-623 1 24 30 0.32768000000000000000e5
-623 3 4 25 0.32768000000000000000e5
-623 3 14 27 0.32768000000000000000e5
-624 1 3 34 0.16384000000000000000e5
-624 1 12 27 -0.32768000000000000000e5
-624 1 20 35 -0.16384000000000000000e5
-624 1 24 32 0.32768000000000000000e5
-624 3 6 35 -0.16384000000000000000e5
-624 3 17 30 0.16384000000000000000e5
-624 3 18 23 0.32768000000000000000e5
-624 3 22 27 0.16384000000000000000e5
-624 4 14 18 0.16384000000000000000e5
-625 1 3 34 -0.32768000000000000000e5
-625 1 12 19 -0.32768000000000000000e5
-625 1 13 28 0.65536000000000000000e5
-625 1 20 35 0.32768000000000000000e5
-625 1 24 33 0.32768000000000000000e5
-625 1 25 32 -0.65536000000000000000e5
-625 2 6 20 -0.16384000000000000000e5
-625 2 14 20 0.16384000000000000000e5
-625 3 2 31 -0.32768000000000000000e5
-625 3 4 25 0.65536000000000000000e5
-625 3 6 35 0.32768000000000000000e5
-625 3 8 21 -0.32768000000000000000e5
-625 3 9 22 -0.32768000000000000000e5
-625 3 16 29 -0.16384000000000000000e5
-625 3 17 30 -0.32768000000000000000e5
-625 3 18 23 -0.32768000000000000000e5
-625 3 22 27 -0.16384000000000000000e5
-625 4 4 16 -0.32768000000000000000e5
-625 4 8 20 -0.32768000000000000000e5
-625 4 12 16 -0.32768000000000000000e5
-625 4 14 18 -0.16384000000000000000e5
-626 1 9 24 -0.32768000000000000000e5
-626 1 24 34 0.32768000000000000000e5
-626 3 4 25 0.32768000000000000000e5
-626 3 14 27 0.32768000000000000000e5
-626 3 24 29 0.32768000000000000000e5
-627 1 3 34 -0.32768000000000000000e5
-627 1 12 19 -0.32768000000000000000e5
-627 1 13 28 0.65536000000000000000e5
-627 1 20 35 0.32768000000000000000e5
-627 1 24 35 0.32768000000000000000e5
-627 1 25 32 -0.65536000000000000000e5
-627 2 6 20 -0.16384000000000000000e5
-627 2 14 20 0.16384000000000000000e5
-627 3 2 31 -0.32768000000000000000e5
-627 3 4 25 0.65536000000000000000e5
-627 3 6 35 0.32768000000000000000e5
-627 3 8 21 -0.32768000000000000000e5
-627 3 9 22 -0.32768000000000000000e5
-627 3 16 29 -0.16384000000000000000e5
-627 3 17 30 -0.32768000000000000000e5
-627 3 18 23 -0.32768000000000000000e5
-627 3 21 34 0.32768000000000000000e5
-627 3 22 27 -0.16384000000000000000e5
-627 4 4 16 -0.32768000000000000000e5
-627 4 8 20 -0.32768000000000000000e5
-627 4 12 16 -0.32768000000000000000e5
-627 4 14 18 -0.16384000000000000000e5
-628 1 12 15 -0.16384000000000000000e5
-628 1 14 21 0.40960000000000000000e4
-628 1 14 29 -0.40960000000000000000e4
-628 1 15 22 0.81920000000000000000e4
-628 1 15 30 -0.81920000000000000000e4
-628 1 25 25 0.32768000000000000000e5
-628 3 10 23 0.40960000000000000000e4
-628 3 11 24 0.40960000000000000000e4
-628 3 12 25 0.81920000000000000000e4
-628 3 13 14 0.16384000000000000000e5
-628 4 10 14 0.40960000000000000000e4
-628 4 10 16 0.81920000000000000000e4
-629 1 7 22 0.16384000000000000000e5
-629 1 8 23 -0.32768000000000000000e5
-629 1 17 24 -0.16384000000000000000e5
-629 1 25 26 0.32768000000000000000e5
-629 3 7 20 0.16384000000000000000e5
-629 3 8 21 0.16384000000000000000e5
-629 3 13 26 0.32768000000000000000e5
-629 4 8 12 0.16384000000000000000e5
-630 1 3 34 -0.16384000000000000000e5
-630 1 20 35 0.16384000000000000000e5
-630 1 25 27 0.32768000000000000000e5
-630 1 25 32 -0.32768000000000000000e5
-630 2 6 20 -0.81920000000000000000e4
-630 2 14 20 0.81920000000000000000e4
-630 3 6 35 0.16384000000000000000e5
-630 3 16 29 -0.81920000000000000000e4
-630 3 17 30 -0.16384000000000000000e5
-630 3 18 31 -0.16384000000000000000e5
-630 3 22 27 -0.81920000000000000000e4
-630 4 8 20 -0.16384000000000000000e5
-630 4 14 18 -0.81920000000000000000e4
-631 1 9 24 -0.32768000000000000000e5
-631 1 25 28 0.32768000000000000000e5
-631 3 4 25 0.32768000000000000000e5
-631 3 14 27 0.32768000000000000000e5
-632 1 14 29 -0.32768000000000000000e5
-632 1 25 29 0.32768000000000000000e5
-632 3 20 25 0.32768000000000000000e5
-633 1 24 31 -0.32768000000000000000e5
-633 1 25 30 0.32768000000000000000e5
-634 1 15 30 -0.32768000000000000000e5
-634 1 22 25 0.16384000000000000000e5
-634 1 24 31 -0.16384000000000000000e5
-634 1 25 31 0.32768000000000000000e5
-634 3 15 28 0.16384000000000000000e5
-634 3 20 25 0.16384000000000000000e5
-634 4 16 16 0.32768000000000000000e5
-635 1 9 24 -0.32768000000000000000e5
-635 1 25 33 0.32768000000000000000e5
-635 3 4 25 0.32768000000000000000e5
-635 3 14 27 0.32768000000000000000e5
-635 3 24 29 0.32768000000000000000e5
-636 1 24 31 -0.32768000000000000000e5
-636 1 25 34 0.32768000000000000000e5
-636 3 13 34 0.32768000000000000000e5
-637 1 25 35 0.32768000000000000000e5
-637 1 31 34 -0.32768000000000000000e5
-638 1 2 33 -0.16384000000000000000e5
-638 1 3 34 0.32768000000000000000e5
-638 1 4 35 -0.16384000000000000000e5
-638 1 17 32 0.16384000000000000000e5
-638 1 20 27 -0.32768000000000000000e5
-638 1 26 26 0.32768000000000000000e5
-638 2 12 18 -0.16384000000000000000e5
-638 2 17 17 0.32768000000000000000e5
-638 3 4 33 0.16384000000000000000e5
-638 3 16 29 0.32768000000000000000e5
-638 3 17 30 -0.32768000000000000000e5
-638 4 13 17 0.16384000000000000000e5
-639 1 17 32 -0.32768000000000000000e5
-639 1 26 27 0.32768000000000000000e5
-640 1 2 33 0.32768000000000000000e5
-640 1 3 34 -0.65536000000000000000e5
-640 1 4 35 0.32768000000000000000e5
-640 1 26 28 0.32768000000000000000e5
-640 2 12 18 0.32768000000000000000e5
-640 3 4 33 -0.32768000000000000000e5
-640 3 17 30 0.65536000000000000000e5
-640 4 13 17 -0.32768000000000000000e5
-641 1 20 27 -0.32768000000000000000e5
-641 1 26 29 0.32768000000000000000e5
-641 3 16 29 0.32768000000000000000e5
-642 1 20 35 -0.32768000000000000000e5
-642 1 26 30 0.32768000000000000000e5
-642 3 6 35 -0.32768000000000000000e5
-643 1 3 34 0.16384000000000000000e5
-643 1 17 24 -0.32768000000000000000e5
-643 1 20 35 -0.16384000000000000000e5
-643 1 26 31 0.32768000000000000000e5
-643 2 6 20 0.16384000000000000000e5
-643 2 14 20 -0.16384000000000000000e5
-643 3 2 31 0.32768000000000000000e5
-643 3 6 35 -0.16384000000000000000e5
-643 3 16 29 0.16384000000000000000e5
-643 3 17 30 0.16384000000000000000e5
-644 1 2 33 0.32768000000000000000e5
-644 1 3 34 -0.65536000000000000000e5
-644 1 4 27 0.32768000000000000000e5
-644 1 4 35 0.32768000000000000000e5
-644 1 17 32 -0.32768000000000000000e5
-644 1 26 32 0.32768000000000000000e5
-644 2 4 18 0.32768000000000000000e5
-644 2 12 18 0.32768000000000000000e5
-644 2 18 20 -0.32768000000000000000e5
-644 3 3 32 -0.32768000000000000000e5
-644 3 4 33 -0.32768000000000000000e5
-644 3 5 26 0.32768000000000000000e5
-644 3 6 35 0.65536000000000000000e5
-644 3 17 22 -0.65536000000000000000e5
-644 3 17 30 0.65536000000000000000e5
-644 3 18 19 0.32768000000000000000e5
-644 3 19 32 0.32768000000000000000e5
-644 3 20 33 -0.65536000000000000000e5
-644 4 13 17 -0.65536000000000000000e5
-644 4 17 17 -0.65536000000000000000e5
-645 1 20 35 -0.32768000000000000000e5
-645 1 26 34 0.32768000000000000000e5
-646 1 3 34 0.65536000000000000000e5
-646 1 4 27 0.32768000000000000000e5
-646 1 4 35 0.32768000000000000000e5
-646 1 17 24 -0.13107200000000000000e6
-646 1 20 27 0.65536000000000000000e5
-646 1 26 33 -0.32768000000000000000e5
-646 1 26 35 0.32768000000000000000e5
-646 1 28 35 0.32768000000000000000e5
-646 2 4 18 0.32768000000000000000e5
-646 2 6 20 0.65536000000000000000e5
-646 2 18 20 -0.32768000000000000000e5
-646 2 20 20 0.65536000000000000000e5
-646 3 2 31 0.13107200000000000000e6
-646 3 3 32 -0.32768000000000000000e5
-646 3 5 26 0.32768000000000000000e5
-646 3 17 22 -0.65536000000000000000e5
-646 3 17 30 0.65536000000000000000e5
-646 3 18 19 0.32768000000000000000e5
-646 3 19 32 0.32768000000000000000e5
-646 3 20 35 0.65536000000000000000e5
-646 3 27 32 -0.32768000000000000000e5
-646 4 13 17 -0.32768000000000000000e5
-647 1 2 33 0.16384000000000000000e5
-647 1 3 34 -0.32768000000000000000e5
-647 1 4 35 0.16384000000000000000e5
-647 1 27 27 0.32768000000000000000e5
-647 2 12 18 0.16384000000000000000e5
-647 3 4 33 -0.16384000000000000000e5
-647 3 17 30 0.32768000000000000000e5
-647 4 13 17 -0.16384000000000000000e5
-648 1 4 35 -0.32768000000000000000e5
-648 1 27 28 0.32768000000000000000e5
-649 1 20 35 -0.32768000000000000000e5
-649 1 27 29 0.32768000000000000000e5
-649 3 6 35 -0.32768000000000000000e5
-650 1 3 34 0.32768000000000000000e5
-650 1 17 24 -0.65536000000000000000e5
-650 1 20 27 0.32768000000000000000e5
-650 1 27 30 0.32768000000000000000e5
-650 2 6 20 0.32768000000000000000e5
-650 3 2 31 0.65536000000000000000e5
-650 3 17 30 0.32768000000000000000e5
-651 1 3 34 0.16384000000000000000e5
-651 1 12 27 -0.32768000000000000000e5
-651 1 20 35 -0.16384000000000000000e5
-651 1 27 31 0.32768000000000000000e5
-651 3 6 35 -0.16384000000000000000e5
-651 3 17 30 0.16384000000000000000e5
-651 3 18 23 0.32768000000000000000e5
-651 3 22 27 0.16384000000000000000e5
-651 4 14 18 0.16384000000000000000e5
-652 1 26 33 -0.32768000000000000000e5
-652 1 27 32 0.32768000000000000000e5
-653 1 4 27 -0.32768000000000000000e5
-653 1 4 35 -0.32768000000000000000e5
-653 1 26 33 0.32768000000000000000e5
-653 1 27 33 0.32768000000000000000e5
-653 2 4 18 -0.32768000000000000000e5
-653 2 18 20 0.32768000000000000000e5
-653 3 3 32 0.32768000000000000000e5
-653 3 5 26 -0.32768000000000000000e5
-653 3 17 22 0.65536000000000000000e5
-653 3 18 19 -0.32768000000000000000e5
-653 3 19 32 -0.32768000000000000000e5
-653 3 20 33 0.65536000000000000000e5
-653 4 13 17 0.32768000000000000000e5
-654 1 3 34 0.32768000000000000000e5
-654 1 17 24 -0.65536000000000000000e5
-654 1 20 27 0.32768000000000000000e5
-654 1 27 34 0.32768000000000000000e5
-654 2 6 20 0.32768000000000000000e5
-654 3 2 31 0.65536000000000000000e5
-654 3 17 30 0.32768000000000000000e5
-654 3 20 33 0.32768000000000000000e5
-655 1 4 27 -0.32768000000000000000e5
-655 1 4 35 -0.32768000000000000000e5
-655 1 26 33 0.32768000000000000000e5
-655 1 27 35 0.32768000000000000000e5
-655 2 4 18 -0.32768000000000000000e5
-655 2 18 20 0.32768000000000000000e5
-655 3 3 32 0.32768000000000000000e5
-655 3 5 26 -0.32768000000000000000e5
-655 3 17 22 0.65536000000000000000e5
-655 3 18 19 -0.32768000000000000000e5
-655 3 19 32 -0.32768000000000000000e5
-655 3 20 33 0.65536000000000000000e5
-655 3 27 32 0.32768000000000000000e5
-655 4 13 17 0.32768000000000000000e5
-656 1 3 34 0.32768000000000000000e5
-656 1 4 27 0.16384000000000000000e5
-656 1 4 35 0.16384000000000000000e5
-656 1 17 24 -0.65536000000000000000e5
-656 1 20 27 0.32768000000000000000e5
-656 1 28 28 0.32768000000000000000e5
-656 2 4 18 0.16384000000000000000e5
-656 2 6 20 0.32768000000000000000e5
-656 3 2 31 0.65536000000000000000e5
-656 3 3 32 -0.16384000000000000000e5
-656 3 5 26 0.16384000000000000000e5
-656 3 17 22 -0.32768000000000000000e5
-656 3 17 30 0.32768000000000000000e5
-656 3 18 19 0.16384000000000000000e5
-656 4 13 17 -0.16384000000000000000e5
-657 1 3 34 0.32768000000000000000e5
-657 1 17 24 -0.65536000000000000000e5
-657 1 20 27 0.32768000000000000000e5
-657 1 28 29 0.32768000000000000000e5
-657 2 6 20 0.32768000000000000000e5
-657 3 2 31 0.65536000000000000000e5
-657 3 17 30 0.32768000000000000000e5
-658 1 19 34 -0.32768000000000000000e5
-658 1 28 30 0.32768000000000000000e5
-659 1 3 34 -0.32768000000000000000e5
-659 1 12 19 -0.32768000000000000000e5
-659 1 13 28 0.65536000000000000000e5
-659 1 20 35 0.32768000000000000000e5
-659 1 25 32 -0.65536000000000000000e5
-659 1 28 31 0.32768000000000000000e5
-659 2 6 20 -0.16384000000000000000e5
-659 2 14 20 0.16384000000000000000e5
-659 3 2 31 -0.32768000000000000000e5
-659 3 4 25 0.65536000000000000000e5
-659 3 6 35 0.32768000000000000000e5
-659 3 8 21 -0.32768000000000000000e5
-659 3 9 22 -0.32768000000000000000e5
-659 3 16 29 -0.16384000000000000000e5
-659 3 17 30 -0.32768000000000000000e5
-659 3 18 23 -0.32768000000000000000e5
-659 3 22 27 -0.16384000000000000000e5
-659 4 4 16 -0.32768000000000000000e5
-659 4 8 20 -0.32768000000000000000e5
-659 4 12 16 -0.32768000000000000000e5
-659 4 14 18 -0.16384000000000000000e5
-660 1 4 27 -0.32768000000000000000e5
-660 1 4 35 -0.32768000000000000000e5
-660 1 26 33 0.32768000000000000000e5
-660 1 28 32 0.32768000000000000000e5
-660 2 4 18 -0.32768000000000000000e5
-660 2 18 20 0.32768000000000000000e5
-660 3 3 32 0.32768000000000000000e5
-660 3 5 26 -0.32768000000000000000e5
-660 3 17 22 0.65536000000000000000e5
-660 3 18 19 -0.32768000000000000000e5
-660 3 19 32 -0.32768000000000000000e5
-660 3 20 33 0.65536000000000000000e5
-660 4 13 17 0.32768000000000000000e5
-661 1 3 34 0.65536000000000000000e5
-661 1 4 27 0.32768000000000000000e5
-661 1 4 35 0.32768000000000000000e5
-661 1 17 24 -0.13107200000000000000e6
-661 1 20 27 0.65536000000000000000e5
-661 1 28 33 0.32768000000000000000e5
-661 2 4 18 0.32768000000000000000e5
-661 2 6 20 0.65536000000000000000e5
-661 3 2 31 0.13107200000000000000e6
-661 3 3 32 -0.32768000000000000000e5
-661 3 5 26 0.32768000000000000000e5
-661 3 17 22 -0.65536000000000000000e5
-661 3 17 30 0.65536000000000000000e5
-661 3 18 19 0.32768000000000000000e5
-661 3 19 32 0.32768000000000000000e5
-661 4 13 17 -0.32768000000000000000e5
-662 1 28 34 0.32768000000000000000e5
-662 1 30 33 -0.32768000000000000000e5
-663 1 3 34 0.81920000000000000000e4
-663 1 17 24 -0.16384000000000000000e5
-663 1 20 35 -0.81920000000000000000e4
-663 1 29 29 0.32768000000000000000e5
-663 2 6 20 0.81920000000000000000e4
-663 2 14 20 -0.81920000000000000000e4
-663 3 2 31 0.16384000000000000000e5
-663 3 6 35 -0.81920000000000000000e4
-663 3 16 29 0.81920000000000000000e4
-663 3 17 30 0.81920000000000000000e4
-664 1 3 34 0.16384000000000000000e5
-664 1 12 27 -0.32768000000000000000e5
-664 1 20 35 -0.16384000000000000000e5
-664 1 29 30 0.32768000000000000000e5
-664 3 6 35 -0.16384000000000000000e5
-664 3 17 30 0.16384000000000000000e5
-664 3 18 23 0.32768000000000000000e5
-664 3 22 27 0.16384000000000000000e5
-664 4 14 18 0.16384000000000000000e5
-665 1 25 32 -0.32768000000000000000e5
-665 1 29 31 0.32768000000000000000e5
-666 1 20 35 -0.32768000000000000000e5
-666 1 29 32 0.32768000000000000000e5
-667 1 3 34 0.32768000000000000000e5
-667 1 17 24 -0.65536000000000000000e5
-667 1 20 27 0.32768000000000000000e5
-667 1 29 33 0.32768000000000000000e5
-667 2 6 20 0.32768000000000000000e5
-667 3 2 31 0.65536000000000000000e5
-667 3 17 30 0.32768000000000000000e5
-667 3 20 33 0.32768000000000000000e5
-668 1 3 34 0.16384000000000000000e5
-668 1 12 27 -0.32768000000000000000e5
-668 1 20 35 -0.16384000000000000000e5
-668 1 29 34 0.32768000000000000000e5
-668 3 6 35 -0.16384000000000000000e5
-668 3 17 30 0.16384000000000000000e5
-668 3 18 23 0.32768000000000000000e5
-668 3 22 27 0.16384000000000000000e5
-668 3 26 31 0.32768000000000000000e5
-668 4 14 18 0.16384000000000000000e5
-669 1 3 34 0.32768000000000000000e5
-669 1 17 24 -0.65536000000000000000e5
-669 1 20 27 0.32768000000000000000e5
-669 1 29 35 0.32768000000000000000e5
-669 2 6 20 0.32768000000000000000e5
-669 3 2 31 0.65536000000000000000e5
-669 3 17 30 0.32768000000000000000e5
-669 3 20 33 0.32768000000000000000e5
-669 3 20 35 0.32768000000000000000e5
-670 1 3 34 -0.16384000000000000000e5
-670 1 12 19 -0.16384000000000000000e5
-670 1 13 28 0.32768000000000000000e5
-670 1 20 35 0.16384000000000000000e5
-670 1 25 32 -0.32768000000000000000e5
-670 1 30 30 0.32768000000000000000e5
-670 2 6 20 -0.81920000000000000000e4
-670 2 14 20 0.81920000000000000000e4
-670 3 2 31 -0.16384000000000000000e5
-670 3 4 25 0.32768000000000000000e5
-670 3 6 35 0.16384000000000000000e5
-670 3 8 21 -0.16384000000000000000e5
-670 3 9 22 -0.16384000000000000000e5
-670 3 16 29 -0.81920000000000000000e4
-670 3 17 30 -0.16384000000000000000e5
-670 3 18 23 -0.16384000000000000000e5
-670 3 22 27 -0.81920000000000000000e4
-670 4 4 16 -0.16384000000000000000e5
-670 4 8 20 -0.16384000000000000000e5
-670 4 12 16 -0.16384000000000000000e5
-670 4 14 18 -0.81920000000000000000e4
-671 1 9 24 -0.32768000000000000000e5
-671 1 30 31 0.32768000000000000000e5
-671 3 4 25 0.32768000000000000000e5
-671 3 14 27 0.32768000000000000000e5
-671 3 24 29 0.32768000000000000000e5
-672 1 3 34 0.32768000000000000000e5
-672 1 17 24 -0.65536000000000000000e5
-672 1 20 27 0.32768000000000000000e5
-672 1 30 32 0.32768000000000000000e5
-672 2 6 20 0.32768000000000000000e5
-672 3 2 31 0.65536000000000000000e5
-672 3 17 30 0.32768000000000000000e5
-672 3 20 33 0.32768000000000000000e5
-673 1 3 34 -0.32768000000000000000e5
-673 1 12 19 -0.32768000000000000000e5
-673 1 13 28 0.65536000000000000000e5
-673 1 20 35 0.32768000000000000000e5
-673 1 25 32 -0.65536000000000000000e5
-673 1 30 34 0.32768000000000000000e5
-673 2 6 20 -0.16384000000000000000e5
-673 2 14 20 0.16384000000000000000e5
-673 3 2 31 -0.32768000000000000000e5
-673 3 4 25 0.65536000000000000000e5
-673 3 6 35 0.32768000000000000000e5
-673 3 8 21 -0.32768000000000000000e5
-673 3 9 22 -0.32768000000000000000e5
-673 3 16 29 -0.16384000000000000000e5
-673 3 17 30 -0.32768000000000000000e5
-673 3 18 23 -0.32768000000000000000e5
-673 3 21 34 0.32768000000000000000e5
-673 3 22 27 -0.16384000000000000000e5
-673 4 4 16 -0.32768000000000000000e5
-673 4 8 20 -0.32768000000000000000e5
-673 4 12 16 -0.32768000000000000000e5
-673 4 14 18 -0.16384000000000000000e5
-674 1 30 35 0.32768000000000000000e5
-674 1 33 34 -0.32768000000000000000e5
-675 1 24 31 -0.16384000000000000000e5
-675 1 31 31 0.32768000000000000000e5
-675 3 13 34 0.16384000000000000000e5
-676 1 3 34 0.16384000000000000000e5
-676 1 12 27 -0.32768000000000000000e5
-676 1 20 35 -0.16384000000000000000e5
-676 1 31 32 0.32768000000000000000e5
-676 3 6 35 -0.16384000000000000000e5
-676 3 17 30 0.16384000000000000000e5
-676 3 18 23 0.32768000000000000000e5
-676 3 22 27 0.16384000000000000000e5
-676 3 26 31 0.32768000000000000000e5
-676 4 14 18 0.16384000000000000000e5
-677 1 3 34 -0.32768000000000000000e5
-677 1 12 19 -0.32768000000000000000e5
-677 1 13 28 0.65536000000000000000e5
-677 1 20 35 0.32768000000000000000e5
-677 1 25 32 -0.65536000000000000000e5
-677 1 31 33 0.32768000000000000000e5
-677 2 6 20 -0.16384000000000000000e5
-677 2 14 20 0.16384000000000000000e5
-677 3 2 31 -0.32768000000000000000e5
-677 3 4 25 0.65536000000000000000e5
-677 3 6 35 0.32768000000000000000e5
-677 3 8 21 -0.32768000000000000000e5
-677 3 9 22 -0.32768000000000000000e5
-677 3 16 29 -0.16384000000000000000e5
-677 3 17 30 -0.32768000000000000000e5
-677 3 18 23 -0.32768000000000000000e5
-677 3 21 34 0.32768000000000000000e5
-677 3 22 27 -0.16384000000000000000e5
-677 4 4 16 -0.32768000000000000000e5
-677 4 8 20 -0.32768000000000000000e5
-677 4 12 16 -0.32768000000000000000e5
-677 4 14 18 -0.16384000000000000000e5
-678 1 3 34 -0.32768000000000000000e5
-678 1 12 19 -0.32768000000000000000e5
-678 1 13 28 0.65536000000000000000e5
-678 1 20 35 0.32768000000000000000e5
-678 1 25 32 -0.65536000000000000000e5
-678 1 31 35 0.32768000000000000000e5
-678 2 6 20 -0.16384000000000000000e5
-678 2 14 20 0.16384000000000000000e5
-678 3 2 31 -0.32768000000000000000e5
-678 3 4 25 0.65536000000000000000e5
-678 3 6 35 0.32768000000000000000e5
-678 3 8 21 -0.32768000000000000000e5
-678 3 9 22 -0.32768000000000000000e5
-678 3 16 29 -0.16384000000000000000e5
-678 3 17 30 -0.32768000000000000000e5
-678 3 18 23 -0.32768000000000000000e5
-678 3 21 34 0.32768000000000000000e5
-678 3 22 27 -0.16384000000000000000e5
-678 3 29 34 0.32768000000000000000e5
-678 4 4 16 -0.32768000000000000000e5
-678 4 8 20 -0.32768000000000000000e5
-678 4 12 16 -0.32768000000000000000e5
-678 4 14 18 -0.16384000000000000000e5
-679 1 3 34 0.32768000000000000000e5
-679 1 4 27 0.16384000000000000000e5
-679 1 4 35 0.16384000000000000000e5
-679 1 17 24 -0.65536000000000000000e5
-679 1 20 27 0.32768000000000000000e5
-679 1 26 33 -0.16384000000000000000e5
-679 1 28 35 0.16384000000000000000e5
-679 1 32 32 0.32768000000000000000e5
-679 2 4 18 0.16384000000000000000e5
-679 2 6 20 0.32768000000000000000e5
-679 2 18 20 -0.16384000000000000000e5
-679 2 20 20 0.32768000000000000000e5
-679 3 2 31 0.65536000000000000000e5
-679 3 3 32 -0.16384000000000000000e5
-679 3 5 26 0.16384000000000000000e5
-679 3 17 22 -0.32768000000000000000e5
-679 3 17 30 0.32768000000000000000e5
-679 3 18 19 0.16384000000000000000e5
-679 3 19 32 0.16384000000000000000e5
-679 3 20 35 0.32768000000000000000e5
-679 3 27 32 -0.16384000000000000000e5
-679 4 13 17 -0.16384000000000000000e5
-680 1 4 27 -0.32768000000000000000e5
-680 1 4 35 -0.32768000000000000000e5
-680 1 26 33 0.32768000000000000000e5
-680 1 32 33 0.32768000000000000000e5
-680 2 4 18 -0.32768000000000000000e5
-680 2 18 20 0.32768000000000000000e5
-680 3 3 32 0.32768000000000000000e5
-680 3 5 26 -0.32768000000000000000e5
-680 3 17 22 0.65536000000000000000e5
-680 3 18 19 -0.32768000000000000000e5
-680 3 19 32 -0.32768000000000000000e5
-680 3 20 33 0.65536000000000000000e5
-680 3 27 32 0.32768000000000000000e5
-680 4 13 17 0.32768000000000000000e5
-681 1 3 34 0.32768000000000000000e5
-681 1 17 24 -0.65536000000000000000e5
-681 1 20 27 0.32768000000000000000e5
-681 1 32 34 0.32768000000000000000e5
-681 2 6 20 0.32768000000000000000e5
-681 3 2 31 0.65536000000000000000e5
-681 3 17 30 0.32768000000000000000e5
-681 3 20 33 0.32768000000000000000e5
-681 3 20 35 0.32768000000000000000e5
-682 1 28 35 -0.16384000000000000000e5
-682 1 33 33 0.32768000000000000000e5
-683 1 28 35 -0.32768000000000000000e5
-683 1 33 35 0.32768000000000000000e5
-683 3 32 33 0.32768000000000000000e5
-684 1 3 34 -0.16384000000000000000e5
-684 1 12 19 -0.16384000000000000000e5
-684 1 13 28 0.32768000000000000000e5
-684 1 20 35 0.16384000000000000000e5
-684 1 25 32 -0.32768000000000000000e5
-684 1 34 34 0.32768000000000000000e5
-684 2 6 20 -0.81920000000000000000e4
-684 2 14 20 0.81920000000000000000e4
-684 3 2 31 -0.16384000000000000000e5
-684 3 4 25 0.32768000000000000000e5
-684 3 6 35 0.16384000000000000000e5
-684 3 8 21 -0.16384000000000000000e5
-684 3 9 22 -0.16384000000000000000e5
-684 3 16 29 -0.81920000000000000000e4
-684 3 17 30 -0.16384000000000000000e5
-684 3 18 23 -0.16384000000000000000e5
-684 3 21 34 0.16384000000000000000e5
-684 3 22 27 -0.81920000000000000000e4
-684 3 29 34 0.16384000000000000000e5
-684 4 4 16 -0.16384000000000000000e5
-684 4 8 20 -0.16384000000000000000e5
-684 4 12 16 -0.16384000000000000000e5
-684 4 14 18 -0.81920000000000000000e4
-685 1 28 35 -0.16384000000000000000e5
-685 1 35 35 0.32768000000000000000e5
-685 3 32 33 0.16384000000000000000e5
-685 3 32 35 0.16384000000000000000e5
-686 1 1 8 0.19660800000000000000e6
-686 1 1 16 0.32768000000000000000e5
-686 1 2 5 0.32768000000000000000e5
-686 1 2 9 0.65536000000000000000e5
-686 1 4 11 -0.26214400000000000000e6
-686 1 4 27 0.32768000000000000000e5
-686 1 5 12 -0.13107200000000000000e6
-686 1 5 20 -0.13107200000000000000e6
-686 1 7 10 -0.26214400000000000000e6
-686 1 7 22 0.13107200000000000000e6
-686 1 8 23 0.26214400000000000000e6
-686 1 9 16 -0.19660800000000000000e6
-686 1 11 26 0.26214400000000000000e6
-686 1 12 19 0.13107200000000000000e6
-686 1 12 27 -0.13107200000000000000e6
-686 2 1 2 0.32768000000000000000e5
-686 2 1 3 -0.32768000000000000000e5
-686 2 1 7 0.65536000000000000000e5
-686 2 2 8 0.13107200000000000000e6
-686 2 3 9 -0.13107200000000000000e6
-686 2 3 17 0.32768000000000000000e5
-686 2 5 11 0.65536000000000000000e5
-686 2 6 12 -0.13107200000000000000e6
-686 3 1 2 -0.32768000000000000000e5
-686 3 1 6 0.65536000000000000000e5
-686 3 1 14 -0.26214400000000000000e6
-686 3 2 7 0.65536000000000000000e5
-686 3 2 15 0.52428800000000000000e6
-686 3 4 17 0.32768000000000000000e5
-686 3 5 10 -0.26214400000000000000e6
-686 3 7 20 0.26214400000000000000e6
-686 3 8 21 -0.13107200000000000000e6
-686 4 1 1 -0.65536000000000000000e5
-686 4 1 5 0.65536000000000000000e5
-686 4 1 13 0.32768000000000000000e5
-686 4 2 2 0.65536000000000000000e5
-686 4 4 8 -0.13107200000000000000e6
-686 4 5 9 -0.26214400000000000000e6
-687 1 2 17 0.32768000000000000000e5
-687 1 4 27 -0.32768000000000000000e5
-687 1 5 20 0.65536000000000000000e5
-687 1 9 16 0.13107200000000000000e6
-687 1 11 26 -0.13107200000000000000e6
-687 2 1 4 0.32768000000000000000e5
-687 2 3 17 -0.32768000000000000000e5
-687 2 6 12 0.65536000000000000000e5
-687 3 4 17 -0.32768000000000000000e5
-687 3 7 20 -0.13107200000000000000e6
-687 4 1 13 -0.32768000000000000000e5
-687 4 2 2 -0.65536000000000000000e5
-688 1 1 6 0.32768000000000000000e5
-688 1 1 8 -0.32768000000000000000e5
-688 1 1 10 -0.65536000000000000000e5
-688 1 2 9 -0.32768000000000000000e5
-688 1 4 11 0.13107200000000000000e6
-688 1 5 12 0.65536000000000000000e5
-688 1 5 20 0.65536000000000000000e5
-688 1 7 10 0.13107200000000000000e6
-688 1 7 22 -0.65536000000000000000e5
-688 1 8 23 -0.13107200000000000000e6
-688 1 9 16 0.65536000000000000000e5
-688 1 11 26 -0.13107200000000000000e6
-688 1 12 19 -0.65536000000000000000e5
-688 1 12 27 0.65536000000000000000e5
-688 2 1 5 0.32768000000000000000e5
-688 2 1 7 -0.32768000000000000000e5
-688 2 2 8 -0.65536000000000000000e5
-688 2 3 9 0.65536000000000000000e5
-688 2 5 11 -0.32768000000000000000e5
-688 2 6 12 0.65536000000000000000e5
-688 3 1 14 0.13107200000000000000e6
-688 3 2 7 -0.65536000000000000000e5
-688 3 2 15 -0.26214400000000000000e6
-688 3 5 10 0.13107200000000000000e6
-688 3 7 20 -0.13107200000000000000e6
-688 3 8 21 0.65536000000000000000e5
-688 4 1 5 -0.32768000000000000000e5
-688 4 4 8 0.65536000000000000000e5
-688 4 5 9 0.13107200000000000000e6
-689 2 1 6 0.32768000000000000000e5
-689 2 5 11 -0.32768000000000000000e5
-689 4 1 5 -0.32768000000000000000e5
-690 2 1 8 0.32768000000000000000e5
-690 2 5 5 -0.65536000000000000000e5
-691 2 1 9 0.32768000000000000000e5
-691 2 2 8 -0.32768000000000000000e5
-692 1 1 10 0.16384000000000000000e5
-692 1 4 11 0.32768000000000000000e5
-692 1 5 12 0.16384000000000000000e5
-692 1 6 13 -0.65536000000000000000e5
-692 1 6 21 0.16384000000000000000e5
-692 1 7 10 0.65536000000000000000e5
-692 1 8 23 -0.32768000000000000000e5
-692 1 11 26 0.16384000000000000000e5
-692 1 12 19 -0.16384000000000000000e5
-692 1 12 27 0.16384000000000000000e5
-692 2 1 10 0.32768000000000000000e5
-692 2 2 8 -0.16384000000000000000e5
-692 2 2 16 0.16384000000000000000e5
-692 2 3 9 0.16384000000000000000e5
-692 2 5 5 0.32768000000000000000e5
-692 3 1 14 0.65536000000000000000e5
-692 3 2 15 -0.65536000000000000000e5
-692 3 5 10 0.32768000000000000000e5
-692 3 7 20 0.16384000000000000000e5
-692 3 8 21 0.16384000000000000000e5
-692 4 4 8 0.16384000000000000000e5
-692 4 5 9 0.32768000000000000000e5
-693 1 1 8 0.19660800000000000000e6
-693 1 1 16 0.32768000000000000000e5
-693 1 2 5 0.32768000000000000000e5
-693 1 2 9 0.65536000000000000000e5
-693 1 4 11 -0.26214400000000000000e6
-693 1 4 27 0.32768000000000000000e5
-693 1 5 12 -0.13107200000000000000e6
-693 1 5 20 -0.13107200000000000000e6
-693 1 7 10 -0.26214400000000000000e6
-693 1 7 22 0.13107200000000000000e6
-693 1 8 23 0.26214400000000000000e6
-693 1 9 16 -0.19660800000000000000e6
-693 1 11 26 0.26214400000000000000e6
-693 1 12 19 0.13107200000000000000e6
-693 1 12 27 -0.13107200000000000000e6
-693 2 1 3 -0.32768000000000000000e5
-693 2 1 7 0.65536000000000000000e5
-693 2 1 11 0.32768000000000000000e5
-693 2 2 8 0.13107200000000000000e6
-693 2 3 9 -0.13107200000000000000e6
-693 2 3 17 0.32768000000000000000e5
-693 2 5 11 0.65536000000000000000e5
-693 2 6 12 -0.13107200000000000000e6
-693 3 1 2 -0.32768000000000000000e5
-693 3 1 6 0.65536000000000000000e5
-693 3 1 14 -0.26214400000000000000e6
-693 3 2 7 0.65536000000000000000e5
-693 3 2 15 0.52428800000000000000e6
-693 3 4 17 0.32768000000000000000e5
-693 3 5 10 -0.26214400000000000000e6
-693 3 7 20 0.26214400000000000000e6
-693 3 8 21 -0.13107200000000000000e6
-693 4 1 5 0.65536000000000000000e5
-693 4 1 13 0.32768000000000000000e5
-693 4 2 2 0.65536000000000000000e5
-693 4 4 8 -0.13107200000000000000e6
-693 4 5 9 -0.26214400000000000000e6
-694 1 1 8 0.65536000000000000000e5
-694 1 2 5 0.32768000000000000000e5
-694 1 3 18 -0.32768000000000000000e5
-694 1 5 20 -0.65536000000000000000e5
-694 1 6 21 -0.13107200000000000000e6
-694 1 11 26 0.13107200000000000000e6
-694 2 1 3 -0.32768000000000000000e5
-694 2 1 12 0.32768000000000000000e5
-694 2 1 15 0.65536000000000000000e5
-694 2 6 12 -0.65536000000000000000e5
-694 3 1 2 -0.32768000000000000000e5
-694 3 2 7 -0.65536000000000000000e5
-694 3 7 20 0.13107200000000000000e6
-694 4 2 2 0.65536000000000000000e5
-695 1 2 17 0.32768000000000000000e5
-695 1 4 27 -0.32768000000000000000e5
-695 1 5 20 0.65536000000000000000e5
-695 1 9 16 0.13107200000000000000e6
-695 1 11 26 -0.13107200000000000000e6
-695 2 1 13 0.32768000000000000000e5
-695 2 3 17 -0.32768000000000000000e5
-695 2 6 12 0.65536000000000000000e5
-695 3 4 17 -0.32768000000000000000e5
-695 3 7 20 -0.13107200000000000000e6
-695 4 1 13 -0.32768000000000000000e5
-696 2 1 14 0.32768000000000000000e5
-696 2 5 11 -0.32768000000000000000e5
-697 1 1 8 -0.32768000000000000000e5
-697 1 2 9 -0.16384000000000000000e5
-697 1 4 11 0.65536000000000000000e5
-697 1 5 12 0.32768000000000000000e5
-697 1 5 20 0.32768000000000000000e5
-697 1 6 21 0.98304000000000000000e5
-697 1 7 10 0.65536000000000000000e5
-697 1 9 16 0.16384000000000000000e5
-697 1 12 19 -0.32768000000000000000e5
-697 1 12 27 0.32768000000000000000e5
-697 1 13 20 -0.13107200000000000000e6
-697 2 1 7 -0.16384000000000000000e5
-697 2 1 15 -0.16384000000000000000e5
-697 2 1 16 0.32768000000000000000e5
-697 2 2 8 -0.32768000000000000000e5
-697 2 2 16 0.32768000000000000000e5
-697 2 3 9 0.32768000000000000000e5
-697 2 6 12 0.32768000000000000000e5
-697 2 8 14 0.65536000000000000000e5
-697 3 1 6 -0.16384000000000000000e5
-697 3 1 14 0.65536000000000000000e5
-697 3 2 7 -0.32768000000000000000e5
-697 3 2 15 -0.13107200000000000000e6
-697 3 5 10 0.65536000000000000000e5
-697 3 8 21 0.32768000000000000000e5
-697 4 1 5 -0.16384000000000000000e5
-697 4 4 8 0.32768000000000000000e5
-697 4 5 9 0.65536000000000000000e5
-698 2 1 17 0.32768000000000000000e5
-698 2 11 11 -0.65536000000000000000e5
-699 2 1 18 0.32768000000000000000e5
-699 2 11 17 -0.32768000000000000000e5
-699 4 11 11 -0.65536000000000000000e5
-700 2 1 20 0.32768000000000000000e5
-700 2 11 17 -0.32768000000000000000e5
-701 2 1 3 -0.16384000000000000000e5
-701 2 2 2 0.32768000000000000000e5
-702 1 2 17 0.32768000000000000000e5
-702 1 4 27 -0.32768000000000000000e5
-702 1 5 20 0.65536000000000000000e5
-702 1 9 16 0.13107200000000000000e6
-702 1 11 26 -0.13107200000000000000e6
-702 2 2 3 0.32768000000000000000e5
-702 2 3 17 -0.32768000000000000000e5
-702 2 6 12 0.65536000000000000000e5
-702 3 4 17 -0.32768000000000000000e5
-702 3 7 20 -0.13107200000000000000e6
-702 4 1 13 -0.32768000000000000000e5
-702 4 2 2 -0.65536000000000000000e5
-703 2 2 5 0.32768000000000000000e5
-703 2 5 11 -0.32768000000000000000e5
-703 4 1 5 -0.32768000000000000000e5
-704 2 1 7 -0.32768000000000000000e5
-704 2 2 6 0.32768000000000000000e5
-705 2 2 7 0.32768000000000000000e5
-705 2 6 12 -0.32768000000000000000e5
-705 4 2 6 -0.32768000000000000000e5
-706 1 1 8 0.16384000000000000000e5
-706 1 2 9 0.16384000000000000000e5
-706 1 4 11 -0.32768000000000000000e5
-706 1 5 12 -0.32768000000000000000e5
-706 1 5 20 -0.16384000000000000000e5
-706 1 6 21 -0.32768000000000000000e5
-706 1 8 23 0.65536000000000000000e5
-706 1 9 16 -0.16384000000000000000e5
-706 1 12 19 0.32768000000000000000e5
-706 1 12 27 -0.32768000000000000000e5
-706 2 1 7 0.16384000000000000000e5
-706 2 2 9 0.32768000000000000000e5
-706 2 2 16 -0.32768000000000000000e5
-706 2 3 9 -0.32768000000000000000e5
-706 2 6 12 -0.16384000000000000000e5
-706 3 1 14 -0.13107200000000000000e6
-706 3 2 7 0.16384000000000000000e5
-706 3 2 15 0.13107200000000000000e6
-706 3 5 10 -0.65536000000000000000e5
-706 3 8 21 -0.32768000000000000000e5
-706 4 4 8 -0.32768000000000000000e5
-706 4 5 9 -0.65536000000000000000e5
-707 2 2 10 0.32768000000000000000e5
-707 2 6 8 -0.32768000000000000000e5
-708 1 1 8 0.65536000000000000000e5
-708 1 2 5 0.32768000000000000000e5
-708 1 3 18 -0.32768000000000000000e5
-708 1 5 20 -0.65536000000000000000e5
-708 1 6 21 -0.13107200000000000000e6
-708 1 11 26 0.13107200000000000000e6
-708 2 1 3 -0.32768000000000000000e5
-708 2 1 15 0.65536000000000000000e5
-708 2 2 11 0.32768000000000000000e5
-708 2 6 12 -0.65536000000000000000e5
-708 3 1 2 -0.32768000000000000000e5
-708 3 2 7 -0.65536000000000000000e5
-708 3 7 20 0.13107200000000000000e6
-708 4 2 2 0.65536000000000000000e5
-709 1 2 17 0.32768000000000000000e5
-709 1 4 27 -0.32768000000000000000e5
-709 1 5 20 0.65536000000000000000e5
-709 1 9 16 0.13107200000000000000e6
-709 1 11 26 -0.13107200000000000000e6
-709 2 2 12 0.32768000000000000000e5
-709 2 3 17 -0.32768000000000000000e5
-709 2 6 12 0.65536000000000000000e5
-709 3 4 17 -0.32768000000000000000e5
-709 3 7 20 -0.13107200000000000000e6
-709 4 1 13 -0.32768000000000000000e5
-710 2 2 13 0.32768000000000000000e5
-710 2 3 17 -0.32768000000000000000e5
-710 4 1 13 -0.32768000000000000000e5
-711 2 1 15 -0.32768000000000000000e5
-711 2 2 14 0.32768000000000000000e5
-712 2 2 15 0.32768000000000000000e5
-712 2 6 12 -0.32768000000000000000e5
-713 2 2 17 0.32768000000000000000e5
-713 2 11 17 -0.32768000000000000000e5
-713 4 11 11 -0.65536000000000000000e5
-714 2 2 18 0.32768000000000000000e5
-714 2 3 17 -0.32768000000000000000e5
-715 2 2 19 0.32768000000000000000e5
-715 2 6 12 -0.32768000000000000000e5
-715 4 2 14 0.32768000000000000000e5
-716 1 1 32 -0.32768000000000000000e5
-716 1 2 33 -0.32768000000000000000e5
-716 1 4 35 -0.32768000000000000000e5
-716 1 16 31 0.13107200000000000000e6
-716 1 20 27 -0.13107200000000000000e6
-716 2 2 20 0.32768000000000000000e5
-716 2 6 12 -0.65536000000000000000e5
-716 2 11 17 -0.32768000000000000000e5
-716 2 12 18 -0.32768000000000000000e5
-716 3 3 32 0.32768000000000000000e5
-716 3 4 33 0.32768000000000000000e5
-716 3 17 30 -0.65536000000000000000e5
-716 4 2 14 0.65536000000000000000e5
-716 4 5 17 0.65536000000000000000e5
-716 4 13 17 0.32768000000000000000e5
-717 2 2 4 -0.16384000000000000000e5
-717 2 3 3 0.32768000000000000000e5
-718 1 3 18 0.32768000000000000000e5
-718 1 4 19 0.32768000000000000000e5
-718 1 4 27 0.32768000000000000000e5
-718 1 5 20 -0.65536000000000000000e5
-718 2 3 4 0.32768000000000000000e5
-718 3 4 17 0.32768000000000000000e5
-718 4 3 3 -0.65536000000000000000e5
-719 2 1 7 -0.32768000000000000000e5
-719 2 3 5 0.32768000000000000000e5
-720 2 3 6 0.32768000000000000000e5
-720 2 6 12 -0.32768000000000000000e5
-720 4 2 6 -0.32768000000000000000e5
-721 1 2 9 0.32768000000000000000e5
-721 1 3 34 -0.32768000000000000000e5
-721 1 4 11 -0.65536000000000000000e5
-721 1 5 20 0.32768000000000000000e5
-721 1 7 22 0.65536000000000000000e5
-721 1 9 16 -0.32768000000000000000e5
-721 2 3 7 0.32768000000000000000e5
-721 2 6 20 -0.32768000000000000000e5
-721 3 1 30 0.32768000000000000000e5
-721 3 2 31 -0.65536000000000000000e5
-721 3 4 9 -0.32768000000000000000e5
-721 3 5 10 0.65536000000000000000e5
-721 3 6 19 -0.32768000000000000000e5
-721 3 17 22 0.32768000000000000000e5
-721 4 3 7 -0.32768000000000000000e5
-721 4 7 11 -0.32768000000000000000e5
-722 1 1 8 0.16384000000000000000e5
-722 1 2 9 0.16384000000000000000e5
-722 1 4 11 -0.32768000000000000000e5
-722 1 5 12 -0.32768000000000000000e5
-722 1 5 20 -0.16384000000000000000e5
-722 1 6 21 -0.32768000000000000000e5
-722 1 8 23 0.65536000000000000000e5
-722 1 9 16 -0.16384000000000000000e5
-722 1 12 19 0.32768000000000000000e5
-722 1 12 27 -0.32768000000000000000e5
-722 2 1 7 0.16384000000000000000e5
-722 2 2 16 -0.32768000000000000000e5
-722 2 3 8 0.32768000000000000000e5
-722 2 3 9 -0.32768000000000000000e5
-722 2 6 12 -0.16384000000000000000e5
-722 3 1 14 -0.13107200000000000000e6
-722 3 2 7 0.16384000000000000000e5
-722 3 2 15 0.13107200000000000000e6
-722 3 5 10 -0.65536000000000000000e5
-722 3 8 21 -0.32768000000000000000e5
-722 4 4 8 -0.32768000000000000000e5
-722 4 5 9 -0.65536000000000000000e5
-723 1 6 21 0.16384000000000000000e5
-723 1 7 14 -0.65536000000000000000e5
-723 1 7 22 0.16384000000000000000e5
-723 1 8 23 0.32768000000000000000e5
-723 1 11 26 0.16384000000000000000e5
-723 1 13 28 0.32768000000000000000e5
-723 2 2 16 0.16384000000000000000e5
-723 2 3 10 0.32768000000000000000e5
-723 3 2 15 0.65536000000000000000e5
-723 3 7 20 0.16384000000000000000e5
-723 3 13 18 0.32768000000000000000e5
-723 4 5 9 -0.32768000000000000000e5
-724 1 2 17 0.32768000000000000000e5
-724 1 4 27 -0.32768000000000000000e5
-724 1 5 20 0.65536000000000000000e5
-724 1 9 16 0.13107200000000000000e6
-724 1 11 26 -0.13107200000000000000e6
-724 2 3 11 0.32768000000000000000e5
-724 2 3 17 -0.32768000000000000000e5
-724 2 6 12 0.65536000000000000000e5
-724 3 4 17 -0.32768000000000000000e5
-724 3 7 20 -0.13107200000000000000e6
-724 4 1 13 -0.32768000000000000000e5
-725 2 3 12 0.32768000000000000000e5
-725 2 3 17 -0.32768000000000000000e5
-725 4 1 13 -0.32768000000000000000e5
-726 1 3 18 0.32768000000000000000e5
-726 1 4 19 0.32768000000000000000e5
-726 1 4 27 0.32768000000000000000e5
-726 1 5 20 -0.65536000000000000000e5
-726 2 3 13 0.32768000000000000000e5
-726 3 4 17 0.32768000000000000000e5
-727 2 3 14 0.32768000000000000000e5
-727 2 6 12 -0.32768000000000000000e5
-728 1 3 34 -0.32768000000000000000e5
-728 1 5 20 0.32768000000000000000e5
-728 2 3 15 0.32768000000000000000e5
-728 2 6 20 -0.32768000000000000000e5
-728 3 1 30 0.32768000000000000000e5
-728 3 2 31 -0.65536000000000000000e5
-728 3 6 19 -0.32768000000000000000e5
-728 3 17 22 0.32768000000000000000e5
-728 4 7 11 -0.32768000000000000000e5
-729 1 7 22 0.32768000000000000000e5
-729 1 8 23 -0.65536000000000000000e5
-729 1 11 26 0.32768000000000000000e5
-729 1 12 27 0.32768000000000000000e5
-729 2 3 16 0.32768000000000000000e5
-729 3 7 20 0.32768000000000000000e5
-729 3 8 21 0.32768000000000000000e5
-730 1 3 18 0.32768000000000000000e5
-730 1 4 27 0.32768000000000000000e5
-730 1 4 35 0.32768000000000000000e5
-730 1 5 20 -0.65536000000000000000e5
-730 1 9 16 -0.65536000000000000000e5
-730 1 20 27 0.65536000000000000000e5
-730 2 3 18 0.32768000000000000000e5
-730 3 1 30 0.65536000000000000000e5
-730 3 3 16 0.32768000000000000000e5
-730 3 3 32 -0.32768000000000000000e5
-730 3 4 17 0.32768000000000000000e5
-730 3 4 33 -0.32768000000000000000e5
-730 3 5 26 0.32768000000000000000e5
-730 3 6 19 0.65536000000000000000e5
-730 3 17 30 0.65536000000000000000e5
-730 4 1 13 0.32768000000000000000e5
-730 4 13 17 -0.32768000000000000000e5
-731 1 3 34 -0.32768000000000000000e5
-731 1 5 20 0.32768000000000000000e5
-731 2 3 19 0.32768000000000000000e5
-731 2 6 20 -0.32768000000000000000e5
-731 3 1 30 0.32768000000000000000e5
-731 3 2 31 -0.65536000000000000000e5
-731 3 6 19 -0.32768000000000000000e5
-731 3 17 22 0.32768000000000000000e5
-732 2 3 20 0.32768000000000000000e5
-732 2 12 18 -0.32768000000000000000e5
-733 1 2 5 -0.16384000000000000000e5
-733 1 2 9 -0.65536000000000000000e5
-733 1 3 18 0.16384000000000000000e5
-733 1 4 11 -0.26214400000000000000e6
-733 1 4 19 0.16384000000000000000e5
-733 1 4 35 -0.16384000000000000000e5
-733 1 5 12 -0.13107200000000000000e6
-733 1 7 22 0.65536000000000000000e5
-733 1 8 23 0.26214400000000000000e6
-733 1 9 16 0.98304000000000000000e5
-733 1 11 26 -0.13107200000000000000e6
-733 1 12 19 0.13107200000000000000e6
-733 1 12 27 -0.13107200000000000000e6
-733 1 17 24 0.65536000000000000000e5
-733 1 20 27 -0.32768000000000000000e5
-733 2 3 9 -0.13107200000000000000e6
-733 2 4 4 0.32768000000000000000e5
-733 2 4 18 -0.16384000000000000000e5
-733 3 1 14 -0.26214400000000000000e6
-733 3 1 30 -0.32768000000000000000e5
-733 3 2 7 -0.65536000000000000000e5
-733 3 2 15 0.52428800000000000000e6
-733 3 3 32 0.16384000000000000000e5
-733 3 4 5 0.16384000000000000000e5
-733 3 4 9 0.32768000000000000000e5
-733 3 4 17 0.16384000000000000000e5
-733 3 4 33 0.16384000000000000000e5
-733 3 5 10 -0.32768000000000000000e6
-733 3 5 18 0.16384000000000000000e5
-733 3 5 26 -0.16384000000000000000e5
-733 3 6 19 0.32768000000000000000e5
-733 3 7 20 -0.13107200000000000000e6
-733 3 8 21 -0.13107200000000000000e6
-733 3 17 30 -0.32768000000000000000e5
-733 4 2 6 -0.65536000000000000000e5
-733 4 3 3 -0.32768000000000000000e5
-733 4 3 7 0.32768000000000000000e5
-733 4 4 8 -0.13107200000000000000e6
-733 4 5 9 -0.26214400000000000000e6
-733 4 7 11 0.32768000000000000000e5
-733 4 13 17 0.16384000000000000000e5
-734 2 4 5 0.32768000000000000000e5
-734 2 6 12 -0.32768000000000000000e5
-734 4 2 6 -0.32768000000000000000e5
-735 1 2 9 0.32768000000000000000e5
-735 1 3 34 -0.32768000000000000000e5
-735 1 4 11 -0.65536000000000000000e5
-735 1 5 20 0.32768000000000000000e5
-735 1 7 22 0.65536000000000000000e5
-735 1 9 16 -0.32768000000000000000e5
-735 2 4 6 0.32768000000000000000e5
-735 2 6 20 -0.32768000000000000000e5
-735 3 1 30 0.32768000000000000000e5
-735 3 2 31 -0.65536000000000000000e5
-735 3 4 9 -0.32768000000000000000e5
-735 3 5 10 0.65536000000000000000e5
-735 3 6 19 -0.32768000000000000000e5
-735 3 17 22 0.32768000000000000000e5
-735 4 3 7 -0.32768000000000000000e5
-735 4 7 11 -0.32768000000000000000e5
-736 1 12 27 -0.65536000000000000000e5
-736 1 17 24 0.65536000000000000000e5
-736 1 19 34 0.32768000000000000000e5
-736 1 20 27 -0.32768000000000000000e5
-736 2 4 7 0.32768000000000000000e5
-736 2 6 20 -0.32768000000000000000e5
-736 3 2 31 -0.65536000000000000000e5
-736 3 18 23 0.65536000000000000000e5
-736 3 22 27 0.32768000000000000000e5
-736 4 3 7 -0.32768000000000000000e5
-736 4 3 15 -0.32768000000000000000e5
-736 4 6 18 -0.32768000000000000000e5
-737 2 3 9 -0.32768000000000000000e5
-737 2 4 8 0.32768000000000000000e5
-738 1 7 22 0.32768000000000000000e5
-738 1 12 19 0.32768000000000000000e5
-738 1 12 27 0.32768000000000000000e5
-738 1 13 28 -0.65536000000000000000e5
-738 2 4 9 0.32768000000000000000e5
-738 3 8 21 0.32768000000000000000e5
-738 3 13 18 -0.65536000000000000000e5
-738 4 4 8 -0.32768000000000000000e5
-739 2 3 17 -0.32768000000000000000e5
-739 2 4 11 0.32768000000000000000e5
-739 4 1 13 -0.32768000000000000000e5
-740 1 3 18 0.32768000000000000000e5
-740 1 4 19 0.32768000000000000000e5
-740 1 4 27 0.32768000000000000000e5
-740 1 5 20 -0.65536000000000000000e5
-740 2 4 12 0.32768000000000000000e5
-740 3 4 17 0.32768000000000000000e5
-741 1 4 19 0.32768000000000000000e5
-741 1 4 35 -0.32768000000000000000e5
-741 1 7 22 -0.13107200000000000000e6
-741 1 9 16 0.65536000000000000000e5
-741 1 17 24 0.13107200000000000000e6
-741 1 20 27 -0.65536000000000000000e5
-741 2 4 13 0.32768000000000000000e5
-741 2 4 18 -0.32768000000000000000e5
-741 3 1 30 -0.65536000000000000000e5
-741 3 3 32 0.32768000000000000000e5
-741 3 4 17 0.32768000000000000000e5
-741 3 4 33 0.32768000000000000000e5
-741 3 5 18 0.32768000000000000000e5
-741 3 5 26 -0.32768000000000000000e5
-741 3 6 19 0.65536000000000000000e5
-741 3 17 30 -0.65536000000000000000e5
-741 4 7 11 0.65536000000000000000e5
-741 4 13 17 0.32768000000000000000e5
-742 1 3 34 -0.32768000000000000000e5
-742 1 5 20 0.32768000000000000000e5
-742 2 4 14 0.32768000000000000000e5
-742 2 6 20 -0.32768000000000000000e5
-742 3 1 30 0.32768000000000000000e5
-742 3 2 31 -0.65536000000000000000e5
-742 3 6 19 -0.32768000000000000000e5
-742 3 17 22 0.32768000000000000000e5
-742 4 7 11 -0.32768000000000000000e5
-743 1 12 27 -0.65536000000000000000e5
-743 1 17 24 0.65536000000000000000e5
-743 1 19 34 0.32768000000000000000e5
-743 1 20 27 -0.32768000000000000000e5
-743 2 4 15 0.32768000000000000000e5
-743 2 6 20 -0.32768000000000000000e5
-743 3 2 31 -0.65536000000000000000e5
-743 3 18 23 0.65536000000000000000e5
-743 3 22 27 0.32768000000000000000e5
-743 4 3 15 -0.32768000000000000000e5
-743 4 6 18 -0.32768000000000000000e5
-744 1 7 22 0.32768000000000000000e5
-744 1 12 19 0.32768000000000000000e5
-744 1 12 27 0.32768000000000000000e5
-744 1 13 28 -0.65536000000000000000e5
-744 2 4 16 0.32768000000000000000e5
-744 3 8 21 0.32768000000000000000e5
-744 3 13 18 -0.65536000000000000000e5
-745 1 3 18 0.32768000000000000000e5
-745 1 4 27 0.32768000000000000000e5
-745 1 4 35 0.32768000000000000000e5
-745 1 5 20 -0.65536000000000000000e5
-745 1 9 16 -0.65536000000000000000e5
-745 1 20 27 0.65536000000000000000e5
-745 2 4 17 0.32768000000000000000e5
-745 3 1 30 0.65536000000000000000e5
-745 3 3 16 0.32768000000000000000e5
-745 3 3 32 -0.32768000000000000000e5
-745 3 4 17 0.32768000000000000000e5
-745 3 4 33 -0.32768000000000000000e5
-745 3 5 26 0.32768000000000000000e5
-745 3 6 19 0.65536000000000000000e5
-745 3 17 30 0.65536000000000000000e5
-745 4 1 13 0.32768000000000000000e5
-745 4 13 17 -0.32768000000000000000e5
-746 1 12 27 -0.65536000000000000000e5
-746 1 17 24 0.65536000000000000000e5
-746 1 19 34 0.32768000000000000000e5
-746 1 20 27 -0.32768000000000000000e5
-746 2 4 19 0.32768000000000000000e5
-746 2 6 20 -0.32768000000000000000e5
-746 3 2 31 -0.65536000000000000000e5
-746 3 18 23 0.65536000000000000000e5
-746 3 22 27 0.32768000000000000000e5
-746 4 6 18 -0.32768000000000000000e5
-747 1 2 33 -0.32768000000000000000e5
-747 1 3 34 0.65536000000000000000e5
-747 1 4 27 -0.32768000000000000000e5
-747 1 4 35 -0.32768000000000000000e5
-747 2 4 18 -0.32768000000000000000e5
-747 2 4 20 0.32768000000000000000e5
-747 2 12 18 -0.32768000000000000000e5
-747 3 3 32 0.32768000000000000000e5
-747 3 4 33 0.32768000000000000000e5
-747 3 5 26 -0.32768000000000000000e5
-747 3 17 22 0.65536000000000000000e5
-747 3 17 30 -0.65536000000000000000e5
-747 3 18 19 -0.32768000000000000000e5
-747 4 13 17 0.32768000000000000000e5
-748 2 2 8 -0.32768000000000000000e5
-748 2 5 6 0.32768000000000000000e5
-749 1 1 8 0.16384000000000000000e5
-749 1 2 9 0.16384000000000000000e5
-749 1 4 11 -0.32768000000000000000e5
-749 1 5 12 -0.32768000000000000000e5
-749 1 5 20 -0.16384000000000000000e5
-749 1 6 21 -0.32768000000000000000e5
-749 1 8 23 0.65536000000000000000e5
-749 1 9 16 -0.16384000000000000000e5
-749 1 12 19 0.32768000000000000000e5
-749 1 12 27 -0.32768000000000000000e5
-749 2 1 7 0.16384000000000000000e5
-749 2 2 16 -0.32768000000000000000e5
-749 2 3 9 -0.32768000000000000000e5
-749 2 5 7 0.32768000000000000000e5
-749 2 6 12 -0.16384000000000000000e5
-749 3 1 14 -0.13107200000000000000e6
-749 3 2 7 0.16384000000000000000e5
-749 3 2 15 0.13107200000000000000e6
-749 3 5 10 -0.65536000000000000000e5
-749 3 8 21 -0.32768000000000000000e5
-749 4 4 8 -0.32768000000000000000e5
-749 4 5 9 -0.65536000000000000000e5
-750 1 1 10 0.16384000000000000000e5
-750 1 4 11 0.32768000000000000000e5
-750 1 5 12 0.16384000000000000000e5
-750 1 6 13 -0.65536000000000000000e5
-750 1 6 21 0.16384000000000000000e5
-750 1 7 10 0.65536000000000000000e5
-750 1 8 23 -0.32768000000000000000e5
-750 1 11 26 0.16384000000000000000e5
-750 1 12 19 -0.16384000000000000000e5
-750 1 12 27 0.16384000000000000000e5
-750 2 2 8 -0.16384000000000000000e5
-750 2 2 16 0.16384000000000000000e5
-750 2 3 9 0.16384000000000000000e5
-750 2 5 5 0.32768000000000000000e5
-750 2 5 8 0.32768000000000000000e5
-750 3 1 14 0.65536000000000000000e5
-750 3 2 15 -0.65536000000000000000e5
-750 3 5 10 0.32768000000000000000e5
-750 3 7 20 0.16384000000000000000e5
-750 3 8 21 0.16384000000000000000e5
-750 4 4 8 0.16384000000000000000e5
-750 4 5 9 0.32768000000000000000e5
-751 2 5 9 0.32768000000000000000e5
-751 2 6 8 -0.32768000000000000000e5
-752 1 4 11 -0.81920000000000000000e4
-752 1 5 12 -0.81920000000000000000e4
-752 1 6 13 0.32768000000000000000e5
-752 1 6 21 0.81920000000000000000e4
-752 1 7 10 0.16384000000000000000e5
-752 1 7 14 0.32768000000000000000e5
-752 1 7 22 0.16384000000000000000e5
-752 1 8 23 0.16384000000000000000e5
-752 1 10 13 -0.65536000000000000000e5
-752 1 11 26 0.81920000000000000000e4
-752 1 12 19 0.81920000000000000000e4
-752 2 2 16 0.81920000000000000000e4
-752 2 5 10 0.32768000000000000000e5
-752 2 6 8 0.16384000000000000000e5
-752 3 2 15 0.32768000000000000000e5
-752 3 5 10 -0.81920000000000000000e4
-752 3 7 20 0.81920000000000000000e4
-752 4 4 8 -0.81920000000000000000e4
-752 4 5 9 -0.16384000000000000000e5
-753 2 1 15 -0.32768000000000000000e5
-753 2 5 12 0.32768000000000000000e5
-754 2 5 13 0.32768000000000000000e5
-754 2 6 12 -0.32768000000000000000e5
-755 1 1 8 -0.32768000000000000000e5
-755 1 2 9 -0.16384000000000000000e5
-755 1 4 11 0.65536000000000000000e5
-755 1 5 12 0.32768000000000000000e5
-755 1 5 20 0.32768000000000000000e5
-755 1 6 21 0.98304000000000000000e5
-755 1 7 10 0.65536000000000000000e5
-755 1 9 16 0.16384000000000000000e5
-755 1 12 19 -0.32768000000000000000e5
-755 1 12 27 0.32768000000000000000e5
-755 1 13 20 -0.13107200000000000000e6
-755 2 1 7 -0.16384000000000000000e5
-755 2 1 15 -0.16384000000000000000e5
-755 2 2 8 -0.32768000000000000000e5
-755 2 2 16 0.32768000000000000000e5
-755 2 3 9 0.32768000000000000000e5
-755 2 5 14 0.32768000000000000000e5
-755 2 6 12 0.32768000000000000000e5
-755 2 8 14 0.65536000000000000000e5
-755 3 1 6 -0.16384000000000000000e5
-755 3 1 14 0.65536000000000000000e5
-755 3 2 7 -0.32768000000000000000e5
-755 3 2 15 -0.13107200000000000000e6
-755 3 5 10 0.65536000000000000000e5
-755 3 8 21 0.32768000000000000000e5
-755 4 1 5 -0.16384000000000000000e5
-755 4 4 8 0.32768000000000000000e5
-755 4 5 9 0.65536000000000000000e5
-756 2 2 16 -0.32768000000000000000e5
-756 2 5 15 0.32768000000000000000e5
-757 2 5 16 0.32768000000000000000e5
-757 2 8 14 -0.32768000000000000000e5
-758 2 1 19 -0.32768000000000000000e5
-758 2 5 17 0.32768000000000000000e5
-759 2 5 18 0.32768000000000000000e5
-759 2 6 12 -0.32768000000000000000e5
-759 4 2 14 0.32768000000000000000e5
-760 2 5 20 0.32768000000000000000e5
-760 2 6 12 -0.32768000000000000000e5
-760 4 2 14 0.32768000000000000000e5
-760 4 5 17 0.32768000000000000000e5
-761 1 1 8 0.81920000000000000000e4
-761 1 2 9 0.81920000000000000000e4
-761 1 4 11 -0.16384000000000000000e5
-761 1 5 12 -0.16384000000000000000e5
-761 1 5 20 -0.81920000000000000000e4
-761 1 6 21 -0.16384000000000000000e5
-761 1 8 23 0.32768000000000000000e5
-761 1 9 16 -0.81920000000000000000e4
-761 1 12 19 0.16384000000000000000e5
-761 1 12 27 -0.16384000000000000000e5
-761 2 1 7 0.81920000000000000000e4
-761 2 2 16 -0.16384000000000000000e5
-761 2 3 9 -0.16384000000000000000e5
-761 2 6 6 0.32768000000000000000e5
-761 2 6 12 -0.81920000000000000000e4
-761 3 1 14 -0.65536000000000000000e5
-761 3 2 7 0.81920000000000000000e4
-761 3 2 15 0.65536000000000000000e5
-761 3 5 10 -0.32768000000000000000e5
-761 3 8 21 -0.16384000000000000000e5
-761 4 4 8 -0.16384000000000000000e5
-761 4 5 9 -0.32768000000000000000e5
-762 2 3 9 -0.32768000000000000000e5
-762 2 6 7 0.32768000000000000000e5
-763 1 6 21 0.16384000000000000000e5
-763 1 7 14 -0.65536000000000000000e5
-763 1 7 22 0.16384000000000000000e5
-763 1 8 23 0.32768000000000000000e5
-763 1 11 26 0.16384000000000000000e5
-763 1 13 28 0.32768000000000000000e5
-763 2 2 16 0.16384000000000000000e5
-763 2 6 9 0.32768000000000000000e5
-763 3 2 15 0.65536000000000000000e5
-763 3 7 20 0.16384000000000000000e5
-763 3 13 18 0.32768000000000000000e5
-763 4 5 9 -0.32768000000000000000e5
-764 1 7 14 0.32768000000000000000e5
-764 1 10 25 -0.65536000000000000000e5
-764 1 13 20 0.32768000000000000000e5
-764 1 14 21 0.32768000000000000000e5
-764 2 6 10 0.32768000000000000000e5
-764 3 2 15 -0.32768000000000000000e5
-764 4 8 8 -0.65536000000000000000e5
-765 2 1 15 -0.32768000000000000000e5
-765 2 6 11 0.32768000000000000000e5
-766 1 3 34 -0.32768000000000000000e5
-766 1 5 20 0.32768000000000000000e5
-766 2 6 13 0.32768000000000000000e5
-766 2 6 20 -0.32768000000000000000e5
-766 3 1 30 0.32768000000000000000e5
-766 3 2 31 -0.65536000000000000000e5
-766 3 6 19 -0.32768000000000000000e5
-766 3 17 22 0.32768000000000000000e5
-766 4 7 11 -0.32768000000000000000e5
-767 2 2 16 -0.32768000000000000000e5
-767 2 6 14 0.32768000000000000000e5
-768 1 7 22 0.32768000000000000000e5
-768 1 8 23 -0.65536000000000000000e5
-768 1 11 26 0.32768000000000000000e5
-768 1 12 27 0.32768000000000000000e5
-768 2 6 15 0.32768000000000000000e5
-768 3 7 20 0.32768000000000000000e5
-768 3 8 21 0.32768000000000000000e5
-769 1 6 21 0.16384000000000000000e5
-769 1 7 14 -0.65536000000000000000e5
-769 1 7 22 0.16384000000000000000e5
-769 1 8 23 0.32768000000000000000e5
-769 1 11 26 0.16384000000000000000e5
-769 1 13 28 0.32768000000000000000e5
-769 2 2 16 0.16384000000000000000e5
-769 2 6 16 0.32768000000000000000e5
-769 3 2 15 0.65536000000000000000e5
-769 3 7 20 0.16384000000000000000e5
-769 3 13 18 0.32768000000000000000e5
-770 2 6 12 -0.32768000000000000000e5
-770 2 6 17 0.32768000000000000000e5
-770 4 2 14 0.32768000000000000000e5
-771 1 3 34 -0.32768000000000000000e5
-771 1 5 20 0.32768000000000000000e5
-771 2 6 18 0.32768000000000000000e5
-771 2 6 20 -0.32768000000000000000e5
-771 3 1 30 0.32768000000000000000e5
-771 3 2 31 -0.65536000000000000000e5
-771 3 6 19 -0.32768000000000000000e5
-771 3 17 22 0.32768000000000000000e5
-772 1 7 22 0.32768000000000000000e5
-772 1 8 23 -0.65536000000000000000e5
-772 1 11 26 0.32768000000000000000e5
-772 1 12 27 0.32768000000000000000e5
-772 2 6 19 0.32768000000000000000e5
-772 3 7 20 0.32768000000000000000e5
-772 3 8 21 0.32768000000000000000e5
-772 4 8 12 0.32768000000000000000e5
-773 1 7 22 0.16384000000000000000e5
-773 1 12 19 0.16384000000000000000e5
-773 1 12 27 0.16384000000000000000e5
-773 1 13 28 -0.32768000000000000000e5
-773 2 7 7 0.32768000000000000000e5
-773 3 8 21 0.16384000000000000000e5
-773 3 13 18 -0.32768000000000000000e5
-773 4 4 8 -0.16384000000000000000e5
-774 1 6 21 0.16384000000000000000e5
-774 1 7 14 -0.65536000000000000000e5
-774 1 7 22 0.16384000000000000000e5
-774 1 8 23 0.32768000000000000000e5
-774 1 11 26 0.16384000000000000000e5
-774 1 13 28 0.32768000000000000000e5
-774 2 2 16 0.16384000000000000000e5
-774 2 7 8 0.32768000000000000000e5
-774 3 2 15 0.65536000000000000000e5
-774 3 7 20 0.16384000000000000000e5
-774 3 13 18 0.32768000000000000000e5
-774 4 5 9 -0.32768000000000000000e5
-775 2 4 10 -0.32768000000000000000e5
-775 2 7 9 0.32768000000000000000e5
-776 1 7 14 0.32768000000000000000e5
-776 1 8 15 -0.65536000000000000000e5
-776 1 14 21 0.32768000000000000000e5
-776 1 22 25 0.32768000000000000000e5
-776 2 7 10 0.32768000000000000000e5
-776 3 8 13 0.32768000000000000000e5
-776 3 11 12 0.32768000000000000000e5
-776 3 11 24 0.32768000000000000000e5
-777 2 6 12 -0.32768000000000000000e5
-777 2 7 11 0.32768000000000000000e5
-778 1 3 34 -0.32768000000000000000e5
-778 1 5 20 0.32768000000000000000e5
-778 2 6 20 -0.32768000000000000000e5
-778 2 7 12 0.32768000000000000000e5
-778 3 1 30 0.32768000000000000000e5
-778 3 2 31 -0.65536000000000000000e5
-778 3 6 19 -0.32768000000000000000e5
-778 3 17 22 0.32768000000000000000e5
-778 4 7 11 -0.32768000000000000000e5
-779 1 12 27 -0.65536000000000000000e5
-779 1 17 24 0.65536000000000000000e5
-779 1 19 34 0.32768000000000000000e5
-779 1 20 27 -0.32768000000000000000e5
-779 2 6 20 -0.32768000000000000000e5
-779 2 7 13 0.32768000000000000000e5
-779 3 2 31 -0.65536000000000000000e5
-779 3 18 23 0.65536000000000000000e5
-779 3 22 27 0.32768000000000000000e5
-779 4 3 15 -0.32768000000000000000e5
-779 4 6 18 -0.32768000000000000000e5
-780 1 7 22 0.32768000000000000000e5
-780 1 8 23 -0.65536000000000000000e5
-780 1 11 26 0.32768000000000000000e5
-780 1 12 27 0.32768000000000000000e5
-780 2 7 14 0.32768000000000000000e5
-780 3 7 20 0.32768000000000000000e5
-780 3 8 21 0.32768000000000000000e5
-781 1 7 22 0.32768000000000000000e5
-781 1 12 19 0.32768000000000000000e5
-781 1 12 27 0.32768000000000000000e5
-781 1 13 28 -0.65536000000000000000e5
-781 2 7 15 0.32768000000000000000e5
-781 3 8 21 0.32768000000000000000e5
-781 3 13 18 -0.65536000000000000000e5
-782 1 8 23 0.32768000000000000000e5
-782 1 9 24 0.32768000000000000000e5
-782 1 13 28 0.32768000000000000000e5
-782 1 14 21 -0.65536000000000000000e5
-782 2 7 16 0.32768000000000000000e5
-782 3 13 18 0.32768000000000000000e5
-783 1 3 34 -0.32768000000000000000e5
-783 1 5 20 0.32768000000000000000e5
-783 2 6 20 -0.32768000000000000000e5
-783 2 7 17 0.32768000000000000000e5
-783 3 1 30 0.32768000000000000000e5
-783 3 2 31 -0.65536000000000000000e5
-783 3 6 19 -0.32768000000000000000e5
-783 3 17 22 0.32768000000000000000e5
-784 1 12 27 -0.65536000000000000000e5
-784 1 17 24 0.65536000000000000000e5
-784 1 19 34 0.32768000000000000000e5
-784 1 20 27 -0.32768000000000000000e5
-784 2 6 20 -0.32768000000000000000e5
-784 2 7 18 0.32768000000000000000e5
-784 3 2 31 -0.65536000000000000000e5
-784 3 18 23 0.65536000000000000000e5
-784 3 22 27 0.32768000000000000000e5
-784 4 6 18 -0.32768000000000000000e5
-785 1 12 19 0.32768000000000000000e5
-785 1 12 27 0.32768000000000000000e5
-785 1 13 28 -0.65536000000000000000e5
-785 1 17 24 0.32768000000000000000e5
-785 2 7 19 0.32768000000000000000e5
-785 3 4 25 -0.65536000000000000000e5
-785 3 8 21 0.32768000000000000000e5
-785 3 9 22 0.32768000000000000000e5
-785 4 4 16 0.32768000000000000000e5
-786 1 12 27 -0.65536000000000000000e5
-786 1 17 24 0.65536000000000000000e5
-786 1 19 34 0.32768000000000000000e5
-786 1 20 27 -0.32768000000000000000e5
-786 2 6 20 -0.32768000000000000000e5
-786 2 7 20 0.32768000000000000000e5
-786 3 2 31 -0.65536000000000000000e5
-786 3 18 23 0.65536000000000000000e5
-786 3 22 27 0.32768000000000000000e5
-787 1 4 11 -0.40960000000000000000e4
-787 1 5 12 -0.40960000000000000000e4
-787 1 6 13 0.16384000000000000000e5
-787 1 6 21 0.40960000000000000000e4
-787 1 7 10 0.81920000000000000000e4
-787 1 7 14 0.16384000000000000000e5
-787 1 7 22 0.81920000000000000000e4
-787 1 8 23 0.81920000000000000000e4
-787 1 10 13 -0.32768000000000000000e5
-787 1 11 26 0.40960000000000000000e4
-787 1 12 19 0.40960000000000000000e4
-787 2 2 16 0.40960000000000000000e4
-787 2 6 8 0.81920000000000000000e4
-787 2 8 8 0.32768000000000000000e5
-787 3 2 15 0.16384000000000000000e5
-787 3 5 10 -0.40960000000000000000e4
-787 3 7 20 0.40960000000000000000e4
-787 4 4 8 -0.40960000000000000000e4
-787 4 5 9 -0.81920000000000000000e4
-788 1 7 14 0.32768000000000000000e5
-788 1 10 25 -0.65536000000000000000e5
-788 1 13 20 0.32768000000000000000e5
-788 1 14 21 0.32768000000000000000e5
-788 2 8 9 0.32768000000000000000e5
-788 3 2 15 -0.32768000000000000000e5
-788 4 8 8 -0.65536000000000000000e5
-789 1 1 8 -0.32768000000000000000e5
-789 1 2 9 -0.16384000000000000000e5
-789 1 4 11 0.65536000000000000000e5
-789 1 5 12 0.32768000000000000000e5
-789 1 5 20 0.32768000000000000000e5
-789 1 6 21 0.98304000000000000000e5
-789 1 7 10 0.65536000000000000000e5
-789 1 9 16 0.16384000000000000000e5
-789 1 12 19 -0.32768000000000000000e5
-789 1 12 27 0.32768000000000000000e5
-789 1 13 20 -0.13107200000000000000e6
-789 2 1 7 -0.16384000000000000000e5
-789 2 1 15 -0.16384000000000000000e5
-789 2 2 8 -0.32768000000000000000e5
-789 2 2 16 0.32768000000000000000e5
-789 2 3 9 0.32768000000000000000e5
-789 2 6 12 0.32768000000000000000e5
-789 2 8 11 0.32768000000000000000e5
-789 2 8 14 0.65536000000000000000e5
-789 3 1 6 -0.16384000000000000000e5
-789 3 1 14 0.65536000000000000000e5
-789 3 2 7 -0.32768000000000000000e5
-789 3 2 15 -0.13107200000000000000e6
-789 3 5 10 0.65536000000000000000e5
-789 3 8 21 0.32768000000000000000e5
-789 4 1 5 -0.16384000000000000000e5
-789 4 4 8 0.32768000000000000000e5
-789 4 5 9 0.65536000000000000000e5
-790 2 2 16 -0.32768000000000000000e5
-790 2 8 12 0.32768000000000000000e5
-791 1 7 22 0.32768000000000000000e5
-791 1 8 23 -0.65536000000000000000e5
-791 1 11 26 0.32768000000000000000e5
-791 1 12 27 0.32768000000000000000e5
-791 2 8 13 0.32768000000000000000e5
-791 3 7 20 0.32768000000000000000e5
-791 3 8 21 0.32768000000000000000e5
-792 1 6 21 0.16384000000000000000e5
-792 1 7 14 -0.65536000000000000000e5
-792 1 7 22 0.16384000000000000000e5
-792 1 8 23 0.32768000000000000000e5
-792 1 11 26 0.16384000000000000000e5
-792 1 13 28 0.32768000000000000000e5
-792 2 2 16 0.16384000000000000000e5
-792 2 8 15 0.32768000000000000000e5
-792 3 2 15 0.65536000000000000000e5
-792 3 7 20 0.16384000000000000000e5
-792 3 13 18 0.32768000000000000000e5
-793 1 7 14 0.32768000000000000000e5
-793 1 10 25 -0.65536000000000000000e5
-793 1 13 20 0.32768000000000000000e5
-793 1 14 21 0.32768000000000000000e5
-793 2 8 16 0.32768000000000000000e5
-793 3 2 15 -0.32768000000000000000e5
-794 2 5 19 -0.32768000000000000000e5
-794 2 8 17 0.32768000000000000000e5
-795 1 7 22 0.32768000000000000000e5
-795 1 8 23 -0.65536000000000000000e5
-795 1 11 26 0.32768000000000000000e5
-795 1 12 27 0.32768000000000000000e5
-795 2 8 18 0.32768000000000000000e5
-795 3 7 20 0.32768000000000000000e5
-795 3 8 21 0.32768000000000000000e5
-795 4 8 12 0.32768000000000000000e5
-796 1 7 14 -0.65536000000000000000e5
-796 1 7 22 -0.16384000000000000000e5
-796 1 8 23 0.32768000000000000000e5
-796 1 11 26 0.16384000000000000000e5
-796 1 13 28 0.32768000000000000000e5
-796 1 16 23 0.16384000000000000000e5
-796 1 17 24 0.32768000000000000000e5
-796 2 5 19 0.16384000000000000000e5
-796 2 8 19 0.32768000000000000000e5
-796 3 2 15 0.65536000000000000000e5
-796 3 7 20 -0.16384000000000000000e5
-796 3 8 21 -0.16384000000000000000e5
-796 3 10 23 0.65536000000000000000e5
-796 4 8 12 -0.16384000000000000000e5
-797 1 7 22 0.32768000000000000000e5
-797 1 8 23 -0.65536000000000000000e5
-797 1 12 27 0.32768000000000000000e5
-797 1 16 31 0.32768000000000000000e5
-797 2 8 20 0.32768000000000000000e5
-797 3 2 31 -0.32768000000000000000e5
-797 3 7 20 0.32768000000000000000e5
-797 3 8 21 0.32768000000000000000e5
-797 3 13 26 0.65536000000000000000e5
-797 3 18 23 -0.32768000000000000000e5
-797 4 8 12 0.32768000000000000000e5
-798 1 7 14 0.16384000000000000000e5
-798 1 8 15 -0.32768000000000000000e5
-798 1 14 21 0.16384000000000000000e5
-798 1 22 25 0.16384000000000000000e5
-798 2 9 9 0.32768000000000000000e5
-798 3 8 13 0.16384000000000000000e5
-798 3 11 12 0.16384000000000000000e5
-798 3 11 24 0.16384000000000000000e5
-799 1 4 11 -0.40960000000000000000e4
-799 1 5 12 -0.40960000000000000000e4
-799 1 6 21 0.40960000000000000000e4
-799 1 7 10 0.81920000000000000000e4
-799 1 7 22 0.81920000000000000000e4
-799 1 8 23 0.81920000000000000000e4
-799 1 11 26 0.40960000000000000000e4
-799 1 12 19 0.40960000000000000000e4
-799 1 13 20 -0.16384000000000000000e5
-799 2 2 16 0.40960000000000000000e4
-799 2 6 8 0.81920000000000000000e4
-799 2 9 10 0.32768000000000000000e5
-799 2 10 16 -0.32768000000000000000e5
-799 3 2 15 0.49152000000000000000e5
-799 3 5 10 -0.40960000000000000000e4
-799 3 7 20 0.40960000000000000000e4
-799 3 8 13 0.32768000000000000000e5
-799 3 10 15 -0.65536000000000000000e5
-799 3 11 12 0.16384000000000000000e5
-799 3 12 13 0.32768000000000000000e5
-799 4 4 8 -0.40960000000000000000e4
-799 4 5 9 -0.81920000000000000000e4
-799 4 6 10 0.16384000000000000000e5
-799 4 8 8 0.32768000000000000000e5
-800 2 2 16 -0.32768000000000000000e5
-800 2 9 11 0.32768000000000000000e5
-801 1 7 22 0.32768000000000000000e5
-801 1 8 23 -0.65536000000000000000e5
-801 1 11 26 0.32768000000000000000e5
-801 1 12 27 0.32768000000000000000e5
-801 2 9 12 0.32768000000000000000e5
-801 3 7 20 0.32768000000000000000e5
-801 3 8 21 0.32768000000000000000e5
-802 1 7 22 0.32768000000000000000e5
-802 1 12 19 0.32768000000000000000e5
-802 1 12 27 0.32768000000000000000e5
-802 1 13 28 -0.65536000000000000000e5
-802 2 9 13 0.32768000000000000000e5
-802 3 8 21 0.32768000000000000000e5
-802 3 13 18 -0.65536000000000000000e5
-803 1 6 21 0.16384000000000000000e5
-803 1 7 14 -0.65536000000000000000e5
-803 1 7 22 0.16384000000000000000e5
-803 1 8 23 0.32768000000000000000e5
-803 1 11 26 0.16384000000000000000e5
-803 1 13 28 0.32768000000000000000e5
-803 2 2 16 0.16384000000000000000e5
-803 2 9 14 0.32768000000000000000e5
-803 3 2 15 0.65536000000000000000e5
-803 3 7 20 0.16384000000000000000e5
-803 3 13 18 0.32768000000000000000e5
-804 1 8 23 0.32768000000000000000e5
-804 1 9 24 0.32768000000000000000e5
-804 1 13 28 0.32768000000000000000e5
-804 1 14 21 -0.65536000000000000000e5
-804 2 9 15 0.32768000000000000000e5
-804 3 13 18 0.32768000000000000000e5
-805 1 7 14 0.32768000000000000000e5
-805 1 8 15 -0.65536000000000000000e5
-805 1 14 21 0.32768000000000000000e5
-805 1 22 25 0.32768000000000000000e5
-805 2 9 16 0.32768000000000000000e5
-805 3 8 13 0.32768000000000000000e5
-805 3 11 12 0.32768000000000000000e5
-805 3 11 24 0.32768000000000000000e5
-805 4 6 10 0.32768000000000000000e5
-806 1 7 22 0.32768000000000000000e5
-806 1 8 23 -0.65536000000000000000e5
-806 1 11 26 0.32768000000000000000e5
-806 1 12 27 0.32768000000000000000e5
-806 2 9 17 0.32768000000000000000e5
-806 3 7 20 0.32768000000000000000e5
-806 3 8 21 0.32768000000000000000e5
-806 4 8 12 0.32768000000000000000e5
-807 1 12 19 0.32768000000000000000e5
-807 1 12 27 0.32768000000000000000e5
-807 1 13 28 -0.65536000000000000000e5
-807 1 17 24 0.32768000000000000000e5
-807 2 9 18 0.32768000000000000000e5
-807 3 4 25 -0.65536000000000000000e5
-807 3 8 21 0.32768000000000000000e5
-807 3 9 22 0.32768000000000000000e5
-807 4 4 16 0.32768000000000000000e5
-808 1 7 22 -0.16384000000000000000e5
-808 1 8 23 0.32768000000000000000e5
-808 1 9 24 0.32768000000000000000e5
-808 1 13 28 0.32768000000000000000e5
-808 1 14 29 -0.65536000000000000000e5
-808 1 17 24 0.16384000000000000000e5
-808 2 9 19 0.32768000000000000000e5
-808 3 4 25 -0.32768000000000000000e5
-808 3 7 20 -0.16384000000000000000e5
-808 3 8 21 -0.16384000000000000000e5
-808 4 8 12 -0.16384000000000000000e5
-809 1 12 19 0.32768000000000000000e5
-809 1 12 27 0.32768000000000000000e5
-809 1 13 28 -0.65536000000000000000e5
-809 1 17 24 0.32768000000000000000e5
-809 2 9 20 0.32768000000000000000e5
-809 3 4 25 -0.65536000000000000000e5
-809 3 8 21 0.32768000000000000000e5
-809 3 9 22 0.32768000000000000000e5
-809 4 4 16 0.32768000000000000000e5
-809 4 12 16 0.32768000000000000000e5
-810 2 8 14 -0.32768000000000000000e5
-810 2 10 11 0.32768000000000000000e5
-811 1 6 21 0.16384000000000000000e5
-811 1 7 14 -0.65536000000000000000e5
-811 1 7 22 0.16384000000000000000e5
-811 1 8 23 0.32768000000000000000e5
-811 1 11 26 0.16384000000000000000e5
-811 1 13 28 0.32768000000000000000e5
-811 2 2 16 0.16384000000000000000e5
-811 2 10 12 0.32768000000000000000e5
-811 3 2 15 0.65536000000000000000e5
-811 3 7 20 0.16384000000000000000e5
-811 3 13 18 0.32768000000000000000e5
-812 1 8 23 0.32768000000000000000e5
-812 1 9 24 0.32768000000000000000e5
-812 1 13 28 0.32768000000000000000e5
-812 1 14 21 -0.65536000000000000000e5
-812 2 10 13 0.32768000000000000000e5
-812 3 13 18 0.32768000000000000000e5
-813 1 7 14 0.32768000000000000000e5
-813 1 10 25 -0.65536000000000000000e5
-813 1 13 20 0.32768000000000000000e5
-813 1 14 21 0.32768000000000000000e5
-813 2 10 14 0.32768000000000000000e5
-813 3 2 15 -0.32768000000000000000e5
-814 1 7 14 0.32768000000000000000e5
-814 1 8 15 -0.65536000000000000000e5
-814 1 14 21 0.32768000000000000000e5
-814 1 22 25 0.32768000000000000000e5
-814 2 10 15 0.32768000000000000000e5
-814 3 8 13 0.32768000000000000000e5
-814 3 11 12 0.32768000000000000000e5
-814 3 11 24 0.32768000000000000000e5
-814 4 6 10 0.32768000000000000000e5
-815 1 7 14 -0.65536000000000000000e5
-815 1 7 22 -0.16384000000000000000e5
-815 1 8 23 0.32768000000000000000e5
-815 1 11 26 0.16384000000000000000e5
-815 1 13 28 0.32768000000000000000e5
-815 1 16 23 0.16384000000000000000e5
-815 1 17 24 0.32768000000000000000e5
-815 2 5 19 0.16384000000000000000e5
-815 2 10 17 0.32768000000000000000e5
-815 3 2 15 0.65536000000000000000e5
-815 3 7 20 -0.16384000000000000000e5
-815 3 8 21 -0.16384000000000000000e5
-815 3 10 23 0.65536000000000000000e5
-815 4 8 12 -0.16384000000000000000e5
-816 1 7 22 -0.16384000000000000000e5
-816 1 8 23 0.32768000000000000000e5
-816 1 9 24 0.32768000000000000000e5
-816 1 13 28 0.32768000000000000000e5
-816 1 14 29 -0.65536000000000000000e5
-816 1 17 24 0.16384000000000000000e5
-816 2 10 18 0.32768000000000000000e5
-816 3 4 25 -0.32768000000000000000e5
-816 3 7 20 -0.16384000000000000000e5
-816 3 8 21 -0.16384000000000000000e5
-816 4 8 12 -0.16384000000000000000e5
-817 1 7 14 0.32768000000000000000e5
-817 1 8 15 -0.65536000000000000000e5
-817 1 14 21 0.32768000000000000000e5
-817 1 22 25 0.32768000000000000000e5
-817 2 10 19 0.32768000000000000000e5
-817 3 8 13 0.32768000000000000000e5
-817 3 11 12 0.32768000000000000000e5
-817 3 11 24 0.32768000000000000000e5
-817 4 6 10 0.32768000000000000000e5
-817 4 10 14 0.32768000000000000000e5
-818 1 3 34 0.16384000000000000000e5
-818 1 7 22 -0.16384000000000000000e5
-818 1 8 23 0.32768000000000000000e5
-818 1 9 24 0.32768000000000000000e5
-818 1 14 29 -0.65536000000000000000e5
-818 1 17 24 0.16384000000000000000e5
-818 1 20 35 -0.16384000000000000000e5
-818 1 25 32 0.32768000000000000000e5
-818 2 6 20 0.81920000000000000000e4
-818 2 10 20 0.32768000000000000000e5
-818 2 14 20 -0.81920000000000000000e4
-818 3 4 25 -0.32768000000000000000e5
-818 3 6 35 -0.16384000000000000000e5
-818 3 7 20 -0.16384000000000000000e5
-818 3 8 21 -0.16384000000000000000e5
-818 3 13 26 -0.32768000000000000000e5
-818 3 14 27 -0.32768000000000000000e5
-818 3 16 29 0.81920000000000000000e4
-818 3 17 30 0.16384000000000000000e5
-818 3 18 31 0.16384000000000000000e5
-818 3 20 25 0.65536000000000000000e5
-818 3 22 27 0.81920000000000000000e4
-818 4 8 12 -0.16384000000000000000e5
-818 4 8 20 0.16384000000000000000e5
-818 4 14 18 0.81920000000000000000e4
-819 2 11 12 0.32768000000000000000e5
-819 2 11 17 -0.32768000000000000000e5
-819 4 11 11 -0.65536000000000000000e5
-820 2 3 17 -0.32768000000000000000e5
-820 2 11 13 0.32768000000000000000e5
-821 2 1 19 -0.32768000000000000000e5
-821 2 11 14 0.32768000000000000000e5
-822 2 6 12 -0.32768000000000000000e5
-822 2 11 15 0.32768000000000000000e5
-822 4 2 14 0.32768000000000000000e5
-823 2 5 19 -0.32768000000000000000e5
-823 2 11 16 0.32768000000000000000e5
-824 1 1 32 -0.32768000000000000000e5
-824 1 2 33 -0.32768000000000000000e5
-824 1 4 35 -0.32768000000000000000e5
-824 1 16 31 0.13107200000000000000e6
-824 1 20 27 -0.13107200000000000000e6
-824 2 6 12 -0.65536000000000000000e5
-824 2 11 17 -0.32768000000000000000e5
-824 2 11 18 0.32768000000000000000e5
-824 2 12 18 -0.32768000000000000000e5
-824 3 3 32 0.32768000000000000000e5
-824 3 4 33 0.32768000000000000000e5
-824 3 17 30 -0.65536000000000000000e5
-824 4 2 14 0.65536000000000000000e5
-824 4 5 17 0.65536000000000000000e5
-824 4 13 17 0.32768000000000000000e5
-825 2 6 12 -0.32768000000000000000e5
-825 2 11 19 0.32768000000000000000e5
-825 4 2 14 0.32768000000000000000e5
-825 4 5 17 0.32768000000000000000e5
-826 2 11 20 0.32768000000000000000e5
-826 2 17 17 -0.65536000000000000000e5
-827 2 3 17 -0.16384000000000000000e5
-827 2 12 12 0.32768000000000000000e5
-828 1 3 18 0.32768000000000000000e5
-828 1 4 27 0.32768000000000000000e5
-828 1 4 35 0.32768000000000000000e5
-828 1 5 20 -0.65536000000000000000e5
-828 1 9 16 -0.65536000000000000000e5
-828 1 20 27 0.65536000000000000000e5
-828 2 12 13 0.32768000000000000000e5
-828 3 1 30 0.65536000000000000000e5
-828 3 3 16 0.32768000000000000000e5
-828 3 3 32 -0.32768000000000000000e5
-828 3 4 17 0.32768000000000000000e5
-828 3 4 33 -0.32768000000000000000e5
-828 3 5 26 0.32768000000000000000e5
-828 3 6 19 0.65536000000000000000e5
-828 3 17 30 0.65536000000000000000e5
-828 4 1 13 0.32768000000000000000e5
-828 4 13 17 -0.32768000000000000000e5
-829 2 6 12 -0.32768000000000000000e5
-829 2 12 14 0.32768000000000000000e5
-829 4 2 14 0.32768000000000000000e5
-830 1 3 34 -0.32768000000000000000e5
-830 1 5 20 0.32768000000000000000e5
-830 2 6 20 -0.32768000000000000000e5
-830 2 12 15 0.32768000000000000000e5
-830 3 1 30 0.32768000000000000000e5
-830 3 2 31 -0.65536000000000000000e5
-830 3 6 19 -0.32768000000000000000e5
-830 3 17 22 0.32768000000000000000e5
-831 1 7 22 0.32768000000000000000e5
-831 1 8 23 -0.65536000000000000000e5
-831 1 11 26 0.32768000000000000000e5
-831 1 12 27 0.32768000000000000000e5
-831 2 12 16 0.32768000000000000000e5
-831 3 7 20 0.32768000000000000000e5
-831 3 8 21 0.32768000000000000000e5
-831 4 8 12 0.32768000000000000000e5
-832 1 1 32 -0.32768000000000000000e5
-832 1 2 33 -0.32768000000000000000e5
-832 1 4 35 -0.32768000000000000000e5
-832 1 16 31 0.13107200000000000000e6
-832 1 20 27 -0.13107200000000000000e6
-832 2 6 12 -0.65536000000000000000e5
-832 2 11 17 -0.32768000000000000000e5
-832 2 12 17 0.32768000000000000000e5
-832 2 12 18 -0.32768000000000000000e5
-832 3 3 32 0.32768000000000000000e5
-832 3 4 33 0.32768000000000000000e5
-832 3 17 30 -0.65536000000000000000e5
-832 4 2 14 0.65536000000000000000e5
-832 4 5 17 0.65536000000000000000e5
-832 4 13 17 0.32768000000000000000e5
-833 2 6 20 -0.32768000000000000000e5
-833 2 12 19 0.32768000000000000000e5
-834 1 2 33 -0.32768000000000000000e5
-834 1 3 34 0.65536000000000000000e5
-834 1 17 32 0.32768000000000000000e5
-834 1 20 35 -0.65536000000000000000e5
-834 2 12 18 -0.32768000000000000000e5
-834 2 12 20 0.32768000000000000000e5
-834 3 4 33 0.32768000000000000000e5
-834 3 6 35 -0.65536000000000000000e5
-834 3 17 30 -0.65536000000000000000e5
-834 4 13 17 0.32768000000000000000e5
-835 2 4 18 -0.16384000000000000000e5
-835 2 13 13 0.32768000000000000000e5
-836 1 3 34 -0.32768000000000000000e5
-836 1 5 20 0.32768000000000000000e5
-836 2 6 20 -0.32768000000000000000e5
-836 2 13 14 0.32768000000000000000e5
-836 3 1 30 0.32768000000000000000e5
-836 3 2 31 -0.65536000000000000000e5
-836 3 6 19 -0.32768000000000000000e5
-836 3 17 22 0.32768000000000000000e5
-837 1 12 27 -0.65536000000000000000e5
-837 1 17 24 0.65536000000000000000e5
-837 1 19 34 0.32768000000000000000e5
-837 1 20 27 -0.32768000000000000000e5
-837 2 6 20 -0.32768000000000000000e5
-837 2 13 15 0.32768000000000000000e5
-837 3 2 31 -0.65536000000000000000e5
-837 3 18 23 0.65536000000000000000e5
-837 3 22 27 0.32768000000000000000e5
-837 4 6 18 -0.32768000000000000000e5
-838 1 12 19 0.32768000000000000000e5
-838 1 12 27 0.32768000000000000000e5
-838 1 13 28 -0.65536000000000000000e5
-838 1 17 24 0.32768000000000000000e5
-838 2 13 16 0.32768000000000000000e5
-838 3 4 25 -0.65536000000000000000e5
-838 3 8 21 0.32768000000000000000e5
-838 3 9 22 0.32768000000000000000e5
-838 4 4 16 0.32768000000000000000e5
-839 2 12 18 -0.32768000000000000000e5
-839 2 13 17 0.32768000000000000000e5
-840 1 2 33 -0.32768000000000000000e5
-840 1 3 34 0.65536000000000000000e5
-840 1 4 27 -0.32768000000000000000e5
-840 1 4 35 -0.32768000000000000000e5
-840 2 4 18 -0.32768000000000000000e5
-840 2 12 18 -0.32768000000000000000e5
-840 2 13 18 0.32768000000000000000e5
-840 3 3 32 0.32768000000000000000e5
-840 3 4 33 0.32768000000000000000e5
-840 3 5 26 -0.32768000000000000000e5
-840 3 17 22 0.65536000000000000000e5
-840 3 17 30 -0.65536000000000000000e5
-840 3 18 19 -0.32768000000000000000e5
-840 4 13 17 0.32768000000000000000e5
-841 1 12 27 -0.65536000000000000000e5
-841 1 17 24 0.65536000000000000000e5
-841 1 19 34 0.32768000000000000000e5
-841 1 20 27 -0.32768000000000000000e5
-841 2 6 20 -0.32768000000000000000e5
-841 2 13 19 0.32768000000000000000e5
-841 3 2 31 -0.65536000000000000000e5
-841 3 18 23 0.65536000000000000000e5
-841 3 22 27 0.32768000000000000000e5
-842 1 2 33 -0.32768000000000000000e5
-842 1 3 34 0.65536000000000000000e5
-842 1 4 27 -0.32768000000000000000e5
-842 1 4 35 -0.32768000000000000000e5
-842 2 4 18 -0.32768000000000000000e5
-842 2 12 18 -0.32768000000000000000e5
-842 2 13 20 0.32768000000000000000e5
-842 3 3 32 0.32768000000000000000e5
-842 3 4 33 0.32768000000000000000e5
-842 3 5 26 -0.32768000000000000000e5
-842 3 17 22 0.65536000000000000000e5
-842 3 17 30 -0.65536000000000000000e5
-842 3 18 19 -0.32768000000000000000e5
-842 4 13 17 0.65536000000000000000e5
-843 2 5 19 -0.16384000000000000000e5
-843 2 14 14 0.32768000000000000000e5
-844 1 7 22 0.32768000000000000000e5
-844 1 8 23 -0.65536000000000000000e5
-844 1 11 26 0.32768000000000000000e5
-844 1 12 27 0.32768000000000000000e5
-844 2 14 15 0.32768000000000000000e5
-844 3 7 20 0.32768000000000000000e5
-844 3 8 21 0.32768000000000000000e5
-844 4 8 12 0.32768000000000000000e5
-845 1 7 14 -0.65536000000000000000e5
-845 1 7 22 -0.16384000000000000000e5
-845 1 8 23 0.32768000000000000000e5
-845 1 11 26 0.16384000000000000000e5
-845 1 13 28 0.32768000000000000000e5
-845 1 16 23 0.16384000000000000000e5
-845 1 17 24 0.32768000000000000000e5
-845 2 5 19 0.16384000000000000000e5
-845 2 14 16 0.32768000000000000000e5
-845 3 2 15 0.65536000000000000000e5
-845 3 7 20 -0.16384000000000000000e5
-845 3 8 21 -0.16384000000000000000e5
-845 3 10 23 0.65536000000000000000e5
-845 4 8 12 -0.16384000000000000000e5
-846 2 6 12 -0.32768000000000000000e5
-846 2 14 17 0.32768000000000000000e5
-846 4 2 14 0.32768000000000000000e5
-846 4 5 17 0.32768000000000000000e5
-847 2 6 20 -0.32768000000000000000e5
-847 2 14 18 0.32768000000000000000e5
-848 1 7 22 0.32768000000000000000e5
-848 1 8 23 -0.65536000000000000000e5
-848 1 12 27 0.32768000000000000000e5
-848 1 16 31 0.32768000000000000000e5
-848 2 14 19 0.32768000000000000000e5
-848 3 2 31 -0.32768000000000000000e5
-848 3 7 20 0.32768000000000000000e5
-848 3 8 21 0.32768000000000000000e5
-848 3 13 26 0.65536000000000000000e5
-848 3 18 23 -0.32768000000000000000e5
-848 4 8 12 0.32768000000000000000e5
-849 1 12 19 0.16384000000000000000e5
-849 1 12 27 0.16384000000000000000e5
-849 1 13 28 -0.32768000000000000000e5
-849 1 17 24 0.16384000000000000000e5
-849 2 15 15 0.32768000000000000000e5
-849 3 4 25 -0.32768000000000000000e5
-849 3 8 21 0.16384000000000000000e5
-849 3 9 22 0.16384000000000000000e5
-849 4 4 16 0.16384000000000000000e5
-850 1 7 22 -0.16384000000000000000e5
-850 1 8 23 0.32768000000000000000e5
-850 1 9 24 0.32768000000000000000e5
-850 1 13 28 0.32768000000000000000e5
-850 1 14 29 -0.65536000000000000000e5
-850 1 17 24 0.16384000000000000000e5
-850 2 15 16 0.32768000000000000000e5
-850 3 4 25 -0.32768000000000000000e5
-850 3 7 20 -0.16384000000000000000e5
-850 3 8 21 -0.16384000000000000000e5
-850 4 8 12 -0.16384000000000000000e5
-851 2 6 20 -0.32768000000000000000e5
-851 2 15 17 0.32768000000000000000e5
-852 1 12 27 -0.65536000000000000000e5
-852 1 17 24 0.65536000000000000000e5
-852 1 19 34 0.32768000000000000000e5
-852 1 20 27 -0.32768000000000000000e5
-852 2 6 20 -0.32768000000000000000e5
-852 2 15 18 0.32768000000000000000e5
-852 3 2 31 -0.65536000000000000000e5
-852 3 18 23 0.65536000000000000000e5
-852 3 22 27 0.32768000000000000000e5
-853 1 12 19 0.32768000000000000000e5
-853 1 12 27 0.32768000000000000000e5
-853 1 13 28 -0.65536000000000000000e5
-853 1 17 24 0.32768000000000000000e5
-853 2 15 19 0.32768000000000000000e5
-853 3 4 25 -0.65536000000000000000e5
-853 3 8 21 0.32768000000000000000e5
-853 3 9 22 0.32768000000000000000e5
-853 4 4 16 0.32768000000000000000e5
-853 4 12 16 0.32768000000000000000e5
-854 1 12 27 -0.65536000000000000000e5
-854 1 17 24 0.65536000000000000000e5
-854 1 19 34 0.32768000000000000000e5
-854 1 20 27 -0.32768000000000000000e5
-854 2 6 20 -0.32768000000000000000e5
-854 2 15 20 0.32768000000000000000e5
-854 3 2 31 -0.65536000000000000000e5
-854 3 18 23 0.65536000000000000000e5
-854 3 22 27 0.32768000000000000000e5
-854 4 14 18 0.32768000000000000000e5
-855 1 7 14 0.16384000000000000000e5
-855 1 8 15 -0.32768000000000000000e5
-855 1 14 21 0.16384000000000000000e5
-855 1 22 25 0.16384000000000000000e5
-855 2 16 16 0.32768000000000000000e5
-855 3 8 13 0.16384000000000000000e5
-855 3 11 12 0.16384000000000000000e5
-855 3 11 24 0.16384000000000000000e5
-855 4 6 10 0.16384000000000000000e5
-855 4 10 14 0.16384000000000000000e5
-856 1 7 22 0.32768000000000000000e5
-856 1 8 23 -0.65536000000000000000e5
-856 1 12 27 0.32768000000000000000e5
-856 1 16 31 0.32768000000000000000e5
-856 2 16 17 0.32768000000000000000e5
-856 3 2 31 -0.32768000000000000000e5
-856 3 7 20 0.32768000000000000000e5
-856 3 8 21 0.32768000000000000000e5
-856 3 13 26 0.65536000000000000000e5
-856 3 18 23 -0.32768000000000000000e5
-856 4 8 12 0.32768000000000000000e5
-857 1 12 19 0.32768000000000000000e5
-857 1 12 27 0.32768000000000000000e5
-857 1 13 28 -0.65536000000000000000e5
-857 1 17 24 0.32768000000000000000e5
-857 2 16 18 0.32768000000000000000e5
-857 3 4 25 -0.65536000000000000000e5
-857 3 8 21 0.32768000000000000000e5
-857 3 9 22 0.32768000000000000000e5
-857 4 4 16 0.32768000000000000000e5
-857 4 12 16 0.32768000000000000000e5
-858 1 3 34 0.16384000000000000000e5
-858 1 7 22 -0.16384000000000000000e5
-858 1 8 23 0.32768000000000000000e5
-858 1 9 24 0.32768000000000000000e5
-858 1 14 29 -0.65536000000000000000e5
-858 1 17 24 0.16384000000000000000e5
-858 1 20 35 -0.16384000000000000000e5
-858 1 25 32 0.32768000000000000000e5
-858 2 6 20 0.81920000000000000000e4
-858 2 14 20 -0.81920000000000000000e4
-858 2 16 19 0.32768000000000000000e5
-858 3 4 25 -0.32768000000000000000e5
-858 3 6 35 -0.16384000000000000000e5
-858 3 7 20 -0.16384000000000000000e5
-858 3 8 21 -0.16384000000000000000e5
-858 3 13 26 -0.32768000000000000000e5
-858 3 14 27 -0.32768000000000000000e5
-858 3 16 29 0.81920000000000000000e4
-858 3 17 30 0.16384000000000000000e5
-858 3 18 31 0.16384000000000000000e5
-858 3 20 25 0.65536000000000000000e5
-858 3 22 27 0.81920000000000000000e4
-858 4 8 12 -0.16384000000000000000e5
-858 4 8 20 0.16384000000000000000e5
-858 4 14 18 0.81920000000000000000e4
-859 1 12 19 0.32768000000000000000e5
-859 1 12 27 0.32768000000000000000e5
-859 1 13 28 -0.65536000000000000000e5
-859 1 17 24 0.32768000000000000000e5
-859 2 16 20 0.32768000000000000000e5
-859 3 4 25 -0.65536000000000000000e5
-859 3 8 21 0.32768000000000000000e5
-859 3 9 22 0.32768000000000000000e5
-859 4 4 16 0.32768000000000000000e5
-859 4 8 20 0.32768000000000000000e5
-859 4 12 16 0.32768000000000000000e5
-860 1 2 33 -0.32768000000000000000e5
-860 1 3 34 0.65536000000000000000e5
-860 1 17 32 0.32768000000000000000e5
-860 1 20 35 -0.65536000000000000000e5
-860 2 12 18 -0.32768000000000000000e5
-860 2 17 18 0.32768000000000000000e5
-860 3 4 33 0.32768000000000000000e5
-860 3 6 35 -0.65536000000000000000e5
-860 3 17 30 -0.65536000000000000000e5
-860 4 13 17 0.32768000000000000000e5
-861 2 14 20 -0.32768000000000000000e5
-861 2 17 19 0.32768000000000000000e5
-862 1 2 33 -0.32768000000000000000e5
-862 1 3 34 0.65536000000000000000e5
-862 1 17 32 0.32768000000000000000e5
-862 1 20 35 -0.65536000000000000000e5
-862 2 12 18 -0.32768000000000000000e5
-862 2 17 20 0.32768000000000000000e5
-862 3 4 33 0.32768000000000000000e5
-862 3 6 35 -0.65536000000000000000e5
-862 3 17 30 -0.65536000000000000000e5
-862 4 13 17 0.32768000000000000000e5
-862 4 17 17 0.65536000000000000000e5
-863 1 2 33 -0.16384000000000000000e5
-863 1 3 34 0.32768000000000000000e5
-863 1 4 27 -0.16384000000000000000e5
-863 1 4 35 -0.16384000000000000000e5
-863 2 4 18 -0.16384000000000000000e5
-863 2 12 18 -0.16384000000000000000e5
-863 2 18 18 0.32768000000000000000e5
-863 3 3 32 0.16384000000000000000e5
-863 3 4 33 0.16384000000000000000e5
-863 3 5 26 -0.16384000000000000000e5
-863 3 17 22 0.32768000000000000000e5
-863 3 17 30 -0.32768000000000000000e5
-863 3 18 19 -0.16384000000000000000e5
-863 4 13 17 0.32768000000000000000e5
-864 1 12 27 -0.65536000000000000000e5
-864 1 17 24 0.65536000000000000000e5
-864 1 19 34 0.32768000000000000000e5
-864 1 20 27 -0.32768000000000000000e5
-864 2 6 20 -0.32768000000000000000e5
-864 2 18 19 0.32768000000000000000e5
-864 3 2 31 -0.65536000000000000000e5
-864 3 18 23 0.65536000000000000000e5
-864 3 22 27 0.32768000000000000000e5
-864 4 14 18 0.32768000000000000000e5
-865 1 12 19 0.16384000000000000000e5
-865 1 12 27 0.16384000000000000000e5
-865 1 13 28 -0.32768000000000000000e5
-865 1 17 24 0.16384000000000000000e5
-865 2 19 19 0.32768000000000000000e5
-865 3 4 25 -0.32768000000000000000e5
-865 3 8 21 0.16384000000000000000e5
-865 3 9 22 0.16384000000000000000e5
-865 4 4 16 0.16384000000000000000e5
-865 4 8 20 0.16384000000000000000e5
-865 4 12 16 0.16384000000000000000e5
-866 1 12 27 -0.65536000000000000000e5
-866 1 17 24 0.65536000000000000000e5
-866 1 20 27 -0.32768000000000000000e5
-866 1 30 33 0.32768000000000000000e5
-866 2 6 20 -0.32768000000000000000e5
-866 2 19 20 0.32768000000000000000e5
-866 3 2 31 -0.65536000000000000000e5
-866 3 6 35 -0.32768000000000000000e5
-866 3 18 23 0.65536000000000000000e5
-866 3 20 33 -0.32768000000000000000e5
-866 3 22 27 0.32768000000000000000e5
-866 3 26 31 0.65536000000000000000e5
-866 4 14 18 0.32768000000000000000e5
-867 1 2 5 -0.16384000000000000000e5
-867 1 3 18 0.16384000000000000000e5
-867 3 1 1 0.32768000000000000000e5
-867 3 1 2 0.16384000000000000000e5
-867 3 1 6 -0.32768000000000000000e5
-867 3 2 3 -0.16384000000000000000e5
-867 3 2 7 0.32768000000000000000e5
-867 4 1 1 0.32768000000000000000e5
-867 4 2 2 -0.32768000000000000000e5
-868 1 2 5 0.32768000000000000000e5
-868 1 3 18 -0.32768000000000000000e5
-868 3 1 3 0.32768000000000000000e5
-868 3 2 3 0.32768000000000000000e5
-868 3 2 7 -0.65536000000000000000e5
-868 4 2 2 0.65536000000000000000e5
-869 3 1 4 0.32768000000000000000e5
-869 3 2 3 -0.32768000000000000000e5
-870 1 2 5 -0.32768000000000000000e5
-870 1 3 18 0.32768000000000000000e5
-870 3 1 5 0.32768000000000000000e5
-871 1 1 8 -0.32768000000000000000e5
-871 1 5 20 0.32768000000000000000e5
-871 1 6 21 0.65536000000000000000e5
-871 1 11 26 -0.65536000000000000000e5
-871 2 1 15 -0.32768000000000000000e5
-871 2 6 12 0.32768000000000000000e5
-871 3 1 7 0.32768000000000000000e5
-871 3 7 20 -0.65536000000000000000e5
-872 3 1 8 0.32768000000000000000e5
-872 3 2 7 -0.32768000000000000000e5
-873 1 2 9 -0.32768000000000000000e5
-873 1 9 16 0.32768000000000000000e5
-873 3 1 9 0.32768000000000000000e5
-874 1 1 8 -0.16384000000000000000e5
-874 1 5 20 0.16384000000000000000e5
-874 1 6 21 0.32768000000000000000e5
-874 1 11 26 -0.32768000000000000000e5
-874 2 1 15 -0.16384000000000000000e5
-874 2 6 12 0.16384000000000000000e5
-874 3 1 6 -0.16384000000000000000e5
-874 3 1 10 0.32768000000000000000e5
-874 3 2 7 -0.16384000000000000000e5
-874 3 7 20 -0.32768000000000000000e5
-874 4 1 5 -0.16384000000000000000e5
-875 1 1 8 -0.16384000000000000000e5
-875 1 2 9 -0.16384000000000000000e5
-875 1 5 20 0.16384000000000000000e5
-875 1 6 21 0.32768000000000000000e5
-875 1 9 16 0.16384000000000000000e5
-875 1 11 26 -0.32768000000000000000e5
-875 2 1 7 -0.16384000000000000000e5
-875 2 6 12 0.16384000000000000000e5
-875 3 1 11 0.32768000000000000000e5
-875 3 2 7 -0.16384000000000000000e5
-875 3 7 20 -0.32768000000000000000e5
-876 1 4 11 0.65536000000000000000e5
-876 1 5 12 0.32768000000000000000e5
-876 1 7 22 -0.32768000000000000000e5
-876 1 8 23 -0.65536000000000000000e5
-876 1 11 26 0.32768000000000000000e5
-876 1 12 19 -0.32768000000000000000e5
-876 1 12 27 0.32768000000000000000e5
-876 2 3 9 0.32768000000000000000e5
-876 3 1 12 0.32768000000000000000e5
-876 3 1 14 0.65536000000000000000e5
-876 3 2 15 -0.13107200000000000000e6
-876 3 5 10 0.65536000000000000000e5
-876 3 7 20 0.32768000000000000000e5
-876 3 8 21 0.32768000000000000000e5
-876 4 4 8 0.32768000000000000000e5
-876 4 5 9 0.65536000000000000000e5
-877 1 6 21 -0.16384000000000000000e5
-877 1 7 10 -0.32768000000000000000e5
-877 1 7 22 -0.16384000000000000000e5
-877 1 8 23 -0.32768000000000000000e5
-877 1 11 26 -0.16384000000000000000e5
-877 1 13 20 0.65536000000000000000e5
-877 2 2 16 -0.16384000000000000000e5
-877 2 8 14 -0.32768000000000000000e5
-877 3 1 13 0.32768000000000000000e5
-877 3 7 20 -0.16384000000000000000e5
-878 1 4 11 0.81920000000000000000e4
-878 1 5 12 0.81920000000000000000e4
-878 1 6 21 -0.81920000000000000000e4
-878 1 7 10 -0.16384000000000000000e5
-878 1 7 22 -0.16384000000000000000e5
-878 1 8 23 -0.16384000000000000000e5
-878 1 11 26 -0.81920000000000000000e4
-878 1 12 19 -0.81920000000000000000e4
-878 1 13 20 0.32768000000000000000e5
-878 2 2 16 -0.81920000000000000000e4
-878 2 6 8 -0.16384000000000000000e5
-878 3 1 15 0.32768000000000000000e5
-878 3 2 15 -0.32768000000000000000e5
-878 3 5 10 0.81920000000000000000e4
-878 3 7 20 -0.81920000000000000000e4
-878 4 4 8 0.81920000000000000000e4
-878 4 5 9 0.16384000000000000000e5
-879 1 1 8 -0.65536000000000000000e5
-879 1 2 5 -0.32768000000000000000e5
-879 1 2 17 0.32768000000000000000e5
-879 1 3 18 0.32768000000000000000e5
-879 1 4 27 -0.32768000000000000000e5
-879 1 5 20 0.13107200000000000000e6
-879 1 11 26 -0.26214400000000000000e6
-879 1 16 23 0.13107200000000000000e6
-879 1 20 27 0.13107200000000000000e6
-879 2 1 3 0.32768000000000000000e5
-879 2 1 19 -0.65536000000000000000e5
-879 2 3 17 -0.32768000000000000000e5
-879 2 6 12 0.13107200000000000000e6
-879 2 11 11 -0.65536000000000000000e5
-879 2 11 17 0.32768000000000000000e5
-879 3 1 2 0.32768000000000000000e5
-879 3 1 16 0.32768000000000000000e5
-879 3 1 30 0.13107200000000000000e6
-879 3 2 7 0.65536000000000000000e5
-879 3 3 16 0.32768000000000000000e5
-879 3 6 19 -0.13107200000000000000e6
-879 4 2 2 -0.65536000000000000000e5
-879 4 2 14 -0.13107200000000000000e6
-879 4 11 11 0.65536000000000000000e5
-880 1 2 17 -0.32768000000000000000e5
-880 1 4 27 0.32768000000000000000e5
-880 1 5 20 -0.65536000000000000000e5
-880 1 11 26 0.13107200000000000000e6
-880 1 20 27 -0.13107200000000000000e6
-880 2 3 17 0.32768000000000000000e5
-880 2 6 12 -0.65536000000000000000e5
-880 2 11 17 -0.32768000000000000000e5
-880 3 1 17 0.32768000000000000000e5
-880 3 1 30 -0.13107200000000000000e6
-880 3 6 19 0.65536000000000000000e5
-880 4 2 14 0.65536000000000000000e5
-880 4 11 11 -0.65536000000000000000e5
-881 3 1 18 0.32768000000000000000e5
-881 3 3 16 -0.32768000000000000000e5
-882 1 9 16 -0.65536000000000000000e5
-882 1 20 27 0.65536000000000000000e5
-882 3 1 19 0.32768000000000000000e5
-882 3 1 30 0.65536000000000000000e5
-882 3 3 16 0.32768000000000000000e5
-882 3 4 17 0.32768000000000000000e5
-882 4 1 13 0.32768000000000000000e5
-883 1 6 21 -0.65536000000000000000e5
-883 1 16 23 0.65536000000000000000e5
-883 2 1 15 0.32768000000000000000e5
-883 2 1 19 -0.32768000000000000000e5
-883 3 1 20 0.32768000000000000000e5
-883 3 6 19 -0.32768000000000000000e5
-883 3 7 20 0.65536000000000000000e5
-883 4 2 14 -0.32768000000000000000e5
-884 1 9 16 0.32768000000000000000e5
-884 1 20 27 -0.32768000000000000000e5
-884 3 1 21 0.32768000000000000000e5
-884 3 1 30 -0.32768000000000000000e5
-884 3 6 19 0.32768000000000000000e5
-884 3 7 20 -0.65536000000000000000e5
-884 4 2 14 0.32768000000000000000e5
-885 1 9 16 -0.32768000000000000000e5
-885 1 20 27 0.32768000000000000000e5
-885 3 1 22 0.32768000000000000000e5
-885 3 1 30 0.32768000000000000000e5
-886 1 6 21 -0.32768000000000000000e5
-886 1 16 23 0.32768000000000000000e5
-886 3 1 23 0.32768000000000000000e5
-887 3 1 24 0.32768000000000000000e5
-887 3 7 20 -0.32768000000000000000e5
-888 1 6 21 -0.16384000000000000000e5
-888 1 7 22 -0.16384000000000000000e5
-888 1 16 23 0.16384000000000000000e5
-888 1 17 24 0.16384000000000000000e5
-888 2 2 16 -0.16384000000000000000e5
-888 2 5 19 0.16384000000000000000e5
-888 3 1 25 0.32768000000000000000e5
-888 3 7 20 -0.16384000000000000000e5
-889 1 1 32 0.32768000000000000000e5
-889 1 4 27 -0.32768000000000000000e5
-889 1 5 20 0.65536000000000000000e5
-889 1 11 26 -0.13107200000000000000e6
-889 1 20 27 0.13107200000000000000e6
-889 2 3 17 -0.32768000000000000000e5
-889 2 6 12 0.65536000000000000000e5
-889 2 11 17 0.32768000000000000000e5
-889 3 1 26 0.32768000000000000000e5
-889 3 1 30 0.13107200000000000000e6
-889 3 6 19 -0.65536000000000000000e5
-889 4 2 14 -0.65536000000000000000e5
-889 4 11 11 0.65536000000000000000e5
-890 1 1 32 -0.32768000000000000000e5
-890 1 2 33 -0.32768000000000000000e5
-890 1 3 18 0.32768000000000000000e5
-890 1 3 34 -0.65536000000000000000e5
-890 1 4 27 0.32768000000000000000e5
-890 1 9 16 -0.65536000000000000000e5
-890 1 16 31 0.13107200000000000000e6
-890 1 20 27 -0.65536000000000000000e5
-890 2 3 17 0.32768000000000000000e5
-890 2 6 12 -0.65536000000000000000e5
-890 2 11 17 -0.32768000000000000000e5
-890 3 1 27 0.32768000000000000000e5
-890 3 3 16 0.32768000000000000000e5
-890 3 4 17 0.32768000000000000000e5
-890 4 1 13 0.32768000000000000000e5
-890 4 2 14 0.65536000000000000000e5
-890 4 5 17 0.65536000000000000000e5
-891 1 2 33 0.32768000000000000000e5
-891 1 3 18 -0.32768000000000000000e5
-891 1 9 16 0.65536000000000000000e5
-891 1 20 27 -0.65536000000000000000e5
-891 3 1 28 0.32768000000000000000e5
-891 3 1 30 -0.65536000000000000000e5
-891 3 3 16 -0.32768000000000000000e5
-891 3 4 17 -0.32768000000000000000e5
-891 4 1 13 -0.32768000000000000000e5
-892 1 3 34 -0.32768000000000000000e5
-892 1 5 20 0.32768000000000000000e5
-892 1 11 26 -0.65536000000000000000e5
-892 1 16 31 0.65536000000000000000e5
-892 3 1 29 0.32768000000000000000e5
-892 3 1 30 0.32768000000000000000e5
-892 3 6 19 -0.32768000000000000000e5
-892 4 5 17 0.32768000000000000000e5
-893 1 11 26 -0.32768000000000000000e5
-893 1 16 31 0.32768000000000000000e5
-893 3 1 31 0.32768000000000000000e5
-894 1 1 32 0.32768000000000000000e5
-894 1 2 33 0.65536000000000000000e5
-894 1 4 35 0.32768000000000000000e5
-894 1 16 31 -0.13107200000000000000e6
-894 1 17 32 -0.32768000000000000000e5
-894 1 20 27 0.13107200000000000000e6
-894 2 6 12 0.65536000000000000000e5
-894 2 11 17 0.32768000000000000000e5
-894 2 12 18 0.32768000000000000000e5
-894 2 17 17 -0.65536000000000000000e5
-894 3 1 32 0.32768000000000000000e5
-894 3 4 33 -0.32768000000000000000e5
-894 3 16 29 -0.65536000000000000000e5
-894 3 17 30 0.65536000000000000000e5
-894 4 2 14 -0.65536000000000000000e5
-894 4 5 17 -0.65536000000000000000e5
-894 4 13 17 -0.32768000000000000000e5
-895 1 2 33 -0.32768000000000000000e5
-895 1 17 32 0.32768000000000000000e5
-895 3 1 33 0.32768000000000000000e5
-896 3 1 34 0.32768000000000000000e5
-896 3 16 29 -0.32768000000000000000e5
-897 1 2 33 -0.32768000000000000000e5
-897 1 3 34 0.65536000000000000000e5
-897 1 4 27 -0.32768000000000000000e5
-897 1 4 35 -0.32768000000000000000e5
-897 2 4 18 -0.32768000000000000000e5
-897 2 12 18 -0.32768000000000000000e5
-897 2 18 20 0.32768000000000000000e5
-897 3 1 35 0.32768000000000000000e5
-897 3 3 32 0.32768000000000000000e5
-897 3 4 33 0.32768000000000000000e5
-897 3 5 26 -0.32768000000000000000e5
-897 3 6 35 -0.65536000000000000000e5
-897 3 17 22 0.65536000000000000000e5
-897 3 17 30 -0.65536000000000000000e5
-897 3 18 19 -0.32768000000000000000e5
-897 3 19 32 -0.32768000000000000000e5
-897 3 20 33 0.65536000000000000000e5
-897 4 13 17 0.65536000000000000000e5
-897 4 17 17 0.65536000000000000000e5
-898 1 2 5 0.16384000000000000000e5
-898 1 3 18 -0.16384000000000000000e5
-898 3 2 2 0.32768000000000000000e5
-898 3 2 3 0.16384000000000000000e5
-898 3 2 7 -0.32768000000000000000e5
-898 4 2 2 0.32768000000000000000e5
-899 1 2 5 -0.32768000000000000000e5
-899 1 3 18 0.32768000000000000000e5
-899 3 2 4 0.32768000000000000000e5
-900 1 2 5 0.32768000000000000000e5
-900 1 2 9 -0.65536000000000000000e5
-900 1 3 18 -0.32768000000000000000e5
-900 1 9 16 0.65536000000000000000e5
-900 2 2 4 0.32768000000000000000e5
-900 2 3 17 -0.32768000000000000000e5
-900 3 2 3 0.32768000000000000000e5
-900 3 2 5 0.32768000000000000000e5
-900 4 1 13 -0.32768000000000000000e5
-901 1 1 8 -0.32768000000000000000e5
-901 1 5 20 0.32768000000000000000e5
-901 1 6 21 0.65536000000000000000e5
-901 1 11 26 -0.65536000000000000000e5
-901 2 1 15 -0.32768000000000000000e5
-901 2 6 12 0.32768000000000000000e5
-901 3 2 6 0.32768000000000000000e5
-901 3 7 20 -0.65536000000000000000e5
-902 1 2 9 -0.32768000000000000000e5
-902 1 9 16 0.32768000000000000000e5
-902 3 2 8 0.32768000000000000000e5
-903 1 2 9 0.32768000000000000000e5
-903 1 4 11 0.13107200000000000000e6
-903 1 5 12 0.65536000000000000000e5
-903 1 7 22 -0.65536000000000000000e5
-903 1 8 23 -0.13107200000000000000e6
-903 1 9 16 -0.32768000000000000000e5
-903 1 11 26 0.65536000000000000000e5
-903 1 12 19 -0.65536000000000000000e5
-903 1 12 27 0.65536000000000000000e5
-903 2 3 9 0.65536000000000000000e5
-903 3 1 14 0.13107200000000000000e6
-903 3 2 7 0.32768000000000000000e5
-903 3 2 9 0.32768000000000000000e5
-903 3 2 15 -0.26214400000000000000e6
-903 3 5 10 0.13107200000000000000e6
-903 3 7 20 0.65536000000000000000e5
-903 3 8 21 0.65536000000000000000e5
-903 4 2 6 0.32768000000000000000e5
-903 4 4 8 0.65536000000000000000e5
-903 4 5 9 0.13107200000000000000e6
-904 1 1 8 -0.16384000000000000000e5
-904 1 2 9 -0.16384000000000000000e5
-904 1 5 20 0.16384000000000000000e5
-904 1 6 21 0.32768000000000000000e5
-904 1 9 16 0.16384000000000000000e5
-904 1 11 26 -0.32768000000000000000e5
-904 2 1 7 -0.16384000000000000000e5
-904 2 6 12 0.16384000000000000000e5
-904 3 2 7 -0.16384000000000000000e5
-904 3 2 10 0.32768000000000000000e5
-904 3 7 20 -0.32768000000000000000e5
-905 1 4 11 0.65536000000000000000e5
-905 1 5 12 0.32768000000000000000e5
-905 1 7 22 -0.32768000000000000000e5
-905 1 8 23 -0.65536000000000000000e5
-905 1 11 26 0.32768000000000000000e5
-905 1 12 19 -0.32768000000000000000e5
-905 1 12 27 0.32768000000000000000e5
-905 2 3 9 0.32768000000000000000e5
-905 3 1 14 0.65536000000000000000e5
-905 3 2 11 0.32768000000000000000e5
-905 3 2 15 -0.13107200000000000000e6
-905 3 5 10 0.65536000000000000000e5
-905 3 7 20 0.32768000000000000000e5
-905 3 8 21 0.32768000000000000000e5
-905 4 4 8 0.32768000000000000000e5
-905 4 5 9 0.65536000000000000000e5
-906 1 4 11 -0.32768000000000000000e5
-906 1 7 22 0.32768000000000000000e5
-906 3 2 12 0.32768000000000000000e5
-907 3 1 14 -0.32768000000000000000e5
-907 3 2 13 0.32768000000000000000e5
-908 1 4 11 0.16384000000000000000e5
-908 1 5 12 0.16384000000000000000e5
-908 1 7 22 -0.16384000000000000000e5
-908 1 12 19 -0.16384000000000000000e5
-908 3 1 14 0.32768000000000000000e5
-908 3 2 14 0.32768000000000000000e5
-908 3 2 15 -0.65536000000000000000e5
-908 3 5 10 0.16384000000000000000e5
-908 4 4 8 0.16384000000000000000e5
-908 4 5 9 0.32768000000000000000e5
-909 1 2 17 -0.32768000000000000000e5
-909 1 4 27 0.32768000000000000000e5
-909 1 5 20 -0.65536000000000000000e5
-909 1 11 26 0.13107200000000000000e6
-909 1 20 27 -0.13107200000000000000e6
-909 2 3 17 0.32768000000000000000e5
-909 2 6 12 -0.65536000000000000000e5
-909 2 11 17 -0.32768000000000000000e5
-909 3 1 30 -0.13107200000000000000e6
-909 3 2 16 0.32768000000000000000e5
-909 3 6 19 0.65536000000000000000e5
-909 4 2 14 0.65536000000000000000e5
-909 4 11 11 -0.65536000000000000000e5
-910 3 2 17 0.32768000000000000000e5
-910 3 3 16 -0.32768000000000000000e5
-911 1 9 16 -0.65536000000000000000e5
-911 1 20 27 0.65536000000000000000e5
-911 3 1 30 0.65536000000000000000e5
-911 3 2 18 0.32768000000000000000e5
-911 3 3 16 0.32768000000000000000e5
-911 3 4 17 0.32768000000000000000e5
-911 4 1 13 0.32768000000000000000e5
-912 3 2 19 0.32768000000000000000e5
-912 3 4 17 -0.32768000000000000000e5
-913 1 9 16 0.32768000000000000000e5
-913 1 20 27 -0.32768000000000000000e5
-913 3 1 30 -0.32768000000000000000e5
-913 3 2 20 0.32768000000000000000e5
-913 3 6 19 0.32768000000000000000e5
-913 3 7 20 -0.65536000000000000000e5
-913 4 2 14 0.32768000000000000000e5
-914 1 9 16 -0.32768000000000000000e5
-914 1 20 27 0.32768000000000000000e5
-914 3 1 30 0.32768000000000000000e5
-914 3 2 21 0.32768000000000000000e5
-915 3 2 22 0.32768000000000000000e5
-915 3 6 19 -0.32768000000000000000e5
-916 3 2 23 0.32768000000000000000e5
-916 3 7 20 -0.32768000000000000000e5
-917 1 7 22 -0.32768000000000000000e5
-917 1 17 24 0.32768000000000000000e5
-917 3 2 24 0.32768000000000000000e5
-918 1 7 22 -0.16384000000000000000e5
-918 1 17 24 0.16384000000000000000e5
-918 3 2 25 0.32768000000000000000e5
-918 3 7 20 -0.16384000000000000000e5
-918 3 8 21 -0.16384000000000000000e5
-918 4 8 12 -0.16384000000000000000e5
-919 1 1 32 -0.32768000000000000000e5
-919 1 2 33 -0.32768000000000000000e5
-919 1 3 18 0.32768000000000000000e5
-919 1 3 34 -0.65536000000000000000e5
-919 1 4 27 0.32768000000000000000e5
-919 1 9 16 -0.65536000000000000000e5
-919 1 16 31 0.13107200000000000000e6
-919 1 20 27 -0.65536000000000000000e5
-919 2 3 17 0.32768000000000000000e5
-919 2 6 12 -0.65536000000000000000e5
-919 2 11 17 -0.32768000000000000000e5
-919 3 2 26 0.32768000000000000000e5
-919 3 3 16 0.32768000000000000000e5
-919 3 4 17 0.32768000000000000000e5
-919 4 1 13 0.32768000000000000000e5
-919 4 2 14 0.65536000000000000000e5
-919 4 5 17 0.65536000000000000000e5
-920 1 2 33 0.32768000000000000000e5
-920 1 3 18 -0.32768000000000000000e5
-920 1 9 16 0.65536000000000000000e5
-920 1 20 27 -0.65536000000000000000e5
-920 3 1 30 -0.65536000000000000000e5
-920 3 2 27 0.32768000000000000000e5
-920 3 3 16 -0.32768000000000000000e5
-920 3 4 17 -0.32768000000000000000e5
-920 4 1 13 -0.32768000000000000000e5
-921 1 2 33 -0.32768000000000000000e5
-921 1 3 34 0.65536000000000000000e5
-921 1 4 27 -0.32768000000000000000e5
-921 1 4 35 -0.32768000000000000000e5
-921 2 12 18 -0.32768000000000000000e5
-921 3 2 28 0.32768000000000000000e5
-921 3 3 32 0.32768000000000000000e5
-921 3 4 33 0.32768000000000000000e5
-921 3 17 30 -0.65536000000000000000e5
-921 4 13 17 0.32768000000000000000e5
-922 3 1 30 -0.32768000000000000000e5
-922 3 2 29 0.32768000000000000000e5
-923 1 3 34 0.32768000000000000000e5
-923 1 5 20 -0.32768000000000000000e5
-923 3 2 30 0.32768000000000000000e5
-923 3 6 19 0.32768000000000000000e5
-924 1 2 33 -0.32768000000000000000e5
-924 1 17 32 0.32768000000000000000e5
-924 3 2 32 0.32768000000000000000e5
-925 3 2 33 0.32768000000000000000e5
-925 3 3 32 -0.32768000000000000000e5
-926 1 3 34 -0.32768000000000000000e5
-926 1 20 35 0.32768000000000000000e5
-926 3 2 34 0.32768000000000000000e5
-926 3 6 35 0.32768000000000000000e5
-927 1 2 33 0.32768000000000000000e5
-927 1 3 34 -0.65536000000000000000e5
-927 1 4 35 0.32768000000000000000e5
-927 1 26 33 0.32768000000000000000e5
-927 2 12 18 0.32768000000000000000e5
-927 3 2 35 0.32768000000000000000e5
-927 3 4 33 -0.32768000000000000000e5
-927 3 17 30 0.65536000000000000000e5
-927 4 13 17 -0.32768000000000000000e5
-928 1 2 5 -0.16384000000000000000e5
-928 1 3 18 0.16384000000000000000e5
-928 3 3 3 0.32768000000000000000e5
-929 1 2 5 0.32768000000000000000e5
-929 1 2 9 -0.65536000000000000000e5
-929 1 3 18 -0.32768000000000000000e5
-929 1 9 16 0.65536000000000000000e5
-929 2 2 4 0.32768000000000000000e5
-929 2 3 17 -0.32768000000000000000e5
-929 3 2 3 0.32768000000000000000e5
-929 3 3 4 0.32768000000000000000e5
-929 4 1 13 -0.32768000000000000000e5
-930 1 2 9 0.13107200000000000000e6
-930 1 4 11 0.26214400000000000000e6
-930 1 5 12 0.13107200000000000000e6
-930 1 7 22 -0.13107200000000000000e6
-930 1 8 23 -0.26214400000000000000e6
-930 1 9 16 -0.13107200000000000000e6
-930 1 11 26 0.13107200000000000000e6
-930 1 12 19 -0.13107200000000000000e6
-930 1 12 27 0.13107200000000000000e6
-930 2 2 4 -0.32768000000000000000e5
-930 2 3 9 0.13107200000000000000e6
-930 2 3 17 0.32768000000000000000e5
-930 3 1 14 0.26214400000000000000e6
-930 3 2 3 -0.32768000000000000000e5
-930 3 2 7 0.65536000000000000000e5
-930 3 2 15 -0.52428800000000000000e6
-930 3 3 5 0.32768000000000000000e5
-930 3 5 10 0.26214400000000000000e6
-930 3 7 20 0.13107200000000000000e6
-930 3 8 21 0.13107200000000000000e6
-930 4 1 13 0.32768000000000000000e5
-930 4 2 6 0.65536000000000000000e5
-930 4 3 3 0.65536000000000000000e5
-930 4 4 8 0.13107200000000000000e6
-930 4 5 9 0.26214400000000000000e6
-931 3 2 7 -0.32768000000000000000e5
-931 3 3 6 0.32768000000000000000e5
-932 1 2 9 -0.32768000000000000000e5
-932 1 9 16 0.32768000000000000000e5
-932 3 3 7 0.32768000000000000000e5
-933 1 2 9 0.32768000000000000000e5
-933 1 4 11 0.13107200000000000000e6
-933 1 5 12 0.65536000000000000000e5
-933 1 7 22 -0.65536000000000000000e5
-933 1 8 23 -0.13107200000000000000e6
-933 1 9 16 -0.32768000000000000000e5
-933 1 11 26 0.65536000000000000000e5
-933 1 12 19 -0.65536000000000000000e5
-933 1 12 27 0.65536000000000000000e5
-933 2 3 9 0.65536000000000000000e5
-933 3 1 14 0.13107200000000000000e6
-933 3 2 7 0.32768000000000000000e5
-933 3 2 15 -0.26214400000000000000e6
-933 3 3 8 0.32768000000000000000e5
-933 3 5 10 0.13107200000000000000e6
-933 3 7 20 0.65536000000000000000e5
-933 3 8 21 0.65536000000000000000e5
-933 4 2 6 0.32768000000000000000e5
-933 4 4 8 0.65536000000000000000e5
-933 4 5 9 0.13107200000000000000e6
-934 1 2 9 -0.32768000000000000000e5
-934 1 4 11 -0.13107200000000000000e6
-934 1 5 12 -0.65536000000000000000e5
-934 1 7 22 0.65536000000000000000e5
-934 1 8 23 0.13107200000000000000e6
-934 1 9 16 0.32768000000000000000e5
-934 1 11 26 -0.65536000000000000000e5
-934 1 12 19 0.65536000000000000000e5
-934 1 12 27 -0.65536000000000000000e5
-934 2 3 9 -0.65536000000000000000e5
-934 3 1 14 -0.13107200000000000000e6
-934 3 2 7 -0.32768000000000000000e5
-934 3 2 15 0.26214400000000000000e6
-934 3 3 9 0.32768000000000000000e5
-934 3 4 9 0.32768000000000000000e5
-934 3 5 10 -0.19660800000000000000e6
-934 3 7 20 -0.65536000000000000000e5
-934 3 8 21 -0.65536000000000000000e5
-934 4 2 6 -0.32768000000000000000e5
-934 4 3 7 0.32768000000000000000e5
-934 4 4 8 -0.65536000000000000000e5
-934 4 5 9 -0.13107200000000000000e6
-935 1 4 11 0.65536000000000000000e5
-935 1 5 12 0.32768000000000000000e5
-935 1 7 22 -0.32768000000000000000e5
-935 1 8 23 -0.65536000000000000000e5
-935 1 11 26 0.32768000000000000000e5
-935 1 12 19 -0.32768000000000000000e5
-935 1 12 27 0.32768000000000000000e5
-935 2 3 9 0.32768000000000000000e5
-935 3 1 14 0.65536000000000000000e5
-935 3 2 15 -0.13107200000000000000e6
-935 3 3 10 0.32768000000000000000e5
-935 3 5 10 0.65536000000000000000e5
-935 3 7 20 0.32768000000000000000e5
-935 3 8 21 0.32768000000000000000e5
-935 4 4 8 0.32768000000000000000e5
-935 4 5 9 0.65536000000000000000e5
-936 1 4 11 -0.32768000000000000000e5
-936 1 7 22 0.32768000000000000000e5
-936 3 3 11 0.32768000000000000000e5
-937 3 3 12 0.32768000000000000000e5
-937 3 5 10 -0.32768000000000000000e5
-938 1 4 11 0.16384000000000000000e5
-938 1 5 12 0.16384000000000000000e5
-938 1 7 22 -0.16384000000000000000e5
-938 1 12 19 -0.16384000000000000000e5
-938 3 1 14 0.32768000000000000000e5
-938 3 2 15 -0.65536000000000000000e5
-938 3 3 13 0.32768000000000000000e5
-938 3 5 10 0.16384000000000000000e5
-938 4 4 8 0.16384000000000000000e5
-938 4 5 9 0.32768000000000000000e5
-939 1 4 11 -0.16384000000000000000e5
-939 1 5 12 -0.16384000000000000000e5
-939 1 7 22 0.16384000000000000000e5
-939 1 12 19 0.16384000000000000000e5
-939 3 3 14 0.32768000000000000000e5
-939 3 5 10 -0.16384000000000000000e5
-939 4 4 8 -0.16384000000000000000e5
-940 3 3 15 0.32768000000000000000e5
-940 3 8 13 -0.32768000000000000000e5
-941 1 9 16 -0.65536000000000000000e5
-941 1 20 27 0.65536000000000000000e5
-941 3 1 30 0.65536000000000000000e5
-941 3 3 16 0.32768000000000000000e5
-941 3 3 17 0.32768000000000000000e5
-941 3 4 17 0.32768000000000000000e5
-941 4 1 13 0.32768000000000000000e5
-942 3 3 18 0.32768000000000000000e5
-942 3 4 17 -0.32768000000000000000e5
-943 1 4 19 -0.32768000000000000000e5
-943 1 4 35 0.32768000000000000000e5
-943 3 3 19 0.32768000000000000000e5
-943 3 3 32 -0.32768000000000000000e5
-943 3 4 33 -0.32768000000000000000e5
-943 3 5 26 0.32768000000000000000e5
-943 3 17 30 0.65536000000000000000e5
-943 4 13 17 -0.32768000000000000000e5
-944 1 9 16 -0.32768000000000000000e5
-944 1 20 27 0.32768000000000000000e5
-944 3 1 30 0.32768000000000000000e5
-944 3 3 20 0.32768000000000000000e5
-945 3 3 21 0.32768000000000000000e5
-945 3 6 19 -0.32768000000000000000e5
-946 1 7 22 -0.65536000000000000000e5
-946 1 9 16 0.32768000000000000000e5
-946 1 17 24 0.65536000000000000000e5
-946 1 20 27 -0.32768000000000000000e5
-946 3 1 30 -0.32768000000000000000e5
-946 3 3 22 0.32768000000000000000e5
-946 3 6 19 0.32768000000000000000e5
-946 4 7 11 0.32768000000000000000e5
-947 1 7 22 -0.32768000000000000000e5
-947 1 17 24 0.32768000000000000000e5
-947 3 3 23 0.32768000000000000000e5
-948 3 3 24 0.32768000000000000000e5
-948 3 8 21 -0.32768000000000000000e5
-949 3 3 25 0.32768000000000000000e5
-949 3 13 18 -0.32768000000000000000e5
-950 1 2 33 0.32768000000000000000e5
-950 1 3 18 -0.32768000000000000000e5
-950 1 9 16 0.65536000000000000000e5
-950 1 20 27 -0.65536000000000000000e5
-950 3 1 30 -0.65536000000000000000e5
-950 3 3 16 -0.32768000000000000000e5
-950 3 3 26 0.32768000000000000000e5
-950 3 4 17 -0.32768000000000000000e5
-950 4 1 13 -0.32768000000000000000e5
-951 1 2 33 -0.32768000000000000000e5
-951 1 3 34 0.65536000000000000000e5
-951 1 4 27 -0.32768000000000000000e5
-951 1 4 35 -0.32768000000000000000e5
-951 2 12 18 -0.32768000000000000000e5
-951 3 3 27 0.32768000000000000000e5
-951 3 3 32 0.32768000000000000000e5
-951 3 4 33 0.32768000000000000000e5
-951 3 17 30 -0.65536000000000000000e5
-951 4 13 17 0.32768000000000000000e5
-952 3 3 28 0.32768000000000000000e5
-952 3 5 26 -0.32768000000000000000e5
-953 1 3 34 0.32768000000000000000e5
-953 1 5 20 -0.32768000000000000000e5
-953 3 3 29 0.32768000000000000000e5
-953 3 6 19 0.32768000000000000000e5
-954 3 3 30 0.32768000000000000000e5
-954 3 17 22 -0.32768000000000000000e5
-955 3 3 31 0.32768000000000000000e5
-955 3 18 23 -0.32768000000000000000e5
-956 3 3 32 0.32768000000000000000e5
-956 3 3 33 0.32768000000000000000e5
-956 3 4 33 0.32768000000000000000e5
-956 3 17 30 -0.65536000000000000000e5
-956 4 13 17 0.32768000000000000000e5
-957 3 3 34 0.32768000000000000000e5
-957 3 17 30 -0.32768000000000000000e5
-958 1 4 27 0.32768000000000000000e5
-958 1 26 33 -0.32768000000000000000e5
-958 2 4 18 0.32768000000000000000e5
-958 2 18 20 -0.32768000000000000000e5
-958 3 3 32 -0.32768000000000000000e5
-958 3 3 35 0.32768000000000000000e5
-958 3 5 26 0.32768000000000000000e5
-958 3 17 22 -0.65536000000000000000e5
-958 3 18 19 0.32768000000000000000e5
-958 3 19 32 0.32768000000000000000e5
-958 3 20 33 -0.65536000000000000000e5
-958 4 13 17 -0.32768000000000000000e5
-959 1 2 9 0.65536000000000000000e5
-959 1 4 11 0.13107200000000000000e6
-959 1 5 12 0.65536000000000000000e5
-959 1 7 22 -0.65536000000000000000e5
-959 1 8 23 -0.13107200000000000000e6
-959 1 9 16 -0.65536000000000000000e5
-959 1 11 26 0.65536000000000000000e5
-959 1 12 19 -0.65536000000000000000e5
-959 1 12 27 0.65536000000000000000e5
-959 2 2 4 -0.16384000000000000000e5
-959 2 3 9 0.65536000000000000000e5
-959 2 3 17 0.16384000000000000000e5
-959 3 1 14 0.13107200000000000000e6
-959 3 2 3 -0.16384000000000000000e5
-959 3 2 7 0.32768000000000000000e5
-959 3 2 15 -0.26214400000000000000e6
-959 3 4 4 0.32768000000000000000e5
-959 3 5 10 0.13107200000000000000e6
-959 3 7 20 0.65536000000000000000e5
-959 3 8 21 0.65536000000000000000e5
-959 4 1 13 0.16384000000000000000e5
-959 4 2 6 0.32768000000000000000e5
-959 4 3 3 0.32768000000000000000e5
-959 4 4 8 0.65536000000000000000e5
-959 4 5 9 0.13107200000000000000e6
-960 1 2 9 -0.32768000000000000000e5
-960 1 9 16 0.32768000000000000000e5
-960 3 4 6 0.32768000000000000000e5
-961 1 2 9 0.32768000000000000000e5
-961 1 4 11 0.13107200000000000000e6
-961 1 5 12 0.65536000000000000000e5
-961 1 7 22 -0.65536000000000000000e5
-961 1 8 23 -0.13107200000000000000e6
-961 1 9 16 -0.32768000000000000000e5
-961 1 11 26 0.65536000000000000000e5
-961 1 12 19 -0.65536000000000000000e5
-961 1 12 27 0.65536000000000000000e5
-961 2 3 9 0.65536000000000000000e5
-961 3 1 14 0.13107200000000000000e6
-961 3 2 7 0.32768000000000000000e5
-961 3 2 15 -0.26214400000000000000e6
-961 3 4 7 0.32768000000000000000e5
-961 3 5 10 0.13107200000000000000e6
-961 3 7 20 0.65536000000000000000e5
-961 3 8 21 0.65536000000000000000e5
-961 4 2 6 0.32768000000000000000e5
-961 4 4 8 0.65536000000000000000e5
-961 4 5 9 0.13107200000000000000e6
-962 1 2 9 -0.32768000000000000000e5
-962 1 4 11 -0.13107200000000000000e6
-962 1 5 12 -0.65536000000000000000e5
-962 1 7 22 0.65536000000000000000e5
-962 1 8 23 0.13107200000000000000e6
-962 1 9 16 0.32768000000000000000e5
-962 1 11 26 -0.65536000000000000000e5
-962 1 12 19 0.65536000000000000000e5
-962 1 12 27 -0.65536000000000000000e5
-962 2 3 9 -0.65536000000000000000e5
-962 3 1 14 -0.13107200000000000000e6
-962 3 2 7 -0.32768000000000000000e5
-962 3 2 15 0.26214400000000000000e6
-962 3 4 8 0.32768000000000000000e5
-962 3 4 9 0.32768000000000000000e5
-962 3 5 10 -0.19660800000000000000e6
-962 3 7 20 -0.65536000000000000000e5
-962 3 8 21 -0.65536000000000000000e5
-962 4 2 6 -0.32768000000000000000e5
-962 4 3 7 0.32768000000000000000e5
-962 4 4 8 -0.65536000000000000000e5
-962 4 5 9 -0.13107200000000000000e6
-963 1 4 11 -0.32768000000000000000e5
-963 1 7 22 0.32768000000000000000e5
-963 3 4 10 0.32768000000000000000e5
-964 3 4 11 0.32768000000000000000e5
-964 3 5 10 -0.32768000000000000000e5
-965 1 5 12 -0.32768000000000000000e5
-965 1 12 19 0.32768000000000000000e5
-965 3 4 12 0.32768000000000000000e5
-966 1 4 11 -0.16384000000000000000e5
-966 1 5 12 -0.16384000000000000000e5
-966 1 7 22 0.16384000000000000000e5
-966 1 12 19 0.16384000000000000000e5
-966 3 4 13 0.32768000000000000000e5
-966 3 5 10 -0.16384000000000000000e5
-966 4 4 8 -0.16384000000000000000e5
-967 1 8 23 0.32768000000000000000e5
-967 1 9 24 0.32768000000000000000e5
-967 1 13 28 0.32768000000000000000e5
-967 1 14 21 -0.65536000000000000000e5
-967 2 4 10 0.32768000000000000000e5
-967 3 1 14 -0.32768000000000000000e5
-967 3 2 15 0.65536000000000000000e5
-967 3 4 14 0.32768000000000000000e5
-967 3 8 13 -0.65536000000000000000e5
-967 3 13 18 0.32768000000000000000e5
-967 4 5 9 -0.32768000000000000000e5
-968 3 4 15 0.32768000000000000000e5
-968 3 11 12 -0.32768000000000000000e5
-969 1 9 16 -0.65536000000000000000e5
-969 1 20 27 0.65536000000000000000e5
-969 3 1 30 0.65536000000000000000e5
-969 3 3 16 0.32768000000000000000e5
-969 3 4 16 0.32768000000000000000e5
-969 3 4 17 0.32768000000000000000e5
-969 4 1 13 0.32768000000000000000e5
-970 1 4 19 -0.32768000000000000000e5
-970 1 4 35 0.32768000000000000000e5
-970 3 3 32 -0.32768000000000000000e5
-970 3 4 18 0.32768000000000000000e5
-970 3 4 33 -0.32768000000000000000e5
-970 3 5 26 0.32768000000000000000e5
-970 3 17 30 0.65536000000000000000e5
-970 4 13 17 -0.32768000000000000000e5
-971 3 4 19 0.32768000000000000000e5
-971 3 5 18 -0.32768000000000000000e5
-972 3 4 20 0.32768000000000000000e5
-972 3 6 19 -0.32768000000000000000e5
-973 1 7 22 -0.65536000000000000000e5
-973 1 9 16 0.32768000000000000000e5
-973 1 17 24 0.65536000000000000000e5
-973 1 20 27 -0.32768000000000000000e5
-973 3 1 30 -0.32768000000000000000e5
-973 3 4 21 0.32768000000000000000e5
-973 3 6 19 0.32768000000000000000e5
-973 4 7 11 0.32768000000000000000e5
-974 1 7 22 0.65536000000000000000e5
-974 1 9 16 -0.32768000000000000000e5
-974 1 17 24 -0.65536000000000000000e5
-974 1 20 27 0.32768000000000000000e5
-974 3 1 30 0.32768000000000000000e5
-974 3 4 22 0.32768000000000000000e5
-974 3 8 21 -0.65536000000000000000e5
-974 4 3 15 0.32768000000000000000e5
-974 4 7 11 -0.32768000000000000000e5
-975 3 4 23 0.32768000000000000000e5
-975 3 8 21 -0.32768000000000000000e5
-976 3 4 24 0.32768000000000000000e5
-976 3 4 25 -0.65536000000000000000e5
-976 3 8 21 0.32768000000000000000e5
-976 3 9 22 0.32768000000000000000e5
-976 4 4 16 0.32768000000000000000e5
-977 1 2 33 -0.32768000000000000000e5
-977 1 3 34 0.65536000000000000000e5
-977 1 4 27 -0.32768000000000000000e5
-977 1 4 35 -0.32768000000000000000e5
-977 2 12 18 -0.32768000000000000000e5
-977 3 3 32 0.32768000000000000000e5
-977 3 4 26 0.32768000000000000000e5
-977 3 4 33 0.32768000000000000000e5
-977 3 17 30 -0.65536000000000000000e5
-977 4 13 17 0.32768000000000000000e5
-978 3 4 27 0.32768000000000000000e5
-978 3 5 26 -0.32768000000000000000e5
-979 3 4 28 0.32768000000000000000e5
-979 3 18 19 -0.32768000000000000000e5
-980 3 4 29 0.32768000000000000000e5
-980 3 17 22 -0.32768000000000000000e5
-981 1 3 34 -0.32768000000000000000e5
-981 1 5 20 0.32768000000000000000e5
-981 3 4 30 0.32768000000000000000e5
-981 3 6 19 -0.32768000000000000000e5
-981 3 17 22 0.32768000000000000000e5
-981 3 18 23 -0.65536000000000000000e5
-981 4 6 18 0.32768000000000000000e5
-982 1 3 34 0.32768000000000000000e5
-982 1 13 28 -0.65536000000000000000e5
-982 1 20 35 -0.32768000000000000000e5
-982 1 25 32 0.65536000000000000000e5
-982 2 6 20 0.16384000000000000000e5
-982 2 14 20 -0.16384000000000000000e5
-982 3 2 31 0.32768000000000000000e5
-982 3 4 31 0.32768000000000000000e5
-982 3 6 35 -0.32768000000000000000e5
-982 3 16 29 0.16384000000000000000e5
-982 3 17 30 0.32768000000000000000e5
-982 3 18 23 0.32768000000000000000e5
-982 3 18 31 0.32768000000000000000e5
-982 3 22 27 0.16384000000000000000e5
-982 4 8 20 0.32768000000000000000e5
-982 4 12 16 0.32768000000000000000e5
-982 4 14 18 0.16384000000000000000e5
-983 3 3 32 0.32768000000000000000e5
-983 3 4 32 0.32768000000000000000e5
-983 3 4 33 0.32768000000000000000e5
-983 3 17 30 -0.65536000000000000000e5
-983 4 13 17 0.32768000000000000000e5
-984 3 4 34 0.32768000000000000000e5
-984 3 22 27 -0.32768000000000000000e5
-985 3 4 35 0.32768000000000000000e5
-985 3 19 32 -0.32768000000000000000e5
-986 1 2 9 -0.65536000000000000000e5
-986 1 4 11 -0.13107200000000000000e6
-986 1 5 12 -0.65536000000000000000e5
-986 1 7 22 0.65536000000000000000e5
-986 1 8 23 0.13107200000000000000e6
-986 1 9 16 0.65536000000000000000e5
-986 1 11 26 -0.65536000000000000000e5
-986 1 12 19 0.65536000000000000000e5
-986 1 12 27 -0.65536000000000000000e5
-986 2 2 4 0.16384000000000000000e5
-986 2 3 9 -0.65536000000000000000e5
-986 2 3 17 -0.16384000000000000000e5
-986 3 1 14 -0.13107200000000000000e6
-986 3 2 3 0.16384000000000000000e5
-986 3 2 7 -0.32768000000000000000e5
-986 3 2 15 0.26214400000000000000e6
-986 3 4 5 0.16384000000000000000e5
-986 3 4 9 -0.32768000000000000000e5
-986 3 5 5 0.32768000000000000000e5
-986 3 5 10 -0.13107200000000000000e6
-986 3 7 20 -0.65536000000000000000e5
-986 3 8 21 -0.65536000000000000000e5
-986 4 1 13 -0.16384000000000000000e5
-986 4 2 6 -0.32768000000000000000e5
-986 4 3 3 -0.32768000000000000000e5
-986 4 4 4 0.32768000000000000000e5
-986 4 4 8 -0.65536000000000000000e5
-986 4 5 9 -0.13107200000000000000e6
-987 1 2 9 0.32768000000000000000e5
-987 1 4 11 0.13107200000000000000e6
-987 1 5 12 0.65536000000000000000e5
-987 1 7 22 -0.65536000000000000000e5
-987 1 8 23 -0.13107200000000000000e6
-987 1 9 16 -0.32768000000000000000e5
-987 1 11 26 0.65536000000000000000e5
-987 1 12 19 -0.65536000000000000000e5
-987 1 12 27 0.65536000000000000000e5
-987 2 3 9 0.65536000000000000000e5
-987 3 1 14 0.13107200000000000000e6
-987 3 2 7 0.32768000000000000000e5
-987 3 2 15 -0.26214400000000000000e6
-987 3 5 6 0.32768000000000000000e5
-987 3 5 10 0.13107200000000000000e6
-987 3 7 20 0.65536000000000000000e5
-987 3 8 21 0.65536000000000000000e5
-987 4 2 6 0.32768000000000000000e5
-987 4 4 8 0.65536000000000000000e5
-987 4 5 9 0.13107200000000000000e6
-988 1 2 9 -0.32768000000000000000e5
-988 1 4 11 -0.13107200000000000000e6
-988 1 5 12 -0.65536000000000000000e5
-988 1 7 22 0.65536000000000000000e5
-988 1 8 23 0.13107200000000000000e6
-988 1 9 16 0.32768000000000000000e5
-988 1 11 26 -0.65536000000000000000e5
-988 1 12 19 0.65536000000000000000e5
-988 1 12 27 -0.65536000000000000000e5
-988 2 3 9 -0.65536000000000000000e5
-988 3 1 14 -0.13107200000000000000e6
-988 3 2 7 -0.32768000000000000000e5
-988 3 2 15 0.26214400000000000000e6
-988 3 4 9 0.32768000000000000000e5
-988 3 5 7 0.32768000000000000000e5
-988 3 5 10 -0.19660800000000000000e6
-988 3 7 20 -0.65536000000000000000e5
-988 3 8 21 -0.65536000000000000000e5
-988 4 2 6 -0.32768000000000000000e5
-988 4 3 7 0.32768000000000000000e5
-988 4 4 8 -0.65536000000000000000e5
-988 4 5 9 -0.13107200000000000000e6
-989 3 4 9 -0.32768000000000000000e5
-989 3 5 8 0.32768000000000000000e5
-990 1 2 9 0.32768000000000000000e5
-990 1 4 11 0.13107200000000000000e6
-990 1 7 22 -0.65536000000000000000e5
-990 1 8 23 -0.13107200000000000000e6
-990 1 9 16 -0.32768000000000000000e5
-990 1 11 26 0.65536000000000000000e5
-990 1 12 27 0.65536000000000000000e5
-990 2 3 9 0.65536000000000000000e5
-990 3 1 14 0.13107200000000000000e6
-990 3 2 7 0.32768000000000000000e5
-990 3 2 15 -0.26214400000000000000e6
-990 3 5 9 0.32768000000000000000e5
-990 3 5 10 0.19660800000000000000e6
-990 3 7 20 0.65536000000000000000e5
-990 3 8 21 0.65536000000000000000e5
-990 4 2 6 0.32768000000000000000e5
-990 4 3 7 -0.32768000000000000000e5
-990 4 4 7 0.32768000000000000000e5
-990 4 4 8 0.65536000000000000000e5
-990 4 5 9 0.13107200000000000000e6
-991 1 5 12 -0.32768000000000000000e5
-991 1 12 19 0.32768000000000000000e5
-991 3 5 11 0.32768000000000000000e5
-992 1 5 12 0.32768000000000000000e5
-992 1 8 23 0.65536000000000000000e5
-992 1 9 24 0.65536000000000000000e5
-992 1 12 19 -0.32768000000000000000e5
-992 1 13 28 0.65536000000000000000e5
-992 1 14 21 -0.13107200000000000000e6
-992 2 4 10 0.65536000000000000000e5
-992 3 1 14 -0.65536000000000000000e5
-992 3 2 15 0.13107200000000000000e6
-992 3 5 10 0.32768000000000000000e5
-992 3 5 12 0.32768000000000000000e5
-992 3 8 13 -0.13107200000000000000e6
-992 3 13 18 0.65536000000000000000e5
-992 4 5 9 -0.65536000000000000000e5
-992 4 7 7 0.65536000000000000000e5
-993 1 8 23 0.32768000000000000000e5
-993 1 9 24 0.32768000000000000000e5
-993 1 13 28 0.32768000000000000000e5
-993 1 14 21 -0.65536000000000000000e5
-993 2 4 10 0.32768000000000000000e5
-993 3 1 14 -0.32768000000000000000e5
-993 3 2 15 0.65536000000000000000e5
-993 3 5 13 0.32768000000000000000e5
-993 3 8 13 -0.65536000000000000000e5
-993 3 13 18 0.32768000000000000000e5
-993 4 5 9 -0.32768000000000000000e5
-994 3 5 15 0.32768000000000000000e5
-994 3 9 14 -0.32768000000000000000e5
-995 3 4 17 -0.32768000000000000000e5
-995 3 5 16 0.32768000000000000000e5
-996 1 4 19 -0.32768000000000000000e5
-996 1 4 35 0.32768000000000000000e5
-996 3 3 32 -0.32768000000000000000e5
-996 3 4 33 -0.32768000000000000000e5
-996 3 5 17 0.32768000000000000000e5
-996 3 5 26 0.32768000000000000000e5
-996 3 17 30 0.65536000000000000000e5
-996 4 13 17 -0.32768000000000000000e5
-997 1 7 22 -0.65536000000000000000e5
-997 1 9 16 0.32768000000000000000e5
-997 1 17 24 0.65536000000000000000e5
-997 1 20 27 -0.32768000000000000000e5
-997 3 1 30 -0.32768000000000000000e5
-997 3 5 20 0.32768000000000000000e5
-997 3 6 19 0.32768000000000000000e5
-997 4 7 11 0.32768000000000000000e5
-998 1 7 22 0.65536000000000000000e5
-998 1 9 16 -0.32768000000000000000e5
-998 1 17 24 -0.65536000000000000000e5
-998 1 20 27 0.32768000000000000000e5
-998 3 1 30 0.32768000000000000000e5
-998 3 5 21 0.32768000000000000000e5
-998 3 8 21 -0.65536000000000000000e5
-998 4 3 15 0.32768000000000000000e5
-998 4 7 11 -0.32768000000000000000e5
-999 3 4 25 -0.65536000000000000000e5
-999 3 5 23 0.32768000000000000000e5
-999 3 8 21 0.32768000000000000000e5
-999 3 9 22 0.32768000000000000000e5
-999 4 4 16 0.32768000000000000000e5
-1000 3 5 24 0.32768000000000000000e5
-1000 3 9 22 -0.32768000000000000000e5
-1001 3 5 25 0.32768000000000000000e5
-1001 3 14 19 -0.32768000000000000000e5
-1002 3 5 27 0.32768000000000000000e5
-1002 3 18 19 -0.32768000000000000000e5
-1003 1 3 34 -0.65536000000000000000e5
-1003 1 5 20 0.65536000000000000000e5
-1003 3 5 26 0.32768000000000000000e5
-1003 3 5 28 0.32768000000000000000e5
-1003 3 6 19 -0.65536000000000000000e5
-1003 3 17 22 0.65536000000000000000e5
-1003 3 18 19 0.32768000000000000000e5
-1003 3 18 23 -0.13107200000000000000e6
-1003 4 6 18 0.65536000000000000000e5
-1003 4 13 13 0.65536000000000000000e5
-1004 1 3 34 -0.32768000000000000000e5
-1004 1 5 20 0.32768000000000000000e5
-1004 3 5 29 0.32768000000000000000e5
-1004 3 6 19 -0.32768000000000000000e5
-1004 3 17 22 0.32768000000000000000e5
-1004 3 18 23 -0.65536000000000000000e5
-1004 4 6 18 0.32768000000000000000e5
-1005 1 3 34 -0.32768000000000000000e5
-1005 1 13 28 0.65536000000000000000e5
-1005 1 20 35 0.32768000000000000000e5
-1005 1 25 32 -0.65536000000000000000e5
-1005 2 6 20 -0.16384000000000000000e5
-1005 2 14 20 0.16384000000000000000e5
-1005 3 2 31 -0.32768000000000000000e5
-1005 3 5 31 0.32768000000000000000e5
-1005 3 6 35 0.32768000000000000000e5
-1005 3 14 27 -0.65536000000000000000e5
-1005 3 16 29 -0.16384000000000000000e5
-1005 3 17 30 -0.32768000000000000000e5
-1005 3 18 31 -0.32768000000000000000e5
-1005 3 22 27 -0.16384000000000000000e5
-1005 4 7 19 0.32768000000000000000e5
-1005 4 8 20 -0.32768000000000000000e5
-1005 4 12 16 -0.32768000000000000000e5
-1005 4 14 18 -0.16384000000000000000e5
-1006 3 4 33 -0.32768000000000000000e5
-1006 3 5 32 0.32768000000000000000e5
-1007 3 3 32 -0.32768000000000000000e5
-1007 3 5 33 0.32768000000000000000e5
-1007 3 17 30 0.65536000000000000000e5
-1007 3 22 27 -0.65536000000000000000e5
-1007 4 4 20 0.32768000000000000000e5
-1007 4 13 17 -0.32768000000000000000e5
-1008 1 4 27 -0.32768000000000000000e5
-1008 1 19 34 -0.65536000000000000000e5
-1008 1 26 33 0.32768000000000000000e5
-1008 1 30 33 0.65536000000000000000e5
-1008 2 4 18 -0.32768000000000000000e5
-1008 2 18 20 0.32768000000000000000e5
-1008 3 3 32 0.32768000000000000000e5
-1008 3 5 26 -0.32768000000000000000e5
-1008 3 5 35 0.32768000000000000000e5
-1008 3 17 22 0.65536000000000000000e5
-1008 3 18 19 -0.32768000000000000000e5
-1008 3 20 33 0.65536000000000000000e5
-1008 4 13 17 0.32768000000000000000e5
-1008 4 18 18 0.65536000000000000000e5
-1009 1 1 8 -0.81920000000000000000e4
-1009 1 5 20 0.81920000000000000000e4
-1009 1 6 21 0.16384000000000000000e5
-1009 1 11 26 -0.16384000000000000000e5
-1009 2 1 15 -0.81920000000000000000e4
-1009 2 6 12 0.81920000000000000000e4
-1009 3 1 6 -0.81920000000000000000e4
-1009 3 2 7 -0.81920000000000000000e4
-1009 3 6 6 0.32768000000000000000e5
-1009 3 7 20 -0.16384000000000000000e5
-1009 4 1 5 -0.81920000000000000000e4
-1010 1 1 8 -0.16384000000000000000e5
-1010 1 2 9 -0.16384000000000000000e5
-1010 1 5 20 0.16384000000000000000e5
-1010 1 6 21 0.32768000000000000000e5
-1010 1 9 16 0.16384000000000000000e5
-1010 1 11 26 -0.32768000000000000000e5
-1010 2 1 7 -0.16384000000000000000e5
-1010 2 6 12 0.16384000000000000000e5
-1010 3 2 7 -0.16384000000000000000e5
-1010 3 6 7 0.32768000000000000000e5
-1010 3 7 20 -0.32768000000000000000e5
-1011 1 4 11 0.65536000000000000000e5
-1011 1 5 12 0.32768000000000000000e5
-1011 1 7 22 -0.32768000000000000000e5
-1011 1 8 23 -0.65536000000000000000e5
-1011 1 11 26 0.32768000000000000000e5
-1011 1 12 19 -0.32768000000000000000e5
-1011 1 12 27 0.32768000000000000000e5
-1011 2 3 9 0.32768000000000000000e5
-1011 3 1 14 0.65536000000000000000e5
-1011 3 2 15 -0.13107200000000000000e6
-1011 3 5 10 0.65536000000000000000e5
-1011 3 6 8 0.32768000000000000000e5
-1011 3 7 20 0.32768000000000000000e5
-1011 3 8 21 0.32768000000000000000e5
-1011 4 4 8 0.32768000000000000000e5
-1011 4 5 9 0.65536000000000000000e5
-1012 1 4 11 -0.32768000000000000000e5
-1012 1 7 22 0.32768000000000000000e5
-1012 3 6 9 0.32768000000000000000e5
-1013 1 6 21 -0.16384000000000000000e5
-1013 1 7 10 -0.32768000000000000000e5
-1013 1 7 22 -0.16384000000000000000e5
-1013 1 8 23 -0.32768000000000000000e5
-1013 1 11 26 -0.16384000000000000000e5
-1013 1 13 20 0.65536000000000000000e5
-1013 2 2 16 -0.16384000000000000000e5
-1013 2 8 14 -0.32768000000000000000e5
-1013 3 6 10 0.32768000000000000000e5
-1013 3 7 20 -0.16384000000000000000e5
-1014 3 1 14 -0.32768000000000000000e5
-1014 3 6 11 0.32768000000000000000e5
-1015 1 4 11 0.16384000000000000000e5
-1015 1 5 12 0.16384000000000000000e5
-1015 1 7 22 -0.16384000000000000000e5
-1015 1 12 19 -0.16384000000000000000e5
-1015 3 1 14 0.32768000000000000000e5
-1015 3 2 15 -0.65536000000000000000e5
-1015 3 5 10 0.16384000000000000000e5
-1015 3 6 12 0.32768000000000000000e5
-1015 4 4 8 0.16384000000000000000e5
-1015 4 5 9 0.32768000000000000000e5
-1016 1 4 11 0.81920000000000000000e4
-1016 1 5 12 0.81920000000000000000e4
-1016 1 6 21 -0.81920000000000000000e4
-1016 1 7 10 -0.16384000000000000000e5
-1016 1 7 22 -0.16384000000000000000e5
-1016 1 8 23 -0.16384000000000000000e5
-1016 1 11 26 -0.81920000000000000000e4
-1016 1 12 19 -0.81920000000000000000e4
-1016 1 13 20 0.32768000000000000000e5
-1016 2 2 16 -0.81920000000000000000e4
-1016 2 6 8 -0.16384000000000000000e5
-1016 3 2 15 -0.32768000000000000000e5
-1016 3 5 10 0.81920000000000000000e4
-1016 3 6 13 0.32768000000000000000e5
-1016 3 7 20 -0.81920000000000000000e4
-1016 4 4 8 0.81920000000000000000e4
-1016 4 5 9 0.16384000000000000000e5
-1017 3 2 15 -0.32768000000000000000e5
-1017 3 6 14 0.32768000000000000000e5
-1018 1 4 11 0.40960000000000000000e4
-1018 1 5 12 0.40960000000000000000e4
-1018 1 6 21 -0.40960000000000000000e4
-1018 1 7 10 -0.81920000000000000000e4
-1018 1 7 22 -0.81920000000000000000e4
-1018 1 8 23 -0.81920000000000000000e4
-1018 1 11 26 -0.40960000000000000000e4
-1018 1 12 19 -0.40960000000000000000e4
-1018 1 13 20 0.16384000000000000000e5
-1018 2 2 16 -0.40960000000000000000e4
-1018 2 6 8 -0.81920000000000000000e4
-1018 3 2 15 -0.32768000000000000000e5
-1018 3 5 10 0.40960000000000000000e4
-1018 3 6 15 0.32768000000000000000e5
-1018 3 7 20 -0.40960000000000000000e4
-1018 3 8 13 -0.16384000000000000000e5
-1018 4 4 8 0.40960000000000000000e4
-1018 4 5 9 0.81920000000000000000e4
-1018 4 8 8 -0.32768000000000000000e5
-1019 1 6 21 -0.65536000000000000000e5
-1019 1 16 23 0.65536000000000000000e5
-1019 2 1 15 0.32768000000000000000e5
-1019 2 1 19 -0.32768000000000000000e5
-1019 3 6 16 0.32768000000000000000e5
-1019 3 6 19 -0.32768000000000000000e5
-1019 3 7 20 0.65536000000000000000e5
-1019 4 2 14 -0.32768000000000000000e5
-1020 1 9 16 0.32768000000000000000e5
-1020 1 20 27 -0.32768000000000000000e5
-1020 3 1 30 -0.32768000000000000000e5
-1020 3 6 17 0.32768000000000000000e5
-1020 3 6 19 0.32768000000000000000e5
-1020 3 7 20 -0.65536000000000000000e5
-1020 4 2 14 0.32768000000000000000e5
-1021 1 9 16 -0.32768000000000000000e5
-1021 1 20 27 0.32768000000000000000e5
-1021 3 1 30 0.32768000000000000000e5
-1021 3 6 18 0.32768000000000000000e5
-1022 1 6 21 -0.32768000000000000000e5
-1022 1 16 23 0.32768000000000000000e5
-1022 3 6 20 0.32768000000000000000e5
-1023 3 6 21 0.32768000000000000000e5
-1023 3 7 20 -0.32768000000000000000e5
-1024 1 7 22 -0.32768000000000000000e5
-1024 1 17 24 0.32768000000000000000e5
-1024 3 6 22 0.32768000000000000000e5
-1025 1 6 21 -0.16384000000000000000e5
-1025 1 7 22 -0.16384000000000000000e5
-1025 1 16 23 0.16384000000000000000e5
-1025 1 17 24 0.16384000000000000000e5
-1025 2 2 16 -0.16384000000000000000e5
-1025 2 5 19 0.16384000000000000000e5
-1025 3 6 23 0.32768000000000000000e5
-1025 3 7 20 -0.16384000000000000000e5
-1026 1 7 22 -0.16384000000000000000e5
-1026 1 17 24 0.16384000000000000000e5
-1026 3 6 24 0.32768000000000000000e5
-1026 3 7 20 -0.16384000000000000000e5
-1026 3 8 21 -0.16384000000000000000e5
-1026 4 8 12 -0.16384000000000000000e5
-1027 3 6 25 0.32768000000000000000e5
-1027 3 10 23 -0.32768000000000000000e5
-1028 1 3 34 -0.32768000000000000000e5
-1028 1 5 20 0.32768000000000000000e5
-1028 1 11 26 -0.65536000000000000000e5
-1028 1 16 31 0.65536000000000000000e5
-1028 3 1 30 0.32768000000000000000e5
-1028 3 6 19 -0.32768000000000000000e5
-1028 3 6 26 0.32768000000000000000e5
-1028 4 5 17 0.32768000000000000000e5
-1029 3 1 30 -0.32768000000000000000e5
-1029 3 6 27 0.32768000000000000000e5
-1030 1 3 34 0.32768000000000000000e5
-1030 1 5 20 -0.32768000000000000000e5
-1030 3 6 19 0.32768000000000000000e5
-1030 3 6 28 0.32768000000000000000e5
-1031 1 11 26 -0.32768000000000000000e5
-1031 1 16 31 0.32768000000000000000e5
-1031 3 6 29 0.32768000000000000000e5
-1032 3 2 31 -0.32768000000000000000e5
-1032 3 6 30 0.32768000000000000000e5
-1033 3 6 31 0.32768000000000000000e5
-1033 3 13 26 -0.32768000000000000000e5
-1034 3 6 32 0.32768000000000000000e5
-1034 3 16 29 -0.32768000000000000000e5
-1035 1 3 34 -0.32768000000000000000e5
-1035 1 20 35 0.32768000000000000000e5
-1035 3 6 33 0.32768000000000000000e5
-1035 3 6 35 0.32768000000000000000e5
-1036 1 3 34 -0.16384000000000000000e5
-1036 1 20 35 0.16384000000000000000e5
-1036 2 6 20 -0.16384000000000000000e5
-1036 2 14 20 0.16384000000000000000e5
-1036 3 6 34 0.32768000000000000000e5
-1036 3 6 35 0.16384000000000000000e5
-1036 3 16 29 -0.16384000000000000000e5
-1036 3 17 30 -0.16384000000000000000e5
-1037 1 4 11 0.32768000000000000000e5
-1037 1 5 12 0.16384000000000000000e5
-1037 1 7 22 -0.16384000000000000000e5
-1037 1 8 23 -0.32768000000000000000e5
-1037 1 11 26 0.16384000000000000000e5
-1037 1 12 19 -0.16384000000000000000e5
-1037 1 12 27 0.16384000000000000000e5
-1037 2 3 9 0.16384000000000000000e5
-1037 3 1 14 0.32768000000000000000e5
-1037 3 2 15 -0.65536000000000000000e5
-1037 3 5 10 0.32768000000000000000e5
-1037 3 7 7 0.32768000000000000000e5
-1037 3 7 20 0.16384000000000000000e5
-1037 3 8 21 0.16384000000000000000e5
-1037 4 4 8 0.16384000000000000000e5
-1037 4 5 9 0.32768000000000000000e5
-1038 1 4 11 -0.32768000000000000000e5
-1038 1 7 22 0.32768000000000000000e5
-1038 3 7 8 0.32768000000000000000e5
-1039 3 5 10 -0.32768000000000000000e5
-1039 3 7 9 0.32768000000000000000e5
-1040 3 1 14 -0.32768000000000000000e5
-1040 3 7 10 0.32768000000000000000e5
-1041 1 4 11 0.16384000000000000000e5
-1041 1 5 12 0.16384000000000000000e5
-1041 1 7 22 -0.16384000000000000000e5
-1041 1 12 19 -0.16384000000000000000e5
-1041 3 1 14 0.32768000000000000000e5
-1041 3 2 15 -0.65536000000000000000e5
-1041 3 5 10 0.16384000000000000000e5
-1041 3 7 11 0.32768000000000000000e5
-1041 4 4 8 0.16384000000000000000e5
-1041 4 5 9 0.32768000000000000000e5
-1042 1 4 11 -0.16384000000000000000e5
-1042 1 5 12 -0.16384000000000000000e5
-1042 1 7 22 0.16384000000000000000e5
-1042 1 12 19 0.16384000000000000000e5
-1042 3 5 10 -0.16384000000000000000e5
-1042 3 7 12 0.32768000000000000000e5
-1042 4 4 8 -0.16384000000000000000e5
-1043 3 2 15 -0.32768000000000000000e5
-1043 3 7 13 0.32768000000000000000e5
-1044 3 7 14 0.32768000000000000000e5
-1044 3 8 13 -0.32768000000000000000e5
-1045 3 2 15 -0.16384000000000000000e5
-1045 3 7 15 0.32768000000000000000e5
-1045 3 8 13 -0.16384000000000000000e5
-1045 3 11 12 -0.16384000000000000000e5
-1045 4 6 10 -0.16384000000000000000e5
-1046 1 9 16 0.32768000000000000000e5
-1046 1 20 27 -0.32768000000000000000e5
-1046 3 1 30 -0.32768000000000000000e5
-1046 3 6 19 0.32768000000000000000e5
-1046 3 7 16 0.32768000000000000000e5
-1046 3 7 20 -0.65536000000000000000e5
-1046 4 2 14 0.32768000000000000000e5
-1047 1 9 16 -0.32768000000000000000e5
-1047 1 20 27 0.32768000000000000000e5
-1047 3 1 30 0.32768000000000000000e5
-1047 3 7 17 0.32768000000000000000e5
-1048 3 6 19 -0.32768000000000000000e5
-1048 3 7 18 0.32768000000000000000e5
-1049 1 7 22 -0.65536000000000000000e5
-1049 1 9 16 0.32768000000000000000e5
-1049 1 17 24 0.65536000000000000000e5
-1049 1 20 27 -0.32768000000000000000e5
-1049 3 1 30 -0.32768000000000000000e5
-1049 3 6 19 0.32768000000000000000e5
-1049 3 7 19 0.32768000000000000000e5
-1049 4 7 11 0.32768000000000000000e5
-1050 1 7 22 -0.32768000000000000000e5
-1050 1 17 24 0.32768000000000000000e5
-1050 3 7 21 0.32768000000000000000e5
-1051 3 7 22 0.32768000000000000000e5
-1051 3 8 21 -0.32768000000000000000e5
-1052 1 7 22 -0.16384000000000000000e5
-1052 1 17 24 0.16384000000000000000e5
-1052 3 7 20 -0.16384000000000000000e5
-1052 3 7 23 0.32768000000000000000e5
-1052 3 8 21 -0.16384000000000000000e5
-1052 4 8 12 -0.16384000000000000000e5
-1053 3 7 24 0.32768000000000000000e5
-1053 3 13 18 -0.32768000000000000000e5
-1054 1 14 21 -0.32768000000000000000e5
-1054 1 14 29 0.32768000000000000000e5
-1054 3 7 25 0.32768000000000000000e5
-1055 3 1 30 -0.32768000000000000000e5
-1055 3 7 26 0.32768000000000000000e5
-1056 1 3 34 0.32768000000000000000e5
-1056 1 5 20 -0.32768000000000000000e5
-1056 3 6 19 0.32768000000000000000e5
-1056 3 7 27 0.32768000000000000000e5
-1057 3 7 28 0.32768000000000000000e5
-1057 3 17 22 -0.32768000000000000000e5
-1058 3 2 31 -0.32768000000000000000e5
-1058 3 7 29 0.32768000000000000000e5
-1059 3 7 30 0.32768000000000000000e5
-1059 3 18 23 -0.32768000000000000000e5
-1060 1 3 34 0.16384000000000000000e5
-1060 1 13 28 -0.32768000000000000000e5
-1060 1 20 35 -0.16384000000000000000e5
-1060 1 25 32 0.32768000000000000000e5
-1060 2 6 20 0.81920000000000000000e4
-1060 2 14 20 -0.81920000000000000000e4
-1060 3 6 35 -0.16384000000000000000e5
-1060 3 7 31 0.32768000000000000000e5
-1060 3 16 29 0.81920000000000000000e4
-1060 3 17 30 0.16384000000000000000e5
-1060 3 18 31 0.16384000000000000000e5
-1060 3 22 27 0.81920000000000000000e4
-1060 4 8 20 0.16384000000000000000e5
-1060 4 14 18 0.81920000000000000000e4
-1061 1 3 34 -0.32768000000000000000e5
-1061 1 20 35 0.32768000000000000000e5
-1061 3 6 35 0.32768000000000000000e5
-1061 3 7 32 0.32768000000000000000e5
-1062 3 7 33 0.32768000000000000000e5
-1062 3 17 30 -0.32768000000000000000e5
-1063 1 3 34 -0.16384000000000000000e5
-1063 1 20 35 0.16384000000000000000e5
-1063 3 6 35 0.16384000000000000000e5
-1063 3 7 34 0.32768000000000000000e5
-1063 3 17 30 -0.16384000000000000000e5
-1063 3 22 27 -0.16384000000000000000e5
-1063 4 14 18 -0.16384000000000000000e5
-1064 3 7 35 0.32768000000000000000e5
-1064 3 20 33 -0.32768000000000000000e5
-1065 3 5 10 -0.16384000000000000000e5
-1065 3 8 8 0.32768000000000000000e5
-1066 1 5 12 -0.32768000000000000000e5
-1066 1 12 19 0.32768000000000000000e5
-1066 3 8 9 0.32768000000000000000e5
-1067 1 4 11 0.16384000000000000000e5
-1067 1 5 12 0.16384000000000000000e5
-1067 1 7 22 -0.16384000000000000000e5
-1067 1 12 19 -0.16384000000000000000e5
-1067 3 1 14 0.32768000000000000000e5
-1067 3 2 15 -0.65536000000000000000e5
-1067 3 5 10 0.16384000000000000000e5
-1067 3 8 10 0.32768000000000000000e5
-1067 4 4 8 0.16384000000000000000e5
-1067 4 5 9 0.32768000000000000000e5
-1068 1 4 11 -0.16384000000000000000e5
-1068 1 5 12 -0.16384000000000000000e5
-1068 1 7 22 0.16384000000000000000e5
-1068 1 12 19 0.16384000000000000000e5
-1068 3 5 10 -0.16384000000000000000e5
-1068 3 8 11 0.32768000000000000000e5
-1068 4 4 8 -0.16384000000000000000e5
-1069 1 8 23 0.32768000000000000000e5
-1069 1 9 24 0.32768000000000000000e5
-1069 1 13 28 0.32768000000000000000e5
-1069 1 14 21 -0.65536000000000000000e5
-1069 2 4 10 0.32768000000000000000e5
-1069 3 1 14 -0.32768000000000000000e5
-1069 3 2 15 0.65536000000000000000e5
-1069 3 8 12 0.32768000000000000000e5
-1069 3 8 13 -0.65536000000000000000e5
-1069 3 13 18 0.32768000000000000000e5
-1069 4 5 9 -0.32768000000000000000e5
-1070 3 8 14 0.32768000000000000000e5
-1070 3 11 12 -0.32768000000000000000e5
-1071 3 8 15 0.32768000000000000000e5
-1071 3 12 13 -0.32768000000000000000e5
-1072 1 9 16 -0.32768000000000000000e5
-1072 1 20 27 0.32768000000000000000e5
-1072 3 1 30 0.32768000000000000000e5
-1072 3 8 16 0.32768000000000000000e5
-1073 3 6 19 -0.32768000000000000000e5
-1073 3 8 17 0.32768000000000000000e5
-1074 1 7 22 -0.65536000000000000000e5
-1074 1 9 16 0.32768000000000000000e5
-1074 1 17 24 0.65536000000000000000e5
-1074 1 20 27 -0.32768000000000000000e5
-1074 3 1 30 -0.32768000000000000000e5
-1074 3 6 19 0.32768000000000000000e5
-1074 3 8 18 0.32768000000000000000e5
-1074 4 7 11 0.32768000000000000000e5
-1075 1 7 22 0.65536000000000000000e5
-1075 1 9 16 -0.32768000000000000000e5
-1075 1 17 24 -0.65536000000000000000e5
-1075 1 20 27 0.32768000000000000000e5
-1075 3 1 30 0.32768000000000000000e5
-1075 3 8 19 0.32768000000000000000e5
-1075 3 8 21 -0.65536000000000000000e5
-1075 4 3 15 0.32768000000000000000e5
-1075 4 7 11 -0.32768000000000000000e5
-1076 1 7 22 -0.32768000000000000000e5
-1076 1 17 24 0.32768000000000000000e5
-1076 3 8 20 0.32768000000000000000e5
-1077 3 4 25 -0.65536000000000000000e5
-1077 3 8 21 0.32768000000000000000e5
-1077 3 8 22 0.32768000000000000000e5
-1077 3 9 22 0.32768000000000000000e5
-1077 4 4 16 0.32768000000000000000e5
-1078 3 8 23 0.32768000000000000000e5
-1078 3 13 18 -0.32768000000000000000e5
-1079 3 4 25 -0.32768000000000000000e5
-1079 3 8 24 0.32768000000000000000e5
-1080 3 8 25 0.32768000000000000000e5
-1080 3 11 24 -0.32768000000000000000e5
-1081 1 3 34 0.32768000000000000000e5
-1081 1 5 20 -0.32768000000000000000e5
-1081 3 6 19 0.32768000000000000000e5
-1081 3 8 26 0.32768000000000000000e5
-1082 3 8 27 0.32768000000000000000e5
-1082 3 17 22 -0.32768000000000000000e5
-1083 1 3 34 -0.32768000000000000000e5
-1083 1 5 20 0.32768000000000000000e5
-1083 3 6 19 -0.32768000000000000000e5
-1083 3 8 28 0.32768000000000000000e5
-1083 3 17 22 0.32768000000000000000e5
-1083 3 18 23 -0.65536000000000000000e5
-1083 4 6 18 0.32768000000000000000e5
-1084 3 8 29 0.32768000000000000000e5
-1084 3 18 23 -0.32768000000000000000e5
-1085 1 3 34 0.32768000000000000000e5
-1085 1 13 28 -0.65536000000000000000e5
-1085 1 20 35 -0.32768000000000000000e5
-1085 1 25 32 0.65536000000000000000e5
-1085 2 6 20 0.16384000000000000000e5
-1085 2 14 20 -0.16384000000000000000e5
-1085 3 2 31 0.32768000000000000000e5
-1085 3 6 35 -0.32768000000000000000e5
-1085 3 8 30 0.32768000000000000000e5
-1085 3 16 29 0.16384000000000000000e5
-1085 3 17 30 0.32768000000000000000e5
-1085 3 18 23 0.32768000000000000000e5
-1085 3 18 31 0.32768000000000000000e5
-1085 3 22 27 0.16384000000000000000e5
-1085 4 8 20 0.32768000000000000000e5
-1085 4 12 16 0.32768000000000000000e5
-1085 4 14 18 0.16384000000000000000e5
-1086 3 8 31 0.32768000000000000000e5
-1086 3 14 27 -0.32768000000000000000e5
-1087 3 8 32 0.32768000000000000000e5
-1087 3 17 30 -0.32768000000000000000e5
-1088 3 8 33 0.32768000000000000000e5
-1088 3 22 27 -0.32768000000000000000e5
-1089 3 8 34 0.32768000000000000000e5
-1089 3 18 31 -0.32768000000000000000e5
-1090 1 19 34 -0.32768000000000000000e5
-1090 1 30 33 0.32768000000000000000e5
-1090 3 8 35 0.32768000000000000000e5
-1091 1 5 12 0.16384000000000000000e5
-1091 1 8 23 0.32768000000000000000e5
-1091 1 9 24 0.32768000000000000000e5
-1091 1 12 19 -0.16384000000000000000e5
-1091 1 13 28 0.32768000000000000000e5
-1091 1 14 21 -0.65536000000000000000e5
-1091 2 4 10 0.32768000000000000000e5
-1091 3 1 14 -0.32768000000000000000e5
-1091 3 2 15 0.65536000000000000000e5
-1091 3 5 10 0.16384000000000000000e5
-1091 3 8 13 -0.65536000000000000000e5
-1091 3 9 9 0.32768000000000000000e5
-1091 3 13 18 0.32768000000000000000e5
-1091 4 5 9 -0.32768000000000000000e5
-1091 4 7 7 0.32768000000000000000e5
-1092 1 4 11 -0.16384000000000000000e5
-1092 1 5 12 -0.16384000000000000000e5
-1092 1 7 22 0.16384000000000000000e5
-1092 1 12 19 0.16384000000000000000e5
-1092 3 5 10 -0.16384000000000000000e5
-1092 3 9 10 0.32768000000000000000e5
-1092 4 4 8 -0.16384000000000000000e5
-1093 1 8 23 0.32768000000000000000e5
-1093 1 9 24 0.32768000000000000000e5
-1093 1 13 28 0.32768000000000000000e5
-1093 1 14 21 -0.65536000000000000000e5
-1093 2 4 10 0.32768000000000000000e5
-1093 3 1 14 -0.32768000000000000000e5
-1093 3 2 15 0.65536000000000000000e5
-1093 3 8 13 -0.65536000000000000000e5
-1093 3 9 11 0.32768000000000000000e5
-1093 3 13 18 0.32768000000000000000e5
-1093 4 5 9 -0.32768000000000000000e5
-1094 3 5 14 -0.32768000000000000000e5
-1094 3 9 12 0.32768000000000000000e5
-1095 3 9 13 0.32768000000000000000e5
-1095 3 11 12 -0.32768000000000000000e5
-1096 3 6 19 -0.32768000000000000000e5
-1096 3 9 16 0.32768000000000000000e5
-1097 1 7 22 -0.65536000000000000000e5
-1097 1 9 16 0.32768000000000000000e5
-1097 1 17 24 0.65536000000000000000e5
-1097 1 20 27 -0.32768000000000000000e5
-1097 3 1 30 -0.32768000000000000000e5
-1097 3 6 19 0.32768000000000000000e5
-1097 3 9 17 0.32768000000000000000e5
-1097 4 7 11 0.32768000000000000000e5
-1098 1 7 22 0.65536000000000000000e5
-1098 1 9 16 -0.32768000000000000000e5
-1098 1 17 24 -0.65536000000000000000e5
-1098 1 20 27 0.32768000000000000000e5
-1098 3 1 30 0.32768000000000000000e5
-1098 3 8 21 -0.65536000000000000000e5
-1098 3 9 18 0.32768000000000000000e5
-1098 4 3 15 0.32768000000000000000e5
-1098 4 7 11 -0.32768000000000000000e5
-1099 3 5 22 -0.32768000000000000000e5
-1099 3 9 19 0.32768000000000000000e5
-1100 3 8 21 -0.32768000000000000000e5
-1100 3 9 20 0.32768000000000000000e5
-1101 3 4 25 -0.65536000000000000000e5
-1101 3 8 21 0.32768000000000000000e5
-1101 3 9 21 0.32768000000000000000e5
-1101 3 9 22 0.32768000000000000000e5
-1101 4 4 16 0.32768000000000000000e5
-1102 3 4 25 -0.32768000000000000000e5
-1102 3 9 23 0.32768000000000000000e5
-1103 3 9 24 0.32768000000000000000e5
-1103 3 14 19 -0.32768000000000000000e5
-1104 1 14 21 0.32768000000000000000e5
-1104 1 14 29 -0.32768000000000000000e5
-1104 1 15 22 -0.65536000000000000000e5
-1104 1 15 30 0.65536000000000000000e5
-1104 3 9 25 0.32768000000000000000e5
-1104 3 11 24 0.32768000000000000000e5
-1104 4 10 15 0.32768000000000000000e5
-1105 3 9 26 0.32768000000000000000e5
-1105 3 17 22 -0.32768000000000000000e5
-1106 1 3 34 -0.32768000000000000000e5
-1106 1 5 20 0.32768000000000000000e5
-1106 3 6 19 -0.32768000000000000000e5
-1106 3 9 27 0.32768000000000000000e5
-1106 3 17 22 0.32768000000000000000e5
-1106 3 18 23 -0.65536000000000000000e5
-1106 4 6 18 0.32768000000000000000e5
-1107 3 5 30 -0.32768000000000000000e5
-1107 3 9 28 0.32768000000000000000e5
-1108 1 3 34 0.32768000000000000000e5
-1108 1 13 28 -0.65536000000000000000e5
-1108 1 20 35 -0.32768000000000000000e5
-1108 1 25 32 0.65536000000000000000e5
-1108 2 6 20 0.16384000000000000000e5
-1108 2 14 20 -0.16384000000000000000e5
-1108 3 2 31 0.32768000000000000000e5
-1108 3 6 35 -0.32768000000000000000e5
-1108 3 9 29 0.32768000000000000000e5
-1108 3 16 29 0.16384000000000000000e5
-1108 3 17 30 0.32768000000000000000e5
-1108 3 18 23 0.32768000000000000000e5
-1108 3 18 31 0.32768000000000000000e5
-1108 3 22 27 0.16384000000000000000e5
-1108 4 8 20 0.32768000000000000000e5
-1108 4 12 16 0.32768000000000000000e5
-1108 4 14 18 0.16384000000000000000e5
-1109 1 3 34 -0.32768000000000000000e5
-1109 1 13 28 0.65536000000000000000e5
-1109 1 20 35 0.32768000000000000000e5
-1109 1 25 32 -0.65536000000000000000e5
-1109 2 6 20 -0.16384000000000000000e5
-1109 2 14 20 0.16384000000000000000e5
-1109 3 2 31 -0.32768000000000000000e5
-1109 3 6 35 0.32768000000000000000e5
-1109 3 9 30 0.32768000000000000000e5
-1109 3 14 27 -0.65536000000000000000e5
-1109 3 16 29 -0.16384000000000000000e5
-1109 3 17 30 -0.32768000000000000000e5
-1109 3 18 31 -0.32768000000000000000e5
-1109 3 22 27 -0.16384000000000000000e5
-1109 4 7 19 0.32768000000000000000e5
-1109 4 8 20 -0.32768000000000000000e5
-1109 4 12 16 -0.32768000000000000000e5
-1109 4 14 18 -0.16384000000000000000e5
-1110 1 3 34 -0.16384000000000000000e5
-1110 1 13 28 0.32768000000000000000e5
-1110 1 20 35 0.16384000000000000000e5
-1110 1 22 25 -0.65536000000000000000e5
-1110 1 24 31 0.65536000000000000000e5
-1110 1 25 32 -0.32768000000000000000e5
-1110 2 6 20 -0.81920000000000000000e4
-1110 2 14 20 0.81920000000000000000e4
-1110 3 6 35 0.16384000000000000000e5
-1110 3 9 31 0.32768000000000000000e5
-1110 3 14 27 0.32768000000000000000e5
-1110 3 16 29 -0.81920000000000000000e4
-1110 3 17 30 -0.16384000000000000000e5
-1110 3 18 31 -0.16384000000000000000e5
-1110 3 22 27 -0.81920000000000000000e4
-1110 4 8 20 -0.16384000000000000000e5
-1110 4 10 18 0.32768000000000000000e5
-1110 4 14 18 -0.81920000000000000000e4
-1111 3 9 32 0.32768000000000000000e5
-1111 3 22 27 -0.32768000000000000000e5
-1112 3 5 34 -0.32768000000000000000e5
-1112 3 9 33 0.32768000000000000000e5
-1113 1 3 34 0.16384000000000000000e5
-1113 1 20 35 -0.16384000000000000000e5
-1113 3 6 35 -0.16384000000000000000e5
-1113 3 9 34 0.32768000000000000000e5
-1113 3 17 30 0.16384000000000000000e5
-1113 3 18 31 0.32768000000000000000e5
-1113 3 22 27 0.16384000000000000000e5
-1113 3 24 29 -0.65536000000000000000e5
-1113 4 14 18 0.16384000000000000000e5
-1113 4 15 19 0.32768000000000000000e5
-1114 3 9 35 0.32768000000000000000e5
-1114 3 19 34 -0.32768000000000000000e5
-1115 1 4 11 0.40960000000000000000e4
-1115 1 5 12 0.40960000000000000000e4
-1115 1 6 21 -0.40960000000000000000e4
-1115 1 7 10 -0.81920000000000000000e4
-1115 1 7 22 -0.81920000000000000000e4
-1115 1 8 23 -0.81920000000000000000e4
-1115 1 11 26 -0.40960000000000000000e4
-1115 1 12 19 -0.40960000000000000000e4
-1115 1 13 20 0.16384000000000000000e5
-1115 2 2 16 -0.40960000000000000000e4
-1115 2 6 8 -0.81920000000000000000e4
-1115 3 2 15 -0.16384000000000000000e5
-1115 3 5 10 0.40960000000000000000e4
-1115 3 7 20 -0.40960000000000000000e4
-1115 3 10 10 0.32768000000000000000e5
-1115 4 4 8 0.40960000000000000000e4
-1115 4 5 9 0.81920000000000000000e4
-1116 3 2 15 -0.32768000000000000000e5
-1116 3 10 11 0.32768000000000000000e5
-1117 3 8 13 -0.32768000000000000000e5
-1117 3 10 12 0.32768000000000000000e5
-1118 1 4 11 0.40960000000000000000e4
-1118 1 5 12 0.40960000000000000000e4
-1118 1 6 21 -0.40960000000000000000e4
-1118 1 7 10 -0.81920000000000000000e4
-1118 1 7 22 -0.81920000000000000000e4
-1118 1 8 23 -0.81920000000000000000e4
-1118 1 11 26 -0.40960000000000000000e4
-1118 1 12 19 -0.40960000000000000000e4
-1118 1 13 20 0.16384000000000000000e5
-1118 2 2 16 -0.40960000000000000000e4
-1118 2 6 8 -0.81920000000000000000e4
-1118 3 2 15 -0.32768000000000000000e5
-1118 3 5 10 0.40960000000000000000e4
-1118 3 7 20 -0.40960000000000000000e4
-1118 3 8 13 -0.16384000000000000000e5
-1118 3 10 13 0.32768000000000000000e5
-1118 4 4 8 0.40960000000000000000e4
-1118 4 5 9 0.81920000000000000000e4
-1118 4 8 8 -0.32768000000000000000e5
-1119 3 2 15 -0.16384000000000000000e5
-1119 3 8 13 -0.16384000000000000000e5
-1119 3 10 14 0.32768000000000000000e5
-1119 3 11 12 -0.16384000000000000000e5
-1119 4 6 10 -0.16384000000000000000e5
-1120 1 6 21 -0.32768000000000000000e5
-1120 1 16 23 0.32768000000000000000e5
-1120 3 10 16 0.32768000000000000000e5
-1121 3 7 20 -0.32768000000000000000e5
-1121 3 10 17 0.32768000000000000000e5
-1122 1 7 22 -0.32768000000000000000e5
-1122 1 17 24 0.32768000000000000000e5
-1122 3 10 18 0.32768000000000000000e5
-1123 3 8 21 -0.32768000000000000000e5
-1123 3 10 19 0.32768000000000000000e5
-1124 1 6 21 -0.16384000000000000000e5
-1124 1 7 22 -0.16384000000000000000e5
-1124 1 16 23 0.16384000000000000000e5
-1124 1 17 24 0.16384000000000000000e5
-1124 2 2 16 -0.16384000000000000000e5
-1124 2 5 19 0.16384000000000000000e5
-1124 3 7 20 -0.16384000000000000000e5
-1124 3 10 20 0.32768000000000000000e5
-1125 1 7 22 -0.16384000000000000000e5
-1125 1 17 24 0.16384000000000000000e5
-1125 3 7 20 -0.16384000000000000000e5
-1125 3 8 21 -0.16384000000000000000e5
-1125 3 10 21 0.32768000000000000000e5
-1125 4 8 12 -0.16384000000000000000e5
-1126 3 10 22 0.32768000000000000000e5
-1126 3 13 18 -0.32768000000000000000e5
-1127 1 14 21 -0.32768000000000000000e5
-1127 1 14 29 0.32768000000000000000e5
-1127 3 10 24 0.32768000000000000000e5
-1128 1 14 21 -0.16384000000000000000e5
-1128 1 14 29 0.16384000000000000000e5
-1128 3 10 23 -0.16384000000000000000e5
-1128 3 10 25 0.32768000000000000000e5
-1128 3 11 24 -0.16384000000000000000e5
-1128 4 10 14 -0.16384000000000000000e5
-1129 1 11 26 -0.32768000000000000000e5
-1129 1 16 31 0.32768000000000000000e5
-1129 3 10 26 0.32768000000000000000e5
-1130 3 2 31 -0.32768000000000000000e5
-1130 3 10 27 0.32768000000000000000e5
-1131 3 10 28 0.32768000000000000000e5
-1131 3 18 23 -0.32768000000000000000e5
-1132 3 10 29 0.32768000000000000000e5
-1132 3 13 26 -0.32768000000000000000e5
-1133 1 3 34 0.16384000000000000000e5
-1133 1 13 28 -0.32768000000000000000e5
-1133 1 20 35 -0.16384000000000000000e5
-1133 1 25 32 0.32768000000000000000e5
-1133 2 6 20 0.81920000000000000000e4
-1133 2 14 20 -0.81920000000000000000e4
-1133 3 6 35 -0.16384000000000000000e5
-1133 3 10 30 0.32768000000000000000e5
-1133 3 16 29 0.81920000000000000000e4
-1133 3 17 30 0.16384000000000000000e5
-1133 3 18 31 0.16384000000000000000e5
-1133 3 22 27 0.81920000000000000000e4
-1133 4 8 20 0.16384000000000000000e5
-1133 4 14 18 0.81920000000000000000e4
-1134 3 10 31 0.32768000000000000000e5
-1134 3 20 25 -0.32768000000000000000e5
-1135 1 3 34 -0.16384000000000000000e5
-1135 1 20 35 0.16384000000000000000e5
-1135 2 6 20 -0.16384000000000000000e5
-1135 2 14 20 0.16384000000000000000e5
-1135 3 6 35 0.16384000000000000000e5
-1135 3 10 32 0.32768000000000000000e5
-1135 3 16 29 -0.16384000000000000000e5
-1135 3 17 30 -0.16384000000000000000e5
-1136 1 3 34 -0.16384000000000000000e5
-1136 1 20 35 0.16384000000000000000e5
-1136 3 6 35 0.16384000000000000000e5
-1136 3 10 33 0.32768000000000000000e5
-1136 3 17 30 -0.16384000000000000000e5
-1136 3 22 27 -0.16384000000000000000e5
-1136 4 14 18 -0.16384000000000000000e5
-1137 1 3 34 -0.16384000000000000000e5
-1137 1 20 35 0.16384000000000000000e5
-1137 2 6 20 -0.81920000000000000000e4
-1137 2 14 20 0.81920000000000000000e4
-1137 3 6 35 0.16384000000000000000e5
-1137 3 10 34 0.32768000000000000000e5
-1137 3 16 29 -0.81920000000000000000e4
-1137 3 17 30 -0.16384000000000000000e5
-1137 3 18 31 -0.16384000000000000000e5
-1137 3 22 27 -0.81920000000000000000e4
-1137 4 8 20 -0.16384000000000000000e5
-1137 4 14 18 -0.81920000000000000000e4
-1138 3 10 35 0.32768000000000000000e5
-1138 3 26 31 -0.32768000000000000000e5
-1139 3 8 13 -0.16384000000000000000e5
-1139 3 11 11 0.32768000000000000000e5
-1140 3 2 15 -0.16384000000000000000e5
-1140 3 8 13 -0.16384000000000000000e5
-1140 3 11 12 -0.16384000000000000000e5
-1140 3 11 13 0.32768000000000000000e5
-1140 4 6 10 -0.16384000000000000000e5
-1141 3 11 14 0.32768000000000000000e5
-1141 3 12 13 -0.32768000000000000000e5
-1142 3 11 15 0.32768000000000000000e5
-1142 3 13 14 -0.32768000000000000000e5
-1143 3 7 20 -0.32768000000000000000e5
-1143 3 11 16 0.32768000000000000000e5
-1144 1 7 22 -0.32768000000000000000e5
-1144 1 17 24 0.32768000000000000000e5
-1144 3 11 17 0.32768000000000000000e5
-1145 3 8 21 -0.32768000000000000000e5
-1145 3 11 18 0.32768000000000000000e5
-1146 3 4 25 -0.65536000000000000000e5
-1146 3 8 21 0.32768000000000000000e5
-1146 3 9 22 0.32768000000000000000e5
-1146 3 11 19 0.32768000000000000000e5
-1146 4 4 16 0.32768000000000000000e5
-1147 1 7 22 -0.16384000000000000000e5
-1147 1 17 24 0.16384000000000000000e5
-1147 3 7 20 -0.16384000000000000000e5
-1147 3 8 21 -0.16384000000000000000e5
-1147 3 11 20 0.32768000000000000000e5
-1147 4 8 12 -0.16384000000000000000e5
-1148 3 11 21 0.32768000000000000000e5
-1148 3 13 18 -0.32768000000000000000e5
-1149 3 4 25 -0.32768000000000000000e5
-1149 3 11 22 0.32768000000000000000e5
-1150 1 14 21 -0.32768000000000000000e5
-1150 1 14 29 0.32768000000000000000e5
-1150 3 11 23 0.32768000000000000000e5
-1151 1 15 22 -0.32768000000000000000e5
-1151 1 15 30 0.32768000000000000000e5
-1151 3 11 25 0.32768000000000000000e5
-1152 3 2 31 -0.32768000000000000000e5
-1152 3 11 26 0.32768000000000000000e5
-1153 3 11 27 0.32768000000000000000e5
-1153 3 18 23 -0.32768000000000000000e5
-1154 1 3 34 0.32768000000000000000e5
-1154 1 13 28 -0.65536000000000000000e5
-1154 1 20 35 -0.32768000000000000000e5
-1154 1 25 32 0.65536000000000000000e5
-1154 2 6 20 0.16384000000000000000e5
-1154 2 14 20 -0.16384000000000000000e5
-1154 3 2 31 0.32768000000000000000e5
-1154 3 6 35 -0.32768000000000000000e5
-1154 3 11 28 0.32768000000000000000e5
-1154 3 16 29 0.16384000000000000000e5
-1154 3 17 30 0.32768000000000000000e5
-1154 3 18 23 0.32768000000000000000e5
-1154 3 18 31 0.32768000000000000000e5
-1154 3 22 27 0.16384000000000000000e5
-1154 4 8 20 0.32768000000000000000e5
-1154 4 12 16 0.32768000000000000000e5
-1154 4 14 18 0.16384000000000000000e5
-1155 1 3 34 0.16384000000000000000e5
-1155 1 13 28 -0.32768000000000000000e5
-1155 1 20 35 -0.16384000000000000000e5
-1155 1 25 32 0.32768000000000000000e5
-1155 2 6 20 0.81920000000000000000e4
-1155 2 14 20 -0.81920000000000000000e4
-1155 3 6 35 -0.16384000000000000000e5
-1155 3 11 29 0.32768000000000000000e5
-1155 3 16 29 0.81920000000000000000e4
-1155 3 17 30 0.16384000000000000000e5
-1155 3 18 31 0.16384000000000000000e5
-1155 3 22 27 0.81920000000000000000e4
-1155 4 8 20 0.16384000000000000000e5
-1155 4 14 18 0.81920000000000000000e4
-1156 3 11 30 0.32768000000000000000e5
-1156 3 14 27 -0.32768000000000000000e5
-1157 1 22 25 -0.32768000000000000000e5
-1157 1 24 31 0.32768000000000000000e5
-1157 3 11 31 0.32768000000000000000e5
-1158 1 3 34 -0.16384000000000000000e5
-1158 1 20 35 0.16384000000000000000e5
-1158 3 6 35 0.16384000000000000000e5
-1158 3 11 32 0.32768000000000000000e5
-1158 3 17 30 -0.16384000000000000000e5
-1158 3 22 27 -0.16384000000000000000e5
-1158 4 14 18 -0.16384000000000000000e5
-1159 3 11 33 0.32768000000000000000e5
-1159 3 18 31 -0.32768000000000000000e5
-1160 3 11 34 0.32768000000000000000e5
-1160 3 24 29 -0.32768000000000000000e5
-1161 3 11 35 0.32768000000000000000e5
-1161 3 21 34 -0.32768000000000000000e5
-1162 3 9 14 -0.16384000000000000000e5
-1162 3 12 12 0.32768000000000000000e5
-1163 3 9 15 -0.32768000000000000000e5
-1163 3 12 14 0.32768000000000000000e5
-1164 1 7 22 -0.32768000000000000000e5
-1164 1 17 24 0.32768000000000000000e5
-1164 3 12 16 0.32768000000000000000e5
-1165 3 8 21 -0.32768000000000000000e5
-1165 3 12 17 0.32768000000000000000e5
-1166 3 4 25 -0.65536000000000000000e5
-1166 3 8 21 0.32768000000000000000e5
-1166 3 9 22 0.32768000000000000000e5
-1166 3 12 18 0.32768000000000000000e5
-1166 4 4 16 0.32768000000000000000e5
-1167 3 9 22 -0.32768000000000000000e5
-1167 3 12 19 0.32768000000000000000e5
-1168 3 12 20 0.32768000000000000000e5
-1168 3 13 18 -0.32768000000000000000e5
-1169 3 4 25 -0.32768000000000000000e5
-1169 3 12 21 0.32768000000000000000e5
-1170 3 12 22 0.32768000000000000000e5
-1170 3 14 19 -0.32768000000000000000e5
-1171 3 11 24 -0.32768000000000000000e5
-1171 3 12 23 0.32768000000000000000e5
-1172 1 14 21 0.32768000000000000000e5
-1172 1 14 29 -0.32768000000000000000e5
-1172 1 15 22 -0.65536000000000000000e5
-1172 1 15 30 0.65536000000000000000e5
-1172 3 11 24 0.32768000000000000000e5
-1172 3 12 24 0.32768000000000000000e5
-1172 4 10 15 0.32768000000000000000e5
-1173 3 12 26 0.32768000000000000000e5
-1173 3 18 23 -0.32768000000000000000e5
-1174 1 3 34 0.32768000000000000000e5
-1174 1 13 28 -0.65536000000000000000e5
-1174 1 20 35 -0.32768000000000000000e5
-1174 1 25 32 0.65536000000000000000e5
-1174 2 6 20 0.16384000000000000000e5
-1174 2 14 20 -0.16384000000000000000e5
-1174 3 2 31 0.32768000000000000000e5
-1174 3 6 35 -0.32768000000000000000e5
-1174 3 12 27 0.32768000000000000000e5
-1174 3 16 29 0.16384000000000000000e5
-1174 3 17 30 0.32768000000000000000e5
-1174 3 18 23 0.32768000000000000000e5
-1174 3 18 31 0.32768000000000000000e5
-1174 3 22 27 0.16384000000000000000e5
-1174 4 8 20 0.32768000000000000000e5
-1174 4 12 16 0.32768000000000000000e5
-1174 4 14 18 0.16384000000000000000e5
-1175 1 3 34 -0.32768000000000000000e5
-1175 1 13 28 0.65536000000000000000e5
-1175 1 20 35 0.32768000000000000000e5
-1175 1 25 32 -0.65536000000000000000e5
-1175 2 6 20 -0.16384000000000000000e5
-1175 2 14 20 0.16384000000000000000e5
-1175 3 2 31 -0.32768000000000000000e5
-1175 3 6 35 0.32768000000000000000e5
-1175 3 12 28 0.32768000000000000000e5
-1175 3 14 27 -0.65536000000000000000e5
-1175 3 16 29 -0.16384000000000000000e5
-1175 3 17 30 -0.32768000000000000000e5
-1175 3 18 31 -0.32768000000000000000e5
-1175 3 22 27 -0.16384000000000000000e5
-1175 4 7 19 0.32768000000000000000e5
-1175 4 8 20 -0.32768000000000000000e5
-1175 4 12 16 -0.32768000000000000000e5
-1175 4 14 18 -0.16384000000000000000e5
-1176 3 12 29 0.32768000000000000000e5
-1176 3 14 27 -0.32768000000000000000e5
-1177 1 3 34 -0.16384000000000000000e5
-1177 1 13 28 0.32768000000000000000e5
-1177 1 20 35 0.16384000000000000000e5
-1177 1 22 25 -0.65536000000000000000e5
-1177 1 24 31 0.65536000000000000000e5
-1177 1 25 32 -0.32768000000000000000e5
-1177 2 6 20 -0.81920000000000000000e4
-1177 2 14 20 0.81920000000000000000e4
-1177 3 6 35 0.16384000000000000000e5
-1177 3 12 30 0.32768000000000000000e5
-1177 3 14 27 0.32768000000000000000e5
-1177 3 16 29 -0.81920000000000000000e4
-1177 3 17 30 -0.16384000000000000000e5
-1177 3 18 31 -0.16384000000000000000e5
-1177 3 22 27 -0.81920000000000000000e4
-1177 4 8 20 -0.16384000000000000000e5
-1177 4 10 18 0.32768000000000000000e5
-1177 4 14 18 -0.81920000000000000000e4
-1178 3 12 31 0.32768000000000000000e5
-1178 3 15 28 -0.32768000000000000000e5
-1179 3 12 32 0.32768000000000000000e5
-1179 3 18 31 -0.32768000000000000000e5
-1180 1 3 34 0.16384000000000000000e5
-1180 1 20 35 -0.16384000000000000000e5
-1180 3 6 35 -0.16384000000000000000e5
-1180 3 12 33 0.32768000000000000000e5
-1180 3 17 30 0.16384000000000000000e5
-1180 3 18 31 0.32768000000000000000e5
-1180 3 22 27 0.16384000000000000000e5
-1180 3 24 29 -0.65536000000000000000e5
-1180 4 14 18 0.16384000000000000000e5
-1180 4 15 19 0.32768000000000000000e5
-1181 3 12 34 0.32768000000000000000e5
-1181 3 22 31 -0.32768000000000000000e5
-1182 1 9 24 -0.65536000000000000000e5
-1182 1 31 34 0.65536000000000000000e5
-1182 3 4 25 0.65536000000000000000e5
-1182 3 12 35 0.32768000000000000000e5
-1182 3 14 27 0.65536000000000000000e5
-1182 3 21 34 0.32768000000000000000e5
-1182 3 24 29 0.65536000000000000000e5
-1182 3 26 31 0.32768000000000000000e5
-1182 4 16 20 0.32768000000000000000e5
-1183 3 10 15 -0.16384000000000000000e5
-1183 3 13 13 0.32768000000000000000e5
-1184 3 10 15 -0.16384000000000000000e5
-1184 3 12 15 -0.16384000000000000000e5
-1184 3 13 14 -0.16384000000000000000e5
-1184 3 13 15 0.32768000000000000000e5
-1184 4 10 10 -0.32768000000000000000e5
-1185 1 6 21 -0.16384000000000000000e5
-1185 1 7 22 -0.16384000000000000000e5
-1185 1 16 23 0.16384000000000000000e5
-1185 1 17 24 0.16384000000000000000e5
-1185 2 2 16 -0.16384000000000000000e5
-1185 2 5 19 0.16384000000000000000e5
-1185 3 7 20 -0.16384000000000000000e5
-1185 3 13 16 0.32768000000000000000e5
-1186 1 7 22 -0.16384000000000000000e5
-1186 1 17 24 0.16384000000000000000e5
-1186 3 7 20 -0.16384000000000000000e5
-1186 3 8 21 -0.16384000000000000000e5
-1186 3 13 17 0.32768000000000000000e5
-1186 4 8 12 -0.16384000000000000000e5
-1187 3 4 25 -0.32768000000000000000e5
-1187 3 13 19 0.32768000000000000000e5
-1188 3 10 23 -0.32768000000000000000e5
-1188 3 13 20 0.32768000000000000000e5
-1189 1 14 21 -0.32768000000000000000e5
-1189 1 14 29 0.32768000000000000000e5
-1189 3 13 21 0.32768000000000000000e5
-1190 3 11 24 -0.32768000000000000000e5
-1190 3 13 22 0.32768000000000000000e5
-1191 1 14 21 -0.16384000000000000000e5
-1191 1 14 29 0.16384000000000000000e5
-1191 3 10 23 -0.16384000000000000000e5
-1191 3 11 24 -0.16384000000000000000e5
-1191 3 13 23 0.32768000000000000000e5
-1191 4 10 14 -0.16384000000000000000e5
-1192 1 15 22 -0.32768000000000000000e5
-1192 1 15 30 0.32768000000000000000e5
-1192 3 13 24 0.32768000000000000000e5
-1193 1 14 21 -0.81920000000000000000e4
-1193 1 14 29 0.81920000000000000000e4
-1193 1 15 22 -0.16384000000000000000e5
-1193 1 15 30 0.16384000000000000000e5
-1193 3 10 23 -0.81920000000000000000e4
-1193 3 11 24 -0.81920000000000000000e4
-1193 3 12 25 -0.16384000000000000000e5
-1193 3 13 25 0.32768000000000000000e5
-1193 4 10 14 -0.81920000000000000000e4
-1193 4 10 16 -0.16384000000000000000e5
-1194 1 3 34 0.16384000000000000000e5
-1194 1 13 28 -0.32768000000000000000e5
-1194 1 20 35 -0.16384000000000000000e5
-1194 1 25 32 0.32768000000000000000e5
-1194 2 6 20 0.81920000000000000000e4
-1194 2 14 20 -0.81920000000000000000e4
-1194 3 6 35 -0.16384000000000000000e5
-1194 3 13 27 0.32768000000000000000e5
-1194 3 16 29 0.81920000000000000000e4
-1194 3 17 30 0.16384000000000000000e5
-1194 3 18 31 0.16384000000000000000e5
-1194 3 22 27 0.81920000000000000000e4
-1194 4 8 20 0.16384000000000000000e5
-1194 4 14 18 0.81920000000000000000e4
-1195 3 13 28 0.32768000000000000000e5
-1195 3 14 27 -0.32768000000000000000e5
-1196 3 13 29 0.32768000000000000000e5
-1196 3 20 25 -0.32768000000000000000e5
-1197 1 22 25 -0.32768000000000000000e5
-1197 1 24 31 0.32768000000000000000e5
-1197 3 13 30 0.32768000000000000000e5
-1198 1 22 25 -0.16384000000000000000e5
-1198 1 24 31 0.16384000000000000000e5
-1198 3 13 31 0.32768000000000000000e5
-1198 3 15 28 -0.16384000000000000000e5
-1198 3 20 25 -0.16384000000000000000e5
-1198 4 16 16 -0.32768000000000000000e5
-1199 1 3 34 -0.16384000000000000000e5
-1199 1 20 35 0.16384000000000000000e5
-1199 2 6 20 -0.81920000000000000000e4
-1199 2 14 20 0.81920000000000000000e4
-1199 3 6 35 0.16384000000000000000e5
-1199 3 13 32 0.32768000000000000000e5
-1199 3 16 29 -0.81920000000000000000e4
-1199 3 17 30 -0.16384000000000000000e5
-1199 3 18 31 -0.16384000000000000000e5
-1199 3 22 27 -0.81920000000000000000e4
-1199 4 8 20 -0.16384000000000000000e5
-1199 4 14 18 -0.81920000000000000000e4
-1200 3 13 33 0.32768000000000000000e5
-1200 3 24 29 -0.32768000000000000000e5
-1201 1 9 24 -0.32768000000000000000e5
-1201 1 31 34 0.32768000000000000000e5
-1201 3 4 25 0.32768000000000000000e5
-1201 3 13 35 0.32768000000000000000e5
-1201 3 14 27 0.32768000000000000000e5
-1201 3 24 29 0.32768000000000000000e5
-1202 3 12 15 -0.16384000000000000000e5
-1202 3 14 14 0.32768000000000000000e5
-1203 1 7 22 -0.16384000000000000000e5
-1203 1 17 24 0.16384000000000000000e5
-1203 3 7 20 -0.16384000000000000000e5
-1203 3 8 21 -0.16384000000000000000e5
-1203 3 14 16 0.32768000000000000000e5
-1203 4 8 12 -0.16384000000000000000e5
-1204 3 13 18 -0.32768000000000000000e5
-1204 3 14 17 0.32768000000000000000e5
-1205 3 4 25 -0.32768000000000000000e5
-1205 3 14 18 0.32768000000000000000e5
-1206 1 14 21 -0.32768000000000000000e5
-1206 1 14 29 0.32768000000000000000e5
-1206 3 14 20 0.32768000000000000000e5
-1207 3 11 24 -0.32768000000000000000e5
-1207 3 14 21 0.32768000000000000000e5
-1208 1 14 21 0.32768000000000000000e5
-1208 1 14 29 -0.32768000000000000000e5
-1208 1 15 22 -0.65536000000000000000e5
-1208 1 15 30 0.65536000000000000000e5
-1208 3 11 24 0.32768000000000000000e5
-1208 3 14 22 0.32768000000000000000e5
-1208 4 10 15 0.32768000000000000000e5
-1209 1 15 22 -0.32768000000000000000e5
-1209 1 15 30 0.32768000000000000000e5
-1209 3 14 23 0.32768000000000000000e5
-1210 3 12 25 -0.32768000000000000000e5
-1210 3 14 24 0.32768000000000000000e5
-1211 3 14 25 0.32768000000000000000e5
-1211 3 15 24 -0.32768000000000000000e5
-1212 1 3 34 0.16384000000000000000e5
-1212 1 13 28 -0.32768000000000000000e5
-1212 1 20 35 -0.16384000000000000000e5
-1212 1 25 32 0.32768000000000000000e5
-1212 2 6 20 0.81920000000000000000e4
-1212 2 14 20 -0.81920000000000000000e4
-1212 3 6 35 -0.16384000000000000000e5
-1212 3 14 26 0.32768000000000000000e5
-1212 3 16 29 0.81920000000000000000e4
-1212 3 17 30 0.16384000000000000000e5
-1212 3 18 31 0.16384000000000000000e5
-1212 3 22 27 0.81920000000000000000e4
-1212 4 8 20 0.16384000000000000000e5
-1212 4 14 18 0.81920000000000000000e4
-1213 1 3 34 -0.16384000000000000000e5
-1213 1 13 28 0.32768000000000000000e5
-1213 1 20 35 0.16384000000000000000e5
-1213 1 22 25 -0.65536000000000000000e5
-1213 1 24 31 0.65536000000000000000e5
-1213 1 25 32 -0.32768000000000000000e5
-1213 2 6 20 -0.81920000000000000000e4
-1213 2 14 20 0.81920000000000000000e4
-1213 3 6 35 0.16384000000000000000e5
-1213 3 14 27 0.32768000000000000000e5
-1213 3 14 28 0.32768000000000000000e5
-1213 3 16 29 -0.81920000000000000000e4
-1213 3 17 30 -0.16384000000000000000e5
-1213 3 18 31 -0.16384000000000000000e5
-1213 3 22 27 -0.81920000000000000000e4
-1213 4 8 20 -0.16384000000000000000e5
-1213 4 10 18 0.32768000000000000000e5
-1213 4 14 18 -0.81920000000000000000e4
-1214 1 22 25 -0.32768000000000000000e5
-1214 1 24 31 0.32768000000000000000e5
-1214 3 14 29 0.32768000000000000000e5
-1215 3 14 30 0.32768000000000000000e5
-1215 3 15 28 -0.32768000000000000000e5
-1216 3 14 31 0.32768000000000000000e5
-1216 3 24 25 -0.32768000000000000000e5
-1217 3 14 32 0.32768000000000000000e5
-1217 3 24 29 -0.32768000000000000000e5
-1218 3 14 33 0.32768000000000000000e5
-1218 3 22 31 -0.32768000000000000000e5
-1219 3 14 34 0.32768000000000000000e5
-1219 3 25 30 -0.32768000000000000000e5
-1220 3 10 23 -0.32768000000000000000e5
-1220 3 15 16 0.32768000000000000000e5
-1221 1 14 21 -0.32768000000000000000e5
-1221 1 14 29 0.32768000000000000000e5
-1221 3 15 17 0.32768000000000000000e5
-1222 3 11 24 -0.32768000000000000000e5
-1222 3 15 18 0.32768000000000000000e5
-1223 1 14 21 0.32768000000000000000e5
-1223 1 14 29 -0.32768000000000000000e5
-1223 1 15 22 -0.65536000000000000000e5
-1223 1 15 30 0.65536000000000000000e5
-1223 3 11 24 0.32768000000000000000e5
-1223 3 15 19 0.32768000000000000000e5
-1223 4 10 15 0.32768000000000000000e5
-1224 1 14 21 -0.16384000000000000000e5
-1224 1 14 29 0.16384000000000000000e5
-1224 3 10 23 -0.16384000000000000000e5
-1224 3 11 24 -0.16384000000000000000e5
-1224 3 15 20 0.32768000000000000000e5
-1224 4 10 14 -0.16384000000000000000e5
-1225 1 15 22 -0.32768000000000000000e5
-1225 1 15 30 0.32768000000000000000e5
-1225 3 15 21 0.32768000000000000000e5
-1226 3 12 25 -0.32768000000000000000e5
-1226 3 15 22 0.32768000000000000000e5
-1227 1 14 21 -0.81920000000000000000e4
-1227 1 14 29 0.81920000000000000000e4
-1227 1 15 22 -0.16384000000000000000e5
-1227 1 15 30 0.16384000000000000000e5
-1227 3 10 23 -0.81920000000000000000e4
-1227 3 11 24 -0.81920000000000000000e4
-1227 3 12 25 -0.16384000000000000000e5
-1227 3 15 23 0.32768000000000000000e5
-1227 4 10 14 -0.81920000000000000000e4
-1227 4 10 16 -0.16384000000000000000e5
-1228 3 15 26 0.32768000000000000000e5
-1228 3 20 25 -0.32768000000000000000e5
-1229 1 22 25 -0.32768000000000000000e5
-1229 1 24 31 0.32768000000000000000e5
-1229 3 15 27 0.32768000000000000000e5
-1230 1 22 25 -0.16384000000000000000e5
-1230 1 24 31 0.16384000000000000000e5
-1230 3 15 28 -0.16384000000000000000e5
-1230 3 15 29 0.32768000000000000000e5
-1230 3 20 25 -0.16384000000000000000e5
-1230 4 16 16 -0.32768000000000000000e5
-1231 3 15 30 0.32768000000000000000e5
-1231 3 24 25 -0.32768000000000000000e5
-1232 3 15 31 0.32768000000000000000e5
-1232 3 25 25 -0.65536000000000000000e5
-1233 3 13 34 -0.32768000000000000000e5
-1233 3 15 32 0.32768000000000000000e5
-1234 3 15 33 0.32768000000000000000e5
-1234 3 25 30 -0.32768000000000000000e5
-1235 3 15 35 0.32768000000000000000e5
-1235 3 25 34 -0.32768000000000000000e5
-1236 1 1 32 0.16384000000000000000e5
-1236 1 4 27 -0.16384000000000000000e5
-1236 1 5 20 0.32768000000000000000e5
-1236 1 11 26 -0.65536000000000000000e5
-1236 1 20 27 0.65536000000000000000e5
-1236 2 3 17 -0.16384000000000000000e5
-1236 2 6 12 0.32768000000000000000e5
-1236 2 11 17 0.16384000000000000000e5
-1236 3 1 30 0.65536000000000000000e5
-1236 3 6 19 -0.32768000000000000000e5
-1236 3 16 16 0.32768000000000000000e5
-1236 4 2 14 -0.32768000000000000000e5
-1236 4 11 11 0.32768000000000000000e5
-1237 1 1 32 -0.32768000000000000000e5
-1237 1 2 33 -0.32768000000000000000e5
-1237 1 3 18 0.32768000000000000000e5
-1237 1 3 34 -0.65536000000000000000e5
-1237 1 4 27 0.32768000000000000000e5
-1237 1 9 16 -0.65536000000000000000e5
-1237 1 16 31 0.13107200000000000000e6
-1237 1 20 27 -0.65536000000000000000e5
-1237 2 3 17 0.32768000000000000000e5
-1237 2 6 12 -0.65536000000000000000e5
-1237 2 11 17 -0.32768000000000000000e5
-1237 3 3 16 0.32768000000000000000e5
-1237 3 4 17 0.32768000000000000000e5
-1237 3 16 17 0.32768000000000000000e5
-1237 4 1 13 0.32768000000000000000e5
-1237 4 2 14 0.65536000000000000000e5
-1237 4 5 17 0.65536000000000000000e5
-1238 1 2 33 0.32768000000000000000e5
-1238 1 3 18 -0.32768000000000000000e5
-1238 1 9 16 0.65536000000000000000e5
-1238 1 20 27 -0.65536000000000000000e5
-1238 3 1 30 -0.65536000000000000000e5
-1238 3 3 16 -0.32768000000000000000e5
-1238 3 4 17 -0.32768000000000000000e5
-1238 3 16 18 0.32768000000000000000e5
-1238 4 1 13 -0.32768000000000000000e5
-1239 1 2 33 -0.32768000000000000000e5
-1239 1 3 34 0.65536000000000000000e5
-1239 1 4 27 -0.32768000000000000000e5
-1239 1 4 35 -0.32768000000000000000e5
-1239 2 12 18 -0.32768000000000000000e5
-1239 3 3 32 0.32768000000000000000e5
-1239 3 4 33 0.32768000000000000000e5
-1239 3 16 19 0.32768000000000000000e5
-1239 3 17 30 -0.65536000000000000000e5
-1239 4 13 17 0.32768000000000000000e5
-1240 1 3 34 -0.32768000000000000000e5
-1240 1 5 20 0.32768000000000000000e5
-1240 1 11 26 -0.65536000000000000000e5
-1240 1 16 31 0.65536000000000000000e5
-1240 3 1 30 0.32768000000000000000e5
-1240 3 6 19 -0.32768000000000000000e5
-1240 3 16 20 0.32768000000000000000e5
-1240 4 5 17 0.32768000000000000000e5
-1241 3 1 30 -0.32768000000000000000e5
-1241 3 16 21 0.32768000000000000000e5
-1242 1 3 34 0.32768000000000000000e5
-1242 1 5 20 -0.32768000000000000000e5
-1242 3 6 19 0.32768000000000000000e5
-1242 3 16 22 0.32768000000000000000e5
-1243 1 11 26 -0.32768000000000000000e5
-1243 1 16 31 0.32768000000000000000e5
-1243 3 16 23 0.32768000000000000000e5
-1244 3 2 31 -0.32768000000000000000e5
-1244 3 16 24 0.32768000000000000000e5
-1245 3 13 26 -0.32768000000000000000e5
-1245 3 16 25 0.32768000000000000000e5
-1246 1 1 32 0.32768000000000000000e5
-1246 1 2 33 0.65536000000000000000e5
-1246 1 4 35 0.32768000000000000000e5
-1246 1 16 31 -0.13107200000000000000e6
-1246 1 17 32 -0.32768000000000000000e5
-1246 1 20 27 0.13107200000000000000e6
-1246 2 6 12 0.65536000000000000000e5
-1246 2 11 17 0.32768000000000000000e5
-1246 2 12 18 0.32768000000000000000e5
-1246 2 17 17 -0.65536000000000000000e5
-1246 3 4 33 -0.32768000000000000000e5
-1246 3 16 26 0.32768000000000000000e5
-1246 3 16 29 -0.65536000000000000000e5
-1246 3 17 30 0.65536000000000000000e5
-1246 4 2 14 -0.65536000000000000000e5
-1246 4 5 17 -0.65536000000000000000e5
-1246 4 13 17 -0.32768000000000000000e5
-1247 1 2 33 -0.32768000000000000000e5
-1247 1 17 32 0.32768000000000000000e5
-1247 3 16 27 0.32768000000000000000e5
-1248 3 3 32 -0.32768000000000000000e5
-1248 3 16 28 0.32768000000000000000e5
-1249 1 3 34 -0.32768000000000000000e5
-1249 1 20 35 0.32768000000000000000e5
-1249 3 6 35 0.32768000000000000000e5
-1249 3 16 30 0.32768000000000000000e5
-1250 1 3 34 -0.16384000000000000000e5
-1250 1 20 35 0.16384000000000000000e5
-1250 2 6 20 -0.16384000000000000000e5
-1250 2 14 20 0.16384000000000000000e5
-1250 3 6 35 0.16384000000000000000e5
-1250 3 16 29 -0.16384000000000000000e5
-1250 3 16 31 0.32768000000000000000e5
-1250 3 17 30 -0.16384000000000000000e5
-1251 1 2 33 -0.32768000000000000000e5
-1251 1 3 34 0.65536000000000000000e5
-1251 1 4 27 -0.32768000000000000000e5
-1251 1 4 35 -0.32768000000000000000e5
-1251 2 4 18 -0.32768000000000000000e5
-1251 2 12 18 -0.32768000000000000000e5
-1251 2 18 20 0.32768000000000000000e5
-1251 3 3 32 0.32768000000000000000e5
-1251 3 4 33 0.32768000000000000000e5
-1251 3 5 26 -0.32768000000000000000e5
-1251 3 6 35 -0.65536000000000000000e5
-1251 3 16 32 0.32768000000000000000e5
-1251 3 17 22 0.65536000000000000000e5
-1251 3 17 30 -0.65536000000000000000e5
-1251 3 18 19 -0.32768000000000000000e5
-1251 3 19 32 -0.32768000000000000000e5
-1251 3 20 33 0.65536000000000000000e5
-1251 4 13 17 0.65536000000000000000e5
-1251 4 17 17 0.65536000000000000000e5
-1252 1 2 33 0.32768000000000000000e5
-1252 1 3 34 -0.65536000000000000000e5
-1252 1 4 35 0.32768000000000000000e5
-1252 1 26 33 0.32768000000000000000e5
-1252 2 12 18 0.32768000000000000000e5
-1252 3 4 33 -0.32768000000000000000e5
-1252 3 16 33 0.32768000000000000000e5
-1252 3 17 30 0.65536000000000000000e5
-1252 4 13 17 -0.32768000000000000000e5
-1253 3 6 35 -0.32768000000000000000e5
-1253 3 16 34 0.32768000000000000000e5
-1254 1 3 34 -0.65536000000000000000e5
-1254 1 4 27 -0.32768000000000000000e5
-1254 1 4 35 -0.32768000000000000000e5
-1254 1 17 24 0.13107200000000000000e6
-1254 1 20 27 -0.65536000000000000000e5
-1254 1 28 35 -0.32768000000000000000e5
-1254 2 4 18 -0.32768000000000000000e5
-1254 2 6 20 -0.65536000000000000000e5
-1254 2 18 20 0.32768000000000000000e5
-1254 2 20 20 -0.65536000000000000000e5
-1254 3 2 31 -0.13107200000000000000e6
-1254 3 3 32 0.32768000000000000000e5
-1254 3 5 26 -0.32768000000000000000e5
-1254 3 16 35 0.32768000000000000000e5
-1254 3 17 22 0.65536000000000000000e5
-1254 3 17 30 -0.65536000000000000000e5
-1254 3 18 19 -0.32768000000000000000e5
-1254 3 19 32 -0.32768000000000000000e5
-1254 3 20 35 -0.65536000000000000000e5
-1254 3 27 32 0.32768000000000000000e5
-1254 4 13 17 0.32768000000000000000e5
-1255 1 2 33 0.16384000000000000000e5
-1255 1 3 18 -0.16384000000000000000e5
-1255 1 9 16 0.32768000000000000000e5
-1255 1 20 27 -0.32768000000000000000e5
-1255 3 1 30 -0.32768000000000000000e5
-1255 3 3 16 -0.16384000000000000000e5
-1255 3 4 17 -0.16384000000000000000e5
-1255 3 17 17 0.32768000000000000000e5
-1255 4 1 13 -0.16384000000000000000e5
-1256 1 2 33 -0.32768000000000000000e5
-1256 1 3 34 0.65536000000000000000e5
-1256 1 4 27 -0.32768000000000000000e5
-1256 1 4 35 -0.32768000000000000000e5
-1256 2 12 18 -0.32768000000000000000e5
-1256 3 3 32 0.32768000000000000000e5
-1256 3 4 33 0.32768000000000000000e5
-1256 3 17 18 0.32768000000000000000e5
-1256 3 17 30 -0.65536000000000000000e5
-1256 4 13 17 0.32768000000000000000e5
-1257 3 5 26 -0.32768000000000000000e5
-1257 3 17 19 0.32768000000000000000e5
-1258 3 1 30 -0.32768000000000000000e5
-1258 3 17 20 0.32768000000000000000e5
-1259 1 3 34 0.32768000000000000000e5
-1259 1 5 20 -0.32768000000000000000e5
-1259 3 6 19 0.32768000000000000000e5
-1259 3 17 21 0.32768000000000000000e5
-1260 3 2 31 -0.32768000000000000000e5
-1260 3 17 23 0.32768000000000000000e5
-1261 3 17 24 0.32768000000000000000e5
-1261 3 18 23 -0.32768000000000000000e5
-1262 1 3 34 0.16384000000000000000e5
-1262 1 13 28 -0.32768000000000000000e5
-1262 1 20 35 -0.16384000000000000000e5
-1262 1 25 32 0.32768000000000000000e5
-1262 2 6 20 0.81920000000000000000e4
-1262 2 14 20 -0.81920000000000000000e4
-1262 3 6 35 -0.16384000000000000000e5
-1262 3 16 29 0.81920000000000000000e4
-1262 3 17 25 0.32768000000000000000e5
-1262 3 17 30 0.16384000000000000000e5
-1262 3 18 31 0.16384000000000000000e5
-1262 3 22 27 0.81920000000000000000e4
-1262 4 8 20 0.16384000000000000000e5
-1262 4 14 18 0.81920000000000000000e4
-1263 1 2 33 -0.32768000000000000000e5
-1263 1 17 32 0.32768000000000000000e5
-1263 3 17 26 0.32768000000000000000e5
-1264 3 3 32 -0.32768000000000000000e5
-1264 3 17 27 0.32768000000000000000e5
-1265 3 3 32 0.32768000000000000000e5
-1265 3 4 33 0.32768000000000000000e5
-1265 3 17 28 0.32768000000000000000e5
-1265 3 17 30 -0.65536000000000000000e5
-1265 4 13 17 0.32768000000000000000e5
-1266 1 3 34 -0.32768000000000000000e5
-1266 1 20 35 0.32768000000000000000e5
-1266 3 6 35 0.32768000000000000000e5
-1266 3 17 29 0.32768000000000000000e5
-1267 1 3 34 -0.16384000000000000000e5
-1267 1 20 35 0.16384000000000000000e5
-1267 3 6 35 0.16384000000000000000e5
-1267 3 17 30 -0.16384000000000000000e5
-1267 3 17 31 0.32768000000000000000e5
-1267 3 22 27 -0.16384000000000000000e5
-1267 4 14 18 -0.16384000000000000000e5
-1268 1 2 33 0.32768000000000000000e5
-1268 1 3 34 -0.65536000000000000000e5
-1268 1 4 35 0.32768000000000000000e5
-1268 1 26 33 0.32768000000000000000e5
-1268 2 12 18 0.32768000000000000000e5
-1268 3 4 33 -0.32768000000000000000e5
-1268 3 17 30 0.65536000000000000000e5
-1268 3 17 32 0.32768000000000000000e5
-1268 4 13 17 -0.32768000000000000000e5
-1269 1 4 27 0.32768000000000000000e5
-1269 1 26 33 -0.32768000000000000000e5
-1269 2 4 18 0.32768000000000000000e5
-1269 2 18 20 -0.32768000000000000000e5
-1269 3 3 32 -0.32768000000000000000e5
-1269 3 5 26 0.32768000000000000000e5
-1269 3 17 22 -0.65536000000000000000e5
-1269 3 17 33 0.32768000000000000000e5
-1269 3 18 19 0.32768000000000000000e5
-1269 3 19 32 0.32768000000000000000e5
-1269 3 20 33 -0.65536000000000000000e5
-1269 4 13 17 -0.32768000000000000000e5
-1270 3 17 34 0.32768000000000000000e5
-1270 3 20 33 -0.32768000000000000000e5
-1271 3 17 35 0.32768000000000000000e5
-1271 3 27 32 -0.32768000000000000000e5
-1272 3 5 26 -0.16384000000000000000e5
-1272 3 18 18 0.32768000000000000000e5
-1273 1 3 34 0.32768000000000000000e5
-1273 1 5 20 -0.32768000000000000000e5
-1273 3 6 19 0.32768000000000000000e5
-1273 3 18 20 0.32768000000000000000e5
-1274 3 17 22 -0.32768000000000000000e5
-1274 3 18 21 0.32768000000000000000e5
-1275 1 3 34 -0.32768000000000000000e5
-1275 1 5 20 0.32768000000000000000e5
-1275 3 6 19 -0.32768000000000000000e5
-1275 3 17 22 0.32768000000000000000e5
-1275 3 18 22 0.32768000000000000000e5
-1275 3 18 23 -0.65536000000000000000e5
-1275 4 6 18 0.32768000000000000000e5
-1276 1 3 34 0.32768000000000000000e5
-1276 1 13 28 -0.65536000000000000000e5
-1276 1 20 35 -0.32768000000000000000e5
-1276 1 25 32 0.65536000000000000000e5
-1276 2 6 20 0.16384000000000000000e5
-1276 2 14 20 -0.16384000000000000000e5
-1276 3 2 31 0.32768000000000000000e5
-1276 3 6 35 -0.32768000000000000000e5
-1276 3 16 29 0.16384000000000000000e5
-1276 3 17 30 0.32768000000000000000e5
-1276 3 18 23 0.32768000000000000000e5
-1276 3 18 24 0.32768000000000000000e5
-1276 3 18 31 0.32768000000000000000e5
-1276 3 22 27 0.16384000000000000000e5
-1276 4 8 20 0.32768000000000000000e5
-1276 4 12 16 0.32768000000000000000e5
-1276 4 14 18 0.16384000000000000000e5
-1277 3 14 27 -0.32768000000000000000e5
-1277 3 18 25 0.32768000000000000000e5
-1278 3 3 32 -0.32768000000000000000e5
-1278 3 18 26 0.32768000000000000000e5
-1279 3 3 32 0.32768000000000000000e5
-1279 3 4 33 0.32768000000000000000e5
-1279 3 17 30 -0.65536000000000000000e5
-1279 3 18 27 0.32768000000000000000e5
-1279 4 13 17 0.32768000000000000000e5
-1280 3 4 33 -0.32768000000000000000e5
-1280 3 18 28 0.32768000000000000000e5
-1281 3 17 30 -0.32768000000000000000e5
-1281 3 18 29 0.32768000000000000000e5
-1282 3 18 30 0.32768000000000000000e5
-1282 3 22 27 -0.32768000000000000000e5
-1283 1 4 27 0.32768000000000000000e5
-1283 1 26 33 -0.32768000000000000000e5
-1283 2 4 18 0.32768000000000000000e5
-1283 2 18 20 -0.32768000000000000000e5
-1283 3 3 32 -0.32768000000000000000e5
-1283 3 5 26 0.32768000000000000000e5
-1283 3 17 22 -0.65536000000000000000e5
-1283 3 18 19 0.32768000000000000000e5
-1283 3 18 32 0.32768000000000000000e5
-1283 3 19 32 0.32768000000000000000e5
-1283 3 20 33 -0.65536000000000000000e5
-1283 4 13 17 -0.32768000000000000000e5
-1284 3 18 33 0.32768000000000000000e5
-1284 3 19 32 -0.32768000000000000000e5
-1285 1 19 34 -0.32768000000000000000e5
-1285 1 30 33 0.32768000000000000000e5
-1285 3 18 34 0.32768000000000000000e5
-1286 1 3 34 0.65536000000000000000e5
-1286 1 4 27 0.32768000000000000000e5
-1286 1 4 35 0.32768000000000000000e5
-1286 1 17 24 -0.13107200000000000000e6
-1286 1 20 27 0.65536000000000000000e5
-1286 1 28 35 0.32768000000000000000e5
-1286 2 4 18 0.32768000000000000000e5
-1286 2 6 20 0.65536000000000000000e5
-1286 3 2 31 0.13107200000000000000e6
-1286 3 3 32 -0.32768000000000000000e5
-1286 3 5 26 0.32768000000000000000e5
-1286 3 17 22 -0.65536000000000000000e5
-1286 3 17 30 0.65536000000000000000e5
-1286 3 18 19 0.32768000000000000000e5
-1286 3 18 35 0.32768000000000000000e5
-1286 3 19 32 0.32768000000000000000e5
-1286 4 13 17 -0.32768000000000000000e5
-1287 1 3 34 -0.32768000000000000000e5
-1287 1 5 20 0.32768000000000000000e5
-1287 3 5 26 0.16384000000000000000e5
-1287 3 6 19 -0.32768000000000000000e5
-1287 3 17 22 0.32768000000000000000e5
-1287 3 18 19 0.16384000000000000000e5
-1287 3 18 23 -0.65536000000000000000e5
-1287 3 19 19 0.32768000000000000000e5
-1287 4 6 18 0.32768000000000000000e5
-1287 4 13 13 0.32768000000000000000e5
-1288 3 17 22 -0.32768000000000000000e5
-1288 3 19 20 0.32768000000000000000e5
-1289 1 3 34 -0.32768000000000000000e5
-1289 1 5 20 0.32768000000000000000e5
-1289 3 6 19 -0.32768000000000000000e5
-1289 3 17 22 0.32768000000000000000e5
-1289 3 18 23 -0.65536000000000000000e5
-1289 3 19 21 0.32768000000000000000e5
-1289 4 6 18 0.32768000000000000000e5
-1290 3 5 30 -0.32768000000000000000e5
-1290 3 19 22 0.32768000000000000000e5
-1291 1 3 34 0.32768000000000000000e5
-1291 1 13 28 -0.65536000000000000000e5
-1291 1 20 35 -0.32768000000000000000e5
-1291 1 25 32 0.65536000000000000000e5
-1291 2 6 20 0.16384000000000000000e5
-1291 2 14 20 -0.16384000000000000000e5
-1291 3 2 31 0.32768000000000000000e5
-1291 3 6 35 -0.32768000000000000000e5
-1291 3 16 29 0.16384000000000000000e5
-1291 3 17 30 0.32768000000000000000e5
-1291 3 18 23 0.32768000000000000000e5
-1291 3 18 31 0.32768000000000000000e5
-1291 3 19 23 0.32768000000000000000e5
-1291 3 22 27 0.16384000000000000000e5
-1291 4 8 20 0.32768000000000000000e5
-1291 4 12 16 0.32768000000000000000e5
-1291 4 14 18 0.16384000000000000000e5
-1292 1 3 34 -0.32768000000000000000e5
-1292 1 13 28 0.65536000000000000000e5
-1292 1 20 35 0.32768000000000000000e5
-1292 1 25 32 -0.65536000000000000000e5
-1292 2 6 20 -0.16384000000000000000e5
-1292 2 14 20 0.16384000000000000000e5
-1292 3 2 31 -0.32768000000000000000e5
-1292 3 6 35 0.32768000000000000000e5
-1292 3 14 27 -0.65536000000000000000e5
-1292 3 16 29 -0.16384000000000000000e5
-1292 3 17 30 -0.32768000000000000000e5
-1292 3 18 31 -0.32768000000000000000e5
-1292 3 19 24 0.32768000000000000000e5
-1292 3 22 27 -0.16384000000000000000e5
-1292 4 7 19 0.32768000000000000000e5
-1292 4 8 20 -0.32768000000000000000e5
-1292 4 12 16 -0.32768000000000000000e5
-1292 4 14 18 -0.16384000000000000000e5
-1293 1 3 34 -0.16384000000000000000e5
-1293 1 13 28 0.32768000000000000000e5
-1293 1 20 35 0.16384000000000000000e5
-1293 1 22 25 -0.65536000000000000000e5
-1293 1 24 31 0.65536000000000000000e5
-1293 1 25 32 -0.32768000000000000000e5
-1293 2 6 20 -0.81920000000000000000e4
-1293 2 14 20 0.81920000000000000000e4
-1293 3 6 35 0.16384000000000000000e5
-1293 3 14 27 0.32768000000000000000e5
-1293 3 16 29 -0.81920000000000000000e4
-1293 3 17 30 -0.16384000000000000000e5
-1293 3 18 31 -0.16384000000000000000e5
-1293 3 19 25 0.32768000000000000000e5
-1293 3 22 27 -0.81920000000000000000e4
-1293 4 8 20 -0.16384000000000000000e5
-1293 4 10 18 0.32768000000000000000e5
-1293 4 14 18 -0.81920000000000000000e4
-1294 3 3 32 0.32768000000000000000e5
-1294 3 4 33 0.32768000000000000000e5
-1294 3 17 30 -0.65536000000000000000e5
-1294 3 19 26 0.32768000000000000000e5
-1294 4 13 17 0.32768000000000000000e5
-1295 3 4 33 -0.32768000000000000000e5
-1295 3 19 27 0.32768000000000000000e5
-1296 3 3 32 -0.32768000000000000000e5
-1296 3 17 30 0.65536000000000000000e5
-1296 3 19 28 0.32768000000000000000e5
-1296 3 22 27 -0.65536000000000000000e5
-1296 4 4 20 0.32768000000000000000e5
-1296 4 13 17 -0.32768000000000000000e5
-1297 3 19 29 0.32768000000000000000e5
-1297 3 22 27 -0.32768000000000000000e5
-1298 3 5 34 -0.32768000000000000000e5
-1298 3 19 30 0.32768000000000000000e5
-1299 1 3 34 0.16384000000000000000e5
-1299 1 20 35 -0.16384000000000000000e5
-1299 3 6 35 -0.16384000000000000000e5
-1299 3 17 30 0.16384000000000000000e5
-1299 3 18 31 0.32768000000000000000e5
-1299 3 19 31 0.32768000000000000000e5
-1299 3 22 27 0.16384000000000000000e5
-1299 3 24 29 -0.65536000000000000000e5
-1299 4 14 18 0.16384000000000000000e5
-1299 4 15 19 0.32768000000000000000e5
-1300 1 4 27 -0.32768000000000000000e5
-1300 1 19 34 -0.65536000000000000000e5
-1300 1 26 33 0.32768000000000000000e5
-1300 1 30 33 0.65536000000000000000e5
-1300 2 4 18 -0.32768000000000000000e5
-1300 2 18 20 0.32768000000000000000e5
-1300 3 3 32 0.32768000000000000000e5
-1300 3 5 26 -0.32768000000000000000e5
-1300 3 17 22 0.65536000000000000000e5
-1300 3 18 19 -0.32768000000000000000e5
-1300 3 19 33 0.32768000000000000000e5
-1300 3 20 33 0.65536000000000000000e5
-1300 4 13 17 0.32768000000000000000e5
-1300 4 18 18 0.65536000000000000000e5
-1301 3 19 35 0.32768000000000000000e5
-1301 3 28 33 -0.32768000000000000000e5
-1302 1 11 26 -0.16384000000000000000e5
-1302 1 16 31 0.16384000000000000000e5
-1302 3 20 20 0.32768000000000000000e5
-1303 3 2 31 -0.32768000000000000000e5
-1303 3 20 21 0.32768000000000000000e5
-1304 3 18 23 -0.32768000000000000000e5
-1304 3 20 22 0.32768000000000000000e5
-1305 3 13 26 -0.32768000000000000000e5
-1305 3 20 23 0.32768000000000000000e5
-1306 1 3 34 0.16384000000000000000e5
-1306 1 13 28 -0.32768000000000000000e5
-1306 1 20 35 -0.16384000000000000000e5
-1306 1 25 32 0.32768000000000000000e5
-1306 2 6 20 0.81920000000000000000e4
-1306 2 14 20 -0.81920000000000000000e4
-1306 3 6 35 -0.16384000000000000000e5
-1306 3 16 29 0.81920000000000000000e4
-1306 3 17 30 0.16384000000000000000e5
-1306 3 18 31 0.16384000000000000000e5
-1306 3 20 24 0.32768000000000000000e5
-1306 3 22 27 0.81920000000000000000e4
-1306 4 8 20 0.16384000000000000000e5
-1306 4 14 18 0.81920000000000000000e4
-1307 3 16 29 -0.32768000000000000000e5
-1307 3 20 26 0.32768000000000000000e5
-1308 1 3 34 -0.32768000000000000000e5
-1308 1 20 35 0.32768000000000000000e5
-1308 3 6 35 0.32768000000000000000e5
-1308 3 20 27 0.32768000000000000000e5
-1309 3 17 30 -0.32768000000000000000e5
-1309 3 20 28 0.32768000000000000000e5
-1310 1 3 34 -0.16384000000000000000e5
-1310 1 20 35 0.16384000000000000000e5
-1310 2 6 20 -0.16384000000000000000e5
-1310 2 14 20 0.16384000000000000000e5
-1310 3 6 35 0.16384000000000000000e5
-1310 3 16 29 -0.16384000000000000000e5
-1310 3 17 30 -0.16384000000000000000e5
-1310 3 20 29 0.32768000000000000000e5
-1311 1 3 34 -0.16384000000000000000e5
-1311 1 20 35 0.16384000000000000000e5
-1311 3 6 35 0.16384000000000000000e5
-1311 3 17 30 -0.16384000000000000000e5
-1311 3 20 30 0.32768000000000000000e5
-1311 3 22 27 -0.16384000000000000000e5
-1311 4 14 18 -0.16384000000000000000e5
-1312 1 3 34 -0.16384000000000000000e5
-1312 1 20 35 0.16384000000000000000e5
-1312 2 6 20 -0.81920000000000000000e4
-1312 2 14 20 0.81920000000000000000e4
-1312 3 6 35 0.16384000000000000000e5
-1312 3 16 29 -0.81920000000000000000e4
-1312 3 17 30 -0.16384000000000000000e5
-1312 3 18 31 -0.16384000000000000000e5
-1312 3 20 31 0.32768000000000000000e5
-1312 3 22 27 -0.81920000000000000000e4
-1312 4 8 20 -0.16384000000000000000e5
-1312 4 14 18 -0.81920000000000000000e4
-1313 3 6 35 -0.32768000000000000000e5
-1313 3 20 32 0.32768000000000000000e5
-1314 3 20 34 0.32768000000000000000e5
-1314 3 26 31 -0.32768000000000000000e5
-1315 3 18 23 -0.16384000000000000000e5
-1315 3 21 21 0.32768000000000000000e5
-1316 1 3 34 0.32768000000000000000e5
-1316 1 13 28 -0.65536000000000000000e5
-1316 1 20 35 -0.32768000000000000000e5
-1316 1 25 32 0.65536000000000000000e5
-1316 2 6 20 0.16384000000000000000e5
-1316 2 14 20 -0.16384000000000000000e5
-1316 3 2 31 0.32768000000000000000e5
-1316 3 6 35 -0.32768000000000000000e5
-1316 3 16 29 0.16384000000000000000e5
-1316 3 17 30 0.32768000000000000000e5
-1316 3 18 23 0.32768000000000000000e5
-1316 3 18 31 0.32768000000000000000e5
-1316 3 21 22 0.32768000000000000000e5
-1316 3 22 27 0.16384000000000000000e5
-1316 4 8 20 0.32768000000000000000e5
-1316 4 12 16 0.32768000000000000000e5
-1316 4 14 18 0.16384000000000000000e5
-1317 1 3 34 0.16384000000000000000e5
-1317 1 13 28 -0.32768000000000000000e5
-1317 1 20 35 -0.16384000000000000000e5
-1317 1 25 32 0.32768000000000000000e5
-1317 2 6 20 0.81920000000000000000e4
-1317 2 14 20 -0.81920000000000000000e4
-1317 3 6 35 -0.16384000000000000000e5
-1317 3 16 29 0.81920000000000000000e4
-1317 3 17 30 0.16384000000000000000e5
-1317 3 18 31 0.16384000000000000000e5
-1317 3 21 23 0.32768000000000000000e5
-1317 3 22 27 0.81920000000000000000e4
-1317 4 8 20 0.16384000000000000000e5
-1317 4 14 18 0.81920000000000000000e4
-1318 3 14 27 -0.32768000000000000000e5
-1318 3 21 24 0.32768000000000000000e5
-1319 1 22 25 -0.32768000000000000000e5
-1319 1 24 31 0.32768000000000000000e5
-1319 3 21 25 0.32768000000000000000e5
-1320 1 3 34 -0.32768000000000000000e5
-1320 1 20 35 0.32768000000000000000e5
-1320 3 6 35 0.32768000000000000000e5
-1320 3 21 26 0.32768000000000000000e5
-1321 3 17 30 -0.32768000000000000000e5
-1321 3 21 27 0.32768000000000000000e5
-1322 3 21 28 0.32768000000000000000e5
-1322 3 22 27 -0.32768000000000000000e5
-1323 1 3 34 -0.16384000000000000000e5
-1323 1 20 35 0.16384000000000000000e5
-1323 3 6 35 0.16384000000000000000e5
-1323 3 17 30 -0.16384000000000000000e5
-1323 3 21 29 0.32768000000000000000e5
-1323 3 22 27 -0.16384000000000000000e5
-1323 4 14 18 -0.16384000000000000000e5
-1324 3 18 31 -0.32768000000000000000e5
-1324 3 21 30 0.32768000000000000000e5
-1325 3 21 31 0.32768000000000000000e5
-1325 3 24 29 -0.32768000000000000000e5
-1326 3 20 33 -0.32768000000000000000e5
-1326 3 21 32 0.32768000000000000000e5
-1327 1 19 34 -0.32768000000000000000e5
-1327 1 30 33 0.32768000000000000000e5
-1327 3 21 33 0.32768000000000000000e5
-1328 1 30 33 -0.32768000000000000000e5
-1328 1 33 34 0.32768000000000000000e5
-1328 3 21 35 0.32768000000000000000e5
-1329 1 3 34 -0.16384000000000000000e5
-1329 1 13 28 0.32768000000000000000e5
-1329 1 20 35 0.16384000000000000000e5
-1329 1 25 32 -0.32768000000000000000e5
-1329 2 6 20 -0.81920000000000000000e4
-1329 2 14 20 0.81920000000000000000e4
-1329 3 2 31 -0.16384000000000000000e5
-1329 3 6 35 0.16384000000000000000e5
-1329 3 14 27 -0.32768000000000000000e5
-1329 3 16 29 -0.81920000000000000000e4
-1329 3 17 30 -0.16384000000000000000e5
-1329 3 18 31 -0.16384000000000000000e5
-1329 3 22 22 0.32768000000000000000e5
-1329 3 22 27 -0.81920000000000000000e4
-1329 4 7 19 0.16384000000000000000e5
-1329 4 8 20 -0.16384000000000000000e5
-1329 4 12 16 -0.16384000000000000000e5
-1329 4 14 18 -0.81920000000000000000e4
-1330 3 14 27 -0.32768000000000000000e5
-1330 3 22 23 0.32768000000000000000e5
-1331 1 3 34 -0.16384000000000000000e5
-1331 1 13 28 0.32768000000000000000e5
-1331 1 20 35 0.16384000000000000000e5
-1331 1 22 25 -0.65536000000000000000e5
-1331 1 24 31 0.65536000000000000000e5
-1331 1 25 32 -0.32768000000000000000e5
-1331 2 6 20 -0.81920000000000000000e4
-1331 2 14 20 0.81920000000000000000e4
-1331 3 6 35 0.16384000000000000000e5
-1331 3 14 27 0.32768000000000000000e5
-1331 3 16 29 -0.81920000000000000000e4
-1331 3 17 30 -0.16384000000000000000e5
-1331 3 18 31 -0.16384000000000000000e5
-1331 3 22 24 0.32768000000000000000e5
-1331 3 22 27 -0.81920000000000000000e4
-1331 4 8 20 -0.16384000000000000000e5
-1331 4 10 18 0.32768000000000000000e5
-1331 4 14 18 -0.81920000000000000000e4
-1332 3 15 28 -0.32768000000000000000e5
-1332 3 22 25 0.32768000000000000000e5
-1333 3 17 30 -0.32768000000000000000e5
-1333 3 22 26 0.32768000000000000000e5
-1334 3 5 34 -0.32768000000000000000e5
-1334 3 22 28 0.32768000000000000000e5
-1335 3 18 31 -0.32768000000000000000e5
-1335 3 22 29 0.32768000000000000000e5
-1336 1 3 34 0.16384000000000000000e5
-1336 1 20 35 -0.16384000000000000000e5
-1336 3 6 35 -0.16384000000000000000e5
-1336 3 17 30 0.16384000000000000000e5
-1336 3 18 31 0.32768000000000000000e5
-1336 3 22 27 0.16384000000000000000e5
-1336 3 22 30 0.32768000000000000000e5
-1336 3 24 29 -0.65536000000000000000e5
-1336 4 14 18 0.16384000000000000000e5
-1336 4 15 19 0.32768000000000000000e5
-1337 1 19 34 -0.32768000000000000000e5
-1337 1 30 33 0.32768000000000000000e5
-1337 3 22 32 0.32768000000000000000e5
-1338 3 19 34 -0.32768000000000000000e5
-1338 3 22 33 0.32768000000000000000e5
-1339 1 9 24 -0.65536000000000000000e5
-1339 1 31 34 0.65536000000000000000e5
-1339 3 4 25 0.65536000000000000000e5
-1339 3 14 27 0.65536000000000000000e5
-1339 3 21 34 0.32768000000000000000e5
-1339 3 22 34 0.32768000000000000000e5
-1339 3 24 29 0.65536000000000000000e5
-1339 3 26 31 0.32768000000000000000e5
-1339 4 16 20 0.32768000000000000000e5
-1340 3 20 25 -0.16384000000000000000e5
-1340 3 23 23 0.32768000000000000000e5
-1341 1 22 25 -0.32768000000000000000e5
-1341 1 24 31 0.32768000000000000000e5
-1341 3 23 24 0.32768000000000000000e5
-1342 1 22 25 -0.16384000000000000000e5
-1342 1 24 31 0.16384000000000000000e5
-1342 3 15 28 -0.16384000000000000000e5
-1342 3 20 25 -0.16384000000000000000e5
-1342 3 23 25 0.32768000000000000000e5
-1342 4 16 16 -0.32768000000000000000e5
-1343 1 3 34 -0.16384000000000000000e5
-1343 1 20 35 0.16384000000000000000e5
-1343 2 6 20 -0.16384000000000000000e5
-1343 2 14 20 0.16384000000000000000e5
-1343 3 6 35 0.16384000000000000000e5
-1343 3 16 29 -0.16384000000000000000e5
-1343 3 17 30 -0.16384000000000000000e5
-1343 3 23 26 0.32768000000000000000e5
-1344 1 3 34 -0.16384000000000000000e5
-1344 1 20 35 0.16384000000000000000e5
-1344 3 6 35 0.16384000000000000000e5
-1344 3 17 30 -0.16384000000000000000e5
-1344 3 22 27 -0.16384000000000000000e5
-1344 3 23 27 0.32768000000000000000e5
-1344 4 14 18 -0.16384000000000000000e5
-1345 3 18 31 -0.32768000000000000000e5
-1345 3 23 28 0.32768000000000000000e5
-1346 1 3 34 -0.16384000000000000000e5
-1346 1 20 35 0.16384000000000000000e5
-1346 2 6 20 -0.81920000000000000000e4
-1346 2 14 20 0.81920000000000000000e4
-1346 3 6 35 0.16384000000000000000e5
-1346 3 16 29 -0.81920000000000000000e4
-1346 3 17 30 -0.16384000000000000000e5
-1346 3 18 31 -0.16384000000000000000e5
-1346 3 22 27 -0.81920000000000000000e4
-1346 3 23 29 0.32768000000000000000e5
-1346 4 8 20 -0.16384000000000000000e5
-1346 4 14 18 -0.81920000000000000000e4
-1347 3 23 30 0.32768000000000000000e5
-1347 3 24 29 -0.32768000000000000000e5
-1348 3 13 34 -0.32768000000000000000e5
-1348 3 23 31 0.32768000000000000000e5
-1349 3 23 32 0.32768000000000000000e5
-1349 3 26 31 -0.32768000000000000000e5
-1350 3 21 34 -0.32768000000000000000e5
-1350 3 23 33 0.32768000000000000000e5
-1351 1 9 24 -0.32768000000000000000e5
-1351 1 31 34 0.32768000000000000000e5
-1351 3 4 25 0.32768000000000000000e5
-1351 3 14 27 0.32768000000000000000e5
-1351 3 23 34 0.32768000000000000000e5
-1351 3 24 29 0.32768000000000000000e5
-1352 3 23 35 0.32768000000000000000e5
-1352 3 29 34 -0.32768000000000000000e5
-1353 3 15 28 -0.16384000000000000000e5
-1353 3 24 24 0.32768000000000000000e5
-1354 1 3 34 -0.16384000000000000000e5
-1354 1 20 35 0.16384000000000000000e5
-1354 3 6 35 0.16384000000000000000e5
-1354 3 17 30 -0.16384000000000000000e5
-1354 3 22 27 -0.16384000000000000000e5
-1354 3 24 26 0.32768000000000000000e5
-1354 4 14 18 -0.16384000000000000000e5
-1355 3 18 31 -0.32768000000000000000e5
-1355 3 24 27 0.32768000000000000000e5
-1356 1 3 34 0.16384000000000000000e5
-1356 1 20 35 -0.16384000000000000000e5
-1356 3 6 35 -0.16384000000000000000e5
-1356 3 17 30 0.16384000000000000000e5
-1356 3 18 31 0.32768000000000000000e5
-1356 3 22 27 0.16384000000000000000e5
-1356 3 24 28 0.32768000000000000000e5
-1356 3 24 29 -0.65536000000000000000e5
-1356 4 14 18 0.16384000000000000000e5
-1356 4 15 19 0.32768000000000000000e5
-1357 3 22 31 -0.32768000000000000000e5
-1357 3 24 30 0.32768000000000000000e5
-1358 3 24 31 0.32768000000000000000e5
-1358 3 25 30 -0.32768000000000000000e5
-1359 3 21 34 -0.32768000000000000000e5
-1359 3 24 32 0.32768000000000000000e5
-1360 1 9 24 -0.65536000000000000000e5
-1360 1 31 34 0.65536000000000000000e5
-1360 3 4 25 0.65536000000000000000e5
-1360 3 14 27 0.65536000000000000000e5
-1360 3 21 34 0.32768000000000000000e5
-1360 3 24 29 0.65536000000000000000e5
-1360 3 24 33 0.32768000000000000000e5
-1360 3 26 31 0.32768000000000000000e5
-1360 4 16 20 0.32768000000000000000e5
-1361 3 14 35 -0.32768000000000000000e5
-1361 3 24 34 0.32768000000000000000e5
-1362 1 3 34 -0.16384000000000000000e5
-1362 1 20 35 0.16384000000000000000e5
-1362 2 6 20 -0.81920000000000000000e4
-1362 2 14 20 0.81920000000000000000e4
-1362 3 6 35 0.16384000000000000000e5
-1362 3 16 29 -0.81920000000000000000e4
-1362 3 17 30 -0.16384000000000000000e5
-1362 3 18 31 -0.16384000000000000000e5
-1362 3 22 27 -0.81920000000000000000e4
-1362 3 25 26 0.32768000000000000000e5
-1362 4 8 20 -0.16384000000000000000e5
-1362 4 14 18 -0.81920000000000000000e4
-1363 3 24 29 -0.32768000000000000000e5
-1363 3 25 27 0.32768000000000000000e5
-1364 3 22 31 -0.32768000000000000000e5
-1364 3 25 28 0.32768000000000000000e5
-1365 3 13 34 -0.32768000000000000000e5
-1365 3 25 29 0.32768000000000000000e5
-1366 3 15 34 -0.32768000000000000000e5
-1366 3 25 31 0.32768000000000000000e5
-1367 1 9 24 -0.32768000000000000000e5
-1367 1 31 34 0.32768000000000000000e5
-1367 3 4 25 0.32768000000000000000e5
-1367 3 14 27 0.32768000000000000000e5
-1367 3 24 29 0.32768000000000000000e5
-1367 3 25 32 0.32768000000000000000e5
-1368 3 14 35 -0.32768000000000000000e5
-1368 3 25 33 0.32768000000000000000e5
-1369 3 25 35 0.32768000000000000000e5
-1369 3 31 34 -0.32768000000000000000e5
-1370 1 2 33 -0.16384000000000000000e5
-1370 1 3 34 0.32768000000000000000e5
-1370 1 4 27 -0.16384000000000000000e5
-1370 1 4 35 -0.16384000000000000000e5
-1370 2 4 18 -0.16384000000000000000e5
-1370 2 12 18 -0.16384000000000000000e5
-1370 2 18 20 0.16384000000000000000e5
-1370 3 3 32 0.16384000000000000000e5
-1370 3 4 33 0.16384000000000000000e5
-1370 3 5 26 -0.16384000000000000000e5
-1370 3 6 35 -0.32768000000000000000e5
-1370 3 17 22 0.32768000000000000000e5
-1370 3 17 30 -0.32768000000000000000e5
-1370 3 18 19 -0.16384000000000000000e5
-1370 3 19 32 -0.16384000000000000000e5
-1370 3 20 33 0.32768000000000000000e5
-1370 3 26 26 0.32768000000000000000e5
-1370 4 13 17 0.32768000000000000000e5
-1370 4 17 17 0.32768000000000000000e5
-1371 1 2 33 0.32768000000000000000e5
-1371 1 3 34 -0.65536000000000000000e5
-1371 1 4 35 0.32768000000000000000e5
-1371 1 26 33 0.32768000000000000000e5
-1371 2 12 18 0.32768000000000000000e5
-1371 3 4 33 -0.32768000000000000000e5
-1371 3 17 30 0.65536000000000000000e5
-1371 3 26 27 0.32768000000000000000e5
-1371 4 13 17 -0.32768000000000000000e5
-1372 1 4 27 0.32768000000000000000e5
-1372 1 26 33 -0.32768000000000000000e5
-1372 2 4 18 0.32768000000000000000e5
-1372 2 18 20 -0.32768000000000000000e5
-1372 3 3 32 -0.32768000000000000000e5
-1372 3 5 26 0.32768000000000000000e5
-1372 3 17 22 -0.65536000000000000000e5
-1372 3 18 19 0.32768000000000000000e5
-1372 3 19 32 0.32768000000000000000e5
-1372 3 20 33 -0.65536000000000000000e5
-1372 3 26 28 0.32768000000000000000e5
-1372 4 13 17 -0.32768000000000000000e5
-1373 3 6 35 -0.32768000000000000000e5
-1373 3 26 29 0.32768000000000000000e5
-1374 3 20 33 -0.32768000000000000000e5
-1374 3 26 30 0.32768000000000000000e5
-1375 1 3 34 -0.65536000000000000000e5
-1375 1 4 27 -0.32768000000000000000e5
-1375 1 4 35 -0.32768000000000000000e5
-1375 1 17 24 0.13107200000000000000e6
-1375 1 20 27 -0.65536000000000000000e5
-1375 1 28 35 -0.32768000000000000000e5
-1375 2 4 18 -0.32768000000000000000e5
-1375 2 6 20 -0.65536000000000000000e5
-1375 2 18 20 0.32768000000000000000e5
-1375 2 20 20 -0.65536000000000000000e5
-1375 3 2 31 -0.13107200000000000000e6
-1375 3 3 32 0.32768000000000000000e5
-1375 3 5 26 -0.32768000000000000000e5
-1375 3 17 22 0.65536000000000000000e5
-1375 3 17 30 -0.65536000000000000000e5
-1375 3 18 19 -0.32768000000000000000e5
-1375 3 19 32 -0.32768000000000000000e5
-1375 3 20 35 -0.65536000000000000000e5
-1375 3 26 32 0.32768000000000000000e5
-1375 3 27 32 0.32768000000000000000e5
-1375 4 13 17 0.32768000000000000000e5
-1376 3 26 33 0.32768000000000000000e5
-1376 3 27 32 -0.32768000000000000000e5
-1377 3 20 35 -0.32768000000000000000e5
-1377 3 26 34 0.32768000000000000000e5
-1378 1 4 27 -0.32768000000000000000e5
-1378 1 4 35 -0.32768000000000000000e5
-1378 1 26 33 0.32768000000000000000e5
-1378 1 32 35 0.32768000000000000000e5
-1378 2 4 18 -0.32768000000000000000e5
-1378 2 18 20 0.32768000000000000000e5
-1378 3 3 32 0.32768000000000000000e5
-1378 3 5 26 -0.32768000000000000000e5
-1378 3 17 22 0.65536000000000000000e5
-1378 3 18 19 -0.32768000000000000000e5
-1378 3 19 32 -0.32768000000000000000e5
-1378 3 20 33 0.65536000000000000000e5
-1378 3 26 35 0.32768000000000000000e5
-1378 3 27 32 0.32768000000000000000e5
-1378 4 13 17 0.32768000000000000000e5
-1379 1 4 27 0.16384000000000000000e5
-1379 1 26 33 -0.16384000000000000000e5
-1379 2 4 18 0.16384000000000000000e5
-1379 2 18 20 -0.16384000000000000000e5
-1379 3 3 32 -0.16384000000000000000e5
-1379 3 5 26 0.16384000000000000000e5
-1379 3 17 22 -0.32768000000000000000e5
-1379 3 18 19 0.16384000000000000000e5
-1379 3 19 32 0.16384000000000000000e5
-1379 3 20 33 -0.32768000000000000000e5
-1379 3 27 27 0.32768000000000000000e5
-1379 4 13 17 -0.16384000000000000000e5
-1380 3 19 32 -0.32768000000000000000e5
-1380 3 27 28 0.32768000000000000000e5
-1381 3 20 33 -0.32768000000000000000e5
-1381 3 27 29 0.32768000000000000000e5
-1382 1 19 34 -0.32768000000000000000e5
-1382 1 30 33 0.32768000000000000000e5
-1382 3 27 30 0.32768000000000000000e5
-1383 3 21 34 -0.32768000000000000000e5
-1383 3 27 31 0.32768000000000000000e5
-1384 1 3 34 0.65536000000000000000e5
-1384 1 4 27 0.32768000000000000000e5
-1384 1 4 35 0.32768000000000000000e5
-1384 1 17 24 -0.13107200000000000000e6
-1384 1 20 27 0.65536000000000000000e5
-1384 1 28 35 0.32768000000000000000e5
-1384 2 4 18 0.32768000000000000000e5
-1384 2 6 20 0.65536000000000000000e5
-1384 3 2 31 0.13107200000000000000e6
-1384 3 3 32 -0.32768000000000000000e5
-1384 3 5 26 0.32768000000000000000e5
-1384 3 17 22 -0.65536000000000000000e5
-1384 3 17 30 0.65536000000000000000e5
-1384 3 18 19 0.32768000000000000000e5
-1384 3 19 32 0.32768000000000000000e5
-1384 3 27 33 0.32768000000000000000e5
-1384 4 13 17 -0.32768000000000000000e5
-1385 1 30 33 -0.32768000000000000000e5
-1385 1 33 34 0.32768000000000000000e5
-1385 3 27 34 0.32768000000000000000e5
-1386 3 27 35 0.32768000000000000000e5
-1386 3 32 33 -0.32768000000000000000e5
-1387 1 4 27 -0.16384000000000000000e5
-1387 1 19 34 -0.32768000000000000000e5
-1387 1 26 33 0.16384000000000000000e5
-1387 1 30 33 0.32768000000000000000e5
-1387 2 4 18 -0.16384000000000000000e5
-1387 2 18 20 0.16384000000000000000e5
-1387 3 3 32 0.16384000000000000000e5
-1387 3 5 26 -0.16384000000000000000e5
-1387 3 17 22 0.32768000000000000000e5
-1387 3 18 19 -0.16384000000000000000e5
-1387 3 20 33 0.32768000000000000000e5
-1387 3 28 28 0.32768000000000000000e5
-1387 4 13 17 0.16384000000000000000e5
-1387 4 18 18 0.32768000000000000000e5
-1388 1 19 34 -0.32768000000000000000e5
-1388 1 30 33 0.32768000000000000000e5
-1388 3 28 29 0.32768000000000000000e5
-1389 3 19 34 -0.32768000000000000000e5
-1389 3 28 30 0.32768000000000000000e5
-1390 1 9 24 -0.65536000000000000000e5
-1390 1 31 34 0.65536000000000000000e5
-1390 3 4 25 0.65536000000000000000e5
-1390 3 14 27 0.65536000000000000000e5
-1390 3 21 34 0.32768000000000000000e5
-1390 3 24 29 0.65536000000000000000e5
-1390 3 26 31 0.32768000000000000000e5
-1390 3 28 31 0.32768000000000000000e5
-1390 4 16 20 0.32768000000000000000e5
-1391 1 3 34 0.65536000000000000000e5
-1391 1 4 27 0.32768000000000000000e5
-1391 1 4 35 0.32768000000000000000e5
-1391 1 17 24 -0.13107200000000000000e6
-1391 1 20 27 0.65536000000000000000e5
-1391 1 28 35 0.32768000000000000000e5
-1391 2 4 18 0.32768000000000000000e5
-1391 2 6 20 0.65536000000000000000e5
-1391 3 2 31 0.13107200000000000000e6
-1391 3 3 32 -0.32768000000000000000e5
-1391 3 5 26 0.32768000000000000000e5
-1391 3 17 22 -0.65536000000000000000e5
-1391 3 17 30 0.65536000000000000000e5
-1391 3 18 19 0.32768000000000000000e5
-1391 3 19 32 0.32768000000000000000e5
-1391 3 28 32 0.32768000000000000000e5
-1391 4 13 17 -0.32768000000000000000e5
-1392 3 22 35 -0.32768000000000000000e5
-1392 3 28 34 0.32768000000000000000e5
-1393 1 4 27 0.32768000000000000000e5
-1393 1 4 35 0.32768000000000000000e5
-1393 1 26 33 -0.32768000000000000000e5
-1393 1 32 35 -0.32768000000000000000e5
-1393 1 33 34 -0.65536000000000000000e5
-1393 1 34 35 0.65536000000000000000e5
-1393 2 4 18 0.32768000000000000000e5
-1393 2 18 20 -0.32768000000000000000e5
-1393 3 3 32 -0.32768000000000000000e5
-1393 3 5 26 0.32768000000000000000e5
-1393 3 17 22 -0.65536000000000000000e5
-1393 3 18 19 0.32768000000000000000e5
-1393 3 19 32 0.32768000000000000000e5
-1393 3 20 33 -0.65536000000000000000e5
-1393 3 27 32 -0.32768000000000000000e5
-1393 3 28 35 0.32768000000000000000e5
-1393 3 32 33 0.32768000000000000000e5
-1393 4 13 17 -0.32768000000000000000e5
-1393 4 20 20 0.65536000000000000000e5
-1394 3 26 31 -0.16384000000000000000e5
-1394 3 29 29 0.32768000000000000000e5
-1395 3 21 34 -0.32768000000000000000e5
-1395 3 29 30 0.32768000000000000000e5
-1396 1 9 24 -0.32768000000000000000e5
-1396 1 31 34 0.32768000000000000000e5
-1396 3 4 25 0.32768000000000000000e5
-1396 3 14 27 0.32768000000000000000e5
-1396 3 24 29 0.32768000000000000000e5
-1396 3 29 31 0.32768000000000000000e5
-1397 3 20 35 -0.32768000000000000000e5
-1397 3 29 32 0.32768000000000000000e5
-1398 1 30 33 -0.32768000000000000000e5
-1398 1 33 34 0.32768000000000000000e5
-1398 3 29 33 0.32768000000000000000e5
-1399 1 33 34 -0.32768000000000000000e5
-1399 1 34 35 0.32768000000000000000e5
-1399 3 29 35 0.32768000000000000000e5
-1400 1 9 24 -0.32768000000000000000e5
-1400 1 31 34 0.32768000000000000000e5
-1400 3 4 25 0.32768000000000000000e5
-1400 3 14 27 0.32768000000000000000e5
-1400 3 21 34 0.16384000000000000000e5
-1400 3 24 29 0.32768000000000000000e5
-1400 3 26 31 0.16384000000000000000e5
-1400 3 30 30 0.32768000000000000000e5
-1400 4 16 20 0.16384000000000000000e5
-1401 3 14 35 -0.32768000000000000000e5
-1401 3 30 31 0.32768000000000000000e5
-1402 1 30 33 -0.32768000000000000000e5
-1402 1 33 34 0.32768000000000000000e5
-1402 3 30 32 0.32768000000000000000e5
-1403 3 22 35 -0.32768000000000000000e5
-1403 3 30 33 0.32768000000000000000e5
-1404 3 24 35 -0.32768000000000000000e5
-1404 3 30 34 0.32768000000000000000e5
-1405 3 25 34 -0.16384000000000000000e5
-1405 3 31 31 0.32768000000000000000e5
-1406 3 29 34 -0.32768000000000000000e5
-1406 3 31 32 0.32768000000000000000e5
-1407 3 24 35 -0.32768000000000000000e5
-1407 3 31 33 0.32768000000000000000e5
-1408 3 31 35 0.32768000000000000000e5
-1408 3 34 34 -0.65536000000000000000e5
-1409 1 4 27 -0.16384000000000000000e5
-1409 1 4 35 -0.16384000000000000000e5
-1409 1 26 33 0.16384000000000000000e5
-1409 1 32 35 0.16384000000000000000e5
-1409 2 4 18 -0.16384000000000000000e5
-1409 2 18 20 0.16384000000000000000e5
-1409 3 3 32 0.16384000000000000000e5
-1409 3 5 26 -0.16384000000000000000e5
-1409 3 17 22 0.32768000000000000000e5
-1409 3 18 19 -0.16384000000000000000e5
-1409 3 19 32 -0.16384000000000000000e5
-1409 3 20 33 0.32768000000000000000e5
-1409 3 27 32 0.16384000000000000000e5
-1409 3 32 32 0.32768000000000000000e5
-1409 4 13 17 0.16384000000000000000e5
-1410 1 33 34 -0.32768000000000000000e5
-1410 1 34 35 0.32768000000000000000e5
-1410 3 32 34 0.32768000000000000000e5
-1411 1 4 27 0.16384000000000000000e5
-1411 1 4 35 0.16384000000000000000e5
-1411 1 26 33 -0.16384000000000000000e5
-1411 1 32 35 -0.16384000000000000000e5
-1411 1 33 34 -0.32768000000000000000e5
-1411 1 34 35 0.32768000000000000000e5
-1411 2 4 18 0.16384000000000000000e5
-1411 2 18 20 -0.16384000000000000000e5
-1411 3 3 32 -0.16384000000000000000e5
-1411 3 5 26 0.16384000000000000000e5
-1411 3 17 22 -0.32768000000000000000e5
-1411 3 18 19 0.16384000000000000000e5
-1411 3 19 32 0.16384000000000000000e5
-1411 3 20 33 -0.32768000000000000000e5
-1411 3 27 32 -0.16384000000000000000e5
-1411 3 32 33 0.16384000000000000000e5
-1411 3 33 33 0.32768000000000000000e5
-1411 4 13 17 -0.16384000000000000000e5
-1411 4 20 20 0.32768000000000000000e5
-1412 3 30 35 -0.32768000000000000000e5
-1412 3 33 34 0.32768000000000000000e5
-1413 1 1 8 -0.65536000000000000000e5
-1413 1 2 5 -0.32768000000000000000e5
-1413 1 3 18 0.32768000000000000000e5
-1413 1 5 20 0.65536000000000000000e5
-1413 1 6 21 0.13107200000000000000e6
-1413 1 11 26 -0.13107200000000000000e6
-1413 2 1 15 -0.65536000000000000000e5
-1413 2 6 12 0.65536000000000000000e5
-1413 3 1 2 0.32768000000000000000e5
-1413 3 2 7 0.65536000000000000000e5
-1413 3 7 20 -0.13107200000000000000e6
-1413 4 1 2 0.32768000000000000000e5
-1413 4 2 2 -0.65536000000000000000e5
-1414 4 1 3 0.32768000000000000000e5
-1414 4 2 2 -0.65536000000000000000e5
-1415 2 2 4 -0.32768000000000000000e5
-1415 2 3 17 0.32768000000000000000e5
-1415 4 1 4 0.32768000000000000000e5
-1415 4 1 13 0.32768000000000000000e5
-1416 2 1 7 -0.32768000000000000000e5
-1416 2 1 15 0.32768000000000000000e5
-1416 4 1 6 0.32768000000000000000e5
-1417 4 1 7 0.32768000000000000000e5
-1417 4 2 6 -0.32768000000000000000e5
-1418 1 1 8 0.32768000000000000000e5
-1418 1 2 9 0.16384000000000000000e5
-1418 1 4 11 -0.65536000000000000000e5
-1418 1 5 12 -0.32768000000000000000e5
-1418 1 5 20 -0.32768000000000000000e5
-1418 1 6 21 -0.98304000000000000000e5
-1418 1 7 10 -0.65536000000000000000e5
-1418 1 9 16 -0.16384000000000000000e5
-1418 1 12 19 0.32768000000000000000e5
-1418 1 12 27 -0.32768000000000000000e5
-1418 1 13 20 0.13107200000000000000e6
-1418 2 1 7 0.16384000000000000000e5
-1418 2 1 15 0.16384000000000000000e5
-1418 2 2 16 -0.32768000000000000000e5
-1418 2 3 9 -0.32768000000000000000e5
-1418 2 6 12 -0.32768000000000000000e5
-1418 2 8 14 -0.65536000000000000000e5
-1418 3 1 6 0.16384000000000000000e5
-1418 3 1 14 -0.65536000000000000000e5
-1418 3 2 7 0.32768000000000000000e5
-1418 3 2 15 0.13107200000000000000e6
-1418 3 5 10 -0.65536000000000000000e5
-1418 3 8 21 -0.32768000000000000000e5
-1418 4 1 5 0.16384000000000000000e5
-1418 4 1 8 0.32768000000000000000e5
-1418 4 4 8 -0.32768000000000000000e5
-1418 4 5 9 -0.65536000000000000000e5
-1419 1 1 8 0.16384000000000000000e5
-1419 1 2 9 0.16384000000000000000e5
-1419 1 4 11 -0.32768000000000000000e5
-1419 1 5 12 -0.32768000000000000000e5
-1419 1 5 20 -0.16384000000000000000e5
-1419 1 6 21 -0.32768000000000000000e5
-1419 1 8 23 0.65536000000000000000e5
-1419 1 9 16 -0.16384000000000000000e5
-1419 1 12 19 0.32768000000000000000e5
-1419 1 12 27 -0.32768000000000000000e5
-1419 2 1 7 0.16384000000000000000e5
-1419 2 3 9 -0.32768000000000000000e5
-1419 2 6 12 -0.16384000000000000000e5
-1419 3 1 14 -0.13107200000000000000e6
-1419 3 2 7 0.16384000000000000000e5
-1419 3 2 15 0.13107200000000000000e6
-1419 3 5 10 -0.65536000000000000000e5
-1419 3 8 21 -0.32768000000000000000e5
-1419 4 1 9 0.32768000000000000000e5
-1419 4 4 8 -0.32768000000000000000e5
-1419 4 5 9 -0.65536000000000000000e5
-1420 2 6 8 -0.32768000000000000000e5
-1420 2 8 14 0.32768000000000000000e5
-1420 4 1 10 0.32768000000000000000e5
-1421 1 1 8 0.65536000000000000000e5
-1421 1 2 5 0.32768000000000000000e5
-1421 1 3 18 -0.32768000000000000000e5
-1421 1 5 20 -0.65536000000000000000e5
-1421 1 6 21 -0.13107200000000000000e6
-1421 1 11 26 0.13107200000000000000e6
-1421 2 1 3 -0.32768000000000000000e5
-1421 2 1 15 0.65536000000000000000e5
-1421 2 6 12 -0.65536000000000000000e5
-1421 2 11 11 0.65536000000000000000e5
-1421 3 1 2 -0.32768000000000000000e5
-1421 3 2 7 -0.65536000000000000000e5
-1421 3 7 20 0.13107200000000000000e6
-1421 4 1 11 0.32768000000000000000e5
-1421 4 2 2 0.65536000000000000000e5
-1422 1 2 17 0.32768000000000000000e5
-1422 1 4 27 -0.32768000000000000000e5
-1422 1 5 20 0.65536000000000000000e5
-1422 1 9 16 0.13107200000000000000e6
-1422 1 11 26 -0.13107200000000000000e6
-1422 2 3 17 -0.32768000000000000000e5
-1422 2 6 12 0.65536000000000000000e5
-1422 2 11 17 0.32768000000000000000e5
-1422 3 4 17 -0.32768000000000000000e5
-1422 3 7 20 -0.13107200000000000000e6
-1422 4 1 12 0.32768000000000000000e5
-1422 4 1 13 -0.32768000000000000000e5
-1422 4 11 11 0.65536000000000000000e5
-1423 2 1 15 -0.32768000000000000000e5
-1423 2 1 19 0.32768000000000000000e5
-1423 4 1 14 0.32768000000000000000e5
-1424 4 1 15 0.32768000000000000000e5
-1424 4 2 14 -0.32768000000000000000e5
-1425 2 2 16 -0.32768000000000000000e5
-1425 2 5 19 0.32768000000000000000e5
-1425 4 1 16 0.32768000000000000000e5
-1426 4 1 17 0.32768000000000000000e5
-1426 4 11 11 -0.65536000000000000000e5
-1427 1 1 32 0.32768000000000000000e5
-1427 1 2 33 0.32768000000000000000e5
-1427 1 4 35 0.32768000000000000000e5
-1427 1 16 31 -0.13107200000000000000e6
-1427 1 20 27 0.13107200000000000000e6
-1427 2 3 17 -0.32768000000000000000e5
-1427 2 6 12 0.65536000000000000000e5
-1427 2 11 17 0.32768000000000000000e5
-1427 2 12 18 0.32768000000000000000e5
-1427 3 3 32 -0.32768000000000000000e5
-1427 3 4 33 -0.32768000000000000000e5
-1427 3 17 30 0.65536000000000000000e5
-1427 4 1 18 0.32768000000000000000e5
-1427 4 2 14 -0.65536000000000000000e5
-1427 4 5 17 -0.65536000000000000000e5
-1427 4 13 17 -0.32768000000000000000e5
-1428 4 1 19 0.32768000000000000000e5
-1428 4 5 17 -0.32768000000000000000e5
-1429 1 1 32 -0.32768000000000000000e5
-1429 1 2 33 -0.32768000000000000000e5
-1429 1 4 35 -0.32768000000000000000e5
-1429 1 16 31 0.13107200000000000000e6
-1429 1 20 27 -0.13107200000000000000e6
-1429 2 6 12 -0.65536000000000000000e5
-1429 2 11 17 -0.32768000000000000000e5
-1429 2 12 18 -0.32768000000000000000e5
-1429 2 17 17 0.65536000000000000000e5
-1429 3 3 32 0.32768000000000000000e5
-1429 3 4 33 0.32768000000000000000e5
-1429 3 17 30 -0.65536000000000000000e5
-1429 4 1 20 0.32768000000000000000e5
-1429 4 2 14 0.65536000000000000000e5
-1429 4 5 17 0.65536000000000000000e5
-1429 4 13 17 0.32768000000000000000e5
-1430 2 2 4 -0.32768000000000000000e5
-1430 2 3 17 0.32768000000000000000e5
-1430 4 1 13 0.32768000000000000000e5
-1430 4 2 3 0.32768000000000000000e5
-1431 4 2 4 0.32768000000000000000e5
-1431 4 3 3 -0.65536000000000000000e5
-1432 2 1 7 -0.32768000000000000000e5
-1432 2 1 15 0.32768000000000000000e5
-1432 4 2 5 0.32768000000000000000e5
-1433 1 2 9 0.32768000000000000000e5
-1433 1 4 11 -0.65536000000000000000e5
-1433 1 7 22 0.65536000000000000000e5
-1433 1 9 16 -0.32768000000000000000e5
-1433 3 4 9 -0.32768000000000000000e5
-1433 3 5 10 0.65536000000000000000e5
-1433 4 2 7 0.32768000000000000000e5
-1433 4 3 7 -0.32768000000000000000e5
-1434 1 1 8 0.16384000000000000000e5
-1434 1 2 9 0.16384000000000000000e5
-1434 1 4 11 -0.32768000000000000000e5
-1434 1 5 12 -0.32768000000000000000e5
-1434 1 5 20 -0.16384000000000000000e5
-1434 1 6 21 -0.32768000000000000000e5
-1434 1 8 23 0.65536000000000000000e5
-1434 1 9 16 -0.16384000000000000000e5
-1434 1 12 19 0.32768000000000000000e5
-1434 1 12 27 -0.32768000000000000000e5
-1434 2 1 7 0.16384000000000000000e5
-1434 2 3 9 -0.32768000000000000000e5
-1434 2 6 12 -0.16384000000000000000e5
-1434 3 1 14 -0.13107200000000000000e6
-1434 3 2 7 0.16384000000000000000e5
-1434 3 2 15 0.13107200000000000000e6
-1434 3 5 10 -0.65536000000000000000e5
-1434 3 8 21 -0.32768000000000000000e5
-1434 4 2 8 0.32768000000000000000e5
-1434 4 4 8 -0.32768000000000000000e5
-1434 4 5 9 -0.65536000000000000000e5
-1435 1 7 22 -0.32768000000000000000e5
-1435 1 8 23 0.65536000000000000000e5
-1435 1 11 26 -0.32768000000000000000e5
-1435 1 12 27 -0.32768000000000000000e5
-1435 2 3 9 -0.32768000000000000000e5
-1435 3 7 20 -0.32768000000000000000e5
-1435 3 8 21 -0.32768000000000000000e5
-1435 4 2 9 0.32768000000000000000e5
-1436 4 2 10 0.32768000000000000000e5
-1436 4 5 9 -0.32768000000000000000e5
-1437 1 2 17 0.32768000000000000000e5
-1437 1 4 27 -0.32768000000000000000e5
-1437 1 5 20 0.65536000000000000000e5
-1437 1 9 16 0.13107200000000000000e6
-1437 1 11 26 -0.13107200000000000000e6
-1437 2 3 17 -0.32768000000000000000e5
-1437 2 6 12 0.65536000000000000000e5
-1437 2 11 17 0.32768000000000000000e5
-1437 3 4 17 -0.32768000000000000000e5
-1437 3 7 20 -0.13107200000000000000e6
-1437 4 1 13 -0.32768000000000000000e5
-1437 4 2 11 0.32768000000000000000e5
-1437 4 11 11 0.65536000000000000000e5
-1438 4 1 13 -0.32768000000000000000e5
-1438 4 2 12 0.32768000000000000000e5
-1439 1 4 19 0.32768000000000000000e5
-1439 1 4 35 -0.32768000000000000000e5
-1439 1 9 16 0.65536000000000000000e5
-1439 1 20 27 -0.65536000000000000000e5
-1439 3 1 30 -0.65536000000000000000e5
-1439 3 3 16 -0.32768000000000000000e5
-1439 3 3 32 0.32768000000000000000e5
-1439 3 4 33 0.32768000000000000000e5
-1439 3 5 26 -0.32768000000000000000e5
-1439 3 6 19 -0.65536000000000000000e5
-1439 3 17 30 -0.65536000000000000000e5
-1439 4 1 13 -0.32768000000000000000e5
-1439 4 2 13 0.32768000000000000000e5
-1439 4 13 17 0.32768000000000000000e5
-1440 4 2 15 0.32768000000000000000e5
-1440 4 7 11 -0.32768000000000000000e5
-1441 4 2 16 0.32768000000000000000e5
-1441 4 8 12 -0.32768000000000000000e5
-1442 1 1 32 0.32768000000000000000e5
-1442 1 2 33 0.32768000000000000000e5
-1442 1 4 35 0.32768000000000000000e5
-1442 1 16 31 -0.13107200000000000000e6
-1442 1 20 27 0.13107200000000000000e6
-1442 2 3 17 -0.32768000000000000000e5
-1442 2 6 12 0.65536000000000000000e5
-1442 2 11 17 0.32768000000000000000e5
-1442 2 12 18 0.32768000000000000000e5
-1442 3 3 32 -0.32768000000000000000e5
-1442 3 4 33 -0.32768000000000000000e5
-1442 3 17 30 0.65536000000000000000e5
-1442 4 2 14 -0.65536000000000000000e5
-1442 4 2 17 0.32768000000000000000e5
-1442 4 5 17 -0.65536000000000000000e5
-1442 4 13 17 -0.32768000000000000000e5
-1443 1 3 18 0.32768000000000000000e5
-1443 1 4 27 0.32768000000000000000e5
-1443 1 4 35 0.32768000000000000000e5
-1443 1 5 20 -0.65536000000000000000e5
-1443 1 9 16 -0.65536000000000000000e5
-1443 1 20 27 0.65536000000000000000e5
-1443 2 12 18 0.32768000000000000000e5
-1443 3 1 30 0.65536000000000000000e5
-1443 3 3 16 0.32768000000000000000e5
-1443 3 3 32 -0.32768000000000000000e5
-1443 3 4 17 0.32768000000000000000e5
-1443 3 4 33 -0.32768000000000000000e5
-1443 3 5 26 0.32768000000000000000e5
-1443 3 6 19 0.65536000000000000000e5
-1443 3 17 30 0.65536000000000000000e5
-1443 4 1 13 0.32768000000000000000e5
-1443 4 2 18 0.32768000000000000000e5
-1443 4 13 17 -0.32768000000000000000e5
-1444 1 3 34 -0.32768000000000000000e5
-1444 1 5 20 0.32768000000000000000e5
-1444 3 1 30 0.32768000000000000000e5
-1444 3 2 31 -0.65536000000000000000e5
-1444 3 6 19 -0.32768000000000000000e5
-1444 3 17 22 0.32768000000000000000e5
-1444 4 2 19 0.32768000000000000000e5
-1445 1 2 33 0.32768000000000000000e5
-1445 1 3 34 -0.65536000000000000000e5
-1445 1 17 32 -0.32768000000000000000e5
-1445 1 20 35 0.65536000000000000000e5
-1445 3 4 33 -0.32768000000000000000e5
-1445 3 6 35 0.65536000000000000000e5
-1445 3 17 30 0.65536000000000000000e5
-1445 4 2 20 0.32768000000000000000e5
-1445 4 13 17 -0.32768000000000000000e5
-1446 1 2 5 -0.32768000000000000000e5
-1446 1 2 9 -0.13107200000000000000e6
-1446 1 3 18 0.32768000000000000000e5
-1446 1 4 11 -0.52428800000000000000e6
-1446 1 5 12 -0.26214400000000000000e6
-1446 1 7 22 0.26214400000000000000e6
-1446 1 8 23 0.52428800000000000000e6
-1446 1 9 16 0.13107200000000000000e6
-1446 1 11 26 -0.26214400000000000000e6
-1446 1 12 19 0.26214400000000000000e6
-1446 1 12 27 -0.26214400000000000000e6
-1446 2 3 9 -0.26214400000000000000e6
-1446 3 1 14 -0.52428800000000000000e6
-1446 3 2 7 -0.13107200000000000000e6
-1446 3 2 15 0.10485760000000000000e7
-1446 3 4 5 0.32768000000000000000e5
-1446 3 4 9 0.65536000000000000000e5
-1446 3 5 10 -0.65536000000000000000e6
-1446 3 7 20 -0.26214400000000000000e6
-1446 3 8 21 -0.26214400000000000000e6
-1446 4 2 6 -0.13107200000000000000e6
-1446 4 3 3 -0.65536000000000000000e5
-1446 4 3 4 0.32768000000000000000e5
-1446 4 3 7 0.65536000000000000000e5
-1446 4 4 8 -0.26214400000000000000e6
-1446 4 5 9 -0.52428800000000000000e6
-1447 4 2 6 -0.32768000000000000000e5
-1447 4 3 5 0.32768000000000000000e5
-1448 1 2 9 0.32768000000000000000e5
-1448 1 4 11 -0.65536000000000000000e5
-1448 1 7 22 0.65536000000000000000e5
-1448 1 9 16 -0.32768000000000000000e5
-1448 3 4 9 -0.32768000000000000000e5
-1448 3 5 10 0.65536000000000000000e5
-1448 4 3 6 0.32768000000000000000e5
-1448 4 3 7 -0.32768000000000000000e5
-1449 1 7 22 -0.32768000000000000000e5
-1449 1 8 23 0.65536000000000000000e5
-1449 1 11 26 -0.32768000000000000000e5
-1449 1 12 27 -0.32768000000000000000e5
-1449 2 3 9 -0.32768000000000000000e5
-1449 3 7 20 -0.32768000000000000000e5
-1449 3 8 21 -0.32768000000000000000e5
-1449 4 3 8 0.32768000000000000000e5
-1450 4 3 9 0.32768000000000000000e5
-1450 4 4 8 -0.32768000000000000000e5
-1451 1 8 23 -0.32768000000000000000e5
-1451 1 9 24 -0.32768000000000000000e5
-1451 1 13 28 -0.32768000000000000000e5
-1451 1 14 21 0.65536000000000000000e5
-1451 2 4 10 -0.32768000000000000000e5
-1451 3 13 18 -0.32768000000000000000e5
-1451 4 3 10 0.32768000000000000000e5
-1452 4 1 13 -0.32768000000000000000e5
-1452 4 3 11 0.32768000000000000000e5
-1453 1 4 19 0.32768000000000000000e5
-1453 1 4 35 -0.32768000000000000000e5
-1453 1 9 16 0.65536000000000000000e5
-1453 1 20 27 -0.65536000000000000000e5
-1453 3 1 30 -0.65536000000000000000e5
-1453 3 3 16 -0.32768000000000000000e5
-1453 3 3 32 0.32768000000000000000e5
-1453 3 4 33 0.32768000000000000000e5
-1453 3 5 26 -0.32768000000000000000e5
-1453 3 6 19 -0.65536000000000000000e5
-1453 3 17 30 -0.65536000000000000000e5
-1453 4 1 13 -0.32768000000000000000e5
-1453 4 3 12 0.32768000000000000000e5
-1453 4 13 17 0.32768000000000000000e5
-1454 1 4 19 0.32768000000000000000e5
-1454 1 4 35 -0.32768000000000000000e5
-1454 1 7 22 -0.13107200000000000000e6
-1454 1 9 16 0.65536000000000000000e5
-1454 1 17 24 0.13107200000000000000e6
-1454 1 20 27 -0.65536000000000000000e5
-1454 3 1 30 -0.65536000000000000000e5
-1454 3 3 32 0.32768000000000000000e5
-1454 3 4 17 0.32768000000000000000e5
-1454 3 4 33 0.32768000000000000000e5
-1454 3 5 18 0.32768000000000000000e5
-1454 3 5 26 -0.32768000000000000000e5
-1454 3 6 19 0.65536000000000000000e5
-1454 3 17 30 -0.65536000000000000000e5
-1454 4 3 13 0.32768000000000000000e5
-1454 4 7 11 0.65536000000000000000e5
-1454 4 13 17 0.32768000000000000000e5
-1455 4 3 14 0.32768000000000000000e5
-1455 4 7 11 -0.32768000000000000000e5
-1456 1 7 22 0.32768000000000000000e5
-1456 1 17 24 -0.32768000000000000000e5
-1456 3 4 25 0.65536000000000000000e5
-1456 3 9 22 -0.32768000000000000000e5
-1456 3 13 18 -0.65536000000000000000e5
-1456 4 3 16 0.32768000000000000000e5
-1456 4 4 16 -0.32768000000000000000e5
-1457 1 3 18 0.32768000000000000000e5
-1457 1 4 27 0.32768000000000000000e5
-1457 1 4 35 0.32768000000000000000e5
-1457 1 5 20 -0.65536000000000000000e5
-1457 1 9 16 -0.65536000000000000000e5
-1457 1 20 27 0.65536000000000000000e5
-1457 2 12 18 0.32768000000000000000e5
-1457 3 1 30 0.65536000000000000000e5
-1457 3 3 16 0.32768000000000000000e5
-1457 3 3 32 -0.32768000000000000000e5
-1457 3 4 17 0.32768000000000000000e5
-1457 3 4 33 -0.32768000000000000000e5
-1457 3 5 26 0.32768000000000000000e5
-1457 3 6 19 0.65536000000000000000e5
-1457 3 17 30 0.65536000000000000000e5
-1457 4 1 13 0.32768000000000000000e5
-1457 4 3 17 0.32768000000000000000e5
-1457 4 13 17 -0.32768000000000000000e5
-1458 1 2 33 0.32768000000000000000e5
-1458 1 3 34 -0.65536000000000000000e5
-1458 1 4 27 0.32768000000000000000e5
-1458 1 4 35 0.32768000000000000000e5
-1458 2 12 18 0.32768000000000000000e5
-1458 3 3 32 -0.32768000000000000000e5
-1458 3 4 33 -0.32768000000000000000e5
-1458 3 5 26 0.32768000000000000000e5
-1458 3 17 22 -0.65536000000000000000e5
-1458 3 17 30 0.65536000000000000000e5
-1458 3 18 19 0.32768000000000000000e5
-1458 4 3 18 0.32768000000000000000e5
-1458 4 13 17 -0.32768000000000000000e5
-1459 4 3 19 0.32768000000000000000e5
-1459 4 6 18 -0.32768000000000000000e5
-1460 4 3 20 0.32768000000000000000e5
-1460 4 13 17 -0.32768000000000000000e5
-1461 1 2 9 0.32768000000000000000e5
-1461 1 4 11 -0.65536000000000000000e5
-1461 1 7 22 0.65536000000000000000e5
-1461 1 9 16 -0.32768000000000000000e5
-1461 3 4 9 -0.32768000000000000000e5
-1461 3 5 10 0.65536000000000000000e5
-1461 4 3 7 -0.32768000000000000000e5
-1461 4 4 5 0.32768000000000000000e5
-1462 4 3 7 -0.32768000000000000000e5
-1462 4 4 6 0.32768000000000000000e5
-1463 4 4 9 0.32768000000000000000e5
-1463 4 7 7 -0.65536000000000000000e5
-1464 1 4 11 0.16384000000000000000e5
-1464 1 5 12 0.16384000000000000000e5
-1464 1 7 22 -0.16384000000000000000e5
-1464 1 8 23 -0.32768000000000000000e5
-1464 1 9 24 -0.32768000000000000000e5
-1464 1 12 19 -0.16384000000000000000e5
-1464 1 13 28 -0.32768000000000000000e5
-1464 1 14 21 0.65536000000000000000e5
-1464 2 4 10 -0.32768000000000000000e5
-1464 3 1 14 0.32768000000000000000e5
-1464 3 2 15 -0.65536000000000000000e5
-1464 3 5 10 0.16384000000000000000e5
-1464 3 5 14 0.32768000000000000000e5
-1464 3 8 13 0.65536000000000000000e5
-1464 3 11 12 -0.65536000000000000000e5
-1464 3 13 18 -0.32768000000000000000e5
-1464 4 4 8 0.16384000000000000000e5
-1464 4 4 10 0.32768000000000000000e5
-1464 4 5 9 0.32768000000000000000e5
-1465 1 4 19 0.32768000000000000000e5
-1465 1 4 35 -0.32768000000000000000e5
-1465 1 9 16 0.65536000000000000000e5
-1465 1 20 27 -0.65536000000000000000e5
-1465 3 1 30 -0.65536000000000000000e5
-1465 3 3 16 -0.32768000000000000000e5
-1465 3 3 32 0.32768000000000000000e5
-1465 3 4 33 0.32768000000000000000e5
-1465 3 5 26 -0.32768000000000000000e5
-1465 3 6 19 -0.65536000000000000000e5
-1465 3 17 30 -0.65536000000000000000e5
-1465 4 1 13 -0.32768000000000000000e5
-1465 4 4 11 0.32768000000000000000e5
-1465 4 13 17 0.32768000000000000000e5
-1466 1 4 19 0.32768000000000000000e5
-1466 1 4 35 -0.32768000000000000000e5
-1466 1 7 22 -0.13107200000000000000e6
-1466 1 9 16 0.65536000000000000000e5
-1466 1 17 24 0.13107200000000000000e6
-1466 1 20 27 -0.65536000000000000000e5
-1466 3 1 30 -0.65536000000000000000e5
-1466 3 3 32 0.32768000000000000000e5
-1466 3 4 17 0.32768000000000000000e5
-1466 3 4 33 0.32768000000000000000e5
-1466 3 5 18 0.32768000000000000000e5
-1466 3 5 26 -0.32768000000000000000e5
-1466 3 6 19 0.65536000000000000000e5
-1466 3 17 30 -0.65536000000000000000e5
-1466 4 4 12 0.32768000000000000000e5
-1466 4 7 11 0.65536000000000000000e5
-1466 4 13 17 0.32768000000000000000e5
-1467 1 4 19 0.32768000000000000000e5
-1467 1 4 35 -0.32768000000000000000e5
-1467 1 7 22 0.13107200000000000000e6
-1467 1 9 16 -0.65536000000000000000e5
-1467 1 17 24 -0.13107200000000000000e6
-1467 1 20 27 0.65536000000000000000e5
-1467 3 1 30 0.65536000000000000000e5
-1467 3 3 32 0.32768000000000000000e5
-1467 3 4 33 0.32768000000000000000e5
-1467 3 5 18 0.32768000000000000000e5
-1467 3 5 19 0.32768000000000000000e5
-1467 3 5 26 -0.32768000000000000000e5
-1467 3 8 21 -0.13107200000000000000e6
-1467 3 17 30 -0.65536000000000000000e5
-1467 4 3 15 0.65536000000000000000e5
-1467 4 4 13 0.32768000000000000000e5
-1467 4 7 11 -0.65536000000000000000e5
-1467 4 13 17 0.32768000000000000000e5
-1468 4 3 15 -0.32768000000000000000e5
-1468 4 4 14 0.32768000000000000000e5
-1469 3 4 25 -0.13107200000000000000e6
-1469 3 5 22 0.32768000000000000000e5
-1469 3 6 19 -0.32768000000000000000e5
-1469 3 8 21 0.13107200000000000000e6
-1469 3 9 22 0.65536000000000000000e5
-1469 4 3 15 -0.32768000000000000000e5
-1469 4 4 15 0.32768000000000000000e5
-1469 4 4 16 0.65536000000000000000e5
-1470 1 2 33 0.32768000000000000000e5
-1470 1 3 34 -0.65536000000000000000e5
-1470 1 4 27 0.32768000000000000000e5
-1470 1 4 35 0.32768000000000000000e5
-1470 2 12 18 0.32768000000000000000e5
-1470 3 3 32 -0.32768000000000000000e5
-1470 3 4 33 -0.32768000000000000000e5
-1470 3 5 26 0.32768000000000000000e5
-1470 3 17 22 -0.65536000000000000000e5
-1470 3 17 30 0.65536000000000000000e5
-1470 3 18 19 0.32768000000000000000e5
-1470 4 4 17 0.32768000000000000000e5
-1470 4 13 17 -0.32768000000000000000e5
-1471 4 4 18 0.32768000000000000000e5
-1471 4 13 13 -0.65536000000000000000e5
-1472 1 3 34 0.98304000000000000000e5
-1472 1 5 20 -0.32768000000000000000e5
-1472 1 13 28 -0.13107200000000000000e6
-1472 1 20 35 -0.65536000000000000000e5
-1472 1 25 32 0.13107200000000000000e6
-1472 2 6 20 0.32768000000000000000e5
-1472 2 14 20 -0.32768000000000000000e5
-1472 3 2 31 0.65536000000000000000e5
-1472 3 5 30 0.32768000000000000000e5
-1472 3 6 19 0.32768000000000000000e5
-1472 3 6 35 -0.65536000000000000000e5
-1472 3 16 29 0.32768000000000000000e5
-1472 3 17 30 0.65536000000000000000e5
-1472 3 18 23 0.13107200000000000000e6
-1472 3 18 31 0.65536000000000000000e5
-1472 3 22 27 0.32768000000000000000e5
-1472 4 4 19 0.32768000000000000000e5
-1472 4 6 18 -0.32768000000000000000e5
-1472 4 8 20 0.65536000000000000000e5
-1472 4 12 16 0.65536000000000000000e5
-1472 4 14 18 0.32768000000000000000e5
-1473 1 1 8 0.16384000000000000000e5
-1473 1 2 9 0.81920000000000000000e4
-1473 1 4 11 -0.32768000000000000000e5
-1473 1 5 12 -0.16384000000000000000e5
-1473 1 5 20 -0.16384000000000000000e5
-1473 1 6 21 -0.49152000000000000000e5
-1473 1 7 10 -0.32768000000000000000e5
-1473 1 9 16 -0.81920000000000000000e4
-1473 1 12 19 0.16384000000000000000e5
-1473 1 12 27 -0.16384000000000000000e5
-1473 1 13 20 0.65536000000000000000e5
-1473 2 1 7 0.81920000000000000000e4
-1473 2 1 15 0.81920000000000000000e4
-1473 2 2 16 -0.16384000000000000000e5
-1473 2 3 9 -0.16384000000000000000e5
-1473 2 6 12 -0.16384000000000000000e5
-1473 2 8 14 -0.32768000000000000000e5
-1473 3 1 6 0.81920000000000000000e4
-1473 3 1 14 -0.32768000000000000000e5
-1473 3 2 7 0.16384000000000000000e5
-1473 3 2 15 0.65536000000000000000e5
-1473 3 5 10 -0.32768000000000000000e5
-1473 3 8 21 -0.16384000000000000000e5
-1473 4 1 5 0.81920000000000000000e4
-1473 4 4 8 -0.16384000000000000000e5
-1473 4 5 5 0.32768000000000000000e5
-1473 4 5 9 -0.32768000000000000000e5
-1474 1 1 8 0.16384000000000000000e5
-1474 1 2 9 0.16384000000000000000e5
-1474 1 4 11 -0.32768000000000000000e5
-1474 1 5 12 -0.32768000000000000000e5
-1474 1 5 20 -0.16384000000000000000e5
-1474 1 6 21 -0.32768000000000000000e5
-1474 1 8 23 0.65536000000000000000e5
-1474 1 9 16 -0.16384000000000000000e5
-1474 1 12 19 0.32768000000000000000e5
-1474 1 12 27 -0.32768000000000000000e5
-1474 2 1 7 0.16384000000000000000e5
-1474 2 3 9 -0.32768000000000000000e5
-1474 2 6 12 -0.16384000000000000000e5
-1474 3 1 14 -0.13107200000000000000e6
-1474 3 2 7 0.16384000000000000000e5
-1474 3 2 15 0.13107200000000000000e6
-1474 3 5 10 -0.65536000000000000000e5
-1474 3 8 21 -0.32768000000000000000e5
-1474 4 4 8 -0.32768000000000000000e5
-1474 4 5 6 0.32768000000000000000e5
-1474 4 5 9 -0.65536000000000000000e5
-1475 1 7 22 -0.32768000000000000000e5
-1475 1 8 23 0.65536000000000000000e5
-1475 1 11 26 -0.32768000000000000000e5
-1475 1 12 27 -0.32768000000000000000e5
-1475 2 3 9 -0.32768000000000000000e5
-1475 3 7 20 -0.32768000000000000000e5
-1475 3 8 21 -0.32768000000000000000e5
-1475 4 5 7 0.32768000000000000000e5
-1476 2 6 8 -0.32768000000000000000e5
-1476 2 8 14 0.32768000000000000000e5
-1476 4 5 8 0.32768000000000000000e5
-1477 4 5 10 0.32768000000000000000e5
-1477 4 8 8 -0.65536000000000000000e5
-1478 2 1 15 -0.32768000000000000000e5
-1478 2 1 19 0.32768000000000000000e5
-1478 4 5 11 0.32768000000000000000e5
-1479 4 2 14 -0.32768000000000000000e5
-1479 4 5 12 0.32768000000000000000e5
-1480 4 5 13 0.32768000000000000000e5
-1480 4 7 11 -0.32768000000000000000e5
-1481 2 2 16 -0.32768000000000000000e5
-1481 2 5 19 0.32768000000000000000e5
-1481 4 5 14 0.32768000000000000000e5
-1482 4 5 15 0.32768000000000000000e5
-1482 4 8 12 -0.32768000000000000000e5
-1483 1 6 21 0.16384000000000000000e5
-1483 1 7 22 0.32768000000000000000e5
-1483 1 16 23 -0.16384000000000000000e5
-1483 1 17 24 -0.32768000000000000000e5
-1483 2 2 16 0.16384000000000000000e5
-1483 2 5 19 -0.16384000000000000000e5
-1483 3 7 20 0.32768000000000000000e5
-1483 3 8 21 0.16384000000000000000e5
-1483 3 10 23 -0.65536000000000000000e5
-1483 3 13 18 0.32768000000000000000e5
-1483 4 5 16 0.32768000000000000000e5
-1483 4 8 12 0.16384000000000000000e5
-1484 1 3 34 -0.32768000000000000000e5
-1484 1 5 20 0.32768000000000000000e5
-1484 3 1 30 0.32768000000000000000e5
-1484 3 2 31 -0.65536000000000000000e5
-1484 3 6 19 -0.32768000000000000000e5
-1484 3 17 22 0.32768000000000000000e5
-1484 4 5 18 0.32768000000000000000e5
-1485 1 11 26 0.32768000000000000000e5
-1485 1 16 31 -0.32768000000000000000e5
-1485 3 2 31 0.32768000000000000000e5
-1485 3 13 26 -0.65536000000000000000e5
-1485 3 18 23 0.32768000000000000000e5
-1485 4 5 19 0.32768000000000000000e5
-1486 2 6 20 -0.32768000000000000000e5
-1486 2 14 20 0.32768000000000000000e5
-1486 4 5 20 0.32768000000000000000e5
-1487 1 7 22 -0.16384000000000000000e5
-1487 1 8 23 0.32768000000000000000e5
-1487 1 11 26 -0.16384000000000000000e5
-1487 1 12 27 -0.16384000000000000000e5
-1487 2 3 9 -0.16384000000000000000e5
-1487 3 7 20 -0.16384000000000000000e5
-1487 3 8 21 -0.16384000000000000000e5
-1487 4 6 6 0.32768000000000000000e5
-1488 4 4 8 -0.32768000000000000000e5
-1488 4 6 7 0.32768000000000000000e5
-1489 4 5 9 -0.32768000000000000000e5
-1489 4 6 8 0.32768000000000000000e5
-1490 1 8 23 -0.32768000000000000000e5
-1490 1 9 24 -0.32768000000000000000e5
-1490 1 13 28 -0.32768000000000000000e5
-1490 1 14 21 0.65536000000000000000e5
-1490 2 4 10 -0.32768000000000000000e5
-1490 3 13 18 -0.32768000000000000000e5
-1490 4 6 9 0.32768000000000000000e5
-1491 4 2 14 -0.32768000000000000000e5
-1491 4 6 11 0.32768000000000000000e5
-1492 4 6 12 0.32768000000000000000e5
-1492 4 7 11 -0.32768000000000000000e5
-1493 4 3 15 -0.32768000000000000000e5
-1493 4 6 13 0.32768000000000000000e5
-1494 4 6 14 0.32768000000000000000e5
-1494 4 8 12 -0.32768000000000000000e5
-1495 1 7 22 0.32768000000000000000e5
-1495 1 17 24 -0.32768000000000000000e5
-1495 3 4 25 0.65536000000000000000e5
-1495 3 9 22 -0.32768000000000000000e5
-1495 3 13 18 -0.65536000000000000000e5
-1495 4 4 16 -0.32768000000000000000e5
-1495 4 6 15 0.32768000000000000000e5
-1496 1 7 22 0.16384000000000000000e5
-1496 1 14 21 -0.65536000000000000000e5
-1496 1 14 29 0.65536000000000000000e5
-1496 1 17 24 -0.16384000000000000000e5
-1496 3 4 25 0.32768000000000000000e5
-1496 3 7 20 0.16384000000000000000e5
-1496 3 8 21 0.16384000000000000000e5
-1496 3 13 18 0.32768000000000000000e5
-1496 4 6 16 0.32768000000000000000e5
-1496 4 8 12 0.16384000000000000000e5
-1497 1 3 34 -0.32768000000000000000e5
-1497 1 5 20 0.32768000000000000000e5
-1497 3 1 30 0.32768000000000000000e5
-1497 3 2 31 -0.65536000000000000000e5
-1497 3 6 19 -0.32768000000000000000e5
-1497 3 17 22 0.32768000000000000000e5
-1497 4 6 17 0.32768000000000000000e5
-1498 4 6 19 0.32768000000000000000e5
-1498 4 12 16 -0.32768000000000000000e5
-1499 4 6 20 0.32768000000000000000e5
-1499 4 14 18 -0.32768000000000000000e5
-1500 1 8 23 -0.32768000000000000000e5
-1500 1 9 24 -0.32768000000000000000e5
-1500 1 13 28 -0.32768000000000000000e5
-1500 1 14 21 0.65536000000000000000e5
-1500 2 4 10 -0.32768000000000000000e5
-1500 3 13 18 -0.32768000000000000000e5
-1500 4 7 8 0.32768000000000000000e5
-1501 1 4 11 0.16384000000000000000e5
-1501 1 5 12 0.16384000000000000000e5
-1501 1 7 22 -0.16384000000000000000e5
-1501 1 8 23 -0.32768000000000000000e5
-1501 1 9 24 -0.32768000000000000000e5
-1501 1 12 19 -0.16384000000000000000e5
-1501 1 13 28 -0.32768000000000000000e5
-1501 1 14 21 0.65536000000000000000e5
-1501 2 4 10 -0.32768000000000000000e5
-1501 3 1 14 0.32768000000000000000e5
-1501 3 2 15 -0.65536000000000000000e5
-1501 3 5 10 0.16384000000000000000e5
-1501 3 5 14 0.32768000000000000000e5
-1501 3 8 13 0.65536000000000000000e5
-1501 3 11 12 -0.65536000000000000000e5
-1501 3 13 18 -0.32768000000000000000e5
-1501 4 4 8 0.16384000000000000000e5
-1501 4 5 9 0.32768000000000000000e5
-1501 4 7 9 0.32768000000000000000e5
-1502 3 8 13 0.32768000000000000000e5
-1502 3 9 14 0.32768000000000000000e5
-1502 3 11 12 0.32768000000000000000e5
-1502 3 12 13 -0.65536000000000000000e5
-1502 4 7 10 0.32768000000000000000e5
-1503 4 3 15 -0.32768000000000000000e5
-1503 4 7 12 0.32768000000000000000e5
-1504 3 4 25 -0.13107200000000000000e6
-1504 3 5 22 0.32768000000000000000e5
-1504 3 6 19 -0.32768000000000000000e5
-1504 3 8 21 0.13107200000000000000e6
-1504 3 9 22 0.65536000000000000000e5
-1504 4 3 15 -0.32768000000000000000e5
-1504 4 4 16 0.65536000000000000000e5
-1504 4 7 13 0.32768000000000000000e5
-1505 1 7 22 0.32768000000000000000e5
-1505 1 17 24 -0.32768000000000000000e5
-1505 3 4 25 0.65536000000000000000e5
-1505 3 9 22 -0.32768000000000000000e5
-1505 3 13 18 -0.65536000000000000000e5
-1505 4 4 16 -0.32768000000000000000e5
-1505 4 7 14 0.32768000000000000000e5
-1506 4 4 16 -0.32768000000000000000e5
-1506 4 7 15 0.32768000000000000000e5
-1507 3 4 25 0.32768000000000000000e5
-1507 3 11 24 -0.65536000000000000000e5
-1507 3 13 18 0.32768000000000000000e5
-1507 3 14 19 0.32768000000000000000e5
-1507 4 7 16 0.32768000000000000000e5
-1508 4 6 18 -0.32768000000000000000e5
-1508 4 7 17 0.32768000000000000000e5
-1509 1 3 34 0.98304000000000000000e5
-1509 1 5 20 -0.32768000000000000000e5
-1509 1 13 28 -0.13107200000000000000e6
-1509 1 20 35 -0.65536000000000000000e5
-1509 1 25 32 0.13107200000000000000e6
-1509 2 6 20 0.32768000000000000000e5
-1509 2 14 20 -0.32768000000000000000e5
-1509 3 2 31 0.65536000000000000000e5
-1509 3 5 30 0.32768000000000000000e5
-1509 3 6 19 0.32768000000000000000e5
-1509 3 6 35 -0.65536000000000000000e5
-1509 3 16 29 0.32768000000000000000e5
-1509 3 17 30 0.65536000000000000000e5
-1509 3 18 23 0.13107200000000000000e6
-1509 3 18 31 0.65536000000000000000e5
-1509 3 22 27 0.32768000000000000000e5
-1509 4 6 18 -0.32768000000000000000e5
-1509 4 7 18 0.32768000000000000000e5
-1509 4 8 20 0.65536000000000000000e5
-1509 4 12 16 0.65536000000000000000e5
-1509 4 14 18 0.32768000000000000000e5
-1510 3 5 34 0.32768000000000000000e5
-1510 3 17 30 0.32768000000000000000e5
-1510 3 18 31 -0.65536000000000000000e5
-1510 3 22 27 0.32768000000000000000e5
-1510 4 7 20 0.32768000000000000000e5
-1511 4 6 10 -0.32768000000000000000e5
-1511 4 8 9 0.32768000000000000000e5
-1512 1 4 11 -0.40960000000000000000e4
-1512 1 5 12 -0.40960000000000000000e4
-1512 1 6 21 0.40960000000000000000e4
-1512 1 7 10 0.81920000000000000000e4
-1512 1 7 22 0.81920000000000000000e4
-1512 1 8 23 0.81920000000000000000e4
-1512 1 11 26 0.40960000000000000000e4
-1512 1 12 19 0.40960000000000000000e4
-1512 1 13 20 -0.16384000000000000000e5
-1512 2 2 16 0.40960000000000000000e4
-1512 2 6 8 0.81920000000000000000e4
-1512 3 2 15 0.49152000000000000000e5
-1512 3 5 10 -0.40960000000000000000e4
-1512 3 7 20 0.40960000000000000000e4
-1512 3 8 13 0.32768000000000000000e5
-1512 3 10 15 -0.65536000000000000000e5
-1512 3 11 12 0.16384000000000000000e5
-1512 3 12 13 0.32768000000000000000e5
-1512 4 4 8 -0.40960000000000000000e4
-1512 4 5 9 -0.81920000000000000000e4
-1512 4 6 10 0.16384000000000000000e5
-1512 4 8 8 0.32768000000000000000e5
-1512 4 8 10 0.32768000000000000000e5
-1513 2 2 16 -0.32768000000000000000e5
-1513 2 5 19 0.32768000000000000000e5
-1513 4 8 11 0.32768000000000000000e5
-1514 1 7 22 0.32768000000000000000e5
-1514 1 17 24 -0.32768000000000000000e5
-1514 3 4 25 0.65536000000000000000e5
-1514 3 9 22 -0.32768000000000000000e5
-1514 3 13 18 -0.65536000000000000000e5
-1514 4 4 16 -0.32768000000000000000e5
-1514 4 8 13 0.32768000000000000000e5
-1515 1 6 21 0.16384000000000000000e5
-1515 1 7 22 0.32768000000000000000e5
-1515 1 16 23 -0.16384000000000000000e5
-1515 1 17 24 -0.32768000000000000000e5
-1515 2 2 16 0.16384000000000000000e5
-1515 2 5 19 -0.16384000000000000000e5
-1515 3 7 20 0.32768000000000000000e5
-1515 3 8 21 0.16384000000000000000e5
-1515 3 10 23 -0.65536000000000000000e5
-1515 3 13 18 0.32768000000000000000e5
-1515 4 8 12 0.16384000000000000000e5
-1515 4 8 14 0.32768000000000000000e5
-1516 1 7 22 0.16384000000000000000e5
-1516 1 14 21 -0.65536000000000000000e5
-1516 1 14 29 0.65536000000000000000e5
-1516 1 17 24 -0.16384000000000000000e5
-1516 3 4 25 0.32768000000000000000e5
-1516 3 7 20 0.16384000000000000000e5
-1516 3 8 21 0.16384000000000000000e5
-1516 3 13 18 0.32768000000000000000e5
-1516 4 8 12 0.16384000000000000000e5
-1516 4 8 15 0.32768000000000000000e5
-1517 4 8 16 0.32768000000000000000e5
-1517 4 10 14 -0.32768000000000000000e5
-1518 1 11 26 0.32768000000000000000e5
-1518 1 16 31 -0.32768000000000000000e5
-1518 3 2 31 0.32768000000000000000e5
-1518 3 13 26 -0.65536000000000000000e5
-1518 3 18 23 0.32768000000000000000e5
-1518 4 8 17 0.32768000000000000000e5
-1519 4 8 18 0.32768000000000000000e5
-1519 4 12 16 -0.32768000000000000000e5
-1520 1 3 34 -0.16384000000000000000e5
-1520 1 13 28 0.32768000000000000000e5
-1520 1 20 35 0.16384000000000000000e5
-1520 1 25 32 -0.32768000000000000000e5
-1520 2 6 20 -0.81920000000000000000e4
-1520 2 14 20 0.81920000000000000000e4
-1520 3 6 35 0.16384000000000000000e5
-1520 3 13 26 0.32768000000000000000e5
-1520 3 14 27 0.32768000000000000000e5
-1520 3 16 29 -0.81920000000000000000e4
-1520 3 17 30 -0.16384000000000000000e5
-1520 3 18 31 -0.16384000000000000000e5
-1520 3 20 25 -0.65536000000000000000e5
-1520 3 22 27 -0.81920000000000000000e4
-1520 4 8 19 0.32768000000000000000e5
-1520 4 8 20 -0.16384000000000000000e5
-1520 4 14 18 -0.81920000000000000000e4
-1521 3 8 13 0.16384000000000000000e5
-1521 3 9 14 0.16384000000000000000e5
-1521 3 11 12 0.16384000000000000000e5
-1521 3 12 13 -0.32768000000000000000e5
-1521 4 9 9 0.32768000000000000000e5
-1522 3 2 15 0.16384000000000000000e5
-1522 3 8 13 0.16384000000000000000e5
-1522 3 9 15 0.32768000000000000000e5
-1522 3 11 12 0.16384000000000000000e5
-1522 3 12 13 0.32768000000000000000e5
-1522 3 13 14 -0.65536000000000000000e5
-1522 4 6 10 0.16384000000000000000e5
-1522 4 9 10 0.32768000000000000000e5
-1523 4 8 12 -0.32768000000000000000e5
-1523 4 9 11 0.32768000000000000000e5
-1524 1 7 22 0.32768000000000000000e5
-1524 1 17 24 -0.32768000000000000000e5
-1524 3 4 25 0.65536000000000000000e5
-1524 3 9 22 -0.32768000000000000000e5
-1524 3 13 18 -0.65536000000000000000e5
-1524 4 4 16 -0.32768000000000000000e5
-1524 4 9 12 0.32768000000000000000e5
-1525 4 4 16 -0.32768000000000000000e5
-1525 4 9 13 0.32768000000000000000e5
-1526 1 7 22 0.16384000000000000000e5
-1526 1 14 21 -0.65536000000000000000e5
-1526 1 14 29 0.65536000000000000000e5
-1526 1 17 24 -0.16384000000000000000e5
-1526 3 4 25 0.32768000000000000000e5
-1526 3 7 20 0.16384000000000000000e5
-1526 3 8 21 0.16384000000000000000e5
-1526 3 13 18 0.32768000000000000000e5
-1526 4 8 12 0.16384000000000000000e5
-1526 4 9 14 0.32768000000000000000e5
-1527 3 4 25 0.32768000000000000000e5
-1527 3 11 24 -0.65536000000000000000e5
-1527 3 13 18 0.32768000000000000000e5
-1527 3 14 19 0.32768000000000000000e5
-1527 4 9 15 0.32768000000000000000e5
-1528 4 9 16 0.32768000000000000000e5
-1528 4 10 15 -0.32768000000000000000e5
-1529 4 9 17 0.32768000000000000000e5
-1529 4 12 16 -0.32768000000000000000e5
-1530 4 7 19 -0.32768000000000000000e5
-1530 4 9 18 0.32768000000000000000e5
-1531 4 9 19 0.32768000000000000000e5
-1531 4 10 18 -0.32768000000000000000e5
-1532 4 9 20 0.32768000000000000000e5
-1532 4 15 19 -0.32768000000000000000e5
-1533 1 6 21 0.16384000000000000000e5
-1533 1 7 22 0.32768000000000000000e5
-1533 1 16 23 -0.16384000000000000000e5
-1533 1 17 24 -0.32768000000000000000e5
-1533 2 2 16 0.16384000000000000000e5
-1533 2 5 19 -0.16384000000000000000e5
-1533 3 7 20 0.32768000000000000000e5
-1533 3 8 21 0.16384000000000000000e5
-1533 3 10 23 -0.65536000000000000000e5
-1533 3 13 18 0.32768000000000000000e5
-1533 4 8 12 0.16384000000000000000e5
-1533 4 10 11 0.32768000000000000000e5
-1534 1 7 22 0.16384000000000000000e5
-1534 1 14 21 -0.65536000000000000000e5
-1534 1 14 29 0.65536000000000000000e5
-1534 1 17 24 -0.16384000000000000000e5
-1534 3 4 25 0.32768000000000000000e5
-1534 3 7 20 0.16384000000000000000e5
-1534 3 8 21 0.16384000000000000000e5
-1534 3 13 18 0.32768000000000000000e5
-1534 4 8 12 0.16384000000000000000e5
-1534 4 10 12 0.32768000000000000000e5
-1535 3 4 25 0.32768000000000000000e5
-1535 3 11 24 -0.65536000000000000000e5
-1535 3 13 18 0.32768000000000000000e5
-1535 3 14 19 0.32768000000000000000e5
-1535 4 10 13 0.32768000000000000000e5
-1536 1 3 34 -0.16384000000000000000e5
-1536 1 13 28 0.32768000000000000000e5
-1536 1 20 35 0.16384000000000000000e5
-1536 1 25 32 -0.32768000000000000000e5
-1536 2 6 20 -0.81920000000000000000e4
-1536 2 14 20 0.81920000000000000000e4
-1536 3 6 35 0.16384000000000000000e5
-1536 3 13 26 0.32768000000000000000e5
-1536 3 14 27 0.32768000000000000000e5
-1536 3 16 29 -0.81920000000000000000e4
-1536 3 17 30 -0.16384000000000000000e5
-1536 3 18 31 -0.16384000000000000000e5
-1536 3 20 25 -0.65536000000000000000e5
-1536 3 22 27 -0.81920000000000000000e4
-1536 4 8 20 -0.16384000000000000000e5
-1536 4 10 17 0.32768000000000000000e5
-1536 4 14 18 -0.81920000000000000000e4
-1537 4 10 19 0.32768000000000000000e5
-1537 4 16 16 -0.65536000000000000000e5
-1538 1 3 34 0.16384000000000000000e5
-1538 1 20 35 -0.16384000000000000000e5
-1538 2 6 20 0.81920000000000000000e4
-1538 2 14 20 -0.81920000000000000000e4
-1538 3 6 35 -0.16384000000000000000e5
-1538 3 13 34 -0.65536000000000000000e5
-1538 3 16 29 0.81920000000000000000e4
-1538 3 17 30 0.16384000000000000000e5
-1538 3 18 31 0.16384000000000000000e5
-1538 3 22 27 0.81920000000000000000e4
-1538 3 22 31 0.32768000000000000000e5
-1538 3 24 29 0.32768000000000000000e5
-1538 4 8 20 0.16384000000000000000e5
-1538 4 10 20 0.32768000000000000000e5
-1538 4 14 18 0.81920000000000000000e4
-1539 1 1 32 0.32768000000000000000e5
-1539 1 2 33 0.32768000000000000000e5
-1539 1 4 35 0.32768000000000000000e5
-1539 1 16 31 -0.13107200000000000000e6
-1539 1 20 27 0.13107200000000000000e6
-1539 2 3 17 -0.32768000000000000000e5
-1539 2 6 12 0.65536000000000000000e5
-1539 2 11 17 0.32768000000000000000e5
-1539 2 12 18 0.32768000000000000000e5
-1539 3 3 32 -0.32768000000000000000e5
-1539 3 4 33 -0.32768000000000000000e5
-1539 3 17 30 0.65536000000000000000e5
-1539 4 2 14 -0.65536000000000000000e5
-1539 4 5 17 -0.65536000000000000000e5
-1539 4 11 12 0.32768000000000000000e5
-1539 4 13 17 -0.32768000000000000000e5
-1540 1 3 18 0.32768000000000000000e5
-1540 1 4 27 0.32768000000000000000e5
-1540 1 4 35 0.32768000000000000000e5
-1540 1 5 20 -0.65536000000000000000e5
-1540 1 9 16 -0.65536000000000000000e5
-1540 1 20 27 0.65536000000000000000e5
-1540 2 12 18 0.32768000000000000000e5
-1540 3 1 30 0.65536000000000000000e5
-1540 3 3 16 0.32768000000000000000e5
-1540 3 3 32 -0.32768000000000000000e5
-1540 3 4 17 0.32768000000000000000e5
-1540 3 4 33 -0.32768000000000000000e5
-1540 3 5 26 0.32768000000000000000e5
-1540 3 6 19 0.65536000000000000000e5
-1540 3 17 30 0.65536000000000000000e5
-1540 4 1 13 0.32768000000000000000e5
-1540 4 11 13 0.32768000000000000000e5
-1540 4 13 17 -0.32768000000000000000e5
-1541 4 5 17 -0.32768000000000000000e5
-1541 4 11 14 0.32768000000000000000e5
-1542 1 3 34 -0.32768000000000000000e5
-1542 1 5 20 0.32768000000000000000e5
-1542 3 1 30 0.32768000000000000000e5
-1542 3 2 31 -0.65536000000000000000e5
-1542 3 6 19 -0.32768000000000000000e5
-1542 3 17 22 0.32768000000000000000e5
-1542 4 11 15 0.32768000000000000000e5
-1543 1 11 26 0.32768000000000000000e5
-1543 1 16 31 -0.32768000000000000000e5
-1543 3 2 31 0.32768000000000000000e5
-1543 3 13 26 -0.65536000000000000000e5
-1543 3 18 23 0.32768000000000000000e5
-1543 4 11 16 0.32768000000000000000e5
-1544 1 1 32 -0.32768000000000000000e5
-1544 1 2 33 -0.32768000000000000000e5
-1544 1 4 35 -0.32768000000000000000e5
-1544 1 16 31 0.13107200000000000000e6
-1544 1 20 27 -0.13107200000000000000e6
-1544 2 6 12 -0.65536000000000000000e5
-1544 2 11 17 -0.32768000000000000000e5
-1544 2 12 18 -0.32768000000000000000e5
-1544 2 17 17 0.65536000000000000000e5
-1544 3 3 32 0.32768000000000000000e5
-1544 3 4 33 0.32768000000000000000e5
-1544 3 17 30 -0.65536000000000000000e5
-1544 4 2 14 0.65536000000000000000e5
-1544 4 5 17 0.65536000000000000000e5
-1544 4 11 17 0.32768000000000000000e5
-1544 4 13 17 0.32768000000000000000e5
-1545 1 2 33 0.32768000000000000000e5
-1545 1 3 34 -0.65536000000000000000e5
-1545 1 17 32 -0.32768000000000000000e5
-1545 1 20 35 0.65536000000000000000e5
-1545 3 4 33 -0.32768000000000000000e5
-1545 3 6 35 0.65536000000000000000e5
-1545 3 17 30 0.65536000000000000000e5
-1545 4 11 18 0.32768000000000000000e5
-1545 4 13 17 -0.32768000000000000000e5
-1546 2 6 20 -0.32768000000000000000e5
-1546 2 14 20 0.32768000000000000000e5
-1546 4 11 19 0.32768000000000000000e5
-1547 4 11 20 0.32768000000000000000e5
-1547 4 17 17 -0.65536000000000000000e5
-1548 1 3 18 0.16384000000000000000e5
-1548 1 4 27 0.16384000000000000000e5
-1548 1 4 35 0.16384000000000000000e5
-1548 1 5 20 -0.32768000000000000000e5
-1548 1 9 16 -0.32768000000000000000e5
-1548 1 20 27 0.32768000000000000000e5
-1548 2 12 18 0.16384000000000000000e5
-1548 3 1 30 0.32768000000000000000e5
-1548 3 3 16 0.16384000000000000000e5
-1548 3 3 32 -0.16384000000000000000e5
-1548 3 4 17 0.16384000000000000000e5
-1548 3 4 33 -0.16384000000000000000e5
-1548 3 5 26 0.16384000000000000000e5
-1548 3 6 19 0.32768000000000000000e5
-1548 3 17 30 0.32768000000000000000e5
-1548 4 1 13 0.16384000000000000000e5
-1548 4 12 12 0.32768000000000000000e5
-1548 4 13 17 -0.16384000000000000000e5
-1549 1 2 33 0.32768000000000000000e5
-1549 1 3 34 -0.65536000000000000000e5
-1549 1 4 27 0.32768000000000000000e5
-1549 1 4 35 0.32768000000000000000e5
-1549 2 12 18 0.32768000000000000000e5
-1549 3 3 32 -0.32768000000000000000e5
-1549 3 4 33 -0.32768000000000000000e5
-1549 3 5 26 0.32768000000000000000e5
-1549 3 17 22 -0.65536000000000000000e5
-1549 3 17 30 0.65536000000000000000e5
-1549 3 18 19 0.32768000000000000000e5
-1549 4 12 13 0.32768000000000000000e5
-1549 4 13 17 -0.32768000000000000000e5
-1550 1 3 34 -0.32768000000000000000e5
-1550 1 5 20 0.32768000000000000000e5
-1550 3 1 30 0.32768000000000000000e5
-1550 3 2 31 -0.65536000000000000000e5
-1550 3 6 19 -0.32768000000000000000e5
-1550 3 17 22 0.32768000000000000000e5
-1550 4 12 14 0.32768000000000000000e5
-1551 4 6 18 -0.32768000000000000000e5
-1551 4 12 15 0.32768000000000000000e5
-1552 1 2 33 0.32768000000000000000e5
-1552 1 3 34 -0.65536000000000000000e5
-1552 1 17 32 -0.32768000000000000000e5
-1552 1 20 35 0.65536000000000000000e5
-1552 3 4 33 -0.32768000000000000000e5
-1552 3 6 35 0.65536000000000000000e5
-1552 3 17 30 0.65536000000000000000e5
-1552 4 12 17 0.32768000000000000000e5
-1552 4 13 17 -0.32768000000000000000e5
-1553 4 12 18 0.32768000000000000000e5
-1553 4 13 17 -0.32768000000000000000e5
-1554 4 12 19 0.32768000000000000000e5
-1554 4 14 18 -0.32768000000000000000e5
-1555 1 2 33 -0.32768000000000000000e5
-1555 1 3 34 0.65536000000000000000e5
-1555 1 4 27 -0.32768000000000000000e5
-1555 1 4 35 -0.32768000000000000000e5
-1555 2 4 18 -0.32768000000000000000e5
-1555 2 12 18 -0.32768000000000000000e5
-1555 2 18 20 0.32768000000000000000e5
-1555 3 3 32 0.32768000000000000000e5
-1555 3 4 33 0.32768000000000000000e5
-1555 3 5 26 -0.32768000000000000000e5
-1555 3 17 22 0.65536000000000000000e5
-1555 3 17 30 -0.65536000000000000000e5
-1555 3 18 19 -0.32768000000000000000e5
-1555 4 12 20 0.32768000000000000000e5
-1555 4 13 17 0.65536000000000000000e5
-1556 4 6 18 -0.32768000000000000000e5
-1556 4 13 14 0.32768000000000000000e5
-1557 1 3 34 0.98304000000000000000e5
-1557 1 5 20 -0.32768000000000000000e5
-1557 1 13 28 -0.13107200000000000000e6
-1557 1 20 35 -0.65536000000000000000e5
-1557 1 25 32 0.13107200000000000000e6
-1557 2 6 20 0.32768000000000000000e5
-1557 2 14 20 -0.32768000000000000000e5
-1557 3 2 31 0.65536000000000000000e5
-1557 3 5 30 0.32768000000000000000e5
-1557 3 6 19 0.32768000000000000000e5
-1557 3 6 35 -0.65536000000000000000e5
-1557 3 16 29 0.32768000000000000000e5
-1557 3 17 30 0.65536000000000000000e5
-1557 3 18 23 0.13107200000000000000e6
-1557 3 18 31 0.65536000000000000000e5
-1557 3 22 27 0.32768000000000000000e5
-1557 4 6 18 -0.32768000000000000000e5
-1557 4 8 20 0.65536000000000000000e5
-1557 4 12 16 0.65536000000000000000e5
-1557 4 13 15 0.32768000000000000000e5
-1557 4 14 18 0.32768000000000000000e5
-1558 4 7 19 -0.32768000000000000000e5
-1558 4 13 16 0.32768000000000000000e5
-1559 4 4 20 -0.32768000000000000000e5
-1559 4 13 18 0.32768000000000000000e5
-1560 3 5 34 0.32768000000000000000e5
-1560 3 17 30 0.32768000000000000000e5
-1560 3 18 31 -0.65536000000000000000e5
-1560 3 22 27 0.32768000000000000000e5
-1560 4 13 19 0.32768000000000000000e5
-1561 4 13 20 0.32768000000000000000e5
-1561 4 18 18 -0.65536000000000000000e5
-1562 1 11 26 0.16384000000000000000e5
-1562 1 16 31 -0.16384000000000000000e5
-1562 3 2 31 0.16384000000000000000e5
-1562 3 13 26 -0.32768000000000000000e5
-1562 3 18 23 0.16384000000000000000e5
-1562 4 14 14 0.32768000000000000000e5
-1563 4 12 16 -0.32768000000000000000e5
-1563 4 14 15 0.32768000000000000000e5
-1564 1 3 34 -0.16384000000000000000e5
-1564 1 13 28 0.32768000000000000000e5
-1564 1 20 35 0.16384000000000000000e5
-1564 1 25 32 -0.32768000000000000000e5
-1564 2 6 20 -0.81920000000000000000e4
-1564 2 14 20 0.81920000000000000000e4
-1564 3 6 35 0.16384000000000000000e5
-1564 3 13 26 0.32768000000000000000e5
-1564 3 14 27 0.32768000000000000000e5
-1564 3 16 29 -0.81920000000000000000e4
-1564 3 17 30 -0.16384000000000000000e5
-1564 3 18 31 -0.16384000000000000000e5
-1564 3 20 25 -0.65536000000000000000e5
-1564 3 22 27 -0.81920000000000000000e4
-1564 4 8 20 -0.16384000000000000000e5
-1564 4 14 16 0.32768000000000000000e5
-1564 4 14 18 -0.81920000000000000000e4
-1565 2 6 20 -0.32768000000000000000e5
-1565 2 14 20 0.32768000000000000000e5
-1565 4 14 17 0.32768000000000000000e5
-1566 4 8 20 -0.32768000000000000000e5
-1566 4 14 19 0.32768000000000000000e5
-1567 1 19 34 0.32768000000000000000e5
-1567 1 30 33 -0.32768000000000000000e5
-1567 3 6 35 0.32768000000000000000e5
-1567 3 20 33 0.32768000000000000000e5
-1567 3 26 31 -0.65536000000000000000e5
-1567 4 14 20 0.32768000000000000000e5
-1568 4 7 19 -0.16384000000000000000e5
-1568 4 15 15 0.32768000000000000000e5
-1569 4 10 18 -0.32768000000000000000e5
-1569 4 15 16 0.32768000000000000000e5
-1570 4 14 18 -0.32768000000000000000e5
-1570 4 15 17 0.32768000000000000000e5
-1571 3 5 34 0.32768000000000000000e5
-1571 3 17 30 0.32768000000000000000e5
-1571 3 18 31 -0.65536000000000000000e5
-1571 3 22 27 0.32768000000000000000e5
-1571 4 15 18 0.32768000000000000000e5
-1572 1 19 34 0.32768000000000000000e5
-1572 1 30 33 -0.32768000000000000000e5
-1572 3 19 34 0.32768000000000000000e5
-1572 3 20 33 0.32768000000000000000e5
-1572 3 21 34 -0.65536000000000000000e5
-1572 4 15 20 0.32768000000000000000e5
-1573 4 8 20 -0.32768000000000000000e5
-1573 4 16 17 0.32768000000000000000e5
-1574 4 15 19 -0.32768000000000000000e5
-1574 4 16 18 0.32768000000000000000e5
-1575 1 3 34 0.16384000000000000000e5
-1575 1 20 35 -0.16384000000000000000e5
-1575 2 6 20 0.81920000000000000000e4
-1575 2 14 20 -0.81920000000000000000e4
-1575 3 6 35 -0.16384000000000000000e5
-1575 3 13 34 -0.65536000000000000000e5
-1575 3 16 29 0.81920000000000000000e4
-1575 3 17 30 0.16384000000000000000e5
-1575 3 18 31 0.16384000000000000000e5
-1575 3 22 27 0.81920000000000000000e4
-1575 3 22 31 0.32768000000000000000e5
-1575 3 24 29 0.32768000000000000000e5
-1575 4 8 20 0.16384000000000000000e5
-1575 4 14 18 0.81920000000000000000e4
-1575 4 16 19 0.32768000000000000000e5
-1576 1 2 33 -0.32768000000000000000e5
-1576 1 3 34 0.65536000000000000000e5
-1576 1 4 27 -0.32768000000000000000e5
-1576 1 4 35 -0.32768000000000000000e5
-1576 2 4 18 -0.32768000000000000000e5
-1576 2 12 18 -0.32768000000000000000e5
-1576 2 18 20 0.32768000000000000000e5
-1576 3 3 32 0.32768000000000000000e5
-1576 3 4 33 0.32768000000000000000e5
-1576 3 5 26 -0.32768000000000000000e5
-1576 3 17 22 0.65536000000000000000e5
-1576 3 17 30 -0.65536000000000000000e5
-1576 3 18 19 -0.32768000000000000000e5
-1576 4 13 17 0.65536000000000000000e5
-1576 4 17 18 0.32768000000000000000e5
-1577 1 19 34 0.32768000000000000000e5
-1577 1 30 33 -0.32768000000000000000e5
-1577 3 6 35 0.32768000000000000000e5
-1577 3 20 33 0.32768000000000000000e5
-1577 3 26 31 -0.65536000000000000000e5
-1577 4 17 19 0.32768000000000000000e5
-1578 2 18 20 -0.32768000000000000000e5
-1578 2 20 20 0.65536000000000000000e5
-1578 4 17 20 0.32768000000000000000e5
-1579 1 19 34 0.32768000000000000000e5
-1579 1 30 33 -0.32768000000000000000e5
-1579 3 19 34 0.32768000000000000000e5
-1579 3 20 33 0.32768000000000000000e5
-1579 3 21 34 -0.65536000000000000000e5
-1579 4 18 19 0.32768000000000000000e5
-1580 1 3 34 -0.65536000000000000000e5
-1580 1 4 27 -0.32768000000000000000e5
-1580 1 4 35 -0.32768000000000000000e5
-1580 1 17 24 0.13107200000000000000e6
-1580 1 20 27 -0.65536000000000000000e5
-1580 1 28 35 -0.32768000000000000000e5
-1580 1 30 33 -0.65536000000000000000e5
-1580 1 33 34 0.65536000000000000000e5
-1580 2 4 18 -0.32768000000000000000e5
-1580 2 6 20 -0.65536000000000000000e5
-1580 3 2 31 -0.13107200000000000000e6
-1580 3 3 32 0.32768000000000000000e5
-1580 3 5 26 -0.32768000000000000000e5
-1580 3 17 22 0.65536000000000000000e5
-1580 3 17 30 -0.65536000000000000000e5
-1580 3 18 19 -0.32768000000000000000e5
-1580 3 19 32 -0.32768000000000000000e5
-1580 3 27 32 0.32768000000000000000e5
-1580 3 28 33 0.32768000000000000000e5
-1580 4 13 17 0.32768000000000000000e5
-1580 4 18 20 0.32768000000000000000e5
-1581 4 16 20 -0.16384000000000000000e5
-1581 4 19 19 0.32768000000000000000e5
-1582 1 30 33 0.32768000000000000000e5
-1582 1 33 34 -0.32768000000000000000e5
-1582 3 20 35 0.32768000000000000000e5
-1582 3 22 35 0.32768000000000000000e5
-1582 3 29 34 -0.65536000000000000000e5
-1582 4 19 20 0.32768000000000000000e5
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-2945
-4
-56 35 35 20
-0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.32768000000000000000e6 0.0 -0.13107200000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 -0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 -0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 -0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.19660800000000000000e6 -0.32768000000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 -0.52428800000000000000e6 0.0 0.19660800000000000000e6 0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.19660800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.19660800000000000000e6 0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.19660800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.10485760000000000000e7 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 -0.10485760000000000000e7 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.19660800000000000000e6 0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.32768000000000000000e6 0.0 0.0 -0.19660800000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 -0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.12451840000000000000e7 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.12451840000000000000e7 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 -0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.26214400000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0
-0 1 1 8 -0.32768000000000000000e5
-0 1 1 40 0.16384000000000000000e5
-0 1 2 5 -0.16384000000000000000e5
-0 1 2 9 0.32768000000000000000e5
-0 1 7 22 0.32768000000000000000e5
-0 1 7 38 0.32768000000000000000e5
-0 1 8 23 -0.65536000000000000000e5
-0 2 1 1 -0.32768000000000000000e5
-0 3 1 16 -0.16384000000000000000e5
-0 3 2 3 -0.16384000000000000000e5
-0 3 3 16 -0.16384000000000000000e5
-0 3 4 17 -0.16384000000000000000e5
-0 3 6 19 -0.32768000000000000000e5
-0 3 7 20 0.65536000000000000000e5
-0 4 1 1 0.32768000000000000000e5
-0 4 1 13 -0.16384000000000000000e5
-0 4 2 2 -0.32768000000000000000e5
-0 4 2 14 -0.32768000000000000000e5
-1 1 1 48 -0.16384000000000000000e5
-1 1 2 49 -0.16384000000000000000e5
-1 1 3 50 -0.32768000000000000000e5
-1 1 11 42 0.65536000000000000000e5
-1 1 12 43 0.13107200000000000000e6
-1 1 17 48 -0.13107200000000000000e6
-1 1 23 38 -0.16384000000000000000e5
-1 1 24 55 0.32768000000000000000e5
-1 1 28 43 -0.65536000000000000000e5
-1 1 53 56 0.16384000000000000000e5
-1 1 56 56 0.32768000000000000000e5
-1 2 2 32 -0.16384000000000000000e5
-1 2 8 22 0.65536000000000000000e5
-1 2 12 26 -0.65536000000000000000e5
-1 2 16 30 -0.32768000000000000000e5
-1 2 21 35 0.32768000000000000000e5
-1 3 2 31 -0.65536000000000000000e5
-1 3 14 27 -0.13107200000000000000e6
-1 3 17 30 -0.32768000000000000000e5
-1 3 18 31 0.65536000000000000000e5
-1 3 20 33 -0.32768000000000000000e5
-1 3 21 34 0.65536000000000000000e5
-1 3 22 35 0.32768000000000000000e5
-1 3 30 35 0.32768000000000000000e5
-1 3 34 35 0.32768000000000000000e5
-1 4 4 16 -0.65536000000000000000e5
-2 1 1 48 0.81920000000000000000e4
-2 1 2 49 0.81920000000000000000e4
-2 1 3 50 0.16384000000000000000e5
-2 1 11 42 -0.32768000000000000000e5
-2 1 12 43 -0.65536000000000000000e5
-2 1 17 48 0.65536000000000000000e5
-2 1 23 38 0.81920000000000000000e4
-2 1 24 55 -0.16384000000000000000e5
-2 1 28 43 0.32768000000000000000e5
-2 1 52 53 -0.32768000000000000000e5
-2 1 55 56 0.16384000000000000000e5
-2 2 2 32 0.81920000000000000000e4
-2 2 8 22 -0.32768000000000000000e5
-2 2 12 26 0.32768000000000000000e5
-2 2 16 30 0.16384000000000000000e5
-2 2 21 35 -0.16384000000000000000e5
-2 3 2 31 0.32768000000000000000e5
-2 3 14 27 0.65536000000000000000e5
-2 3 17 30 0.16384000000000000000e5
-2 3 18 31 -0.32768000000000000000e5
-2 3 20 33 0.16384000000000000000e5
-2 3 21 34 -0.32768000000000000000e5
-2 3 22 35 -0.16384000000000000000e5
-2 3 30 35 -0.16384000000000000000e5
-2 3 34 35 -0.16384000000000000000e5
-2 4 4 16 0.32768000000000000000e5
-3 1 1 48 0.16384000000000000000e5
-3 1 2 49 0.16384000000000000000e5
-3 1 3 50 0.32768000000000000000e5
-3 1 11 42 -0.65536000000000000000e5
-3 1 12 43 -0.13107200000000000000e6
-3 1 17 48 0.13107200000000000000e6
-3 1 23 38 0.16384000000000000000e5
-3 1 24 55 -0.32768000000000000000e5
-3 1 28 43 0.65536000000000000000e5
-3 1 41 56 -0.32768000000000000000e5
-3 1 49 56 -0.16384000000000000000e5
-3 1 53 54 -0.16384000000000000000e5
-3 1 53 56 0.16384000000000000000e5
-3 2 2 32 0.16384000000000000000e5
-3 2 8 22 -0.65536000000000000000e5
-3 2 12 26 0.65536000000000000000e5
-3 2 16 30 0.32768000000000000000e5
-3 2 21 35 -0.32768000000000000000e5
-3 2 35 35 -0.32768000000000000000e5
-3 3 2 31 0.65536000000000000000e5
-3 3 14 27 0.13107200000000000000e6
-3 3 17 30 0.32768000000000000000e5
-3 3 18 31 -0.65536000000000000000e5
-3 3 20 33 0.32768000000000000000e5
-3 3 21 34 -0.65536000000000000000e5
-3 3 22 35 -0.32768000000000000000e5
-3 3 30 35 -0.32768000000000000000e5
-3 3 34 35 -0.32768000000000000000e5
-3 4 4 16 0.65536000000000000000e5
-4 1 1 48 0.81920000000000000000e4
-4 1 2 49 0.81920000000000000000e4
-4 1 3 50 0.16384000000000000000e5
-4 1 11 42 -0.32768000000000000000e5
-4 1 12 43 -0.65536000000000000000e5
-4 1 17 48 0.65536000000000000000e5
-4 1 23 38 0.81920000000000000000e4
-4 1 24 55 -0.16384000000000000000e5
-4 1 28 43 0.32768000000000000000e5
-4 1 50 51 -0.32768000000000000000e5
-4 1 54 55 0.16384000000000000000e5
-4 2 2 32 0.81920000000000000000e4
-4 2 8 22 -0.32768000000000000000e5
-4 2 12 26 0.32768000000000000000e5
-4 2 16 30 0.16384000000000000000e5
-4 2 21 35 -0.16384000000000000000e5
-4 3 2 31 0.32768000000000000000e5
-4 3 14 27 0.65536000000000000000e5
-4 3 17 30 0.16384000000000000000e5
-4 3 18 31 -0.32768000000000000000e5
-4 3 20 33 0.16384000000000000000e5
-4 3 21 34 -0.32768000000000000000e5
-4 3 22 35 -0.16384000000000000000e5
-4 3 30 35 -0.16384000000000000000e5
-4 4 4 16 0.32768000000000000000e5
-5 1 1 48 0.81920000000000000000e4
-5 1 2 49 0.81920000000000000000e4
-5 1 3 50 0.16384000000000000000e5
-5 1 11 42 -0.32768000000000000000e5
-5 1 12 43 -0.65536000000000000000e5
-5 1 17 48 0.65536000000000000000e5
-5 1 23 38 0.81920000000000000000e4
-5 1 24 55 -0.16384000000000000000e5
-5 1 41 56 0.16384000000000000000e5
-5 2 2 32 0.81920000000000000000e4
-5 2 8 22 -0.32768000000000000000e5
-5 2 12 26 0.32768000000000000000e5
-5 2 16 30 0.16384000000000000000e5
-5 2 21 35 -0.16384000000000000000e5
-5 3 2 31 0.32768000000000000000e5
-5 3 14 27 0.65536000000000000000e5
-5 3 17 30 0.16384000000000000000e5
-5 3 20 33 0.16384000000000000000e5
-5 3 22 35 -0.16384000000000000000e5
-5 3 29 34 0.32768000000000000000e5
-5 3 30 35 -0.16384000000000000000e5
-5 3 34 35 -0.16384000000000000000e5
-5 4 4 16 0.32768000000000000000e5
-6 1 25 56 0.16384000000000000000e5
-6 1 28 43 -0.65536000000000000000e5
-6 1 37 56 -0.16384000000000000000e5
-6 1 38 53 0.16384000000000000000e5
-6 1 41 56 0.32768000000000000000e5
-6 1 47 50 0.32768000000000000000e5
-6 1 49 56 0.16384000000000000000e5
-6 2 29 35 0.32768000000000000000e5
-6 3 18 31 0.65536000000000000000e5
-6 3 21 34 0.65536000000000000000e5
-6 3 29 34 0.65536000000000000000e5
-6 3 32 33 0.16384000000000000000e5
-6 4 20 20 0.32768000000000000000e5
-7 1 1 48 0.16384000000000000000e5
-7 1 2 49 0.16384000000000000000e5
-7 1 3 50 0.32768000000000000000e5
-7 1 11 42 -0.65536000000000000000e5
-7 1 12 43 -0.13107200000000000000e6
-7 1 17 48 0.13107200000000000000e6
-7 1 23 38 0.16384000000000000000e5
-7 1 24 55 -0.32768000000000000000e5
-7 1 47 50 0.32768000000000000000e5
-7 1 47 54 0.16384000000000000000e5
-7 1 53 54 0.16384000000000000000e5
-7 2 2 32 0.16384000000000000000e5
-7 2 8 22 -0.65536000000000000000e5
-7 2 12 26 0.65536000000000000000e5
-7 2 16 30 0.32768000000000000000e5
-7 2 21 35 -0.32768000000000000000e5
-7 2 29 35 0.32768000000000000000e5
-7 3 2 31 0.65536000000000000000e5
-7 3 14 27 0.13107200000000000000e6
-7 3 17 30 0.32768000000000000000e5
-7 3 20 33 0.32768000000000000000e5
-7 3 22 35 -0.32768000000000000000e5
-7 3 29 34 0.65536000000000000000e5
-7 4 4 16 0.65536000000000000000e5
-8 1 1 48 0.16384000000000000000e5
-8 1 2 49 0.16384000000000000000e5
-8 1 3 50 0.32768000000000000000e5
-8 1 11 42 -0.65536000000000000000e5
-8 1 12 43 -0.13107200000000000000e6
-8 1 17 48 0.13107200000000000000e6
-8 1 23 38 0.16384000000000000000e5
-8 1 24 55 -0.32768000000000000000e5
-8 1 28 43 0.65536000000000000000e5
-8 1 37 56 0.16384000000000000000e5
-8 1 47 50 -0.32768000000000000000e5
-8 1 49 56 -0.16384000000000000000e5
-8 1 53 54 -0.16384000000000000000e5
-8 2 2 32 0.16384000000000000000e5
-8 2 8 22 -0.65536000000000000000e5
-8 2 12 26 0.65536000000000000000e5
-8 2 16 30 0.32768000000000000000e5
-8 2 21 35 -0.32768000000000000000e5
-8 2 35 35 -0.32768000000000000000e5
-8 3 2 31 0.65536000000000000000e5
-8 3 14 27 0.13107200000000000000e6
-8 3 17 30 0.32768000000000000000e5
-8 3 18 31 -0.65536000000000000000e5
-8 3 20 33 0.32768000000000000000e5
-8 3 21 34 -0.65536000000000000000e5
-8 3 22 35 -0.32768000000000000000e5
-8 3 30 35 -0.32768000000000000000e5
-8 3 34 35 -0.32768000000000000000e5
-8 4 4 16 0.65536000000000000000e5
-9 1 35 50 -0.32768000000000000000e5
-9 1 46 53 0.16384000000000000000e5
-9 1 52 55 0.16384000000000000000e5
-9 3 25 34 0.32768000000000000000e5
-10 1 44 51 -0.32768000000000000000e5
-10 1 45 56 0.16384000000000000000e5
-10 1 50 51 0.16384000000000000000e5
-11 1 17 48 -0.32768000000000000000e5
-11 1 28 43 0.16384000000000000000e5
-11 1 32 47 0.16384000000000000000e5
-11 1 33 48 0.16384000000000000000e5
-11 1 37 52 -0.16384000000000000000e5
-11 1 43 50 -0.16384000000000000000e5
-11 1 52 53 0.16384000000000000000e5
-11 3 18 31 -0.16384000000000000000e5
-11 3 24 29 0.32768000000000000000e5
-11 3 29 34 -0.16384000000000000000e5
-11 4 16 20 0.16384000000000000000e5
-12 1 1 48 0.81920000000000000000e4
-12 1 2 49 0.81920000000000000000e4
-12 1 3 50 0.16384000000000000000e5
-12 1 11 42 -0.32768000000000000000e5
-12 1 12 43 -0.65536000000000000000e5
-12 1 17 48 0.65536000000000000000e5
-12 1 23 38 0.81920000000000000000e4
-12 1 24 55 -0.16384000000000000000e5
-12 1 28 43 0.32768000000000000000e5
-12 1 43 50 -0.32768000000000000000e5
-12 1 51 54 0.16384000000000000000e5
-12 2 2 32 0.81920000000000000000e4
-12 2 8 22 -0.32768000000000000000e5
-12 2 12 26 0.32768000000000000000e5
-12 2 16 30 0.16384000000000000000e5
-12 2 21 35 -0.16384000000000000000e5
-12 3 2 31 0.32768000000000000000e5
-12 3 14 27 0.65536000000000000000e5
-12 3 17 30 0.16384000000000000000e5
-12 3 18 31 -0.32768000000000000000e5
-12 3 20 33 0.16384000000000000000e5
-12 3 21 34 -0.32768000000000000000e5
-12 3 22 35 -0.16384000000000000000e5
-12 4 4 16 0.32768000000000000000e5
-13 1 47 50 -0.16384000000000000000e5
-13 2 29 35 -0.16384000000000000000e5
-13 3 29 34 -0.32768000000000000000e5
-13 3 30 35 -0.16384000000000000000e5
-14 1 37 52 -0.32768000000000000000e5
-14 1 41 56 0.16384000000000000000e5
-14 1 47 50 0.16384000000000000000e5
-15 1 1 48 -0.16384000000000000000e5
-15 1 2 49 -0.16384000000000000000e5
-15 1 3 50 -0.32768000000000000000e5
-15 1 11 42 0.65536000000000000000e5
-15 1 12 43 0.13107200000000000000e6
-15 1 17 48 -0.13107200000000000000e6
-15 1 23 38 -0.16384000000000000000e5
-15 1 24 55 0.32768000000000000000e5
-15 1 37 56 0.16384000000000000000e5
-15 1 38 53 -0.16384000000000000000e5
-15 1 41 56 -0.32768000000000000000e5
-15 1 47 50 -0.32768000000000000000e5
-15 1 47 54 -0.16384000000000000000e5
-15 2 2 32 -0.16384000000000000000e5
-15 2 8 22 0.65536000000000000000e5
-15 2 12 26 -0.65536000000000000000e5
-15 2 16 30 -0.32768000000000000000e5
-15 2 21 35 0.32768000000000000000e5
-15 2 29 35 -0.32768000000000000000e5
-15 2 33 35 -0.16384000000000000000e5
-15 3 2 31 -0.65536000000000000000e5
-15 3 14 27 -0.13107200000000000000e6
-15 3 17 30 -0.32768000000000000000e5
-15 3 20 33 -0.32768000000000000000e5
-15 3 29 34 -0.65536000000000000000e5
-15 3 30 35 -0.32768000000000000000e5
-15 3 32 33 -0.16384000000000000000e5
-15 4 4 16 -0.65536000000000000000e5
-15 4 20 20 -0.32768000000000000000e5
-16 1 1 48 0.16384000000000000000e5
-16 1 2 49 0.16384000000000000000e5
-16 1 3 50 0.32768000000000000000e5
-16 1 11 42 -0.65536000000000000000e5
-16 1 12 43 -0.13107200000000000000e6
-16 1 17 48 0.13107200000000000000e6
-16 1 23 38 0.16384000000000000000e5
-16 1 24 55 -0.65536000000000000000e5
-16 1 25 56 0.16384000000000000000e5
-16 1 37 56 -0.16384000000000000000e5
-16 1 38 53 0.16384000000000000000e5
-16 1 41 56 0.32768000000000000000e5
-16 1 47 50 0.32768000000000000000e5
-16 1 47 54 0.16384000000000000000e5
-16 2 2 32 0.16384000000000000000e5
-16 2 8 22 -0.65536000000000000000e5
-16 2 12 26 0.65536000000000000000e5
-16 2 16 30 0.32768000000000000000e5
-16 2 21 35 -0.32768000000000000000e5
-16 2 29 35 0.32768000000000000000e5
-16 3 2 31 0.65536000000000000000e5
-16 3 14 27 0.13107200000000000000e6
-16 3 17 30 0.32768000000000000000e5
-16 3 20 33 0.32768000000000000000e5
-16 3 22 35 -0.32768000000000000000e5
-16 3 29 34 0.65536000000000000000e5
-16 3 32 33 0.32768000000000000000e5
-16 4 4 16 0.65536000000000000000e5
-16 4 20 20 0.32768000000000000000e5
-17 1 1 48 0.16384000000000000000e5
-17 1 2 49 0.16384000000000000000e5
-17 1 3 50 0.32768000000000000000e5
-17 1 11 42 -0.65536000000000000000e5
-17 1 12 43 -0.13107200000000000000e6
-17 1 17 48 0.13107200000000000000e6
-17 1 23 38 0.16384000000000000000e5
-17 1 38 53 0.16384000000000000000e5
-17 1 47 54 0.16384000000000000000e5
-17 2 2 32 0.16384000000000000000e5
-17 2 8 22 -0.65536000000000000000e5
-17 2 12 26 0.65536000000000000000e5
-17 2 16 30 0.32768000000000000000e5
-17 3 2 31 0.65536000000000000000e5
-17 3 14 27 0.13107200000000000000e6
-17 3 17 30 0.32768000000000000000e5
-17 3 20 33 0.32768000000000000000e5
-17 4 4 16 0.65536000000000000000e5
-18 1 7 54 -0.32768000000000000000e5
-18 1 37 56 0.16384000000000000000e5
-18 1 38 53 -0.16384000000000000000e5
-18 1 47 50 0.32768000000000000000e5
-18 1 47 54 -0.16384000000000000000e5
-18 2 32 32 -0.32768000000000000000e5
-18 3 6 35 0.32768000000000000000e5
-18 3 32 33 -0.16384000000000000000e5
-19 1 16 55 -0.16384000000000000000e5
-19 1 43 46 -0.16384000000000000000e5
-19 1 46 55 0.16384000000000000000e5
-19 2 31 31 -0.32768000000000000000e5
-19 3 25 34 -0.16384000000000000000e5
-20 1 35 50 -0.32768000000000000000e5
-20 1 44 51 0.16384000000000000000e5
-20 1 51 52 0.16384000000000000000e5
-21 1 16 55 -0.32768000000000000000e5
-21 1 17 48 0.16384000000000000000e5
-21 1 32 47 -0.81920000000000000000e4
-21 1 33 48 -0.81920000000000000000e4
-21 1 37 52 0.81920000000000000000e4
-21 1 43 50 0.81920000000000000000e4
-21 1 46 53 0.16384000000000000000e5
-21 3 21 34 -0.81920000000000000000e4
-21 3 24 29 -0.16384000000000000000e5
-21 4 16 20 -0.81920000000000000000e4
-22 1 33 56 0.16384000000000000000e5
-22 1 34 49 -0.32768000000000000000e5
-22 1 43 50 0.16384000000000000000e5
-23 1 17 48 -0.32768000000000000000e5
-23 1 28 43 0.16384000000000000000e5
-23 1 50 51 0.16384000000000000000e5
-23 3 18 31 -0.16384000000000000000e5
-23 3 21 34 -0.16384000000000000000e5
-23 3 24 29 0.32768000000000000000e5
-24 1 32 47 -0.16384000000000000000e5
-24 1 37 44 -0.16384000000000000000e5
-24 1 37 52 0.16384000000000000000e5
-24 2 20 34 -0.16384000000000000000e5
-24 3 21 34 -0.16384000000000000000e5
-24 3 29 34 -0.16384000000000000000e5
-25 1 1 48 0.81920000000000000000e4
-25 1 2 49 0.81920000000000000000e4
-25 1 3 50 0.16384000000000000000e5
-25 1 11 42 -0.32768000000000000000e5
-25 1 12 43 -0.65536000000000000000e5
-25 1 17 48 0.65536000000000000000e5
-25 1 23 38 0.81920000000000000000e4
-25 1 24 55 -0.16384000000000000000e5
-25 1 28 43 0.32768000000000000000e5
-25 1 33 48 -0.32768000000000000000e5
-25 1 40 55 0.16384000000000000000e5
-25 2 2 32 0.81920000000000000000e4
-25 2 8 22 -0.32768000000000000000e5
-25 2 12 26 0.32768000000000000000e5
-25 2 16 30 0.16384000000000000000e5
-25 2 21 35 -0.16384000000000000000e5
-25 3 2 31 0.32768000000000000000e5
-25 3 14 27 0.65536000000000000000e5
-25 3 17 30 0.16384000000000000000e5
-25 3 18 31 -0.32768000000000000000e5
-25 3 20 33 0.16384000000000000000e5
-25 3 21 34 -0.32768000000000000000e5
-25 4 4 16 0.32768000000000000000e5
-26 1 1 48 0.81920000000000000000e4
-26 1 2 49 0.81920000000000000000e4
-26 1 3 50 0.16384000000000000000e5
-26 1 11 42 -0.32768000000000000000e5
-26 1 12 43 -0.65536000000000000000e5
-26 1 17 48 0.65536000000000000000e5
-26 1 23 38 0.81920000000000000000e4
-26 2 2 32 0.81920000000000000000e4
-26 2 8 22 -0.32768000000000000000e5
-26 2 12 26 0.32768000000000000000e5
-26 2 16 30 0.16384000000000000000e5
-26 2 21 35 -0.16384000000000000000e5
-26 3 2 31 0.32768000000000000000e5
-26 3 14 27 0.65536000000000000000e5
-26 3 17 30 0.16384000000000000000e5
-26 3 20 33 0.16384000000000000000e5
-26 3 21 34 -0.32768000000000000000e5
-26 3 22 35 -0.16384000000000000000e5
-26 4 4 16 0.32768000000000000000e5
-27 1 1 48 -0.16384000000000000000e5
-27 1 2 49 -0.16384000000000000000e5
-27 1 3 50 -0.32768000000000000000e5
-27 1 11 42 0.65536000000000000000e5
-27 1 12 43 0.13107200000000000000e6
-27 1 17 48 -0.13107200000000000000e6
-27 1 23 38 -0.16384000000000000000e5
-27 1 24 55 0.16384000000000000000e5
-27 1 32 47 -0.32768000000000000000e5
-27 1 47 50 -0.16384000000000000000e5
-27 2 2 32 -0.16384000000000000000e5
-27 2 8 22 0.65536000000000000000e5
-27 2 12 26 -0.65536000000000000000e5
-27 2 16 30 -0.32768000000000000000e5
-27 2 21 35 0.16384000000000000000e5
-27 2 29 35 -0.16384000000000000000e5
-27 3 2 31 -0.65536000000000000000e5
-27 3 14 27 -0.13107200000000000000e6
-27 3 17 30 -0.32768000000000000000e5
-27 3 20 33 -0.32768000000000000000e5
-27 3 22 35 0.16384000000000000000e5
-27 3 29 34 -0.32768000000000000000e5
-27 4 4 16 -0.65536000000000000000e5
-28 1 7 54 0.16384000000000000000e5
-28 1 37 44 -0.32768000000000000000e5
-28 1 47 50 0.16384000000000000000e5
-28 3 6 35 -0.16384000000000000000e5
-29 1 24 55 -0.32768000000000000000e5
-29 1 26 41 0.32768000000000000000e5
-29 1 47 54 -0.16384000000000000000e5
-29 2 4 34 0.32768000000000000000e5
-29 2 21 35 -0.32768000000000000000e5
-29 2 33 33 -0.32768000000000000000e5
-29 3 5 34 0.32768000000000000000e5
-29 3 17 30 0.32768000000000000000e5
-29 3 18 31 -0.65536000000000000000e5
-29 3 20 33 0.32768000000000000000e5
-29 3 21 34 -0.65536000000000000000e5
-29 3 22 35 -0.32768000000000000000e5
-29 3 28 33 0.16384000000000000000e5
-29 3 32 33 -0.16384000000000000000e5
-30 1 1 48 -0.16384000000000000000e5
-30 1 2 49 -0.32768000000000000000e5
-30 1 3 50 -0.32768000000000000000e5
-30 1 11 42 0.65536000000000000000e5
-30 1 12 43 0.13107200000000000000e6
-30 1 17 48 -0.13107200000000000000e6
-30 1 23 38 -0.16384000000000000000e5
-30 1 24 39 -0.16384000000000000000e5
-30 1 25 56 0.16384000000000000000e5
-30 1 26 41 -0.32768000000000000000e5
-30 2 2 32 -0.16384000000000000000e5
-30 2 3 33 -0.16384000000000000000e5
-30 2 8 22 0.65536000000000000000e5
-30 2 12 26 -0.65536000000000000000e5
-30 2 16 30 -0.32768000000000000000e5
-30 3 2 31 -0.65536000000000000000e5
-30 3 4 33 -0.16384000000000000000e5
-30 3 14 27 -0.13107200000000000000e6
-30 3 19 32 -0.16384000000000000000e5
-30 3 22 27 0.32768000000000000000e5
-30 4 4 16 -0.65536000000000000000e5
-31 1 1 48 0.16384000000000000000e5
-31 1 2 49 0.16384000000000000000e5
-31 1 3 50 0.32768000000000000000e5
-31 1 11 42 -0.65536000000000000000e5
-31 1 12 43 -0.13107200000000000000e6
-31 1 17 48 0.13107200000000000000e6
-31 1 23 38 0.16384000000000000000e5
-31 1 23 54 0.16384000000000000000e5
-31 1 47 54 0.16384000000000000000e5
-31 2 2 32 0.16384000000000000000e5
-31 2 8 22 -0.65536000000000000000e5
-31 2 12 26 0.65536000000000000000e5
-31 2 16 30 0.32768000000000000000e5
-31 3 2 31 0.65536000000000000000e5
-31 3 14 27 0.13107200000000000000e6
-31 3 17 30 0.32768000000000000000e5
-31 3 32 33 0.16384000000000000000e5
-31 4 4 16 0.65536000000000000000e5
-32 1 22 53 -0.16384000000000000000e5
-32 1 23 54 -0.16384000000000000000e5
-32 1 38 53 0.16384000000000000000e5
-32 2 26 32 -0.16384000000000000000e5
-32 3 6 35 -0.32768000000000000000e5
-33 1 1 48 -0.16384000000000000000e5
-33 1 2 49 -0.16384000000000000000e5
-33 1 22 53 0.16384000000000000000e5
-33 1 23 38 -0.16384000000000000000e5
-33 1 38 53 -0.16384000000000000000e5
-33 1 47 50 0.32768000000000000000e5
-33 1 47 54 -0.16384000000000000000e5
-33 2 2 32 -0.16384000000000000000e5
-33 2 32 32 -0.32768000000000000000e5
-33 3 16 29 0.32768000000000000000e5
-33 3 32 33 -0.16384000000000000000e5
-34 1 16 55 0.81920000000000000000e4
-34 1 19 50 -0.16384000000000000000e5
-34 1 20 51 -0.16384000000000000000e5
-34 1 21 56 0.16384000000000000000e5
-34 1 29 36 -0.16384000000000000000e5
-34 1 35 50 0.81920000000000000000e4
-34 1 43 46 0.81920000000000000000e4
-34 2 25 31 -0.16384000000000000000e5
-34 2 31 31 0.16384000000000000000e5
-34 3 24 25 0.16384000000000000000e5
-35 1 29 36 -0.32768000000000000000e5
-35 1 35 50 0.16384000000000000000e5
-35 1 45 52 0.16384000000000000000e5
-35 3 24 25 0.32768000000000000000e5
-36 1 16 55 0.16384000000000000000e5
-36 1 19 50 -0.32768000000000000000e5
-36 1 35 50 0.16384000000000000000e5
-36 3 25 34 -0.16384000000000000000e5
-37 1 14 45 -0.32768000000000000000e5
-37 1 34 49 0.16384000000000000000e5
-37 1 46 49 0.16384000000000000000e5
-37 3 15 28 0.32768000000000000000e5
-38 1 13 52 -0.32768000000000000000e5
-38 1 17 48 0.16384000000000000000e5
-38 1 44 51 0.16384000000000000000e5
-38 3 24 29 -0.16384000000000000000e5
-39 1 17 48 0.16384000000000000000e5
-39 1 28 43 0.81920000000000000000e4
-39 1 33 48 -0.81920000000000000000e4
-39 1 34 41 -0.32768000000000000000e5
-39 1 37 44 0.81920000000000000000e4
-39 1 37 52 0.81920000000000000000e4
-39 1 43 50 0.81920000000000000000e4
-39 2 20 34 0.81920000000000000000e4
-39 3 18 31 -0.81920000000000000000e4
-39 3 21 34 -0.81920000000000000000e4
-39 3 24 29 -0.16384000000000000000e5
-39 4 16 20 -0.81920000000000000000e4
-40 1 14 45 -0.65536000000000000000e5
-40 1 17 48 0.32768000000000000000e5
-40 1 18 49 0.32768000000000000000e5
-40 1 28 43 -0.16384000000000000000e5
-40 1 33 48 0.16384000000000000000e5
-40 1 43 50 -0.16384000000000000000e5
-40 1 44 51 0.32768000000000000000e5
-40 2 24 30 0.32768000000000000000e5
-40 2 31 33 -0.16384000000000000000e5
-40 3 15 28 0.65536000000000000000e5
-40 3 18 31 0.16384000000000000000e5
-40 3 21 34 0.16384000000000000000e5
-41 1 17 48 -0.32768000000000000000e5
-41 1 28 43 0.16384000000000000000e5
-41 1 43 50 0.16384000000000000000e5
-41 3 18 31 -0.16384000000000000000e5
-42 1 5 52 0.16384000000000000000e5
-42 1 11 42 -0.16384000000000000000e5
-42 1 12 43 -0.32768000000000000000e5
-42 1 28 43 0.16384000000000000000e5
-42 1 32 47 0.16384000000000000000e5
-42 2 12 26 0.16384000000000000000e5
-42 2 20 34 -0.16384000000000000000e5
-42 3 2 31 0.16384000000000000000e5
-42 3 14 27 0.32768000000000000000e5
-42 3 18 31 -0.16384000000000000000e5
-42 3 21 34 -0.16384000000000000000e5
-42 4 7 19 -0.16384000000000000000e5
-42 4 8 20 -0.16384000000000000000e5
-43 1 16 47 -0.32768000000000000000e5
-43 1 37 44 0.16384000000000000000e5
-43 1 37 52 0.16384000000000000000e5
-44 1 5 52 -0.32768000000000000000e5
-44 1 26 41 -0.16384000000000000000e5
-44 1 43 50 0.32768000000000000000e5
-44 2 4 34 -0.16384000000000000000e5
-44 2 21 35 0.16384000000000000000e5
-44 2 28 34 -0.16384000000000000000e5
-44 3 5 34 -0.16384000000000000000e5
-44 3 17 30 -0.16384000000000000000e5
-44 3 18 31 0.32768000000000000000e5
-44 3 20 33 -0.16384000000000000000e5
-44 3 21 34 0.32768000000000000000e5
-45 1 1 48 0.81920000000000000000e4
-45 1 2 49 0.81920000000000000000e4
-45 1 3 50 0.16384000000000000000e5
-45 1 11 42 -0.32768000000000000000e5
-45 1 12 43 -0.65536000000000000000e5
-45 1 17 48 0.65536000000000000000e5
-45 1 23 38 0.81920000000000000000e4
-45 1 24 55 -0.16384000000000000000e5
-45 1 26 41 0.16384000000000000000e5
-45 2 2 32 0.81920000000000000000e4
-45 2 8 22 -0.32768000000000000000e5
-45 2 12 26 0.32768000000000000000e5
-45 2 16 30 0.16384000000000000000e5
-45 2 21 35 -0.16384000000000000000e5
-45 3 2 31 0.32768000000000000000e5
-45 3 14 27 0.65536000000000000000e5
-45 3 17 30 0.16384000000000000000e5
-45 3 18 31 -0.32768000000000000000e5
-45 3 20 33 0.16384000000000000000e5
-45 3 21 34 -0.32768000000000000000e5
-45 3 22 27 -0.16384000000000000000e5
-45 4 4 16 0.32768000000000000000e5
-46 1 1 48 -0.81920000000000000000e4
-46 1 2 49 -0.81920000000000000000e4
-46 1 3 50 -0.16384000000000000000e5
-46 1 5 52 0.32768000000000000000e5
-46 1 11 42 0.32768000000000000000e5
-46 1 12 43 0.65536000000000000000e5
-46 1 17 48 -0.13107200000000000000e6
-46 1 23 38 -0.81920000000000000000e4
-46 1 24 55 0.16384000000000000000e5
-46 1 28 43 0.32768000000000000000e5
-46 2 2 32 -0.81920000000000000000e4
-46 2 8 22 0.65536000000000000000e5
-46 2 12 26 -0.32768000000000000000e5
-46 2 16 30 -0.16384000000000000000e5
-46 3 2 31 -0.32768000000000000000e5
-46 3 14 27 -0.65536000000000000000e5
-46 3 17 30 -0.16384000000000000000e5
-46 4 4 16 -0.65536000000000000000e5
-46 4 7 19 -0.32768000000000000000e5
-47 1 1 48 -0.81920000000000000000e4
-47 1 2 49 -0.81920000000000000000e4
-47 1 3 50 -0.16384000000000000000e5
-47 1 7 54 0.16384000000000000000e5
-47 1 23 38 -0.81920000000000000000e4
-47 2 2 32 -0.81920000000000000000e4
-47 2 16 30 -0.16384000000000000000e5
-47 3 17 30 -0.16384000000000000000e5
-47 3 20 33 -0.16384000000000000000e5
-48 1 1 48 0.81920000000000000000e4
-48 1 2 49 0.81920000000000000000e4
-48 1 5 52 -0.32768000000000000000e5
-48 1 7 54 0.16384000000000000000e5
-48 1 11 42 0.32768000000000000000e5
-48 1 12 43 0.65536000000000000000e5
-48 1 16 47 -0.65536000000000000000e5
-48 1 23 38 0.81920000000000000000e4
-48 1 28 43 -0.32768000000000000000e5
-48 2 2 32 0.81920000000000000000e4
-48 2 10 32 0.32768000000000000000e5
-48 2 12 26 -0.32768000000000000000e5
-48 3 2 31 -0.32768000000000000000e5
-48 3 6 35 -0.16384000000000000000e5
-48 3 14 27 -0.65536000000000000000e5
-48 3 16 29 -0.16384000000000000000e5
-48 4 7 19 0.32768000000000000000e5
-49 1 1 48 0.16384000000000000000e5
-49 1 2 49 0.32768000000000000000e5
-49 1 3 50 0.32768000000000000000e5
-49 1 6 53 0.16384000000000000000e5
-49 1 11 42 -0.65536000000000000000e5
-49 1 12 43 -0.13107200000000000000e6
-49 1 17 48 0.13107200000000000000e6
-49 1 23 38 0.16384000000000000000e5
-49 1 24 39 0.16384000000000000000e5
-49 1 24 55 -0.32768000000000000000e5
-49 1 25 56 -0.16384000000000000000e5
-49 1 26 41 0.32768000000000000000e5
-49 2 2 32 0.16384000000000000000e5
-49 2 3 33 0.16384000000000000000e5
-49 2 4 34 0.32768000000000000000e5
-49 2 8 22 -0.65536000000000000000e5
-49 2 12 26 0.65536000000000000000e5
-49 2 16 30 0.32768000000000000000e5
-49 2 19 35 -0.16384000000000000000e5
-49 2 21 35 -0.32768000000000000000e5
-49 3 2 31 0.65536000000000000000e5
-49 3 4 33 0.16384000000000000000e5
-49 3 14 27 0.13107200000000000000e6
-49 3 17 30 0.32768000000000000000e5
-49 3 18 31 -0.65536000000000000000e5
-49 3 19 32 0.16384000000000000000e5
-49 3 20 33 0.32768000000000000000e5
-49 3 21 34 -0.65536000000000000000e5
-49 3 28 33 -0.16384000000000000000e5
-49 4 4 16 0.65536000000000000000e5
-50 1 1 48 -0.16384000000000000000e5
-50 1 2 49 -0.32768000000000000000e5
-50 1 3 50 -0.32768000000000000000e5
-50 1 11 42 0.65536000000000000000e5
-50 1 12 43 0.13107200000000000000e6
-50 1 17 48 -0.13107200000000000000e6
-50 1 23 38 -0.16384000000000000000e5
-50 1 24 39 -0.16384000000000000000e5
-50 1 25 56 0.16384000000000000000e5
-50 1 26 41 -0.32768000000000000000e5
-50 2 2 32 -0.16384000000000000000e5
-50 2 3 33 -0.16384000000000000000e5
-50 2 8 22 0.65536000000000000000e5
-50 2 12 26 -0.65536000000000000000e5
-50 2 16 30 -0.32768000000000000000e5
-50 3 2 31 -0.65536000000000000000e5
-50 3 4 33 -0.16384000000000000000e5
-50 3 14 27 -0.13107200000000000000e6
-50 3 28 33 0.16384000000000000000e5
-50 4 4 16 -0.65536000000000000000e5
-51 1 2 49 -0.16384000000000000000e5
-51 2 18 32 -0.16384000000000000000e5
-51 3 3 32 0.16384000000000000000e5
-51 3 17 30 -0.32768000000000000000e5
-51 3 19 32 -0.16384000000000000000e5
-52 1 2 49 0.16384000000000000000e5
-52 1 3 50 -0.32768000000000000000e5
-52 1 23 54 0.16384000000000000000e5
-52 3 3 32 -0.16384000000000000000e5
-53 1 1 48 -0.16384000000000000000e5
-53 1 2 49 -0.32768000000000000000e5
-53 1 7 54 0.65536000000000000000e5
-53 1 22 53 -0.16384000000000000000e5
-53 1 23 38 -0.16384000000000000000e5
-53 1 23 54 -0.16384000000000000000e5
-53 1 24 39 -0.16384000000000000000e5
-53 2 2 32 -0.16384000000000000000e5
-53 2 3 33 -0.16384000000000000000e5
-53 2 18 32 0.16384000000000000000e5
-53 2 26 32 -0.32768000000000000000e5
-53 3 4 33 -0.16384000000000000000e5
-53 3 6 35 -0.32768000000000000000e5
-53 3 17 30 0.32768000000000000000e5
-53 4 17 17 -0.32768000000000000000e5
-54 1 1 48 0.16384000000000000000e5
-54 1 2 33 -0.65536000000000000000e5
-54 1 2 49 0.16384000000000000000e5
-54 1 3 34 0.13107200000000000000e6
-54 1 3 50 0.32768000000000000000e5
-54 1 5 52 -0.65536000000000000000e5
-54 1 7 38 -0.32768000000000000000e5
-54 1 7 54 -0.32768000000000000000e5
-54 1 8 39 -0.32768000000000000000e5
-54 1 10 41 -0.65536000000000000000e5
-54 1 11 42 0.65536000000000000000e5
-54 1 12 43 0.13107200000000000000e6
-54 1 16 47 -0.13107200000000000000e6
-54 1 22 53 0.16384000000000000000e5
-54 1 23 38 0.16384000000000000000e5
-54 1 24 39 0.16384000000000000000e5
-54 1 28 43 -0.65536000000000000000e5
-54 2 1 35 -0.16384000000000000000e5
-54 2 2 32 0.16384000000000000000e5
-54 2 3 33 0.16384000000000000000e5
-54 2 7 21 -0.65536000000000000000e5
-54 2 10 32 0.65536000000000000000e5
-54 2 12 26 -0.65536000000000000000e5
-54 2 18 32 -0.16384000000000000000e5
-54 2 26 32 0.16384000000000000000e5
-54 3 1 30 -0.32768000000000000000e5
-54 3 2 31 -0.65536000000000000000e5
-54 3 3 32 0.16384000000000000000e5
-54 3 4 33 0.16384000000000000000e5
-54 3 7 20 -0.65536000000000000000e5
-54 3 8 21 -0.65536000000000000000e5
-54 3 14 27 -0.13107200000000000000e6
-54 3 16 29 -0.32768000000000000000e5
-54 3 17 30 -0.32768000000000000000e5
-54 4 5 17 -0.32768000000000000000e5
-54 4 7 19 0.65536000000000000000e5
-54 4 17 17 0.32768000000000000000e5
-55 1 19 50 0.81920000000000000000e4
-55 1 20 51 0.81920000000000000000e4
-55 1 21 44 -0.32768000000000000000e5
-55 1 29 36 0.81920000000000000000e4
-55 1 46 46 0.32768000000000000000e5
-55 2 25 31 0.81920000000000000000e4
-55 3 24 25 -0.81920000000000000000e4
-56 1 17 32 -0.16384000000000000000e5
-56 1 18 33 -0.16384000000000000000e5
-56 1 36 51 0.16384000000000000000e5
-56 2 14 24 -0.16384000000000000000e5
-56 3 12 25 -0.16384000000000000000e5
-56 3 15 24 0.32768000000000000000e5
-56 3 24 25 -0.16384000000000000000e5
-57 1 4 19 0.81920000000000000000e4
-57 1 13 44 -0.81920000000000000000e4
-57 1 16 55 0.81920000000000000000e4
-57 1 19 42 -0.16384000000000000000e5
-57 1 19 50 0.16384000000000000000e5
-57 1 20 27 -0.16384000000000000000e5
-57 1 29 36 -0.16384000000000000000e5
-57 1 35 50 0.81920000000000000000e4
-57 1 43 46 0.81920000000000000000e4
-57 2 15 29 -0.16384000000000000000e5
-57 2 31 31 0.16384000000000000000e5
-57 3 8 13 -0.81920000000000000000e4
-57 3 10 23 0.81920000000000000000e4
-57 3 11 24 0.81920000000000000000e4
-57 4 10 14 0.81920000000000000000e4
-58 1 14 45 0.16384000000000000000e5
-58 1 29 36 -0.32768000000000000000e5
-58 1 43 46 0.16384000000000000000e5
-58 3 15 28 -0.16384000000000000000e5
-59 1 13 52 0.16384000000000000000e5
-59 1 19 42 -0.32768000000000000000e5
-59 1 35 50 0.16384000000000000000e5
-60 1 4 19 0.16384000000000000000e5
-60 1 13 44 -0.16384000000000000000e5
-60 1 16 55 0.16384000000000000000e5
-60 1 20 27 -0.32768000000000000000e5
-60 1 34 41 0.16384000000000000000e5
-60 3 8 13 -0.16384000000000000000e5
-60 3 10 23 0.16384000000000000000e5
-60 3 11 24 0.16384000000000000000e5
-60 4 10 14 0.16384000000000000000e5
-61 1 17 48 -0.32768000000000000000e5
-61 1 18 49 -0.16384000000000000000e5
-61 1 34 49 -0.16384000000000000000e5
-61 1 35 50 0.32768000000000000000e5
-61 2 24 30 -0.16384000000000000000e5
-61 2 24 34 -0.16384000000000000000e5
-61 3 15 28 -0.32768000000000000000e5
-61 3 24 29 0.16384000000000000000e5
-62 1 17 48 0.16384000000000000000e5
-62 1 28 35 -0.32768000000000000000e5
-62 1 34 49 0.16384000000000000000e5
-63 1 5 52 -0.81920000000000000000e4
-63 1 11 42 0.81920000000000000000e4
-63 1 12 43 0.16384000000000000000e5
-63 1 13 44 -0.32768000000000000000e5
-63 1 17 48 0.16384000000000000000e5
-63 2 12 26 -0.81920000000000000000e4
-63 2 20 34 0.81920000000000000000e4
-63 3 2 31 -0.81920000000000000000e4
-63 3 14 27 -0.16384000000000000000e5
-63 3 24 29 -0.16384000000000000000e5
-63 4 7 19 0.81920000000000000000e4
-63 4 8 20 0.81920000000000000000e4
-64 1 4 19 0.32768000000000000000e5
-64 1 16 47 0.16384000000000000000e5
-64 1 20 27 -0.65536000000000000000e5
-64 1 28 35 0.32768000000000000000e5
-64 1 28 43 0.81920000000000000000e4
-64 1 32 47 0.81920000000000000000e4
-64 1 37 44 0.81920000000000000000e4
-64 2 10 24 0.32768000000000000000e5
-64 2 20 34 0.81920000000000000000e4
-64 3 8 13 -0.32768000000000000000e5
-64 3 10 23 0.32768000000000000000e5
-64 3 11 24 0.32768000000000000000e5
-64 3 18 31 -0.81920000000000000000e4
-65 1 5 52 0.16384000000000000000e5
-65 1 15 54 0.16384000000000000000e5
-65 1 18 25 -0.32768000000000000000e5
-65 3 14 19 0.32768000000000000000e5
-66 1 17 48 -0.32768000000000000000e5
-66 1 28 43 0.16384000000000000000e5
-66 1 33 48 0.16384000000000000000e5
-66 3 14 27 -0.32768000000000000000e5
-67 1 5 52 -0.16384000000000000000e5
-67 1 12 43 -0.32768000000000000000e5
-67 1 17 48 0.32768000000000000000e5
-67 2 8 22 -0.16384000000000000000e5
-67 3 18 31 -0.16384000000000000000e5
-67 4 4 16 0.16384000000000000000e5
-67 4 7 19 0.16384000000000000000e5
-68 1 11 42 0.16384000000000000000e5
-68 1 12 43 0.32768000000000000000e5
-68 1 16 47 -0.32768000000000000000e5
-68 1 17 48 -0.32768000000000000000e5
-68 1 32 47 0.16384000000000000000e5
-68 2 8 22 0.16384000000000000000e5
-68 2 12 26 -0.16384000000000000000e5
-68 3 2 31 -0.16384000000000000000e5
-68 3 13 26 -0.32768000000000000000e5
-68 3 14 27 -0.32768000000000000000e5
-68 4 4 16 -0.16384000000000000000e5
-69 1 2 17 -0.32768000000000000000e5
-69 1 5 52 0.16384000000000000000e5
-69 1 11 42 -0.16384000000000000000e5
-69 1 12 43 -0.32768000000000000000e5
-69 1 16 47 0.32768000000000000000e5
-69 1 28 43 0.16384000000000000000e5
-69 1 37 44 0.16384000000000000000e5
-69 2 10 32 -0.16384000000000000000e5
-69 2 12 26 0.16384000000000000000e5
-69 3 1 14 0.32768000000000000000e5
-69 3 2 31 0.16384000000000000000e5
-69 3 6 23 0.32768000000000000000e5
-69 3 14 27 0.32768000000000000000e5
-69 4 7 19 -0.16384000000000000000e5
-70 1 11 42 -0.32768000000000000000e5
-70 1 26 41 -0.16384000000000000000e5
-70 1 33 48 0.32768000000000000000e5
-70 2 28 30 -0.16384000000000000000e5
-70 3 5 34 0.16384000000000000000e5
-70 3 22 27 0.16384000000000000000e5
-71 1 1 48 0.81920000000000000000e4
-71 1 2 49 0.81920000000000000000e4
-71 1 3 50 0.16384000000000000000e5
-71 1 10 41 0.32768000000000000000e5
-71 1 12 43 -0.65536000000000000000e5
-71 1 23 38 0.81920000000000000000e4
-71 1 28 43 0.32768000000000000000e5
-71 2 2 32 0.81920000000000000000e4
-71 2 4 34 -0.16384000000000000000e5
-71 2 12 26 0.32768000000000000000e5
-71 2 16 30 0.16384000000000000000e5
-71 3 2 31 0.32768000000000000000e5
-71 3 5 34 -0.16384000000000000000e5
-72 1 1 48 -0.81920000000000000000e4
-72 1 2 49 -0.81920000000000000000e4
-72 1 3 50 -0.16384000000000000000e5
-72 1 10 41 -0.32768000000000000000e5
-72 1 11 42 0.32768000000000000000e5
-72 1 12 43 0.65536000000000000000e5
-72 1 17 48 -0.65536000000000000000e5
-72 1 23 38 -0.81920000000000000000e4
-72 1 26 41 0.16384000000000000000e5
-72 2 2 32 -0.81920000000000000000e4
-72 2 8 22 0.32768000000000000000e5
-72 2 12 26 -0.32768000000000000000e5
-72 2 16 30 -0.16384000000000000000e5
-72 3 2 31 -0.32768000000000000000e5
-72 3 14 27 -0.65536000000000000000e5
-72 3 22 27 -0.16384000000000000000e5
-72 4 4 16 -0.32768000000000000000e5
-73 1 1 48 -0.81920000000000000000e4
-73 1 2 49 -0.81920000000000000000e4
-73 1 23 38 -0.81920000000000000000e4
-73 2 2 32 -0.81920000000000000000e4
-73 2 16 30 -0.16384000000000000000e5
-73 3 2 31 -0.32768000000000000000e5
-73 3 17 30 -0.16384000000000000000e5
-74 1 1 48 0.81920000000000000000e4
-74 1 2 33 0.32768000000000000000e5
-74 1 2 49 0.81920000000000000000e4
-74 1 3 34 -0.65536000000000000000e5
-74 1 7 54 0.16384000000000000000e5
-74 1 10 41 0.32768000000000000000e5
-74 1 23 38 0.81920000000000000000e4
-74 2 2 32 0.81920000000000000000e4
-74 2 7 21 0.32768000000000000000e5
-74 3 7 20 0.32768000000000000000e5
-74 3 8 21 0.32768000000000000000e5
-75 1 1 48 0.81920000000000000000e4
-75 1 2 17 -0.65536000000000000000e5
-75 1 2 49 0.81920000000000000000e4
-75 1 3 50 -0.16384000000000000000e5
-75 1 5 52 0.32768000000000000000e5
-75 1 7 38 0.16384000000000000000e5
-75 1 8 39 0.16384000000000000000e5
-75 1 16 47 0.65536000000000000000e5
-75 1 17 48 -0.65536000000000000000e5
-75 1 23 38 0.81920000000000000000e4
-75 1 28 43 0.32768000000000000000e5
-75 2 1 31 0.32768000000000000000e5
-75 2 2 32 0.81920000000000000000e4
-75 2 8 22 0.32768000000000000000e5
-75 2 10 32 -0.32768000000000000000e5
-75 3 1 14 0.65536000000000000000e5
-75 3 1 30 0.16384000000000000000e5
-75 3 2 31 0.32768000000000000000e5
-75 3 6 23 0.65536000000000000000e5
-75 3 16 29 -0.16384000000000000000e5
-75 4 4 16 -0.32768000000000000000e5
-75 4 5 17 0.16384000000000000000e5
-75 4 7 19 -0.32768000000000000000e5
-76 1 1 48 0.32768000000000000000e5
-76 1 2 49 0.49152000000000000000e5
-76 1 3 50 0.65536000000000000000e5
-76 1 6 53 -0.16384000000000000000e5
-76 1 11 42 -0.13107200000000000000e6
-76 1 12 43 -0.26214400000000000000e6
-76 1 17 48 0.26214400000000000000e6
-76 1 23 38 0.32768000000000000000e5
-76 1 24 39 0.16384000000000000000e5
-76 1 25 40 0.16384000000000000000e5
-76 1 26 29 -0.32768000000000000000e5
-76 1 26 41 -0.32768000000000000000e5
-76 1 28 43 0.65536000000000000000e5
-76 2 2 32 0.32768000000000000000e5
-76 2 3 33 0.16384000000000000000e5
-76 2 4 34 -0.32768000000000000000e5
-76 2 5 35 -0.16384000000000000000e5
-76 2 8 22 -0.13107200000000000000e6
-76 2 12 26 0.13107200000000000000e6
-76 2 16 30 0.65536000000000000000e5
-76 3 2 31 0.13107200000000000000e6
-76 3 4 33 0.16384000000000000000e5
-76 3 5 34 -0.32768000000000000000e5
-76 3 14 27 0.26214400000000000000e6
-76 4 4 16 0.13107200000000000000e6
-77 1 1 48 -0.16384000000000000000e5
-77 1 2 49 -0.32768000000000000000e5
-77 1 3 50 -0.32768000000000000000e5
-77 1 6 53 0.16384000000000000000e5
-77 1 9 40 -0.32768000000000000000e5
-77 1 11 42 0.65536000000000000000e5
-77 1 12 43 0.13107200000000000000e6
-77 1 17 48 -0.13107200000000000000e6
-77 1 23 38 -0.16384000000000000000e5
-77 1 24 39 -0.16384000000000000000e5
-77 2 2 32 -0.16384000000000000000e5
-77 2 3 33 -0.16384000000000000000e5
-77 2 8 22 0.65536000000000000000e5
-77 2 12 26 -0.65536000000000000000e5
-77 2 16 30 -0.32768000000000000000e5
-77 3 2 31 -0.65536000000000000000e5
-77 3 14 27 -0.13107200000000000000e6
-77 4 4 16 -0.65536000000000000000e5
-78 1 2 49 -0.16384000000000000000e5
-78 1 3 50 -0.32768000000000000000e5
-78 1 5 52 -0.65536000000000000000e5
-78 1 8 39 0.32768000000000000000e5
-78 1 9 40 0.32768000000000000000e5
-78 1 10 41 -0.65536000000000000000e5
-78 1 17 48 0.13107200000000000000e6
-78 1 26 41 -0.32768000000000000000e5
-78 1 28 43 -0.65536000000000000000e5
-78 2 3 33 -0.16384000000000000000e5
-78 2 8 22 -0.65536000000000000000e5
-78 3 4 33 -0.16384000000000000000e5
-78 4 4 16 0.65536000000000000000e5
-78 4 6 18 0.32768000000000000000e5
-78 4 7 19 0.65536000000000000000e5
-79 1 2 49 0.16384000000000000000e5
-79 1 8 39 -0.32768000000000000000e5
-79 1 24 39 0.16384000000000000000e5
-79 2 3 33 0.16384000000000000000e5
-79 2 18 32 -0.16384000000000000000e5
-79 3 3 32 0.16384000000000000000e5
-79 3 4 33 0.16384000000000000000e5
-79 3 17 30 -0.32768000000000000000e5
-80 1 1 48 -0.16384000000000000000e5
-80 2 2 32 -0.16384000000000000000e5
-80 3 1 30 -0.32768000000000000000e5
-80 3 3 32 -0.16384000000000000000e5
-81 1 1 48 0.16384000000000000000e5
-81 1 2 49 -0.16384000000000000000e5
-81 1 7 38 -0.32768000000000000000e5
-81 1 7 54 0.32768000000000000000e5
-81 1 24 39 -0.16384000000000000000e5
-81 2 3 33 -0.16384000000000000000e5
-81 2 18 32 0.16384000000000000000e5
-81 2 26 32 -0.16384000000000000000e5
-81 3 4 33 -0.16384000000000000000e5
-81 3 17 30 0.32768000000000000000e5
-81 4 17 17 -0.32768000000000000000e5
-82 1 1 24 0.16384000000000000000e5
-82 1 1 32 0.65536000000000000000e5
-82 1 1 40 0.16384000000000000000e5
-82 1 1 48 0.16384000000000000000e5
-82 1 2 49 0.32768000000000000000e5
-82 1 3 50 -0.32768000000000000000e5
-82 1 5 52 0.65536000000000000000e5
-82 1 6 37 0.16384000000000000000e5
-82 1 7 22 0.32768000000000000000e5
-82 1 7 54 -0.32768000000000000000e5
-82 1 8 23 0.32768000000000000000e5
-82 1 11 42 -0.65536000000000000000e5
-82 1 12 27 -0.13107200000000000000e6
-82 1 12 43 -0.13107200000000000000e6
-82 1 16 47 0.13107200000000000000e6
-82 1 23 38 0.16384000000000000000e5
-82 1 24 39 0.16384000000000000000e5
-82 1 28 43 0.65536000000000000000e5
-82 2 1 7 0.32768000000000000000e5
-82 2 1 35 -0.16384000000000000000e5
-82 2 2 16 0.16384000000000000000e5
-82 2 2 32 0.32768000000000000000e5
-82 2 3 17 -0.16384000000000000000e5
-82 2 3 33 0.16384000000000000000e5
-82 2 4 26 0.16384000000000000000e5
-82 2 6 20 0.65536000000000000000e5
-82 2 10 32 -0.65536000000000000000e5
-82 2 12 26 0.65536000000000000000e5
-82 2 16 16 -0.32768000000000000000e5
-82 2 18 32 -0.16384000000000000000e5
-82 2 26 32 0.16384000000000000000e5
-82 3 1 16 0.16384000000000000000e5
-82 3 1 30 0.65536000000000000000e5
-82 3 2 31 0.65536000000000000000e5
-82 3 3 16 0.16384000000000000000e5
-82 3 3 32 0.16384000000000000000e5
-82 3 4 33 0.16384000000000000000e5
-82 3 7 20 0.65536000000000000000e5
-82 3 14 27 0.13107200000000000000e6
-82 3 16 29 -0.32768000000000000000e5
-82 3 17 30 -0.32768000000000000000e5
-82 4 1 5 -0.32768000000000000000e5
-82 4 1 13 0.16384000000000000000e5
-82 4 5 17 0.32768000000000000000e5
-82 4 7 19 -0.65536000000000000000e5
-82 4 11 11 0.32768000000000000000e5
-82 4 17 17 0.32768000000000000000e5
-83 1 14 21 -0.16384000000000000000e5
-83 1 19 34 -0.16384000000000000000e5
-83 1 20 35 -0.16384000000000000000e5
-83 1 21 44 0.16384000000000000000e5
-83 1 21 52 0.16384000000000000000e5
-83 2 15 25 -0.16384000000000000000e5
-83 3 14 15 0.16384000000000000000e5
-84 1 14 21 -0.32768000000000000000e5
-84 1 17 32 0.81920000000000000000e4
-84 1 18 33 0.81920000000000000000e4
-84 1 29 36 0.81920000000000000000e4
-84 1 35 46 0.16384000000000000000e5
-84 2 14 24 0.81920000000000000000e4
-84 3 12 25 0.81920000000000000000e4
-84 3 14 15 0.32768000000000000000e5
-84 3 15 24 -0.16384000000000000000e5
-85 1 4 19 -0.40960000000000000000e4
-85 1 13 44 0.40960000000000000000e4
-85 1 19 34 -0.32768000000000000000e5
-85 1 19 42 0.81920000000000000000e4
-85 1 19 50 0.81920000000000000000e4
-85 1 20 27 0.81920000000000000000e4
-85 1 20 51 0.81920000000000000000e4
-85 1 29 36 0.16384000000000000000e5
-85 2 15 29 0.81920000000000000000e4
-85 2 25 31 0.81920000000000000000e4
-85 3 8 13 0.40960000000000000000e4
-85 3 10 23 -0.40960000000000000000e4
-85 3 11 24 -0.40960000000000000000e4
-85 3 24 25 -0.81920000000000000000e4
-85 4 10 14 -0.40960000000000000000e4
-86 1 17 32 -0.16384000000000000000e5
-86 1 18 33 -0.16384000000000000000e5
-86 1 20 51 0.16384000000000000000e5
-86 2 14 24 -0.16384000000000000000e5
-86 3 12 25 -0.16384000000000000000e5
-87 1 17 32 -0.16384000000000000000e5
-87 1 19 42 0.16384000000000000000e5
-87 1 20 27 -0.16384000000000000000e5
-87 2 11 25 -0.16384000000000000000e5
-87 3 12 25 -0.16384000000000000000e5
-87 3 24 25 -0.16384000000000000000e5
-88 1 4 19 -0.16384000000000000000e5
-88 1 5 20 -0.81920000000000000000e4
-88 1 10 17 -0.16384000000000000000e5
-88 1 13 16 -0.16384000000000000000e5
-88 1 13 44 0.81920000000000000000e4
-88 1 19 50 0.16384000000000000000e5
-88 1 28 35 0.81920000000000000000e4
-88 2 8 14 -0.81920000000000000000e4
-88 2 11 13 -0.16384000000000000000e5
-88 3 2 15 -0.81920000000000000000e4
-88 3 10 15 0.32768000000000000000e5
-88 3 10 23 -0.81920000000000000000e4
-88 4 6 10 -0.81920000000000000000e4
-88 4 10 14 -0.81920000000000000000e4
-89 1 13 52 -0.16384000000000000000e5
-89 2 15 33 -0.16384000000000000000e5
-89 3 12 25 -0.32768000000000000000e5
-89 3 15 28 0.16384000000000000000e5
-89 3 24 25 -0.32768000000000000000e5
-90 1 14 45 0.16384000000000000000e5
-90 1 17 32 -0.32768000000000000000e5
-90 1 28 35 0.16384000000000000000e5
-90 3 15 28 -0.16384000000000000000e5
-91 1 13 44 0.16384000000000000000e5
-91 1 13 52 0.16384000000000000000e5
-91 1 20 27 -0.32768000000000000000e5
-92 1 4 19 -0.16384000000000000000e5
-92 1 16 31 -0.32768000000000000000e5
-92 1 20 27 0.32768000000000000000e5
-92 1 28 35 -0.16384000000000000000e5
-92 1 34 41 0.16384000000000000000e5
-92 2 10 24 -0.16384000000000000000e5
-92 3 8 13 0.16384000000000000000e5
-92 3 10 23 -0.16384000000000000000e5
-92 3 11 24 -0.16384000000000000000e5
-93 1 5 36 -0.32768000000000000000e5
-93 1 18 25 0.16384000000000000000e5
-93 1 18 49 0.16384000000000000000e5
-93 3 14 19 -0.16384000000000000000e5
-94 1 14 45 0.32768000000000000000e5
-94 1 18 49 -0.16384000000000000000e5
-94 1 28 35 -0.32768000000000000000e5
-94 2 24 30 -0.16384000000000000000e5
-94 3 11 24 -0.32768000000000000000e5
-94 3 14 27 0.16384000000000000000e5
-94 3 15 28 -0.32768000000000000000e5
-95 1 4 19 -0.32768000000000000000e5
-95 1 12 43 0.16384000000000000000e5
-95 1 17 48 0.16384000000000000000e5
-95 3 8 13 0.32768000000000000000e5
-96 1 4 19 0.32768000000000000000e5
-96 1 5 52 -0.81920000000000000000e4
-96 1 11 42 0.81920000000000000000e4
-96 1 12 43 0.16384000000000000000e5
-96 1 16 47 0.16384000000000000000e5
-96 1 20 27 -0.65536000000000000000e5
-96 1 28 35 0.32768000000000000000e5
-96 2 10 24 0.32768000000000000000e5
-96 2 12 26 -0.81920000000000000000e4
-96 2 20 34 0.81920000000000000000e4
-96 3 2 31 -0.81920000000000000000e4
-96 3 8 13 -0.32768000000000000000e5
-96 3 11 24 0.32768000000000000000e5
-96 3 13 26 0.16384000000000000000e5
-96 3 14 27 -0.16384000000000000000e5
-96 4 7 19 0.81920000000000000000e4
-96 4 8 20 0.81920000000000000000e4
-97 1 2 17 0.16384000000000000000e5
-97 1 16 31 -0.65536000000000000000e5
-97 1 16 47 0.16384000000000000000e5
-97 1 20 27 0.65536000000000000000e5
-97 1 28 35 -0.32768000000000000000e5
-97 2 7 13 0.32768000000000000000e5
-97 2 10 24 -0.32768000000000000000e5
-97 3 1 14 -0.16384000000000000000e5
-97 3 6 23 -0.16384000000000000000e5
-97 3 11 24 -0.32768000000000000000e5
-97 4 8 8 -0.65536000000000000000e5
-98 1 11 42 0.16384000000000000000e5
-98 1 18 25 -0.32768000000000000000e5
-98 1 33 40 0.16384000000000000000e5
-99 1 4 35 -0.32768000000000000000e5
-99 1 5 52 0.16384000000000000000e5
-99 1 10 41 -0.16384000000000000000e5
-99 1 11 42 -0.16384000000000000000e5
-99 1 17 48 0.32768000000000000000e5
-99 2 8 22 -0.16384000000000000000e5
-99 3 14 27 0.32768000000000000000e5
-99 4 4 16 0.16384000000000000000e5
-100 1 4 35 0.32768000000000000000e5
-100 1 10 41 0.16384000000000000000e5
-100 1 18 25 0.32768000000000000000e5
-100 1 28 35 -0.65536000000000000000e5
-100 1 28 43 0.16384000000000000000e5
-100 2 9 23 0.32768000000000000000e5
-100 3 11 24 -0.65536000000000000000e5
-101 1 3 34 -0.32768000000000000000e5
-101 1 5 52 -0.16384000000000000000e5
-101 1 11 42 0.16384000000000000000e5
-101 1 12 43 0.32768000000000000000e5
-101 1 28 43 -0.16384000000000000000e5
-101 2 12 26 -0.16384000000000000000e5
-101 3 14 27 -0.32768000000000000000e5
-101 4 7 19 0.16384000000000000000e5
-102 1 2 17 -0.32768000000000000000e5
-102 1 2 33 -0.16384000000000000000e5
-102 1 3 34 0.32768000000000000000e5
-102 1 10 41 -0.16384000000000000000e5
-102 1 11 42 0.16384000000000000000e5
-102 1 12 43 0.32768000000000000000e5
-102 1 17 48 -0.32768000000000000000e5
-102 2 7 21 -0.16384000000000000000e5
-102 2 8 22 0.16384000000000000000e5
-102 2 12 26 -0.16384000000000000000e5
-102 3 1 14 0.32768000000000000000e5
-102 3 2 31 -0.16384000000000000000e5
-102 3 7 20 -0.16384000000000000000e5
-102 3 8 21 -0.16384000000000000000e5
-102 3 14 27 -0.32768000000000000000e5
-102 4 4 16 -0.16384000000000000000e5
-103 1 2 17 0.32768000000000000000e5
-103 1 2 33 0.16384000000000000000e5
-103 1 3 34 -0.32768000000000000000e5
-103 1 5 52 0.16384000000000000000e5
-103 1 10 41 0.16384000000000000000e5
-103 1 11 42 -0.32768000000000000000e5
-103 1 12 27 -0.32768000000000000000e5
-103 1 12 43 -0.65536000000000000000e5
-103 1 16 47 0.32768000000000000000e5
-103 1 17 48 0.32768000000000000000e5
-103 1 28 43 0.16384000000000000000e5
-103 2 1 31 -0.16384000000000000000e5
-103 2 7 21 0.16384000000000000000e5
-103 2 8 22 -0.16384000000000000000e5
-103 2 10 32 -0.16384000000000000000e5
-103 2 12 26 0.32768000000000000000e5
-103 3 1 14 -0.32768000000000000000e5
-103 3 2 31 0.16384000000000000000e5
-103 3 6 23 -0.32768000000000000000e5
-103 3 7 20 0.16384000000000000000e5
-103 3 8 21 0.16384000000000000000e5
-103 3 14 27 0.65536000000000000000e5
-103 4 4 16 0.16384000000000000000e5
-103 4 7 19 -0.16384000000000000000e5
-104 1 1 48 -0.81920000000000000000e4
-104 1 2 49 -0.81920000000000000000e4
-104 1 3 50 -0.16384000000000000000e5
-104 1 5 52 0.32768000000000000000e5
-104 1 12 43 0.65536000000000000000e5
-104 1 17 48 -0.65536000000000000000e5
-104 1 23 38 -0.81920000000000000000e4
-104 1 26 29 0.16384000000000000000e5
-104 1 28 43 -0.32768000000000000000e5
-104 2 2 32 -0.81920000000000000000e4
-104 2 4 34 0.16384000000000000000e5
-104 2 8 22 0.32768000000000000000e5
-104 2 12 26 -0.32768000000000000000e5
-104 2 16 30 -0.16384000000000000000e5
-104 2 22 28 -0.16384000000000000000e5
-104 3 2 31 -0.32768000000000000000e5
-104 3 9 22 -0.32768000000000000000e5
-104 3 14 27 -0.65536000000000000000e5
-104 4 4 16 -0.32768000000000000000e5
-105 1 1 48 0.81920000000000000000e4
-105 1 2 49 0.81920000000000000000e4
-105 1 3 50 0.16384000000000000000e5
-105 1 4 35 -0.65536000000000000000e5
-105 1 9 40 0.16384000000000000000e5
-105 1 10 41 0.32768000000000000000e5
-105 1 12 43 -0.65536000000000000000e5
-105 1 17 48 0.65536000000000000000e5
-105 1 23 38 0.81920000000000000000e4
-105 1 26 41 -0.16384000000000000000e5
-105 1 28 43 0.32768000000000000000e5
-105 2 2 32 0.81920000000000000000e4
-105 2 4 34 -0.16384000000000000000e5
-105 2 12 26 0.32768000000000000000e5
-105 2 16 30 0.16384000000000000000e5
-105 3 2 31 0.32768000000000000000e5
-105 3 8 21 0.32768000000000000000e5
-105 3 9 22 0.32768000000000000000e5
-105 3 14 27 0.65536000000000000000e5
-105 4 4 16 0.32768000000000000000e5
-106 1 1 48 -0.81920000000000000000e4
-106 1 2 49 -0.81920000000000000000e4
-106 1 5 52 0.32768000000000000000e5
-106 1 8 39 -0.16384000000000000000e5
-106 1 9 40 -0.16384000000000000000e5
-106 1 11 42 0.32768000000000000000e5
-106 1 12 43 0.65536000000000000000e5
-106 1 17 48 -0.13107200000000000000e6
-106 1 23 38 -0.81920000000000000000e4
-106 1 26 41 0.32768000000000000000e5
-106 1 28 43 0.32768000000000000000e5
-106 2 2 32 -0.81920000000000000000e4
-106 2 8 22 0.65536000000000000000e5
-106 2 12 26 -0.32768000000000000000e5
-106 2 16 30 -0.16384000000000000000e5
-106 3 2 31 -0.32768000000000000000e5
-106 3 8 21 -0.32768000000000000000e5
-106 3 14 27 -0.65536000000000000000e5
-106 4 4 16 -0.65536000000000000000e5
-106 4 6 18 -0.16384000000000000000e5
-106 4 7 19 -0.32768000000000000000e5
-107 1 1 48 -0.81920000000000000000e4
-107 1 2 33 -0.32768000000000000000e5
-107 1 2 49 -0.81920000000000000000e4
-107 1 3 50 -0.16384000000000000000e5
-107 1 8 39 0.16384000000000000000e5
-107 1 11 42 0.32768000000000000000e5
-107 1 12 43 0.65536000000000000000e5
-107 1 17 48 -0.65536000000000000000e5
-107 1 23 38 -0.81920000000000000000e4
-107 2 2 32 -0.81920000000000000000e4
-107 2 8 22 0.32768000000000000000e5
-107 2 12 26 -0.32768000000000000000e5
-107 2 16 30 -0.16384000000000000000e5
-107 3 2 31 -0.32768000000000000000e5
-107 3 14 27 -0.65536000000000000000e5
-107 4 4 16 -0.32768000000000000000e5
-108 1 1 48 0.81920000000000000000e4
-108 1 2 33 0.32768000000000000000e5
-108 1 2 49 0.81920000000000000000e4
-108 1 3 34 -0.65536000000000000000e5
-108 1 3 50 0.16384000000000000000e5
-108 1 10 41 0.32768000000000000000e5
-108 1 23 38 0.81920000000000000000e4
-108 2 2 32 0.81920000000000000000e4
-108 2 7 21 0.32768000000000000000e5
-108 3 1 30 0.16384000000000000000e5
-108 3 8 21 0.32768000000000000000e5
-109 1 1 32 -0.32768000000000000000e5
-109 1 1 48 0.81920000000000000000e4
-109 1 2 49 0.81920000000000000000e4
-109 1 7 38 0.16384000000000000000e5
-109 1 23 38 0.81920000000000000000e4
-109 2 2 32 0.81920000000000000000e4
-110 1 1 24 -0.81920000000000000000e4
-110 1 1 40 -0.81920000000000000000e4
-110 1 2 49 -0.81920000000000000000e4
-110 1 6 37 -0.81920000000000000000e4
-110 1 7 22 -0.16384000000000000000e5
-110 1 7 38 0.16384000000000000000e5
-110 1 8 23 -0.16384000000000000000e5
-110 1 8 39 0.16384000000000000000e5
-110 1 22 37 0.81920000000000000000e4
-110 2 1 7 -0.16384000000000000000e5
-110 2 2 16 -0.81920000000000000000e4
-110 2 2 32 -0.81920000000000000000e4
-110 2 3 17 0.81920000000000000000e4
-110 2 4 26 -0.81920000000000000000e4
-110 2 16 16 0.16384000000000000000e5
-110 3 1 16 -0.81920000000000000000e4
-110 3 1 30 -0.16384000000000000000e5
-110 3 3 16 -0.81920000000000000000e4
-110 4 1 5 0.16384000000000000000e5
-110 4 1 13 -0.81920000000000000000e4
-110 4 11 11 -0.16384000000000000000e5
-111 1 1 40 -0.16384000000000000000e5
-111 1 1 48 0.16384000000000000000e5
-111 1 2 49 0.16384000000000000000e5
-111 1 3 26 0.16384000000000000000e5
-111 1 5 52 -0.65536000000000000000e5
-111 1 6 29 -0.32768000000000000000e5
-111 1 6 37 -0.32768000000000000000e5
-111 1 6 49 0.16384000000000000000e5
-111 1 8 39 0.65536000000000000000e5
-111 1 9 40 0.32768000000000000000e5
-111 1 10 25 0.32768000000000000000e5
-111 1 10 41 -0.65536000000000000000e5
-111 1 11 42 -0.65536000000000000000e5
-111 1 12 43 -0.13107200000000000000e6
-111 1 17 48 0.26214400000000000000e6
-111 1 23 38 0.16384000000000000000e5
-111 1 26 41 -0.32768000000000000000e5
-111 1 28 43 -0.65536000000000000000e5
-111 2 2 32 0.16384000000000000000e5
-111 2 4 18 0.16384000000000000000e5
-111 2 4 26 -0.16384000000000000000e5
-111 2 5 27 -0.16384000000000000000e5
-111 2 8 22 -0.13107200000000000000e6
-111 2 12 26 0.65536000000000000000e5
-111 2 16 30 0.32768000000000000000e5
-111 3 2 31 0.65536000000000000000e5
-111 3 4 17 0.16384000000000000000e5
-111 3 5 18 0.16384000000000000000e5
-111 3 6 19 0.32768000000000000000e5
-111 3 8 21 -0.65536000000000000000e5
-111 3 14 27 0.13107200000000000000e6
-111 4 3 15 0.32768000000000000000e5
-111 4 4 16 0.13107200000000000000e6
-111 4 6 18 0.32768000000000000000e5
-111 4 7 19 0.65536000000000000000e5
-112 1 1 40 0.16384000000000000000e5
-112 1 1 48 -0.16384000000000000000e5
-112 1 2 49 -0.16384000000000000000e5
-112 1 3 26 -0.16384000000000000000e5
-112 1 5 52 0.65536000000000000000e5
-112 1 6 37 0.16384000000000000000e5
-112 1 8 39 -0.65536000000000000000e5
-112 1 10 25 -0.65536000000000000000e5
-112 1 10 41 0.65536000000000000000e5
-112 1 11 42 0.65536000000000000000e5
-112 1 12 43 0.13107200000000000000e6
-112 1 17 48 -0.26214400000000000000e6
-112 1 23 38 -0.16384000000000000000e5
-112 1 25 40 0.16384000000000000000e5
-112 1 26 41 0.32768000000000000000e5
-112 1 28 43 0.65536000000000000000e5
-112 2 2 32 -0.16384000000000000000e5
-112 2 4 18 -0.16384000000000000000e5
-112 2 4 26 0.16384000000000000000e5
-112 2 8 22 0.13107200000000000000e6
-112 2 12 26 -0.65536000000000000000e5
-112 2 16 30 -0.32768000000000000000e5
-112 3 2 31 -0.65536000000000000000e5
-112 3 4 17 -0.16384000000000000000e5
-112 3 5 18 -0.16384000000000000000e5
-112 3 6 19 -0.32768000000000000000e5
-112 3 8 21 0.65536000000000000000e5
-112 3 14 27 -0.13107200000000000000e6
-112 4 3 15 -0.32768000000000000000e5
-112 4 4 16 -0.13107200000000000000e6
-112 4 6 18 -0.32768000000000000000e5
-112 4 7 19 -0.65536000000000000000e5
-113 1 2 49 -0.16384000000000000000e5
-113 1 3 50 -0.32768000000000000000e5
-113 1 5 52 -0.65536000000000000000e5
-113 1 6 37 0.16384000000000000000e5
-113 1 8 39 0.32768000000000000000e5
-113 1 10 25 0.32768000000000000000e5
-113 1 10 41 -0.65536000000000000000e5
-113 1 17 48 0.13107200000000000000e6
-113 1 24 39 -0.16384000000000000000e5
-113 1 26 41 -0.32768000000000000000e5
-113 1 28 43 -0.65536000000000000000e5
-113 2 3 33 -0.16384000000000000000e5
-113 2 8 22 -0.65536000000000000000e5
-113 3 6 19 0.32768000000000000000e5
-113 3 8 21 -0.65536000000000000000e5
-113 4 3 15 0.32768000000000000000e5
-113 4 4 16 0.65536000000000000000e5
-113 4 6 18 0.32768000000000000000e5
-113 4 7 19 0.65536000000000000000e5
-114 1 1 40 -0.16384000000000000000e5
-114 1 6 37 -0.16384000000000000000e5
-114 1 24 39 0.16384000000000000000e5
-114 2 4 26 -0.16384000000000000000e5
-114 3 6 19 -0.32768000000000000000e5
-115 1 1 40 0.16384000000000000000e5
-115 1 1 48 -0.16384000000000000000e5
-115 1 7 38 -0.32768000000000000000e5
-115 1 8 23 0.32768000000000000000e5
-115 1 23 38 -0.16384000000000000000e5
-115 2 2 32 -0.16384000000000000000e5
-115 3 1 30 -0.32768000000000000000e5
-115 3 6 19 0.32768000000000000000e5
-115 3 7 20 -0.65536000000000000000e5
-115 4 2 14 0.32768000000000000000e5
-116 1 1 48 0.16384000000000000000e5
-116 1 2 49 0.16384000000000000000e5
-116 1 6 37 0.16384000000000000000e5
-116 1 8 23 -0.32768000000000000000e5
-116 1 8 39 -0.32768000000000000000e5
-116 1 23 38 0.32768000000000000000e5
-116 2 2 32 0.16384000000000000000e5
-116 2 3 17 -0.16384000000000000000e5
-116 2 4 26 0.16384000000000000000e5
-116 3 1 30 0.32768000000000000000e5
-116 4 1 13 0.16384000000000000000e5
-117 1 1 32 0.65536000000000000000e5
-117 1 1 40 -0.16384000000000000000e5
-117 1 1 48 0.16384000000000000000e5
-117 1 2 33 -0.13107200000000000000e6
-117 1 2 49 -0.16384000000000000000e5
-117 1 3 34 0.26214400000000000000e6
-117 1 3 50 0.32768000000000000000e5
-117 1 5 52 -0.65536000000000000000e5
-117 1 6 37 -0.16384000000000000000e5
-117 1 7 22 0.32768000000000000000e5
-117 1 8 23 0.32768000000000000000e5
-117 1 10 41 -0.13107200000000000000e6
-117 1 11 42 0.65536000000000000000e5
-117 1 12 27 -0.13107200000000000000e6
-117 1 12 43 0.13107200000000000000e6
-117 1 16 47 -0.13107200000000000000e6
-117 1 22 37 0.16384000000000000000e5
-117 1 28 43 -0.65536000000000000000e5
-117 2 1 7 0.32768000000000000000e5
-117 2 2 32 -0.16384000000000000000e5
-117 2 3 17 0.16384000000000000000e5
-117 2 4 26 -0.16384000000000000000e5
-117 2 6 20 0.65536000000000000000e5
-117 2 7 21 -0.13107200000000000000e6
-117 2 10 32 0.65536000000000000000e5
-117 2 12 26 -0.65536000000000000000e5
-117 3 1 30 -0.65536000000000000000e5
-117 3 2 31 -0.65536000000000000000e5
-117 3 7 20 -0.65536000000000000000e5
-117 3 8 21 -0.13107200000000000000e6
-117 3 14 27 -0.13107200000000000000e6
-117 4 1 5 -0.32768000000000000000e5
-117 4 1 13 -0.16384000000000000000e5
-117 4 5 17 -0.32768000000000000000e5
-117 4 7 19 0.65536000000000000000e5
-117 4 11 11 -0.32768000000000000000e5
-118 1 1 24 -0.16384000000000000000e5
-118 1 1 32 -0.65536000000000000000e5
-118 1 1 48 -0.16384000000000000000e5
-118 1 2 33 0.65536000000000000000e5
-118 1 2 49 -0.16384000000000000000e5
-118 1 3 34 -0.13107200000000000000e6
-118 1 6 37 -0.16384000000000000000e5
-118 1 7 22 -0.65536000000000000000e5
-118 1 8 23 -0.32768000000000000000e5
-118 1 8 39 0.32768000000000000000e5
-118 1 10 41 0.65536000000000000000e5
-118 1 12 27 0.13107200000000000000e6
-118 1 22 37 0.16384000000000000000e5
-118 1 23 38 -0.16384000000000000000e5
-118 2 1 7 -0.32768000000000000000e5
-118 2 2 16 -0.16384000000000000000e5
-118 2 2 32 -0.16384000000000000000e5
-118 2 3 17 0.16384000000000000000e5
-118 2 4 26 -0.16384000000000000000e5
-118 2 6 20 -0.65536000000000000000e5
-118 2 7 21 0.65536000000000000000e5
-118 3 1 16 -0.16384000000000000000e5
-118 3 1 30 -0.32768000000000000000e5
-118 3 3 16 -0.16384000000000000000e5
-118 3 8 21 0.65536000000000000000e5
-118 4 1 5 0.32768000000000000000e5
-118 4 1 13 -0.16384000000000000000e5
-119 1 10 21 -0.40960000000000000000e4
-119 1 13 20 -0.40960000000000000000e4
-119 1 16 19 -0.81920000000000000000e4
-119 1 17 32 0.40960000000000000000e4
-119 1 18 21 -0.16384000000000000000e5
-119 1 18 33 0.20480000000000000000e4
-119 1 19 20 -0.16384000000000000000e5
-119 1 20 27 0.20480000000000000000e4
-119 1 20 35 0.81920000000000000000e4
-119 1 21 46 0.16384000000000000000e5
-119 1 29 36 0.40960000000000000000e4
-119 2 11 25 0.20480000000000000000e4
-119 2 13 15 -0.81920000000000000000e4
-119 2 14 24 0.20480000000000000000e4
-119 2 15 15 -0.32768000000000000000e5
-119 2 15 25 0.81920000000000000000e4
-119 3 10 15 -0.40960000000000000000e4
-119 3 12 25 0.40960000000000000000e4
-119 3 14 15 -0.81920000000000000000e4
-119 4 10 10 -0.81920000000000000000e4
-120 1 14 21 0.16384000000000000000e5
-120 1 19 20 -0.32768000000000000000e5
-120 1 35 36 0.16384000000000000000e5
-120 3 14 15 -0.16384000000000000000e5
-121 1 10 21 -0.81920000000000000000e4
-121 1 13 20 -0.81920000000000000000e4
-121 1 14 21 -0.16384000000000000000e5
-121 1 16 19 -0.16384000000000000000e5
-121 1 17 32 0.81920000000000000000e4
-121 1 18 33 0.40960000000000000000e4
-121 1 20 27 0.40960000000000000000e4
-121 1 21 44 0.16384000000000000000e5
-121 1 29 36 0.81920000000000000000e4
-121 2 11 25 0.40960000000000000000e4
-121 2 13 15 -0.16384000000000000000e5
-121 2 14 24 0.40960000000000000000e4
-121 3 10 15 -0.81920000000000000000e4
-121 3 12 25 0.81920000000000000000e4
-121 4 10 10 -0.16384000000000000000e5
-122 1 14 21 -0.32768000000000000000e5
-122 1 17 32 0.81920000000000000000e4
-122 1 18 33 0.81920000000000000000e4
-122 1 29 36 0.81920000000000000000e4
-122 1 33 36 0.16384000000000000000e5
-122 2 14 24 0.81920000000000000000e4
-122 3 12 25 0.81920000000000000000e4
-123 1 10 21 -0.16384000000000000000e5
-123 1 13 20 -0.16384000000000000000e5
-123 1 17 32 0.32768000000000000000e5
-123 1 18 33 0.16384000000000000000e5
-123 1 19 34 -0.32768000000000000000e5
-123 1 20 27 0.16384000000000000000e5
-123 1 29 36 0.32768000000000000000e5
-123 2 11 25 0.16384000000000000000e5
-123 2 14 24 0.16384000000000000000e5
-123 3 10 15 -0.16384000000000000000e5
-123 3 12 25 0.32768000000000000000e5
-123 3 15 24 -0.16384000000000000000e5
-123 4 10 10 -0.32768000000000000000e5
-124 1 5 20 0.40960000000000000000e4
-124 1 10 17 0.81920000000000000000e4
-124 1 13 16 0.81920000000000000000e4
-124 1 13 44 0.40960000000000000000e4
-124 1 16 19 -0.32768000000000000000e5
-124 1 19 42 0.81920000000000000000e4
-124 1 20 27 0.16384000000000000000e5
-124 1 28 35 -0.40960000000000000000e4
-124 1 29 36 0.81920000000000000000e4
-124 2 8 14 0.40960000000000000000e4
-124 2 11 13 0.81920000000000000000e4
-124 2 15 29 0.81920000000000000000e4
-124 3 2 15 0.40960000000000000000e4
-124 3 8 13 0.81920000000000000000e4
-124 3 10 15 -0.16384000000000000000e5
-124 3 10 23 -0.40960000000000000000e4
-124 3 11 24 -0.81920000000000000000e4
-124 4 6 10 0.40960000000000000000e4
-124 4 10 14 -0.40960000000000000000e4
-125 1 10 21 -0.32768000000000000000e5
-125 1 15 46 0.16384000000000000000e5
-125 1 29 36 0.16384000000000000000e5
-125 3 12 25 0.16384000000000000000e5
-126 1 13 20 -0.32768000000000000000e5
-126 1 17 32 0.16384000000000000000e5
-126 1 29 36 0.16384000000000000000e5
-127 1 4 19 -0.81920000000000000000e4
-127 1 5 20 -0.81920000000000000000e4
-127 1 10 17 -0.16384000000000000000e5
-127 1 13 16 -0.16384000000000000000e5
-127 1 19 42 0.16384000000000000000e5
-127 1 28 35 0.81920000000000000000e4
-127 2 8 14 -0.81920000000000000000e4
-127 2 11 13 -0.16384000000000000000e5
-127 3 2 15 -0.81920000000000000000e4
-127 3 8 13 -0.81920000000000000000e4
-127 3 11 24 0.81920000000000000000e4
-127 4 6 10 -0.81920000000000000000e4
-128 1 4 19 -0.81920000000000000000e4
-128 1 12 19 -0.32768000000000000000e5
-128 1 13 44 0.81920000000000000000e4
-128 1 16 31 0.16384000000000000000e5
-128 1 20 27 0.16384000000000000000e5
-128 3 8 13 0.81920000000000000000e4
-128 3 10 23 -0.81920000000000000000e4
-128 3 11 24 -0.81920000000000000000e4
-128 4 10 14 -0.81920000000000000000e4
-129 1 4 19 0.16384000000000000000e5
-129 1 5 20 0.16384000000000000000e5
-129 1 5 36 0.16384000000000000000e5
-129 1 6 21 0.32768000000000000000e5
-129 1 10 17 0.16384000000000000000e5
-129 1 10 21 -0.65536000000000000000e5
-129 1 11 46 0.16384000000000000000e5
-129 2 8 14 0.16384000000000000000e5
-129 2 9 15 0.32768000000000000000e5
-130 1 4 19 -0.16384000000000000000e5
-130 1 5 20 -0.16384000000000000000e5
-130 1 10 17 -0.16384000000000000000e5
-130 1 14 45 0.16384000000000000000e5
-130 1 28 35 0.16384000000000000000e5
-130 2 8 14 -0.16384000000000000000e5
-130 3 11 24 0.16384000000000000000e5
-131 1 4 19 0.16384000000000000000e5
-131 1 10 17 -0.16384000000000000000e5
-131 1 20 27 -0.32768000000000000000e5
-131 1 28 35 0.32768000000000000000e5
-131 3 2 15 -0.16384000000000000000e5
-131 3 8 13 -0.32768000000000000000e5
-131 3 11 24 0.16384000000000000000e5
-131 4 6 10 -0.16384000000000000000e5
-132 1 4 19 -0.16384000000000000000e5
-132 1 13 16 -0.32768000000000000000e5
-132 1 13 44 0.16384000000000000000e5
-132 1 20 27 0.32768000000000000000e5
-132 1 28 35 -0.16384000000000000000e5
-132 2 10 24 -0.16384000000000000000e5
-132 3 8 13 0.16384000000000000000e5
-132 3 11 24 -0.16384000000000000000e5
-133 1 7 16 -0.16384000000000000000e5
-133 1 13 16 -0.32768000000000000000e5
-133 1 16 31 0.32768000000000000000e5
-133 2 1 15 -0.16384000000000000000e5
-133 3 8 13 0.16384000000000000000e5
-133 3 10 23 -0.16384000000000000000e5
-133 4 8 8 0.32768000000000000000e5
-134 1 5 20 -0.32768000000000000000e5
-134 1 14 45 0.32768000000000000000e5
-134 1 17 48 -0.16384000000000000000e5
-134 2 14 28 -0.16384000000000000000e5
-134 3 14 19 0.16384000000000000000e5
-134 3 14 27 -0.16384000000000000000e5
-135 1 4 35 0.16384000000000000000e5
-135 1 10 17 -0.32768000000000000000e5
-135 1 18 25 0.16384000000000000000e5
-135 3 14 19 -0.16384000000000000000e5
-136 1 4 19 -0.32768000000000000000e5
-136 1 4 35 -0.16384000000000000000e5
-136 1 17 48 0.16384000000000000000e5
-136 1 18 25 -0.16384000000000000000e5
-136 1 28 35 0.32768000000000000000e5
-136 2 9 23 -0.16384000000000000000e5
-136 3 11 24 0.32768000000000000000e5
-136 3 14 27 0.16384000000000000000e5
-137 1 3 34 0.16384000000000000000e5
-137 1 4 19 0.32768000000000000000e5
-137 1 12 43 0.16384000000000000000e5
-137 1 20 27 -0.65536000000000000000e5
-137 1 28 35 0.32768000000000000000e5
-137 2 10 24 0.32768000000000000000e5
-137 3 2 15 -0.32768000000000000000e5
-137 3 8 13 -0.32768000000000000000e5
-137 3 11 24 0.32768000000000000000e5
-138 1 2 17 0.16384000000000000000e5
-138 1 13 16 -0.65536000000000000000e5
-138 1 16 47 0.16384000000000000000e5
-138 1 20 27 0.65536000000000000000e5
-138 1 28 35 -0.32768000000000000000e5
-138 2 7 13 0.32768000000000000000e5
-138 2 10 24 -0.32768000000000000000e5
-138 3 1 14 -0.16384000000000000000e5
-138 3 2 15 0.32768000000000000000e5
-138 3 8 13 0.32768000000000000000e5
-138 3 11 24 -0.32768000000000000000e5
-138 3 13 26 0.16384000000000000000e5
-139 1 2 17 0.16384000000000000000e5
-139 1 7 16 -0.32768000000000000000e5
-139 1 12 27 0.16384000000000000000e5
-139 3 1 14 -0.16384000000000000000e5
-139 3 6 23 -0.16384000000000000000e5
-140 1 11 14 -0.32768000000000000000e5
-140 1 11 42 0.16384000000000000000e5
-140 1 26 33 0.16384000000000000000e5
-140 3 9 22 0.16384000000000000000e5
-141 1 3 18 0.32768000000000000000e5
-141 1 4 35 0.32768000000000000000e5
-141 1 10 17 -0.65536000000000000000e5
-141 1 10 41 -0.16384000000000000000e5
-141 1 11 14 0.32768000000000000000e5
-141 2 8 22 -0.16384000000000000000e5
-141 2 9 11 0.32768000000000000000e5
-141 3 8 21 -0.16384000000000000000e5
-141 3 9 22 -0.16384000000000000000e5
-142 1 3 18 -0.32768000000000000000e5
-142 1 11 42 -0.16384000000000000000e5
-142 1 17 48 0.32768000000000000000e5
-142 2 8 22 -0.16384000000000000000e5
-142 3 8 21 0.16384000000000000000e5
-142 3 14 27 0.32768000000000000000e5
-142 4 4 16 0.16384000000000000000e5
-143 1 2 17 0.32768000000000000000e5
-143 1 2 33 0.16384000000000000000e5
-143 1 3 18 0.32768000000000000000e5
-143 1 4 19 0.65536000000000000000e5
-143 1 10 41 0.16384000000000000000e5
-143 1 20 27 -0.13107200000000000000e6
-143 1 28 35 0.65536000000000000000e5
-143 2 6 12 0.32768000000000000000e5
-143 2 10 24 0.65536000000000000000e5
-143 3 2 15 -0.65536000000000000000e5
-143 3 8 13 -0.65536000000000000000e5
-143 3 11 24 0.65536000000000000000e5
-144 1 2 17 -0.32768000000000000000e5
-144 1 2 33 -0.16384000000000000000e5
-144 1 3 34 0.32768000000000000000e5
-144 1 10 41 -0.16384000000000000000e5
-144 1 11 42 0.16384000000000000000e5
-144 1 12 43 0.32768000000000000000e5
-144 1 17 48 -0.32768000000000000000e5
-144 2 7 21 -0.16384000000000000000e5
-144 2 8 22 0.16384000000000000000e5
-144 2 12 26 -0.16384000000000000000e5
-144 3 8 21 -0.16384000000000000000e5
-144 3 14 27 -0.32768000000000000000e5
-144 4 4 16 -0.16384000000000000000e5
-145 1 1 8 -0.81920000000000000000e4
-145 1 1 32 0.16384000000000000000e5
-145 1 1 40 -0.40960000000000000000e4
-145 1 2 5 0.40960000000000000000e4
-145 1 2 9 -0.16384000000000000000e5
-145 1 2 17 0.32768000000000000000e5
-145 1 2 33 -0.16384000000000000000e5
-145 1 3 18 0.65536000000000000000e5
-145 1 3 34 0.65536000000000000000e5
-145 1 4 19 0.65536000000000000000e5
-145 1 4 35 0.65536000000000000000e5
-145 1 6 13 -0.16384000000000000000e5
-145 1 7 22 0.81920000000000000000e4
-145 1 7 38 -0.81920000000000000000e4
-145 1 8 23 0.24576000000000000000e5
-145 1 10 41 -0.32768000000000000000e5
-145 1 11 42 -0.16384000000000000000e5
-145 1 12 27 -0.32768000000000000000e5
-145 1 18 25 0.32768000000000000000e5
-145 1 20 27 -0.13107200000000000000e6
-145 2 1 3 -0.40960000000000000000e4
-145 2 2 16 0.40960000000000000000e4
-145 2 4 10 0.16384000000000000000e5
-145 2 6 12 0.32768000000000000000e5
-145 2 7 21 -0.32768000000000000000e5
-145 2 8 22 -0.16384000000000000000e5
-145 2 9 23 0.32768000000000000000e5
-145 2 10 24 0.65536000000000000000e5
-145 3 1 2 -0.40960000000000000000e4
-145 3 2 15 -0.65536000000000000000e5
-145 3 3 16 0.40960000000000000000e4
-145 3 4 17 0.40960000000000000000e4
-145 3 6 7 -0.16384000000000000000e5
-145 3 6 19 0.81920000000000000000e4
-145 3 7 20 -0.32768000000000000000e5
-145 3 8 13 -0.65536000000000000000e5
-145 3 8 21 -0.32768000000000000000e5
-145 3 9 22 -0.16384000000000000000e5
-145 4 1 5 -0.81920000000000000000e4
-145 4 1 13 0.40960000000000000000e4
-145 4 2 2 0.81920000000000000000e4
-145 4 2 14 0.81920000000000000000e4
-145 4 4 8 -0.16384000000000000000e5
-145 4 5 5 -0.32768000000000000000e5
-146 1 1 16 -0.32768000000000000000e5
-146 1 1 32 -0.16384000000000000000e5
-146 1 2 17 0.32768000000000000000e5
-146 1 2 33 0.32768000000000000000e5
-146 1 3 34 -0.65536000000000000000e5
-146 1 10 41 0.32768000000000000000e5
-146 1 11 42 -0.16384000000000000000e5
-146 1 12 27 0.32768000000000000000e5
-146 1 12 43 -0.32768000000000000000e5
-146 1 17 48 0.32768000000000000000e5
-146 2 1 31 -0.16384000000000000000e5
-146 2 6 20 -0.16384000000000000000e5
-146 2 7 21 0.32768000000000000000e5
-146 2 8 22 -0.16384000000000000000e5
-146 2 12 26 0.16384000000000000000e5
-146 3 1 14 -0.32768000000000000000e5
-146 3 6 23 -0.32768000000000000000e5
-146 3 7 20 0.16384000000000000000e5
-146 3 8 21 0.32768000000000000000e5
-146 3 14 27 0.32768000000000000000e5
-146 4 4 16 0.16384000000000000000e5
-147 1 3 18 0.65536000000000000000e5
-147 1 6 13 0.32768000000000000000e5
-147 1 6 29 0.16384000000000000000e5
-147 1 6 43 0.16384000000000000000e5
-147 1 10 17 -0.13107200000000000000e6
-147 1 10 41 0.32768000000000000000e5
-147 1 11 14 0.65536000000000000000e5
-147 2 5 11 0.32768000000000000000e5
-147 2 9 11 0.65536000000000000000e5
-147 3 5 10 0.32768000000000000000e5
-147 3 8 21 0.32768000000000000000e5
-148 1 6 13 -0.32768000000000000000e5
-148 1 10 25 0.16384000000000000000e5
-148 1 26 29 0.16384000000000000000e5
-149 1 1 48 -0.81920000000000000000e4
-149 1 2 49 -0.81920000000000000000e4
-149 1 5 52 0.32768000000000000000e5
-149 1 8 39 -0.16384000000000000000e5
-149 1 9 40 0.16384000000000000000e5
-149 1 10 25 -0.16384000000000000000e5
-149 1 11 42 0.32768000000000000000e5
-149 1 12 43 0.65536000000000000000e5
-149 1 17 48 -0.13107200000000000000e6
-149 1 23 38 -0.81920000000000000000e4
-149 1 26 41 0.16384000000000000000e5
-149 1 28 43 0.32768000000000000000e5
-149 2 2 32 -0.81920000000000000000e4
-149 2 8 22 0.65536000000000000000e5
-149 2 12 26 -0.32768000000000000000e5
-149 2 16 30 -0.16384000000000000000e5
-149 3 2 31 -0.32768000000000000000e5
-149 3 5 10 -0.32768000000000000000e5
-149 3 6 19 -0.16384000000000000000e5
-149 3 14 27 -0.65536000000000000000e5
-149 4 3 15 -0.16384000000000000000e5
-149 4 4 16 -0.65536000000000000000e5
-149 4 6 18 -0.16384000000000000000e5
-149 4 7 19 -0.32768000000000000000e5
-150 1 1 48 -0.81920000000000000000e4
-150 1 2 33 -0.32768000000000000000e5
-150 1 2 49 -0.81920000000000000000e4
-150 1 3 18 -0.65536000000000000000e5
-150 1 4 35 -0.13107200000000000000e6
-150 1 5 52 0.32768000000000000000e5
-150 1 6 13 0.32768000000000000000e5
-150 1 9 40 -0.16384000000000000000e5
-150 1 10 41 0.65536000000000000000e5
-150 1 11 42 0.65536000000000000000e5
-150 1 12 43 0.65536000000000000000e5
-150 1 17 48 -0.13107200000000000000e6
-150 1 18 25 -0.65536000000000000000e5
-150 1 23 38 -0.81920000000000000000e4
-150 1 26 41 0.16384000000000000000e5
-150 1 28 35 0.13107200000000000000e6
-150 1 28 43 0.32768000000000000000e5
-150 2 2 32 -0.81920000000000000000e4
-150 2 8 22 0.98304000000000000000e5
-150 2 9 23 -0.65536000000000000000e5
-150 2 12 26 -0.32768000000000000000e5
-150 2 16 30 -0.16384000000000000000e5
-150 3 2 31 -0.32768000000000000000e5
-150 3 5 10 0.32768000000000000000e5
-150 3 6 19 0.16384000000000000000e5
-150 3 8 21 0.32768000000000000000e5
-150 3 9 22 0.32768000000000000000e5
-150 3 11 24 0.13107200000000000000e6
-150 3 14 27 -0.65536000000000000000e5
-150 4 4 8 0.32768000000000000000e5
-150 4 4 16 -0.65536000000000000000e5
-150 4 6 18 -0.16384000000000000000e5
-150 4 7 19 -0.32768000000000000000e5
-151 1 1 48 0.81920000000000000000e4
-151 1 2 17 0.65536000000000000000e5
-151 1 2 33 0.32768000000000000000e5
-151 1 2 49 0.81920000000000000000e4
-151 1 3 18 0.13107200000000000000e6
-151 1 4 19 0.13107200000000000000e6
-151 1 4 35 0.13107200000000000000e6
-151 1 6 13 -0.32768000000000000000e5
-151 1 7 38 0.16384000000000000000e5
-151 1 8 23 -0.16384000000000000000e5
-151 1 8 39 0.16384000000000000000e5
-151 1 11 42 -0.32768000000000000000e5
-151 1 18 25 0.65536000000000000000e5
-151 1 20 27 -0.26214400000000000000e6
-151 1 23 38 0.81920000000000000000e4
-151 2 2 32 0.81920000000000000000e4
-151 2 4 10 0.32768000000000000000e5
-151 2 6 12 0.65536000000000000000e5
-151 2 8 22 -0.32768000000000000000e5
-151 2 9 23 0.65536000000000000000e5
-151 2 10 24 0.13107200000000000000e6
-151 3 1 30 0.16384000000000000000e5
-151 3 2 15 -0.13107200000000000000e6
-151 3 6 19 -0.16384000000000000000e5
-151 3 7 20 0.32768000000000000000e5
-151 3 8 13 -0.13107200000000000000e6
-151 3 9 22 -0.32768000000000000000e5
-151 4 2 14 -0.16384000000000000000e5
-151 4 4 8 -0.32768000000000000000e5
-152 1 1 32 -0.32768000000000000000e5
-152 1 1 48 0.81920000000000000000e4
-152 1 2 49 0.81920000000000000000e4
-152 1 8 23 0.16384000000000000000e5
-152 1 23 38 0.81920000000000000000e4
-152 2 2 32 0.81920000000000000000e4
-152 3 1 30 0.16384000000000000000e5
-152 3 6 7 -0.32768000000000000000e5
-153 1 1 8 -0.16384000000000000000e5
-153 1 1 40 -0.81920000000000000000e4
-153 1 2 5 0.81920000000000000000e4
-153 1 2 9 -0.32768000000000000000e5
-153 1 8 23 0.32768000000000000000e5
-153 2 1 3 -0.81920000000000000000e4
-153 2 1 7 -0.16384000000000000000e5
-153 2 2 16 0.81920000000000000000e4
-153 3 1 2 -0.81920000000000000000e4
-153 3 3 16 0.81920000000000000000e4
-153 3 4 17 0.81920000000000000000e4
-153 3 6 19 0.16384000000000000000e5
-153 3 7 20 -0.32768000000000000000e5
-153 4 1 13 0.81920000000000000000e4
-153 4 2 2 0.16384000000000000000e5
-153 4 2 14 0.16384000000000000000e5
-154 1 1 12 -0.32768000000000000000e5
-154 1 1 24 -0.81920000000000000000e4
-154 1 1 32 -0.32768000000000000000e5
-154 1 1 40 -0.81920000000000000000e4
-154 1 2 49 -0.81920000000000000000e4
-154 1 3 50 0.16384000000000000000e5
-154 1 5 52 -0.32768000000000000000e5
-154 1 6 37 -0.81920000000000000000e4
-154 1 8 23 -0.16384000000000000000e5
-154 1 11 42 0.32768000000000000000e5
-154 1 12 27 0.65536000000000000000e5
-154 1 12 43 0.65536000000000000000e5
-154 1 16 47 -0.65536000000000000000e5
-154 1 22 37 0.81920000000000000000e4
-154 1 28 43 -0.32768000000000000000e5
-154 2 1 7 -0.16384000000000000000e5
-154 2 2 16 -0.81920000000000000000e4
-154 2 2 32 -0.81920000000000000000e4
-154 2 3 17 0.81920000000000000000e4
-154 2 4 26 -0.81920000000000000000e4
-154 2 6 20 -0.32768000000000000000e5
-154 2 10 32 0.32768000000000000000e5
-154 2 12 26 -0.32768000000000000000e5
-154 2 16 16 0.16384000000000000000e5
-154 3 1 16 -0.81920000000000000000e4
-154 3 1 30 -0.32768000000000000000e5
-154 3 2 31 -0.32768000000000000000e5
-154 3 3 16 -0.81920000000000000000e4
-154 3 7 20 -0.32768000000000000000e5
-154 3 14 27 -0.65536000000000000000e5
-154 4 1 5 0.16384000000000000000e5
-154 4 1 13 -0.81920000000000000000e4
-154 4 5 17 -0.16384000000000000000e5
-154 4 7 19 0.32768000000000000000e5
-154 4 11 11 -0.16384000000000000000e5
-155 1 3 18 0.13107200000000000000e6
-155 1 6 11 0.32768000000000000000e5
-155 1 6 13 0.65536000000000000000e5
-155 1 6 25 0.16384000000000000000e5
-155 1 6 37 0.16384000000000000000e5
-155 1 9 40 -0.32768000000000000000e5
-155 1 10 17 -0.26214400000000000000e6
-155 1 10 25 0.32768000000000000000e5
-155 1 10 41 0.65536000000000000000e5
-155 1 11 14 0.13107200000000000000e6
-155 1 26 29 0.32768000000000000000e5
-155 2 5 9 0.32768000000000000000e5
-155 2 5 11 0.65536000000000000000e5
-155 2 5 27 0.16384000000000000000e5
-155 2 9 11 0.13107200000000000000e6
-155 2 19 19 -0.32768000000000000000e5
-155 3 4 9 0.32768000000000000000e5
-155 3 5 10 0.65536000000000000000e5
-155 3 8 21 0.65536000000000000000e5
-156 1 6 37 -0.16384000000000000000e5
-156 1 9 40 0.32768000000000000000e5
-156 1 10 25 -0.32768000000000000000e5
-156 2 5 27 -0.16384000000000000000e5
-156 3 4 9 -0.32768000000000000000e5
-156 3 5 18 0.16384000000000000000e5
-157 1 1 40 0.16384000000000000000e5
-157 1 1 48 -0.16384000000000000000e5
-157 1 2 49 -0.16384000000000000000e5
-157 1 5 52 0.65536000000000000000e5
-157 1 6 37 0.16384000000000000000e5
-157 1 8 39 -0.32768000000000000000e5
-157 1 11 42 0.65536000000000000000e5
-157 1 12 43 0.13107200000000000000e6
-157 1 17 48 -0.26214400000000000000e6
-157 1 23 38 -0.16384000000000000000e5
-157 1 26 41 0.32768000000000000000e5
-157 1 28 43 0.65536000000000000000e5
-157 2 2 32 -0.16384000000000000000e5
-157 2 3 9 0.32768000000000000000e5
-157 2 4 18 -0.16384000000000000000e5
-157 2 4 26 0.16384000000000000000e5
-157 2 8 22 0.13107200000000000000e6
-157 2 12 26 -0.65536000000000000000e5
-157 2 16 30 -0.32768000000000000000e5
-157 3 2 31 -0.65536000000000000000e5
-157 3 3 8 0.32768000000000000000e5
-157 3 4 9 0.32768000000000000000e5
-157 3 4 17 -0.16384000000000000000e5
-157 3 5 10 -0.65536000000000000000e5
-157 3 5 18 -0.16384000000000000000e5
-157 3 14 27 -0.13107200000000000000e6
-157 4 3 15 -0.32768000000000000000e5
-157 4 4 16 -0.13107200000000000000e6
-157 4 6 18 -0.32768000000000000000e5
-157 4 7 19 -0.65536000000000000000e5
-158 1 1 40 -0.16384000000000000000e5
-158 2 4 26 -0.16384000000000000000e5
-158 3 3 8 -0.32768000000000000000e5
-158 3 4 17 0.16384000000000000000e5
-158 3 6 19 -0.32768000000000000000e5
-159 1 2 9 0.32768000000000000000e5
-159 1 2 17 0.13107200000000000000e6
-159 1 2 33 0.65536000000000000000e5
-159 1 3 18 0.26214400000000000000e6
-159 1 4 19 0.26214400000000000000e6
-159 1 4 35 0.26214400000000000000e6
-159 1 6 13 -0.65536000000000000000e5
-159 1 6 37 -0.16384000000000000000e5
-159 1 7 38 0.32768000000000000000e5
-159 1 8 23 -0.32768000000000000000e5
-159 1 8 39 0.65536000000000000000e5
-159 1 11 42 -0.65536000000000000000e5
-159 1 18 25 0.13107200000000000000e6
-159 1 20 27 -0.52428800000000000000e6
-159 2 2 8 0.32768000000000000000e5
-159 2 4 10 0.65536000000000000000e5
-159 2 4 26 -0.16384000000000000000e5
-159 2 6 12 0.13107200000000000000e6
-159 2 8 22 -0.65536000000000000000e5
-159 2 9 23 0.13107200000000000000e6
-159 2 10 24 0.26214400000000000000e6
-159 3 2 15 -0.26214400000000000000e6
-159 3 3 8 0.32768000000000000000e5
-159 3 3 16 -0.16384000000000000000e5
-159 3 4 17 -0.16384000000000000000e5
-159 3 7 20 0.65536000000000000000e5
-159 3 8 13 -0.26214400000000000000e6
-159 3 9 22 -0.65536000000000000000e5
-159 4 1 13 -0.16384000000000000000e5
-159 4 2 14 -0.32768000000000000000e5
-159 4 4 8 -0.65536000000000000000e5
-160 1 1 40 0.16384000000000000000e5
-160 1 1 48 0.16384000000000000000e5
-160 1 2 9 -0.32768000000000000000e5
-160 1 2 49 0.16384000000000000000e5
-160 1 6 37 0.16384000000000000000e5
-160 1 8 39 -0.32768000000000000000e5
-160 1 23 38 0.16384000000000000000e5
-160 2 2 32 0.16384000000000000000e5
-160 2 3 17 -0.16384000000000000000e5
-160 2 4 26 0.16384000000000000000e5
-160 3 1 30 0.32768000000000000000e5
-160 3 3 16 0.16384000000000000000e5
-160 4 1 13 0.16384000000000000000e5
-161 1 1 24 0.16384000000000000000e5
-161 1 1 32 0.65536000000000000000e5
-161 1 1 40 -0.16384000000000000000e5
-161 1 1 48 0.16384000000000000000e5
-161 1 2 5 0.16384000000000000000e5
-161 1 2 9 -0.32768000000000000000e5
-161 1 2 33 -0.65536000000000000000e5
-161 1 2 49 0.16384000000000000000e5
-161 1 3 34 0.13107200000000000000e6
-161 1 6 37 0.16384000000000000000e5
-161 1 7 22 0.32768000000000000000e5
-161 1 7 38 -0.32768000000000000000e5
-161 1 8 23 0.98304000000000000000e5
-161 1 8 39 -0.32768000000000000000e5
-161 1 10 41 -0.65536000000000000000e5
-161 1 12 27 -0.13107200000000000000e6
-161 1 23 38 0.16384000000000000000e5
-161 2 1 3 -0.16384000000000000000e5
-161 2 1 7 0.32768000000000000000e5
-161 2 2 16 0.16384000000000000000e5
-161 2 2 32 0.16384000000000000000e5
-161 2 3 17 -0.16384000000000000000e5
-161 2 4 26 0.16384000000000000000e5
-161 2 6 20 0.65536000000000000000e5
-161 2 7 21 -0.65536000000000000000e5
-161 3 1 2 -0.16384000000000000000e5
-161 3 1 30 0.32768000000000000000e5
-161 3 3 16 0.16384000000000000000e5
-161 3 4 17 0.16384000000000000000e5
-161 3 6 19 0.32768000000000000000e5
-161 3 7 20 -0.65536000000000000000e5
-161 3 8 21 -0.65536000000000000000e5
-161 4 1 5 -0.32768000000000000000e5
-161 4 1 13 0.32768000000000000000e5
-161 4 2 2 0.32768000000000000000e5
-161 4 2 14 0.32768000000000000000e5
-162 1 1 8 -0.32768000000000000000e5
-162 1 1 24 -0.16384000000000000000e5
-162 1 1 32 -0.65536000000000000000e5
-162 1 1 40 -0.16384000000000000000e5
-162 1 1 48 -0.16384000000000000000e5
-162 1 2 49 -0.32768000000000000000e5
-162 1 3 50 0.32768000000000000000e5
-162 1 5 52 -0.65536000000000000000e5
-162 1 6 37 -0.32768000000000000000e5
-162 1 7 22 -0.32768000000000000000e5
-162 1 8 23 -0.32768000000000000000e5
-162 1 8 39 0.32768000000000000000e5
-162 1 11 42 0.65536000000000000000e5
-162 1 12 27 0.13107200000000000000e6
-162 1 12 43 0.13107200000000000000e6
-162 1 16 47 -0.13107200000000000000e6
-162 1 22 37 0.16384000000000000000e5
-162 1 23 38 -0.16384000000000000000e5
-162 1 28 43 -0.65536000000000000000e5
-162 2 1 7 -0.32768000000000000000e5
-162 2 2 16 -0.16384000000000000000e5
-162 2 2 32 -0.32768000000000000000e5
-162 2 3 17 0.32768000000000000000e5
-162 2 4 26 -0.32768000000000000000e5
-162 2 6 20 -0.65536000000000000000e5
-162 2 10 32 0.65536000000000000000e5
-162 2 12 26 -0.65536000000000000000e5
-162 3 1 30 -0.98304000000000000000e5
-162 3 2 31 -0.65536000000000000000e5
-162 3 3 16 -0.16384000000000000000e5
-162 3 7 20 -0.65536000000000000000e5
-162 3 14 27 -0.13107200000000000000e6
-162 4 1 5 0.32768000000000000000e5
-162 4 1 13 -0.32768000000000000000e5
-162 4 5 17 -0.32768000000000000000e5
-162 4 7 19 0.65536000000000000000e5
-162 4 11 11 -0.32768000000000000000e5
-163 1 1 1 0.32768000000000000000e5
-163 1 1 8 0.32768000000000000000e5
-163 1 1 40 -0.16384000000000000000e5
-163 1 2 5 0.16384000000000000000e5
-163 1 2 9 -0.32768000000000000000e5
-163 1 7 22 -0.32768000000000000000e5
-163 1 7 38 -0.32768000000000000000e5
-163 1 8 23 0.65536000000000000000e5
-163 2 1 1 0.32768000000000000000e5
-163 3 1 16 0.16384000000000000000e5
-163 3 2 3 0.16384000000000000000e5
-163 3 3 16 0.16384000000000000000e5
-163 3 4 17 0.16384000000000000000e5
-163 3 6 19 0.32768000000000000000e5
-163 3 7 20 -0.65536000000000000000e5
-163 4 1 1 -0.32768000000000000000e5
-163 4 1 13 0.16384000000000000000e5
-163 4 2 2 0.32768000000000000000e5
-163 4 2 14 0.32768000000000000000e5
-164 1 1 3 0.32768000000000000000e5
-164 1 1 24 0.32768000000000000000e5
-164 1 1 32 0.13107200000000000000e6
-164 1 1 48 0.32768000000000000000e5
-164 1 2 33 -0.13107200000000000000e6
-164 1 2 49 0.32768000000000000000e5
-164 1 3 34 0.26214400000000000000e6
-164 1 6 37 0.32768000000000000000e5
-164 1 7 22 0.65536000000000000000e5
-164 1 8 23 0.65536000000000000000e5
-164 1 8 39 -0.65536000000000000000e5
-164 1 10 41 -0.13107200000000000000e6
-164 1 12 27 -0.26214400000000000000e6
-164 1 23 38 0.32768000000000000000e5
-164 2 1 7 0.65536000000000000000e5
-164 2 2 16 0.32768000000000000000e5
-164 2 2 32 0.32768000000000000000e5
-164 2 3 17 -0.32768000000000000000e5
-164 2 4 26 0.32768000000000000000e5
-164 2 6 20 0.13107200000000000000e6
-164 2 7 21 -0.13107200000000000000e6
-164 3 1 2 -0.32768000000000000000e5
-164 3 1 30 0.65536000000000000000e5
-164 3 3 16 0.32768000000000000000e5
-164 3 8 21 -0.13107200000000000000e6
-164 4 1 5 -0.65536000000000000000e5
-164 4 1 13 0.32768000000000000000e5
-165 1 1 4 0.32768000000000000000e5
-165 1 1 24 -0.32768000000000000000e5
-165 1 1 40 -0.32768000000000000000e5
-165 1 2 5 0.32768000000000000000e5
-165 1 2 9 -0.65536000000000000000e5
-165 1 7 38 -0.65536000000000000000e5
-165 1 8 23 0.13107200000000000000e6
-165 3 2 3 0.32768000000000000000e5
-165 3 3 16 0.32768000000000000000e5
-165 3 4 17 0.32768000000000000000e5
-165 3 6 19 0.65536000000000000000e5
-165 3 7 20 -0.13107200000000000000e6
-165 4 1 13 0.32768000000000000000e5
-165 4 2 2 0.65536000000000000000e5
-165 4 2 14 0.65536000000000000000e5
-166 1 1 5 0.32768000000000000000e5
-166 1 1 48 -0.32768000000000000000e5
-166 1 2 49 -0.32768000000000000000e5
-166 1 6 37 -0.32768000000000000000e5
-166 1 8 39 0.65536000000000000000e5
-166 1 23 38 -0.32768000000000000000e5
-166 2 2 32 -0.32768000000000000000e5
-166 2 3 17 0.32768000000000000000e5
-166 2 4 26 -0.32768000000000000000e5
-166 3 1 30 -0.65536000000000000000e5
-166 3 2 3 -0.32768000000000000000e5
-166 3 3 16 -0.32768000000000000000e5
-166 4 1 13 -0.32768000000000000000e5
-167 1 1 6 0.32768000000000000000e5
-167 1 2 5 -0.32768000000000000000e5
-168 1 1 2 -0.16384000000000000000e5
-168 1 1 7 0.32768000000000000000e5
-168 1 1 8 0.32768000000000000000e5
-168 1 1 24 0.16384000000000000000e5
-168 1 1 32 0.65536000000000000000e5
-168 1 1 40 -0.16384000000000000000e5
-168 1 1 48 0.16384000000000000000e5
-168 1 2 5 0.16384000000000000000e5
-168 1 2 9 -0.32768000000000000000e5
-168 1 2 33 -0.65536000000000000000e5
-168 1 2 49 0.16384000000000000000e5
-168 1 3 34 0.13107200000000000000e6
-168 1 6 37 0.16384000000000000000e5
-168 1 7 38 -0.32768000000000000000e5
-168 1 8 23 0.98304000000000000000e5
-168 1 8 39 -0.32768000000000000000e5
-168 1 10 41 -0.65536000000000000000e5
-168 1 12 27 -0.13107200000000000000e6
-168 1 23 38 0.16384000000000000000e5
-168 2 1 7 0.32768000000000000000e5
-168 2 2 16 0.16384000000000000000e5
-168 2 2 32 0.16384000000000000000e5
-168 2 3 17 -0.16384000000000000000e5
-168 2 4 26 0.16384000000000000000e5
-168 2 6 20 0.65536000000000000000e5
-168 2 7 21 -0.65536000000000000000e5
-168 3 1 2 -0.16384000000000000000e5
-168 3 1 16 0.16384000000000000000e5
-168 3 1 30 0.32768000000000000000e5
-168 3 2 3 0.16384000000000000000e5
-168 3 3 16 0.32768000000000000000e5
-168 3 4 17 0.16384000000000000000e5
-168 3 6 19 0.32768000000000000000e5
-168 3 7 20 -0.65536000000000000000e5
-168 3 8 21 -0.65536000000000000000e5
-168 4 1 1 -0.32768000000000000000e5
-168 4 1 5 -0.32768000000000000000e5
-168 4 1 13 0.32768000000000000000e5
-168 4 2 2 0.32768000000000000000e5
-168 4 2 14 0.32768000000000000000e5
-169 1 1 9 0.32768000000000000000e5
-169 1 1 32 0.65536000000000000000e5
-169 1 1 40 -0.16384000000000000000e5
-169 1 2 5 0.16384000000000000000e5
-169 1 2 9 -0.32768000000000000000e5
-169 1 2 33 -0.65536000000000000000e5
-169 1 3 34 0.13107200000000000000e6
-169 1 7 22 0.32768000000000000000e5
-169 1 7 38 -0.32768000000000000000e5
-169 1 8 23 0.98304000000000000000e5
-169 1 10 41 -0.65536000000000000000e5
-169 1 12 27 -0.13107200000000000000e6
-169 2 1 3 -0.16384000000000000000e5
-169 2 1 7 0.32768000000000000000e5
-169 2 2 16 0.16384000000000000000e5
-169 2 6 20 0.65536000000000000000e5
-169 2 7 21 -0.65536000000000000000e5
-169 3 1 2 -0.16384000000000000000e5
-169 3 3 16 0.16384000000000000000e5
-169 3 4 17 0.16384000000000000000e5
-169 3 6 19 0.32768000000000000000e5
-169 3 7 20 -0.65536000000000000000e5
-169 3 8 21 -0.65536000000000000000e5
-169 4 1 5 -0.32768000000000000000e5
-169 4 1 13 0.16384000000000000000e5
-169 4 2 2 0.32768000000000000000e5
-169 4 2 14 0.32768000000000000000e5
-170 1 1 10 0.32768000000000000000e5
-170 1 2 9 -0.32768000000000000000e5
-171 1 1 11 0.32768000000000000000e5
-171 1 2 9 0.32768000000000000000e5
-171 1 2 17 0.13107200000000000000e6
-171 1 2 33 0.65536000000000000000e5
-171 1 3 18 0.26214400000000000000e6
-171 1 4 19 0.26214400000000000000e6
-171 1 4 35 0.26214400000000000000e6
-171 1 6 13 -0.65536000000000000000e5
-171 1 8 39 0.32768000000000000000e5
-171 1 11 42 -0.65536000000000000000e5
-171 1 18 25 0.13107200000000000000e6
-171 1 20 27 -0.52428800000000000000e6
-171 2 2 8 0.32768000000000000000e5
-171 2 4 10 0.65536000000000000000e5
-171 2 6 12 0.13107200000000000000e6
-171 2 8 22 -0.65536000000000000000e5
-171 2 9 23 0.13107200000000000000e6
-171 2 10 24 0.26214400000000000000e6
-171 3 2 15 -0.26214400000000000000e6
-171 3 3 8 0.32768000000000000000e5
-171 3 6 19 0.32768000000000000000e5
-171 3 8 13 -0.26214400000000000000e6
-171 3 9 22 -0.65536000000000000000e5
-171 4 4 8 -0.65536000000000000000e5
-172 1 1 8 -0.16384000000000000000e5
-172 1 1 13 0.32768000000000000000e5
-172 1 1 32 0.32768000000000000000e5
-172 1 1 40 -0.81920000000000000000e4
-172 1 2 5 0.81920000000000000000e4
-172 1 2 9 -0.32768000000000000000e5
-172 1 2 33 -0.32768000000000000000e5
-172 1 3 34 0.65536000000000000000e5
-172 1 7 22 0.16384000000000000000e5
-172 1 7 38 -0.16384000000000000000e5
-172 1 8 23 0.49152000000000000000e5
-172 1 10 41 -0.32768000000000000000e5
-172 1 12 27 -0.65536000000000000000e5
-172 2 1 3 -0.81920000000000000000e4
-172 2 2 16 0.81920000000000000000e4
-172 2 6 20 0.32768000000000000000e5
-172 2 7 21 -0.32768000000000000000e5
-172 3 1 2 -0.81920000000000000000e4
-172 3 3 16 0.81920000000000000000e4
-172 3 4 17 0.81920000000000000000e4
-172 3 6 19 0.16384000000000000000e5
-172 3 7 20 -0.32768000000000000000e5
-172 3 8 21 -0.32768000000000000000e5
-172 4 1 5 -0.16384000000000000000e5
-172 4 1 13 0.81920000000000000000e4
-172 4 2 2 0.16384000000000000000e5
-172 4 2 14 0.16384000000000000000e5
-173 1 1 14 0.32768000000000000000e5
-173 1 1 32 -0.32768000000000000000e5
-173 3 6 7 -0.32768000000000000000e5
-174 1 1 15 0.32768000000000000000e5
-174 1 2 17 0.65536000000000000000e5
-174 1 2 33 0.32768000000000000000e5
-174 1 3 18 0.13107200000000000000e6
-174 1 4 19 0.13107200000000000000e6
-174 1 4 35 0.13107200000000000000e6
-174 1 6 13 -0.32768000000000000000e5
-174 1 11 42 -0.32768000000000000000e5
-174 1 18 25 0.65536000000000000000e5
-174 1 20 27 -0.26214400000000000000e6
-174 2 4 10 0.32768000000000000000e5
-174 2 6 12 0.65536000000000000000e5
-174 2 8 22 -0.32768000000000000000e5
-174 2 9 23 0.65536000000000000000e5
-174 2 10 24 0.13107200000000000000e6
-174 3 2 15 -0.13107200000000000000e6
-174 3 8 13 -0.13107200000000000000e6
-174 3 9 22 -0.32768000000000000000e5
-174 4 4 8 -0.32768000000000000000e5
-175 1 1 8 -0.81920000000000000000e4
-175 1 1 17 0.32768000000000000000e5
-175 1 1 40 -0.40960000000000000000e4
-175 1 2 5 0.40960000000000000000e4
-175 1 2 9 -0.16384000000000000000e5
-175 1 2 17 0.32768000000000000000e5
-175 1 3 18 0.65536000000000000000e5
-175 1 3 34 0.32768000000000000000e5
-175 1 4 19 0.65536000000000000000e5
-175 1 4 35 0.65536000000000000000e5
-175 1 6 13 -0.16384000000000000000e5
-175 1 7 22 0.81920000000000000000e4
-175 1 7 38 -0.81920000000000000000e4
-175 1 8 23 0.24576000000000000000e5
-175 1 10 41 -0.16384000000000000000e5
-175 1 11 42 -0.16384000000000000000e5
-175 1 12 27 -0.32768000000000000000e5
-175 1 18 25 0.32768000000000000000e5
-175 1 20 27 -0.13107200000000000000e6
-175 2 1 3 -0.40960000000000000000e4
-175 2 2 16 0.40960000000000000000e4
-175 2 4 10 0.16384000000000000000e5
-175 2 6 12 0.32768000000000000000e5
-175 2 7 21 -0.16384000000000000000e5
-175 2 8 22 -0.16384000000000000000e5
-175 2 9 23 0.32768000000000000000e5
-175 2 10 24 0.65536000000000000000e5
-175 3 1 2 -0.40960000000000000000e4
-175 3 2 15 -0.65536000000000000000e5
-175 3 3 16 0.40960000000000000000e4
-175 3 4 17 0.40960000000000000000e4
-175 3 6 7 -0.16384000000000000000e5
-175 3 6 19 0.81920000000000000000e4
-175 3 7 20 -0.16384000000000000000e5
-175 3 8 13 -0.65536000000000000000e5
-175 3 8 21 -0.16384000000000000000e5
-175 3 9 22 -0.16384000000000000000e5
-175 4 1 5 -0.81920000000000000000e4
-175 4 1 13 0.40960000000000000000e4
-175 4 2 2 0.81920000000000000000e4
-175 4 2 14 0.81920000000000000000e4
-175 4 4 8 -0.16384000000000000000e5
-175 4 5 5 -0.32768000000000000000e5
-176 1 1 18 0.32768000000000000000e5
-176 1 2 17 -0.32768000000000000000e5
-177 1 1 19 0.32768000000000000000e5
-177 1 7 16 -0.32768000000000000000e5
-178 1 1 20 0.32768000000000000000e5
-178 1 13 16 -0.65536000000000000000e5
-178 1 20 27 0.65536000000000000000e5
-178 1 28 35 -0.32768000000000000000e5
-178 2 7 13 0.32768000000000000000e5
-178 2 10 24 -0.32768000000000000000e5
-178 3 2 15 0.32768000000000000000e5
-178 3 8 13 0.32768000000000000000e5
-178 3 11 24 -0.32768000000000000000e5
-179 1 1 21 0.32768000000000000000e5
-179 1 4 19 0.16384000000000000000e5
-179 1 7 16 -0.16384000000000000000e5
-179 1 13 16 -0.32768000000000000000e5
-179 2 1 15 -0.16384000000000000000e5
-179 2 7 13 0.16384000000000000000e5
-180 1 1 2 -0.32768000000000000000e5
-180 1 1 8 0.65536000000000000000e5
-180 1 1 22 0.32768000000000000000e5
-180 1 1 40 -0.32768000000000000000e5
-180 1 2 5 0.32768000000000000000e5
-180 1 2 9 -0.65536000000000000000e5
-180 1 7 22 -0.65536000000000000000e5
-180 1 7 38 -0.65536000000000000000e5
-180 1 8 23 0.13107200000000000000e6
-180 3 1 2 -0.32768000000000000000e5
-180 3 2 3 0.32768000000000000000e5
-180 3 3 16 0.32768000000000000000e5
-180 3 4 17 0.32768000000000000000e5
-180 3 6 19 0.65536000000000000000e5
-180 3 7 20 -0.13107200000000000000e6
-180 4 1 1 -0.65536000000000000000e5
-180 4 1 13 0.32768000000000000000e5
-180 4 2 2 0.65536000000000000000e5
-180 4 2 14 0.65536000000000000000e5
-181 1 1 23 0.32768000000000000000e5
-181 1 1 24 0.32768000000000000000e5
-181 1 1 32 0.13107200000000000000e6
-181 1 1 48 0.32768000000000000000e5
-181 1 2 33 -0.13107200000000000000e6
-181 1 2 49 0.32768000000000000000e5
-181 1 3 34 0.26214400000000000000e6
-181 1 6 37 0.32768000000000000000e5
-181 1 7 22 0.65536000000000000000e5
-181 1 8 23 0.65536000000000000000e5
-181 1 8 39 -0.65536000000000000000e5
-181 1 10 41 -0.13107200000000000000e6
-181 1 12 27 -0.26214400000000000000e6
-181 1 23 38 0.32768000000000000000e5
-181 2 1 7 0.65536000000000000000e5
-181 2 2 16 0.32768000000000000000e5
-181 2 2 32 0.32768000000000000000e5
-181 2 3 17 -0.32768000000000000000e5
-181 2 4 26 0.32768000000000000000e5
-181 2 6 20 0.13107200000000000000e6
-181 2 7 21 -0.13107200000000000000e6
-181 3 1 30 0.65536000000000000000e5
-181 3 3 16 0.32768000000000000000e5
-181 3 8 21 -0.13107200000000000000e6
-181 4 1 5 -0.65536000000000000000e5
-181 4 1 13 0.32768000000000000000e5
-182 1 1 25 0.32768000000000000000e5
-182 1 1 48 -0.32768000000000000000e5
-182 1 2 49 -0.32768000000000000000e5
-182 1 6 37 -0.32768000000000000000e5
-182 1 8 39 0.65536000000000000000e5
-182 1 23 38 -0.32768000000000000000e5
-182 2 2 32 -0.32768000000000000000e5
-182 2 3 17 0.32768000000000000000e5
-182 2 4 26 -0.32768000000000000000e5
-182 3 1 30 -0.65536000000000000000e5
-182 3 3 16 -0.32768000000000000000e5
-182 4 1 13 -0.32768000000000000000e5
-183 1 1 26 0.32768000000000000000e5
-183 1 1 40 -0.32768000000000000000e5
-183 1 7 38 -0.65536000000000000000e5
-183 1 8 23 0.65536000000000000000e5
-183 3 3 16 0.32768000000000000000e5
-183 3 4 17 0.32768000000000000000e5
-183 3 6 19 0.65536000000000000000e5
-183 3 7 20 -0.13107200000000000000e6
-183 4 1 13 0.32768000000000000000e5
-183 4 2 14 0.65536000000000000000e5
-184 1 1 27 0.32768000000000000000e5
-184 1 7 22 -0.32768000000000000000e5
-185 1 1 28 0.32768000000000000000e5
-185 1 1 32 0.65536000000000000000e5
-185 1 2 33 -0.65536000000000000000e5
-185 1 3 34 0.13107200000000000000e6
-185 1 7 22 0.32768000000000000000e5
-185 1 8 23 0.32768000000000000000e5
-185 1 10 41 -0.65536000000000000000e5
-185 1 12 27 -0.13107200000000000000e6
-185 2 1 7 0.32768000000000000000e5
-185 2 6 20 0.65536000000000000000e5
-185 2 7 21 -0.65536000000000000000e5
-185 3 8 21 -0.65536000000000000000e5
-185 4 1 5 -0.32768000000000000000e5
-186 1 1 29 0.32768000000000000000e5
-186 1 8 23 -0.32768000000000000000e5
-187 1 1 30 0.32768000000000000000e5
-187 1 1 48 -0.16384000000000000000e5
-187 1 2 49 -0.16384000000000000000e5
-187 1 7 38 -0.32768000000000000000e5
-187 1 8 23 0.32768000000000000000e5
-187 1 23 38 -0.16384000000000000000e5
-187 2 2 32 -0.16384000000000000000e5
-187 3 1 30 -0.32768000000000000000e5
-187 3 6 19 0.32768000000000000000e5
-187 3 7 20 -0.65536000000000000000e5
-187 4 2 14 0.32768000000000000000e5
-188 1 1 31 0.32768000000000000000e5
-188 1 1 32 0.32768000000000000000e5
-188 1 2 33 -0.32768000000000000000e5
-188 1 3 34 0.65536000000000000000e5
-188 1 10 41 -0.32768000000000000000e5
-188 1 12 27 -0.65536000000000000000e5
-188 2 6 20 0.32768000000000000000e5
-188 2 7 21 -0.32768000000000000000e5
-188 3 8 21 -0.32768000000000000000e5
-189 1 1 33 0.32768000000000000000e5
-189 1 2 33 0.32768000000000000000e5
-189 1 3 34 -0.65536000000000000000e5
-189 1 10 41 0.32768000000000000000e5
-189 2 7 21 0.32768000000000000000e5
-189 3 8 21 0.32768000000000000000e5
-190 1 1 34 0.32768000000000000000e5
-190 1 12 27 -0.32768000000000000000e5
-191 1 1 35 0.32768000000000000000e5
-191 1 2 17 -0.32768000000000000000e5
-191 3 1 14 0.32768000000000000000e5
-192 1 1 36 0.32768000000000000000e5
-192 1 16 31 -0.65536000000000000000e5
-192 1 20 27 0.65536000000000000000e5
-192 1 28 35 -0.32768000000000000000e5
-192 2 7 13 0.32768000000000000000e5
-192 2 10 24 -0.32768000000000000000e5
-192 3 11 24 -0.32768000000000000000e5
-192 4 8 8 -0.65536000000000000000e5
-193 1 1 24 0.32768000000000000000e5
-193 1 1 32 0.13107200000000000000e6
-193 1 1 37 0.32768000000000000000e5
-193 1 1 48 0.32768000000000000000e5
-193 1 2 33 -0.13107200000000000000e6
-193 1 2 49 0.32768000000000000000e5
-193 1 3 34 0.26214400000000000000e6
-193 1 6 37 0.32768000000000000000e5
-193 1 7 22 0.65536000000000000000e5
-193 1 8 23 0.65536000000000000000e5
-193 1 8 39 -0.65536000000000000000e5
-193 1 10 41 -0.13107200000000000000e6
-193 1 12 27 -0.26214400000000000000e6
-193 1 23 38 0.32768000000000000000e5
-193 2 1 7 0.65536000000000000000e5
-193 2 2 16 0.32768000000000000000e5
-193 2 2 32 0.32768000000000000000e5
-193 2 3 17 -0.32768000000000000000e5
-193 2 4 26 0.32768000000000000000e5
-193 2 6 20 0.13107200000000000000e6
-193 2 7 21 -0.13107200000000000000e6
-193 3 1 16 0.32768000000000000000e5
-193 3 1 30 0.65536000000000000000e5
-193 3 3 16 0.32768000000000000000e5
-193 3 8 21 -0.13107200000000000000e6
-193 4 1 5 -0.65536000000000000000e5
-193 4 1 13 0.32768000000000000000e5
-194 1 1 38 0.32768000000000000000e5
-194 1 1 40 0.32768000000000000000e5
-194 1 2 33 0.13107200000000000000e6
-194 1 2 49 0.32768000000000000000e5
-194 1 3 34 -0.26214400000000000000e6
-194 1 3 50 -0.65536000000000000000e5
-194 1 5 52 0.13107200000000000000e6
-194 1 6 37 0.32768000000000000000e5
-194 1 10 41 0.13107200000000000000e6
-194 1 11 42 -0.13107200000000000000e6
-194 1 12 43 -0.26214400000000000000e6
-194 1 16 47 0.26214400000000000000e6
-194 1 22 37 -0.32768000000000000000e5
-194 1 28 43 0.13107200000000000000e6
-194 2 2 32 0.32768000000000000000e5
-194 2 3 17 -0.32768000000000000000e5
-194 2 4 26 0.32768000000000000000e5
-194 2 7 21 0.13107200000000000000e6
-194 2 10 32 -0.13107200000000000000e6
-194 2 12 26 0.13107200000000000000e6
-194 3 1 30 0.13107200000000000000e6
-194 3 2 31 0.13107200000000000000e6
-194 3 7 20 0.13107200000000000000e6
-194 3 8 21 0.13107200000000000000e6
-194 3 14 27 0.26214400000000000000e6
-194 4 1 13 0.32768000000000000000e5
-194 4 5 17 0.65536000000000000000e5
-194 4 7 19 -0.13107200000000000000e6
-194 4 11 11 0.65536000000000000000e5
-195 1 1 39 0.32768000000000000000e5
-195 1 1 48 -0.32768000000000000000e5
-195 1 2 49 -0.32768000000000000000e5
-195 1 6 37 -0.32768000000000000000e5
-195 1 8 39 0.65536000000000000000e5
-195 1 23 38 -0.32768000000000000000e5
-195 2 2 32 -0.32768000000000000000e5
-195 2 3 17 0.32768000000000000000e5
-195 2 4 26 -0.32768000000000000000e5
-195 3 1 30 -0.65536000000000000000e5
-195 4 1 13 -0.32768000000000000000e5
-196 1 1 24 0.16384000000000000000e5
-196 1 1 32 0.65536000000000000000e5
-196 1 1 40 0.16384000000000000000e5
-196 1 1 41 0.32768000000000000000e5
-196 1 2 49 0.16384000000000000000e5
-196 1 3 50 -0.32768000000000000000e5
-196 1 5 52 0.65536000000000000000e5
-196 1 6 37 0.16384000000000000000e5
-196 1 7 22 0.32768000000000000000e5
-196 1 8 23 0.32768000000000000000e5
-196 1 11 42 -0.65536000000000000000e5
-196 1 12 27 -0.13107200000000000000e6
-196 1 12 43 -0.13107200000000000000e6
-196 1 16 47 0.13107200000000000000e6
-196 1 22 37 -0.16384000000000000000e5
-196 1 28 43 0.65536000000000000000e5
-196 2 1 7 0.32768000000000000000e5
-196 2 2 16 0.16384000000000000000e5
-196 2 2 32 0.16384000000000000000e5
-196 2 3 17 -0.16384000000000000000e5
-196 2 4 26 0.16384000000000000000e5
-196 2 6 20 0.65536000000000000000e5
-196 2 10 32 -0.65536000000000000000e5
-196 2 12 26 0.65536000000000000000e5
-196 2 16 16 -0.32768000000000000000e5
-196 3 1 16 0.16384000000000000000e5
-196 3 1 30 0.65536000000000000000e5
-196 3 2 31 0.65536000000000000000e5
-196 3 3 16 0.16384000000000000000e5
-196 3 7 20 0.65536000000000000000e5
-196 3 14 27 0.13107200000000000000e6
-196 4 1 5 -0.32768000000000000000e5
-196 4 1 13 0.16384000000000000000e5
-196 4 5 17 0.32768000000000000000e5
-196 4 7 19 -0.65536000000000000000e5
-196 4 11 11 0.32768000000000000000e5
-197 1 1 42 0.32768000000000000000e5
-197 1 7 38 -0.32768000000000000000e5
-198 1 1 43 0.32768000000000000000e5
-198 1 1 48 -0.16384000000000000000e5
-198 1 2 49 -0.16384000000000000000e5
-198 1 23 38 -0.16384000000000000000e5
-198 2 2 32 -0.16384000000000000000e5
-198 3 1 30 -0.32768000000000000000e5
-199 1 1 44 0.32768000000000000000e5
-199 1 2 17 -0.65536000000000000000e5
-199 1 2 33 -0.32768000000000000000e5
-199 1 3 34 0.65536000000000000000e5
-199 1 10 41 -0.32768000000000000000e5
-199 1 11 42 0.32768000000000000000e5
-199 1 12 43 0.65536000000000000000e5
-199 1 17 48 -0.65536000000000000000e5
-199 2 1 31 0.32768000000000000000e5
-199 2 7 21 -0.32768000000000000000e5
-199 2 8 22 0.32768000000000000000e5
-199 2 12 26 -0.32768000000000000000e5
-199 3 1 14 0.65536000000000000000e5
-199 3 6 23 0.65536000000000000000e5
-199 3 7 20 -0.32768000000000000000e5
-199 3 8 21 -0.32768000000000000000e5
-199 3 14 27 -0.65536000000000000000e5
-199 4 4 16 -0.32768000000000000000e5
-200 1 1 45 0.32768000000000000000e5
-200 1 2 33 0.32768000000000000000e5
-200 1 3 34 -0.65536000000000000000e5
-200 1 10 41 0.32768000000000000000e5
-200 2 7 21 0.32768000000000000000e5
-200 3 7 20 0.32768000000000000000e5
-200 3 8 21 0.32768000000000000000e5
-201 1 1 46 0.32768000000000000000e5
-201 1 2 17 -0.32768000000000000000e5
-201 3 1 14 0.32768000000000000000e5
-201 3 6 23 0.32768000000000000000e5
-202 1 1 47 0.32768000000000000000e5
-202 1 22 37 -0.32768000000000000000e5
-203 1 1 49 0.32768000000000000000e5
-203 1 23 38 -0.32768000000000000000e5
-204 1 1 50 0.32768000000000000000e5
-204 1 2 33 -0.65536000000000000000e5
-204 1 3 34 0.13107200000000000000e6
-204 1 3 50 0.32768000000000000000e5
-204 1 5 52 -0.65536000000000000000e5
-204 1 7 38 -0.32768000000000000000e5
-204 1 8 39 -0.32768000000000000000e5
-204 1 10 41 -0.65536000000000000000e5
-204 1 11 42 0.65536000000000000000e5
-204 1 12 43 0.13107200000000000000e6
-204 1 16 47 -0.13107200000000000000e6
-204 1 28 43 -0.65536000000000000000e5
-204 2 7 21 -0.65536000000000000000e5
-204 2 10 32 0.65536000000000000000e5
-204 2 12 26 -0.65536000000000000000e5
-204 3 1 30 -0.32768000000000000000e5
-204 3 2 31 -0.65536000000000000000e5
-204 3 7 20 -0.65536000000000000000e5
-204 3 8 21 -0.65536000000000000000e5
-204 3 14 27 -0.13107200000000000000e6
-204 4 5 17 -0.32768000000000000000e5
-204 4 7 19 0.65536000000000000000e5
-205 1 1 48 -0.16384000000000000000e5
-205 1 1 51 0.32768000000000000000e5
-205 1 2 49 -0.16384000000000000000e5
-205 1 23 38 -0.16384000000000000000e5
-205 2 2 32 -0.16384000000000000000e5
-206 1 1 52 0.32768000000000000000e5
-206 1 5 52 -0.32768000000000000000e5
-206 1 11 42 0.32768000000000000000e5
-206 1 12 43 0.65536000000000000000e5
-206 1 16 47 -0.65536000000000000000e5
-206 1 28 43 -0.32768000000000000000e5
-206 2 10 32 0.32768000000000000000e5
-206 2 12 26 -0.32768000000000000000e5
-206 3 2 31 -0.32768000000000000000e5
-206 3 14 27 -0.65536000000000000000e5
-206 4 7 19 0.32768000000000000000e5
-207 1 1 48 -0.32768000000000000000e5
-207 1 1 53 0.32768000000000000000e5
-207 1 2 49 -0.32768000000000000000e5
-207 1 7 54 0.65536000000000000000e5
-207 1 23 38 -0.32768000000000000000e5
-207 1 24 39 -0.32768000000000000000e5
-207 2 1 35 0.32768000000000000000e5
-207 2 2 32 -0.32768000000000000000e5
-207 2 3 33 -0.32768000000000000000e5
-207 2 18 32 0.32768000000000000000e5
-207 2 26 32 -0.32768000000000000000e5
-207 3 3 32 -0.32768000000000000000e5
-207 3 4 33 -0.32768000000000000000e5
-207 3 16 29 0.65536000000000000000e5
-207 3 17 30 0.65536000000000000000e5
-207 4 17 17 -0.65536000000000000000e5
-208 1 1 54 0.32768000000000000000e5
-208 1 2 49 0.32768000000000000000e5
-208 1 7 54 -0.65536000000000000000e5
-208 1 24 39 0.32768000000000000000e5
-208 2 3 33 0.32768000000000000000e5
-208 2 18 32 -0.32768000000000000000e5
-208 2 26 32 0.32768000000000000000e5
-208 3 4 33 0.32768000000000000000e5
-208 3 17 30 -0.65536000000000000000e5
-208 4 17 17 0.65536000000000000000e5
-209 1 1 48 -0.16384000000000000000e5
-209 1 1 55 0.32768000000000000000e5
-209 1 2 49 -0.16384000000000000000e5
-209 1 23 38 -0.16384000000000000000e5
-209 2 2 32 -0.16384000000000000000e5
-209 3 16 29 0.32768000000000000000e5
-210 1 1 56 0.32768000000000000000e5
-210 1 22 53 -0.32768000000000000000e5
-211 1 1 24 0.16384000000000000000e5
-211 1 1 32 0.65536000000000000000e5
-211 1 1 48 0.16384000000000000000e5
-211 1 2 2 0.32768000000000000000e5
-211 1 2 33 -0.65536000000000000000e5
-211 1 2 49 0.16384000000000000000e5
-211 1 3 34 0.13107200000000000000e6
-211 1 6 37 0.16384000000000000000e5
-211 1 7 22 0.32768000000000000000e5
-211 1 8 23 0.32768000000000000000e5
-211 1 8 39 -0.32768000000000000000e5
-211 1 10 41 -0.65536000000000000000e5
-211 1 12 27 -0.13107200000000000000e6
-211 1 23 38 0.16384000000000000000e5
-211 2 1 7 0.32768000000000000000e5
-211 2 2 16 0.16384000000000000000e5
-211 2 2 32 0.16384000000000000000e5
-211 2 3 17 -0.16384000000000000000e5
-211 2 4 26 0.16384000000000000000e5
-211 2 6 20 0.65536000000000000000e5
-211 2 7 21 -0.65536000000000000000e5
-211 3 1 2 -0.16384000000000000000e5
-211 3 1 30 0.32768000000000000000e5
-211 3 3 16 0.16384000000000000000e5
-211 3 8 21 -0.65536000000000000000e5
-211 4 1 5 -0.32768000000000000000e5
-211 4 1 13 0.16384000000000000000e5
-212 1 1 24 -0.32768000000000000000e5
-212 1 1 40 -0.32768000000000000000e5
-212 1 2 3 0.32768000000000000000e5
-212 1 2 5 0.32768000000000000000e5
-212 1 2 9 -0.65536000000000000000e5
-212 1 7 38 -0.65536000000000000000e5
-212 1 8 23 0.13107200000000000000e6
-212 3 2 3 0.32768000000000000000e5
-212 3 3 16 0.32768000000000000000e5
-212 3 4 17 0.32768000000000000000e5
-212 3 6 19 0.65536000000000000000e5
-212 3 7 20 -0.13107200000000000000e6
-212 4 1 13 0.32768000000000000000e5
-212 4 2 2 0.65536000000000000000e5
-212 4 2 14 0.65536000000000000000e5
-213 1 1 48 -0.32768000000000000000e5
-213 1 2 4 0.32768000000000000000e5
-213 1 2 49 -0.32768000000000000000e5
-213 1 6 37 -0.32768000000000000000e5
-213 1 8 39 0.65536000000000000000e5
-213 1 23 38 -0.32768000000000000000e5
-213 2 2 32 -0.32768000000000000000e5
-213 2 3 17 0.32768000000000000000e5
-213 2 4 26 -0.32768000000000000000e5
-213 3 1 30 -0.65536000000000000000e5
-213 3 2 3 -0.32768000000000000000e5
-213 3 3 16 -0.32768000000000000000e5
-213 4 1 13 -0.32768000000000000000e5
-214 1 1 48 0.32768000000000000000e5
-214 1 2 5 0.32768000000000000000e5
-214 1 2 6 0.32768000000000000000e5
-214 1 2 9 0.65536000000000000000e5
-214 1 2 17 0.26214400000000000000e6
-214 1 2 33 0.13107200000000000000e6
-214 1 2 49 0.32768000000000000000e5
-214 1 3 18 0.52428800000000000000e6
-214 1 4 19 0.52428800000000000000e6
-214 1 4 35 0.52428800000000000000e6
-214 1 6 13 -0.13107200000000000000e6
-214 1 6 37 0.32768000000000000000e5
-214 1 11 42 -0.13107200000000000000e6
-214 1 18 25 0.26214400000000000000e6
-214 1 20 27 -0.10485760000000000000e7
-214 1 23 38 0.32768000000000000000e5
-214 2 2 4 0.32768000000000000000e5
-214 2 2 8 0.65536000000000000000e5
-214 2 2 32 0.32768000000000000000e5
-214 2 3 17 -0.32768000000000000000e5
-214 2 4 10 0.13107200000000000000e6
-214 2 4 26 0.32768000000000000000e5
-214 2 6 12 0.26214400000000000000e6
-214 2 8 22 -0.13107200000000000000e6
-214 2 9 23 0.26214400000000000000e6
-214 2 10 24 0.52428800000000000000e6
-214 3 1 30 0.65536000000000000000e5
-214 3 2 3 0.32768000000000000000e5
-214 3 2 15 -0.52428800000000000000e6
-214 3 3 8 0.65536000000000000000e5
-214 3 3 16 0.32768000000000000000e5
-214 3 6 19 0.65536000000000000000e5
-214 3 8 13 -0.52428800000000000000e6
-214 3 9 22 -0.13107200000000000000e6
-214 4 1 13 0.32768000000000000000e5
-214 4 4 8 -0.13107200000000000000e6
-215 1 1 8 -0.32768000000000000000e5
-215 1 2 7 0.32768000000000000000e5
-216 1 1 32 0.65536000000000000000e5
-216 1 1 40 -0.16384000000000000000e5
-216 1 2 5 0.16384000000000000000e5
-216 1 2 8 0.32768000000000000000e5
-216 1 2 9 -0.32768000000000000000e5
-216 1 2 33 -0.65536000000000000000e5
-216 1 3 34 0.13107200000000000000e6
-216 1 7 22 0.32768000000000000000e5
-216 1 7 38 -0.32768000000000000000e5
-216 1 8 23 0.98304000000000000000e5
-216 1 10 41 -0.65536000000000000000e5
-216 1 12 27 -0.13107200000000000000e6
-216 2 1 3 -0.16384000000000000000e5
-216 2 1 7 0.32768000000000000000e5
-216 2 2 16 0.16384000000000000000e5
-216 2 6 20 0.65536000000000000000e5
-216 2 7 21 -0.65536000000000000000e5
-216 3 1 2 -0.16384000000000000000e5
-216 3 3 16 0.16384000000000000000e5
-216 3 4 17 0.16384000000000000000e5
-216 3 6 19 0.32768000000000000000e5
-216 3 7 20 -0.65536000000000000000e5
-216 3 8 21 -0.65536000000000000000e5
-216 4 1 5 -0.32768000000000000000e5
-216 4 1 13 0.16384000000000000000e5
-216 4 2 2 0.32768000000000000000e5
-216 4 2 14 0.32768000000000000000e5
-217 1 2 9 0.32768000000000000000e5
-217 1 2 10 0.32768000000000000000e5
-217 1 2 17 0.13107200000000000000e6
-217 1 2 33 0.65536000000000000000e5
-217 1 3 18 0.26214400000000000000e6
-217 1 4 19 0.26214400000000000000e6
-217 1 4 35 0.26214400000000000000e6
-217 1 6 13 -0.65536000000000000000e5
-217 1 8 39 0.32768000000000000000e5
-217 1 11 42 -0.65536000000000000000e5
-217 1 18 25 0.13107200000000000000e6
-217 1 20 27 -0.52428800000000000000e6
-217 2 2 8 0.32768000000000000000e5
-217 2 4 10 0.65536000000000000000e5
-217 2 6 12 0.13107200000000000000e6
-217 2 8 22 -0.65536000000000000000e5
-217 2 9 23 0.13107200000000000000e6
-217 2 10 24 0.26214400000000000000e6
-217 3 2 15 -0.26214400000000000000e6
-217 3 3 8 0.32768000000000000000e5
-217 3 6 19 0.32768000000000000000e5
-217 3 8 13 -0.26214400000000000000e6
-217 3 9 22 -0.65536000000000000000e5
-217 4 4 8 -0.65536000000000000000e5
-218 1 2 11 0.32768000000000000000e5
-218 1 8 39 -0.32768000000000000000e5
-218 3 3 8 -0.32768000000000000000e5
-218 3 6 19 -0.32768000000000000000e5
-219 1 1 8 -0.16384000000000000000e5
-219 1 1 32 0.32768000000000000000e5
-219 1 1 40 -0.81920000000000000000e4
-219 1 2 5 0.81920000000000000000e4
-219 1 2 9 -0.32768000000000000000e5
-219 1 2 12 0.32768000000000000000e5
-219 1 2 33 -0.32768000000000000000e5
-219 1 3 34 0.65536000000000000000e5
-219 1 7 22 0.16384000000000000000e5
-219 1 7 38 -0.16384000000000000000e5
-219 1 8 23 0.49152000000000000000e5
-219 1 10 41 -0.32768000000000000000e5
-219 1 12 27 -0.65536000000000000000e5
-219 2 1 3 -0.81920000000000000000e4
-219 2 2 16 0.81920000000000000000e4
-219 2 6 20 0.32768000000000000000e5
-219 2 7 21 -0.32768000000000000000e5
-219 3 1 2 -0.81920000000000000000e4
-219 3 3 16 0.81920000000000000000e4
-219 3 4 17 0.81920000000000000000e4
-219 3 6 19 0.16384000000000000000e5
-219 3 7 20 -0.32768000000000000000e5
-219 3 8 21 -0.32768000000000000000e5
-219 4 1 5 -0.16384000000000000000e5
-219 4 1 13 0.81920000000000000000e4
-219 4 2 2 0.16384000000000000000e5
-219 4 2 14 0.16384000000000000000e5
-220 1 1 32 -0.32768000000000000000e5
-220 1 2 13 0.32768000000000000000e5
-220 3 6 7 -0.32768000000000000000e5
-221 1 2 14 0.32768000000000000000e5
-221 1 2 17 0.65536000000000000000e5
-221 1 2 33 0.32768000000000000000e5
-221 1 3 18 0.13107200000000000000e6
-221 1 4 19 0.13107200000000000000e6
-221 1 4 35 0.13107200000000000000e6
-221 1 6 13 -0.32768000000000000000e5
-221 1 11 42 -0.32768000000000000000e5
-221 1 18 25 0.65536000000000000000e5
-221 1 20 27 -0.26214400000000000000e6
-221 2 4 10 0.32768000000000000000e5
-221 2 6 12 0.65536000000000000000e5
-221 2 8 22 -0.32768000000000000000e5
-221 2 9 23 0.65536000000000000000e5
-221 2 10 24 0.13107200000000000000e6
-221 3 2 15 -0.13107200000000000000e6
-221 3 8 13 -0.13107200000000000000e6
-221 3 9 22 -0.32768000000000000000e5
-221 4 4 8 -0.32768000000000000000e5
-222 1 2 15 0.32768000000000000000e5
-222 1 2 33 -0.32768000000000000000e5
-222 1 3 18 -0.65536000000000000000e5
-222 1 4 35 -0.13107200000000000000e6
-222 1 6 13 0.32768000000000000000e5
-222 1 10 41 0.32768000000000000000e5
-222 1 11 42 0.32768000000000000000e5
-222 1 18 25 -0.65536000000000000000e5
-222 1 28 35 0.13107200000000000000e6
-222 2 8 22 0.32768000000000000000e5
-222 2 9 23 -0.65536000000000000000e5
-222 3 5 10 0.32768000000000000000e5
-222 3 8 21 0.32768000000000000000e5
-222 3 9 22 0.32768000000000000000e5
-222 3 11 24 0.13107200000000000000e6
-222 4 4 8 0.32768000000000000000e5
-223 1 1 8 -0.81920000000000000000e4
-223 1 1 40 -0.40960000000000000000e4
-223 1 2 5 0.40960000000000000000e4
-223 1 2 9 -0.16384000000000000000e5
-223 1 2 16 0.32768000000000000000e5
-223 1 2 17 0.32768000000000000000e5
-223 1 3 18 0.65536000000000000000e5
-223 1 3 34 0.32768000000000000000e5
-223 1 4 19 0.65536000000000000000e5
-223 1 4 35 0.65536000000000000000e5
-223 1 6 13 -0.16384000000000000000e5
-223 1 7 22 0.81920000000000000000e4
-223 1 7 38 -0.81920000000000000000e4
-223 1 8 23 0.24576000000000000000e5
-223 1 10 41 -0.16384000000000000000e5
-223 1 11 42 -0.16384000000000000000e5
-223 1 12 27 -0.32768000000000000000e5
-223 1 18 25 0.32768000000000000000e5
-223 1 20 27 -0.13107200000000000000e6
-223 2 1 3 -0.40960000000000000000e4
-223 2 2 16 0.40960000000000000000e4
-223 2 4 10 0.16384000000000000000e5
-223 2 6 12 0.32768000000000000000e5
-223 2 7 21 -0.16384000000000000000e5
-223 2 8 22 -0.16384000000000000000e5
-223 2 9 23 0.32768000000000000000e5
-223 2 10 24 0.65536000000000000000e5
-223 3 1 2 -0.40960000000000000000e4
-223 3 2 15 -0.65536000000000000000e5
-223 3 3 16 0.40960000000000000000e4
-223 3 4 17 0.40960000000000000000e4
-223 3 6 7 -0.16384000000000000000e5
-223 3 6 19 0.81920000000000000000e4
-223 3 7 20 -0.16384000000000000000e5
-223 3 8 13 -0.65536000000000000000e5
-223 3 8 21 -0.16384000000000000000e5
-223 3 9 22 -0.16384000000000000000e5
-223 4 1 5 -0.81920000000000000000e4
-223 4 1 13 0.40960000000000000000e4
-223 4 2 2 0.81920000000000000000e4
-223 4 2 14 0.81920000000000000000e4
-223 4 4 8 -0.16384000000000000000e5
-223 4 5 5 -0.32768000000000000000e5
-224 1 2 17 0.32768000000000000000e5
-224 1 2 18 0.32768000000000000000e5
-224 1 3 18 0.32768000000000000000e5
-224 1 4 19 0.65536000000000000000e5
-224 1 20 27 -0.13107200000000000000e6
-224 1 28 35 0.65536000000000000000e5
-224 2 6 12 0.32768000000000000000e5
-224 2 10 24 0.65536000000000000000e5
-224 3 2 15 -0.65536000000000000000e5
-224 3 8 13 -0.65536000000000000000e5
-224 3 11 24 0.65536000000000000000e5
-225 1 2 19 0.32768000000000000000e5
-225 1 13 16 -0.65536000000000000000e5
-225 1 20 27 0.65536000000000000000e5
-225 1 28 35 -0.32768000000000000000e5
-225 2 7 13 0.32768000000000000000e5
-225 2 10 24 -0.32768000000000000000e5
-225 3 2 15 0.32768000000000000000e5
-225 3 8 13 0.32768000000000000000e5
-225 3 11 24 -0.32768000000000000000e5
-226 1 2 20 0.32768000000000000000e5
-226 1 4 19 0.32768000000000000000e5
-226 1 20 27 -0.65536000000000000000e5
-226 1 28 35 0.32768000000000000000e5
-226 2 10 24 0.32768000000000000000e5
-226 3 2 15 -0.32768000000000000000e5
-226 3 8 13 -0.32768000000000000000e5
-226 3 11 24 0.32768000000000000000e5
-227 1 2 21 0.32768000000000000000e5
-227 1 13 16 -0.32768000000000000000e5
-228 1 1 24 0.32768000000000000000e5
-228 1 1 32 0.13107200000000000000e6
-228 1 1 48 0.32768000000000000000e5
-228 1 2 22 0.32768000000000000000e5
-228 1 2 33 -0.13107200000000000000e6
-228 1 2 49 0.32768000000000000000e5
-228 1 3 34 0.26214400000000000000e6
-228 1 6 37 0.32768000000000000000e5
-228 1 7 22 0.65536000000000000000e5
-228 1 8 23 0.65536000000000000000e5
-228 1 8 39 -0.65536000000000000000e5
-228 1 10 41 -0.13107200000000000000e6
-228 1 12 27 -0.26214400000000000000e6
-228 1 23 38 0.32768000000000000000e5
-228 2 1 7 0.65536000000000000000e5
-228 2 2 16 0.32768000000000000000e5
-228 2 2 32 0.32768000000000000000e5
-228 2 3 17 -0.32768000000000000000e5
-228 2 4 26 0.32768000000000000000e5
-228 2 6 20 0.13107200000000000000e6
-228 2 7 21 -0.13107200000000000000e6
-228 3 1 30 0.65536000000000000000e5
-228 3 3 16 0.32768000000000000000e5
-228 3 8 21 -0.13107200000000000000e6
-228 4 1 5 -0.65536000000000000000e5
-228 4 1 13 0.32768000000000000000e5
-229 1 1 24 -0.32768000000000000000e5
-229 1 2 23 0.32768000000000000000e5
-230 1 1 48 -0.32768000000000000000e5
-230 1 2 24 0.32768000000000000000e5
-230 1 2 49 -0.32768000000000000000e5
-230 1 6 37 -0.32768000000000000000e5
-230 1 8 39 0.65536000000000000000e5
-230 1 23 38 -0.32768000000000000000e5
-230 2 2 32 -0.32768000000000000000e5
-230 2 3 17 0.32768000000000000000e5
-230 2 4 26 -0.32768000000000000000e5
-230 3 1 30 -0.65536000000000000000e5
-230 3 3 16 -0.32768000000000000000e5
-230 4 1 13 -0.32768000000000000000e5
-231 1 1 40 -0.32768000000000000000e5
-231 1 2 25 0.32768000000000000000e5
-231 1 7 38 -0.65536000000000000000e5
-231 1 8 23 0.65536000000000000000e5
-231 3 3 16 0.32768000000000000000e5
-231 3 4 17 0.32768000000000000000e5
-231 3 6 19 0.65536000000000000000e5
-231 3 7 20 -0.13107200000000000000e6
-231 4 1 13 0.32768000000000000000e5
-231 4 2 14 0.65536000000000000000e5
-232 1 1 40 0.32768000000000000000e5
-232 1 2 26 0.32768000000000000000e5
-232 1 6 37 0.32768000000000000000e5
-232 1 8 39 -0.65536000000000000000e5
-232 2 4 26 0.32768000000000000000e5
-232 3 4 17 -0.32768000000000000000e5
-233 1 1 32 0.65536000000000000000e5
-233 1 2 27 0.32768000000000000000e5
-233 1 2 33 -0.65536000000000000000e5
-233 1 3 34 0.13107200000000000000e6
-233 1 7 22 0.32768000000000000000e5
-233 1 8 23 0.32768000000000000000e5
-233 1 10 41 -0.65536000000000000000e5
-233 1 12 27 -0.13107200000000000000e6
-233 2 1 7 0.32768000000000000000e5
-233 2 6 20 0.65536000000000000000e5
-233 2 7 21 -0.65536000000000000000e5
-233 3 8 21 -0.65536000000000000000e5
-233 4 1 5 -0.32768000000000000000e5
-234 1 2 28 0.32768000000000000000e5
-234 1 8 23 -0.32768000000000000000e5
-235 1 1 48 -0.16384000000000000000e5
-235 1 2 29 0.32768000000000000000e5
-235 1 2 49 -0.16384000000000000000e5
-235 1 7 38 -0.32768000000000000000e5
-235 1 8 23 0.32768000000000000000e5
-235 1 23 38 -0.16384000000000000000e5
-235 2 2 32 -0.16384000000000000000e5
-235 3 1 30 -0.32768000000000000000e5
-235 3 6 19 0.32768000000000000000e5
-235 3 7 20 -0.65536000000000000000e5
-235 4 2 14 0.32768000000000000000e5
-236 1 2 30 0.32768000000000000000e5
-236 1 8 39 -0.32768000000000000000e5
-236 3 6 19 -0.32768000000000000000e5
-237 1 1 32 -0.32768000000000000000e5
-237 1 2 31 0.32768000000000000000e5
-238 1 2 32 0.32768000000000000000e5
-238 1 2 33 0.32768000000000000000e5
-238 1 3 34 -0.65536000000000000000e5
-238 1 10 41 0.32768000000000000000e5
-238 2 7 21 0.32768000000000000000e5
-238 3 8 21 0.32768000000000000000e5
-239 1 2 17 -0.32768000000000000000e5
-239 1 2 34 0.32768000000000000000e5
-239 3 1 14 0.32768000000000000000e5
-240 1 2 35 0.32768000000000000000e5
-240 1 3 34 -0.32768000000000000000e5
-241 1 2 36 0.32768000000000000000e5
-241 1 4 19 0.32768000000000000000e5
-241 1 20 27 -0.65536000000000000000e5
-241 1 28 35 0.32768000000000000000e5
-241 2 10 24 0.32768000000000000000e5
-241 3 8 13 -0.32768000000000000000e5
-241 3 11 24 0.32768000000000000000e5
-242 1 1 40 0.32768000000000000000e5
-242 1 2 33 0.13107200000000000000e6
-242 1 2 37 0.32768000000000000000e5
-242 1 2 49 0.32768000000000000000e5
-242 1 3 34 -0.26214400000000000000e6
-242 1 3 50 -0.65536000000000000000e5
-242 1 5 52 0.13107200000000000000e6
-242 1 6 37 0.32768000000000000000e5
-242 1 10 41 0.13107200000000000000e6
-242 1 11 42 -0.13107200000000000000e6
-242 1 12 43 -0.26214400000000000000e6
-242 1 16 47 0.26214400000000000000e6
-242 1 22 37 -0.32768000000000000000e5
-242 1 28 43 0.13107200000000000000e6
-242 2 2 32 0.32768000000000000000e5
-242 2 3 17 -0.32768000000000000000e5
-242 2 4 26 0.32768000000000000000e5
-242 2 7 21 0.13107200000000000000e6
-242 2 10 32 -0.13107200000000000000e6
-242 2 12 26 0.13107200000000000000e6
-242 3 1 30 0.13107200000000000000e6
-242 3 2 31 0.13107200000000000000e6
-242 3 7 20 0.13107200000000000000e6
-242 3 8 21 0.13107200000000000000e6
-242 3 14 27 0.26214400000000000000e6
-242 4 1 13 0.32768000000000000000e5
-242 4 5 17 0.65536000000000000000e5
-242 4 7 19 -0.13107200000000000000e6
-242 4 11 11 0.65536000000000000000e5
-243 1 1 48 -0.32768000000000000000e5
-243 1 2 38 0.32768000000000000000e5
-243 1 2 49 -0.32768000000000000000e5
-243 1 6 37 -0.32768000000000000000e5
-243 1 8 39 0.65536000000000000000e5
-243 1 23 38 -0.32768000000000000000e5
-243 2 2 32 -0.32768000000000000000e5
-243 2 3 17 0.32768000000000000000e5
-243 2 4 26 -0.32768000000000000000e5
-243 3 1 30 -0.65536000000000000000e5
-243 4 1 13 -0.32768000000000000000e5
-244 1 1 40 -0.32768000000000000000e5
-244 1 2 39 0.32768000000000000000e5
-245 1 1 40 0.32768000000000000000e5
-245 1 2 40 0.32768000000000000000e5
-245 1 6 37 0.32768000000000000000e5
-245 1 8 39 -0.65536000000000000000e5
-245 2 4 26 0.32768000000000000000e5
-246 1 2 41 0.32768000000000000000e5
-246 1 7 38 -0.32768000000000000000e5
-247 1 1 48 -0.16384000000000000000e5
-247 1 2 42 0.32768000000000000000e5
-247 1 2 49 -0.16384000000000000000e5
-247 1 23 38 -0.16384000000000000000e5
-247 2 2 32 -0.16384000000000000000e5
-247 3 1 30 -0.32768000000000000000e5
-248 1 2 43 0.32768000000000000000e5
-248 1 8 39 -0.32768000000000000000e5
-249 1 2 33 0.32768000000000000000e5
-249 1 2 44 0.32768000000000000000e5
-249 1 3 34 -0.65536000000000000000e5
-249 1 10 41 0.32768000000000000000e5
-249 2 7 21 0.32768000000000000000e5
-249 3 7 20 0.32768000000000000000e5
-249 3 8 21 0.32768000000000000000e5
-250 1 2 45 0.32768000000000000000e5
-250 1 11 42 -0.32768000000000000000e5
-250 1 12 43 -0.65536000000000000000e5
-250 1 17 48 0.65536000000000000000e5
-250 2 8 22 -0.32768000000000000000e5
-250 2 12 26 0.32768000000000000000e5
-250 3 14 27 0.65536000000000000000e5
-250 4 4 16 0.32768000000000000000e5
-251 1 2 46 0.32768000000000000000e5
-251 1 16 47 -0.32768000000000000000e5
-251 3 13 26 -0.32768000000000000000e5
-252 1 1 48 -0.32768000000000000000e5
-252 1 2 47 0.32768000000000000000e5
-253 1 2 48 0.32768000000000000000e5
-253 1 23 38 -0.32768000000000000000e5
-254 1 1 48 -0.16384000000000000000e5
-254 1 2 49 -0.16384000000000000000e5
-254 1 2 50 0.32768000000000000000e5
-254 1 23 38 -0.16384000000000000000e5
-254 2 2 32 -0.16384000000000000000e5
-255 1 2 51 0.32768000000000000000e5
-255 1 3 50 -0.32768000000000000000e5
-256 1 2 52 0.32768000000000000000e5
-256 1 11 42 -0.32768000000000000000e5
-256 1 12 43 -0.65536000000000000000e5
-256 1 17 48 0.65536000000000000000e5
-256 2 8 22 -0.32768000000000000000e5
-256 2 12 26 0.32768000000000000000e5
-256 3 2 31 0.32768000000000000000e5
-256 3 14 27 0.65536000000000000000e5
-256 4 4 16 0.32768000000000000000e5
-257 1 2 49 0.32768000000000000000e5
-257 1 2 53 0.32768000000000000000e5
-257 1 7 54 -0.65536000000000000000e5
-257 1 24 39 0.32768000000000000000e5
-257 2 3 33 0.32768000000000000000e5
-257 2 18 32 -0.32768000000000000000e5
-257 2 26 32 0.32768000000000000000e5
-257 3 4 33 0.32768000000000000000e5
-257 3 17 30 -0.65536000000000000000e5
-257 4 17 17 0.65536000000000000000e5
-258 1 2 49 -0.32768000000000000000e5
-258 1 2 54 0.32768000000000000000e5
-258 3 3 32 0.32768000000000000000e5
-259 1 2 55 0.32768000000000000000e5
-259 1 7 54 -0.32768000000000000000e5
-260 1 2 56 0.32768000000000000000e5
-260 1 7 54 -0.65536000000000000000e5
-260 1 22 53 0.32768000000000000000e5
-260 1 23 54 0.32768000000000000000e5
-260 2 26 32 0.32768000000000000000e5
-260 3 6 35 0.65536000000000000000e5
-261 1 1 48 -0.16384000000000000000e5
-261 1 2 49 -0.16384000000000000000e5
-261 1 3 3 0.32768000000000000000e5
-261 1 6 37 -0.16384000000000000000e5
-261 1 8 39 0.32768000000000000000e5
-261 1 23 38 -0.16384000000000000000e5
-261 2 2 32 -0.16384000000000000000e5
-261 2 3 17 0.16384000000000000000e5
-261 2 4 26 -0.16384000000000000000e5
-261 3 1 30 -0.32768000000000000000e5
-261 3 2 3 -0.16384000000000000000e5
-261 3 3 16 -0.16384000000000000000e5
-261 4 1 13 -0.16384000000000000000e5
-262 1 2 5 -0.32768000000000000000e5
-262 1 3 4 0.32768000000000000000e5
-263 1 1 48 0.32768000000000000000e5
-263 1 2 5 0.32768000000000000000e5
-263 1 2 9 0.65536000000000000000e5
-263 1 2 17 0.26214400000000000000e6
-263 1 2 33 0.13107200000000000000e6
-263 1 2 49 0.32768000000000000000e5
-263 1 3 5 0.32768000000000000000e5
-263 1 3 18 0.52428800000000000000e6
-263 1 4 19 0.52428800000000000000e6
-263 1 4 35 0.52428800000000000000e6
-263 1 6 13 -0.13107200000000000000e6
-263 1 6 37 0.32768000000000000000e5
-263 1 11 42 -0.13107200000000000000e6
-263 1 18 25 0.26214400000000000000e6
-263 1 20 27 -0.10485760000000000000e7
-263 1 23 38 0.32768000000000000000e5
-263 2 2 4 0.32768000000000000000e5
-263 2 2 8 0.65536000000000000000e5
-263 2 2 32 0.32768000000000000000e5
-263 2 3 17 -0.32768000000000000000e5
-263 2 4 10 0.13107200000000000000e6
-263 2 4 26 0.32768000000000000000e5
-263 2 6 12 0.26214400000000000000e6
-263 2 8 22 -0.13107200000000000000e6
-263 2 9 23 0.26214400000000000000e6
-263 2 10 24 0.52428800000000000000e6
-263 3 1 30 0.65536000000000000000e5
-263 3 2 3 0.32768000000000000000e5
-263 3 2 15 -0.52428800000000000000e6
-263 3 3 8 0.65536000000000000000e5
-263 3 3 16 0.32768000000000000000e5
-263 3 6 19 0.65536000000000000000e5
-263 3 8 13 -0.52428800000000000000e6
-263 3 9 22 -0.13107200000000000000e6
-263 4 1 13 0.32768000000000000000e5
-263 4 4 8 -0.13107200000000000000e6
-264 1 1 40 0.32768000000000000000e5
-264 1 1 48 -0.65536000000000000000e5
-264 1 2 5 -0.32768000000000000000e5
-264 1 2 9 -0.65536000000000000000e5
-264 1 2 17 -0.26214400000000000000e6
-264 1 2 33 -0.13107200000000000000e6
-264 1 2 49 -0.65536000000000000000e5
-264 1 3 6 0.32768000000000000000e5
-264 1 3 18 -0.52428800000000000000e6
-264 1 3 26 -0.32768000000000000000e5
-264 1 4 19 -0.52428800000000000000e6
-264 1 4 35 -0.52428800000000000000e6
-264 1 5 52 0.13107200000000000000e6
-264 1 6 13 0.13107200000000000000e6
-264 1 8 39 -0.65536000000000000000e5
-264 1 11 42 0.26214400000000000000e6
-264 1 12 43 0.26214400000000000000e6
-264 1 17 48 -0.52428800000000000000e6
-264 1 18 25 -0.26214400000000000000e6
-264 1 20 27 0.10485760000000000000e7
-264 1 23 38 -0.65536000000000000000e5
-264 1 26 41 0.65536000000000000000e5
-264 1 28 43 0.13107200000000000000e6
-264 2 2 4 -0.32768000000000000000e5
-264 2 2 8 -0.65536000000000000000e5
-264 2 2 32 -0.65536000000000000000e5
-264 2 3 5 0.32768000000000000000e5
-264 2 3 9 0.65536000000000000000e5
-264 2 3 17 0.32768000000000000000e5
-264 2 4 10 -0.13107200000000000000e6
-264 2 4 18 -0.32768000000000000000e5
-264 2 6 12 -0.26214400000000000000e6
-264 2 8 22 0.39321600000000000000e6
-264 2 9 23 -0.26214400000000000000e6
-264 2 10 24 -0.52428800000000000000e6
-264 2 12 26 -0.13107200000000000000e6
-264 2 16 30 -0.65536000000000000000e5
-264 3 1 30 -0.65536000000000000000e5
-264 3 2 3 -0.32768000000000000000e5
-264 3 2 15 0.52428800000000000000e6
-264 3 2 31 -0.13107200000000000000e6
-264 3 3 16 -0.32768000000000000000e5
-264 3 4 5 0.32768000000000000000e5
-264 3 4 9 0.65536000000000000000e5
-264 3 4 17 -0.32768000000000000000e5
-264 3 5 10 -0.13107200000000000000e6
-264 3 6 19 -0.65536000000000000000e5
-264 3 8 13 0.52428800000000000000e6
-264 3 9 22 0.13107200000000000000e6
-264 3 14 27 -0.26214400000000000000e6
-264 4 1 13 -0.32768000000000000000e5
-264 4 3 15 -0.65536000000000000000e5
-264 4 4 8 0.13107200000000000000e6
-264 4 4 16 -0.26214400000000000000e6
-264 4 6 18 -0.65536000000000000000e5
-264 4 7 19 -0.13107200000000000000e6
-265 1 1 32 0.65536000000000000000e5
-265 1 1 40 -0.16384000000000000000e5
-265 1 2 5 0.16384000000000000000e5
-265 1 2 9 -0.32768000000000000000e5
-265 1 2 33 -0.65536000000000000000e5
-265 1 3 7 0.32768000000000000000e5
-265 1 3 34 0.13107200000000000000e6
-265 1 7 22 0.32768000000000000000e5
-265 1 7 38 -0.32768000000000000000e5
-265 1 8 23 0.98304000000000000000e5
-265 1 10 41 -0.65536000000000000000e5
-265 1 12 27 -0.13107200000000000000e6
-265 2 1 3 -0.16384000000000000000e5
-265 2 1 7 0.32768000000000000000e5
-265 2 2 16 0.16384000000000000000e5
-265 2 6 20 0.65536000000000000000e5
-265 2 7 21 -0.65536000000000000000e5
-265 3 1 2 -0.16384000000000000000e5
-265 3 3 16 0.16384000000000000000e5
-265 3 4 17 0.16384000000000000000e5
-265 3 6 19 0.32768000000000000000e5
-265 3 7 20 -0.65536000000000000000e5
-265 3 8 21 -0.65536000000000000000e5
-265 4 1 5 -0.32768000000000000000e5
-265 4 1 13 0.16384000000000000000e5
-265 4 2 2 0.32768000000000000000e5
-265 4 2 14 0.32768000000000000000e5
-266 1 2 9 -0.32768000000000000000e5
-266 1 3 8 0.32768000000000000000e5
-267 1 2 9 0.32768000000000000000e5
-267 1 2 17 0.13107200000000000000e6
-267 1 2 33 0.65536000000000000000e5
-267 1 3 9 0.32768000000000000000e5
-267 1 3 18 0.26214400000000000000e6
-267 1 4 19 0.26214400000000000000e6
-267 1 4 35 0.26214400000000000000e6
-267 1 6 13 -0.65536000000000000000e5
-267 1 8 39 0.32768000000000000000e5
-267 1 11 42 -0.65536000000000000000e5
-267 1 18 25 0.13107200000000000000e6
-267 1 20 27 -0.52428800000000000000e6
-267 2 2 8 0.32768000000000000000e5
-267 2 4 10 0.65536000000000000000e5
-267 2 6 12 0.13107200000000000000e6
-267 2 8 22 -0.65536000000000000000e5
-267 2 9 23 0.13107200000000000000e6
-267 2 10 24 0.26214400000000000000e6
-267 3 2 15 -0.26214400000000000000e6
-267 3 3 8 0.32768000000000000000e5
-267 3 6 19 0.32768000000000000000e5
-267 3 8 13 -0.26214400000000000000e6
-267 3 9 22 -0.65536000000000000000e5
-267 4 4 8 -0.65536000000000000000e5
-268 1 3 10 0.32768000000000000000e5
-268 1 8 39 -0.32768000000000000000e5
-268 3 3 8 -0.32768000000000000000e5
-268 3 6 19 -0.32768000000000000000e5
-269 1 3 11 0.32768000000000000000e5
-269 1 8 39 0.32768000000000000000e5
-269 1 10 25 0.32768000000000000000e5
-269 1 10 41 -0.65536000000000000000e5
-269 2 3 9 0.32768000000000000000e5
-269 3 3 8 0.32768000000000000000e5
-269 3 4 9 0.32768000000000000000e5
-269 3 5 10 -0.65536000000000000000e5
-269 3 6 19 0.32768000000000000000e5
-269 3 8 21 -0.65536000000000000000e5
-270 1 1 32 -0.32768000000000000000e5
-270 1 3 12 0.32768000000000000000e5
-270 3 6 7 -0.32768000000000000000e5
-271 1 2 17 0.65536000000000000000e5
-271 1 2 33 0.32768000000000000000e5
-271 1 3 13 0.32768000000000000000e5
-271 1 3 18 0.13107200000000000000e6
-271 1 4 19 0.13107200000000000000e6
-271 1 4 35 0.13107200000000000000e6
-271 1 6 13 -0.32768000000000000000e5
-271 1 11 42 -0.32768000000000000000e5
-271 1 18 25 0.65536000000000000000e5
-271 1 20 27 -0.26214400000000000000e6
-271 2 4 10 0.32768000000000000000e5
-271 2 6 12 0.65536000000000000000e5
-271 2 8 22 -0.32768000000000000000e5
-271 2 9 23 0.65536000000000000000e5
-271 2 10 24 0.13107200000000000000e6
-271 3 2 15 -0.13107200000000000000e6
-271 3 8 13 -0.13107200000000000000e6
-271 3 9 22 -0.32768000000000000000e5
-271 4 4 8 -0.32768000000000000000e5
-272 1 2 33 -0.32768000000000000000e5
-272 1 3 14 0.32768000000000000000e5
-272 1 3 18 -0.65536000000000000000e5
-272 1 4 35 -0.13107200000000000000e6
-272 1 6 13 0.32768000000000000000e5
-272 1 10 41 0.32768000000000000000e5
-272 1 11 42 0.32768000000000000000e5
-272 1 18 25 -0.65536000000000000000e5
-272 1 28 35 0.13107200000000000000e6
-272 2 8 22 0.32768000000000000000e5
-272 2 9 23 -0.65536000000000000000e5
-272 3 5 10 0.32768000000000000000e5
-272 3 8 21 0.32768000000000000000e5
-272 3 9 22 0.32768000000000000000e5
-272 3 11 24 0.13107200000000000000e6
-272 4 4 8 0.32768000000000000000e5
-273 1 3 15 0.32768000000000000000e5
-273 1 10 41 -0.32768000000000000000e5
-273 3 5 10 -0.32768000000000000000e5
-273 3 8 21 -0.32768000000000000000e5
-274 1 2 17 -0.32768000000000000000e5
-274 1 3 16 0.32768000000000000000e5
-275 1 2 17 0.32768000000000000000e5
-275 1 3 17 0.32768000000000000000e5
-275 1 3 18 0.32768000000000000000e5
-275 1 4 19 0.65536000000000000000e5
-275 1 20 27 -0.13107200000000000000e6
-275 1 28 35 0.65536000000000000000e5
-275 2 6 12 0.32768000000000000000e5
-275 2 10 24 0.65536000000000000000e5
-275 3 2 15 -0.65536000000000000000e5
-275 3 8 13 -0.65536000000000000000e5
-275 3 11 24 0.65536000000000000000e5
-276 1 3 19 0.32768000000000000000e5
-276 1 4 19 0.32768000000000000000e5
-276 1 20 27 -0.65536000000000000000e5
-276 1 28 35 0.32768000000000000000e5
-276 2 10 24 0.32768000000000000000e5
-276 3 2 15 -0.32768000000000000000e5
-276 3 8 13 -0.32768000000000000000e5
-276 3 11 24 0.32768000000000000000e5
-277 1 3 20 0.32768000000000000000e5
-277 1 4 19 -0.32768000000000000000e5
-278 1 3 21 0.32768000000000000000e5
-278 1 10 17 -0.16384000000000000000e5
-278 1 20 27 -0.32768000000000000000e5
-278 1 28 35 0.16384000000000000000e5
-278 3 2 15 -0.16384000000000000000e5
-278 3 8 13 -0.16384000000000000000e5
-278 3 11 24 0.16384000000000000000e5
-278 4 6 10 -0.16384000000000000000e5
-279 1 1 24 -0.32768000000000000000e5
-279 1 3 22 0.32768000000000000000e5
-280 1 1 48 -0.32768000000000000000e5
-280 1 2 49 -0.32768000000000000000e5
-280 1 3 23 0.32768000000000000000e5
-280 1 6 37 -0.32768000000000000000e5
-280 1 8 39 0.65536000000000000000e5
-280 1 23 38 -0.32768000000000000000e5
-280 2 2 32 -0.32768000000000000000e5
-280 2 3 17 0.32768000000000000000e5
-280 2 4 26 -0.32768000000000000000e5
-280 3 1 30 -0.65536000000000000000e5
-280 3 3 16 -0.32768000000000000000e5
-280 4 1 13 -0.32768000000000000000e5
-281 1 1 40 -0.32768000000000000000e5
-281 1 3 24 0.32768000000000000000e5
-281 1 7 38 -0.65536000000000000000e5
-281 1 8 23 0.65536000000000000000e5
-281 3 3 16 0.32768000000000000000e5
-281 3 4 17 0.32768000000000000000e5
-281 3 6 19 0.65536000000000000000e5
-281 3 7 20 -0.13107200000000000000e6
-281 4 1 13 0.32768000000000000000e5
-281 4 2 14 0.65536000000000000000e5
-282 1 1 40 0.32768000000000000000e5
-282 1 3 25 0.32768000000000000000e5
-282 1 6 37 0.32768000000000000000e5
-282 1 8 39 -0.65536000000000000000e5
-282 2 4 26 0.32768000000000000000e5
-282 3 4 17 -0.32768000000000000000e5
-283 1 3 27 0.32768000000000000000e5
-283 1 8 23 -0.32768000000000000000e5
-284 1 1 48 -0.16384000000000000000e5
-284 1 2 49 -0.16384000000000000000e5
-284 1 3 28 0.32768000000000000000e5
-284 1 7 38 -0.32768000000000000000e5
-284 1 8 23 0.32768000000000000000e5
-284 1 23 38 -0.16384000000000000000e5
-284 2 2 32 -0.16384000000000000000e5
-284 3 1 30 -0.32768000000000000000e5
-284 3 6 19 0.32768000000000000000e5
-284 3 7 20 -0.65536000000000000000e5
-284 4 2 14 0.32768000000000000000e5
-285 1 3 29 0.32768000000000000000e5
-285 1 8 39 -0.32768000000000000000e5
-285 3 6 19 -0.32768000000000000000e5
-286 1 1 48 0.16384000000000000000e5
-286 1 2 49 0.16384000000000000000e5
-286 1 3 30 0.32768000000000000000e5
-286 1 5 52 -0.65536000000000000000e5
-286 1 8 39 0.32768000000000000000e5
-286 1 10 25 0.32768000000000000000e5
-286 1 10 41 -0.65536000000000000000e5
-286 1 11 42 -0.65536000000000000000e5
-286 1 12 43 -0.13107200000000000000e6
-286 1 17 48 0.26214400000000000000e6
-286 1 23 38 0.16384000000000000000e5
-286 1 26 41 -0.32768000000000000000e5
-286 1 28 43 -0.65536000000000000000e5
-286 2 2 32 0.16384000000000000000e5
-286 2 8 22 -0.13107200000000000000e6
-286 2 12 26 0.65536000000000000000e5
-286 2 16 30 0.32768000000000000000e5
-286 3 2 31 0.65536000000000000000e5
-286 3 6 19 0.32768000000000000000e5
-286 3 8 21 -0.65536000000000000000e5
-286 3 14 27 0.13107200000000000000e6
-286 4 3 15 0.32768000000000000000e5
-286 4 4 16 0.13107200000000000000e6
-286 4 6 18 0.32768000000000000000e5
-286 4 7 19 0.65536000000000000000e5
-287 1 2 33 0.32768000000000000000e5
-287 1 3 31 0.32768000000000000000e5
-287 1 3 34 -0.65536000000000000000e5
-287 1 10 41 0.32768000000000000000e5
-287 2 7 21 0.32768000000000000000e5
-287 3 8 21 0.32768000000000000000e5
-288 1 2 33 -0.32768000000000000000e5
-288 1 3 32 0.32768000000000000000e5
-289 1 3 33 0.32768000000000000000e5
-289 1 10 41 -0.32768000000000000000e5
-289 3 8 21 -0.32768000000000000000e5
-290 1 3 35 0.32768000000000000000e5
-290 1 4 35 0.32768000000000000000e5
-290 1 18 25 0.32768000000000000000e5
-290 1 28 35 -0.65536000000000000000e5
-290 2 9 23 0.32768000000000000000e5
-290 3 11 24 -0.65536000000000000000e5
-291 1 3 36 0.32768000000000000000e5
-291 1 4 19 -0.32768000000000000000e5
-291 3 8 13 0.32768000000000000000e5
-292 1 1 48 -0.32768000000000000000e5
-292 1 2 49 -0.32768000000000000000e5
-292 1 3 37 0.32768000000000000000e5
-292 1 6 37 -0.32768000000000000000e5
-292 1 8 39 0.65536000000000000000e5
-292 1 23 38 -0.32768000000000000000e5
-292 2 2 32 -0.32768000000000000000e5
-292 2 3 17 0.32768000000000000000e5
-292 2 4 26 -0.32768000000000000000e5
-292 3 1 30 -0.65536000000000000000e5
-292 4 1 13 -0.32768000000000000000e5
-293 1 1 40 -0.32768000000000000000e5
-293 1 3 38 0.32768000000000000000e5
-294 1 1 40 0.32768000000000000000e5
-294 1 3 39 0.32768000000000000000e5
-294 1 6 37 0.32768000000000000000e5
-294 1 8 39 -0.65536000000000000000e5
-294 2 4 26 0.32768000000000000000e5
-295 1 3 40 0.32768000000000000000e5
-295 1 6 37 -0.32768000000000000000e5
-296 1 1 48 -0.16384000000000000000e5
-296 1 2 49 -0.16384000000000000000e5
-296 1 3 41 0.32768000000000000000e5
-296 1 23 38 -0.16384000000000000000e5
-296 2 2 32 -0.16384000000000000000e5
-296 3 1 30 -0.32768000000000000000e5
-297 1 3 42 0.32768000000000000000e5
-297 1 8 39 -0.32768000000000000000e5
-298 1 1 48 0.16384000000000000000e5
-298 1 2 49 0.16384000000000000000e5
-298 1 3 43 0.32768000000000000000e5
-298 1 5 52 -0.65536000000000000000e5
-298 1 8 39 0.32768000000000000000e5
-298 1 9 40 0.32768000000000000000e5
-298 1 10 41 -0.65536000000000000000e5
-298 1 11 42 -0.65536000000000000000e5
-298 1 12 43 -0.13107200000000000000e6
-298 1 17 48 0.26214400000000000000e6
-298 1 23 38 0.16384000000000000000e5
-298 1 26 41 -0.32768000000000000000e5
-298 1 28 43 -0.65536000000000000000e5
-298 2 2 32 0.16384000000000000000e5
-298 2 8 22 -0.13107200000000000000e6
-298 2 12 26 0.65536000000000000000e5
-298 2 16 30 0.32768000000000000000e5
-298 3 2 31 0.65536000000000000000e5
-298 3 14 27 0.13107200000000000000e6
-298 4 4 16 0.13107200000000000000e6
-298 4 6 18 0.32768000000000000000e5
-298 4 7 19 0.65536000000000000000e5
-299 1 3 44 0.32768000000000000000e5
-299 1 11 42 -0.32768000000000000000e5
-299 1 12 43 -0.65536000000000000000e5
-299 1 17 48 0.65536000000000000000e5
-299 2 8 22 -0.32768000000000000000e5
-299 2 12 26 0.32768000000000000000e5
-299 3 14 27 0.65536000000000000000e5
-299 4 4 16 0.32768000000000000000e5
-300 1 3 45 0.32768000000000000000e5
-300 1 10 41 -0.32768000000000000000e5
-301 1 3 46 0.32768000000000000000e5
-301 1 12 43 -0.32768000000000000000e5
-302 1 3 47 0.32768000000000000000e5
-302 1 23 38 -0.32768000000000000000e5
-303 1 2 49 -0.32768000000000000000e5
-303 1 3 48 0.32768000000000000000e5
-304 1 3 49 0.32768000000000000000e5
-304 1 24 39 -0.32768000000000000000e5
-305 1 1 48 0.16384000000000000000e5
-305 1 2 49 0.16384000000000000000e5
-305 1 3 50 0.32768000000000000000e5
-305 1 3 51 0.32768000000000000000e5
-305 1 11 42 -0.65536000000000000000e5
-305 1 12 43 -0.13107200000000000000e6
-305 1 17 48 0.13107200000000000000e6
-305 1 23 38 0.16384000000000000000e5
-305 2 2 32 0.16384000000000000000e5
-305 2 8 22 -0.65536000000000000000e5
-305 2 12 26 0.65536000000000000000e5
-305 2 16 30 0.32768000000000000000e5
-305 3 2 31 0.65536000000000000000e5
-305 3 14 27 0.13107200000000000000e6
-305 4 4 16 0.65536000000000000000e5
-306 1 3 52 0.32768000000000000000e5
-306 1 5 52 0.32768000000000000000e5
-306 1 17 48 -0.65536000000000000000e5
-306 1 28 43 0.32768000000000000000e5
-306 2 8 22 0.32768000000000000000e5
-306 4 4 16 -0.32768000000000000000e5
-306 4 7 19 -0.32768000000000000000e5
-307 1 2 49 -0.32768000000000000000e5
-307 1 3 53 0.32768000000000000000e5
-307 3 3 32 0.32768000000000000000e5
-308 1 3 54 0.32768000000000000000e5
-308 1 24 39 -0.32768000000000000000e5
-308 2 3 33 -0.32768000000000000000e5
-308 2 18 32 0.32768000000000000000e5
-308 3 3 32 -0.32768000000000000000e5
-308 3 4 33 -0.32768000000000000000e5
-308 3 17 30 0.65536000000000000000e5
-309 1 1 48 0.16384000000000000000e5
-309 1 2 49 0.16384000000000000000e5
-309 1 3 50 0.32768000000000000000e5
-309 1 3 55 0.32768000000000000000e5
-309 1 11 42 -0.65536000000000000000e5
-309 1 12 43 -0.13107200000000000000e6
-309 1 17 48 0.13107200000000000000e6
-309 1 23 38 0.16384000000000000000e5
-309 2 2 32 0.16384000000000000000e5
-309 2 8 22 -0.65536000000000000000e5
-309 2 12 26 0.65536000000000000000e5
-309 2 16 30 0.32768000000000000000e5
-309 3 2 31 0.65536000000000000000e5
-309 3 14 27 0.13107200000000000000e6
-309 3 17 30 0.32768000000000000000e5
-309 4 4 16 0.65536000000000000000e5
-310 1 3 56 0.32768000000000000000e5
-310 1 23 54 -0.32768000000000000000e5
-311 1 1 48 0.16384000000000000000e5
-311 1 2 5 0.16384000000000000000e5
-311 1 2 9 0.32768000000000000000e5
-311 1 2 17 0.13107200000000000000e6
-311 1 2 33 0.65536000000000000000e5
-311 1 2 49 0.16384000000000000000e5
-311 1 3 18 0.26214400000000000000e6
-311 1 4 4 0.32768000000000000000e5
-311 1 4 19 0.26214400000000000000e6
-311 1 4 35 0.26214400000000000000e6
-311 1 6 13 -0.65536000000000000000e5
-311 1 6 37 0.16384000000000000000e5
-311 1 11 42 -0.65536000000000000000e5
-311 1 18 25 0.13107200000000000000e6
-311 1 20 27 -0.52428800000000000000e6
-311 1 23 38 0.16384000000000000000e5
-311 2 2 4 0.16384000000000000000e5
-311 2 2 8 0.32768000000000000000e5
-311 2 2 32 0.16384000000000000000e5
-311 2 3 17 -0.16384000000000000000e5
-311 2 4 10 0.65536000000000000000e5
-311 2 4 26 0.16384000000000000000e5
-311 2 6 12 0.13107200000000000000e6
-311 2 8 22 -0.65536000000000000000e5
-311 2 9 23 0.13107200000000000000e6
-311 2 10 24 0.26214400000000000000e6
-311 3 1 30 0.32768000000000000000e5
-311 3 2 3 0.16384000000000000000e5
-311 3 2 15 -0.26214400000000000000e6
-311 3 3 8 0.32768000000000000000e5
-311 3 3 16 0.16384000000000000000e5
-311 3 6 19 0.32768000000000000000e5
-311 3 8 13 -0.26214400000000000000e6
-311 3 9 22 -0.65536000000000000000e5
-311 4 1 13 0.16384000000000000000e5
-311 4 4 8 -0.65536000000000000000e5
-312 1 1 40 0.32768000000000000000e5
-312 1 1 48 -0.65536000000000000000e5
-312 1 2 5 -0.32768000000000000000e5
-312 1 2 9 -0.65536000000000000000e5
-312 1 2 17 -0.26214400000000000000e6
-312 1 2 33 -0.13107200000000000000e6
-312 1 2 49 -0.65536000000000000000e5
-312 1 3 18 -0.52428800000000000000e6
-312 1 3 26 -0.32768000000000000000e5
-312 1 4 5 0.32768000000000000000e5
-312 1 4 19 -0.52428800000000000000e6
-312 1 4 35 -0.52428800000000000000e6
-312 1 5 52 0.13107200000000000000e6
-312 1 6 13 0.13107200000000000000e6
-312 1 8 39 -0.65536000000000000000e5
-312 1 11 42 0.26214400000000000000e6
-312 1 12 43 0.26214400000000000000e6
-312 1 17 48 -0.52428800000000000000e6
-312 1 18 25 -0.26214400000000000000e6
-312 1 20 27 0.10485760000000000000e7
-312 1 23 38 -0.65536000000000000000e5
-312 1 26 41 0.65536000000000000000e5
-312 1 28 43 0.13107200000000000000e6
-312 2 2 4 -0.32768000000000000000e5
-312 2 2 8 -0.65536000000000000000e5
-312 2 2 32 -0.65536000000000000000e5
-312 2 3 5 0.32768000000000000000e5
-312 2 3 9 0.65536000000000000000e5
-312 2 3 17 0.32768000000000000000e5
-312 2 4 10 -0.13107200000000000000e6
-312 2 4 18 -0.32768000000000000000e5
-312 2 6 12 -0.26214400000000000000e6
-312 2 8 22 0.39321600000000000000e6
-312 2 9 23 -0.26214400000000000000e6
-312 2 10 24 -0.52428800000000000000e6
-312 2 12 26 -0.13107200000000000000e6
-312 2 16 30 -0.65536000000000000000e5
-312 3 1 30 -0.65536000000000000000e5
-312 3 2 3 -0.32768000000000000000e5
-312 3 2 15 0.52428800000000000000e6
-312 3 2 31 -0.13107200000000000000e6
-312 3 3 16 -0.32768000000000000000e5
-312 3 4 5 0.32768000000000000000e5
-312 3 4 9 0.65536000000000000000e5
-312 3 4 17 -0.32768000000000000000e5
-312 3 5 10 -0.13107200000000000000e6
-312 3 6 19 -0.65536000000000000000e5
-312 3 8 13 0.52428800000000000000e6
-312 3 9 22 0.13107200000000000000e6
-312 3 14 27 -0.26214400000000000000e6
-312 4 1 13 -0.32768000000000000000e5
-312 4 3 15 -0.65536000000000000000e5
-312 4 4 8 0.13107200000000000000e6
-312 4 4 16 -0.26214400000000000000e6
-312 4 6 18 -0.65536000000000000000e5
-312 4 7 19 -0.13107200000000000000e6
-313 1 1 40 -0.32768000000000000000e5
-313 1 1 48 0.32768000000000000000e5
-313 1 2 49 0.32768000000000000000e5
-313 1 3 26 0.32768000000000000000e5
-313 1 4 6 0.32768000000000000000e5
-313 1 5 52 -0.13107200000000000000e6
-313 1 6 37 -0.32768000000000000000e5
-313 1 8 39 0.13107200000000000000e6
-313 1 10 25 0.65536000000000000000e5
-313 1 10 41 -0.13107200000000000000e6
-313 1 11 42 -0.13107200000000000000e6
-313 1 12 43 -0.26214400000000000000e6
-313 1 17 48 0.52428800000000000000e6
-313 1 23 38 0.32768000000000000000e5
-313 1 26 41 -0.65536000000000000000e5
-313 1 28 43 -0.13107200000000000000e6
-313 2 2 32 0.32768000000000000000e5
-313 2 4 18 0.32768000000000000000e5
-313 2 4 26 -0.32768000000000000000e5
-313 2 8 22 -0.26214400000000000000e6
-313 2 12 26 0.13107200000000000000e6
-313 2 16 30 0.65536000000000000000e5
-313 3 2 31 0.13107200000000000000e6
-313 3 4 5 -0.32768000000000000000e5
-313 3 4 17 0.32768000000000000000e5
-313 3 6 19 0.65536000000000000000e5
-313 3 8 21 -0.13107200000000000000e6
-313 3 14 27 0.26214400000000000000e6
-313 4 3 15 0.65536000000000000000e5
-313 4 4 16 0.26214400000000000000e6
-313 4 6 18 0.65536000000000000000e5
-313 4 7 19 0.13107200000000000000e6
-314 1 2 9 -0.32768000000000000000e5
-314 1 4 7 0.32768000000000000000e5
-315 1 2 9 0.32768000000000000000e5
-315 1 2 17 0.13107200000000000000e6
-315 1 2 33 0.65536000000000000000e5
-315 1 3 18 0.26214400000000000000e6
-315 1 4 8 0.32768000000000000000e5
-315 1 4 19 0.26214400000000000000e6
-315 1 4 35 0.26214400000000000000e6
-315 1 6 13 -0.65536000000000000000e5
-315 1 8 39 0.32768000000000000000e5
-315 1 11 42 -0.65536000000000000000e5
-315 1 18 25 0.13107200000000000000e6
-315 1 20 27 -0.52428800000000000000e6
-315 2 2 8 0.32768000000000000000e5
-315 2 4 10 0.65536000000000000000e5
-315 2 6 12 0.13107200000000000000e6
-315 2 8 22 -0.65536000000000000000e5
-315 2 9 23 0.13107200000000000000e6
-315 2 10 24 0.26214400000000000000e6
-315 3 2 15 -0.26214400000000000000e6
-315 3 3 8 0.32768000000000000000e5
-315 3 6 19 0.32768000000000000000e5
-315 3 8 13 -0.26214400000000000000e6
-315 3 9 22 -0.65536000000000000000e5
-315 4 4 8 -0.65536000000000000000e5
-316 1 4 9 0.32768000000000000000e5
-316 1 8 39 -0.32768000000000000000e5
-316 3 3 8 -0.32768000000000000000e5
-316 3 6 19 -0.32768000000000000000e5
-317 1 4 10 0.32768000000000000000e5
-317 1 8 39 0.32768000000000000000e5
-317 1 10 25 0.32768000000000000000e5
-317 1 10 41 -0.65536000000000000000e5
-317 2 3 9 0.32768000000000000000e5
-317 3 3 8 0.32768000000000000000e5
-317 3 4 9 0.32768000000000000000e5
-317 3 5 10 -0.65536000000000000000e5
-317 3 6 19 0.32768000000000000000e5
-317 3 8 21 -0.65536000000000000000e5
-318 1 4 11 0.32768000000000000000e5
-318 1 10 25 -0.32768000000000000000e5
-318 3 4 9 -0.32768000000000000000e5
-319 1 2 17 0.65536000000000000000e5
-319 1 2 33 0.32768000000000000000e5
-319 1 3 18 0.13107200000000000000e6
-319 1 4 12 0.32768000000000000000e5
-319 1 4 19 0.13107200000000000000e6
-319 1 4 35 0.13107200000000000000e6
-319 1 6 13 -0.32768000000000000000e5
-319 1 11 42 -0.32768000000000000000e5
-319 1 18 25 0.65536000000000000000e5
-319 1 20 27 -0.26214400000000000000e6
-319 2 4 10 0.32768000000000000000e5
-319 2 6 12 0.65536000000000000000e5
-319 2 8 22 -0.32768000000000000000e5
-319 2 9 23 0.65536000000000000000e5
-319 2 10 24 0.13107200000000000000e6
-319 3 2 15 -0.13107200000000000000e6
-319 3 8 13 -0.13107200000000000000e6
-319 3 9 22 -0.32768000000000000000e5
-319 4 4 8 -0.32768000000000000000e5
-320 1 2 33 -0.32768000000000000000e5
-320 1 3 18 -0.65536000000000000000e5
-320 1 4 13 0.32768000000000000000e5
-320 1 4 35 -0.13107200000000000000e6
-320 1 6 13 0.32768000000000000000e5
-320 1 10 41 0.32768000000000000000e5
-320 1 11 42 0.32768000000000000000e5
-320 1 18 25 -0.65536000000000000000e5
-320 1 28 35 0.13107200000000000000e6
-320 2 8 22 0.32768000000000000000e5
-320 2 9 23 -0.65536000000000000000e5
-320 3 5 10 0.32768000000000000000e5
-320 3 8 21 0.32768000000000000000e5
-320 3 9 22 0.32768000000000000000e5
-320 3 11 24 0.13107200000000000000e6
-320 4 4 8 0.32768000000000000000e5
-321 1 4 14 0.32768000000000000000e5
-321 1 10 41 -0.32768000000000000000e5
-321 3 5 10 -0.32768000000000000000e5
-321 3 8 21 -0.32768000000000000000e5
-322 1 4 15 0.32768000000000000000e5
-322 1 6 13 -0.32768000000000000000e5
-323 1 2 17 0.32768000000000000000e5
-323 1 3 18 0.32768000000000000000e5
-323 1 4 16 0.32768000000000000000e5
-323 1 4 19 0.65536000000000000000e5
-323 1 20 27 -0.13107200000000000000e6
-323 1 28 35 0.65536000000000000000e5
-323 2 6 12 0.32768000000000000000e5
-323 2 10 24 0.65536000000000000000e5
-323 3 2 15 -0.65536000000000000000e5
-323 3 8 13 -0.65536000000000000000e5
-323 3 11 24 0.65536000000000000000e5
-324 1 3 18 -0.32768000000000000000e5
-324 1 4 17 0.32768000000000000000e5
-325 1 3 18 0.32768000000000000000e5
-325 1 4 18 0.32768000000000000000e5
-325 1 10 17 -0.65536000000000000000e5
-325 1 11 14 0.32768000000000000000e5
-325 2 9 11 0.32768000000000000000e5
-326 1 4 20 0.32768000000000000000e5
-326 1 10 17 -0.32768000000000000000e5
-327 1 4 19 -0.16384000000000000000e5
-327 1 4 21 0.32768000000000000000e5
-327 1 5 20 -0.16384000000000000000e5
-327 1 10 17 -0.16384000000000000000e5
-327 2 8 14 -0.16384000000000000000e5
-328 1 1 48 -0.32768000000000000000e5
-328 1 2 49 -0.32768000000000000000e5
-328 1 4 22 0.32768000000000000000e5
-328 1 6 37 -0.32768000000000000000e5
-328 1 8 39 0.65536000000000000000e5
-328 1 23 38 -0.32768000000000000000e5
-328 2 2 32 -0.32768000000000000000e5
-328 2 3 17 0.32768000000000000000e5
-328 2 4 26 -0.32768000000000000000e5
-328 3 1 30 -0.65536000000000000000e5
-328 3 3 16 -0.32768000000000000000e5
-328 4 1 13 -0.32768000000000000000e5
-329 1 1 40 -0.32768000000000000000e5
-329 1 4 23 0.32768000000000000000e5
-329 1 7 38 -0.65536000000000000000e5
-329 1 8 23 0.65536000000000000000e5
-329 3 3 16 0.32768000000000000000e5
-329 3 4 17 0.32768000000000000000e5
-329 3 6 19 0.65536000000000000000e5
-329 3 7 20 -0.13107200000000000000e6
-329 4 1 13 0.32768000000000000000e5
-329 4 2 14 0.65536000000000000000e5
-330 1 1 40 0.32768000000000000000e5
-330 1 4 24 0.32768000000000000000e5
-330 1 6 37 0.32768000000000000000e5
-330 1 8 39 -0.65536000000000000000e5
-330 2 4 26 0.32768000000000000000e5
-330 3 4 17 -0.32768000000000000000e5
-331 1 3 26 -0.32768000000000000000e5
-331 1 4 25 0.32768000000000000000e5
-332 1 1 40 -0.32768000000000000000e5
-332 1 1 48 0.32768000000000000000e5
-332 1 2 49 0.32768000000000000000e5
-332 1 3 26 0.32768000000000000000e5
-332 1 4 26 0.32768000000000000000e5
-332 1 5 52 -0.13107200000000000000e6
-332 1 6 37 -0.32768000000000000000e5
-332 1 8 39 0.13107200000000000000e6
-332 1 10 25 0.65536000000000000000e5
-332 1 10 41 -0.13107200000000000000e6
-332 1 11 42 -0.13107200000000000000e6
-332 1 12 43 -0.26214400000000000000e6
-332 1 17 48 0.52428800000000000000e6
-332 1 23 38 0.32768000000000000000e5
-332 1 26 41 -0.65536000000000000000e5
-332 1 28 43 -0.13107200000000000000e6
-332 2 2 32 0.32768000000000000000e5
-332 2 4 18 0.32768000000000000000e5
-332 2 4 26 -0.32768000000000000000e5
-332 2 8 22 -0.26214400000000000000e6
-332 2 12 26 0.13107200000000000000e6
-332 2 16 30 0.65536000000000000000e5
-332 3 2 31 0.13107200000000000000e6
-332 3 4 17 0.32768000000000000000e5
-332 3 6 19 0.65536000000000000000e5
-332 3 8 21 -0.13107200000000000000e6
-332 3 14 27 0.26214400000000000000e6
-332 4 3 15 0.65536000000000000000e5
-332 4 4 16 0.26214400000000000000e6
-332 4 6 18 0.65536000000000000000e5
-332 4 7 19 0.13107200000000000000e6
-333 1 1 48 -0.16384000000000000000e5
-333 1 2 49 -0.16384000000000000000e5
-333 1 4 27 0.32768000000000000000e5
-333 1 7 38 -0.32768000000000000000e5
-333 1 8 23 0.32768000000000000000e5
-333 1 23 38 -0.16384000000000000000e5
-333 2 2 32 -0.16384000000000000000e5
-333 3 1 30 -0.32768000000000000000e5
-333 3 6 19 0.32768000000000000000e5
-333 3 7 20 -0.65536000000000000000e5
-333 4 2 14 0.32768000000000000000e5
-334 1 4 28 0.32768000000000000000e5
-334 1 8 39 -0.32768000000000000000e5
-334 3 6 19 -0.32768000000000000000e5
-335 1 1 48 0.16384000000000000000e5
-335 1 2 49 0.16384000000000000000e5
-335 1 4 29 0.32768000000000000000e5
-335 1 5 52 -0.65536000000000000000e5
-335 1 8 39 0.32768000000000000000e5
-335 1 10 25 0.32768000000000000000e5
-335 1 10 41 -0.65536000000000000000e5
-335 1 11 42 -0.65536000000000000000e5
-335 1 12 43 -0.13107200000000000000e6
-335 1 17 48 0.26214400000000000000e6
-335 1 23 38 0.16384000000000000000e5
-335 1 26 41 -0.32768000000000000000e5
-335 1 28 43 -0.65536000000000000000e5
-335 2 2 32 0.16384000000000000000e5
-335 2 8 22 -0.13107200000000000000e6
-335 2 12 26 0.65536000000000000000e5
-335 2 16 30 0.32768000000000000000e5
-335 3 2 31 0.65536000000000000000e5
-335 3 6 19 0.32768000000000000000e5
-335 3 8 21 -0.65536000000000000000e5
-335 3 14 27 0.13107200000000000000e6
-335 4 3 15 0.32768000000000000000e5
-335 4 4 16 0.13107200000000000000e6
-335 4 6 18 0.32768000000000000000e5
-335 4 7 19 0.65536000000000000000e5
-336 1 4 30 0.32768000000000000000e5
-336 1 10 25 -0.32768000000000000000e5
-337 1 2 33 -0.32768000000000000000e5
-337 1 4 31 0.32768000000000000000e5
-338 1 4 32 0.32768000000000000000e5
-338 1 10 41 -0.32768000000000000000e5
-338 3 8 21 -0.32768000000000000000e5
-339 1 4 33 0.32768000000000000000e5
-339 1 4 35 -0.65536000000000000000e5
-339 1 10 41 0.32768000000000000000e5
-339 1 11 42 0.32768000000000000000e5
-339 2 8 22 0.32768000000000000000e5
-339 3 8 21 0.32768000000000000000e5
-339 3 9 22 0.32768000000000000000e5
-340 1 4 34 0.32768000000000000000e5
-340 1 4 35 0.32768000000000000000e5
-340 1 18 25 0.32768000000000000000e5
-340 1 28 35 -0.65536000000000000000e5
-340 2 9 23 0.32768000000000000000e5
-340 3 11 24 -0.65536000000000000000e5
-341 1 4 36 0.32768000000000000000e5
-341 1 28 35 -0.32768000000000000000e5
-341 3 11 24 -0.32768000000000000000e5
-342 1 1 40 -0.32768000000000000000e5
-342 1 4 37 0.32768000000000000000e5
-343 1 1 40 0.32768000000000000000e5
-343 1 4 38 0.32768000000000000000e5
-343 1 6 37 0.32768000000000000000e5
-343 1 8 39 -0.65536000000000000000e5
-343 2 4 26 0.32768000000000000000e5
-344 1 4 39 0.32768000000000000000e5
-344 1 6 37 -0.32768000000000000000e5
-345 1 1 40 -0.32768000000000000000e5
-345 1 1 48 0.32768000000000000000e5
-345 1 2 49 0.32768000000000000000e5
-345 1 3 26 0.32768000000000000000e5
-345 1 4 40 0.32768000000000000000e5
-345 1 5 52 -0.13107200000000000000e6
-345 1 6 37 -0.32768000000000000000e5
-345 1 8 39 0.13107200000000000000e6
-345 1 10 25 0.65536000000000000000e5
-345 1 10 41 -0.13107200000000000000e6
-345 1 11 42 -0.13107200000000000000e6
-345 1 12 43 -0.26214400000000000000e6
-345 1 17 48 0.52428800000000000000e6
-345 1 23 38 0.32768000000000000000e5
-345 1 26 41 -0.65536000000000000000e5
-345 1 28 43 -0.13107200000000000000e6
-345 2 2 32 0.32768000000000000000e5
-345 2 4 18 0.32768000000000000000e5
-345 2 4 26 -0.32768000000000000000e5
-345 2 8 22 -0.26214400000000000000e6
-345 2 12 26 0.13107200000000000000e6
-345 2 16 30 0.65536000000000000000e5
-345 3 2 31 0.13107200000000000000e6
-345 3 4 17 0.32768000000000000000e5
-345 3 5 18 0.32768000000000000000e5
-345 3 6 19 0.65536000000000000000e5
-345 3 8 21 -0.13107200000000000000e6
-345 3 14 27 0.26214400000000000000e6
-345 4 3 15 0.65536000000000000000e5
-345 4 4 16 0.26214400000000000000e6
-345 4 6 18 0.65536000000000000000e5
-345 4 7 19 0.13107200000000000000e6
-346 1 4 41 0.32768000000000000000e5
-346 1 8 39 -0.32768000000000000000e5
-347 1 1 48 0.16384000000000000000e5
-347 1 2 49 0.16384000000000000000e5
-347 1 4 42 0.32768000000000000000e5
-347 1 5 52 -0.65536000000000000000e5
-347 1 8 39 0.32768000000000000000e5
-347 1 9 40 0.32768000000000000000e5
-347 1 10 41 -0.65536000000000000000e5
-347 1 11 42 -0.65536000000000000000e5
-347 1 12 43 -0.13107200000000000000e6
-347 1 17 48 0.26214400000000000000e6
-347 1 23 38 0.16384000000000000000e5
-347 1 26 41 -0.32768000000000000000e5
-347 1 28 43 -0.65536000000000000000e5
-347 2 2 32 0.16384000000000000000e5
-347 2 8 22 -0.13107200000000000000e6
-347 2 12 26 0.65536000000000000000e5
-347 2 16 30 0.32768000000000000000e5
-347 3 2 31 0.65536000000000000000e5
-347 3 14 27 0.13107200000000000000e6
-347 4 4 16 0.13107200000000000000e6
-347 4 6 18 0.32768000000000000000e5
-347 4 7 19 0.65536000000000000000e5
-348 1 4 43 0.32768000000000000000e5
-348 1 9 40 -0.32768000000000000000e5
-349 1 4 44 0.32768000000000000000e5
-349 1 10 41 -0.32768000000000000000e5
-350 1 4 45 0.32768000000000000000e5
-350 1 10 41 0.32768000000000000000e5
-350 1 11 42 0.32768000000000000000e5
-350 1 17 48 -0.65536000000000000000e5
-350 2 8 22 0.32768000000000000000e5
-350 3 14 27 -0.65536000000000000000e5
-350 4 4 16 -0.32768000000000000000e5
-351 1 4 46 0.32768000000000000000e5
-351 1 17 48 -0.32768000000000000000e5
-351 3 14 27 -0.32768000000000000000e5
-352 1 2 49 -0.32768000000000000000e5
-352 1 4 47 0.32768000000000000000e5
-353 1 4 48 0.32768000000000000000e5
-353 1 24 39 -0.32768000000000000000e5
-354 1 1 48 0.32768000000000000000e5
-354 1 2 49 0.65536000000000000000e5
-354 1 3 50 0.65536000000000000000e5
-354 1 4 49 0.32768000000000000000e5
-354 1 11 42 -0.13107200000000000000e6
-354 1 12 43 -0.26214400000000000000e6
-354 1 17 48 0.26214400000000000000e6
-354 1 23 38 0.32768000000000000000e5
-354 1 24 39 0.32768000000000000000e5
-354 2 2 32 0.32768000000000000000e5
-354 2 3 33 0.32768000000000000000e5
-354 2 8 22 -0.13107200000000000000e6
-354 2 12 26 0.13107200000000000000e6
-354 2 16 30 0.65536000000000000000e5
-354 3 2 31 0.13107200000000000000e6
-354 3 14 27 0.26214400000000000000e6
-354 4 4 16 0.13107200000000000000e6
-355 1 1 48 0.16384000000000000000e5
-355 1 2 49 0.16384000000000000000e5
-355 1 3 50 0.32768000000000000000e5
-355 1 4 50 0.32768000000000000000e5
-355 1 11 42 -0.65536000000000000000e5
-355 1 12 43 -0.13107200000000000000e6
-355 1 17 48 0.13107200000000000000e6
-355 1 23 38 0.16384000000000000000e5
-355 2 2 32 0.16384000000000000000e5
-355 2 8 22 -0.65536000000000000000e5
-355 2 12 26 0.65536000000000000000e5
-355 2 16 30 0.32768000000000000000e5
-355 3 2 31 0.65536000000000000000e5
-355 3 14 27 0.13107200000000000000e6
-355 4 4 16 0.65536000000000000000e5
-356 1 4 51 0.32768000000000000000e5
-356 1 26 41 -0.32768000000000000000e5
-357 1 4 52 0.32768000000000000000e5
-357 1 28 43 -0.32768000000000000000e5
-358 1 4 53 0.32768000000000000000e5
-358 1 24 39 -0.32768000000000000000e5
-358 2 3 33 -0.32768000000000000000e5
-358 2 18 32 0.32768000000000000000e5
-358 3 3 32 -0.32768000000000000000e5
-358 3 4 33 -0.32768000000000000000e5
-358 3 17 30 0.65536000000000000000e5
-359 1 1 48 0.32768000000000000000e5
-359 1 2 49 0.65536000000000000000e5
-359 1 3 50 0.65536000000000000000e5
-359 1 4 54 0.32768000000000000000e5
-359 1 11 42 -0.13107200000000000000e6
-359 1 12 43 -0.26214400000000000000e6
-359 1 17 48 0.26214400000000000000e6
-359 1 23 38 0.32768000000000000000e5
-359 1 24 39 0.32768000000000000000e5
-359 2 2 32 0.32768000000000000000e5
-359 2 3 33 0.32768000000000000000e5
-359 2 8 22 -0.13107200000000000000e6
-359 2 12 26 0.13107200000000000000e6
-359 2 16 30 0.65536000000000000000e5
-359 3 2 31 0.13107200000000000000e6
-359 3 4 33 0.32768000000000000000e5
-359 3 14 27 0.26214400000000000000e6
-359 4 4 16 0.13107200000000000000e6
-360 1 4 55 0.32768000000000000000e5
-360 1 26 41 -0.32768000000000000000e5
-360 3 22 27 0.32768000000000000000e5
-361 1 1 48 0.32768000000000000000e5
-361 1 2 49 0.65536000000000000000e5
-361 1 3 50 0.65536000000000000000e5
-361 1 4 56 0.32768000000000000000e5
-361 1 11 42 -0.13107200000000000000e6
-361 1 12 43 -0.26214400000000000000e6
-361 1 17 48 0.26214400000000000000e6
-361 1 23 38 0.32768000000000000000e5
-361 1 24 39 0.32768000000000000000e5
-361 2 2 32 0.32768000000000000000e5
-361 2 3 33 0.32768000000000000000e5
-361 2 8 22 -0.13107200000000000000e6
-361 2 12 26 0.13107200000000000000e6
-361 2 16 30 0.65536000000000000000e5
-361 3 2 31 0.13107200000000000000e6
-361 3 4 33 0.32768000000000000000e5
-361 3 14 27 0.26214400000000000000e6
-361 3 19 32 0.32768000000000000000e5
-361 4 4 16 0.13107200000000000000e6
-362 1 1 40 -0.16384000000000000000e5
-362 1 1 48 0.16384000000000000000e5
-362 1 2 49 0.16384000000000000000e5
-362 1 3 26 0.16384000000000000000e5
-362 1 5 5 0.32768000000000000000e5
-362 1 5 52 -0.65536000000000000000e5
-362 1 6 37 -0.16384000000000000000e5
-362 1 8 39 0.65536000000000000000e5
-362 1 10 25 0.32768000000000000000e5
-362 1 10 41 -0.65536000000000000000e5
-362 1 11 42 -0.65536000000000000000e5
-362 1 12 43 -0.13107200000000000000e6
-362 1 17 48 0.26214400000000000000e6
-362 1 23 38 0.16384000000000000000e5
-362 1 26 41 -0.32768000000000000000e5
-362 1 28 43 -0.65536000000000000000e5
-362 2 2 32 0.16384000000000000000e5
-362 2 4 18 0.16384000000000000000e5
-362 2 4 26 -0.16384000000000000000e5
-362 2 8 22 -0.13107200000000000000e6
-362 2 12 26 0.65536000000000000000e5
-362 2 16 30 0.32768000000000000000e5
-362 3 2 31 0.65536000000000000000e5
-362 3 4 5 -0.16384000000000000000e5
-362 3 4 17 0.16384000000000000000e5
-362 3 6 19 0.32768000000000000000e5
-362 3 8 21 -0.65536000000000000000e5
-362 3 14 27 0.13107200000000000000e6
-362 4 3 15 0.32768000000000000000e5
-362 4 4 16 0.13107200000000000000e6
-362 4 6 18 0.32768000000000000000e5
-362 4 7 19 0.65536000000000000000e5
-363 1 1 40 -0.32768000000000000000e5
-363 1 1 48 0.65536000000000000000e5
-363 1 2 5 0.32768000000000000000e5
-363 1 2 9 0.65536000000000000000e5
-363 1 2 17 0.26214400000000000000e6
-363 1 2 33 0.13107200000000000000e6
-363 1 2 49 0.65536000000000000000e5
-363 1 3 18 0.52428800000000000000e6
-363 1 4 19 0.52428800000000000000e6
-363 1 4 35 0.52428800000000000000e6
-363 1 5 6 0.32768000000000000000e5
-363 1 5 52 -0.13107200000000000000e6
-363 1 6 13 -0.13107200000000000000e6
-363 1 6 25 -0.32768000000000000000e5
-363 1 8 39 0.65536000000000000000e5
-363 1 11 42 -0.26214400000000000000e6
-363 1 12 43 -0.26214400000000000000e6
-363 1 17 48 0.52428800000000000000e6
-363 1 18 25 0.26214400000000000000e6
-363 1 20 27 -0.10485760000000000000e7
-363 1 23 38 0.65536000000000000000e5
-363 1 26 41 -0.65536000000000000000e5
-363 1 28 43 -0.13107200000000000000e6
-363 2 2 4 0.32768000000000000000e5
-363 2 2 8 0.65536000000000000000e5
-363 2 2 32 0.65536000000000000000e5
-363 2 3 5 -0.32768000000000000000e5
-363 2 3 9 -0.65536000000000000000e5
-363 2 3 17 -0.32768000000000000000e5
-363 2 4 10 0.13107200000000000000e6
-363 2 4 18 0.32768000000000000000e5
-363 2 6 12 0.26214400000000000000e6
-363 2 8 22 -0.39321600000000000000e6
-363 2 9 23 0.26214400000000000000e6
-363 2 10 24 0.52428800000000000000e6
-363 2 12 26 0.13107200000000000000e6
-363 2 16 30 0.65536000000000000000e5
-363 3 1 30 0.65536000000000000000e5
-363 3 2 3 0.32768000000000000000e5
-363 3 2 15 -0.52428800000000000000e6
-363 3 2 31 0.13107200000000000000e6
-363 3 3 16 0.32768000000000000000e5
-363 3 4 9 -0.13107200000000000000e6
-363 3 4 17 0.32768000000000000000e5
-363 3 5 10 0.13107200000000000000e6
-363 3 6 19 0.65536000000000000000e5
-363 3 8 13 -0.52428800000000000000e6
-363 3 9 22 -0.13107200000000000000e6
-363 3 14 27 0.26214400000000000000e6
-363 4 1 13 0.32768000000000000000e5
-363 4 3 15 0.65536000000000000000e5
-363 4 4 4 0.65536000000000000000e5
-363 4 4 8 -0.13107200000000000000e6
-363 4 4 16 0.26214400000000000000e6
-363 4 6 18 0.65536000000000000000e5
-363 4 7 19 0.13107200000000000000e6
-364 1 2 9 0.32768000000000000000e5
-364 1 2 17 0.13107200000000000000e6
-364 1 2 33 0.65536000000000000000e5
-364 1 3 18 0.26214400000000000000e6
-364 1 4 19 0.26214400000000000000e6
-364 1 4 35 0.26214400000000000000e6
-364 1 5 7 0.32768000000000000000e5
-364 1 6 13 -0.65536000000000000000e5
-364 1 8 39 0.32768000000000000000e5
-364 1 11 42 -0.65536000000000000000e5
-364 1 18 25 0.13107200000000000000e6
-364 1 20 27 -0.52428800000000000000e6
-364 2 2 8 0.32768000000000000000e5
-364 2 4 10 0.65536000000000000000e5
-364 2 6 12 0.13107200000000000000e6
-364 2 8 22 -0.65536000000000000000e5
-364 2 9 23 0.13107200000000000000e6
-364 2 10 24 0.26214400000000000000e6
-364 3 2 15 -0.26214400000000000000e6
-364 3 3 8 0.32768000000000000000e5
-364 3 6 19 0.32768000000000000000e5
-364 3 8 13 -0.26214400000000000000e6
-364 3 9 22 -0.65536000000000000000e5
-364 4 4 8 -0.65536000000000000000e5
-365 1 5 8 0.32768000000000000000e5
-365 1 8 39 -0.32768000000000000000e5
-365 3 3 8 -0.32768000000000000000e5
-365 3 6 19 -0.32768000000000000000e5
-366 1 5 9 0.32768000000000000000e5
-366 1 8 39 0.32768000000000000000e5
-366 1 10 25 0.32768000000000000000e5
-366 1 10 41 -0.65536000000000000000e5
-366 2 3 9 0.32768000000000000000e5
-366 3 3 8 0.32768000000000000000e5
-366 3 4 9 0.32768000000000000000e5
-366 3 5 10 -0.65536000000000000000e5
-366 3 6 19 0.32768000000000000000e5
-366 3 8 21 -0.65536000000000000000e5
-367 1 5 10 0.32768000000000000000e5
-367 1 10 25 -0.32768000000000000000e5
-367 3 4 9 -0.32768000000000000000e5
-368 1 3 18 0.13107200000000000000e6
-368 1 5 11 0.32768000000000000000e5
-368 1 6 11 0.32768000000000000000e5
-368 1 6 13 0.65536000000000000000e5
-368 1 10 17 -0.26214400000000000000e6
-368 1 10 25 0.32768000000000000000e5
-368 1 10 41 0.65536000000000000000e5
-368 1 11 14 0.13107200000000000000e6
-368 2 5 9 0.32768000000000000000e5
-368 2 5 11 0.65536000000000000000e5
-368 2 9 11 0.13107200000000000000e6
-368 3 4 9 0.32768000000000000000e5
-368 3 5 10 0.65536000000000000000e5
-368 3 8 21 0.65536000000000000000e5
-369 1 2 33 -0.32768000000000000000e5
-369 1 3 18 -0.65536000000000000000e5
-369 1 4 35 -0.13107200000000000000e6
-369 1 5 12 0.32768000000000000000e5
-369 1 6 13 0.32768000000000000000e5
-369 1 10 41 0.32768000000000000000e5
-369 1 11 42 0.32768000000000000000e5
-369 1 18 25 -0.65536000000000000000e5
-369 1 28 35 0.13107200000000000000e6
-369 2 8 22 0.32768000000000000000e5
-369 2 9 23 -0.65536000000000000000e5
-369 3 5 10 0.32768000000000000000e5
-369 3 8 21 0.32768000000000000000e5
-369 3 9 22 0.32768000000000000000e5
-369 3 11 24 0.13107200000000000000e6
-369 4 4 8 0.32768000000000000000e5
-370 1 5 13 0.32768000000000000000e5
-370 1 10 41 -0.32768000000000000000e5
-370 3 5 10 -0.32768000000000000000e5
-370 3 8 21 -0.32768000000000000000e5
-371 1 5 14 0.32768000000000000000e5
-371 1 6 13 -0.32768000000000000000e5
-372 1 3 18 0.65536000000000000000e5
-372 1 5 15 0.32768000000000000000e5
-372 1 6 13 0.32768000000000000000e5
-372 1 10 17 -0.13107200000000000000e6
-372 1 10 41 0.32768000000000000000e5
-372 1 11 14 0.65536000000000000000e5
-372 2 5 11 0.32768000000000000000e5
-372 2 9 11 0.65536000000000000000e5
-372 3 5 10 0.32768000000000000000e5
-372 3 8 21 0.32768000000000000000e5
-373 1 3 18 -0.32768000000000000000e5
-373 1 5 16 0.32768000000000000000e5
-374 1 3 18 0.32768000000000000000e5
-374 1 5 17 0.32768000000000000000e5
-374 1 10 17 -0.65536000000000000000e5
-374 1 11 14 0.32768000000000000000e5
-374 2 9 11 0.32768000000000000000e5
-375 1 5 18 0.32768000000000000000e5
-375 1 11 14 -0.32768000000000000000e5
-376 1 5 19 0.32768000000000000000e5
-376 1 10 17 -0.32768000000000000000e5
-377 1 4 19 0.16384000000000000000e5
-377 1 5 20 0.16384000000000000000e5
-377 1 5 21 0.32768000000000000000e5
-377 1 6 21 0.32768000000000000000e5
-377 1 10 17 0.16384000000000000000e5
-377 1 10 21 -0.65536000000000000000e5
-377 2 8 14 0.16384000000000000000e5
-377 2 9 15 0.32768000000000000000e5
-378 1 1 40 -0.32768000000000000000e5
-378 1 5 22 0.32768000000000000000e5
-378 1 7 38 -0.65536000000000000000e5
-378 1 8 23 0.65536000000000000000e5
-378 3 3 16 0.32768000000000000000e5
-378 3 4 17 0.32768000000000000000e5
-378 3 6 19 0.65536000000000000000e5
-378 3 7 20 -0.13107200000000000000e6
-378 4 1 13 0.32768000000000000000e5
-378 4 2 14 0.65536000000000000000e5
-379 1 1 40 0.32768000000000000000e5
-379 1 5 23 0.32768000000000000000e5
-379 1 6 37 0.32768000000000000000e5
-379 1 8 39 -0.65536000000000000000e5
-379 2 4 26 0.32768000000000000000e5
-379 3 4 17 -0.32768000000000000000e5
-380 1 3 26 -0.32768000000000000000e5
-380 1 5 24 0.32768000000000000000e5
-381 1 1 40 -0.32768000000000000000e5
-381 1 1 48 0.32768000000000000000e5
-381 1 2 49 0.32768000000000000000e5
-381 1 3 26 0.32768000000000000000e5
-381 1 5 25 0.32768000000000000000e5
-381 1 5 52 -0.13107200000000000000e6
-381 1 6 37 -0.32768000000000000000e5
-381 1 8 39 0.13107200000000000000e6
-381 1 10 25 0.65536000000000000000e5
-381 1 10 41 -0.13107200000000000000e6
-381 1 11 42 -0.13107200000000000000e6
-381 1 12 43 -0.26214400000000000000e6
-381 1 17 48 0.52428800000000000000e6
-381 1 23 38 0.32768000000000000000e5
-381 1 26 41 -0.65536000000000000000e5
-381 1 28 43 -0.13107200000000000000e6
-381 2 2 32 0.32768000000000000000e5
-381 2 4 18 0.32768000000000000000e5
-381 2 4 26 -0.32768000000000000000e5
-381 2 8 22 -0.26214400000000000000e6
-381 2 12 26 0.13107200000000000000e6
-381 2 16 30 0.65536000000000000000e5
-381 3 2 31 0.13107200000000000000e6
-381 3 4 17 0.32768000000000000000e5
-381 3 6 19 0.65536000000000000000e5
-381 3 8 21 -0.13107200000000000000e6
-381 3 14 27 0.26214400000000000000e6
-381 4 3 15 0.65536000000000000000e5
-381 4 4 16 0.26214400000000000000e6
-381 4 6 18 0.65536000000000000000e5
-381 4 7 19 0.13107200000000000000e6
-382 1 5 26 0.32768000000000000000e5
-382 1 6 25 -0.32768000000000000000e5
-383 1 5 27 0.32768000000000000000e5
-383 1 8 39 -0.32768000000000000000e5
-383 3 6 19 -0.32768000000000000000e5
-384 1 1 48 0.16384000000000000000e5
-384 1 2 49 0.16384000000000000000e5
-384 1 5 28 0.32768000000000000000e5
-384 1 5 52 -0.65536000000000000000e5
-384 1 8 39 0.32768000000000000000e5
-384 1 10 25 0.32768000000000000000e5
-384 1 10 41 -0.65536000000000000000e5
-384 1 11 42 -0.65536000000000000000e5
-384 1 12 43 -0.13107200000000000000e6
-384 1 17 48 0.26214400000000000000e6
-384 1 23 38 0.16384000000000000000e5
-384 1 26 41 -0.32768000000000000000e5
-384 1 28 43 -0.65536000000000000000e5
-384 2 2 32 0.16384000000000000000e5
-384 2 8 22 -0.13107200000000000000e6
-384 2 12 26 0.65536000000000000000e5
-384 2 16 30 0.32768000000000000000e5
-384 3 2 31 0.65536000000000000000e5
-384 3 6 19 0.32768000000000000000e5
-384 3 8 21 -0.65536000000000000000e5
-384 3 14 27 0.13107200000000000000e6
-384 4 3 15 0.32768000000000000000e5
-384 4 4 16 0.13107200000000000000e6
-384 4 6 18 0.32768000000000000000e5
-384 4 7 19 0.65536000000000000000e5
-385 1 5 29 0.32768000000000000000e5
-385 1 10 25 -0.32768000000000000000e5
-386 1 5 30 0.32768000000000000000e5
-386 1 6 29 -0.32768000000000000000e5
-387 1 5 31 0.32768000000000000000e5
-387 1 10 41 -0.32768000000000000000e5
-387 3 8 21 -0.32768000000000000000e5
-388 1 4 35 -0.65536000000000000000e5
-388 1 5 32 0.32768000000000000000e5
-388 1 10 41 0.32768000000000000000e5
-388 1 11 42 0.32768000000000000000e5
-388 2 8 22 0.32768000000000000000e5
-388 3 8 21 0.32768000000000000000e5
-388 3 9 22 0.32768000000000000000e5
-389 1 5 33 0.32768000000000000000e5
-389 1 11 42 -0.32768000000000000000e5
-389 3 9 22 -0.32768000000000000000e5
-390 1 4 35 -0.32768000000000000000e5
-390 1 5 34 0.32768000000000000000e5
-391 1 5 35 0.32768000000000000000e5
-391 1 18 25 -0.32768000000000000000e5
-392 1 1 40 0.32768000000000000000e5
-392 1 5 37 0.32768000000000000000e5
-392 1 6 37 0.32768000000000000000e5
-392 1 8 39 -0.65536000000000000000e5
-392 2 4 26 0.32768000000000000000e5
-393 1 5 38 0.32768000000000000000e5
-393 1 6 37 -0.32768000000000000000e5
-394 1 1 40 -0.32768000000000000000e5
-394 1 1 48 0.32768000000000000000e5
-394 1 2 49 0.32768000000000000000e5
-394 1 3 26 0.32768000000000000000e5
-394 1 5 39 0.32768000000000000000e5
-394 1 5 52 -0.13107200000000000000e6
-394 1 6 37 -0.32768000000000000000e5
-394 1 8 39 0.13107200000000000000e6
-394 1 10 25 0.65536000000000000000e5
-394 1 10 41 -0.13107200000000000000e6
-394 1 11 42 -0.13107200000000000000e6
-394 1 12 43 -0.26214400000000000000e6
-394 1 17 48 0.52428800000000000000e6
-394 1 23 38 0.32768000000000000000e5
-394 1 26 41 -0.65536000000000000000e5
-394 1 28 43 -0.13107200000000000000e6
-394 2 2 32 0.32768000000000000000e5
-394 2 4 18 0.32768000000000000000e5
-394 2 4 26 -0.32768000000000000000e5
-394 2 8 22 -0.26214400000000000000e6
-394 2 12 26 0.13107200000000000000e6
-394 2 16 30 0.65536000000000000000e5
-394 3 2 31 0.13107200000000000000e6
-394 3 4 17 0.32768000000000000000e5
-394 3 5 18 0.32768000000000000000e5
-394 3 6 19 0.65536000000000000000e5
-394 3 8 21 -0.13107200000000000000e6
-394 3 14 27 0.26214400000000000000e6
-394 4 3 15 0.65536000000000000000e5
-394 4 4 16 0.26214400000000000000e6
-394 4 6 18 0.65536000000000000000e5
-394 4 7 19 0.13107200000000000000e6
-395 1 1 40 0.32768000000000000000e5
-395 1 1 48 -0.32768000000000000000e5
-395 1 2 49 -0.32768000000000000000e5
-395 1 3 26 -0.32768000000000000000e5
-395 1 5 40 0.32768000000000000000e5
-395 1 5 52 0.13107200000000000000e6
-395 1 6 37 0.65536000000000000000e5
-395 1 8 39 -0.13107200000000000000e6
-395 1 9 40 -0.65536000000000000000e5
-395 1 10 25 -0.65536000000000000000e5
-395 1 10 41 0.13107200000000000000e6
-395 1 11 42 0.13107200000000000000e6
-395 1 12 43 0.26214400000000000000e6
-395 1 17 48 -0.52428800000000000000e6
-395 1 23 38 -0.32768000000000000000e5
-395 1 26 41 0.65536000000000000000e5
-395 1 28 43 0.13107200000000000000e6
-395 2 2 32 -0.32768000000000000000e5
-395 2 4 18 -0.32768000000000000000e5
-395 2 4 26 0.32768000000000000000e5
-395 2 5 27 0.32768000000000000000e5
-395 2 8 22 0.26214400000000000000e6
-395 2 12 26 -0.13107200000000000000e6
-395 2 16 30 -0.65536000000000000000e5
-395 3 2 31 -0.13107200000000000000e6
-395 3 4 17 -0.32768000000000000000e5
-395 3 5 18 -0.32768000000000000000e5
-395 3 6 19 -0.65536000000000000000e5
-395 3 8 21 0.13107200000000000000e6
-395 3 14 27 -0.26214400000000000000e6
-395 4 3 15 -0.65536000000000000000e5
-395 4 4 16 -0.26214400000000000000e6
-395 4 6 18 -0.65536000000000000000e5
-395 4 7 19 -0.13107200000000000000e6
-396 1 1 48 0.16384000000000000000e5
-396 1 2 49 0.16384000000000000000e5
-396 1 5 41 0.32768000000000000000e5
-396 1 5 52 -0.65536000000000000000e5
-396 1 8 39 0.32768000000000000000e5
-396 1 9 40 0.32768000000000000000e5
-396 1 10 41 -0.65536000000000000000e5
-396 1 11 42 -0.65536000000000000000e5
-396 1 12 43 -0.13107200000000000000e6
-396 1 17 48 0.26214400000000000000e6
-396 1 23 38 0.16384000000000000000e5
-396 1 26 41 -0.32768000000000000000e5
-396 1 28 43 -0.65536000000000000000e5
-396 2 2 32 0.16384000000000000000e5
-396 2 8 22 -0.13107200000000000000e6
-396 2 12 26 0.65536000000000000000e5
-396 2 16 30 0.32768000000000000000e5
-396 3 2 31 0.65536000000000000000e5
-396 3 14 27 0.13107200000000000000e6
-396 4 4 16 0.13107200000000000000e6
-396 4 6 18 0.32768000000000000000e5
-396 4 7 19 0.65536000000000000000e5
-397 1 5 42 0.32768000000000000000e5
-397 1 9 40 -0.32768000000000000000e5
-398 1 5 43 0.32768000000000000000e5
-398 1 26 29 -0.32768000000000000000e5
-399 1 5 44 0.32768000000000000000e5
-399 1 10 41 0.32768000000000000000e5
-399 1 11 42 0.32768000000000000000e5
-399 1 17 48 -0.65536000000000000000e5
-399 2 8 22 0.32768000000000000000e5
-399 3 14 27 -0.65536000000000000000e5
-399 4 4 16 -0.32768000000000000000e5
-400 1 5 45 0.32768000000000000000e5
-400 1 11 42 -0.32768000000000000000e5
-401 1 5 46 0.32768000000000000000e5
-401 1 18 25 -0.32768000000000000000e5
-401 3 14 19 0.32768000000000000000e5
-402 1 5 47 0.32768000000000000000e5
-402 1 24 39 -0.32768000000000000000e5
-403 1 1 48 0.32768000000000000000e5
-403 1 2 49 0.65536000000000000000e5
-403 1 3 50 0.65536000000000000000e5
-403 1 5 48 0.32768000000000000000e5
-403 1 11 42 -0.13107200000000000000e6
-403 1 12 43 -0.26214400000000000000e6
-403 1 17 48 0.26214400000000000000e6
-403 1 23 38 0.32768000000000000000e5
-403 1 24 39 0.32768000000000000000e5
-403 2 2 32 0.32768000000000000000e5
-403 2 3 33 0.32768000000000000000e5
-403 2 8 22 -0.13107200000000000000e6
-403 2 12 26 0.13107200000000000000e6
-403 2 16 30 0.65536000000000000000e5
-403 3 2 31 0.13107200000000000000e6
-403 3 14 27 0.26214400000000000000e6
-403 4 4 16 0.13107200000000000000e6
-404 1 5 49 0.32768000000000000000e5
-404 1 25 40 -0.32768000000000000000e5
-405 1 5 50 0.32768000000000000000e5
-405 1 26 41 -0.32768000000000000000e5
-406 1 1 48 -0.16384000000000000000e5
-406 1 2 49 -0.16384000000000000000e5
-406 1 3 50 -0.32768000000000000000e5
-406 1 5 51 0.32768000000000000000e5
-406 1 11 42 0.65536000000000000000e5
-406 1 12 43 0.13107200000000000000e6
-406 1 17 48 -0.13107200000000000000e6
-406 1 23 38 -0.16384000000000000000e5
-406 1 26 41 0.32768000000000000000e5
-406 1 28 43 -0.65536000000000000000e5
-406 2 2 32 -0.16384000000000000000e5
-406 2 4 34 0.32768000000000000000e5
-406 2 8 22 0.65536000000000000000e5
-406 2 12 26 -0.65536000000000000000e5
-406 2 16 30 -0.32768000000000000000e5
-406 3 2 31 -0.65536000000000000000e5
-406 3 14 27 -0.13107200000000000000e6
-406 4 4 16 -0.65536000000000000000e5
-407 1 1 48 0.32768000000000000000e5
-407 1 2 49 0.65536000000000000000e5
-407 1 3 50 0.65536000000000000000e5
-407 1 5 53 0.32768000000000000000e5
-407 1 11 42 -0.13107200000000000000e6
-407 1 12 43 -0.26214400000000000000e6
-407 1 17 48 0.26214400000000000000e6
-407 1 23 38 0.32768000000000000000e5
-407 1 24 39 0.32768000000000000000e5
-407 2 2 32 0.32768000000000000000e5
-407 2 3 33 0.32768000000000000000e5
-407 2 8 22 -0.13107200000000000000e6
-407 2 12 26 0.13107200000000000000e6
-407 2 16 30 0.65536000000000000000e5
-407 3 2 31 0.13107200000000000000e6
-407 3 4 33 0.32768000000000000000e5
-407 3 14 27 0.26214400000000000000e6
-407 4 4 16 0.13107200000000000000e6
-408 1 5 54 0.32768000000000000000e5
-408 1 6 53 -0.32768000000000000000e5
-409 1 1 48 -0.16384000000000000000e5
-409 1 2 49 -0.16384000000000000000e5
-409 1 3 50 -0.32768000000000000000e5
-409 1 5 55 0.32768000000000000000e5
-409 1 11 42 0.65536000000000000000e5
-409 1 12 43 0.13107200000000000000e6
-409 1 17 48 -0.13107200000000000000e6
-409 1 23 38 -0.16384000000000000000e5
-409 1 26 41 0.32768000000000000000e5
-409 1 28 43 -0.65536000000000000000e5
-409 2 2 32 -0.16384000000000000000e5
-409 2 4 34 0.32768000000000000000e5
-409 2 8 22 0.65536000000000000000e5
-409 2 12 26 -0.65536000000000000000e5
-409 2 16 30 -0.32768000000000000000e5
-409 3 2 31 -0.65536000000000000000e5
-409 3 5 34 0.32768000000000000000e5
-409 3 14 27 -0.13107200000000000000e6
-409 4 4 16 -0.65536000000000000000e5
-410 1 5 56 0.32768000000000000000e5
-410 1 25 56 -0.32768000000000000000e5
-410 3 28 33 -0.32768000000000000000e5
-411 1 1 40 0.32768000000000000000e5
-411 1 1 48 -0.49152000000000000000e5
-411 1 2 5 -0.16384000000000000000e5
-411 1 2 9 -0.32768000000000000000e5
-411 1 2 17 -0.13107200000000000000e6
-411 1 2 33 -0.65536000000000000000e5
-411 1 2 49 -0.49152000000000000000e5
-411 1 3 18 -0.13107200000000000000e6
-411 1 3 26 -0.16384000000000000000e5
-411 1 4 19 -0.26214400000000000000e6
-411 1 4 35 -0.26214400000000000000e6
-411 1 5 52 0.13107200000000000000e6
-411 1 6 6 0.32768000000000000000e5
-411 1 6 11 0.32768000000000000000e5
-411 1 6 13 0.13107200000000000000e6
-411 1 6 25 0.16384000000000000000e5
-411 1 6 37 0.16384000000000000000e5
-411 1 8 39 -0.98304000000000000000e5
-411 1 10 17 -0.26214400000000000000e6
-411 1 10 41 0.13107200000000000000e6
-411 1 11 14 0.13107200000000000000e6
-411 1 11 42 0.19660800000000000000e6
-411 1 12 43 0.26214400000000000000e6
-411 1 17 48 -0.52428800000000000000e6
-411 1 18 25 -0.13107200000000000000e6
-411 1 20 27 0.52428800000000000000e6
-411 1 23 38 -0.49152000000000000000e5
-411 1 26 41 0.65536000000000000000e5
-411 1 28 43 0.13107200000000000000e6
-411 2 2 4 -0.16384000000000000000e5
-411 2 2 8 -0.32768000000000000000e5
-411 2 2 32 -0.49152000000000000000e5
-411 2 3 5 0.16384000000000000000e5
-411 2 3 9 0.32768000000000000000e5
-411 2 3 17 0.16384000000000000000e5
-411 2 4 10 -0.65536000000000000000e5
-411 2 4 18 -0.32768000000000000000e5
-411 2 4 26 0.16384000000000000000e5
-411 2 5 5 0.32768000000000000000e5
-411 2 5 9 0.32768000000000000000e5
-411 2 5 11 0.65536000000000000000e5
-411 2 6 12 -0.13107200000000000000e6
-411 2 8 22 0.32768000000000000000e6
-411 2 9 11 0.13107200000000000000e6
-411 2 9 23 -0.13107200000000000000e6
-411 2 10 24 -0.26214400000000000000e6
-411 2 12 26 -0.13107200000000000000e6
-411 2 16 30 -0.65536000000000000000e5
-411 3 1 30 -0.32768000000000000000e5
-411 3 2 3 -0.16384000000000000000e5
-411 3 2 15 0.26214400000000000000e6
-411 3 2 31 -0.13107200000000000000e6
-411 3 3 16 -0.16384000000000000000e5
-411 3 4 5 0.16384000000000000000e5
-411 3 4 9 0.98304000000000000000e5
-411 3 4 17 -0.32768000000000000000e5
-411 3 6 19 -0.65536000000000000000e5
-411 3 8 13 0.26214400000000000000e6
-411 3 8 21 0.13107200000000000000e6
-411 3 9 22 0.65536000000000000000e5
-411 3 14 27 -0.26214400000000000000e6
-411 4 1 13 -0.16384000000000000000e5
-411 4 3 15 -0.65536000000000000000e5
-411 4 4 4 -0.32768000000000000000e5
-411 4 4 8 0.65536000000000000000e5
-411 4 4 16 -0.26214400000000000000e6
-411 4 6 18 -0.65536000000000000000e5
-411 4 7 19 -0.13107200000000000000e6
-412 1 6 7 0.32768000000000000000e5
-412 1 8 39 -0.32768000000000000000e5
-412 3 3 8 -0.32768000000000000000e5
-412 3 6 19 -0.32768000000000000000e5
-413 1 6 8 0.32768000000000000000e5
-413 1 8 39 0.32768000000000000000e5
-413 1 10 25 0.32768000000000000000e5
-413 1 10 41 -0.65536000000000000000e5
-413 2 3 9 0.32768000000000000000e5
-413 3 3 8 0.32768000000000000000e5
-413 3 4 9 0.32768000000000000000e5
-413 3 5 10 -0.65536000000000000000e5
-413 3 6 19 0.32768000000000000000e5
-413 3 8 21 -0.65536000000000000000e5
-414 1 6 9 0.32768000000000000000e5
-414 1 10 25 -0.32768000000000000000e5
-414 3 4 9 -0.32768000000000000000e5
-415 1 3 18 0.13107200000000000000e6
-415 1 6 10 0.32768000000000000000e5
-415 1 6 11 0.32768000000000000000e5
-415 1 6 13 0.65536000000000000000e5
-415 1 10 17 -0.26214400000000000000e6
-415 1 10 25 0.32768000000000000000e5
-415 1 10 41 0.65536000000000000000e5
-415 1 11 14 0.13107200000000000000e6
-415 2 5 9 0.32768000000000000000e5
-415 2 5 11 0.65536000000000000000e5
-415 2 9 11 0.13107200000000000000e6
-415 3 4 9 0.32768000000000000000e5
-415 3 5 10 0.65536000000000000000e5
-415 3 8 21 0.65536000000000000000e5
-416 1 6 12 0.32768000000000000000e5
-416 1 10 41 -0.32768000000000000000e5
-416 3 5 10 -0.32768000000000000000e5
-416 3 8 21 -0.32768000000000000000e5
-417 1 3 18 0.65536000000000000000e5
-417 1 6 13 0.32768000000000000000e5
-417 1 6 14 0.32768000000000000000e5
-417 1 10 17 -0.13107200000000000000e6
-417 1 10 41 0.32768000000000000000e5
-417 1 11 14 0.65536000000000000000e5
-417 2 5 11 0.32768000000000000000e5
-417 2 9 11 0.65536000000000000000e5
-417 3 5 10 0.32768000000000000000e5
-417 3 8 21 0.32768000000000000000e5
-418 1 3 18 -0.65536000000000000000e5
-418 1 6 15 0.32768000000000000000e5
-418 1 10 17 0.13107200000000000000e6
-418 1 10 41 -0.32768000000000000000e5
-418 1 11 14 -0.13107200000000000000e6
-418 2 5 11 -0.32768000000000000000e5
-418 2 9 9 0.65536000000000000000e5
-418 2 9 11 -0.65536000000000000000e5
-418 3 5 10 -0.32768000000000000000e5
-418 3 8 21 -0.32768000000000000000e5
-419 1 3 18 0.32768000000000000000e5
-419 1 6 16 0.32768000000000000000e5
-419 1 10 17 -0.65536000000000000000e5
-419 1 11 14 0.32768000000000000000e5
-419 2 9 11 0.32768000000000000000e5
-420 1 6 17 0.32768000000000000000e5
-420 1 11 14 -0.32768000000000000000e5
-421 1 3 18 -0.32768000000000000000e5
-421 1 5 20 -0.65536000000000000000e5
-421 1 6 18 0.32768000000000000000e5
-421 1 10 17 0.65536000000000000000e5
-421 2 9 11 -0.32768000000000000000e5
-421 2 9 12 0.32768000000000000000e5
-422 1 5 20 -0.32768000000000000000e5
-422 1 6 19 0.32768000000000000000e5
-423 1 6 20 0.32768000000000000000e5
-423 1 11 18 -0.32768000000000000000e5
-424 1 1 40 0.32768000000000000000e5
-424 1 6 22 0.32768000000000000000e5
-424 1 6 37 0.32768000000000000000e5
-424 1 8 39 -0.65536000000000000000e5
-424 2 4 26 0.32768000000000000000e5
-424 3 4 17 -0.32768000000000000000e5
-425 1 3 26 -0.32768000000000000000e5
-425 1 6 23 0.32768000000000000000e5
-426 1 1 40 -0.32768000000000000000e5
-426 1 1 48 0.32768000000000000000e5
-426 1 2 49 0.32768000000000000000e5
-426 1 3 26 0.32768000000000000000e5
-426 1 5 52 -0.13107200000000000000e6
-426 1 6 24 0.32768000000000000000e5
-426 1 6 37 -0.32768000000000000000e5
-426 1 8 39 0.13107200000000000000e6
-426 1 10 25 0.65536000000000000000e5
-426 1 10 41 -0.13107200000000000000e6
-426 1 11 42 -0.13107200000000000000e6
-426 1 12 43 -0.26214400000000000000e6
-426 1 17 48 0.52428800000000000000e6
-426 1 23 38 0.32768000000000000000e5
-426 1 26 41 -0.65536000000000000000e5
-426 1 28 43 -0.13107200000000000000e6
-426 2 2 32 0.32768000000000000000e5
-426 2 4 18 0.32768000000000000000e5
-426 2 4 26 -0.32768000000000000000e5
-426 2 8 22 -0.26214400000000000000e6
-426 2 12 26 0.13107200000000000000e6
-426 2 16 30 0.65536000000000000000e5
-426 3 2 31 0.13107200000000000000e6
-426 3 4 17 0.32768000000000000000e5
-426 3 6 19 0.65536000000000000000e5
-426 3 8 21 -0.13107200000000000000e6
-426 3 14 27 0.26214400000000000000e6
-426 4 3 15 0.65536000000000000000e5
-426 4 4 16 0.26214400000000000000e6
-426 4 6 18 0.65536000000000000000e5
-426 4 7 19 0.13107200000000000000e6
-427 1 1 40 0.32768000000000000000e5
-427 1 1 48 -0.32768000000000000000e5
-427 1 2 49 -0.32768000000000000000e5
-427 1 3 26 -0.32768000000000000000e5
-427 1 5 52 0.13107200000000000000e6
-427 1 6 25 0.32768000000000000000e5
-427 1 6 26 0.32768000000000000000e5
-427 1 6 29 -0.65536000000000000000e5
-427 1 6 37 0.32768000000000000000e5
-427 1 8 39 -0.13107200000000000000e6
-427 1 10 25 -0.65536000000000000000e5
-427 1 10 41 0.13107200000000000000e6
-427 1 11 42 0.13107200000000000000e6
-427 1 12 43 0.26214400000000000000e6
-427 1 17 48 -0.52428800000000000000e6
-427 1 23 38 -0.32768000000000000000e5
-427 1 26 41 0.65536000000000000000e5
-427 1 28 43 0.13107200000000000000e6
-427 2 2 32 -0.32768000000000000000e5
-427 2 4 18 -0.32768000000000000000e5
-427 2 4 26 0.32768000000000000000e5
-427 2 5 19 0.32768000000000000000e5
-427 2 8 22 0.26214400000000000000e6
-427 2 12 26 -0.13107200000000000000e6
-427 2 16 30 -0.65536000000000000000e5
-427 3 2 31 -0.13107200000000000000e6
-427 3 4 17 -0.32768000000000000000e5
-427 3 6 19 -0.65536000000000000000e5
-427 3 8 21 0.13107200000000000000e6
-427 3 14 27 -0.26214400000000000000e6
-427 4 3 15 -0.65536000000000000000e5
-427 4 4 16 -0.26214400000000000000e6
-427 4 6 18 -0.65536000000000000000e5
-427 4 7 19 -0.13107200000000000000e6
-428 1 1 48 0.16384000000000000000e5
-428 1 2 49 0.16384000000000000000e5
-428 1 5 52 -0.65536000000000000000e5
-428 1 6 27 0.32768000000000000000e5
-428 1 8 39 0.32768000000000000000e5
-428 1 10 25 0.32768000000000000000e5
-428 1 10 41 -0.65536000000000000000e5
-428 1 11 42 -0.65536000000000000000e5
-428 1 12 43 -0.13107200000000000000e6
-428 1 17 48 0.26214400000000000000e6
-428 1 23 38 0.16384000000000000000e5
-428 1 26 41 -0.32768000000000000000e5
-428 1 28 43 -0.65536000000000000000e5
-428 2 2 32 0.16384000000000000000e5
-428 2 8 22 -0.13107200000000000000e6
-428 2 12 26 0.65536000000000000000e5
-428 2 16 30 0.32768000000000000000e5
-428 3 2 31 0.65536000000000000000e5
-428 3 6 19 0.32768000000000000000e5
-428 3 8 21 -0.65536000000000000000e5
-428 3 14 27 0.13107200000000000000e6
-428 4 3 15 0.32768000000000000000e5
-428 4 4 16 0.13107200000000000000e6
-428 4 6 18 0.32768000000000000000e5
-428 4 7 19 0.65536000000000000000e5
-429 1 6 28 0.32768000000000000000e5
-429 1 10 25 -0.32768000000000000000e5
-430 1 6 30 0.32768000000000000000e5
-430 1 11 26 -0.32768000000000000000e5
-431 1 4 35 -0.65536000000000000000e5
-431 1 6 31 0.32768000000000000000e5
-431 1 10 41 0.32768000000000000000e5
-431 1 11 42 0.32768000000000000000e5
-431 2 8 22 0.32768000000000000000e5
-431 3 8 21 0.32768000000000000000e5
-431 3 9 22 0.32768000000000000000e5
-432 1 6 32 0.32768000000000000000e5
-432 1 11 42 -0.32768000000000000000e5
-432 3 9 22 -0.32768000000000000000e5
-433 1 6 33 0.32768000000000000000e5
-433 1 11 30 -0.32768000000000000000e5
-434 1 6 34 0.32768000000000000000e5
-434 1 18 25 -0.32768000000000000000e5
-435 1 6 35 0.32768000000000000000e5
-435 1 15 30 -0.32768000000000000000e5
-436 1 5 36 0.32768000000000000000e5
-436 1 6 36 0.32768000000000000000e5
-436 1 28 35 0.32768000000000000000e5
-436 1 29 36 -0.65536000000000000000e5
-436 2 9 25 0.32768000000000000000e5
-436 3 11 24 0.32768000000000000000e5
-436 3 12 25 -0.65536000000000000000e5
-437 1 1 40 -0.32768000000000000000e5
-437 1 1 48 0.32768000000000000000e5
-437 1 2 49 0.32768000000000000000e5
-437 1 3 26 0.32768000000000000000e5
-437 1 5 52 -0.13107200000000000000e6
-437 1 6 37 -0.32768000000000000000e5
-437 1 6 38 0.32768000000000000000e5
-437 1 8 39 0.13107200000000000000e6
-437 1 10 25 0.65536000000000000000e5
-437 1 10 41 -0.13107200000000000000e6
-437 1 11 42 -0.13107200000000000000e6
-437 1 12 43 -0.26214400000000000000e6
-437 1 17 48 0.52428800000000000000e6
-437 1 23 38 0.32768000000000000000e5
-437 1 26 41 -0.65536000000000000000e5
-437 1 28 43 -0.13107200000000000000e6
-437 2 2 32 0.32768000000000000000e5
-437 2 4 18 0.32768000000000000000e5
-437 2 4 26 -0.32768000000000000000e5
-437 2 8 22 -0.26214400000000000000e6
-437 2 12 26 0.13107200000000000000e6
-437 2 16 30 0.65536000000000000000e5
-437 3 2 31 0.13107200000000000000e6
-437 3 4 17 0.32768000000000000000e5
-437 3 5 18 0.32768000000000000000e5
-437 3 6 19 0.65536000000000000000e5
-437 3 8 21 -0.13107200000000000000e6
-437 3 14 27 0.26214400000000000000e6
-437 4 3 15 0.65536000000000000000e5
-437 4 4 16 0.26214400000000000000e6
-437 4 6 18 0.65536000000000000000e5
-437 4 7 19 0.13107200000000000000e6
-438 1 1 40 0.32768000000000000000e5
-438 1 1 48 -0.32768000000000000000e5
-438 1 2 49 -0.32768000000000000000e5
-438 1 3 26 -0.32768000000000000000e5
-438 1 5 52 0.13107200000000000000e6
-438 1 6 37 0.65536000000000000000e5
-438 1 6 39 0.32768000000000000000e5
-438 1 8 39 -0.13107200000000000000e6
-438 1 9 40 -0.65536000000000000000e5
-438 1 10 25 -0.65536000000000000000e5
-438 1 10 41 0.13107200000000000000e6
-438 1 11 42 0.13107200000000000000e6
-438 1 12 43 0.26214400000000000000e6
-438 1 17 48 -0.52428800000000000000e6
-438 1 23 38 -0.32768000000000000000e5
-438 1 26 41 0.65536000000000000000e5
-438 1 28 43 0.13107200000000000000e6
-438 2 2 32 -0.32768000000000000000e5
-438 2 4 18 -0.32768000000000000000e5
-438 2 4 26 0.32768000000000000000e5
-438 2 5 27 0.32768000000000000000e5
-438 2 8 22 0.26214400000000000000e6
-438 2 12 26 -0.13107200000000000000e6
-438 2 16 30 -0.65536000000000000000e5
-438 3 2 31 -0.13107200000000000000e6
-438 3 4 17 -0.32768000000000000000e5
-438 3 5 18 -0.32768000000000000000e5
-438 3 6 19 -0.65536000000000000000e5
-438 3 8 21 0.13107200000000000000e6
-438 3 14 27 -0.26214400000000000000e6
-438 4 3 15 -0.65536000000000000000e5
-438 4 4 16 -0.26214400000000000000e6
-438 4 6 18 -0.65536000000000000000e5
-438 4 7 19 -0.13107200000000000000e6
-439 1 6 37 -0.32768000000000000000e5
-439 1 6 40 0.32768000000000000000e5
-439 1 9 40 0.65536000000000000000e5
-439 1 26 29 -0.65536000000000000000e5
-439 2 5 27 -0.32768000000000000000e5
-439 2 19 19 0.65536000000000000000e5
-440 1 6 41 0.32768000000000000000e5
-440 1 9 40 -0.32768000000000000000e5
-441 1 6 42 0.32768000000000000000e5
-441 1 26 29 -0.32768000000000000000e5
-442 1 6 44 0.32768000000000000000e5
-442 1 11 42 -0.32768000000000000000e5
-443 1 6 45 0.32768000000000000000e5
-443 1 26 33 -0.32768000000000000000e5
-444 1 6 46 0.32768000000000000000e5
-444 1 14 45 -0.65536000000000000000e5
-444 1 17 48 0.32768000000000000000e5
-444 1 18 25 0.32768000000000000000e5
-444 2 14 28 0.32768000000000000000e5
-444 3 14 19 -0.32768000000000000000e5
-444 3 14 27 0.32768000000000000000e5
-445 1 1 48 0.32768000000000000000e5
-445 1 2 49 0.65536000000000000000e5
-445 1 3 50 0.65536000000000000000e5
-445 1 6 47 0.32768000000000000000e5
-445 1 11 42 -0.13107200000000000000e6
-445 1 12 43 -0.26214400000000000000e6
-445 1 17 48 0.26214400000000000000e6
-445 1 23 38 0.32768000000000000000e5
-445 1 24 39 0.32768000000000000000e5
-445 2 2 32 0.32768000000000000000e5
-445 2 3 33 0.32768000000000000000e5
-445 2 8 22 -0.13107200000000000000e6
-445 2 12 26 0.13107200000000000000e6
-445 2 16 30 0.65536000000000000000e5
-445 3 2 31 0.13107200000000000000e6
-445 3 14 27 0.26214400000000000000e6
-445 4 4 16 0.13107200000000000000e6
-446 1 6 48 0.32768000000000000000e5
-446 1 25 40 -0.32768000000000000000e5
-447 1 1 48 -0.16384000000000000000e5
-447 1 2 49 -0.16384000000000000000e5
-447 1 3 50 -0.32768000000000000000e5
-447 1 6 50 0.32768000000000000000e5
-447 1 11 42 0.65536000000000000000e5
-447 1 12 43 0.13107200000000000000e6
-447 1 17 48 -0.13107200000000000000e6
-447 1 23 38 -0.16384000000000000000e5
-447 1 26 41 0.32768000000000000000e5
-447 1 28 43 -0.65536000000000000000e5
-447 2 2 32 -0.16384000000000000000e5
-447 2 4 34 0.32768000000000000000e5
-447 2 8 22 0.65536000000000000000e5
-447 2 12 26 -0.65536000000000000000e5
-447 2 16 30 -0.32768000000000000000e5
-447 3 2 31 -0.65536000000000000000e5
-447 3 14 27 -0.13107200000000000000e6
-447 4 4 16 -0.65536000000000000000e5
-448 1 1 48 0.16384000000000000000e5
-448 1 2 49 0.16384000000000000000e5
-448 1 3 50 0.32768000000000000000e5
-448 1 5 52 -0.65536000000000000000e5
-448 1 6 51 0.32768000000000000000e5
-448 1 11 42 -0.65536000000000000000e5
-448 1 12 43 -0.13107200000000000000e6
-448 1 17 48 0.13107200000000000000e6
-448 1 23 38 0.16384000000000000000e5
-448 1 28 43 0.65536000000000000000e5
-448 2 2 32 0.16384000000000000000e5
-448 2 4 34 -0.32768000000000000000e5
-448 2 8 22 -0.65536000000000000000e5
-448 2 12 26 0.65536000000000000000e5
-448 2 16 30 0.32768000000000000000e5
-448 2 22 28 0.32768000000000000000e5
-448 3 2 31 0.65536000000000000000e5
-448 3 14 27 0.13107200000000000000e6
-448 4 4 16 0.65536000000000000000e5
-449 1 6 52 0.32768000000000000000e5
-449 1 33 40 -0.32768000000000000000e5
-450 1 1 48 -0.65536000000000000000e5
-450 1 2 49 -0.98304000000000000000e5
-450 1 3 50 -0.13107200000000000000e6
-450 1 6 53 0.32768000000000000000e5
-450 1 6 54 0.32768000000000000000e5
-450 1 11 42 0.26214400000000000000e6
-450 1 12 43 0.52428800000000000000e6
-450 1 17 48 -0.52428800000000000000e6
-450 1 23 38 -0.65536000000000000000e5
-450 1 24 39 -0.32768000000000000000e5
-450 1 26 41 0.65536000000000000000e5
-450 1 28 43 -0.13107200000000000000e6
-450 2 2 32 -0.65536000000000000000e5
-450 2 3 33 -0.32768000000000000000e5
-450 2 4 34 0.65536000000000000000e5
-450 2 5 35 0.32768000000000000000e5
-450 2 8 22 0.26214400000000000000e6
-450 2 12 26 -0.26214400000000000000e6
-450 2 16 30 -0.13107200000000000000e6
-450 3 2 31 -0.26214400000000000000e6
-450 3 4 33 -0.32768000000000000000e5
-450 3 5 34 0.65536000000000000000e5
-450 3 14 27 -0.52428800000000000000e6
-450 4 4 16 -0.26214400000000000000e6
-451 1 1 48 0.16384000000000000000e5
-451 1 2 49 0.16384000000000000000e5
-451 1 3 50 0.32768000000000000000e5
-451 1 6 55 0.32768000000000000000e5
-451 1 11 42 -0.65536000000000000000e5
-451 1 12 43 -0.13107200000000000000e6
-451 1 17 48 0.13107200000000000000e6
-451 1 23 38 0.16384000000000000000e5
-451 1 28 43 0.65536000000000000000e5
-451 1 33 48 -0.65536000000000000000e5
-451 2 2 32 0.16384000000000000000e5
-451 2 4 34 -0.32768000000000000000e5
-451 2 8 22 -0.65536000000000000000e5
-451 2 12 26 0.65536000000000000000e5
-451 2 16 30 0.32768000000000000000e5
-451 2 28 30 0.32768000000000000000e5
-451 3 2 31 0.65536000000000000000e5
-451 3 5 34 -0.32768000000000000000e5
-451 3 14 27 0.13107200000000000000e6
-451 3 22 27 -0.32768000000000000000e5
-451 4 4 16 0.65536000000000000000e5
-452 1 1 48 -0.65536000000000000000e5
-452 1 2 49 -0.98304000000000000000e5
-452 1 3 50 -0.13107200000000000000e6
-452 1 6 56 0.32768000000000000000e5
-452 1 11 42 0.26214400000000000000e6
-452 1 12 43 0.52428800000000000000e6
-452 1 17 48 -0.52428800000000000000e6
-452 1 23 38 -0.65536000000000000000e5
-452 1 24 39 -0.32768000000000000000e5
-452 1 24 55 0.65536000000000000000e5
-452 1 25 56 0.32768000000000000000e5
-452 1 28 43 -0.13107200000000000000e6
-452 2 2 32 -0.65536000000000000000e5
-452 2 3 33 -0.32768000000000000000e5
-452 2 8 22 0.26214400000000000000e6
-452 2 12 26 -0.26214400000000000000e6
-452 2 16 30 -0.13107200000000000000e6
-452 2 19 35 0.32768000000000000000e5
-452 2 21 35 0.65536000000000000000e5
-452 3 2 31 -0.26214400000000000000e6
-452 3 4 33 -0.32768000000000000000e5
-452 3 14 27 -0.52428800000000000000e6
-452 3 17 30 -0.65536000000000000000e5
-452 3 18 31 0.13107200000000000000e6
-452 3 19 32 -0.32768000000000000000e5
-452 3 20 33 -0.65536000000000000000e5
-452 3 21 34 0.13107200000000000000e6
-452 3 28 33 0.32768000000000000000e5
-452 4 4 16 -0.26214400000000000000e6
-453 1 1 12 -0.16384000000000000000e5
-453 1 7 7 0.32768000000000000000e5
-454 1 1 8 -0.16384000000000000000e5
-454 1 1 32 0.32768000000000000000e5
-454 1 1 40 -0.81920000000000000000e4
-454 1 2 5 0.81920000000000000000e4
-454 1 2 9 -0.32768000000000000000e5
-454 1 2 33 -0.32768000000000000000e5
-454 1 3 34 0.65536000000000000000e5
-454 1 7 8 0.32768000000000000000e5
-454 1 7 22 0.16384000000000000000e5
-454 1 7 38 -0.16384000000000000000e5
-454 1 8 23 0.49152000000000000000e5
-454 1 10 41 -0.32768000000000000000e5
-454 1 12 27 -0.65536000000000000000e5
-454 2 1 3 -0.81920000000000000000e4
-454 2 2 16 0.81920000000000000000e4
-454 2 6 20 0.32768000000000000000e5
-454 2 7 21 -0.32768000000000000000e5
-454 3 1 2 -0.81920000000000000000e4
-454 3 3 16 0.81920000000000000000e4
-454 3 4 17 0.81920000000000000000e4
-454 3 6 19 0.16384000000000000000e5
-454 3 7 20 -0.32768000000000000000e5
-454 3 8 21 -0.32768000000000000000e5
-454 4 1 5 -0.16384000000000000000e5
-454 4 1 13 0.81920000000000000000e4
-454 4 2 2 0.16384000000000000000e5
-454 4 2 14 0.16384000000000000000e5
-455 1 1 32 -0.32768000000000000000e5
-455 1 7 9 0.32768000000000000000e5
-455 3 6 7 -0.32768000000000000000e5
-456 1 2 17 0.65536000000000000000e5
-456 1 2 33 0.32768000000000000000e5
-456 1 3 18 0.13107200000000000000e6
-456 1 4 19 0.13107200000000000000e6
-456 1 4 35 0.13107200000000000000e6
-456 1 6 13 -0.32768000000000000000e5
-456 1 7 10 0.32768000000000000000e5
-456 1 11 42 -0.32768000000000000000e5
-456 1 18 25 0.65536000000000000000e5
-456 1 20 27 -0.26214400000000000000e6
-456 2 4 10 0.32768000000000000000e5
-456 2 6 12 0.65536000000000000000e5
-456 2 8 22 -0.32768000000000000000e5
-456 2 9 23 0.65536000000000000000e5
-456 2 10 24 0.13107200000000000000e6
-456 3 2 15 -0.13107200000000000000e6
-456 3 8 13 -0.13107200000000000000e6
-456 3 9 22 -0.32768000000000000000e5
-456 4 4 8 -0.32768000000000000000e5
-457 1 2 33 -0.32768000000000000000e5
-457 1 3 18 -0.65536000000000000000e5
-457 1 4 35 -0.13107200000000000000e6
-457 1 6 13 0.32768000000000000000e5
-457 1 7 11 0.32768000000000000000e5
-457 1 10 41 0.32768000000000000000e5
-457 1 11 42 0.32768000000000000000e5
-457 1 18 25 -0.65536000000000000000e5
-457 1 28 35 0.13107200000000000000e6
-457 2 8 22 0.32768000000000000000e5
-457 2 9 23 -0.65536000000000000000e5
-457 3 5 10 0.32768000000000000000e5
-457 3 8 21 0.32768000000000000000e5
-457 3 9 22 0.32768000000000000000e5
-457 3 11 24 0.13107200000000000000e6
-457 4 4 8 0.32768000000000000000e5
-458 1 1 16 -0.32768000000000000000e5
-458 1 7 12 0.32768000000000000000e5
-459 1 1 8 -0.81920000000000000000e4
-459 1 1 40 -0.40960000000000000000e4
-459 1 2 5 0.40960000000000000000e4
-459 1 2 9 -0.16384000000000000000e5
-459 1 2 17 0.32768000000000000000e5
-459 1 3 18 0.65536000000000000000e5
-459 1 3 34 0.32768000000000000000e5
-459 1 4 19 0.65536000000000000000e5
-459 1 4 35 0.65536000000000000000e5
-459 1 6 13 -0.16384000000000000000e5
-459 1 7 13 0.32768000000000000000e5
-459 1 7 22 0.81920000000000000000e4
-459 1 7 38 -0.81920000000000000000e4
-459 1 8 23 0.24576000000000000000e5
-459 1 10 41 -0.16384000000000000000e5
-459 1 11 42 -0.16384000000000000000e5
-459 1 12 27 -0.32768000000000000000e5
-459 1 18 25 0.32768000000000000000e5
-459 1 20 27 -0.13107200000000000000e6
-459 2 1 3 -0.40960000000000000000e4
-459 2 2 16 0.40960000000000000000e4
-459 2 4 10 0.16384000000000000000e5
-459 2 6 12 0.32768000000000000000e5
-459 2 7 21 -0.16384000000000000000e5
-459 2 8 22 -0.16384000000000000000e5
-459 2 9 23 0.32768000000000000000e5
-459 2 10 24 0.65536000000000000000e5
-459 3 1 2 -0.40960000000000000000e4
-459 3 2 15 -0.65536000000000000000e5
-459 3 3 16 0.40960000000000000000e4
-459 3 4 17 0.40960000000000000000e4
-459 3 6 7 -0.16384000000000000000e5
-459 3 6 19 0.81920000000000000000e4
-459 3 7 20 -0.16384000000000000000e5
-459 3 8 13 -0.65536000000000000000e5
-459 3 8 21 -0.16384000000000000000e5
-459 3 9 22 -0.16384000000000000000e5
-459 4 1 5 -0.81920000000000000000e4
-459 4 1 13 0.40960000000000000000e4
-459 4 2 2 0.81920000000000000000e4
-459 4 2 14 0.81920000000000000000e4
-459 4 4 8 -0.16384000000000000000e5
-459 4 5 5 -0.32768000000000000000e5
-460 1 2 17 -0.32768000000000000000e5
-460 1 7 14 0.32768000000000000000e5
-461 1 2 17 0.32768000000000000000e5
-461 1 3 18 0.32768000000000000000e5
-461 1 4 19 0.65536000000000000000e5
-461 1 7 15 0.32768000000000000000e5
-461 1 20 27 -0.13107200000000000000e6
-461 1 28 35 0.65536000000000000000e5
-461 2 6 12 0.32768000000000000000e5
-461 2 10 24 0.65536000000000000000e5
-461 3 2 15 -0.65536000000000000000e5
-461 3 8 13 -0.65536000000000000000e5
-461 3 11 24 0.65536000000000000000e5
-462 1 7 17 0.32768000000000000000e5
-462 1 13 16 -0.65536000000000000000e5
-462 1 20 27 0.65536000000000000000e5
-462 1 28 35 -0.32768000000000000000e5
-462 2 7 13 0.32768000000000000000e5
-462 2 10 24 -0.32768000000000000000e5
-462 3 2 15 0.32768000000000000000e5
-462 3 8 13 0.32768000000000000000e5
-462 3 11 24 -0.32768000000000000000e5
-463 1 4 19 0.32768000000000000000e5
-463 1 7 18 0.32768000000000000000e5
-463 1 20 27 -0.65536000000000000000e5
-463 1 28 35 0.32768000000000000000e5
-463 2 10 24 0.32768000000000000000e5
-463 3 2 15 -0.32768000000000000000e5
-463 3 8 13 -0.32768000000000000000e5
-463 3 11 24 0.32768000000000000000e5
-464 1 4 19 0.16384000000000000000e5
-464 1 7 16 -0.16384000000000000000e5
-464 1 7 19 0.32768000000000000000e5
-464 1 13 16 -0.32768000000000000000e5
-464 2 1 15 -0.16384000000000000000e5
-464 2 7 13 0.16384000000000000000e5
-465 1 7 20 0.32768000000000000000e5
-465 1 13 16 -0.32768000000000000000e5
-466 1 7 21 0.32768000000000000000e5
-466 1 12 19 -0.32768000000000000000e5
-467 1 1 32 0.65536000000000000000e5
-467 1 2 33 -0.65536000000000000000e5
-467 1 3 34 0.13107200000000000000e6
-467 1 7 22 0.32768000000000000000e5
-467 1 7 23 0.32768000000000000000e5
-467 1 8 23 0.32768000000000000000e5
-467 1 10 41 -0.65536000000000000000e5
-467 1 12 27 -0.13107200000000000000e6
-467 2 1 7 0.32768000000000000000e5
-467 2 6 20 0.65536000000000000000e5
-467 2 7 21 -0.65536000000000000000e5
-467 3 8 21 -0.65536000000000000000e5
-467 4 1 5 -0.32768000000000000000e5
-468 1 7 24 0.32768000000000000000e5
-468 1 8 23 -0.32768000000000000000e5
-469 1 1 48 -0.16384000000000000000e5
-469 1 2 49 -0.16384000000000000000e5
-469 1 7 25 0.32768000000000000000e5
-469 1 7 38 -0.32768000000000000000e5
-469 1 8 23 0.32768000000000000000e5
-469 1 23 38 -0.16384000000000000000e5
-469 2 2 32 -0.16384000000000000000e5
-469 3 1 30 -0.32768000000000000000e5
-469 3 6 19 0.32768000000000000000e5
-469 3 7 20 -0.65536000000000000000e5
-469 4 2 14 0.32768000000000000000e5
-470 1 7 26 0.32768000000000000000e5
-470 1 8 39 -0.32768000000000000000e5
-470 3 6 19 -0.32768000000000000000e5
-471 1 1 32 0.32768000000000000000e5
-471 1 2 33 -0.32768000000000000000e5
-471 1 3 34 0.65536000000000000000e5
-471 1 7 27 0.32768000000000000000e5
-471 1 10 41 -0.32768000000000000000e5
-471 1 12 27 -0.65536000000000000000e5
-471 2 6 20 0.32768000000000000000e5
-471 2 7 21 -0.32768000000000000000e5
-471 3 8 21 -0.32768000000000000000e5
-472 1 1 32 -0.32768000000000000000e5
-472 1 7 28 0.32768000000000000000e5
-473 1 2 33 0.32768000000000000000e5
-473 1 3 34 -0.65536000000000000000e5
-473 1 7 29 0.32768000000000000000e5
-473 1 10 41 0.32768000000000000000e5
-473 2 7 21 0.32768000000000000000e5
-473 3 8 21 0.32768000000000000000e5
-474 1 2 33 -0.32768000000000000000e5
-474 1 7 30 0.32768000000000000000e5
-475 1 7 31 0.32768000000000000000e5
-475 1 12 27 -0.32768000000000000000e5
-476 1 2 17 -0.32768000000000000000e5
-476 1 7 32 0.32768000000000000000e5
-476 3 1 14 0.32768000000000000000e5
-477 1 3 34 -0.32768000000000000000e5
-477 1 7 33 0.32768000000000000000e5
-478 1 7 34 0.32768000000000000000e5
-478 1 16 31 -0.65536000000000000000e5
-478 1 20 27 0.65536000000000000000e5
-478 1 28 35 -0.32768000000000000000e5
-478 2 7 13 0.32768000000000000000e5
-478 2 10 24 -0.32768000000000000000e5
-478 3 11 24 -0.32768000000000000000e5
-478 4 8 8 -0.65536000000000000000e5
-479 1 4 19 0.32768000000000000000e5
-479 1 7 35 0.32768000000000000000e5
-479 1 20 27 -0.65536000000000000000e5
-479 1 28 35 0.32768000000000000000e5
-479 2 10 24 0.32768000000000000000e5
-479 3 8 13 -0.32768000000000000000e5
-479 3 11 24 0.32768000000000000000e5
-480 1 7 36 0.32768000000000000000e5
-480 1 16 31 -0.32768000000000000000e5
-481 1 1 24 0.16384000000000000000e5
-481 1 1 32 0.65536000000000000000e5
-481 1 1 40 0.16384000000000000000e5
-481 1 2 49 0.16384000000000000000e5
-481 1 3 50 -0.32768000000000000000e5
-481 1 5 52 0.65536000000000000000e5
-481 1 6 37 0.16384000000000000000e5
-481 1 7 22 0.32768000000000000000e5
-481 1 7 37 0.32768000000000000000e5
-481 1 8 23 0.32768000000000000000e5
-481 1 11 42 -0.65536000000000000000e5
-481 1 12 27 -0.13107200000000000000e6
-481 1 12 43 -0.13107200000000000000e6
-481 1 16 47 0.13107200000000000000e6
-481 1 22 37 -0.16384000000000000000e5
-481 1 28 43 0.65536000000000000000e5
-481 2 1 7 0.32768000000000000000e5
-481 2 2 16 0.16384000000000000000e5
-481 2 2 32 0.16384000000000000000e5
-481 2 3 17 -0.16384000000000000000e5
-481 2 4 26 0.16384000000000000000e5
-481 2 6 20 0.65536000000000000000e5
-481 2 10 32 -0.65536000000000000000e5
-481 2 12 26 0.65536000000000000000e5
-481 2 16 16 -0.32768000000000000000e5
-481 3 1 16 0.16384000000000000000e5
-481 3 1 30 0.65536000000000000000e5
-481 3 2 31 0.65536000000000000000e5
-481 3 3 16 0.16384000000000000000e5
-481 3 7 20 0.65536000000000000000e5
-481 3 14 27 0.13107200000000000000e6
-481 4 1 5 -0.32768000000000000000e5
-481 4 1 13 0.16384000000000000000e5
-481 4 5 17 0.32768000000000000000e5
-481 4 7 19 -0.65536000000000000000e5
-481 4 11 11 0.32768000000000000000e5
-482 1 1 48 -0.16384000000000000000e5
-482 1 2 49 -0.16384000000000000000e5
-482 1 7 39 0.32768000000000000000e5
-482 1 23 38 -0.16384000000000000000e5
-482 2 2 32 -0.16384000000000000000e5
-482 3 1 30 -0.32768000000000000000e5
-483 1 7 40 0.32768000000000000000e5
-483 1 8 39 -0.32768000000000000000e5
-484 1 2 17 -0.65536000000000000000e5
-484 1 2 33 -0.32768000000000000000e5
-484 1 3 34 0.65536000000000000000e5
-484 1 7 41 0.32768000000000000000e5
-484 1 10 41 -0.32768000000000000000e5
-484 1 11 42 0.32768000000000000000e5
-484 1 12 43 0.65536000000000000000e5
-484 1 17 48 -0.65536000000000000000e5
-484 2 1 31 0.32768000000000000000e5
-484 2 7 21 -0.32768000000000000000e5
-484 2 8 22 0.32768000000000000000e5
-484 2 12 26 -0.32768000000000000000e5
-484 3 1 14 0.65536000000000000000e5
-484 3 6 23 0.65536000000000000000e5
-484 3 7 20 -0.32768000000000000000e5
-484 3 8 21 -0.32768000000000000000e5
-484 3 14 27 -0.65536000000000000000e5
-484 4 4 16 -0.32768000000000000000e5
-485 1 2 33 0.32768000000000000000e5
-485 1 3 34 -0.65536000000000000000e5
-485 1 7 42 0.32768000000000000000e5
-485 1 10 41 0.32768000000000000000e5
-485 2 7 21 0.32768000000000000000e5
-485 3 7 20 0.32768000000000000000e5
-485 3 8 21 0.32768000000000000000e5
-486 1 7 43 0.32768000000000000000e5
-486 1 11 42 -0.32768000000000000000e5
-486 1 12 43 -0.65536000000000000000e5
-486 1 17 48 0.65536000000000000000e5
-486 2 8 22 -0.32768000000000000000e5
-486 2 12 26 0.32768000000000000000e5
-486 3 14 27 0.65536000000000000000e5
-486 4 4 16 0.32768000000000000000e5
-487 1 2 17 -0.32768000000000000000e5
-487 1 7 44 0.32768000000000000000e5
-487 3 1 14 0.32768000000000000000e5
-487 3 6 23 0.32768000000000000000e5
-488 1 7 45 0.32768000000000000000e5
-488 1 16 47 -0.32768000000000000000e5
-488 3 13 26 -0.32768000000000000000e5
-489 1 4 19 0.32768000000000000000e5
-489 1 7 46 0.32768000000000000000e5
-489 1 20 27 -0.65536000000000000000e5
-489 1 28 35 0.32768000000000000000e5
-489 2 10 24 0.32768000000000000000e5
-489 3 8 13 -0.32768000000000000000e5
-489 3 10 23 0.32768000000000000000e5
-489 3 11 24 0.32768000000000000000e5
-490 1 2 33 -0.65536000000000000000e5
-490 1 3 34 0.13107200000000000000e6
-490 1 3 50 0.32768000000000000000e5
-490 1 5 52 -0.65536000000000000000e5
-490 1 7 38 -0.32768000000000000000e5
-490 1 7 47 0.32768000000000000000e5
-490 1 8 39 -0.32768000000000000000e5
-490 1 10 41 -0.65536000000000000000e5
-490 1 11 42 0.65536000000000000000e5
-490 1 12 43 0.13107200000000000000e6
-490 1 16 47 -0.13107200000000000000e6
-490 1 28 43 -0.65536000000000000000e5
-490 2 7 21 -0.65536000000000000000e5
-490 2 10 32 0.65536000000000000000e5
-490 2 12 26 -0.65536000000000000000e5
-490 3 1 30 -0.32768000000000000000e5
-490 3 2 31 -0.65536000000000000000e5
-490 3 7 20 -0.65536000000000000000e5
-490 3 8 21 -0.65536000000000000000e5
-490 3 14 27 -0.13107200000000000000e6
-490 4 5 17 -0.32768000000000000000e5
-490 4 7 19 0.65536000000000000000e5
-491 1 1 48 -0.16384000000000000000e5
-491 1 2 49 -0.16384000000000000000e5
-491 1 7 48 0.32768000000000000000e5
-491 1 23 38 -0.16384000000000000000e5
-491 2 2 32 -0.16384000000000000000e5
-492 1 3 50 -0.32768000000000000000e5
-492 1 7 49 0.32768000000000000000e5
-493 1 5 52 -0.32768000000000000000e5
-493 1 7 50 0.32768000000000000000e5
-493 1 11 42 0.32768000000000000000e5
-493 1 12 43 0.65536000000000000000e5
-493 1 16 47 -0.65536000000000000000e5
-493 1 28 43 -0.32768000000000000000e5
-493 2 10 32 0.32768000000000000000e5
-493 2 12 26 -0.32768000000000000000e5
-493 3 2 31 -0.32768000000000000000e5
-493 3 14 27 -0.65536000000000000000e5
-493 4 7 19 0.32768000000000000000e5
-494 1 7 51 0.32768000000000000000e5
-494 1 11 42 -0.32768000000000000000e5
-494 1 12 43 -0.65536000000000000000e5
-494 1 17 48 0.65536000000000000000e5
-494 2 8 22 -0.32768000000000000000e5
-494 2 12 26 0.32768000000000000000e5
-494 3 2 31 0.32768000000000000000e5
-494 3 14 27 0.65536000000000000000e5
-494 4 4 16 0.32768000000000000000e5
-495 1 7 52 0.32768000000000000000e5
-495 1 16 47 -0.32768000000000000000e5
-496 1 1 48 -0.16384000000000000000e5
-496 1 2 49 -0.16384000000000000000e5
-496 1 7 53 0.32768000000000000000e5
-496 1 23 38 -0.16384000000000000000e5
-496 2 2 32 -0.16384000000000000000e5
-496 3 16 29 0.32768000000000000000e5
-497 1 7 55 0.32768000000000000000e5
-497 1 37 44 -0.32768000000000000000e5
-498 1 7 54 -0.32768000000000000000e5
-498 1 7 56 0.32768000000000000000e5
-498 3 6 35 0.32768000000000000000e5
-499 1 1 32 -0.16384000000000000000e5
-499 1 8 8 0.32768000000000000000e5
-499 3 6 7 -0.16384000000000000000e5
-500 1 2 17 0.65536000000000000000e5
-500 1 2 33 0.32768000000000000000e5
-500 1 3 18 0.13107200000000000000e6
-500 1 4 19 0.13107200000000000000e6
-500 1 4 35 0.13107200000000000000e6
-500 1 6 13 -0.32768000000000000000e5
-500 1 8 9 0.32768000000000000000e5
-500 1 11 42 -0.32768000000000000000e5
-500 1 18 25 0.65536000000000000000e5
-500 1 20 27 -0.26214400000000000000e6
-500 2 4 10 0.32768000000000000000e5
-500 2 6 12 0.65536000000000000000e5
-500 2 8 22 -0.32768000000000000000e5
-500 2 9 23 0.65536000000000000000e5
-500 2 10 24 0.13107200000000000000e6
-500 3 2 15 -0.13107200000000000000e6
-500 3 8 13 -0.13107200000000000000e6
-500 3 9 22 -0.32768000000000000000e5
-500 4 4 8 -0.32768000000000000000e5
-501 1 2 33 -0.32768000000000000000e5
-501 1 3 18 -0.65536000000000000000e5
-501 1 4 35 -0.13107200000000000000e6
-501 1 6 13 0.32768000000000000000e5
-501 1 8 10 0.32768000000000000000e5
-501 1 10 41 0.32768000000000000000e5
-501 1 11 42 0.32768000000000000000e5
-501 1 18 25 -0.65536000000000000000e5
-501 1 28 35 0.13107200000000000000e6
-501 2 8 22 0.32768000000000000000e5
-501 2 9 23 -0.65536000000000000000e5
-501 3 5 10 0.32768000000000000000e5
-501 3 8 21 0.32768000000000000000e5
-501 3 9 22 0.32768000000000000000e5
-501 3 11 24 0.13107200000000000000e6
-501 4 4 8 0.32768000000000000000e5
-502 1 8 11 0.32768000000000000000e5
-502 1 10 41 -0.32768000000000000000e5
-502 3 5 10 -0.32768000000000000000e5
-502 3 8 21 -0.32768000000000000000e5
-503 1 1 8 -0.81920000000000000000e4
-503 1 1 40 -0.40960000000000000000e4
-503 1 2 5 0.40960000000000000000e4
-503 1 2 9 -0.16384000000000000000e5
-503 1 2 17 0.32768000000000000000e5
-503 1 3 18 0.65536000000000000000e5
-503 1 3 34 0.32768000000000000000e5
-503 1 4 19 0.65536000000000000000e5
-503 1 4 35 0.65536000000000000000e5
-503 1 6 13 -0.16384000000000000000e5
-503 1 7 22 0.81920000000000000000e4
-503 1 7 38 -0.81920000000000000000e4
-503 1 8 12 0.32768000000000000000e5
-503 1 8 23 0.24576000000000000000e5
-503 1 10 41 -0.16384000000000000000e5
-503 1 11 42 -0.16384000000000000000e5
-503 1 12 27 -0.32768000000000000000e5
-503 1 18 25 0.32768000000000000000e5
-503 1 20 27 -0.13107200000000000000e6
-503 2 1 3 -0.40960000000000000000e4
-503 2 2 16 0.40960000000000000000e4
-503 2 4 10 0.16384000000000000000e5
-503 2 6 12 0.32768000000000000000e5
-503 2 7 21 -0.16384000000000000000e5
-503 2 8 22 -0.16384000000000000000e5
-503 2 9 23 0.32768000000000000000e5
-503 2 10 24 0.65536000000000000000e5
-503 3 1 2 -0.40960000000000000000e4
-503 3 2 15 -0.65536000000000000000e5
-503 3 3 16 0.40960000000000000000e4
-503 3 4 17 0.40960000000000000000e4
-503 3 6 7 -0.16384000000000000000e5
-503 3 6 19 0.81920000000000000000e4
-503 3 7 20 -0.16384000000000000000e5
-503 3 8 13 -0.65536000000000000000e5
-503 3 8 21 -0.16384000000000000000e5
-503 3 9 22 -0.16384000000000000000e5
-503 4 1 5 -0.81920000000000000000e4
-503 4 1 13 0.40960000000000000000e4
-503 4 2 2 0.81920000000000000000e4
-503 4 2 14 0.81920000000000000000e4
-503 4 4 8 -0.16384000000000000000e5
-503 4 5 5 -0.32768000000000000000e5
-504 1 2 17 -0.32768000000000000000e5
-504 1 8 13 0.32768000000000000000e5
-505 1 2 17 0.32768000000000000000e5
-505 1 3 18 0.32768000000000000000e5
-505 1 4 19 0.65536000000000000000e5
-505 1 8 14 0.32768000000000000000e5
-505 1 20 27 -0.13107200000000000000e6
-505 1 28 35 0.65536000000000000000e5
-505 2 6 12 0.32768000000000000000e5
-505 2 10 24 0.65536000000000000000e5
-505 3 2 15 -0.65536000000000000000e5
-505 3 8 13 -0.65536000000000000000e5
-505 3 11 24 0.65536000000000000000e5
-506 1 3 18 -0.32768000000000000000e5
-506 1 8 15 0.32768000000000000000e5
-507 1 8 16 0.32768000000000000000e5
-507 1 13 16 -0.65536000000000000000e5
-507 1 20 27 0.65536000000000000000e5
-507 1 28 35 -0.32768000000000000000e5
-507 2 7 13 0.32768000000000000000e5
-507 2 10 24 -0.32768000000000000000e5
-507 3 2 15 0.32768000000000000000e5
-507 3 8 13 0.32768000000000000000e5
-507 3 11 24 -0.32768000000000000000e5
-508 1 4 19 0.32768000000000000000e5
-508 1 8 17 0.32768000000000000000e5
-508 1 20 27 -0.65536000000000000000e5
-508 1 28 35 0.32768000000000000000e5
-508 2 10 24 0.32768000000000000000e5
-508 3 2 15 -0.32768000000000000000e5
-508 3 8 13 -0.32768000000000000000e5
-508 3 11 24 0.32768000000000000000e5
-509 1 4 19 -0.32768000000000000000e5
-509 1 8 18 0.32768000000000000000e5
-510 1 8 19 0.32768000000000000000e5
-510 1 13 16 -0.32768000000000000000e5
-511 1 8 20 0.32768000000000000000e5
-511 1 10 17 -0.16384000000000000000e5
-511 1 20 27 -0.32768000000000000000e5
-511 1 28 35 0.16384000000000000000e5
-511 3 2 15 -0.16384000000000000000e5
-511 3 8 13 -0.16384000000000000000e5
-511 3 11 24 0.16384000000000000000e5
-511 4 6 10 -0.16384000000000000000e5
-512 1 4 19 -0.81920000000000000000e4
-512 1 5 20 -0.81920000000000000000e4
-512 1 8 21 0.32768000000000000000e5
-512 1 10 17 -0.16384000000000000000e5
-512 1 13 16 -0.16384000000000000000e5
-512 1 20 27 -0.16384000000000000000e5
-512 1 28 35 0.81920000000000000000e4
-512 2 8 14 -0.81920000000000000000e4
-512 2 11 13 -0.16384000000000000000e5
-512 3 2 15 -0.81920000000000000000e4
-512 3 8 13 -0.81920000000000000000e4
-512 3 11 24 0.81920000000000000000e4
-512 4 6 10 -0.81920000000000000000e4
-513 1 1 32 0.65536000000000000000e5
-513 1 2 33 -0.65536000000000000000e5
-513 1 3 34 0.13107200000000000000e6
-513 1 7 22 0.32768000000000000000e5
-513 1 8 22 0.32768000000000000000e5
-513 1 8 23 0.32768000000000000000e5
-513 1 10 41 -0.65536000000000000000e5
-513 1 12 27 -0.13107200000000000000e6
-513 2 1 7 0.32768000000000000000e5
-513 2 6 20 0.65536000000000000000e5
-513 2 7 21 -0.65536000000000000000e5
-513 3 8 21 -0.65536000000000000000e5
-513 4 1 5 -0.32768000000000000000e5
-514 1 1 48 -0.16384000000000000000e5
-514 1 2 49 -0.16384000000000000000e5
-514 1 7 38 -0.32768000000000000000e5
-514 1 8 23 0.32768000000000000000e5
-514 1 8 24 0.32768000000000000000e5
-514 1 23 38 -0.16384000000000000000e5
-514 2 2 32 -0.16384000000000000000e5
-514 3 1 30 -0.32768000000000000000e5
-514 3 6 19 0.32768000000000000000e5
-514 3 7 20 -0.65536000000000000000e5
-514 4 2 14 0.32768000000000000000e5
-515 1 8 25 0.32768000000000000000e5
-515 1 8 39 -0.32768000000000000000e5
-515 3 6 19 -0.32768000000000000000e5
-516 1 1 48 0.16384000000000000000e5
-516 1 2 49 0.16384000000000000000e5
-516 1 5 52 -0.65536000000000000000e5
-516 1 8 26 0.32768000000000000000e5
-516 1 8 39 0.32768000000000000000e5
-516 1 10 25 0.32768000000000000000e5
-516 1 10 41 -0.65536000000000000000e5
-516 1 11 42 -0.65536000000000000000e5
-516 1 12 43 -0.13107200000000000000e6
-516 1 17 48 0.26214400000000000000e6
-516 1 23 38 0.16384000000000000000e5
-516 1 26 41 -0.32768000000000000000e5
-516 1 28 43 -0.65536000000000000000e5
-516 2 2 32 0.16384000000000000000e5
-516 2 8 22 -0.13107200000000000000e6
-516 2 12 26 0.65536000000000000000e5
-516 2 16 30 0.32768000000000000000e5
-516 3 2 31 0.65536000000000000000e5
-516 3 6 19 0.32768000000000000000e5
-516 3 8 21 -0.65536000000000000000e5
-516 3 14 27 0.13107200000000000000e6
-516 4 3 15 0.32768000000000000000e5
-516 4 4 16 0.13107200000000000000e6
-516 4 6 18 0.32768000000000000000e5
-516 4 7 19 0.65536000000000000000e5
-517 1 1 32 -0.32768000000000000000e5
-517 1 8 27 0.32768000000000000000e5
-518 1 2 33 0.32768000000000000000e5
-518 1 3 34 -0.65536000000000000000e5
-518 1 8 28 0.32768000000000000000e5
-518 1 10 41 0.32768000000000000000e5
-518 2 7 21 0.32768000000000000000e5
-518 3 8 21 0.32768000000000000000e5
-519 1 2 33 -0.32768000000000000000e5
-519 1 8 29 0.32768000000000000000e5
-520 1 8 30 0.32768000000000000000e5
-520 1 10 41 -0.32768000000000000000e5
-520 3 8 21 -0.32768000000000000000e5
-521 1 2 17 -0.32768000000000000000e5
-521 1 8 31 0.32768000000000000000e5
-521 3 1 14 0.32768000000000000000e5
-522 1 3 34 -0.32768000000000000000e5
-522 1 8 32 0.32768000000000000000e5
-523 1 4 35 0.32768000000000000000e5
-523 1 8 33 0.32768000000000000000e5
-523 1 18 25 0.32768000000000000000e5
-523 1 28 35 -0.65536000000000000000e5
-523 2 9 23 0.32768000000000000000e5
-523 3 11 24 -0.65536000000000000000e5
-524 1 4 19 0.32768000000000000000e5
-524 1 8 34 0.32768000000000000000e5
-524 1 20 27 -0.65536000000000000000e5
-524 1 28 35 0.32768000000000000000e5
-524 2 10 24 0.32768000000000000000e5
-524 3 8 13 -0.32768000000000000000e5
-524 3 11 24 0.32768000000000000000e5
-525 1 4 19 -0.32768000000000000000e5
-525 1 8 35 0.32768000000000000000e5
-525 3 8 13 0.32768000000000000000e5
-526 1 8 36 0.32768000000000000000e5
-526 1 20 27 -0.32768000000000000000e5
-527 1 7 38 -0.32768000000000000000e5
-527 1 8 37 0.32768000000000000000e5
-528 1 1 48 -0.16384000000000000000e5
-528 1 2 49 -0.16384000000000000000e5
-528 1 8 38 0.32768000000000000000e5
-528 1 23 38 -0.16384000000000000000e5
-528 2 2 32 -0.16384000000000000000e5
-528 3 1 30 -0.32768000000000000000e5
-529 1 1 48 0.16384000000000000000e5
-529 1 2 49 0.16384000000000000000e5
-529 1 5 52 -0.65536000000000000000e5
-529 1 8 39 0.32768000000000000000e5
-529 1 8 40 0.32768000000000000000e5
-529 1 9 40 0.32768000000000000000e5
-529 1 10 41 -0.65536000000000000000e5
-529 1 11 42 -0.65536000000000000000e5
-529 1 12 43 -0.13107200000000000000e6
-529 1 17 48 0.26214400000000000000e6
-529 1 23 38 0.16384000000000000000e5
-529 1 26 41 -0.32768000000000000000e5
-529 1 28 43 -0.65536000000000000000e5
-529 2 2 32 0.16384000000000000000e5
-529 2 8 22 -0.13107200000000000000e6
-529 2 12 26 0.65536000000000000000e5
-529 2 16 30 0.32768000000000000000e5
-529 3 2 31 0.65536000000000000000e5
-529 3 14 27 0.13107200000000000000e6
-529 4 4 16 0.13107200000000000000e6
-529 4 6 18 0.32768000000000000000e5
-529 4 7 19 0.65536000000000000000e5
-530 1 2 33 0.32768000000000000000e5
-530 1 3 34 -0.65536000000000000000e5
-530 1 8 41 0.32768000000000000000e5
-530 1 10 41 0.32768000000000000000e5
-530 2 7 21 0.32768000000000000000e5
-530 3 7 20 0.32768000000000000000e5
-530 3 8 21 0.32768000000000000000e5
-531 1 8 42 0.32768000000000000000e5
-531 1 11 42 -0.32768000000000000000e5
-531 1 12 43 -0.65536000000000000000e5
-531 1 17 48 0.65536000000000000000e5
-531 2 8 22 -0.32768000000000000000e5
-531 2 12 26 0.32768000000000000000e5
-531 3 14 27 0.65536000000000000000e5
-531 4 4 16 0.32768000000000000000e5
-532 1 8 43 0.32768000000000000000e5
-532 1 10 41 -0.32768000000000000000e5
-533 1 8 44 0.32768000000000000000e5
-533 1 16 47 -0.32768000000000000000e5
-533 3 13 26 -0.32768000000000000000e5
-534 1 8 45 0.32768000000000000000e5
-534 1 12 43 -0.32768000000000000000e5
-535 1 8 46 0.32768000000000000000e5
-535 1 13 44 -0.32768000000000000000e5
-536 1 1 48 -0.16384000000000000000e5
-536 1 2 49 -0.16384000000000000000e5
-536 1 8 47 0.32768000000000000000e5
-536 1 23 38 -0.16384000000000000000e5
-536 2 2 32 -0.16384000000000000000e5
-537 1 3 50 -0.32768000000000000000e5
-537 1 8 48 0.32768000000000000000e5
-538 1 1 48 0.16384000000000000000e5
-538 1 2 49 0.16384000000000000000e5
-538 1 3 50 0.32768000000000000000e5
-538 1 8 49 0.32768000000000000000e5
-538 1 11 42 -0.65536000000000000000e5
-538 1 12 43 -0.13107200000000000000e6
-538 1 17 48 0.13107200000000000000e6
-538 1 23 38 0.16384000000000000000e5
-538 2 2 32 0.16384000000000000000e5
-538 2 8 22 -0.65536000000000000000e5
-538 2 12 26 0.65536000000000000000e5
-538 2 16 30 0.32768000000000000000e5
-538 3 2 31 0.65536000000000000000e5
-538 3 14 27 0.13107200000000000000e6
-538 4 4 16 0.65536000000000000000e5
-539 1 8 50 0.32768000000000000000e5
-539 1 11 42 -0.32768000000000000000e5
-539 1 12 43 -0.65536000000000000000e5
-539 1 17 48 0.65536000000000000000e5
-539 2 8 22 -0.32768000000000000000e5
-539 2 12 26 0.32768000000000000000e5
-539 3 2 31 0.32768000000000000000e5
-539 3 14 27 0.65536000000000000000e5
-539 4 4 16 0.32768000000000000000e5
-540 1 5 52 0.32768000000000000000e5
-540 1 8 51 0.32768000000000000000e5
-540 1 17 48 -0.65536000000000000000e5
-540 1 28 43 0.32768000000000000000e5
-540 2 8 22 0.32768000000000000000e5
-540 4 4 16 -0.32768000000000000000e5
-540 4 7 19 -0.32768000000000000000e5
-541 1 5 52 0.16384000000000000000e5
-541 1 8 52 0.32768000000000000000e5
-541 1 11 42 -0.16384000000000000000e5
-541 1 12 43 -0.32768000000000000000e5
-541 2 12 26 0.16384000000000000000e5
-541 2 20 34 -0.16384000000000000000e5
-541 3 2 31 0.16384000000000000000e5
-541 3 14 27 0.32768000000000000000e5
-541 4 7 19 -0.16384000000000000000e5
-541 4 8 20 -0.16384000000000000000e5
-542 1 7 54 -0.32768000000000000000e5
-542 1 8 53 0.32768000000000000000e5
-543 1 1 48 0.16384000000000000000e5
-543 1 2 49 0.16384000000000000000e5
-543 1 3 50 0.32768000000000000000e5
-543 1 8 54 0.32768000000000000000e5
-543 1 11 42 -0.65536000000000000000e5
-543 1 12 43 -0.13107200000000000000e6
-543 1 17 48 0.13107200000000000000e6
-543 1 23 38 0.16384000000000000000e5
-543 2 2 32 0.16384000000000000000e5
-543 2 8 22 -0.65536000000000000000e5
-543 2 12 26 0.65536000000000000000e5
-543 2 16 30 0.32768000000000000000e5
-543 3 2 31 0.65536000000000000000e5
-543 3 14 27 0.13107200000000000000e6
-543 3 17 30 0.32768000000000000000e5
-543 4 4 16 0.65536000000000000000e5
-544 1 8 55 0.32768000000000000000e5
-544 1 32 47 -0.32768000000000000000e5
-545 1 1 48 0.16384000000000000000e5
-545 1 2 49 0.16384000000000000000e5
-545 1 3 50 0.32768000000000000000e5
-545 1 8 56 0.32768000000000000000e5
-545 1 11 42 -0.65536000000000000000e5
-545 1 12 43 -0.13107200000000000000e6
-545 1 17 48 0.13107200000000000000e6
-545 1 23 38 0.16384000000000000000e5
-545 2 2 32 0.16384000000000000000e5
-545 2 8 22 -0.65536000000000000000e5
-545 2 12 26 0.65536000000000000000e5
-545 2 16 30 0.32768000000000000000e5
-545 3 2 31 0.65536000000000000000e5
-545 3 14 27 0.13107200000000000000e6
-545 3 17 30 0.32768000000000000000e5
-545 3 20 33 0.32768000000000000000e5
-545 4 4 16 0.65536000000000000000e5
-546 1 2 33 -0.16384000000000000000e5
-546 1 3 18 -0.32768000000000000000e5
-546 1 4 35 -0.65536000000000000000e5
-546 1 6 13 0.16384000000000000000e5
-546 1 9 9 0.32768000000000000000e5
-546 1 10 41 0.16384000000000000000e5
-546 1 11 42 0.16384000000000000000e5
-546 1 18 25 -0.32768000000000000000e5
-546 1 28 35 0.65536000000000000000e5
-546 2 8 22 0.16384000000000000000e5
-546 2 9 23 -0.32768000000000000000e5
-546 3 5 10 0.16384000000000000000e5
-546 3 8 21 0.16384000000000000000e5
-546 3 9 22 0.16384000000000000000e5
-546 3 11 24 0.65536000000000000000e5
-546 4 4 8 0.16384000000000000000e5
-547 1 9 10 0.32768000000000000000e5
-547 1 10 41 -0.32768000000000000000e5
-547 3 5 10 -0.32768000000000000000e5
-547 3 8 21 -0.32768000000000000000e5
-548 1 6 13 -0.32768000000000000000e5
-548 1 9 11 0.32768000000000000000e5
-549 1 2 17 -0.32768000000000000000e5
-549 1 9 12 0.32768000000000000000e5
-550 1 2 17 0.32768000000000000000e5
-550 1 3 18 0.32768000000000000000e5
-550 1 4 19 0.65536000000000000000e5
-550 1 9 13 0.32768000000000000000e5
-550 1 20 27 -0.13107200000000000000e6
-550 1 28 35 0.65536000000000000000e5
-550 2 6 12 0.32768000000000000000e5
-550 2 10 24 0.65536000000000000000e5
-550 3 2 15 -0.65536000000000000000e5
-550 3 8 13 -0.65536000000000000000e5
-550 3 11 24 0.65536000000000000000e5
-551 1 3 18 -0.32768000000000000000e5
-551 1 9 14 0.32768000000000000000e5
-552 1 3 18 0.32768000000000000000e5
-552 1 9 15 0.32768000000000000000e5
-552 1 10 17 -0.65536000000000000000e5
-552 1 11 14 0.32768000000000000000e5
-552 2 9 11 0.32768000000000000000e5
-553 1 4 19 0.32768000000000000000e5
-553 1 9 16 0.32768000000000000000e5
-553 1 20 27 -0.65536000000000000000e5
-553 1 28 35 0.32768000000000000000e5
-553 2 10 24 0.32768000000000000000e5
-553 3 2 15 -0.32768000000000000000e5
-553 3 8 13 -0.32768000000000000000e5
-553 3 11 24 0.32768000000000000000e5
-554 1 4 19 -0.32768000000000000000e5
-554 1 9 17 0.32768000000000000000e5
-555 1 9 18 0.32768000000000000000e5
-555 1 10 17 -0.32768000000000000000e5
-556 1 9 19 0.32768000000000000000e5
-556 1 10 17 -0.16384000000000000000e5
-556 1 20 27 -0.32768000000000000000e5
-556 1 28 35 0.16384000000000000000e5
-556 3 2 15 -0.16384000000000000000e5
-556 3 8 13 -0.16384000000000000000e5
-556 3 11 24 0.16384000000000000000e5
-556 4 6 10 -0.16384000000000000000e5
-557 1 4 19 -0.16384000000000000000e5
-557 1 5 20 -0.16384000000000000000e5
-557 1 9 20 0.32768000000000000000e5
-557 1 10 17 -0.16384000000000000000e5
-557 2 8 14 -0.16384000000000000000e5
-558 1 9 21 0.32768000000000000000e5
-558 1 13 20 -0.32768000000000000000e5
-559 1 8 23 -0.32768000000000000000e5
-559 1 9 22 0.32768000000000000000e5
-560 1 1 48 -0.16384000000000000000e5
-560 1 2 49 -0.16384000000000000000e5
-560 1 7 38 -0.32768000000000000000e5
-560 1 8 23 0.32768000000000000000e5
-560 1 9 23 0.32768000000000000000e5
-560 1 23 38 -0.16384000000000000000e5
-560 2 2 32 -0.16384000000000000000e5
-560 3 1 30 -0.32768000000000000000e5
-560 3 6 19 0.32768000000000000000e5
-560 3 7 20 -0.65536000000000000000e5
-560 4 2 14 0.32768000000000000000e5
-561 1 8 39 -0.32768000000000000000e5
-561 1 9 24 0.32768000000000000000e5
-561 3 6 19 -0.32768000000000000000e5
-562 1 1 48 0.16384000000000000000e5
-562 1 2 49 0.16384000000000000000e5
-562 1 5 52 -0.65536000000000000000e5
-562 1 8 39 0.32768000000000000000e5
-562 1 9 25 0.32768000000000000000e5
-562 1 10 25 0.32768000000000000000e5
-562 1 10 41 -0.65536000000000000000e5
-562 1 11 42 -0.65536000000000000000e5
-562 1 12 43 -0.13107200000000000000e6
-562 1 17 48 0.26214400000000000000e6
-562 1 23 38 0.16384000000000000000e5
-562 1 26 41 -0.32768000000000000000e5
-562 1 28 43 -0.65536000000000000000e5
-562 2 2 32 0.16384000000000000000e5
-562 2 8 22 -0.13107200000000000000e6
-562 2 12 26 0.65536000000000000000e5
-562 2 16 30 0.32768000000000000000e5
-562 3 2 31 0.65536000000000000000e5
-562 3 6 19 0.32768000000000000000e5
-562 3 8 21 -0.65536000000000000000e5
-562 3 14 27 0.13107200000000000000e6
-562 4 3 15 0.32768000000000000000e5
-562 4 4 16 0.13107200000000000000e6
-562 4 6 18 0.32768000000000000000e5
-562 4 7 19 0.65536000000000000000e5
-563 1 9 26 0.32768000000000000000e5
-563 1 10 25 -0.32768000000000000000e5
-564 1 2 33 0.32768000000000000000e5
-564 1 3 34 -0.65536000000000000000e5
-564 1 9 27 0.32768000000000000000e5
-564 1 10 41 0.32768000000000000000e5
-564 2 7 21 0.32768000000000000000e5
-564 3 8 21 0.32768000000000000000e5
-565 1 2 33 -0.32768000000000000000e5
-565 1 9 28 0.32768000000000000000e5
-566 1 9 29 0.32768000000000000000e5
-566 1 10 41 -0.32768000000000000000e5
-566 3 8 21 -0.32768000000000000000e5
-567 1 4 35 -0.65536000000000000000e5
-567 1 9 30 0.32768000000000000000e5
-567 1 10 41 0.32768000000000000000e5
-567 1 11 42 0.32768000000000000000e5
-567 2 8 22 0.32768000000000000000e5
-567 3 8 21 0.32768000000000000000e5
-567 3 9 22 0.32768000000000000000e5
-568 1 3 34 -0.32768000000000000000e5
-568 1 9 31 0.32768000000000000000e5
-569 1 4 35 0.32768000000000000000e5
-569 1 9 32 0.32768000000000000000e5
-569 1 18 25 0.32768000000000000000e5
-569 1 28 35 -0.65536000000000000000e5
-569 2 9 23 0.32768000000000000000e5
-569 3 11 24 -0.65536000000000000000e5
-570 1 4 35 -0.32768000000000000000e5
-570 1 9 33 0.32768000000000000000e5
-571 1 4 19 -0.32768000000000000000e5
-571 1 9 34 0.32768000000000000000e5
-571 3 8 13 0.32768000000000000000e5
-572 1 9 35 0.32768000000000000000e5
-572 1 28 35 -0.32768000000000000000e5
-572 3 11 24 -0.32768000000000000000e5
-573 1 9 36 0.32768000000000000000e5
-573 1 17 32 -0.32768000000000000000e5
-574 1 1 48 -0.16384000000000000000e5
-574 1 2 49 -0.16384000000000000000e5
-574 1 9 37 0.32768000000000000000e5
-574 1 23 38 -0.16384000000000000000e5
-574 2 2 32 -0.16384000000000000000e5
-574 3 1 30 -0.32768000000000000000e5
-575 1 8 39 -0.32768000000000000000e5
-575 1 9 38 0.32768000000000000000e5
-576 1 1 48 0.16384000000000000000e5
-576 1 2 49 0.16384000000000000000e5
-576 1 5 52 -0.65536000000000000000e5
-576 1 8 39 0.32768000000000000000e5
-576 1 9 39 0.32768000000000000000e5
-576 1 9 40 0.32768000000000000000e5
-576 1 10 41 -0.65536000000000000000e5
-576 1 11 42 -0.65536000000000000000e5
-576 1 12 43 -0.13107200000000000000e6
-576 1 17 48 0.26214400000000000000e6
-576 1 23 38 0.16384000000000000000e5
-576 1 26 41 -0.32768000000000000000e5
-576 1 28 43 -0.65536000000000000000e5
-576 2 2 32 0.16384000000000000000e5
-576 2 8 22 -0.13107200000000000000e6
-576 2 12 26 0.65536000000000000000e5
-576 2 16 30 0.32768000000000000000e5
-576 3 2 31 0.65536000000000000000e5
-576 3 14 27 0.13107200000000000000e6
-576 4 4 16 0.13107200000000000000e6
-576 4 6 18 0.32768000000000000000e5
-576 4 7 19 0.65536000000000000000e5
-577 1 9 41 0.32768000000000000000e5
-577 1 11 42 -0.32768000000000000000e5
-577 1 12 43 -0.65536000000000000000e5
-577 1 17 48 0.65536000000000000000e5
-577 2 8 22 -0.32768000000000000000e5
-577 2 12 26 0.32768000000000000000e5
-577 3 14 27 0.65536000000000000000e5
-577 4 4 16 0.32768000000000000000e5
-578 1 9 42 0.32768000000000000000e5
-578 1 10 41 -0.32768000000000000000e5
-579 1 9 43 0.32768000000000000000e5
-579 1 10 41 0.32768000000000000000e5
-579 1 11 42 0.32768000000000000000e5
-579 1 17 48 -0.65536000000000000000e5
-579 2 8 22 0.32768000000000000000e5
-579 3 14 27 -0.65536000000000000000e5
-579 4 4 16 -0.32768000000000000000e5
-580 1 9 44 0.32768000000000000000e5
-580 1 12 43 -0.32768000000000000000e5
-581 1 9 45 0.32768000000000000000e5
-581 1 17 48 -0.32768000000000000000e5
-581 3 14 27 -0.32768000000000000000e5
-582 1 9 46 0.32768000000000000000e5
-582 1 28 35 -0.32768000000000000000e5
-583 1 3 50 -0.32768000000000000000e5
-583 1 9 47 0.32768000000000000000e5
-584 1 1 48 0.16384000000000000000e5
-584 1 2 49 0.16384000000000000000e5
-584 1 3 50 0.32768000000000000000e5
-584 1 9 48 0.32768000000000000000e5
-584 1 11 42 -0.65536000000000000000e5
-584 1 12 43 -0.13107200000000000000e6
-584 1 17 48 0.13107200000000000000e6
-584 1 23 38 0.16384000000000000000e5
-584 2 2 32 0.16384000000000000000e5
-584 2 8 22 -0.65536000000000000000e5
-584 2 12 26 0.65536000000000000000e5
-584 2 16 30 0.32768000000000000000e5
-584 3 2 31 0.65536000000000000000e5
-584 3 14 27 0.13107200000000000000e6
-584 4 4 16 0.65536000000000000000e5
-585 1 9 49 0.32768000000000000000e5
-585 1 26 41 -0.32768000000000000000e5
-586 1 5 52 0.32768000000000000000e5
-586 1 9 50 0.32768000000000000000e5
-586 1 17 48 -0.65536000000000000000e5
-586 1 28 43 0.32768000000000000000e5
-586 2 8 22 0.32768000000000000000e5
-586 4 4 16 -0.32768000000000000000e5
-586 4 7 19 -0.32768000000000000000e5
-587 1 9 51 0.32768000000000000000e5
-587 1 28 43 -0.32768000000000000000e5
-588 1 9 52 0.32768000000000000000e5
-588 1 17 48 -0.32768000000000000000e5
-589 1 1 48 0.16384000000000000000e5
-589 1 2 49 0.16384000000000000000e5
-589 1 3 50 0.32768000000000000000e5
-589 1 9 53 0.32768000000000000000e5
-589 1 11 42 -0.65536000000000000000e5
-589 1 12 43 -0.13107200000000000000e6
-589 1 17 48 0.13107200000000000000e6
-589 1 23 38 0.16384000000000000000e5
-589 2 2 32 0.16384000000000000000e5
-589 2 8 22 -0.65536000000000000000e5
-589 2 12 26 0.65536000000000000000e5
-589 2 16 30 0.32768000000000000000e5
-589 3 2 31 0.65536000000000000000e5
-589 3 14 27 0.13107200000000000000e6
-589 3 17 30 0.32768000000000000000e5
-589 4 4 16 0.65536000000000000000e5
-590 1 9 54 0.32768000000000000000e5
-590 1 26 41 -0.32768000000000000000e5
-590 3 22 27 0.32768000000000000000e5
-591 1 9 55 0.32768000000000000000e5
-591 1 28 43 -0.32768000000000000000e5
-591 3 18 31 0.32768000000000000000e5
-592 1 9 56 0.32768000000000000000e5
-592 1 24 55 -0.32768000000000000000e5
-593 1 6 13 -0.16384000000000000000e5
-593 1 10 10 0.32768000000000000000e5
-594 1 3 18 0.65536000000000000000e5
-594 1 6 13 0.32768000000000000000e5
-594 1 10 11 0.32768000000000000000e5
-594 1 10 17 -0.13107200000000000000e6
-594 1 10 41 0.32768000000000000000e5
-594 1 11 14 0.65536000000000000000e5
-594 2 5 11 0.32768000000000000000e5
-594 2 9 11 0.65536000000000000000e5
-594 3 5 10 0.32768000000000000000e5
-594 3 8 21 0.32768000000000000000e5
-595 1 2 17 0.32768000000000000000e5
-595 1 3 18 0.32768000000000000000e5
-595 1 4 19 0.65536000000000000000e5
-595 1 10 12 0.32768000000000000000e5
-595 1 20 27 -0.13107200000000000000e6
-595 1 28 35 0.65536000000000000000e5
-595 2 6 12 0.32768000000000000000e5
-595 2 10 24 0.65536000000000000000e5
-595 3 2 15 -0.65536000000000000000e5
-595 3 8 13 -0.65536000000000000000e5
-595 3 11 24 0.65536000000000000000e5
-596 1 3 18 -0.32768000000000000000e5
-596 1 10 13 0.32768000000000000000e5
-597 1 3 18 0.32768000000000000000e5
-597 1 10 14 0.32768000000000000000e5
-597 1 10 17 -0.65536000000000000000e5
-597 1 11 14 0.32768000000000000000e5
-597 2 9 11 0.32768000000000000000e5
-598 1 10 15 0.32768000000000000000e5
-598 1 11 14 -0.32768000000000000000e5
-599 1 4 19 -0.32768000000000000000e5
-599 1 10 16 0.32768000000000000000e5
-600 1 5 20 -0.32768000000000000000e5
-600 1 10 18 0.32768000000000000000e5
-601 1 4 19 -0.16384000000000000000e5
-601 1 5 20 -0.16384000000000000000e5
-601 1 10 17 -0.16384000000000000000e5
-601 1 10 19 0.32768000000000000000e5
-601 2 8 14 -0.16384000000000000000e5
-602 1 4 19 0.16384000000000000000e5
-602 1 5 20 0.16384000000000000000e5
-602 1 6 21 0.32768000000000000000e5
-602 1 10 17 0.16384000000000000000e5
-602 1 10 20 0.32768000000000000000e5
-602 1 10 21 -0.65536000000000000000e5
-602 2 8 14 0.16384000000000000000e5
-602 2 9 15 0.32768000000000000000e5
-603 1 1 48 -0.16384000000000000000e5
-603 1 2 49 -0.16384000000000000000e5
-603 1 7 38 -0.32768000000000000000e5
-603 1 8 23 0.32768000000000000000e5
-603 1 10 22 0.32768000000000000000e5
-603 1 23 38 -0.16384000000000000000e5
-603 2 2 32 -0.16384000000000000000e5
-603 3 1 30 -0.32768000000000000000e5
-603 3 6 19 0.32768000000000000000e5
-603 3 7 20 -0.65536000000000000000e5
-603 4 2 14 0.32768000000000000000e5
-604 1 8 39 -0.32768000000000000000e5
-604 1 10 23 0.32768000000000000000e5
-604 3 6 19 -0.32768000000000000000e5
-605 1 1 48 0.16384000000000000000e5
-605 1 2 49 0.16384000000000000000e5
-605 1 5 52 -0.65536000000000000000e5
-605 1 8 39 0.32768000000000000000e5
-605 1 10 24 0.32768000000000000000e5
-605 1 10 25 0.32768000000000000000e5
-605 1 10 41 -0.65536000000000000000e5
-605 1 11 42 -0.65536000000000000000e5
-605 1 12 43 -0.13107200000000000000e6
-605 1 17 48 0.26214400000000000000e6
-605 1 23 38 0.16384000000000000000e5
-605 1 26 41 -0.32768000000000000000e5
-605 1 28 43 -0.65536000000000000000e5
-605 2 2 32 0.16384000000000000000e5
-605 2 8 22 -0.13107200000000000000e6
-605 2 12 26 0.65536000000000000000e5
-605 2 16 30 0.32768000000000000000e5
-605 3 2 31 0.65536000000000000000e5
-605 3 6 19 0.32768000000000000000e5
-605 3 8 21 -0.65536000000000000000e5
-605 3 14 27 0.13107200000000000000e6
-605 4 3 15 0.32768000000000000000e5
-605 4 4 16 0.13107200000000000000e6
-605 4 6 18 0.32768000000000000000e5
-605 4 7 19 0.65536000000000000000e5
-606 1 6 29 -0.32768000000000000000e5
-606 1 10 26 0.32768000000000000000e5
-607 1 2 33 -0.32768000000000000000e5
-607 1 10 27 0.32768000000000000000e5
-608 1 10 28 0.32768000000000000000e5
-608 1 10 41 -0.32768000000000000000e5
-608 3 8 21 -0.32768000000000000000e5
-609 1 4 35 -0.65536000000000000000e5
-609 1 10 29 0.32768000000000000000e5
-609 1 10 41 0.32768000000000000000e5
-609 1 11 42 0.32768000000000000000e5
-609 2 8 22 0.32768000000000000000e5
-609 3 8 21 0.32768000000000000000e5
-609 3 9 22 0.32768000000000000000e5
-610 1 10 30 0.32768000000000000000e5
-610 1 11 42 -0.32768000000000000000e5
-610 3 9 22 -0.32768000000000000000e5
-611 1 4 35 0.32768000000000000000e5
-611 1 10 31 0.32768000000000000000e5
-611 1 18 25 0.32768000000000000000e5
-611 1 28 35 -0.65536000000000000000e5
-611 2 9 23 0.32768000000000000000e5
-611 3 11 24 -0.65536000000000000000e5
-612 1 4 35 -0.32768000000000000000e5
-612 1 10 32 0.32768000000000000000e5
-613 1 10 33 0.32768000000000000000e5
-613 1 18 25 -0.32768000000000000000e5
-614 1 10 34 0.32768000000000000000e5
-614 1 28 35 -0.32768000000000000000e5
-614 3 11 24 -0.32768000000000000000e5
-615 1 5 36 -0.32768000000000000000e5
-615 1 10 35 0.32768000000000000000e5
-616 1 10 36 0.32768000000000000000e5
-616 1 29 36 -0.32768000000000000000e5
-616 3 12 25 -0.32768000000000000000e5
-617 1 8 39 -0.32768000000000000000e5
-617 1 10 37 0.32768000000000000000e5
-618 1 1 48 0.16384000000000000000e5
-618 1 2 49 0.16384000000000000000e5
-618 1 5 52 -0.65536000000000000000e5
-618 1 8 39 0.32768000000000000000e5
-618 1 9 40 0.32768000000000000000e5
-618 1 10 38 0.32768000000000000000e5
-618 1 10 41 -0.65536000000000000000e5
-618 1 11 42 -0.65536000000000000000e5
-618 1 12 43 -0.13107200000000000000e6
-618 1 17 48 0.26214400000000000000e6
-618 1 23 38 0.16384000000000000000e5
-618 1 26 41 -0.32768000000000000000e5
-618 1 28 43 -0.65536000000000000000e5
-618 2 2 32 0.16384000000000000000e5
-618 2 8 22 -0.13107200000000000000e6
-618 2 12 26 0.65536000000000000000e5
-618 2 16 30 0.32768000000000000000e5
-618 3 2 31 0.65536000000000000000e5
-618 3 14 27 0.13107200000000000000e6
-618 4 4 16 0.13107200000000000000e6
-618 4 6 18 0.32768000000000000000e5
-618 4 7 19 0.65536000000000000000e5
-619 1 9 40 -0.32768000000000000000e5
-619 1 10 39 0.32768000000000000000e5
-620 1 10 40 0.32768000000000000000e5
-620 1 26 29 -0.32768000000000000000e5
-621 1 10 41 0.32768000000000000000e5
-621 1 10 42 0.32768000000000000000e5
-621 1 11 42 0.32768000000000000000e5
-621 1 17 48 -0.65536000000000000000e5
-621 2 8 22 0.32768000000000000000e5
-621 3 14 27 -0.65536000000000000000e5
-621 4 4 16 -0.32768000000000000000e5
-622 1 10 43 0.32768000000000000000e5
-622 1 11 42 -0.32768000000000000000e5
-623 1 10 44 0.32768000000000000000e5
-623 1 17 48 -0.32768000000000000000e5
-623 3 14 27 -0.32768000000000000000e5
-624 1 10 45 0.32768000000000000000e5
-624 1 18 25 -0.32768000000000000000e5
-624 3 14 19 0.32768000000000000000e5
-625 1 10 46 0.32768000000000000000e5
-625 1 14 45 -0.32768000000000000000e5
-626 1 1 48 0.16384000000000000000e5
-626 1 2 49 0.16384000000000000000e5
-626 1 3 50 0.32768000000000000000e5
-626 1 10 47 0.32768000000000000000e5
-626 1 11 42 -0.65536000000000000000e5
-626 1 12 43 -0.13107200000000000000e6
-626 1 17 48 0.13107200000000000000e6
-626 1 23 38 0.16384000000000000000e5
-626 2 2 32 0.16384000000000000000e5
-626 2 8 22 -0.65536000000000000000e5
-626 2 12 26 0.65536000000000000000e5
-626 2 16 30 0.32768000000000000000e5
-626 3 2 31 0.65536000000000000000e5
-626 3 14 27 0.13107200000000000000e6
-626 4 4 16 0.65536000000000000000e5
-627 1 10 48 0.32768000000000000000e5
-627 1 26 41 -0.32768000000000000000e5
-628 1 1 48 -0.16384000000000000000e5
-628 1 2 49 -0.16384000000000000000e5
-628 1 3 50 -0.32768000000000000000e5
-628 1 10 49 0.32768000000000000000e5
-628 1 11 42 0.65536000000000000000e5
-628 1 12 43 0.13107200000000000000e6
-628 1 17 48 -0.13107200000000000000e6
-628 1 23 38 -0.16384000000000000000e5
-628 1 26 41 0.32768000000000000000e5
-628 1 28 43 -0.65536000000000000000e5
-628 2 2 32 -0.16384000000000000000e5
-628 2 4 34 0.32768000000000000000e5
-628 2 8 22 0.65536000000000000000e5
-628 2 12 26 -0.65536000000000000000e5
-628 2 16 30 -0.32768000000000000000e5
-628 3 2 31 -0.65536000000000000000e5
-628 3 14 27 -0.13107200000000000000e6
-628 4 4 16 -0.65536000000000000000e5
-629 1 10 50 0.32768000000000000000e5
-629 1 28 43 -0.32768000000000000000e5
-630 1 5 52 -0.32768000000000000000e5
-630 1 10 51 0.32768000000000000000e5
-631 1 10 52 0.32768000000000000000e5
-631 1 14 45 -0.65536000000000000000e5
-631 1 17 48 0.32768000000000000000e5
-631 1 18 49 0.32768000000000000000e5
-631 2 24 30 0.32768000000000000000e5
-631 3 15 28 0.65536000000000000000e5
-632 1 10 53 0.32768000000000000000e5
-632 1 26 41 -0.32768000000000000000e5
-632 3 22 27 0.32768000000000000000e5
-633 1 1 48 -0.16384000000000000000e5
-633 1 2 49 -0.16384000000000000000e5
-633 1 3 50 -0.32768000000000000000e5
-633 1 10 54 0.32768000000000000000e5
-633 1 11 42 0.65536000000000000000e5
-633 1 12 43 0.13107200000000000000e6
-633 1 17 48 -0.13107200000000000000e6
-633 1 23 38 -0.16384000000000000000e5
-633 1 26 41 0.32768000000000000000e5
-633 1 28 43 -0.65536000000000000000e5
-633 2 2 32 -0.16384000000000000000e5
-633 2 4 34 0.32768000000000000000e5
-633 2 8 22 0.65536000000000000000e5
-633 2 12 26 -0.65536000000000000000e5
-633 2 16 30 -0.32768000000000000000e5
-633 3 2 31 -0.65536000000000000000e5
-633 3 5 34 0.32768000000000000000e5
-633 3 14 27 -0.13107200000000000000e6
-633 4 4 16 -0.65536000000000000000e5
-634 1 10 55 0.32768000000000000000e5
-634 1 33 48 -0.32768000000000000000e5
-635 1 1 48 -0.16384000000000000000e5
-635 1 2 49 -0.16384000000000000000e5
-635 1 3 50 -0.32768000000000000000e5
-635 1 10 56 0.32768000000000000000e5
-635 1 11 42 0.65536000000000000000e5
-635 1 12 43 0.13107200000000000000e6
-635 1 17 48 -0.13107200000000000000e6
-635 1 23 38 -0.16384000000000000000e5
-635 1 24 55 0.32768000000000000000e5
-635 1 28 43 -0.65536000000000000000e5
-635 2 2 32 -0.16384000000000000000e5
-635 2 8 22 0.65536000000000000000e5
-635 2 12 26 -0.65536000000000000000e5
-635 2 16 30 -0.32768000000000000000e5
-635 2 21 35 0.32768000000000000000e5
-635 3 2 31 -0.65536000000000000000e5
-635 3 14 27 -0.13107200000000000000e6
-635 3 17 30 -0.32768000000000000000e5
-635 3 18 31 0.65536000000000000000e5
-635 3 20 33 -0.32768000000000000000e5
-635 3 21 34 0.65536000000000000000e5
-635 4 4 16 -0.65536000000000000000e5
-636 1 3 18 -0.32768000000000000000e5
-636 1 10 17 0.65536000000000000000e5
-636 1 10 41 -0.16384000000000000000e5
-636 1 11 11 0.32768000000000000000e5
-636 1 11 14 -0.65536000000000000000e5
-636 2 5 11 -0.16384000000000000000e5
-636 2 9 9 0.32768000000000000000e5
-636 2 9 11 -0.32768000000000000000e5
-636 3 5 10 -0.16384000000000000000e5
-636 3 8 21 -0.16384000000000000000e5
-637 1 3 18 -0.32768000000000000000e5
-637 1 11 12 0.32768000000000000000e5
-638 1 3 18 0.32768000000000000000e5
-638 1 10 17 -0.65536000000000000000e5
-638 1 11 13 0.32768000000000000000e5
-638 1 11 14 0.32768000000000000000e5
-638 2 9 11 0.32768000000000000000e5
-639 1 3 18 -0.32768000000000000000e5
-639 1 5 20 -0.65536000000000000000e5
-639 1 10 17 0.65536000000000000000e5
-639 1 11 15 0.32768000000000000000e5
-639 2 9 11 -0.32768000000000000000e5
-639 2 9 12 0.32768000000000000000e5
-640 1 10 17 -0.32768000000000000000e5
-640 1 11 16 0.32768000000000000000e5
-641 1 5 20 -0.32768000000000000000e5
-641 1 11 17 0.32768000000000000000e5
-642 1 4 19 0.16384000000000000000e5
-642 1 5 20 0.16384000000000000000e5
-642 1 6 21 0.32768000000000000000e5
-642 1 10 17 0.16384000000000000000e5
-642 1 10 21 -0.65536000000000000000e5
-642 1 11 19 0.32768000000000000000e5
-642 2 8 14 0.16384000000000000000e5
-642 2 9 15 0.32768000000000000000e5
-643 1 6 21 -0.32768000000000000000e5
-643 1 11 20 0.32768000000000000000e5
-644 1 10 21 0.32768000000000000000e5
-644 1 11 21 0.32768000000000000000e5
-644 1 13 20 0.32768000000000000000e5
-644 1 14 21 -0.65536000000000000000e5
-644 2 14 14 0.65536000000000000000e5
-645 1 8 39 -0.32768000000000000000e5
-645 1 11 22 0.32768000000000000000e5
-645 3 6 19 -0.32768000000000000000e5
-646 1 1 48 0.16384000000000000000e5
-646 1 2 49 0.16384000000000000000e5
-646 1 5 52 -0.65536000000000000000e5
-646 1 8 39 0.32768000000000000000e5
-646 1 10 25 0.32768000000000000000e5
-646 1 10 41 -0.65536000000000000000e5
-646 1 11 23 0.32768000000000000000e5
-646 1 11 42 -0.65536000000000000000e5
-646 1 12 43 -0.13107200000000000000e6
-646 1 17 48 0.26214400000000000000e6
-646 1 23 38 0.16384000000000000000e5
-646 1 26 41 -0.32768000000000000000e5
-646 1 28 43 -0.65536000000000000000e5
-646 2 2 32 0.16384000000000000000e5
-646 2 8 22 -0.13107200000000000000e6
-646 2 12 26 0.65536000000000000000e5
-646 2 16 30 0.32768000000000000000e5
-646 3 2 31 0.65536000000000000000e5
-646 3 6 19 0.32768000000000000000e5
-646 3 8 21 -0.65536000000000000000e5
-646 3 14 27 0.13107200000000000000e6
-646 4 3 15 0.32768000000000000000e5
-646 4 4 16 0.13107200000000000000e6
-646 4 6 18 0.32768000000000000000e5
-646 4 7 19 0.65536000000000000000e5
-647 1 10 25 -0.32768000000000000000e5
-647 1 11 24 0.32768000000000000000e5
-648 1 6 29 -0.32768000000000000000e5
-648 1 11 25 0.32768000000000000000e5
-649 1 10 41 -0.32768000000000000000e5
-649 1 11 27 0.32768000000000000000e5
-649 3 8 21 -0.32768000000000000000e5
-650 1 4 35 -0.65536000000000000000e5
-650 1 10 41 0.32768000000000000000e5
-650 1 11 28 0.32768000000000000000e5
-650 1 11 42 0.32768000000000000000e5
-650 2 8 22 0.32768000000000000000e5
-650 3 8 21 0.32768000000000000000e5
-650 3 9 22 0.32768000000000000000e5
-651 1 11 29 0.32768000000000000000e5
-651 1 11 42 -0.32768000000000000000e5
-651 3 9 22 -0.32768000000000000000e5
-652 1 4 35 -0.32768000000000000000e5
-652 1 11 31 0.32768000000000000000e5
-653 1 11 32 0.32768000000000000000e5
-653 1 18 25 -0.32768000000000000000e5
-654 1 11 33 0.32768000000000000000e5
-654 1 15 30 -0.32768000000000000000e5
-655 1 5 36 -0.32768000000000000000e5
-655 1 11 34 0.32768000000000000000e5
-656 1 5 36 0.32768000000000000000e5
-656 1 11 35 0.32768000000000000000e5
-656 1 28 35 0.32768000000000000000e5
-656 1 29 36 -0.65536000000000000000e5
-656 2 9 25 0.32768000000000000000e5
-656 3 11 24 0.32768000000000000000e5
-656 3 12 25 -0.65536000000000000000e5
-657 1 11 36 0.32768000000000000000e5
-657 1 18 33 -0.32768000000000000000e5
-658 1 1 48 0.16384000000000000000e5
-658 1 2 49 0.16384000000000000000e5
-658 1 5 52 -0.65536000000000000000e5
-658 1 8 39 0.32768000000000000000e5
-658 1 9 40 0.32768000000000000000e5
-658 1 10 41 -0.65536000000000000000e5
-658 1 11 37 0.32768000000000000000e5
-658 1 11 42 -0.65536000000000000000e5
-658 1 12 43 -0.13107200000000000000e6
-658 1 17 48 0.26214400000000000000e6
-658 1 23 38 0.16384000000000000000e5
-658 1 26 41 -0.32768000000000000000e5
-658 1 28 43 -0.65536000000000000000e5
-658 2 2 32 0.16384000000000000000e5
-658 2 8 22 -0.13107200000000000000e6
-658 2 12 26 0.65536000000000000000e5
-658 2 16 30 0.32768000000000000000e5
-658 3 2 31 0.65536000000000000000e5
-658 3 14 27 0.13107200000000000000e6
-658 4 4 16 0.13107200000000000000e6
-658 4 6 18 0.32768000000000000000e5
-658 4 7 19 0.65536000000000000000e5
-659 1 9 40 -0.32768000000000000000e5
-659 1 11 38 0.32768000000000000000e5
-660 1 11 39 0.32768000000000000000e5
-660 1 26 29 -0.32768000000000000000e5
-661 1 6 43 -0.32768000000000000000e5
-661 1 11 40 0.32768000000000000000e5
-662 1 10 41 0.32768000000000000000e5
-662 1 11 41 0.32768000000000000000e5
-662 1 11 42 0.32768000000000000000e5
-662 1 17 48 -0.65536000000000000000e5
-662 2 8 22 0.32768000000000000000e5
-662 3 14 27 -0.65536000000000000000e5
-662 4 4 16 -0.32768000000000000000e5
-663 1 11 43 0.32768000000000000000e5
-663 1 26 33 -0.32768000000000000000e5
-664 1 11 44 0.32768000000000000000e5
-664 1 18 25 -0.32768000000000000000e5
-664 3 14 19 0.32768000000000000000e5
-665 1 11 45 0.32768000000000000000e5
-665 1 14 45 -0.65536000000000000000e5
-665 1 17 48 0.32768000000000000000e5
-665 1 18 25 0.32768000000000000000e5
-665 2 14 28 0.32768000000000000000e5
-665 3 14 19 -0.32768000000000000000e5
-665 3 14 27 0.32768000000000000000e5
-666 1 11 47 0.32768000000000000000e5
-666 1 26 41 -0.32768000000000000000e5
-667 1 1 48 -0.16384000000000000000e5
-667 1 2 49 -0.16384000000000000000e5
-667 1 3 50 -0.32768000000000000000e5
-667 1 11 42 0.65536000000000000000e5
-667 1 11 48 0.32768000000000000000e5
-667 1 12 43 0.13107200000000000000e6
-667 1 17 48 -0.13107200000000000000e6
-667 1 23 38 -0.16384000000000000000e5
-667 1 26 41 0.32768000000000000000e5
-667 1 28 43 -0.65536000000000000000e5
-667 2 2 32 -0.16384000000000000000e5
-667 2 4 34 0.32768000000000000000e5
-667 2 8 22 0.65536000000000000000e5
-667 2 12 26 -0.65536000000000000000e5
-667 2 16 30 -0.32768000000000000000e5
-667 3 2 31 -0.65536000000000000000e5
-667 3 14 27 -0.13107200000000000000e6
-667 4 4 16 -0.65536000000000000000e5
-668 1 1 48 0.16384000000000000000e5
-668 1 2 49 0.16384000000000000000e5
-668 1 3 50 0.32768000000000000000e5
-668 1 5 52 -0.65536000000000000000e5
-668 1 11 42 -0.65536000000000000000e5
-668 1 11 49 0.32768000000000000000e5
-668 1 12 43 -0.13107200000000000000e6
-668 1 17 48 0.13107200000000000000e6
-668 1 23 38 0.16384000000000000000e5
-668 1 28 43 0.65536000000000000000e5
-668 2 2 32 0.16384000000000000000e5
-668 2 4 34 -0.32768000000000000000e5
-668 2 8 22 -0.65536000000000000000e5
-668 2 12 26 0.65536000000000000000e5
-668 2 16 30 0.32768000000000000000e5
-668 2 22 28 0.32768000000000000000e5
-668 3 2 31 0.65536000000000000000e5
-668 3 14 27 0.13107200000000000000e6
-668 4 4 16 0.65536000000000000000e5
-669 1 5 52 -0.32768000000000000000e5
-669 1 11 50 0.32768000000000000000e5
-670 1 11 51 0.32768000000000000000e5
-670 1 33 40 -0.32768000000000000000e5
-671 1 11 52 0.32768000000000000000e5
-671 1 18 49 -0.32768000000000000000e5
-672 1 1 48 -0.16384000000000000000e5
-672 1 2 49 -0.16384000000000000000e5
-672 1 3 50 -0.32768000000000000000e5
-672 1 11 42 0.65536000000000000000e5
-672 1 11 53 0.32768000000000000000e5
-672 1 12 43 0.13107200000000000000e6
-672 1 17 48 -0.13107200000000000000e6
-672 1 23 38 -0.16384000000000000000e5
-672 1 26 41 0.32768000000000000000e5
-672 1 28 43 -0.65536000000000000000e5
-672 2 2 32 -0.16384000000000000000e5
-672 2 4 34 0.32768000000000000000e5
-672 2 8 22 0.65536000000000000000e5
-672 2 12 26 -0.65536000000000000000e5
-672 2 16 30 -0.32768000000000000000e5
-672 3 2 31 -0.65536000000000000000e5
-672 3 5 34 0.32768000000000000000e5
-672 3 14 27 -0.13107200000000000000e6
-672 4 4 16 -0.65536000000000000000e5
-673 1 1 48 0.16384000000000000000e5
-673 1 2 49 0.16384000000000000000e5
-673 1 3 50 0.32768000000000000000e5
-673 1 11 42 -0.65536000000000000000e5
-673 1 11 54 0.32768000000000000000e5
-673 1 12 43 -0.13107200000000000000e6
-673 1 17 48 0.13107200000000000000e6
-673 1 23 38 0.16384000000000000000e5
-673 1 28 43 0.65536000000000000000e5
-673 1 33 48 -0.65536000000000000000e5
-673 2 2 32 0.16384000000000000000e5
-673 2 4 34 -0.32768000000000000000e5
-673 2 8 22 -0.65536000000000000000e5
-673 2 12 26 0.65536000000000000000e5
-673 2 16 30 0.32768000000000000000e5
-673 2 28 30 0.32768000000000000000e5
-673 3 2 31 0.65536000000000000000e5
-673 3 5 34 -0.32768000000000000000e5
-673 3 14 27 0.13107200000000000000e6
-673 3 22 27 -0.32768000000000000000e5
-673 4 4 16 0.65536000000000000000e5
-674 1 11 55 0.32768000000000000000e5
-674 1 15 54 -0.32768000000000000000e5
-675 1 1 48 0.16384000000000000000e5
-675 1 2 49 0.16384000000000000000e5
-675 1 3 50 0.32768000000000000000e5
-675 1 11 42 -0.65536000000000000000e5
-675 1 11 56 0.32768000000000000000e5
-675 1 12 43 -0.13107200000000000000e6
-675 1 17 48 0.13107200000000000000e6
-675 1 23 38 0.16384000000000000000e5
-675 1 28 43 0.65536000000000000000e5
-675 1 43 50 -0.65536000000000000000e5
-675 2 2 32 0.16384000000000000000e5
-675 2 8 22 -0.65536000000000000000e5
-675 2 12 26 0.65536000000000000000e5
-675 2 16 30 0.32768000000000000000e5
-675 2 21 35 -0.32768000000000000000e5
-675 2 28 34 0.32768000000000000000e5
-675 3 2 31 0.65536000000000000000e5
-675 3 14 27 0.13107200000000000000e6
-675 3 17 30 0.32768000000000000000e5
-675 3 18 31 -0.65536000000000000000e5
-675 3 20 33 0.32768000000000000000e5
-675 3 21 34 -0.65536000000000000000e5
-675 4 4 16 0.65536000000000000000e5
-676 1 7 16 -0.16384000000000000000e5
-676 1 12 12 0.32768000000000000000e5
-677 1 12 13 0.32768000000000000000e5
-677 1 13 16 -0.65536000000000000000e5
-677 1 20 27 0.65536000000000000000e5
-677 1 28 35 -0.32768000000000000000e5
-677 2 7 13 0.32768000000000000000e5
-677 2 10 24 -0.32768000000000000000e5
-677 3 2 15 0.32768000000000000000e5
-677 3 8 13 0.32768000000000000000e5
-677 3 11 24 -0.32768000000000000000e5
-678 1 4 19 0.32768000000000000000e5
-678 1 12 14 0.32768000000000000000e5
-678 1 20 27 -0.65536000000000000000e5
-678 1 28 35 0.32768000000000000000e5
-678 2 10 24 0.32768000000000000000e5
-678 3 2 15 -0.32768000000000000000e5
-678 3 8 13 -0.32768000000000000000e5
-678 3 11 24 0.32768000000000000000e5
-679 1 4 19 -0.32768000000000000000e5
-679 1 12 15 0.32768000000000000000e5
-680 1 4 19 0.16384000000000000000e5
-680 1 7 16 -0.16384000000000000000e5
-680 1 12 16 0.32768000000000000000e5
-680 1 13 16 -0.32768000000000000000e5
-680 2 1 15 -0.16384000000000000000e5
-680 2 7 13 0.16384000000000000000e5
-681 1 12 17 0.32768000000000000000e5
-681 1 13 16 -0.32768000000000000000e5
-682 1 10 17 -0.16384000000000000000e5
-682 1 12 18 0.32768000000000000000e5
-682 1 20 27 -0.32768000000000000000e5
-682 1 28 35 0.16384000000000000000e5
-682 3 2 15 -0.16384000000000000000e5
-682 3 8 13 -0.16384000000000000000e5
-682 3 11 24 0.16384000000000000000e5
-682 4 6 10 -0.16384000000000000000e5
-683 1 4 19 -0.81920000000000000000e4
-683 1 5 20 -0.81920000000000000000e4
-683 1 10 17 -0.16384000000000000000e5
-683 1 12 20 0.32768000000000000000e5
-683 1 13 16 -0.16384000000000000000e5
-683 1 20 27 -0.16384000000000000000e5
-683 1 28 35 0.81920000000000000000e4
-683 2 8 14 -0.81920000000000000000e4
-683 2 11 13 -0.16384000000000000000e5
-683 3 2 15 -0.81920000000000000000e4
-683 3 8 13 -0.81920000000000000000e4
-683 3 11 24 0.81920000000000000000e4
-683 4 6 10 -0.81920000000000000000e4
-684 1 12 21 0.32768000000000000000e5
-684 1 16 19 -0.32768000000000000000e5
-685 1 1 32 0.32768000000000000000e5
-685 1 2 33 -0.32768000000000000000e5
-685 1 3 34 0.65536000000000000000e5
-685 1 10 41 -0.32768000000000000000e5
-685 1 12 22 0.32768000000000000000e5
-685 1 12 27 -0.65536000000000000000e5
-685 2 6 20 0.32768000000000000000e5
-685 2 7 21 -0.32768000000000000000e5
-685 3 8 21 -0.32768000000000000000e5
-686 1 1 32 -0.32768000000000000000e5
-686 1 12 23 0.32768000000000000000e5
-687 1 2 33 0.32768000000000000000e5
-687 1 3 34 -0.65536000000000000000e5
-687 1 10 41 0.32768000000000000000e5
-687 1 12 24 0.32768000000000000000e5
-687 2 7 21 0.32768000000000000000e5
-687 3 8 21 0.32768000000000000000e5
-688 1 2 33 -0.32768000000000000000e5
-688 1 12 25 0.32768000000000000000e5
-689 1 10 41 -0.32768000000000000000e5
-689 1 12 26 0.32768000000000000000e5
-689 3 8 21 -0.32768000000000000000e5
-690 1 2 17 -0.32768000000000000000e5
-690 1 12 28 0.32768000000000000000e5
-690 3 1 14 0.32768000000000000000e5
-691 1 3 34 -0.32768000000000000000e5
-691 1 12 29 0.32768000000000000000e5
-692 1 4 35 0.32768000000000000000e5
-692 1 12 30 0.32768000000000000000e5
-692 1 18 25 0.32768000000000000000e5
-692 1 28 35 -0.65536000000000000000e5
-692 2 9 23 0.32768000000000000000e5
-692 3 11 24 -0.65536000000000000000e5
-693 1 12 31 0.32768000000000000000e5
-693 1 16 31 -0.65536000000000000000e5
-693 1 20 27 0.65536000000000000000e5
-693 1 28 35 -0.32768000000000000000e5
-693 2 7 13 0.32768000000000000000e5
-693 2 10 24 -0.32768000000000000000e5
-693 3 11 24 -0.32768000000000000000e5
-693 4 8 8 -0.65536000000000000000e5
-694 1 4 19 0.32768000000000000000e5
-694 1 12 32 0.32768000000000000000e5
-694 1 20 27 -0.65536000000000000000e5
-694 1 28 35 0.32768000000000000000e5
-694 2 10 24 0.32768000000000000000e5
-694 3 8 13 -0.32768000000000000000e5
-694 3 11 24 0.32768000000000000000e5
-695 1 4 19 -0.32768000000000000000e5
-695 1 12 33 0.32768000000000000000e5
-695 3 8 13 0.32768000000000000000e5
-696 1 12 34 0.32768000000000000000e5
-696 1 16 31 -0.32768000000000000000e5
-697 1 12 35 0.32768000000000000000e5
-697 1 20 27 -0.32768000000000000000e5
-698 1 4 19 -0.81920000000000000000e4
-698 1 5 20 -0.81920000000000000000e4
-698 1 10 17 -0.16384000000000000000e5
-698 1 12 36 0.32768000000000000000e5
-698 1 13 16 -0.16384000000000000000e5
-698 1 20 27 -0.16384000000000000000e5
-698 1 28 35 0.81920000000000000000e4
-698 2 8 14 -0.81920000000000000000e4
-698 2 11 13 -0.16384000000000000000e5
-698 3 2 15 -0.81920000000000000000e4
-698 3 8 13 -0.81920000000000000000e4
-698 3 10 15 0.32768000000000000000e5
-698 3 11 24 0.81920000000000000000e4
-698 4 6 10 -0.81920000000000000000e4
-699 1 2 17 -0.65536000000000000000e5
-699 1 2 33 -0.32768000000000000000e5
-699 1 3 34 0.65536000000000000000e5
-699 1 10 41 -0.32768000000000000000e5
-699 1 11 42 0.32768000000000000000e5
-699 1 12 37 0.32768000000000000000e5
-699 1 12 43 0.65536000000000000000e5
-699 1 17 48 -0.65536000000000000000e5
-699 2 1 31 0.32768000000000000000e5
-699 2 7 21 -0.32768000000000000000e5
-699 2 8 22 0.32768000000000000000e5
-699 2 12 26 -0.32768000000000000000e5
-699 3 1 14 0.65536000000000000000e5
-699 3 6 23 0.65536000000000000000e5
-699 3 7 20 -0.32768000000000000000e5
-699 3 8 21 -0.32768000000000000000e5
-699 3 14 27 -0.65536000000000000000e5
-699 4 4 16 -0.32768000000000000000e5
-700 1 2 33 0.32768000000000000000e5
-700 1 3 34 -0.65536000000000000000e5
-700 1 10 41 0.32768000000000000000e5
-700 1 12 38 0.32768000000000000000e5
-700 2 7 21 0.32768000000000000000e5
-700 3 7 20 0.32768000000000000000e5
-700 3 8 21 0.32768000000000000000e5
-701 1 11 42 -0.32768000000000000000e5
-701 1 12 39 0.32768000000000000000e5
-701 1 12 43 -0.65536000000000000000e5
-701 1 17 48 0.65536000000000000000e5
-701 2 8 22 -0.32768000000000000000e5
-701 2 12 26 0.32768000000000000000e5
-701 3 14 27 0.65536000000000000000e5
-701 4 4 16 0.32768000000000000000e5
-702 1 10 41 -0.32768000000000000000e5
-702 1 12 40 0.32768000000000000000e5
-703 1 2 17 -0.32768000000000000000e5
-703 1 12 41 0.32768000000000000000e5
-703 3 1 14 0.32768000000000000000e5
-703 3 6 23 0.32768000000000000000e5
-704 1 12 42 0.32768000000000000000e5
-704 1 16 47 -0.32768000000000000000e5
-704 3 13 26 -0.32768000000000000000e5
-705 1 4 19 0.32768000000000000000e5
-705 1 12 44 0.32768000000000000000e5
-705 1 20 27 -0.65536000000000000000e5
-705 1 28 35 0.32768000000000000000e5
-705 2 10 24 0.32768000000000000000e5
-705 3 8 13 -0.32768000000000000000e5
-705 3 10 23 0.32768000000000000000e5
-705 3 11 24 0.32768000000000000000e5
-706 1 12 45 0.32768000000000000000e5
-706 1 13 44 -0.32768000000000000000e5
-707 1 4 19 0.16384000000000000000e5
-707 1 12 46 0.32768000000000000000e5
-707 1 13 44 -0.16384000000000000000e5
-707 1 20 27 -0.32768000000000000000e5
-707 3 8 13 -0.16384000000000000000e5
-707 3 10 23 0.16384000000000000000e5
-707 3 11 24 0.16384000000000000000e5
-707 4 10 14 0.16384000000000000000e5
-708 1 5 52 -0.32768000000000000000e5
-708 1 11 42 0.32768000000000000000e5
-708 1 12 43 0.65536000000000000000e5
-708 1 12 47 0.32768000000000000000e5
-708 1 16 47 -0.65536000000000000000e5
-708 1 28 43 -0.32768000000000000000e5
-708 2 10 32 0.32768000000000000000e5
-708 2 12 26 -0.32768000000000000000e5
-708 3 2 31 -0.32768000000000000000e5
-708 3 14 27 -0.65536000000000000000e5
-708 4 7 19 0.32768000000000000000e5
-709 1 11 42 -0.32768000000000000000e5
-709 1 12 43 -0.65536000000000000000e5
-709 1 12 48 0.32768000000000000000e5
-709 1 17 48 0.65536000000000000000e5
-709 2 8 22 -0.32768000000000000000e5
-709 2 12 26 0.32768000000000000000e5
-709 3 2 31 0.32768000000000000000e5
-709 3 14 27 0.65536000000000000000e5
-709 4 4 16 0.32768000000000000000e5
-710 1 5 52 0.32768000000000000000e5
-710 1 12 49 0.32768000000000000000e5
-710 1 17 48 -0.65536000000000000000e5
-710 1 28 43 0.32768000000000000000e5
-710 2 8 22 0.32768000000000000000e5
-710 4 4 16 -0.32768000000000000000e5
-710 4 7 19 -0.32768000000000000000e5
-711 1 12 50 0.32768000000000000000e5
-711 1 16 47 -0.32768000000000000000e5
-712 1 5 52 0.16384000000000000000e5
-712 1 11 42 -0.16384000000000000000e5
-712 1 12 43 -0.32768000000000000000e5
-712 1 12 51 0.32768000000000000000e5
-712 2 12 26 0.16384000000000000000e5
-712 2 20 34 -0.16384000000000000000e5
-712 3 2 31 0.16384000000000000000e5
-712 3 14 27 0.32768000000000000000e5
-712 4 7 19 -0.16384000000000000000e5
-712 4 8 20 -0.16384000000000000000e5
-713 1 12 52 0.32768000000000000000e5
-713 1 34 41 -0.32768000000000000000e5
-714 1 12 53 0.32768000000000000000e5
-714 1 37 44 -0.32768000000000000000e5
-715 1 12 54 0.32768000000000000000e5
-715 1 32 47 -0.32768000000000000000e5
-716 1 12 55 0.32768000000000000000e5
-716 1 28 43 -0.16384000000000000000e5
-716 1 32 47 -0.16384000000000000000e5
-716 1 37 44 -0.16384000000000000000e5
-716 2 20 34 -0.16384000000000000000e5
-716 3 18 31 0.16384000000000000000e5
-717 1 12 56 0.32768000000000000000e5
-717 1 37 52 -0.32768000000000000000e5
-718 1 4 19 0.16384000000000000000e5
-718 1 13 13 0.32768000000000000000e5
-718 1 20 27 -0.32768000000000000000e5
-718 1 28 35 0.16384000000000000000e5
-718 2 10 24 0.16384000000000000000e5
-718 3 2 15 -0.16384000000000000000e5
-718 3 8 13 -0.16384000000000000000e5
-718 3 11 24 0.16384000000000000000e5
-719 1 4 19 -0.32768000000000000000e5
-719 1 13 14 0.32768000000000000000e5
-720 1 10 17 -0.32768000000000000000e5
-720 1 13 15 0.32768000000000000000e5
-721 1 10 17 -0.16384000000000000000e5
-721 1 13 17 0.32768000000000000000e5
-721 1 20 27 -0.32768000000000000000e5
-721 1 28 35 0.16384000000000000000e5
-721 3 2 15 -0.16384000000000000000e5
-721 3 8 13 -0.16384000000000000000e5
-721 3 11 24 0.16384000000000000000e5
-721 4 6 10 -0.16384000000000000000e5
-722 1 4 19 -0.16384000000000000000e5
-722 1 5 20 -0.16384000000000000000e5
-722 1 10 17 -0.16384000000000000000e5
-722 1 13 18 0.32768000000000000000e5
-722 2 8 14 -0.16384000000000000000e5
-723 1 4 19 -0.81920000000000000000e4
-723 1 5 20 -0.81920000000000000000e4
-723 1 10 17 -0.16384000000000000000e5
-723 1 13 16 -0.16384000000000000000e5
-723 1 13 19 0.32768000000000000000e5
-723 1 20 27 -0.16384000000000000000e5
-723 1 28 35 0.81920000000000000000e4
-723 2 8 14 -0.81920000000000000000e4
-723 2 11 13 -0.16384000000000000000e5
-723 3 2 15 -0.81920000000000000000e4
-723 3 8 13 -0.81920000000000000000e4
-723 3 11 24 0.81920000000000000000e4
-723 4 6 10 -0.81920000000000000000e4
-724 1 10 21 -0.16384000000000000000e5
-724 1 13 20 -0.16384000000000000000e5
-724 1 13 21 0.32768000000000000000e5
-724 1 17 32 0.16384000000000000000e5
-724 1 18 33 0.81920000000000000000e4
-724 1 19 34 -0.32768000000000000000e5
-724 1 20 27 0.81920000000000000000e4
-724 1 29 36 0.16384000000000000000e5
-724 2 11 25 0.81920000000000000000e4
-724 2 14 24 0.81920000000000000000e4
-724 3 10 15 -0.16384000000000000000e5
-724 3 12 25 0.16384000000000000000e5
-724 4 10 10 -0.32768000000000000000e5
-725 1 1 32 -0.32768000000000000000e5
-725 1 13 22 0.32768000000000000000e5
-726 1 2 33 0.32768000000000000000e5
-726 1 3 34 -0.65536000000000000000e5
-726 1 10 41 0.32768000000000000000e5
-726 1 13 23 0.32768000000000000000e5
-726 2 7 21 0.32768000000000000000e5
-726 3 8 21 0.32768000000000000000e5
-727 1 2 33 -0.32768000000000000000e5
-727 1 13 24 0.32768000000000000000e5
-728 1 10 41 -0.32768000000000000000e5
-728 1 13 25 0.32768000000000000000e5
-728 3 8 21 -0.32768000000000000000e5
-729 1 4 35 -0.65536000000000000000e5
-729 1 10 41 0.32768000000000000000e5
-729 1 11 42 0.32768000000000000000e5
-729 1 13 26 0.32768000000000000000e5
-729 2 8 22 0.32768000000000000000e5
-729 3 8 21 0.32768000000000000000e5
-729 3 9 22 0.32768000000000000000e5
-730 1 2 17 -0.32768000000000000000e5
-730 1 13 27 0.32768000000000000000e5
-730 3 1 14 0.32768000000000000000e5
-731 1 3 34 -0.32768000000000000000e5
-731 1 13 28 0.32768000000000000000e5
-732 1 4 35 0.32768000000000000000e5
-732 1 13 29 0.32768000000000000000e5
-732 1 18 25 0.32768000000000000000e5
-732 1 28 35 -0.65536000000000000000e5
-732 2 9 23 0.32768000000000000000e5
-732 3 11 24 -0.65536000000000000000e5
-733 1 4 35 -0.32768000000000000000e5
-733 1 13 30 0.32768000000000000000e5
-734 1 4 19 0.32768000000000000000e5
-734 1 13 31 0.32768000000000000000e5
-734 1 20 27 -0.65536000000000000000e5
-734 1 28 35 0.32768000000000000000e5
-734 2 10 24 0.32768000000000000000e5
-734 3 8 13 -0.32768000000000000000e5
-734 3 11 24 0.32768000000000000000e5
-735 1 4 19 -0.32768000000000000000e5
-735 1 13 32 0.32768000000000000000e5
-735 3 8 13 0.32768000000000000000e5
-736 1 13 33 0.32768000000000000000e5
-736 1 28 35 -0.32768000000000000000e5
-736 3 11 24 -0.32768000000000000000e5
-737 1 13 34 0.32768000000000000000e5
-737 1 20 27 -0.32768000000000000000e5
-738 1 13 35 0.32768000000000000000e5
-738 1 17 32 -0.32768000000000000000e5
-739 1 13 36 0.32768000000000000000e5
-739 1 17 32 -0.16384000000000000000e5
-739 1 20 27 -0.16384000000000000000e5
-739 1 29 36 -0.16384000000000000000e5
-739 2 11 25 -0.16384000000000000000e5
-739 3 12 25 -0.16384000000000000000e5
-740 1 2 33 0.32768000000000000000e5
-740 1 3 34 -0.65536000000000000000e5
-740 1 10 41 0.32768000000000000000e5
-740 1 13 37 0.32768000000000000000e5
-740 2 7 21 0.32768000000000000000e5
-740 3 7 20 0.32768000000000000000e5
-740 3 8 21 0.32768000000000000000e5
-741 1 11 42 -0.32768000000000000000e5
-741 1 12 43 -0.65536000000000000000e5
-741 1 13 38 0.32768000000000000000e5
-741 1 17 48 0.65536000000000000000e5
-741 2 8 22 -0.32768000000000000000e5
-741 2 12 26 0.32768000000000000000e5
-741 3 14 27 0.65536000000000000000e5
-741 4 4 16 0.32768000000000000000e5
-742 1 10 41 -0.32768000000000000000e5
-742 1 13 39 0.32768000000000000000e5
-743 1 10 41 0.32768000000000000000e5
-743 1 11 42 0.32768000000000000000e5
-743 1 13 40 0.32768000000000000000e5
-743 1 17 48 -0.65536000000000000000e5
-743 2 8 22 0.32768000000000000000e5
-743 3 14 27 -0.65536000000000000000e5
-743 4 4 16 -0.32768000000000000000e5
-744 1 13 41 0.32768000000000000000e5
-744 1 16 47 -0.32768000000000000000e5
-744 3 13 26 -0.32768000000000000000e5
-745 1 12 43 -0.32768000000000000000e5
-745 1 13 42 0.32768000000000000000e5
-746 1 13 43 0.32768000000000000000e5
-746 1 17 48 -0.32768000000000000000e5
-746 3 14 27 -0.32768000000000000000e5
-747 1 13 45 0.32768000000000000000e5
-747 1 28 35 -0.32768000000000000000e5
-748 1 13 46 0.32768000000000000000e5
-748 1 19 42 -0.32768000000000000000e5
-749 1 11 42 -0.32768000000000000000e5
-749 1 12 43 -0.65536000000000000000e5
-749 1 13 47 0.32768000000000000000e5
-749 1 17 48 0.65536000000000000000e5
-749 2 8 22 -0.32768000000000000000e5
-749 2 12 26 0.32768000000000000000e5
-749 3 2 31 0.32768000000000000000e5
-749 3 14 27 0.65536000000000000000e5
-749 4 4 16 0.32768000000000000000e5
-750 1 5 52 0.32768000000000000000e5
-750 1 13 48 0.32768000000000000000e5
-750 1 17 48 -0.65536000000000000000e5
-750 1 28 43 0.32768000000000000000e5
-750 2 8 22 0.32768000000000000000e5
-750 4 4 16 -0.32768000000000000000e5
-750 4 7 19 -0.32768000000000000000e5
-751 1 13 49 0.32768000000000000000e5
-751 1 28 43 -0.32768000000000000000e5
-752 1 5 52 0.16384000000000000000e5
-752 1 11 42 -0.16384000000000000000e5
-752 1 12 43 -0.32768000000000000000e5
-752 1 13 50 0.32768000000000000000e5
-752 2 12 26 0.16384000000000000000e5
-752 2 20 34 -0.16384000000000000000e5
-752 3 2 31 0.16384000000000000000e5
-752 3 14 27 0.32768000000000000000e5
-752 4 7 19 -0.16384000000000000000e5
-752 4 8 20 -0.16384000000000000000e5
-753 1 13 51 0.32768000000000000000e5
-753 1 17 48 -0.32768000000000000000e5
-754 1 13 53 0.32768000000000000000e5
-754 1 32 47 -0.32768000000000000000e5
-755 1 13 54 0.32768000000000000000e5
-755 1 28 43 -0.32768000000000000000e5
-755 3 18 31 0.32768000000000000000e5
-756 1 13 55 0.32768000000000000000e5
-756 1 17 48 -0.32768000000000000000e5
-756 3 24 29 0.32768000000000000000e5
-757 1 13 56 0.32768000000000000000e5
-757 1 28 43 -0.32768000000000000000e5
-757 3 18 31 0.32768000000000000000e5
-757 3 21 34 0.32768000000000000000e5
-758 1 10 17 -0.16384000000000000000e5
-758 1 14 14 0.32768000000000000000e5
-759 1 5 20 -0.32768000000000000000e5
-759 1 14 15 0.32768000000000000000e5
-760 1 10 17 -0.16384000000000000000e5
-760 1 14 16 0.32768000000000000000e5
-760 1 20 27 -0.32768000000000000000e5
-760 1 28 35 0.16384000000000000000e5
-760 3 2 15 -0.16384000000000000000e5
-760 3 8 13 -0.16384000000000000000e5
-760 3 11 24 0.16384000000000000000e5
-760 4 6 10 -0.16384000000000000000e5
-761 1 4 19 -0.16384000000000000000e5
-761 1 5 20 -0.16384000000000000000e5
-761 1 10 17 -0.16384000000000000000e5
-761 1 14 17 0.32768000000000000000e5
-761 2 8 14 -0.16384000000000000000e5
-762 1 4 19 0.16384000000000000000e5
-762 1 5 20 0.16384000000000000000e5
-762 1 6 21 0.32768000000000000000e5
-762 1 10 17 0.16384000000000000000e5
-762 1 10 21 -0.65536000000000000000e5
-762 1 14 18 0.32768000000000000000e5
-762 2 8 14 0.16384000000000000000e5
-762 2 9 15 0.32768000000000000000e5
-763 1 13 20 -0.32768000000000000000e5
-763 1 14 19 0.32768000000000000000e5
-764 1 10 21 -0.32768000000000000000e5
-764 1 14 20 0.32768000000000000000e5
-765 1 2 33 0.32768000000000000000e5
-765 1 3 34 -0.65536000000000000000e5
-765 1 10 41 0.32768000000000000000e5
-765 1 14 22 0.32768000000000000000e5
-765 2 7 21 0.32768000000000000000e5
-765 3 8 21 0.32768000000000000000e5
-766 1 2 33 -0.32768000000000000000e5
-766 1 14 23 0.32768000000000000000e5
-767 1 10 41 -0.32768000000000000000e5
-767 1 14 24 0.32768000000000000000e5
-767 3 8 21 -0.32768000000000000000e5
-768 1 4 35 -0.65536000000000000000e5
-768 1 10 41 0.32768000000000000000e5
-768 1 11 42 0.32768000000000000000e5
-768 1 14 25 0.32768000000000000000e5
-768 2 8 22 0.32768000000000000000e5
-768 3 8 21 0.32768000000000000000e5
-768 3 9 22 0.32768000000000000000e5
-769 1 11 42 -0.32768000000000000000e5
-769 1 14 26 0.32768000000000000000e5
-769 3 9 22 -0.32768000000000000000e5
-770 1 3 34 -0.32768000000000000000e5
-770 1 14 27 0.32768000000000000000e5
-771 1 4 35 0.32768000000000000000e5
-771 1 14 28 0.32768000000000000000e5
-771 1 18 25 0.32768000000000000000e5
-771 1 28 35 -0.65536000000000000000e5
-771 2 9 23 0.32768000000000000000e5
-771 3 11 24 -0.65536000000000000000e5
-772 1 4 35 -0.32768000000000000000e5
-772 1 14 29 0.32768000000000000000e5
-773 1 14 30 0.32768000000000000000e5
-773 1 18 25 -0.32768000000000000000e5
-774 1 4 19 -0.32768000000000000000e5
-774 1 14 31 0.32768000000000000000e5
-774 3 8 13 0.32768000000000000000e5
-775 1 14 32 0.32768000000000000000e5
-775 1 28 35 -0.32768000000000000000e5
-775 3 11 24 -0.32768000000000000000e5
-776 1 5 36 -0.32768000000000000000e5
-776 1 14 33 0.32768000000000000000e5
-777 1 14 34 0.32768000000000000000e5
-777 1 17 32 -0.32768000000000000000e5
-778 1 14 35 0.32768000000000000000e5
-778 1 29 36 -0.32768000000000000000e5
-778 3 12 25 -0.32768000000000000000e5
-779 1 14 36 0.32768000000000000000e5
-779 1 17 32 -0.16384000000000000000e5
-779 1 18 33 -0.16384000000000000000e5
-779 1 29 36 -0.16384000000000000000e5
-779 2 14 24 -0.16384000000000000000e5
-779 3 12 25 -0.16384000000000000000e5
-780 1 11 42 -0.32768000000000000000e5
-780 1 12 43 -0.65536000000000000000e5
-780 1 14 37 0.32768000000000000000e5
-780 1 17 48 0.65536000000000000000e5
-780 2 8 22 -0.32768000000000000000e5
-780 2 12 26 0.32768000000000000000e5
-780 3 14 27 0.65536000000000000000e5
-780 4 4 16 0.32768000000000000000e5
-781 1 10 41 -0.32768000000000000000e5
-781 1 14 38 0.32768000000000000000e5
-782 1 10 41 0.32768000000000000000e5
-782 1 11 42 0.32768000000000000000e5
-782 1 14 39 0.32768000000000000000e5
-782 1 17 48 -0.65536000000000000000e5
-782 2 8 22 0.32768000000000000000e5
-782 3 14 27 -0.65536000000000000000e5
-782 4 4 16 -0.32768000000000000000e5
-783 1 11 42 -0.32768000000000000000e5
-783 1 14 40 0.32768000000000000000e5
-784 1 12 43 -0.32768000000000000000e5
-784 1 14 41 0.32768000000000000000e5
-785 1 14 42 0.32768000000000000000e5
-785 1 17 48 -0.32768000000000000000e5
-785 3 14 27 -0.32768000000000000000e5
-786 1 14 43 0.32768000000000000000e5
-786 1 18 25 -0.32768000000000000000e5
-786 3 14 19 0.32768000000000000000e5
-787 1 14 44 0.32768000000000000000e5
-787 1 28 35 -0.32768000000000000000e5
-788 1 14 46 0.32768000000000000000e5
-788 1 29 36 -0.32768000000000000000e5
-789 1 5 52 0.32768000000000000000e5
-789 1 14 47 0.32768000000000000000e5
-789 1 17 48 -0.65536000000000000000e5
-789 1 28 43 0.32768000000000000000e5
-789 2 8 22 0.32768000000000000000e5
-789 4 4 16 -0.32768000000000000000e5
-789 4 7 19 -0.32768000000000000000e5
-790 1 14 48 0.32768000000000000000e5
-790 1 28 43 -0.32768000000000000000e5
-791 1 5 52 -0.32768000000000000000e5
-791 1 14 49 0.32768000000000000000e5
-792 1 14 50 0.32768000000000000000e5
-792 1 17 48 -0.32768000000000000000e5
-793 1 14 45 -0.65536000000000000000e5
-793 1 14 51 0.32768000000000000000e5
-793 1 17 48 0.32768000000000000000e5
-793 1 18 49 0.32768000000000000000e5
-793 2 24 30 0.32768000000000000000e5
-793 3 15 28 0.65536000000000000000e5
-794 1 14 45 -0.32768000000000000000e5
-794 1 14 52 0.32768000000000000000e5
-794 3 15 28 0.32768000000000000000e5
-795 1 14 53 0.32768000000000000000e5
-795 1 28 43 -0.32768000000000000000e5
-795 3 18 31 0.32768000000000000000e5
-796 1 14 54 0.32768000000000000000e5
-796 1 33 48 -0.32768000000000000000e5
-797 1 14 55 0.32768000000000000000e5
-797 1 34 49 -0.32768000000000000000e5
-798 1 14 56 0.32768000000000000000e5
-798 1 43 50 -0.32768000000000000000e5
-799 1 11 18 -0.16384000000000000000e5
-799 1 15 15 0.32768000000000000000e5
-800 1 4 19 -0.16384000000000000000e5
-800 1 5 20 -0.16384000000000000000e5
-800 1 10 17 -0.16384000000000000000e5
-800 1 15 16 0.32768000000000000000e5
-800 2 8 14 -0.16384000000000000000e5
-801 1 4 19 0.16384000000000000000e5
-801 1 5 20 0.16384000000000000000e5
-801 1 6 21 0.32768000000000000000e5
-801 1 10 17 0.16384000000000000000e5
-801 1 10 21 -0.65536000000000000000e5
-801 1 15 17 0.32768000000000000000e5
-801 2 8 14 0.16384000000000000000e5
-801 2 9 15 0.32768000000000000000e5
-802 1 6 21 -0.32768000000000000000e5
-802 1 15 18 0.32768000000000000000e5
-803 1 10 21 -0.32768000000000000000e5
-803 1 15 19 0.32768000000000000000e5
-804 1 10 21 0.32768000000000000000e5
-804 1 13 20 0.32768000000000000000e5
-804 1 14 21 -0.65536000000000000000e5
-804 1 15 20 0.32768000000000000000e5
-804 2 14 14 0.65536000000000000000e5
-805 1 10 21 0.16384000000000000000e5
-805 1 13 20 0.16384000000000000000e5
-805 1 14 21 0.32768000000000000000e5
-805 1 15 21 0.32768000000000000000e5
-805 1 17 32 -0.16384000000000000000e5
-805 1 18 33 -0.81920000000000000000e4
-805 1 19 20 -0.65536000000000000000e5
-805 1 19 34 0.32768000000000000000e5
-805 1 20 27 -0.81920000000000000000e4
-805 1 29 36 -0.16384000000000000000e5
-805 2 11 25 -0.81920000000000000000e4
-805 2 14 15 0.32768000000000000000e5
-805 2 14 24 -0.81920000000000000000e4
-805 3 10 15 0.16384000000000000000e5
-805 3 12 25 -0.16384000000000000000e5
-805 4 10 10 0.32768000000000000000e5
-806 1 2 33 -0.32768000000000000000e5
-806 1 15 22 0.32768000000000000000e5
-807 1 10 41 -0.32768000000000000000e5
-807 1 15 23 0.32768000000000000000e5
-807 3 8 21 -0.32768000000000000000e5
-808 1 4 35 -0.65536000000000000000e5
-808 1 10 41 0.32768000000000000000e5
-808 1 11 42 0.32768000000000000000e5
-808 1 15 24 0.32768000000000000000e5
-808 2 8 22 0.32768000000000000000e5
-808 3 8 21 0.32768000000000000000e5
-808 3 9 22 0.32768000000000000000e5
-809 1 11 42 -0.32768000000000000000e5
-809 1 15 25 0.32768000000000000000e5
-809 3 9 22 -0.32768000000000000000e5
-810 1 11 30 -0.32768000000000000000e5
-810 1 15 26 0.32768000000000000000e5
-811 1 4 35 0.32768000000000000000e5
-811 1 15 27 0.32768000000000000000e5
-811 1 18 25 0.32768000000000000000e5
-811 1 28 35 -0.65536000000000000000e5
-811 2 9 23 0.32768000000000000000e5
-811 3 11 24 -0.65536000000000000000e5
-812 1 4 35 -0.32768000000000000000e5
-812 1 15 28 0.32768000000000000000e5
-813 1 15 29 0.32768000000000000000e5
-813 1 18 25 -0.32768000000000000000e5
-814 1 15 31 0.32768000000000000000e5
-814 1 28 35 -0.32768000000000000000e5
-814 3 11 24 -0.32768000000000000000e5
-815 1 5 36 -0.32768000000000000000e5
-815 1 15 32 0.32768000000000000000e5
-816 1 5 36 0.32768000000000000000e5
-816 1 15 33 0.32768000000000000000e5
-816 1 28 35 0.32768000000000000000e5
-816 1 29 36 -0.65536000000000000000e5
-816 2 9 25 0.32768000000000000000e5
-816 3 11 24 0.32768000000000000000e5
-816 3 12 25 -0.65536000000000000000e5
-817 1 15 34 0.32768000000000000000e5
-817 1 29 36 -0.32768000000000000000e5
-817 3 12 25 -0.32768000000000000000e5
-818 1 15 35 0.32768000000000000000e5
-818 1 18 33 -0.32768000000000000000e5
-819 1 15 36 0.32768000000000000000e5
-819 1 18 35 -0.32768000000000000000e5
-820 1 10 41 -0.32768000000000000000e5
-820 1 15 37 0.32768000000000000000e5
-821 1 10 41 0.32768000000000000000e5
-821 1 11 42 0.32768000000000000000e5
-821 1 15 38 0.32768000000000000000e5
-821 1 17 48 -0.65536000000000000000e5
-821 2 8 22 0.32768000000000000000e5
-821 3 14 27 -0.65536000000000000000e5
-821 4 4 16 -0.32768000000000000000e5
-822 1 11 42 -0.32768000000000000000e5
-822 1 15 39 0.32768000000000000000e5
-823 1 15 40 0.32768000000000000000e5
-823 1 26 33 -0.32768000000000000000e5
-824 1 15 41 0.32768000000000000000e5
-824 1 17 48 -0.32768000000000000000e5
-824 3 14 27 -0.32768000000000000000e5
-825 1 15 42 0.32768000000000000000e5
-825 1 18 25 -0.32768000000000000000e5
-825 3 14 19 0.32768000000000000000e5
-826 1 14 45 -0.65536000000000000000e5
-826 1 15 43 0.32768000000000000000e5
-826 1 17 48 0.32768000000000000000e5
-826 1 18 25 0.32768000000000000000e5
-826 2 14 28 0.32768000000000000000e5
-826 3 14 19 -0.32768000000000000000e5
-826 3 14 27 0.32768000000000000000e5
-827 1 14 45 -0.32768000000000000000e5
-827 1 15 44 0.32768000000000000000e5
-828 1 11 46 -0.32768000000000000000e5
-828 1 15 45 0.32768000000000000000e5
-829 1 15 47 0.32768000000000000000e5
-829 1 28 43 -0.32768000000000000000e5
-830 1 5 52 -0.32768000000000000000e5
-830 1 15 48 0.32768000000000000000e5
-831 1 15 49 0.32768000000000000000e5
-831 1 33 40 -0.32768000000000000000e5
-832 1 14 45 -0.65536000000000000000e5
-832 1 15 50 0.32768000000000000000e5
-832 1 17 48 0.32768000000000000000e5
-832 1 18 49 0.32768000000000000000e5
-832 2 24 30 0.32768000000000000000e5
-832 3 15 28 0.65536000000000000000e5
-833 1 15 51 0.32768000000000000000e5
-833 1 18 49 -0.32768000000000000000e5
-834 1 13 52 0.32768000000000000000e5
-834 1 14 45 0.32768000000000000000e5
-834 1 15 52 0.32768000000000000000e5
-834 1 29 36 -0.65536000000000000000e5
-834 2 15 33 0.32768000000000000000e5
-834 3 15 28 -0.32768000000000000000e5
-834 3 24 25 0.65536000000000000000e5
-835 1 15 53 0.32768000000000000000e5
-835 1 33 48 -0.32768000000000000000e5
-836 1 15 55 0.32768000000000000000e5
-836 1 17 48 0.32768000000000000000e5
-836 1 34 49 0.32768000000000000000e5
-836 1 35 50 -0.65536000000000000000e5
-836 2 24 34 0.32768000000000000000e5
-836 3 24 29 -0.32768000000000000000e5
-837 1 15 56 0.32768000000000000000e5
-837 1 28 43 0.32768000000000000000e5
-837 1 43 50 0.32768000000000000000e5
-837 1 44 51 -0.65536000000000000000e5
-837 2 31 33 0.32768000000000000000e5
-837 3 18 31 -0.32768000000000000000e5
-837 3 21 34 -0.32768000000000000000e5
-838 1 12 19 -0.16384000000000000000e5
-838 1 16 16 0.32768000000000000000e5
-839 1 4 19 -0.81920000000000000000e4
-839 1 5 20 -0.81920000000000000000e4
-839 1 10 17 -0.16384000000000000000e5
-839 1 13 16 -0.16384000000000000000e5
-839 1 16 17 0.32768000000000000000e5
-839 1 20 27 -0.16384000000000000000e5
-839 1 28 35 0.81920000000000000000e4
-839 2 8 14 -0.81920000000000000000e4
-839 2 11 13 -0.16384000000000000000e5
-839 3 2 15 -0.81920000000000000000e4
-839 3 8 13 -0.81920000000000000000e4
-839 3 11 24 0.81920000000000000000e4
-839 4 6 10 -0.81920000000000000000e4
-840 1 13 20 -0.32768000000000000000e5
-840 1 16 18 0.32768000000000000000e5
-841 1 10 21 -0.16384000000000000000e5
-841 1 13 20 -0.16384000000000000000e5
-841 1 16 20 0.32768000000000000000e5
-841 1 17 32 0.16384000000000000000e5
-841 1 18 33 0.81920000000000000000e4
-841 1 19 34 -0.32768000000000000000e5
-841 1 20 27 0.81920000000000000000e4
-841 1 29 36 0.16384000000000000000e5
-841 2 11 25 0.81920000000000000000e4
-841 2 14 24 0.81920000000000000000e4
-841 3 10 15 -0.16384000000000000000e5
-841 3 12 25 0.16384000000000000000e5
-841 4 10 10 -0.32768000000000000000e5
-842 1 10 21 -0.81920000000000000000e4
-842 1 13 20 -0.81920000000000000000e4
-842 1 14 21 -0.16384000000000000000e5
-842 1 16 19 -0.16384000000000000000e5
-842 1 16 21 0.32768000000000000000e5
-842 1 17 32 0.81920000000000000000e4
-842 1 18 33 0.40960000000000000000e4
-842 1 19 34 -0.16384000000000000000e5
-842 1 20 27 0.40960000000000000000e4
-842 1 29 36 0.81920000000000000000e4
-842 2 11 25 0.40960000000000000000e4
-842 2 13 15 -0.16384000000000000000e5
-842 2 14 24 0.40960000000000000000e4
-842 3 10 15 -0.81920000000000000000e4
-842 3 12 25 0.81920000000000000000e4
-842 4 10 10 -0.16384000000000000000e5
-843 1 12 27 -0.32768000000000000000e5
-843 1 16 22 0.32768000000000000000e5
-844 1 2 17 -0.32768000000000000000e5
-844 1 16 23 0.32768000000000000000e5
-844 3 1 14 0.32768000000000000000e5
-845 1 3 34 -0.32768000000000000000e5
-845 1 16 24 0.32768000000000000000e5
-846 1 4 35 0.32768000000000000000e5
-846 1 16 25 0.32768000000000000000e5
-846 1 18 25 0.32768000000000000000e5
-846 1 28 35 -0.65536000000000000000e5
-846 2 9 23 0.32768000000000000000e5
-846 3 11 24 -0.65536000000000000000e5
-847 1 4 35 -0.32768000000000000000e5
-847 1 16 26 0.32768000000000000000e5
-848 1 16 27 0.32768000000000000000e5
-848 1 16 31 -0.65536000000000000000e5
-848 1 20 27 0.65536000000000000000e5
-848 1 28 35 -0.32768000000000000000e5
-848 2 7 13 0.32768000000000000000e5
-848 2 10 24 -0.32768000000000000000e5
-848 3 11 24 -0.32768000000000000000e5
-848 4 8 8 -0.65536000000000000000e5
-849 1 4 19 0.32768000000000000000e5
-849 1 16 28 0.32768000000000000000e5
-849 1 20 27 -0.65536000000000000000e5
-849 1 28 35 0.32768000000000000000e5
-849 2 10 24 0.32768000000000000000e5
-849 3 8 13 -0.32768000000000000000e5
-849 3 11 24 0.32768000000000000000e5
-850 1 4 19 -0.32768000000000000000e5
-850 1 16 29 0.32768000000000000000e5
-850 3 8 13 0.32768000000000000000e5
-851 1 16 30 0.32768000000000000000e5
-851 1 28 35 -0.32768000000000000000e5
-851 3 11 24 -0.32768000000000000000e5
-852 1 16 32 0.32768000000000000000e5
-852 1 20 27 -0.32768000000000000000e5
-853 1 16 33 0.32768000000000000000e5
-853 1 17 32 -0.32768000000000000000e5
-854 1 4 19 -0.81920000000000000000e4
-854 1 5 20 -0.81920000000000000000e4
-854 1 10 17 -0.16384000000000000000e5
-854 1 13 16 -0.16384000000000000000e5
-854 1 16 34 0.32768000000000000000e5
-854 1 20 27 -0.16384000000000000000e5
-854 1 28 35 0.81920000000000000000e4
-854 2 8 14 -0.81920000000000000000e4
-854 2 11 13 -0.16384000000000000000e5
-854 3 2 15 -0.81920000000000000000e4
-854 3 8 13 -0.81920000000000000000e4
-854 3 10 15 0.32768000000000000000e5
-854 3 11 24 0.81920000000000000000e4
-854 4 6 10 -0.81920000000000000000e4
-855 1 16 35 0.32768000000000000000e5
-855 1 17 32 -0.16384000000000000000e5
-855 1 20 27 -0.16384000000000000000e5
-855 1 29 36 -0.16384000000000000000e5
-855 2 11 25 -0.16384000000000000000e5
-855 3 12 25 -0.16384000000000000000e5
-856 1 16 36 0.32768000000000000000e5
-856 1 19 34 -0.32768000000000000000e5
-857 1 2 17 -0.32768000000000000000e5
-857 1 16 37 0.32768000000000000000e5
-857 3 1 14 0.32768000000000000000e5
-857 3 6 23 0.32768000000000000000e5
-858 1 16 38 0.32768000000000000000e5
-858 1 16 47 -0.32768000000000000000e5
-858 3 13 26 -0.32768000000000000000e5
-859 1 12 43 -0.32768000000000000000e5
-859 1 16 39 0.32768000000000000000e5
-860 1 16 40 0.32768000000000000000e5
-860 1 17 48 -0.32768000000000000000e5
-860 3 14 27 -0.32768000000000000000e5
-861 1 4 19 0.32768000000000000000e5
-861 1 16 41 0.32768000000000000000e5
-861 1 20 27 -0.65536000000000000000e5
-861 1 28 35 0.32768000000000000000e5
-861 2 10 24 0.32768000000000000000e5
-861 3 8 13 -0.32768000000000000000e5
-861 3 10 23 0.32768000000000000000e5
-861 3 11 24 0.32768000000000000000e5
-862 1 13 44 -0.32768000000000000000e5
-862 1 16 42 0.32768000000000000000e5
-863 1 16 43 0.32768000000000000000e5
-863 1 28 35 -0.32768000000000000000e5
-864 1 4 19 0.16384000000000000000e5
-864 1 13 44 -0.16384000000000000000e5
-864 1 16 44 0.32768000000000000000e5
-864 1 20 27 -0.32768000000000000000e5
-864 3 8 13 -0.16384000000000000000e5
-864 3 10 23 0.16384000000000000000e5
-864 3 11 24 0.16384000000000000000e5
-864 4 10 14 0.16384000000000000000e5
-865 1 16 45 0.32768000000000000000e5
-865 1 19 42 -0.32768000000000000000e5
-866 1 4 19 0.81920000000000000000e4
-866 1 13 44 -0.81920000000000000000e4
-866 1 16 46 0.32768000000000000000e5
-866 1 19 42 -0.16384000000000000000e5
-866 1 20 27 -0.16384000000000000000e5
-866 1 29 36 -0.16384000000000000000e5
-866 2 15 29 -0.16384000000000000000e5
-866 3 8 13 -0.81920000000000000000e4
-866 3 10 23 0.81920000000000000000e4
-866 3 11 24 0.81920000000000000000e4
-866 4 10 14 0.81920000000000000000e4
-867 1 5 52 0.16384000000000000000e5
-867 1 11 42 -0.16384000000000000000e5
-867 1 12 43 -0.32768000000000000000e5
-867 1 16 48 0.32768000000000000000e5
-867 2 12 26 0.16384000000000000000e5
-867 2 20 34 -0.16384000000000000000e5
-867 3 2 31 0.16384000000000000000e5
-867 3 14 27 0.32768000000000000000e5
-867 4 7 19 -0.16384000000000000000e5
-867 4 8 20 -0.16384000000000000000e5
-868 1 16 49 0.32768000000000000000e5
-868 1 17 48 -0.32768000000000000000e5
-869 1 16 50 0.32768000000000000000e5
-869 1 34 41 -0.32768000000000000000e5
-870 1 13 52 -0.32768000000000000000e5
-870 1 16 51 0.32768000000000000000e5
-871 1 16 52 0.32768000000000000000e5
-871 1 19 50 -0.32768000000000000000e5
-872 1 16 53 0.32768000000000000000e5
-872 1 28 43 -0.16384000000000000000e5
-872 1 32 47 -0.16384000000000000000e5
-872 1 37 44 -0.16384000000000000000e5
-872 2 20 34 -0.16384000000000000000e5
-872 3 18 31 0.16384000000000000000e5
-873 1 16 54 0.32768000000000000000e5
-873 1 17 48 -0.32768000000000000000e5
-873 3 24 29 0.32768000000000000000e5
-874 1 16 56 0.32768000000000000000e5
-874 1 17 48 -0.32768000000000000000e5
-874 1 32 47 0.16384000000000000000e5
-874 1 33 48 0.16384000000000000000e5
-874 1 37 52 -0.16384000000000000000e5
-874 1 43 50 -0.16384000000000000000e5
-874 3 21 34 0.16384000000000000000e5
-874 3 24 29 0.32768000000000000000e5
-874 4 16 20 0.16384000000000000000e5
-875 1 13 20 -0.16384000000000000000e5
-875 1 17 17 0.32768000000000000000e5
-876 1 10 21 -0.32768000000000000000e5
-876 1 17 18 0.32768000000000000000e5
-877 1 10 21 -0.16384000000000000000e5
-877 1 13 20 -0.16384000000000000000e5
-877 1 17 19 0.32768000000000000000e5
-877 1 17 32 0.16384000000000000000e5
-877 1 18 33 0.81920000000000000000e4
-877 1 19 34 -0.32768000000000000000e5
-877 1 20 27 0.81920000000000000000e4
-877 1 29 36 0.16384000000000000000e5
-877 2 11 25 0.81920000000000000000e4
-877 2 14 24 0.81920000000000000000e4
-877 3 10 15 -0.16384000000000000000e5
-877 3 12 25 0.16384000000000000000e5
-877 4 10 10 -0.32768000000000000000e5
-878 1 14 21 -0.32768000000000000000e5
-878 1 17 20 0.32768000000000000000e5
-879 1 17 21 0.32768000000000000000e5
-879 1 19 20 -0.32768000000000000000e5
-880 1 2 17 -0.32768000000000000000e5
-880 1 17 22 0.32768000000000000000e5
-880 3 1 14 0.32768000000000000000e5
-881 1 3 34 -0.32768000000000000000e5
-881 1 17 23 0.32768000000000000000e5
-882 1 4 35 0.32768000000000000000e5
-882 1 17 24 0.32768000000000000000e5
-882 1 18 25 0.32768000000000000000e5
-882 1 28 35 -0.65536000000000000000e5
-882 2 9 23 0.32768000000000000000e5
-882 3 11 24 -0.65536000000000000000e5
-883 1 4 35 -0.32768000000000000000e5
-883 1 17 25 0.32768000000000000000e5
-884 1 17 26 0.32768000000000000000e5
-884 1 18 25 -0.32768000000000000000e5
-885 1 4 19 0.32768000000000000000e5
-885 1 17 27 0.32768000000000000000e5
-885 1 20 27 -0.65536000000000000000e5
-885 1 28 35 0.32768000000000000000e5
-885 2 10 24 0.32768000000000000000e5
-885 3 8 13 -0.32768000000000000000e5
-885 3 11 24 0.32768000000000000000e5
-886 1 4 19 -0.32768000000000000000e5
-886 1 17 28 0.32768000000000000000e5
-886 3 8 13 0.32768000000000000000e5
-887 1 17 29 0.32768000000000000000e5
-887 1 28 35 -0.32768000000000000000e5
-887 3 11 24 -0.32768000000000000000e5
-888 1 5 36 -0.32768000000000000000e5
-888 1 17 30 0.32768000000000000000e5
-889 1 17 31 0.32768000000000000000e5
-889 1 20 27 -0.32768000000000000000e5
-890 1 17 33 0.32768000000000000000e5
-890 1 29 36 -0.32768000000000000000e5
-890 3 12 25 -0.32768000000000000000e5
-891 1 17 32 -0.16384000000000000000e5
-891 1 17 34 0.32768000000000000000e5
-891 1 20 27 -0.16384000000000000000e5
-891 1 29 36 -0.16384000000000000000e5
-891 2 11 25 -0.16384000000000000000e5
-891 3 12 25 -0.16384000000000000000e5
-892 1 17 32 -0.16384000000000000000e5
-892 1 17 35 0.32768000000000000000e5
-892 1 18 33 -0.16384000000000000000e5
-892 1 29 36 -0.16384000000000000000e5
-892 2 14 24 -0.16384000000000000000e5
-892 3 12 25 -0.16384000000000000000e5
-893 1 14 21 -0.32768000000000000000e5
-893 1 17 36 0.32768000000000000000e5
-893 3 14 15 0.32768000000000000000e5
-894 1 16 47 -0.32768000000000000000e5
-894 1 17 37 0.32768000000000000000e5
-894 3 13 26 -0.32768000000000000000e5
-895 1 12 43 -0.32768000000000000000e5
-895 1 17 38 0.32768000000000000000e5
-896 1 17 39 0.32768000000000000000e5
-896 1 17 48 -0.32768000000000000000e5
-896 3 14 27 -0.32768000000000000000e5
-897 1 17 40 0.32768000000000000000e5
-897 1 18 25 -0.32768000000000000000e5
-897 3 14 19 0.32768000000000000000e5
-898 1 13 44 -0.32768000000000000000e5
-898 1 17 41 0.32768000000000000000e5
-899 1 17 42 0.32768000000000000000e5
-899 1 28 35 -0.32768000000000000000e5
-900 1 14 45 -0.32768000000000000000e5
-900 1 17 43 0.32768000000000000000e5
-901 1 17 44 0.32768000000000000000e5
-901 1 19 42 -0.32768000000000000000e5
-902 1 17 45 0.32768000000000000000e5
-902 1 29 36 -0.32768000000000000000e5
-903 1 17 32 -0.16384000000000000000e5
-903 1 17 46 0.32768000000000000000e5
-903 1 18 33 -0.16384000000000000000e5
-903 1 29 36 -0.16384000000000000000e5
-903 2 14 24 -0.16384000000000000000e5
-903 3 12 25 -0.16384000000000000000e5
-903 3 15 24 0.32768000000000000000e5
-904 1 5 52 0.16384000000000000000e5
-904 1 11 42 -0.16384000000000000000e5
-904 1 12 43 -0.32768000000000000000e5
-904 1 17 47 0.32768000000000000000e5
-904 2 12 26 0.16384000000000000000e5
-904 2 20 34 -0.16384000000000000000e5
-904 3 2 31 0.16384000000000000000e5
-904 3 14 27 0.32768000000000000000e5
-904 4 7 19 -0.16384000000000000000e5
-904 4 8 20 -0.16384000000000000000e5
-905 1 14 45 -0.65536000000000000000e5
-905 1 17 48 0.32768000000000000000e5
-905 1 17 49 0.32768000000000000000e5
-905 1 18 49 0.32768000000000000000e5
-905 2 24 30 0.32768000000000000000e5
-905 3 15 28 0.65536000000000000000e5
-906 1 13 52 -0.32768000000000000000e5
-906 1 17 50 0.32768000000000000000e5
-907 1 14 45 -0.32768000000000000000e5
-907 1 17 51 0.32768000000000000000e5
-907 3 15 28 0.32768000000000000000e5
-908 1 17 52 0.32768000000000000000e5
-908 1 29 36 -0.32768000000000000000e5
-908 3 24 25 0.32768000000000000000e5
-909 1 17 48 -0.32768000000000000000e5
-909 1 17 53 0.32768000000000000000e5
-909 3 24 29 0.32768000000000000000e5
-910 1 17 54 0.32768000000000000000e5
-910 1 34 49 -0.32768000000000000000e5
-911 1 17 55 0.32768000000000000000e5
-911 1 35 50 -0.32768000000000000000e5
-912 1 17 56 0.32768000000000000000e5
-912 1 44 51 -0.32768000000000000000e5
-913 1 10 21 0.16384000000000000000e5
-913 1 13 20 0.16384000000000000000e5
-913 1 14 21 -0.32768000000000000000e5
-913 1 18 18 0.32768000000000000000e5
-913 2 14 14 0.32768000000000000000e5
-914 1 14 21 -0.32768000000000000000e5
-914 1 18 19 0.32768000000000000000e5
-915 1 10 21 0.16384000000000000000e5
-915 1 13 20 0.16384000000000000000e5
-915 1 14 21 0.32768000000000000000e5
-915 1 17 32 -0.16384000000000000000e5
-915 1 18 20 0.32768000000000000000e5
-915 1 18 33 -0.81920000000000000000e4
-915 1 19 20 -0.65536000000000000000e5
-915 1 19 34 0.32768000000000000000e5
-915 1 20 27 -0.81920000000000000000e4
-915 1 29 36 -0.16384000000000000000e5
-915 2 11 25 -0.81920000000000000000e4
-915 2 14 15 0.32768000000000000000e5
-915 2 14 24 -0.81920000000000000000e4
-915 3 10 15 0.16384000000000000000e5
-915 3 12 25 -0.16384000000000000000e5
-915 4 10 10 0.32768000000000000000e5
-916 1 3 34 -0.32768000000000000000e5
-916 1 18 22 0.32768000000000000000e5
-917 1 4 35 0.32768000000000000000e5
-917 1 18 23 0.32768000000000000000e5
-917 1 18 25 0.32768000000000000000e5
-917 1 28 35 -0.65536000000000000000e5
-917 2 9 23 0.32768000000000000000e5
-917 3 11 24 -0.65536000000000000000e5
-918 1 4 35 -0.32768000000000000000e5
-918 1 18 24 0.32768000000000000000e5
-919 1 15 30 -0.32768000000000000000e5
-919 1 18 26 0.32768000000000000000e5
-920 1 4 19 -0.32768000000000000000e5
-920 1 18 27 0.32768000000000000000e5
-920 3 8 13 0.32768000000000000000e5
-921 1 18 28 0.32768000000000000000e5
-921 1 28 35 -0.32768000000000000000e5
-921 3 11 24 -0.32768000000000000000e5
-922 1 5 36 -0.32768000000000000000e5
-922 1 18 29 0.32768000000000000000e5
-923 1 5 36 0.32768000000000000000e5
-923 1 18 30 0.32768000000000000000e5
-923 1 28 35 0.32768000000000000000e5
-923 1 29 36 -0.65536000000000000000e5
-923 2 9 25 0.32768000000000000000e5
-923 3 11 24 0.32768000000000000000e5
-923 3 12 25 -0.65536000000000000000e5
-924 1 17 32 -0.32768000000000000000e5
-924 1 18 31 0.32768000000000000000e5
-925 1 18 32 0.32768000000000000000e5
-925 1 29 36 -0.32768000000000000000e5
-925 3 12 25 -0.32768000000000000000e5
-926 1 17 32 -0.16384000000000000000e5
-926 1 18 33 -0.16384000000000000000e5
-926 1 18 34 0.32768000000000000000e5
-926 1 29 36 -0.16384000000000000000e5
-926 2 14 24 -0.16384000000000000000e5
-926 3 12 25 -0.16384000000000000000e5
-927 1 18 36 0.32768000000000000000e5
-927 1 20 35 -0.32768000000000000000e5
-928 1 12 43 -0.32768000000000000000e5
-928 1 18 37 0.32768000000000000000e5
-929 1 17 48 -0.32768000000000000000e5
-929 1 18 38 0.32768000000000000000e5
-929 3 14 27 -0.32768000000000000000e5
-930 1 18 25 -0.32768000000000000000e5
-930 1 18 39 0.32768000000000000000e5
-930 3 14 19 0.32768000000000000000e5
-931 1 14 45 -0.65536000000000000000e5
-931 1 17 48 0.32768000000000000000e5
-931 1 18 25 0.32768000000000000000e5
-931 1 18 40 0.32768000000000000000e5
-931 2 14 28 0.32768000000000000000e5
-931 3 14 19 -0.32768000000000000000e5
-931 3 14 27 0.32768000000000000000e5
-932 1 18 41 0.32768000000000000000e5
-932 1 28 35 -0.32768000000000000000e5
-933 1 14 45 -0.32768000000000000000e5
-933 1 18 42 0.32768000000000000000e5
-934 1 11 46 -0.32768000000000000000e5
-934 1 18 43 0.32768000000000000000e5
-935 1 18 44 0.32768000000000000000e5
-935 1 29 36 -0.32768000000000000000e5
-936 1 15 46 -0.32768000000000000000e5
-936 1 18 45 0.32768000000000000000e5
-937 1 18 46 0.32768000000000000000e5
-937 1 33 36 -0.32768000000000000000e5
-938 1 17 48 -0.32768000000000000000e5
-938 1 18 47 0.32768000000000000000e5
-939 1 14 45 -0.65536000000000000000e5
-939 1 17 48 0.32768000000000000000e5
-939 1 18 48 0.32768000000000000000e5
-939 1 18 49 0.32768000000000000000e5
-939 2 24 30 0.32768000000000000000e5
-939 3 15 28 0.65536000000000000000e5
-940 1 14 45 -0.32768000000000000000e5
-940 1 18 50 0.32768000000000000000e5
-940 3 15 28 0.32768000000000000000e5
-941 1 13 52 0.32768000000000000000e5
-941 1 14 45 0.32768000000000000000e5
-941 1 18 51 0.32768000000000000000e5
-941 1 29 36 -0.65536000000000000000e5
-941 2 15 33 0.32768000000000000000e5
-941 3 15 28 -0.32768000000000000000e5
-941 3 24 25 0.65536000000000000000e5
-942 1 18 52 0.32768000000000000000e5
-942 1 20 51 -0.32768000000000000000e5
-943 1 18 53 0.32768000000000000000e5
-943 1 34 49 -0.32768000000000000000e5
-944 1 17 48 0.32768000000000000000e5
-944 1 18 54 0.32768000000000000000e5
-944 1 34 49 0.32768000000000000000e5
-944 1 35 50 -0.65536000000000000000e5
-944 2 24 34 0.32768000000000000000e5
-944 3 24 29 -0.32768000000000000000e5
-945 1 18 55 0.32768000000000000000e5
-945 1 43 46 -0.32768000000000000000e5
-946 1 18 56 0.32768000000000000000e5
-946 1 46 49 -0.32768000000000000000e5
-947 1 10 21 -0.40960000000000000000e4
-947 1 13 20 -0.40960000000000000000e4
-947 1 14 21 -0.81920000000000000000e4
-947 1 16 19 -0.81920000000000000000e4
-947 1 17 32 0.40960000000000000000e4
-947 1 18 33 0.20480000000000000000e4
-947 1 19 19 0.32768000000000000000e5
-947 1 19 34 -0.81920000000000000000e4
-947 1 20 27 0.20480000000000000000e4
-947 1 29 36 0.40960000000000000000e4
-947 2 11 25 0.20480000000000000000e4
-947 2 13 15 -0.81920000000000000000e4
-947 2 14 24 0.20480000000000000000e4
-947 3 10 15 -0.40960000000000000000e4
-947 3 12 25 0.40960000000000000000e4
-947 4 10 10 -0.81920000000000000000e4
-948 1 10 21 -0.40960000000000000000e4
-948 1 13 20 -0.40960000000000000000e4
-948 1 14 21 -0.81920000000000000000e4
-948 1 16 19 -0.81920000000000000000e4
-948 1 17 32 0.40960000000000000000e4
-948 1 18 21 -0.16384000000000000000e5
-948 1 18 33 0.20480000000000000000e4
-948 1 19 20 -0.16384000000000000000e5
-948 1 19 21 0.32768000000000000000e5
-948 1 19 34 -0.81920000000000000000e4
-948 1 20 27 0.20480000000000000000e4
-948 1 29 36 0.40960000000000000000e4
-948 2 11 25 0.20480000000000000000e4
-948 2 13 15 -0.81920000000000000000e4
-948 2 14 24 0.20480000000000000000e4
-948 2 15 15 -0.32768000000000000000e5
-948 3 10 15 -0.40960000000000000000e4
-948 3 12 25 0.40960000000000000000e4
-948 4 10 10 -0.81920000000000000000e4
-949 1 16 31 -0.65536000000000000000e5
-949 1 19 22 0.32768000000000000000e5
-949 1 20 27 0.65536000000000000000e5
-949 1 28 35 -0.32768000000000000000e5
-949 2 7 13 0.32768000000000000000e5
-949 2 10 24 -0.32768000000000000000e5
-949 3 11 24 -0.32768000000000000000e5
-949 4 8 8 -0.65536000000000000000e5
-950 1 4 19 0.32768000000000000000e5
-950 1 19 23 0.32768000000000000000e5
-950 1 20 27 -0.65536000000000000000e5
-950 1 28 35 0.32768000000000000000e5
-950 2 10 24 0.32768000000000000000e5
-950 3 8 13 -0.32768000000000000000e5
-950 3 11 24 0.32768000000000000000e5
-951 1 4 19 -0.32768000000000000000e5
-951 1 19 24 0.32768000000000000000e5
-951 3 8 13 0.32768000000000000000e5
-952 1 19 25 0.32768000000000000000e5
-952 1 28 35 -0.32768000000000000000e5
-952 3 11 24 -0.32768000000000000000e5
-953 1 5 36 -0.32768000000000000000e5
-953 1 19 26 0.32768000000000000000e5
-954 1 16 31 -0.32768000000000000000e5
-954 1 19 27 0.32768000000000000000e5
-955 1 19 28 0.32768000000000000000e5
-955 1 20 27 -0.32768000000000000000e5
-956 1 17 32 -0.32768000000000000000e5
-956 1 19 29 0.32768000000000000000e5
-957 1 19 30 0.32768000000000000000e5
-957 1 29 36 -0.32768000000000000000e5
-957 3 12 25 -0.32768000000000000000e5
-958 1 4 19 -0.81920000000000000000e4
-958 1 5 20 -0.81920000000000000000e4
-958 1 10 17 -0.16384000000000000000e5
-958 1 13 16 -0.16384000000000000000e5
-958 1 19 31 0.32768000000000000000e5
-958 1 20 27 -0.16384000000000000000e5
-958 1 28 35 0.81920000000000000000e4
-958 2 8 14 -0.81920000000000000000e4
-958 2 11 13 -0.16384000000000000000e5
-958 3 2 15 -0.81920000000000000000e4
-958 3 8 13 -0.81920000000000000000e4
-958 3 10 15 0.32768000000000000000e5
-958 3 11 24 0.81920000000000000000e4
-958 4 6 10 -0.81920000000000000000e4
-959 1 17 32 -0.16384000000000000000e5
-959 1 19 32 0.32768000000000000000e5
-959 1 20 27 -0.16384000000000000000e5
-959 1 29 36 -0.16384000000000000000e5
-959 2 11 25 -0.16384000000000000000e5
-959 3 12 25 -0.16384000000000000000e5
-960 1 17 32 -0.16384000000000000000e5
-960 1 18 33 -0.16384000000000000000e5
-960 1 19 33 0.32768000000000000000e5
-960 1 29 36 -0.16384000000000000000e5
-960 2 14 24 -0.16384000000000000000e5
-960 3 12 25 -0.16384000000000000000e5
-961 1 14 21 -0.32768000000000000000e5
-961 1 19 35 0.32768000000000000000e5
-961 3 14 15 0.32768000000000000000e5
-962 1 14 21 -0.16384000000000000000e5
-962 1 19 34 -0.16384000000000000000e5
-962 1 19 36 0.32768000000000000000e5
-962 1 20 35 -0.16384000000000000000e5
-962 2 15 25 -0.16384000000000000000e5
-962 3 14 15 0.16384000000000000000e5
-963 1 4 19 0.32768000000000000000e5
-963 1 19 37 0.32768000000000000000e5
-963 1 20 27 -0.65536000000000000000e5
-963 1 28 35 0.32768000000000000000e5
-963 2 10 24 0.32768000000000000000e5
-963 3 8 13 -0.32768000000000000000e5
-963 3 10 23 0.32768000000000000000e5
-963 3 11 24 0.32768000000000000000e5
-964 1 13 44 -0.32768000000000000000e5
-964 1 19 38 0.32768000000000000000e5
-965 1 19 39 0.32768000000000000000e5
-965 1 28 35 -0.32768000000000000000e5
-966 1 14 45 -0.32768000000000000000e5
-966 1 19 40 0.32768000000000000000e5
-967 1 4 19 0.16384000000000000000e5
-967 1 13 44 -0.16384000000000000000e5
-967 1 19 41 0.32768000000000000000e5
-967 1 20 27 -0.32768000000000000000e5
-967 3 8 13 -0.16384000000000000000e5
-967 3 10 23 0.16384000000000000000e5
-967 3 11 24 0.16384000000000000000e5
-967 4 10 14 0.16384000000000000000e5
-968 1 19 43 0.32768000000000000000e5
-968 1 29 36 -0.32768000000000000000e5
-969 1 4 19 0.81920000000000000000e4
-969 1 13 44 -0.81920000000000000000e4
-969 1 19 42 -0.16384000000000000000e5
-969 1 19 44 0.32768000000000000000e5
-969 1 20 27 -0.16384000000000000000e5
-969 1 29 36 -0.16384000000000000000e5
-969 2 15 29 -0.16384000000000000000e5
-969 3 8 13 -0.81920000000000000000e4
-969 3 10 23 0.81920000000000000000e4
-969 3 11 24 0.81920000000000000000e4
-969 4 10 14 0.81920000000000000000e4
-970 1 17 32 -0.16384000000000000000e5
-970 1 18 33 -0.16384000000000000000e5
-970 1 19 45 0.32768000000000000000e5
-970 1 29 36 -0.16384000000000000000e5
-970 2 14 24 -0.16384000000000000000e5
-970 3 12 25 -0.16384000000000000000e5
-970 3 15 24 0.32768000000000000000e5
-971 1 19 46 0.32768000000000000000e5
-971 1 21 44 -0.32768000000000000000e5
-972 1 19 47 0.32768000000000000000e5
-972 1 34 41 -0.32768000000000000000e5
-973 1 13 52 -0.32768000000000000000e5
-973 1 19 48 0.32768000000000000000e5
-974 1 14 45 -0.32768000000000000000e5
-974 1 19 49 0.32768000000000000000e5
-974 3 15 28 0.32768000000000000000e5
-975 1 19 51 0.32768000000000000000e5
-975 1 29 36 -0.32768000000000000000e5
-975 3 24 25 0.32768000000000000000e5
-976 1 19 50 -0.16384000000000000000e5
-976 1 19 52 0.32768000000000000000e5
-976 1 20 51 -0.16384000000000000000e5
-976 1 29 36 -0.16384000000000000000e5
-976 2 25 31 -0.16384000000000000000e5
-976 3 24 25 0.16384000000000000000e5
-977 1 16 55 -0.32768000000000000000e5
-977 1 19 53 0.32768000000000000000e5
-978 1 19 54 0.32768000000000000000e5
-978 1 35 50 -0.32768000000000000000e5
-979 1 16 55 -0.16384000000000000000e5
-979 1 19 55 0.32768000000000000000e5
-979 1 35 50 -0.16384000000000000000e5
-979 1 43 46 -0.16384000000000000000e5
-979 2 31 31 -0.32768000000000000000e5
-980 1 19 56 0.32768000000000000000e5
-980 1 35 50 -0.32768000000000000000e5
-980 3 25 34 0.32768000000000000000e5
-981 1 18 21 -0.16384000000000000000e5
-981 1 20 20 0.32768000000000000000e5
-982 1 4 19 0.32768000000000000000e5
-982 1 20 22 0.32768000000000000000e5
-982 1 20 27 -0.65536000000000000000e5
-982 1 28 35 0.32768000000000000000e5
-982 2 10 24 0.32768000000000000000e5
-982 3 8 13 -0.32768000000000000000e5
-982 3 11 24 0.32768000000000000000e5
-983 1 4 19 -0.32768000000000000000e5
-983 1 20 23 0.32768000000000000000e5
-983 3 8 13 0.32768000000000000000e5
-984 1 20 24 0.32768000000000000000e5
-984 1 28 35 -0.32768000000000000000e5
-984 3 11 24 -0.32768000000000000000e5
-985 1 5 36 -0.32768000000000000000e5
-985 1 20 25 0.32768000000000000000e5
-986 1 5 36 0.32768000000000000000e5
-986 1 20 26 0.32768000000000000000e5
-986 1 28 35 0.32768000000000000000e5
-986 1 29 36 -0.65536000000000000000e5
-986 2 9 25 0.32768000000000000000e5
-986 3 11 24 0.32768000000000000000e5
-986 3 12 25 -0.65536000000000000000e5
-987 1 17 32 -0.32768000000000000000e5
-987 1 20 28 0.32768000000000000000e5
-988 1 20 29 0.32768000000000000000e5
-988 1 29 36 -0.32768000000000000000e5
-988 3 12 25 -0.32768000000000000000e5
-989 1 18 33 -0.32768000000000000000e5
-989 1 20 30 0.32768000000000000000e5
-990 1 17 32 -0.16384000000000000000e5
-990 1 20 27 -0.16384000000000000000e5
-990 1 20 31 0.32768000000000000000e5
-990 1 29 36 -0.16384000000000000000e5
-990 2 11 25 -0.16384000000000000000e5
-990 3 12 25 -0.16384000000000000000e5
-991 1 17 32 -0.16384000000000000000e5
-991 1 18 33 -0.16384000000000000000e5
-991 1 20 32 0.32768000000000000000e5
-991 1 29 36 -0.16384000000000000000e5
-991 2 14 24 -0.16384000000000000000e5
-991 3 12 25 -0.16384000000000000000e5
-992 1 18 35 -0.32768000000000000000e5
-992 1 20 33 0.32768000000000000000e5
-993 1 14 21 -0.32768000000000000000e5
-993 1 20 34 0.32768000000000000000e5
-993 3 14 15 0.32768000000000000000e5
-994 1 13 44 -0.32768000000000000000e5
-994 1 20 37 0.32768000000000000000e5
-995 1 20 38 0.32768000000000000000e5
-995 1 28 35 -0.32768000000000000000e5
-996 1 14 45 -0.32768000000000000000e5
-996 1 20 39 0.32768000000000000000e5
-997 1 11 46 -0.32768000000000000000e5
-997 1 20 40 0.32768000000000000000e5
-998 1 19 42 -0.32768000000000000000e5
-998 1 20 41 0.32768000000000000000e5
-999 1 20 42 0.32768000000000000000e5
-999 1 29 36 -0.32768000000000000000e5
-1000 1 15 46 -0.32768000000000000000e5
-1000 1 20 43 0.32768000000000000000e5
-1001 1 17 32 -0.16384000000000000000e5
-1001 1 18 33 -0.16384000000000000000e5
-1001 1 20 44 0.32768000000000000000e5
-1001 1 29 36 -0.16384000000000000000e5
-1001 2 14 24 -0.16384000000000000000e5
-1001 3 12 25 -0.16384000000000000000e5
-1001 3 15 24 0.32768000000000000000e5
-1002 1 20 45 0.32768000000000000000e5
-1002 1 33 36 -0.32768000000000000000e5
-1003 1 20 46 0.32768000000000000000e5
-1003 1 35 36 -0.32768000000000000000e5
-1004 1 13 52 -0.32768000000000000000e5
-1004 1 20 47 0.32768000000000000000e5
-1005 1 14 45 -0.32768000000000000000e5
-1005 1 20 48 0.32768000000000000000e5
-1005 3 15 28 0.32768000000000000000e5
-1006 1 13 52 0.32768000000000000000e5
-1006 1 14 45 0.32768000000000000000e5
-1006 1 20 49 0.32768000000000000000e5
-1006 1 29 36 -0.65536000000000000000e5
-1006 2 15 33 0.32768000000000000000e5
-1006 3 15 28 -0.32768000000000000000e5
-1006 3 24 25 0.65536000000000000000e5
-1007 1 20 50 0.32768000000000000000e5
-1007 1 29 36 -0.32768000000000000000e5
-1007 3 24 25 0.32768000000000000000e5
-1008 1 20 52 0.32768000000000000000e5
-1008 1 35 46 -0.32768000000000000000e5
-1009 1 20 53 0.32768000000000000000e5
-1009 1 35 50 -0.32768000000000000000e5
-1010 1 20 54 0.32768000000000000000e5
-1010 1 43 46 -0.32768000000000000000e5
-1011 1 20 55 0.32768000000000000000e5
-1011 1 36 51 -0.32768000000000000000e5
-1012 1 20 56 0.32768000000000000000e5
-1012 1 45 52 -0.32768000000000000000e5
-1013 1 16 31 -0.32768000000000000000e5
-1013 1 21 22 0.32768000000000000000e5
-1014 1 20 27 -0.32768000000000000000e5
-1014 1 21 23 0.32768000000000000000e5
-1015 1 17 32 -0.32768000000000000000e5
-1015 1 21 24 0.32768000000000000000e5
-1016 1 21 25 0.32768000000000000000e5
-1016 1 29 36 -0.32768000000000000000e5
-1016 3 12 25 -0.32768000000000000000e5
-1017 1 18 33 -0.32768000000000000000e5
-1017 1 21 26 0.32768000000000000000e5
-1018 1 4 19 -0.81920000000000000000e4
-1018 1 5 20 -0.81920000000000000000e4
-1018 1 10 17 -0.16384000000000000000e5
-1018 1 13 16 -0.16384000000000000000e5
-1018 1 20 27 -0.16384000000000000000e5
-1018 1 21 27 0.32768000000000000000e5
-1018 1 28 35 0.81920000000000000000e4
-1018 2 8 14 -0.81920000000000000000e4
-1018 2 11 13 -0.16384000000000000000e5
-1018 3 2 15 -0.81920000000000000000e4
-1018 3 8 13 -0.81920000000000000000e4
-1018 3 10 15 0.32768000000000000000e5
-1018 3 11 24 0.81920000000000000000e4
-1018 4 6 10 -0.81920000000000000000e4
-1019 1 17 32 -0.16384000000000000000e5
-1019 1 20 27 -0.16384000000000000000e5
-1019 1 21 28 0.32768000000000000000e5
-1019 1 29 36 -0.16384000000000000000e5
-1019 2 11 25 -0.16384000000000000000e5
-1019 3 12 25 -0.16384000000000000000e5
-1020 1 17 32 -0.16384000000000000000e5
-1020 1 18 33 -0.16384000000000000000e5
-1020 1 21 29 0.32768000000000000000e5
-1020 1 29 36 -0.16384000000000000000e5
-1020 2 14 24 -0.16384000000000000000e5
-1020 3 12 25 -0.16384000000000000000e5
-1021 1 18 35 -0.32768000000000000000e5
-1021 1 21 30 0.32768000000000000000e5
-1022 1 19 34 -0.32768000000000000000e5
-1022 1 21 31 0.32768000000000000000e5
-1023 1 14 21 -0.32768000000000000000e5
-1023 1 21 32 0.32768000000000000000e5
-1023 3 14 15 0.32768000000000000000e5
-1024 1 20 35 -0.32768000000000000000e5
-1024 1 21 33 0.32768000000000000000e5
-1025 1 14 21 -0.16384000000000000000e5
-1025 1 19 34 -0.16384000000000000000e5
-1025 1 20 35 -0.16384000000000000000e5
-1025 1 21 34 0.32768000000000000000e5
-1025 2 15 25 -0.16384000000000000000e5
-1025 3 14 15 0.16384000000000000000e5
-1026 1 20 36 -0.32768000000000000000e5
-1026 1 21 35 0.32768000000000000000e5
-1027 1 4 19 0.16384000000000000000e5
-1027 1 13 44 -0.16384000000000000000e5
-1027 1 20 27 -0.32768000000000000000e5
-1027 1 21 37 0.32768000000000000000e5
-1027 3 8 13 -0.16384000000000000000e5
-1027 3 10 23 0.16384000000000000000e5
-1027 3 11 24 0.16384000000000000000e5
-1027 4 10 14 0.16384000000000000000e5
-1028 1 19 42 -0.32768000000000000000e5
-1028 1 21 38 0.32768000000000000000e5
-1029 1 21 39 0.32768000000000000000e5
-1029 1 29 36 -0.32768000000000000000e5
-1030 1 15 46 -0.32768000000000000000e5
-1030 1 21 40 0.32768000000000000000e5
-1031 1 4 19 0.81920000000000000000e4
-1031 1 13 44 -0.81920000000000000000e4
-1031 1 19 42 -0.16384000000000000000e5
-1031 1 20 27 -0.16384000000000000000e5
-1031 1 21 41 0.32768000000000000000e5
-1031 1 29 36 -0.16384000000000000000e5
-1031 2 15 29 -0.16384000000000000000e5
-1031 3 8 13 -0.81920000000000000000e4
-1031 3 10 23 0.81920000000000000000e4
-1031 3 11 24 0.81920000000000000000e4
-1031 4 10 14 0.81920000000000000000e4
-1032 1 17 32 -0.16384000000000000000e5
-1032 1 18 33 -0.16384000000000000000e5
-1032 1 21 42 0.32768000000000000000e5
-1032 1 29 36 -0.16384000000000000000e5
-1032 2 14 24 -0.16384000000000000000e5
-1032 3 12 25 -0.16384000000000000000e5
-1032 3 15 24 0.32768000000000000000e5
-1033 1 21 43 0.32768000000000000000e5
-1033 1 33 36 -0.32768000000000000000e5
-1034 1 21 45 0.32768000000000000000e5
-1034 1 35 36 -0.32768000000000000000e5
-1035 1 19 50 -0.32768000000000000000e5
-1035 1 21 47 0.32768000000000000000e5
-1036 1 21 48 0.32768000000000000000e5
-1036 1 29 36 -0.32768000000000000000e5
-1036 3 24 25 0.32768000000000000000e5
-1037 1 20 51 -0.32768000000000000000e5
-1037 1 21 49 0.32768000000000000000e5
-1038 1 19 50 -0.16384000000000000000e5
-1038 1 20 51 -0.16384000000000000000e5
-1038 1 21 50 0.32768000000000000000e5
-1038 1 29 36 -0.16384000000000000000e5
-1038 2 25 31 -0.16384000000000000000e5
-1038 3 24 25 0.16384000000000000000e5
-1039 1 21 51 0.32768000000000000000e5
-1039 1 35 46 -0.32768000000000000000e5
-1040 1 16 55 -0.16384000000000000000e5
-1040 1 21 53 0.32768000000000000000e5
-1040 1 35 50 -0.16384000000000000000e5
-1040 1 43 46 -0.16384000000000000000e5
-1040 2 31 31 -0.32768000000000000000e5
-1041 1 21 54 0.32768000000000000000e5
-1041 1 36 51 -0.32768000000000000000e5
-1042 1 21 55 0.32768000000000000000e5
-1042 1 46 46 -0.65536000000000000000e5
-1043 1 1 24 0.16384000000000000000e5
-1043 1 1 32 0.65536000000000000000e5
-1043 1 1 48 0.16384000000000000000e5
-1043 1 2 33 -0.65536000000000000000e5
-1043 1 2 49 0.16384000000000000000e5
-1043 1 3 34 0.13107200000000000000e6
-1043 1 6 37 0.16384000000000000000e5
-1043 1 7 22 0.32768000000000000000e5
-1043 1 8 23 0.32768000000000000000e5
-1043 1 8 39 -0.32768000000000000000e5
-1043 1 10 41 -0.65536000000000000000e5
-1043 1 12 27 -0.13107200000000000000e6
-1043 1 22 22 0.32768000000000000000e5
-1043 1 23 38 0.16384000000000000000e5
-1043 2 1 7 0.32768000000000000000e5
-1043 2 2 16 0.16384000000000000000e5
-1043 2 2 32 0.16384000000000000000e5
-1043 2 3 17 -0.16384000000000000000e5
-1043 2 4 26 0.16384000000000000000e5
-1043 2 6 20 0.65536000000000000000e5
-1043 2 7 21 -0.65536000000000000000e5
-1043 3 1 16 0.16384000000000000000e5
-1043 3 1 30 0.32768000000000000000e5
-1043 3 3 16 0.16384000000000000000e5
-1043 3 8 21 -0.65536000000000000000e5
-1043 4 1 5 -0.32768000000000000000e5
-1043 4 1 13 0.16384000000000000000e5
-1044 1 1 40 0.32768000000000000000e5
-1044 1 2 33 0.13107200000000000000e6
-1044 1 2 49 0.32768000000000000000e5
-1044 1 3 34 -0.26214400000000000000e6
-1044 1 3 50 -0.65536000000000000000e5
-1044 1 5 52 0.13107200000000000000e6
-1044 1 6 37 0.32768000000000000000e5
-1044 1 10 41 0.13107200000000000000e6
-1044 1 11 42 -0.13107200000000000000e6
-1044 1 12 43 -0.26214400000000000000e6
-1044 1 16 47 0.26214400000000000000e6
-1044 1 22 23 0.32768000000000000000e5
-1044 1 22 37 -0.32768000000000000000e5
-1044 1 28 43 0.13107200000000000000e6
-1044 2 2 32 0.32768000000000000000e5
-1044 2 3 17 -0.32768000000000000000e5
-1044 2 4 26 0.32768000000000000000e5
-1044 2 7 21 0.13107200000000000000e6
-1044 2 10 32 -0.13107200000000000000e6
-1044 2 12 26 0.13107200000000000000e6
-1044 3 1 30 0.13107200000000000000e6
-1044 3 2 31 0.13107200000000000000e6
-1044 3 7 20 0.13107200000000000000e6
-1044 3 8 21 0.13107200000000000000e6
-1044 3 14 27 0.26214400000000000000e6
-1044 4 1 13 0.32768000000000000000e5
-1044 4 5 17 0.65536000000000000000e5
-1044 4 7 19 -0.13107200000000000000e6
-1044 4 11 11 0.65536000000000000000e5
-1045 1 1 48 -0.32768000000000000000e5
-1045 1 2 49 -0.32768000000000000000e5
-1045 1 6 37 -0.32768000000000000000e5
-1045 1 8 39 0.65536000000000000000e5
-1045 1 22 24 0.32768000000000000000e5
-1045 1 23 38 -0.32768000000000000000e5
-1045 2 2 32 -0.32768000000000000000e5
-1045 2 3 17 0.32768000000000000000e5
-1045 2 4 26 -0.32768000000000000000e5
-1045 3 1 30 -0.65536000000000000000e5
-1045 4 1 13 -0.32768000000000000000e5
-1046 1 1 40 -0.32768000000000000000e5
-1046 1 22 25 0.32768000000000000000e5
-1047 1 1 40 0.32768000000000000000e5
-1047 1 6 37 0.32768000000000000000e5
-1047 1 8 39 -0.65536000000000000000e5
-1047 1 22 26 0.32768000000000000000e5
-1047 2 4 26 0.32768000000000000000e5
-1048 1 1 24 0.16384000000000000000e5
-1048 1 1 32 0.65536000000000000000e5
-1048 1 1 40 0.16384000000000000000e5
-1048 1 2 49 0.16384000000000000000e5
-1048 1 3 50 -0.32768000000000000000e5
-1048 1 5 52 0.65536000000000000000e5
-1048 1 6 37 0.16384000000000000000e5
-1048 1 7 22 0.32768000000000000000e5
-1048 1 8 23 0.32768000000000000000e5
-1048 1 11 42 -0.65536000000000000000e5
-1048 1 12 27 -0.13107200000000000000e6
-1048 1 12 43 -0.13107200000000000000e6
-1048 1 16 47 0.13107200000000000000e6
-1048 1 22 27 0.32768000000000000000e5
-1048 1 22 37 -0.16384000000000000000e5
-1048 1 28 43 0.65536000000000000000e5
-1048 2 1 7 0.32768000000000000000e5
-1048 2 2 16 0.16384000000000000000e5
-1048 2 2 32 0.16384000000000000000e5
-1048 2 3 17 -0.16384000000000000000e5
-1048 2 4 26 0.16384000000000000000e5
-1048 2 6 20 0.65536000000000000000e5
-1048 2 10 32 -0.65536000000000000000e5
-1048 2 12 26 0.65536000000000000000e5
-1048 2 16 16 -0.32768000000000000000e5
-1048 3 1 16 0.16384000000000000000e5
-1048 3 1 30 0.65536000000000000000e5
-1048 3 2 31 0.65536000000000000000e5
-1048 3 3 16 0.16384000000000000000e5
-1048 3 7 20 0.65536000000000000000e5
-1048 3 14 27 0.13107200000000000000e6
-1048 4 1 5 -0.32768000000000000000e5
-1048 4 1 13 0.16384000000000000000e5
-1048 4 5 17 0.32768000000000000000e5
-1048 4 7 19 -0.65536000000000000000e5
-1048 4 11 11 0.32768000000000000000e5
-1049 1 7 38 -0.32768000000000000000e5
-1049 1 22 28 0.32768000000000000000e5
-1050 1 1 48 -0.16384000000000000000e5
-1050 1 2 49 -0.16384000000000000000e5
-1050 1 22 29 0.32768000000000000000e5
-1050 1 23 38 -0.16384000000000000000e5
-1050 2 2 32 -0.16384000000000000000e5
-1050 3 1 30 -0.32768000000000000000e5
-1051 1 8 39 -0.32768000000000000000e5
-1051 1 22 30 0.32768000000000000000e5
-1052 1 2 17 -0.65536000000000000000e5
-1052 1 2 33 -0.32768000000000000000e5
-1052 1 3 34 0.65536000000000000000e5
-1052 1 10 41 -0.32768000000000000000e5
-1052 1 11 42 0.32768000000000000000e5
-1052 1 12 43 0.65536000000000000000e5
-1052 1 17 48 -0.65536000000000000000e5
-1052 1 22 31 0.32768000000000000000e5
-1052 2 1 31 0.32768000000000000000e5
-1052 2 7 21 -0.32768000000000000000e5
-1052 2 8 22 0.32768000000000000000e5
-1052 2 12 26 -0.32768000000000000000e5
-1052 3 1 14 0.65536000000000000000e5
-1052 3 6 23 0.65536000000000000000e5
-1052 3 7 20 -0.32768000000000000000e5
-1052 3 8 21 -0.32768000000000000000e5
-1052 3 14 27 -0.65536000000000000000e5
-1052 4 4 16 -0.32768000000000000000e5
-1053 1 2 33 0.32768000000000000000e5
-1053 1 3 34 -0.65536000000000000000e5
-1053 1 10 41 0.32768000000000000000e5
-1053 1 22 32 0.32768000000000000000e5
-1053 2 7 21 0.32768000000000000000e5
-1053 3 7 20 0.32768000000000000000e5
-1053 3 8 21 0.32768000000000000000e5
-1054 1 11 42 -0.32768000000000000000e5
-1054 1 12 43 -0.65536000000000000000e5
-1054 1 17 48 0.65536000000000000000e5
-1054 1 22 33 0.32768000000000000000e5
-1054 2 8 22 -0.32768000000000000000e5
-1054 2 12 26 0.32768000000000000000e5
-1054 3 14 27 0.65536000000000000000e5
-1054 4 4 16 0.32768000000000000000e5
-1055 1 2 17 -0.32768000000000000000e5
-1055 1 22 34 0.32768000000000000000e5
-1055 3 1 14 0.32768000000000000000e5
-1055 3 6 23 0.32768000000000000000e5
-1056 1 16 47 -0.32768000000000000000e5
-1056 1 22 35 0.32768000000000000000e5
-1056 3 13 26 -0.32768000000000000000e5
-1057 1 4 19 0.32768000000000000000e5
-1057 1 20 27 -0.65536000000000000000e5
-1057 1 22 36 0.32768000000000000000e5
-1057 1 28 35 0.32768000000000000000e5
-1057 2 10 24 0.32768000000000000000e5
-1057 3 8 13 -0.32768000000000000000e5
-1057 3 10 23 0.32768000000000000000e5
-1057 3 11 24 0.32768000000000000000e5
-1058 1 1 48 -0.32768000000000000000e5
-1058 1 22 38 0.32768000000000000000e5
-1059 1 22 39 0.32768000000000000000e5
-1059 1 23 38 -0.32768000000000000000e5
-1060 1 2 49 -0.32768000000000000000e5
-1060 1 22 40 0.32768000000000000000e5
-1061 1 2 33 -0.65536000000000000000e5
-1061 1 3 34 0.13107200000000000000e6
-1061 1 3 50 0.32768000000000000000e5
-1061 1 5 52 -0.65536000000000000000e5
-1061 1 7 38 -0.32768000000000000000e5
-1061 1 8 39 -0.32768000000000000000e5
-1061 1 10 41 -0.65536000000000000000e5
-1061 1 11 42 0.65536000000000000000e5
-1061 1 12 43 0.13107200000000000000e6
-1061 1 16 47 -0.13107200000000000000e6
-1061 1 22 41 0.32768000000000000000e5
-1061 1 28 43 -0.65536000000000000000e5
-1061 2 7 21 -0.65536000000000000000e5
-1061 2 10 32 0.65536000000000000000e5
-1061 2 12 26 -0.65536000000000000000e5
-1061 3 1 30 -0.32768000000000000000e5
-1061 3 2 31 -0.65536000000000000000e5
-1061 3 7 20 -0.65536000000000000000e5
-1061 3 8 21 -0.65536000000000000000e5
-1061 3 14 27 -0.13107200000000000000e6
-1061 4 5 17 -0.32768000000000000000e5
-1061 4 7 19 0.65536000000000000000e5
-1062 1 1 48 -0.16384000000000000000e5
-1062 1 2 49 -0.16384000000000000000e5
-1062 1 22 42 0.32768000000000000000e5
-1062 1 23 38 -0.16384000000000000000e5
-1062 2 2 32 -0.16384000000000000000e5
-1063 1 3 50 -0.32768000000000000000e5
-1063 1 22 43 0.32768000000000000000e5
-1064 1 5 52 -0.32768000000000000000e5
-1064 1 11 42 0.32768000000000000000e5
-1064 1 12 43 0.65536000000000000000e5
-1064 1 16 47 -0.65536000000000000000e5
-1064 1 22 44 0.32768000000000000000e5
-1064 1 28 43 -0.32768000000000000000e5
-1064 2 10 32 0.32768000000000000000e5
-1064 2 12 26 -0.32768000000000000000e5
-1064 3 2 31 -0.32768000000000000000e5
-1064 3 14 27 -0.65536000000000000000e5
-1064 4 7 19 0.32768000000000000000e5
-1065 1 11 42 -0.32768000000000000000e5
-1065 1 12 43 -0.65536000000000000000e5
-1065 1 17 48 0.65536000000000000000e5
-1065 1 22 45 0.32768000000000000000e5
-1065 2 8 22 -0.32768000000000000000e5
-1065 2 12 26 0.32768000000000000000e5
-1065 3 2 31 0.32768000000000000000e5
-1065 3 14 27 0.65536000000000000000e5
-1065 4 4 16 0.32768000000000000000e5
-1066 1 16 47 -0.32768000000000000000e5
-1066 1 22 46 0.32768000000000000000e5
-1067 1 1 48 -0.32768000000000000000e5
-1067 1 2 49 -0.32768000000000000000e5
-1067 1 7 54 0.65536000000000000000e5
-1067 1 22 47 0.32768000000000000000e5
-1067 1 23 38 -0.32768000000000000000e5
-1067 1 24 39 -0.32768000000000000000e5
-1067 2 1 35 0.32768000000000000000e5
-1067 2 2 32 -0.32768000000000000000e5
-1067 2 3 33 -0.32768000000000000000e5
-1067 2 18 32 0.32768000000000000000e5
-1067 2 26 32 -0.32768000000000000000e5
-1067 3 3 32 -0.32768000000000000000e5
-1067 3 4 33 -0.32768000000000000000e5
-1067 3 16 29 0.65536000000000000000e5
-1067 3 17 30 0.65536000000000000000e5
-1067 4 17 17 -0.65536000000000000000e5
-1068 1 2 49 0.32768000000000000000e5
-1068 1 7 54 -0.65536000000000000000e5
-1068 1 22 48 0.32768000000000000000e5
-1068 1 24 39 0.32768000000000000000e5
-1068 2 3 33 0.32768000000000000000e5
-1068 2 18 32 -0.32768000000000000000e5
-1068 2 26 32 0.32768000000000000000e5
-1068 3 4 33 0.32768000000000000000e5
-1068 3 17 30 -0.65536000000000000000e5
-1068 4 17 17 0.65536000000000000000e5
-1069 1 2 49 -0.32768000000000000000e5
-1069 1 22 49 0.32768000000000000000e5
-1069 3 3 32 0.32768000000000000000e5
-1070 1 1 48 -0.16384000000000000000e5
-1070 1 2 49 -0.16384000000000000000e5
-1070 1 22 50 0.32768000000000000000e5
-1070 1 23 38 -0.16384000000000000000e5
-1070 2 2 32 -0.16384000000000000000e5
-1070 3 16 29 0.32768000000000000000e5
-1071 1 7 54 -0.32768000000000000000e5
-1071 1 22 51 0.32768000000000000000e5
-1072 1 22 52 0.32768000000000000000e5
-1072 1 37 44 -0.32768000000000000000e5
-1073 1 7 54 -0.65536000000000000000e5
-1073 1 22 53 0.32768000000000000000e5
-1073 1 22 54 0.32768000000000000000e5
-1073 1 23 54 0.32768000000000000000e5
-1073 2 26 32 0.32768000000000000000e5
-1073 3 6 35 0.65536000000000000000e5
-1074 1 7 54 -0.32768000000000000000e5
-1074 1 22 55 0.32768000000000000000e5
-1074 3 6 35 0.32768000000000000000e5
-1075 1 22 56 0.32768000000000000000e5
-1075 1 38 53 0.32768000000000000000e5
-1075 1 47 50 -0.65536000000000000000e5
-1075 1 47 54 0.32768000000000000000e5
-1075 2 32 32 0.65536000000000000000e5
-1075 3 32 33 0.32768000000000000000e5
-1076 1 1 48 -0.16384000000000000000e5
-1076 1 2 49 -0.16384000000000000000e5
-1076 1 6 37 -0.16384000000000000000e5
-1076 1 8 39 0.32768000000000000000e5
-1076 1 23 23 0.32768000000000000000e5
-1076 1 23 38 -0.16384000000000000000e5
-1076 2 2 32 -0.16384000000000000000e5
-1076 2 3 17 0.16384000000000000000e5
-1076 2 4 26 -0.16384000000000000000e5
-1076 3 1 30 -0.32768000000000000000e5
-1076 4 1 13 -0.16384000000000000000e5
-1077 1 1 40 -0.32768000000000000000e5
-1077 1 23 24 0.32768000000000000000e5
-1078 1 1 40 0.32768000000000000000e5
-1078 1 6 37 0.32768000000000000000e5
-1078 1 8 39 -0.65536000000000000000e5
-1078 1 23 25 0.32768000000000000000e5
-1078 2 4 26 0.32768000000000000000e5
-1079 1 6 37 -0.32768000000000000000e5
-1079 1 23 26 0.32768000000000000000e5
-1080 1 7 38 -0.32768000000000000000e5
-1080 1 23 27 0.32768000000000000000e5
-1081 1 1 48 -0.16384000000000000000e5
-1081 1 2 49 -0.16384000000000000000e5
-1081 1 23 28 0.32768000000000000000e5
-1081 1 23 38 -0.16384000000000000000e5
-1081 2 2 32 -0.16384000000000000000e5
-1081 3 1 30 -0.32768000000000000000e5
-1082 1 8 39 -0.32768000000000000000e5
-1082 1 23 29 0.32768000000000000000e5
-1083 1 1 48 0.16384000000000000000e5
-1083 1 2 49 0.16384000000000000000e5
-1083 1 5 52 -0.65536000000000000000e5
-1083 1 8 39 0.32768000000000000000e5
-1083 1 9 40 0.32768000000000000000e5
-1083 1 10 41 -0.65536000000000000000e5
-1083 1 11 42 -0.65536000000000000000e5
-1083 1 12 43 -0.13107200000000000000e6
-1083 1 17 48 0.26214400000000000000e6
-1083 1 23 30 0.32768000000000000000e5
-1083 1 23 38 0.16384000000000000000e5
-1083 1 26 41 -0.32768000000000000000e5
-1083 1 28 43 -0.65536000000000000000e5
-1083 2 2 32 0.16384000000000000000e5
-1083 2 8 22 -0.13107200000000000000e6
-1083 2 12 26 0.65536000000000000000e5
-1083 2 16 30 0.32768000000000000000e5
-1083 3 2 31 0.65536000000000000000e5
-1083 3 14 27 0.13107200000000000000e6
-1083 4 4 16 0.13107200000000000000e6
-1083 4 6 18 0.32768000000000000000e5
-1083 4 7 19 0.65536000000000000000e5
-1084 1 2 33 0.32768000000000000000e5
-1084 1 3 34 -0.65536000000000000000e5
-1084 1 10 41 0.32768000000000000000e5
-1084 1 23 31 0.32768000000000000000e5
-1084 2 7 21 0.32768000000000000000e5
-1084 3 7 20 0.32768000000000000000e5
-1084 3 8 21 0.32768000000000000000e5
-1085 1 11 42 -0.32768000000000000000e5
-1085 1 12 43 -0.65536000000000000000e5
-1085 1 17 48 0.65536000000000000000e5
-1085 1 23 32 0.32768000000000000000e5
-1085 2 8 22 -0.32768000000000000000e5
-1085 2 12 26 0.32768000000000000000e5
-1085 3 14 27 0.65536000000000000000e5
-1085 4 4 16 0.32768000000000000000e5
-1086 1 10 41 -0.32768000000000000000e5
-1086 1 23 33 0.32768000000000000000e5
-1087 1 16 47 -0.32768000000000000000e5
-1087 1 23 34 0.32768000000000000000e5
-1087 3 13 26 -0.32768000000000000000e5
-1088 1 12 43 -0.32768000000000000000e5
-1088 1 23 35 0.32768000000000000000e5
-1089 1 13 44 -0.32768000000000000000e5
-1089 1 23 36 0.32768000000000000000e5
-1090 1 1 48 -0.32768000000000000000e5
-1090 1 23 37 0.32768000000000000000e5
-1091 1 2 49 -0.32768000000000000000e5
-1091 1 23 39 0.32768000000000000000e5
-1092 1 23 40 0.32768000000000000000e5
-1092 1 24 39 -0.32768000000000000000e5
-1093 1 1 48 -0.16384000000000000000e5
-1093 1 2 49 -0.16384000000000000000e5
-1093 1 23 38 -0.16384000000000000000e5
-1093 1 23 41 0.32768000000000000000e5
-1093 2 2 32 -0.16384000000000000000e5
-1094 1 3 50 -0.32768000000000000000e5
-1094 1 23 42 0.32768000000000000000e5
-1095 1 1 48 0.16384000000000000000e5
-1095 1 2 49 0.16384000000000000000e5
-1095 1 3 50 0.32768000000000000000e5
-1095 1 11 42 -0.65536000000000000000e5
-1095 1 12 43 -0.13107200000000000000e6
-1095 1 17 48 0.13107200000000000000e6
-1095 1 23 38 0.16384000000000000000e5
-1095 1 23 43 0.32768000000000000000e5
-1095 2 2 32 0.16384000000000000000e5
-1095 2 8 22 -0.65536000000000000000e5
-1095 2 12 26 0.65536000000000000000e5
-1095 2 16 30 0.32768000000000000000e5
-1095 3 2 31 0.65536000000000000000e5
-1095 3 14 27 0.13107200000000000000e6
-1095 4 4 16 0.65536000000000000000e5
-1096 1 11 42 -0.32768000000000000000e5
-1096 1 12 43 -0.65536000000000000000e5
-1096 1 17 48 0.65536000000000000000e5
-1096 1 23 44 0.32768000000000000000e5
-1096 2 8 22 -0.32768000000000000000e5
-1096 2 12 26 0.32768000000000000000e5
-1096 3 2 31 0.32768000000000000000e5
-1096 3 14 27 0.65536000000000000000e5
-1096 4 4 16 0.32768000000000000000e5
-1097 1 5 52 0.32768000000000000000e5
-1097 1 17 48 -0.65536000000000000000e5
-1097 1 23 45 0.32768000000000000000e5
-1097 1 28 43 0.32768000000000000000e5
-1097 2 8 22 0.32768000000000000000e5
-1097 4 4 16 -0.32768000000000000000e5
-1097 4 7 19 -0.32768000000000000000e5
-1098 1 5 52 0.16384000000000000000e5
-1098 1 11 42 -0.16384000000000000000e5
-1098 1 12 43 -0.32768000000000000000e5
-1098 1 23 46 0.32768000000000000000e5
-1098 2 12 26 0.16384000000000000000e5
-1098 2 20 34 -0.16384000000000000000e5
-1098 3 2 31 0.16384000000000000000e5
-1098 3 14 27 0.32768000000000000000e5
-1098 4 7 19 -0.16384000000000000000e5
-1098 4 8 20 -0.16384000000000000000e5
-1099 1 2 49 0.32768000000000000000e5
-1099 1 7 54 -0.65536000000000000000e5
-1099 1 23 47 0.32768000000000000000e5
-1099 1 24 39 0.32768000000000000000e5
-1099 2 3 33 0.32768000000000000000e5
-1099 2 18 32 -0.32768000000000000000e5
-1099 2 26 32 0.32768000000000000000e5
-1099 3 4 33 0.32768000000000000000e5
-1099 3 17 30 -0.65536000000000000000e5
-1099 4 17 17 0.65536000000000000000e5
-1100 1 2 49 -0.32768000000000000000e5
-1100 1 23 48 0.32768000000000000000e5
-1100 3 3 32 0.32768000000000000000e5
-1101 1 23 49 0.32768000000000000000e5
-1101 1 24 39 -0.32768000000000000000e5
-1101 2 3 33 -0.32768000000000000000e5
-1101 2 18 32 0.32768000000000000000e5
-1101 3 3 32 -0.32768000000000000000e5
-1101 3 4 33 -0.32768000000000000000e5
-1101 3 17 30 0.65536000000000000000e5
-1102 1 7 54 -0.32768000000000000000e5
-1102 1 23 50 0.32768000000000000000e5
-1103 1 1 48 0.16384000000000000000e5
-1103 1 2 49 0.16384000000000000000e5
-1103 1 3 50 0.32768000000000000000e5
-1103 1 11 42 -0.65536000000000000000e5
-1103 1 12 43 -0.13107200000000000000e6
-1103 1 17 48 0.13107200000000000000e6
-1103 1 23 38 0.16384000000000000000e5
-1103 1 23 51 0.32768000000000000000e5
-1103 2 2 32 0.16384000000000000000e5
-1103 2 8 22 -0.65536000000000000000e5
-1103 2 12 26 0.65536000000000000000e5
-1103 2 16 30 0.32768000000000000000e5
-1103 3 2 31 0.65536000000000000000e5
-1103 3 14 27 0.13107200000000000000e6
-1103 3 17 30 0.32768000000000000000e5
-1103 4 4 16 0.65536000000000000000e5
-1104 1 23 52 0.32768000000000000000e5
-1104 1 32 47 -0.32768000000000000000e5
-1105 1 7 54 -0.65536000000000000000e5
-1105 1 22 53 0.32768000000000000000e5
-1105 1 23 53 0.32768000000000000000e5
-1105 1 23 54 0.32768000000000000000e5
-1105 2 26 32 0.32768000000000000000e5
-1105 3 6 35 0.65536000000000000000e5
-1106 1 1 48 0.16384000000000000000e5
-1106 1 2 49 0.16384000000000000000e5
-1106 1 3 50 0.32768000000000000000e5
-1106 1 11 42 -0.65536000000000000000e5
-1106 1 12 43 -0.13107200000000000000e6
-1106 1 17 48 0.13107200000000000000e6
-1106 1 23 38 0.16384000000000000000e5
-1106 1 23 55 0.32768000000000000000e5
-1106 2 2 32 0.16384000000000000000e5
-1106 2 8 22 -0.65536000000000000000e5
-1106 2 12 26 0.65536000000000000000e5
-1106 2 16 30 0.32768000000000000000e5
-1106 3 2 31 0.65536000000000000000e5
-1106 3 14 27 0.13107200000000000000e6
-1106 3 17 30 0.32768000000000000000e5
-1106 3 20 33 0.32768000000000000000e5
-1106 4 4 16 0.65536000000000000000e5
-1107 1 23 56 0.32768000000000000000e5
-1107 1 38 53 -0.32768000000000000000e5
-1108 1 1 40 0.16384000000000000000e5
-1108 1 6 37 0.16384000000000000000e5
-1108 1 8 39 -0.32768000000000000000e5
-1108 1 24 24 0.32768000000000000000e5
-1108 2 4 26 0.16384000000000000000e5
-1109 1 6 37 -0.32768000000000000000e5
-1109 1 24 25 0.32768000000000000000e5
-1110 1 1 40 -0.32768000000000000000e5
-1110 1 1 48 0.32768000000000000000e5
-1110 1 2 49 0.32768000000000000000e5
-1110 1 3 26 0.32768000000000000000e5
-1110 1 5 52 -0.13107200000000000000e6
-1110 1 6 37 -0.32768000000000000000e5
-1110 1 8 39 0.13107200000000000000e6
-1110 1 10 25 0.65536000000000000000e5
-1110 1 10 41 -0.13107200000000000000e6
-1110 1 11 42 -0.13107200000000000000e6
-1110 1 12 43 -0.26214400000000000000e6
-1110 1 17 48 0.52428800000000000000e6
-1110 1 23 38 0.32768000000000000000e5
-1110 1 24 26 0.32768000000000000000e5
-1110 1 26 41 -0.65536000000000000000e5
-1110 1 28 43 -0.13107200000000000000e6
-1110 2 2 32 0.32768000000000000000e5
-1110 2 4 18 0.32768000000000000000e5
-1110 2 4 26 -0.32768000000000000000e5
-1110 2 8 22 -0.26214400000000000000e6
-1110 2 12 26 0.13107200000000000000e6
-1110 2 16 30 0.65536000000000000000e5
-1110 3 2 31 0.13107200000000000000e6
-1110 3 4 17 0.32768000000000000000e5
-1110 3 5 18 0.32768000000000000000e5
-1110 3 6 19 0.65536000000000000000e5
-1110 3 8 21 -0.13107200000000000000e6
-1110 3 14 27 0.26214400000000000000e6
-1110 4 3 15 0.65536000000000000000e5
-1110 4 4 16 0.26214400000000000000e6
-1110 4 6 18 0.65536000000000000000e5
-1110 4 7 19 0.13107200000000000000e6
-1111 1 1 48 -0.16384000000000000000e5
-1111 1 2 49 -0.16384000000000000000e5
-1111 1 23 38 -0.16384000000000000000e5
-1111 1 24 27 0.32768000000000000000e5
-1111 2 2 32 -0.16384000000000000000e5
-1111 3 1 30 -0.32768000000000000000e5
-1112 1 8 39 -0.32768000000000000000e5
-1112 1 24 28 0.32768000000000000000e5
-1113 1 1 48 0.16384000000000000000e5
-1113 1 2 49 0.16384000000000000000e5
-1113 1 5 52 -0.65536000000000000000e5
-1113 1 8 39 0.32768000000000000000e5
-1113 1 9 40 0.32768000000000000000e5
-1113 1 10 41 -0.65536000000000000000e5
-1113 1 11 42 -0.65536000000000000000e5
-1113 1 12 43 -0.13107200000000000000e6
-1113 1 17 48 0.26214400000000000000e6
-1113 1 23 38 0.16384000000000000000e5
-1113 1 24 29 0.32768000000000000000e5
-1113 1 26 41 -0.32768000000000000000e5
-1113 1 28 43 -0.65536000000000000000e5
-1113 2 2 32 0.16384000000000000000e5
-1113 2 8 22 -0.13107200000000000000e6
-1113 2 12 26 0.65536000000000000000e5
-1113 2 16 30 0.32768000000000000000e5
-1113 3 2 31 0.65536000000000000000e5
-1113 3 14 27 0.13107200000000000000e6
-1113 4 4 16 0.13107200000000000000e6
-1113 4 6 18 0.32768000000000000000e5
-1113 4 7 19 0.65536000000000000000e5
-1114 1 9 40 -0.32768000000000000000e5
-1114 1 24 30 0.32768000000000000000e5
-1115 1 11 42 -0.32768000000000000000e5
-1115 1 12 43 -0.65536000000000000000e5
-1115 1 17 48 0.65536000000000000000e5
-1115 1 24 31 0.32768000000000000000e5
-1115 2 8 22 -0.32768000000000000000e5
-1115 2 12 26 0.32768000000000000000e5
-1115 3 14 27 0.65536000000000000000e5
-1115 4 4 16 0.32768000000000000000e5
-1116 1 10 41 -0.32768000000000000000e5
-1116 1 24 32 0.32768000000000000000e5
-1117 1 10 41 0.32768000000000000000e5
-1117 1 11 42 0.32768000000000000000e5
-1117 1 17 48 -0.65536000000000000000e5
-1117 1 24 33 0.32768000000000000000e5
-1117 2 8 22 0.32768000000000000000e5
-1117 3 14 27 -0.65536000000000000000e5
-1117 4 4 16 -0.32768000000000000000e5
-1118 1 12 43 -0.32768000000000000000e5
-1118 1 24 34 0.32768000000000000000e5
-1119 1 17 48 -0.32768000000000000000e5
-1119 1 24 35 0.32768000000000000000e5
-1119 3 14 27 -0.32768000000000000000e5
-1120 1 24 36 0.32768000000000000000e5
-1120 1 28 35 -0.32768000000000000000e5
-1121 1 23 38 -0.32768000000000000000e5
-1121 1 24 37 0.32768000000000000000e5
-1122 1 2 49 -0.32768000000000000000e5
-1122 1 24 38 0.32768000000000000000e5
-1123 1 1 48 0.32768000000000000000e5
-1123 1 2 49 0.65536000000000000000e5
-1123 1 3 50 0.65536000000000000000e5
-1123 1 11 42 -0.13107200000000000000e6
-1123 1 12 43 -0.26214400000000000000e6
-1123 1 17 48 0.26214400000000000000e6
-1123 1 23 38 0.32768000000000000000e5
-1123 1 24 39 0.32768000000000000000e5
-1123 1 24 40 0.32768000000000000000e5
-1123 2 2 32 0.32768000000000000000e5
-1123 2 3 33 0.32768000000000000000e5
-1123 2 8 22 -0.13107200000000000000e6
-1123 2 12 26 0.13107200000000000000e6
-1123 2 16 30 0.65536000000000000000e5
-1123 3 2 31 0.13107200000000000000e6
-1123 3 14 27 0.26214400000000000000e6
-1123 4 4 16 0.13107200000000000000e6
-1124 1 3 50 -0.32768000000000000000e5
-1124 1 24 41 0.32768000000000000000e5
-1125 1 1 48 0.16384000000000000000e5
-1125 1 2 49 0.16384000000000000000e5
-1125 1 3 50 0.32768000000000000000e5
-1125 1 11 42 -0.65536000000000000000e5
-1125 1 12 43 -0.13107200000000000000e6
-1125 1 17 48 0.13107200000000000000e6
-1125 1 23 38 0.16384000000000000000e5
-1125 1 24 42 0.32768000000000000000e5
-1125 2 2 32 0.16384000000000000000e5
-1125 2 8 22 -0.65536000000000000000e5
-1125 2 12 26 0.65536000000000000000e5
-1125 2 16 30 0.32768000000000000000e5
-1125 3 2 31 0.65536000000000000000e5
-1125 3 14 27 0.13107200000000000000e6
-1125 4 4 16 0.65536000000000000000e5
-1126 1 24 43 0.32768000000000000000e5
-1126 1 26 41 -0.32768000000000000000e5
-1127 1 5 52 0.32768000000000000000e5
-1127 1 17 48 -0.65536000000000000000e5
-1127 1 24 44 0.32768000000000000000e5
-1127 1 28 43 0.32768000000000000000e5
-1127 2 8 22 0.32768000000000000000e5
-1127 4 4 16 -0.32768000000000000000e5
-1127 4 7 19 -0.32768000000000000000e5
-1128 1 24 45 0.32768000000000000000e5
-1128 1 28 43 -0.32768000000000000000e5
-1129 1 17 48 -0.32768000000000000000e5
-1129 1 24 46 0.32768000000000000000e5
-1130 1 2 49 -0.32768000000000000000e5
-1130 1 24 47 0.32768000000000000000e5
-1130 3 3 32 0.32768000000000000000e5
-1131 1 24 39 -0.32768000000000000000e5
-1131 1 24 48 0.32768000000000000000e5
-1131 2 3 33 -0.32768000000000000000e5
-1131 2 18 32 0.32768000000000000000e5
-1131 3 3 32 -0.32768000000000000000e5
-1131 3 4 33 -0.32768000000000000000e5
-1131 3 17 30 0.65536000000000000000e5
-1132 1 1 48 0.32768000000000000000e5
-1132 1 2 49 0.65536000000000000000e5
-1132 1 3 50 0.65536000000000000000e5
-1132 1 11 42 -0.13107200000000000000e6
-1132 1 12 43 -0.26214400000000000000e6
-1132 1 17 48 0.26214400000000000000e6
-1132 1 23 38 0.32768000000000000000e5
-1132 1 24 39 0.32768000000000000000e5
-1132 1 24 49 0.32768000000000000000e5
-1132 2 2 32 0.32768000000000000000e5
-1132 2 3 33 0.32768000000000000000e5
-1132 2 8 22 -0.13107200000000000000e6
-1132 2 12 26 0.13107200000000000000e6
-1132 2 16 30 0.65536000000000000000e5
-1132 3 2 31 0.13107200000000000000e6
-1132 3 4 33 0.32768000000000000000e5
-1132 3 14 27 0.26214400000000000000e6
-1132 4 4 16 0.13107200000000000000e6
-1133 1 1 48 0.16384000000000000000e5
-1133 1 2 49 0.16384000000000000000e5
-1133 1 3 50 0.32768000000000000000e5
-1133 1 11 42 -0.65536000000000000000e5
-1133 1 12 43 -0.13107200000000000000e6
-1133 1 17 48 0.13107200000000000000e6
-1133 1 23 38 0.16384000000000000000e5
-1133 1 24 50 0.32768000000000000000e5
-1133 2 2 32 0.16384000000000000000e5
-1133 2 8 22 -0.65536000000000000000e5
-1133 2 12 26 0.65536000000000000000e5
-1133 2 16 30 0.32768000000000000000e5
-1133 3 2 31 0.65536000000000000000e5
-1133 3 14 27 0.13107200000000000000e6
-1133 3 17 30 0.32768000000000000000e5
-1133 4 4 16 0.65536000000000000000e5
-1134 1 24 51 0.32768000000000000000e5
-1134 1 26 41 -0.32768000000000000000e5
-1134 3 22 27 0.32768000000000000000e5
-1135 1 24 52 0.32768000000000000000e5
-1135 1 28 43 -0.32768000000000000000e5
-1135 3 18 31 0.32768000000000000000e5
-1136 1 23 54 -0.32768000000000000000e5
-1136 1 24 53 0.32768000000000000000e5
-1137 1 1 48 0.32768000000000000000e5
-1137 1 2 49 0.65536000000000000000e5
-1137 1 3 50 0.65536000000000000000e5
-1137 1 11 42 -0.13107200000000000000e6
-1137 1 12 43 -0.26214400000000000000e6
-1137 1 17 48 0.26214400000000000000e6
-1137 1 23 38 0.32768000000000000000e5
-1137 1 24 39 0.32768000000000000000e5
-1137 1 24 54 0.32768000000000000000e5
-1137 2 2 32 0.32768000000000000000e5
-1137 2 3 33 0.32768000000000000000e5
-1137 2 8 22 -0.13107200000000000000e6
-1137 2 12 26 0.13107200000000000000e6
-1137 2 16 30 0.65536000000000000000e5
-1137 3 2 31 0.13107200000000000000e6
-1137 3 4 33 0.32768000000000000000e5
-1137 3 14 27 0.26214400000000000000e6
-1137 3 19 32 0.32768000000000000000e5
-1137 4 4 16 0.13107200000000000000e6
-1138 1 24 56 0.32768000000000000000e5
-1138 1 47 54 -0.32768000000000000000e5
-1138 3 32 33 -0.32768000000000000000e5
-1139 1 1 40 -0.16384000000000000000e5
-1139 1 1 48 0.16384000000000000000e5
-1139 1 2 49 0.16384000000000000000e5
-1139 1 3 26 0.16384000000000000000e5
-1139 1 5 52 -0.65536000000000000000e5
-1139 1 6 37 -0.16384000000000000000e5
-1139 1 8 39 0.65536000000000000000e5
-1139 1 10 25 0.32768000000000000000e5
-1139 1 10 41 -0.65536000000000000000e5
-1139 1 11 42 -0.65536000000000000000e5
-1139 1 12 43 -0.13107200000000000000e6
-1139 1 17 48 0.26214400000000000000e6
-1139 1 23 38 0.16384000000000000000e5
-1139 1 25 25 0.32768000000000000000e5
-1139 1 26 41 -0.32768000000000000000e5
-1139 1 28 43 -0.65536000000000000000e5
-1139 2 2 32 0.16384000000000000000e5
-1139 2 4 18 0.16384000000000000000e5
-1139 2 4 26 -0.16384000000000000000e5
-1139 2 8 22 -0.13107200000000000000e6
-1139 2 12 26 0.65536000000000000000e5
-1139 2 16 30 0.32768000000000000000e5
-1139 3 2 31 0.65536000000000000000e5
-1139 3 4 17 0.16384000000000000000e5
-1139 3 5 18 0.16384000000000000000e5
-1139 3 6 19 0.32768000000000000000e5
-1139 3 8 21 -0.65536000000000000000e5
-1139 3 14 27 0.13107200000000000000e6
-1139 4 3 15 0.32768000000000000000e5
-1139 4 4 16 0.13107200000000000000e6
-1139 4 6 18 0.32768000000000000000e5
-1139 4 7 19 0.65536000000000000000e5
-1140 1 1 40 0.32768000000000000000e5
-1140 1 1 48 -0.32768000000000000000e5
-1140 1 2 49 -0.32768000000000000000e5
-1140 1 3 26 -0.32768000000000000000e5
-1140 1 5 52 0.13107200000000000000e6
-1140 1 6 37 0.65536000000000000000e5
-1140 1 8 39 -0.13107200000000000000e6
-1140 1 9 40 -0.65536000000000000000e5
-1140 1 10 25 -0.65536000000000000000e5
-1140 1 10 41 0.13107200000000000000e6
-1140 1 11 42 0.13107200000000000000e6
-1140 1 12 43 0.26214400000000000000e6
-1140 1 17 48 -0.52428800000000000000e6
-1140 1 23 38 -0.32768000000000000000e5
-1140 1 25 26 0.32768000000000000000e5
-1140 1 26 41 0.65536000000000000000e5
-1140 1 28 43 0.13107200000000000000e6
-1140 2 2 32 -0.32768000000000000000e5
-1140 2 4 18 -0.32768000000000000000e5
-1140 2 4 26 0.32768000000000000000e5
-1140 2 5 27 0.32768000000000000000e5
-1140 2 8 22 0.26214400000000000000e6
-1140 2 12 26 -0.13107200000000000000e6
-1140 2 16 30 -0.65536000000000000000e5
-1140 3 2 31 -0.13107200000000000000e6
-1140 3 4 17 -0.32768000000000000000e5
-1140 3 5 18 -0.32768000000000000000e5
-1140 3 6 19 -0.65536000000000000000e5
-1140 3 8 21 0.13107200000000000000e6
-1140 3 14 27 -0.26214400000000000000e6
-1140 4 3 15 -0.65536000000000000000e5
-1140 4 4 16 -0.26214400000000000000e6
-1140 4 6 18 -0.65536000000000000000e5
-1140 4 7 19 -0.13107200000000000000e6
-1141 1 8 39 -0.32768000000000000000e5
-1141 1 25 27 0.32768000000000000000e5
-1142 1 1 48 0.16384000000000000000e5
-1142 1 2 49 0.16384000000000000000e5
-1142 1 5 52 -0.65536000000000000000e5
-1142 1 8 39 0.32768000000000000000e5
-1142 1 9 40 0.32768000000000000000e5
-1142 1 10 41 -0.65536000000000000000e5
-1142 1 11 42 -0.65536000000000000000e5
-1142 1 12 43 -0.13107200000000000000e6
-1142 1 17 48 0.26214400000000000000e6
-1142 1 23 38 0.16384000000000000000e5
-1142 1 25 28 0.32768000000000000000e5
-1142 1 26 41 -0.32768000000000000000e5
-1142 1 28 43 -0.65536000000000000000e5
-1142 2 2 32 0.16384000000000000000e5
-1142 2 8 22 -0.13107200000000000000e6
-1142 2 12 26 0.65536000000000000000e5
-1142 2 16 30 0.32768000000000000000e5
-1142 3 2 31 0.65536000000000000000e5
-1142 3 14 27 0.13107200000000000000e6
-1142 4 4 16 0.13107200000000000000e6
-1142 4 6 18 0.32768000000000000000e5
-1142 4 7 19 0.65536000000000000000e5
-1143 1 9 40 -0.32768000000000000000e5
-1143 1 25 29 0.32768000000000000000e5
-1144 1 25 30 0.32768000000000000000e5
-1144 1 26 29 -0.32768000000000000000e5
-1145 1 10 41 -0.32768000000000000000e5
-1145 1 25 31 0.32768000000000000000e5
-1146 1 10 41 0.32768000000000000000e5
-1146 1 11 42 0.32768000000000000000e5
-1146 1 17 48 -0.65536000000000000000e5
-1146 1 25 32 0.32768000000000000000e5
-1146 2 8 22 0.32768000000000000000e5
-1146 3 14 27 -0.65536000000000000000e5
-1146 4 4 16 -0.32768000000000000000e5
-1147 1 11 42 -0.32768000000000000000e5
-1147 1 25 33 0.32768000000000000000e5
-1148 1 17 48 -0.32768000000000000000e5
-1148 1 25 34 0.32768000000000000000e5
-1148 3 14 27 -0.32768000000000000000e5
-1149 1 18 25 -0.32768000000000000000e5
-1149 1 25 35 0.32768000000000000000e5
-1149 3 14 19 0.32768000000000000000e5
-1150 1 14 45 -0.32768000000000000000e5
-1150 1 25 36 0.32768000000000000000e5
-1151 1 2 49 -0.32768000000000000000e5
-1151 1 25 37 0.32768000000000000000e5
-1152 1 24 39 -0.32768000000000000000e5
-1152 1 25 38 0.32768000000000000000e5
-1153 1 1 48 0.32768000000000000000e5
-1153 1 2 49 0.65536000000000000000e5
-1153 1 3 50 0.65536000000000000000e5
-1153 1 11 42 -0.13107200000000000000e6
-1153 1 12 43 -0.26214400000000000000e6
-1153 1 17 48 0.26214400000000000000e6
-1153 1 23 38 0.32768000000000000000e5
-1153 1 24 39 0.32768000000000000000e5
-1153 1 25 39 0.32768000000000000000e5
-1153 2 2 32 0.32768000000000000000e5
-1153 2 3 33 0.32768000000000000000e5
-1153 2 8 22 -0.13107200000000000000e6
-1153 2 12 26 0.13107200000000000000e6
-1153 2 16 30 0.65536000000000000000e5
-1153 3 2 31 0.13107200000000000000e6
-1153 3 14 27 0.26214400000000000000e6
-1153 4 4 16 0.13107200000000000000e6
-1154 1 1 48 0.16384000000000000000e5
-1154 1 2 49 0.16384000000000000000e5
-1154 1 3 50 0.32768000000000000000e5
-1154 1 11 42 -0.65536000000000000000e5
-1154 1 12 43 -0.13107200000000000000e6
-1154 1 17 48 0.13107200000000000000e6
-1154 1 23 38 0.16384000000000000000e5
-1154 1 25 41 0.32768000000000000000e5
-1154 2 2 32 0.16384000000000000000e5
-1154 2 8 22 -0.65536000000000000000e5
-1154 2 12 26 0.65536000000000000000e5
-1154 2 16 30 0.32768000000000000000e5
-1154 3 2 31 0.65536000000000000000e5
-1154 3 14 27 0.13107200000000000000e6
-1154 4 4 16 0.65536000000000000000e5
-1155 1 25 42 0.32768000000000000000e5
-1155 1 26 41 -0.32768000000000000000e5
-1156 1 1 48 -0.16384000000000000000e5
-1156 1 2 49 -0.16384000000000000000e5
-1156 1 3 50 -0.32768000000000000000e5
-1156 1 11 42 0.65536000000000000000e5
-1156 1 12 43 0.13107200000000000000e6
-1156 1 17 48 -0.13107200000000000000e6
-1156 1 23 38 -0.16384000000000000000e5
-1156 1 25 43 0.32768000000000000000e5
-1156 1 26 41 0.32768000000000000000e5
-1156 1 28 43 -0.65536000000000000000e5
-1156 2 2 32 -0.16384000000000000000e5
-1156 2 4 34 0.32768000000000000000e5
-1156 2 8 22 0.65536000000000000000e5
-1156 2 12 26 -0.65536000000000000000e5
-1156 2 16 30 -0.32768000000000000000e5
-1156 3 2 31 -0.65536000000000000000e5
-1156 3 14 27 -0.13107200000000000000e6
-1156 4 4 16 -0.65536000000000000000e5
-1157 1 25 44 0.32768000000000000000e5
-1157 1 28 43 -0.32768000000000000000e5
-1158 1 5 52 -0.32768000000000000000e5
-1158 1 25 45 0.32768000000000000000e5
-1159 1 14 45 -0.65536000000000000000e5
-1159 1 17 48 0.32768000000000000000e5
-1159 1 18 49 0.32768000000000000000e5
-1159 1 25 46 0.32768000000000000000e5
-1159 2 24 30 0.32768000000000000000e5
-1159 3 15 28 0.65536000000000000000e5
-1160 1 24 39 -0.32768000000000000000e5
-1160 1 25 47 0.32768000000000000000e5
-1160 2 3 33 -0.32768000000000000000e5
-1160 2 18 32 0.32768000000000000000e5
-1160 3 3 32 -0.32768000000000000000e5
-1160 3 4 33 -0.32768000000000000000e5
-1160 3 17 30 0.65536000000000000000e5
-1161 1 1 48 0.32768000000000000000e5
-1161 1 2 49 0.65536000000000000000e5
-1161 1 3 50 0.65536000000000000000e5
-1161 1 11 42 -0.13107200000000000000e6
-1161 1 12 43 -0.26214400000000000000e6
-1161 1 17 48 0.26214400000000000000e6
-1161 1 23 38 0.32768000000000000000e5
-1161 1 24 39 0.32768000000000000000e5
-1161 1 25 48 0.32768000000000000000e5
-1161 2 2 32 0.32768000000000000000e5
-1161 2 3 33 0.32768000000000000000e5
-1161 2 8 22 -0.13107200000000000000e6
-1161 2 12 26 0.13107200000000000000e6
-1161 2 16 30 0.65536000000000000000e5
-1161 3 2 31 0.13107200000000000000e6
-1161 3 4 33 0.32768000000000000000e5
-1161 3 14 27 0.26214400000000000000e6
-1161 4 4 16 0.13107200000000000000e6
-1162 1 6 53 -0.32768000000000000000e5
-1162 1 25 49 0.32768000000000000000e5
-1163 1 25 50 0.32768000000000000000e5
-1163 1 26 41 -0.32768000000000000000e5
-1163 3 22 27 0.32768000000000000000e5
-1164 1 1 48 -0.16384000000000000000e5
-1164 1 2 49 -0.16384000000000000000e5
-1164 1 3 50 -0.32768000000000000000e5
-1164 1 11 42 0.65536000000000000000e5
-1164 1 12 43 0.13107200000000000000e6
-1164 1 17 48 -0.13107200000000000000e6
-1164 1 23 38 -0.16384000000000000000e5
-1164 1 25 51 0.32768000000000000000e5
-1164 1 26 41 0.32768000000000000000e5
-1164 1 28 43 -0.65536000000000000000e5
-1164 2 2 32 -0.16384000000000000000e5
-1164 2 4 34 0.32768000000000000000e5
-1164 2 8 22 0.65536000000000000000e5
-1164 2 12 26 -0.65536000000000000000e5
-1164 2 16 30 -0.32768000000000000000e5
-1164 3 2 31 -0.65536000000000000000e5
-1164 3 5 34 0.32768000000000000000e5
-1164 3 14 27 -0.13107200000000000000e6
-1164 4 4 16 -0.65536000000000000000e5
-1165 1 25 52 0.32768000000000000000e5
-1165 1 33 48 -0.32768000000000000000e5
-1166 1 1 48 0.32768000000000000000e5
-1166 1 2 49 0.65536000000000000000e5
-1166 1 3 50 0.65536000000000000000e5
-1166 1 11 42 -0.13107200000000000000e6
-1166 1 12 43 -0.26214400000000000000e6
-1166 1 17 48 0.26214400000000000000e6
-1166 1 23 38 0.32768000000000000000e5
-1166 1 24 39 0.32768000000000000000e5
-1166 1 25 53 0.32768000000000000000e5
-1166 2 2 32 0.32768000000000000000e5
-1166 2 3 33 0.32768000000000000000e5
-1166 2 8 22 -0.13107200000000000000e6
-1166 2 12 26 0.13107200000000000000e6
-1166 2 16 30 0.65536000000000000000e5
-1166 3 2 31 0.13107200000000000000e6
-1166 3 4 33 0.32768000000000000000e5
-1166 3 14 27 0.26214400000000000000e6
-1166 3 19 32 0.32768000000000000000e5
-1166 4 4 16 0.13107200000000000000e6
-1167 1 25 54 0.32768000000000000000e5
-1167 1 25 56 -0.32768000000000000000e5
-1167 3 28 33 -0.32768000000000000000e5
-1168 1 1 48 -0.16384000000000000000e5
-1168 1 2 49 -0.16384000000000000000e5
-1168 1 3 50 -0.32768000000000000000e5
-1168 1 11 42 0.65536000000000000000e5
-1168 1 12 43 0.13107200000000000000e6
-1168 1 17 48 -0.13107200000000000000e6
-1168 1 23 38 -0.16384000000000000000e5
-1168 1 24 55 0.32768000000000000000e5
-1168 1 25 55 0.32768000000000000000e5
-1168 1 28 43 -0.65536000000000000000e5
-1168 2 2 32 -0.16384000000000000000e5
-1168 2 8 22 0.65536000000000000000e5
-1168 2 12 26 -0.65536000000000000000e5
-1168 2 16 30 -0.32768000000000000000e5
-1168 2 21 35 0.32768000000000000000e5
-1168 3 2 31 -0.65536000000000000000e5
-1168 3 14 27 -0.13107200000000000000e6
-1168 3 17 30 -0.32768000000000000000e5
-1168 3 18 31 0.65536000000000000000e5
-1168 3 20 33 -0.32768000000000000000e5
-1168 3 21 34 0.65536000000000000000e5
-1168 4 4 16 -0.65536000000000000000e5
-1169 1 6 37 -0.16384000000000000000e5
-1169 1 9 40 0.32768000000000000000e5
-1169 1 26 26 0.32768000000000000000e5
-1169 1 26 29 -0.32768000000000000000e5
-1169 2 5 27 -0.16384000000000000000e5
-1169 2 19 19 0.32768000000000000000e5
-1170 1 1 48 0.16384000000000000000e5
-1170 1 2 49 0.16384000000000000000e5
-1170 1 5 52 -0.65536000000000000000e5
-1170 1 8 39 0.32768000000000000000e5
-1170 1 9 40 0.32768000000000000000e5
-1170 1 10 41 -0.65536000000000000000e5
-1170 1 11 42 -0.65536000000000000000e5
-1170 1 12 43 -0.13107200000000000000e6
-1170 1 17 48 0.26214400000000000000e6
-1170 1 23 38 0.16384000000000000000e5
-1170 1 26 27 0.32768000000000000000e5
-1170 1 26 41 -0.32768000000000000000e5
-1170 1 28 43 -0.65536000000000000000e5
-1170 2 2 32 0.16384000000000000000e5
-1170 2 8 22 -0.13107200000000000000e6
-1170 2 12 26 0.65536000000000000000e5
-1170 2 16 30 0.32768000000000000000e5
-1170 3 2 31 0.65536000000000000000e5
-1170 3 14 27 0.13107200000000000000e6
-1170 4 4 16 0.13107200000000000000e6
-1170 4 6 18 0.32768000000000000000e5
-1170 4 7 19 0.65536000000000000000e5
-1171 1 9 40 -0.32768000000000000000e5
-1171 1 26 28 0.32768000000000000000e5
-1172 1 6 43 -0.32768000000000000000e5
-1172 1 26 30 0.32768000000000000000e5
-1173 1 10 41 0.32768000000000000000e5
-1173 1 11 42 0.32768000000000000000e5
-1173 1 17 48 -0.65536000000000000000e5
-1173 1 26 31 0.32768000000000000000e5
-1173 2 8 22 0.32768000000000000000e5
-1173 3 14 27 -0.65536000000000000000e5
-1173 4 4 16 -0.32768000000000000000e5
-1174 1 11 42 -0.32768000000000000000e5
-1174 1 26 32 0.32768000000000000000e5
-1175 1 18 25 -0.32768000000000000000e5
-1175 1 26 34 0.32768000000000000000e5
-1175 3 14 19 0.32768000000000000000e5
-1176 1 14 45 -0.65536000000000000000e5
-1176 1 17 48 0.32768000000000000000e5
-1176 1 18 25 0.32768000000000000000e5
-1176 1 26 35 0.32768000000000000000e5
-1176 2 14 28 0.32768000000000000000e5
-1176 3 14 19 -0.32768000000000000000e5
-1176 3 14 27 0.32768000000000000000e5
-1177 1 11 46 -0.32768000000000000000e5
-1177 1 26 36 0.32768000000000000000e5
-1178 1 24 39 -0.32768000000000000000e5
-1178 1 26 37 0.32768000000000000000e5
-1179 1 1 48 0.32768000000000000000e5
-1179 1 2 49 0.65536000000000000000e5
-1179 1 3 50 0.65536000000000000000e5
-1179 1 11 42 -0.13107200000000000000e6
-1179 1 12 43 -0.26214400000000000000e6
-1179 1 17 48 0.26214400000000000000e6
-1179 1 23 38 0.32768000000000000000e5
-1179 1 24 39 0.32768000000000000000e5
-1179 1 26 38 0.32768000000000000000e5
-1179 2 2 32 0.32768000000000000000e5
-1179 2 3 33 0.32768000000000000000e5
-1179 2 8 22 -0.13107200000000000000e6
-1179 2 12 26 0.13107200000000000000e6
-1179 2 16 30 0.65536000000000000000e5
-1179 3 2 31 0.13107200000000000000e6
-1179 3 14 27 0.26214400000000000000e6
-1179 4 4 16 0.13107200000000000000e6
-1180 1 25 40 -0.32768000000000000000e5
-1180 1 26 39 0.32768000000000000000e5
-1181 1 6 49 -0.32768000000000000000e5
-1181 1 26 40 0.32768000000000000000e5
-1182 1 1 48 -0.16384000000000000000e5
-1182 1 2 49 -0.16384000000000000000e5
-1182 1 3 50 -0.32768000000000000000e5
-1182 1 11 42 0.65536000000000000000e5
-1182 1 12 43 0.13107200000000000000e6
-1182 1 17 48 -0.13107200000000000000e6
-1182 1 23 38 -0.16384000000000000000e5
-1182 1 26 41 0.32768000000000000000e5
-1182 1 26 42 0.32768000000000000000e5
-1182 1 28 43 -0.65536000000000000000e5
-1182 2 2 32 -0.16384000000000000000e5
-1182 2 4 34 0.32768000000000000000e5
-1182 2 8 22 0.65536000000000000000e5
-1182 2 12 26 -0.65536000000000000000e5
-1182 2 16 30 -0.32768000000000000000e5
-1182 3 2 31 -0.65536000000000000000e5
-1182 3 14 27 -0.13107200000000000000e6
-1182 4 4 16 -0.65536000000000000000e5
-1183 1 1 48 0.16384000000000000000e5
-1183 1 2 49 0.16384000000000000000e5
-1183 1 3 50 0.32768000000000000000e5
-1183 1 5 52 -0.65536000000000000000e5
-1183 1 11 42 -0.65536000000000000000e5
-1183 1 12 43 -0.13107200000000000000e6
-1183 1 17 48 0.13107200000000000000e6
-1183 1 23 38 0.16384000000000000000e5
-1183 1 26 43 0.32768000000000000000e5
-1183 1 28 43 0.65536000000000000000e5
-1183 2 2 32 0.16384000000000000000e5
-1183 2 4 34 -0.32768000000000000000e5
-1183 2 8 22 -0.65536000000000000000e5
-1183 2 12 26 0.65536000000000000000e5
-1183 2 16 30 0.32768000000000000000e5
-1183 2 22 28 0.32768000000000000000e5
-1183 3 2 31 0.65536000000000000000e5
-1183 3 14 27 0.13107200000000000000e6
-1183 4 4 16 0.65536000000000000000e5
-1184 1 5 52 -0.32768000000000000000e5
-1184 1 26 44 0.32768000000000000000e5
-1185 1 26 45 0.32768000000000000000e5
-1185 1 33 40 -0.32768000000000000000e5
-1186 1 18 49 -0.32768000000000000000e5
-1186 1 26 46 0.32768000000000000000e5
-1187 1 1 48 0.32768000000000000000e5
-1187 1 2 49 0.65536000000000000000e5
-1187 1 3 50 0.65536000000000000000e5
-1187 1 11 42 -0.13107200000000000000e6
-1187 1 12 43 -0.26214400000000000000e6
-1187 1 17 48 0.26214400000000000000e6
-1187 1 23 38 0.32768000000000000000e5
-1187 1 24 39 0.32768000000000000000e5
-1187 1 26 47 0.32768000000000000000e5
-1187 2 2 32 0.32768000000000000000e5
-1187 2 3 33 0.32768000000000000000e5
-1187 2 8 22 -0.13107200000000000000e6
-1187 2 12 26 0.13107200000000000000e6
-1187 2 16 30 0.65536000000000000000e5
-1187 3 2 31 0.13107200000000000000e6
-1187 3 4 33 0.32768000000000000000e5
-1187 3 14 27 0.26214400000000000000e6
-1187 4 4 16 0.13107200000000000000e6
-1188 1 6 53 -0.32768000000000000000e5
-1188 1 26 48 0.32768000000000000000e5
-1189 1 1 48 -0.65536000000000000000e5
-1189 1 2 49 -0.98304000000000000000e5
-1189 1 3 50 -0.13107200000000000000e6
-1189 1 6 53 0.32768000000000000000e5
-1189 1 11 42 0.26214400000000000000e6
-1189 1 12 43 0.52428800000000000000e6
-1189 1 17 48 -0.52428800000000000000e6
-1189 1 23 38 -0.65536000000000000000e5
-1189 1 24 39 -0.32768000000000000000e5
-1189 1 26 41 0.65536000000000000000e5
-1189 1 26 49 0.32768000000000000000e5
-1189 1 28 43 -0.13107200000000000000e6
-1189 2 2 32 -0.65536000000000000000e5
-1189 2 3 33 -0.32768000000000000000e5
-1189 2 4 34 0.65536000000000000000e5
-1189 2 5 35 0.32768000000000000000e5
-1189 2 8 22 0.26214400000000000000e6
-1189 2 12 26 -0.26214400000000000000e6
-1189 2 16 30 -0.13107200000000000000e6
-1189 3 2 31 -0.26214400000000000000e6
-1189 3 4 33 -0.32768000000000000000e5
-1189 3 5 34 0.65536000000000000000e5
-1189 3 14 27 -0.52428800000000000000e6
-1189 4 4 16 -0.26214400000000000000e6
-1190 1 1 48 -0.16384000000000000000e5
-1190 1 2 49 -0.16384000000000000000e5
-1190 1 3 50 -0.32768000000000000000e5
-1190 1 11 42 0.65536000000000000000e5
-1190 1 12 43 0.13107200000000000000e6
-1190 1 17 48 -0.13107200000000000000e6
-1190 1 23 38 -0.16384000000000000000e5
-1190 1 26 41 0.32768000000000000000e5
-1190 1 26 50 0.32768000000000000000e5
-1190 1 28 43 -0.65536000000000000000e5
-1190 2 2 32 -0.16384000000000000000e5
-1190 2 4 34 0.32768000000000000000e5
-1190 2 8 22 0.65536000000000000000e5
-1190 2 12 26 -0.65536000000000000000e5
-1190 2 16 30 -0.32768000000000000000e5
-1190 3 2 31 -0.65536000000000000000e5
-1190 3 5 34 0.32768000000000000000e5
-1190 3 14 27 -0.13107200000000000000e6
-1190 4 4 16 -0.65536000000000000000e5
-1191 1 1 48 0.16384000000000000000e5
-1191 1 2 49 0.16384000000000000000e5
-1191 1 3 50 0.32768000000000000000e5
-1191 1 11 42 -0.65536000000000000000e5
-1191 1 12 43 -0.13107200000000000000e6
-1191 1 17 48 0.13107200000000000000e6
-1191 1 23 38 0.16384000000000000000e5
-1191 1 26 51 0.32768000000000000000e5
-1191 1 28 43 0.65536000000000000000e5
-1191 1 33 48 -0.65536000000000000000e5
-1191 2 2 32 0.16384000000000000000e5
-1191 2 4 34 -0.32768000000000000000e5
-1191 2 8 22 -0.65536000000000000000e5
-1191 2 12 26 0.65536000000000000000e5
-1191 2 16 30 0.32768000000000000000e5
-1191 2 28 30 0.32768000000000000000e5
-1191 3 2 31 0.65536000000000000000e5
-1191 3 5 34 -0.32768000000000000000e5
-1191 3 14 27 0.13107200000000000000e6
-1191 3 22 27 -0.32768000000000000000e5
-1191 4 4 16 0.65536000000000000000e5
-1192 1 15 54 -0.32768000000000000000e5
-1192 1 26 52 0.32768000000000000000e5
-1193 1 25 56 -0.32768000000000000000e5
-1193 1 26 53 0.32768000000000000000e5
-1193 3 28 33 -0.32768000000000000000e5
-1194 1 1 48 -0.65536000000000000000e5
-1194 1 2 49 -0.98304000000000000000e5
-1194 1 3 50 -0.13107200000000000000e6
-1194 1 11 42 0.26214400000000000000e6
-1194 1 12 43 0.52428800000000000000e6
-1194 1 17 48 -0.52428800000000000000e6
-1194 1 23 38 -0.65536000000000000000e5
-1194 1 24 39 -0.32768000000000000000e5
-1194 1 24 55 0.65536000000000000000e5
-1194 1 25 56 0.32768000000000000000e5
-1194 1 26 54 0.32768000000000000000e5
-1194 1 28 43 -0.13107200000000000000e6
-1194 2 2 32 -0.65536000000000000000e5
-1194 2 3 33 -0.32768000000000000000e5
-1194 2 8 22 0.26214400000000000000e6
-1194 2 12 26 -0.26214400000000000000e6
-1194 2 16 30 -0.13107200000000000000e6
-1194 2 19 35 0.32768000000000000000e5
-1194 2 21 35 0.65536000000000000000e5
-1194 3 2 31 -0.26214400000000000000e6
-1194 3 4 33 -0.32768000000000000000e5
-1194 3 14 27 -0.52428800000000000000e6
-1194 3 17 30 -0.65536000000000000000e5
-1194 3 18 31 0.13107200000000000000e6
-1194 3 19 32 -0.32768000000000000000e5
-1194 3 20 33 -0.65536000000000000000e5
-1194 3 21 34 0.13107200000000000000e6
-1194 3 28 33 0.32768000000000000000e5
-1194 4 4 16 -0.26214400000000000000e6
-1195 1 1 48 0.16384000000000000000e5
-1195 1 2 49 0.16384000000000000000e5
-1195 1 3 50 0.32768000000000000000e5
-1195 1 11 42 -0.65536000000000000000e5
-1195 1 12 43 -0.13107200000000000000e6
-1195 1 17 48 0.13107200000000000000e6
-1195 1 23 38 0.16384000000000000000e5
-1195 1 26 55 0.32768000000000000000e5
-1195 1 28 43 0.65536000000000000000e5
-1195 1 43 50 -0.65536000000000000000e5
-1195 2 2 32 0.16384000000000000000e5
-1195 2 8 22 -0.65536000000000000000e5
-1195 2 12 26 0.65536000000000000000e5
-1195 2 16 30 0.32768000000000000000e5
-1195 2 21 35 -0.32768000000000000000e5
-1195 2 28 34 0.32768000000000000000e5
-1195 3 2 31 0.65536000000000000000e5
-1195 3 14 27 0.13107200000000000000e6
-1195 3 17 30 0.32768000000000000000e5
-1195 3 18 31 -0.65536000000000000000e5
-1195 3 20 33 0.32768000000000000000e5
-1195 3 21 34 -0.65536000000000000000e5
-1195 4 4 16 0.65536000000000000000e5
-1196 1 1 48 -0.32768000000000000000e5
-1196 1 2 49 -0.32768000000000000000e5
-1196 1 3 50 -0.65536000000000000000e5
-1196 1 11 42 0.13107200000000000000e6
-1196 1 12 43 0.26214400000000000000e6
-1196 1 17 48 -0.26214400000000000000e6
-1196 1 23 38 -0.32768000000000000000e5
-1196 1 24 55 0.65536000000000000000e5
-1196 1 25 56 0.32768000000000000000e5
-1196 1 26 56 0.32768000000000000000e5
-1196 1 28 43 -0.13107200000000000000e6
-1196 1 47 54 0.32768000000000000000e5
-1196 2 2 32 -0.32768000000000000000e5
-1196 2 8 22 0.13107200000000000000e6
-1196 2 12 26 -0.13107200000000000000e6
-1196 2 16 30 -0.65536000000000000000e5
-1196 2 21 35 0.65536000000000000000e5
-1196 2 33 33 0.65536000000000000000e5
-1196 3 2 31 -0.13107200000000000000e6
-1196 3 14 27 -0.26214400000000000000e6
-1196 3 17 30 -0.65536000000000000000e5
-1196 3 18 31 0.13107200000000000000e6
-1196 3 20 33 -0.65536000000000000000e5
-1196 3 21 34 0.13107200000000000000e6
-1196 3 22 35 0.65536000000000000000e5
-1196 3 32 33 0.32768000000000000000e5
-1196 4 4 16 -0.13107200000000000000e6
-1197 1 2 17 -0.32768000000000000000e5
-1197 1 2 33 -0.16384000000000000000e5
-1197 1 3 34 0.32768000000000000000e5
-1197 1 10 41 -0.16384000000000000000e5
-1197 1 11 42 0.16384000000000000000e5
-1197 1 12 43 0.32768000000000000000e5
-1197 1 17 48 -0.32768000000000000000e5
-1197 1 27 27 0.32768000000000000000e5
-1197 2 1 31 0.16384000000000000000e5
-1197 2 7 21 -0.16384000000000000000e5
-1197 2 8 22 0.16384000000000000000e5
-1197 2 12 26 -0.16384000000000000000e5
-1197 3 1 14 0.32768000000000000000e5
-1197 3 6 23 0.32768000000000000000e5
-1197 3 7 20 -0.16384000000000000000e5
-1197 3 8 21 -0.16384000000000000000e5
-1197 3 14 27 -0.32768000000000000000e5
-1197 4 4 16 -0.16384000000000000000e5
-1198 1 2 33 0.32768000000000000000e5
-1198 1 3 34 -0.65536000000000000000e5
-1198 1 10 41 0.32768000000000000000e5
-1198 1 27 28 0.32768000000000000000e5
-1198 2 7 21 0.32768000000000000000e5
-1198 3 7 20 0.32768000000000000000e5
-1198 3 8 21 0.32768000000000000000e5
-1199 1 11 42 -0.32768000000000000000e5
-1199 1 12 43 -0.65536000000000000000e5
-1199 1 17 48 0.65536000000000000000e5
-1199 1 27 29 0.32768000000000000000e5
-1199 2 8 22 -0.32768000000000000000e5
-1199 2 12 26 0.32768000000000000000e5
-1199 3 14 27 0.65536000000000000000e5
-1199 4 4 16 0.32768000000000000000e5
-1200 1 10 41 -0.32768000000000000000e5
-1200 1 27 30 0.32768000000000000000e5
-1201 1 2 17 -0.32768000000000000000e5
-1201 1 27 31 0.32768000000000000000e5
-1201 3 1 14 0.32768000000000000000e5
-1201 3 6 23 0.32768000000000000000e5
-1202 1 16 47 -0.32768000000000000000e5
-1202 1 27 32 0.32768000000000000000e5
-1202 3 13 26 -0.32768000000000000000e5
-1203 1 12 43 -0.32768000000000000000e5
-1203 1 27 33 0.32768000000000000000e5
-1204 1 4 19 0.32768000000000000000e5
-1204 1 20 27 -0.65536000000000000000e5
-1204 1 27 34 0.32768000000000000000e5
-1204 1 28 35 0.32768000000000000000e5
-1204 2 10 24 0.32768000000000000000e5
-1204 3 8 13 -0.32768000000000000000e5
-1204 3 10 23 0.32768000000000000000e5
-1204 3 11 24 0.32768000000000000000e5
-1205 1 13 44 -0.32768000000000000000e5
-1205 1 27 35 0.32768000000000000000e5
-1206 1 4 19 0.16384000000000000000e5
-1206 1 13 44 -0.16384000000000000000e5
-1206 1 20 27 -0.32768000000000000000e5
-1206 1 27 36 0.32768000000000000000e5
-1206 3 8 13 -0.16384000000000000000e5
-1206 3 10 23 0.16384000000000000000e5
-1206 3 11 24 0.16384000000000000000e5
-1206 4 10 14 0.16384000000000000000e5
-1207 1 2 33 -0.65536000000000000000e5
-1207 1 3 34 0.13107200000000000000e6
-1207 1 3 50 0.32768000000000000000e5
-1207 1 5 52 -0.65536000000000000000e5
-1207 1 7 38 -0.32768000000000000000e5
-1207 1 8 39 -0.32768000000000000000e5
-1207 1 10 41 -0.65536000000000000000e5
-1207 1 11 42 0.65536000000000000000e5
-1207 1 12 43 0.13107200000000000000e6
-1207 1 16 47 -0.13107200000000000000e6
-1207 1 27 37 0.32768000000000000000e5
-1207 1 28 43 -0.65536000000000000000e5
-1207 2 7 21 -0.65536000000000000000e5
-1207 2 10 32 0.65536000000000000000e5
-1207 2 12 26 -0.65536000000000000000e5
-1207 3 1 30 -0.32768000000000000000e5
-1207 3 2 31 -0.65536000000000000000e5
-1207 3 7 20 -0.65536000000000000000e5
-1207 3 8 21 -0.65536000000000000000e5
-1207 3 14 27 -0.13107200000000000000e6
-1207 4 5 17 -0.32768000000000000000e5
-1207 4 7 19 0.65536000000000000000e5
-1208 1 1 48 -0.16384000000000000000e5
-1208 1 2 49 -0.16384000000000000000e5
-1208 1 23 38 -0.16384000000000000000e5
-1208 1 27 38 0.32768000000000000000e5
-1208 2 2 32 -0.16384000000000000000e5
-1209 1 3 50 -0.32768000000000000000e5
-1209 1 27 39 0.32768000000000000000e5
-1210 1 1 48 0.16384000000000000000e5
-1210 1 2 49 0.16384000000000000000e5
-1210 1 3 50 0.32768000000000000000e5
-1210 1 11 42 -0.65536000000000000000e5
-1210 1 12 43 -0.13107200000000000000e6
-1210 1 17 48 0.13107200000000000000e6
-1210 1 23 38 0.16384000000000000000e5
-1210 1 27 40 0.32768000000000000000e5
-1210 2 2 32 0.16384000000000000000e5
-1210 2 8 22 -0.65536000000000000000e5
-1210 2 12 26 0.65536000000000000000e5
-1210 2 16 30 0.32768000000000000000e5
-1210 3 2 31 0.65536000000000000000e5
-1210 3 14 27 0.13107200000000000000e6
-1210 4 4 16 0.65536000000000000000e5
-1211 1 5 52 -0.32768000000000000000e5
-1211 1 11 42 0.32768000000000000000e5
-1211 1 12 43 0.65536000000000000000e5
-1211 1 16 47 -0.65536000000000000000e5
-1211 1 27 41 0.32768000000000000000e5
-1211 1 28 43 -0.32768000000000000000e5
-1211 2 10 32 0.32768000000000000000e5
-1211 2 12 26 -0.32768000000000000000e5
-1211 3 2 31 -0.32768000000000000000e5
-1211 3 14 27 -0.65536000000000000000e5
-1211 4 7 19 0.32768000000000000000e5
-1212 1 11 42 -0.32768000000000000000e5
-1212 1 12 43 -0.65536000000000000000e5
-1212 1 17 48 0.65536000000000000000e5
-1212 1 27 42 0.32768000000000000000e5
-1212 2 8 22 -0.32768000000000000000e5
-1212 2 12 26 0.32768000000000000000e5
-1212 3 2 31 0.32768000000000000000e5
-1212 3 14 27 0.65536000000000000000e5
-1212 4 4 16 0.32768000000000000000e5
-1213 1 5 52 0.32768000000000000000e5
-1213 1 17 48 -0.65536000000000000000e5
-1213 1 27 43 0.32768000000000000000e5
-1213 1 28 43 0.32768000000000000000e5
-1213 2 8 22 0.32768000000000000000e5
-1213 4 4 16 -0.32768000000000000000e5
-1213 4 7 19 -0.32768000000000000000e5
-1214 1 16 47 -0.32768000000000000000e5
-1214 1 27 44 0.32768000000000000000e5
-1215 1 5 52 0.16384000000000000000e5
-1215 1 11 42 -0.16384000000000000000e5
-1215 1 12 43 -0.32768000000000000000e5
-1215 1 27 45 0.32768000000000000000e5
-1215 2 12 26 0.16384000000000000000e5
-1215 2 20 34 -0.16384000000000000000e5
-1215 3 2 31 0.16384000000000000000e5
-1215 3 14 27 0.32768000000000000000e5
-1215 4 7 19 -0.16384000000000000000e5
-1215 4 8 20 -0.16384000000000000000e5
-1216 1 27 46 0.32768000000000000000e5
-1216 1 34 41 -0.32768000000000000000e5
-1217 1 1 48 -0.16384000000000000000e5
-1217 1 2 49 -0.16384000000000000000e5
-1217 1 23 38 -0.16384000000000000000e5
-1217 1 27 47 0.32768000000000000000e5
-1217 2 2 32 -0.16384000000000000000e5
-1217 3 16 29 0.32768000000000000000e5
-1218 1 7 54 -0.32768000000000000000e5
-1218 1 27 48 0.32768000000000000000e5
-1219 1 1 48 0.16384000000000000000e5
-1219 1 2 49 0.16384000000000000000e5
-1219 1 3 50 0.32768000000000000000e5
-1219 1 11 42 -0.65536000000000000000e5
-1219 1 12 43 -0.13107200000000000000e6
-1219 1 17 48 0.13107200000000000000e6
-1219 1 23 38 0.16384000000000000000e5
-1219 1 27 49 0.32768000000000000000e5
-1219 2 2 32 0.16384000000000000000e5
-1219 2 8 22 -0.65536000000000000000e5
-1219 2 12 26 0.65536000000000000000e5
-1219 2 16 30 0.32768000000000000000e5
-1219 3 2 31 0.65536000000000000000e5
-1219 3 14 27 0.13107200000000000000e6
-1219 3 17 30 0.32768000000000000000e5
-1219 4 4 16 0.65536000000000000000e5
-1220 1 27 50 0.32768000000000000000e5
-1220 1 37 44 -0.32768000000000000000e5
-1221 1 27 51 0.32768000000000000000e5
-1221 1 32 47 -0.32768000000000000000e5
-1222 1 27 52 0.32768000000000000000e5
-1222 1 28 43 -0.16384000000000000000e5
-1222 1 32 47 -0.16384000000000000000e5
-1222 1 37 44 -0.16384000000000000000e5
-1222 2 20 34 -0.16384000000000000000e5
-1222 3 18 31 0.16384000000000000000e5
-1223 1 7 54 -0.32768000000000000000e5
-1223 1 27 53 0.32768000000000000000e5
-1223 3 6 35 0.32768000000000000000e5
-1224 1 1 48 0.16384000000000000000e5
-1224 1 2 49 0.16384000000000000000e5
-1224 1 3 50 0.32768000000000000000e5
-1224 1 11 42 -0.65536000000000000000e5
-1224 1 12 43 -0.13107200000000000000e6
-1224 1 17 48 0.13107200000000000000e6
-1224 1 23 38 0.16384000000000000000e5
-1224 1 27 54 0.32768000000000000000e5
-1224 2 2 32 0.16384000000000000000e5
-1224 2 8 22 -0.65536000000000000000e5
-1224 2 12 26 0.65536000000000000000e5
-1224 2 16 30 0.32768000000000000000e5
-1224 3 2 31 0.65536000000000000000e5
-1224 3 14 27 0.13107200000000000000e6
-1224 3 17 30 0.32768000000000000000e5
-1224 3 20 33 0.32768000000000000000e5
-1224 4 4 16 0.65536000000000000000e5
-1225 1 27 55 0.32768000000000000000e5
-1225 1 37 52 -0.32768000000000000000e5
-1226 1 27 56 0.32768000000000000000e5
-1226 1 47 50 -0.32768000000000000000e5
-1227 1 11 42 -0.16384000000000000000e5
-1227 1 12 43 -0.32768000000000000000e5
-1227 1 17 48 0.32768000000000000000e5
-1227 1 28 28 0.32768000000000000000e5
-1227 2 8 22 -0.16384000000000000000e5
-1227 2 12 26 0.16384000000000000000e5
-1227 3 14 27 0.32768000000000000000e5
-1227 4 4 16 0.16384000000000000000e5
-1228 1 10 41 -0.32768000000000000000e5
-1228 1 28 29 0.32768000000000000000e5
-1229 1 10 41 0.32768000000000000000e5
-1229 1 11 42 0.32768000000000000000e5
-1229 1 17 48 -0.65536000000000000000e5
-1229 1 28 30 0.32768000000000000000e5
-1229 2 8 22 0.32768000000000000000e5
-1229 3 14 27 -0.65536000000000000000e5
-1229 4 4 16 -0.32768000000000000000e5
-1230 1 16 47 -0.32768000000000000000e5
-1230 1 28 31 0.32768000000000000000e5
-1230 3 13 26 -0.32768000000000000000e5
-1231 1 12 43 -0.32768000000000000000e5
-1231 1 28 32 0.32768000000000000000e5
-1232 1 17 48 -0.32768000000000000000e5
-1232 1 28 33 0.32768000000000000000e5
-1232 3 14 27 -0.32768000000000000000e5
-1233 1 13 44 -0.32768000000000000000e5
-1233 1 28 34 0.32768000000000000000e5
-1234 1 19 42 -0.32768000000000000000e5
-1234 1 28 36 0.32768000000000000000e5
-1235 1 1 48 -0.16384000000000000000e5
-1235 1 2 49 -0.16384000000000000000e5
-1235 1 23 38 -0.16384000000000000000e5
-1235 1 28 37 0.32768000000000000000e5
-1235 2 2 32 -0.16384000000000000000e5
-1236 1 3 50 -0.32768000000000000000e5
-1236 1 28 38 0.32768000000000000000e5
-1237 1 1 48 0.16384000000000000000e5
-1237 1 2 49 0.16384000000000000000e5
-1237 1 3 50 0.32768000000000000000e5
-1237 1 11 42 -0.65536000000000000000e5
-1237 1 12 43 -0.13107200000000000000e6
-1237 1 17 48 0.13107200000000000000e6
-1237 1 23 38 0.16384000000000000000e5
-1237 1 28 39 0.32768000000000000000e5
-1237 2 2 32 0.16384000000000000000e5
-1237 2 8 22 -0.65536000000000000000e5
-1237 2 12 26 0.65536000000000000000e5
-1237 2 16 30 0.32768000000000000000e5
-1237 3 2 31 0.65536000000000000000e5
-1237 3 14 27 0.13107200000000000000e6
-1237 4 4 16 0.65536000000000000000e5
-1238 1 26 41 -0.32768000000000000000e5
-1238 1 28 40 0.32768000000000000000e5
-1239 1 11 42 -0.32768000000000000000e5
-1239 1 12 43 -0.65536000000000000000e5
-1239 1 17 48 0.65536000000000000000e5
-1239 1 28 41 0.32768000000000000000e5
-1239 2 8 22 -0.32768000000000000000e5
-1239 2 12 26 0.32768000000000000000e5
-1239 3 2 31 0.32768000000000000000e5
-1239 3 14 27 0.65536000000000000000e5
-1239 4 4 16 0.32768000000000000000e5
-1240 1 5 52 0.32768000000000000000e5
-1240 1 17 48 -0.65536000000000000000e5
-1240 1 28 42 0.32768000000000000000e5
-1240 1 28 43 0.32768000000000000000e5
-1240 2 8 22 0.32768000000000000000e5
-1240 4 4 16 -0.32768000000000000000e5
-1240 4 7 19 -0.32768000000000000000e5
-1241 1 5 52 0.16384000000000000000e5
-1241 1 11 42 -0.16384000000000000000e5
-1241 1 12 43 -0.32768000000000000000e5
-1241 1 28 44 0.32768000000000000000e5
-1241 2 12 26 0.16384000000000000000e5
-1241 2 20 34 -0.16384000000000000000e5
-1241 3 2 31 0.16384000000000000000e5
-1241 3 14 27 0.32768000000000000000e5
-1241 4 7 19 -0.16384000000000000000e5
-1241 4 8 20 -0.16384000000000000000e5
-1242 1 17 48 -0.32768000000000000000e5
-1242 1 28 45 0.32768000000000000000e5
-1243 1 13 52 -0.32768000000000000000e5
-1243 1 28 46 0.32768000000000000000e5
-1244 1 7 54 -0.32768000000000000000e5
-1244 1 28 47 0.32768000000000000000e5
-1245 1 1 48 0.16384000000000000000e5
-1245 1 2 49 0.16384000000000000000e5
-1245 1 3 50 0.32768000000000000000e5
-1245 1 11 42 -0.65536000000000000000e5
-1245 1 12 43 -0.13107200000000000000e6
-1245 1 17 48 0.13107200000000000000e6
-1245 1 23 38 0.16384000000000000000e5
-1245 1 28 48 0.32768000000000000000e5
-1245 2 2 32 0.16384000000000000000e5
-1245 2 8 22 -0.65536000000000000000e5
-1245 2 12 26 0.65536000000000000000e5
-1245 2 16 30 0.32768000000000000000e5
-1245 3 2 31 0.65536000000000000000e5
-1245 3 14 27 0.13107200000000000000e6
-1245 3 17 30 0.32768000000000000000e5
-1245 4 4 16 0.65536000000000000000e5
-1246 1 26 41 -0.32768000000000000000e5
-1246 1 28 49 0.32768000000000000000e5
-1246 3 22 27 0.32768000000000000000e5
-1247 1 28 50 0.32768000000000000000e5
-1247 1 32 47 -0.32768000000000000000e5
-1248 1 28 43 -0.32768000000000000000e5
-1248 1 28 51 0.32768000000000000000e5
-1248 3 18 31 0.32768000000000000000e5
-1249 1 17 48 -0.32768000000000000000e5
-1249 1 28 52 0.32768000000000000000e5
-1249 3 24 29 0.32768000000000000000e5
-1250 1 1 48 0.16384000000000000000e5
-1250 1 2 49 0.16384000000000000000e5
-1250 1 3 50 0.32768000000000000000e5
-1250 1 11 42 -0.65536000000000000000e5
-1250 1 12 43 -0.13107200000000000000e6
-1250 1 17 48 0.13107200000000000000e6
-1250 1 23 38 0.16384000000000000000e5
-1250 1 28 53 0.32768000000000000000e5
-1250 2 2 32 0.16384000000000000000e5
-1250 2 8 22 -0.65536000000000000000e5
-1250 2 12 26 0.65536000000000000000e5
-1250 2 16 30 0.32768000000000000000e5
-1250 3 2 31 0.65536000000000000000e5
-1250 3 14 27 0.13107200000000000000e6
-1250 3 17 30 0.32768000000000000000e5
-1250 3 20 33 0.32768000000000000000e5
-1250 4 4 16 0.65536000000000000000e5
-1251 1 24 55 -0.32768000000000000000e5
-1251 1 28 54 0.32768000000000000000e5
-1252 1 28 43 -0.32768000000000000000e5
-1252 1 28 55 0.32768000000000000000e5
-1252 3 18 31 0.32768000000000000000e5
-1252 3 21 34 0.32768000000000000000e5
-1253 1 1 48 0.16384000000000000000e5
-1253 1 2 49 0.16384000000000000000e5
-1253 1 3 50 0.32768000000000000000e5
-1253 1 11 42 -0.65536000000000000000e5
-1253 1 12 43 -0.13107200000000000000e6
-1253 1 17 48 0.13107200000000000000e6
-1253 1 23 38 0.16384000000000000000e5
-1253 1 24 55 -0.32768000000000000000e5
-1253 1 28 56 0.32768000000000000000e5
-1253 1 47 50 0.32768000000000000000e5
-1253 2 2 32 0.16384000000000000000e5
-1253 2 8 22 -0.65536000000000000000e5
-1253 2 12 26 0.65536000000000000000e5
-1253 2 16 30 0.32768000000000000000e5
-1253 2 21 35 -0.32768000000000000000e5
-1253 2 29 35 0.32768000000000000000e5
-1253 3 2 31 0.65536000000000000000e5
-1253 3 14 27 0.13107200000000000000e6
-1253 3 17 30 0.32768000000000000000e5
-1253 3 20 33 0.32768000000000000000e5
-1253 3 22 35 -0.32768000000000000000e5
-1253 3 29 34 0.65536000000000000000e5
-1253 4 4 16 0.65536000000000000000e5
-1254 1 10 41 0.16384000000000000000e5
-1254 1 11 42 0.16384000000000000000e5
-1254 1 17 48 -0.32768000000000000000e5
-1254 1 29 29 0.32768000000000000000e5
-1254 2 8 22 0.16384000000000000000e5
-1254 3 14 27 -0.32768000000000000000e5
-1254 4 4 16 -0.16384000000000000000e5
-1255 1 11 42 -0.32768000000000000000e5
-1255 1 29 30 0.32768000000000000000e5
-1256 1 12 43 -0.32768000000000000000e5
-1256 1 29 31 0.32768000000000000000e5
-1257 1 17 48 -0.32768000000000000000e5
-1257 1 29 32 0.32768000000000000000e5
-1257 3 14 27 -0.32768000000000000000e5
-1258 1 18 25 -0.32768000000000000000e5
-1258 1 29 33 0.32768000000000000000e5
-1258 3 14 19 0.32768000000000000000e5
-1259 1 28 35 -0.32768000000000000000e5
-1259 1 29 34 0.32768000000000000000e5
-1260 1 14 45 -0.32768000000000000000e5
-1260 1 29 35 0.32768000000000000000e5
-1261 1 3 50 -0.32768000000000000000e5
-1261 1 29 37 0.32768000000000000000e5
-1262 1 1 48 0.16384000000000000000e5
-1262 1 2 49 0.16384000000000000000e5
-1262 1 3 50 0.32768000000000000000e5
-1262 1 11 42 -0.65536000000000000000e5
-1262 1 12 43 -0.13107200000000000000e6
-1262 1 17 48 0.13107200000000000000e6
-1262 1 23 38 0.16384000000000000000e5
-1262 1 29 38 0.32768000000000000000e5
-1262 2 2 32 0.16384000000000000000e5
-1262 2 8 22 -0.65536000000000000000e5
-1262 2 12 26 0.65536000000000000000e5
-1262 2 16 30 0.32768000000000000000e5
-1262 3 2 31 0.65536000000000000000e5
-1262 3 14 27 0.13107200000000000000e6
-1262 4 4 16 0.65536000000000000000e5
-1263 1 26 41 -0.32768000000000000000e5
-1263 1 29 39 0.32768000000000000000e5
-1264 1 1 48 -0.16384000000000000000e5
-1264 1 2 49 -0.16384000000000000000e5
-1264 1 3 50 -0.32768000000000000000e5
-1264 1 11 42 0.65536000000000000000e5
-1264 1 12 43 0.13107200000000000000e6
-1264 1 17 48 -0.13107200000000000000e6
-1264 1 23 38 -0.16384000000000000000e5
-1264 1 26 41 0.32768000000000000000e5
-1264 1 28 43 -0.65536000000000000000e5
-1264 1 29 40 0.32768000000000000000e5
-1264 2 2 32 -0.16384000000000000000e5
-1264 2 4 34 0.32768000000000000000e5
-1264 2 8 22 0.65536000000000000000e5
-1264 2 12 26 -0.65536000000000000000e5
-1264 2 16 30 -0.32768000000000000000e5
-1264 3 2 31 -0.65536000000000000000e5
-1264 3 14 27 -0.13107200000000000000e6
-1264 4 4 16 -0.65536000000000000000e5
-1265 1 5 52 0.32768000000000000000e5
-1265 1 17 48 -0.65536000000000000000e5
-1265 1 28 43 0.32768000000000000000e5
-1265 1 29 41 0.32768000000000000000e5
-1265 2 8 22 0.32768000000000000000e5
-1265 4 4 16 -0.32768000000000000000e5
-1265 4 7 19 -0.32768000000000000000e5
-1266 1 28 43 -0.32768000000000000000e5
-1266 1 29 42 0.32768000000000000000e5
-1267 1 5 52 -0.32768000000000000000e5
-1267 1 29 43 0.32768000000000000000e5
-1268 1 17 48 -0.32768000000000000000e5
-1268 1 29 44 0.32768000000000000000e5
-1269 1 14 45 -0.65536000000000000000e5
-1269 1 17 48 0.32768000000000000000e5
-1269 1 18 49 0.32768000000000000000e5
-1269 1 29 45 0.32768000000000000000e5
-1269 2 24 30 0.32768000000000000000e5
-1269 3 15 28 0.65536000000000000000e5
-1270 1 14 45 -0.32768000000000000000e5
-1270 1 29 46 0.32768000000000000000e5
-1270 3 15 28 0.32768000000000000000e5
-1271 1 1 48 0.16384000000000000000e5
-1271 1 2 49 0.16384000000000000000e5
-1271 1 3 50 0.32768000000000000000e5
-1271 1 11 42 -0.65536000000000000000e5
-1271 1 12 43 -0.13107200000000000000e6
-1271 1 17 48 0.13107200000000000000e6
-1271 1 23 38 0.16384000000000000000e5
-1271 1 29 47 0.32768000000000000000e5
-1271 2 2 32 0.16384000000000000000e5
-1271 2 8 22 -0.65536000000000000000e5
-1271 2 12 26 0.65536000000000000000e5
-1271 2 16 30 0.32768000000000000000e5
-1271 3 2 31 0.65536000000000000000e5
-1271 3 14 27 0.13107200000000000000e6
-1271 3 17 30 0.32768000000000000000e5
-1271 4 4 16 0.65536000000000000000e5
-1272 1 26 41 -0.32768000000000000000e5
-1272 1 29 48 0.32768000000000000000e5
-1272 3 22 27 0.32768000000000000000e5
-1273 1 1 48 -0.16384000000000000000e5
-1273 1 2 49 -0.16384000000000000000e5
-1273 1 3 50 -0.32768000000000000000e5
-1273 1 11 42 0.65536000000000000000e5
-1273 1 12 43 0.13107200000000000000e6
-1273 1 17 48 -0.13107200000000000000e6
-1273 1 23 38 -0.16384000000000000000e5
-1273 1 26 41 0.32768000000000000000e5
-1273 1 28 43 -0.65536000000000000000e5
-1273 1 29 49 0.32768000000000000000e5
-1273 2 2 32 -0.16384000000000000000e5
-1273 2 4 34 0.32768000000000000000e5
-1273 2 8 22 0.65536000000000000000e5
-1273 2 12 26 -0.65536000000000000000e5
-1273 2 16 30 -0.32768000000000000000e5
-1273 3 2 31 -0.65536000000000000000e5
-1273 3 5 34 0.32768000000000000000e5
-1273 3 14 27 -0.13107200000000000000e6
-1273 4 4 16 -0.65536000000000000000e5
-1274 1 28 43 -0.32768000000000000000e5
-1274 1 29 50 0.32768000000000000000e5
-1274 3 18 31 0.32768000000000000000e5
-1275 1 29 51 0.32768000000000000000e5
-1275 1 33 48 -0.32768000000000000000e5
-1276 1 29 52 0.32768000000000000000e5
-1276 1 34 49 -0.32768000000000000000e5
-1277 1 24 55 -0.32768000000000000000e5
-1277 1 29 53 0.32768000000000000000e5
-1278 1 1 48 -0.16384000000000000000e5
-1278 1 2 49 -0.16384000000000000000e5
-1278 1 3 50 -0.32768000000000000000e5
-1278 1 11 42 0.65536000000000000000e5
-1278 1 12 43 0.13107200000000000000e6
-1278 1 17 48 -0.13107200000000000000e6
-1278 1 23 38 -0.16384000000000000000e5
-1278 1 24 55 0.32768000000000000000e5
-1278 1 28 43 -0.65536000000000000000e5
-1278 1 29 54 0.32768000000000000000e5
-1278 2 2 32 -0.16384000000000000000e5
-1278 2 8 22 0.65536000000000000000e5
-1278 2 12 26 -0.65536000000000000000e5
-1278 2 16 30 -0.32768000000000000000e5
-1278 2 21 35 0.32768000000000000000e5
-1278 3 2 31 -0.65536000000000000000e5
-1278 3 14 27 -0.13107200000000000000e6
-1278 3 17 30 -0.32768000000000000000e5
-1278 3 18 31 0.65536000000000000000e5
-1278 3 20 33 -0.32768000000000000000e5
-1278 3 21 34 0.65536000000000000000e5
-1278 4 4 16 -0.65536000000000000000e5
-1279 1 29 55 0.32768000000000000000e5
-1279 1 43 50 -0.32768000000000000000e5
-1280 1 1 48 -0.16384000000000000000e5
-1280 1 2 49 -0.16384000000000000000e5
-1280 1 3 50 -0.32768000000000000000e5
-1280 1 11 42 0.65536000000000000000e5
-1280 1 12 43 0.13107200000000000000e6
-1280 1 17 48 -0.13107200000000000000e6
-1280 1 23 38 -0.16384000000000000000e5
-1280 1 24 55 0.32768000000000000000e5
-1280 1 28 43 -0.65536000000000000000e5
-1280 1 29 56 0.32768000000000000000e5
-1280 2 2 32 -0.16384000000000000000e5
-1280 2 8 22 0.65536000000000000000e5
-1280 2 12 26 -0.65536000000000000000e5
-1280 2 16 30 -0.32768000000000000000e5
-1280 2 21 35 0.32768000000000000000e5
-1280 3 2 31 -0.65536000000000000000e5
-1280 3 14 27 -0.13107200000000000000e6
-1280 3 17 30 -0.32768000000000000000e5
-1280 3 18 31 0.65536000000000000000e5
-1280 3 20 33 -0.32768000000000000000e5
-1280 3 21 34 0.65536000000000000000e5
-1280 3 22 35 0.32768000000000000000e5
-1280 4 4 16 -0.65536000000000000000e5
-1281 1 26 33 -0.16384000000000000000e5
-1281 1 30 30 0.32768000000000000000e5
-1282 1 17 48 -0.32768000000000000000e5
-1282 1 30 31 0.32768000000000000000e5
-1282 3 14 27 -0.32768000000000000000e5
-1283 1 18 25 -0.32768000000000000000e5
-1283 1 30 32 0.32768000000000000000e5
-1283 3 14 19 0.32768000000000000000e5
-1284 1 14 45 -0.65536000000000000000e5
-1284 1 17 48 0.32768000000000000000e5
-1284 1 18 25 0.32768000000000000000e5
-1284 1 30 33 0.32768000000000000000e5
-1284 2 14 28 0.32768000000000000000e5
-1284 3 14 19 -0.32768000000000000000e5
-1284 3 14 27 0.32768000000000000000e5
-1285 1 14 45 -0.32768000000000000000e5
-1285 1 30 34 0.32768000000000000000e5
-1286 1 11 46 -0.32768000000000000000e5
-1286 1 30 35 0.32768000000000000000e5
-1287 1 15 46 -0.32768000000000000000e5
-1287 1 30 36 0.32768000000000000000e5
-1288 1 1 48 0.16384000000000000000e5
-1288 1 2 49 0.16384000000000000000e5
-1288 1 3 50 0.32768000000000000000e5
-1288 1 11 42 -0.65536000000000000000e5
-1288 1 12 43 -0.13107200000000000000e6
-1288 1 17 48 0.13107200000000000000e6
-1288 1 23 38 0.16384000000000000000e5
-1288 1 30 37 0.32768000000000000000e5
-1288 2 2 32 0.16384000000000000000e5
-1288 2 8 22 -0.65536000000000000000e5
-1288 2 12 26 0.65536000000000000000e5
-1288 2 16 30 0.32768000000000000000e5
-1288 3 2 31 0.65536000000000000000e5
-1288 3 14 27 0.13107200000000000000e6
-1288 4 4 16 0.65536000000000000000e5
-1289 1 26 41 -0.32768000000000000000e5
-1289 1 30 38 0.32768000000000000000e5
-1290 1 1 48 -0.16384000000000000000e5
-1290 1 2 49 -0.16384000000000000000e5
-1290 1 3 50 -0.32768000000000000000e5
-1290 1 11 42 0.65536000000000000000e5
-1290 1 12 43 0.13107200000000000000e6
-1290 1 17 48 -0.13107200000000000000e6
-1290 1 23 38 -0.16384000000000000000e5
-1290 1 26 41 0.32768000000000000000e5
-1290 1 28 43 -0.65536000000000000000e5
-1290 1 30 39 0.32768000000000000000e5
-1290 2 2 32 -0.16384000000000000000e5
-1290 2 4 34 0.32768000000000000000e5
-1290 2 8 22 0.65536000000000000000e5
-1290 2 12 26 -0.65536000000000000000e5
-1290 2 16 30 -0.32768000000000000000e5
-1290 3 2 31 -0.65536000000000000000e5
-1290 3 14 27 -0.13107200000000000000e6
-1290 4 4 16 -0.65536000000000000000e5
-1291 1 1 48 0.16384000000000000000e5
-1291 1 2 49 0.16384000000000000000e5
-1291 1 3 50 0.32768000000000000000e5
-1291 1 5 52 -0.65536000000000000000e5
-1291 1 11 42 -0.65536000000000000000e5
-1291 1 12 43 -0.13107200000000000000e6
-1291 1 17 48 0.13107200000000000000e6
-1291 1 23 38 0.16384000000000000000e5
-1291 1 28 43 0.65536000000000000000e5
-1291 1 30 40 0.32768000000000000000e5
-1291 2 2 32 0.16384000000000000000e5
-1291 2 4 34 -0.32768000000000000000e5
-1291 2 8 22 -0.65536000000000000000e5
-1291 2 12 26 0.65536000000000000000e5
-1291 2 16 30 0.32768000000000000000e5
-1291 2 22 28 0.32768000000000000000e5
-1291 3 2 31 0.65536000000000000000e5
-1291 3 14 27 0.13107200000000000000e6
-1291 4 4 16 0.65536000000000000000e5
-1292 1 28 43 -0.32768000000000000000e5
-1292 1 30 41 0.32768000000000000000e5
-1293 1 5 52 -0.32768000000000000000e5
-1293 1 30 42 0.32768000000000000000e5
-1294 1 30 43 0.32768000000000000000e5
-1294 1 33 40 -0.32768000000000000000e5
-1295 1 14 45 -0.65536000000000000000e5
-1295 1 17 48 0.32768000000000000000e5
-1295 1 18 49 0.32768000000000000000e5
-1295 1 30 44 0.32768000000000000000e5
-1295 2 24 30 0.32768000000000000000e5
-1295 3 15 28 0.65536000000000000000e5
-1296 1 18 49 -0.32768000000000000000e5
-1296 1 30 45 0.32768000000000000000e5
-1297 1 13 52 0.32768000000000000000e5
-1297 1 14 45 0.32768000000000000000e5
-1297 1 29 36 -0.65536000000000000000e5
-1297 1 30 46 0.32768000000000000000e5
-1297 2 15 33 0.32768000000000000000e5
-1297 3 15 28 -0.32768000000000000000e5
-1297 3 24 25 0.65536000000000000000e5
-1298 1 26 41 -0.32768000000000000000e5
-1298 1 30 47 0.32768000000000000000e5
-1298 3 22 27 0.32768000000000000000e5
-1299 1 1 48 -0.16384000000000000000e5
-1299 1 2 49 -0.16384000000000000000e5
-1299 1 3 50 -0.32768000000000000000e5
-1299 1 11 42 0.65536000000000000000e5
-1299 1 12 43 0.13107200000000000000e6
-1299 1 17 48 -0.13107200000000000000e6
-1299 1 23 38 -0.16384000000000000000e5
-1299 1 26 41 0.32768000000000000000e5
-1299 1 28 43 -0.65536000000000000000e5
-1299 1 30 48 0.32768000000000000000e5
-1299 2 2 32 -0.16384000000000000000e5
-1299 2 4 34 0.32768000000000000000e5
-1299 2 8 22 0.65536000000000000000e5
-1299 2 12 26 -0.65536000000000000000e5
-1299 2 16 30 -0.32768000000000000000e5
-1299 3 2 31 -0.65536000000000000000e5
-1299 3 5 34 0.32768000000000000000e5
-1299 3 14 27 -0.13107200000000000000e6
-1299 4 4 16 -0.65536000000000000000e5
-1300 1 1 48 0.16384000000000000000e5
-1300 1 2 49 0.16384000000000000000e5
-1300 1 3 50 0.32768000000000000000e5
-1300 1 11 42 -0.65536000000000000000e5
-1300 1 12 43 -0.13107200000000000000e6
-1300 1 17 48 0.13107200000000000000e6
-1300 1 23 38 0.16384000000000000000e5
-1300 1 28 43 0.65536000000000000000e5
-1300 1 30 49 0.32768000000000000000e5
-1300 1 33 48 -0.65536000000000000000e5
-1300 2 2 32 0.16384000000000000000e5
-1300 2 4 34 -0.32768000000000000000e5
-1300 2 8 22 -0.65536000000000000000e5
-1300 2 12 26 0.65536000000000000000e5
-1300 2 16 30 0.32768000000000000000e5
-1300 2 28 30 0.32768000000000000000e5
-1300 3 2 31 0.65536000000000000000e5
-1300 3 5 34 -0.32768000000000000000e5
-1300 3 14 27 0.13107200000000000000e6
-1300 3 22 27 -0.32768000000000000000e5
-1300 4 4 16 0.65536000000000000000e5
-1301 1 30 50 0.32768000000000000000e5
-1301 1 33 48 -0.32768000000000000000e5
-1302 1 15 54 -0.32768000000000000000e5
-1302 1 30 51 0.32768000000000000000e5
-1303 1 17 48 0.32768000000000000000e5
-1303 1 30 52 0.32768000000000000000e5
-1303 1 34 49 0.32768000000000000000e5
-1303 1 35 50 -0.65536000000000000000e5
-1303 2 24 34 0.32768000000000000000e5
-1303 3 24 29 -0.32768000000000000000e5
-1304 1 1 48 -0.16384000000000000000e5
-1304 1 2 49 -0.16384000000000000000e5
-1304 1 3 50 -0.32768000000000000000e5
-1304 1 11 42 0.65536000000000000000e5
-1304 1 12 43 0.13107200000000000000e6
-1304 1 17 48 -0.13107200000000000000e6
-1304 1 23 38 -0.16384000000000000000e5
-1304 1 24 55 0.32768000000000000000e5
-1304 1 28 43 -0.65536000000000000000e5
-1304 1 30 53 0.32768000000000000000e5
-1304 2 2 32 -0.16384000000000000000e5
-1304 2 8 22 0.65536000000000000000e5
-1304 2 12 26 -0.65536000000000000000e5
-1304 2 16 30 -0.32768000000000000000e5
-1304 2 21 35 0.32768000000000000000e5
-1304 3 2 31 -0.65536000000000000000e5
-1304 3 14 27 -0.13107200000000000000e6
-1304 3 17 30 -0.32768000000000000000e5
-1304 3 18 31 0.65536000000000000000e5
-1304 3 20 33 -0.32768000000000000000e5
-1304 3 21 34 0.65536000000000000000e5
-1304 4 4 16 -0.65536000000000000000e5
-1305 1 1 48 0.16384000000000000000e5
-1305 1 2 49 0.16384000000000000000e5
-1305 1 3 50 0.32768000000000000000e5
-1305 1 11 42 -0.65536000000000000000e5
-1305 1 12 43 -0.13107200000000000000e6
-1305 1 17 48 0.13107200000000000000e6
-1305 1 23 38 0.16384000000000000000e5
-1305 1 28 43 0.65536000000000000000e5
-1305 1 30 54 0.32768000000000000000e5
-1305 1 43 50 -0.65536000000000000000e5
-1305 2 2 32 0.16384000000000000000e5
-1305 2 8 22 -0.65536000000000000000e5
-1305 2 12 26 0.65536000000000000000e5
-1305 2 16 30 0.32768000000000000000e5
-1305 2 21 35 -0.32768000000000000000e5
-1305 2 28 34 0.32768000000000000000e5
-1305 3 2 31 0.65536000000000000000e5
-1305 3 14 27 0.13107200000000000000e6
-1305 3 17 30 0.32768000000000000000e5
-1305 3 18 31 -0.65536000000000000000e5
-1305 3 20 33 0.32768000000000000000e5
-1305 3 21 34 -0.65536000000000000000e5
-1305 4 4 16 0.65536000000000000000e5
-1306 1 28 43 0.32768000000000000000e5
-1306 1 30 55 0.32768000000000000000e5
-1306 1 43 50 0.32768000000000000000e5
-1306 1 44 51 -0.65536000000000000000e5
-1306 2 31 33 0.32768000000000000000e5
-1306 3 18 31 -0.32768000000000000000e5
-1306 3 21 34 -0.32768000000000000000e5
-1307 1 30 56 0.32768000000000000000e5
-1307 1 40 55 -0.32768000000000000000e5
-1308 1 4 19 0.16384000000000000000e5
-1308 1 20 27 -0.32768000000000000000e5
-1308 1 28 35 0.16384000000000000000e5
-1308 1 31 31 0.32768000000000000000e5
-1308 2 10 24 0.16384000000000000000e5
-1308 3 8 13 -0.16384000000000000000e5
-1308 3 10 23 0.16384000000000000000e5
-1308 3 11 24 0.16384000000000000000e5
-1309 1 13 44 -0.32768000000000000000e5
-1309 1 31 32 0.32768000000000000000e5
-1310 1 28 35 -0.32768000000000000000e5
-1310 1 31 33 0.32768000000000000000e5
-1311 1 4 19 0.16384000000000000000e5
-1311 1 13 44 -0.16384000000000000000e5
-1311 1 20 27 -0.32768000000000000000e5
-1311 1 31 34 0.32768000000000000000e5
-1311 3 8 13 -0.16384000000000000000e5
-1311 3 10 23 0.16384000000000000000e5
-1311 3 11 24 0.16384000000000000000e5
-1311 4 10 14 0.16384000000000000000e5
-1312 1 19 42 -0.32768000000000000000e5
-1312 1 31 35 0.32768000000000000000e5
-1313 1 4 19 0.81920000000000000000e4
-1313 1 13 44 -0.81920000000000000000e4
-1313 1 19 42 -0.16384000000000000000e5
-1313 1 20 27 -0.16384000000000000000e5
-1313 1 29 36 -0.16384000000000000000e5
-1313 1 31 36 0.32768000000000000000e5
-1313 2 15 29 -0.16384000000000000000e5
-1313 3 8 13 -0.81920000000000000000e4
-1313 3 10 23 0.81920000000000000000e4
-1313 3 11 24 0.81920000000000000000e4
-1313 4 10 14 0.81920000000000000000e4
-1314 1 5 52 -0.32768000000000000000e5
-1314 1 11 42 0.32768000000000000000e5
-1314 1 12 43 0.65536000000000000000e5
-1314 1 16 47 -0.65536000000000000000e5
-1314 1 28 43 -0.32768000000000000000e5
-1314 1 31 37 0.32768000000000000000e5
-1314 2 10 32 0.32768000000000000000e5
-1314 2 12 26 -0.32768000000000000000e5
-1314 3 2 31 -0.32768000000000000000e5
-1314 3 14 27 -0.65536000000000000000e5
-1314 4 7 19 0.32768000000000000000e5
-1315 1 11 42 -0.32768000000000000000e5
-1315 1 12 43 -0.65536000000000000000e5
-1315 1 17 48 0.65536000000000000000e5
-1315 1 31 38 0.32768000000000000000e5
-1315 2 8 22 -0.32768000000000000000e5
-1315 2 12 26 0.32768000000000000000e5
-1315 3 2 31 0.32768000000000000000e5
-1315 3 14 27 0.65536000000000000000e5
-1315 4 4 16 0.32768000000000000000e5
-1316 1 5 52 0.32768000000000000000e5
-1316 1 17 48 -0.65536000000000000000e5
-1316 1 28 43 0.32768000000000000000e5
-1316 1 31 39 0.32768000000000000000e5
-1316 2 8 22 0.32768000000000000000e5
-1316 4 4 16 -0.32768000000000000000e5
-1316 4 7 19 -0.32768000000000000000e5
-1317 1 28 43 -0.32768000000000000000e5
-1317 1 31 40 0.32768000000000000000e5
-1318 1 16 47 -0.32768000000000000000e5
-1318 1 31 41 0.32768000000000000000e5
-1319 1 5 52 0.16384000000000000000e5
-1319 1 11 42 -0.16384000000000000000e5
-1319 1 12 43 -0.32768000000000000000e5
-1319 1 31 42 0.32768000000000000000e5
-1319 2 12 26 0.16384000000000000000e5
-1319 2 20 34 -0.16384000000000000000e5
-1319 3 2 31 0.16384000000000000000e5
-1319 3 14 27 0.32768000000000000000e5
-1319 4 7 19 -0.16384000000000000000e5
-1319 4 8 20 -0.16384000000000000000e5
-1320 1 17 48 -0.32768000000000000000e5
-1320 1 31 43 0.32768000000000000000e5
-1321 1 31 44 0.32768000000000000000e5
-1321 1 34 41 -0.32768000000000000000e5
-1322 1 13 52 -0.32768000000000000000e5
-1322 1 31 45 0.32768000000000000000e5
-1323 1 19 50 -0.32768000000000000000e5
-1323 1 31 46 0.32768000000000000000e5
-1324 1 31 47 0.32768000000000000000e5
-1324 1 37 44 -0.32768000000000000000e5
-1325 1 31 48 0.32768000000000000000e5
-1325 1 32 47 -0.32768000000000000000e5
-1326 1 28 43 -0.32768000000000000000e5
-1326 1 31 49 0.32768000000000000000e5
-1326 3 18 31 0.32768000000000000000e5
-1327 1 28 43 -0.16384000000000000000e5
-1327 1 31 50 0.32768000000000000000e5
-1327 1 32 47 -0.16384000000000000000e5
-1327 1 37 44 -0.16384000000000000000e5
-1327 2 20 34 -0.16384000000000000000e5
-1327 3 18 31 0.16384000000000000000e5
-1328 1 17 48 -0.32768000000000000000e5
-1328 1 31 51 0.32768000000000000000e5
-1328 3 24 29 0.32768000000000000000e5
-1329 1 16 55 -0.32768000000000000000e5
-1329 1 31 52 0.32768000000000000000e5
-1330 1 31 53 0.32768000000000000000e5
-1330 1 37 52 -0.32768000000000000000e5
-1331 1 28 43 -0.32768000000000000000e5
-1331 1 31 54 0.32768000000000000000e5
-1331 3 18 31 0.32768000000000000000e5
-1331 3 21 34 0.32768000000000000000e5
-1332 1 17 48 -0.32768000000000000000e5
-1332 1 31 55 0.32768000000000000000e5
-1332 1 32 47 0.16384000000000000000e5
-1332 1 33 48 0.16384000000000000000e5
-1332 1 37 52 -0.16384000000000000000e5
-1332 1 43 50 -0.16384000000000000000e5
-1332 3 21 34 0.16384000000000000000e5
-1332 3 24 29 0.32768000000000000000e5
-1332 4 16 20 0.16384000000000000000e5
-1333 1 28 43 -0.32768000000000000000e5
-1333 1 31 56 0.32768000000000000000e5
-1333 3 18 31 0.32768000000000000000e5
-1333 3 21 34 0.32768000000000000000e5
-1333 3 29 34 0.32768000000000000000e5
-1334 1 28 35 -0.16384000000000000000e5
-1334 1 32 32 0.32768000000000000000e5
-1335 1 14 45 -0.32768000000000000000e5
-1335 1 32 33 0.32768000000000000000e5
-1336 1 19 42 -0.32768000000000000000e5
-1336 1 32 34 0.32768000000000000000e5
-1337 1 29 36 -0.32768000000000000000e5
-1337 1 32 35 0.32768000000000000000e5
-1338 1 17 32 -0.16384000000000000000e5
-1338 1 18 33 -0.16384000000000000000e5
-1338 1 29 36 -0.16384000000000000000e5
-1338 1 32 36 0.32768000000000000000e5
-1338 2 14 24 -0.16384000000000000000e5
-1338 3 12 25 -0.16384000000000000000e5
-1338 3 15 24 0.32768000000000000000e5
-1339 1 11 42 -0.32768000000000000000e5
-1339 1 12 43 -0.65536000000000000000e5
-1339 1 17 48 0.65536000000000000000e5
-1339 1 32 37 0.32768000000000000000e5
-1339 2 8 22 -0.32768000000000000000e5
-1339 2 12 26 0.32768000000000000000e5
-1339 3 2 31 0.32768000000000000000e5
-1339 3 14 27 0.65536000000000000000e5
-1339 4 4 16 0.32768000000000000000e5
-1340 1 5 52 0.32768000000000000000e5
-1340 1 17 48 -0.65536000000000000000e5
-1340 1 28 43 0.32768000000000000000e5
-1340 1 32 38 0.32768000000000000000e5
-1340 2 8 22 0.32768000000000000000e5
-1340 4 4 16 -0.32768000000000000000e5
-1340 4 7 19 -0.32768000000000000000e5
-1341 1 28 43 -0.32768000000000000000e5
-1341 1 32 39 0.32768000000000000000e5
-1342 1 5 52 -0.32768000000000000000e5
-1342 1 32 40 0.32768000000000000000e5
-1343 1 5 52 0.16384000000000000000e5
-1343 1 11 42 -0.16384000000000000000e5
-1343 1 12 43 -0.32768000000000000000e5
-1343 1 32 41 0.32768000000000000000e5
-1343 2 12 26 0.16384000000000000000e5
-1343 2 20 34 -0.16384000000000000000e5
-1343 3 2 31 0.16384000000000000000e5
-1343 3 14 27 0.32768000000000000000e5
-1343 4 7 19 -0.16384000000000000000e5
-1343 4 8 20 -0.16384000000000000000e5
-1344 1 17 48 -0.32768000000000000000e5
-1344 1 32 42 0.32768000000000000000e5
-1345 1 14 45 -0.65536000000000000000e5
-1345 1 17 48 0.32768000000000000000e5
-1345 1 18 49 0.32768000000000000000e5
-1345 1 32 43 0.32768000000000000000e5
-1345 2 24 30 0.32768000000000000000e5
-1345 3 15 28 0.65536000000000000000e5
-1346 1 13 52 -0.32768000000000000000e5
-1346 1 32 44 0.32768000000000000000e5
-1347 1 14 45 -0.32768000000000000000e5
-1347 1 32 45 0.32768000000000000000e5
-1347 3 15 28 0.32768000000000000000e5
-1348 1 29 36 -0.32768000000000000000e5
-1348 1 32 46 0.32768000000000000000e5
-1348 3 24 25 0.32768000000000000000e5
-1349 1 28 43 -0.32768000000000000000e5
-1349 1 32 48 0.32768000000000000000e5
-1349 3 18 31 0.32768000000000000000e5
-1350 1 32 49 0.32768000000000000000e5
-1350 1 33 48 -0.32768000000000000000e5
-1351 1 17 48 -0.32768000000000000000e5
-1351 1 32 50 0.32768000000000000000e5
-1351 3 24 29 0.32768000000000000000e5
-1352 1 32 51 0.32768000000000000000e5
-1352 1 34 49 -0.32768000000000000000e5
-1353 1 32 52 0.32768000000000000000e5
-1353 1 35 50 -0.32768000000000000000e5
-1354 1 28 43 -0.32768000000000000000e5
-1354 1 32 53 0.32768000000000000000e5
-1354 3 18 31 0.32768000000000000000e5
-1354 3 21 34 0.32768000000000000000e5
-1355 1 32 54 0.32768000000000000000e5
-1355 1 43 50 -0.32768000000000000000e5
-1356 1 32 55 0.32768000000000000000e5
-1356 1 44 51 -0.32768000000000000000e5
-1357 1 32 56 0.32768000000000000000e5
-1357 1 50 51 -0.32768000000000000000e5
-1358 1 11 46 -0.16384000000000000000e5
-1358 1 33 33 0.32768000000000000000e5
-1359 1 29 36 -0.32768000000000000000e5
-1359 1 33 34 0.32768000000000000000e5
-1360 1 15 46 -0.32768000000000000000e5
-1360 1 33 35 0.32768000000000000000e5
-1361 1 5 52 0.32768000000000000000e5
-1361 1 17 48 -0.65536000000000000000e5
-1361 1 28 43 0.32768000000000000000e5
-1361 1 33 37 0.32768000000000000000e5
-1361 2 8 22 0.32768000000000000000e5
-1361 4 4 16 -0.32768000000000000000e5
-1361 4 7 19 -0.32768000000000000000e5
-1362 1 28 43 -0.32768000000000000000e5
-1362 1 33 38 0.32768000000000000000e5
-1363 1 5 52 -0.32768000000000000000e5
-1363 1 33 39 0.32768000000000000000e5
-1364 1 17 48 -0.32768000000000000000e5
-1364 1 33 41 0.32768000000000000000e5
-1365 1 14 45 -0.65536000000000000000e5
-1365 1 17 48 0.32768000000000000000e5
-1365 1 18 49 0.32768000000000000000e5
-1365 1 33 42 0.32768000000000000000e5
-1365 2 24 30 0.32768000000000000000e5
-1365 3 15 28 0.65536000000000000000e5
-1366 1 18 49 -0.32768000000000000000e5
-1366 1 33 43 0.32768000000000000000e5
-1367 1 14 45 -0.32768000000000000000e5
-1367 1 33 44 0.32768000000000000000e5
-1367 3 15 28 0.32768000000000000000e5
-1368 1 13 52 0.32768000000000000000e5
-1368 1 14 45 0.32768000000000000000e5
-1368 1 29 36 -0.65536000000000000000e5
-1368 1 33 45 0.32768000000000000000e5
-1368 2 15 33 0.32768000000000000000e5
-1368 3 15 28 -0.32768000000000000000e5
-1368 3 24 25 0.65536000000000000000e5
-1369 1 20 51 -0.32768000000000000000e5
-1369 1 33 46 0.32768000000000000000e5
-1370 1 28 43 -0.32768000000000000000e5
-1370 1 33 47 0.32768000000000000000e5
-1370 3 18 31 0.32768000000000000000e5
-1371 1 15 54 -0.32768000000000000000e5
-1371 1 33 49 0.32768000000000000000e5
-1372 1 33 50 0.32768000000000000000e5
-1372 1 34 49 -0.32768000000000000000e5
-1373 1 17 48 0.32768000000000000000e5
-1373 1 33 51 0.32768000000000000000e5
-1373 1 34 49 0.32768000000000000000e5
-1373 1 35 50 -0.65536000000000000000e5
-1373 2 24 34 0.32768000000000000000e5
-1373 3 24 29 -0.32768000000000000000e5
-1374 1 33 52 0.32768000000000000000e5
-1374 1 43 46 -0.32768000000000000000e5
-1375 1 33 53 0.32768000000000000000e5
-1375 1 43 50 -0.32768000000000000000e5
-1376 1 28 43 0.32768000000000000000e5
-1376 1 33 54 0.32768000000000000000e5
-1376 1 43 50 0.32768000000000000000e5
-1376 1 44 51 -0.65536000000000000000e5
-1376 2 31 33 0.32768000000000000000e5
-1376 3 18 31 -0.32768000000000000000e5
-1376 3 21 34 -0.32768000000000000000e5
-1377 1 33 55 0.32768000000000000000e5
-1377 1 46 49 -0.32768000000000000000e5
-1378 1 4 19 0.40960000000000000000e4
-1378 1 13 44 -0.40960000000000000000e4
-1378 1 19 42 -0.81920000000000000000e4
-1378 1 20 27 -0.81920000000000000000e4
-1378 1 29 36 -0.81920000000000000000e4
-1378 1 34 34 0.32768000000000000000e5
-1378 2 15 29 -0.81920000000000000000e4
-1378 3 8 13 -0.40960000000000000000e4
-1378 3 10 23 0.40960000000000000000e4
-1378 3 11 24 0.40960000000000000000e4
-1378 4 10 14 0.40960000000000000000e4
-1379 1 17 32 -0.16384000000000000000e5
-1379 1 18 33 -0.16384000000000000000e5
-1379 1 29 36 -0.16384000000000000000e5
-1379 1 34 35 0.32768000000000000000e5
-1379 2 14 24 -0.16384000000000000000e5
-1379 3 12 25 -0.16384000000000000000e5
-1379 3 15 24 0.32768000000000000000e5
-1380 1 21 44 -0.32768000000000000000e5
-1380 1 34 36 0.32768000000000000000e5
-1381 1 16 47 -0.32768000000000000000e5
-1381 1 34 37 0.32768000000000000000e5
-1382 1 5 52 0.16384000000000000000e5
-1382 1 11 42 -0.16384000000000000000e5
-1382 1 12 43 -0.32768000000000000000e5
-1382 1 34 38 0.32768000000000000000e5
-1382 2 12 26 0.16384000000000000000e5
-1382 2 20 34 -0.16384000000000000000e5
-1382 3 2 31 0.16384000000000000000e5
-1382 3 14 27 0.32768000000000000000e5
-1382 4 7 19 -0.16384000000000000000e5
-1382 4 8 20 -0.16384000000000000000e5
-1383 1 17 48 -0.32768000000000000000e5
-1383 1 34 39 0.32768000000000000000e5
-1384 1 14 45 -0.65536000000000000000e5
-1384 1 17 48 0.32768000000000000000e5
-1384 1 18 49 0.32768000000000000000e5
-1384 1 34 40 0.32768000000000000000e5
-1384 2 24 30 0.32768000000000000000e5
-1384 3 15 28 0.65536000000000000000e5
-1385 1 13 52 -0.32768000000000000000e5
-1385 1 34 42 0.32768000000000000000e5
-1386 1 14 45 -0.32768000000000000000e5
-1386 1 34 43 0.32768000000000000000e5
-1386 3 15 28 0.32768000000000000000e5
-1387 1 19 50 -0.32768000000000000000e5
-1387 1 34 44 0.32768000000000000000e5
-1388 1 29 36 -0.32768000000000000000e5
-1388 1 34 45 0.32768000000000000000e5
-1388 3 24 25 0.32768000000000000000e5
-1389 1 19 50 -0.16384000000000000000e5
-1389 1 20 51 -0.16384000000000000000e5
-1389 1 29 36 -0.16384000000000000000e5
-1389 1 34 46 0.32768000000000000000e5
-1389 2 25 31 -0.16384000000000000000e5
-1389 3 24 25 0.16384000000000000000e5
-1390 1 28 43 -0.16384000000000000000e5
-1390 1 32 47 -0.16384000000000000000e5
-1390 1 34 47 0.32768000000000000000e5
-1390 1 37 44 -0.16384000000000000000e5
-1390 2 20 34 -0.16384000000000000000e5
-1390 3 18 31 0.16384000000000000000e5
-1391 1 17 48 -0.32768000000000000000e5
-1391 1 34 48 0.32768000000000000000e5
-1391 3 24 29 0.32768000000000000000e5
-1392 1 16 55 -0.32768000000000000000e5
-1392 1 34 50 0.32768000000000000000e5
-1393 1 34 51 0.32768000000000000000e5
-1393 1 35 50 -0.32768000000000000000e5
-1394 1 16 55 -0.16384000000000000000e5
-1394 1 34 52 0.32768000000000000000e5
-1394 1 35 50 -0.16384000000000000000e5
-1394 1 43 46 -0.16384000000000000000e5
-1394 2 31 31 -0.32768000000000000000e5
-1395 1 17 48 -0.32768000000000000000e5
-1395 1 32 47 0.16384000000000000000e5
-1395 1 33 48 0.16384000000000000000e5
-1395 1 34 53 0.32768000000000000000e5
-1395 1 37 52 -0.16384000000000000000e5
-1395 1 43 50 -0.16384000000000000000e5
-1395 3 21 34 0.16384000000000000000e5
-1395 3 24 29 0.32768000000000000000e5
-1395 4 16 20 0.16384000000000000000e5
-1396 1 34 54 0.32768000000000000000e5
-1396 1 44 51 -0.32768000000000000000e5
-1397 1 34 55 0.32768000000000000000e5
-1397 1 35 50 -0.32768000000000000000e5
-1397 3 25 34 0.32768000000000000000e5
-1398 1 34 56 0.32768000000000000000e5
-1398 1 46 53 -0.32768000000000000000e5
-1399 1 33 36 -0.16384000000000000000e5
-1399 1 35 35 0.32768000000000000000e5
-1400 1 5 52 0.16384000000000000000e5
-1400 1 11 42 -0.16384000000000000000e5
-1400 1 12 43 -0.32768000000000000000e5
-1400 1 35 37 0.32768000000000000000e5
-1400 2 12 26 0.16384000000000000000e5
-1400 2 20 34 -0.16384000000000000000e5
-1400 3 2 31 0.16384000000000000000e5
-1400 3 14 27 0.32768000000000000000e5
-1400 4 7 19 -0.16384000000000000000e5
-1400 4 8 20 -0.16384000000000000000e5
-1401 1 17 48 -0.32768000000000000000e5
-1401 1 35 38 0.32768000000000000000e5
-1402 1 14 45 -0.65536000000000000000e5
-1402 1 17 48 0.32768000000000000000e5
-1402 1 18 49 0.32768000000000000000e5
-1402 1 35 39 0.32768000000000000000e5
-1402 2 24 30 0.32768000000000000000e5
-1402 3 15 28 0.65536000000000000000e5
-1403 1 18 49 -0.32768000000000000000e5
-1403 1 35 40 0.32768000000000000000e5
-1404 1 13 52 -0.32768000000000000000e5
-1404 1 35 41 0.32768000000000000000e5
-1405 1 14 45 -0.32768000000000000000e5
-1405 1 35 42 0.32768000000000000000e5
-1405 3 15 28 0.32768000000000000000e5
-1406 1 13 52 0.32768000000000000000e5
-1406 1 14 45 0.32768000000000000000e5
-1406 1 29 36 -0.65536000000000000000e5
-1406 1 35 43 0.32768000000000000000e5
-1406 2 15 33 0.32768000000000000000e5
-1406 3 15 28 -0.32768000000000000000e5
-1406 3 24 25 0.65536000000000000000e5
-1407 1 29 36 -0.32768000000000000000e5
-1407 1 35 44 0.32768000000000000000e5
-1407 3 24 25 0.32768000000000000000e5
-1408 1 20 51 -0.32768000000000000000e5
-1408 1 35 45 0.32768000000000000000e5
-1409 1 17 48 -0.32768000000000000000e5
-1409 1 35 47 0.32768000000000000000e5
-1409 3 24 29 0.32768000000000000000e5
-1410 1 34 49 -0.32768000000000000000e5
-1410 1 35 48 0.32768000000000000000e5
-1411 1 17 48 0.32768000000000000000e5
-1411 1 34 49 0.32768000000000000000e5
-1411 1 35 49 0.32768000000000000000e5
-1411 1 35 50 -0.65536000000000000000e5
-1411 2 24 34 0.32768000000000000000e5
-1411 3 24 29 -0.32768000000000000000e5
-1412 1 35 51 0.32768000000000000000e5
-1412 1 43 46 -0.32768000000000000000e5
-1413 1 35 52 0.32768000000000000000e5
-1413 1 36 51 -0.32768000000000000000e5
-1414 1 35 53 0.32768000000000000000e5
-1414 1 44 51 -0.32768000000000000000e5
-1415 1 35 54 0.32768000000000000000e5
-1415 1 46 49 -0.32768000000000000000e5
-1416 1 35 55 0.32768000000000000000e5
-1416 1 45 52 -0.32768000000000000000e5
-1417 1 35 56 0.32768000000000000000e5
-1417 1 51 52 -0.32768000000000000000e5
-1418 1 21 46 -0.16384000000000000000e5
-1418 1 36 36 0.32768000000000000000e5
-1419 1 34 41 -0.32768000000000000000e5
-1419 1 36 37 0.32768000000000000000e5
-1420 1 13 52 -0.32768000000000000000e5
-1420 1 36 38 0.32768000000000000000e5
-1421 1 14 45 -0.32768000000000000000e5
-1421 1 36 39 0.32768000000000000000e5
-1421 3 15 28 0.32768000000000000000e5
-1422 1 13 52 0.32768000000000000000e5
-1422 1 14 45 0.32768000000000000000e5
-1422 1 29 36 -0.65536000000000000000e5
-1422 1 36 40 0.32768000000000000000e5
-1422 2 15 33 0.32768000000000000000e5
-1422 3 15 28 -0.32768000000000000000e5
-1422 3 24 25 0.65536000000000000000e5
-1423 1 19 50 -0.32768000000000000000e5
-1423 1 36 41 0.32768000000000000000e5
-1424 1 29 36 -0.32768000000000000000e5
-1424 1 36 42 0.32768000000000000000e5
-1424 3 24 25 0.32768000000000000000e5
-1425 1 20 51 -0.32768000000000000000e5
-1425 1 36 43 0.32768000000000000000e5
-1426 1 19 50 -0.16384000000000000000e5
-1426 1 20 51 -0.16384000000000000000e5
-1426 1 29 36 -0.16384000000000000000e5
-1426 1 36 44 0.32768000000000000000e5
-1426 2 25 31 -0.16384000000000000000e5
-1426 3 24 25 0.16384000000000000000e5
-1427 1 35 46 -0.32768000000000000000e5
-1427 1 36 45 0.32768000000000000000e5
-1428 1 21 52 -0.32768000000000000000e5
-1428 1 36 46 0.32768000000000000000e5
-1429 1 16 55 -0.32768000000000000000e5
-1429 1 36 47 0.32768000000000000000e5
-1430 1 35 50 -0.32768000000000000000e5
-1430 1 36 48 0.32768000000000000000e5
-1431 1 36 49 0.32768000000000000000e5
-1431 1 43 46 -0.32768000000000000000e5
-1432 1 16 55 -0.16384000000000000000e5
-1432 1 35 50 -0.16384000000000000000e5
-1432 1 36 50 0.32768000000000000000e5
-1432 1 43 46 -0.16384000000000000000e5
-1432 2 31 31 -0.32768000000000000000e5
-1433 1 36 52 0.32768000000000000000e5
-1433 1 46 46 -0.65536000000000000000e5
-1434 1 35 50 -0.32768000000000000000e5
-1434 1 36 53 0.32768000000000000000e5
-1434 3 25 34 0.32768000000000000000e5
-1435 1 36 54 0.32768000000000000000e5
-1435 1 45 52 -0.32768000000000000000e5
-1436 1 21 56 -0.32768000000000000000e5
-1436 1 36 55 0.32768000000000000000e5
-1437 1 36 56 0.32768000000000000000e5
-1437 1 46 55 -0.32768000000000000000e5
-1438 1 1 48 -0.16384000000000000000e5
-1438 1 2 49 -0.16384000000000000000e5
-1438 1 7 54 0.32768000000000000000e5
-1438 1 23 38 -0.16384000000000000000e5
-1438 1 24 39 -0.16384000000000000000e5
-1438 1 37 37 0.32768000000000000000e5
-1438 2 1 35 0.16384000000000000000e5
-1438 2 2 32 -0.16384000000000000000e5
-1438 2 3 33 -0.16384000000000000000e5
-1438 2 18 32 0.16384000000000000000e5
-1438 2 26 32 -0.16384000000000000000e5
-1438 3 3 32 -0.16384000000000000000e5
-1438 3 4 33 -0.16384000000000000000e5
-1438 3 16 29 0.32768000000000000000e5
-1438 3 17 30 0.32768000000000000000e5
-1438 4 17 17 -0.32768000000000000000e5
-1439 1 2 49 0.32768000000000000000e5
-1439 1 7 54 -0.65536000000000000000e5
-1439 1 24 39 0.32768000000000000000e5
-1439 1 37 38 0.32768000000000000000e5
-1439 2 3 33 0.32768000000000000000e5
-1439 2 18 32 -0.32768000000000000000e5
-1439 2 26 32 0.32768000000000000000e5
-1439 3 4 33 0.32768000000000000000e5
-1439 3 17 30 -0.65536000000000000000e5
-1439 4 17 17 0.65536000000000000000e5
-1440 1 2 49 -0.32768000000000000000e5
-1440 1 37 39 0.32768000000000000000e5
-1440 3 3 32 0.32768000000000000000e5
-1441 1 24 39 -0.32768000000000000000e5
-1441 1 37 40 0.32768000000000000000e5
-1441 2 3 33 -0.32768000000000000000e5
-1441 2 18 32 0.32768000000000000000e5
-1441 3 3 32 -0.32768000000000000000e5
-1441 3 4 33 -0.32768000000000000000e5
-1441 3 17 30 0.65536000000000000000e5
-1442 1 1 48 -0.16384000000000000000e5
-1442 1 2 49 -0.16384000000000000000e5
-1442 1 23 38 -0.16384000000000000000e5
-1442 1 37 41 0.32768000000000000000e5
-1442 2 2 32 -0.16384000000000000000e5
-1442 3 16 29 0.32768000000000000000e5
-1443 1 7 54 -0.32768000000000000000e5
-1443 1 37 42 0.32768000000000000000e5
-1444 1 1 48 0.16384000000000000000e5
-1444 1 2 49 0.16384000000000000000e5
-1444 1 3 50 0.32768000000000000000e5
-1444 1 11 42 -0.65536000000000000000e5
-1444 1 12 43 -0.13107200000000000000e6
-1444 1 17 48 0.13107200000000000000e6
-1444 1 23 38 0.16384000000000000000e5
-1444 1 37 43 0.32768000000000000000e5
-1444 2 2 32 0.16384000000000000000e5
-1444 2 8 22 -0.65536000000000000000e5
-1444 2 12 26 0.65536000000000000000e5
-1444 2 16 30 0.32768000000000000000e5
-1444 3 2 31 0.65536000000000000000e5
-1444 3 14 27 0.13107200000000000000e6
-1444 3 17 30 0.32768000000000000000e5
-1444 4 4 16 0.65536000000000000000e5
-1445 1 32 47 -0.32768000000000000000e5
-1445 1 37 45 0.32768000000000000000e5
-1446 1 28 43 -0.16384000000000000000e5
-1446 1 32 47 -0.16384000000000000000e5
-1446 1 37 44 -0.16384000000000000000e5
-1446 1 37 46 0.32768000000000000000e5
-1446 2 20 34 -0.16384000000000000000e5
-1446 3 18 31 0.16384000000000000000e5
-1447 1 22 53 -0.32768000000000000000e5
-1447 1 37 47 0.32768000000000000000e5
-1448 1 7 54 -0.65536000000000000000e5
-1448 1 22 53 0.32768000000000000000e5
-1448 1 23 54 0.32768000000000000000e5
-1448 1 37 48 0.32768000000000000000e5
-1448 2 26 32 0.32768000000000000000e5
-1448 3 6 35 0.65536000000000000000e5
-1449 1 23 54 -0.32768000000000000000e5
-1449 1 37 49 0.32768000000000000000e5
-1450 1 7 54 -0.32768000000000000000e5
-1450 1 37 50 0.32768000000000000000e5
-1450 3 6 35 0.32768000000000000000e5
-1451 1 1 48 0.16384000000000000000e5
-1451 1 2 49 0.16384000000000000000e5
-1451 1 3 50 0.32768000000000000000e5
-1451 1 11 42 -0.65536000000000000000e5
-1451 1 12 43 -0.13107200000000000000e6
-1451 1 17 48 0.13107200000000000000e6
-1451 1 23 38 0.16384000000000000000e5
-1451 1 37 51 0.32768000000000000000e5
-1451 2 2 32 0.16384000000000000000e5
-1451 2 8 22 -0.65536000000000000000e5
-1451 2 12 26 0.65536000000000000000e5
-1451 2 16 30 0.32768000000000000000e5
-1451 3 2 31 0.65536000000000000000e5
-1451 3 14 27 0.13107200000000000000e6
-1451 3 17 30 0.32768000000000000000e5
-1451 3 20 33 0.32768000000000000000e5
-1451 4 4 16 0.65536000000000000000e5
-1452 1 37 53 0.32768000000000000000e5
-1452 1 38 53 0.32768000000000000000e5
-1452 1 47 50 -0.65536000000000000000e5
-1452 1 47 54 0.32768000000000000000e5
-1452 2 32 32 0.65536000000000000000e5
-1452 3 32 33 0.32768000000000000000e5
-1453 1 37 54 0.32768000000000000000e5
-1453 1 38 53 -0.32768000000000000000e5
-1454 1 37 55 0.32768000000000000000e5
-1454 1 47 50 -0.32768000000000000000e5
-1455 1 2 49 -0.16384000000000000000e5
-1455 1 38 38 0.32768000000000000000e5
-1455 3 3 32 0.16384000000000000000e5
-1456 1 24 39 -0.32768000000000000000e5
-1456 1 38 39 0.32768000000000000000e5
-1456 2 3 33 -0.32768000000000000000e5
-1456 2 18 32 0.32768000000000000000e5
-1456 3 3 32 -0.32768000000000000000e5
-1456 3 4 33 -0.32768000000000000000e5
-1456 3 17 30 0.65536000000000000000e5
-1457 1 1 48 0.32768000000000000000e5
-1457 1 2 49 0.65536000000000000000e5
-1457 1 3 50 0.65536000000000000000e5
-1457 1 11 42 -0.13107200000000000000e6
-1457 1 12 43 -0.26214400000000000000e6
-1457 1 17 48 0.26214400000000000000e6
-1457 1 23 38 0.32768000000000000000e5
-1457 1 24 39 0.32768000000000000000e5
-1457 1 38 40 0.32768000000000000000e5
-1457 2 2 32 0.32768000000000000000e5
-1457 2 3 33 0.32768000000000000000e5
-1457 2 8 22 -0.13107200000000000000e6
-1457 2 12 26 0.13107200000000000000e6
-1457 2 16 30 0.65536000000000000000e5
-1457 3 2 31 0.13107200000000000000e6
-1457 3 4 33 0.32768000000000000000e5
-1457 3 14 27 0.26214400000000000000e6
-1457 4 4 16 0.13107200000000000000e6
-1458 1 7 54 -0.32768000000000000000e5
-1458 1 38 41 0.32768000000000000000e5
-1459 1 1 48 0.16384000000000000000e5
-1459 1 2 49 0.16384000000000000000e5
-1459 1 3 50 0.32768000000000000000e5
-1459 1 11 42 -0.65536000000000000000e5
-1459 1 12 43 -0.13107200000000000000e6
-1459 1 17 48 0.13107200000000000000e6
-1459 1 23 38 0.16384000000000000000e5
-1459 1 38 42 0.32768000000000000000e5
-1459 2 2 32 0.16384000000000000000e5
-1459 2 8 22 -0.65536000000000000000e5
-1459 2 12 26 0.65536000000000000000e5
-1459 2 16 30 0.32768000000000000000e5
-1459 3 2 31 0.65536000000000000000e5
-1459 3 14 27 0.13107200000000000000e6
-1459 3 17 30 0.32768000000000000000e5
-1459 4 4 16 0.65536000000000000000e5
-1460 1 26 41 -0.32768000000000000000e5
-1460 1 38 43 0.32768000000000000000e5
-1460 3 22 27 0.32768000000000000000e5
-1461 1 32 47 -0.32768000000000000000e5
-1461 1 38 44 0.32768000000000000000e5
-1462 1 28 43 -0.32768000000000000000e5
-1462 1 38 45 0.32768000000000000000e5
-1462 3 18 31 0.32768000000000000000e5
-1463 1 17 48 -0.32768000000000000000e5
-1463 1 38 46 0.32768000000000000000e5
-1463 3 24 29 0.32768000000000000000e5
-1464 1 7 54 -0.65536000000000000000e5
-1464 1 22 53 0.32768000000000000000e5
-1464 1 23 54 0.32768000000000000000e5
-1464 1 38 47 0.32768000000000000000e5
-1464 2 26 32 0.32768000000000000000e5
-1464 3 6 35 0.65536000000000000000e5
-1465 1 23 54 -0.32768000000000000000e5
-1465 1 38 48 0.32768000000000000000e5
-1466 1 1 48 0.32768000000000000000e5
-1466 1 2 49 0.65536000000000000000e5
-1466 1 3 50 0.65536000000000000000e5
-1466 1 11 42 -0.13107200000000000000e6
-1466 1 12 43 -0.26214400000000000000e6
-1466 1 17 48 0.26214400000000000000e6
-1466 1 23 38 0.32768000000000000000e5
-1466 1 24 39 0.32768000000000000000e5
-1466 1 38 49 0.32768000000000000000e5
-1466 2 2 32 0.32768000000000000000e5
-1466 2 3 33 0.32768000000000000000e5
-1466 2 8 22 -0.13107200000000000000e6
-1466 2 12 26 0.13107200000000000000e6
-1466 2 16 30 0.65536000000000000000e5
-1466 3 2 31 0.13107200000000000000e6
-1466 3 4 33 0.32768000000000000000e5
-1466 3 14 27 0.26214400000000000000e6
-1466 3 19 32 0.32768000000000000000e5
-1466 4 4 16 0.13107200000000000000e6
-1467 1 1 48 0.16384000000000000000e5
-1467 1 2 49 0.16384000000000000000e5
-1467 1 3 50 0.32768000000000000000e5
-1467 1 11 42 -0.65536000000000000000e5
-1467 1 12 43 -0.13107200000000000000e6
-1467 1 17 48 0.13107200000000000000e6
-1467 1 23 38 0.16384000000000000000e5
-1467 1 38 50 0.32768000000000000000e5
-1467 2 2 32 0.16384000000000000000e5
-1467 2 8 22 -0.65536000000000000000e5
-1467 2 12 26 0.65536000000000000000e5
-1467 2 16 30 0.32768000000000000000e5
-1467 3 2 31 0.65536000000000000000e5
-1467 3 14 27 0.13107200000000000000e6
-1467 3 17 30 0.32768000000000000000e5
-1467 3 20 33 0.32768000000000000000e5
-1467 4 4 16 0.65536000000000000000e5
-1468 1 24 55 -0.32768000000000000000e5
-1468 1 38 51 0.32768000000000000000e5
-1469 1 28 43 -0.32768000000000000000e5
-1469 1 38 52 0.32768000000000000000e5
-1469 3 18 31 0.32768000000000000000e5
-1469 3 21 34 0.32768000000000000000e5
-1470 1 38 54 0.32768000000000000000e5
-1470 1 47 54 -0.32768000000000000000e5
-1470 3 32 33 -0.32768000000000000000e5
-1471 1 1 48 0.16384000000000000000e5
-1471 1 2 49 0.16384000000000000000e5
-1471 1 3 50 0.32768000000000000000e5
-1471 1 11 42 -0.65536000000000000000e5
-1471 1 12 43 -0.13107200000000000000e6
-1471 1 17 48 0.13107200000000000000e6
-1471 1 23 38 0.16384000000000000000e5
-1471 1 24 55 -0.32768000000000000000e5
-1471 1 38 55 0.32768000000000000000e5
-1471 1 47 50 0.32768000000000000000e5
-1471 2 2 32 0.16384000000000000000e5
-1471 2 8 22 -0.65536000000000000000e5
-1471 2 12 26 0.65536000000000000000e5
-1471 2 16 30 0.32768000000000000000e5
-1471 2 21 35 -0.32768000000000000000e5
-1471 2 29 35 0.32768000000000000000e5
-1471 3 2 31 0.65536000000000000000e5
-1471 3 14 27 0.13107200000000000000e6
-1471 3 17 30 0.32768000000000000000e5
-1471 3 20 33 0.32768000000000000000e5
-1471 3 22 35 -0.32768000000000000000e5
-1471 3 29 34 0.65536000000000000000e5
-1471 4 4 16 0.65536000000000000000e5
-1472 1 38 56 0.32768000000000000000e5
-1472 1 47 54 -0.32768000000000000000e5
-1473 1 1 48 0.16384000000000000000e5
-1473 1 2 49 0.32768000000000000000e5
-1473 1 3 50 0.32768000000000000000e5
-1473 1 11 42 -0.65536000000000000000e5
-1473 1 12 43 -0.13107200000000000000e6
-1473 1 17 48 0.13107200000000000000e6
-1473 1 23 38 0.16384000000000000000e5
-1473 1 24 39 0.16384000000000000000e5
-1473 1 39 39 0.32768000000000000000e5
-1473 2 2 32 0.16384000000000000000e5
-1473 2 3 33 0.16384000000000000000e5
-1473 2 8 22 -0.65536000000000000000e5
-1473 2 12 26 0.65536000000000000000e5
-1473 2 16 30 0.32768000000000000000e5
-1473 3 2 31 0.65536000000000000000e5
-1473 3 4 33 0.16384000000000000000e5
-1473 3 14 27 0.13107200000000000000e6
-1473 4 4 16 0.65536000000000000000e5
-1474 1 6 53 -0.32768000000000000000e5
-1474 1 39 40 0.32768000000000000000e5
-1475 1 1 48 0.16384000000000000000e5
-1475 1 2 49 0.16384000000000000000e5
-1475 1 3 50 0.32768000000000000000e5
-1475 1 11 42 -0.65536000000000000000e5
-1475 1 12 43 -0.13107200000000000000e6
-1475 1 17 48 0.13107200000000000000e6
-1475 1 23 38 0.16384000000000000000e5
-1475 1 39 41 0.32768000000000000000e5
-1475 2 2 32 0.16384000000000000000e5
-1475 2 8 22 -0.65536000000000000000e5
-1475 2 12 26 0.65536000000000000000e5
-1475 2 16 30 0.32768000000000000000e5
-1475 3 2 31 0.65536000000000000000e5
-1475 3 14 27 0.13107200000000000000e6
-1475 3 17 30 0.32768000000000000000e5
-1475 4 4 16 0.65536000000000000000e5
-1476 1 26 41 -0.32768000000000000000e5
-1476 1 39 42 0.32768000000000000000e5
-1476 3 22 27 0.32768000000000000000e5
-1477 1 1 48 -0.16384000000000000000e5
-1477 1 2 49 -0.16384000000000000000e5
-1477 1 3 50 -0.32768000000000000000e5
-1477 1 11 42 0.65536000000000000000e5
-1477 1 12 43 0.13107200000000000000e6
-1477 1 17 48 -0.13107200000000000000e6
-1477 1 23 38 -0.16384000000000000000e5
-1477 1 26 41 0.32768000000000000000e5
-1477 1 28 43 -0.65536000000000000000e5
-1477 1 39 43 0.32768000000000000000e5
-1477 2 2 32 -0.16384000000000000000e5
-1477 2 4 34 0.32768000000000000000e5
-1477 2 8 22 0.65536000000000000000e5
-1477 2 12 26 -0.65536000000000000000e5
-1477 2 16 30 -0.32768000000000000000e5
-1477 3 2 31 -0.65536000000000000000e5
-1477 3 5 34 0.32768000000000000000e5
-1477 3 14 27 -0.13107200000000000000e6
-1477 4 4 16 -0.65536000000000000000e5
-1478 1 28 43 -0.32768000000000000000e5
-1478 1 39 44 0.32768000000000000000e5
-1478 3 18 31 0.32768000000000000000e5
-1479 1 33 48 -0.32768000000000000000e5
-1479 1 39 45 0.32768000000000000000e5
-1480 1 34 49 -0.32768000000000000000e5
-1480 1 39 46 0.32768000000000000000e5
-1481 1 23 54 -0.32768000000000000000e5
-1481 1 39 47 0.32768000000000000000e5
-1482 1 1 48 0.32768000000000000000e5
-1482 1 2 49 0.65536000000000000000e5
-1482 1 3 50 0.65536000000000000000e5
-1482 1 11 42 -0.13107200000000000000e6
-1482 1 12 43 -0.26214400000000000000e6
-1482 1 17 48 0.26214400000000000000e6
-1482 1 23 38 0.32768000000000000000e5
-1482 1 24 39 0.32768000000000000000e5
-1482 1 39 48 0.32768000000000000000e5
-1482 2 2 32 0.32768000000000000000e5
-1482 2 3 33 0.32768000000000000000e5
-1482 2 8 22 -0.13107200000000000000e6
-1482 2 12 26 0.13107200000000000000e6
-1482 2 16 30 0.65536000000000000000e5
-1482 3 2 31 0.13107200000000000000e6
-1482 3 4 33 0.32768000000000000000e5
-1482 3 14 27 0.26214400000000000000e6
-1482 3 19 32 0.32768000000000000000e5
-1482 4 4 16 0.13107200000000000000e6
-1483 1 25 56 -0.32768000000000000000e5
-1483 1 39 49 0.32768000000000000000e5
-1483 3 28 33 -0.32768000000000000000e5
-1484 1 24 55 -0.32768000000000000000e5
-1484 1 39 50 0.32768000000000000000e5
-1485 1 1 48 -0.16384000000000000000e5
-1485 1 2 49 -0.16384000000000000000e5
-1485 1 3 50 -0.32768000000000000000e5
-1485 1 11 42 0.65536000000000000000e5
-1485 1 12 43 0.13107200000000000000e6
-1485 1 17 48 -0.13107200000000000000e6
-1485 1 23 38 -0.16384000000000000000e5
-1485 1 24 55 0.32768000000000000000e5
-1485 1 28 43 -0.65536000000000000000e5
-1485 1 39 51 0.32768000000000000000e5
-1485 2 2 32 -0.16384000000000000000e5
-1485 2 8 22 0.65536000000000000000e5
-1485 2 12 26 -0.65536000000000000000e5
-1485 2 16 30 -0.32768000000000000000e5
-1485 2 21 35 0.32768000000000000000e5
-1485 3 2 31 -0.65536000000000000000e5
-1485 3 14 27 -0.13107200000000000000e6
-1485 3 17 30 -0.32768000000000000000e5
-1485 3 18 31 0.65536000000000000000e5
-1485 3 20 33 -0.32768000000000000000e5
-1485 3 21 34 0.65536000000000000000e5
-1485 4 4 16 -0.65536000000000000000e5
-1486 1 39 52 0.32768000000000000000e5
-1486 1 43 50 -0.32768000000000000000e5
-1487 1 39 53 0.32768000000000000000e5
-1487 1 47 54 -0.32768000000000000000e5
-1487 3 32 33 -0.32768000000000000000e5
-1488 1 25 56 -0.32768000000000000000e5
-1488 1 39 54 0.32768000000000000000e5
-1489 1 1 48 -0.16384000000000000000e5
-1489 1 2 49 -0.16384000000000000000e5
-1489 1 3 50 -0.32768000000000000000e5
-1489 1 11 42 0.65536000000000000000e5
-1489 1 12 43 0.13107200000000000000e6
-1489 1 17 48 -0.13107200000000000000e6
-1489 1 23 38 -0.16384000000000000000e5
-1489 1 24 55 0.32768000000000000000e5
-1489 1 28 43 -0.65536000000000000000e5
-1489 1 39 55 0.32768000000000000000e5
-1489 2 2 32 -0.16384000000000000000e5
-1489 2 8 22 0.65536000000000000000e5
-1489 2 12 26 -0.65536000000000000000e5
-1489 2 16 30 -0.32768000000000000000e5
-1489 2 21 35 0.32768000000000000000e5
-1489 3 2 31 -0.65536000000000000000e5
-1489 3 14 27 -0.13107200000000000000e6
-1489 3 17 30 -0.32768000000000000000e5
-1489 3 18 31 0.65536000000000000000e5
-1489 3 20 33 -0.32768000000000000000e5
-1489 3 21 34 0.65536000000000000000e5
-1489 3 22 35 0.32768000000000000000e5
-1489 4 4 16 -0.65536000000000000000e5
-1490 1 1 48 -0.32768000000000000000e5
-1490 1 2 49 -0.32768000000000000000e5
-1490 1 3 50 -0.65536000000000000000e5
-1490 1 11 42 0.13107200000000000000e6
-1490 1 12 43 0.26214400000000000000e6
-1490 1 17 48 -0.26214400000000000000e6
-1490 1 23 38 -0.32768000000000000000e5
-1490 1 24 55 0.65536000000000000000e5
-1490 1 25 56 -0.32768000000000000000e5
-1490 1 37 56 0.32768000000000000000e5
-1490 1 38 53 -0.32768000000000000000e5
-1490 1 39 56 0.32768000000000000000e5
-1490 1 41 56 -0.65536000000000000000e5
-1490 1 47 50 -0.65536000000000000000e5
-1490 2 2 32 -0.32768000000000000000e5
-1490 2 8 22 0.13107200000000000000e6
-1490 2 12 26 -0.13107200000000000000e6
-1490 2 16 30 -0.65536000000000000000e5
-1490 2 21 35 0.65536000000000000000e5
-1490 2 29 35 -0.65536000000000000000e5
-1490 3 2 31 -0.13107200000000000000e6
-1490 3 14 27 -0.26214400000000000000e6
-1490 3 17 30 -0.65536000000000000000e5
-1490 3 20 33 -0.65536000000000000000e5
-1490 3 22 35 0.65536000000000000000e5
-1490 3 29 34 -0.13107200000000000000e6
-1490 3 32 33 -0.32768000000000000000e5
-1490 4 4 16 -0.13107200000000000000e6
-1490 4 20 20 -0.65536000000000000000e5
-1491 1 1 48 -0.32768000000000000000e5
-1491 1 2 49 -0.49152000000000000000e5
-1491 1 3 50 -0.65536000000000000000e5
-1491 1 6 53 0.16384000000000000000e5
-1491 1 11 42 0.13107200000000000000e6
-1491 1 12 43 0.26214400000000000000e6
-1491 1 17 48 -0.26214400000000000000e6
-1491 1 23 38 -0.32768000000000000000e5
-1491 1 24 39 -0.16384000000000000000e5
-1491 1 26 41 0.32768000000000000000e5
-1491 1 28 43 -0.65536000000000000000e5
-1491 1 40 40 0.32768000000000000000e5
-1491 2 2 32 -0.32768000000000000000e5
-1491 2 3 33 -0.16384000000000000000e5
-1491 2 4 34 0.32768000000000000000e5
-1491 2 5 35 0.16384000000000000000e5
-1491 2 8 22 0.13107200000000000000e6
-1491 2 12 26 -0.13107200000000000000e6
-1491 2 16 30 -0.65536000000000000000e5
-1491 3 2 31 -0.13107200000000000000e6
-1491 3 4 33 -0.16384000000000000000e5
-1491 3 5 34 0.32768000000000000000e5
-1491 3 14 27 -0.26214400000000000000e6
-1491 4 4 16 -0.13107200000000000000e6
-1492 1 26 41 -0.32768000000000000000e5
-1492 1 40 41 0.32768000000000000000e5
-1492 3 22 27 0.32768000000000000000e5
-1493 1 1 48 -0.16384000000000000000e5
-1493 1 2 49 -0.16384000000000000000e5
-1493 1 3 50 -0.32768000000000000000e5
-1493 1 11 42 0.65536000000000000000e5
-1493 1 12 43 0.13107200000000000000e6
-1493 1 17 48 -0.13107200000000000000e6
-1493 1 23 38 -0.16384000000000000000e5
-1493 1 26 41 0.32768000000000000000e5
-1493 1 28 43 -0.65536000000000000000e5
-1493 1 40 42 0.32768000000000000000e5
-1493 2 2 32 -0.16384000000000000000e5
-1493 2 4 34 0.32768000000000000000e5
-1493 2 8 22 0.65536000000000000000e5
-1493 2 12 26 -0.65536000000000000000e5
-1493 2 16 30 -0.32768000000000000000e5
-1493 3 2 31 -0.65536000000000000000e5
-1493 3 5 34 0.32768000000000000000e5
-1493 3 14 27 -0.13107200000000000000e6
-1493 4 4 16 -0.65536000000000000000e5
-1494 1 1 48 0.16384000000000000000e5
-1494 1 2 49 0.16384000000000000000e5
-1494 1 3 50 0.32768000000000000000e5
-1494 1 11 42 -0.65536000000000000000e5
-1494 1 12 43 -0.13107200000000000000e6
-1494 1 17 48 0.13107200000000000000e6
-1494 1 23 38 0.16384000000000000000e5
-1494 1 28 43 0.65536000000000000000e5
-1494 1 33 48 -0.65536000000000000000e5
-1494 1 40 43 0.32768000000000000000e5
-1494 2 2 32 0.16384000000000000000e5
-1494 2 4 34 -0.32768000000000000000e5
-1494 2 8 22 -0.65536000000000000000e5
-1494 2 12 26 0.65536000000000000000e5
-1494 2 16 30 0.32768000000000000000e5
-1494 2 28 30 0.32768000000000000000e5
-1494 3 2 31 0.65536000000000000000e5
-1494 3 5 34 -0.32768000000000000000e5
-1494 3 14 27 0.13107200000000000000e6
-1494 3 22 27 -0.32768000000000000000e5
-1494 4 4 16 0.65536000000000000000e5
-1495 1 33 48 -0.32768000000000000000e5
-1495 1 40 44 0.32768000000000000000e5
-1496 1 15 54 -0.32768000000000000000e5
-1496 1 40 45 0.32768000000000000000e5
-1497 1 17 48 0.32768000000000000000e5
-1497 1 34 49 0.32768000000000000000e5
-1497 1 35 50 -0.65536000000000000000e5
-1497 1 40 46 0.32768000000000000000e5
-1497 2 24 34 0.32768000000000000000e5
-1497 3 24 29 -0.32768000000000000000e5
-1498 1 1 48 0.32768000000000000000e5
-1498 1 2 49 0.65536000000000000000e5
-1498 1 3 50 0.65536000000000000000e5
-1498 1 11 42 -0.13107200000000000000e6
-1498 1 12 43 -0.26214400000000000000e6
-1498 1 17 48 0.26214400000000000000e6
-1498 1 23 38 0.32768000000000000000e5
-1498 1 24 39 0.32768000000000000000e5
-1498 1 40 47 0.32768000000000000000e5
-1498 2 2 32 0.32768000000000000000e5
-1498 2 3 33 0.32768000000000000000e5
-1498 2 8 22 -0.13107200000000000000e6
-1498 2 12 26 0.13107200000000000000e6
-1498 2 16 30 0.65536000000000000000e5
-1498 3 2 31 0.13107200000000000000e6
-1498 3 4 33 0.32768000000000000000e5
-1498 3 14 27 0.26214400000000000000e6
-1498 3 19 32 0.32768000000000000000e5
-1498 4 4 16 0.13107200000000000000e6
-1499 1 25 56 -0.32768000000000000000e5
-1499 1 40 48 0.32768000000000000000e5
-1499 3 28 33 -0.32768000000000000000e5
-1500 1 1 48 -0.65536000000000000000e5
-1500 1 2 49 -0.98304000000000000000e5
-1500 1 3 50 -0.13107200000000000000e6
-1500 1 11 42 0.26214400000000000000e6
-1500 1 12 43 0.52428800000000000000e6
-1500 1 17 48 -0.52428800000000000000e6
-1500 1 23 38 -0.65536000000000000000e5
-1500 1 24 39 -0.32768000000000000000e5
-1500 1 24 55 0.65536000000000000000e5
-1500 1 25 56 0.32768000000000000000e5
-1500 1 28 43 -0.13107200000000000000e6
-1500 1 40 49 0.32768000000000000000e5
-1500 2 2 32 -0.65536000000000000000e5
-1500 2 3 33 -0.32768000000000000000e5
-1500 2 8 22 0.26214400000000000000e6
-1500 2 12 26 -0.26214400000000000000e6
-1500 2 16 30 -0.13107200000000000000e6
-1500 2 19 35 0.32768000000000000000e5
-1500 2 21 35 0.65536000000000000000e5
-1500 3 2 31 -0.26214400000000000000e6
-1500 3 4 33 -0.32768000000000000000e5
-1500 3 14 27 -0.52428800000000000000e6
-1500 3 17 30 -0.65536000000000000000e5
-1500 3 18 31 0.13107200000000000000e6
-1500 3 19 32 -0.32768000000000000000e5
-1500 3 20 33 -0.65536000000000000000e5
-1500 3 21 34 0.13107200000000000000e6
-1500 3 28 33 0.32768000000000000000e5
-1500 4 4 16 -0.26214400000000000000e6
-1501 1 1 48 -0.16384000000000000000e5
-1501 1 2 49 -0.16384000000000000000e5
-1501 1 3 50 -0.32768000000000000000e5
-1501 1 11 42 0.65536000000000000000e5
-1501 1 12 43 0.13107200000000000000e6
-1501 1 17 48 -0.13107200000000000000e6
-1501 1 23 38 -0.16384000000000000000e5
-1501 1 24 55 0.32768000000000000000e5
-1501 1 28 43 -0.65536000000000000000e5
-1501 1 40 50 0.32768000000000000000e5
-1501 2 2 32 -0.16384000000000000000e5
-1501 2 8 22 0.65536000000000000000e5
-1501 2 12 26 -0.65536000000000000000e5
-1501 2 16 30 -0.32768000000000000000e5
-1501 2 21 35 0.32768000000000000000e5
-1501 3 2 31 -0.65536000000000000000e5
-1501 3 14 27 -0.13107200000000000000e6
-1501 3 17 30 -0.32768000000000000000e5
-1501 3 18 31 0.65536000000000000000e5
-1501 3 20 33 -0.32768000000000000000e5
-1501 3 21 34 0.65536000000000000000e5
-1501 4 4 16 -0.65536000000000000000e5
-1502 1 1 48 0.16384000000000000000e5
-1502 1 2 49 0.16384000000000000000e5
-1502 1 3 50 0.32768000000000000000e5
-1502 1 11 42 -0.65536000000000000000e5
-1502 1 12 43 -0.13107200000000000000e6
-1502 1 17 48 0.13107200000000000000e6
-1502 1 23 38 0.16384000000000000000e5
-1502 1 28 43 0.65536000000000000000e5
-1502 1 40 51 0.32768000000000000000e5
-1502 1 43 50 -0.65536000000000000000e5
-1502 2 2 32 0.16384000000000000000e5
-1502 2 8 22 -0.65536000000000000000e5
-1502 2 12 26 0.65536000000000000000e5
-1502 2 16 30 0.32768000000000000000e5
-1502 2 21 35 -0.32768000000000000000e5
-1502 2 28 34 0.32768000000000000000e5
-1502 3 2 31 0.65536000000000000000e5
-1502 3 14 27 0.13107200000000000000e6
-1502 3 17 30 0.32768000000000000000e5
-1502 3 18 31 -0.65536000000000000000e5
-1502 3 20 33 0.32768000000000000000e5
-1502 3 21 34 -0.65536000000000000000e5
-1502 4 4 16 0.65536000000000000000e5
-1503 1 28 43 0.32768000000000000000e5
-1503 1 40 52 0.32768000000000000000e5
-1503 1 43 50 0.32768000000000000000e5
-1503 1 44 51 -0.65536000000000000000e5
-1503 2 31 33 0.32768000000000000000e5
-1503 3 18 31 -0.32768000000000000000e5
-1503 3 21 34 -0.32768000000000000000e5
-1504 1 25 56 -0.32768000000000000000e5
-1504 1 40 53 0.32768000000000000000e5
-1505 1 1 48 -0.32768000000000000000e5
-1505 1 2 49 -0.32768000000000000000e5
-1505 1 3 50 -0.65536000000000000000e5
-1505 1 11 42 0.13107200000000000000e6
-1505 1 12 43 0.26214400000000000000e6
-1505 1 17 48 -0.26214400000000000000e6
-1505 1 23 38 -0.32768000000000000000e5
-1505 1 24 55 0.65536000000000000000e5
-1505 1 25 56 0.32768000000000000000e5
-1505 1 28 43 -0.13107200000000000000e6
-1505 1 40 54 0.32768000000000000000e5
-1505 1 47 54 0.32768000000000000000e5
-1505 2 2 32 -0.32768000000000000000e5
-1505 2 8 22 0.13107200000000000000e6
-1505 2 12 26 -0.13107200000000000000e6
-1505 2 16 30 -0.65536000000000000000e5
-1505 2 21 35 0.65536000000000000000e5
-1505 2 33 33 0.65536000000000000000e5
-1505 3 2 31 -0.13107200000000000000e6
-1505 3 14 27 -0.26214400000000000000e6
-1505 3 17 30 -0.65536000000000000000e5
-1505 3 18 31 0.13107200000000000000e6
-1505 3 20 33 -0.65536000000000000000e5
-1505 3 21 34 0.13107200000000000000e6
-1505 3 22 35 0.65536000000000000000e5
-1505 3 32 33 0.32768000000000000000e5
-1505 4 4 16 -0.13107200000000000000e6
-1506 1 25 56 0.32768000000000000000e5
-1506 1 28 43 -0.13107200000000000000e6
-1506 1 37 56 -0.32768000000000000000e5
-1506 1 38 53 0.32768000000000000000e5
-1506 1 40 56 0.32768000000000000000e5
-1506 1 41 56 0.65536000000000000000e5
-1506 1 47 50 0.65536000000000000000e5
-1506 1 47 54 0.32768000000000000000e5
-1506 2 29 35 0.65536000000000000000e5
-1506 2 33 35 0.32768000000000000000e5
-1506 3 18 31 0.13107200000000000000e6
-1506 3 21 34 0.13107200000000000000e6
-1506 3 29 34 0.13107200000000000000e6
-1506 3 30 35 0.65536000000000000000e5
-1506 3 32 33 0.32768000000000000000e5
-1506 4 20 20 0.65536000000000000000e5
-1507 1 37 44 -0.16384000000000000000e5
-1507 1 41 41 0.32768000000000000000e5
-1508 1 32 47 -0.32768000000000000000e5
-1508 1 41 42 0.32768000000000000000e5
-1509 1 28 43 -0.32768000000000000000e5
-1509 1 41 43 0.32768000000000000000e5
-1509 3 18 31 0.32768000000000000000e5
-1510 1 28 43 -0.16384000000000000000e5
-1510 1 32 47 -0.16384000000000000000e5
-1510 1 37 44 -0.16384000000000000000e5
-1510 1 41 44 0.32768000000000000000e5
-1510 2 20 34 -0.16384000000000000000e5
-1510 3 18 31 0.16384000000000000000e5
-1511 1 17 48 -0.32768000000000000000e5
-1511 1 41 45 0.32768000000000000000e5
-1511 3 24 29 0.32768000000000000000e5
-1512 1 16 55 -0.32768000000000000000e5
-1512 1 41 46 0.32768000000000000000e5
-1513 1 7 54 -0.32768000000000000000e5
-1513 1 41 47 0.32768000000000000000e5
-1513 3 6 35 0.32768000000000000000e5
-1514 1 1 48 0.16384000000000000000e5
-1514 1 2 49 0.16384000000000000000e5
-1514 1 3 50 0.32768000000000000000e5
-1514 1 11 42 -0.65536000000000000000e5
-1514 1 12 43 -0.13107200000000000000e6
-1514 1 17 48 0.13107200000000000000e6
-1514 1 23 38 0.16384000000000000000e5
-1514 1 41 48 0.32768000000000000000e5
-1514 2 2 32 0.16384000000000000000e5
-1514 2 8 22 -0.65536000000000000000e5
-1514 2 12 26 0.65536000000000000000e5
-1514 2 16 30 0.32768000000000000000e5
-1514 3 2 31 0.65536000000000000000e5
-1514 3 14 27 0.13107200000000000000e6
-1514 3 17 30 0.32768000000000000000e5
-1514 3 20 33 0.32768000000000000000e5
-1514 4 4 16 0.65536000000000000000e5
-1515 1 24 55 -0.32768000000000000000e5
-1515 1 41 49 0.32768000000000000000e5
-1516 1 37 52 -0.32768000000000000000e5
-1516 1 41 50 0.32768000000000000000e5
-1517 1 28 43 -0.32768000000000000000e5
-1517 1 41 51 0.32768000000000000000e5
-1517 3 18 31 0.32768000000000000000e5
-1517 3 21 34 0.32768000000000000000e5
-1518 1 17 48 -0.32768000000000000000e5
-1518 1 32 47 0.16384000000000000000e5
-1518 1 33 48 0.16384000000000000000e5
-1518 1 37 52 -0.16384000000000000000e5
-1518 1 41 52 0.32768000000000000000e5
-1518 1 43 50 -0.16384000000000000000e5
-1518 3 21 34 0.16384000000000000000e5
-1518 3 24 29 0.32768000000000000000e5
-1518 4 16 20 0.16384000000000000000e5
-1519 1 41 53 0.32768000000000000000e5
-1519 1 47 50 -0.32768000000000000000e5
-1520 1 1 48 0.16384000000000000000e5
-1520 1 2 49 0.16384000000000000000e5
-1520 1 3 50 0.32768000000000000000e5
-1520 1 11 42 -0.65536000000000000000e5
-1520 1 12 43 -0.13107200000000000000e6
-1520 1 17 48 0.13107200000000000000e6
-1520 1 23 38 0.16384000000000000000e5
-1520 1 24 55 -0.32768000000000000000e5
-1520 1 41 54 0.32768000000000000000e5
-1520 1 47 50 0.32768000000000000000e5
-1520 2 2 32 0.16384000000000000000e5
-1520 2 8 22 -0.65536000000000000000e5
-1520 2 12 26 0.65536000000000000000e5
-1520 2 16 30 0.32768000000000000000e5
-1520 2 21 35 -0.32768000000000000000e5
-1520 2 29 35 0.32768000000000000000e5
-1520 3 2 31 0.65536000000000000000e5
-1520 3 14 27 0.13107200000000000000e6
-1520 3 17 30 0.32768000000000000000e5
-1520 3 20 33 0.32768000000000000000e5
-1520 3 22 35 -0.32768000000000000000e5
-1520 3 29 34 0.65536000000000000000e5
-1520 4 4 16 0.65536000000000000000e5
-1521 1 28 43 -0.32768000000000000000e5
-1521 1 41 55 0.32768000000000000000e5
-1521 3 18 31 0.32768000000000000000e5
-1521 3 21 34 0.32768000000000000000e5
-1521 3 29 34 0.32768000000000000000e5
-1522 1 28 43 -0.16384000000000000000e5
-1522 1 42 42 0.32768000000000000000e5
-1522 3 18 31 0.16384000000000000000e5
-1523 1 33 48 -0.32768000000000000000e5
-1523 1 42 43 0.32768000000000000000e5
-1524 1 17 48 -0.32768000000000000000e5
-1524 1 42 44 0.32768000000000000000e5
-1524 3 24 29 0.32768000000000000000e5
-1525 1 34 49 -0.32768000000000000000e5
-1525 1 42 45 0.32768000000000000000e5
-1526 1 35 50 -0.32768000000000000000e5
-1526 1 42 46 0.32768000000000000000e5
-1527 1 1 48 0.16384000000000000000e5
-1527 1 2 49 0.16384000000000000000e5
-1527 1 3 50 0.32768000000000000000e5
-1527 1 11 42 -0.65536000000000000000e5
-1527 1 12 43 -0.13107200000000000000e6
-1527 1 17 48 0.13107200000000000000e6
-1527 1 23 38 0.16384000000000000000e5
-1527 1 42 47 0.32768000000000000000e5
-1527 2 2 32 0.16384000000000000000e5
-1527 2 8 22 -0.65536000000000000000e5
-1527 2 12 26 0.65536000000000000000e5
-1527 2 16 30 0.32768000000000000000e5
-1527 3 2 31 0.65536000000000000000e5
-1527 3 14 27 0.13107200000000000000e6
-1527 3 17 30 0.32768000000000000000e5
-1527 3 20 33 0.32768000000000000000e5
-1527 4 4 16 0.65536000000000000000e5
-1528 1 24 55 -0.32768000000000000000e5
-1528 1 42 48 0.32768000000000000000e5
-1529 1 1 48 -0.16384000000000000000e5
-1529 1 2 49 -0.16384000000000000000e5
-1529 1 3 50 -0.32768000000000000000e5
-1529 1 11 42 0.65536000000000000000e5
-1529 1 12 43 0.13107200000000000000e6
-1529 1 17 48 -0.13107200000000000000e6
-1529 1 23 38 -0.16384000000000000000e5
-1529 1 24 55 0.32768000000000000000e5
-1529 1 28 43 -0.65536000000000000000e5
-1529 1 42 49 0.32768000000000000000e5
-1529 2 2 32 -0.16384000000000000000e5
-1529 2 8 22 0.65536000000000000000e5
-1529 2 12 26 -0.65536000000000000000e5
-1529 2 16 30 -0.32768000000000000000e5
-1529 2 21 35 0.32768000000000000000e5
-1529 3 2 31 -0.65536000000000000000e5
-1529 3 14 27 -0.13107200000000000000e6
-1529 3 17 30 -0.32768000000000000000e5
-1529 3 18 31 0.65536000000000000000e5
-1529 3 20 33 -0.32768000000000000000e5
-1529 3 21 34 0.65536000000000000000e5
-1529 4 4 16 -0.65536000000000000000e5
-1530 1 28 43 -0.32768000000000000000e5
-1530 1 42 50 0.32768000000000000000e5
-1530 3 18 31 0.32768000000000000000e5
-1530 3 21 34 0.32768000000000000000e5
-1531 1 42 51 0.32768000000000000000e5
-1531 1 43 50 -0.32768000000000000000e5
-1532 1 42 52 0.32768000000000000000e5
-1532 1 44 51 -0.32768000000000000000e5
-1533 1 1 48 0.16384000000000000000e5
-1533 1 2 49 0.16384000000000000000e5
-1533 1 3 50 0.32768000000000000000e5
-1533 1 11 42 -0.65536000000000000000e5
-1533 1 12 43 -0.13107200000000000000e6
-1533 1 17 48 0.13107200000000000000e6
-1533 1 23 38 0.16384000000000000000e5
-1533 1 24 55 -0.32768000000000000000e5
-1533 1 42 53 0.32768000000000000000e5
-1533 1 47 50 0.32768000000000000000e5
-1533 2 2 32 0.16384000000000000000e5
-1533 2 8 22 -0.65536000000000000000e5
-1533 2 12 26 0.65536000000000000000e5
-1533 2 16 30 0.32768000000000000000e5
-1533 2 21 35 -0.32768000000000000000e5
-1533 2 29 35 0.32768000000000000000e5
-1533 3 2 31 0.65536000000000000000e5
-1533 3 14 27 0.13107200000000000000e6
-1533 3 17 30 0.32768000000000000000e5
-1533 3 20 33 0.32768000000000000000e5
-1533 3 22 35 -0.32768000000000000000e5
-1533 3 29 34 0.65536000000000000000e5
-1533 4 4 16 0.65536000000000000000e5
-1534 1 1 48 -0.16384000000000000000e5
-1534 1 2 49 -0.16384000000000000000e5
-1534 1 3 50 -0.32768000000000000000e5
-1534 1 11 42 0.65536000000000000000e5
-1534 1 12 43 0.13107200000000000000e6
-1534 1 17 48 -0.13107200000000000000e6
-1534 1 23 38 -0.16384000000000000000e5
-1534 1 24 55 0.32768000000000000000e5
-1534 1 28 43 -0.65536000000000000000e5
-1534 1 42 54 0.32768000000000000000e5
-1534 2 2 32 -0.16384000000000000000e5
-1534 2 8 22 0.65536000000000000000e5
-1534 2 12 26 -0.65536000000000000000e5
-1534 2 16 30 -0.32768000000000000000e5
-1534 2 21 35 0.32768000000000000000e5
-1534 3 2 31 -0.65536000000000000000e5
-1534 3 14 27 -0.13107200000000000000e6
-1534 3 17 30 -0.32768000000000000000e5
-1534 3 18 31 0.65536000000000000000e5
-1534 3 20 33 -0.32768000000000000000e5
-1534 3 21 34 0.65536000000000000000e5
-1534 3 22 35 0.32768000000000000000e5
-1534 4 4 16 -0.65536000000000000000e5
-1535 1 42 55 0.32768000000000000000e5
-1535 1 50 51 -0.32768000000000000000e5
-1536 1 1 48 -0.16384000000000000000e5
-1536 1 2 49 -0.16384000000000000000e5
-1536 1 3 50 -0.32768000000000000000e5
-1536 1 11 42 0.65536000000000000000e5
-1536 1 12 43 0.13107200000000000000e6
-1536 1 17 48 -0.13107200000000000000e6
-1536 1 23 38 -0.16384000000000000000e5
-1536 1 24 55 0.32768000000000000000e5
-1536 1 28 43 -0.65536000000000000000e5
-1536 1 42 56 0.32768000000000000000e5
-1536 2 2 32 -0.16384000000000000000e5
-1536 2 8 22 0.65536000000000000000e5
-1536 2 12 26 -0.65536000000000000000e5
-1536 2 16 30 -0.32768000000000000000e5
-1536 2 21 35 0.32768000000000000000e5
-1536 3 2 31 -0.65536000000000000000e5
-1536 3 14 27 -0.13107200000000000000e6
-1536 3 17 30 -0.32768000000000000000e5
-1536 3 18 31 0.65536000000000000000e5
-1536 3 20 33 -0.32768000000000000000e5
-1536 3 21 34 0.65536000000000000000e5
-1536 3 22 35 0.32768000000000000000e5
-1536 3 30 35 0.32768000000000000000e5
-1536 4 4 16 -0.65536000000000000000e5
-1537 1 15 54 -0.16384000000000000000e5
-1537 1 43 43 0.32768000000000000000e5
-1538 1 34 49 -0.32768000000000000000e5
-1538 1 43 44 0.32768000000000000000e5
-1539 1 17 48 0.32768000000000000000e5
-1539 1 34 49 0.32768000000000000000e5
-1539 1 35 50 -0.65536000000000000000e5
-1539 1 43 45 0.32768000000000000000e5
-1539 2 24 34 0.32768000000000000000e5
-1539 3 24 29 -0.32768000000000000000e5
-1540 1 24 55 -0.32768000000000000000e5
-1540 1 43 47 0.32768000000000000000e5
-1541 1 1 48 -0.16384000000000000000e5
-1541 1 2 49 -0.16384000000000000000e5
-1541 1 3 50 -0.32768000000000000000e5
-1541 1 11 42 0.65536000000000000000e5
-1541 1 12 43 0.13107200000000000000e6
-1541 1 17 48 -0.13107200000000000000e6
-1541 1 23 38 -0.16384000000000000000e5
-1541 1 24 55 0.32768000000000000000e5
-1541 1 28 43 -0.65536000000000000000e5
-1541 1 43 48 0.32768000000000000000e5
-1541 2 2 32 -0.16384000000000000000e5
-1541 2 8 22 0.65536000000000000000e5
-1541 2 12 26 -0.65536000000000000000e5
-1541 2 16 30 -0.32768000000000000000e5
-1541 2 21 35 0.32768000000000000000e5
-1541 3 2 31 -0.65536000000000000000e5
-1541 3 14 27 -0.13107200000000000000e6
-1541 3 17 30 -0.32768000000000000000e5
-1541 3 18 31 0.65536000000000000000e5
-1541 3 20 33 -0.32768000000000000000e5
-1541 3 21 34 0.65536000000000000000e5
-1541 4 4 16 -0.65536000000000000000e5
-1542 1 1 48 0.16384000000000000000e5
-1542 1 2 49 0.16384000000000000000e5
-1542 1 3 50 0.32768000000000000000e5
-1542 1 11 42 -0.65536000000000000000e5
-1542 1 12 43 -0.13107200000000000000e6
-1542 1 17 48 0.13107200000000000000e6
-1542 1 23 38 0.16384000000000000000e5
-1542 1 28 43 0.65536000000000000000e5
-1542 1 43 49 0.32768000000000000000e5
-1542 1 43 50 -0.65536000000000000000e5
-1542 2 2 32 0.16384000000000000000e5
-1542 2 8 22 -0.65536000000000000000e5
-1542 2 12 26 0.65536000000000000000e5
-1542 2 16 30 0.32768000000000000000e5
-1542 2 21 35 -0.32768000000000000000e5
-1542 2 28 34 0.32768000000000000000e5
-1542 3 2 31 0.65536000000000000000e5
-1542 3 14 27 0.13107200000000000000e6
-1542 3 17 30 0.32768000000000000000e5
-1542 3 18 31 -0.65536000000000000000e5
-1542 3 20 33 0.32768000000000000000e5
-1542 3 21 34 -0.65536000000000000000e5
-1542 4 4 16 0.65536000000000000000e5
-1543 1 28 43 0.32768000000000000000e5
-1543 1 43 50 0.32768000000000000000e5
-1543 1 43 51 0.32768000000000000000e5
-1543 1 44 51 -0.65536000000000000000e5
-1543 2 31 33 0.32768000000000000000e5
-1543 3 18 31 -0.32768000000000000000e5
-1543 3 21 34 -0.32768000000000000000e5
-1544 1 43 52 0.32768000000000000000e5
-1544 1 46 49 -0.32768000000000000000e5
-1545 1 1 48 -0.16384000000000000000e5
-1545 1 2 49 -0.16384000000000000000e5
-1545 1 3 50 -0.32768000000000000000e5
-1545 1 11 42 0.65536000000000000000e5
-1545 1 12 43 0.13107200000000000000e6
-1545 1 17 48 -0.13107200000000000000e6
-1545 1 23 38 -0.16384000000000000000e5
-1545 1 24 55 0.32768000000000000000e5
-1545 1 28 43 -0.65536000000000000000e5
-1545 1 43 53 0.32768000000000000000e5
-1545 2 2 32 -0.16384000000000000000e5
-1545 2 8 22 0.65536000000000000000e5
-1545 2 12 26 -0.65536000000000000000e5
-1545 2 16 30 -0.32768000000000000000e5
-1545 2 21 35 0.32768000000000000000e5
-1545 3 2 31 -0.65536000000000000000e5
-1545 3 14 27 -0.13107200000000000000e6
-1545 3 17 30 -0.32768000000000000000e5
-1545 3 18 31 0.65536000000000000000e5
-1545 3 20 33 -0.32768000000000000000e5
-1545 3 21 34 0.65536000000000000000e5
-1545 3 22 35 0.32768000000000000000e5
-1545 4 4 16 -0.65536000000000000000e5
-1546 1 40 55 -0.32768000000000000000e5
-1546 1 43 54 0.32768000000000000000e5
-1547 1 33 56 -0.32768000000000000000e5
-1547 1 43 55 0.32768000000000000000e5
-1548 1 43 56 0.32768000000000000000e5
-1548 1 51 54 -0.32768000000000000000e5
-1549 1 16 55 -0.16384000000000000000e5
-1549 1 44 44 0.32768000000000000000e5
-1550 1 35 50 -0.32768000000000000000e5
-1550 1 44 45 0.32768000000000000000e5
-1551 1 16 55 -0.16384000000000000000e5
-1551 1 35 50 -0.16384000000000000000e5
-1551 1 43 46 -0.16384000000000000000e5
-1551 1 44 46 0.32768000000000000000e5
-1551 2 31 31 -0.32768000000000000000e5
-1552 1 37 52 -0.32768000000000000000e5
-1552 1 44 47 0.32768000000000000000e5
-1553 1 28 43 -0.32768000000000000000e5
-1553 1 44 48 0.32768000000000000000e5
-1553 3 18 31 0.32768000000000000000e5
-1553 3 21 34 0.32768000000000000000e5
-1554 1 43 50 -0.32768000000000000000e5
-1554 1 44 49 0.32768000000000000000e5
-1555 1 17 48 -0.32768000000000000000e5
-1555 1 32 47 0.16384000000000000000e5
-1555 1 33 48 0.16384000000000000000e5
-1555 1 37 52 -0.16384000000000000000e5
-1555 1 43 50 -0.16384000000000000000e5
-1555 1 44 50 0.32768000000000000000e5
-1555 3 21 34 0.16384000000000000000e5
-1555 3 24 29 0.32768000000000000000e5
-1555 4 16 20 0.16384000000000000000e5
-1556 1 35 50 -0.32768000000000000000e5
-1556 1 44 52 0.32768000000000000000e5
-1556 3 25 34 0.32768000000000000000e5
-1557 1 28 43 -0.32768000000000000000e5
-1557 1 44 53 0.32768000000000000000e5
-1557 3 18 31 0.32768000000000000000e5
-1557 3 21 34 0.32768000000000000000e5
-1557 3 29 34 0.32768000000000000000e5
-1558 1 44 54 0.32768000000000000000e5
-1558 1 50 51 -0.32768000000000000000e5
-1559 1 44 55 0.32768000000000000000e5
-1559 1 46 53 -0.32768000000000000000e5
-1560 1 44 56 0.32768000000000000000e5
-1560 1 52 53 -0.32768000000000000000e5
-1561 1 43 46 -0.16384000000000000000e5
-1561 1 45 45 0.32768000000000000000e5
-1562 1 36 51 -0.32768000000000000000e5
-1562 1 45 46 0.32768000000000000000e5
-1563 1 28 43 -0.32768000000000000000e5
-1563 1 45 47 0.32768000000000000000e5
-1563 3 18 31 0.32768000000000000000e5
-1563 3 21 34 0.32768000000000000000e5
-1564 1 43 50 -0.32768000000000000000e5
-1564 1 45 48 0.32768000000000000000e5
-1565 1 28 43 0.32768000000000000000e5
-1565 1 43 50 0.32768000000000000000e5
-1565 1 44 51 -0.65536000000000000000e5
-1565 1 45 49 0.32768000000000000000e5
-1565 2 31 33 0.32768000000000000000e5
-1565 3 18 31 -0.32768000000000000000e5
-1565 3 21 34 -0.32768000000000000000e5
-1566 1 44 51 -0.32768000000000000000e5
-1566 1 45 50 0.32768000000000000000e5
-1567 1 45 51 0.32768000000000000000e5
-1567 1 46 49 -0.32768000000000000000e5
-1568 1 45 53 0.32768000000000000000e5
-1568 1 50 51 -0.32768000000000000000e5
-1569 1 33 56 -0.32768000000000000000e5
-1569 1 45 54 0.32768000000000000000e5
-1570 1 45 55 0.32768000000000000000e5
-1570 1 51 52 -0.32768000000000000000e5
-1571 1 17 48 -0.32768000000000000000e5
-1571 1 32 47 0.16384000000000000000e5
-1571 1 33 48 0.16384000000000000000e5
-1571 1 37 52 -0.16384000000000000000e5
-1571 1 43 50 -0.16384000000000000000e5
-1571 1 46 47 0.32768000000000000000e5
-1571 3 21 34 0.16384000000000000000e5
-1571 3 24 29 0.32768000000000000000e5
-1571 4 16 20 0.16384000000000000000e5
-1572 1 44 51 -0.32768000000000000000e5
-1572 1 46 48 0.32768000000000000000e5
-1573 1 35 50 -0.32768000000000000000e5
-1573 1 46 50 0.32768000000000000000e5
-1573 3 25 34 0.32768000000000000000e5
-1574 1 45 52 -0.32768000000000000000e5
-1574 1 46 51 0.32768000000000000000e5
-1575 1 21 56 -0.32768000000000000000e5
-1575 1 46 52 0.32768000000000000000e5
-1576 1 46 54 0.32768000000000000000e5
-1576 1 51 52 -0.32768000000000000000e5
-1577 1 46 56 0.32768000000000000000e5
-1577 1 52 55 -0.32768000000000000000e5
-1578 1 38 53 0.16384000000000000000e5
-1578 1 47 47 0.32768000000000000000e5
-1578 1 47 50 -0.32768000000000000000e5
-1578 1 47 54 0.16384000000000000000e5
-1578 2 32 32 0.32768000000000000000e5
-1578 3 32 33 0.16384000000000000000e5
-1579 1 38 53 -0.32768000000000000000e5
-1579 1 47 48 0.32768000000000000000e5
-1580 1 47 49 0.32768000000000000000e5
-1580 1 47 54 -0.32768000000000000000e5
-1580 3 32 33 -0.32768000000000000000e5
-1581 1 1 48 0.16384000000000000000e5
-1581 1 2 49 0.16384000000000000000e5
-1581 1 3 50 0.32768000000000000000e5
-1581 1 11 42 -0.65536000000000000000e5
-1581 1 12 43 -0.13107200000000000000e6
-1581 1 17 48 0.13107200000000000000e6
-1581 1 23 38 0.16384000000000000000e5
-1581 1 24 55 -0.32768000000000000000e5
-1581 1 47 50 0.32768000000000000000e5
-1581 1 47 51 0.32768000000000000000e5
-1581 2 2 32 0.16384000000000000000e5
-1581 2 8 22 -0.65536000000000000000e5
-1581 2 12 26 0.65536000000000000000e5
-1581 2 16 30 0.32768000000000000000e5
-1581 2 21 35 -0.32768000000000000000e5
-1581 2 29 35 0.32768000000000000000e5
-1581 3 2 31 0.65536000000000000000e5
-1581 3 14 27 0.13107200000000000000e6
-1581 3 17 30 0.32768000000000000000e5
-1581 3 20 33 0.32768000000000000000e5
-1581 3 22 35 -0.32768000000000000000e5
-1581 3 29 34 0.65536000000000000000e5
-1581 4 4 16 0.65536000000000000000e5
-1582 1 28 43 -0.32768000000000000000e5
-1582 1 47 52 0.32768000000000000000e5
-1582 3 18 31 0.32768000000000000000e5
-1582 3 21 34 0.32768000000000000000e5
-1582 3 29 34 0.32768000000000000000e5
-1583 1 37 56 -0.32768000000000000000e5
-1583 1 47 53 0.32768000000000000000e5
-1584 1 41 56 -0.32768000000000000000e5
-1584 1 47 55 0.32768000000000000000e5
-1585 1 1 48 -0.32768000000000000000e5
-1585 1 2 49 -0.32768000000000000000e5
-1585 1 3 50 -0.65536000000000000000e5
-1585 1 11 42 0.13107200000000000000e6
-1585 1 12 43 0.26214400000000000000e6
-1585 1 17 48 -0.26214400000000000000e6
-1585 1 23 38 -0.32768000000000000000e5
-1585 1 24 55 0.65536000000000000000e5
-1585 1 28 43 -0.13107200000000000000e6
-1585 1 47 56 0.32768000000000000000e5
-1585 1 49 56 0.32768000000000000000e5
-1585 1 53 54 0.32768000000000000000e5
-1585 2 2 32 -0.32768000000000000000e5
-1585 2 8 22 0.13107200000000000000e6
-1585 2 12 26 -0.13107200000000000000e6
-1585 2 16 30 -0.65536000000000000000e5
-1585 2 21 35 0.65536000000000000000e5
-1585 2 35 35 0.65536000000000000000e5
-1585 3 2 31 -0.13107200000000000000e6
-1585 3 14 27 -0.26214400000000000000e6
-1585 3 17 30 -0.65536000000000000000e5
-1585 3 18 31 0.13107200000000000000e6
-1585 3 20 33 -0.65536000000000000000e5
-1585 3 21 34 0.13107200000000000000e6
-1585 3 22 35 0.65536000000000000000e5
-1585 3 30 35 0.65536000000000000000e5
-1585 3 34 35 0.65536000000000000000e5
-1585 4 4 16 -0.13107200000000000000e6
-1586 1 47 54 -0.16384000000000000000e5
-1586 1 48 48 0.32768000000000000000e5
-1586 3 32 33 -0.16384000000000000000e5
-1587 1 25 56 -0.32768000000000000000e5
-1587 1 48 49 0.32768000000000000000e5
-1588 1 1 48 0.16384000000000000000e5
-1588 1 2 49 0.16384000000000000000e5
-1588 1 3 50 0.32768000000000000000e5
-1588 1 11 42 -0.65536000000000000000e5
-1588 1 12 43 -0.13107200000000000000e6
-1588 1 17 48 0.13107200000000000000e6
-1588 1 23 38 0.16384000000000000000e5
-1588 1 24 55 -0.32768000000000000000e5
-1588 1 47 50 0.32768000000000000000e5
-1588 1 48 50 0.32768000000000000000e5
-1588 2 2 32 0.16384000000000000000e5
-1588 2 8 22 -0.65536000000000000000e5
-1588 2 12 26 0.65536000000000000000e5
-1588 2 16 30 0.32768000000000000000e5
-1588 2 21 35 -0.32768000000000000000e5
-1588 2 29 35 0.32768000000000000000e5
-1588 3 2 31 0.65536000000000000000e5
-1588 3 14 27 0.13107200000000000000e6
-1588 3 17 30 0.32768000000000000000e5
-1588 3 20 33 0.32768000000000000000e5
-1588 3 22 35 -0.32768000000000000000e5
-1588 3 29 34 0.65536000000000000000e5
-1588 4 4 16 0.65536000000000000000e5
-1589 1 1 48 -0.16384000000000000000e5
-1589 1 2 49 -0.16384000000000000000e5
-1589 1 3 50 -0.32768000000000000000e5
-1589 1 11 42 0.65536000000000000000e5
-1589 1 12 43 0.13107200000000000000e6
-1589 1 17 48 -0.13107200000000000000e6
-1589 1 23 38 -0.16384000000000000000e5
-1589 1 24 55 0.32768000000000000000e5
-1589 1 28 43 -0.65536000000000000000e5
-1589 1 48 51 0.32768000000000000000e5
-1589 2 2 32 -0.16384000000000000000e5
-1589 2 8 22 0.65536000000000000000e5
-1589 2 12 26 -0.65536000000000000000e5
-1589 2 16 30 -0.32768000000000000000e5
-1589 2 21 35 0.32768000000000000000e5
-1589 3 2 31 -0.65536000000000000000e5
-1589 3 14 27 -0.13107200000000000000e6
-1589 3 17 30 -0.32768000000000000000e5
-1589 3 18 31 0.65536000000000000000e5
-1589 3 20 33 -0.32768000000000000000e5
-1589 3 21 34 0.65536000000000000000e5
-1589 3 22 35 0.32768000000000000000e5
-1589 4 4 16 -0.65536000000000000000e5
-1590 1 48 52 0.32768000000000000000e5
-1590 1 50 51 -0.32768000000000000000e5
-1591 1 47 54 -0.32768000000000000000e5
-1591 1 48 53 0.32768000000000000000e5
-1592 1 1 48 -0.32768000000000000000e5
-1592 1 2 49 -0.32768000000000000000e5
-1592 1 3 50 -0.65536000000000000000e5
-1592 1 11 42 0.13107200000000000000e6
-1592 1 12 43 0.26214400000000000000e6
-1592 1 17 48 -0.26214400000000000000e6
-1592 1 23 38 -0.32768000000000000000e5
-1592 1 24 55 0.65536000000000000000e5
-1592 1 25 56 -0.32768000000000000000e5
-1592 1 37 56 0.32768000000000000000e5
-1592 1 38 53 -0.32768000000000000000e5
-1592 1 41 56 -0.65536000000000000000e5
-1592 1 47 50 -0.65536000000000000000e5
-1592 1 48 54 0.32768000000000000000e5
-1592 2 2 32 -0.32768000000000000000e5
-1592 2 8 22 0.13107200000000000000e6
-1592 2 12 26 -0.13107200000000000000e6
-1592 2 16 30 -0.65536000000000000000e5
-1592 2 21 35 0.65536000000000000000e5
-1592 2 29 35 -0.65536000000000000000e5
-1592 3 2 31 -0.13107200000000000000e6
-1592 3 14 27 -0.26214400000000000000e6
-1592 3 17 30 -0.65536000000000000000e5
-1592 3 20 33 -0.65536000000000000000e5
-1592 3 22 35 0.65536000000000000000e5
-1592 3 29 34 -0.13107200000000000000e6
-1592 3 32 33 -0.32768000000000000000e5
-1592 4 4 16 -0.13107200000000000000e6
-1592 4 20 20 -0.65536000000000000000e5
-1593 1 1 48 -0.16384000000000000000e5
-1593 1 2 49 -0.16384000000000000000e5
-1593 1 3 50 -0.32768000000000000000e5
-1593 1 11 42 0.65536000000000000000e5
-1593 1 12 43 0.13107200000000000000e6
-1593 1 17 48 -0.13107200000000000000e6
-1593 1 23 38 -0.16384000000000000000e5
-1593 1 24 55 0.32768000000000000000e5
-1593 1 28 43 -0.65536000000000000000e5
-1593 1 48 55 0.32768000000000000000e5
-1593 2 2 32 -0.16384000000000000000e5
-1593 2 8 22 0.65536000000000000000e5
-1593 2 12 26 -0.65536000000000000000e5
-1593 2 16 30 -0.32768000000000000000e5
-1593 2 21 35 0.32768000000000000000e5
-1593 3 2 31 -0.65536000000000000000e5
-1593 3 14 27 -0.13107200000000000000e6
-1593 3 17 30 -0.32768000000000000000e5
-1593 3 18 31 0.65536000000000000000e5
-1593 3 20 33 -0.32768000000000000000e5
-1593 3 21 34 0.65536000000000000000e5
-1593 3 22 35 0.32768000000000000000e5
-1593 3 30 35 0.32768000000000000000e5
-1593 4 4 16 -0.65536000000000000000e5
-1594 1 48 56 0.32768000000000000000e5
-1594 1 53 54 -0.32768000000000000000e5
-1595 1 1 48 -0.16384000000000000000e5
-1595 1 2 49 -0.16384000000000000000e5
-1595 1 3 50 -0.32768000000000000000e5
-1595 1 11 42 0.65536000000000000000e5
-1595 1 12 43 0.13107200000000000000e6
-1595 1 17 48 -0.13107200000000000000e6
-1595 1 23 38 -0.16384000000000000000e5
-1595 1 24 55 0.32768000000000000000e5
-1595 1 25 56 0.16384000000000000000e5
-1595 1 28 43 -0.65536000000000000000e5
-1595 1 47 54 0.16384000000000000000e5
-1595 1 49 49 0.32768000000000000000e5
-1595 2 2 32 -0.16384000000000000000e5
-1595 2 8 22 0.65536000000000000000e5
-1595 2 12 26 -0.65536000000000000000e5
-1595 2 16 30 -0.32768000000000000000e5
-1595 2 21 35 0.32768000000000000000e5
-1595 2 33 33 0.32768000000000000000e5
-1595 3 2 31 -0.65536000000000000000e5
-1595 3 14 27 -0.13107200000000000000e6
-1595 3 17 30 -0.32768000000000000000e5
-1595 3 18 31 0.65536000000000000000e5
-1595 3 20 33 -0.32768000000000000000e5
-1595 3 21 34 0.65536000000000000000e5
-1595 3 22 35 0.32768000000000000000e5
-1595 3 32 33 0.16384000000000000000e5
-1595 4 4 16 -0.65536000000000000000e5
-1596 1 1 48 -0.16384000000000000000e5
-1596 1 2 49 -0.16384000000000000000e5
-1596 1 3 50 -0.32768000000000000000e5
-1596 1 11 42 0.65536000000000000000e5
-1596 1 12 43 0.13107200000000000000e6
-1596 1 17 48 -0.13107200000000000000e6
-1596 1 23 38 -0.16384000000000000000e5
-1596 1 24 55 0.32768000000000000000e5
-1596 1 28 43 -0.65536000000000000000e5
-1596 1 49 50 0.32768000000000000000e5
-1596 2 2 32 -0.16384000000000000000e5
-1596 2 8 22 0.65536000000000000000e5
-1596 2 12 26 -0.65536000000000000000e5
-1596 2 16 30 -0.32768000000000000000e5
-1596 2 21 35 0.32768000000000000000e5
-1596 3 2 31 -0.65536000000000000000e5
-1596 3 14 27 -0.13107200000000000000e6
-1596 3 17 30 -0.32768000000000000000e5
-1596 3 18 31 0.65536000000000000000e5
-1596 3 20 33 -0.32768000000000000000e5
-1596 3 21 34 0.65536000000000000000e5
-1596 3 22 35 0.32768000000000000000e5
-1596 4 4 16 -0.65536000000000000000e5
-1597 1 40 55 -0.32768000000000000000e5
-1597 1 49 51 0.32768000000000000000e5
-1598 1 33 56 -0.32768000000000000000e5
-1598 1 49 52 0.32768000000000000000e5
-1599 1 1 48 -0.32768000000000000000e5
-1599 1 2 49 -0.32768000000000000000e5
-1599 1 3 50 -0.65536000000000000000e5
-1599 1 11 42 0.13107200000000000000e6
-1599 1 12 43 0.26214400000000000000e6
-1599 1 17 48 -0.26214400000000000000e6
-1599 1 23 38 -0.32768000000000000000e5
-1599 1 24 55 0.65536000000000000000e5
-1599 1 25 56 -0.32768000000000000000e5
-1599 1 37 56 0.32768000000000000000e5
-1599 1 38 53 -0.32768000000000000000e5
-1599 1 41 56 -0.65536000000000000000e5
-1599 1 47 50 -0.65536000000000000000e5
-1599 1 49 53 0.32768000000000000000e5
-1599 2 2 32 -0.32768000000000000000e5
-1599 2 8 22 0.13107200000000000000e6
-1599 2 12 26 -0.13107200000000000000e6
-1599 2 16 30 -0.65536000000000000000e5
-1599 2 21 35 0.65536000000000000000e5
-1599 2 29 35 -0.65536000000000000000e5
-1599 3 2 31 -0.13107200000000000000e6
-1599 3 14 27 -0.26214400000000000000e6
-1599 3 17 30 -0.65536000000000000000e5
-1599 3 20 33 -0.65536000000000000000e5
-1599 3 22 35 0.65536000000000000000e5
-1599 3 29 34 -0.13107200000000000000e6
-1599 3 32 33 -0.32768000000000000000e5
-1599 4 4 16 -0.13107200000000000000e6
-1599 4 20 20 -0.65536000000000000000e5
-1600 1 25 56 0.32768000000000000000e5
-1600 1 28 43 -0.13107200000000000000e6
-1600 1 37 56 -0.32768000000000000000e5
-1600 1 38 53 0.32768000000000000000e5
-1600 1 41 56 0.65536000000000000000e5
-1600 1 47 50 0.65536000000000000000e5
-1600 1 47 54 0.32768000000000000000e5
-1600 1 49 54 0.32768000000000000000e5
-1600 2 29 35 0.65536000000000000000e5
-1600 2 33 35 0.32768000000000000000e5
-1600 3 18 31 0.13107200000000000000e6
-1600 3 21 34 0.13107200000000000000e6
-1600 3 29 34 0.13107200000000000000e6
-1600 3 30 35 0.65536000000000000000e5
-1600 3 32 33 0.32768000000000000000e5
-1600 4 20 20 0.65536000000000000000e5
-1601 1 49 55 0.32768000000000000000e5
-1601 1 51 54 -0.32768000000000000000e5
-1602 1 28 43 -0.16384000000000000000e5
-1602 1 50 50 0.32768000000000000000e5
-1602 3 18 31 0.16384000000000000000e5
-1602 3 21 34 0.16384000000000000000e5
-1602 3 29 34 0.16384000000000000000e5
-1603 1 46 53 -0.32768000000000000000e5
-1603 1 50 52 0.32768000000000000000e5
-1604 1 41 56 -0.32768000000000000000e5
-1604 1 50 53 0.32768000000000000000e5
-1605 1 1 48 -0.16384000000000000000e5
-1605 1 2 49 -0.16384000000000000000e5
-1605 1 3 50 -0.32768000000000000000e5
-1605 1 11 42 0.65536000000000000000e5
-1605 1 12 43 0.13107200000000000000e6
-1605 1 17 48 -0.13107200000000000000e6
-1605 1 23 38 -0.16384000000000000000e5
-1605 1 24 55 0.32768000000000000000e5
-1605 1 28 43 -0.65536000000000000000e5
-1605 1 50 54 0.32768000000000000000e5
-1605 2 2 32 -0.16384000000000000000e5
-1605 2 8 22 0.65536000000000000000e5
-1605 2 12 26 -0.65536000000000000000e5
-1605 2 16 30 -0.32768000000000000000e5
-1605 2 21 35 0.32768000000000000000e5
-1605 3 2 31 -0.65536000000000000000e5
-1605 3 14 27 -0.13107200000000000000e6
-1605 3 17 30 -0.32768000000000000000e5
-1605 3 18 31 0.65536000000000000000e5
-1605 3 20 33 -0.32768000000000000000e5
-1605 3 21 34 0.65536000000000000000e5
-1605 3 22 35 0.32768000000000000000e5
-1605 3 30 35 0.32768000000000000000e5
-1605 4 4 16 -0.65536000000000000000e5
-1606 1 50 55 0.32768000000000000000e5
-1606 1 52 53 -0.32768000000000000000e5
-1607 1 1 48 -0.16384000000000000000e5
-1607 1 2 49 -0.16384000000000000000e5
-1607 1 3 50 -0.32768000000000000000e5
-1607 1 11 42 0.65536000000000000000e5
-1607 1 12 43 0.13107200000000000000e6
-1607 1 17 48 -0.13107200000000000000e6
-1607 1 23 38 -0.16384000000000000000e5
-1607 1 24 55 0.32768000000000000000e5
-1607 1 28 43 -0.65536000000000000000e5
-1607 1 50 56 0.32768000000000000000e5
-1607 2 2 32 -0.16384000000000000000e5
-1607 2 8 22 0.65536000000000000000e5
-1607 2 12 26 -0.65536000000000000000e5
-1607 2 16 30 -0.32768000000000000000e5
-1607 2 21 35 0.32768000000000000000e5
-1607 3 2 31 -0.65536000000000000000e5
-1607 3 14 27 -0.13107200000000000000e6
-1607 3 17 30 -0.32768000000000000000e5
-1607 3 18 31 0.65536000000000000000e5
-1607 3 20 33 -0.32768000000000000000e5
-1607 3 21 34 0.65536000000000000000e5
-1607 3 22 35 0.32768000000000000000e5
-1607 3 30 35 0.32768000000000000000e5
-1607 3 34 35 0.32768000000000000000e5
-1607 4 4 16 -0.65536000000000000000e5
-1608 1 33 56 -0.16384000000000000000e5
-1608 1 51 51 0.32768000000000000000e5
-1609 1 1 48 -0.16384000000000000000e5
-1609 1 2 49 -0.16384000000000000000e5
-1609 1 3 50 -0.32768000000000000000e5
-1609 1 11 42 0.65536000000000000000e5
-1609 1 12 43 0.13107200000000000000e6
-1609 1 17 48 -0.13107200000000000000e6
-1609 1 23 38 -0.16384000000000000000e5
-1609 1 24 55 0.32768000000000000000e5
-1609 1 28 43 -0.65536000000000000000e5
-1609 1 51 53 0.32768000000000000000e5
-1609 2 2 32 -0.16384000000000000000e5
-1609 2 8 22 0.65536000000000000000e5
-1609 2 12 26 -0.65536000000000000000e5
-1609 2 16 30 -0.32768000000000000000e5
-1609 2 21 35 0.32768000000000000000e5
-1609 3 2 31 -0.65536000000000000000e5
-1609 3 14 27 -0.13107200000000000000e6
-1609 3 17 30 -0.32768000000000000000e5
-1609 3 18 31 0.65536000000000000000e5
-1609 3 20 33 -0.32768000000000000000e5
-1609 3 21 34 0.65536000000000000000e5
-1609 3 22 35 0.32768000000000000000e5
-1609 3 30 35 0.32768000000000000000e5
-1609 4 4 16 -0.65536000000000000000e5
-1610 1 45 56 -0.32768000000000000000e5
-1610 1 51 55 0.32768000000000000000e5
-1611 1 51 56 0.32768000000000000000e5
-1611 1 54 55 -0.32768000000000000000e5
-1612 1 46 55 -0.16384000000000000000e5
-1612 1 52 52 0.32768000000000000000e5
-1613 1 45 56 -0.32768000000000000000e5
-1613 1 52 54 0.32768000000000000000e5
-1614 1 46 53 -0.65536000000000000000e5
-1614 1 52 53 0.32768000000000000000e5
-1614 1 52 56 0.32768000000000000000e5
-1615 1 1 48 -0.16384000000000000000e5
-1615 1 2 49 -0.16384000000000000000e5
-1615 1 3 50 -0.32768000000000000000e5
-1615 1 11 42 0.65536000000000000000e5
-1615 1 12 43 0.13107200000000000000e6
-1615 1 17 48 -0.13107200000000000000e6
-1615 1 23 38 -0.16384000000000000000e5
-1615 1 24 55 0.32768000000000000000e5
-1615 1 28 43 -0.65536000000000000000e5
-1615 1 49 56 0.16384000000000000000e5
-1615 1 53 53 0.32768000000000000000e5
-1615 1 53 54 0.16384000000000000000e5
-1615 2 2 32 -0.16384000000000000000e5
-1615 2 8 22 0.65536000000000000000e5
-1615 2 12 26 -0.65536000000000000000e5
-1615 2 16 30 -0.32768000000000000000e5
-1615 2 21 35 0.32768000000000000000e5
-1615 2 35 35 0.32768000000000000000e5
-1615 3 2 31 -0.65536000000000000000e5
-1615 3 14 27 -0.13107200000000000000e6
-1615 3 17 30 -0.32768000000000000000e5
-1615 3 18 31 0.65536000000000000000e5
-1615 3 20 33 -0.32768000000000000000e5
-1615 3 21 34 0.65536000000000000000e5
-1615 3 22 35 0.32768000000000000000e5
-1615 3 30 35 0.32768000000000000000e5
-1615 3 34 35 0.32768000000000000000e5
-1615 4 4 16 -0.65536000000000000000e5
-1616 1 1 48 -0.16384000000000000000e5
-1616 1 2 49 -0.16384000000000000000e5
-1616 1 3 50 -0.32768000000000000000e5
-1616 1 11 42 0.65536000000000000000e5
-1616 1 12 43 0.13107200000000000000e6
-1616 1 17 48 -0.13107200000000000000e6
-1616 1 23 38 -0.16384000000000000000e5
-1616 1 24 55 0.32768000000000000000e5
-1616 1 28 43 -0.65536000000000000000e5
-1616 1 53 55 0.32768000000000000000e5
-1616 2 2 32 -0.16384000000000000000e5
-1616 2 8 22 0.65536000000000000000e5
-1616 2 12 26 -0.65536000000000000000e5
-1616 2 16 30 -0.32768000000000000000e5
-1616 2 21 35 0.32768000000000000000e5
-1616 3 2 31 -0.65536000000000000000e5
-1616 3 14 27 -0.13107200000000000000e6
-1616 3 17 30 -0.32768000000000000000e5
-1616 3 18 31 0.65536000000000000000e5
-1616 3 20 33 -0.32768000000000000000e5
-1616 3 21 34 0.65536000000000000000e5
-1616 3 22 35 0.32768000000000000000e5
-1616 3 30 35 0.32768000000000000000e5
-1616 3 34 35 0.32768000000000000000e5
-1616 4 4 16 -0.65536000000000000000e5
-1617 1 49 56 -0.16384000000000000000e5
-1617 1 54 54 0.32768000000000000000e5
-1618 1 1 48 -0.32768000000000000000e5
-1618 1 2 49 -0.32768000000000000000e5
-1618 1 3 50 -0.65536000000000000000e5
-1618 1 11 42 0.13107200000000000000e6
-1618 1 12 43 0.26214400000000000000e6
-1618 1 17 48 -0.26214400000000000000e6
-1618 1 23 38 -0.32768000000000000000e5
-1618 1 24 55 0.65536000000000000000e5
-1618 1 28 43 -0.13107200000000000000e6
-1618 1 53 54 0.32768000000000000000e5
-1618 1 54 56 0.32768000000000000000e5
-1618 2 2 32 -0.32768000000000000000e5
-1618 2 8 22 0.13107200000000000000e6
-1618 2 12 26 -0.13107200000000000000e6
-1618 2 16 30 -0.65536000000000000000e5
-1618 2 21 35 0.65536000000000000000e5
-1618 3 2 31 -0.13107200000000000000e6
-1618 3 14 27 -0.26214400000000000000e6
-1618 3 17 30 -0.65536000000000000000e5
-1618 3 18 31 0.13107200000000000000e6
-1618 3 20 33 -0.65536000000000000000e5
-1618 3 21 34 0.13107200000000000000e6
-1618 3 22 35 0.65536000000000000000e5
-1618 3 30 35 0.65536000000000000000e5
-1618 4 4 16 -0.13107200000000000000e6
-1619 1 46 53 -0.32768000000000000000e5
-1619 1 52 53 0.16384000000000000000e5
-1619 1 55 55 0.32768000000000000000e5
-1620 1 1 2 0.32768000000000000000e5
-1620 1 1 8 -0.65536000000000000000e5
-1620 1 1 32 -0.13107200000000000000e6
-1620 1 1 40 0.32768000000000000000e5
-1620 1 1 48 -0.32768000000000000000e5
-1620 1 2 5 -0.32768000000000000000e5
-1620 1 2 9 0.65536000000000000000e5
-1620 1 2 33 0.13107200000000000000e6
-1620 1 2 49 -0.32768000000000000000e5
-1620 1 3 34 -0.26214400000000000000e6
-1620 1 6 37 -0.32768000000000000000e5
-1620 1 7 22 -0.65536000000000000000e5
-1620 1 7 38 0.65536000000000000000e5
-1620 1 8 23 -0.19660800000000000000e6
-1620 1 8 39 0.65536000000000000000e5
-1620 1 10 41 0.13107200000000000000e6
-1620 1 12 27 0.26214400000000000000e6
-1620 1 23 38 -0.32768000000000000000e5
-1620 2 1 2 0.32768000000000000000e5
-1620 2 1 7 -0.65536000000000000000e5
-1620 2 2 16 -0.32768000000000000000e5
-1620 2 2 32 -0.32768000000000000000e5
-1620 2 3 17 0.32768000000000000000e5
-1620 2 4 26 -0.32768000000000000000e5
-1620 2 6 20 -0.13107200000000000000e6
-1620 2 7 21 0.13107200000000000000e6
-1620 3 1 2 0.32768000000000000000e5
-1620 3 1 30 -0.65536000000000000000e5
-1620 3 2 3 -0.32768000000000000000e5
-1620 3 3 16 -0.65536000000000000000e5
-1620 3 4 17 -0.32768000000000000000e5
-1620 3 6 19 -0.65536000000000000000e5
-1620 3 7 20 0.13107200000000000000e6
-1620 3 8 21 0.13107200000000000000e6
-1620 4 1 5 0.65536000000000000000e5
-1620 4 1 13 -0.65536000000000000000e5
-1620 4 2 2 -0.65536000000000000000e5
-1620 4 2 14 -0.65536000000000000000e5
-1621 1 1 24 0.32768000000000000000e5
-1621 1 1 40 0.32768000000000000000e5
-1621 1 1 48 0.32768000000000000000e5
-1621 1 2 49 0.32768000000000000000e5
-1621 1 6 37 0.32768000000000000000e5
-1621 1 7 38 0.65536000000000000000e5
-1621 1 8 23 -0.13107200000000000000e6
-1621 1 8 39 -0.65536000000000000000e5
-1621 1 23 38 0.32768000000000000000e5
-1621 2 1 4 0.32768000000000000000e5
-1621 2 2 32 0.32768000000000000000e5
-1621 2 3 17 -0.32768000000000000000e5
-1621 2 4 26 0.32768000000000000000e5
-1621 3 1 30 0.65536000000000000000e5
-1621 3 4 17 -0.32768000000000000000e5
-1621 3 6 19 -0.65536000000000000000e5
-1621 3 7 20 0.13107200000000000000e6
-1621 4 2 2 -0.65536000000000000000e5
-1621 4 2 14 -0.65536000000000000000e5
-1622 2 1 5 0.32768000000000000000e5
-1622 2 2 4 -0.32768000000000000000e5
-1623 1 1 2 0.16384000000000000000e5
-1623 1 1 12 -0.65536000000000000000e5
-1623 1 1 24 -0.16384000000000000000e5
-1623 1 1 32 -0.13107200000000000000e6
-1623 1 1 40 0.32768000000000000000e5
-1623 1 1 48 -0.16384000000000000000e5
-1623 1 2 5 -0.32768000000000000000e5
-1623 1 2 9 0.65536000000000000000e5
-1623 1 2 33 0.13107200000000000000e6
-1623 1 2 49 -0.16384000000000000000e5
-1623 1 3 34 -0.26214400000000000000e6
-1623 1 6 37 -0.16384000000000000000e5
-1623 1 7 22 -0.32768000000000000000e5
-1623 1 7 38 0.65536000000000000000e5
-1623 1 8 23 -0.19660800000000000000e6
-1623 1 8 39 0.32768000000000000000e5
-1623 1 10 41 0.13107200000000000000e6
-1623 1 12 27 0.26214400000000000000e6
-1623 1 23 38 -0.16384000000000000000e5
-1623 2 1 3 0.16384000000000000000e5
-1623 2 1 6 0.32768000000000000000e5
-1623 2 1 7 -0.65536000000000000000e5
-1623 2 2 16 -0.32768000000000000000e5
-1623 2 2 32 -0.16384000000000000000e5
-1623 2 3 17 0.16384000000000000000e5
-1623 2 4 26 -0.16384000000000000000e5
-1623 2 6 20 -0.13107200000000000000e6
-1623 2 7 21 0.13107200000000000000e6
-1623 3 1 2 0.32768000000000000000e5
-1623 3 1 16 -0.16384000000000000000e5
-1623 3 1 30 -0.32768000000000000000e5
-1623 3 2 3 -0.16384000000000000000e5
-1623 3 3 16 -0.49152000000000000000e5
-1623 3 4 17 -0.32768000000000000000e5
-1623 3 6 19 -0.65536000000000000000e5
-1623 3 7 20 0.13107200000000000000e6
-1623 3 8 21 0.13107200000000000000e6
-1623 4 1 1 0.32768000000000000000e5
-1623 4 1 5 0.65536000000000000000e5
-1623 4 1 13 -0.49152000000000000000e5
-1623 4 2 2 -0.65536000000000000000e5
-1623 4 2 14 -0.65536000000000000000e5
-1624 1 1 32 -0.13107200000000000000e6
-1624 1 1 40 0.16384000000000000000e5
-1624 1 2 5 -0.16384000000000000000e5
-1624 1 2 9 0.32768000000000000000e5
-1624 1 2 17 -0.13107200000000000000e6
-1624 1 3 18 -0.26214400000000000000e6
-1624 1 3 34 -0.13107200000000000000e6
-1624 1 4 19 -0.26214400000000000000e6
-1624 1 4 35 -0.26214400000000000000e6
-1624 1 6 13 0.65536000000000000000e5
-1624 1 7 22 -0.32768000000000000000e5
-1624 1 7 38 0.32768000000000000000e5
-1624 1 8 23 -0.98304000000000000000e5
-1624 1 8 39 -0.32768000000000000000e5
-1624 1 10 41 0.65536000000000000000e5
-1624 1 11 42 0.65536000000000000000e5
-1624 1 12 27 0.13107200000000000000e6
-1624 1 18 25 -0.13107200000000000000e6
-1624 1 20 27 0.52428800000000000000e6
-1624 2 1 3 0.16384000000000000000e5
-1624 2 1 7 -0.32768000000000000000e5
-1624 2 1 8 0.32768000000000000000e5
-1624 2 2 8 -0.32768000000000000000e5
-1624 2 2 16 -0.16384000000000000000e5
-1624 2 4 10 -0.65536000000000000000e5
-1624 2 6 12 -0.13107200000000000000e6
-1624 2 6 20 -0.65536000000000000000e5
-1624 2 7 21 0.65536000000000000000e5
-1624 2 8 22 0.65536000000000000000e5
-1624 2 9 23 -0.13107200000000000000e6
-1624 2 10 24 -0.26214400000000000000e6
-1624 3 1 2 0.16384000000000000000e5
-1624 3 2 15 0.26214400000000000000e6
-1624 3 3 8 -0.32768000000000000000e5
-1624 3 3 16 -0.16384000000000000000e5
-1624 3 4 17 -0.16384000000000000000e5
-1624 3 6 7 -0.65536000000000000000e5
-1624 3 6 19 -0.65536000000000000000e5
-1624 3 7 20 0.65536000000000000000e5
-1624 3 8 13 0.26214400000000000000e6
-1624 3 8 21 0.65536000000000000000e5
-1624 3 9 22 0.65536000000000000000e5
-1624 4 1 5 0.32768000000000000000e5
-1624 4 1 13 -0.16384000000000000000e5
-1624 4 2 2 -0.32768000000000000000e5
-1624 4 2 14 -0.32768000000000000000e5
-1624 4 4 8 0.65536000000000000000e5
-1625 2 1 9 0.32768000000000000000e5
-1625 2 2 8 -0.32768000000000000000e5
-1626 1 1 8 0.16384000000000000000e5
-1626 1 1 12 0.32768000000000000000e5
-1626 1 1 16 -0.65536000000000000000e5
-1626 1 1 40 0.81920000000000000000e4
-1626 1 2 5 -0.81920000000000000000e4
-1626 1 2 9 0.32768000000000000000e5
-1626 1 2 33 0.32768000000000000000e5
-1626 1 3 34 -0.65536000000000000000e5
-1626 1 7 22 -0.16384000000000000000e5
-1626 1 7 38 0.16384000000000000000e5
-1626 1 8 23 -0.49152000000000000000e5
-1626 1 10 41 0.32768000000000000000e5
-1626 1 12 27 0.65536000000000000000e5
-1626 2 1 3 0.81920000000000000000e4
-1626 2 1 10 0.32768000000000000000e5
-1626 2 2 16 -0.81920000000000000000e4
-1626 2 6 20 -0.32768000000000000000e5
-1626 2 7 21 0.32768000000000000000e5
-1626 3 1 2 0.81920000000000000000e4
-1626 3 3 16 -0.81920000000000000000e4
-1626 3 4 17 -0.81920000000000000000e4
-1626 3 6 7 0.32768000000000000000e5
-1626 3 6 19 -0.16384000000000000000e5
-1626 3 7 20 0.32768000000000000000e5
-1626 3 8 21 0.32768000000000000000e5
-1626 4 1 5 0.16384000000000000000e5
-1626 4 1 13 -0.81920000000000000000e4
-1626 4 2 2 -0.16384000000000000000e5
-1626 4 2 14 -0.16384000000000000000e5
-1627 2 1 11 0.32768000000000000000e5
-1627 2 6 20 -0.32768000000000000000e5
-1627 4 5 5 -0.65536000000000000000e5
-1628 1 1 32 0.32768000000000000000e5
-1628 1 2 17 -0.13107200000000000000e6
-1628 1 3 18 -0.65536000000000000000e5
-1628 1 4 19 -0.13107200000000000000e6
-1628 1 10 41 -0.32768000000000000000e5
-1628 1 20 27 0.26214400000000000000e6
-1628 1 28 35 -0.13107200000000000000e6
-1628 2 1 12 0.32768000000000000000e5
-1628 2 4 10 -0.32768000000000000000e5
-1628 2 6 12 -0.65536000000000000000e5
-1628 2 10 24 -0.13107200000000000000e6
-1628 3 2 15 0.13107200000000000000e6
-1628 3 5 10 -0.32768000000000000000e5
-1628 3 6 7 0.32768000000000000000e5
-1628 3 8 13 0.13107200000000000000e6
-1628 3 8 21 -0.32768000000000000000e5
-1628 3 11 24 -0.13107200000000000000e6
-1629 1 1 8 0.81920000000000000000e4
-1629 1 1 16 0.32768000000000000000e5
-1629 1 1 40 0.40960000000000000000e4
-1629 1 2 5 -0.40960000000000000000e4
-1629 1 2 9 0.16384000000000000000e5
-1629 1 3 18 -0.65536000000000000000e5
-1629 1 3 34 -0.32768000000000000000e5
-1629 1 4 19 -0.65536000000000000000e5
-1629 1 4 35 -0.65536000000000000000e5
-1629 1 6 13 0.16384000000000000000e5
-1629 1 7 16 -0.65536000000000000000e5
-1629 1 7 22 -0.81920000000000000000e4
-1629 1 7 38 0.81920000000000000000e4
-1629 1 8 23 -0.24576000000000000000e5
-1629 1 10 41 0.16384000000000000000e5
-1629 1 11 42 0.16384000000000000000e5
-1629 1 12 27 0.32768000000000000000e5
-1629 1 18 25 -0.32768000000000000000e5
-1629 1 20 27 0.13107200000000000000e6
-1629 2 1 3 0.40960000000000000000e4
-1629 2 1 13 0.32768000000000000000e5
-1629 2 2 16 -0.40960000000000000000e4
-1629 2 4 10 -0.16384000000000000000e5
-1629 2 6 12 -0.32768000000000000000e5
-1629 2 7 21 0.16384000000000000000e5
-1629 2 8 22 0.16384000000000000000e5
-1629 2 9 23 -0.32768000000000000000e5
-1629 2 10 24 -0.65536000000000000000e5
-1629 3 1 2 0.40960000000000000000e4
-1629 3 2 15 0.65536000000000000000e5
-1629 3 3 16 -0.40960000000000000000e4
-1629 3 4 17 -0.40960000000000000000e4
-1629 3 6 7 0.16384000000000000000e5
-1629 3 6 19 -0.81920000000000000000e4
-1629 3 7 20 0.16384000000000000000e5
-1629 3 8 13 0.65536000000000000000e5
-1629 3 8 21 0.16384000000000000000e5
-1629 3 9 22 0.16384000000000000000e5
-1629 4 1 5 0.81920000000000000000e4
-1629 4 1 13 -0.40960000000000000000e4
-1629 4 2 2 -0.81920000000000000000e4
-1629 4 2 14 -0.81920000000000000000e4
-1629 4 4 8 0.16384000000000000000e5
-1629 4 5 5 0.32768000000000000000e5
-1630 1 1 8 0.81920000000000000000e4
-1630 1 1 40 0.40960000000000000000e4
-1630 1 2 5 -0.40960000000000000000e4
-1630 1 2 9 0.16384000000000000000e5
-1630 1 2 17 -0.32768000000000000000e5
-1630 1 3 18 -0.98304000000000000000e5
-1630 1 3 34 -0.32768000000000000000e5
-1630 1 4 19 -0.13107200000000000000e6
-1630 1 4 35 -0.65536000000000000000e5
-1630 1 6 13 0.16384000000000000000e5
-1630 1 7 22 -0.81920000000000000000e4
-1630 1 7 38 0.81920000000000000000e4
-1630 1 8 23 -0.24576000000000000000e5
-1630 1 10 41 0.16384000000000000000e5
-1630 1 11 42 0.16384000000000000000e5
-1630 1 12 27 0.32768000000000000000e5
-1630 1 13 16 -0.13107200000000000000e6
-1630 1 18 25 -0.32768000000000000000e5
-1630 1 20 27 0.39321600000000000000e6
-1630 1 28 35 -0.13107200000000000000e6
-1630 2 1 3 0.40960000000000000000e4
-1630 2 1 14 0.32768000000000000000e5
-1630 2 2 16 -0.40960000000000000000e4
-1630 2 4 10 -0.16384000000000000000e5
-1630 2 6 12 -0.65536000000000000000e5
-1630 2 7 13 0.65536000000000000000e5
-1630 2 7 21 0.16384000000000000000e5
-1630 2 8 22 0.16384000000000000000e5
-1630 2 9 23 -0.32768000000000000000e5
-1630 2 10 24 -0.19660800000000000000e6
-1630 3 1 2 0.40960000000000000000e4
-1630 3 2 15 0.19660800000000000000e6
-1630 3 3 16 -0.40960000000000000000e4
-1630 3 4 17 -0.40960000000000000000e4
-1630 3 6 7 0.16384000000000000000e5
-1630 3 6 19 -0.81920000000000000000e4
-1630 3 7 20 0.16384000000000000000e5
-1630 3 8 13 0.19660800000000000000e6
-1630 3 8 21 0.16384000000000000000e5
-1630 3 9 22 0.16384000000000000000e5
-1630 3 11 24 -0.13107200000000000000e6
-1630 4 1 5 0.81920000000000000000e4
-1630 4 1 13 -0.40960000000000000000e4
-1630 4 2 2 -0.81920000000000000000e4
-1630 4 2 14 -0.81920000000000000000e4
-1630 4 4 8 0.16384000000000000000e5
-1630 4 5 5 0.32768000000000000000e5
-1631 1 1 2 0.32768000000000000000e5
-1631 1 1 8 -0.65536000000000000000e5
-1631 1 1 32 -0.13107200000000000000e6
-1631 1 1 40 0.32768000000000000000e5
-1631 1 1 48 -0.32768000000000000000e5
-1631 1 2 5 -0.32768000000000000000e5
-1631 1 2 9 0.65536000000000000000e5
-1631 1 2 33 0.13107200000000000000e6
-1631 1 2 49 -0.32768000000000000000e5
-1631 1 3 34 -0.26214400000000000000e6
-1631 1 6 37 -0.32768000000000000000e5
-1631 1 7 22 -0.65536000000000000000e5
-1631 1 7 38 0.65536000000000000000e5
-1631 1 8 23 -0.19660800000000000000e6
-1631 1 8 39 0.65536000000000000000e5
-1631 1 10 41 0.13107200000000000000e6
-1631 1 12 27 0.26214400000000000000e6
-1631 1 23 38 -0.32768000000000000000e5
-1631 2 1 7 -0.65536000000000000000e5
-1631 2 1 16 0.32768000000000000000e5
-1631 2 2 16 -0.32768000000000000000e5
-1631 2 2 32 -0.32768000000000000000e5
-1631 2 3 17 0.32768000000000000000e5
-1631 2 4 26 -0.32768000000000000000e5
-1631 2 6 20 -0.13107200000000000000e6
-1631 2 7 21 0.13107200000000000000e6
-1631 3 1 2 0.32768000000000000000e5
-1631 3 1 30 -0.65536000000000000000e5
-1631 3 2 3 -0.32768000000000000000e5
-1631 3 3 16 -0.65536000000000000000e5
-1631 3 4 17 -0.32768000000000000000e5
-1631 3 6 19 -0.65536000000000000000e5
-1631 3 7 20 0.13107200000000000000e6
-1631 3 8 21 0.13107200000000000000e6
-1631 4 1 1 0.65536000000000000000e5
-1631 4 1 5 0.65536000000000000000e5
-1631 4 1 13 -0.65536000000000000000e5
-1631 4 2 2 -0.65536000000000000000e5
-1631 4 2 14 -0.65536000000000000000e5
-1632 2 1 17 0.32768000000000000000e5
-1632 2 2 16 -0.32768000000000000000e5
-1633 1 1 24 0.32768000000000000000e5
-1633 1 1 40 0.32768000000000000000e5
-1633 1 1 48 0.32768000000000000000e5
-1633 1 2 49 0.32768000000000000000e5
-1633 1 6 37 0.32768000000000000000e5
-1633 1 7 38 0.65536000000000000000e5
-1633 1 8 23 -0.13107200000000000000e6
-1633 1 8 39 -0.65536000000000000000e5
-1633 1 23 38 0.32768000000000000000e5
-1633 2 1 18 0.32768000000000000000e5
-1633 2 2 32 0.32768000000000000000e5
-1633 2 3 17 -0.32768000000000000000e5
-1633 2 4 26 0.32768000000000000000e5
-1633 3 1 30 0.65536000000000000000e5
-1633 3 4 17 -0.32768000000000000000e5
-1633 3 6 19 -0.65536000000000000000e5
-1633 3 7 20 0.13107200000000000000e6
-1633 4 2 14 -0.65536000000000000000e5
-1634 2 1 19 0.32768000000000000000e5
-1634 2 3 17 -0.32768000000000000000e5
-1635 2 1 7 -0.32768000000000000000e5
-1635 2 1 20 0.32768000000000000000e5
-1635 4 1 5 0.32768000000000000000e5
-1636 1 1 32 -0.13107200000000000000e6
-1636 1 1 48 0.16384000000000000000e5
-1636 1 2 33 0.65536000000000000000e5
-1636 1 2 49 0.16384000000000000000e5
-1636 1 3 34 -0.13107200000000000000e6
-1636 1 7 22 -0.32768000000000000000e5
-1636 1 7 38 0.32768000000000000000e5
-1636 1 8 23 -0.32768000000000000000e5
-1636 1 10 41 0.65536000000000000000e5
-1636 1 12 27 0.13107200000000000000e6
-1636 1 23 38 0.16384000000000000000e5
-1636 2 1 7 -0.32768000000000000000e5
-1636 2 1 21 0.32768000000000000000e5
-1636 2 2 32 0.16384000000000000000e5
-1636 2 6 20 -0.65536000000000000000e5
-1636 2 7 21 0.65536000000000000000e5
-1636 3 1 30 0.32768000000000000000e5
-1636 3 6 19 -0.32768000000000000000e5
-1636 3 7 20 0.65536000000000000000e5
-1636 3 8 21 0.65536000000000000000e5
-1636 4 1 5 0.32768000000000000000e5
-1636 4 2 14 -0.32768000000000000000e5
-1637 1 1 48 0.16384000000000000000e5
-1637 1 2 33 0.65536000000000000000e5
-1637 1 2 49 0.16384000000000000000e5
-1637 1 3 34 -0.13107200000000000000e6
-1637 1 7 38 0.32768000000000000000e5
-1637 1 8 39 0.32768000000000000000e5
-1637 1 10 41 0.65536000000000000000e5
-1637 1 23 38 0.16384000000000000000e5
-1637 2 1 22 0.32768000000000000000e5
-1637 2 2 32 0.16384000000000000000e5
-1637 2 7 21 0.65536000000000000000e5
-1637 3 1 30 0.32768000000000000000e5
-1637 3 7 20 0.65536000000000000000e5
-1637 3 8 21 0.65536000000000000000e5
-1637 4 2 14 -0.32768000000000000000e5
-1638 2 1 23 0.32768000000000000000e5
-1638 2 6 20 -0.32768000000000000000e5
-1639 1 1 32 0.32768000000000000000e5
-1639 1 2 17 -0.65536000000000000000e5
-1639 1 3 34 0.65536000000000000000e5
-1639 1 10 41 -0.32768000000000000000e5
-1639 2 1 24 0.32768000000000000000e5
-1639 2 7 21 -0.32768000000000000000e5
-1639 3 1 14 0.65536000000000000000e5
-1639 3 8 21 -0.32768000000000000000e5
-1640 1 2 17 0.32768000000000000000e5
-1640 1 3 34 0.32768000000000000000e5
-1640 1 12 27 0.32768000000000000000e5
-1640 1 16 31 -0.13107200000000000000e6
-1640 1 20 27 0.13107200000000000000e6
-1640 1 28 35 -0.65536000000000000000e5
-1640 2 1 25 0.32768000000000000000e5
-1640 2 7 13 0.65536000000000000000e5
-1640 2 10 24 -0.65536000000000000000e5
-1640 3 1 14 -0.32768000000000000000e5
-1640 3 11 24 -0.65536000000000000000e5
-1640 4 8 8 -0.13107200000000000000e6
-1641 2 1 26 0.32768000000000000000e5
-1641 2 16 16 -0.65536000000000000000e5
-1642 1 1 48 0.32768000000000000000e5
-1642 1 2 33 -0.13107200000000000000e6
-1642 1 3 34 0.26214400000000000000e6
-1642 1 3 50 0.65536000000000000000e5
-1642 1 5 52 -0.13107200000000000000e6
-1642 1 7 38 -0.65536000000000000000e5
-1642 1 8 39 -0.65536000000000000000e5
-1642 1 10 41 -0.13107200000000000000e6
-1642 1 11 42 0.13107200000000000000e6
-1642 1 12 43 0.26214400000000000000e6
-1642 1 16 47 -0.26214400000000000000e6
-1642 1 22 37 0.32768000000000000000e5
-1642 1 23 38 0.32768000000000000000e5
-1642 1 28 43 -0.13107200000000000000e6
-1642 2 1 27 0.32768000000000000000e5
-1642 2 7 21 -0.13107200000000000000e6
-1642 2 10 32 0.13107200000000000000e6
-1642 2 12 26 -0.13107200000000000000e6
-1642 3 1 30 -0.65536000000000000000e5
-1642 3 2 31 -0.13107200000000000000e6
-1642 3 7 20 -0.13107200000000000000e6
-1642 3 8 21 -0.13107200000000000000e6
-1642 3 14 27 -0.26214400000000000000e6
-1642 4 5 17 -0.65536000000000000000e5
-1642 4 7 19 0.13107200000000000000e6
-1642 4 11 11 -0.65536000000000000000e5
-1643 2 1 28 0.32768000000000000000e5
-1643 2 3 17 -0.32768000000000000000e5
-1643 4 1 13 0.32768000000000000000e5
-1644 1 1 24 -0.16384000000000000000e5
-1644 1 1 32 -0.65536000000000000000e5
-1644 1 1 40 -0.16384000000000000000e5
-1644 1 1 48 0.16384000000000000000e5
-1644 1 2 17 -0.13107200000000000000e6
-1644 1 2 33 -0.65536000000000000000e5
-1644 1 3 34 0.13107200000000000000e6
-1644 1 3 50 0.32768000000000000000e5
-1644 1 5 52 -0.65536000000000000000e5
-1644 1 6 37 -0.16384000000000000000e5
-1644 1 7 22 -0.32768000000000000000e5
-1644 1 7 38 0.32768000000000000000e5
-1644 1 8 23 -0.32768000000000000000e5
-1644 1 10 41 -0.65536000000000000000e5
-1644 1 11 42 0.13107200000000000000e6
-1644 1 12 27 0.13107200000000000000e6
-1644 1 12 43 0.26214400000000000000e6
-1644 1 16 47 -0.13107200000000000000e6
-1644 1 17 48 -0.13107200000000000000e6
-1644 1 22 37 0.16384000000000000000e5
-1644 1 23 38 0.16384000000000000000e5
-1644 1 28 43 -0.65536000000000000000e5
-1644 2 1 7 -0.32768000000000000000e5
-1644 2 1 29 0.32768000000000000000e5
-1644 2 1 31 0.65536000000000000000e5
-1644 2 2 16 -0.16384000000000000000e5
-1644 2 3 17 0.16384000000000000000e5
-1644 2 4 26 -0.16384000000000000000e5
-1644 2 6 20 -0.65536000000000000000e5
-1644 2 7 21 -0.65536000000000000000e5
-1644 2 8 22 0.65536000000000000000e5
-1644 2 10 32 0.65536000000000000000e5
-1644 2 12 26 -0.13107200000000000000e6
-1644 2 16 16 0.32768000000000000000e5
-1644 3 1 14 0.13107200000000000000e6
-1644 3 1 16 -0.16384000000000000000e5
-1644 3 1 30 -0.32768000000000000000e5
-1644 3 2 31 -0.65536000000000000000e5
-1644 3 3 16 -0.16384000000000000000e5
-1644 3 6 23 0.13107200000000000000e6
-1644 3 7 20 -0.13107200000000000000e6
-1644 3 8 21 -0.65536000000000000000e5
-1644 3 14 27 -0.26214400000000000000e6
-1644 4 1 5 0.32768000000000000000e5
-1644 4 1 13 -0.16384000000000000000e5
-1644 4 4 16 -0.65536000000000000000e5
-1644 4 5 17 -0.32768000000000000000e5
-1644 4 7 19 0.65536000000000000000e5
-1644 4 11 11 -0.32768000000000000000e5
-1645 1 1 48 0.16384000000000000000e5
-1645 1 2 33 0.65536000000000000000e5
-1645 1 2 49 0.16384000000000000000e5
-1645 1 3 34 -0.13107200000000000000e6
-1645 1 7 38 0.32768000000000000000e5
-1645 1 8 39 0.32768000000000000000e5
-1645 1 10 41 0.65536000000000000000e5
-1645 1 23 38 0.16384000000000000000e5
-1645 2 1 30 0.32768000000000000000e5
-1645 2 2 32 0.16384000000000000000e5
-1645 2 7 21 0.65536000000000000000e5
-1645 3 1 30 0.32768000000000000000e5
-1645 3 7 20 0.65536000000000000000e5
-1645 3 8 21 0.65536000000000000000e5
-1646 1 1 48 0.32768000000000000000e5
-1646 1 2 33 -0.13107200000000000000e6
-1646 1 3 34 0.26214400000000000000e6
-1646 1 3 50 0.65536000000000000000e5
-1646 1 5 52 -0.13107200000000000000e6
-1646 1 7 38 -0.65536000000000000000e5
-1646 1 8 39 -0.65536000000000000000e5
-1646 1 10 41 -0.13107200000000000000e6
-1646 1 11 42 0.13107200000000000000e6
-1646 1 12 43 0.26214400000000000000e6
-1646 1 16 47 -0.26214400000000000000e6
-1646 1 22 37 0.32768000000000000000e5
-1646 1 23 38 0.32768000000000000000e5
-1646 1 28 43 -0.13107200000000000000e6
-1646 2 1 32 0.32768000000000000000e5
-1646 2 7 21 -0.13107200000000000000e6
-1646 2 10 32 0.13107200000000000000e6
-1646 2 12 26 -0.13107200000000000000e6
-1646 3 1 30 -0.65536000000000000000e5
-1646 3 2 31 -0.13107200000000000000e6
-1646 3 7 20 -0.13107200000000000000e6
-1646 3 8 21 -0.13107200000000000000e6
-1646 3 14 27 -0.26214400000000000000e6
-1646 4 5 17 -0.65536000000000000000e5
-1646 4 7 19 0.13107200000000000000e6
-1647 2 1 33 0.32768000000000000000e5
-1647 2 2 32 -0.32768000000000000000e5
-1648 1 1 48 0.16384000000000000000e5
-1648 1 2 33 0.65536000000000000000e5
-1648 1 2 49 0.16384000000000000000e5
-1648 1 3 34 -0.13107200000000000000e6
-1648 1 7 38 0.32768000000000000000e5
-1648 1 8 39 0.32768000000000000000e5
-1648 1 10 41 0.65536000000000000000e5
-1648 1 23 38 0.16384000000000000000e5
-1648 2 1 34 0.32768000000000000000e5
-1648 2 2 32 0.16384000000000000000e5
-1648 2 7 21 0.65536000000000000000e5
-1648 3 1 30 0.32768000000000000000e5
-1648 3 7 20 0.65536000000000000000e5
-1648 3 8 21 0.65536000000000000000e5
-1648 4 5 17 0.32768000000000000000e5
-1649 2 1 3 -0.16384000000000000000e5
-1649 2 2 2 0.32768000000000000000e5
-1650 1 1 24 0.32768000000000000000e5
-1650 1 1 40 0.32768000000000000000e5
-1650 1 1 48 0.32768000000000000000e5
-1650 1 2 49 0.32768000000000000000e5
-1650 1 6 37 0.32768000000000000000e5
-1650 1 7 38 0.65536000000000000000e5
-1650 1 8 23 -0.13107200000000000000e6
-1650 1 8 39 -0.65536000000000000000e5
-1650 1 23 38 0.32768000000000000000e5
-1650 2 2 3 0.32768000000000000000e5
-1650 2 2 32 0.32768000000000000000e5
-1650 2 3 17 -0.32768000000000000000e5
-1650 2 4 26 0.32768000000000000000e5
-1650 3 1 30 0.65536000000000000000e5
-1650 3 4 17 -0.32768000000000000000e5
-1650 3 6 19 -0.65536000000000000000e5
-1650 3 7 20 0.13107200000000000000e6
-1650 4 2 2 -0.65536000000000000000e5
-1650 4 2 14 -0.65536000000000000000e5
-1651 1 1 40 -0.32768000000000000000e5
-1651 1 1 48 0.32768000000000000000e5
-1651 1 2 5 0.32768000000000000000e5
-1651 1 2 49 0.32768000000000000000e5
-1651 1 3 26 0.32768000000000000000e5
-1651 1 5 52 -0.13107200000000000000e6
-1651 1 6 37 -0.32768000000000000000e5
-1651 1 11 42 -0.13107200000000000000e6
-1651 1 12 43 -0.26214400000000000000e6
-1651 1 17 48 0.52428800000000000000e6
-1651 1 23 38 0.32768000000000000000e5
-1651 1 26 41 -0.65536000000000000000e5
-1651 1 28 43 -0.13107200000000000000e6
-1651 2 2 5 0.32768000000000000000e5
-1651 2 2 32 0.32768000000000000000e5
-1651 2 3 5 -0.32768000000000000000e5
-1651 2 3 9 -0.65536000000000000000e5
-1651 2 4 18 0.32768000000000000000e5
-1651 2 4 26 -0.32768000000000000000e5
-1651 2 8 22 -0.26214400000000000000e6
-1651 2 12 26 0.13107200000000000000e6
-1651 2 16 30 0.65536000000000000000e5
-1651 3 2 31 0.13107200000000000000e6
-1651 3 3 8 -0.13107200000000000000e6
-1651 3 4 5 -0.32768000000000000000e5
-1651 3 4 9 -0.65536000000000000000e5
-1651 3 4 17 0.32768000000000000000e5
-1651 3 5 10 0.13107200000000000000e6
-1651 3 6 19 -0.65536000000000000000e5
-1651 3 14 27 0.26214400000000000000e6
-1651 4 3 15 0.65536000000000000000e5
-1651 4 4 16 0.26214400000000000000e6
-1651 4 6 18 0.65536000000000000000e5
-1651 4 7 19 0.13107200000000000000e6
-1652 2 1 7 -0.32768000000000000000e5
-1652 2 2 6 0.32768000000000000000e5
-1653 1 1 32 -0.13107200000000000000e6
-1653 1 1 40 0.16384000000000000000e5
-1653 1 2 5 -0.16384000000000000000e5
-1653 1 2 9 0.32768000000000000000e5
-1653 1 2 17 -0.13107200000000000000e6
-1653 1 3 18 -0.26214400000000000000e6
-1653 1 3 34 -0.13107200000000000000e6
-1653 1 4 19 -0.26214400000000000000e6
-1653 1 4 35 -0.26214400000000000000e6
-1653 1 6 13 0.65536000000000000000e5
-1653 1 7 22 -0.32768000000000000000e5
-1653 1 7 38 0.32768000000000000000e5
-1653 1 8 23 -0.98304000000000000000e5
-1653 1 8 39 -0.32768000000000000000e5
-1653 1 10 41 0.65536000000000000000e5
-1653 1 11 42 0.65536000000000000000e5
-1653 1 12 27 0.13107200000000000000e6
-1653 1 18 25 -0.13107200000000000000e6
-1653 1 20 27 0.52428800000000000000e6
-1653 2 1 3 0.16384000000000000000e5
-1653 2 1 7 -0.32768000000000000000e5
-1653 2 2 7 0.32768000000000000000e5
-1653 2 2 8 -0.32768000000000000000e5
-1653 2 2 16 -0.16384000000000000000e5
-1653 2 4 10 -0.65536000000000000000e5
-1653 2 6 12 -0.13107200000000000000e6
-1653 2 6 20 -0.65536000000000000000e5
-1653 2 7 21 0.65536000000000000000e5
-1653 2 8 22 0.65536000000000000000e5
-1653 2 9 23 -0.13107200000000000000e6
-1653 2 10 24 -0.26214400000000000000e6
-1653 3 1 2 0.16384000000000000000e5
-1653 3 2 15 0.26214400000000000000e6
-1653 3 3 8 -0.32768000000000000000e5
-1653 3 3 16 -0.16384000000000000000e5
-1653 3 4 17 -0.16384000000000000000e5
-1653 3 6 7 -0.65536000000000000000e5
-1653 3 6 19 -0.65536000000000000000e5
-1653 3 7 20 0.65536000000000000000e5
-1653 3 8 13 0.26214400000000000000e6
-1653 3 8 21 0.65536000000000000000e5
-1653 3 9 22 0.65536000000000000000e5
-1653 4 1 5 0.32768000000000000000e5
-1653 4 1 13 -0.16384000000000000000e5
-1653 4 2 2 -0.32768000000000000000e5
-1653 4 2 14 -0.32768000000000000000e5
-1653 4 4 8 0.65536000000000000000e5
-1654 1 2 9 -0.32768000000000000000e5
-1654 1 2 17 -0.13107200000000000000e6
-1654 1 2 33 -0.13107200000000000000e6
-1654 1 3 18 -0.39321600000000000000e6
-1654 1 4 19 -0.26214400000000000000e6
-1654 1 4 35 -0.52428800000000000000e6
-1654 1 6 13 0.13107200000000000000e6
-1654 1 8 39 -0.32768000000000000000e5
-1654 1 10 25 -0.32768000000000000000e5
-1654 1 10 41 0.13107200000000000000e6
-1654 1 11 42 0.13107200000000000000e6
-1654 1 18 25 -0.26214400000000000000e6
-1654 1 20 27 0.52428800000000000000e6
-1654 1 28 35 0.26214400000000000000e6
-1654 2 2 8 -0.32768000000000000000e5
-1654 2 2 9 0.32768000000000000000e5
-1654 2 3 9 -0.32768000000000000000e5
-1654 2 4 10 -0.65536000000000000000e5
-1654 2 6 12 -0.13107200000000000000e6
-1654 2 8 22 0.13107200000000000000e6
-1654 2 9 23 -0.26214400000000000000e6
-1654 2 10 24 -0.26214400000000000000e6
-1654 3 2 15 0.26214400000000000000e6
-1654 3 3 8 -0.32768000000000000000e5
-1654 3 4 9 -0.32768000000000000000e5
-1654 3 5 10 0.13107200000000000000e6
-1654 3 6 19 -0.32768000000000000000e5
-1654 3 8 13 0.26214400000000000000e6
-1654 3 8 21 0.13107200000000000000e6
-1654 3 9 22 0.13107200000000000000e6
-1654 3 11 24 0.26214400000000000000e6
-1654 4 4 8 0.13107200000000000000e6
-1655 2 2 10 0.32768000000000000000e5
-1655 2 6 20 -0.32768000000000000000e5
-1655 4 5 5 -0.65536000000000000000e5
-1656 1 1 32 0.32768000000000000000e5
-1656 1 2 17 -0.13107200000000000000e6
-1656 1 3 18 -0.65536000000000000000e5
-1656 1 4 19 -0.13107200000000000000e6
-1656 1 10 41 -0.32768000000000000000e5
-1656 1 20 27 0.26214400000000000000e6
-1656 1 28 35 -0.13107200000000000000e6
-1656 2 2 11 0.32768000000000000000e5
-1656 2 4 10 -0.32768000000000000000e5
-1656 2 6 12 -0.65536000000000000000e5
-1656 2 10 24 -0.13107200000000000000e6
-1656 3 2 15 0.13107200000000000000e6
-1656 3 5 10 -0.32768000000000000000e5
-1656 3 6 7 0.32768000000000000000e5
-1656 3 8 13 0.13107200000000000000e6
-1656 3 8 21 -0.32768000000000000000e5
-1656 3 11 24 -0.13107200000000000000e6
-1657 2 2 12 0.32768000000000000000e5
-1657 2 4 10 -0.32768000000000000000e5
-1658 1 1 8 0.81920000000000000000e4
-1658 1 1 40 0.40960000000000000000e4
-1658 1 2 5 -0.40960000000000000000e4
-1658 1 2 9 0.16384000000000000000e5
-1658 1 2 17 -0.32768000000000000000e5
-1658 1 3 18 -0.98304000000000000000e5
-1658 1 3 34 -0.32768000000000000000e5
-1658 1 4 19 -0.13107200000000000000e6
-1658 1 4 35 -0.65536000000000000000e5
-1658 1 6 13 0.16384000000000000000e5
-1658 1 7 22 -0.81920000000000000000e4
-1658 1 7 38 0.81920000000000000000e4
-1658 1 8 23 -0.24576000000000000000e5
-1658 1 10 41 0.16384000000000000000e5
-1658 1 11 42 0.16384000000000000000e5
-1658 1 12 27 0.32768000000000000000e5
-1658 1 13 16 -0.13107200000000000000e6
-1658 1 18 25 -0.32768000000000000000e5
-1658 1 20 27 0.39321600000000000000e6
-1658 1 28 35 -0.13107200000000000000e6
-1658 2 1 3 0.40960000000000000000e4
-1658 2 2 13 0.32768000000000000000e5
-1658 2 2 16 -0.40960000000000000000e4
-1658 2 4 10 -0.16384000000000000000e5
-1658 2 6 12 -0.65536000000000000000e5
-1658 2 7 13 0.65536000000000000000e5
-1658 2 7 21 0.16384000000000000000e5
-1658 2 8 22 0.16384000000000000000e5
-1658 2 9 23 -0.32768000000000000000e5
-1658 2 10 24 -0.19660800000000000000e6
-1658 3 1 2 0.40960000000000000000e4
-1658 3 2 15 0.19660800000000000000e6
-1658 3 3 16 -0.40960000000000000000e4
-1658 3 4 17 -0.40960000000000000000e4
-1658 3 6 7 0.16384000000000000000e5
-1658 3 6 19 -0.81920000000000000000e4
-1658 3 7 20 0.16384000000000000000e5
-1658 3 8 13 0.19660800000000000000e6
-1658 3 8 21 0.16384000000000000000e5
-1658 3 9 22 0.16384000000000000000e5
-1658 3 11 24 -0.13107200000000000000e6
-1658 4 1 5 0.81920000000000000000e4
-1658 4 1 13 -0.40960000000000000000e4
-1658 4 2 2 -0.81920000000000000000e4
-1658 4 2 14 -0.81920000000000000000e4
-1658 4 4 8 0.16384000000000000000e5
-1658 4 5 5 0.32768000000000000000e5
-1659 2 2 14 0.32768000000000000000e5
-1659 2 6 12 -0.32768000000000000000e5
-1660 2 2 15 0.32768000000000000000e5
-1660 2 7 13 -0.32768000000000000000e5
-1661 1 1 24 0.32768000000000000000e5
-1661 1 1 40 0.32768000000000000000e5
-1661 1 1 48 0.32768000000000000000e5
-1661 1 2 49 0.32768000000000000000e5
-1661 1 6 37 0.32768000000000000000e5
-1661 1 7 38 0.65536000000000000000e5
-1661 1 8 23 -0.13107200000000000000e6
-1661 1 8 39 -0.65536000000000000000e5
-1661 1 23 38 0.32768000000000000000e5
-1661 2 2 17 0.32768000000000000000e5
-1661 2 2 32 0.32768000000000000000e5
-1661 2 3 17 -0.32768000000000000000e5
-1661 2 4 26 0.32768000000000000000e5
-1661 3 1 30 0.65536000000000000000e5
-1661 3 4 17 -0.32768000000000000000e5
-1661 3 6 19 -0.65536000000000000000e5
-1661 3 7 20 0.13107200000000000000e6
-1661 4 2 14 -0.65536000000000000000e5
-1662 2 2 18 0.32768000000000000000e5
-1662 2 3 17 -0.32768000000000000000e5
-1663 1 3 26 0.32768000000000000000e5
-1663 1 6 37 -0.32768000000000000000e5
-1663 1 7 38 0.65536000000000000000e5
-1663 1 8 23 -0.65536000000000000000e5
-1663 2 2 19 0.32768000000000000000e5
-1663 2 4 26 -0.32768000000000000000e5
-1663 3 3 16 -0.32768000000000000000e5
-1663 3 6 19 -0.13107200000000000000e6
-1663 3 7 20 0.13107200000000000000e6
-1663 4 1 13 -0.32768000000000000000e5
-1663 4 2 14 -0.65536000000000000000e5
-1664 1 1 32 -0.13107200000000000000e6
-1664 1 1 48 0.16384000000000000000e5
-1664 1 2 33 0.65536000000000000000e5
-1664 1 2 49 0.16384000000000000000e5
-1664 1 3 34 -0.13107200000000000000e6
-1664 1 7 22 -0.32768000000000000000e5
-1664 1 7 38 0.32768000000000000000e5
-1664 1 8 23 -0.32768000000000000000e5
-1664 1 10 41 0.65536000000000000000e5
-1664 1 12 27 0.13107200000000000000e6
-1664 1 23 38 0.16384000000000000000e5
-1664 2 1 7 -0.32768000000000000000e5
-1664 2 2 20 0.32768000000000000000e5
-1664 2 2 32 0.16384000000000000000e5
-1664 2 6 20 -0.65536000000000000000e5
-1664 2 7 21 0.65536000000000000000e5
-1664 3 1 30 0.32768000000000000000e5
-1664 3 6 19 -0.32768000000000000000e5
-1664 3 7 20 0.65536000000000000000e5
-1664 3 8 21 0.65536000000000000000e5
-1664 4 1 5 0.32768000000000000000e5
-1664 4 2 14 -0.32768000000000000000e5
-1665 1 1 48 0.16384000000000000000e5
-1665 1 2 33 0.65536000000000000000e5
-1665 1 2 49 0.16384000000000000000e5
-1665 1 3 34 -0.13107200000000000000e6
-1665 1 7 38 0.32768000000000000000e5
-1665 1 8 39 0.32768000000000000000e5
-1665 1 10 41 0.65536000000000000000e5
-1665 1 23 38 0.16384000000000000000e5
-1665 2 2 21 0.32768000000000000000e5
-1665 2 2 32 0.16384000000000000000e5
-1665 2 7 21 0.65536000000000000000e5
-1665 3 1 30 0.32768000000000000000e5
-1665 3 7 20 0.65536000000000000000e5
-1665 3 8 21 0.65536000000000000000e5
-1665 4 2 14 -0.32768000000000000000e5
-1666 1 2 33 -0.65536000000000000000e5
-1666 1 5 52 0.65536000000000000000e5
-1666 1 7 38 0.32768000000000000000e5
-1666 1 8 23 -0.32768000000000000000e5
-1666 1 10 25 -0.32768000000000000000e5
-1666 1 10 41 0.65536000000000000000e5
-1666 1 11 42 0.65536000000000000000e5
-1666 1 12 43 0.13107200000000000000e6
-1666 1 17 48 -0.26214400000000000000e6
-1666 1 26 41 0.32768000000000000000e5
-1666 1 28 43 0.65536000000000000000e5
-1666 2 2 22 0.32768000000000000000e5
-1666 2 8 22 0.13107200000000000000e6
-1666 2 12 26 -0.65536000000000000000e5
-1666 2 16 30 -0.32768000000000000000e5
-1666 3 1 30 0.32768000000000000000e5
-1666 3 2 31 -0.65536000000000000000e5
-1666 3 6 19 -0.32768000000000000000e5
-1666 3 7 20 0.65536000000000000000e5
-1666 3 8 21 0.65536000000000000000e5
-1666 3 14 27 -0.13107200000000000000e6
-1666 4 2 14 -0.32768000000000000000e5
-1666 4 3 15 -0.32768000000000000000e5
-1666 4 4 16 -0.13107200000000000000e6
-1666 4 6 18 -0.32768000000000000000e5
-1666 4 7 19 -0.65536000000000000000e5
-1667 1 1 32 0.32768000000000000000e5
-1667 1 2 17 -0.65536000000000000000e5
-1667 1 3 34 0.65536000000000000000e5
-1667 1 10 41 -0.32768000000000000000e5
-1667 2 2 23 0.32768000000000000000e5
-1667 2 7 21 -0.32768000000000000000e5
-1667 3 1 14 0.65536000000000000000e5
-1667 3 8 21 -0.32768000000000000000e5
-1668 2 2 24 0.32768000000000000000e5
-1668 2 7 21 -0.32768000000000000000e5
-1669 1 2 17 0.32768000000000000000e5
-1669 1 3 34 0.32768000000000000000e5
-1669 1 4 19 0.65536000000000000000e5
-1669 1 4 35 -0.32768000000000000000e5
-1669 1 18 25 -0.32768000000000000000e5
-1669 1 20 27 -0.13107200000000000000e6
-1669 1 28 35 0.13107200000000000000e6
-1669 2 2 25 0.32768000000000000000e5
-1669 2 9 23 -0.32768000000000000000e5
-1669 2 10 24 0.65536000000000000000e5
-1669 3 1 14 -0.32768000000000000000e5
-1669 3 8 13 -0.65536000000000000000e5
-1669 3 11 24 0.13107200000000000000e6
-1670 1 1 48 0.32768000000000000000e5
-1670 1 2 33 -0.13107200000000000000e6
-1670 1 3 34 0.26214400000000000000e6
-1670 1 3 50 0.65536000000000000000e5
-1670 1 5 52 -0.13107200000000000000e6
-1670 1 7 38 -0.65536000000000000000e5
-1670 1 8 39 -0.65536000000000000000e5
-1670 1 10 41 -0.13107200000000000000e6
-1670 1 11 42 0.13107200000000000000e6
-1670 1 12 43 0.26214400000000000000e6
-1670 1 16 47 -0.26214400000000000000e6
-1670 1 22 37 0.32768000000000000000e5
-1670 1 23 38 0.32768000000000000000e5
-1670 1 28 43 -0.13107200000000000000e6
-1670 2 2 26 0.32768000000000000000e5
-1670 2 7 21 -0.13107200000000000000e6
-1670 2 10 32 0.13107200000000000000e6
-1670 2 12 26 -0.13107200000000000000e6
-1670 3 1 30 -0.65536000000000000000e5
-1670 3 2 31 -0.13107200000000000000e6
-1670 3 7 20 -0.13107200000000000000e6
-1670 3 8 21 -0.13107200000000000000e6
-1670 3 14 27 -0.26214400000000000000e6
-1670 4 5 17 -0.65536000000000000000e5
-1670 4 7 19 0.13107200000000000000e6
-1670 4 11 11 -0.65536000000000000000e5
-1671 2 2 27 0.32768000000000000000e5
-1671 2 3 17 -0.32768000000000000000e5
-1671 4 1 13 0.32768000000000000000e5
-1672 2 2 28 0.32768000000000000000e5
-1672 2 4 26 -0.32768000000000000000e5
-1673 1 1 48 0.16384000000000000000e5
-1673 1 2 33 0.65536000000000000000e5
-1673 1 2 49 0.16384000000000000000e5
-1673 1 3 34 -0.13107200000000000000e6
-1673 1 7 38 0.32768000000000000000e5
-1673 1 8 39 0.32768000000000000000e5
-1673 1 10 41 0.65536000000000000000e5
-1673 1 23 38 0.16384000000000000000e5
-1673 2 2 29 0.32768000000000000000e5
-1673 2 2 32 0.16384000000000000000e5
-1673 2 7 21 0.65536000000000000000e5
-1673 3 1 30 0.32768000000000000000e5
-1673 3 7 20 0.65536000000000000000e5
-1673 3 8 21 0.65536000000000000000e5
-1674 1 5 52 0.65536000000000000000e5
-1674 1 9 40 -0.32768000000000000000e5
-1674 1 10 41 0.65536000000000000000e5
-1674 1 17 48 -0.13107200000000000000e6
-1674 1 26 41 0.32768000000000000000e5
-1674 1 28 43 0.65536000000000000000e5
-1674 2 2 30 0.32768000000000000000e5
-1674 2 8 22 0.65536000000000000000e5
-1674 2 16 30 -0.32768000000000000000e5
-1674 3 1 30 0.32768000000000000000e5
-1674 3 2 31 -0.65536000000000000000e5
-1674 4 4 16 -0.65536000000000000000e5
-1674 4 6 18 -0.32768000000000000000e5
-1674 4 7 19 -0.65536000000000000000e5
-1675 1 2 33 -0.32768000000000000000e5
-1675 1 3 34 0.65536000000000000000e5
-1675 1 11 42 0.32768000000000000000e5
-1675 1 12 43 0.65536000000000000000e5
-1675 1 16 47 -0.65536000000000000000e5
-1675 1 17 48 -0.65536000000000000000e5
-1675 2 2 31 0.32768000000000000000e5
-1675 2 7 21 -0.32768000000000000000e5
-1675 2 8 22 0.32768000000000000000e5
-1675 2 12 26 -0.32768000000000000000e5
-1675 3 7 20 -0.32768000000000000000e5
-1675 3 8 21 -0.32768000000000000000e5
-1675 3 13 26 -0.65536000000000000000e5
-1675 3 14 27 -0.65536000000000000000e5
-1675 4 4 16 -0.32768000000000000000e5
-1676 1 2 49 0.32768000000000000000e5
-1676 1 3 50 -0.65536000000000000000e5
-1676 1 23 38 0.32768000000000000000e5
-1676 1 24 39 0.32768000000000000000e5
-1676 2 2 33 0.32768000000000000000e5
-1677 2 2 34 0.32768000000000000000e5
-1677 2 16 30 -0.32768000000000000000e5
-1678 2 2 35 0.32768000000000000000e5
-1678 2 26 32 -0.32768000000000000000e5
-1678 4 17 17 -0.65536000000000000000e5
-1679 2 2 4 -0.16384000000000000000e5
-1679 2 3 3 0.32768000000000000000e5
-1680 1 1 40 -0.32768000000000000000e5
-1680 1 1 48 0.32768000000000000000e5
-1680 1 2 5 0.32768000000000000000e5
-1680 1 2 49 0.32768000000000000000e5
-1680 1 3 26 0.32768000000000000000e5
-1680 1 5 52 -0.13107200000000000000e6
-1680 1 6 37 -0.32768000000000000000e5
-1680 1 11 42 -0.13107200000000000000e6
-1680 1 12 43 -0.26214400000000000000e6
-1680 1 17 48 0.52428800000000000000e6
-1680 1 23 38 0.32768000000000000000e5
-1680 1 26 41 -0.65536000000000000000e5
-1680 1 28 43 -0.13107200000000000000e6
-1680 2 2 32 0.32768000000000000000e5
-1680 2 3 4 0.32768000000000000000e5
-1680 2 3 5 -0.32768000000000000000e5
-1680 2 3 9 -0.65536000000000000000e5
-1680 2 4 18 0.32768000000000000000e5
-1680 2 4 26 -0.32768000000000000000e5
-1680 2 8 22 -0.26214400000000000000e6
-1680 2 12 26 0.13107200000000000000e6
-1680 2 16 30 0.65536000000000000000e5
-1680 3 2 31 0.13107200000000000000e6
-1680 3 3 8 -0.13107200000000000000e6
-1680 3 4 5 -0.32768000000000000000e5
-1680 3 4 9 -0.65536000000000000000e5
-1680 3 4 17 0.32768000000000000000e5
-1680 3 5 10 0.13107200000000000000e6
-1680 3 6 19 -0.65536000000000000000e5
-1680 3 14 27 0.26214400000000000000e6
-1680 4 3 15 0.65536000000000000000e5
-1680 4 4 16 0.26214400000000000000e6
-1680 4 6 18 0.65536000000000000000e5
-1680 4 7 19 0.13107200000000000000e6
-1681 1 1 32 -0.13107200000000000000e6
-1681 1 1 40 0.16384000000000000000e5
-1681 1 2 5 -0.16384000000000000000e5
-1681 1 2 9 0.32768000000000000000e5
-1681 1 2 17 -0.13107200000000000000e6
-1681 1 3 18 -0.26214400000000000000e6
-1681 1 3 34 -0.13107200000000000000e6
-1681 1 4 19 -0.26214400000000000000e6
-1681 1 4 35 -0.26214400000000000000e6
-1681 1 6 13 0.65536000000000000000e5
-1681 1 7 22 -0.32768000000000000000e5
-1681 1 7 38 0.32768000000000000000e5
-1681 1 8 23 -0.98304000000000000000e5
-1681 1 8 39 -0.32768000000000000000e5
-1681 1 10 41 0.65536000000000000000e5
-1681 1 11 42 0.65536000000000000000e5
-1681 1 12 27 0.13107200000000000000e6
-1681 1 18 25 -0.13107200000000000000e6
-1681 1 20 27 0.52428800000000000000e6
-1681 2 1 3 0.16384000000000000000e5
-1681 2 1 7 -0.32768000000000000000e5
-1681 2 2 8 -0.32768000000000000000e5
-1681 2 2 16 -0.16384000000000000000e5
-1681 2 3 6 0.32768000000000000000e5
-1681 2 4 10 -0.65536000000000000000e5
-1681 2 6 12 -0.13107200000000000000e6
-1681 2 6 20 -0.65536000000000000000e5
-1681 2 7 21 0.65536000000000000000e5
-1681 2 8 22 0.65536000000000000000e5
-1681 2 9 23 -0.13107200000000000000e6
-1681 2 10 24 -0.26214400000000000000e6
-1681 3 1 2 0.16384000000000000000e5
-1681 3 2 15 0.26214400000000000000e6
-1681 3 3 8 -0.32768000000000000000e5
-1681 3 3 16 -0.16384000000000000000e5
-1681 3 4 17 -0.16384000000000000000e5
-1681 3 6 7 -0.65536000000000000000e5
-1681 3 6 19 -0.65536000000000000000e5
-1681 3 7 20 0.65536000000000000000e5
-1681 3 8 13 0.26214400000000000000e6
-1681 3 8 21 0.65536000000000000000e5
-1681 3 9 22 0.65536000000000000000e5
-1681 4 1 5 0.32768000000000000000e5
-1681 4 1 13 -0.16384000000000000000e5
-1681 4 2 2 -0.32768000000000000000e5
-1681 4 2 14 -0.32768000000000000000e5
-1681 4 4 8 0.65536000000000000000e5
-1682 2 2 8 -0.32768000000000000000e5
-1682 2 3 7 0.32768000000000000000e5
-1683 1 2 9 -0.32768000000000000000e5
-1683 1 2 17 -0.13107200000000000000e6
-1683 1 2 33 -0.13107200000000000000e6
-1683 1 3 18 -0.39321600000000000000e6
-1683 1 4 19 -0.26214400000000000000e6
-1683 1 4 35 -0.52428800000000000000e6
-1683 1 6 13 0.13107200000000000000e6
-1683 1 8 39 -0.32768000000000000000e5
-1683 1 10 25 -0.32768000000000000000e5
-1683 1 10 41 0.13107200000000000000e6
-1683 1 11 42 0.13107200000000000000e6
-1683 1 18 25 -0.26214400000000000000e6
-1683 1 20 27 0.52428800000000000000e6
-1683 1 28 35 0.26214400000000000000e6
-1683 2 2 8 -0.32768000000000000000e5
-1683 2 3 8 0.32768000000000000000e5
-1683 2 3 9 -0.32768000000000000000e5
-1683 2 4 10 -0.65536000000000000000e5
-1683 2 6 12 -0.13107200000000000000e6
-1683 2 8 22 0.13107200000000000000e6
-1683 2 9 23 -0.26214400000000000000e6
-1683 2 10 24 -0.26214400000000000000e6
-1683 3 2 15 0.26214400000000000000e6
-1683 3 3 8 -0.32768000000000000000e5
-1683 3 4 9 -0.32768000000000000000e5
-1683 3 5 10 0.13107200000000000000e6
-1683 3 6 19 -0.32768000000000000000e5
-1683 3 8 13 0.26214400000000000000e6
-1683 3 8 21 0.13107200000000000000e6
-1683 3 9 22 0.13107200000000000000e6
-1683 3 11 24 0.26214400000000000000e6
-1683 4 4 8 0.13107200000000000000e6
-1684 1 1 32 0.32768000000000000000e5
-1684 1 2 17 -0.13107200000000000000e6
-1684 1 3 18 -0.65536000000000000000e5
-1684 1 4 19 -0.13107200000000000000e6
-1684 1 10 41 -0.32768000000000000000e5
-1684 1 20 27 0.26214400000000000000e6
-1684 1 28 35 -0.13107200000000000000e6
-1684 2 3 10 0.32768000000000000000e5
-1684 2 4 10 -0.32768000000000000000e5
-1684 2 6 12 -0.65536000000000000000e5
-1684 2 10 24 -0.13107200000000000000e6
-1684 3 2 15 0.13107200000000000000e6
-1684 3 5 10 -0.32768000000000000000e5
-1684 3 6 7 0.32768000000000000000e5
-1684 3 8 13 0.13107200000000000000e6
-1684 3 8 21 -0.32768000000000000000e5
-1684 3 11 24 -0.13107200000000000000e6
-1685 2 3 11 0.32768000000000000000e5
-1685 2 4 10 -0.32768000000000000000e5
-1686 1 2 33 0.32768000000000000000e5
-1686 1 4 35 0.13107200000000000000e6
-1686 1 11 42 -0.32768000000000000000e5
-1686 1 18 25 0.65536000000000000000e5
-1686 1 28 35 -0.13107200000000000000e6
-1686 2 3 12 0.32768000000000000000e5
-1686 2 8 22 -0.32768000000000000000e5
-1686 2 9 23 0.65536000000000000000e5
-1686 3 9 22 -0.32768000000000000000e5
-1686 3 11 24 -0.13107200000000000000e6
-1686 4 4 8 -0.32768000000000000000e5
-1687 2 3 13 0.32768000000000000000e5
-1687 2 6 12 -0.32768000000000000000e5
-1688 1 2 17 -0.32768000000000000000e5
-1688 1 3 18 -0.32768000000000000000e5
-1688 1 4 19 -0.13107200000000000000e6
-1688 1 10 17 0.65536000000000000000e5
-1688 1 11 14 -0.32768000000000000000e5
-1688 1 20 27 0.13107200000000000000e6
-1688 1 28 35 -0.65536000000000000000e5
-1688 2 3 14 0.32768000000000000000e5
-1688 2 6 12 -0.32768000000000000000e5
-1688 2 9 11 -0.32768000000000000000e5
-1688 2 10 24 -0.65536000000000000000e5
-1688 3 2 15 0.65536000000000000000e5
-1688 3 8 13 0.65536000000000000000e5
-1688 3 11 24 -0.65536000000000000000e5
-1689 2 3 15 0.32768000000000000000e5
-1689 2 10 24 -0.32768000000000000000e5
-1689 4 6 10 -0.32768000000000000000e5
-1690 1 1 24 0.32768000000000000000e5
-1690 1 1 40 0.32768000000000000000e5
-1690 1 1 48 0.32768000000000000000e5
-1690 1 2 49 0.32768000000000000000e5
-1690 1 6 37 0.32768000000000000000e5
-1690 1 7 38 0.65536000000000000000e5
-1690 1 8 23 -0.13107200000000000000e6
-1690 1 8 39 -0.65536000000000000000e5
-1690 1 23 38 0.32768000000000000000e5
-1690 2 2 32 0.32768000000000000000e5
-1690 2 3 16 0.32768000000000000000e5
-1690 2 3 17 -0.32768000000000000000e5
-1690 2 4 26 0.32768000000000000000e5
-1690 3 1 30 0.65536000000000000000e5
-1690 3 4 17 -0.32768000000000000000e5
-1690 3 6 19 -0.65536000000000000000e5
-1690 3 7 20 0.13107200000000000000e6
-1690 4 2 14 -0.65536000000000000000e5
-1691 1 3 26 0.32768000000000000000e5
-1691 1 6 37 -0.32768000000000000000e5
-1691 1 7 38 0.65536000000000000000e5
-1691 1 8 23 -0.65536000000000000000e5
-1691 2 3 18 0.32768000000000000000e5
-1691 2 4 26 -0.32768000000000000000e5
-1691 3 3 16 -0.32768000000000000000e5
-1691 3 6 19 -0.13107200000000000000e6
-1691 3 7 20 0.13107200000000000000e6
-1691 4 1 13 -0.32768000000000000000e5
-1691 4 2 14 -0.65536000000000000000e5
-1692 2 3 19 0.32768000000000000000e5
-1692 2 4 18 -0.32768000000000000000e5
-1693 1 1 48 0.16384000000000000000e5
-1693 1 2 33 0.65536000000000000000e5
-1693 1 2 49 0.16384000000000000000e5
-1693 1 3 34 -0.13107200000000000000e6
-1693 1 7 38 0.32768000000000000000e5
-1693 1 8 39 0.32768000000000000000e5
-1693 1 10 41 0.65536000000000000000e5
-1693 1 23 38 0.16384000000000000000e5
-1693 2 2 32 0.16384000000000000000e5
-1693 2 3 20 0.32768000000000000000e5
-1693 2 7 21 0.65536000000000000000e5
-1693 3 1 30 0.32768000000000000000e5
-1693 3 7 20 0.65536000000000000000e5
-1693 3 8 21 0.65536000000000000000e5
-1693 4 2 14 -0.32768000000000000000e5
-1694 1 2 33 -0.65536000000000000000e5
-1694 1 5 52 0.65536000000000000000e5
-1694 1 7 38 0.32768000000000000000e5
-1694 1 8 23 -0.32768000000000000000e5
-1694 1 10 25 -0.32768000000000000000e5
-1694 1 10 41 0.65536000000000000000e5
-1694 1 11 42 0.65536000000000000000e5
-1694 1 12 43 0.13107200000000000000e6
-1694 1 17 48 -0.26214400000000000000e6
-1694 1 26 41 0.32768000000000000000e5
-1694 1 28 43 0.65536000000000000000e5
-1694 2 3 21 0.32768000000000000000e5
-1694 2 8 22 0.13107200000000000000e6
-1694 2 12 26 -0.65536000000000000000e5
-1694 2 16 30 -0.32768000000000000000e5
-1694 3 1 30 0.32768000000000000000e5
-1694 3 2 31 -0.65536000000000000000e5
-1694 3 6 19 -0.32768000000000000000e5
-1694 3 7 20 0.65536000000000000000e5
-1694 3 8 21 0.65536000000000000000e5
-1694 3 14 27 -0.13107200000000000000e6
-1694 4 2 14 -0.32768000000000000000e5
-1694 4 3 15 -0.32768000000000000000e5
-1694 4 4 16 -0.13107200000000000000e6
-1694 4 6 18 -0.32768000000000000000e5
-1694 4 7 19 -0.65536000000000000000e5
-1695 1 1 48 -0.16384000000000000000e5
-1695 1 2 49 -0.16384000000000000000e5
-1695 1 5 52 0.65536000000000000000e5
-1695 1 11 42 0.65536000000000000000e5
-1695 1 12 43 0.13107200000000000000e6
-1695 1 17 48 -0.26214400000000000000e6
-1695 1 23 38 -0.16384000000000000000e5
-1695 1 26 41 0.32768000000000000000e5
-1695 1 28 43 0.65536000000000000000e5
-1695 2 2 32 -0.16384000000000000000e5
-1695 2 3 22 0.32768000000000000000e5
-1695 2 8 22 0.13107200000000000000e6
-1695 2 12 26 -0.65536000000000000000e5
-1695 2 16 30 -0.32768000000000000000e5
-1695 3 2 31 -0.65536000000000000000e5
-1695 3 14 27 -0.13107200000000000000e6
-1695 4 3 15 -0.32768000000000000000e5
-1695 4 4 16 -0.13107200000000000000e6
-1695 4 6 18 -0.32768000000000000000e5
-1695 4 7 19 -0.65536000000000000000e5
-1696 2 3 23 0.32768000000000000000e5
-1696 2 7 21 -0.32768000000000000000e5
-1697 1 2 33 0.32768000000000000000e5
-1697 1 4 35 0.13107200000000000000e6
-1697 1 11 42 -0.32768000000000000000e5
-1697 1 18 25 0.65536000000000000000e5
-1697 1 28 35 -0.13107200000000000000e6
-1697 2 3 24 0.32768000000000000000e5
-1697 2 8 22 -0.32768000000000000000e5
-1697 2 9 23 0.65536000000000000000e5
-1697 3 9 22 -0.32768000000000000000e5
-1697 3 11 24 -0.13107200000000000000e6
-1698 1 3 34 0.32768000000000000000e5
-1698 1 4 19 -0.65536000000000000000e5
-1698 1 18 25 -0.32768000000000000000e5
-1698 1 28 35 0.65536000000000000000e5
-1698 2 3 25 0.32768000000000000000e5
-1698 2 9 23 -0.32768000000000000000e5
-1698 3 8 13 0.65536000000000000000e5
-1698 3 11 24 0.65536000000000000000e5
-1699 2 3 17 -0.32768000000000000000e5
-1699 2 3 26 0.32768000000000000000e5
-1699 4 1 13 0.32768000000000000000e5
-1700 2 3 27 0.32768000000000000000e5
-1700 2 4 26 -0.32768000000000000000e5
-1701 1 3 26 -0.32768000000000000000e5
-1701 1 6 37 0.32768000000000000000e5
-1701 1 9 40 0.65536000000000000000e5
-1701 1 10 25 -0.65536000000000000000e5
-1701 2 3 28 0.32768000000000000000e5
-1701 2 4 18 -0.32768000000000000000e5
-1701 3 4 17 -0.32768000000000000000e5
-1701 3 5 18 -0.32768000000000000000e5
-1701 3 6 19 -0.65536000000000000000e5
-1701 3 8 21 0.13107200000000000000e6
-1701 4 3 15 -0.65536000000000000000e5
-1702 1 5 52 0.65536000000000000000e5
-1702 1 9 40 -0.32768000000000000000e5
-1702 1 10 41 0.65536000000000000000e5
-1702 1 17 48 -0.13107200000000000000e6
-1702 1 26 41 0.32768000000000000000e5
-1702 1 28 43 0.65536000000000000000e5
-1702 2 3 29 0.32768000000000000000e5
-1702 2 8 22 0.65536000000000000000e5
-1702 2 16 30 -0.32768000000000000000e5
-1702 3 1 30 0.32768000000000000000e5
-1702 3 2 31 -0.65536000000000000000e5
-1702 4 4 16 -0.65536000000000000000e5
-1702 4 6 18 -0.32768000000000000000e5
-1702 4 7 19 -0.65536000000000000000e5
-1703 1 1 48 -0.16384000000000000000e5
-1703 1 2 49 -0.16384000000000000000e5
-1703 1 5 52 0.65536000000000000000e5
-1703 1 11 42 0.65536000000000000000e5
-1703 1 12 43 0.13107200000000000000e6
-1703 1 17 48 -0.26214400000000000000e6
-1703 1 23 38 -0.16384000000000000000e5
-1703 1 26 41 0.32768000000000000000e5
-1703 1 28 43 0.65536000000000000000e5
-1703 2 2 32 -0.16384000000000000000e5
-1703 2 3 30 0.32768000000000000000e5
-1703 2 8 22 0.13107200000000000000e6
-1703 2 12 26 -0.65536000000000000000e5
-1703 2 16 30 -0.32768000000000000000e5
-1703 3 2 31 -0.65536000000000000000e5
-1703 3 14 27 -0.13107200000000000000e6
-1703 4 4 16 -0.13107200000000000000e6
-1703 4 6 18 -0.32768000000000000000e5
-1703 4 7 19 -0.65536000000000000000e5
-1704 2 3 31 0.32768000000000000000e5
-1704 2 12 26 -0.32768000000000000000e5
-1705 1 2 49 0.32768000000000000000e5
-1705 1 3 50 -0.65536000000000000000e5
-1705 1 23 38 0.32768000000000000000e5
-1705 1 24 39 0.32768000000000000000e5
-1705 2 3 32 0.32768000000000000000e5
-1706 1 1 48 -0.16384000000000000000e5
-1706 1 2 49 -0.16384000000000000000e5
-1706 1 5 52 0.65536000000000000000e5
-1706 1 11 42 0.65536000000000000000e5
-1706 1 12 43 0.13107200000000000000e6
-1706 1 17 48 -0.26214400000000000000e6
-1706 1 23 38 -0.16384000000000000000e5
-1706 1 26 41 0.32768000000000000000e5
-1706 1 28 43 0.65536000000000000000e5
-1706 2 2 32 -0.16384000000000000000e5
-1706 2 3 34 0.32768000000000000000e5
-1706 2 8 22 0.13107200000000000000e6
-1706 2 12 26 -0.65536000000000000000e5
-1706 2 16 30 -0.32768000000000000000e5
-1706 3 2 31 -0.65536000000000000000e5
-1706 3 14 27 -0.13107200000000000000e6
-1706 4 4 16 -0.13107200000000000000e6
-1706 4 7 19 -0.65536000000000000000e5
-1707 2 3 35 0.32768000000000000000e5
-1707 2 18 32 -0.32768000000000000000e5
-1708 2 3 5 -0.16384000000000000000e5
-1708 2 4 4 0.32768000000000000000e5
-1709 1 1 40 0.32768000000000000000e5
-1709 1 1 48 -0.32768000000000000000e5
-1709 1 2 49 -0.32768000000000000000e5
-1709 1 5 52 0.13107200000000000000e6
-1709 1 6 25 0.32768000000000000000e5
-1709 1 6 37 0.32768000000000000000e5
-1709 1 8 39 -0.13107200000000000000e6
-1709 1 10 25 -0.13107200000000000000e6
-1709 1 10 41 0.13107200000000000000e6
-1709 1 11 42 0.13107200000000000000e6
-1709 1 12 43 0.26214400000000000000e6
-1709 1 17 48 -0.52428800000000000000e6
-1709 1 23 38 -0.32768000000000000000e5
-1709 1 26 41 0.65536000000000000000e5
-1709 1 28 43 0.13107200000000000000e6
-1709 2 2 32 -0.32768000000000000000e5
-1709 2 4 5 0.32768000000000000000e5
-1709 2 4 18 -0.32768000000000000000e5
-1709 2 4 26 0.32768000000000000000e5
-1709 2 8 22 0.26214400000000000000e6
-1709 2 12 26 -0.13107200000000000000e6
-1709 2 16 30 -0.65536000000000000000e5
-1709 3 2 31 -0.13107200000000000000e6
-1709 3 4 17 -0.32768000000000000000e5
-1709 3 6 19 -0.65536000000000000000e5
-1709 3 8 21 0.13107200000000000000e6
-1709 3 14 27 -0.26214400000000000000e6
-1709 4 3 15 -0.65536000000000000000e5
-1709 4 4 4 -0.65536000000000000000e5
-1709 4 4 16 -0.26214400000000000000e6
-1709 4 6 18 -0.65536000000000000000e5
-1709 4 7 19 -0.13107200000000000000e6
-1710 2 2 8 -0.32768000000000000000e5
-1710 2 4 6 0.32768000000000000000e5
-1711 1 2 9 -0.32768000000000000000e5
-1711 1 2 17 -0.13107200000000000000e6
-1711 1 2 33 -0.13107200000000000000e6
-1711 1 3 18 -0.39321600000000000000e6
-1711 1 4 19 -0.26214400000000000000e6
-1711 1 4 35 -0.52428800000000000000e6
-1711 1 6 13 0.13107200000000000000e6
-1711 1 8 39 -0.32768000000000000000e5
-1711 1 10 25 -0.32768000000000000000e5
-1711 1 10 41 0.13107200000000000000e6
-1711 1 11 42 0.13107200000000000000e6
-1711 1 18 25 -0.26214400000000000000e6
-1711 1 20 27 0.52428800000000000000e6
-1711 1 28 35 0.26214400000000000000e6
-1711 2 2 8 -0.32768000000000000000e5
-1711 2 3 9 -0.32768000000000000000e5
-1711 2 4 7 0.32768000000000000000e5
-1711 2 4 10 -0.65536000000000000000e5
-1711 2 6 12 -0.13107200000000000000e6
-1711 2 8 22 0.13107200000000000000e6
-1711 2 9 23 -0.26214400000000000000e6
-1711 2 10 24 -0.26214400000000000000e6
-1711 3 2 15 0.26214400000000000000e6
-1711 3 3 8 -0.32768000000000000000e5
-1711 3 4 9 -0.32768000000000000000e5
-1711 3 5 10 0.13107200000000000000e6
-1711 3 6 19 -0.32768000000000000000e5
-1711 3 8 13 0.26214400000000000000e6
-1711 3 8 21 0.13107200000000000000e6
-1711 3 9 22 0.13107200000000000000e6
-1711 3 11 24 0.26214400000000000000e6
-1711 4 4 8 0.13107200000000000000e6
-1712 2 3 9 -0.32768000000000000000e5
-1712 2 4 8 0.32768000000000000000e5
-1713 1 3 18 -0.13107200000000000000e6
-1713 1 6 11 -0.32768000000000000000e5
-1713 1 6 13 -0.13107200000000000000e6
-1713 1 8 39 -0.32768000000000000000e5
-1713 1 10 17 0.26214400000000000000e6
-1713 1 10 25 -0.32768000000000000000e5
-1713 1 11 14 -0.13107200000000000000e6
-1713 2 3 9 -0.32768000000000000000e5
-1713 2 4 9 0.32768000000000000000e5
-1713 2 5 9 -0.32768000000000000000e5
-1713 2 5 11 -0.65536000000000000000e5
-1713 2 9 11 -0.13107200000000000000e6
-1713 3 3 8 -0.32768000000000000000e5
-1713 3 4 9 -0.32768000000000000000e5
-1713 3 6 19 -0.32768000000000000000e5
-1714 1 2 33 0.32768000000000000000e5
-1714 1 4 35 0.13107200000000000000e6
-1714 1 11 42 -0.32768000000000000000e5
-1714 1 18 25 0.65536000000000000000e5
-1714 1 28 35 -0.13107200000000000000e6
-1714 2 4 11 0.32768000000000000000e5
-1714 2 8 22 -0.32768000000000000000e5
-1714 2 9 23 0.65536000000000000000e5
-1714 3 9 22 -0.32768000000000000000e5
-1714 3 11 24 -0.13107200000000000000e6
-1714 4 4 8 -0.32768000000000000000e5
-1715 2 4 12 0.32768000000000000000e5
-1715 2 5 11 -0.32768000000000000000e5
-1716 1 2 17 -0.32768000000000000000e5
-1716 1 3 18 -0.32768000000000000000e5
-1716 1 4 19 -0.13107200000000000000e6
-1716 1 10 17 0.65536000000000000000e5
-1716 1 11 14 -0.32768000000000000000e5
-1716 1 20 27 0.13107200000000000000e6
-1716 1 28 35 -0.65536000000000000000e5
-1716 2 4 13 0.32768000000000000000e5
-1716 2 6 12 -0.32768000000000000000e5
-1716 2 9 11 -0.32768000000000000000e5
-1716 2 10 24 -0.65536000000000000000e5
-1716 3 2 15 0.65536000000000000000e5
-1716 3 8 13 0.65536000000000000000e5
-1716 3 11 24 -0.65536000000000000000e5
-1717 2 4 14 0.32768000000000000000e5
-1717 2 9 11 -0.32768000000000000000e5
-1718 2 4 15 0.32768000000000000000e5
-1718 2 8 14 -0.32768000000000000000e5
-1719 2 3 17 -0.32768000000000000000e5
-1719 2 4 16 0.32768000000000000000e5
-1720 1 3 26 0.32768000000000000000e5
-1720 1 6 37 -0.32768000000000000000e5
-1720 1 7 38 0.65536000000000000000e5
-1720 1 8 23 -0.65536000000000000000e5
-1720 2 4 17 0.32768000000000000000e5
-1720 2 4 26 -0.32768000000000000000e5
-1720 3 3 16 -0.32768000000000000000e5
-1720 3 6 19 -0.13107200000000000000e6
-1720 3 7 20 0.13107200000000000000e6
-1720 4 1 13 -0.32768000000000000000e5
-1720 4 2 14 -0.65536000000000000000e5
-1721 1 1 40 0.32768000000000000000e5
-1721 1 1 48 -0.32768000000000000000e5
-1721 1 2 49 -0.32768000000000000000e5
-1721 1 5 52 0.13107200000000000000e6
-1721 1 6 25 0.32768000000000000000e5
-1721 1 6 37 0.32768000000000000000e5
-1721 1 8 39 -0.13107200000000000000e6
-1721 1 10 25 -0.13107200000000000000e6
-1721 1 10 41 0.13107200000000000000e6
-1721 1 11 42 0.13107200000000000000e6
-1721 1 12 43 0.26214400000000000000e6
-1721 1 17 48 -0.52428800000000000000e6
-1721 1 23 38 -0.32768000000000000000e5
-1721 1 26 41 0.65536000000000000000e5
-1721 1 28 43 0.13107200000000000000e6
-1721 2 2 32 -0.32768000000000000000e5
-1721 2 4 18 -0.32768000000000000000e5
-1721 2 4 19 0.32768000000000000000e5
-1721 2 4 26 0.32768000000000000000e5
-1721 2 8 22 0.26214400000000000000e6
-1721 2 12 26 -0.13107200000000000000e6
-1721 2 16 30 -0.65536000000000000000e5
-1721 3 2 31 -0.13107200000000000000e6
-1721 3 4 17 -0.32768000000000000000e5
-1721 3 6 19 -0.65536000000000000000e5
-1721 3 8 21 0.13107200000000000000e6
-1721 3 14 27 -0.26214400000000000000e6
-1721 4 3 15 -0.65536000000000000000e5
-1721 4 4 16 -0.26214400000000000000e6
-1721 4 6 18 -0.65536000000000000000e5
-1721 4 7 19 -0.13107200000000000000e6
-1722 1 2 33 -0.65536000000000000000e5
-1722 1 5 52 0.65536000000000000000e5
-1722 1 7 38 0.32768000000000000000e5
-1722 1 8 23 -0.32768000000000000000e5
-1722 1 10 25 -0.32768000000000000000e5
-1722 1 10 41 0.65536000000000000000e5
-1722 1 11 42 0.65536000000000000000e5
-1722 1 12 43 0.13107200000000000000e6
-1722 1 17 48 -0.26214400000000000000e6
-1722 1 26 41 0.32768000000000000000e5
-1722 1 28 43 0.65536000000000000000e5
-1722 2 4 20 0.32768000000000000000e5
-1722 2 8 22 0.13107200000000000000e6
-1722 2 12 26 -0.65536000000000000000e5
-1722 2 16 30 -0.32768000000000000000e5
-1722 3 1 30 0.32768000000000000000e5
-1722 3 2 31 -0.65536000000000000000e5
-1722 3 6 19 -0.32768000000000000000e5
-1722 3 7 20 0.65536000000000000000e5
-1722 3 8 21 0.65536000000000000000e5
-1722 3 14 27 -0.13107200000000000000e6
-1722 4 2 14 -0.32768000000000000000e5
-1722 4 3 15 -0.32768000000000000000e5
-1722 4 4 16 -0.13107200000000000000e6
-1722 4 6 18 -0.32768000000000000000e5
-1722 4 7 19 -0.65536000000000000000e5
-1723 1 1 48 -0.16384000000000000000e5
-1723 1 2 49 -0.16384000000000000000e5
-1723 1 5 52 0.65536000000000000000e5
-1723 1 11 42 0.65536000000000000000e5
-1723 1 12 43 0.13107200000000000000e6
-1723 1 17 48 -0.26214400000000000000e6
-1723 1 23 38 -0.16384000000000000000e5
-1723 1 26 41 0.32768000000000000000e5
-1723 1 28 43 0.65536000000000000000e5
-1723 2 2 32 -0.16384000000000000000e5
-1723 2 4 21 0.32768000000000000000e5
-1723 2 8 22 0.13107200000000000000e6
-1723 2 12 26 -0.65536000000000000000e5
-1723 2 16 30 -0.32768000000000000000e5
-1723 3 2 31 -0.65536000000000000000e5
-1723 3 14 27 -0.13107200000000000000e6
-1723 4 3 15 -0.32768000000000000000e5
-1723 4 4 16 -0.13107200000000000000e6
-1723 4 6 18 -0.32768000000000000000e5
-1723 4 7 19 -0.65536000000000000000e5
-1724 1 1 48 -0.16384000000000000000e5
-1724 1 2 49 -0.16384000000000000000e5
-1724 1 4 35 -0.13107200000000000000e6
-1724 1 5 52 0.65536000000000000000e5
-1724 1 6 29 0.32768000000000000000e5
-1724 1 8 39 -0.32768000000000000000e5
-1724 1 10 41 0.13107200000000000000e6
-1724 1 11 42 0.13107200000000000000e6
-1724 1 12 43 0.13107200000000000000e6
-1724 1 17 48 -0.26214400000000000000e6
-1724 1 23 38 -0.16384000000000000000e5
-1724 1 26 41 0.32768000000000000000e5
-1724 1 28 43 0.65536000000000000000e5
-1724 2 2 32 -0.16384000000000000000e5
-1724 2 4 22 0.32768000000000000000e5
-1724 2 8 22 0.19660800000000000000e6
-1724 2 12 26 -0.65536000000000000000e5
-1724 2 16 30 -0.32768000000000000000e5
-1724 3 2 31 -0.65536000000000000000e5
-1724 3 6 19 -0.32768000000000000000e5
-1724 3 8 21 0.13107200000000000000e6
-1724 3 9 22 0.65536000000000000000e5
-1724 3 14 27 -0.13107200000000000000e6
-1724 4 3 15 -0.32768000000000000000e5
-1724 4 4 16 -0.13107200000000000000e6
-1724 4 6 18 -0.32768000000000000000e5
-1724 4 7 19 -0.65536000000000000000e5
-1725 1 2 33 0.32768000000000000000e5
-1725 1 4 35 0.13107200000000000000e6
-1725 1 11 42 -0.32768000000000000000e5
-1725 1 18 25 0.65536000000000000000e5
-1725 1 28 35 -0.13107200000000000000e6
-1725 2 4 23 0.32768000000000000000e5
-1725 2 8 22 -0.32768000000000000000e5
-1725 2 9 23 0.65536000000000000000e5
-1725 3 9 22 -0.32768000000000000000e5
-1725 3 11 24 -0.13107200000000000000e6
-1726 2 4 24 0.32768000000000000000e5
-1726 2 8 22 -0.32768000000000000000e5
-1727 2 4 25 0.32768000000000000000e5
-1727 2 9 23 -0.32768000000000000000e5
-1728 1 3 26 -0.32768000000000000000e5
-1728 1 6 37 0.32768000000000000000e5
-1728 1 9 40 0.65536000000000000000e5
-1728 1 10 25 -0.65536000000000000000e5
-1728 2 4 18 -0.32768000000000000000e5
-1728 2 4 27 0.32768000000000000000e5
-1728 3 4 17 -0.32768000000000000000e5
-1728 3 5 18 -0.32768000000000000000e5
-1728 3 6 19 -0.65536000000000000000e5
-1728 3 8 21 0.13107200000000000000e6
-1728 4 3 15 -0.65536000000000000000e5
-1729 2 4 28 0.32768000000000000000e5
-1729 2 5 27 -0.32768000000000000000e5
-1730 1 1 48 -0.16384000000000000000e5
-1730 1 2 49 -0.16384000000000000000e5
-1730 1 5 52 0.65536000000000000000e5
-1730 1 11 42 0.65536000000000000000e5
-1730 1 12 43 0.13107200000000000000e6
-1730 1 17 48 -0.26214400000000000000e6
-1730 1 23 38 -0.16384000000000000000e5
-1730 1 26 41 0.32768000000000000000e5
-1730 1 28 43 0.65536000000000000000e5
-1730 2 2 32 -0.16384000000000000000e5
-1730 2 4 29 0.32768000000000000000e5
-1730 2 8 22 0.13107200000000000000e6
-1730 2 12 26 -0.65536000000000000000e5
-1730 2 16 30 -0.32768000000000000000e5
-1730 3 2 31 -0.65536000000000000000e5
-1730 3 14 27 -0.13107200000000000000e6
-1730 4 4 16 -0.13107200000000000000e6
-1730 4 6 18 -0.32768000000000000000e5
-1730 4 7 19 -0.65536000000000000000e5
-1731 1 1 48 -0.16384000000000000000e5
-1731 1 2 49 -0.16384000000000000000e5
-1731 1 5 52 0.65536000000000000000e5
-1731 1 8 39 -0.32768000000000000000e5
-1731 1 10 41 0.13107200000000000000e6
-1731 1 11 42 0.13107200000000000000e6
-1731 1 12 43 0.13107200000000000000e6
-1731 1 17 48 -0.39321600000000000000e6
-1731 1 23 38 -0.16384000000000000000e5
-1731 1 26 29 0.32768000000000000000e5
-1731 1 26 41 0.32768000000000000000e5
-1731 1 28 43 0.65536000000000000000e5
-1731 2 2 32 -0.16384000000000000000e5
-1731 2 4 30 0.32768000000000000000e5
-1731 2 8 22 0.19660800000000000000e6
-1731 2 12 26 -0.65536000000000000000e5
-1731 2 16 30 -0.32768000000000000000e5
-1731 3 2 31 -0.65536000000000000000e5
-1731 3 14 27 -0.26214400000000000000e6
-1731 4 4 16 -0.19660800000000000000e6
-1731 4 6 18 -0.32768000000000000000e5
-1731 4 7 19 -0.65536000000000000000e5
-1732 2 4 31 0.32768000000000000000e5
-1732 2 8 22 -0.32768000000000000000e5
-1732 4 4 16 0.32768000000000000000e5
-1733 2 3 33 -0.32768000000000000000e5
-1733 2 4 32 0.32768000000000000000e5
-1734 1 1 48 -0.32768000000000000000e5
-1734 1 2 49 -0.65536000000000000000e5
-1734 1 3 50 -0.65536000000000000000e5
-1734 1 11 42 0.13107200000000000000e6
-1734 1 12 43 0.26214400000000000000e6
-1734 1 17 48 -0.26214400000000000000e6
-1734 1 23 38 -0.32768000000000000000e5
-1734 1 25 40 0.32768000000000000000e5
-1734 1 26 41 -0.65536000000000000000e5
-1734 2 2 32 -0.32768000000000000000e5
-1734 2 3 33 -0.32768000000000000000e5
-1734 2 4 33 0.32768000000000000000e5
-1734 2 8 22 0.13107200000000000000e6
-1734 2 12 26 -0.13107200000000000000e6
-1734 2 16 30 -0.65536000000000000000e5
-1734 3 2 31 -0.13107200000000000000e6
-1734 3 14 27 -0.26214400000000000000e6
-1734 4 4 16 -0.13107200000000000000e6
-1735 1 1 48 -0.32768000000000000000e5
-1735 1 2 49 -0.65536000000000000000e5
-1735 1 3 50 -0.65536000000000000000e5
-1735 1 6 53 0.32768000000000000000e5
-1735 1 11 42 0.13107200000000000000e6
-1735 1 12 43 0.26214400000000000000e6
-1735 1 17 48 -0.26214400000000000000e6
-1735 1 23 38 -0.32768000000000000000e5
-1735 1 26 41 -0.65536000000000000000e5
-1735 2 2 32 -0.32768000000000000000e5
-1735 2 4 35 0.32768000000000000000e5
-1735 2 8 22 0.13107200000000000000e6
-1735 2 12 26 -0.13107200000000000000e6
-1735 2 16 30 -0.65536000000000000000e5
-1735 2 18 32 -0.32768000000000000000e5
-1735 3 2 31 -0.13107200000000000000e6
-1735 3 3 32 0.32768000000000000000e5
-1735 3 14 27 -0.26214400000000000000e6
-1735 3 17 30 -0.65536000000000000000e5
-1735 3 22 27 0.65536000000000000000e5
-1735 4 4 16 -0.13107200000000000000e6
-1736 1 2 9 -0.32768000000000000000e5
-1736 1 2 17 -0.13107200000000000000e6
-1736 1 2 33 -0.13107200000000000000e6
-1736 1 3 18 -0.39321600000000000000e6
-1736 1 4 19 -0.26214400000000000000e6
-1736 1 4 35 -0.52428800000000000000e6
-1736 1 6 13 0.13107200000000000000e6
-1736 1 8 39 -0.32768000000000000000e5
-1736 1 10 25 -0.32768000000000000000e5
-1736 1 10 41 0.13107200000000000000e6
-1736 1 11 42 0.13107200000000000000e6
-1736 1 18 25 -0.26214400000000000000e6
-1736 1 20 27 0.52428800000000000000e6
-1736 1 28 35 0.26214400000000000000e6
-1736 2 2 8 -0.32768000000000000000e5
-1736 2 3 9 -0.32768000000000000000e5
-1736 2 4 10 -0.65536000000000000000e5
-1736 2 5 6 0.32768000000000000000e5
-1736 2 6 12 -0.13107200000000000000e6
-1736 2 8 22 0.13107200000000000000e6
-1736 2 9 23 -0.26214400000000000000e6
-1736 2 10 24 -0.26214400000000000000e6
-1736 3 2 15 0.26214400000000000000e6
-1736 3 3 8 -0.32768000000000000000e5
-1736 3 4 9 -0.32768000000000000000e5
-1736 3 5 10 0.13107200000000000000e6
-1736 3 6 19 -0.32768000000000000000e5
-1736 3 8 13 0.26214400000000000000e6
-1736 3 8 21 0.13107200000000000000e6
-1736 3 9 22 0.13107200000000000000e6
-1736 3 11 24 0.26214400000000000000e6
-1736 4 4 8 0.13107200000000000000e6
-1737 2 3 9 -0.32768000000000000000e5
-1737 2 5 7 0.32768000000000000000e5
-1738 1 3 18 -0.13107200000000000000e6
-1738 1 6 11 -0.32768000000000000000e5
-1738 1 6 13 -0.13107200000000000000e6
-1738 1 8 39 -0.32768000000000000000e5
-1738 1 10 17 0.26214400000000000000e6
-1738 1 10 25 -0.32768000000000000000e5
-1738 1 11 14 -0.13107200000000000000e6
-1738 2 3 9 -0.32768000000000000000e5
-1738 2 5 8 0.32768000000000000000e5
-1738 2 5 9 -0.32768000000000000000e5
-1738 2 5 11 -0.65536000000000000000e5
-1738 2 9 11 -0.13107200000000000000e6
-1738 3 3 8 -0.32768000000000000000e5
-1738 3 4 9 -0.32768000000000000000e5
-1738 3 6 19 -0.32768000000000000000e5
-1739 1 2 33 0.32768000000000000000e5
-1739 1 4 35 0.13107200000000000000e6
-1739 1 11 42 -0.32768000000000000000e5
-1739 1 18 25 0.65536000000000000000e5
-1739 1 28 35 -0.13107200000000000000e6
-1739 2 5 10 0.32768000000000000000e5
-1739 2 8 22 -0.32768000000000000000e5
-1739 2 9 23 0.65536000000000000000e5
-1739 3 9 22 -0.32768000000000000000e5
-1739 3 11 24 -0.13107200000000000000e6
-1739 4 4 8 -0.32768000000000000000e5
-1740 2 5 12 0.32768000000000000000e5
-1740 2 9 9 -0.65536000000000000000e5
-1741 2 5 13 0.32768000000000000000e5
-1741 2 9 11 -0.32768000000000000000e5
-1742 2 5 14 0.32768000000000000000e5
-1742 2 9 12 -0.32768000000000000000e5
-1743 1 4 19 0.32768000000000000000e5
-1743 1 5 20 0.65536000000000000000e5
-1743 1 6 21 0.65536000000000000000e5
-1743 1 10 17 0.65536000000000000000e5
-1743 1 10 21 -0.13107200000000000000e6
-1743 1 11 18 0.32768000000000000000e5
-1743 2 5 15 0.32768000000000000000e5
-1743 2 8 14 0.32768000000000000000e5
-1743 2 9 15 0.65536000000000000000e5
-1744 1 3 26 0.32768000000000000000e5
-1744 1 6 37 -0.32768000000000000000e5
-1744 1 7 38 0.65536000000000000000e5
-1744 1 8 23 -0.65536000000000000000e5
-1744 2 4 26 -0.32768000000000000000e5
-1744 2 5 16 0.32768000000000000000e5
-1744 3 3 16 -0.32768000000000000000e5
-1744 3 6 19 -0.13107200000000000000e6
-1744 3 7 20 0.13107200000000000000e6
-1744 4 1 13 -0.32768000000000000000e5
-1744 4 2 14 -0.65536000000000000000e5
-1745 2 4 18 -0.32768000000000000000e5
-1745 2 5 17 0.32768000000000000000e5
-1746 1 1 40 0.32768000000000000000e5
-1746 1 1 48 -0.32768000000000000000e5
-1746 1 2 49 -0.32768000000000000000e5
-1746 1 5 52 0.13107200000000000000e6
-1746 1 6 25 0.32768000000000000000e5
-1746 1 6 37 0.32768000000000000000e5
-1746 1 8 39 -0.13107200000000000000e6
-1746 1 10 25 -0.13107200000000000000e6
-1746 1 10 41 0.13107200000000000000e6
-1746 1 11 42 0.13107200000000000000e6
-1746 1 12 43 0.26214400000000000000e6
-1746 1 17 48 -0.52428800000000000000e6
-1746 1 23 38 -0.32768000000000000000e5
-1746 1 26 41 0.65536000000000000000e5
-1746 1 28 43 0.13107200000000000000e6
-1746 2 2 32 -0.32768000000000000000e5
-1746 2 4 18 -0.32768000000000000000e5
-1746 2 4 26 0.32768000000000000000e5
-1746 2 5 18 0.32768000000000000000e5
-1746 2 8 22 0.26214400000000000000e6
-1746 2 12 26 -0.13107200000000000000e6
-1746 2 16 30 -0.65536000000000000000e5
-1746 3 2 31 -0.13107200000000000000e6
-1746 3 4 17 -0.32768000000000000000e5
-1746 3 6 19 -0.65536000000000000000e5
-1746 3 8 21 0.13107200000000000000e6
-1746 3 14 27 -0.26214400000000000000e6
-1746 4 3 15 -0.65536000000000000000e5
-1746 4 4 16 -0.26214400000000000000e6
-1746 4 6 18 -0.65536000000000000000e5
-1746 4 7 19 -0.13107200000000000000e6
-1747 1 1 48 -0.16384000000000000000e5
-1747 1 2 49 -0.16384000000000000000e5
-1747 1 5 52 0.65536000000000000000e5
-1747 1 11 42 0.65536000000000000000e5
-1747 1 12 43 0.13107200000000000000e6
-1747 1 17 48 -0.26214400000000000000e6
-1747 1 23 38 -0.16384000000000000000e5
-1747 1 26 41 0.32768000000000000000e5
-1747 1 28 43 0.65536000000000000000e5
-1747 2 2 32 -0.16384000000000000000e5
-1747 2 5 20 0.32768000000000000000e5
-1747 2 8 22 0.13107200000000000000e6
-1747 2 12 26 -0.65536000000000000000e5
-1747 2 16 30 -0.32768000000000000000e5
-1747 3 2 31 -0.65536000000000000000e5
-1747 3 14 27 -0.13107200000000000000e6
-1747 4 3 15 -0.32768000000000000000e5
-1747 4 4 16 -0.13107200000000000000e6
-1747 4 6 18 -0.32768000000000000000e5
-1747 4 7 19 -0.65536000000000000000e5
-1748 1 1 48 -0.16384000000000000000e5
-1748 1 2 49 -0.16384000000000000000e5
-1748 1 4 35 -0.13107200000000000000e6
-1748 1 5 52 0.65536000000000000000e5
-1748 1 6 29 0.32768000000000000000e5
-1748 1 8 39 -0.32768000000000000000e5
-1748 1 10 41 0.13107200000000000000e6
-1748 1 11 42 0.13107200000000000000e6
-1748 1 12 43 0.13107200000000000000e6
-1748 1 17 48 -0.26214400000000000000e6
-1748 1 23 38 -0.16384000000000000000e5
-1748 1 26 41 0.32768000000000000000e5
-1748 1 28 43 0.65536000000000000000e5
-1748 2 2 32 -0.16384000000000000000e5
-1748 2 5 21 0.32768000000000000000e5
-1748 2 8 22 0.19660800000000000000e6
-1748 2 12 26 -0.65536000000000000000e5
-1748 2 16 30 -0.32768000000000000000e5
-1748 3 2 31 -0.65536000000000000000e5
-1748 3 6 19 -0.32768000000000000000e5
-1748 3 8 21 0.13107200000000000000e6
-1748 3 9 22 0.65536000000000000000e5
-1748 3 14 27 -0.13107200000000000000e6
-1748 4 3 15 -0.32768000000000000000e5
-1748 4 4 16 -0.13107200000000000000e6
-1748 4 6 18 -0.32768000000000000000e5
-1748 4 7 19 -0.65536000000000000000e5
-1749 1 6 29 0.32768000000000000000e5
-1749 1 10 25 0.32768000000000000000e5
-1749 1 11 26 0.32768000000000000000e5
-1749 1 11 42 -0.65536000000000000000e5
-1749 2 5 22 0.32768000000000000000e5
-1749 3 9 22 -0.65536000000000000000e5
-1750 2 5 23 0.32768000000000000000e5
-1750 2 8 22 -0.32768000000000000000e5
-1751 1 4 35 0.65536000000000000000e5
-1751 1 10 41 -0.32768000000000000000e5
-1751 1 11 30 0.32768000000000000000e5
-1751 1 18 25 -0.65536000000000000000e5
-1751 2 5 24 0.32768000000000000000e5
-1751 2 8 22 -0.32768000000000000000e5
-1751 3 8 21 -0.32768000000000000000e5
-1752 1 4 35 0.32768000000000000000e5
-1752 1 5 36 -0.65536000000000000000e5
-1752 1 15 30 0.32768000000000000000e5
-1752 1 18 25 0.32768000000000000000e5
-1752 2 5 25 0.32768000000000000000e5
-1753 1 3 26 -0.32768000000000000000e5
-1753 1 6 37 0.32768000000000000000e5
-1753 1 9 40 0.65536000000000000000e5
-1753 1 10 25 -0.65536000000000000000e5
-1753 2 4 18 -0.32768000000000000000e5
-1753 2 5 26 0.32768000000000000000e5
-1753 3 4 17 -0.32768000000000000000e5
-1753 3 5 18 -0.32768000000000000000e5
-1753 3 6 19 -0.65536000000000000000e5
-1753 3 8 21 0.13107200000000000000e6
-1753 4 3 15 -0.65536000000000000000e5
-1754 2 5 28 0.32768000000000000000e5
-1754 2 19 19 -0.65536000000000000000e5
-1755 1 1 48 -0.16384000000000000000e5
-1755 1 2 49 -0.16384000000000000000e5
-1755 1 5 52 0.65536000000000000000e5
-1755 1 8 39 -0.32768000000000000000e5
-1755 1 10 41 0.13107200000000000000e6
-1755 1 11 42 0.13107200000000000000e6
-1755 1 12 43 0.13107200000000000000e6
-1755 1 17 48 -0.39321600000000000000e6
-1755 1 23 38 -0.16384000000000000000e5
-1755 1 26 29 0.32768000000000000000e5
-1755 1 26 41 0.32768000000000000000e5
-1755 1 28 43 0.65536000000000000000e5
-1755 2 2 32 -0.16384000000000000000e5
-1755 2 5 29 0.32768000000000000000e5
-1755 2 8 22 0.19660800000000000000e6
-1755 2 12 26 -0.65536000000000000000e5
-1755 2 16 30 -0.32768000000000000000e5
-1755 3 2 31 -0.65536000000000000000e5
-1755 3 14 27 -0.26214400000000000000e6
-1755 4 4 16 -0.19660800000000000000e6
-1755 4 6 18 -0.32768000000000000000e5
-1755 4 7 19 -0.65536000000000000000e5
-1756 1 6 43 0.32768000000000000000e5
-1756 1 9 40 0.32768000000000000000e5
-1756 1 11 42 -0.65536000000000000000e5
-1756 1 26 29 0.32768000000000000000e5
-1756 2 5 30 0.32768000000000000000e5
-1757 1 10 41 -0.32768000000000000000e5
-1757 1 17 48 0.65536000000000000000e5
-1757 1 18 25 -0.65536000000000000000e5
-1757 1 26 33 0.32768000000000000000e5
-1757 2 5 31 0.32768000000000000000e5
-1757 2 8 22 -0.32768000000000000000e5
-1757 3 14 19 0.65536000000000000000e5
-1757 3 14 27 0.65536000000000000000e5
-1757 4 4 16 0.32768000000000000000e5
-1758 1 1 48 -0.32768000000000000000e5
-1758 1 2 49 -0.65536000000000000000e5
-1758 1 3 50 -0.65536000000000000000e5
-1758 1 11 42 0.13107200000000000000e6
-1758 1 12 43 0.26214400000000000000e6
-1758 1 17 48 -0.26214400000000000000e6
-1758 1 23 38 -0.32768000000000000000e5
-1758 1 25 40 0.32768000000000000000e5
-1758 1 26 41 -0.65536000000000000000e5
-1758 2 2 32 -0.32768000000000000000e5
-1758 2 3 33 -0.32768000000000000000e5
-1758 2 5 32 0.32768000000000000000e5
-1758 2 8 22 0.13107200000000000000e6
-1758 2 12 26 -0.13107200000000000000e6
-1758 2 16 30 -0.65536000000000000000e5
-1758 3 2 31 -0.13107200000000000000e6
-1758 3 14 27 -0.26214400000000000000e6
-1758 4 4 16 -0.13107200000000000000e6
-1759 1 1 48 -0.65536000000000000000e5
-1759 1 2 49 -0.98304000000000000000e5
-1759 1 3 50 -0.13107200000000000000e6
-1759 1 6 49 0.32768000000000000000e5
-1759 1 11 42 0.26214400000000000000e6
-1759 1 12 43 0.52428800000000000000e6
-1759 1 17 48 -0.52428800000000000000e6
-1759 1 23 38 -0.65536000000000000000e5
-1759 1 24 39 -0.32768000000000000000e5
-1759 1 25 40 0.32768000000000000000e5
-1759 1 26 41 0.65536000000000000000e5
-1759 1 28 43 -0.13107200000000000000e6
-1759 2 2 32 -0.65536000000000000000e5
-1759 2 3 33 -0.32768000000000000000e5
-1759 2 4 34 0.65536000000000000000e5
-1759 2 5 33 0.32768000000000000000e5
-1759 2 8 22 0.26214400000000000000e6
-1759 2 12 26 -0.26214400000000000000e6
-1759 2 16 30 -0.13107200000000000000e6
-1759 3 2 31 -0.26214400000000000000e6
-1759 3 14 27 -0.52428800000000000000e6
-1759 4 4 16 -0.26214400000000000000e6
-1760 2 5 34 0.32768000000000000000e5
-1760 2 22 28 -0.32768000000000000000e5
-1761 1 1 8 0.81920000000000000000e4
-1761 1 1 12 0.16384000000000000000e5
-1761 1 1 16 -0.32768000000000000000e5
-1761 1 1 40 0.40960000000000000000e4
-1761 1 2 5 -0.40960000000000000000e4
-1761 1 2 9 0.16384000000000000000e5
-1761 1 2 33 0.16384000000000000000e5
-1761 1 3 34 -0.32768000000000000000e5
-1761 1 7 22 -0.81920000000000000000e4
-1761 1 7 38 0.81920000000000000000e4
-1761 1 8 23 -0.24576000000000000000e5
-1761 1 10 41 0.16384000000000000000e5
-1761 1 12 27 0.32768000000000000000e5
-1761 2 1 3 0.40960000000000000000e4
-1761 2 2 16 -0.40960000000000000000e4
-1761 2 6 6 0.32768000000000000000e5
-1761 2 6 20 -0.16384000000000000000e5
-1761 2 7 21 0.16384000000000000000e5
-1761 3 1 2 0.40960000000000000000e4
-1761 3 3 16 -0.40960000000000000000e4
-1761 3 4 17 -0.40960000000000000000e4
-1761 3 6 7 0.16384000000000000000e5
-1761 3 6 19 -0.81920000000000000000e4
-1761 3 7 20 0.16384000000000000000e5
-1761 3 8 21 0.16384000000000000000e5
-1761 4 1 5 0.81920000000000000000e4
-1761 4 1 13 -0.40960000000000000000e4
-1761 4 2 2 -0.81920000000000000000e4
-1761 4 2 14 -0.81920000000000000000e4
-1762 2 6 7 0.32768000000000000000e5
-1762 2 6 20 -0.32768000000000000000e5
-1762 4 5 5 -0.65536000000000000000e5
-1763 1 1 32 0.32768000000000000000e5
-1763 1 2 17 -0.13107200000000000000e6
-1763 1 3 18 -0.65536000000000000000e5
-1763 1 4 19 -0.13107200000000000000e6
-1763 1 10 41 -0.32768000000000000000e5
-1763 1 20 27 0.26214400000000000000e6
-1763 1 28 35 -0.13107200000000000000e6
-1763 2 4 10 -0.32768000000000000000e5
-1763 2 6 8 0.32768000000000000000e5
-1763 2 6 12 -0.65536000000000000000e5
-1763 2 10 24 -0.13107200000000000000e6
-1763 3 2 15 0.13107200000000000000e6
-1763 3 5 10 -0.32768000000000000000e5
-1763 3 6 7 0.32768000000000000000e5
-1763 3 8 13 0.13107200000000000000e6
-1763 3 8 21 -0.32768000000000000000e5
-1763 3 11 24 -0.13107200000000000000e6
-1764 2 4 10 -0.32768000000000000000e5
-1764 2 6 9 0.32768000000000000000e5
-1765 1 1 8 0.81920000000000000000e4
-1765 1 1 16 0.32768000000000000000e5
-1765 1 1 40 0.40960000000000000000e4
-1765 1 2 5 -0.40960000000000000000e4
-1765 1 2 9 0.16384000000000000000e5
-1765 1 3 18 -0.65536000000000000000e5
-1765 1 3 34 -0.32768000000000000000e5
-1765 1 4 19 -0.65536000000000000000e5
-1765 1 4 35 -0.65536000000000000000e5
-1765 1 6 13 0.16384000000000000000e5
-1765 1 7 16 -0.65536000000000000000e5
-1765 1 7 22 -0.81920000000000000000e4
-1765 1 7 38 0.81920000000000000000e4
-1765 1 8 23 -0.24576000000000000000e5
-1765 1 10 41 0.16384000000000000000e5
-1765 1 11 42 0.16384000000000000000e5
-1765 1 12 27 0.32768000000000000000e5
-1765 1 18 25 -0.32768000000000000000e5
-1765 1 20 27 0.13107200000000000000e6
-1765 2 1 3 0.40960000000000000000e4
-1765 2 2 16 -0.40960000000000000000e4
-1765 2 4 10 -0.16384000000000000000e5
-1765 2 6 10 0.32768000000000000000e5
-1765 2 6 12 -0.32768000000000000000e5
-1765 2 7 21 0.16384000000000000000e5
-1765 2 8 22 0.16384000000000000000e5
-1765 2 9 23 -0.32768000000000000000e5
-1765 2 10 24 -0.65536000000000000000e5
-1765 3 1 2 0.40960000000000000000e4
-1765 3 2 15 0.65536000000000000000e5
-1765 3 3 16 -0.40960000000000000000e4
-1765 3 4 17 -0.40960000000000000000e4
-1765 3 6 7 0.16384000000000000000e5
-1765 3 6 19 -0.81920000000000000000e4
-1765 3 7 20 0.16384000000000000000e5
-1765 3 8 13 0.65536000000000000000e5
-1765 3 8 21 0.16384000000000000000e5
-1765 3 9 22 0.16384000000000000000e5
-1765 4 1 5 0.81920000000000000000e4
-1765 4 1 13 -0.40960000000000000000e4
-1765 4 2 2 -0.81920000000000000000e4
-1765 4 2 14 -0.81920000000000000000e4
-1765 4 4 8 0.16384000000000000000e5
-1765 4 5 5 0.32768000000000000000e5
-1766 1 1 8 0.81920000000000000000e4
-1766 1 1 40 0.40960000000000000000e4
-1766 1 2 5 -0.40960000000000000000e4
-1766 1 2 9 0.16384000000000000000e5
-1766 1 2 17 -0.32768000000000000000e5
-1766 1 3 18 -0.98304000000000000000e5
-1766 1 3 34 -0.32768000000000000000e5
-1766 1 4 19 -0.13107200000000000000e6
-1766 1 4 35 -0.65536000000000000000e5
-1766 1 6 13 0.16384000000000000000e5
-1766 1 7 22 -0.81920000000000000000e4
-1766 1 7 38 0.81920000000000000000e4
-1766 1 8 23 -0.24576000000000000000e5
-1766 1 10 41 0.16384000000000000000e5
-1766 1 11 42 0.16384000000000000000e5
-1766 1 12 27 0.32768000000000000000e5
-1766 1 13 16 -0.13107200000000000000e6
-1766 1 18 25 -0.32768000000000000000e5
-1766 1 20 27 0.39321600000000000000e6
-1766 1 28 35 -0.13107200000000000000e6
-1766 2 1 3 0.40960000000000000000e4
-1766 2 2 16 -0.40960000000000000000e4
-1766 2 4 10 -0.16384000000000000000e5
-1766 2 6 11 0.32768000000000000000e5
-1766 2 6 12 -0.65536000000000000000e5
-1766 2 7 13 0.65536000000000000000e5
-1766 2 7 21 0.16384000000000000000e5
-1766 2 8 22 0.16384000000000000000e5
-1766 2 9 23 -0.32768000000000000000e5
-1766 2 10 24 -0.19660800000000000000e6
-1766 3 1 2 0.40960000000000000000e4
-1766 3 2 15 0.19660800000000000000e6
-1766 3 3 16 -0.40960000000000000000e4
-1766 3 4 17 -0.40960000000000000000e4
-1766 3 6 7 0.16384000000000000000e5
-1766 3 6 19 -0.81920000000000000000e4
-1766 3 7 20 0.16384000000000000000e5
-1766 3 8 13 0.19660800000000000000e6
-1766 3 8 21 0.16384000000000000000e5
-1766 3 9 22 0.16384000000000000000e5
-1766 3 11 24 -0.13107200000000000000e6
-1766 4 1 5 0.81920000000000000000e4
-1766 4 1 13 -0.40960000000000000000e4
-1766 4 2 2 -0.81920000000000000000e4
-1766 4 2 14 -0.81920000000000000000e4
-1766 4 4 8 0.16384000000000000000e5
-1766 4 5 5 0.32768000000000000000e5
-1767 2 1 15 -0.32768000000000000000e5
-1767 2 6 13 0.32768000000000000000e5
-1768 2 6 14 0.32768000000000000000e5
-1768 2 7 13 -0.32768000000000000000e5
-1769 1 4 19 -0.16384000000000000000e5
-1769 1 7 16 0.16384000000000000000e5
-1769 1 10 17 0.16384000000000000000e5
-1769 1 12 19 -0.65536000000000000000e5
-1769 1 13 16 0.65536000000000000000e5
-1769 1 20 27 0.32768000000000000000e5
-1769 1 28 35 -0.16384000000000000000e5
-1769 2 1 15 0.16384000000000000000e5
-1769 2 6 15 0.32768000000000000000e5
-1769 2 7 13 -0.16384000000000000000e5
-1769 3 2 15 0.16384000000000000000e5
-1769 3 8 13 0.16384000000000000000e5
-1769 3 11 24 -0.16384000000000000000e5
-1769 4 6 10 0.16384000000000000000e5
-1770 2 1 7 -0.32768000000000000000e5
-1770 2 6 16 0.32768000000000000000e5
-1770 4 1 5 0.32768000000000000000e5
-1771 1 1 32 -0.13107200000000000000e6
-1771 1 1 48 0.16384000000000000000e5
-1771 1 2 33 0.65536000000000000000e5
-1771 1 2 49 0.16384000000000000000e5
-1771 1 3 34 -0.13107200000000000000e6
-1771 1 7 22 -0.32768000000000000000e5
-1771 1 7 38 0.32768000000000000000e5
-1771 1 8 23 -0.32768000000000000000e5
-1771 1 10 41 0.65536000000000000000e5
-1771 1 12 27 0.13107200000000000000e6
-1771 1 23 38 0.16384000000000000000e5
-1771 2 1 7 -0.32768000000000000000e5
-1771 2 2 32 0.16384000000000000000e5
-1771 2 6 17 0.32768000000000000000e5
-1771 2 6 20 -0.65536000000000000000e5
-1771 2 7 21 0.65536000000000000000e5
-1771 3 1 30 0.32768000000000000000e5
-1771 3 6 19 -0.32768000000000000000e5
-1771 3 7 20 0.65536000000000000000e5
-1771 3 8 21 0.65536000000000000000e5
-1771 4 1 5 0.32768000000000000000e5
-1771 4 2 14 -0.32768000000000000000e5
-1772 1 1 48 0.16384000000000000000e5
-1772 1 2 33 0.65536000000000000000e5
-1772 1 2 49 0.16384000000000000000e5
-1772 1 3 34 -0.13107200000000000000e6
-1772 1 7 38 0.32768000000000000000e5
-1772 1 8 39 0.32768000000000000000e5
-1772 1 10 41 0.65536000000000000000e5
-1772 1 23 38 0.16384000000000000000e5
-1772 2 2 32 0.16384000000000000000e5
-1772 2 6 18 0.32768000000000000000e5
-1772 2 7 21 0.65536000000000000000e5
-1772 3 1 30 0.32768000000000000000e5
-1772 3 7 20 0.65536000000000000000e5
-1772 3 8 21 0.65536000000000000000e5
-1772 4 2 14 -0.32768000000000000000e5
-1773 1 2 33 -0.65536000000000000000e5
-1773 1 5 52 0.65536000000000000000e5
-1773 1 7 38 0.32768000000000000000e5
-1773 1 8 23 -0.32768000000000000000e5
-1773 1 10 25 -0.32768000000000000000e5
-1773 1 10 41 0.65536000000000000000e5
-1773 1 11 42 0.65536000000000000000e5
-1773 1 12 43 0.13107200000000000000e6
-1773 1 17 48 -0.26214400000000000000e6
-1773 1 26 41 0.32768000000000000000e5
-1773 1 28 43 0.65536000000000000000e5
-1773 2 6 19 0.32768000000000000000e5
-1773 2 8 22 0.13107200000000000000e6
-1773 2 12 26 -0.65536000000000000000e5
-1773 2 16 30 -0.32768000000000000000e5
-1773 3 1 30 0.32768000000000000000e5
-1773 3 2 31 -0.65536000000000000000e5
-1773 3 6 19 -0.32768000000000000000e5
-1773 3 7 20 0.65536000000000000000e5
-1773 3 8 21 0.65536000000000000000e5
-1773 3 14 27 -0.13107200000000000000e6
-1773 4 2 14 -0.32768000000000000000e5
-1773 4 3 15 -0.32768000000000000000e5
-1773 4 4 16 -0.13107200000000000000e6
-1773 4 6 18 -0.32768000000000000000e5
-1773 4 7 19 -0.65536000000000000000e5
-1774 1 1 32 0.32768000000000000000e5
-1774 1 2 17 -0.65536000000000000000e5
-1774 1 3 34 0.65536000000000000000e5
-1774 1 10 41 -0.32768000000000000000e5
-1774 2 6 21 0.32768000000000000000e5
-1774 2 7 21 -0.32768000000000000000e5
-1774 3 1 14 0.65536000000000000000e5
-1774 3 8 21 -0.32768000000000000000e5
-1775 2 6 22 0.32768000000000000000e5
-1775 2 7 21 -0.32768000000000000000e5
-1776 1 2 17 0.32768000000000000000e5
-1776 1 3 34 0.32768000000000000000e5
-1776 1 12 27 0.32768000000000000000e5
-1776 1 16 31 -0.13107200000000000000e6
-1776 1 20 27 0.13107200000000000000e6
-1776 1 28 35 -0.65536000000000000000e5
-1776 2 6 23 0.32768000000000000000e5
-1776 2 7 13 0.65536000000000000000e5
-1776 2 10 24 -0.65536000000000000000e5
-1776 3 1 14 -0.32768000000000000000e5
-1776 3 11 24 -0.65536000000000000000e5
-1776 4 8 8 -0.13107200000000000000e6
-1777 1 2 17 0.32768000000000000000e5
-1777 1 3 34 0.32768000000000000000e5
-1777 1 4 19 0.65536000000000000000e5
-1777 1 4 35 -0.32768000000000000000e5
-1777 1 18 25 -0.32768000000000000000e5
-1777 1 20 27 -0.13107200000000000000e6
-1777 1 28 35 0.13107200000000000000e6
-1777 2 6 24 0.32768000000000000000e5
-1777 2 9 23 -0.32768000000000000000e5
-1777 2 10 24 0.65536000000000000000e5
-1777 3 1 14 -0.32768000000000000000e5
-1777 3 8 13 -0.65536000000000000000e5
-1777 3 11 24 0.13107200000000000000e6
-1778 2 6 25 0.32768000000000000000e5
-1778 2 7 13 -0.32768000000000000000e5
-1778 4 8 8 0.65536000000000000000e5
-1779 1 1 24 -0.16384000000000000000e5
-1779 1 1 32 -0.65536000000000000000e5
-1779 1 1 40 -0.16384000000000000000e5
-1779 1 1 48 0.16384000000000000000e5
-1779 1 2 17 -0.13107200000000000000e6
-1779 1 2 33 -0.65536000000000000000e5
-1779 1 3 34 0.13107200000000000000e6
-1779 1 3 50 0.32768000000000000000e5
-1779 1 5 52 -0.65536000000000000000e5
-1779 1 6 37 -0.16384000000000000000e5
-1779 1 7 22 -0.32768000000000000000e5
-1779 1 7 38 0.32768000000000000000e5
-1779 1 8 23 -0.32768000000000000000e5
-1779 1 10 41 -0.65536000000000000000e5
-1779 1 11 42 0.13107200000000000000e6
-1779 1 12 27 0.13107200000000000000e6
-1779 1 12 43 0.26214400000000000000e6
-1779 1 16 47 -0.13107200000000000000e6
-1779 1 17 48 -0.13107200000000000000e6
-1779 1 22 37 0.16384000000000000000e5
-1779 1 23 38 0.16384000000000000000e5
-1779 1 28 43 -0.65536000000000000000e5
-1779 2 1 7 -0.32768000000000000000e5
-1779 2 1 31 0.65536000000000000000e5
-1779 2 2 16 -0.16384000000000000000e5
-1779 2 3 17 0.16384000000000000000e5
-1779 2 4 26 -0.16384000000000000000e5
-1779 2 6 20 -0.65536000000000000000e5
-1779 2 6 26 0.32768000000000000000e5
-1779 2 7 21 -0.65536000000000000000e5
-1779 2 8 22 0.65536000000000000000e5
-1779 2 10 32 0.65536000000000000000e5
-1779 2 12 26 -0.13107200000000000000e6
-1779 2 16 16 0.32768000000000000000e5
-1779 3 1 14 0.13107200000000000000e6
-1779 3 1 16 -0.16384000000000000000e5
-1779 3 1 30 -0.32768000000000000000e5
-1779 3 2 31 -0.65536000000000000000e5
-1779 3 3 16 -0.16384000000000000000e5
-1779 3 6 23 0.13107200000000000000e6
-1779 3 7 20 -0.13107200000000000000e6
-1779 3 8 21 -0.65536000000000000000e5
-1779 3 14 27 -0.26214400000000000000e6
-1779 4 1 5 0.32768000000000000000e5
-1779 4 1 13 -0.16384000000000000000e5
-1779 4 4 16 -0.65536000000000000000e5
-1779 4 5 17 -0.32768000000000000000e5
-1779 4 7 19 0.65536000000000000000e5
-1779 4 11 11 -0.32768000000000000000e5
-1780 1 1 48 0.16384000000000000000e5
-1780 1 2 33 0.65536000000000000000e5
-1780 1 2 49 0.16384000000000000000e5
-1780 1 3 34 -0.13107200000000000000e6
-1780 1 7 38 0.32768000000000000000e5
-1780 1 8 39 0.32768000000000000000e5
-1780 1 10 41 0.65536000000000000000e5
-1780 1 23 38 0.16384000000000000000e5
-1780 2 2 32 0.16384000000000000000e5
-1780 2 6 27 0.32768000000000000000e5
-1780 2 7 21 0.65536000000000000000e5
-1780 3 1 30 0.32768000000000000000e5
-1780 3 7 20 0.65536000000000000000e5
-1780 3 8 21 0.65536000000000000000e5
-1781 1 5 52 0.65536000000000000000e5
-1781 1 9 40 -0.32768000000000000000e5
-1781 1 10 41 0.65536000000000000000e5
-1781 1 17 48 -0.13107200000000000000e6
-1781 1 26 41 0.32768000000000000000e5
-1781 1 28 43 0.65536000000000000000e5
-1781 2 6 28 0.32768000000000000000e5
-1781 2 8 22 0.65536000000000000000e5
-1781 2 16 30 -0.32768000000000000000e5
-1781 3 1 30 0.32768000000000000000e5
-1781 3 2 31 -0.65536000000000000000e5
-1781 4 4 16 -0.65536000000000000000e5
-1781 4 6 18 -0.32768000000000000000e5
-1781 4 7 19 -0.65536000000000000000e5
-1782 2 1 31 -0.32768000000000000000e5
-1782 2 6 29 0.32768000000000000000e5
-1783 1 2 33 -0.32768000000000000000e5
-1783 1 3 34 0.65536000000000000000e5
-1783 1 11 42 0.32768000000000000000e5
-1783 1 12 43 0.65536000000000000000e5
-1783 1 16 47 -0.65536000000000000000e5
-1783 1 17 48 -0.65536000000000000000e5
-1783 2 6 30 0.32768000000000000000e5
-1783 2 7 21 -0.32768000000000000000e5
-1783 2 8 22 0.32768000000000000000e5
-1783 2 12 26 -0.32768000000000000000e5
-1783 3 7 20 -0.32768000000000000000e5
-1783 3 8 21 -0.32768000000000000000e5
-1783 3 13 26 -0.65536000000000000000e5
-1783 3 14 27 -0.65536000000000000000e5
-1783 4 4 16 -0.32768000000000000000e5
-1784 1 2 17 0.32768000000000000000e5
-1784 1 4 19 0.65536000000000000000e5
-1784 1 12 43 0.32768000000000000000e5
-1784 1 16 47 0.32768000000000000000e5
-1784 1 20 27 -0.13107200000000000000e6
-1784 1 28 35 0.65536000000000000000e5
-1784 2 6 31 0.32768000000000000000e5
-1784 2 10 24 0.65536000000000000000e5
-1784 3 1 14 -0.32768000000000000000e5
-1784 3 6 23 -0.32768000000000000000e5
-1784 3 8 13 -0.65536000000000000000e5
-1784 3 10 23 0.65536000000000000000e5
-1784 3 11 24 0.65536000000000000000e5
-1784 3 13 26 0.32768000000000000000e5
-1785 1 1 48 0.16384000000000000000e5
-1785 1 2 33 0.65536000000000000000e5
-1785 1 2 49 0.16384000000000000000e5
-1785 1 3 34 -0.13107200000000000000e6
-1785 1 7 38 0.32768000000000000000e5
-1785 1 8 39 0.32768000000000000000e5
-1785 1 10 41 0.65536000000000000000e5
-1785 1 23 38 0.16384000000000000000e5
-1785 2 2 32 0.16384000000000000000e5
-1785 2 6 32 0.32768000000000000000e5
-1785 2 7 21 0.65536000000000000000e5
-1785 3 1 30 0.32768000000000000000e5
-1785 3 7 20 0.65536000000000000000e5
-1785 3 8 21 0.65536000000000000000e5
-1785 4 5 17 0.32768000000000000000e5
-1786 2 6 33 0.32768000000000000000e5
-1786 2 16 30 -0.32768000000000000000e5
-1787 2 6 34 0.32768000000000000000e5
-1787 2 10 32 -0.32768000000000000000e5
-1788 1 3 50 -0.32768000000000000000e5
-1788 1 7 54 0.32768000000000000000e5
-1788 1 11 42 0.65536000000000000000e5
-1788 1 12 43 0.13107200000000000000e6
-1788 1 17 48 -0.13107200000000000000e6
-1788 1 37 44 -0.65536000000000000000e5
-1788 2 6 35 0.32768000000000000000e5
-1788 2 8 22 0.65536000000000000000e5
-1788 2 12 26 -0.65536000000000000000e5
-1788 2 16 30 -0.32768000000000000000e5
-1788 3 2 31 -0.65536000000000000000e5
-1788 3 14 27 -0.13107200000000000000e6
-1788 3 16 29 -0.32768000000000000000e5
-1788 3 17 30 -0.32768000000000000000e5
-1788 4 4 16 -0.65536000000000000000e5
-1789 1 1 32 0.16384000000000000000e5
-1789 1 2 17 -0.65536000000000000000e5
-1789 1 3 18 -0.32768000000000000000e5
-1789 1 4 19 -0.65536000000000000000e5
-1789 1 10 41 -0.16384000000000000000e5
-1789 1 20 27 0.13107200000000000000e6
-1789 1 28 35 -0.65536000000000000000e5
-1789 2 4 10 -0.16384000000000000000e5
-1789 2 6 12 -0.32768000000000000000e5
-1789 2 7 7 0.32768000000000000000e5
-1789 2 10 24 -0.65536000000000000000e5
-1789 3 2 15 0.65536000000000000000e5
-1789 3 5 10 -0.16384000000000000000e5
-1789 3 6 7 0.16384000000000000000e5
-1789 3 8 13 0.65536000000000000000e5
-1789 3 8 21 -0.16384000000000000000e5
-1789 3 11 24 -0.65536000000000000000e5
-1790 2 4 10 -0.32768000000000000000e5
-1790 2 7 8 0.32768000000000000000e5
-1791 1 2 33 0.32768000000000000000e5
-1791 1 4 35 0.13107200000000000000e6
-1791 1 11 42 -0.32768000000000000000e5
-1791 1 18 25 0.65536000000000000000e5
-1791 1 28 35 -0.13107200000000000000e6
-1791 2 7 9 0.32768000000000000000e5
-1791 2 8 22 -0.32768000000000000000e5
-1791 2 9 23 0.65536000000000000000e5
-1791 3 9 22 -0.32768000000000000000e5
-1791 3 11 24 -0.13107200000000000000e6
-1791 4 4 8 -0.32768000000000000000e5
-1792 1 1 8 0.81920000000000000000e4
-1792 1 1 40 0.40960000000000000000e4
-1792 1 2 5 -0.40960000000000000000e4
-1792 1 2 9 0.16384000000000000000e5
-1792 1 2 17 -0.32768000000000000000e5
-1792 1 3 18 -0.98304000000000000000e5
-1792 1 3 34 -0.32768000000000000000e5
-1792 1 4 19 -0.13107200000000000000e6
-1792 1 4 35 -0.65536000000000000000e5
-1792 1 6 13 0.16384000000000000000e5
-1792 1 7 22 -0.81920000000000000000e4
-1792 1 7 38 0.81920000000000000000e4
-1792 1 8 23 -0.24576000000000000000e5
-1792 1 10 41 0.16384000000000000000e5
-1792 1 11 42 0.16384000000000000000e5
-1792 1 12 27 0.32768000000000000000e5
-1792 1 13 16 -0.13107200000000000000e6
-1792 1 18 25 -0.32768000000000000000e5
-1792 1 20 27 0.39321600000000000000e6
-1792 1 28 35 -0.13107200000000000000e6
-1792 2 1 3 0.40960000000000000000e4
-1792 2 2 16 -0.40960000000000000000e4
-1792 2 4 10 -0.16384000000000000000e5
-1792 2 6 12 -0.65536000000000000000e5
-1792 2 7 10 0.32768000000000000000e5
-1792 2 7 13 0.65536000000000000000e5
-1792 2 7 21 0.16384000000000000000e5
-1792 2 8 22 0.16384000000000000000e5
-1792 2 9 23 -0.32768000000000000000e5
-1792 2 10 24 -0.19660800000000000000e6
-1792 3 1 2 0.40960000000000000000e4
-1792 3 2 15 0.19660800000000000000e6
-1792 3 3 16 -0.40960000000000000000e4
-1792 3 4 17 -0.40960000000000000000e4
-1792 3 6 7 0.16384000000000000000e5
-1792 3 6 19 -0.81920000000000000000e4
-1792 3 7 20 0.16384000000000000000e5
-1792 3 8 13 0.19660800000000000000e6
-1792 3 8 21 0.16384000000000000000e5
-1792 3 9 22 0.16384000000000000000e5
-1792 3 11 24 -0.13107200000000000000e6
-1792 4 1 5 0.81920000000000000000e4
-1792 4 1 13 -0.40960000000000000000e4
-1792 4 2 2 -0.81920000000000000000e4
-1792 4 2 14 -0.81920000000000000000e4
-1792 4 4 8 0.16384000000000000000e5
-1792 4 5 5 0.32768000000000000000e5
-1793 2 6 12 -0.32768000000000000000e5
-1793 2 7 11 0.32768000000000000000e5
-1794 1 2 17 -0.32768000000000000000e5
-1794 1 3 18 -0.32768000000000000000e5
-1794 1 4 19 -0.13107200000000000000e6
-1794 1 10 17 0.65536000000000000000e5
-1794 1 11 14 -0.32768000000000000000e5
-1794 1 20 27 0.13107200000000000000e6
-1794 1 28 35 -0.65536000000000000000e5
-1794 2 6 12 -0.32768000000000000000e5
-1794 2 7 12 0.32768000000000000000e5
-1794 2 9 11 -0.32768000000000000000e5
-1794 2 10 24 -0.65536000000000000000e5
-1794 3 2 15 0.65536000000000000000e5
-1794 3 8 13 0.65536000000000000000e5
-1794 3 11 24 -0.65536000000000000000e5
-1795 2 7 14 0.32768000000000000000e5
-1795 2 10 24 -0.32768000000000000000e5
-1795 4 6 10 -0.32768000000000000000e5
-1796 2 7 15 0.32768000000000000000e5
-1796 2 11 13 -0.32768000000000000000e5
-1797 1 1 32 -0.13107200000000000000e6
-1797 1 1 48 0.16384000000000000000e5
-1797 1 2 33 0.65536000000000000000e5
-1797 1 2 49 0.16384000000000000000e5
-1797 1 3 34 -0.13107200000000000000e6
-1797 1 7 22 -0.32768000000000000000e5
-1797 1 7 38 0.32768000000000000000e5
-1797 1 8 23 -0.32768000000000000000e5
-1797 1 10 41 0.65536000000000000000e5
-1797 1 12 27 0.13107200000000000000e6
-1797 1 23 38 0.16384000000000000000e5
-1797 2 1 7 -0.32768000000000000000e5
-1797 2 2 32 0.16384000000000000000e5
-1797 2 6 20 -0.65536000000000000000e5
-1797 2 7 16 0.32768000000000000000e5
-1797 2 7 21 0.65536000000000000000e5
-1797 3 1 30 0.32768000000000000000e5
-1797 3 6 19 -0.32768000000000000000e5
-1797 3 7 20 0.65536000000000000000e5
-1797 3 8 21 0.65536000000000000000e5
-1797 4 1 5 0.32768000000000000000e5
-1797 4 2 14 -0.32768000000000000000e5
-1798 1 1 48 0.16384000000000000000e5
-1798 1 2 33 0.65536000000000000000e5
-1798 1 2 49 0.16384000000000000000e5
-1798 1 3 34 -0.13107200000000000000e6
-1798 1 7 38 0.32768000000000000000e5
-1798 1 8 39 0.32768000000000000000e5
-1798 1 10 41 0.65536000000000000000e5
-1798 1 23 38 0.16384000000000000000e5
-1798 2 2 32 0.16384000000000000000e5
-1798 2 7 17 0.32768000000000000000e5
-1798 2 7 21 0.65536000000000000000e5
-1798 3 1 30 0.32768000000000000000e5
-1798 3 7 20 0.65536000000000000000e5
-1798 3 8 21 0.65536000000000000000e5
-1798 4 2 14 -0.32768000000000000000e5
-1799 1 2 33 -0.65536000000000000000e5
-1799 1 5 52 0.65536000000000000000e5
-1799 1 7 38 0.32768000000000000000e5
-1799 1 8 23 -0.32768000000000000000e5
-1799 1 10 25 -0.32768000000000000000e5
-1799 1 10 41 0.65536000000000000000e5
-1799 1 11 42 0.65536000000000000000e5
-1799 1 12 43 0.13107200000000000000e6
-1799 1 17 48 -0.26214400000000000000e6
-1799 1 26 41 0.32768000000000000000e5
-1799 1 28 43 0.65536000000000000000e5
-1799 2 7 18 0.32768000000000000000e5
-1799 2 8 22 0.13107200000000000000e6
-1799 2 12 26 -0.65536000000000000000e5
-1799 2 16 30 -0.32768000000000000000e5
-1799 3 1 30 0.32768000000000000000e5
-1799 3 2 31 -0.65536000000000000000e5
-1799 3 6 19 -0.32768000000000000000e5
-1799 3 7 20 0.65536000000000000000e5
-1799 3 8 21 0.65536000000000000000e5
-1799 3 14 27 -0.13107200000000000000e6
-1799 4 2 14 -0.32768000000000000000e5
-1799 4 3 15 -0.32768000000000000000e5
-1799 4 4 16 -0.13107200000000000000e6
-1799 4 6 18 -0.32768000000000000000e5
-1799 4 7 19 -0.65536000000000000000e5
-1800 1 1 48 -0.16384000000000000000e5
-1800 1 2 49 -0.16384000000000000000e5
-1800 1 5 52 0.65536000000000000000e5
-1800 1 11 42 0.65536000000000000000e5
-1800 1 12 43 0.13107200000000000000e6
-1800 1 17 48 -0.26214400000000000000e6
-1800 1 23 38 -0.16384000000000000000e5
-1800 1 26 41 0.32768000000000000000e5
-1800 1 28 43 0.65536000000000000000e5
-1800 2 2 32 -0.16384000000000000000e5
-1800 2 7 19 0.32768000000000000000e5
-1800 2 8 22 0.13107200000000000000e6
-1800 2 12 26 -0.65536000000000000000e5
-1800 2 16 30 -0.32768000000000000000e5
-1800 3 2 31 -0.65536000000000000000e5
-1800 3 14 27 -0.13107200000000000000e6
-1800 4 3 15 -0.32768000000000000000e5
-1800 4 4 16 -0.13107200000000000000e6
-1800 4 6 18 -0.32768000000000000000e5
-1800 4 7 19 -0.65536000000000000000e5
-1801 1 1 32 0.32768000000000000000e5
-1801 1 2 17 -0.65536000000000000000e5
-1801 1 3 34 0.65536000000000000000e5
-1801 1 10 41 -0.32768000000000000000e5
-1801 2 7 20 0.32768000000000000000e5
-1801 2 7 21 -0.32768000000000000000e5
-1801 3 1 14 0.65536000000000000000e5
-1801 3 8 21 -0.32768000000000000000e5
-1802 1 2 33 0.32768000000000000000e5
-1802 1 4 35 0.13107200000000000000e6
-1802 1 11 42 -0.32768000000000000000e5
-1802 1 18 25 0.65536000000000000000e5
-1802 1 28 35 -0.13107200000000000000e6
-1802 2 7 22 0.32768000000000000000e5
-1802 2 8 22 -0.32768000000000000000e5
-1802 2 9 23 0.65536000000000000000e5
-1802 3 9 22 -0.32768000000000000000e5
-1802 3 11 24 -0.13107200000000000000e6
-1803 1 2 17 0.32768000000000000000e5
-1803 1 3 34 0.32768000000000000000e5
-1803 1 4 19 0.65536000000000000000e5
-1803 1 4 35 -0.32768000000000000000e5
-1803 1 18 25 -0.32768000000000000000e5
-1803 1 20 27 -0.13107200000000000000e6
-1803 1 28 35 0.13107200000000000000e6
-1803 2 7 23 0.32768000000000000000e5
-1803 2 9 23 -0.32768000000000000000e5
-1803 2 10 24 0.65536000000000000000e5
-1803 3 1 14 -0.32768000000000000000e5
-1803 3 8 13 -0.65536000000000000000e5
-1803 3 11 24 0.13107200000000000000e6
-1804 1 3 34 0.32768000000000000000e5
-1804 1 4 19 -0.65536000000000000000e5
-1804 1 18 25 -0.32768000000000000000e5
-1804 1 28 35 0.65536000000000000000e5
-1804 2 7 24 0.32768000000000000000e5
-1804 2 9 23 -0.32768000000000000000e5
-1804 3 8 13 0.65536000000000000000e5
-1804 3 11 24 0.65536000000000000000e5
-1805 2 7 25 0.32768000000000000000e5
-1805 2 10 24 -0.32768000000000000000e5
-1806 1 1 48 0.16384000000000000000e5
-1806 1 2 33 0.65536000000000000000e5
-1806 1 2 49 0.16384000000000000000e5
-1806 1 3 34 -0.13107200000000000000e6
-1806 1 7 38 0.32768000000000000000e5
-1806 1 8 39 0.32768000000000000000e5
-1806 1 10 41 0.65536000000000000000e5
-1806 1 23 38 0.16384000000000000000e5
-1806 2 2 32 0.16384000000000000000e5
-1806 2 7 21 0.65536000000000000000e5
-1806 2 7 26 0.32768000000000000000e5
-1806 3 1 30 0.32768000000000000000e5
-1806 3 7 20 0.65536000000000000000e5
-1806 3 8 21 0.65536000000000000000e5
-1807 1 5 52 0.65536000000000000000e5
-1807 1 9 40 -0.32768000000000000000e5
-1807 1 10 41 0.65536000000000000000e5
-1807 1 17 48 -0.13107200000000000000e6
-1807 1 26 41 0.32768000000000000000e5
-1807 1 28 43 0.65536000000000000000e5
-1807 2 7 27 0.32768000000000000000e5
-1807 2 8 22 0.65536000000000000000e5
-1807 2 16 30 -0.32768000000000000000e5
-1807 3 1 30 0.32768000000000000000e5
-1807 3 2 31 -0.65536000000000000000e5
-1807 4 4 16 -0.65536000000000000000e5
-1807 4 6 18 -0.32768000000000000000e5
-1807 4 7 19 -0.65536000000000000000e5
-1808 1 1 48 -0.16384000000000000000e5
-1808 1 2 49 -0.16384000000000000000e5
-1808 1 5 52 0.65536000000000000000e5
-1808 1 11 42 0.65536000000000000000e5
-1808 1 12 43 0.13107200000000000000e6
-1808 1 17 48 -0.26214400000000000000e6
-1808 1 23 38 -0.16384000000000000000e5
-1808 1 26 41 0.32768000000000000000e5
-1808 1 28 43 0.65536000000000000000e5
-1808 2 2 32 -0.16384000000000000000e5
-1808 2 7 28 0.32768000000000000000e5
-1808 2 8 22 0.13107200000000000000e6
-1808 2 12 26 -0.65536000000000000000e5
-1808 2 16 30 -0.32768000000000000000e5
-1808 3 2 31 -0.65536000000000000000e5
-1808 3 14 27 -0.13107200000000000000e6
-1808 4 4 16 -0.13107200000000000000e6
-1808 4 6 18 -0.32768000000000000000e5
-1808 4 7 19 -0.65536000000000000000e5
-1809 1 2 33 -0.32768000000000000000e5
-1809 1 3 34 0.65536000000000000000e5
-1809 1 11 42 0.32768000000000000000e5
-1809 1 12 43 0.65536000000000000000e5
-1809 1 16 47 -0.65536000000000000000e5
-1809 1 17 48 -0.65536000000000000000e5
-1809 2 7 21 -0.32768000000000000000e5
-1809 2 7 29 0.32768000000000000000e5
-1809 2 8 22 0.32768000000000000000e5
-1809 2 12 26 -0.32768000000000000000e5
-1809 3 7 20 -0.32768000000000000000e5
-1809 3 8 21 -0.32768000000000000000e5
-1809 3 13 26 -0.65536000000000000000e5
-1809 3 14 27 -0.65536000000000000000e5
-1809 4 4 16 -0.32768000000000000000e5
-1810 2 7 30 0.32768000000000000000e5
-1810 2 12 26 -0.32768000000000000000e5
-1811 1 12 43 0.32768000000000000000e5
-1811 1 13 44 -0.65536000000000000000e5
-1811 1 16 47 0.32768000000000000000e5
-1811 1 17 48 0.32768000000000000000e5
-1811 2 7 31 0.32768000000000000000e5
-1811 3 13 26 0.32768000000000000000e5
-1811 3 14 27 0.32768000000000000000e5
-1812 2 7 32 0.32768000000000000000e5
-1812 2 16 30 -0.32768000000000000000e5
-1813 1 1 48 -0.16384000000000000000e5
-1813 1 2 49 -0.16384000000000000000e5
-1813 1 5 52 0.65536000000000000000e5
-1813 1 11 42 0.65536000000000000000e5
-1813 1 12 43 0.13107200000000000000e6
-1813 1 17 48 -0.26214400000000000000e6
-1813 1 23 38 -0.16384000000000000000e5
-1813 1 26 41 0.32768000000000000000e5
-1813 1 28 43 0.65536000000000000000e5
-1813 2 2 32 -0.16384000000000000000e5
-1813 2 7 33 0.32768000000000000000e5
-1813 2 8 22 0.13107200000000000000e6
-1813 2 12 26 -0.65536000000000000000e5
-1813 2 16 30 -0.32768000000000000000e5
-1813 3 2 31 -0.65536000000000000000e5
-1813 3 14 27 -0.13107200000000000000e6
-1813 4 4 16 -0.13107200000000000000e6
-1813 4 7 19 -0.65536000000000000000e5
-1814 2 7 34 0.32768000000000000000e5
-1814 2 20 34 -0.32768000000000000000e5
-1814 4 8 20 -0.32768000000000000000e5
-1815 1 1 48 -0.16384000000000000000e5
-1815 1 2 49 -0.16384000000000000000e5
-1815 1 3 50 -0.32768000000000000000e5
-1815 1 7 54 0.32768000000000000000e5
-1815 1 11 42 0.65536000000000000000e5
-1815 1 12 43 0.13107200000000000000e6
-1815 1 17 48 -0.13107200000000000000e6
-1815 1 23 38 -0.16384000000000000000e5
-1815 1 26 41 0.32768000000000000000e5
-1815 1 32 47 -0.65536000000000000000e5
-1815 2 2 32 -0.16384000000000000000e5
-1815 2 7 35 0.32768000000000000000e5
-1815 2 8 22 0.65536000000000000000e5
-1815 2 12 26 -0.65536000000000000000e5
-1815 2 16 30 -0.32768000000000000000e5
-1815 3 2 31 -0.65536000000000000000e5
-1815 3 14 27 -0.13107200000000000000e6
-1815 3 17 30 -0.32768000000000000000e5
-1815 3 22 27 -0.32768000000000000000e5
-1815 4 4 16 -0.65536000000000000000e5
-1816 1 2 33 0.16384000000000000000e5
-1816 1 4 35 0.65536000000000000000e5
-1816 1 11 42 -0.16384000000000000000e5
-1816 1 18 25 0.32768000000000000000e5
-1816 1 28 35 -0.65536000000000000000e5
-1816 2 8 8 0.32768000000000000000e5
-1816 2 8 22 -0.16384000000000000000e5
-1816 2 9 23 0.32768000000000000000e5
-1816 3 9 22 -0.16384000000000000000e5
-1816 3 11 24 -0.65536000000000000000e5
-1816 4 4 8 -0.16384000000000000000e5
-1817 2 5 11 -0.32768000000000000000e5
-1817 2 8 9 0.32768000000000000000e5
-1818 2 6 12 -0.32768000000000000000e5
-1818 2 8 10 0.32768000000000000000e5
-1819 1 2 17 -0.32768000000000000000e5
-1819 1 3 18 -0.32768000000000000000e5
-1819 1 4 19 -0.13107200000000000000e6
-1819 1 10 17 0.65536000000000000000e5
-1819 1 11 14 -0.32768000000000000000e5
-1819 1 20 27 0.13107200000000000000e6
-1819 1 28 35 -0.65536000000000000000e5
-1819 2 6 12 -0.32768000000000000000e5
-1819 2 8 11 0.32768000000000000000e5
-1819 2 9 11 -0.32768000000000000000e5
-1819 2 10 24 -0.65536000000000000000e5
-1819 3 2 15 0.65536000000000000000e5
-1819 3 8 13 0.65536000000000000000e5
-1819 3 11 24 -0.65536000000000000000e5
-1820 2 8 12 0.32768000000000000000e5
-1820 2 9 11 -0.32768000000000000000e5
-1821 2 8 13 0.32768000000000000000e5
-1821 2 10 24 -0.32768000000000000000e5
-1821 4 6 10 -0.32768000000000000000e5
-1822 1 6 21 -0.32768000000000000000e5
-1822 1 10 17 0.16384000000000000000e5
-1822 1 10 21 0.65536000000000000000e5
-1822 1 13 20 -0.65536000000000000000e5
-1822 1 20 27 0.32768000000000000000e5
-1822 1 28 35 -0.16384000000000000000e5
-1822 2 8 15 0.32768000000000000000e5
-1822 2 9 15 -0.32768000000000000000e5
-1822 3 2 15 0.16384000000000000000e5
-1822 3 8 13 0.16384000000000000000e5
-1822 3 11 24 -0.16384000000000000000e5
-1822 4 6 10 0.16384000000000000000e5
-1823 1 1 48 0.16384000000000000000e5
-1823 1 2 33 0.65536000000000000000e5
-1823 1 2 49 0.16384000000000000000e5
-1823 1 3 34 -0.13107200000000000000e6
-1823 1 7 38 0.32768000000000000000e5
-1823 1 8 39 0.32768000000000000000e5
-1823 1 10 41 0.65536000000000000000e5
-1823 1 23 38 0.16384000000000000000e5
-1823 2 2 32 0.16384000000000000000e5
-1823 2 7 21 0.65536000000000000000e5
-1823 2 8 16 0.32768000000000000000e5
-1823 3 1 30 0.32768000000000000000e5
-1823 3 7 20 0.65536000000000000000e5
-1823 3 8 21 0.65536000000000000000e5
-1823 4 2 14 -0.32768000000000000000e5
-1824 1 2 33 -0.65536000000000000000e5
-1824 1 5 52 0.65536000000000000000e5
-1824 1 7 38 0.32768000000000000000e5
-1824 1 8 23 -0.32768000000000000000e5
-1824 1 10 25 -0.32768000000000000000e5
-1824 1 10 41 0.65536000000000000000e5
-1824 1 11 42 0.65536000000000000000e5
-1824 1 12 43 0.13107200000000000000e6
-1824 1 17 48 -0.26214400000000000000e6
-1824 1 26 41 0.32768000000000000000e5
-1824 1 28 43 0.65536000000000000000e5
-1824 2 8 17 0.32768000000000000000e5
-1824 2 8 22 0.13107200000000000000e6
-1824 2 12 26 -0.65536000000000000000e5
-1824 2 16 30 -0.32768000000000000000e5
-1824 3 1 30 0.32768000000000000000e5
-1824 3 2 31 -0.65536000000000000000e5
-1824 3 6 19 -0.32768000000000000000e5
-1824 3 7 20 0.65536000000000000000e5
-1824 3 8 21 0.65536000000000000000e5
-1824 3 14 27 -0.13107200000000000000e6
-1824 4 2 14 -0.32768000000000000000e5
-1824 4 3 15 -0.32768000000000000000e5
-1824 4 4 16 -0.13107200000000000000e6
-1824 4 6 18 -0.32768000000000000000e5
-1824 4 7 19 -0.65536000000000000000e5
-1825 1 1 48 -0.16384000000000000000e5
-1825 1 2 49 -0.16384000000000000000e5
-1825 1 5 52 0.65536000000000000000e5
-1825 1 11 42 0.65536000000000000000e5
-1825 1 12 43 0.13107200000000000000e6
-1825 1 17 48 -0.26214400000000000000e6
-1825 1 23 38 -0.16384000000000000000e5
-1825 1 26 41 0.32768000000000000000e5
-1825 1 28 43 0.65536000000000000000e5
-1825 2 2 32 -0.16384000000000000000e5
-1825 2 8 18 0.32768000000000000000e5
-1825 2 8 22 0.13107200000000000000e6
-1825 2 12 26 -0.65536000000000000000e5
-1825 2 16 30 -0.32768000000000000000e5
-1825 3 2 31 -0.65536000000000000000e5
-1825 3 14 27 -0.13107200000000000000e6
-1825 4 3 15 -0.32768000000000000000e5
-1825 4 4 16 -0.13107200000000000000e6
-1825 4 6 18 -0.32768000000000000000e5
-1825 4 7 19 -0.65536000000000000000e5
-1826 1 1 48 -0.16384000000000000000e5
-1826 1 2 49 -0.16384000000000000000e5
-1826 1 4 35 -0.13107200000000000000e6
-1826 1 5 52 0.65536000000000000000e5
-1826 1 6 29 0.32768000000000000000e5
-1826 1 8 39 -0.32768000000000000000e5
-1826 1 10 41 0.13107200000000000000e6
-1826 1 11 42 0.13107200000000000000e6
-1826 1 12 43 0.13107200000000000000e6
-1826 1 17 48 -0.26214400000000000000e6
-1826 1 23 38 -0.16384000000000000000e5
-1826 1 26 41 0.32768000000000000000e5
-1826 1 28 43 0.65536000000000000000e5
-1826 2 2 32 -0.16384000000000000000e5
-1826 2 8 19 0.32768000000000000000e5
-1826 2 8 22 0.19660800000000000000e6
-1826 2 12 26 -0.65536000000000000000e5
-1826 2 16 30 -0.32768000000000000000e5
-1826 3 2 31 -0.65536000000000000000e5
-1826 3 6 19 -0.32768000000000000000e5
-1826 3 8 21 0.13107200000000000000e6
-1826 3 9 22 0.65536000000000000000e5
-1826 3 14 27 -0.13107200000000000000e6
-1826 4 3 15 -0.32768000000000000000e5
-1826 4 4 16 -0.13107200000000000000e6
-1826 4 6 18 -0.32768000000000000000e5
-1826 4 7 19 -0.65536000000000000000e5
-1827 2 7 21 -0.32768000000000000000e5
-1827 2 8 20 0.32768000000000000000e5
-1828 1 2 33 0.32768000000000000000e5
-1828 1 4 35 0.13107200000000000000e6
-1828 1 11 42 -0.32768000000000000000e5
-1828 1 18 25 0.65536000000000000000e5
-1828 1 28 35 -0.13107200000000000000e6
-1828 2 8 21 0.32768000000000000000e5
-1828 2 8 22 -0.32768000000000000000e5
-1828 2 9 23 0.65536000000000000000e5
-1828 3 9 22 -0.32768000000000000000e5
-1828 3 11 24 -0.13107200000000000000e6
-1829 1 3 34 0.32768000000000000000e5
-1829 1 4 19 -0.65536000000000000000e5
-1829 1 18 25 -0.32768000000000000000e5
-1829 1 28 35 0.65536000000000000000e5
-1829 2 8 23 0.32768000000000000000e5
-1829 2 9 23 -0.32768000000000000000e5
-1829 3 8 13 0.65536000000000000000e5
-1829 3 11 24 0.65536000000000000000e5
-1830 2 8 24 0.32768000000000000000e5
-1830 2 9 23 -0.32768000000000000000e5
-1831 1 4 19 0.32768000000000000000e5
-1831 1 5 36 0.32768000000000000000e5
-1831 1 17 32 -0.65536000000000000000e5
-1831 1 28 35 0.32768000000000000000e5
-1831 2 8 25 0.32768000000000000000e5
-1831 3 8 13 -0.32768000000000000000e5
-1831 3 11 24 0.32768000000000000000e5
-1832 1 5 52 0.65536000000000000000e5
-1832 1 9 40 -0.32768000000000000000e5
-1832 1 10 41 0.65536000000000000000e5
-1832 1 17 48 -0.13107200000000000000e6
-1832 1 26 41 0.32768000000000000000e5
-1832 1 28 43 0.65536000000000000000e5
-1832 2 8 22 0.65536000000000000000e5
-1832 2 8 26 0.32768000000000000000e5
-1832 2 16 30 -0.32768000000000000000e5
-1832 3 1 30 0.32768000000000000000e5
-1832 3 2 31 -0.65536000000000000000e5
-1832 4 4 16 -0.65536000000000000000e5
-1832 4 6 18 -0.32768000000000000000e5
-1832 4 7 19 -0.65536000000000000000e5
-1833 1 1 48 -0.16384000000000000000e5
-1833 1 2 49 -0.16384000000000000000e5
-1833 1 5 52 0.65536000000000000000e5
-1833 1 11 42 0.65536000000000000000e5
-1833 1 12 43 0.13107200000000000000e6
-1833 1 17 48 -0.26214400000000000000e6
-1833 1 23 38 -0.16384000000000000000e5
-1833 1 26 41 0.32768000000000000000e5
-1833 1 28 43 0.65536000000000000000e5
-1833 2 2 32 -0.16384000000000000000e5
-1833 2 8 22 0.13107200000000000000e6
-1833 2 8 27 0.32768000000000000000e5
-1833 2 12 26 -0.65536000000000000000e5
-1833 2 16 30 -0.32768000000000000000e5
-1833 3 2 31 -0.65536000000000000000e5
-1833 3 14 27 -0.13107200000000000000e6
-1833 4 4 16 -0.13107200000000000000e6
-1833 4 6 18 -0.32768000000000000000e5
-1833 4 7 19 -0.65536000000000000000e5
-1834 1 1 48 -0.16384000000000000000e5
-1834 1 2 49 -0.16384000000000000000e5
-1834 1 5 52 0.65536000000000000000e5
-1834 1 8 39 -0.32768000000000000000e5
-1834 1 10 41 0.13107200000000000000e6
-1834 1 11 42 0.13107200000000000000e6
-1834 1 12 43 0.13107200000000000000e6
-1834 1 17 48 -0.39321600000000000000e6
-1834 1 23 38 -0.16384000000000000000e5
-1834 1 26 29 0.32768000000000000000e5
-1834 1 26 41 0.32768000000000000000e5
-1834 1 28 43 0.65536000000000000000e5
-1834 2 2 32 -0.16384000000000000000e5
-1834 2 8 22 0.19660800000000000000e6
-1834 2 8 28 0.32768000000000000000e5
-1834 2 12 26 -0.65536000000000000000e5
-1834 2 16 30 -0.32768000000000000000e5
-1834 3 2 31 -0.65536000000000000000e5
-1834 3 14 27 -0.26214400000000000000e6
-1834 4 4 16 -0.19660800000000000000e6
-1834 4 6 18 -0.32768000000000000000e5
-1834 4 7 19 -0.65536000000000000000e5
-1835 2 8 29 0.32768000000000000000e5
-1835 2 12 26 -0.32768000000000000000e5
-1836 2 8 22 -0.32768000000000000000e5
-1836 2 8 30 0.32768000000000000000e5
-1836 4 4 16 0.32768000000000000000e5
-1837 1 12 43 0.32768000000000000000e5
-1837 1 17 48 0.32768000000000000000e5
-1837 1 18 25 0.32768000000000000000e5
-1837 1 28 35 -0.65536000000000000000e5
-1837 2 8 31 0.32768000000000000000e5
-1837 3 14 19 -0.32768000000000000000e5
-1837 3 14 27 0.32768000000000000000e5
-1838 1 1 48 -0.16384000000000000000e5
-1838 1 2 49 -0.16384000000000000000e5
-1838 1 5 52 0.65536000000000000000e5
-1838 1 11 42 0.65536000000000000000e5
-1838 1 12 43 0.13107200000000000000e6
-1838 1 17 48 -0.26214400000000000000e6
-1838 1 23 38 -0.16384000000000000000e5
-1838 1 26 41 0.32768000000000000000e5
-1838 1 28 43 0.65536000000000000000e5
-1838 2 2 32 -0.16384000000000000000e5
-1838 2 8 22 0.13107200000000000000e6
-1838 2 8 32 0.32768000000000000000e5
-1838 2 12 26 -0.65536000000000000000e5
-1838 2 16 30 -0.32768000000000000000e5
-1838 3 2 31 -0.65536000000000000000e5
-1838 3 14 27 -0.13107200000000000000e6
-1838 4 4 16 -0.13107200000000000000e6
-1838 4 7 19 -0.65536000000000000000e5
-1839 2 4 34 -0.32768000000000000000e5
-1839 2 8 33 0.32768000000000000000e5
-1840 2 8 22 -0.32768000000000000000e5
-1840 2 8 34 0.32768000000000000000e5
-1840 4 4 16 0.32768000000000000000e5
-1840 4 7 19 0.32768000000000000000e5
-1841 2 4 34 -0.32768000000000000000e5
-1841 2 8 35 0.32768000000000000000e5
-1841 3 5 34 -0.32768000000000000000e5
-1841 3 17 30 -0.32768000000000000000e5
-1841 3 18 31 0.65536000000000000000e5
-1841 3 22 27 -0.32768000000000000000e5
-1842 1 2 17 -0.32768000000000000000e5
-1842 1 3 18 -0.32768000000000000000e5
-1842 1 4 19 -0.13107200000000000000e6
-1842 1 10 17 0.65536000000000000000e5
-1842 1 11 14 -0.32768000000000000000e5
-1842 1 20 27 0.13107200000000000000e6
-1842 1 28 35 -0.65536000000000000000e5
-1842 2 6 12 -0.32768000000000000000e5
-1842 2 9 10 0.32768000000000000000e5
-1842 2 9 11 -0.32768000000000000000e5
-1842 2 10 24 -0.65536000000000000000e5
-1842 3 2 15 0.65536000000000000000e5
-1842 3 8 13 0.65536000000000000000e5
-1842 3 11 24 -0.65536000000000000000e5
-1843 2 8 14 -0.32768000000000000000e5
-1843 2 9 13 0.32768000000000000000e5
-1844 1 4 19 0.32768000000000000000e5
-1844 1 5 20 0.65536000000000000000e5
-1844 1 6 21 0.65536000000000000000e5
-1844 1 10 17 0.65536000000000000000e5
-1844 1 10 21 -0.13107200000000000000e6
-1844 1 11 18 0.32768000000000000000e5
-1844 2 8 14 0.32768000000000000000e5
-1844 2 9 14 0.32768000000000000000e5
-1844 2 9 15 0.65536000000000000000e5
-1845 1 2 33 -0.65536000000000000000e5
-1845 1 5 52 0.65536000000000000000e5
-1845 1 7 38 0.32768000000000000000e5
-1845 1 8 23 -0.32768000000000000000e5
-1845 1 10 25 -0.32768000000000000000e5
-1845 1 10 41 0.65536000000000000000e5
-1845 1 11 42 0.65536000000000000000e5
-1845 1 12 43 0.13107200000000000000e6
-1845 1 17 48 -0.26214400000000000000e6
-1845 1 26 41 0.32768000000000000000e5
-1845 1 28 43 0.65536000000000000000e5
-1845 2 8 22 0.13107200000000000000e6
-1845 2 9 16 0.32768000000000000000e5
-1845 2 12 26 -0.65536000000000000000e5
-1845 2 16 30 -0.32768000000000000000e5
-1845 3 1 30 0.32768000000000000000e5
-1845 3 2 31 -0.65536000000000000000e5
-1845 3 6 19 -0.32768000000000000000e5
-1845 3 7 20 0.65536000000000000000e5
-1845 3 8 21 0.65536000000000000000e5
-1845 3 14 27 -0.13107200000000000000e6
-1845 4 2 14 -0.32768000000000000000e5
-1845 4 3 15 -0.32768000000000000000e5
-1845 4 4 16 -0.13107200000000000000e6
-1845 4 6 18 -0.32768000000000000000e5
-1845 4 7 19 -0.65536000000000000000e5
-1846 1 1 48 -0.16384000000000000000e5
-1846 1 2 49 -0.16384000000000000000e5
-1846 1 5 52 0.65536000000000000000e5
-1846 1 11 42 0.65536000000000000000e5
-1846 1 12 43 0.13107200000000000000e6
-1846 1 17 48 -0.26214400000000000000e6
-1846 1 23 38 -0.16384000000000000000e5
-1846 1 26 41 0.32768000000000000000e5
-1846 1 28 43 0.65536000000000000000e5
-1846 2 2 32 -0.16384000000000000000e5
-1846 2 8 22 0.13107200000000000000e6
-1846 2 9 17 0.32768000000000000000e5
-1846 2 12 26 -0.65536000000000000000e5
-1846 2 16 30 -0.32768000000000000000e5
-1846 3 2 31 -0.65536000000000000000e5
-1846 3 14 27 -0.13107200000000000000e6
-1846 4 3 15 -0.32768000000000000000e5
-1846 4 4 16 -0.13107200000000000000e6
-1846 4 6 18 -0.32768000000000000000e5
-1846 4 7 19 -0.65536000000000000000e5
-1847 1 1 48 -0.16384000000000000000e5
-1847 1 2 49 -0.16384000000000000000e5
-1847 1 4 35 -0.13107200000000000000e6
-1847 1 5 52 0.65536000000000000000e5
-1847 1 6 29 0.32768000000000000000e5
-1847 1 8 39 -0.32768000000000000000e5
-1847 1 10 41 0.13107200000000000000e6
-1847 1 11 42 0.13107200000000000000e6
-1847 1 12 43 0.13107200000000000000e6
-1847 1 17 48 -0.26214400000000000000e6
-1847 1 23 38 -0.16384000000000000000e5
-1847 1 26 41 0.32768000000000000000e5
-1847 1 28 43 0.65536000000000000000e5
-1847 2 2 32 -0.16384000000000000000e5
-1847 2 8 22 0.19660800000000000000e6
-1847 2 9 18 0.32768000000000000000e5
-1847 2 12 26 -0.65536000000000000000e5
-1847 2 16 30 -0.32768000000000000000e5
-1847 3 2 31 -0.65536000000000000000e5
-1847 3 6 19 -0.32768000000000000000e5
-1847 3 8 21 0.13107200000000000000e6
-1847 3 9 22 0.65536000000000000000e5
-1847 3 14 27 -0.13107200000000000000e6
-1847 4 3 15 -0.32768000000000000000e5
-1847 4 4 16 -0.13107200000000000000e6
-1847 4 6 18 -0.32768000000000000000e5
-1847 4 7 19 -0.65536000000000000000e5
-1848 1 6 29 0.32768000000000000000e5
-1848 1 10 25 0.32768000000000000000e5
-1848 1 11 26 0.32768000000000000000e5
-1848 1 11 42 -0.65536000000000000000e5
-1848 2 9 19 0.32768000000000000000e5
-1848 3 9 22 -0.65536000000000000000e5
-1849 1 2 33 0.32768000000000000000e5
-1849 1 4 35 0.13107200000000000000e6
-1849 1 11 42 -0.32768000000000000000e5
-1849 1 18 25 0.65536000000000000000e5
-1849 1 28 35 -0.13107200000000000000e6
-1849 2 8 22 -0.32768000000000000000e5
-1849 2 9 20 0.32768000000000000000e5
-1849 2 9 23 0.65536000000000000000e5
-1849 3 9 22 -0.32768000000000000000e5
-1849 3 11 24 -0.13107200000000000000e6
-1850 2 8 22 -0.32768000000000000000e5
-1850 2 9 21 0.32768000000000000000e5
-1851 1 4 35 0.65536000000000000000e5
-1851 1 10 41 -0.32768000000000000000e5
-1851 1 11 30 0.32768000000000000000e5
-1851 1 18 25 -0.65536000000000000000e5
-1851 2 8 22 -0.32768000000000000000e5
-1851 2 9 22 0.32768000000000000000e5
-1851 3 8 21 -0.32768000000000000000e5
-1852 1 4 35 0.32768000000000000000e5
-1852 1 5 36 -0.65536000000000000000e5
-1852 1 15 30 0.32768000000000000000e5
-1852 1 18 25 0.32768000000000000000e5
-1852 2 9 24 0.32768000000000000000e5
-1853 1 1 48 -0.16384000000000000000e5
-1853 1 2 49 -0.16384000000000000000e5
-1853 1 5 52 0.65536000000000000000e5
-1853 1 11 42 0.65536000000000000000e5
-1853 1 12 43 0.13107200000000000000e6
-1853 1 17 48 -0.26214400000000000000e6
-1853 1 23 38 -0.16384000000000000000e5
-1853 1 26 41 0.32768000000000000000e5
-1853 1 28 43 0.65536000000000000000e5
-1853 2 2 32 -0.16384000000000000000e5
-1853 2 8 22 0.13107200000000000000e6
-1853 2 9 26 0.32768000000000000000e5
-1853 2 12 26 -0.65536000000000000000e5
-1853 2 16 30 -0.32768000000000000000e5
-1853 3 2 31 -0.65536000000000000000e5
-1853 3 14 27 -0.13107200000000000000e6
-1853 4 4 16 -0.13107200000000000000e6
-1853 4 6 18 -0.32768000000000000000e5
-1853 4 7 19 -0.65536000000000000000e5
-1854 1 1 48 -0.16384000000000000000e5
-1854 1 2 49 -0.16384000000000000000e5
-1854 1 5 52 0.65536000000000000000e5
-1854 1 8 39 -0.32768000000000000000e5
-1854 1 10 41 0.13107200000000000000e6
-1854 1 11 42 0.13107200000000000000e6
-1854 1 12 43 0.13107200000000000000e6
-1854 1 17 48 -0.39321600000000000000e6
-1854 1 23 38 -0.16384000000000000000e5
-1854 1 26 29 0.32768000000000000000e5
-1854 1 26 41 0.32768000000000000000e5
-1854 1 28 43 0.65536000000000000000e5
-1854 2 2 32 -0.16384000000000000000e5
-1854 2 8 22 0.19660800000000000000e6
-1854 2 9 27 0.32768000000000000000e5
-1854 2 12 26 -0.65536000000000000000e5
-1854 2 16 30 -0.32768000000000000000e5
-1854 3 2 31 -0.65536000000000000000e5
-1854 3 14 27 -0.26214400000000000000e6
-1854 4 4 16 -0.19660800000000000000e6
-1854 4 6 18 -0.32768000000000000000e5
-1854 4 7 19 -0.65536000000000000000e5
-1855 1 6 43 0.32768000000000000000e5
-1855 1 9 40 0.32768000000000000000e5
-1855 1 11 42 -0.65536000000000000000e5
-1855 1 26 29 0.32768000000000000000e5
-1855 2 9 28 0.32768000000000000000e5
-1856 2 8 22 -0.32768000000000000000e5
-1856 2 9 29 0.32768000000000000000e5
-1856 4 4 16 0.32768000000000000000e5
-1857 1 10 41 -0.32768000000000000000e5
-1857 1 17 48 0.65536000000000000000e5
-1857 1 18 25 -0.65536000000000000000e5
-1857 1 26 33 0.32768000000000000000e5
-1857 2 8 22 -0.32768000000000000000e5
-1857 2 9 30 0.32768000000000000000e5
-1857 3 14 19 0.65536000000000000000e5
-1857 3 14 27 0.65536000000000000000e5
-1857 4 4 16 0.32768000000000000000e5
-1858 2 9 31 0.32768000000000000000e5
-1858 2 14 28 -0.32768000000000000000e5
-1859 2 4 34 -0.32768000000000000000e5
-1859 2 9 32 0.32768000000000000000e5
-1860 2 9 33 0.32768000000000000000e5
-1860 2 22 28 -0.32768000000000000000e5
-1861 1 5 52 0.32768000000000000000e5
-1861 1 14 45 -0.13107200000000000000e6
-1861 1 17 48 0.65536000000000000000e5
-1861 1 18 49 0.65536000000000000000e5
-1861 1 28 43 0.32768000000000000000e5
-1861 1 33 40 0.32768000000000000000e5
-1861 2 9 34 0.32768000000000000000e5
-1861 2 24 30 0.65536000000000000000e5
-1861 3 15 28 0.13107200000000000000e6
-1862 2 9 35 0.32768000000000000000e5
-1862 2 28 30 -0.32768000000000000000e5
-1863 2 1 15 -0.16384000000000000000e5
-1863 2 10 10 0.32768000000000000000e5
-1864 2 7 13 -0.32768000000000000000e5
-1864 2 10 11 0.32768000000000000000e5
-1865 2 10 12 0.32768000000000000000e5
-1865 2 10 24 -0.32768000000000000000e5
-1865 4 6 10 -0.32768000000000000000e5
-1866 1 4 19 -0.16384000000000000000e5
-1866 1 7 16 0.16384000000000000000e5
-1866 1 10 17 0.16384000000000000000e5
-1866 1 12 19 -0.65536000000000000000e5
-1866 1 13 16 0.65536000000000000000e5
-1866 1 20 27 0.32768000000000000000e5
-1866 1 28 35 -0.16384000000000000000e5
-1866 2 1 15 0.16384000000000000000e5
-1866 2 7 13 -0.16384000000000000000e5
-1866 2 10 13 0.32768000000000000000e5
-1866 3 2 15 0.16384000000000000000e5
-1866 3 8 13 0.16384000000000000000e5
-1866 3 11 24 -0.16384000000000000000e5
-1866 4 6 10 0.16384000000000000000e5
-1867 2 10 14 0.32768000000000000000e5
-1867 2 11 13 -0.32768000000000000000e5
-1868 1 4 19 0.81920000000000000000e4
-1868 1 5 20 0.81920000000000000000e4
-1868 1 10 17 0.16384000000000000000e5
-1868 1 12 19 0.32768000000000000000e5
-1868 1 13 16 0.16384000000000000000e5
-1868 1 13 20 0.32768000000000000000e5
-1868 1 16 19 -0.65536000000000000000e5
-1868 1 20 27 0.16384000000000000000e5
-1868 1 28 35 -0.81920000000000000000e4
-1868 2 8 14 0.81920000000000000000e4
-1868 2 10 15 0.32768000000000000000e5
-1868 2 11 13 0.16384000000000000000e5
-1868 3 2 15 0.81920000000000000000e4
-1868 3 8 13 0.81920000000000000000e4
-1868 3 11 24 -0.81920000000000000000e4
-1868 4 6 10 0.81920000000000000000e4
-1869 2 6 20 -0.32768000000000000000e5
-1869 2 10 16 0.32768000000000000000e5
-1870 1 1 32 0.32768000000000000000e5
-1870 1 2 17 -0.65536000000000000000e5
-1870 1 3 34 0.65536000000000000000e5
-1870 1 10 41 -0.32768000000000000000e5
-1870 2 7 21 -0.32768000000000000000e5
-1870 2 10 17 0.32768000000000000000e5
-1870 3 1 14 0.65536000000000000000e5
-1870 3 8 21 -0.32768000000000000000e5
-1871 2 7 21 -0.32768000000000000000e5
-1871 2 10 18 0.32768000000000000000e5
-1872 1 2 33 0.32768000000000000000e5
-1872 1 4 35 0.13107200000000000000e6
-1872 1 11 42 -0.32768000000000000000e5
-1872 1 18 25 0.65536000000000000000e5
-1872 1 28 35 -0.13107200000000000000e6
-1872 2 8 22 -0.32768000000000000000e5
-1872 2 9 23 0.65536000000000000000e5
-1872 2 10 19 0.32768000000000000000e5
-1872 3 9 22 -0.32768000000000000000e5
-1872 3 11 24 -0.13107200000000000000e6
-1873 1 2 17 0.32768000000000000000e5
-1873 1 3 34 0.32768000000000000000e5
-1873 1 12 27 0.32768000000000000000e5
-1873 1 16 31 -0.13107200000000000000e6
-1873 1 20 27 0.13107200000000000000e6
-1873 1 28 35 -0.65536000000000000000e5
-1873 2 7 13 0.65536000000000000000e5
-1873 2 10 20 0.32768000000000000000e5
-1873 2 10 24 -0.65536000000000000000e5
-1873 3 1 14 -0.32768000000000000000e5
-1873 3 11 24 -0.65536000000000000000e5
-1873 4 8 8 -0.13107200000000000000e6
-1874 1 2 17 0.32768000000000000000e5
-1874 1 3 34 0.32768000000000000000e5
-1874 1 4 19 0.65536000000000000000e5
-1874 1 4 35 -0.32768000000000000000e5
-1874 1 18 25 -0.32768000000000000000e5
-1874 1 20 27 -0.13107200000000000000e6
-1874 1 28 35 0.13107200000000000000e6
-1874 2 9 23 -0.32768000000000000000e5
-1874 2 10 21 0.32768000000000000000e5
-1874 2 10 24 0.65536000000000000000e5
-1874 3 1 14 -0.32768000000000000000e5
-1874 3 8 13 -0.65536000000000000000e5
-1874 3 11 24 0.13107200000000000000e6
-1875 1 3 34 0.32768000000000000000e5
-1875 1 4 19 -0.65536000000000000000e5
-1875 1 18 25 -0.32768000000000000000e5
-1875 1 28 35 0.65536000000000000000e5
-1875 2 9 23 -0.32768000000000000000e5
-1875 2 10 22 0.32768000000000000000e5
-1875 3 8 13 0.65536000000000000000e5
-1875 3 11 24 0.65536000000000000000e5
-1876 2 7 13 -0.32768000000000000000e5
-1876 2 10 23 0.32768000000000000000e5
-1876 4 8 8 0.65536000000000000000e5
-1877 1 4 19 -0.16384000000000000000e5
-1877 1 5 20 -0.16384000000000000000e5
-1877 1 10 17 -0.32768000000000000000e5
-1877 1 13 16 -0.32768000000000000000e5
-1877 1 16 31 0.32768000000000000000e5
-1877 1 17 32 0.32768000000000000000e5
-1877 1 28 35 0.16384000000000000000e5
-1877 2 8 14 -0.16384000000000000000e5
-1877 2 10 25 0.32768000000000000000e5
-1877 2 11 13 -0.32768000000000000000e5
-1877 3 2 15 -0.16384000000000000000e5
-1877 3 8 13 -0.16384000000000000000e5
-1877 3 10 15 0.65536000000000000000e5
-1877 3 11 24 0.16384000000000000000e5
-1877 4 6 10 -0.16384000000000000000e5
-1878 2 1 31 -0.32768000000000000000e5
-1878 2 10 26 0.32768000000000000000e5
-1879 1 2 33 -0.32768000000000000000e5
-1879 1 3 34 0.65536000000000000000e5
-1879 1 11 42 0.32768000000000000000e5
-1879 1 12 43 0.65536000000000000000e5
-1879 1 16 47 -0.65536000000000000000e5
-1879 1 17 48 -0.65536000000000000000e5
-1879 2 7 21 -0.32768000000000000000e5
-1879 2 8 22 0.32768000000000000000e5
-1879 2 10 27 0.32768000000000000000e5
-1879 2 12 26 -0.32768000000000000000e5
-1879 3 7 20 -0.32768000000000000000e5
-1879 3 8 21 -0.32768000000000000000e5
-1879 3 13 26 -0.65536000000000000000e5
-1879 3 14 27 -0.65536000000000000000e5
-1879 4 4 16 -0.32768000000000000000e5
-1880 2 10 28 0.32768000000000000000e5
-1880 2 12 26 -0.32768000000000000000e5
-1881 1 2 17 0.32768000000000000000e5
-1881 1 4 19 0.65536000000000000000e5
-1881 1 12 43 0.32768000000000000000e5
-1881 1 16 47 0.32768000000000000000e5
-1881 1 20 27 -0.13107200000000000000e6
-1881 1 28 35 0.65536000000000000000e5
-1881 2 10 24 0.65536000000000000000e5
-1881 2 10 29 0.32768000000000000000e5
-1881 3 1 14 -0.32768000000000000000e5
-1881 3 6 23 -0.32768000000000000000e5
-1881 3 8 13 -0.65536000000000000000e5
-1881 3 10 23 0.65536000000000000000e5
-1881 3 11 24 0.65536000000000000000e5
-1881 3 13 26 0.32768000000000000000e5
-1882 1 12 43 0.32768000000000000000e5
-1882 1 13 44 -0.65536000000000000000e5
-1882 1 16 47 0.32768000000000000000e5
-1882 1 17 48 0.32768000000000000000e5
-1882 2 10 30 0.32768000000000000000e5
-1882 3 13 26 0.32768000000000000000e5
-1882 3 14 27 0.32768000000000000000e5
-1883 2 10 24 -0.32768000000000000000e5
-1883 2 10 31 0.32768000000000000000e5
-1883 4 10 14 0.32768000000000000000e5
-1884 2 10 33 0.32768000000000000000e5
-1884 2 20 34 -0.32768000000000000000e5
-1884 4 8 20 -0.32768000000000000000e5
-1885 1 5 52 -0.16384000000000000000e5
-1885 1 11 42 0.16384000000000000000e5
-1885 1 12 43 0.32768000000000000000e5
-1885 1 16 47 0.32768000000000000000e5
-1885 1 17 48 0.32768000000000000000e5
-1885 1 34 41 -0.65536000000000000000e5
-1885 2 10 34 0.32768000000000000000e5
-1885 2 12 26 -0.16384000000000000000e5
-1885 2 20 34 0.16384000000000000000e5
-1885 3 2 31 -0.16384000000000000000e5
-1885 3 14 27 -0.32768000000000000000e5
-1885 4 7 19 0.16384000000000000000e5
-1885 4 8 20 0.16384000000000000000e5
-1886 2 10 35 0.32768000000000000000e5
-1886 2 20 34 -0.32768000000000000000e5
-1887 2 10 24 -0.16384000000000000000e5
-1887 2 11 11 0.32768000000000000000e5
-1887 4 6 10 -0.16384000000000000000e5
-1888 2 8 14 -0.32768000000000000000e5
-1888 2 11 12 0.32768000000000000000e5
-1889 1 6 21 -0.32768000000000000000e5
-1889 1 10 17 0.16384000000000000000e5
-1889 1 10 21 0.65536000000000000000e5
-1889 1 13 20 -0.65536000000000000000e5
-1889 1 20 27 0.32768000000000000000e5
-1889 1 28 35 -0.16384000000000000000e5
-1889 2 9 15 -0.32768000000000000000e5
-1889 2 11 14 0.32768000000000000000e5
-1889 3 2 15 0.16384000000000000000e5
-1889 3 8 13 0.16384000000000000000e5
-1889 3 11 24 -0.16384000000000000000e5
-1889 4 6 10 0.16384000000000000000e5
-1890 1 4 19 0.81920000000000000000e4
-1890 1 5 20 0.81920000000000000000e4
-1890 1 10 17 0.16384000000000000000e5
-1890 1 13 16 0.16384000000000000000e5
-1890 1 17 32 0.32768000000000000000e5
-1890 1 18 33 0.16384000000000000000e5
-1890 1 19 34 -0.65536000000000000000e5
-1890 1 20 27 0.32768000000000000000e5
-1890 1 28 35 -0.81920000000000000000e4
-1890 1 29 36 0.32768000000000000000e5
-1890 2 8 14 0.81920000000000000000e4
-1890 2 11 13 0.16384000000000000000e5
-1890 2 11 15 0.32768000000000000000e5
-1890 2 11 25 0.16384000000000000000e5
-1890 2 14 24 0.16384000000000000000e5
-1890 3 2 15 0.81920000000000000000e4
-1890 3 8 13 0.81920000000000000000e4
-1890 3 10 15 -0.32768000000000000000e5
-1890 3 11 24 -0.81920000000000000000e4
-1890 3 12 25 0.32768000000000000000e5
-1890 4 6 10 0.81920000000000000000e4
-1890 4 10 10 -0.65536000000000000000e5
-1891 1 1 32 0.32768000000000000000e5
-1891 1 2 17 -0.65536000000000000000e5
-1891 1 3 34 0.65536000000000000000e5
-1891 1 10 41 -0.32768000000000000000e5
-1891 2 7 21 -0.32768000000000000000e5
-1891 2 11 16 0.32768000000000000000e5
-1891 3 1 14 0.65536000000000000000e5
-1891 3 8 21 -0.32768000000000000000e5
-1892 2 7 21 -0.32768000000000000000e5
-1892 2 11 17 0.32768000000000000000e5
-1893 1 2 33 0.32768000000000000000e5
-1893 1 4 35 0.13107200000000000000e6
-1893 1 11 42 -0.32768000000000000000e5
-1893 1 18 25 0.65536000000000000000e5
-1893 1 28 35 -0.13107200000000000000e6
-1893 2 8 22 -0.32768000000000000000e5
-1893 2 9 23 0.65536000000000000000e5
-1893 2 11 18 0.32768000000000000000e5
-1893 3 9 22 -0.32768000000000000000e5
-1893 3 11 24 -0.13107200000000000000e6
-1894 2 8 22 -0.32768000000000000000e5
-1894 2 11 19 0.32768000000000000000e5
-1895 1 2 17 0.32768000000000000000e5
-1895 1 3 34 0.32768000000000000000e5
-1895 1 4 19 0.65536000000000000000e5
-1895 1 4 35 -0.32768000000000000000e5
-1895 1 18 25 -0.32768000000000000000e5
-1895 1 20 27 -0.13107200000000000000e6
-1895 1 28 35 0.13107200000000000000e6
-1895 2 9 23 -0.32768000000000000000e5
-1895 2 10 24 0.65536000000000000000e5
-1895 2 11 20 0.32768000000000000000e5
-1895 3 1 14 -0.32768000000000000000e5
-1895 3 8 13 -0.65536000000000000000e5
-1895 3 11 24 0.13107200000000000000e6
-1896 1 3 34 0.32768000000000000000e5
-1896 1 4 19 -0.65536000000000000000e5
-1896 1 18 25 -0.32768000000000000000e5
-1896 1 28 35 0.65536000000000000000e5
-1896 2 9 23 -0.32768000000000000000e5
-1896 2 11 21 0.32768000000000000000e5
-1896 3 8 13 0.65536000000000000000e5
-1896 3 11 24 0.65536000000000000000e5
-1897 2 9 23 -0.32768000000000000000e5
-1897 2 11 22 0.32768000000000000000e5
-1898 2 10 24 -0.32768000000000000000e5
-1898 2 11 23 0.32768000000000000000e5
-1899 1 4 19 0.32768000000000000000e5
-1899 1 5 36 0.32768000000000000000e5
-1899 1 17 32 -0.65536000000000000000e5
-1899 1 28 35 0.32768000000000000000e5
-1899 2 11 24 0.32768000000000000000e5
-1899 3 8 13 -0.32768000000000000000e5
-1899 3 11 24 0.32768000000000000000e5
-1900 1 2 33 -0.32768000000000000000e5
-1900 1 3 34 0.65536000000000000000e5
-1900 1 11 42 0.32768000000000000000e5
-1900 1 12 43 0.65536000000000000000e5
-1900 1 16 47 -0.65536000000000000000e5
-1900 1 17 48 -0.65536000000000000000e5
-1900 2 7 21 -0.32768000000000000000e5
-1900 2 8 22 0.32768000000000000000e5
-1900 2 11 26 0.32768000000000000000e5
-1900 2 12 26 -0.32768000000000000000e5
-1900 3 7 20 -0.32768000000000000000e5
-1900 3 8 21 -0.32768000000000000000e5
-1900 3 13 26 -0.65536000000000000000e5
-1900 3 14 27 -0.65536000000000000000e5
-1900 4 4 16 -0.32768000000000000000e5
-1901 2 11 27 0.32768000000000000000e5
-1901 2 12 26 -0.32768000000000000000e5
-1902 2 8 22 -0.32768000000000000000e5
-1902 2 11 28 0.32768000000000000000e5
-1902 4 4 16 0.32768000000000000000e5
-1903 1 12 43 0.32768000000000000000e5
-1903 1 13 44 -0.65536000000000000000e5
-1903 1 16 47 0.32768000000000000000e5
-1903 1 17 48 0.32768000000000000000e5
-1903 2 11 29 0.32768000000000000000e5
-1903 3 13 26 0.32768000000000000000e5
-1903 3 14 27 0.32768000000000000000e5
-1904 1 12 43 0.32768000000000000000e5
-1904 1 17 48 0.32768000000000000000e5
-1904 1 18 25 0.32768000000000000000e5
-1904 1 28 35 -0.65536000000000000000e5
-1904 2 11 30 0.32768000000000000000e5
-1904 3 14 19 -0.32768000000000000000e5
-1904 3 14 27 0.32768000000000000000e5
-1905 1 13 44 0.32768000000000000000e5
-1905 1 14 45 0.32768000000000000000e5
-1905 1 19 42 -0.65536000000000000000e5
-1905 1 28 35 0.32768000000000000000e5
-1905 2 11 31 0.32768000000000000000e5
-1906 2 11 32 0.32768000000000000000e5
-1906 2 20 34 -0.32768000000000000000e5
-1906 4 8 20 -0.32768000000000000000e5
-1907 2 8 22 -0.32768000000000000000e5
-1907 2 11 33 0.32768000000000000000e5
-1907 4 4 16 0.32768000000000000000e5
-1907 4 7 19 0.32768000000000000000e5
-1908 1 5 52 -0.16384000000000000000e5
-1908 1 11 42 0.16384000000000000000e5
-1908 1 12 43 0.32768000000000000000e5
-1908 1 13 52 -0.65536000000000000000e5
-1908 1 14 45 0.65536000000000000000e5
-1908 1 18 49 -0.32768000000000000000e5
-1908 2 11 34 0.32768000000000000000e5
-1908 2 12 26 -0.16384000000000000000e5
-1908 2 20 34 0.16384000000000000000e5
-1908 2 24 30 -0.32768000000000000000e5
-1908 3 2 31 -0.16384000000000000000e5
-1908 3 14 27 -0.32768000000000000000e5
-1908 3 15 28 -0.65536000000000000000e5
-1908 4 7 19 0.16384000000000000000e5
-1908 4 8 20 0.16384000000000000000e5
-1909 1 17 48 -0.65536000000000000000e5
-1909 1 28 43 0.32768000000000000000e5
-1909 1 32 47 0.32768000000000000000e5
-1909 1 33 48 0.32768000000000000000e5
-1909 2 11 35 0.32768000000000000000e5
-1909 3 18 31 -0.32768000000000000000e5
-1909 3 24 29 0.65536000000000000000e5
-1910 1 4 19 0.16384000000000000000e5
-1910 1 5 20 0.32768000000000000000e5
-1910 1 6 21 0.32768000000000000000e5
-1910 1 10 17 0.32768000000000000000e5
-1910 1 10 21 -0.65536000000000000000e5
-1910 1 11 18 0.16384000000000000000e5
-1910 2 8 14 0.16384000000000000000e5
-1910 2 9 15 0.32768000000000000000e5
-1910 2 12 12 0.32768000000000000000e5
-1911 1 6 21 -0.32768000000000000000e5
-1911 1 10 17 0.16384000000000000000e5
-1911 1 10 21 0.65536000000000000000e5
-1911 1 13 20 -0.65536000000000000000e5
-1911 1 20 27 0.32768000000000000000e5
-1911 1 28 35 -0.16384000000000000000e5
-1911 2 9 15 -0.32768000000000000000e5
-1911 2 12 13 0.32768000000000000000e5
-1911 3 2 15 0.16384000000000000000e5
-1911 3 8 13 0.16384000000000000000e5
-1911 3 11 24 -0.16384000000000000000e5
-1911 4 6 10 0.16384000000000000000e5
-1912 2 9 15 -0.32768000000000000000e5
-1912 2 12 14 0.32768000000000000000e5
-1913 2 12 15 0.32768000000000000000e5
-1913 2 14 14 -0.65536000000000000000e5
-1914 2 7 21 -0.32768000000000000000e5
-1914 2 12 16 0.32768000000000000000e5
-1915 1 2 33 0.32768000000000000000e5
-1915 1 4 35 0.13107200000000000000e6
-1915 1 11 42 -0.32768000000000000000e5
-1915 1 18 25 0.65536000000000000000e5
-1915 1 28 35 -0.13107200000000000000e6
-1915 2 8 22 -0.32768000000000000000e5
-1915 2 9 23 0.65536000000000000000e5
-1915 2 12 17 0.32768000000000000000e5
-1915 3 9 22 -0.32768000000000000000e5
-1915 3 11 24 -0.13107200000000000000e6
-1916 2 8 22 -0.32768000000000000000e5
-1916 2 12 18 0.32768000000000000000e5
-1917 1 4 35 0.65536000000000000000e5
-1917 1 10 41 -0.32768000000000000000e5
-1917 1 11 30 0.32768000000000000000e5
-1917 1 18 25 -0.65536000000000000000e5
-1917 2 8 22 -0.32768000000000000000e5
-1917 2 12 19 0.32768000000000000000e5
-1917 3 8 21 -0.32768000000000000000e5
-1918 1 3 34 0.32768000000000000000e5
-1918 1 4 19 -0.65536000000000000000e5
-1918 1 18 25 -0.32768000000000000000e5
-1918 1 28 35 0.65536000000000000000e5
-1918 2 9 23 -0.32768000000000000000e5
-1918 2 12 20 0.32768000000000000000e5
-1918 3 8 13 0.65536000000000000000e5
-1918 3 11 24 0.65536000000000000000e5
-1919 2 9 23 -0.32768000000000000000e5
-1919 2 12 21 0.32768000000000000000e5
-1920 1 4 35 0.32768000000000000000e5
-1920 1 5 36 -0.65536000000000000000e5
-1920 1 15 30 0.32768000000000000000e5
-1920 1 18 25 0.32768000000000000000e5
-1920 2 12 22 0.32768000000000000000e5
-1921 1 4 19 0.32768000000000000000e5
-1921 1 5 36 0.32768000000000000000e5
-1921 1 17 32 -0.65536000000000000000e5
-1921 1 28 35 0.32768000000000000000e5
-1921 2 12 23 0.32768000000000000000e5
-1921 3 8 13 -0.32768000000000000000e5
-1921 3 11 24 0.32768000000000000000e5
-1922 2 9 25 -0.32768000000000000000e5
-1922 2 12 24 0.32768000000000000000e5
-1923 2 12 25 0.32768000000000000000e5
-1923 2 14 24 -0.32768000000000000000e5
-1924 2 8 22 -0.32768000000000000000e5
-1924 2 12 27 0.32768000000000000000e5
-1924 4 4 16 0.32768000000000000000e5
-1925 1 10 41 -0.32768000000000000000e5
-1925 1 17 48 0.65536000000000000000e5
-1925 1 18 25 -0.65536000000000000000e5
-1925 1 26 33 0.32768000000000000000e5
-1925 2 8 22 -0.32768000000000000000e5
-1925 2 12 28 0.32768000000000000000e5
-1925 3 14 19 0.65536000000000000000e5
-1925 3 14 27 0.65536000000000000000e5
-1925 4 4 16 0.32768000000000000000e5
-1926 1 12 43 0.32768000000000000000e5
-1926 1 17 48 0.32768000000000000000e5
-1926 1 18 25 0.32768000000000000000e5
-1926 1 28 35 -0.65536000000000000000e5
-1926 2 12 29 0.32768000000000000000e5
-1926 3 14 19 -0.32768000000000000000e5
-1926 3 14 27 0.32768000000000000000e5
-1927 2 12 30 0.32768000000000000000e5
-1927 2 14 28 -0.32768000000000000000e5
-1928 1 11 46 0.32768000000000000000e5
-1928 1 14 45 0.32768000000000000000e5
-1928 1 28 35 0.32768000000000000000e5
-1928 1 29 36 -0.65536000000000000000e5
-1928 2 12 31 0.32768000000000000000e5
-1929 2 8 22 -0.32768000000000000000e5
-1929 2 12 32 0.32768000000000000000e5
-1929 4 4 16 0.32768000000000000000e5
-1929 4 7 19 0.32768000000000000000e5
-1930 1 5 52 0.32768000000000000000e5
-1930 1 14 45 -0.13107200000000000000e6
-1930 1 17 48 0.65536000000000000000e5
-1930 1 18 49 0.65536000000000000000e5
-1930 1 28 43 0.32768000000000000000e5
-1930 1 33 40 0.32768000000000000000e5
-1930 2 12 33 0.32768000000000000000e5
-1930 2 24 30 0.65536000000000000000e5
-1930 3 15 28 0.13107200000000000000e6
-1931 2 12 34 0.32768000000000000000e5
-1931 2 24 30 -0.32768000000000000000e5
-1932 1 15 54 0.32768000000000000000e5
-1932 1 28 43 0.32768000000000000000e5
-1932 1 33 48 0.32768000000000000000e5
-1932 1 34 49 -0.65536000000000000000e5
-1932 2 12 35 0.32768000000000000000e5
-1932 3 18 31 -0.32768000000000000000e5
-1933 1 4 19 0.40960000000000000000e4
-1933 1 5 20 0.40960000000000000000e4
-1933 1 10 17 0.81920000000000000000e4
-1933 1 12 19 0.16384000000000000000e5
-1933 1 13 16 0.81920000000000000000e4
-1933 1 13 20 0.16384000000000000000e5
-1933 1 16 19 -0.32768000000000000000e5
-1933 1 20 27 0.81920000000000000000e4
-1933 1 28 35 -0.40960000000000000000e4
-1933 2 8 14 0.40960000000000000000e4
-1933 2 11 13 0.81920000000000000000e4
-1933 2 13 13 0.32768000000000000000e5
-1933 3 2 15 0.40960000000000000000e4
-1933 3 8 13 0.40960000000000000000e4
-1933 3 11 24 -0.40960000000000000000e4
-1933 4 6 10 0.40960000000000000000e4
-1934 1 4 19 0.81920000000000000000e4
-1934 1 5 20 0.81920000000000000000e4
-1934 1 10 17 0.16384000000000000000e5
-1934 1 13 16 0.16384000000000000000e5
-1934 1 17 32 0.32768000000000000000e5
-1934 1 18 33 0.16384000000000000000e5
-1934 1 19 34 -0.65536000000000000000e5
-1934 1 20 27 0.32768000000000000000e5
-1934 1 28 35 -0.81920000000000000000e4
-1934 1 29 36 0.32768000000000000000e5
-1934 2 8 14 0.81920000000000000000e4
-1934 2 11 13 0.16384000000000000000e5
-1934 2 11 25 0.16384000000000000000e5
-1934 2 13 14 0.32768000000000000000e5
-1934 2 14 24 0.16384000000000000000e5
-1934 3 2 15 0.81920000000000000000e4
-1934 3 8 13 0.81920000000000000000e4
-1934 3 10 15 -0.32768000000000000000e5
-1934 3 11 24 -0.81920000000000000000e4
-1934 3 12 25 0.32768000000000000000e5
-1934 4 6 10 0.81920000000000000000e4
-1934 4 10 10 -0.65536000000000000000e5
-1935 1 2 17 0.32768000000000000000e5
-1935 1 3 34 0.32768000000000000000e5
-1935 1 12 27 0.32768000000000000000e5
-1935 1 16 31 -0.13107200000000000000e6
-1935 1 20 27 0.13107200000000000000e6
-1935 1 28 35 -0.65536000000000000000e5
-1935 2 7 13 0.65536000000000000000e5
-1935 2 10 24 -0.65536000000000000000e5
-1935 2 13 16 0.32768000000000000000e5
-1935 3 1 14 -0.32768000000000000000e5
-1935 3 11 24 -0.65536000000000000000e5
-1935 4 8 8 -0.13107200000000000000e6
-1936 1 2 17 0.32768000000000000000e5
-1936 1 3 34 0.32768000000000000000e5
-1936 1 4 19 0.65536000000000000000e5
-1936 1 4 35 -0.32768000000000000000e5
-1936 1 18 25 -0.32768000000000000000e5
-1936 1 20 27 -0.13107200000000000000e6
-1936 1 28 35 0.13107200000000000000e6
-1936 2 9 23 -0.32768000000000000000e5
-1936 2 10 24 0.65536000000000000000e5
-1936 2 13 17 0.32768000000000000000e5
-1936 3 1 14 -0.32768000000000000000e5
-1936 3 8 13 -0.65536000000000000000e5
-1936 3 11 24 0.13107200000000000000e6
-1937 1 3 34 0.32768000000000000000e5
-1937 1 4 19 -0.65536000000000000000e5
-1937 1 18 25 -0.32768000000000000000e5
-1937 1 28 35 0.65536000000000000000e5
-1937 2 9 23 -0.32768000000000000000e5
-1937 2 13 18 0.32768000000000000000e5
-1937 3 8 13 0.65536000000000000000e5
-1937 3 11 24 0.65536000000000000000e5
-1938 2 9 23 -0.32768000000000000000e5
-1938 2 13 19 0.32768000000000000000e5
-1939 2 7 13 -0.32768000000000000000e5
-1939 2 13 20 0.32768000000000000000e5
-1939 4 8 8 0.65536000000000000000e5
-1940 2 10 24 -0.32768000000000000000e5
-1940 2 13 21 0.32768000000000000000e5
-1941 1 4 19 0.32768000000000000000e5
-1941 1 5 36 0.32768000000000000000e5
-1941 1 17 32 -0.65536000000000000000e5
-1941 1 28 35 0.32768000000000000000e5
-1941 2 13 22 0.32768000000000000000e5
-1941 3 8 13 -0.32768000000000000000e5
-1941 3 11 24 0.32768000000000000000e5
-1942 1 4 19 -0.16384000000000000000e5
-1942 1 5 20 -0.16384000000000000000e5
-1942 1 10 17 -0.32768000000000000000e5
-1942 1 13 16 -0.32768000000000000000e5
-1942 1 16 31 0.32768000000000000000e5
-1942 1 17 32 0.32768000000000000000e5
-1942 1 28 35 0.16384000000000000000e5
-1942 2 8 14 -0.16384000000000000000e5
-1942 2 11 13 -0.32768000000000000000e5
-1942 2 13 23 0.32768000000000000000e5
-1942 3 2 15 -0.16384000000000000000e5
-1942 3 8 13 -0.16384000000000000000e5
-1942 3 10 15 0.65536000000000000000e5
-1942 3 11 24 0.16384000000000000000e5
-1942 4 6 10 -0.16384000000000000000e5
-1943 2 11 25 -0.32768000000000000000e5
-1943 2 13 24 0.32768000000000000000e5
-1944 1 4 19 0.81920000000000000000e4
-1944 1 5 20 0.81920000000000000000e4
-1944 1 10 17 0.16384000000000000000e5
-1944 1 13 16 0.16384000000000000000e5
-1944 1 17 32 0.32768000000000000000e5
-1944 1 18 33 0.16384000000000000000e5
-1944 1 19 34 -0.65536000000000000000e5
-1944 1 20 27 0.32768000000000000000e5
-1944 1 28 35 -0.81920000000000000000e4
-1944 1 29 36 0.32768000000000000000e5
-1944 2 8 14 0.81920000000000000000e4
-1944 2 11 13 0.16384000000000000000e5
-1944 2 11 25 0.16384000000000000000e5
-1944 2 13 25 0.32768000000000000000e5
-1944 2 14 24 0.16384000000000000000e5
-1944 3 2 15 0.81920000000000000000e4
-1944 3 8 13 0.81920000000000000000e4
-1944 3 10 15 -0.32768000000000000000e5
-1944 3 11 24 -0.81920000000000000000e4
-1944 3 12 25 0.32768000000000000000e5
-1944 4 6 10 0.81920000000000000000e4
-1945 1 2 17 0.32768000000000000000e5
-1945 1 4 19 0.65536000000000000000e5
-1945 1 12 43 0.32768000000000000000e5
-1945 1 16 47 0.32768000000000000000e5
-1945 1 20 27 -0.13107200000000000000e6
-1945 1 28 35 0.65536000000000000000e5
-1945 2 10 24 0.65536000000000000000e5
-1945 2 13 26 0.32768000000000000000e5
-1945 3 1 14 -0.32768000000000000000e5
-1945 3 6 23 -0.32768000000000000000e5
-1945 3 8 13 -0.65536000000000000000e5
-1945 3 10 23 0.65536000000000000000e5
-1945 3 11 24 0.65536000000000000000e5
-1945 3 13 26 0.32768000000000000000e5
-1946 1 12 43 0.32768000000000000000e5
-1946 1 13 44 -0.65536000000000000000e5
-1946 1 16 47 0.32768000000000000000e5
-1946 1 17 48 0.32768000000000000000e5
-1946 2 13 27 0.32768000000000000000e5
-1946 3 13 26 0.32768000000000000000e5
-1946 3 14 27 0.32768000000000000000e5
-1947 1 12 43 0.32768000000000000000e5
-1947 1 17 48 0.32768000000000000000e5
-1947 1 18 25 0.32768000000000000000e5
-1947 1 28 35 -0.65536000000000000000e5
-1947 2 13 28 0.32768000000000000000e5
-1947 3 14 19 -0.32768000000000000000e5
-1947 3 14 27 0.32768000000000000000e5
-1948 2 10 24 -0.32768000000000000000e5
-1948 2 13 29 0.32768000000000000000e5
-1948 4 10 14 0.32768000000000000000e5
-1949 1 13 44 0.32768000000000000000e5
-1949 1 14 45 0.32768000000000000000e5
-1949 1 19 42 -0.65536000000000000000e5
-1949 1 28 35 0.32768000000000000000e5
-1949 2 13 30 0.32768000000000000000e5
-1950 2 13 31 0.32768000000000000000e5
-1950 2 15 29 -0.32768000000000000000e5
-1951 1 5 52 -0.16384000000000000000e5
-1951 1 11 42 0.16384000000000000000e5
-1951 1 12 43 0.32768000000000000000e5
-1951 1 16 47 0.32768000000000000000e5
-1951 1 17 48 0.32768000000000000000e5
-1951 1 34 41 -0.65536000000000000000e5
-1951 2 12 26 -0.16384000000000000000e5
-1951 2 13 32 0.32768000000000000000e5
-1951 2 20 34 0.16384000000000000000e5
-1951 3 2 31 -0.16384000000000000000e5
-1951 3 14 27 -0.32768000000000000000e5
-1951 4 7 19 0.16384000000000000000e5
-1951 4 8 20 0.16384000000000000000e5
-1952 1 5 52 -0.16384000000000000000e5
-1952 1 11 42 0.16384000000000000000e5
-1952 1 12 43 0.32768000000000000000e5
-1952 1 13 52 -0.65536000000000000000e5
-1952 1 14 45 0.65536000000000000000e5
-1952 1 18 49 -0.32768000000000000000e5
-1952 2 12 26 -0.16384000000000000000e5
-1952 2 13 33 0.32768000000000000000e5
-1952 2 20 34 0.16384000000000000000e5
-1952 2 24 30 -0.32768000000000000000e5
-1952 3 2 31 -0.16384000000000000000e5
-1952 3 14 27 -0.32768000000000000000e5
-1952 3 15 28 -0.65536000000000000000e5
-1952 4 7 19 0.16384000000000000000e5
-1952 4 8 20 0.16384000000000000000e5
-1953 1 13 52 0.32768000000000000000e5
-1953 1 14 45 0.32768000000000000000e5
-1953 1 19 50 -0.65536000000000000000e5
-1953 1 34 41 0.32768000000000000000e5
-1953 2 13 34 0.32768000000000000000e5
-1953 3 15 28 -0.32768000000000000000e5
-1954 1 16 55 -0.65536000000000000000e5
-1954 1 17 48 0.32768000000000000000e5
-1954 1 28 43 0.16384000000000000000e5
-1954 1 32 47 0.16384000000000000000e5
-1954 1 34 49 0.32768000000000000000e5
-1954 1 37 44 0.16384000000000000000e5
-1954 2 13 35 0.32768000000000000000e5
-1954 2 20 34 0.16384000000000000000e5
-1954 3 18 31 -0.16384000000000000000e5
-1954 3 24 29 -0.32768000000000000000e5
-1955 1 2 17 0.32768000000000000000e5
-1955 1 3 34 0.32768000000000000000e5
-1955 1 4 19 0.65536000000000000000e5
-1955 1 4 35 -0.32768000000000000000e5
-1955 1 18 25 -0.32768000000000000000e5
-1955 1 20 27 -0.13107200000000000000e6
-1955 1 28 35 0.13107200000000000000e6
-1955 2 9 23 -0.32768000000000000000e5
-1955 2 10 24 0.65536000000000000000e5
-1955 2 14 16 0.32768000000000000000e5
-1955 3 1 14 -0.32768000000000000000e5
-1955 3 8 13 -0.65536000000000000000e5
-1955 3 11 24 0.13107200000000000000e6
-1956 1 3 34 0.32768000000000000000e5
-1956 1 4 19 -0.65536000000000000000e5
-1956 1 18 25 -0.32768000000000000000e5
-1956 1 28 35 0.65536000000000000000e5
-1956 2 9 23 -0.32768000000000000000e5
-1956 2 14 17 0.32768000000000000000e5
-1956 3 8 13 0.65536000000000000000e5
-1956 3 11 24 0.65536000000000000000e5
-1957 2 9 23 -0.32768000000000000000e5
-1957 2 14 18 0.32768000000000000000e5
-1958 1 4 35 0.32768000000000000000e5
-1958 1 5 36 -0.65536000000000000000e5
-1958 1 15 30 0.32768000000000000000e5
-1958 1 18 25 0.32768000000000000000e5
-1958 2 14 19 0.32768000000000000000e5
-1959 2 10 24 -0.32768000000000000000e5
-1959 2 14 20 0.32768000000000000000e5
-1960 1 4 19 0.32768000000000000000e5
-1960 1 5 36 0.32768000000000000000e5
-1960 1 17 32 -0.65536000000000000000e5
-1960 1 28 35 0.32768000000000000000e5
-1960 2 14 21 0.32768000000000000000e5
-1960 3 8 13 -0.32768000000000000000e5
-1960 3 11 24 0.32768000000000000000e5
-1961 2 9 25 -0.32768000000000000000e5
-1961 2 14 22 0.32768000000000000000e5
-1962 2 11 25 -0.32768000000000000000e5
-1962 2 14 23 0.32768000000000000000e5
-1963 1 14 21 -0.65536000000000000000e5
-1963 1 17 32 0.32768000000000000000e5
-1963 1 18 33 0.16384000000000000000e5
-1963 1 18 35 0.32768000000000000000e5
-1963 1 20 27 0.16384000000000000000e5
-1963 1 29 36 0.32768000000000000000e5
-1963 2 11 25 0.16384000000000000000e5
-1963 2 14 24 0.16384000000000000000e5
-1963 2 14 25 0.32768000000000000000e5
-1963 3 12 25 0.32768000000000000000e5
-1963 3 14 15 0.65536000000000000000e5
-1964 1 12 43 0.32768000000000000000e5
-1964 1 13 44 -0.65536000000000000000e5
-1964 1 16 47 0.32768000000000000000e5
-1964 1 17 48 0.32768000000000000000e5
-1964 2 14 26 0.32768000000000000000e5
-1964 3 13 26 0.32768000000000000000e5
-1964 3 14 27 0.32768000000000000000e5
-1965 1 12 43 0.32768000000000000000e5
-1965 1 17 48 0.32768000000000000000e5
-1965 1 18 25 0.32768000000000000000e5
-1965 1 28 35 -0.65536000000000000000e5
-1965 2 14 27 0.32768000000000000000e5
-1965 3 14 19 -0.32768000000000000000e5
-1965 3 14 27 0.32768000000000000000e5
-1966 1 13 44 0.32768000000000000000e5
-1966 1 14 45 0.32768000000000000000e5
-1966 1 19 42 -0.65536000000000000000e5
-1966 1 28 35 0.32768000000000000000e5
-1966 2 14 29 0.32768000000000000000e5
-1967 1 11 46 0.32768000000000000000e5
-1967 1 14 45 0.32768000000000000000e5
-1967 1 28 35 0.32768000000000000000e5
-1967 1 29 36 -0.65536000000000000000e5
-1967 2 14 30 0.32768000000000000000e5
-1968 1 15 46 0.32768000000000000000e5
-1968 1 17 32 -0.32768000000000000000e5
-1968 1 18 33 -0.32768000000000000000e5
-1968 1 19 42 0.32768000000000000000e5
-1968 2 14 24 -0.32768000000000000000e5
-1968 2 14 31 0.32768000000000000000e5
-1968 3 12 25 -0.32768000000000000000e5
-1968 3 15 24 0.65536000000000000000e5
-1969 1 5 52 -0.16384000000000000000e5
-1969 1 11 42 0.16384000000000000000e5
-1969 1 12 43 0.32768000000000000000e5
-1969 1 13 52 -0.65536000000000000000e5
-1969 1 14 45 0.65536000000000000000e5
-1969 1 18 49 -0.32768000000000000000e5
-1969 2 12 26 -0.16384000000000000000e5
-1969 2 14 32 0.32768000000000000000e5
-1969 2 20 34 0.16384000000000000000e5
-1969 2 24 30 -0.32768000000000000000e5
-1969 3 2 31 -0.16384000000000000000e5
-1969 3 14 27 -0.32768000000000000000e5
-1969 3 15 28 -0.65536000000000000000e5
-1969 4 7 19 0.16384000000000000000e5
-1969 4 8 20 0.16384000000000000000e5
-1970 2 14 33 0.32768000000000000000e5
-1970 2 24 30 -0.32768000000000000000e5
-1971 2 14 34 0.32768000000000000000e5
-1971 2 15 33 -0.32768000000000000000e5
-1972 2 14 35 0.32768000000000000000e5
-1972 2 24 34 -0.32768000000000000000e5
-1973 2 7 13 -0.32768000000000000000e5
-1973 2 15 16 0.32768000000000000000e5
-1973 4 8 8 0.65536000000000000000e5
-1974 2 10 24 -0.32768000000000000000e5
-1974 2 15 17 0.32768000000000000000e5
-1975 1 4 19 0.32768000000000000000e5
-1975 1 5 36 0.32768000000000000000e5
-1975 1 17 32 -0.65536000000000000000e5
-1975 1 28 35 0.32768000000000000000e5
-1975 2 15 18 0.32768000000000000000e5
-1975 3 8 13 -0.32768000000000000000e5
-1975 3 11 24 0.32768000000000000000e5
-1976 2 9 25 -0.32768000000000000000e5
-1976 2 15 19 0.32768000000000000000e5
-1977 1 4 19 -0.16384000000000000000e5
-1977 1 5 20 -0.16384000000000000000e5
-1977 1 10 17 -0.32768000000000000000e5
-1977 1 13 16 -0.32768000000000000000e5
-1977 1 16 31 0.32768000000000000000e5
-1977 1 17 32 0.32768000000000000000e5
-1977 1 28 35 0.16384000000000000000e5
-1977 2 8 14 -0.16384000000000000000e5
-1977 2 11 13 -0.32768000000000000000e5
-1977 2 15 20 0.32768000000000000000e5
-1977 3 2 15 -0.16384000000000000000e5
-1977 3 8 13 -0.16384000000000000000e5
-1977 3 10 15 0.65536000000000000000e5
-1977 3 11 24 0.16384000000000000000e5
-1977 4 6 10 -0.16384000000000000000e5
-1978 2 11 25 -0.32768000000000000000e5
-1978 2 15 21 0.32768000000000000000e5
-1979 2 14 24 -0.32768000000000000000e5
-1979 2 15 22 0.32768000000000000000e5
-1980 1 4 19 0.81920000000000000000e4
-1980 1 5 20 0.81920000000000000000e4
-1980 1 10 17 0.16384000000000000000e5
-1980 1 13 16 0.16384000000000000000e5
-1980 1 17 32 0.32768000000000000000e5
-1980 1 18 33 0.16384000000000000000e5
-1980 1 19 34 -0.65536000000000000000e5
-1980 1 20 27 0.32768000000000000000e5
-1980 1 28 35 -0.81920000000000000000e4
-1980 1 29 36 0.32768000000000000000e5
-1980 2 8 14 0.81920000000000000000e4
-1980 2 11 13 0.16384000000000000000e5
-1980 2 11 25 0.16384000000000000000e5
-1980 2 14 24 0.16384000000000000000e5
-1980 2 15 23 0.32768000000000000000e5
-1980 3 2 15 0.81920000000000000000e4
-1980 3 8 13 0.81920000000000000000e4
-1980 3 10 15 -0.32768000000000000000e5
-1980 3 11 24 -0.81920000000000000000e4
-1980 3 12 25 0.32768000000000000000e5
-1980 4 6 10 0.81920000000000000000e4
-1981 1 14 21 -0.65536000000000000000e5
-1981 1 17 32 0.32768000000000000000e5
-1981 1 18 33 0.16384000000000000000e5
-1981 1 18 35 0.32768000000000000000e5
-1981 1 20 27 0.16384000000000000000e5
-1981 1 29 36 0.32768000000000000000e5
-1981 2 11 25 0.16384000000000000000e5
-1981 2 14 24 0.16384000000000000000e5
-1981 2 15 24 0.32768000000000000000e5
-1981 3 12 25 0.32768000000000000000e5
-1981 3 14 15 0.65536000000000000000e5
-1982 2 10 24 -0.32768000000000000000e5
-1982 2 15 26 0.32768000000000000000e5
-1982 4 10 14 0.32768000000000000000e5
-1983 1 13 44 0.32768000000000000000e5
-1983 1 14 45 0.32768000000000000000e5
-1983 1 19 42 -0.65536000000000000000e5
-1983 1 28 35 0.32768000000000000000e5
-1983 2 15 27 0.32768000000000000000e5
-1984 1 11 46 0.32768000000000000000e5
-1984 1 14 45 0.32768000000000000000e5
-1984 1 28 35 0.32768000000000000000e5
-1984 1 29 36 -0.65536000000000000000e5
-1984 2 15 28 0.32768000000000000000e5
-1985 1 15 46 0.32768000000000000000e5
-1985 1 17 32 -0.32768000000000000000e5
-1985 1 18 33 -0.32768000000000000000e5
-1985 1 19 42 0.32768000000000000000e5
-1985 2 14 24 -0.32768000000000000000e5
-1985 2 15 30 0.32768000000000000000e5
-1985 3 12 25 -0.32768000000000000000e5
-1985 3 15 24 0.65536000000000000000e5
-1986 1 4 19 -0.81920000000000000000e4
-1986 1 13 44 0.81920000000000000000e4
-1986 1 17 32 0.16384000000000000000e5
-1986 1 18 33 0.16384000000000000000e5
-1986 1 19 42 0.16384000000000000000e5
-1986 1 20 27 0.16384000000000000000e5
-1986 1 21 44 -0.65536000000000000000e5
-1986 1 29 36 0.32768000000000000000e5
-1986 1 33 36 0.32768000000000000000e5
-1986 2 14 24 0.16384000000000000000e5
-1986 2 15 29 0.16384000000000000000e5
-1986 2 15 31 0.32768000000000000000e5
-1986 3 8 13 0.81920000000000000000e4
-1986 3 10 23 -0.81920000000000000000e4
-1986 3 11 24 -0.81920000000000000000e4
-1986 3 12 25 0.16384000000000000000e5
-1986 3 15 24 -0.32768000000000000000e5
-1986 4 10 14 -0.81920000000000000000e4
-1987 1 13 52 0.32768000000000000000e5
-1987 1 14 45 0.32768000000000000000e5
-1987 1 19 50 -0.65536000000000000000e5
-1987 1 34 41 0.32768000000000000000e5
-1987 2 15 32 0.32768000000000000000e5
-1987 3 15 28 -0.32768000000000000000e5
-1988 2 15 34 0.32768000000000000000e5
-1988 2 25 31 -0.32768000000000000000e5
-1989 2 15 35 0.32768000000000000000e5
-1989 2 31 31 -0.65536000000000000000e5
-1990 1 1 48 0.32768000000000000000e5
-1990 1 2 33 -0.13107200000000000000e6
-1990 1 3 34 0.26214400000000000000e6
-1990 1 3 50 0.65536000000000000000e5
-1990 1 5 52 -0.13107200000000000000e6
-1990 1 7 38 -0.65536000000000000000e5
-1990 1 8 39 -0.65536000000000000000e5
-1990 1 10 41 -0.13107200000000000000e6
-1990 1 11 42 0.13107200000000000000e6
-1990 1 12 43 0.26214400000000000000e6
-1990 1 16 47 -0.26214400000000000000e6
-1990 1 22 37 0.32768000000000000000e5
-1990 1 23 38 0.32768000000000000000e5
-1990 1 28 43 -0.13107200000000000000e6
-1990 2 7 21 -0.13107200000000000000e6
-1990 2 10 32 0.13107200000000000000e6
-1990 2 12 26 -0.13107200000000000000e6
-1990 2 16 17 0.32768000000000000000e5
-1990 3 1 30 -0.65536000000000000000e5
-1990 3 2 31 -0.13107200000000000000e6
-1990 3 7 20 -0.13107200000000000000e6
-1990 3 8 21 -0.13107200000000000000e6
-1990 3 14 27 -0.26214400000000000000e6
-1990 4 5 17 -0.65536000000000000000e5
-1990 4 7 19 0.13107200000000000000e6
-1990 4 11 11 -0.65536000000000000000e5
-1991 2 3 17 -0.32768000000000000000e5
-1991 2 16 18 0.32768000000000000000e5
-1991 4 1 13 0.32768000000000000000e5
-1992 2 4 26 -0.32768000000000000000e5
-1992 2 16 19 0.32768000000000000000e5
-1993 1 1 24 -0.16384000000000000000e5
-1993 1 1 32 -0.65536000000000000000e5
-1993 1 1 40 -0.16384000000000000000e5
-1993 1 1 48 0.16384000000000000000e5
-1993 1 2 17 -0.13107200000000000000e6
-1993 1 2 33 -0.65536000000000000000e5
-1993 1 3 34 0.13107200000000000000e6
-1993 1 3 50 0.32768000000000000000e5
-1993 1 5 52 -0.65536000000000000000e5
-1993 1 6 37 -0.16384000000000000000e5
-1993 1 7 22 -0.32768000000000000000e5
-1993 1 7 38 0.32768000000000000000e5
-1993 1 8 23 -0.32768000000000000000e5
-1993 1 10 41 -0.65536000000000000000e5
-1993 1 11 42 0.13107200000000000000e6
-1993 1 12 27 0.13107200000000000000e6
-1993 1 12 43 0.26214400000000000000e6
-1993 1 16 47 -0.13107200000000000000e6
-1993 1 17 48 -0.13107200000000000000e6
-1993 1 22 37 0.16384000000000000000e5
-1993 1 23 38 0.16384000000000000000e5
-1993 1 28 43 -0.65536000000000000000e5
-1993 2 1 7 -0.32768000000000000000e5
-1993 2 1 31 0.65536000000000000000e5
-1993 2 2 16 -0.16384000000000000000e5
-1993 2 3 17 0.16384000000000000000e5
-1993 2 4 26 -0.16384000000000000000e5
-1993 2 6 20 -0.65536000000000000000e5
-1993 2 7 21 -0.65536000000000000000e5
-1993 2 8 22 0.65536000000000000000e5
-1993 2 10 32 0.65536000000000000000e5
-1993 2 12 26 -0.13107200000000000000e6
-1993 2 16 16 0.32768000000000000000e5
-1993 2 16 20 0.32768000000000000000e5
-1993 3 1 14 0.13107200000000000000e6
-1993 3 1 16 -0.16384000000000000000e5
-1993 3 1 30 -0.32768000000000000000e5
-1993 3 2 31 -0.65536000000000000000e5
-1993 3 3 16 -0.16384000000000000000e5
-1993 3 6 23 0.13107200000000000000e6
-1993 3 7 20 -0.13107200000000000000e6
-1993 3 8 21 -0.65536000000000000000e5
-1993 3 14 27 -0.26214400000000000000e6
-1993 4 1 5 0.32768000000000000000e5
-1993 4 1 13 -0.16384000000000000000e5
-1993 4 4 16 -0.65536000000000000000e5
-1993 4 5 17 -0.32768000000000000000e5
-1993 4 7 19 0.65536000000000000000e5
-1993 4 11 11 -0.32768000000000000000e5
-1994 1 1 48 0.16384000000000000000e5
-1994 1 2 33 0.65536000000000000000e5
-1994 1 2 49 0.16384000000000000000e5
-1994 1 3 34 -0.13107200000000000000e6
-1994 1 7 38 0.32768000000000000000e5
-1994 1 8 39 0.32768000000000000000e5
-1994 1 10 41 0.65536000000000000000e5
-1994 1 23 38 0.16384000000000000000e5
-1994 2 2 32 0.16384000000000000000e5
-1994 2 7 21 0.65536000000000000000e5
-1994 2 16 21 0.32768000000000000000e5
-1994 3 1 30 0.32768000000000000000e5
-1994 3 7 20 0.65536000000000000000e5
-1994 3 8 21 0.65536000000000000000e5
-1995 1 5 52 0.65536000000000000000e5
-1995 1 9 40 -0.32768000000000000000e5
-1995 1 10 41 0.65536000000000000000e5
-1995 1 17 48 -0.13107200000000000000e6
-1995 1 26 41 0.32768000000000000000e5
-1995 1 28 43 0.65536000000000000000e5
-1995 2 8 22 0.65536000000000000000e5
-1995 2 16 22 0.32768000000000000000e5
-1995 2 16 30 -0.32768000000000000000e5
-1995 3 1 30 0.32768000000000000000e5
-1995 3 2 31 -0.65536000000000000000e5
-1995 4 4 16 -0.65536000000000000000e5
-1995 4 6 18 -0.32768000000000000000e5
-1995 4 7 19 -0.65536000000000000000e5
-1996 2 1 31 -0.32768000000000000000e5
-1996 2 16 23 0.32768000000000000000e5
-1997 1 2 33 -0.32768000000000000000e5
-1997 1 3 34 0.65536000000000000000e5
-1997 1 11 42 0.32768000000000000000e5
-1997 1 12 43 0.65536000000000000000e5
-1997 1 16 47 -0.65536000000000000000e5
-1997 1 17 48 -0.65536000000000000000e5
-1997 2 7 21 -0.32768000000000000000e5
-1997 2 8 22 0.32768000000000000000e5
-1997 2 12 26 -0.32768000000000000000e5
-1997 2 16 24 0.32768000000000000000e5
-1997 3 7 20 -0.32768000000000000000e5
-1997 3 8 21 -0.32768000000000000000e5
-1997 3 13 26 -0.65536000000000000000e5
-1997 3 14 27 -0.65536000000000000000e5
-1997 4 4 16 -0.32768000000000000000e5
-1998 1 2 17 0.32768000000000000000e5
-1998 1 4 19 0.65536000000000000000e5
-1998 1 12 43 0.32768000000000000000e5
-1998 1 16 47 0.32768000000000000000e5
-1998 1 20 27 -0.13107200000000000000e6
-1998 1 28 35 0.65536000000000000000e5
-1998 2 10 24 0.65536000000000000000e5
-1998 2 16 25 0.32768000000000000000e5
-1998 3 1 14 -0.32768000000000000000e5
-1998 3 6 23 -0.32768000000000000000e5
-1998 3 8 13 -0.65536000000000000000e5
-1998 3 10 23 0.65536000000000000000e5
-1998 3 11 24 0.65536000000000000000e5
-1998 3 13 26 0.32768000000000000000e5
-1999 1 1 48 0.32768000000000000000e5
-1999 1 2 33 -0.13107200000000000000e6
-1999 1 3 34 0.26214400000000000000e6
-1999 1 3 50 0.65536000000000000000e5
-1999 1 5 52 -0.13107200000000000000e6
-1999 1 7 38 -0.65536000000000000000e5
-1999 1 8 39 -0.65536000000000000000e5
-1999 1 10 41 -0.13107200000000000000e6
-1999 1 11 42 0.13107200000000000000e6
-1999 1 12 43 0.26214400000000000000e6
-1999 1 16 47 -0.26214400000000000000e6
-1999 1 22 37 0.32768000000000000000e5
-1999 1 23 38 0.32768000000000000000e5
-1999 1 28 43 -0.13107200000000000000e6
-1999 2 7 21 -0.13107200000000000000e6
-1999 2 10 32 0.13107200000000000000e6
-1999 2 12 26 -0.13107200000000000000e6
-1999 2 16 26 0.32768000000000000000e5
-1999 3 1 30 -0.65536000000000000000e5
-1999 3 2 31 -0.13107200000000000000e6
-1999 3 7 20 -0.13107200000000000000e6
-1999 3 8 21 -0.13107200000000000000e6
-1999 3 14 27 -0.26214400000000000000e6
-1999 4 5 17 -0.65536000000000000000e5
-1999 4 7 19 0.13107200000000000000e6
-2000 2 2 32 -0.32768000000000000000e5
-2000 2 16 27 0.32768000000000000000e5
-2001 1 2 49 0.32768000000000000000e5
-2001 1 3 50 -0.65536000000000000000e5
-2001 1 23 38 0.32768000000000000000e5
-2001 1 24 39 0.32768000000000000000e5
-2001 2 16 28 0.32768000000000000000e5
-2002 1 1 48 0.16384000000000000000e5
-2002 1 2 33 0.65536000000000000000e5
-2002 1 2 49 0.16384000000000000000e5
-2002 1 3 34 -0.13107200000000000000e6
-2002 1 7 38 0.32768000000000000000e5
-2002 1 8 39 0.32768000000000000000e5
-2002 1 10 41 0.65536000000000000000e5
-2002 1 23 38 0.16384000000000000000e5
-2002 2 2 32 0.16384000000000000000e5
-2002 2 7 21 0.65536000000000000000e5
-2002 2 16 29 0.32768000000000000000e5
-2002 3 1 30 0.32768000000000000000e5
-2002 3 7 20 0.65536000000000000000e5
-2002 3 8 21 0.65536000000000000000e5
-2002 4 5 17 0.32768000000000000000e5
-2003 2 10 32 -0.32768000000000000000e5
-2003 2 16 31 0.32768000000000000000e5
-2004 2 1 35 -0.32768000000000000000e5
-2004 2 16 32 0.32768000000000000000e5
-2005 2 16 33 0.32768000000000000000e5
-2005 2 26 32 -0.32768000000000000000e5
-2005 4 17 17 -0.65536000000000000000e5
-2006 1 3 50 -0.32768000000000000000e5
-2006 1 7 54 0.32768000000000000000e5
-2006 1 11 42 0.65536000000000000000e5
-2006 1 12 43 0.13107200000000000000e6
-2006 1 17 48 -0.13107200000000000000e6
-2006 1 37 44 -0.65536000000000000000e5
-2006 2 8 22 0.65536000000000000000e5
-2006 2 12 26 -0.65536000000000000000e5
-2006 2 16 30 -0.32768000000000000000e5
-2006 2 16 34 0.32768000000000000000e5
-2006 3 2 31 -0.65536000000000000000e5
-2006 3 14 27 -0.13107200000000000000e6
-2006 3 16 29 -0.32768000000000000000e5
-2006 3 17 30 -0.32768000000000000000e5
-2006 4 4 16 -0.65536000000000000000e5
-2007 2 16 35 0.32768000000000000000e5
-2007 2 26 32 -0.32768000000000000000e5
-2008 2 3 17 -0.16384000000000000000e5
-2008 2 17 17 0.32768000000000000000e5
-2008 4 1 13 0.16384000000000000000e5
-2009 2 4 26 -0.32768000000000000000e5
-2009 2 17 18 0.32768000000000000000e5
-2010 1 3 26 -0.32768000000000000000e5
-2010 1 6 37 0.32768000000000000000e5
-2010 1 9 40 0.65536000000000000000e5
-2010 1 10 25 -0.65536000000000000000e5
-2010 2 4 18 -0.32768000000000000000e5
-2010 2 17 19 0.32768000000000000000e5
-2010 3 4 17 -0.32768000000000000000e5
-2010 3 5 18 -0.32768000000000000000e5
-2010 3 6 19 -0.65536000000000000000e5
-2010 3 8 21 0.13107200000000000000e6
-2010 4 3 15 -0.65536000000000000000e5
-2011 1 1 48 0.16384000000000000000e5
-2011 1 2 33 0.65536000000000000000e5
-2011 1 2 49 0.16384000000000000000e5
-2011 1 3 34 -0.13107200000000000000e6
-2011 1 7 38 0.32768000000000000000e5
-2011 1 8 39 0.32768000000000000000e5
-2011 1 10 41 0.65536000000000000000e5
-2011 1 23 38 0.16384000000000000000e5
-2011 2 2 32 0.16384000000000000000e5
-2011 2 7 21 0.65536000000000000000e5
-2011 2 17 20 0.32768000000000000000e5
-2011 3 1 30 0.32768000000000000000e5
-2011 3 7 20 0.65536000000000000000e5
-2011 3 8 21 0.65536000000000000000e5
-2012 1 5 52 0.65536000000000000000e5
-2012 1 9 40 -0.32768000000000000000e5
-2012 1 10 41 0.65536000000000000000e5
-2012 1 17 48 -0.13107200000000000000e6
-2012 1 26 41 0.32768000000000000000e5
-2012 1 28 43 0.65536000000000000000e5
-2012 2 8 22 0.65536000000000000000e5
-2012 2 16 30 -0.32768000000000000000e5
-2012 2 17 21 0.32768000000000000000e5
-2012 3 1 30 0.32768000000000000000e5
-2012 3 2 31 -0.65536000000000000000e5
-2012 4 4 16 -0.65536000000000000000e5
-2012 4 6 18 -0.32768000000000000000e5
-2012 4 7 19 -0.65536000000000000000e5
-2013 1 1 48 -0.16384000000000000000e5
-2013 1 2 49 -0.16384000000000000000e5
-2013 1 5 52 0.65536000000000000000e5
-2013 1 11 42 0.65536000000000000000e5
-2013 1 12 43 0.13107200000000000000e6
-2013 1 17 48 -0.26214400000000000000e6
-2013 1 23 38 -0.16384000000000000000e5
-2013 1 26 41 0.32768000000000000000e5
-2013 1 28 43 0.65536000000000000000e5
-2013 2 2 32 -0.16384000000000000000e5
-2013 2 8 22 0.13107200000000000000e6
-2013 2 12 26 -0.65536000000000000000e5
-2013 2 16 30 -0.32768000000000000000e5
-2013 2 17 22 0.32768000000000000000e5
-2013 3 2 31 -0.65536000000000000000e5
-2013 3 14 27 -0.13107200000000000000e6
-2013 4 4 16 -0.13107200000000000000e6
-2013 4 6 18 -0.32768000000000000000e5
-2013 4 7 19 -0.65536000000000000000e5
-2014 1 2 33 -0.32768000000000000000e5
-2014 1 3 34 0.65536000000000000000e5
-2014 1 11 42 0.32768000000000000000e5
-2014 1 12 43 0.65536000000000000000e5
-2014 1 16 47 -0.65536000000000000000e5
-2014 1 17 48 -0.65536000000000000000e5
-2014 2 7 21 -0.32768000000000000000e5
-2014 2 8 22 0.32768000000000000000e5
-2014 2 12 26 -0.32768000000000000000e5
-2014 2 17 23 0.32768000000000000000e5
-2014 3 7 20 -0.32768000000000000000e5
-2014 3 8 21 -0.32768000000000000000e5
-2014 3 13 26 -0.65536000000000000000e5
-2014 3 14 27 -0.65536000000000000000e5
-2014 4 4 16 -0.32768000000000000000e5
-2015 2 12 26 -0.32768000000000000000e5
-2015 2 17 24 0.32768000000000000000e5
-2016 1 12 43 0.32768000000000000000e5
-2016 1 13 44 -0.65536000000000000000e5
-2016 1 16 47 0.32768000000000000000e5
-2016 1 17 48 0.32768000000000000000e5
-2016 2 17 25 0.32768000000000000000e5
-2016 3 13 26 0.32768000000000000000e5
-2016 3 14 27 0.32768000000000000000e5
-2017 2 2 32 -0.32768000000000000000e5
-2017 2 17 26 0.32768000000000000000e5
-2018 1 2 49 0.32768000000000000000e5
-2018 1 3 50 -0.65536000000000000000e5
-2018 1 23 38 0.32768000000000000000e5
-2018 1 24 39 0.32768000000000000000e5
-2018 2 17 27 0.32768000000000000000e5
-2019 2 3 33 -0.32768000000000000000e5
-2019 2 17 28 0.32768000000000000000e5
-2020 2 16 30 -0.32768000000000000000e5
-2020 2 17 29 0.32768000000000000000e5
-2021 1 1 48 -0.16384000000000000000e5
-2021 1 2 49 -0.16384000000000000000e5
-2021 1 5 52 0.65536000000000000000e5
-2021 1 11 42 0.65536000000000000000e5
-2021 1 12 43 0.13107200000000000000e6
-2021 1 17 48 -0.26214400000000000000e6
-2021 1 23 38 -0.16384000000000000000e5
-2021 1 26 41 0.32768000000000000000e5
-2021 1 28 43 0.65536000000000000000e5
-2021 2 2 32 -0.16384000000000000000e5
-2021 2 8 22 0.13107200000000000000e6
-2021 2 12 26 -0.65536000000000000000e5
-2021 2 16 30 -0.32768000000000000000e5
-2021 2 17 30 0.32768000000000000000e5
-2021 3 2 31 -0.65536000000000000000e5
-2021 3 14 27 -0.13107200000000000000e6
-2021 4 4 16 -0.13107200000000000000e6
-2021 4 7 19 -0.65536000000000000000e5
-2022 2 17 31 0.32768000000000000000e5
-2022 2 20 34 -0.32768000000000000000e5
-2022 4 8 20 -0.32768000000000000000e5
-2023 2 17 32 0.32768000000000000000e5
-2023 2 26 32 -0.32768000000000000000e5
-2023 4 17 17 -0.65536000000000000000e5
-2024 2 17 33 0.32768000000000000000e5
-2024 2 18 32 -0.32768000000000000000e5
-2025 1 1 48 -0.16384000000000000000e5
-2025 1 2 49 -0.16384000000000000000e5
-2025 1 3 50 -0.32768000000000000000e5
-2025 1 7 54 0.32768000000000000000e5
-2025 1 11 42 0.65536000000000000000e5
-2025 1 12 43 0.13107200000000000000e6
-2025 1 17 48 -0.13107200000000000000e6
-2025 1 23 38 -0.16384000000000000000e5
-2025 1 26 41 0.32768000000000000000e5
-2025 1 32 47 -0.65536000000000000000e5
-2025 2 2 32 -0.16384000000000000000e5
-2025 2 8 22 0.65536000000000000000e5
-2025 2 12 26 -0.65536000000000000000e5
-2025 2 16 30 -0.32768000000000000000e5
-2025 2 17 34 0.32768000000000000000e5
-2025 3 2 31 -0.65536000000000000000e5
-2025 3 14 27 -0.13107200000000000000e6
-2025 3 17 30 -0.32768000000000000000e5
-2025 3 22 27 -0.32768000000000000000e5
-2025 4 4 16 -0.65536000000000000000e5
-2026 1 2 49 -0.32768000000000000000e5
-2026 1 7 54 0.65536000000000000000e5
-2026 1 22 53 -0.32768000000000000000e5
-2026 1 24 39 -0.32768000000000000000e5
-2026 2 3 33 -0.32768000000000000000e5
-2026 2 17 35 0.32768000000000000000e5
-2026 2 26 32 -0.32768000000000000000e5
-2026 3 4 33 -0.32768000000000000000e5
-2026 3 6 35 -0.65536000000000000000e5
-2026 3 17 30 0.65536000000000000000e5
-2026 3 19 32 -0.32768000000000000000e5
-2026 3 20 33 0.65536000000000000000e5
-2027 1 3 26 -0.16384000000000000000e5
-2027 1 6 37 0.16384000000000000000e5
-2027 1 9 40 0.32768000000000000000e5
-2027 1 10 25 -0.32768000000000000000e5
-2027 2 4 18 -0.16384000000000000000e5
-2027 2 18 18 0.32768000000000000000e5
-2027 3 4 17 -0.16384000000000000000e5
-2027 3 5 18 -0.16384000000000000000e5
-2027 3 6 19 -0.32768000000000000000e5
-2027 3 8 21 0.65536000000000000000e5
-2027 4 3 15 -0.32768000000000000000e5
-2028 2 5 27 -0.32768000000000000000e5
-2028 2 18 19 0.32768000000000000000e5
-2029 1 5 52 0.65536000000000000000e5
-2029 1 9 40 -0.32768000000000000000e5
-2029 1 10 41 0.65536000000000000000e5
-2029 1 17 48 -0.13107200000000000000e6
-2029 1 26 41 0.32768000000000000000e5
-2029 1 28 43 0.65536000000000000000e5
-2029 2 8 22 0.65536000000000000000e5
-2029 2 16 30 -0.32768000000000000000e5
-2029 2 18 20 0.32768000000000000000e5
-2029 3 1 30 0.32768000000000000000e5
-2029 3 2 31 -0.65536000000000000000e5
-2029 4 4 16 -0.65536000000000000000e5
-2029 4 6 18 -0.32768000000000000000e5
-2029 4 7 19 -0.65536000000000000000e5
-2030 1 1 48 -0.16384000000000000000e5
-2030 1 2 49 -0.16384000000000000000e5
-2030 1 5 52 0.65536000000000000000e5
-2030 1 11 42 0.65536000000000000000e5
-2030 1 12 43 0.13107200000000000000e6
-2030 1 17 48 -0.26214400000000000000e6
-2030 1 23 38 -0.16384000000000000000e5
-2030 1 26 41 0.32768000000000000000e5
-2030 1 28 43 0.65536000000000000000e5
-2030 2 2 32 -0.16384000000000000000e5
-2030 2 8 22 0.13107200000000000000e6
-2030 2 12 26 -0.65536000000000000000e5
-2030 2 16 30 -0.32768000000000000000e5
-2030 2 18 21 0.32768000000000000000e5
-2030 3 2 31 -0.65536000000000000000e5
-2030 3 14 27 -0.13107200000000000000e6
-2030 4 4 16 -0.13107200000000000000e6
-2030 4 6 18 -0.32768000000000000000e5
-2030 4 7 19 -0.65536000000000000000e5
-2031 1 1 48 -0.16384000000000000000e5
-2031 1 2 49 -0.16384000000000000000e5
-2031 1 5 52 0.65536000000000000000e5
-2031 1 8 39 -0.32768000000000000000e5
-2031 1 10 41 0.13107200000000000000e6
-2031 1 11 42 0.13107200000000000000e6
-2031 1 12 43 0.13107200000000000000e6
-2031 1 17 48 -0.39321600000000000000e6
-2031 1 23 38 -0.16384000000000000000e5
-2031 1 26 29 0.32768000000000000000e5
-2031 1 26 41 0.32768000000000000000e5
-2031 1 28 43 0.65536000000000000000e5
-2031 2 2 32 -0.16384000000000000000e5
-2031 2 8 22 0.19660800000000000000e6
-2031 2 12 26 -0.65536000000000000000e5
-2031 2 16 30 -0.32768000000000000000e5
-2031 2 18 22 0.32768000000000000000e5
-2031 3 2 31 -0.65536000000000000000e5
-2031 3 14 27 -0.26214400000000000000e6
-2031 4 4 16 -0.19660800000000000000e6
-2031 4 6 18 -0.32768000000000000000e5
-2031 4 7 19 -0.65536000000000000000e5
-2032 2 12 26 -0.32768000000000000000e5
-2032 2 18 23 0.32768000000000000000e5
-2033 2 8 22 -0.32768000000000000000e5
-2033 2 18 24 0.32768000000000000000e5
-2033 4 4 16 0.32768000000000000000e5
-2034 1 12 43 0.32768000000000000000e5
-2034 1 17 48 0.32768000000000000000e5
-2034 1 18 25 0.32768000000000000000e5
-2034 1 28 35 -0.65536000000000000000e5
-2034 2 18 25 0.32768000000000000000e5
-2034 3 14 19 -0.32768000000000000000e5
-2034 3 14 27 0.32768000000000000000e5
-2035 1 2 49 0.32768000000000000000e5
-2035 1 3 50 -0.65536000000000000000e5
-2035 1 23 38 0.32768000000000000000e5
-2035 1 24 39 0.32768000000000000000e5
-2035 2 18 26 0.32768000000000000000e5
-2036 2 3 33 -0.32768000000000000000e5
-2036 2 18 27 0.32768000000000000000e5
-2037 1 1 48 -0.32768000000000000000e5
-2037 1 2 49 -0.65536000000000000000e5
-2037 1 3 50 -0.65536000000000000000e5
-2037 1 11 42 0.13107200000000000000e6
-2037 1 12 43 0.26214400000000000000e6
-2037 1 17 48 -0.26214400000000000000e6
-2037 1 23 38 -0.32768000000000000000e5
-2037 1 25 40 0.32768000000000000000e5
-2037 1 26 41 -0.65536000000000000000e5
-2037 2 2 32 -0.32768000000000000000e5
-2037 2 3 33 -0.32768000000000000000e5
-2037 2 8 22 0.13107200000000000000e6
-2037 2 12 26 -0.13107200000000000000e6
-2037 2 16 30 -0.65536000000000000000e5
-2037 2 18 28 0.32768000000000000000e5
-2037 3 2 31 -0.13107200000000000000e6
-2037 3 14 27 -0.26214400000000000000e6
-2037 4 4 16 -0.13107200000000000000e6
-2038 1 1 48 -0.16384000000000000000e5
-2038 1 2 49 -0.16384000000000000000e5
-2038 1 5 52 0.65536000000000000000e5
-2038 1 11 42 0.65536000000000000000e5
-2038 1 12 43 0.13107200000000000000e6
-2038 1 17 48 -0.26214400000000000000e6
-2038 1 23 38 -0.16384000000000000000e5
-2038 1 26 41 0.32768000000000000000e5
-2038 1 28 43 0.65536000000000000000e5
-2038 2 2 32 -0.16384000000000000000e5
-2038 2 8 22 0.13107200000000000000e6
-2038 2 12 26 -0.65536000000000000000e5
-2038 2 16 30 -0.32768000000000000000e5
-2038 2 18 29 0.32768000000000000000e5
-2038 3 2 31 -0.65536000000000000000e5
-2038 3 14 27 -0.13107200000000000000e6
-2038 4 4 16 -0.13107200000000000000e6
-2038 4 7 19 -0.65536000000000000000e5
-2039 2 4 34 -0.32768000000000000000e5
-2039 2 18 30 0.32768000000000000000e5
-2040 2 8 22 -0.32768000000000000000e5
-2040 2 18 31 0.32768000000000000000e5
-2040 4 4 16 0.32768000000000000000e5
-2040 4 7 19 0.32768000000000000000e5
-2041 1 1 48 -0.32768000000000000000e5
-2041 1 2 49 -0.65536000000000000000e5
-2041 1 3 50 -0.65536000000000000000e5
-2041 1 6 53 0.32768000000000000000e5
-2041 1 11 42 0.13107200000000000000e6
-2041 1 12 43 0.26214400000000000000e6
-2041 1 17 48 -0.26214400000000000000e6
-2041 1 23 38 -0.32768000000000000000e5
-2041 1 26 41 -0.65536000000000000000e5
-2041 2 2 32 -0.32768000000000000000e5
-2041 2 8 22 0.13107200000000000000e6
-2041 2 12 26 -0.13107200000000000000e6
-2041 2 16 30 -0.65536000000000000000e5
-2041 2 18 32 -0.32768000000000000000e5
-2041 2 18 33 0.32768000000000000000e5
-2041 3 2 31 -0.13107200000000000000e6
-2041 3 3 32 0.32768000000000000000e5
-2041 3 14 27 -0.26214400000000000000e6
-2041 3 17 30 -0.65536000000000000000e5
-2041 3 22 27 0.65536000000000000000e5
-2041 4 4 16 -0.13107200000000000000e6
-2042 2 4 34 -0.32768000000000000000e5
-2042 2 18 34 0.32768000000000000000e5
-2042 3 5 34 -0.32768000000000000000e5
-2042 3 17 30 -0.32768000000000000000e5
-2042 3 18 31 0.65536000000000000000e5
-2042 3 22 27 -0.32768000000000000000e5
-2043 1 1 48 -0.32768000000000000000e5
-2043 1 2 49 -0.65536000000000000000e5
-2043 1 3 50 -0.65536000000000000000e5
-2043 1 11 42 0.13107200000000000000e6
-2043 1 12 43 0.26214400000000000000e6
-2043 1 17 48 -0.26214400000000000000e6
-2043 1 23 38 -0.32768000000000000000e5
-2043 1 23 54 0.32768000000000000000e5
-2043 1 24 39 -0.32768000000000000000e5
-2043 1 24 55 -0.65536000000000000000e5
-2043 1 25 56 0.32768000000000000000e5
-2043 2 2 32 -0.32768000000000000000e5
-2043 2 3 33 -0.32768000000000000000e5
-2043 2 8 22 0.13107200000000000000e6
-2043 2 12 26 -0.13107200000000000000e6
-2043 2 16 30 -0.65536000000000000000e5
-2043 2 18 35 0.32768000000000000000e5
-2043 3 2 31 -0.13107200000000000000e6
-2043 3 4 33 -0.32768000000000000000e5
-2043 3 14 27 -0.26214400000000000000e6
-2043 3 19 32 -0.32768000000000000000e5
-2043 3 28 33 0.32768000000000000000e5
-2043 4 4 16 -0.13107200000000000000e6
-2044 1 1 48 -0.16384000000000000000e5
-2044 1 2 49 -0.16384000000000000000e5
-2044 1 5 52 0.65536000000000000000e5
-2044 1 11 42 0.65536000000000000000e5
-2044 1 12 43 0.13107200000000000000e6
-2044 1 17 48 -0.26214400000000000000e6
-2044 1 23 38 -0.16384000000000000000e5
-2044 1 26 41 0.32768000000000000000e5
-2044 1 28 43 0.65536000000000000000e5
-2044 2 2 32 -0.16384000000000000000e5
-2044 2 8 22 0.13107200000000000000e6
-2044 2 12 26 -0.65536000000000000000e5
-2044 2 16 30 -0.32768000000000000000e5
-2044 2 19 20 0.32768000000000000000e5
-2044 3 2 31 -0.65536000000000000000e5
-2044 3 14 27 -0.13107200000000000000e6
-2044 4 4 16 -0.13107200000000000000e6
-2044 4 6 18 -0.32768000000000000000e5
-2044 4 7 19 -0.65536000000000000000e5
-2045 1 1 48 -0.16384000000000000000e5
-2045 1 2 49 -0.16384000000000000000e5
-2045 1 5 52 0.65536000000000000000e5
-2045 1 8 39 -0.32768000000000000000e5
-2045 1 10 41 0.13107200000000000000e6
-2045 1 11 42 0.13107200000000000000e6
-2045 1 12 43 0.13107200000000000000e6
-2045 1 17 48 -0.39321600000000000000e6
-2045 1 23 38 -0.16384000000000000000e5
-2045 1 26 29 0.32768000000000000000e5
-2045 1 26 41 0.32768000000000000000e5
-2045 1 28 43 0.65536000000000000000e5
-2045 2 2 32 -0.16384000000000000000e5
-2045 2 8 22 0.19660800000000000000e6
-2045 2 12 26 -0.65536000000000000000e5
-2045 2 16 30 -0.32768000000000000000e5
-2045 2 19 21 0.32768000000000000000e5
-2045 3 2 31 -0.65536000000000000000e5
-2045 3 14 27 -0.26214400000000000000e6
-2045 4 4 16 -0.19660800000000000000e6
-2045 4 6 18 -0.32768000000000000000e5
-2045 4 7 19 -0.65536000000000000000e5
-2046 1 6 43 0.32768000000000000000e5
-2046 1 9 40 0.32768000000000000000e5
-2046 1 11 42 -0.65536000000000000000e5
-2046 1 26 29 0.32768000000000000000e5
-2046 2 19 22 0.32768000000000000000e5
-2047 2 8 22 -0.32768000000000000000e5
-2047 2 19 23 0.32768000000000000000e5
-2047 4 4 16 0.32768000000000000000e5
-2048 1 10 41 -0.32768000000000000000e5
-2048 1 17 48 0.65536000000000000000e5
-2048 1 18 25 -0.65536000000000000000e5
-2048 1 26 33 0.32768000000000000000e5
-2048 2 8 22 -0.32768000000000000000e5
-2048 2 19 24 0.32768000000000000000e5
-2048 3 14 19 0.65536000000000000000e5
-2048 3 14 27 0.65536000000000000000e5
-2048 4 4 16 0.32768000000000000000e5
-2049 2 14 28 -0.32768000000000000000e5
-2049 2 19 25 0.32768000000000000000e5
-2050 2 3 33 -0.32768000000000000000e5
-2050 2 19 26 0.32768000000000000000e5
-2051 1 1 48 -0.32768000000000000000e5
-2051 1 2 49 -0.65536000000000000000e5
-2051 1 3 50 -0.65536000000000000000e5
-2051 1 11 42 0.13107200000000000000e6
-2051 1 12 43 0.26214400000000000000e6
-2051 1 17 48 -0.26214400000000000000e6
-2051 1 23 38 -0.32768000000000000000e5
-2051 1 25 40 0.32768000000000000000e5
-2051 1 26 41 -0.65536000000000000000e5
-2051 2 2 32 -0.32768000000000000000e5
-2051 2 3 33 -0.32768000000000000000e5
-2051 2 8 22 0.13107200000000000000e6
-2051 2 12 26 -0.13107200000000000000e6
-2051 2 16 30 -0.65536000000000000000e5
-2051 2 19 27 0.32768000000000000000e5
-2051 3 2 31 -0.13107200000000000000e6
-2051 3 14 27 -0.26214400000000000000e6
-2051 4 4 16 -0.13107200000000000000e6
-2052 1 1 48 -0.65536000000000000000e5
-2052 1 2 49 -0.98304000000000000000e5
-2052 1 3 50 -0.13107200000000000000e6
-2052 1 6 49 0.32768000000000000000e5
-2052 1 11 42 0.26214400000000000000e6
-2052 1 12 43 0.52428800000000000000e6
-2052 1 17 48 -0.52428800000000000000e6
-2052 1 23 38 -0.65536000000000000000e5
-2052 1 24 39 -0.32768000000000000000e5
-2052 1 25 40 0.32768000000000000000e5
-2052 1 26 41 0.65536000000000000000e5
-2052 1 28 43 -0.13107200000000000000e6
-2052 2 2 32 -0.65536000000000000000e5
-2052 2 3 33 -0.32768000000000000000e5
-2052 2 4 34 0.65536000000000000000e5
-2052 2 8 22 0.26214400000000000000e6
-2052 2 12 26 -0.26214400000000000000e6
-2052 2 16 30 -0.13107200000000000000e6
-2052 2 19 28 0.32768000000000000000e5
-2052 3 2 31 -0.26214400000000000000e6
-2052 3 14 27 -0.52428800000000000000e6
-2052 4 4 16 -0.26214400000000000000e6
-2053 2 4 34 -0.32768000000000000000e5
-2053 2 19 29 0.32768000000000000000e5
-2054 2 19 30 0.32768000000000000000e5
-2054 2 22 28 -0.32768000000000000000e5
-2055 1 5 52 0.32768000000000000000e5
-2055 1 14 45 -0.13107200000000000000e6
-2055 1 17 48 0.65536000000000000000e5
-2055 1 18 49 0.65536000000000000000e5
-2055 1 28 43 0.32768000000000000000e5
-2055 1 33 40 0.32768000000000000000e5
-2055 2 19 31 0.32768000000000000000e5
-2055 2 24 30 0.65536000000000000000e5
-2055 3 15 28 0.13107200000000000000e6
-2056 1 1 48 -0.32768000000000000000e5
-2056 1 2 49 -0.65536000000000000000e5
-2056 1 3 50 -0.65536000000000000000e5
-2056 1 6 53 0.32768000000000000000e5
-2056 1 11 42 0.13107200000000000000e6
-2056 1 12 43 0.26214400000000000000e6
-2056 1 17 48 -0.26214400000000000000e6
-2056 1 23 38 -0.32768000000000000000e5
-2056 1 26 41 -0.65536000000000000000e5
-2056 2 2 32 -0.32768000000000000000e5
-2056 2 8 22 0.13107200000000000000e6
-2056 2 12 26 -0.13107200000000000000e6
-2056 2 16 30 -0.65536000000000000000e5
-2056 2 18 32 -0.32768000000000000000e5
-2056 2 19 32 0.32768000000000000000e5
-2056 3 2 31 -0.13107200000000000000e6
-2056 3 3 32 0.32768000000000000000e5
-2056 3 14 27 -0.26214400000000000000e6
-2056 3 17 30 -0.65536000000000000000e5
-2056 3 22 27 0.65536000000000000000e5
-2056 4 4 16 -0.13107200000000000000e6
-2057 2 5 35 -0.32768000000000000000e5
-2057 2 19 33 0.32768000000000000000e5
-2058 2 19 34 0.32768000000000000000e5
-2058 2 28 30 -0.32768000000000000000e5
-2059 2 1 31 -0.16384000000000000000e5
-2059 2 20 20 0.32768000000000000000e5
-2060 1 2 33 -0.32768000000000000000e5
-2060 1 3 34 0.65536000000000000000e5
-2060 1 11 42 0.32768000000000000000e5
-2060 1 12 43 0.65536000000000000000e5
-2060 1 16 47 -0.65536000000000000000e5
-2060 1 17 48 -0.65536000000000000000e5
-2060 2 7 21 -0.32768000000000000000e5
-2060 2 8 22 0.32768000000000000000e5
-2060 2 12 26 -0.32768000000000000000e5
-2060 2 20 21 0.32768000000000000000e5
-2060 3 7 20 -0.32768000000000000000e5
-2060 3 8 21 -0.32768000000000000000e5
-2060 3 13 26 -0.65536000000000000000e5
-2060 3 14 27 -0.65536000000000000000e5
-2060 4 4 16 -0.32768000000000000000e5
-2061 2 12 26 -0.32768000000000000000e5
-2061 2 20 22 0.32768000000000000000e5
-2062 1 2 17 0.32768000000000000000e5
-2062 1 4 19 0.65536000000000000000e5
-2062 1 12 43 0.32768000000000000000e5
-2062 1 16 47 0.32768000000000000000e5
-2062 1 20 27 -0.13107200000000000000e6
-2062 1 28 35 0.65536000000000000000e5
-2062 2 10 24 0.65536000000000000000e5
-2062 2 20 23 0.32768000000000000000e5
-2062 3 1 14 -0.32768000000000000000e5
-2062 3 6 23 -0.32768000000000000000e5
-2062 3 8 13 -0.65536000000000000000e5
-2062 3 10 23 0.65536000000000000000e5
-2062 3 11 24 0.65536000000000000000e5
-2062 3 13 26 0.32768000000000000000e5
-2063 1 12 43 0.32768000000000000000e5
-2063 1 13 44 -0.65536000000000000000e5
-2063 1 16 47 0.32768000000000000000e5
-2063 1 17 48 0.32768000000000000000e5
-2063 2 20 24 0.32768000000000000000e5
-2063 3 13 26 0.32768000000000000000e5
-2063 3 14 27 0.32768000000000000000e5
-2064 2 10 24 -0.32768000000000000000e5
-2064 2 20 25 0.32768000000000000000e5
-2064 4 10 14 0.32768000000000000000e5
-2065 1 1 48 0.16384000000000000000e5
-2065 1 2 33 0.65536000000000000000e5
-2065 1 2 49 0.16384000000000000000e5
-2065 1 3 34 -0.13107200000000000000e6
-2065 1 7 38 0.32768000000000000000e5
-2065 1 8 39 0.32768000000000000000e5
-2065 1 10 41 0.65536000000000000000e5
-2065 1 23 38 0.16384000000000000000e5
-2065 2 2 32 0.16384000000000000000e5
-2065 2 7 21 0.65536000000000000000e5
-2065 2 20 26 0.32768000000000000000e5
-2065 3 1 30 0.32768000000000000000e5
-2065 3 7 20 0.65536000000000000000e5
-2065 3 8 21 0.65536000000000000000e5
-2065 4 5 17 0.32768000000000000000e5
-2066 2 16 30 -0.32768000000000000000e5
-2066 2 20 27 0.32768000000000000000e5
-2067 1 1 48 -0.16384000000000000000e5
-2067 1 2 49 -0.16384000000000000000e5
-2067 1 5 52 0.65536000000000000000e5
-2067 1 11 42 0.65536000000000000000e5
-2067 1 12 43 0.13107200000000000000e6
-2067 1 17 48 -0.26214400000000000000e6
-2067 1 23 38 -0.16384000000000000000e5
-2067 1 26 41 0.32768000000000000000e5
-2067 1 28 43 0.65536000000000000000e5
-2067 2 2 32 -0.16384000000000000000e5
-2067 2 8 22 0.13107200000000000000e6
-2067 2 12 26 -0.65536000000000000000e5
-2067 2 16 30 -0.32768000000000000000e5
-2067 2 20 28 0.32768000000000000000e5
-2067 3 2 31 -0.65536000000000000000e5
-2067 3 14 27 -0.13107200000000000000e6
-2067 4 4 16 -0.13107200000000000000e6
-2067 4 7 19 -0.65536000000000000000e5
-2068 2 10 32 -0.32768000000000000000e5
-2068 2 20 29 0.32768000000000000000e5
-2069 2 20 30 0.32768000000000000000e5
-2069 2 20 34 -0.32768000000000000000e5
-2069 4 8 20 -0.32768000000000000000e5
-2070 1 5 52 -0.16384000000000000000e5
-2070 1 11 42 0.16384000000000000000e5
-2070 1 12 43 0.32768000000000000000e5
-2070 1 16 47 0.32768000000000000000e5
-2070 1 17 48 0.32768000000000000000e5
-2070 1 34 41 -0.65536000000000000000e5
-2070 2 12 26 -0.16384000000000000000e5
-2070 2 20 31 0.32768000000000000000e5
-2070 2 20 34 0.16384000000000000000e5
-2070 3 2 31 -0.16384000000000000000e5
-2070 3 14 27 -0.32768000000000000000e5
-2070 4 7 19 0.16384000000000000000e5
-2070 4 8 20 0.16384000000000000000e5
-2071 1 3 50 -0.32768000000000000000e5
-2071 1 7 54 0.32768000000000000000e5
-2071 1 11 42 0.65536000000000000000e5
-2071 1 12 43 0.13107200000000000000e6
-2071 1 17 48 -0.13107200000000000000e6
-2071 1 37 44 -0.65536000000000000000e5
-2071 2 8 22 0.65536000000000000000e5
-2071 2 12 26 -0.65536000000000000000e5
-2071 2 16 30 -0.32768000000000000000e5
-2071 2 20 32 0.32768000000000000000e5
-2071 3 2 31 -0.65536000000000000000e5
-2071 3 14 27 -0.13107200000000000000e6
-2071 3 16 29 -0.32768000000000000000e5
-2071 3 17 30 -0.32768000000000000000e5
-2071 4 4 16 -0.65536000000000000000e5
-2072 1 1 48 -0.16384000000000000000e5
-2072 1 2 49 -0.16384000000000000000e5
-2072 1 3 50 -0.32768000000000000000e5
-2072 1 7 54 0.32768000000000000000e5
-2072 1 11 42 0.65536000000000000000e5
-2072 1 12 43 0.13107200000000000000e6
-2072 1 17 48 -0.13107200000000000000e6
-2072 1 23 38 -0.16384000000000000000e5
-2072 1 26 41 0.32768000000000000000e5
-2072 1 32 47 -0.65536000000000000000e5
-2072 2 2 32 -0.16384000000000000000e5
-2072 2 8 22 0.65536000000000000000e5
-2072 2 12 26 -0.65536000000000000000e5
-2072 2 16 30 -0.32768000000000000000e5
-2072 2 20 33 0.32768000000000000000e5
-2072 3 2 31 -0.65536000000000000000e5
-2072 3 14 27 -0.13107200000000000000e6
-2072 3 17 30 -0.32768000000000000000e5
-2072 3 22 27 -0.32768000000000000000e5
-2072 4 4 16 -0.65536000000000000000e5
-2073 1 1 48 -0.16384000000000000000e5
-2073 1 2 49 -0.16384000000000000000e5
-2073 1 3 50 -0.32768000000000000000e5
-2073 1 7 54 0.32768000000000000000e5
-2073 1 11 42 0.65536000000000000000e5
-2073 1 12 43 0.13107200000000000000e6
-2073 1 17 48 -0.13107200000000000000e6
-2073 1 23 38 -0.16384000000000000000e5
-2073 1 24 55 0.32768000000000000000e5
-2073 1 37 52 -0.65536000000000000000e5
-2073 2 2 32 -0.16384000000000000000e5
-2073 2 8 22 0.65536000000000000000e5
-2073 2 12 26 -0.65536000000000000000e5
-2073 2 16 30 -0.32768000000000000000e5
-2073 2 20 35 0.32768000000000000000e5
-2073 3 2 31 -0.65536000000000000000e5
-2073 3 6 35 -0.32768000000000000000e5
-2073 3 14 27 -0.13107200000000000000e6
-2073 3 17 30 -0.32768000000000000000e5
-2073 3 20 33 -0.32768000000000000000e5
-2073 4 4 16 -0.65536000000000000000e5
-2074 2 12 26 -0.16384000000000000000e5
-2074 2 21 21 0.32768000000000000000e5
-2075 2 8 22 -0.32768000000000000000e5
-2075 2 21 22 0.32768000000000000000e5
-2075 4 4 16 0.32768000000000000000e5
-2076 1 12 43 0.32768000000000000000e5
-2076 1 13 44 -0.65536000000000000000e5
-2076 1 16 47 0.32768000000000000000e5
-2076 1 17 48 0.32768000000000000000e5
-2076 2 21 23 0.32768000000000000000e5
-2076 3 13 26 0.32768000000000000000e5
-2076 3 14 27 0.32768000000000000000e5
-2077 1 12 43 0.32768000000000000000e5
-2077 1 17 48 0.32768000000000000000e5
-2077 1 18 25 0.32768000000000000000e5
-2077 1 28 35 -0.65536000000000000000e5
-2077 2 21 24 0.32768000000000000000e5
-2077 3 14 19 -0.32768000000000000000e5
-2077 3 14 27 0.32768000000000000000e5
-2078 1 13 44 0.32768000000000000000e5
-2078 1 14 45 0.32768000000000000000e5
-2078 1 19 42 -0.65536000000000000000e5
-2078 1 28 35 0.32768000000000000000e5
-2078 2 21 25 0.32768000000000000000e5
-2079 2 16 30 -0.32768000000000000000e5
-2079 2 21 26 0.32768000000000000000e5
-2080 1 1 48 -0.16384000000000000000e5
-2080 1 2 49 -0.16384000000000000000e5
-2080 1 5 52 0.65536000000000000000e5
-2080 1 11 42 0.65536000000000000000e5
-2080 1 12 43 0.13107200000000000000e6
-2080 1 17 48 -0.26214400000000000000e6
-2080 1 23 38 -0.16384000000000000000e5
-2080 1 26 41 0.32768000000000000000e5
-2080 1 28 43 0.65536000000000000000e5
-2080 2 2 32 -0.16384000000000000000e5
-2080 2 8 22 0.13107200000000000000e6
-2080 2 12 26 -0.65536000000000000000e5
-2080 2 16 30 -0.32768000000000000000e5
-2080 2 21 27 0.32768000000000000000e5
-2080 3 2 31 -0.65536000000000000000e5
-2080 3 14 27 -0.13107200000000000000e6
-2080 4 4 16 -0.13107200000000000000e6
-2080 4 7 19 -0.65536000000000000000e5
-2081 2 4 34 -0.32768000000000000000e5
-2081 2 21 28 0.32768000000000000000e5
-2082 2 20 34 -0.32768000000000000000e5
-2082 2 21 29 0.32768000000000000000e5
-2082 4 8 20 -0.32768000000000000000e5
-2083 2 8 22 -0.32768000000000000000e5
-2083 2 21 30 0.32768000000000000000e5
-2083 4 4 16 0.32768000000000000000e5
-2083 4 7 19 0.32768000000000000000e5
-2084 1 5 52 -0.16384000000000000000e5
-2084 1 11 42 0.16384000000000000000e5
-2084 1 12 43 0.32768000000000000000e5
-2084 1 13 52 -0.65536000000000000000e5
-2084 1 14 45 0.65536000000000000000e5
-2084 1 18 49 -0.32768000000000000000e5
-2084 2 12 26 -0.16384000000000000000e5
-2084 2 20 34 0.16384000000000000000e5
-2084 2 21 31 0.32768000000000000000e5
-2084 2 24 30 -0.32768000000000000000e5
-2084 3 2 31 -0.16384000000000000000e5
-2084 3 14 27 -0.32768000000000000000e5
-2084 3 15 28 -0.65536000000000000000e5
-2084 4 7 19 0.16384000000000000000e5
-2084 4 8 20 0.16384000000000000000e5
-2085 1 1 48 -0.16384000000000000000e5
-2085 1 2 49 -0.16384000000000000000e5
-2085 1 3 50 -0.32768000000000000000e5
-2085 1 7 54 0.32768000000000000000e5
-2085 1 11 42 0.65536000000000000000e5
-2085 1 12 43 0.13107200000000000000e6
-2085 1 17 48 -0.13107200000000000000e6
-2085 1 23 38 -0.16384000000000000000e5
-2085 1 26 41 0.32768000000000000000e5
-2085 1 32 47 -0.65536000000000000000e5
-2085 2 2 32 -0.16384000000000000000e5
-2085 2 8 22 0.65536000000000000000e5
-2085 2 12 26 -0.65536000000000000000e5
-2085 2 16 30 -0.32768000000000000000e5
-2085 2 21 32 0.32768000000000000000e5
-2085 3 2 31 -0.65536000000000000000e5
-2085 3 14 27 -0.13107200000000000000e6
-2085 3 17 30 -0.32768000000000000000e5
-2085 3 22 27 -0.32768000000000000000e5
-2085 4 4 16 -0.65536000000000000000e5
-2086 2 4 34 -0.32768000000000000000e5
-2086 2 21 33 0.32768000000000000000e5
-2086 3 5 34 -0.32768000000000000000e5
-2086 3 17 30 -0.32768000000000000000e5
-2086 3 18 31 0.65536000000000000000e5
-2086 3 22 27 -0.32768000000000000000e5
-2087 1 17 48 -0.65536000000000000000e5
-2087 1 28 43 0.32768000000000000000e5
-2087 1 32 47 0.32768000000000000000e5
-2087 1 33 48 0.32768000000000000000e5
-2087 2 21 34 0.32768000000000000000e5
-2087 3 18 31 -0.32768000000000000000e5
-2087 3 24 29 0.65536000000000000000e5
-2088 1 10 41 -0.16384000000000000000e5
-2088 1 17 48 0.32768000000000000000e5
-2088 1 18 25 -0.32768000000000000000e5
-2088 1 26 33 0.16384000000000000000e5
-2088 2 8 22 -0.16384000000000000000e5
-2088 2 22 22 0.32768000000000000000e5
-2088 3 14 19 0.32768000000000000000e5
-2088 3 14 27 0.32768000000000000000e5
-2088 4 4 16 0.16384000000000000000e5
-2089 1 12 43 0.32768000000000000000e5
-2089 1 17 48 0.32768000000000000000e5
-2089 1 18 25 0.32768000000000000000e5
-2089 1 28 35 -0.65536000000000000000e5
-2089 2 22 23 0.32768000000000000000e5
-2089 3 14 19 -0.32768000000000000000e5
-2089 3 14 27 0.32768000000000000000e5
-2090 2 14 28 -0.32768000000000000000e5
-2090 2 22 24 0.32768000000000000000e5
-2091 1 11 46 0.32768000000000000000e5
-2091 1 14 45 0.32768000000000000000e5
-2091 1 28 35 0.32768000000000000000e5
-2091 1 29 36 -0.65536000000000000000e5
-2091 2 22 25 0.32768000000000000000e5
-2092 1 1 48 -0.16384000000000000000e5
-2092 1 2 49 -0.16384000000000000000e5
-2092 1 5 52 0.65536000000000000000e5
-2092 1 11 42 0.65536000000000000000e5
-2092 1 12 43 0.13107200000000000000e6
-2092 1 17 48 -0.26214400000000000000e6
-2092 1 23 38 -0.16384000000000000000e5
-2092 1 26 41 0.32768000000000000000e5
-2092 1 28 43 0.65536000000000000000e5
-2092 2 2 32 -0.16384000000000000000e5
-2092 2 8 22 0.13107200000000000000e6
-2092 2 12 26 -0.65536000000000000000e5
-2092 2 16 30 -0.32768000000000000000e5
-2092 2 22 26 0.32768000000000000000e5
-2092 3 2 31 -0.65536000000000000000e5
-2092 3 14 27 -0.13107200000000000000e6
-2092 4 4 16 -0.13107200000000000000e6
-2092 4 7 19 -0.65536000000000000000e5
-2093 2 4 34 -0.32768000000000000000e5
-2093 2 22 27 0.32768000000000000000e5
-2094 2 8 22 -0.32768000000000000000e5
-2094 2 22 29 0.32768000000000000000e5
-2094 4 4 16 0.32768000000000000000e5
-2094 4 7 19 0.32768000000000000000e5
-2095 1 5 52 0.32768000000000000000e5
-2095 1 14 45 -0.13107200000000000000e6
-2095 1 17 48 0.65536000000000000000e5
-2095 1 18 49 0.65536000000000000000e5
-2095 1 28 43 0.32768000000000000000e5
-2095 1 33 40 0.32768000000000000000e5
-2095 2 22 30 0.32768000000000000000e5
-2095 2 24 30 0.65536000000000000000e5
-2095 3 15 28 0.13107200000000000000e6
-2096 2 22 31 0.32768000000000000000e5
-2096 2 24 30 -0.32768000000000000000e5
-2097 2 4 34 -0.32768000000000000000e5
-2097 2 22 32 0.32768000000000000000e5
-2097 3 5 34 -0.32768000000000000000e5
-2097 3 17 30 -0.32768000000000000000e5
-2097 3 18 31 0.65536000000000000000e5
-2097 3 22 27 -0.32768000000000000000e5
-2098 2 22 33 0.32768000000000000000e5
-2098 2 28 30 -0.32768000000000000000e5
-2099 1 15 54 0.32768000000000000000e5
-2099 1 28 43 0.32768000000000000000e5
-2099 1 33 48 0.32768000000000000000e5
-2099 1 34 49 -0.65536000000000000000e5
-2099 2 22 34 0.32768000000000000000e5
-2099 3 18 31 -0.32768000000000000000e5
-2100 2 22 35 0.32768000000000000000e5
-2100 2 28 34 -0.32768000000000000000e5
-2101 2 10 24 -0.16384000000000000000e5
-2101 2 23 23 0.32768000000000000000e5
-2101 4 10 14 0.16384000000000000000e5
-2102 1 13 44 0.32768000000000000000e5
-2102 1 14 45 0.32768000000000000000e5
-2102 1 19 42 -0.65536000000000000000e5
-2102 1 28 35 0.32768000000000000000e5
-2102 2 23 24 0.32768000000000000000e5
-2103 2 15 29 -0.32768000000000000000e5
-2103 2 23 25 0.32768000000000000000e5
-2104 2 10 32 -0.32768000000000000000e5
-2104 2 23 26 0.32768000000000000000e5
-2105 2 20 34 -0.32768000000000000000e5
-2105 2 23 27 0.32768000000000000000e5
-2105 4 8 20 -0.32768000000000000000e5
-2106 2 8 22 -0.32768000000000000000e5
-2106 2 23 28 0.32768000000000000000e5
-2106 4 4 16 0.32768000000000000000e5
-2106 4 7 19 0.32768000000000000000e5
-2107 1 5 52 -0.16384000000000000000e5
-2107 1 11 42 0.16384000000000000000e5
-2107 1 12 43 0.32768000000000000000e5
-2107 1 16 47 0.32768000000000000000e5
-2107 1 17 48 0.32768000000000000000e5
-2107 1 34 41 -0.65536000000000000000e5
-2107 2 12 26 -0.16384000000000000000e5
-2107 2 20 34 0.16384000000000000000e5
-2107 2 23 29 0.32768000000000000000e5
-2107 3 2 31 -0.16384000000000000000e5
-2107 3 14 27 -0.32768000000000000000e5
-2107 4 7 19 0.16384000000000000000e5
-2107 4 8 20 0.16384000000000000000e5
-2108 1 5 52 -0.16384000000000000000e5
-2108 1 11 42 0.16384000000000000000e5
-2108 1 12 43 0.32768000000000000000e5
-2108 1 13 52 -0.65536000000000000000e5
-2108 1 14 45 0.65536000000000000000e5
-2108 1 18 49 -0.32768000000000000000e5
-2108 2 12 26 -0.16384000000000000000e5
-2108 2 20 34 0.16384000000000000000e5
-2108 2 23 30 0.32768000000000000000e5
-2108 2 24 30 -0.32768000000000000000e5
-2108 3 2 31 -0.16384000000000000000e5
-2108 3 14 27 -0.32768000000000000000e5
-2108 3 15 28 -0.65536000000000000000e5
-2108 4 7 19 0.16384000000000000000e5
-2108 4 8 20 0.16384000000000000000e5
-2109 1 13 52 0.32768000000000000000e5
-2109 1 14 45 0.32768000000000000000e5
-2109 1 19 50 -0.65536000000000000000e5
-2109 1 34 41 0.32768000000000000000e5
-2109 2 23 31 0.32768000000000000000e5
-2109 3 15 28 -0.32768000000000000000e5
-2110 2 20 34 -0.32768000000000000000e5
-2110 2 23 32 0.32768000000000000000e5
-2111 1 17 48 -0.65536000000000000000e5
-2111 1 28 43 0.32768000000000000000e5
-2111 1 32 47 0.32768000000000000000e5
-2111 1 33 48 0.32768000000000000000e5
-2111 2 23 33 0.32768000000000000000e5
-2111 3 18 31 -0.32768000000000000000e5
-2111 3 24 29 0.65536000000000000000e5
-2112 1 16 55 -0.65536000000000000000e5
-2112 1 17 48 0.32768000000000000000e5
-2112 1 28 43 0.16384000000000000000e5
-2112 1 32 47 0.16384000000000000000e5
-2112 1 34 49 0.32768000000000000000e5
-2112 1 37 44 0.16384000000000000000e5
-2112 2 20 34 0.16384000000000000000e5
-2112 2 23 34 0.32768000000000000000e5
-2112 3 18 31 -0.16384000000000000000e5
-2112 3 24 29 -0.32768000000000000000e5
-2113 1 17 48 -0.65536000000000000000e5
-2113 1 28 43 0.32768000000000000000e5
-2113 1 32 47 0.32768000000000000000e5
-2113 1 33 48 0.32768000000000000000e5
-2113 2 23 35 0.32768000000000000000e5
-2113 3 18 31 -0.32768000000000000000e5
-2113 3 24 29 0.65536000000000000000e5
-2113 4 16 20 0.32768000000000000000e5
-2114 1 11 46 0.16384000000000000000e5
-2114 1 14 45 0.16384000000000000000e5
-2114 1 28 35 0.16384000000000000000e5
-2114 1 29 36 -0.32768000000000000000e5
-2114 2 24 24 0.32768000000000000000e5
-2115 1 15 46 0.32768000000000000000e5
-2115 1 17 32 -0.32768000000000000000e5
-2115 1 18 33 -0.32768000000000000000e5
-2115 1 19 42 0.32768000000000000000e5
-2115 2 14 24 -0.32768000000000000000e5
-2115 2 24 25 0.32768000000000000000e5
-2115 3 12 25 -0.32768000000000000000e5
-2115 3 15 24 0.65536000000000000000e5
-2116 2 20 34 -0.32768000000000000000e5
-2116 2 24 26 0.32768000000000000000e5
-2116 4 8 20 -0.32768000000000000000e5
-2117 2 8 22 -0.32768000000000000000e5
-2117 2 24 27 0.32768000000000000000e5
-2117 4 4 16 0.32768000000000000000e5
-2117 4 7 19 0.32768000000000000000e5
-2118 1 5 52 0.32768000000000000000e5
-2118 1 14 45 -0.13107200000000000000e6
-2118 1 17 48 0.65536000000000000000e5
-2118 1 18 49 0.65536000000000000000e5
-2118 1 28 43 0.32768000000000000000e5
-2118 1 33 40 0.32768000000000000000e5
-2118 2 24 28 0.32768000000000000000e5
-2118 2 24 30 0.65536000000000000000e5
-2118 3 15 28 0.13107200000000000000e6
-2119 1 5 52 -0.16384000000000000000e5
-2119 1 11 42 0.16384000000000000000e5
-2119 1 12 43 0.32768000000000000000e5
-2119 1 13 52 -0.65536000000000000000e5
-2119 1 14 45 0.65536000000000000000e5
-2119 1 18 49 -0.32768000000000000000e5
-2119 2 12 26 -0.16384000000000000000e5
-2119 2 20 34 0.16384000000000000000e5
-2119 2 24 29 0.32768000000000000000e5
-2119 2 24 30 -0.32768000000000000000e5
-2119 3 2 31 -0.16384000000000000000e5
-2119 3 14 27 -0.32768000000000000000e5
-2119 3 15 28 -0.65536000000000000000e5
-2119 4 7 19 0.16384000000000000000e5
-2119 4 8 20 0.16384000000000000000e5
-2120 2 15 33 -0.32768000000000000000e5
-2120 2 24 31 0.32768000000000000000e5
-2121 1 17 48 -0.65536000000000000000e5
-2121 1 28 43 0.32768000000000000000e5
-2121 1 32 47 0.32768000000000000000e5
-2121 1 33 48 0.32768000000000000000e5
-2121 2 24 32 0.32768000000000000000e5
-2121 3 18 31 -0.32768000000000000000e5
-2121 3 24 29 0.65536000000000000000e5
-2122 1 15 54 0.32768000000000000000e5
-2122 1 28 43 0.32768000000000000000e5
-2122 1 33 48 0.32768000000000000000e5
-2122 1 34 49 -0.65536000000000000000e5
-2122 2 24 33 0.32768000000000000000e5
-2122 3 18 31 -0.32768000000000000000e5
-2123 2 24 35 0.32768000000000000000e5
-2123 2 31 33 -0.32768000000000000000e5
-2124 1 4 19 -0.40960000000000000000e4
-2124 1 13 44 0.40960000000000000000e4
-2124 1 17 32 0.81920000000000000000e4
-2124 1 18 33 0.81920000000000000000e4
-2124 1 19 42 0.81920000000000000000e4
-2124 1 20 27 0.81920000000000000000e4
-2124 1 21 44 -0.32768000000000000000e5
-2124 1 29 36 0.16384000000000000000e5
-2124 1 33 36 0.16384000000000000000e5
-2124 2 14 24 0.81920000000000000000e4
-2124 2 15 29 0.81920000000000000000e4
-2124 2 25 25 0.32768000000000000000e5
-2124 3 8 13 0.40960000000000000000e4
-2124 3 10 23 -0.40960000000000000000e4
-2124 3 11 24 -0.40960000000000000000e4
-2124 3 12 25 0.81920000000000000000e4
-2124 3 15 24 -0.16384000000000000000e5
-2124 4 10 14 -0.40960000000000000000e4
-2125 1 5 52 -0.16384000000000000000e5
-2125 1 11 42 0.16384000000000000000e5
-2125 1 12 43 0.32768000000000000000e5
-2125 1 16 47 0.32768000000000000000e5
-2125 1 17 48 0.32768000000000000000e5
-2125 1 34 41 -0.65536000000000000000e5
-2125 2 12 26 -0.16384000000000000000e5
-2125 2 20 34 0.16384000000000000000e5
-2125 2 25 26 0.32768000000000000000e5
-2125 3 2 31 -0.16384000000000000000e5
-2125 3 14 27 -0.32768000000000000000e5
-2125 4 7 19 0.16384000000000000000e5
-2125 4 8 20 0.16384000000000000000e5
-2126 1 5 52 -0.16384000000000000000e5
-2126 1 11 42 0.16384000000000000000e5
-2126 1 12 43 0.32768000000000000000e5
-2126 1 13 52 -0.65536000000000000000e5
-2126 1 14 45 0.65536000000000000000e5
-2126 1 18 49 -0.32768000000000000000e5
-2126 2 12 26 -0.16384000000000000000e5
-2126 2 20 34 0.16384000000000000000e5
-2126 2 24 30 -0.32768000000000000000e5
-2126 2 25 27 0.32768000000000000000e5
-2126 3 2 31 -0.16384000000000000000e5
-2126 3 14 27 -0.32768000000000000000e5
-2126 3 15 28 -0.65536000000000000000e5
-2126 4 7 19 0.16384000000000000000e5
-2126 4 8 20 0.16384000000000000000e5
-2127 2 24 30 -0.32768000000000000000e5
-2127 2 25 28 0.32768000000000000000e5
-2128 1 13 52 0.32768000000000000000e5
-2128 1 14 45 0.32768000000000000000e5
-2128 1 19 50 -0.65536000000000000000e5
-2128 1 34 41 0.32768000000000000000e5
-2128 2 25 29 0.32768000000000000000e5
-2128 3 15 28 -0.32768000000000000000e5
-2129 2 15 33 -0.32768000000000000000e5
-2129 2 25 30 0.32768000000000000000e5
-2130 1 16 55 -0.65536000000000000000e5
-2130 1 17 48 0.32768000000000000000e5
-2130 1 28 43 0.16384000000000000000e5
-2130 1 32 47 0.16384000000000000000e5
-2130 1 34 49 0.32768000000000000000e5
-2130 1 37 44 0.16384000000000000000e5
-2130 2 20 34 0.16384000000000000000e5
-2130 2 25 32 0.32768000000000000000e5
-2130 3 18 31 -0.16384000000000000000e5
-2130 3 24 29 -0.32768000000000000000e5
-2131 2 24 34 -0.32768000000000000000e5
-2131 2 25 33 0.32768000000000000000e5
-2132 2 25 34 0.32768000000000000000e5
-2132 2 31 31 -0.65536000000000000000e5
-2133 1 17 48 0.32768000000000000000e5
-2133 1 32 47 -0.16384000000000000000e5
-2133 1 33 48 -0.16384000000000000000e5
-2133 1 35 50 -0.65536000000000000000e5
-2133 1 37 52 0.16384000000000000000e5
-2133 1 43 50 0.16384000000000000000e5
-2133 1 44 51 0.32768000000000000000e5
-2133 1 46 49 0.32768000000000000000e5
-2133 2 25 35 0.32768000000000000000e5
-2133 3 21 34 -0.16384000000000000000e5
-2133 3 24 29 -0.32768000000000000000e5
-2133 3 25 34 0.65536000000000000000e5
-2133 4 16 20 -0.16384000000000000000e5
-2134 2 1 35 -0.16384000000000000000e5
-2134 2 26 26 0.32768000000000000000e5
-2135 2 26 27 0.32768000000000000000e5
-2135 2 26 32 -0.32768000000000000000e5
-2135 4 17 17 -0.65536000000000000000e5
-2136 2 18 32 -0.32768000000000000000e5
-2136 2 26 28 0.32768000000000000000e5
-2137 1 3 50 -0.32768000000000000000e5
-2137 1 7 54 0.32768000000000000000e5
-2137 1 11 42 0.65536000000000000000e5
-2137 1 12 43 0.13107200000000000000e6
-2137 1 17 48 -0.13107200000000000000e6
-2137 1 37 44 -0.65536000000000000000e5
-2137 2 8 22 0.65536000000000000000e5
-2137 2 12 26 -0.65536000000000000000e5
-2137 2 16 30 -0.32768000000000000000e5
-2137 2 26 29 0.32768000000000000000e5
-2137 3 2 31 -0.65536000000000000000e5
-2137 3 14 27 -0.13107200000000000000e6
-2137 3 16 29 -0.32768000000000000000e5
-2137 3 17 30 -0.32768000000000000000e5
-2137 4 4 16 -0.65536000000000000000e5
-2138 1 1 48 -0.16384000000000000000e5
-2138 1 2 49 -0.16384000000000000000e5
-2138 1 3 50 -0.32768000000000000000e5
-2138 1 7 54 0.32768000000000000000e5
-2138 1 11 42 0.65536000000000000000e5
-2138 1 12 43 0.13107200000000000000e6
-2138 1 17 48 -0.13107200000000000000e6
-2138 1 23 38 -0.16384000000000000000e5
-2138 1 26 41 0.32768000000000000000e5
-2138 1 32 47 -0.65536000000000000000e5
-2138 2 2 32 -0.16384000000000000000e5
-2138 2 8 22 0.65536000000000000000e5
-2138 2 12 26 -0.65536000000000000000e5
-2138 2 16 30 -0.32768000000000000000e5
-2138 2 26 30 0.32768000000000000000e5
-2138 3 2 31 -0.65536000000000000000e5
-2138 3 14 27 -0.13107200000000000000e6
-2138 3 17 30 -0.32768000000000000000e5
-2138 3 22 27 -0.32768000000000000000e5
-2138 4 4 16 -0.65536000000000000000e5
-2139 2 20 34 -0.32768000000000000000e5
-2139 2 26 31 0.32768000000000000000e5
-2140 1 2 49 -0.32768000000000000000e5
-2140 1 7 54 0.65536000000000000000e5
-2140 1 22 53 -0.32768000000000000000e5
-2140 1 24 39 -0.32768000000000000000e5
-2140 2 3 33 -0.32768000000000000000e5
-2140 2 26 32 -0.32768000000000000000e5
-2140 2 26 33 0.32768000000000000000e5
-2140 3 4 33 -0.32768000000000000000e5
-2140 3 6 35 -0.65536000000000000000e5
-2140 3 17 30 0.65536000000000000000e5
-2140 3 19 32 -0.32768000000000000000e5
-2140 3 20 33 0.65536000000000000000e5
-2141 1 1 48 -0.16384000000000000000e5
-2141 1 2 49 -0.16384000000000000000e5
-2141 1 3 50 -0.32768000000000000000e5
-2141 1 7 54 0.32768000000000000000e5
-2141 1 11 42 0.65536000000000000000e5
-2141 1 12 43 0.13107200000000000000e6
-2141 1 17 48 -0.13107200000000000000e6
-2141 1 23 38 -0.16384000000000000000e5
-2141 1 24 55 0.32768000000000000000e5
-2141 1 37 52 -0.65536000000000000000e5
-2141 2 2 32 -0.16384000000000000000e5
-2141 2 8 22 0.65536000000000000000e5
-2141 2 12 26 -0.65536000000000000000e5
-2141 2 16 30 -0.32768000000000000000e5
-2141 2 26 34 0.32768000000000000000e5
-2141 3 2 31 -0.65536000000000000000e5
-2141 3 6 35 -0.32768000000000000000e5
-2141 3 14 27 -0.13107200000000000000e6
-2141 3 17 30 -0.32768000000000000000e5
-2141 3 20 33 -0.32768000000000000000e5
-2141 4 4 16 -0.65536000000000000000e5
-2142 2 26 35 0.32768000000000000000e5
-2142 2 32 32 -0.65536000000000000000e5
-2143 2 18 32 -0.16384000000000000000e5
-2143 2 27 27 0.32768000000000000000e5
-2144 1 1 48 -0.32768000000000000000e5
-2144 1 2 49 -0.65536000000000000000e5
-2144 1 3 50 -0.65536000000000000000e5
-2144 1 6 53 0.32768000000000000000e5
-2144 1 11 42 0.13107200000000000000e6
-2144 1 12 43 0.26214400000000000000e6
-2144 1 17 48 -0.26214400000000000000e6
-2144 1 23 38 -0.32768000000000000000e5
-2144 1 26 41 -0.65536000000000000000e5
-2144 2 2 32 -0.32768000000000000000e5
-2144 2 8 22 0.13107200000000000000e6
-2144 2 12 26 -0.13107200000000000000e6
-2144 2 16 30 -0.65536000000000000000e5
-2144 2 18 32 -0.32768000000000000000e5
-2144 2 27 28 0.32768000000000000000e5
-2144 3 2 31 -0.13107200000000000000e6
-2144 3 3 32 0.32768000000000000000e5
-2144 3 14 27 -0.26214400000000000000e6
-2144 3 17 30 -0.65536000000000000000e5
-2144 3 22 27 0.65536000000000000000e5
-2144 4 4 16 -0.13107200000000000000e6
-2145 1 1 48 -0.16384000000000000000e5
-2145 1 2 49 -0.16384000000000000000e5
-2145 1 3 50 -0.32768000000000000000e5
-2145 1 7 54 0.32768000000000000000e5
-2145 1 11 42 0.65536000000000000000e5
-2145 1 12 43 0.13107200000000000000e6
-2145 1 17 48 -0.13107200000000000000e6
-2145 1 23 38 -0.16384000000000000000e5
-2145 1 26 41 0.32768000000000000000e5
-2145 1 32 47 -0.65536000000000000000e5
-2145 2 2 32 -0.16384000000000000000e5
-2145 2 8 22 0.65536000000000000000e5
-2145 2 12 26 -0.65536000000000000000e5
-2145 2 16 30 -0.32768000000000000000e5
-2145 2 27 29 0.32768000000000000000e5
-2145 3 2 31 -0.65536000000000000000e5
-2145 3 14 27 -0.13107200000000000000e6
-2145 3 17 30 -0.32768000000000000000e5
-2145 3 22 27 -0.32768000000000000000e5
-2145 4 4 16 -0.65536000000000000000e5
-2146 2 4 34 -0.32768000000000000000e5
-2146 2 27 30 0.32768000000000000000e5
-2146 3 5 34 -0.32768000000000000000e5
-2146 3 17 30 -0.32768000000000000000e5
-2146 3 18 31 0.65536000000000000000e5
-2146 3 22 27 -0.32768000000000000000e5
-2147 1 17 48 -0.65536000000000000000e5
-2147 1 28 43 0.32768000000000000000e5
-2147 1 32 47 0.32768000000000000000e5
-2147 1 33 48 0.32768000000000000000e5
-2147 2 27 31 0.32768000000000000000e5
-2147 3 18 31 -0.32768000000000000000e5
-2147 3 24 29 0.65536000000000000000e5
-2148 1 2 49 -0.32768000000000000000e5
-2148 1 7 54 0.65536000000000000000e5
-2148 1 22 53 -0.32768000000000000000e5
-2148 1 24 39 -0.32768000000000000000e5
-2148 2 3 33 -0.32768000000000000000e5
-2148 2 26 32 -0.32768000000000000000e5
-2148 2 27 32 0.32768000000000000000e5
-2148 3 4 33 -0.32768000000000000000e5
-2148 3 6 35 -0.65536000000000000000e5
-2148 3 17 30 0.65536000000000000000e5
-2148 3 19 32 -0.32768000000000000000e5
-2148 3 20 33 0.65536000000000000000e5
-2149 1 1 48 -0.32768000000000000000e5
-2149 1 2 49 -0.65536000000000000000e5
-2149 1 3 50 -0.65536000000000000000e5
-2149 1 11 42 0.13107200000000000000e6
-2149 1 12 43 0.26214400000000000000e6
-2149 1 17 48 -0.26214400000000000000e6
-2149 1 23 38 -0.32768000000000000000e5
-2149 1 23 54 0.32768000000000000000e5
-2149 1 24 39 -0.32768000000000000000e5
-2149 1 24 55 -0.65536000000000000000e5
-2149 1 25 56 0.32768000000000000000e5
-2149 2 2 32 -0.32768000000000000000e5
-2149 2 3 33 -0.32768000000000000000e5
-2149 2 8 22 0.13107200000000000000e6
-2149 2 12 26 -0.13107200000000000000e6
-2149 2 16 30 -0.65536000000000000000e5
-2149 2 27 33 0.32768000000000000000e5
-2149 3 2 31 -0.13107200000000000000e6
-2149 3 4 33 -0.32768000000000000000e5
-2149 3 14 27 -0.26214400000000000000e6
-2149 3 19 32 -0.32768000000000000000e5
-2149 3 28 33 0.32768000000000000000e5
-2149 4 4 16 -0.13107200000000000000e6
-2150 2 21 35 -0.32768000000000000000e5
-2150 2 27 34 0.32768000000000000000e5
-2151 1 1 48 0.32768000000000000000e5
-2151 1 2 49 0.32768000000000000000e5
-2151 1 3 50 0.65536000000000000000e5
-2151 1 11 42 -0.13107200000000000000e6
-2151 1 12 43 -0.26214400000000000000e6
-2151 1 17 48 0.26214400000000000000e6
-2151 1 23 38 0.32768000000000000000e5
-2151 1 24 55 -0.65536000000000000000e5
-2151 1 25 56 0.32768000000000000000e5
-2151 1 38 53 0.32768000000000000000e5
-2151 1 47 50 0.65536000000000000000e5
-2151 1 47 54 0.32768000000000000000e5
-2151 2 2 32 0.32768000000000000000e5
-2151 2 8 22 -0.13107200000000000000e6
-2151 2 12 26 0.13107200000000000000e6
-2151 2 16 30 0.65536000000000000000e5
-2151 2 21 35 -0.65536000000000000000e5
-2151 2 27 35 0.32768000000000000000e5
-2151 2 29 35 0.65536000000000000000e5
-2151 3 2 31 0.13107200000000000000e6
-2151 3 14 27 0.26214400000000000000e6
-2151 3 17 30 0.65536000000000000000e5
-2151 3 20 33 0.65536000000000000000e5
-2151 3 22 35 -0.65536000000000000000e5
-2151 3 29 34 0.13107200000000000000e6
-2151 3 32 33 0.32768000000000000000e5
-2151 4 4 16 0.13107200000000000000e6
-2152 2 5 35 -0.16384000000000000000e5
-2152 2 28 28 0.32768000000000000000e5
-2153 2 4 34 -0.32768000000000000000e5
-2153 2 28 29 0.32768000000000000000e5
-2153 3 5 34 -0.32768000000000000000e5
-2153 3 17 30 -0.32768000000000000000e5
-2153 3 18 31 0.65536000000000000000e5
-2153 3 22 27 -0.32768000000000000000e5
-2154 1 15 54 0.32768000000000000000e5
-2154 1 28 43 0.32768000000000000000e5
-2154 1 33 48 0.32768000000000000000e5
-2154 1 34 49 -0.65536000000000000000e5
-2154 2 28 31 0.32768000000000000000e5
-2154 3 18 31 -0.32768000000000000000e5
-2155 1 1 48 -0.32768000000000000000e5
-2155 1 2 49 -0.65536000000000000000e5
-2155 1 3 50 -0.65536000000000000000e5
-2155 1 11 42 0.13107200000000000000e6
-2155 1 12 43 0.26214400000000000000e6
-2155 1 17 48 -0.26214400000000000000e6
-2155 1 23 38 -0.32768000000000000000e5
-2155 1 23 54 0.32768000000000000000e5
-2155 1 24 39 -0.32768000000000000000e5
-2155 1 24 55 -0.65536000000000000000e5
-2155 1 25 56 0.32768000000000000000e5
-2155 2 2 32 -0.32768000000000000000e5
-2155 2 3 33 -0.32768000000000000000e5
-2155 2 8 22 0.13107200000000000000e6
-2155 2 12 26 -0.13107200000000000000e6
-2155 2 16 30 -0.65536000000000000000e5
-2155 2 28 32 0.32768000000000000000e5
-2155 3 2 31 -0.13107200000000000000e6
-2155 3 4 33 -0.32768000000000000000e5
-2155 3 14 27 -0.26214400000000000000e6
-2155 3 19 32 -0.32768000000000000000e5
-2155 3 28 33 0.32768000000000000000e5
-2155 4 4 16 -0.13107200000000000000e6
-2156 2 19 35 -0.32768000000000000000e5
-2156 2 28 33 0.32768000000000000000e5
-2157 2 28 35 0.32768000000000000000e5
-2157 2 33 33 -0.65536000000000000000e5
-2158 2 20 34 -0.16384000000000000000e5
-2158 2 29 29 0.32768000000000000000e5
-2159 1 17 48 -0.65536000000000000000e5
-2159 1 28 43 0.32768000000000000000e5
-2159 1 32 47 0.32768000000000000000e5
-2159 1 33 48 0.32768000000000000000e5
-2159 2 29 30 0.32768000000000000000e5
-2159 3 18 31 -0.32768000000000000000e5
-2159 3 24 29 0.65536000000000000000e5
-2160 1 16 55 -0.65536000000000000000e5
-2160 1 17 48 0.32768000000000000000e5
-2160 1 28 43 0.16384000000000000000e5
-2160 1 32 47 0.16384000000000000000e5
-2160 1 34 49 0.32768000000000000000e5
-2160 1 37 44 0.16384000000000000000e5
-2160 2 20 34 0.16384000000000000000e5
-2160 2 29 31 0.32768000000000000000e5
-2160 3 18 31 -0.16384000000000000000e5
-2160 3 24 29 -0.32768000000000000000e5
-2161 1 1 48 -0.16384000000000000000e5
-2161 1 2 49 -0.16384000000000000000e5
-2161 1 3 50 -0.32768000000000000000e5
-2161 1 7 54 0.32768000000000000000e5
-2161 1 11 42 0.65536000000000000000e5
-2161 1 12 43 0.13107200000000000000e6
-2161 1 17 48 -0.13107200000000000000e6
-2161 1 23 38 -0.16384000000000000000e5
-2161 1 24 55 0.32768000000000000000e5
-2161 1 37 52 -0.65536000000000000000e5
-2161 2 2 32 -0.16384000000000000000e5
-2161 2 8 22 0.65536000000000000000e5
-2161 2 12 26 -0.65536000000000000000e5
-2161 2 16 30 -0.32768000000000000000e5
-2161 2 29 32 0.32768000000000000000e5
-2161 3 2 31 -0.65536000000000000000e5
-2161 3 6 35 -0.32768000000000000000e5
-2161 3 14 27 -0.13107200000000000000e6
-2161 3 17 30 -0.32768000000000000000e5
-2161 3 20 33 -0.32768000000000000000e5
-2161 4 4 16 -0.65536000000000000000e5
-2162 2 21 35 -0.32768000000000000000e5
-2162 2 29 33 0.32768000000000000000e5
-2163 1 17 48 -0.65536000000000000000e5
-2163 1 28 43 0.32768000000000000000e5
-2163 1 32 47 0.32768000000000000000e5
-2163 1 33 48 0.32768000000000000000e5
-2163 2 29 34 0.32768000000000000000e5
-2163 3 18 31 -0.32768000000000000000e5
-2163 3 24 29 0.65536000000000000000e5
-2163 4 16 20 0.32768000000000000000e5
-2164 1 15 54 0.16384000000000000000e5
-2164 1 28 43 0.16384000000000000000e5
-2164 1 33 48 0.16384000000000000000e5
-2164 1 34 49 -0.32768000000000000000e5
-2164 2 30 30 0.32768000000000000000e5
-2164 3 18 31 -0.16384000000000000000e5
-2165 2 24 34 -0.32768000000000000000e5
-2165 2 30 31 0.32768000000000000000e5
-2166 2 21 35 -0.32768000000000000000e5
-2166 2 30 32 0.32768000000000000000e5
-2167 2 28 34 -0.32768000000000000000e5
-2167 2 30 33 0.32768000000000000000e5
-2168 2 30 34 0.32768000000000000000e5
-2168 2 31 33 -0.32768000000000000000e5
-2169 1 28 43 0.65536000000000000000e5
-2169 1 40 55 0.32768000000000000000e5
-2169 1 47 50 -0.32768000000000000000e5
-2169 1 50 51 -0.65536000000000000000e5
-2169 2 29 35 -0.32768000000000000000e5
-2169 2 30 35 0.32768000000000000000e5
-2169 3 18 31 -0.65536000000000000000e5
-2169 3 21 34 -0.65536000000000000000e5
-2169 3 29 34 -0.65536000000000000000e5
-2170 1 17 48 -0.65536000000000000000e5
-2170 1 28 43 0.32768000000000000000e5
-2170 1 32 47 0.32768000000000000000e5
-2170 1 33 48 0.32768000000000000000e5
-2170 2 31 32 0.32768000000000000000e5
-2170 3 18 31 -0.32768000000000000000e5
-2170 3 24 29 0.65536000000000000000e5
-2170 4 16 20 0.32768000000000000000e5
-2171 1 17 48 0.32768000000000000000e5
-2171 1 32 47 -0.16384000000000000000e5
-2171 1 33 48 -0.16384000000000000000e5
-2171 1 35 50 -0.65536000000000000000e5
-2171 1 37 52 0.16384000000000000000e5
-2171 1 43 50 0.16384000000000000000e5
-2171 1 44 51 0.32768000000000000000e5
-2171 1 46 49 0.32768000000000000000e5
-2171 2 31 34 0.32768000000000000000e5
-2171 3 21 34 -0.16384000000000000000e5
-2171 3 24 29 -0.32768000000000000000e5
-2171 3 25 34 0.65536000000000000000e5
-2171 4 16 20 -0.16384000000000000000e5
-2172 1 28 43 0.32768000000000000000e5
-2172 1 33 56 0.32768000000000000000e5
-2172 1 46 53 -0.65536000000000000000e5
-2172 1 50 51 0.32768000000000000000e5
-2172 2 31 35 0.32768000000000000000e5
-2172 3 18 31 -0.32768000000000000000e5
-2172 3 21 34 -0.32768000000000000000e5
-2172 3 29 34 -0.32768000000000000000e5
-2173 1 1 48 0.32768000000000000000e5
-2173 1 2 49 0.32768000000000000000e5
-2173 1 3 50 0.65536000000000000000e5
-2173 1 11 42 -0.13107200000000000000e6
-2173 1 12 43 -0.26214400000000000000e6
-2173 1 17 48 0.26214400000000000000e6
-2173 1 23 38 0.32768000000000000000e5
-2173 1 24 55 -0.65536000000000000000e5
-2173 1 25 56 0.32768000000000000000e5
-2173 1 38 53 0.32768000000000000000e5
-2173 1 47 50 0.65536000000000000000e5
-2173 1 47 54 0.32768000000000000000e5
-2173 2 2 32 0.32768000000000000000e5
-2173 2 8 22 -0.13107200000000000000e6
-2173 2 12 26 0.13107200000000000000e6
-2173 2 16 30 0.65536000000000000000e5
-2173 2 21 35 -0.65536000000000000000e5
-2173 2 29 35 0.65536000000000000000e5
-2173 2 32 33 0.32768000000000000000e5
-2173 3 2 31 0.13107200000000000000e6
-2173 3 14 27 0.26214400000000000000e6
-2173 3 17 30 0.65536000000000000000e5
-2173 3 20 33 0.65536000000000000000e5
-2173 3 22 35 -0.65536000000000000000e5
-2173 3 29 34 0.13107200000000000000e6
-2173 3 32 33 0.32768000000000000000e5
-2173 4 4 16 0.13107200000000000000e6
-2174 2 29 35 -0.32768000000000000000e5
-2174 2 32 34 0.32768000000000000000e5
-2175 1 1 48 0.32768000000000000000e5
-2175 1 2 49 0.32768000000000000000e5
-2175 1 3 50 0.65536000000000000000e5
-2175 1 11 42 -0.13107200000000000000e6
-2175 1 12 43 -0.26214400000000000000e6
-2175 1 17 48 0.26214400000000000000e6
-2175 1 23 38 0.32768000000000000000e5
-2175 1 24 55 -0.65536000000000000000e5
-2175 1 25 56 0.32768000000000000000e5
-2175 1 38 53 0.32768000000000000000e5
-2175 1 47 50 0.65536000000000000000e5
-2175 1 47 54 0.32768000000000000000e5
-2175 2 2 32 0.32768000000000000000e5
-2175 2 8 22 -0.13107200000000000000e6
-2175 2 12 26 0.13107200000000000000e6
-2175 2 16 30 0.65536000000000000000e5
-2175 2 21 35 -0.65536000000000000000e5
-2175 2 29 35 0.65536000000000000000e5
-2175 2 32 35 0.32768000000000000000e5
-2175 3 2 31 0.13107200000000000000e6
-2175 3 14 27 0.26214400000000000000e6
-2175 3 17 30 0.65536000000000000000e5
-2175 3 20 33 0.65536000000000000000e5
-2175 3 22 35 -0.65536000000000000000e5
-2175 3 29 34 0.13107200000000000000e6
-2175 3 32 33 0.32768000000000000000e5
-2175 4 4 16 0.13107200000000000000e6
-2175 4 20 20 0.65536000000000000000e5
-2176 1 28 43 0.65536000000000000000e5
-2176 1 40 55 0.32768000000000000000e5
-2176 1 47 50 -0.32768000000000000000e5
-2176 1 50 51 -0.65536000000000000000e5
-2176 2 29 35 -0.32768000000000000000e5
-2176 2 33 34 0.32768000000000000000e5
-2176 3 18 31 -0.65536000000000000000e5
-2176 3 21 34 -0.65536000000000000000e5
-2176 3 29 34 -0.65536000000000000000e5
-2177 1 28 43 0.16384000000000000000e5
-2177 1 33 56 0.16384000000000000000e5
-2177 1 46 53 -0.32768000000000000000e5
-2177 1 50 51 0.16384000000000000000e5
-2177 2 34 34 0.32768000000000000000e5
-2177 3 18 31 -0.16384000000000000000e5
-2177 3 21 34 -0.16384000000000000000e5
-2177 3 29 34 -0.16384000000000000000e5
-2178 1 1 48 0.16384000000000000000e5
-2178 1 2 49 0.16384000000000000000e5
-2178 1 3 50 0.32768000000000000000e5
-2178 1 11 42 -0.65536000000000000000e5
-2178 1 12 43 -0.13107200000000000000e6
-2178 1 17 48 0.13107200000000000000e6
-2178 1 23 38 0.16384000000000000000e5
-2178 1 24 55 -0.32768000000000000000e5
-2178 1 28 43 0.65536000000000000000e5
-2178 1 41 56 0.32768000000000000000e5
-2178 1 51 54 0.32768000000000000000e5
-2178 1 52 53 -0.65536000000000000000e5
-2178 2 2 32 0.16384000000000000000e5
-2178 2 8 22 -0.65536000000000000000e5
-2178 2 12 26 0.65536000000000000000e5
-2178 2 16 30 0.32768000000000000000e5
-2178 2 21 35 -0.32768000000000000000e5
-2178 2 34 35 0.32768000000000000000e5
-2178 3 2 31 0.65536000000000000000e5
-2178 3 14 27 0.13107200000000000000e6
-2178 3 17 30 0.32768000000000000000e5
-2178 3 18 31 -0.65536000000000000000e5
-2178 3 20 33 0.32768000000000000000e5
-2178 3 21 34 -0.65536000000000000000e5
-2178 3 22 35 -0.32768000000000000000e5
-2178 3 30 35 -0.32768000000000000000e5
-2178 4 4 16 0.65536000000000000000e5
-2179 1 1 8 -0.32768000000000000000e5
-2179 1 1 40 0.16384000000000000000e5
-2179 1 2 5 -0.16384000000000000000e5
-2179 1 2 9 0.32768000000000000000e5
-2179 1 7 22 0.32768000000000000000e5
-2179 1 7 38 0.32768000000000000000e5
-2179 1 8 23 -0.65536000000000000000e5
-2179 3 1 1 0.32768000000000000000e5
-2179 3 1 2 0.16384000000000000000e5
-2179 3 2 3 -0.16384000000000000000e5
-2179 3 3 16 -0.16384000000000000000e5
-2179 3 4 17 -0.16384000000000000000e5
-2179 3 6 19 -0.32768000000000000000e5
-2179 3 7 20 0.65536000000000000000e5
-2179 4 1 1 0.32768000000000000000e5
-2179 4 1 13 -0.16384000000000000000e5
-2179 4 2 2 -0.32768000000000000000e5
-2179 4 2 14 -0.32768000000000000000e5
-2180 1 1 40 -0.32768000000000000000e5
-2180 1 2 5 0.32768000000000000000e5
-2180 1 2 9 -0.65536000000000000000e5
-2180 1 7 38 -0.65536000000000000000e5
-2180 1 8 23 0.13107200000000000000e6
-2180 3 1 3 0.32768000000000000000e5
-2180 3 2 3 0.32768000000000000000e5
-2180 3 3 16 0.32768000000000000000e5
-2180 3 4 17 0.32768000000000000000e5
-2180 3 6 19 0.65536000000000000000e5
-2180 3 7 20 -0.13107200000000000000e6
-2180 4 1 13 0.32768000000000000000e5
-2180 4 2 2 0.65536000000000000000e5
-2180 4 2 14 0.65536000000000000000e5
-2181 3 1 4 0.32768000000000000000e5
-2181 3 2 3 -0.32768000000000000000e5
-2182 1 1 40 0.32768000000000000000e5
-2182 1 2 5 -0.32768000000000000000e5
-2182 1 7 38 0.65536000000000000000e5
-2182 1 8 23 -0.65536000000000000000e5
-2182 3 1 5 0.32768000000000000000e5
-2182 3 3 16 -0.32768000000000000000e5
-2182 3 4 17 -0.32768000000000000000e5
-2182 3 6 19 -0.65536000000000000000e5
-2182 3 7 20 0.13107200000000000000e6
-2182 4 1 13 -0.32768000000000000000e5
-2182 4 2 14 -0.65536000000000000000e5
-2183 1 1 8 -0.32768000000000000000e5
-2183 1 7 22 0.32768000000000000000e5
-2183 3 1 6 0.32768000000000000000e5
-2184 1 1 40 -0.16384000000000000000e5
-2184 1 2 5 0.16384000000000000000e5
-2184 1 2 9 -0.32768000000000000000e5
-2184 1 7 38 -0.32768000000000000000e5
-2184 1 8 23 0.65536000000000000000e5
-2184 2 1 3 -0.16384000000000000000e5
-2184 2 2 16 0.16384000000000000000e5
-2184 3 1 2 -0.16384000000000000000e5
-2184 3 1 7 0.32768000000000000000e5
-2184 3 3 16 0.16384000000000000000e5
-2184 3 4 17 0.16384000000000000000e5
-2184 3 6 19 0.32768000000000000000e5
-2184 3 7 20 -0.65536000000000000000e5
-2184 4 1 13 0.16384000000000000000e5
-2184 4 2 2 0.32768000000000000000e5
-2184 4 2 14 0.32768000000000000000e5
-2185 1 2 9 -0.32768000000000000000e5
-2185 1 8 23 0.32768000000000000000e5
-2185 3 1 8 0.32768000000000000000e5
-2186 1 1 48 0.16384000000000000000e5
-2186 1 2 9 0.32768000000000000000e5
-2186 1 2 17 0.13107200000000000000e6
-2186 1 2 33 0.65536000000000000000e5
-2186 1 2 49 0.16384000000000000000e5
-2186 1 3 18 0.26214400000000000000e6
-2186 1 4 19 0.26214400000000000000e6
-2186 1 4 35 0.26214400000000000000e6
-2186 1 6 13 -0.65536000000000000000e5
-2186 1 7 38 0.32768000000000000000e5
-2186 1 8 23 -0.32768000000000000000e5
-2186 1 8 39 0.32768000000000000000e5
-2186 1 11 42 -0.65536000000000000000e5
-2186 1 18 25 0.13107200000000000000e6
-2186 1 20 27 -0.52428800000000000000e6
-2186 1 23 38 0.16384000000000000000e5
-2186 2 2 8 0.32768000000000000000e5
-2186 2 2 32 0.16384000000000000000e5
-2186 2 4 10 0.65536000000000000000e5
-2186 2 6 12 0.13107200000000000000e6
-2186 2 8 22 -0.65536000000000000000e5
-2186 2 9 23 0.13107200000000000000e6
-2186 2 10 24 0.26214400000000000000e6
-2186 3 1 9 0.32768000000000000000e5
-2186 3 1 30 0.32768000000000000000e5
-2186 3 2 15 -0.26214400000000000000e6
-2186 3 3 8 0.32768000000000000000e5
-2186 3 7 20 0.65536000000000000000e5
-2186 3 8 13 -0.26214400000000000000e6
-2186 3 9 22 -0.65536000000000000000e5
-2186 4 2 14 -0.32768000000000000000e5
-2186 4 4 8 -0.65536000000000000000e5
-2187 1 1 8 -0.16384000000000000000e5
-2187 1 1 40 -0.81920000000000000000e4
-2187 1 2 5 0.81920000000000000000e4
-2187 1 2 9 -0.32768000000000000000e5
-2187 1 7 22 0.16384000000000000000e5
-2187 1 7 38 -0.16384000000000000000e5
-2187 1 8 23 0.49152000000000000000e5
-2187 2 1 3 -0.81920000000000000000e4
-2187 2 2 16 0.81920000000000000000e4
-2187 3 1 2 -0.81920000000000000000e4
-2187 3 1 10 0.32768000000000000000e5
-2187 3 3 16 0.81920000000000000000e4
-2187 3 4 17 0.81920000000000000000e4
-2187 3 6 19 0.16384000000000000000e5
-2187 3 7 20 -0.32768000000000000000e5
-2187 4 1 5 -0.16384000000000000000e5
-2187 4 1 13 0.81920000000000000000e4
-2187 4 2 2 0.16384000000000000000e5
-2187 4 2 14 0.16384000000000000000e5
-2188 3 1 11 0.32768000000000000000e5
-2188 3 6 7 -0.32768000000000000000e5
-2189 1 2 17 0.65536000000000000000e5
-2189 1 3 18 0.13107200000000000000e6
-2189 1 3 34 0.65536000000000000000e5
-2189 1 4 19 0.13107200000000000000e6
-2189 1 4 35 0.13107200000000000000e6
-2189 1 6 13 -0.32768000000000000000e5
-2189 1 10 41 -0.32768000000000000000e5
-2189 1 11 42 -0.32768000000000000000e5
-2189 1 18 25 0.65536000000000000000e5
-2189 1 20 27 -0.26214400000000000000e6
-2189 2 4 10 0.32768000000000000000e5
-2189 2 6 12 0.65536000000000000000e5
-2189 2 7 21 -0.32768000000000000000e5
-2189 2 8 22 -0.32768000000000000000e5
-2189 2 9 23 0.65536000000000000000e5
-2189 2 10 24 0.13107200000000000000e6
-2189 3 1 12 0.32768000000000000000e5
-2189 3 2 15 -0.13107200000000000000e6
-2189 3 8 13 -0.13107200000000000000e6
-2189 3 8 21 -0.32768000000000000000e5
-2189 3 9 22 -0.32768000000000000000e5
-2189 4 4 8 -0.32768000000000000000e5
-2190 1 1 8 -0.81920000000000000000e4
-2190 1 1 40 -0.40960000000000000000e4
-2190 1 2 5 0.40960000000000000000e4
-2190 1 2 9 -0.16384000000000000000e5
-2190 1 2 17 0.32768000000000000000e5
-2190 1 3 18 0.65536000000000000000e5
-2190 1 3 34 0.32768000000000000000e5
-2190 1 4 19 0.65536000000000000000e5
-2190 1 4 35 0.65536000000000000000e5
-2190 1 6 13 -0.16384000000000000000e5
-2190 1 7 22 0.81920000000000000000e4
-2190 1 7 38 -0.81920000000000000000e4
-2190 1 8 23 0.24576000000000000000e5
-2190 1 10 41 -0.16384000000000000000e5
-2190 1 11 42 -0.16384000000000000000e5
-2190 1 18 25 0.32768000000000000000e5
-2190 1 20 27 -0.13107200000000000000e6
-2190 2 1 3 -0.40960000000000000000e4
-2190 2 2 16 0.40960000000000000000e4
-2190 2 4 10 0.16384000000000000000e5
-2190 2 6 12 0.32768000000000000000e5
-2190 2 7 21 -0.16384000000000000000e5
-2190 2 8 22 -0.16384000000000000000e5
-2190 2 9 23 0.32768000000000000000e5
-2190 2 10 24 0.65536000000000000000e5
-2190 3 1 2 -0.40960000000000000000e4
-2190 3 1 13 0.32768000000000000000e5
-2190 3 2 15 -0.65536000000000000000e5
-2190 3 3 16 0.40960000000000000000e4
-2190 3 4 17 0.40960000000000000000e4
-2190 3 6 7 -0.16384000000000000000e5
-2190 3 6 19 0.81920000000000000000e4
-2190 3 7 20 -0.16384000000000000000e5
-2190 3 8 13 -0.65536000000000000000e5
-2190 3 8 21 -0.16384000000000000000e5
-2190 3 9 22 -0.16384000000000000000e5
-2190 4 1 5 -0.81920000000000000000e4
-2190 4 1 13 0.40960000000000000000e4
-2190 4 2 2 0.81920000000000000000e4
-2190 4 2 14 0.81920000000000000000e4
-2190 4 4 8 -0.16384000000000000000e5
-2190 4 5 5 -0.32768000000000000000e5
-2191 1 13 16 -0.65536000000000000000e5
-2191 1 16 31 0.65536000000000000000e5
-2191 3 1 15 0.32768000000000000000e5
-2191 3 2 15 0.32768000000000000000e5
-2191 3 8 13 0.32768000000000000000e5
-2191 4 8 8 0.65536000000000000000e5
-2192 1 1 24 -0.32768000000000000000e5
-2192 1 1 40 -0.32768000000000000000e5
-2192 1 2 33 -0.13107200000000000000e6
-2192 1 2 49 -0.32768000000000000000e5
-2192 1 3 34 0.26214400000000000000e6
-2192 1 3 50 0.65536000000000000000e5
-2192 1 5 52 -0.13107200000000000000e6
-2192 1 6 37 -0.32768000000000000000e5
-2192 1 10 41 -0.13107200000000000000e6
-2192 1 11 42 0.13107200000000000000e6
-2192 1 12 43 0.26214400000000000000e6
-2192 1 16 47 -0.26214400000000000000e6
-2192 1 22 37 0.32768000000000000000e5
-2192 1 28 43 -0.13107200000000000000e6
-2192 2 2 32 -0.32768000000000000000e5
-2192 2 3 17 0.32768000000000000000e5
-2192 2 4 26 -0.32768000000000000000e5
-2192 2 7 21 -0.13107200000000000000e6
-2192 2 10 32 0.13107200000000000000e6
-2192 2 12 26 -0.13107200000000000000e6
-2192 3 1 17 0.32768000000000000000e5
-2192 3 1 30 -0.13107200000000000000e6
-2192 3 2 31 -0.13107200000000000000e6
-2192 3 7 20 -0.13107200000000000000e6
-2192 3 8 21 -0.13107200000000000000e6
-2192 3 14 27 -0.26214400000000000000e6
-2192 4 1 13 -0.32768000000000000000e5
-2192 4 5 17 -0.65536000000000000000e5
-2192 4 7 19 0.13107200000000000000e6
-2192 4 11 11 -0.65536000000000000000e5
-2193 3 1 18 0.32768000000000000000e5
-2193 3 3 16 -0.32768000000000000000e5
-2194 1 7 38 -0.65536000000000000000e5
-2194 1 8 23 0.65536000000000000000e5
-2194 3 1 19 0.32768000000000000000e5
-2194 3 3 16 0.32768000000000000000e5
-2194 3 4 17 0.32768000000000000000e5
-2194 3 6 19 0.65536000000000000000e5
-2194 3 7 20 -0.13107200000000000000e6
-2194 4 1 13 0.32768000000000000000e5
-2194 4 2 14 0.65536000000000000000e5
-2195 1 1 24 -0.16384000000000000000e5
-2195 1 1 40 -0.16384000000000000000e5
-2195 1 2 33 -0.65536000000000000000e5
-2195 1 2 49 -0.16384000000000000000e5
-2195 1 3 34 0.13107200000000000000e6
-2195 1 3 50 0.32768000000000000000e5
-2195 1 5 52 -0.65536000000000000000e5
-2195 1 6 37 -0.16384000000000000000e5
-2195 1 10 41 -0.65536000000000000000e5
-2195 1 11 42 0.65536000000000000000e5
-2195 1 12 43 0.13107200000000000000e6
-2195 1 16 47 -0.13107200000000000000e6
-2195 1 22 37 0.16384000000000000000e5
-2195 1 28 43 -0.65536000000000000000e5
-2195 2 2 16 -0.16384000000000000000e5
-2195 2 2 32 -0.16384000000000000000e5
-2195 2 3 17 0.16384000000000000000e5
-2195 2 4 26 -0.16384000000000000000e5
-2195 2 7 21 -0.65536000000000000000e5
-2195 2 10 32 0.65536000000000000000e5
-2195 2 12 26 -0.65536000000000000000e5
-2195 2 16 16 0.32768000000000000000e5
-2195 3 1 16 -0.16384000000000000000e5
-2195 3 1 20 0.32768000000000000000e5
-2195 3 1 30 -0.65536000000000000000e5
-2195 3 2 31 -0.65536000000000000000e5
-2195 3 3 16 -0.16384000000000000000e5
-2195 3 7 20 -0.65536000000000000000e5
-2195 3 8 21 -0.65536000000000000000e5
-2195 3 14 27 -0.13107200000000000000e6
-2195 4 1 13 -0.16384000000000000000e5
-2195 4 5 17 -0.32768000000000000000e5
-2195 4 7 19 0.65536000000000000000e5
-2195 4 11 11 -0.32768000000000000000e5
-2196 1 7 38 0.32768000000000000000e5
-2196 1 8 23 -0.32768000000000000000e5
-2196 3 1 21 0.32768000000000000000e5
-2197 1 7 38 -0.32768000000000000000e5
-2197 1 8 23 0.32768000000000000000e5
-2197 3 1 22 0.32768000000000000000e5
-2197 3 6 19 0.32768000000000000000e5
-2197 3 7 20 -0.65536000000000000000e5
-2197 4 2 14 0.32768000000000000000e5
-2198 1 1 32 -0.32768000000000000000e5
-2198 1 2 17 0.65536000000000000000e5
-2198 1 2 33 0.32768000000000000000e5
-2198 1 3 34 -0.65536000000000000000e5
-2198 1 10 41 0.32768000000000000000e5
-2198 1 11 42 -0.32768000000000000000e5
-2198 1 12 43 -0.65536000000000000000e5
-2198 1 17 48 0.65536000000000000000e5
-2198 2 1 31 -0.32768000000000000000e5
-2198 2 7 21 0.32768000000000000000e5
-2198 2 8 22 -0.32768000000000000000e5
-2198 2 12 26 0.32768000000000000000e5
-2198 3 1 14 -0.65536000000000000000e5
-2198 3 1 23 0.32768000000000000000e5
-2198 3 6 23 -0.65536000000000000000e5
-2198 3 7 20 0.32768000000000000000e5
-2198 3 8 21 0.32768000000000000000e5
-2198 3 14 27 0.65536000000000000000e5
-2198 4 4 16 0.32768000000000000000e5
-2199 3 1 24 0.32768000000000000000e5
-2199 3 7 20 -0.32768000000000000000e5
-2200 3 1 25 0.32768000000000000000e5
-2200 3 6 23 -0.32768000000000000000e5
-2201 1 1 40 0.32768000000000000000e5
-2201 1 2 33 0.13107200000000000000e6
-2201 1 2 49 0.32768000000000000000e5
-2201 1 3 34 -0.26214400000000000000e6
-2201 1 3 50 -0.65536000000000000000e5
-2201 1 5 52 0.13107200000000000000e6
-2201 1 6 37 0.32768000000000000000e5
-2201 1 10 41 0.13107200000000000000e6
-2201 1 11 42 -0.13107200000000000000e6
-2201 1 12 43 -0.26214400000000000000e6
-2201 1 16 47 0.26214400000000000000e6
-2201 1 28 43 0.13107200000000000000e6
-2201 2 2 32 0.32768000000000000000e5
-2201 2 3 17 -0.32768000000000000000e5
-2201 2 4 26 0.32768000000000000000e5
-2201 2 7 21 0.13107200000000000000e6
-2201 2 10 32 -0.13107200000000000000e6
-2201 2 12 26 0.13107200000000000000e6
-2201 3 1 26 0.32768000000000000000e5
-2201 3 1 30 0.13107200000000000000e6
-2201 3 2 31 0.13107200000000000000e6
-2201 3 7 20 0.13107200000000000000e6
-2201 3 8 21 0.13107200000000000000e6
-2201 3 14 27 0.26214400000000000000e6
-2201 4 1 13 0.32768000000000000000e5
-2201 4 5 17 0.65536000000000000000e5
-2201 4 7 19 -0.13107200000000000000e6
-2201 4 11 11 0.65536000000000000000e5
-2202 1 2 49 -0.32768000000000000000e5
-2202 1 6 37 -0.32768000000000000000e5
-2202 1 8 39 0.65536000000000000000e5
-2202 1 23 38 -0.32768000000000000000e5
-2202 2 2 32 -0.32768000000000000000e5
-2202 2 3 17 0.32768000000000000000e5
-2202 2 4 26 -0.32768000000000000000e5
-2202 3 1 27 0.32768000000000000000e5
-2202 3 1 30 -0.65536000000000000000e5
-2202 4 1 13 -0.32768000000000000000e5
-2203 1 1 40 -0.32768000000000000000e5
-2203 1 23 38 0.32768000000000000000e5
-2203 3 1 28 0.32768000000000000000e5
-2204 1 2 33 0.65536000000000000000e5
-2204 1 3 34 -0.13107200000000000000e6
-2204 1 3 50 -0.32768000000000000000e5
-2204 1 5 52 0.65536000000000000000e5
-2204 1 8 39 0.32768000000000000000e5
-2204 1 10 41 0.65536000000000000000e5
-2204 1 11 42 -0.65536000000000000000e5
-2204 1 12 43 -0.13107200000000000000e6
-2204 1 16 47 0.13107200000000000000e6
-2204 1 28 43 0.65536000000000000000e5
-2204 2 7 21 0.65536000000000000000e5
-2204 2 10 32 -0.65536000000000000000e5
-2204 2 12 26 0.65536000000000000000e5
-2204 3 1 29 0.32768000000000000000e5
-2204 3 1 30 0.32768000000000000000e5
-2204 3 2 31 0.65536000000000000000e5
-2204 3 7 20 0.65536000000000000000e5
-2204 3 8 21 0.65536000000000000000e5
-2204 3 14 27 0.13107200000000000000e6
-2204 4 5 17 0.32768000000000000000e5
-2204 4 7 19 -0.65536000000000000000e5
-2205 1 2 33 0.32768000000000000000e5
-2205 1 3 34 -0.65536000000000000000e5
-2205 1 5 52 0.32768000000000000000e5
-2205 1 10 41 0.32768000000000000000e5
-2205 1 11 42 -0.32768000000000000000e5
-2205 1 12 43 -0.65536000000000000000e5
-2205 1 16 47 0.65536000000000000000e5
-2205 1 28 43 0.32768000000000000000e5
-2205 2 7 21 0.32768000000000000000e5
-2205 2 10 32 -0.32768000000000000000e5
-2205 2 12 26 0.32768000000000000000e5
-2205 3 1 31 0.32768000000000000000e5
-2205 3 2 31 0.32768000000000000000e5
-2205 3 7 20 0.32768000000000000000e5
-2205 3 8 21 0.32768000000000000000e5
-2205 3 14 27 0.65536000000000000000e5
-2205 4 7 19 -0.32768000000000000000e5
-2206 1 2 49 0.32768000000000000000e5
-2206 1 7 54 -0.65536000000000000000e5
-2206 1 23 38 0.32768000000000000000e5
-2206 1 24 39 0.32768000000000000000e5
-2206 2 1 35 -0.32768000000000000000e5
-2206 2 2 32 0.32768000000000000000e5
-2206 2 3 33 0.32768000000000000000e5
-2206 2 18 32 -0.32768000000000000000e5
-2206 2 26 32 0.32768000000000000000e5
-2206 3 1 32 0.32768000000000000000e5
-2206 3 3 32 0.32768000000000000000e5
-2206 3 4 33 0.32768000000000000000e5
-2206 3 16 29 -0.65536000000000000000e5
-2206 3 17 30 -0.65536000000000000000e5
-2206 4 17 17 0.65536000000000000000e5
-2207 1 2 49 -0.32768000000000000000e5
-2207 1 7 54 0.65536000000000000000e5
-2207 1 23 38 -0.32768000000000000000e5
-2207 1 24 39 -0.32768000000000000000e5
-2207 2 3 33 -0.32768000000000000000e5
-2207 2 18 32 0.32768000000000000000e5
-2207 2 26 32 -0.32768000000000000000e5
-2207 3 1 33 0.32768000000000000000e5
-2207 3 4 33 -0.32768000000000000000e5
-2207 3 17 30 0.65536000000000000000e5
-2207 4 17 17 -0.65536000000000000000e5
-2208 3 1 34 0.32768000000000000000e5
-2208 3 16 29 -0.32768000000000000000e5
-2209 1 2 49 0.32768000000000000000e5
-2209 1 7 54 -0.65536000000000000000e5
-2209 1 22 53 0.32768000000000000000e5
-2209 1 24 39 0.32768000000000000000e5
-2209 2 3 33 0.32768000000000000000e5
-2209 2 18 32 -0.32768000000000000000e5
-2209 2 26 32 0.32768000000000000000e5
-2209 3 1 35 0.32768000000000000000e5
-2209 3 4 33 0.32768000000000000000e5
-2209 3 17 30 -0.65536000000000000000e5
-2209 4 17 17 0.65536000000000000000e5
-2210 1 1 40 -0.16384000000000000000e5
-2210 1 2 5 0.16384000000000000000e5
-2210 1 2 9 -0.32768000000000000000e5
-2210 1 7 38 -0.32768000000000000000e5
-2210 1 8 23 0.65536000000000000000e5
-2210 3 2 2 0.32768000000000000000e5
-2210 3 2 3 0.16384000000000000000e5
-2210 3 3 16 0.16384000000000000000e5
-2210 3 4 17 0.16384000000000000000e5
-2210 3 6 19 0.32768000000000000000e5
-2210 3 7 20 -0.65536000000000000000e5
-2210 4 1 13 0.16384000000000000000e5
-2210 4 2 2 0.32768000000000000000e5
-2210 4 2 14 0.32768000000000000000e5
-2211 1 1 40 0.32768000000000000000e5
-2211 1 2 5 -0.32768000000000000000e5
-2211 1 7 38 0.65536000000000000000e5
-2211 1 8 23 -0.65536000000000000000e5
-2211 3 2 4 0.32768000000000000000e5
-2211 3 3 16 -0.32768000000000000000e5
-2211 3 4 17 -0.32768000000000000000e5
-2211 3 6 19 -0.65536000000000000000e5
-2211 3 7 20 0.13107200000000000000e6
-2211 4 1 13 -0.32768000000000000000e5
-2211 4 2 14 -0.65536000000000000000e5
-2212 1 1 40 -0.32768000000000000000e5
-2212 1 1 48 0.32768000000000000000e5
-2212 1 2 5 0.32768000000000000000e5
-2212 1 2 9 0.65536000000000000000e5
-2212 1 2 17 0.26214400000000000000e6
-2212 1 2 33 0.13107200000000000000e6
-2212 1 2 49 0.32768000000000000000e5
-2212 1 3 18 0.52428800000000000000e6
-2212 1 4 19 0.52428800000000000000e6
-2212 1 4 35 0.52428800000000000000e6
-2212 1 6 13 -0.13107200000000000000e6
-2212 1 8 39 0.65536000000000000000e5
-2212 1 11 42 -0.13107200000000000000e6
-2212 1 18 25 0.26214400000000000000e6
-2212 1 20 27 -0.10485760000000000000e7
-2212 1 23 38 0.32768000000000000000e5
-2212 2 2 4 0.32768000000000000000e5
-2212 2 2 8 0.65536000000000000000e5
-2212 2 2 32 0.32768000000000000000e5
-2212 2 3 17 -0.32768000000000000000e5
-2212 2 4 10 0.13107200000000000000e6
-2212 2 6 12 0.26214400000000000000e6
-2212 2 8 22 -0.13107200000000000000e6
-2212 2 9 23 0.26214400000000000000e6
-2212 2 10 24 0.52428800000000000000e6
-2212 3 1 30 0.65536000000000000000e5
-2212 3 2 3 0.32768000000000000000e5
-2212 3 2 5 0.32768000000000000000e5
-2212 3 2 15 -0.52428800000000000000e6
-2212 3 3 8 0.65536000000000000000e5
-2212 3 3 16 0.32768000000000000000e5
-2212 3 4 17 0.32768000000000000000e5
-2212 3 6 19 0.65536000000000000000e5
-2212 3 8 13 -0.52428800000000000000e6
-2212 3 9 22 -0.13107200000000000000e6
-2212 4 1 13 0.32768000000000000000e5
-2212 4 4 8 -0.13107200000000000000e6
-2213 1 1 40 -0.16384000000000000000e5
-2213 1 2 5 0.16384000000000000000e5
-2213 1 2 9 -0.32768000000000000000e5
-2213 1 7 38 -0.32768000000000000000e5
-2213 1 8 23 0.65536000000000000000e5
-2213 2 1 3 -0.16384000000000000000e5
-2213 2 2 16 0.16384000000000000000e5
-2213 3 1 2 -0.16384000000000000000e5
-2213 3 2 6 0.32768000000000000000e5
-2213 3 3 16 0.16384000000000000000e5
-2213 3 4 17 0.16384000000000000000e5
-2213 3 6 19 0.32768000000000000000e5
-2213 3 7 20 -0.65536000000000000000e5
-2213 4 1 13 0.16384000000000000000e5
-2213 4 2 2 0.32768000000000000000e5
-2213 4 2 14 0.32768000000000000000e5
-2214 1 2 9 -0.32768000000000000000e5
-2214 1 8 23 0.32768000000000000000e5
-2214 3 2 7 0.32768000000000000000e5
-2215 1 1 48 0.16384000000000000000e5
-2215 1 2 9 0.32768000000000000000e5
-2215 1 2 17 0.13107200000000000000e6
-2215 1 2 33 0.65536000000000000000e5
-2215 1 2 49 0.16384000000000000000e5
-2215 1 3 18 0.26214400000000000000e6
-2215 1 4 19 0.26214400000000000000e6
-2215 1 4 35 0.26214400000000000000e6
-2215 1 6 13 -0.65536000000000000000e5
-2215 1 7 38 0.32768000000000000000e5
-2215 1 8 23 -0.32768000000000000000e5
-2215 1 8 39 0.32768000000000000000e5
-2215 1 11 42 -0.65536000000000000000e5
-2215 1 18 25 0.13107200000000000000e6
-2215 1 20 27 -0.52428800000000000000e6
-2215 1 23 38 0.16384000000000000000e5
-2215 2 2 8 0.32768000000000000000e5
-2215 2 2 32 0.16384000000000000000e5
-2215 2 4 10 0.65536000000000000000e5
-2215 2 6 12 0.13107200000000000000e6
-2215 2 8 22 -0.65536000000000000000e5
-2215 2 9 23 0.13107200000000000000e6
-2215 2 10 24 0.26214400000000000000e6
-2215 3 1 30 0.32768000000000000000e5
-2215 3 2 8 0.32768000000000000000e5
-2215 3 2 15 -0.26214400000000000000e6
-2215 3 3 8 0.32768000000000000000e5
-2215 3 7 20 0.65536000000000000000e5
-2215 3 8 13 -0.26214400000000000000e6
-2215 3 9 22 -0.65536000000000000000e5
-2215 4 2 14 -0.32768000000000000000e5
-2215 4 4 8 -0.65536000000000000000e5
-2216 3 2 9 0.32768000000000000000e5
-2216 3 3 8 -0.32768000000000000000e5
-2217 3 2 10 0.32768000000000000000e5
-2217 3 6 7 -0.32768000000000000000e5
-2218 1 2 17 0.65536000000000000000e5
-2218 1 3 18 0.13107200000000000000e6
-2218 1 3 34 0.65536000000000000000e5
-2218 1 4 19 0.13107200000000000000e6
-2218 1 4 35 0.13107200000000000000e6
-2218 1 6 13 -0.32768000000000000000e5
-2218 1 10 41 -0.32768000000000000000e5
-2218 1 11 42 -0.32768000000000000000e5
-2218 1 18 25 0.65536000000000000000e5
-2218 1 20 27 -0.26214400000000000000e6
-2218 2 4 10 0.32768000000000000000e5
-2218 2 6 12 0.65536000000000000000e5
-2218 2 7 21 -0.32768000000000000000e5
-2218 2 8 22 -0.32768000000000000000e5
-2218 2 9 23 0.65536000000000000000e5
-2218 2 10 24 0.13107200000000000000e6
-2218 3 2 11 0.32768000000000000000e5
-2218 3 2 15 -0.13107200000000000000e6
-2218 3 8 13 -0.13107200000000000000e6
-2218 3 8 21 -0.32768000000000000000e5
-2218 3 9 22 -0.32768000000000000000e5
-2218 4 4 8 -0.32768000000000000000e5
-2219 1 3 18 -0.65536000000000000000e5
-2219 1 4 35 -0.13107200000000000000e6
-2219 1 6 13 0.32768000000000000000e5
-2219 1 10 41 0.32768000000000000000e5
-2219 1 11 42 0.32768000000000000000e5
-2219 1 18 25 -0.65536000000000000000e5
-2219 1 28 35 0.13107200000000000000e6
-2219 2 8 22 0.32768000000000000000e5
-2219 2 9 23 -0.65536000000000000000e5
-2219 3 2 12 0.32768000000000000000e5
-2219 3 5 10 0.32768000000000000000e5
-2219 3 8 21 0.32768000000000000000e5
-2219 3 9 22 0.32768000000000000000e5
-2219 3 11 24 0.13107200000000000000e6
-2219 4 4 8 0.32768000000000000000e5
-2220 3 1 14 -0.32768000000000000000e5
-2220 3 2 13 0.32768000000000000000e5
-2221 1 2 17 0.32768000000000000000e5
-2221 1 3 18 0.32768000000000000000e5
-2221 1 3 34 0.32768000000000000000e5
-2221 1 4 19 0.65536000000000000000e5
-2221 1 20 27 -0.13107200000000000000e6
-2221 1 28 35 0.65536000000000000000e5
-2221 2 6 12 0.32768000000000000000e5
-2221 2 10 24 0.65536000000000000000e5
-2221 3 2 14 0.32768000000000000000e5
-2221 3 2 15 -0.65536000000000000000e5
-2221 3 8 13 -0.65536000000000000000e5
-2221 3 11 24 0.65536000000000000000e5
-2222 1 1 24 -0.32768000000000000000e5
-2222 1 1 40 -0.32768000000000000000e5
-2222 1 2 33 -0.13107200000000000000e6
-2222 1 2 49 -0.32768000000000000000e5
-2222 1 3 34 0.26214400000000000000e6
-2222 1 3 50 0.65536000000000000000e5
-2222 1 5 52 -0.13107200000000000000e6
-2222 1 6 37 -0.32768000000000000000e5
-2222 1 10 41 -0.13107200000000000000e6
-2222 1 11 42 0.13107200000000000000e6
-2222 1 12 43 0.26214400000000000000e6
-2222 1 16 47 -0.26214400000000000000e6
-2222 1 22 37 0.32768000000000000000e5
-2222 1 28 43 -0.13107200000000000000e6
-2222 2 2 32 -0.32768000000000000000e5
-2222 2 3 17 0.32768000000000000000e5
-2222 2 4 26 -0.32768000000000000000e5
-2222 2 7 21 -0.13107200000000000000e6
-2222 2 10 32 0.13107200000000000000e6
-2222 2 12 26 -0.13107200000000000000e6
-2222 3 1 30 -0.13107200000000000000e6
-2222 3 2 16 0.32768000000000000000e5
-2222 3 2 31 -0.13107200000000000000e6
-2222 3 7 20 -0.13107200000000000000e6
-2222 3 8 21 -0.13107200000000000000e6
-2222 3 14 27 -0.26214400000000000000e6
-2222 4 1 13 -0.32768000000000000000e5
-2222 4 5 17 -0.65536000000000000000e5
-2222 4 7 19 0.13107200000000000000e6
-2222 4 11 11 -0.65536000000000000000e5
-2223 3 2 17 0.32768000000000000000e5
-2223 3 3 16 -0.32768000000000000000e5
-2224 1 7 38 -0.65536000000000000000e5
-2224 1 8 23 0.65536000000000000000e5
-2224 3 2 18 0.32768000000000000000e5
-2224 3 3 16 0.32768000000000000000e5
-2224 3 4 17 0.32768000000000000000e5
-2224 3 6 19 0.65536000000000000000e5
-2224 3 7 20 -0.13107200000000000000e6
-2224 4 1 13 0.32768000000000000000e5
-2224 4 2 14 0.65536000000000000000e5
-2225 3 2 19 0.32768000000000000000e5
-2225 3 4 17 -0.32768000000000000000e5
-2226 1 7 38 0.32768000000000000000e5
-2226 1 8 23 -0.32768000000000000000e5
-2226 3 2 20 0.32768000000000000000e5
-2227 1 7 38 -0.32768000000000000000e5
-2227 1 8 23 0.32768000000000000000e5
-2227 3 2 21 0.32768000000000000000e5
-2227 3 6 19 0.32768000000000000000e5
-2227 3 7 20 -0.65536000000000000000e5
-2227 4 2 14 0.32768000000000000000e5
-2228 3 2 22 0.32768000000000000000e5
-2228 3 6 19 -0.32768000000000000000e5
-2229 3 2 23 0.32768000000000000000e5
-2229 3 7 20 -0.32768000000000000000e5
-2230 1 2 33 -0.32768000000000000000e5
-2230 1 11 42 0.32768000000000000000e5
-2230 1 12 43 0.65536000000000000000e5
-2230 1 17 48 -0.65536000000000000000e5
-2230 2 8 22 0.32768000000000000000e5
-2230 2 12 26 -0.32768000000000000000e5
-2230 3 2 24 0.32768000000000000000e5
-2230 3 14 27 -0.65536000000000000000e5
-2230 4 4 16 -0.32768000000000000000e5
-2231 1 3 34 -0.32768000000000000000e5
-2231 1 16 47 0.32768000000000000000e5
-2231 3 2 25 0.32768000000000000000e5
-2231 3 13 26 0.32768000000000000000e5
-2232 1 2 49 -0.32768000000000000000e5
-2232 1 6 37 -0.32768000000000000000e5
-2232 1 8 39 0.65536000000000000000e5
-2232 1 23 38 -0.32768000000000000000e5
-2232 2 2 32 -0.32768000000000000000e5
-2232 2 3 17 0.32768000000000000000e5
-2232 2 4 26 -0.32768000000000000000e5
-2232 3 1 30 -0.65536000000000000000e5
-2232 3 2 26 0.32768000000000000000e5
-2232 4 1 13 -0.32768000000000000000e5
-2233 1 1 40 -0.32768000000000000000e5
-2233 1 23 38 0.32768000000000000000e5
-2233 3 2 27 0.32768000000000000000e5
-2234 1 1 40 0.32768000000000000000e5
-2234 1 2 49 0.32768000000000000000e5
-2234 1 6 37 0.32768000000000000000e5
-2234 1 8 39 -0.65536000000000000000e5
-2234 2 4 26 0.32768000000000000000e5
-2234 3 2 28 0.32768000000000000000e5
-2235 3 1 30 -0.32768000000000000000e5
-2235 3 2 29 0.32768000000000000000e5
-2236 1 3 50 0.32768000000000000000e5
-2236 1 8 39 -0.32768000000000000000e5
-2236 3 2 30 0.32768000000000000000e5
-2237 1 2 49 -0.32768000000000000000e5
-2237 1 7 54 0.65536000000000000000e5
-2237 1 23 38 -0.32768000000000000000e5
-2237 1 24 39 -0.32768000000000000000e5
-2237 2 3 33 -0.32768000000000000000e5
-2237 2 18 32 0.32768000000000000000e5
-2237 2 26 32 -0.32768000000000000000e5
-2237 3 2 32 0.32768000000000000000e5
-2237 3 4 33 -0.32768000000000000000e5
-2237 3 17 30 0.65536000000000000000e5
-2237 4 17 17 -0.65536000000000000000e5
-2238 3 2 33 0.32768000000000000000e5
-2238 3 3 32 -0.32768000000000000000e5
-2239 1 3 50 -0.32768000000000000000e5
-2239 1 7 54 0.32768000000000000000e5
-2239 3 2 34 0.32768000000000000000e5
-2240 1 2 49 -0.32768000000000000000e5
-2240 1 7 54 0.65536000000000000000e5
-2240 1 22 53 -0.32768000000000000000e5
-2240 1 23 54 -0.32768000000000000000e5
-2240 2 26 32 -0.32768000000000000000e5
-2240 3 2 35 0.32768000000000000000e5
-2240 3 3 32 0.32768000000000000000e5
-2240 3 6 35 -0.65536000000000000000e5
-2241 1 1 40 0.16384000000000000000e5
-2241 1 2 5 -0.16384000000000000000e5
-2241 1 7 38 0.32768000000000000000e5
-2241 1 8 23 -0.32768000000000000000e5
-2241 3 3 3 0.32768000000000000000e5
-2241 3 3 16 -0.16384000000000000000e5
-2241 3 4 17 -0.16384000000000000000e5
-2241 3 6 19 -0.32768000000000000000e5
-2241 3 7 20 0.65536000000000000000e5
-2241 4 1 13 -0.16384000000000000000e5
-2241 4 2 14 -0.32768000000000000000e5
-2242 1 1 40 -0.32768000000000000000e5
-2242 1 1 48 0.32768000000000000000e5
-2242 1 2 5 0.32768000000000000000e5
-2242 1 2 9 0.65536000000000000000e5
-2242 1 2 17 0.26214400000000000000e6
-2242 1 2 33 0.13107200000000000000e6
-2242 1 2 49 0.32768000000000000000e5
-2242 1 3 18 0.52428800000000000000e6
-2242 1 4 19 0.52428800000000000000e6
-2242 1 4 35 0.52428800000000000000e6
-2242 1 6 13 -0.13107200000000000000e6
-2242 1 8 39 0.65536000000000000000e5
-2242 1 11 42 -0.13107200000000000000e6
-2242 1 18 25 0.26214400000000000000e6
-2242 1 20 27 -0.10485760000000000000e7
-2242 1 23 38 0.32768000000000000000e5
-2242 2 2 4 0.32768000000000000000e5
-2242 2 2 8 0.65536000000000000000e5
-2242 2 2 32 0.32768000000000000000e5
-2242 2 3 17 -0.32768000000000000000e5
-2242 2 4 10 0.13107200000000000000e6
-2242 2 6 12 0.26214400000000000000e6
-2242 2 8 22 -0.13107200000000000000e6
-2242 2 9 23 0.26214400000000000000e6
-2242 2 10 24 0.52428800000000000000e6
-2242 3 1 30 0.65536000000000000000e5
-2242 3 2 3 0.32768000000000000000e5
-2242 3 2 15 -0.52428800000000000000e6
-2242 3 3 4 0.32768000000000000000e5
-2242 3 3 8 0.65536000000000000000e5
-2242 3 3 16 0.32768000000000000000e5
-2242 3 4 17 0.32768000000000000000e5
-2242 3 6 19 0.65536000000000000000e5
-2242 3 8 13 -0.52428800000000000000e6
-2242 3 9 22 -0.13107200000000000000e6
-2242 4 1 13 0.32768000000000000000e5
-2242 4 4 8 -0.13107200000000000000e6
-2243 1 1 40 0.32768000000000000000e5
-2243 1 1 48 -0.65536000000000000000e5
-2243 1 2 5 -0.32768000000000000000e5
-2243 1 2 9 -0.65536000000000000000e5
-2243 1 2 17 -0.26214400000000000000e6
-2243 1 2 33 -0.13107200000000000000e6
-2243 1 2 49 -0.65536000000000000000e5
-2243 1 3 18 -0.52428800000000000000e6
-2243 1 4 19 -0.52428800000000000000e6
-2243 1 4 35 -0.52428800000000000000e6
-2243 1 5 52 0.13107200000000000000e6
-2243 1 6 13 0.13107200000000000000e6
-2243 1 8 39 -0.65536000000000000000e5
-2243 1 11 42 0.26214400000000000000e6
-2243 1 12 43 0.26214400000000000000e6
-2243 1 17 48 -0.52428800000000000000e6
-2243 1 18 25 -0.26214400000000000000e6
-2243 1 20 27 0.10485760000000000000e7
-2243 1 23 38 -0.65536000000000000000e5
-2243 1 26 41 0.65536000000000000000e5
-2243 1 28 43 0.13107200000000000000e6
-2243 2 2 4 -0.32768000000000000000e5
-2243 2 2 8 -0.65536000000000000000e5
-2243 2 2 32 -0.65536000000000000000e5
-2243 2 3 5 0.32768000000000000000e5
-2243 2 3 9 0.65536000000000000000e5
-2243 2 3 17 0.32768000000000000000e5
-2243 2 4 10 -0.13107200000000000000e6
-2243 2 4 18 -0.32768000000000000000e5
-2243 2 6 12 -0.26214400000000000000e6
-2243 2 8 22 0.39321600000000000000e6
-2243 2 9 23 -0.26214400000000000000e6
-2243 2 10 24 -0.52428800000000000000e6
-2243 2 12 26 -0.13107200000000000000e6
-2243 2 16 30 -0.65536000000000000000e5
-2243 3 1 30 -0.65536000000000000000e5
-2243 3 2 3 -0.32768000000000000000e5
-2243 3 2 15 0.52428800000000000000e6
-2243 3 2 31 -0.13107200000000000000e6
-2243 3 3 5 0.32768000000000000000e5
-2243 3 3 16 -0.32768000000000000000e5
-2243 3 4 5 0.32768000000000000000e5
-2243 3 4 9 0.65536000000000000000e5
-2243 3 4 17 -0.32768000000000000000e5
-2243 3 5 10 -0.13107200000000000000e6
-2243 3 6 19 -0.65536000000000000000e5
-2243 3 8 13 0.52428800000000000000e6
-2243 3 9 22 0.13107200000000000000e6
-2243 3 14 27 -0.26214400000000000000e6
-2243 4 1 13 -0.32768000000000000000e5
-2243 4 3 15 -0.65536000000000000000e5
-2243 4 4 8 0.13107200000000000000e6
-2243 4 4 16 -0.26214400000000000000e6
-2243 4 6 18 -0.65536000000000000000e5
-2243 4 7 19 -0.13107200000000000000e6
-2244 1 2 9 -0.32768000000000000000e5
-2244 1 8 23 0.32768000000000000000e5
-2244 3 3 6 0.32768000000000000000e5
-2245 1 1 48 0.16384000000000000000e5
-2245 1 2 9 0.32768000000000000000e5
-2245 1 2 17 0.13107200000000000000e6
-2245 1 2 33 0.65536000000000000000e5
-2245 1 2 49 0.16384000000000000000e5
-2245 1 3 18 0.26214400000000000000e6
-2245 1 4 19 0.26214400000000000000e6
-2245 1 4 35 0.26214400000000000000e6
-2245 1 6 13 -0.65536000000000000000e5
-2245 1 7 38 0.32768000000000000000e5
-2245 1 8 23 -0.32768000000000000000e5
-2245 1 8 39 0.32768000000000000000e5
-2245 1 11 42 -0.65536000000000000000e5
-2245 1 18 25 0.13107200000000000000e6
-2245 1 20 27 -0.52428800000000000000e6
-2245 1 23 38 0.16384000000000000000e5
-2245 2 2 8 0.32768000000000000000e5
-2245 2 2 32 0.16384000000000000000e5
-2245 2 4 10 0.65536000000000000000e5
-2245 2 6 12 0.13107200000000000000e6
-2245 2 8 22 -0.65536000000000000000e5
-2245 2 9 23 0.13107200000000000000e6
-2245 2 10 24 0.26214400000000000000e6
-2245 3 1 30 0.32768000000000000000e5
-2245 3 2 15 -0.26214400000000000000e6
-2245 3 3 7 0.32768000000000000000e5
-2245 3 3 8 0.32768000000000000000e5
-2245 3 7 20 0.65536000000000000000e5
-2245 3 8 13 -0.26214400000000000000e6
-2245 3 9 22 -0.65536000000000000000e5
-2245 4 2 14 -0.32768000000000000000e5
-2245 4 4 8 -0.65536000000000000000e5
-2246 1 1 48 -0.16384000000000000000e5
-2246 1 2 49 -0.16384000000000000000e5
-2246 1 5 52 0.65536000000000000000e5
-2246 1 11 42 0.65536000000000000000e5
-2246 1 12 43 0.13107200000000000000e6
-2246 1 17 48 -0.26214400000000000000e6
-2246 1 23 38 -0.16384000000000000000e5
-2246 1 26 41 0.32768000000000000000e5
-2246 1 28 43 0.65536000000000000000e5
-2246 2 2 32 -0.16384000000000000000e5
-2246 2 3 9 0.32768000000000000000e5
-2246 2 8 22 0.13107200000000000000e6
-2246 2 12 26 -0.65536000000000000000e5
-2246 2 16 30 -0.32768000000000000000e5
-2246 3 2 31 -0.65536000000000000000e5
-2246 3 3 8 0.32768000000000000000e5
-2246 3 3 9 0.32768000000000000000e5
-2246 3 4 9 0.32768000000000000000e5
-2246 3 5 10 -0.65536000000000000000e5
-2246 3 14 27 -0.13107200000000000000e6
-2246 4 3 15 -0.32768000000000000000e5
-2246 4 4 16 -0.13107200000000000000e6
-2246 4 6 18 -0.32768000000000000000e5
-2246 4 7 19 -0.65536000000000000000e5
-2247 1 2 17 0.65536000000000000000e5
-2247 1 3 18 0.13107200000000000000e6
-2247 1 3 34 0.65536000000000000000e5
-2247 1 4 19 0.13107200000000000000e6
-2247 1 4 35 0.13107200000000000000e6
-2247 1 6 13 -0.32768000000000000000e5
-2247 1 10 41 -0.32768000000000000000e5
-2247 1 11 42 -0.32768000000000000000e5
-2247 1 18 25 0.65536000000000000000e5
-2247 1 20 27 -0.26214400000000000000e6
-2247 2 4 10 0.32768000000000000000e5
-2247 2 6 12 0.65536000000000000000e5
-2247 2 7 21 -0.32768000000000000000e5
-2247 2 8 22 -0.32768000000000000000e5
-2247 2 9 23 0.65536000000000000000e5
-2247 2 10 24 0.13107200000000000000e6
-2247 3 2 15 -0.13107200000000000000e6
-2247 3 3 10 0.32768000000000000000e5
-2247 3 8 13 -0.13107200000000000000e6
-2247 3 8 21 -0.32768000000000000000e5
-2247 3 9 22 -0.32768000000000000000e5
-2247 4 4 8 -0.32768000000000000000e5
-2248 1 3 18 -0.65536000000000000000e5
-2248 1 4 35 -0.13107200000000000000e6
-2248 1 6 13 0.32768000000000000000e5
-2248 1 10 41 0.32768000000000000000e5
-2248 1 11 42 0.32768000000000000000e5
-2248 1 18 25 -0.65536000000000000000e5
-2248 1 28 35 0.13107200000000000000e6
-2248 2 8 22 0.32768000000000000000e5
-2248 2 9 23 -0.65536000000000000000e5
-2248 3 3 11 0.32768000000000000000e5
-2248 3 5 10 0.32768000000000000000e5
-2248 3 8 21 0.32768000000000000000e5
-2248 3 9 22 0.32768000000000000000e5
-2248 3 11 24 0.13107200000000000000e6
-2248 4 4 8 0.32768000000000000000e5
-2249 3 3 12 0.32768000000000000000e5
-2249 3 5 10 -0.32768000000000000000e5
-2250 1 2 17 0.32768000000000000000e5
-2250 1 3 18 0.32768000000000000000e5
-2250 1 3 34 0.32768000000000000000e5
-2250 1 4 19 0.65536000000000000000e5
-2250 1 20 27 -0.13107200000000000000e6
-2250 1 28 35 0.65536000000000000000e5
-2250 2 6 12 0.32768000000000000000e5
-2250 2 10 24 0.65536000000000000000e5
-2250 3 2 15 -0.65536000000000000000e5
-2250 3 3 13 0.32768000000000000000e5
-2250 3 8 13 -0.65536000000000000000e5
-2250 3 11 24 0.65536000000000000000e5
-2251 1 3 18 -0.32768000000000000000e5
-2251 1 4 35 -0.32768000000000000000e5
-2251 1 18 25 -0.32768000000000000000e5
-2251 1 28 35 0.65536000000000000000e5
-2251 2 9 23 -0.32768000000000000000e5
-2251 3 3 14 0.32768000000000000000e5
-2251 3 11 24 0.65536000000000000000e5
-2252 3 3 15 0.32768000000000000000e5
-2252 3 8 13 -0.32768000000000000000e5
-2253 1 7 38 -0.65536000000000000000e5
-2253 1 8 23 0.65536000000000000000e5
-2253 3 3 16 0.32768000000000000000e5
-2253 3 3 17 0.32768000000000000000e5
-2253 3 4 17 0.32768000000000000000e5
-2253 3 6 19 0.65536000000000000000e5
-2253 3 7 20 -0.13107200000000000000e6
-2253 4 1 13 0.32768000000000000000e5
-2253 4 2 14 0.65536000000000000000e5
-2254 3 3 18 0.32768000000000000000e5
-2254 3 4 17 -0.32768000000000000000e5
-2255 1 3 26 -0.32768000000000000000e5
-2255 1 6 37 0.32768000000000000000e5
-2255 3 3 19 0.32768000000000000000e5
-2256 1 7 38 -0.32768000000000000000e5
-2256 1 8 23 0.32768000000000000000e5
-2256 3 3 20 0.32768000000000000000e5
-2256 3 6 19 0.32768000000000000000e5
-2256 3 7 20 -0.65536000000000000000e5
-2256 4 2 14 0.32768000000000000000e5
-2257 3 3 21 0.32768000000000000000e5
-2257 3 6 19 -0.32768000000000000000e5
-2258 1 9 40 -0.32768000000000000000e5
-2258 1 10 25 0.32768000000000000000e5
-2258 3 3 22 0.32768000000000000000e5
-2258 3 6 19 0.32768000000000000000e5
-2258 3 8 21 -0.65536000000000000000e5
-2258 4 3 15 0.32768000000000000000e5
-2259 1 2 33 -0.32768000000000000000e5
-2259 1 11 42 0.32768000000000000000e5
-2259 1 12 43 0.65536000000000000000e5
-2259 1 17 48 -0.65536000000000000000e5
-2259 2 8 22 0.32768000000000000000e5
-2259 2 12 26 -0.32768000000000000000e5
-2259 3 3 23 0.32768000000000000000e5
-2259 3 14 27 -0.65536000000000000000e5
-2259 4 4 16 -0.32768000000000000000e5
-2260 3 3 24 0.32768000000000000000e5
-2260 3 8 21 -0.32768000000000000000e5
-2261 1 4 35 0.32768000000000000000e5
-2261 1 12 43 0.32768000000000000000e5
-2261 1 18 25 0.32768000000000000000e5
-2261 1 28 35 -0.65536000000000000000e5
-2261 2 9 23 0.32768000000000000000e5
-2261 3 3 25 0.32768000000000000000e5
-2261 3 11 24 -0.65536000000000000000e5
-2262 1 1 40 -0.32768000000000000000e5
-2262 1 23 38 0.32768000000000000000e5
-2262 3 3 26 0.32768000000000000000e5
-2263 1 1 40 0.32768000000000000000e5
-2263 1 2 49 0.32768000000000000000e5
-2263 1 6 37 0.32768000000000000000e5
-2263 1 8 39 -0.65536000000000000000e5
-2263 2 4 26 0.32768000000000000000e5
-2263 3 3 27 0.32768000000000000000e5
-2264 1 6 37 -0.32768000000000000000e5
-2264 1 24 39 0.32768000000000000000e5
-2264 3 3 28 0.32768000000000000000e5
-2265 1 3 50 0.32768000000000000000e5
-2265 1 8 39 -0.32768000000000000000e5
-2265 3 3 29 0.32768000000000000000e5
-2266 1 3 50 -0.32768000000000000000e5
-2266 1 5 52 -0.65536000000000000000e5
-2266 1 8 39 0.32768000000000000000e5
-2266 1 9 40 0.32768000000000000000e5
-2266 1 10 41 -0.65536000000000000000e5
-2266 1 17 48 0.13107200000000000000e6
-2266 1 26 41 -0.32768000000000000000e5
-2266 1 28 43 -0.65536000000000000000e5
-2266 2 8 22 -0.65536000000000000000e5
-2266 3 3 30 0.32768000000000000000e5
-2266 4 4 16 0.65536000000000000000e5
-2266 4 6 18 0.32768000000000000000e5
-2266 4 7 19 0.65536000000000000000e5
-2267 1 5 52 -0.32768000000000000000e5
-2267 1 10 41 -0.32768000000000000000e5
-2267 1 17 48 0.65536000000000000000e5
-2267 1 28 43 -0.32768000000000000000e5
-2267 2 8 22 -0.32768000000000000000e5
-2267 3 3 31 0.32768000000000000000e5
-2267 4 4 16 0.32768000000000000000e5
-2267 4 7 19 0.32768000000000000000e5
-2268 2 3 33 0.32768000000000000000e5
-2268 2 18 32 -0.32768000000000000000e5
-2268 3 3 32 0.32768000000000000000e5
-2268 3 3 33 0.32768000000000000000e5
-2268 3 4 33 0.32768000000000000000e5
-2268 3 17 30 -0.65536000000000000000e5
-2269 3 3 34 0.32768000000000000000e5
-2269 3 17 30 -0.32768000000000000000e5
-2270 1 23 54 0.32768000000000000000e5
-2270 1 24 39 -0.32768000000000000000e5
-2270 2 3 33 -0.32768000000000000000e5
-2270 2 18 32 0.32768000000000000000e5
-2270 3 3 32 -0.32768000000000000000e5
-2270 3 3 35 0.32768000000000000000e5
-2270 3 4 33 -0.32768000000000000000e5
-2270 3 17 30 0.65536000000000000000e5
-2271 1 1 40 0.16384000000000000000e5
-2271 1 1 48 -0.32768000000000000000e5
-2271 1 2 5 -0.16384000000000000000e5
-2271 1 2 9 -0.32768000000000000000e5
-2271 1 2 17 -0.13107200000000000000e6
-2271 1 2 33 -0.65536000000000000000e5
-2271 1 2 49 -0.32768000000000000000e5
-2271 1 3 18 -0.26214400000000000000e6
-2271 1 4 19 -0.26214400000000000000e6
-2271 1 4 35 -0.26214400000000000000e6
-2271 1 5 52 0.65536000000000000000e5
-2271 1 6 13 0.65536000000000000000e5
-2271 1 8 39 -0.32768000000000000000e5
-2271 1 11 42 0.13107200000000000000e6
-2271 1 12 43 0.13107200000000000000e6
-2271 1 17 48 -0.26214400000000000000e6
-2271 1 18 25 -0.13107200000000000000e6
-2271 1 20 27 0.52428800000000000000e6
-2271 1 23 38 -0.32768000000000000000e5
-2271 1 26 41 0.32768000000000000000e5
-2271 1 28 43 0.65536000000000000000e5
-2271 2 2 4 -0.16384000000000000000e5
-2271 2 2 8 -0.32768000000000000000e5
-2271 2 2 32 -0.32768000000000000000e5
-2271 2 3 5 0.16384000000000000000e5
-2271 2 3 9 0.32768000000000000000e5
-2271 2 3 17 0.16384000000000000000e5
-2271 2 4 10 -0.65536000000000000000e5
-2271 2 4 18 -0.16384000000000000000e5
-2271 2 6 12 -0.13107200000000000000e6
-2271 2 8 22 0.19660800000000000000e6
-2271 2 9 23 -0.13107200000000000000e6
-2271 2 10 24 -0.26214400000000000000e6
-2271 2 12 26 -0.65536000000000000000e5
-2271 2 16 30 -0.32768000000000000000e5
-2271 3 1 30 -0.32768000000000000000e5
-2271 3 2 3 -0.16384000000000000000e5
-2271 3 2 15 0.26214400000000000000e6
-2271 3 2 31 -0.65536000000000000000e5
-2271 3 3 16 -0.16384000000000000000e5
-2271 3 4 4 0.32768000000000000000e5
-2271 3 4 5 0.16384000000000000000e5
-2271 3 4 9 0.32768000000000000000e5
-2271 3 4 17 -0.16384000000000000000e5
-2271 3 5 10 -0.65536000000000000000e5
-2271 3 6 19 -0.32768000000000000000e5
-2271 3 8 13 0.26214400000000000000e6
-2271 3 9 22 0.65536000000000000000e5
-2271 3 14 27 -0.13107200000000000000e6
-2271 4 1 13 -0.16384000000000000000e5
-2271 4 3 15 -0.32768000000000000000e5
-2271 4 4 8 0.65536000000000000000e5
-2271 4 4 16 -0.13107200000000000000e6
-2271 4 6 18 -0.32768000000000000000e5
-2271 4 7 19 -0.65536000000000000000e5
-2272 1 1 48 0.16384000000000000000e5
-2272 1 2 9 0.32768000000000000000e5
-2272 1 2 17 0.13107200000000000000e6
-2272 1 2 33 0.65536000000000000000e5
-2272 1 2 49 0.16384000000000000000e5
-2272 1 3 18 0.26214400000000000000e6
-2272 1 4 19 0.26214400000000000000e6
-2272 1 4 35 0.26214400000000000000e6
-2272 1 6 13 -0.65536000000000000000e5
-2272 1 7 38 0.32768000000000000000e5
-2272 1 8 23 -0.32768000000000000000e5
-2272 1 8 39 0.32768000000000000000e5
-2272 1 11 42 -0.65536000000000000000e5
-2272 1 18 25 0.13107200000000000000e6
-2272 1 20 27 -0.52428800000000000000e6
-2272 1 23 38 0.16384000000000000000e5
-2272 2 2 8 0.32768000000000000000e5
-2272 2 2 32 0.16384000000000000000e5
-2272 2 4 10 0.65536000000000000000e5
-2272 2 6 12 0.13107200000000000000e6
-2272 2 8 22 -0.65536000000000000000e5
-2272 2 9 23 0.13107200000000000000e6
-2272 2 10 24 0.26214400000000000000e6
-2272 3 1 30 0.32768000000000000000e5
-2272 3 2 15 -0.26214400000000000000e6
-2272 3 3 8 0.32768000000000000000e5
-2272 3 4 6 0.32768000000000000000e5
-2272 3 7 20 0.65536000000000000000e5
-2272 3 8 13 -0.26214400000000000000e6
-2272 3 9 22 -0.65536000000000000000e5
-2272 4 2 14 -0.32768000000000000000e5
-2272 4 4 8 -0.65536000000000000000e5
-2273 3 3 8 -0.32768000000000000000e5
-2273 3 4 7 0.32768000000000000000e5
-2274 1 1 48 -0.16384000000000000000e5
-2274 1 2 49 -0.16384000000000000000e5
-2274 1 5 52 0.65536000000000000000e5
-2274 1 11 42 0.65536000000000000000e5
-2274 1 12 43 0.13107200000000000000e6
-2274 1 17 48 -0.26214400000000000000e6
-2274 1 23 38 -0.16384000000000000000e5
-2274 1 26 41 0.32768000000000000000e5
-2274 1 28 43 0.65536000000000000000e5
-2274 2 2 32 -0.16384000000000000000e5
-2274 2 3 9 0.32768000000000000000e5
-2274 2 8 22 0.13107200000000000000e6
-2274 2 12 26 -0.65536000000000000000e5
-2274 2 16 30 -0.32768000000000000000e5
-2274 3 2 31 -0.65536000000000000000e5
-2274 3 3 8 0.32768000000000000000e5
-2274 3 4 8 0.32768000000000000000e5
-2274 3 4 9 0.32768000000000000000e5
-2274 3 5 10 -0.65536000000000000000e5
-2274 3 14 27 -0.13107200000000000000e6
-2274 4 3 15 -0.32768000000000000000e5
-2274 4 4 16 -0.13107200000000000000e6
-2274 4 6 18 -0.32768000000000000000e5
-2274 4 7 19 -0.65536000000000000000e5
-2275 1 3 18 -0.65536000000000000000e5
-2275 1 4 35 -0.13107200000000000000e6
-2275 1 6 13 0.32768000000000000000e5
-2275 1 10 41 0.32768000000000000000e5
-2275 1 11 42 0.32768000000000000000e5
-2275 1 18 25 -0.65536000000000000000e5
-2275 1 28 35 0.13107200000000000000e6
-2275 2 8 22 0.32768000000000000000e5
-2275 2 9 23 -0.65536000000000000000e5
-2275 3 4 10 0.32768000000000000000e5
-2275 3 5 10 0.32768000000000000000e5
-2275 3 8 21 0.32768000000000000000e5
-2275 3 9 22 0.32768000000000000000e5
-2275 3 11 24 0.13107200000000000000e6
-2275 4 4 8 0.32768000000000000000e5
-2276 3 4 11 0.32768000000000000000e5
-2276 3 5 10 -0.32768000000000000000e5
-2277 1 4 35 0.65536000000000000000e5
-2277 1 6 13 -0.32768000000000000000e5
-2277 1 10 41 -0.32768000000000000000e5
-2277 1 11 42 -0.32768000000000000000e5
-2277 2 8 22 -0.32768000000000000000e5
-2277 3 4 12 0.32768000000000000000e5
-2277 3 8 21 -0.32768000000000000000e5
-2277 3 9 22 -0.32768000000000000000e5
-2278 1 3 18 -0.32768000000000000000e5
-2278 1 4 35 -0.32768000000000000000e5
-2278 1 18 25 -0.32768000000000000000e5
-2278 1 28 35 0.65536000000000000000e5
-2278 2 9 23 -0.32768000000000000000e5
-2278 3 4 13 0.32768000000000000000e5
-2278 3 11 24 0.65536000000000000000e5
-2279 1 3 18 0.32768000000000000000e5
-2279 1 4 35 0.32768000000000000000e5
-2279 1 10 17 -0.65536000000000000000e5
-2279 1 11 14 0.32768000000000000000e5
-2279 2 9 11 0.32768000000000000000e5
-2279 3 4 14 0.32768000000000000000e5
-2280 1 10 17 -0.32768000000000000000e5
-2280 1 28 35 0.32768000000000000000e5
-2280 3 4 15 0.32768000000000000000e5
-2280 3 11 24 0.32768000000000000000e5
-2281 1 7 38 -0.65536000000000000000e5
-2281 1 8 23 0.65536000000000000000e5
-2281 3 3 16 0.32768000000000000000e5
-2281 3 4 16 0.32768000000000000000e5
-2281 3 4 17 0.32768000000000000000e5
-2281 3 6 19 0.65536000000000000000e5
-2281 3 7 20 -0.13107200000000000000e6
-2281 4 1 13 0.32768000000000000000e5
-2281 4 2 14 0.65536000000000000000e5
-2282 1 3 26 -0.32768000000000000000e5
-2282 1 6 37 0.32768000000000000000e5
-2282 3 4 18 0.32768000000000000000e5
-2283 3 4 19 0.32768000000000000000e5
-2283 3 5 18 -0.32768000000000000000e5
-2284 3 4 20 0.32768000000000000000e5
-2284 3 6 19 -0.32768000000000000000e5
-2285 1 9 40 -0.32768000000000000000e5
-2285 1 10 25 0.32768000000000000000e5
-2285 3 4 21 0.32768000000000000000e5
-2285 3 6 19 0.32768000000000000000e5
-2285 3 8 21 -0.65536000000000000000e5
-2285 4 3 15 0.32768000000000000000e5
-2286 1 9 40 0.32768000000000000000e5
-2286 1 10 25 -0.32768000000000000000e5
-2286 3 4 22 0.32768000000000000000e5
-2287 3 4 23 0.32768000000000000000e5
-2287 3 8 21 -0.32768000000000000000e5
-2288 1 4 35 -0.65536000000000000000e5
-2288 1 17 48 0.65536000000000000000e5
-2288 3 4 24 0.32768000000000000000e5
-2288 3 8 21 0.32768000000000000000e5
-2288 3 9 22 0.32768000000000000000e5
-2288 3 14 27 0.65536000000000000000e5
-2288 4 4 16 0.32768000000000000000e5
-2289 1 4 35 -0.32768000000000000000e5
-2289 1 17 48 0.32768000000000000000e5
-2289 3 4 25 0.32768000000000000000e5
-2289 3 14 27 0.32768000000000000000e5
-2290 1 1 40 0.32768000000000000000e5
-2290 1 2 49 0.32768000000000000000e5
-2290 1 6 37 0.32768000000000000000e5
-2290 1 8 39 -0.65536000000000000000e5
-2290 2 4 26 0.32768000000000000000e5
-2290 3 4 26 0.32768000000000000000e5
-2291 1 6 37 -0.32768000000000000000e5
-2291 1 24 39 0.32768000000000000000e5
-2291 3 4 27 0.32768000000000000000e5
-2292 1 1 40 -0.32768000000000000000e5
-2292 1 2 49 -0.32768000000000000000e5
-2292 1 3 26 0.32768000000000000000e5
-2292 1 3 50 -0.65536000000000000000e5
-2292 1 5 52 -0.13107200000000000000e6
-2292 1 6 37 -0.32768000000000000000e5
-2292 1 8 39 0.13107200000000000000e6
-2292 1 10 25 0.65536000000000000000e5
-2292 1 10 41 -0.13107200000000000000e6
-2292 1 17 48 0.26214400000000000000e6
-2292 1 24 39 -0.32768000000000000000e5
-2292 1 26 41 -0.65536000000000000000e5
-2292 1 28 43 -0.13107200000000000000e6
-2292 2 3 33 -0.32768000000000000000e5
-2292 2 4 18 0.32768000000000000000e5
-2292 2 4 26 -0.32768000000000000000e5
-2292 2 8 22 -0.13107200000000000000e6
-2292 3 4 17 0.32768000000000000000e5
-2292 3 4 28 0.32768000000000000000e5
-2292 3 5 18 0.32768000000000000000e5
-2292 3 6 19 0.65536000000000000000e5
-2292 3 8 21 -0.13107200000000000000e6
-2292 4 3 15 0.65536000000000000000e5
-2292 4 4 16 0.13107200000000000000e6
-2292 4 6 18 0.65536000000000000000e5
-2292 4 7 19 0.13107200000000000000e6
-2293 1 3 50 -0.32768000000000000000e5
-2293 1 5 52 -0.65536000000000000000e5
-2293 1 8 39 0.32768000000000000000e5
-2293 1 9 40 0.32768000000000000000e5
-2293 1 10 41 -0.65536000000000000000e5
-2293 1 17 48 0.13107200000000000000e6
-2293 1 26 41 -0.32768000000000000000e5
-2293 1 28 43 -0.65536000000000000000e5
-2293 2 8 22 -0.65536000000000000000e5
-2293 3 4 29 0.32768000000000000000e5
-2293 4 4 16 0.65536000000000000000e5
-2293 4 6 18 0.32768000000000000000e5
-2293 4 7 19 0.65536000000000000000e5
-2294 1 9 40 -0.32768000000000000000e5
-2294 1 26 41 0.32768000000000000000e5
-2294 3 4 30 0.32768000000000000000e5
-2295 1 10 41 0.32768000000000000000e5
-2295 1 11 42 0.32768000000000000000e5
-2295 1 17 48 -0.65536000000000000000e5
-2295 1 28 43 0.32768000000000000000e5
-2295 2 8 22 0.32768000000000000000e5
-2295 3 4 31 0.32768000000000000000e5
-2295 3 14 27 -0.65536000000000000000e5
-2295 4 4 16 -0.32768000000000000000e5
-2296 2 3 33 0.32768000000000000000e5
-2296 2 18 32 -0.32768000000000000000e5
-2296 3 3 32 0.32768000000000000000e5
-2296 3 4 32 0.32768000000000000000e5
-2296 3 4 33 0.32768000000000000000e5
-2296 3 17 30 -0.65536000000000000000e5
-2297 3 4 34 0.32768000000000000000e5
-2297 3 22 27 -0.32768000000000000000e5
-2298 3 4 35 0.32768000000000000000e5
-2298 3 19 32 -0.32768000000000000000e5
-2299 1 1 40 -0.16384000000000000000e5
-2299 1 1 48 0.32768000000000000000e5
-2299 1 2 5 0.16384000000000000000e5
-2299 1 2 9 0.32768000000000000000e5
-2299 1 2 17 0.13107200000000000000e6
-2299 1 2 33 0.65536000000000000000e5
-2299 1 2 49 0.32768000000000000000e5
-2299 1 3 18 0.26214400000000000000e6
-2299 1 4 19 0.26214400000000000000e6
-2299 1 4 35 0.26214400000000000000e6
-2299 1 5 52 -0.65536000000000000000e5
-2299 1 6 13 -0.65536000000000000000e5
-2299 1 8 39 0.32768000000000000000e5
-2299 1 11 42 -0.13107200000000000000e6
-2299 1 12 43 -0.13107200000000000000e6
-2299 1 17 48 0.26214400000000000000e6
-2299 1 18 25 0.13107200000000000000e6
-2299 1 20 27 -0.52428800000000000000e6
-2299 1 23 38 0.32768000000000000000e5
-2299 1 26 41 -0.32768000000000000000e5
-2299 1 28 43 -0.65536000000000000000e5
-2299 2 2 4 0.16384000000000000000e5
-2299 2 2 8 0.32768000000000000000e5
-2299 2 2 32 0.32768000000000000000e5
-2299 2 3 5 -0.16384000000000000000e5
-2299 2 3 9 -0.32768000000000000000e5
-2299 2 3 17 -0.16384000000000000000e5
-2299 2 4 10 0.65536000000000000000e5
-2299 2 4 18 0.16384000000000000000e5
-2299 2 6 12 0.13107200000000000000e6
-2299 2 8 22 -0.19660800000000000000e6
-2299 2 9 23 0.13107200000000000000e6
-2299 2 10 24 0.26214400000000000000e6
-2299 2 12 26 0.65536000000000000000e5
-2299 2 16 30 0.32768000000000000000e5
-2299 3 1 30 0.32768000000000000000e5
-2299 3 2 3 0.16384000000000000000e5
-2299 3 2 15 -0.26214400000000000000e6
-2299 3 2 31 0.65536000000000000000e5
-2299 3 3 16 0.16384000000000000000e5
-2299 3 4 9 -0.65536000000000000000e5
-2299 3 4 17 0.16384000000000000000e5
-2299 3 5 5 0.32768000000000000000e5
-2299 3 5 10 0.65536000000000000000e5
-2299 3 6 19 0.32768000000000000000e5
-2299 3 8 13 -0.26214400000000000000e6
-2299 3 9 22 -0.65536000000000000000e5
-2299 3 14 27 0.13107200000000000000e6
-2299 4 1 13 0.16384000000000000000e5
-2299 4 3 15 0.32768000000000000000e5
-2299 4 4 4 0.32768000000000000000e5
-2299 4 4 8 -0.65536000000000000000e5
-2299 4 4 16 0.13107200000000000000e6
-2299 4 6 18 0.32768000000000000000e5
-2299 4 7 19 0.65536000000000000000e5
-2300 3 3 8 -0.32768000000000000000e5
-2300 3 5 6 0.32768000000000000000e5
-2301 1 1 48 -0.16384000000000000000e5
-2301 1 2 49 -0.16384000000000000000e5
-2301 1 5 52 0.65536000000000000000e5
-2301 1 11 42 0.65536000000000000000e5
-2301 1 12 43 0.13107200000000000000e6
-2301 1 17 48 -0.26214400000000000000e6
-2301 1 23 38 -0.16384000000000000000e5
-2301 1 26 41 0.32768000000000000000e5
-2301 1 28 43 0.65536000000000000000e5
-2301 2 2 32 -0.16384000000000000000e5
-2301 2 3 9 0.32768000000000000000e5
-2301 2 8 22 0.13107200000000000000e6
-2301 2 12 26 -0.65536000000000000000e5
-2301 2 16 30 -0.32768000000000000000e5
-2301 3 2 31 -0.65536000000000000000e5
-2301 3 3 8 0.32768000000000000000e5
-2301 3 4 9 0.32768000000000000000e5
-2301 3 5 7 0.32768000000000000000e5
-2301 3 5 10 -0.65536000000000000000e5
-2301 3 14 27 -0.13107200000000000000e6
-2301 4 3 15 -0.32768000000000000000e5
-2301 4 4 16 -0.13107200000000000000e6
-2301 4 6 18 -0.32768000000000000000e5
-2301 4 7 19 -0.65536000000000000000e5
-2302 3 4 9 -0.32768000000000000000e5
-2302 3 5 8 0.32768000000000000000e5
-2303 1 3 18 0.13107200000000000000e6
-2303 1 6 11 0.32768000000000000000e5
-2303 1 6 13 0.65536000000000000000e5
-2303 1 6 29 0.32768000000000000000e5
-2303 1 10 17 -0.26214400000000000000e6
-2303 1 10 25 0.32768000000000000000e5
-2303 1 10 41 0.65536000000000000000e5
-2303 1 11 14 0.13107200000000000000e6
-2303 2 5 9 0.32768000000000000000e5
-2303 2 5 11 0.65536000000000000000e5
-2303 2 9 11 0.13107200000000000000e6
-2303 3 4 9 0.32768000000000000000e5
-2303 3 5 9 0.32768000000000000000e5
-2303 3 5 10 0.65536000000000000000e5
-2303 3 8 21 0.65536000000000000000e5
-2304 1 4 35 0.65536000000000000000e5
-2304 1 6 13 -0.32768000000000000000e5
-2304 1 10 41 -0.32768000000000000000e5
-2304 1 11 42 -0.32768000000000000000e5
-2304 2 8 22 -0.32768000000000000000e5
-2304 3 5 11 0.32768000000000000000e5
-2304 3 8 21 -0.32768000000000000000e5
-2304 3 9 22 -0.32768000000000000000e5
-2305 1 3 18 0.65536000000000000000e5
-2305 1 6 13 0.32768000000000000000e5
-2305 1 10 17 -0.13107200000000000000e6
-2305 1 10 41 0.32768000000000000000e5
-2305 1 11 14 0.65536000000000000000e5
-2305 1 11 42 0.32768000000000000000e5
-2305 2 5 11 0.32768000000000000000e5
-2305 2 9 11 0.65536000000000000000e5
-2305 3 5 10 0.32768000000000000000e5
-2305 3 5 12 0.32768000000000000000e5
-2305 3 8 21 0.32768000000000000000e5
-2305 3 9 22 0.32768000000000000000e5
-2306 1 3 18 0.32768000000000000000e5
-2306 1 4 35 0.32768000000000000000e5
-2306 1 10 17 -0.65536000000000000000e5
-2306 1 11 14 0.32768000000000000000e5
-2306 2 9 11 0.32768000000000000000e5
-2306 3 5 13 0.32768000000000000000e5
-2307 1 11 14 -0.32768000000000000000e5
-2307 1 18 25 0.32768000000000000000e5
-2307 3 5 14 0.32768000000000000000e5
-2308 1 5 20 -0.32768000000000000000e5
-2308 1 5 36 0.32768000000000000000e5
-2308 3 5 15 0.32768000000000000000e5
-2309 3 4 17 -0.32768000000000000000e5
-2309 3 5 16 0.32768000000000000000e5
-2310 1 3 26 -0.32768000000000000000e5
-2310 1 6 37 0.32768000000000000000e5
-2310 3 5 17 0.32768000000000000000e5
-2311 1 1 40 -0.32768000000000000000e5
-2311 1 1 48 0.32768000000000000000e5
-2311 1 2 49 0.32768000000000000000e5
-2311 1 3 26 0.32768000000000000000e5
-2311 1 5 52 -0.13107200000000000000e6
-2311 1 6 25 -0.32768000000000000000e5
-2311 1 6 37 -0.65536000000000000000e5
-2311 1 8 39 0.13107200000000000000e6
-2311 1 9 40 0.65536000000000000000e5
-2311 1 10 25 0.65536000000000000000e5
-2311 1 10 41 -0.13107200000000000000e6
-2311 1 11 42 -0.13107200000000000000e6
-2311 1 12 43 -0.26214400000000000000e6
-2311 1 17 48 0.52428800000000000000e6
-2311 1 23 38 0.32768000000000000000e5
-2311 1 26 41 -0.65536000000000000000e5
-2311 1 28 43 -0.13107200000000000000e6
-2311 2 2 32 0.32768000000000000000e5
-2311 2 4 18 0.32768000000000000000e5
-2311 2 4 26 -0.32768000000000000000e5
-2311 2 5 27 -0.32768000000000000000e5
-2311 2 8 22 -0.26214400000000000000e6
-2311 2 12 26 0.13107200000000000000e6
-2311 2 16 30 0.65536000000000000000e5
-2311 3 2 31 0.13107200000000000000e6
-2311 3 4 17 0.32768000000000000000e5
-2311 3 5 18 0.32768000000000000000e5
-2311 3 5 19 0.32768000000000000000e5
-2311 3 6 19 0.65536000000000000000e5
-2311 3 8 21 -0.13107200000000000000e6
-2311 3 14 27 0.26214400000000000000e6
-2311 4 3 15 0.65536000000000000000e5
-2311 4 4 16 0.26214400000000000000e6
-2311 4 6 18 0.65536000000000000000e5
-2311 4 7 19 0.13107200000000000000e6
-2312 1 9 40 -0.32768000000000000000e5
-2312 1 10 25 0.32768000000000000000e5
-2312 3 5 20 0.32768000000000000000e5
-2312 3 6 19 0.32768000000000000000e5
-2312 3 8 21 -0.65536000000000000000e5
-2312 4 3 15 0.32768000000000000000e5
-2313 1 9 40 0.32768000000000000000e5
-2313 1 10 25 -0.32768000000000000000e5
-2313 3 5 21 0.32768000000000000000e5
-2314 1 6 29 -0.32768000000000000000e5
-2314 1 26 29 0.32768000000000000000e5
-2314 3 5 22 0.32768000000000000000e5
-2315 1 4 35 -0.65536000000000000000e5
-2315 1 17 48 0.65536000000000000000e5
-2315 3 5 23 0.32768000000000000000e5
-2315 3 8 21 0.32768000000000000000e5
-2315 3 9 22 0.32768000000000000000e5
-2315 3 14 27 0.65536000000000000000e5
-2315 4 4 16 0.32768000000000000000e5
-2316 3 5 24 0.32768000000000000000e5
-2316 3 9 22 -0.32768000000000000000e5
-2317 3 5 25 0.32768000000000000000e5
-2317 3 14 19 -0.32768000000000000000e5
-2318 1 6 37 -0.32768000000000000000e5
-2318 1 24 39 0.32768000000000000000e5
-2318 3 5 26 0.32768000000000000000e5
-2319 1 1 40 -0.32768000000000000000e5
-2319 1 2 49 -0.32768000000000000000e5
-2319 1 3 26 0.32768000000000000000e5
-2319 1 3 50 -0.65536000000000000000e5
-2319 1 5 52 -0.13107200000000000000e6
-2319 1 6 37 -0.32768000000000000000e5
-2319 1 8 39 0.13107200000000000000e6
-2319 1 10 25 0.65536000000000000000e5
-2319 1 10 41 -0.13107200000000000000e6
-2319 1 17 48 0.26214400000000000000e6
-2319 1 24 39 -0.32768000000000000000e5
-2319 1 26 41 -0.65536000000000000000e5
-2319 1 28 43 -0.13107200000000000000e6
-2319 2 3 33 -0.32768000000000000000e5
-2319 2 4 18 0.32768000000000000000e5
-2319 2 4 26 -0.32768000000000000000e5
-2319 2 8 22 -0.13107200000000000000e6
-2319 3 4 17 0.32768000000000000000e5
-2319 3 5 18 0.32768000000000000000e5
-2319 3 5 27 0.32768000000000000000e5
-2319 3 6 19 0.65536000000000000000e5
-2319 3 8 21 -0.13107200000000000000e6
-2319 4 3 15 0.65536000000000000000e5
-2319 4 4 16 0.13107200000000000000e6
-2319 4 6 18 0.65536000000000000000e5
-2319 4 7 19 0.13107200000000000000e6
-2320 1 1 40 0.32768000000000000000e5
-2320 1 1 48 -0.32768000000000000000e5
-2320 1 2 49 -0.32768000000000000000e5
-2320 1 3 26 -0.32768000000000000000e5
-2320 1 5 52 0.13107200000000000000e6
-2320 1 6 37 0.65536000000000000000e5
-2320 1 8 39 -0.13107200000000000000e6
-2320 1 9 40 -0.65536000000000000000e5
-2320 1 10 25 -0.65536000000000000000e5
-2320 1 10 41 0.13107200000000000000e6
-2320 1 11 42 0.13107200000000000000e6
-2320 1 12 43 0.26214400000000000000e6
-2320 1 17 48 -0.52428800000000000000e6
-2320 1 23 38 -0.32768000000000000000e5
-2320 1 25 40 0.32768000000000000000e5
-2320 1 26 41 0.65536000000000000000e5
-2320 1 28 43 0.13107200000000000000e6
-2320 2 2 32 -0.32768000000000000000e5
-2320 2 4 18 -0.32768000000000000000e5
-2320 2 4 26 0.32768000000000000000e5
-2320 2 5 27 0.32768000000000000000e5
-2320 2 8 22 0.26214400000000000000e6
-2320 2 12 26 -0.13107200000000000000e6
-2320 2 16 30 -0.65536000000000000000e5
-2320 3 2 31 -0.13107200000000000000e6
-2320 3 4 17 -0.32768000000000000000e5
-2320 3 5 18 -0.32768000000000000000e5
-2320 3 5 28 0.32768000000000000000e5
-2320 3 6 19 -0.65536000000000000000e5
-2320 3 8 21 0.13107200000000000000e6
-2320 3 14 27 -0.26214400000000000000e6
-2320 4 3 15 -0.65536000000000000000e5
-2320 4 4 16 -0.26214400000000000000e6
-2320 4 6 18 -0.65536000000000000000e5
-2320 4 7 19 -0.13107200000000000000e6
-2321 1 9 40 -0.32768000000000000000e5
-2321 1 26 41 0.32768000000000000000e5
-2321 3 5 29 0.32768000000000000000e5
-2322 1 1 48 0.16384000000000000000e5
-2322 1 2 49 0.16384000000000000000e5
-2322 1 3 50 0.32768000000000000000e5
-2322 1 11 42 -0.65536000000000000000e5
-2322 1 12 43 -0.13107200000000000000e6
-2322 1 17 48 0.13107200000000000000e6
-2322 1 23 38 0.16384000000000000000e5
-2322 1 26 29 -0.32768000000000000000e5
-2322 1 26 41 -0.32768000000000000000e5
-2322 1 28 43 0.65536000000000000000e5
-2322 2 2 32 0.16384000000000000000e5
-2322 2 4 34 -0.32768000000000000000e5
-2322 2 8 22 -0.65536000000000000000e5
-2322 2 12 26 0.65536000000000000000e5
-2322 2 16 30 0.32768000000000000000e5
-2322 3 2 31 0.65536000000000000000e5
-2322 3 5 30 0.32768000000000000000e5
-2322 3 14 27 0.13107200000000000000e6
-2322 4 4 16 0.65536000000000000000e5
-2323 1 5 52 0.32768000000000000000e5
-2323 1 11 42 -0.32768000000000000000e5
-2323 3 5 31 0.32768000000000000000e5
-2324 3 4 33 -0.32768000000000000000e5
-2324 3 5 32 0.32768000000000000000e5
-2325 1 6 53 0.32768000000000000000e5
-2325 1 25 40 -0.32768000000000000000e5
-2325 3 5 33 0.32768000000000000000e5
-2326 1 6 53 -0.32768000000000000000e5
-2326 1 25 56 0.32768000000000000000e5
-2326 3 5 35 0.32768000000000000000e5
-2326 3 28 33 0.32768000000000000000e5
-2327 1 1 8 -0.81920000000000000000e4
-2327 1 1 40 -0.40960000000000000000e4
-2327 1 2 5 0.40960000000000000000e4
-2327 1 2 9 -0.16384000000000000000e5
-2327 1 7 22 0.81920000000000000000e4
-2327 1 7 38 -0.81920000000000000000e4
-2327 1 8 23 0.24576000000000000000e5
-2327 2 1 3 -0.40960000000000000000e4
-2327 2 2 16 0.40960000000000000000e4
-2327 3 1 2 -0.40960000000000000000e4
-2327 3 3 16 0.40960000000000000000e4
-2327 3 4 17 0.40960000000000000000e4
-2327 3 6 6 0.32768000000000000000e5
-2327 3 6 19 0.81920000000000000000e4
-2327 3 7 20 -0.16384000000000000000e5
-2327 4 1 5 -0.81920000000000000000e4
-2327 4 1 13 0.40960000000000000000e4
-2327 4 2 2 0.81920000000000000000e4
-2327 4 2 14 0.81920000000000000000e4
-2328 1 2 17 0.65536000000000000000e5
-2328 1 3 18 0.13107200000000000000e6
-2328 1 3 34 0.65536000000000000000e5
-2328 1 4 19 0.13107200000000000000e6
-2328 1 4 35 0.13107200000000000000e6
-2328 1 6 13 -0.32768000000000000000e5
-2328 1 10 41 -0.32768000000000000000e5
-2328 1 11 42 -0.32768000000000000000e5
-2328 1 18 25 0.65536000000000000000e5
-2328 1 20 27 -0.26214400000000000000e6
-2328 2 4 10 0.32768000000000000000e5
-2328 2 6 12 0.65536000000000000000e5
-2328 2 7 21 -0.32768000000000000000e5
-2328 2 8 22 -0.32768000000000000000e5
-2328 2 9 23 0.65536000000000000000e5
-2328 2 10 24 0.13107200000000000000e6
-2328 3 2 15 -0.13107200000000000000e6
-2328 3 6 8 0.32768000000000000000e5
-2328 3 8 13 -0.13107200000000000000e6
-2328 3 8 21 -0.32768000000000000000e5
-2328 3 9 22 -0.32768000000000000000e5
-2328 4 4 8 -0.32768000000000000000e5
-2329 1 3 18 -0.65536000000000000000e5
-2329 1 4 35 -0.13107200000000000000e6
-2329 1 6 13 0.32768000000000000000e5
-2329 1 10 41 0.32768000000000000000e5
-2329 1 11 42 0.32768000000000000000e5
-2329 1 18 25 -0.65536000000000000000e5
-2329 1 28 35 0.13107200000000000000e6
-2329 2 8 22 0.32768000000000000000e5
-2329 2 9 23 -0.65536000000000000000e5
-2329 3 5 10 0.32768000000000000000e5
-2329 3 6 9 0.32768000000000000000e5
-2329 3 8 21 0.32768000000000000000e5
-2329 3 9 22 0.32768000000000000000e5
-2329 3 11 24 0.13107200000000000000e6
-2329 4 4 8 0.32768000000000000000e5
-2330 1 1 8 -0.81920000000000000000e4
-2330 1 1 40 -0.40960000000000000000e4
-2330 1 2 5 0.40960000000000000000e4
-2330 1 2 9 -0.16384000000000000000e5
-2330 1 2 17 0.32768000000000000000e5
-2330 1 3 18 0.65536000000000000000e5
-2330 1 3 34 0.32768000000000000000e5
-2330 1 4 19 0.65536000000000000000e5
-2330 1 4 35 0.65536000000000000000e5
-2330 1 6 13 -0.16384000000000000000e5
-2330 1 7 22 0.81920000000000000000e4
-2330 1 7 38 -0.81920000000000000000e4
-2330 1 8 23 0.24576000000000000000e5
-2330 1 10 41 -0.16384000000000000000e5
-2330 1 11 42 -0.16384000000000000000e5
-2330 1 18 25 0.32768000000000000000e5
-2330 1 20 27 -0.13107200000000000000e6
-2330 2 1 3 -0.40960000000000000000e4
-2330 2 2 16 0.40960000000000000000e4
-2330 2 4 10 0.16384000000000000000e5
-2330 2 6 12 0.32768000000000000000e5
-2330 2 7 21 -0.16384000000000000000e5
-2330 2 8 22 -0.16384000000000000000e5
-2330 2 9 23 0.32768000000000000000e5
-2330 2 10 24 0.65536000000000000000e5
-2330 3 1 2 -0.40960000000000000000e4
-2330 3 2 15 -0.65536000000000000000e5
-2330 3 3 16 0.40960000000000000000e4
-2330 3 4 17 0.40960000000000000000e4
-2330 3 6 7 -0.16384000000000000000e5
-2330 3 6 10 0.32768000000000000000e5
-2330 3 6 19 0.81920000000000000000e4
-2330 3 7 20 -0.16384000000000000000e5
-2330 3 8 13 -0.65536000000000000000e5
-2330 3 8 21 -0.16384000000000000000e5
-2330 3 9 22 -0.16384000000000000000e5
-2330 4 1 5 -0.81920000000000000000e4
-2330 4 1 13 0.40960000000000000000e4
-2330 4 2 2 0.81920000000000000000e4
-2330 4 2 14 0.81920000000000000000e4
-2330 4 4 8 -0.16384000000000000000e5
-2330 4 5 5 -0.32768000000000000000e5
-2331 3 1 14 -0.32768000000000000000e5
-2331 3 6 11 0.32768000000000000000e5
-2332 1 2 17 0.32768000000000000000e5
-2332 1 3 18 0.32768000000000000000e5
-2332 1 3 34 0.32768000000000000000e5
-2332 1 4 19 0.65536000000000000000e5
-2332 1 20 27 -0.13107200000000000000e6
-2332 1 28 35 0.65536000000000000000e5
-2332 2 6 12 0.32768000000000000000e5
-2332 2 10 24 0.65536000000000000000e5
-2332 3 2 15 -0.65536000000000000000e5
-2332 3 6 12 0.32768000000000000000e5
-2332 3 8 13 -0.65536000000000000000e5
-2332 3 11 24 0.65536000000000000000e5
-2333 1 13 16 -0.65536000000000000000e5
-2333 1 16 31 0.65536000000000000000e5
-2333 3 2 15 0.32768000000000000000e5
-2333 3 6 13 0.32768000000000000000e5
-2333 3 8 13 0.32768000000000000000e5
-2333 4 8 8 0.65536000000000000000e5
-2334 3 2 15 -0.32768000000000000000e5
-2334 3 6 14 0.32768000000000000000e5
-2335 1 13 16 -0.32768000000000000000e5
-2335 1 16 31 0.32768000000000000000e5
-2335 3 6 15 0.32768000000000000000e5
-2336 1 1 24 -0.16384000000000000000e5
-2336 1 1 40 -0.16384000000000000000e5
-2336 1 2 33 -0.65536000000000000000e5
-2336 1 2 49 -0.16384000000000000000e5
-2336 1 3 34 0.13107200000000000000e6
-2336 1 3 50 0.32768000000000000000e5
-2336 1 5 52 -0.65536000000000000000e5
-2336 1 6 37 -0.16384000000000000000e5
-2336 1 10 41 -0.65536000000000000000e5
-2336 1 11 42 0.65536000000000000000e5
-2336 1 12 43 0.13107200000000000000e6
-2336 1 16 47 -0.13107200000000000000e6
-2336 1 22 37 0.16384000000000000000e5
-2336 1 28 43 -0.65536000000000000000e5
-2336 2 2 16 -0.16384000000000000000e5
-2336 2 2 32 -0.16384000000000000000e5
-2336 2 3 17 0.16384000000000000000e5
-2336 2 4 26 -0.16384000000000000000e5
-2336 2 7 21 -0.65536000000000000000e5
-2336 2 10 32 0.65536000000000000000e5
-2336 2 12 26 -0.65536000000000000000e5
-2336 2 16 16 0.32768000000000000000e5
-2336 3 1 16 -0.16384000000000000000e5
-2336 3 1 30 -0.65536000000000000000e5
-2336 3 2 31 -0.65536000000000000000e5
-2336 3 3 16 -0.16384000000000000000e5
-2336 3 6 16 0.32768000000000000000e5
-2336 3 7 20 -0.65536000000000000000e5
-2336 3 8 21 -0.65536000000000000000e5
-2336 3 14 27 -0.13107200000000000000e6
-2336 4 1 13 -0.16384000000000000000e5
-2336 4 5 17 -0.32768000000000000000e5
-2336 4 7 19 0.65536000000000000000e5
-2336 4 11 11 -0.32768000000000000000e5
-2337 1 7 38 0.32768000000000000000e5
-2337 1 8 23 -0.32768000000000000000e5
-2337 3 6 17 0.32768000000000000000e5
-2338 1 7 38 -0.32768000000000000000e5
-2338 1 8 23 0.32768000000000000000e5
-2338 3 6 18 0.32768000000000000000e5
-2338 3 6 19 0.32768000000000000000e5
-2338 3 7 20 -0.65536000000000000000e5
-2338 4 2 14 0.32768000000000000000e5
-2339 1 1 32 -0.32768000000000000000e5
-2339 1 2 17 0.65536000000000000000e5
-2339 1 2 33 0.32768000000000000000e5
-2339 1 3 34 -0.65536000000000000000e5
-2339 1 10 41 0.32768000000000000000e5
-2339 1 11 42 -0.32768000000000000000e5
-2339 1 12 43 -0.65536000000000000000e5
-2339 1 17 48 0.65536000000000000000e5
-2339 2 1 31 -0.32768000000000000000e5
-2339 2 7 21 0.32768000000000000000e5
-2339 2 8 22 -0.32768000000000000000e5
-2339 2 12 26 0.32768000000000000000e5
-2339 3 1 14 -0.65536000000000000000e5
-2339 3 6 20 0.32768000000000000000e5
-2339 3 6 23 -0.65536000000000000000e5
-2339 3 7 20 0.32768000000000000000e5
-2339 3 8 21 0.32768000000000000000e5
-2339 3 14 27 0.65536000000000000000e5
-2339 4 4 16 0.32768000000000000000e5
-2340 3 6 21 0.32768000000000000000e5
-2340 3 7 20 -0.32768000000000000000e5
-2341 1 2 33 -0.32768000000000000000e5
-2341 1 11 42 0.32768000000000000000e5
-2341 1 12 43 0.65536000000000000000e5
-2341 1 17 48 -0.65536000000000000000e5
-2341 2 8 22 0.32768000000000000000e5
-2341 2 12 26 -0.32768000000000000000e5
-2341 3 6 22 0.32768000000000000000e5
-2341 3 14 27 -0.65536000000000000000e5
-2341 4 4 16 -0.32768000000000000000e5
-2342 1 3 34 -0.32768000000000000000e5
-2342 1 16 47 0.32768000000000000000e5
-2342 3 6 24 0.32768000000000000000e5
-2342 3 13 26 0.32768000000000000000e5
-2343 3 6 25 0.32768000000000000000e5
-2343 3 10 23 -0.32768000000000000000e5
-2344 1 2 33 0.65536000000000000000e5
-2344 1 3 34 -0.13107200000000000000e6
-2344 1 3 50 -0.32768000000000000000e5
-2344 1 5 52 0.65536000000000000000e5
-2344 1 8 39 0.32768000000000000000e5
-2344 1 10 41 0.65536000000000000000e5
-2344 1 11 42 -0.65536000000000000000e5
-2344 1 12 43 -0.13107200000000000000e6
-2344 1 16 47 0.13107200000000000000e6
-2344 1 28 43 0.65536000000000000000e5
-2344 2 7 21 0.65536000000000000000e5
-2344 2 10 32 -0.65536000000000000000e5
-2344 2 12 26 0.65536000000000000000e5
-2344 3 1 30 0.32768000000000000000e5
-2344 3 2 31 0.65536000000000000000e5
-2344 3 6 26 0.32768000000000000000e5
-2344 3 7 20 0.65536000000000000000e5
-2344 3 8 21 0.65536000000000000000e5
-2344 3 14 27 0.13107200000000000000e6
-2344 4 5 17 0.32768000000000000000e5
-2344 4 7 19 -0.65536000000000000000e5
-2345 3 1 30 -0.32768000000000000000e5
-2345 3 6 27 0.32768000000000000000e5
-2346 1 3 50 0.32768000000000000000e5
-2346 1 8 39 -0.32768000000000000000e5
-2346 3 6 28 0.32768000000000000000e5
-2347 1 2 33 0.32768000000000000000e5
-2347 1 3 34 -0.65536000000000000000e5
-2347 1 5 52 0.32768000000000000000e5
-2347 1 10 41 0.32768000000000000000e5
-2347 1 11 42 -0.32768000000000000000e5
-2347 1 12 43 -0.65536000000000000000e5
-2347 1 16 47 0.65536000000000000000e5
-2347 1 28 43 0.32768000000000000000e5
-2347 2 7 21 0.32768000000000000000e5
-2347 2 10 32 -0.32768000000000000000e5
-2347 2 12 26 0.32768000000000000000e5
-2347 3 2 31 0.32768000000000000000e5
-2347 3 6 29 0.32768000000000000000e5
-2347 3 7 20 0.32768000000000000000e5
-2347 3 8 21 0.32768000000000000000e5
-2347 3 14 27 0.65536000000000000000e5
-2347 4 7 19 -0.32768000000000000000e5
-2348 3 2 31 -0.32768000000000000000e5
-2348 3 6 30 0.32768000000000000000e5
-2349 3 6 31 0.32768000000000000000e5
-2349 3 13 26 -0.32768000000000000000e5
-2350 3 6 32 0.32768000000000000000e5
-2350 3 16 29 -0.32768000000000000000e5
-2351 1 3 50 -0.32768000000000000000e5
-2351 1 7 54 0.32768000000000000000e5
-2351 3 6 33 0.32768000000000000000e5
-2352 1 11 42 -0.32768000000000000000e5
-2352 1 12 43 -0.65536000000000000000e5
-2352 1 17 48 0.65536000000000000000e5
-2352 1 37 44 0.32768000000000000000e5
-2352 2 8 22 -0.32768000000000000000e5
-2352 2 12 26 0.32768000000000000000e5
-2352 3 2 31 0.32768000000000000000e5
-2352 3 6 34 0.32768000000000000000e5
-2352 3 14 27 0.65536000000000000000e5
-2352 4 4 16 0.32768000000000000000e5
-2353 1 2 17 0.32768000000000000000e5
-2353 1 3 18 0.65536000000000000000e5
-2353 1 3 34 0.32768000000000000000e5
-2353 1 4 19 0.65536000000000000000e5
-2353 1 4 35 0.65536000000000000000e5
-2353 1 6 13 -0.16384000000000000000e5
-2353 1 10 41 -0.16384000000000000000e5
-2353 1 11 42 -0.16384000000000000000e5
-2353 1 18 25 0.32768000000000000000e5
-2353 1 20 27 -0.13107200000000000000e6
-2353 2 4 10 0.16384000000000000000e5
-2353 2 6 12 0.32768000000000000000e5
-2353 2 7 21 -0.16384000000000000000e5
-2353 2 8 22 -0.16384000000000000000e5
-2353 2 9 23 0.32768000000000000000e5
-2353 2 10 24 0.65536000000000000000e5
-2353 3 2 15 -0.65536000000000000000e5
-2353 3 7 7 0.32768000000000000000e5
-2353 3 8 13 -0.65536000000000000000e5
-2353 3 8 21 -0.16384000000000000000e5
-2353 3 9 22 -0.16384000000000000000e5
-2353 4 4 8 -0.16384000000000000000e5
-2354 1 3 18 -0.65536000000000000000e5
-2354 1 4 35 -0.13107200000000000000e6
-2354 1 6 13 0.32768000000000000000e5
-2354 1 10 41 0.32768000000000000000e5
-2354 1 11 42 0.32768000000000000000e5
-2354 1 18 25 -0.65536000000000000000e5
-2354 1 28 35 0.13107200000000000000e6
-2354 2 8 22 0.32768000000000000000e5
-2354 2 9 23 -0.65536000000000000000e5
-2354 3 5 10 0.32768000000000000000e5
-2354 3 7 8 0.32768000000000000000e5
-2354 3 8 21 0.32768000000000000000e5
-2354 3 9 22 0.32768000000000000000e5
-2354 3 11 24 0.13107200000000000000e6
-2354 4 4 8 0.32768000000000000000e5
-2355 3 5 10 -0.32768000000000000000e5
-2355 3 7 9 0.32768000000000000000e5
-2356 3 1 14 -0.32768000000000000000e5
-2356 3 7 10 0.32768000000000000000e5
-2357 1 2 17 0.32768000000000000000e5
-2357 1 3 18 0.32768000000000000000e5
-2357 1 3 34 0.32768000000000000000e5
-2357 1 4 19 0.65536000000000000000e5
-2357 1 20 27 -0.13107200000000000000e6
-2357 1 28 35 0.65536000000000000000e5
-2357 2 6 12 0.32768000000000000000e5
-2357 2 10 24 0.65536000000000000000e5
-2357 3 2 15 -0.65536000000000000000e5
-2357 3 7 11 0.32768000000000000000e5
-2357 3 8 13 -0.65536000000000000000e5
-2357 3 11 24 0.65536000000000000000e5
-2358 1 3 18 -0.32768000000000000000e5
-2358 1 4 35 -0.32768000000000000000e5
-2358 1 18 25 -0.32768000000000000000e5
-2358 1 28 35 0.65536000000000000000e5
-2358 2 9 23 -0.32768000000000000000e5
-2358 3 7 12 0.32768000000000000000e5
-2358 3 11 24 0.65536000000000000000e5
-2359 3 2 15 -0.32768000000000000000e5
-2359 3 7 13 0.32768000000000000000e5
-2360 3 7 14 0.32768000000000000000e5
-2360 3 8 13 -0.32768000000000000000e5
-2361 1 10 17 -0.16384000000000000000e5
-2361 1 28 35 0.16384000000000000000e5
-2361 3 2 15 -0.16384000000000000000e5
-2361 3 7 15 0.32768000000000000000e5
-2361 3 8 13 -0.16384000000000000000e5
-2361 3 11 24 0.16384000000000000000e5
-2361 4 6 10 -0.16384000000000000000e5
-2362 1 7 38 0.32768000000000000000e5
-2362 1 8 23 -0.32768000000000000000e5
-2362 3 7 16 0.32768000000000000000e5
-2363 1 7 38 -0.32768000000000000000e5
-2363 1 8 23 0.32768000000000000000e5
-2363 3 6 19 0.32768000000000000000e5
-2363 3 7 17 0.32768000000000000000e5
-2363 3 7 20 -0.65536000000000000000e5
-2363 4 2 14 0.32768000000000000000e5
-2364 3 6 19 -0.32768000000000000000e5
-2364 3 7 18 0.32768000000000000000e5
-2365 1 9 40 -0.32768000000000000000e5
-2365 1 10 25 0.32768000000000000000e5
-2365 3 6 19 0.32768000000000000000e5
-2365 3 7 19 0.32768000000000000000e5
-2365 3 8 21 -0.65536000000000000000e5
-2365 4 3 15 0.32768000000000000000e5
-2366 1 2 33 -0.32768000000000000000e5
-2366 1 11 42 0.32768000000000000000e5
-2366 1 12 43 0.65536000000000000000e5
-2366 1 17 48 -0.65536000000000000000e5
-2366 2 8 22 0.32768000000000000000e5
-2366 2 12 26 -0.32768000000000000000e5
-2366 3 7 21 0.32768000000000000000e5
-2366 3 14 27 -0.65536000000000000000e5
-2366 4 4 16 -0.32768000000000000000e5
-2367 3 7 22 0.32768000000000000000e5
-2367 3 8 21 -0.32768000000000000000e5
-2368 1 3 34 -0.32768000000000000000e5
-2368 1 16 47 0.32768000000000000000e5
-2368 3 7 23 0.32768000000000000000e5
-2368 3 13 26 0.32768000000000000000e5
-2369 1 4 35 0.32768000000000000000e5
-2369 1 12 43 0.32768000000000000000e5
-2369 1 18 25 0.32768000000000000000e5
-2369 1 28 35 -0.65536000000000000000e5
-2369 2 9 23 0.32768000000000000000e5
-2369 3 7 24 0.32768000000000000000e5
-2369 3 11 24 -0.65536000000000000000e5
-2370 1 4 19 -0.32768000000000000000e5
-2370 1 13 44 0.32768000000000000000e5
-2370 3 7 25 0.32768000000000000000e5
-2370 3 8 13 0.32768000000000000000e5
-2371 3 1 30 -0.32768000000000000000e5
-2371 3 7 26 0.32768000000000000000e5
-2372 1 3 50 0.32768000000000000000e5
-2372 1 8 39 -0.32768000000000000000e5
-2372 3 7 27 0.32768000000000000000e5
-2373 1 3 50 -0.32768000000000000000e5
-2373 1 5 52 -0.65536000000000000000e5
-2373 1 8 39 0.32768000000000000000e5
-2373 1 9 40 0.32768000000000000000e5
-2373 1 10 41 -0.65536000000000000000e5
-2373 1 17 48 0.13107200000000000000e6
-2373 1 26 41 -0.32768000000000000000e5
-2373 1 28 43 -0.65536000000000000000e5
-2373 2 8 22 -0.65536000000000000000e5
-2373 3 7 28 0.32768000000000000000e5
-2373 4 4 16 0.65536000000000000000e5
-2373 4 6 18 0.32768000000000000000e5
-2373 4 7 19 0.65536000000000000000e5
-2374 3 2 31 -0.32768000000000000000e5
-2374 3 7 29 0.32768000000000000000e5
-2375 1 5 52 -0.32768000000000000000e5
-2375 1 10 41 -0.32768000000000000000e5
-2375 1 17 48 0.65536000000000000000e5
-2375 1 28 43 -0.32768000000000000000e5
-2375 2 8 22 -0.32768000000000000000e5
-2375 3 7 30 0.32768000000000000000e5
-2375 4 4 16 0.32768000000000000000e5
-2375 4 7 19 0.32768000000000000000e5
-2376 1 5 52 -0.16384000000000000000e5
-2376 1 11 42 0.16384000000000000000e5
-2376 2 12 26 -0.16384000000000000000e5
-2376 2 20 34 0.16384000000000000000e5
-2376 3 2 31 -0.16384000000000000000e5
-2376 3 7 31 0.32768000000000000000e5
-2376 3 14 27 -0.32768000000000000000e5
-2376 4 7 19 0.16384000000000000000e5
-2376 4 8 20 0.16384000000000000000e5
-2377 1 3 50 -0.32768000000000000000e5
-2377 1 7 54 0.32768000000000000000e5
-2377 3 7 32 0.32768000000000000000e5
-2378 3 7 33 0.32768000000000000000e5
-2378 3 17 30 -0.32768000000000000000e5
-2379 1 5 52 0.32768000000000000000e5
-2379 1 17 48 -0.65536000000000000000e5
-2379 1 28 43 0.32768000000000000000e5
-2379 1 32 47 0.32768000000000000000e5
-2379 2 8 22 0.32768000000000000000e5
-2379 3 7 34 0.32768000000000000000e5
-2379 4 4 16 -0.32768000000000000000e5
-2379 4 7 19 -0.32768000000000000000e5
-2380 3 7 35 0.32768000000000000000e5
-2380 3 20 33 -0.32768000000000000000e5
-2381 3 5 10 -0.16384000000000000000e5
-2381 3 8 8 0.32768000000000000000e5
-2382 1 4 35 0.65536000000000000000e5
-2382 1 6 13 -0.32768000000000000000e5
-2382 1 10 41 -0.32768000000000000000e5
-2382 1 11 42 -0.32768000000000000000e5
-2382 2 8 22 -0.32768000000000000000e5
-2382 3 8 9 0.32768000000000000000e5
-2382 3 8 21 -0.32768000000000000000e5
-2382 3 9 22 -0.32768000000000000000e5
-2383 1 2 17 0.32768000000000000000e5
-2383 1 3 18 0.32768000000000000000e5
-2383 1 3 34 0.32768000000000000000e5
-2383 1 4 19 0.65536000000000000000e5
-2383 1 20 27 -0.13107200000000000000e6
-2383 1 28 35 0.65536000000000000000e5
-2383 2 6 12 0.32768000000000000000e5
-2383 2 10 24 0.65536000000000000000e5
-2383 3 2 15 -0.65536000000000000000e5
-2383 3 8 10 0.32768000000000000000e5
-2383 3 8 13 -0.65536000000000000000e5
-2383 3 11 24 0.65536000000000000000e5
-2384 1 3 18 -0.32768000000000000000e5
-2384 1 4 35 -0.32768000000000000000e5
-2384 1 18 25 -0.32768000000000000000e5
-2384 1 28 35 0.65536000000000000000e5
-2384 2 9 23 -0.32768000000000000000e5
-2384 3 8 11 0.32768000000000000000e5
-2384 3 11 24 0.65536000000000000000e5
-2385 1 3 18 0.32768000000000000000e5
-2385 1 4 35 0.32768000000000000000e5
-2385 1 10 17 -0.65536000000000000000e5
-2385 1 11 14 0.32768000000000000000e5
-2385 2 9 11 0.32768000000000000000e5
-2385 3 8 12 0.32768000000000000000e5
-2386 1 10 17 -0.32768000000000000000e5
-2386 1 28 35 0.32768000000000000000e5
-2386 3 8 14 0.32768000000000000000e5
-2386 3 11 24 0.32768000000000000000e5
-2387 1 4 19 -0.16384000000000000000e5
-2387 1 5 20 -0.16384000000000000000e5
-2387 1 10 17 -0.16384000000000000000e5
-2387 1 17 32 0.32768000000000000000e5
-2387 2 8 14 -0.16384000000000000000e5
-2387 3 8 15 0.32768000000000000000e5
-2388 1 7 38 -0.32768000000000000000e5
-2388 1 8 23 0.32768000000000000000e5
-2388 3 6 19 0.32768000000000000000e5
-2388 3 7 20 -0.65536000000000000000e5
-2388 3 8 16 0.32768000000000000000e5
-2388 4 2 14 0.32768000000000000000e5
-2389 3 6 19 -0.32768000000000000000e5
-2389 3 8 17 0.32768000000000000000e5
-2390 1 9 40 -0.32768000000000000000e5
-2390 1 10 25 0.32768000000000000000e5
-2390 3 6 19 0.32768000000000000000e5
-2390 3 8 18 0.32768000000000000000e5
-2390 3 8 21 -0.65536000000000000000e5
-2390 4 3 15 0.32768000000000000000e5
-2391 1 9 40 0.32768000000000000000e5
-2391 1 10 25 -0.32768000000000000000e5
-2391 3 8 19 0.32768000000000000000e5
-2392 1 2 33 -0.32768000000000000000e5
-2392 1 11 42 0.32768000000000000000e5
-2392 1 12 43 0.65536000000000000000e5
-2392 1 17 48 -0.65536000000000000000e5
-2392 2 8 22 0.32768000000000000000e5
-2392 2 12 26 -0.32768000000000000000e5
-2392 3 8 20 0.32768000000000000000e5
-2392 3 14 27 -0.65536000000000000000e5
-2392 4 4 16 -0.32768000000000000000e5
-2393 1 4 35 -0.65536000000000000000e5
-2393 1 17 48 0.65536000000000000000e5
-2393 3 8 21 0.32768000000000000000e5
-2393 3 8 22 0.32768000000000000000e5
-2393 3 9 22 0.32768000000000000000e5
-2393 3 14 27 0.65536000000000000000e5
-2393 4 4 16 0.32768000000000000000e5
-2394 1 4 35 0.32768000000000000000e5
-2394 1 12 43 0.32768000000000000000e5
-2394 1 18 25 0.32768000000000000000e5
-2394 1 28 35 -0.65536000000000000000e5
-2394 2 9 23 0.32768000000000000000e5
-2394 3 8 23 0.32768000000000000000e5
-2394 3 11 24 -0.65536000000000000000e5
-2395 1 4 35 -0.32768000000000000000e5
-2395 1 17 48 0.32768000000000000000e5
-2395 3 8 24 0.32768000000000000000e5
-2395 3 14 27 0.32768000000000000000e5
-2396 3 8 25 0.32768000000000000000e5
-2396 3 11 24 -0.32768000000000000000e5
-2397 1 3 50 0.32768000000000000000e5
-2397 1 8 39 -0.32768000000000000000e5
-2397 3 8 26 0.32768000000000000000e5
-2398 1 3 50 -0.32768000000000000000e5
-2398 1 5 52 -0.65536000000000000000e5
-2398 1 8 39 0.32768000000000000000e5
-2398 1 9 40 0.32768000000000000000e5
-2398 1 10 41 -0.65536000000000000000e5
-2398 1 17 48 0.13107200000000000000e6
-2398 1 26 41 -0.32768000000000000000e5
-2398 1 28 43 -0.65536000000000000000e5
-2398 2 8 22 -0.65536000000000000000e5
-2398 3 8 27 0.32768000000000000000e5
-2398 4 4 16 0.65536000000000000000e5
-2398 4 6 18 0.32768000000000000000e5
-2398 4 7 19 0.65536000000000000000e5
-2399 1 9 40 -0.32768000000000000000e5
-2399 1 26 41 0.32768000000000000000e5
-2399 3 8 28 0.32768000000000000000e5
-2400 1 5 52 -0.32768000000000000000e5
-2400 1 10 41 -0.32768000000000000000e5
-2400 1 17 48 0.65536000000000000000e5
-2400 1 28 43 -0.32768000000000000000e5
-2400 2 8 22 -0.32768000000000000000e5
-2400 3 8 29 0.32768000000000000000e5
-2400 4 4 16 0.32768000000000000000e5
-2400 4 7 19 0.32768000000000000000e5
-2401 1 10 41 0.32768000000000000000e5
-2401 1 11 42 0.32768000000000000000e5
-2401 1 17 48 -0.65536000000000000000e5
-2401 1 28 43 0.32768000000000000000e5
-2401 2 8 22 0.32768000000000000000e5
-2401 3 8 30 0.32768000000000000000e5
-2401 3 14 27 -0.65536000000000000000e5
-2401 4 4 16 -0.32768000000000000000e5
-2402 3 8 31 0.32768000000000000000e5
-2402 3 14 27 -0.32768000000000000000e5
-2403 3 8 32 0.32768000000000000000e5
-2403 3 17 30 -0.32768000000000000000e5
-2404 3 8 33 0.32768000000000000000e5
-2404 3 22 27 -0.32768000000000000000e5
-2405 3 8 34 0.32768000000000000000e5
-2405 3 18 31 -0.32768000000000000000e5
-2406 1 24 55 0.32768000000000000000e5
-2406 1 26 41 -0.32768000000000000000e5
-2406 3 8 35 0.32768000000000000000e5
-2406 3 22 27 0.32768000000000000000e5
-2407 1 3 18 0.32768000000000000000e5
-2407 1 6 13 0.16384000000000000000e5
-2407 1 10 17 -0.65536000000000000000e5
-2407 1 10 41 0.16384000000000000000e5
-2407 1 11 14 0.32768000000000000000e5
-2407 1 11 42 0.16384000000000000000e5
-2407 2 5 11 0.16384000000000000000e5
-2407 2 9 11 0.32768000000000000000e5
-2407 3 5 10 0.16384000000000000000e5
-2407 3 8 21 0.16384000000000000000e5
-2407 3 9 9 0.32768000000000000000e5
-2407 3 9 22 0.16384000000000000000e5
-2408 1 3 18 -0.32768000000000000000e5
-2408 1 4 35 -0.32768000000000000000e5
-2408 1 18 25 -0.32768000000000000000e5
-2408 1 28 35 0.65536000000000000000e5
-2408 2 9 23 -0.32768000000000000000e5
-2408 3 9 10 0.32768000000000000000e5
-2408 3 11 24 0.65536000000000000000e5
-2409 1 3 18 0.32768000000000000000e5
-2409 1 4 35 0.32768000000000000000e5
-2409 1 10 17 -0.65536000000000000000e5
-2409 1 11 14 0.32768000000000000000e5
-2409 2 9 11 0.32768000000000000000e5
-2409 3 9 11 0.32768000000000000000e5
-2410 1 11 14 -0.32768000000000000000e5
-2410 1 18 25 0.32768000000000000000e5
-2410 3 9 12 0.32768000000000000000e5
-2411 1 10 17 -0.32768000000000000000e5
-2411 1 28 35 0.32768000000000000000e5
-2411 3 9 13 0.32768000000000000000e5
-2411 3 11 24 0.32768000000000000000e5
-2412 1 5 20 -0.32768000000000000000e5
-2412 1 5 36 0.32768000000000000000e5
-2412 3 9 14 0.32768000000000000000e5
-2413 1 4 19 0.16384000000000000000e5
-2413 1 5 20 0.16384000000000000000e5
-2413 1 6 21 0.32768000000000000000e5
-2413 1 10 17 0.16384000000000000000e5
-2413 1 10 21 -0.65536000000000000000e5
-2413 1 29 36 0.32768000000000000000e5
-2413 2 8 14 0.16384000000000000000e5
-2413 2 9 15 0.32768000000000000000e5
-2413 3 9 15 0.32768000000000000000e5
-2413 3 12 25 0.32768000000000000000e5
-2414 3 6 19 -0.32768000000000000000e5
-2414 3 9 16 0.32768000000000000000e5
-2415 1 9 40 -0.32768000000000000000e5
-2415 1 10 25 0.32768000000000000000e5
-2415 3 6 19 0.32768000000000000000e5
-2415 3 8 21 -0.65536000000000000000e5
-2415 3 9 17 0.32768000000000000000e5
-2415 4 3 15 0.32768000000000000000e5
-2416 1 9 40 0.32768000000000000000e5
-2416 1 10 25 -0.32768000000000000000e5
-2416 3 9 18 0.32768000000000000000e5
-2417 1 6 29 -0.32768000000000000000e5
-2417 1 26 29 0.32768000000000000000e5
-2417 3 9 19 0.32768000000000000000e5
-2418 3 8 21 -0.32768000000000000000e5
-2418 3 9 20 0.32768000000000000000e5
-2419 1 4 35 -0.65536000000000000000e5
-2419 1 17 48 0.65536000000000000000e5
-2419 3 8 21 0.32768000000000000000e5
-2419 3 9 21 0.32768000000000000000e5
-2419 3 9 22 0.32768000000000000000e5
-2419 3 14 27 0.65536000000000000000e5
-2419 4 4 16 0.32768000000000000000e5
-2420 1 4 35 -0.32768000000000000000e5
-2420 1 17 48 0.32768000000000000000e5
-2420 3 9 23 0.32768000000000000000e5
-2420 3 14 27 0.32768000000000000000e5
-2421 3 9 24 0.32768000000000000000e5
-2421 3 14 19 -0.32768000000000000000e5
-2422 1 5 36 -0.32768000000000000000e5
-2422 1 14 45 0.32768000000000000000e5
-2422 3 9 25 0.32768000000000000000e5
-2423 1 3 50 -0.32768000000000000000e5
-2423 1 5 52 -0.65536000000000000000e5
-2423 1 8 39 0.32768000000000000000e5
-2423 1 9 40 0.32768000000000000000e5
-2423 1 10 41 -0.65536000000000000000e5
-2423 1 17 48 0.13107200000000000000e6
-2423 1 26 41 -0.32768000000000000000e5
-2423 1 28 43 -0.65536000000000000000e5
-2423 2 8 22 -0.65536000000000000000e5
-2423 3 9 26 0.32768000000000000000e5
-2423 4 4 16 0.65536000000000000000e5
-2423 4 6 18 0.32768000000000000000e5
-2423 4 7 19 0.65536000000000000000e5
-2424 1 9 40 -0.32768000000000000000e5
-2424 1 26 41 0.32768000000000000000e5
-2424 3 9 27 0.32768000000000000000e5
-2425 1 1 48 0.16384000000000000000e5
-2425 1 2 49 0.16384000000000000000e5
-2425 1 3 50 0.32768000000000000000e5
-2425 1 11 42 -0.65536000000000000000e5
-2425 1 12 43 -0.13107200000000000000e6
-2425 1 17 48 0.13107200000000000000e6
-2425 1 23 38 0.16384000000000000000e5
-2425 1 26 29 -0.32768000000000000000e5
-2425 1 26 41 -0.32768000000000000000e5
-2425 1 28 43 0.65536000000000000000e5
-2425 2 2 32 0.16384000000000000000e5
-2425 2 4 34 -0.32768000000000000000e5
-2425 2 8 22 -0.65536000000000000000e5
-2425 2 12 26 0.65536000000000000000e5
-2425 2 16 30 0.32768000000000000000e5
-2425 3 2 31 0.65536000000000000000e5
-2425 3 9 28 0.32768000000000000000e5
-2425 3 14 27 0.13107200000000000000e6
-2425 4 4 16 0.65536000000000000000e5
-2426 1 10 41 0.32768000000000000000e5
-2426 1 11 42 0.32768000000000000000e5
-2426 1 17 48 -0.65536000000000000000e5
-2426 1 28 43 0.32768000000000000000e5
-2426 2 8 22 0.32768000000000000000e5
-2426 3 9 29 0.32768000000000000000e5
-2426 3 14 27 -0.65536000000000000000e5
-2426 4 4 16 -0.32768000000000000000e5
-2427 1 5 52 0.32768000000000000000e5
-2427 1 11 42 -0.32768000000000000000e5
-2427 3 9 30 0.32768000000000000000e5
-2428 1 14 45 0.65536000000000000000e5
-2428 1 17 48 -0.32768000000000000000e5
-2428 1 18 25 -0.32768000000000000000e5
-2428 1 18 49 -0.32768000000000000000e5
-2428 2 24 30 -0.32768000000000000000e5
-2428 3 9 31 0.32768000000000000000e5
-2428 3 14 19 0.32768000000000000000e5
-2428 3 15 28 -0.65536000000000000000e5
-2429 3 9 32 0.32768000000000000000e5
-2429 3 22 27 -0.32768000000000000000e5
-2430 3 5 34 -0.32768000000000000000e5
-2430 3 9 33 0.32768000000000000000e5
-2431 1 5 52 -0.32768000000000000000e5
-2431 1 33 48 0.32768000000000000000e5
-2431 3 9 34 0.32768000000000000000e5
-2432 1 24 55 -0.32768000000000000000e5
-2432 1 26 41 0.32768000000000000000e5
-2432 2 4 34 0.32768000000000000000e5
-2432 2 21 35 -0.32768000000000000000e5
-2432 3 5 34 0.32768000000000000000e5
-2432 3 9 35 0.32768000000000000000e5
-2432 3 17 30 0.32768000000000000000e5
-2432 3 18 31 -0.65536000000000000000e5
-2432 3 20 33 0.32768000000000000000e5
-2432 3 21 34 -0.65536000000000000000e5
-2433 1 13 16 -0.32768000000000000000e5
-2433 1 16 31 0.32768000000000000000e5
-2433 3 2 15 0.16384000000000000000e5
-2433 3 8 13 0.16384000000000000000e5
-2433 3 10 10 0.32768000000000000000e5
-2433 4 8 8 0.32768000000000000000e5
-2434 3 2 15 -0.32768000000000000000e5
-2434 3 10 11 0.32768000000000000000e5
-2435 3 8 13 -0.32768000000000000000e5
-2435 3 10 12 0.32768000000000000000e5
-2436 1 13 16 -0.32768000000000000000e5
-2436 1 16 31 0.32768000000000000000e5
-2436 3 10 13 0.32768000000000000000e5
-2437 1 10 17 -0.16384000000000000000e5
-2437 1 28 35 0.16384000000000000000e5
-2437 3 2 15 -0.16384000000000000000e5
-2437 3 8 13 -0.16384000000000000000e5
-2437 3 10 14 0.32768000000000000000e5
-2437 3 11 24 0.16384000000000000000e5
-2437 4 6 10 -0.16384000000000000000e5
-2438 1 1 32 -0.32768000000000000000e5
-2438 1 2 17 0.65536000000000000000e5
-2438 1 2 33 0.32768000000000000000e5
-2438 1 3 34 -0.65536000000000000000e5
-2438 1 10 41 0.32768000000000000000e5
-2438 1 11 42 -0.32768000000000000000e5
-2438 1 12 43 -0.65536000000000000000e5
-2438 1 17 48 0.65536000000000000000e5
-2438 2 1 31 -0.32768000000000000000e5
-2438 2 7 21 0.32768000000000000000e5
-2438 2 8 22 -0.32768000000000000000e5
-2438 2 12 26 0.32768000000000000000e5
-2438 3 1 14 -0.65536000000000000000e5
-2438 3 6 23 -0.65536000000000000000e5
-2438 3 7 20 0.32768000000000000000e5
-2438 3 8 21 0.32768000000000000000e5
-2438 3 10 16 0.32768000000000000000e5
-2438 3 14 27 0.65536000000000000000e5
-2438 4 4 16 0.32768000000000000000e5
-2439 3 7 20 -0.32768000000000000000e5
-2439 3 10 17 0.32768000000000000000e5
-2440 1 2 33 -0.32768000000000000000e5
-2440 1 11 42 0.32768000000000000000e5
-2440 1 12 43 0.65536000000000000000e5
-2440 1 17 48 -0.65536000000000000000e5
-2440 2 8 22 0.32768000000000000000e5
-2440 2 12 26 -0.32768000000000000000e5
-2440 3 10 18 0.32768000000000000000e5
-2440 3 14 27 -0.65536000000000000000e5
-2440 4 4 16 -0.32768000000000000000e5
-2441 3 8 21 -0.32768000000000000000e5
-2441 3 10 19 0.32768000000000000000e5
-2442 3 6 23 -0.32768000000000000000e5
-2442 3 10 20 0.32768000000000000000e5
-2443 1 3 34 -0.32768000000000000000e5
-2443 1 16 47 0.32768000000000000000e5
-2443 3 10 21 0.32768000000000000000e5
-2443 3 13 26 0.32768000000000000000e5
-2444 1 4 35 0.32768000000000000000e5
-2444 1 12 43 0.32768000000000000000e5
-2444 1 18 25 0.32768000000000000000e5
-2444 1 28 35 -0.65536000000000000000e5
-2444 2 9 23 0.32768000000000000000e5
-2444 3 10 22 0.32768000000000000000e5
-2444 3 11 24 -0.65536000000000000000e5
-2445 1 4 19 -0.32768000000000000000e5
-2445 1 13 44 0.32768000000000000000e5
-2445 3 8 13 0.32768000000000000000e5
-2445 3 10 24 0.32768000000000000000e5
-2446 1 4 19 -0.16384000000000000000e5
-2446 1 13 44 0.16384000000000000000e5
-2446 3 8 13 0.16384000000000000000e5
-2446 3 10 23 -0.16384000000000000000e5
-2446 3 10 25 0.32768000000000000000e5
-2446 3 11 24 -0.16384000000000000000e5
-2446 4 10 14 -0.16384000000000000000e5
-2447 1 2 33 0.32768000000000000000e5
-2447 1 3 34 -0.65536000000000000000e5
-2447 1 5 52 0.32768000000000000000e5
-2447 1 10 41 0.32768000000000000000e5
-2447 1 11 42 -0.32768000000000000000e5
-2447 1 12 43 -0.65536000000000000000e5
-2447 1 16 47 0.65536000000000000000e5
-2447 1 28 43 0.32768000000000000000e5
-2447 2 7 21 0.32768000000000000000e5
-2447 2 10 32 -0.32768000000000000000e5
-2447 2 12 26 0.32768000000000000000e5
-2447 3 2 31 0.32768000000000000000e5
-2447 3 7 20 0.32768000000000000000e5
-2447 3 8 21 0.32768000000000000000e5
-2447 3 10 26 0.32768000000000000000e5
-2447 3 14 27 0.65536000000000000000e5
-2447 4 7 19 -0.32768000000000000000e5
-2448 3 2 31 -0.32768000000000000000e5
-2448 3 10 27 0.32768000000000000000e5
-2449 1 5 52 -0.32768000000000000000e5
-2449 1 10 41 -0.32768000000000000000e5
-2449 1 17 48 0.65536000000000000000e5
-2449 1 28 43 -0.32768000000000000000e5
-2449 2 8 22 -0.32768000000000000000e5
-2449 3 10 28 0.32768000000000000000e5
-2449 4 4 16 0.32768000000000000000e5
-2449 4 7 19 0.32768000000000000000e5
-2450 3 10 29 0.32768000000000000000e5
-2450 3 13 26 -0.32768000000000000000e5
-2451 1 5 52 -0.16384000000000000000e5
-2451 1 11 42 0.16384000000000000000e5
-2451 2 12 26 -0.16384000000000000000e5
-2451 2 20 34 0.16384000000000000000e5
-2451 3 2 31 -0.16384000000000000000e5
-2451 3 10 30 0.32768000000000000000e5
-2451 3 14 27 -0.32768000000000000000e5
-2451 4 7 19 0.16384000000000000000e5
-2451 4 8 20 0.16384000000000000000e5
-2452 1 13 44 -0.32768000000000000000e5
-2452 1 34 41 0.32768000000000000000e5
-2452 3 10 31 0.32768000000000000000e5
-2453 1 11 42 -0.32768000000000000000e5
-2453 1 12 43 -0.65536000000000000000e5
-2453 1 17 48 0.65536000000000000000e5
-2453 1 37 44 0.32768000000000000000e5
-2453 2 8 22 -0.32768000000000000000e5
-2453 2 12 26 0.32768000000000000000e5
-2453 3 2 31 0.32768000000000000000e5
-2453 3 10 32 0.32768000000000000000e5
-2453 3 14 27 0.65536000000000000000e5
-2453 4 4 16 0.32768000000000000000e5
-2454 1 5 52 0.32768000000000000000e5
-2454 1 17 48 -0.65536000000000000000e5
-2454 1 28 43 0.32768000000000000000e5
-2454 1 32 47 0.32768000000000000000e5
-2454 2 8 22 0.32768000000000000000e5
-2454 3 10 33 0.32768000000000000000e5
-2454 4 4 16 -0.32768000000000000000e5
-2454 4 7 19 -0.32768000000000000000e5
-2455 1 5 52 0.16384000000000000000e5
-2455 1 11 42 -0.16384000000000000000e5
-2455 1 12 43 -0.32768000000000000000e5
-2455 1 28 43 0.16384000000000000000e5
-2455 1 32 47 0.16384000000000000000e5
-2455 1 37 44 0.16384000000000000000e5
-2455 2 12 26 0.16384000000000000000e5
-2455 3 2 31 0.16384000000000000000e5
-2455 3 10 34 0.32768000000000000000e5
-2455 3 14 27 0.32768000000000000000e5
-2455 3 18 31 -0.16384000000000000000e5
-2455 4 7 19 -0.16384000000000000000e5
-2455 4 8 20 -0.16384000000000000000e5
-2456 1 32 47 -0.32768000000000000000e5
-2456 1 37 52 0.32768000000000000000e5
-2456 3 10 35 0.32768000000000000000e5
-2457 3 8 13 -0.16384000000000000000e5
-2457 3 11 11 0.32768000000000000000e5
-2458 1 10 17 -0.32768000000000000000e5
-2458 1 28 35 0.32768000000000000000e5
-2458 3 11 12 0.32768000000000000000e5
-2458 3 11 24 0.32768000000000000000e5
-2459 1 10 17 -0.16384000000000000000e5
-2459 1 28 35 0.16384000000000000000e5
-2459 3 2 15 -0.16384000000000000000e5
-2459 3 8 13 -0.16384000000000000000e5
-2459 3 11 13 0.32768000000000000000e5
-2459 3 11 24 0.16384000000000000000e5
-2459 4 6 10 -0.16384000000000000000e5
-2460 1 4 19 -0.16384000000000000000e5
-2460 1 5 20 -0.16384000000000000000e5
-2460 1 10 17 -0.16384000000000000000e5
-2460 1 17 32 0.32768000000000000000e5
-2460 2 8 14 -0.16384000000000000000e5
-2460 3 11 14 0.32768000000000000000e5
-2461 1 13 20 -0.32768000000000000000e5
-2461 1 17 32 0.16384000000000000000e5
-2461 1 20 27 0.16384000000000000000e5
-2461 1 29 36 0.16384000000000000000e5
-2461 2 11 25 0.16384000000000000000e5
-2461 3 11 15 0.32768000000000000000e5
-2461 3 12 25 0.16384000000000000000e5
-2462 3 7 20 -0.32768000000000000000e5
-2462 3 11 16 0.32768000000000000000e5
-2463 1 2 33 -0.32768000000000000000e5
-2463 1 11 42 0.32768000000000000000e5
-2463 1 12 43 0.65536000000000000000e5
-2463 1 17 48 -0.65536000000000000000e5
-2463 2 8 22 0.32768000000000000000e5
-2463 2 12 26 -0.32768000000000000000e5
-2463 3 11 17 0.32768000000000000000e5
-2463 3 14 27 -0.65536000000000000000e5
-2463 4 4 16 -0.32768000000000000000e5
-2464 3 8 21 -0.32768000000000000000e5
-2464 3 11 18 0.32768000000000000000e5
-2465 1 4 35 -0.65536000000000000000e5
-2465 1 17 48 0.65536000000000000000e5
-2465 3 8 21 0.32768000000000000000e5
-2465 3 9 22 0.32768000000000000000e5
-2465 3 11 19 0.32768000000000000000e5
-2465 3 14 27 0.65536000000000000000e5
-2465 4 4 16 0.32768000000000000000e5
-2466 1 3 34 -0.32768000000000000000e5
-2466 1 16 47 0.32768000000000000000e5
-2466 3 11 20 0.32768000000000000000e5
-2466 3 13 26 0.32768000000000000000e5
-2467 1 4 35 0.32768000000000000000e5
-2467 1 12 43 0.32768000000000000000e5
-2467 1 18 25 0.32768000000000000000e5
-2467 1 28 35 -0.65536000000000000000e5
-2467 2 9 23 0.32768000000000000000e5
-2467 3 11 21 0.32768000000000000000e5
-2467 3 11 24 -0.65536000000000000000e5
-2468 1 4 35 -0.32768000000000000000e5
-2468 1 17 48 0.32768000000000000000e5
-2468 3 11 22 0.32768000000000000000e5
-2468 3 14 27 0.32768000000000000000e5
-2469 1 4 19 -0.32768000000000000000e5
-2469 1 13 44 0.32768000000000000000e5
-2469 3 8 13 0.32768000000000000000e5
-2469 3 11 23 0.32768000000000000000e5
-2470 1 17 32 -0.32768000000000000000e5
-2470 1 19 42 0.32768000000000000000e5
-2470 3 11 25 0.32768000000000000000e5
-2471 3 2 31 -0.32768000000000000000e5
-2471 3 11 26 0.32768000000000000000e5
-2472 1 5 52 -0.32768000000000000000e5
-2472 1 10 41 -0.32768000000000000000e5
-2472 1 17 48 0.65536000000000000000e5
-2472 1 28 43 -0.32768000000000000000e5
-2472 2 8 22 -0.32768000000000000000e5
-2472 3 11 27 0.32768000000000000000e5
-2472 4 4 16 0.32768000000000000000e5
-2472 4 7 19 0.32768000000000000000e5
-2473 1 10 41 0.32768000000000000000e5
-2473 1 11 42 0.32768000000000000000e5
-2473 1 17 48 -0.65536000000000000000e5
-2473 1 28 43 0.32768000000000000000e5
-2473 2 8 22 0.32768000000000000000e5
-2473 3 11 28 0.32768000000000000000e5
-2473 3 14 27 -0.65536000000000000000e5
-2473 4 4 16 -0.32768000000000000000e5
-2474 1 5 52 -0.16384000000000000000e5
-2474 1 11 42 0.16384000000000000000e5
-2474 2 12 26 -0.16384000000000000000e5
-2474 2 20 34 0.16384000000000000000e5
-2474 3 2 31 -0.16384000000000000000e5
-2474 3 11 29 0.32768000000000000000e5
-2474 3 14 27 -0.32768000000000000000e5
-2474 4 7 19 0.16384000000000000000e5
-2474 4 8 20 0.16384000000000000000e5
-2475 3 11 30 0.32768000000000000000e5
-2475 3 14 27 -0.32768000000000000000e5
-2476 1 13 52 0.32768000000000000000e5
-2476 1 28 35 -0.32768000000000000000e5
-2476 3 11 31 0.32768000000000000000e5
-2477 1 5 52 0.32768000000000000000e5
-2477 1 17 48 -0.65536000000000000000e5
-2477 1 28 43 0.32768000000000000000e5
-2477 1 32 47 0.32768000000000000000e5
-2477 2 8 22 0.32768000000000000000e5
-2477 3 11 32 0.32768000000000000000e5
-2477 4 4 16 -0.32768000000000000000e5
-2477 4 7 19 -0.32768000000000000000e5
-2478 3 11 33 0.32768000000000000000e5
-2478 3 18 31 -0.32768000000000000000e5
-2479 3 11 34 0.32768000000000000000e5
-2479 3 24 29 -0.32768000000000000000e5
-2480 3 11 35 0.32768000000000000000e5
-2480 3 21 34 -0.32768000000000000000e5
-2481 1 5 20 -0.16384000000000000000e5
-2481 1 5 36 0.16384000000000000000e5
-2481 3 12 12 0.32768000000000000000e5
-2482 1 4 19 -0.16384000000000000000e5
-2482 1 5 20 -0.16384000000000000000e5
-2482 1 10 17 -0.16384000000000000000e5
-2482 1 17 32 0.32768000000000000000e5
-2482 2 8 14 -0.16384000000000000000e5
-2482 3 12 13 0.32768000000000000000e5
-2483 1 4 19 0.16384000000000000000e5
-2483 1 5 20 0.16384000000000000000e5
-2483 1 6 21 0.32768000000000000000e5
-2483 1 10 17 0.16384000000000000000e5
-2483 1 10 21 -0.65536000000000000000e5
-2483 1 29 36 0.32768000000000000000e5
-2483 2 8 14 0.16384000000000000000e5
-2483 2 9 15 0.32768000000000000000e5
-2483 3 12 14 0.32768000000000000000e5
-2483 3 12 25 0.32768000000000000000e5
-2484 1 10 21 -0.32768000000000000000e5
-2484 1 17 32 0.16384000000000000000e5
-2484 1 18 33 0.16384000000000000000e5
-2484 1 29 36 0.16384000000000000000e5
-2484 2 14 24 0.16384000000000000000e5
-2484 3 12 15 0.32768000000000000000e5
-2484 3 12 25 0.16384000000000000000e5
-2485 1 2 33 -0.32768000000000000000e5
-2485 1 11 42 0.32768000000000000000e5
-2485 1 12 43 0.65536000000000000000e5
-2485 1 17 48 -0.65536000000000000000e5
-2485 2 8 22 0.32768000000000000000e5
-2485 2 12 26 -0.32768000000000000000e5
-2485 3 12 16 0.32768000000000000000e5
-2485 3 14 27 -0.65536000000000000000e5
-2485 4 4 16 -0.32768000000000000000e5
-2486 3 8 21 -0.32768000000000000000e5
-2486 3 12 17 0.32768000000000000000e5
-2487 1 4 35 -0.65536000000000000000e5
-2487 1 17 48 0.65536000000000000000e5
-2487 3 8 21 0.32768000000000000000e5
-2487 3 9 22 0.32768000000000000000e5
-2487 3 12 18 0.32768000000000000000e5
-2487 3 14 27 0.65536000000000000000e5
-2487 4 4 16 0.32768000000000000000e5
-2488 3 9 22 -0.32768000000000000000e5
-2488 3 12 19 0.32768000000000000000e5
-2489 1 4 35 0.32768000000000000000e5
-2489 1 12 43 0.32768000000000000000e5
-2489 1 18 25 0.32768000000000000000e5
-2489 1 28 35 -0.65536000000000000000e5
-2489 2 9 23 0.32768000000000000000e5
-2489 3 11 24 -0.65536000000000000000e5
-2489 3 12 20 0.32768000000000000000e5
-2490 1 4 35 -0.32768000000000000000e5
-2490 1 17 48 0.32768000000000000000e5
-2490 3 12 21 0.32768000000000000000e5
-2490 3 14 27 0.32768000000000000000e5
-2491 3 12 22 0.32768000000000000000e5
-2491 3 14 19 -0.32768000000000000000e5
-2492 3 11 24 -0.32768000000000000000e5
-2492 3 12 23 0.32768000000000000000e5
-2493 1 5 36 -0.32768000000000000000e5
-2493 1 14 45 0.32768000000000000000e5
-2493 3 12 24 0.32768000000000000000e5
-2494 1 5 52 -0.32768000000000000000e5
-2494 1 10 41 -0.32768000000000000000e5
-2494 1 17 48 0.65536000000000000000e5
-2494 1 28 43 -0.32768000000000000000e5
-2494 2 8 22 -0.32768000000000000000e5
-2494 3 12 26 0.32768000000000000000e5
-2494 4 4 16 0.32768000000000000000e5
-2494 4 7 19 0.32768000000000000000e5
-2495 1 10 41 0.32768000000000000000e5
-2495 1 11 42 0.32768000000000000000e5
-2495 1 17 48 -0.65536000000000000000e5
-2495 1 28 43 0.32768000000000000000e5
-2495 2 8 22 0.32768000000000000000e5
-2495 3 12 27 0.32768000000000000000e5
-2495 3 14 27 -0.65536000000000000000e5
-2495 4 4 16 -0.32768000000000000000e5
-2496 1 5 52 0.32768000000000000000e5
-2496 1 11 42 -0.32768000000000000000e5
-2496 3 12 28 0.32768000000000000000e5
-2497 3 12 29 0.32768000000000000000e5
-2497 3 14 27 -0.32768000000000000000e5
-2498 1 14 45 0.65536000000000000000e5
-2498 1 17 48 -0.32768000000000000000e5
-2498 1 18 25 -0.32768000000000000000e5
-2498 1 18 49 -0.32768000000000000000e5
-2498 2 24 30 -0.32768000000000000000e5
-2498 3 12 30 0.32768000000000000000e5
-2498 3 14 19 0.32768000000000000000e5
-2498 3 15 28 -0.65536000000000000000e5
-2499 3 12 31 0.32768000000000000000e5
-2499 3 15 28 -0.32768000000000000000e5
-2500 3 12 32 0.32768000000000000000e5
-2500 3 18 31 -0.32768000000000000000e5
-2501 1 5 52 -0.32768000000000000000e5
-2501 1 33 48 0.32768000000000000000e5
-2501 3 12 33 0.32768000000000000000e5
-2502 1 14 45 -0.65536000000000000000e5
-2502 1 17 48 0.32768000000000000000e5
-2502 1 18 49 0.32768000000000000000e5
-2502 1 34 49 0.32768000000000000000e5
-2502 2 24 30 0.32768000000000000000e5
-2502 3 12 34 0.32768000000000000000e5
-2502 3 15 28 0.65536000000000000000e5
-2503 1 33 48 -0.32768000000000000000e5
-2503 1 43 50 0.32768000000000000000e5
-2503 3 12 35 0.32768000000000000000e5
-2504 3 10 15 -0.16384000000000000000e5
-2504 3 13 13 0.32768000000000000000e5
-2505 1 13 20 -0.32768000000000000000e5
-2505 1 17 32 0.16384000000000000000e5
-2505 1 20 27 0.16384000000000000000e5
-2505 1 29 36 0.16384000000000000000e5
-2505 2 11 25 0.16384000000000000000e5
-2505 3 12 25 0.16384000000000000000e5
-2505 3 13 14 0.32768000000000000000e5
-2506 1 10 21 -0.16384000000000000000e5
-2506 1 13 20 -0.16384000000000000000e5
-2506 1 17 32 0.16384000000000000000e5
-2506 1 18 33 0.81920000000000000000e4
-2506 1 20 27 0.81920000000000000000e4
-2506 1 29 36 0.16384000000000000000e5
-2506 2 11 25 0.81920000000000000000e4
-2506 2 14 24 0.81920000000000000000e4
-2506 3 10 15 -0.16384000000000000000e5
-2506 3 12 25 0.16384000000000000000e5
-2506 3 13 15 0.32768000000000000000e5
-2506 4 10 10 -0.32768000000000000000e5
-2507 3 6 23 -0.32768000000000000000e5
-2507 3 13 16 0.32768000000000000000e5
-2508 1 3 34 -0.32768000000000000000e5
-2508 1 16 47 0.32768000000000000000e5
-2508 3 13 17 0.32768000000000000000e5
-2508 3 13 26 0.32768000000000000000e5
-2509 1 4 35 0.32768000000000000000e5
-2509 1 12 43 0.32768000000000000000e5
-2509 1 18 25 0.32768000000000000000e5
-2509 1 28 35 -0.65536000000000000000e5
-2509 2 9 23 0.32768000000000000000e5
-2509 3 11 24 -0.65536000000000000000e5
-2509 3 13 18 0.32768000000000000000e5
-2510 1 4 35 -0.32768000000000000000e5
-2510 1 17 48 0.32768000000000000000e5
-2510 3 13 19 0.32768000000000000000e5
-2510 3 14 27 0.32768000000000000000e5
-2511 3 10 23 -0.32768000000000000000e5
-2511 3 13 20 0.32768000000000000000e5
-2512 1 4 19 -0.32768000000000000000e5
-2512 1 13 44 0.32768000000000000000e5
-2512 3 8 13 0.32768000000000000000e5
-2512 3 13 21 0.32768000000000000000e5
-2513 3 11 24 -0.32768000000000000000e5
-2513 3 13 22 0.32768000000000000000e5
-2514 1 4 19 -0.16384000000000000000e5
-2514 1 13 44 0.16384000000000000000e5
-2514 3 8 13 0.16384000000000000000e5
-2514 3 10 23 -0.16384000000000000000e5
-2514 3 11 24 -0.16384000000000000000e5
-2514 3 13 23 0.32768000000000000000e5
-2514 4 10 14 -0.16384000000000000000e5
-2515 1 17 32 -0.32768000000000000000e5
-2515 1 19 42 0.32768000000000000000e5
-2515 3 13 24 0.32768000000000000000e5
-2516 1 4 19 -0.81920000000000000000e4
-2516 1 13 44 0.81920000000000000000e4
-2516 1 17 32 -0.16384000000000000000e5
-2516 1 19 42 0.16384000000000000000e5
-2516 2 11 25 -0.16384000000000000000e5
-2516 2 15 29 0.16384000000000000000e5
-2516 3 8 13 0.81920000000000000000e4
-2516 3 10 23 -0.81920000000000000000e4
-2516 3 11 24 -0.81920000000000000000e4
-2516 3 12 25 -0.16384000000000000000e5
-2516 3 13 25 0.32768000000000000000e5
-2516 4 10 14 -0.81920000000000000000e4
-2517 1 5 52 -0.16384000000000000000e5
-2517 1 11 42 0.16384000000000000000e5
-2517 2 12 26 -0.16384000000000000000e5
-2517 2 20 34 0.16384000000000000000e5
-2517 3 2 31 -0.16384000000000000000e5
-2517 3 13 27 0.32768000000000000000e5
-2517 3 14 27 -0.32768000000000000000e5
-2517 4 7 19 0.16384000000000000000e5
-2517 4 8 20 0.16384000000000000000e5
-2518 3 13 28 0.32768000000000000000e5
-2518 3 14 27 -0.32768000000000000000e5
-2519 1 13 44 -0.32768000000000000000e5
-2519 1 34 41 0.32768000000000000000e5
-2519 3 13 29 0.32768000000000000000e5
-2520 1 13 52 0.32768000000000000000e5
-2520 1 28 35 -0.32768000000000000000e5
-2520 3 13 30 0.32768000000000000000e5
-2521 1 19 42 -0.32768000000000000000e5
-2521 1 19 50 0.32768000000000000000e5
-2521 3 13 31 0.32768000000000000000e5
-2522 1 5 52 0.16384000000000000000e5
-2522 1 11 42 -0.16384000000000000000e5
-2522 1 12 43 -0.32768000000000000000e5
-2522 1 28 43 0.16384000000000000000e5
-2522 1 32 47 0.16384000000000000000e5
-2522 1 37 44 0.16384000000000000000e5
-2522 2 12 26 0.16384000000000000000e5
-2522 3 2 31 0.16384000000000000000e5
-2522 3 13 32 0.32768000000000000000e5
-2522 3 14 27 0.32768000000000000000e5
-2522 3 18 31 -0.16384000000000000000e5
-2522 4 7 19 -0.16384000000000000000e5
-2522 4 8 20 -0.16384000000000000000e5
-2523 3 13 33 0.32768000000000000000e5
-2523 3 24 29 -0.32768000000000000000e5
-2524 1 13 52 -0.32768000000000000000e5
-2524 1 16 55 0.32768000000000000000e5
-2524 3 13 34 0.32768000000000000000e5
-2525 1 32 47 -0.16384000000000000000e5
-2525 1 33 48 -0.16384000000000000000e5
-2525 1 37 52 0.16384000000000000000e5
-2525 1 43 50 0.16384000000000000000e5
-2525 3 13 35 0.32768000000000000000e5
-2525 3 21 34 -0.16384000000000000000e5
-2525 4 16 20 -0.16384000000000000000e5
-2526 1 10 21 -0.16384000000000000000e5
-2526 1 17 32 0.81920000000000000000e4
-2526 1 18 33 0.81920000000000000000e4
-2526 1 29 36 0.81920000000000000000e4
-2526 2 14 24 0.81920000000000000000e4
-2526 3 12 25 0.81920000000000000000e4
-2526 3 14 14 0.32768000000000000000e5
-2527 1 3 34 -0.32768000000000000000e5
-2527 1 16 47 0.32768000000000000000e5
-2527 3 13 26 0.32768000000000000000e5
-2527 3 14 16 0.32768000000000000000e5
-2528 1 4 35 0.32768000000000000000e5
-2528 1 12 43 0.32768000000000000000e5
-2528 1 18 25 0.32768000000000000000e5
-2528 1 28 35 -0.65536000000000000000e5
-2528 2 9 23 0.32768000000000000000e5
-2528 3 11 24 -0.65536000000000000000e5
-2528 3 14 17 0.32768000000000000000e5
-2529 1 4 35 -0.32768000000000000000e5
-2529 1 17 48 0.32768000000000000000e5
-2529 3 14 18 0.32768000000000000000e5
-2529 3 14 27 0.32768000000000000000e5
-2530 1 4 19 -0.32768000000000000000e5
-2530 1 13 44 0.32768000000000000000e5
-2530 3 8 13 0.32768000000000000000e5
-2530 3 14 20 0.32768000000000000000e5
-2531 3 11 24 -0.32768000000000000000e5
-2531 3 14 21 0.32768000000000000000e5
-2532 1 5 36 -0.32768000000000000000e5
-2532 1 14 45 0.32768000000000000000e5
-2532 3 14 22 0.32768000000000000000e5
-2533 1 17 32 -0.32768000000000000000e5
-2533 1 19 42 0.32768000000000000000e5
-2533 3 14 23 0.32768000000000000000e5
-2534 3 12 25 -0.32768000000000000000e5
-2534 3 14 24 0.32768000000000000000e5
-2535 3 14 25 0.32768000000000000000e5
-2535 3 15 24 -0.32768000000000000000e5
-2536 1 5 52 -0.16384000000000000000e5
-2536 1 11 42 0.16384000000000000000e5
-2536 2 12 26 -0.16384000000000000000e5
-2536 2 20 34 0.16384000000000000000e5
-2536 3 2 31 -0.16384000000000000000e5
-2536 3 14 26 0.32768000000000000000e5
-2536 3 14 27 -0.32768000000000000000e5
-2536 4 7 19 0.16384000000000000000e5
-2536 4 8 20 0.16384000000000000000e5
-2537 1 14 45 0.65536000000000000000e5
-2537 1 17 48 -0.32768000000000000000e5
-2537 1 18 25 -0.32768000000000000000e5
-2537 1 18 49 -0.32768000000000000000e5
-2537 2 24 30 -0.32768000000000000000e5
-2537 3 14 19 0.32768000000000000000e5
-2537 3 14 28 0.32768000000000000000e5
-2537 3 15 28 -0.65536000000000000000e5
-2538 1 13 52 0.32768000000000000000e5
-2538 1 28 35 -0.32768000000000000000e5
-2538 3 14 29 0.32768000000000000000e5
-2539 3 14 30 0.32768000000000000000e5
-2539 3 15 28 -0.32768000000000000000e5
-2540 3 14 31 0.32768000000000000000e5
-2540 3 24 25 -0.32768000000000000000e5
-2541 3 14 32 0.32768000000000000000e5
-2541 3 24 29 -0.32768000000000000000e5
-2542 1 14 45 -0.65536000000000000000e5
-2542 1 17 48 0.32768000000000000000e5
-2542 1 18 49 0.32768000000000000000e5
-2542 1 34 49 0.32768000000000000000e5
-2542 2 24 30 0.32768000000000000000e5
-2542 3 14 33 0.32768000000000000000e5
-2542 3 15 28 0.65536000000000000000e5
-2543 1 14 45 -0.32768000000000000000e5
-2543 1 35 50 0.32768000000000000000e5
-2543 3 14 34 0.32768000000000000000e5
-2543 3 15 28 0.32768000000000000000e5
-2544 1 34 49 -0.32768000000000000000e5
-2544 1 44 51 0.32768000000000000000e5
-2544 3 14 35 0.32768000000000000000e5
-2545 1 14 21 0.81920000000000000000e4
-2545 1 19 20 -0.16384000000000000000e5
-2545 1 19 34 0.81920000000000000000e4
-2545 1 20 35 0.81920000000000000000e4
-2545 2 15 25 0.81920000000000000000e4
-2545 3 14 15 -0.81920000000000000000e4
-2545 3 15 15 0.32768000000000000000e5
-2546 3 10 23 -0.32768000000000000000e5
-2546 3 15 16 0.32768000000000000000e5
-2547 1 4 19 -0.32768000000000000000e5
-2547 1 13 44 0.32768000000000000000e5
-2547 3 8 13 0.32768000000000000000e5
-2547 3 15 17 0.32768000000000000000e5
-2548 3 11 24 -0.32768000000000000000e5
-2548 3 15 18 0.32768000000000000000e5
-2549 1 5 36 -0.32768000000000000000e5
-2549 1 14 45 0.32768000000000000000e5
-2549 3 15 19 0.32768000000000000000e5
-2550 1 4 19 -0.16384000000000000000e5
-2550 1 13 44 0.16384000000000000000e5
-2550 3 8 13 0.16384000000000000000e5
-2550 3 10 23 -0.16384000000000000000e5
-2550 3 11 24 -0.16384000000000000000e5
-2550 3 15 20 0.32768000000000000000e5
-2550 4 10 14 -0.16384000000000000000e5
-2551 1 17 32 -0.32768000000000000000e5
-2551 1 19 42 0.32768000000000000000e5
-2551 3 15 21 0.32768000000000000000e5
-2552 3 12 25 -0.32768000000000000000e5
-2552 3 15 22 0.32768000000000000000e5
-2553 1 4 19 -0.81920000000000000000e4
-2553 1 13 44 0.81920000000000000000e4
-2553 1 17 32 -0.16384000000000000000e5
-2553 1 19 42 0.16384000000000000000e5
-2553 2 11 25 -0.16384000000000000000e5
-2553 2 15 29 0.16384000000000000000e5
-2553 3 8 13 0.81920000000000000000e4
-2553 3 10 23 -0.81920000000000000000e4
-2553 3 11 24 -0.81920000000000000000e4
-2553 3 12 25 -0.16384000000000000000e5
-2553 3 15 23 0.32768000000000000000e5
-2553 4 10 14 -0.81920000000000000000e4
-2554 1 14 21 -0.32768000000000000000e5
-2554 1 21 44 0.32768000000000000000e5
-2554 3 14 15 0.32768000000000000000e5
-2554 3 15 25 0.32768000000000000000e5
-2555 1 13 44 -0.32768000000000000000e5
-2555 1 34 41 0.32768000000000000000e5
-2555 3 15 26 0.32768000000000000000e5
-2556 1 13 52 0.32768000000000000000e5
-2556 1 28 35 -0.32768000000000000000e5
-2556 3 15 27 0.32768000000000000000e5
-2557 1 19 42 -0.32768000000000000000e5
-2557 1 19 50 0.32768000000000000000e5
-2557 3 15 29 0.32768000000000000000e5
-2558 3 15 30 0.32768000000000000000e5
-2558 3 24 25 -0.32768000000000000000e5
-2559 1 17 32 -0.16384000000000000000e5
-2559 1 18 33 -0.16384000000000000000e5
-2559 1 19 50 0.16384000000000000000e5
-2559 1 20 51 0.16384000000000000000e5
-2559 2 14 24 -0.16384000000000000000e5
-2559 2 25 31 0.16384000000000000000e5
-2559 3 12 25 -0.16384000000000000000e5
-2559 3 15 24 0.32768000000000000000e5
-2559 3 15 31 0.32768000000000000000e5
-2559 3 24 25 -0.16384000000000000000e5
-2560 1 13 52 -0.32768000000000000000e5
-2560 1 16 55 0.32768000000000000000e5
-2560 3 15 32 0.32768000000000000000e5
-2561 1 14 45 -0.32768000000000000000e5
-2561 1 35 50 0.32768000000000000000e5
-2561 3 15 28 0.32768000000000000000e5
-2561 3 15 33 0.32768000000000000000e5
-2562 1 16 55 0.16384000000000000000e5
-2562 1 29 36 -0.32768000000000000000e5
-2562 1 35 50 0.16384000000000000000e5
-2562 1 43 46 0.16384000000000000000e5
-2562 2 31 31 0.32768000000000000000e5
-2562 3 15 34 0.32768000000000000000e5
-2562 3 24 25 0.32768000000000000000e5
-2563 3 15 35 0.32768000000000000000e5
-2563 3 25 34 -0.32768000000000000000e5
-2564 1 1 40 0.16384000000000000000e5
-2564 1 2 33 0.65536000000000000000e5
-2564 1 2 49 0.16384000000000000000e5
-2564 1 3 34 -0.13107200000000000000e6
-2564 1 3 50 -0.32768000000000000000e5
-2564 1 5 52 0.65536000000000000000e5
-2564 1 6 37 0.16384000000000000000e5
-2564 1 10 41 0.65536000000000000000e5
-2564 1 11 42 -0.65536000000000000000e5
-2564 1 12 43 -0.13107200000000000000e6
-2564 1 16 47 0.13107200000000000000e6
-2564 1 28 43 0.65536000000000000000e5
-2564 2 2 32 0.16384000000000000000e5
-2564 2 3 17 -0.16384000000000000000e5
-2564 2 4 26 0.16384000000000000000e5
-2564 2 7 21 0.65536000000000000000e5
-2564 2 10 32 -0.65536000000000000000e5
-2564 2 12 26 0.65536000000000000000e5
-2564 3 1 30 0.65536000000000000000e5
-2564 3 2 31 0.65536000000000000000e5
-2564 3 7 20 0.65536000000000000000e5
-2564 3 8 21 0.65536000000000000000e5
-2564 3 14 27 0.13107200000000000000e6
-2564 3 16 16 0.32768000000000000000e5
-2564 4 1 13 0.16384000000000000000e5
-2564 4 5 17 0.32768000000000000000e5
-2564 4 7 19 -0.65536000000000000000e5
-2564 4 11 11 0.32768000000000000000e5
-2565 1 2 49 -0.32768000000000000000e5
-2565 1 6 37 -0.32768000000000000000e5
-2565 1 8 39 0.65536000000000000000e5
-2565 1 23 38 -0.32768000000000000000e5
-2565 2 2 32 -0.32768000000000000000e5
-2565 2 3 17 0.32768000000000000000e5
-2565 2 4 26 -0.32768000000000000000e5
-2565 3 1 30 -0.65536000000000000000e5
-2565 3 16 17 0.32768000000000000000e5
-2565 4 1 13 -0.32768000000000000000e5
-2566 1 1 40 -0.32768000000000000000e5
-2566 1 23 38 0.32768000000000000000e5
-2566 3 16 18 0.32768000000000000000e5
-2567 1 1 40 0.32768000000000000000e5
-2567 1 2 49 0.32768000000000000000e5
-2567 1 6 37 0.32768000000000000000e5
-2567 1 8 39 -0.65536000000000000000e5
-2567 2 4 26 0.32768000000000000000e5
-2567 3 16 19 0.32768000000000000000e5
-2568 1 2 33 0.65536000000000000000e5
-2568 1 3 34 -0.13107200000000000000e6
-2568 1 3 50 -0.32768000000000000000e5
-2568 1 5 52 0.65536000000000000000e5
-2568 1 8 39 0.32768000000000000000e5
-2568 1 10 41 0.65536000000000000000e5
-2568 1 11 42 -0.65536000000000000000e5
-2568 1 12 43 -0.13107200000000000000e6
-2568 1 16 47 0.13107200000000000000e6
-2568 1 28 43 0.65536000000000000000e5
-2568 2 7 21 0.65536000000000000000e5
-2568 2 10 32 -0.65536000000000000000e5
-2568 2 12 26 0.65536000000000000000e5
-2568 3 1 30 0.32768000000000000000e5
-2568 3 2 31 0.65536000000000000000e5
-2568 3 7 20 0.65536000000000000000e5
-2568 3 8 21 0.65536000000000000000e5
-2568 3 14 27 0.13107200000000000000e6
-2568 3 16 20 0.32768000000000000000e5
-2568 4 5 17 0.32768000000000000000e5
-2568 4 7 19 -0.65536000000000000000e5
-2569 3 1 30 -0.32768000000000000000e5
-2569 3 16 21 0.32768000000000000000e5
-2570 1 3 50 0.32768000000000000000e5
-2570 1 8 39 -0.32768000000000000000e5
-2570 3 16 22 0.32768000000000000000e5
-2571 1 2 33 0.32768000000000000000e5
-2571 1 3 34 -0.65536000000000000000e5
-2571 1 5 52 0.32768000000000000000e5
-2571 1 10 41 0.32768000000000000000e5
-2571 1 11 42 -0.32768000000000000000e5
-2571 1 12 43 -0.65536000000000000000e5
-2571 1 16 47 0.65536000000000000000e5
-2571 1 28 43 0.32768000000000000000e5
-2571 2 7 21 0.32768000000000000000e5
-2571 2 10 32 -0.32768000000000000000e5
-2571 2 12 26 0.32768000000000000000e5
-2571 3 2 31 0.32768000000000000000e5
-2571 3 7 20 0.32768000000000000000e5
-2571 3 8 21 0.32768000000000000000e5
-2571 3 14 27 0.65536000000000000000e5
-2571 3 16 23 0.32768000000000000000e5
-2571 4 7 19 -0.32768000000000000000e5
-2572 3 2 31 -0.32768000000000000000e5
-2572 3 16 24 0.32768000000000000000e5
-2573 3 13 26 -0.32768000000000000000e5
-2573 3 16 25 0.32768000000000000000e5
-2574 1 2 49 0.32768000000000000000e5
-2574 1 7 54 -0.65536000000000000000e5
-2574 1 23 38 0.32768000000000000000e5
-2574 1 24 39 0.32768000000000000000e5
-2574 2 1 35 -0.32768000000000000000e5
-2574 2 2 32 0.32768000000000000000e5
-2574 2 3 33 0.32768000000000000000e5
-2574 2 18 32 -0.32768000000000000000e5
-2574 2 26 32 0.32768000000000000000e5
-2574 3 3 32 0.32768000000000000000e5
-2574 3 4 33 0.32768000000000000000e5
-2574 3 16 26 0.32768000000000000000e5
-2574 3 16 29 -0.65536000000000000000e5
-2574 3 17 30 -0.65536000000000000000e5
-2574 4 17 17 0.65536000000000000000e5
-2575 1 2 49 -0.32768000000000000000e5
-2575 1 7 54 0.65536000000000000000e5
-2575 1 23 38 -0.32768000000000000000e5
-2575 1 24 39 -0.32768000000000000000e5
-2575 2 3 33 -0.32768000000000000000e5
-2575 2 18 32 0.32768000000000000000e5
-2575 2 26 32 -0.32768000000000000000e5
-2575 3 4 33 -0.32768000000000000000e5
-2575 3 16 27 0.32768000000000000000e5
-2575 3 17 30 0.65536000000000000000e5
-2575 4 17 17 -0.65536000000000000000e5
-2576 3 3 32 -0.32768000000000000000e5
-2576 3 16 28 0.32768000000000000000e5
-2577 1 3 50 -0.32768000000000000000e5
-2577 1 7 54 0.32768000000000000000e5
-2577 3 16 30 0.32768000000000000000e5
-2578 1 11 42 -0.32768000000000000000e5
-2578 1 12 43 -0.65536000000000000000e5
-2578 1 17 48 0.65536000000000000000e5
-2578 1 37 44 0.32768000000000000000e5
-2578 2 8 22 -0.32768000000000000000e5
-2578 2 12 26 0.32768000000000000000e5
-2578 3 2 31 0.32768000000000000000e5
-2578 3 14 27 0.65536000000000000000e5
-2578 3 16 31 0.32768000000000000000e5
-2578 4 4 16 0.32768000000000000000e5
-2579 1 2 49 0.32768000000000000000e5
-2579 1 7 54 -0.65536000000000000000e5
-2579 1 22 53 0.32768000000000000000e5
-2579 1 24 39 0.32768000000000000000e5
-2579 2 3 33 0.32768000000000000000e5
-2579 2 18 32 -0.32768000000000000000e5
-2579 2 26 32 0.32768000000000000000e5
-2579 3 4 33 0.32768000000000000000e5
-2579 3 16 32 0.32768000000000000000e5
-2579 3 17 30 -0.65536000000000000000e5
-2579 4 17 17 0.65536000000000000000e5
-2580 1 2 49 -0.32768000000000000000e5
-2580 1 7 54 0.65536000000000000000e5
-2580 1 22 53 -0.32768000000000000000e5
-2580 1 23 54 -0.32768000000000000000e5
-2580 2 26 32 -0.32768000000000000000e5
-2580 3 3 32 0.32768000000000000000e5
-2580 3 6 35 -0.65536000000000000000e5
-2580 3 16 33 0.32768000000000000000e5
-2581 3 6 35 -0.32768000000000000000e5
-2581 3 16 34 0.32768000000000000000e5
-2582 1 7 54 -0.65536000000000000000e5
-2582 1 22 53 0.32768000000000000000e5
-2582 1 23 54 0.32768000000000000000e5
-2582 1 38 53 -0.32768000000000000000e5
-2582 1 47 50 0.65536000000000000000e5
-2582 1 47 54 -0.32768000000000000000e5
-2582 2 26 32 0.32768000000000000000e5
-2582 2 32 32 -0.65536000000000000000e5
-2582 3 6 35 0.65536000000000000000e5
-2582 3 16 35 0.32768000000000000000e5
-2582 3 32 33 -0.32768000000000000000e5
-2583 1 1 40 -0.16384000000000000000e5
-2583 1 23 38 0.16384000000000000000e5
-2583 3 17 17 0.32768000000000000000e5
-2584 1 1 40 0.32768000000000000000e5
-2584 1 2 49 0.32768000000000000000e5
-2584 1 6 37 0.32768000000000000000e5
-2584 1 8 39 -0.65536000000000000000e5
-2584 2 4 26 0.32768000000000000000e5
-2584 3 17 18 0.32768000000000000000e5
-2585 1 6 37 -0.32768000000000000000e5
-2585 1 24 39 0.32768000000000000000e5
-2585 3 17 19 0.32768000000000000000e5
-2586 3 1 30 -0.32768000000000000000e5
-2586 3 17 20 0.32768000000000000000e5
-2587 1 3 50 0.32768000000000000000e5
-2587 1 8 39 -0.32768000000000000000e5
-2587 3 17 21 0.32768000000000000000e5
-2588 1 3 50 -0.32768000000000000000e5
-2588 1 5 52 -0.65536000000000000000e5
-2588 1 8 39 0.32768000000000000000e5
-2588 1 9 40 0.32768000000000000000e5
-2588 1 10 41 -0.65536000000000000000e5
-2588 1 17 48 0.13107200000000000000e6
-2588 1 26 41 -0.32768000000000000000e5
-2588 1 28 43 -0.65536000000000000000e5
-2588 2 8 22 -0.65536000000000000000e5
-2588 3 17 22 0.32768000000000000000e5
-2588 4 4 16 0.65536000000000000000e5
-2588 4 6 18 0.32768000000000000000e5
-2588 4 7 19 0.65536000000000000000e5
-2589 3 2 31 -0.32768000000000000000e5
-2589 3 17 23 0.32768000000000000000e5
-2590 1 5 52 -0.32768000000000000000e5
-2590 1 10 41 -0.32768000000000000000e5
-2590 1 17 48 0.65536000000000000000e5
-2590 1 28 43 -0.32768000000000000000e5
-2590 2 8 22 -0.32768000000000000000e5
-2590 3 17 24 0.32768000000000000000e5
-2590 4 4 16 0.32768000000000000000e5
-2590 4 7 19 0.32768000000000000000e5
-2591 1 5 52 -0.16384000000000000000e5
-2591 1 11 42 0.16384000000000000000e5
-2591 2 12 26 -0.16384000000000000000e5
-2591 2 20 34 0.16384000000000000000e5
-2591 3 2 31 -0.16384000000000000000e5
-2591 3 14 27 -0.32768000000000000000e5
-2591 3 17 25 0.32768000000000000000e5
-2591 4 7 19 0.16384000000000000000e5
-2591 4 8 20 0.16384000000000000000e5
-2592 1 2 49 -0.32768000000000000000e5
-2592 1 7 54 0.65536000000000000000e5
-2592 1 23 38 -0.32768000000000000000e5
-2592 1 24 39 -0.32768000000000000000e5
-2592 2 3 33 -0.32768000000000000000e5
-2592 2 18 32 0.32768000000000000000e5
-2592 2 26 32 -0.32768000000000000000e5
-2592 3 4 33 -0.32768000000000000000e5
-2592 3 17 26 0.32768000000000000000e5
-2592 3 17 30 0.65536000000000000000e5
-2592 4 17 17 -0.65536000000000000000e5
-2593 3 3 32 -0.32768000000000000000e5
-2593 3 17 27 0.32768000000000000000e5
-2594 2 3 33 0.32768000000000000000e5
-2594 2 18 32 -0.32768000000000000000e5
-2594 3 3 32 0.32768000000000000000e5
-2594 3 4 33 0.32768000000000000000e5
-2594 3 17 28 0.32768000000000000000e5
-2594 3 17 30 -0.65536000000000000000e5
-2595 1 3 50 -0.32768000000000000000e5
-2595 1 7 54 0.32768000000000000000e5
-2595 3 17 29 0.32768000000000000000e5
-2596 1 5 52 0.32768000000000000000e5
-2596 1 17 48 -0.65536000000000000000e5
-2596 1 28 43 0.32768000000000000000e5
-2596 1 32 47 0.32768000000000000000e5
-2596 2 8 22 0.32768000000000000000e5
-2596 3 17 31 0.32768000000000000000e5
-2596 4 4 16 -0.32768000000000000000e5
-2596 4 7 19 -0.32768000000000000000e5
-2597 1 2 49 -0.32768000000000000000e5
-2597 1 7 54 0.65536000000000000000e5
-2597 1 22 53 -0.32768000000000000000e5
-2597 1 23 54 -0.32768000000000000000e5
-2597 2 26 32 -0.32768000000000000000e5
-2597 3 3 32 0.32768000000000000000e5
-2597 3 6 35 -0.65536000000000000000e5
-2597 3 17 32 0.32768000000000000000e5
-2598 1 23 54 0.32768000000000000000e5
-2598 1 24 39 -0.32768000000000000000e5
-2598 2 3 33 -0.32768000000000000000e5
-2598 2 18 32 0.32768000000000000000e5
-2598 3 3 32 -0.32768000000000000000e5
-2598 3 4 33 -0.32768000000000000000e5
-2598 3 17 30 0.65536000000000000000e5
-2598 3 17 33 0.32768000000000000000e5
-2599 3 17 34 0.32768000000000000000e5
-2599 3 20 33 -0.32768000000000000000e5
-2600 1 23 54 -0.32768000000000000000e5
-2600 1 38 53 0.32768000000000000000e5
-2600 3 17 35 0.32768000000000000000e5
-2601 1 6 37 -0.16384000000000000000e5
-2601 1 24 39 0.16384000000000000000e5
-2601 3 18 18 0.32768000000000000000e5
-2602 1 1 40 -0.32768000000000000000e5
-2602 1 2 49 -0.32768000000000000000e5
-2602 1 3 26 0.32768000000000000000e5
-2602 1 3 50 -0.65536000000000000000e5
-2602 1 5 52 -0.13107200000000000000e6
-2602 1 6 37 -0.32768000000000000000e5
-2602 1 8 39 0.13107200000000000000e6
-2602 1 10 25 0.65536000000000000000e5
-2602 1 10 41 -0.13107200000000000000e6
-2602 1 17 48 0.26214400000000000000e6
-2602 1 24 39 -0.32768000000000000000e5
-2602 1 26 41 -0.65536000000000000000e5
-2602 1 28 43 -0.13107200000000000000e6
-2602 2 3 33 -0.32768000000000000000e5
-2602 2 4 18 0.32768000000000000000e5
-2602 2 4 26 -0.32768000000000000000e5
-2602 2 8 22 -0.13107200000000000000e6
-2602 3 4 17 0.32768000000000000000e5
-2602 3 5 18 0.32768000000000000000e5
-2602 3 6 19 0.65536000000000000000e5
-2602 3 8 21 -0.13107200000000000000e6
-2602 3 18 19 0.32768000000000000000e5
-2602 4 3 15 0.65536000000000000000e5
-2602 4 4 16 0.13107200000000000000e6
-2602 4 6 18 0.65536000000000000000e5
-2602 4 7 19 0.13107200000000000000e6
-2603 1 3 50 0.32768000000000000000e5
-2603 1 8 39 -0.32768000000000000000e5
-2603 3 18 20 0.32768000000000000000e5
-2604 1 3 50 -0.32768000000000000000e5
-2604 1 5 52 -0.65536000000000000000e5
-2604 1 8 39 0.32768000000000000000e5
-2604 1 9 40 0.32768000000000000000e5
-2604 1 10 41 -0.65536000000000000000e5
-2604 1 17 48 0.13107200000000000000e6
-2604 1 26 41 -0.32768000000000000000e5
-2604 1 28 43 -0.65536000000000000000e5
-2604 2 8 22 -0.65536000000000000000e5
-2604 3 18 21 0.32768000000000000000e5
-2604 4 4 16 0.65536000000000000000e5
-2604 4 6 18 0.32768000000000000000e5
-2604 4 7 19 0.65536000000000000000e5
-2605 1 9 40 -0.32768000000000000000e5
-2605 1 26 41 0.32768000000000000000e5
-2605 3 18 22 0.32768000000000000000e5
-2606 1 5 52 -0.32768000000000000000e5
-2606 1 10 41 -0.32768000000000000000e5
-2606 1 17 48 0.65536000000000000000e5
-2606 1 28 43 -0.32768000000000000000e5
-2606 2 8 22 -0.32768000000000000000e5
-2606 3 18 23 0.32768000000000000000e5
-2606 4 4 16 0.32768000000000000000e5
-2606 4 7 19 0.32768000000000000000e5
-2607 1 10 41 0.32768000000000000000e5
-2607 1 11 42 0.32768000000000000000e5
-2607 1 17 48 -0.65536000000000000000e5
-2607 1 28 43 0.32768000000000000000e5
-2607 2 8 22 0.32768000000000000000e5
-2607 3 14 27 -0.65536000000000000000e5
-2607 3 18 24 0.32768000000000000000e5
-2607 4 4 16 -0.32768000000000000000e5
-2608 3 14 27 -0.32768000000000000000e5
-2608 3 18 25 0.32768000000000000000e5
-2609 3 3 32 -0.32768000000000000000e5
-2609 3 18 26 0.32768000000000000000e5
-2610 2 3 33 0.32768000000000000000e5
-2610 2 18 32 -0.32768000000000000000e5
-2610 3 3 32 0.32768000000000000000e5
-2610 3 4 33 0.32768000000000000000e5
-2610 3 17 30 -0.65536000000000000000e5
-2610 3 18 27 0.32768000000000000000e5
-2611 3 4 33 -0.32768000000000000000e5
-2611 3 18 28 0.32768000000000000000e5
-2612 3 17 30 -0.32768000000000000000e5
-2612 3 18 29 0.32768000000000000000e5
-2613 3 18 30 0.32768000000000000000e5
-2613 3 22 27 -0.32768000000000000000e5
-2614 1 23 54 0.32768000000000000000e5
-2614 1 24 39 -0.32768000000000000000e5
-2614 2 3 33 -0.32768000000000000000e5
-2614 2 18 32 0.32768000000000000000e5
-2614 3 3 32 -0.32768000000000000000e5
-2614 3 4 33 -0.32768000000000000000e5
-2614 3 17 30 0.65536000000000000000e5
-2614 3 18 32 0.32768000000000000000e5
-2615 3 18 33 0.32768000000000000000e5
-2615 3 19 32 -0.32768000000000000000e5
-2616 1 24 55 0.32768000000000000000e5
-2616 1 26 41 -0.32768000000000000000e5
-2616 3 18 34 0.32768000000000000000e5
-2616 3 22 27 0.32768000000000000000e5
-2617 1 1 48 0.32768000000000000000e5
-2617 1 2 49 0.65536000000000000000e5
-2617 1 3 50 0.65536000000000000000e5
-2617 1 11 42 -0.13107200000000000000e6
-2617 1 12 43 -0.26214400000000000000e6
-2617 1 17 48 0.26214400000000000000e6
-2617 1 23 38 0.32768000000000000000e5
-2617 1 24 39 0.32768000000000000000e5
-2617 1 47 54 0.32768000000000000000e5
-2617 2 2 32 0.32768000000000000000e5
-2617 2 3 33 0.32768000000000000000e5
-2617 2 8 22 -0.13107200000000000000e6
-2617 2 12 26 0.13107200000000000000e6
-2617 2 16 30 0.65536000000000000000e5
-2617 3 2 31 0.13107200000000000000e6
-2617 3 4 33 0.32768000000000000000e5
-2617 3 14 27 0.26214400000000000000e6
-2617 3 18 35 0.32768000000000000000e5
-2617 3 19 32 0.32768000000000000000e5
-2617 3 32 33 0.32768000000000000000e5
-2617 4 4 16 0.13107200000000000000e6
-2618 1 1 40 0.16384000000000000000e5
-2618 1 1 48 -0.16384000000000000000e5
-2618 1 2 49 -0.16384000000000000000e5
-2618 1 3 26 -0.16384000000000000000e5
-2618 1 5 52 0.65536000000000000000e5
-2618 1 6 37 0.32768000000000000000e5
-2618 1 8 39 -0.65536000000000000000e5
-2618 1 9 40 -0.32768000000000000000e5
-2618 1 10 25 -0.32768000000000000000e5
-2618 1 10 41 0.65536000000000000000e5
-2618 1 11 42 0.65536000000000000000e5
-2618 1 12 43 0.13107200000000000000e6
-2618 1 17 48 -0.26214400000000000000e6
-2618 1 23 38 -0.16384000000000000000e5
-2618 1 25 40 0.16384000000000000000e5
-2618 1 26 41 0.32768000000000000000e5
-2618 1 28 43 0.65536000000000000000e5
-2618 2 2 32 -0.16384000000000000000e5
-2618 2 4 18 -0.16384000000000000000e5
-2618 2 4 26 0.16384000000000000000e5
-2618 2 5 27 0.16384000000000000000e5
-2618 2 8 22 0.13107200000000000000e6
-2618 2 12 26 -0.65536000000000000000e5
-2618 2 16 30 -0.32768000000000000000e5
-2618 3 2 31 -0.65536000000000000000e5
-2618 3 4 17 -0.16384000000000000000e5
-2618 3 5 18 -0.16384000000000000000e5
-2618 3 6 19 -0.32768000000000000000e5
-2618 3 8 21 0.65536000000000000000e5
-2618 3 14 27 -0.13107200000000000000e6
-2618 3 19 19 0.32768000000000000000e5
-2618 4 3 15 -0.32768000000000000000e5
-2618 4 4 16 -0.13107200000000000000e6
-2618 4 6 18 -0.32768000000000000000e5
-2618 4 7 19 -0.65536000000000000000e5
-2619 1 3 50 -0.32768000000000000000e5
-2619 1 5 52 -0.65536000000000000000e5
-2619 1 8 39 0.32768000000000000000e5
-2619 1 9 40 0.32768000000000000000e5
-2619 1 10 41 -0.65536000000000000000e5
-2619 1 17 48 0.13107200000000000000e6
-2619 1 26 41 -0.32768000000000000000e5
-2619 1 28 43 -0.65536000000000000000e5
-2619 2 8 22 -0.65536000000000000000e5
-2619 3 19 20 0.32768000000000000000e5
-2619 4 4 16 0.65536000000000000000e5
-2619 4 6 18 0.32768000000000000000e5
-2619 4 7 19 0.65536000000000000000e5
-2620 1 9 40 -0.32768000000000000000e5
-2620 1 26 41 0.32768000000000000000e5
-2620 3 19 21 0.32768000000000000000e5
-2621 1 1 48 0.16384000000000000000e5
-2621 1 2 49 0.16384000000000000000e5
-2621 1 3 50 0.32768000000000000000e5
-2621 1 11 42 -0.65536000000000000000e5
-2621 1 12 43 -0.13107200000000000000e6
-2621 1 17 48 0.13107200000000000000e6
-2621 1 23 38 0.16384000000000000000e5
-2621 1 26 29 -0.32768000000000000000e5
-2621 1 26 41 -0.32768000000000000000e5
-2621 1 28 43 0.65536000000000000000e5
-2621 2 2 32 0.16384000000000000000e5
-2621 2 4 34 -0.32768000000000000000e5
-2621 2 8 22 -0.65536000000000000000e5
-2621 2 12 26 0.65536000000000000000e5
-2621 2 16 30 0.32768000000000000000e5
-2621 3 2 31 0.65536000000000000000e5
-2621 3 14 27 0.13107200000000000000e6
-2621 3 19 22 0.32768000000000000000e5
-2621 4 4 16 0.65536000000000000000e5
-2622 1 10 41 0.32768000000000000000e5
-2622 1 11 42 0.32768000000000000000e5
-2622 1 17 48 -0.65536000000000000000e5
-2622 1 28 43 0.32768000000000000000e5
-2622 2 8 22 0.32768000000000000000e5
-2622 3 14 27 -0.65536000000000000000e5
-2622 3 19 23 0.32768000000000000000e5
-2622 4 4 16 -0.32768000000000000000e5
-2623 1 5 52 0.32768000000000000000e5
-2623 1 11 42 -0.32768000000000000000e5
-2623 3 19 24 0.32768000000000000000e5
-2624 1 14 45 0.65536000000000000000e5
-2624 1 17 48 -0.32768000000000000000e5
-2624 1 18 25 -0.32768000000000000000e5
-2624 1 18 49 -0.32768000000000000000e5
-2624 2 24 30 -0.32768000000000000000e5
-2624 3 14 19 0.32768000000000000000e5
-2624 3 15 28 -0.65536000000000000000e5
-2624 3 19 25 0.32768000000000000000e5
-2625 2 3 33 0.32768000000000000000e5
-2625 2 18 32 -0.32768000000000000000e5
-2625 3 3 32 0.32768000000000000000e5
-2625 3 4 33 0.32768000000000000000e5
-2625 3 17 30 -0.65536000000000000000e5
-2625 3 19 26 0.32768000000000000000e5
-2626 3 4 33 -0.32768000000000000000e5
-2626 3 19 27 0.32768000000000000000e5
-2627 1 6 53 0.32768000000000000000e5
-2627 1 25 40 -0.32768000000000000000e5
-2627 3 19 28 0.32768000000000000000e5
-2628 3 19 29 0.32768000000000000000e5
-2628 3 22 27 -0.32768000000000000000e5
-2629 3 5 34 -0.32768000000000000000e5
-2629 3 19 30 0.32768000000000000000e5
-2630 1 5 52 -0.32768000000000000000e5
-2630 1 33 48 0.32768000000000000000e5
-2630 3 19 31 0.32768000000000000000e5
-2631 1 6 53 -0.32768000000000000000e5
-2631 1 25 56 0.32768000000000000000e5
-2631 3 19 33 0.32768000000000000000e5
-2631 3 28 33 0.32768000000000000000e5
-2632 1 24 55 -0.32768000000000000000e5
-2632 1 26 41 0.32768000000000000000e5
-2632 2 4 34 0.32768000000000000000e5
-2632 2 21 35 -0.32768000000000000000e5
-2632 3 5 34 0.32768000000000000000e5
-2632 3 17 30 0.32768000000000000000e5
-2632 3 18 31 -0.65536000000000000000e5
-2632 3 19 34 0.32768000000000000000e5
-2632 3 20 33 0.32768000000000000000e5
-2632 3 21 34 -0.65536000000000000000e5
-2633 3 19 35 0.32768000000000000000e5
-2633 3 28 33 -0.32768000000000000000e5
-2634 1 2 33 0.16384000000000000000e5
-2634 1 3 34 -0.32768000000000000000e5
-2634 1 5 52 0.16384000000000000000e5
-2634 1 10 41 0.16384000000000000000e5
-2634 1 11 42 -0.16384000000000000000e5
-2634 1 12 43 -0.32768000000000000000e5
-2634 1 16 47 0.32768000000000000000e5
-2634 1 28 43 0.16384000000000000000e5
-2634 2 7 21 0.16384000000000000000e5
-2634 2 10 32 -0.16384000000000000000e5
-2634 2 12 26 0.16384000000000000000e5
-2634 3 2 31 0.16384000000000000000e5
-2634 3 7 20 0.16384000000000000000e5
-2634 3 8 21 0.16384000000000000000e5
-2634 3 14 27 0.32768000000000000000e5
-2634 3 20 20 0.32768000000000000000e5
-2634 4 7 19 -0.16384000000000000000e5
-2635 3 2 31 -0.32768000000000000000e5
-2635 3 20 21 0.32768000000000000000e5
-2636 1 5 52 -0.32768000000000000000e5
-2636 1 10 41 -0.32768000000000000000e5
-2636 1 17 48 0.65536000000000000000e5
-2636 1 28 43 -0.32768000000000000000e5
-2636 2 8 22 -0.32768000000000000000e5
-2636 3 20 22 0.32768000000000000000e5
-2636 4 4 16 0.32768000000000000000e5
-2636 4 7 19 0.32768000000000000000e5
-2637 3 13 26 -0.32768000000000000000e5
-2637 3 20 23 0.32768000000000000000e5
-2638 1 5 52 -0.16384000000000000000e5
-2638 1 11 42 0.16384000000000000000e5
-2638 2 12 26 -0.16384000000000000000e5
-2638 2 20 34 0.16384000000000000000e5
-2638 3 2 31 -0.16384000000000000000e5
-2638 3 14 27 -0.32768000000000000000e5
-2638 3 20 24 0.32768000000000000000e5
-2638 4 7 19 0.16384000000000000000e5
-2638 4 8 20 0.16384000000000000000e5
-2639 1 13 44 -0.32768000000000000000e5
-2639 1 34 41 0.32768000000000000000e5
-2639 3 20 25 0.32768000000000000000e5
-2640 3 16 29 -0.32768000000000000000e5
-2640 3 20 26 0.32768000000000000000e5
-2641 1 3 50 -0.32768000000000000000e5
-2641 1 7 54 0.32768000000000000000e5
-2641 3 20 27 0.32768000000000000000e5
-2642 3 17 30 -0.32768000000000000000e5
-2642 3 20 28 0.32768000000000000000e5
-2643 1 11 42 -0.32768000000000000000e5
-2643 1 12 43 -0.65536000000000000000e5
-2643 1 17 48 0.65536000000000000000e5
-2643 1 37 44 0.32768000000000000000e5
-2643 2 8 22 -0.32768000000000000000e5
-2643 2 12 26 0.32768000000000000000e5
-2643 3 2 31 0.32768000000000000000e5
-2643 3 14 27 0.65536000000000000000e5
-2643 3 20 29 0.32768000000000000000e5
-2643 4 4 16 0.32768000000000000000e5
-2644 1 5 52 0.32768000000000000000e5
-2644 1 17 48 -0.65536000000000000000e5
-2644 1 28 43 0.32768000000000000000e5
-2644 1 32 47 0.32768000000000000000e5
-2644 2 8 22 0.32768000000000000000e5
-2644 3 20 30 0.32768000000000000000e5
-2644 4 4 16 -0.32768000000000000000e5
-2644 4 7 19 -0.32768000000000000000e5
-2645 1 5 52 0.16384000000000000000e5
-2645 1 11 42 -0.16384000000000000000e5
-2645 1 12 43 -0.32768000000000000000e5
-2645 1 28 43 0.16384000000000000000e5
-2645 1 32 47 0.16384000000000000000e5
-2645 1 37 44 0.16384000000000000000e5
-2645 2 12 26 0.16384000000000000000e5
-2645 3 2 31 0.16384000000000000000e5
-2645 3 14 27 0.32768000000000000000e5
-2645 3 18 31 -0.16384000000000000000e5
-2645 3 20 31 0.32768000000000000000e5
-2645 4 7 19 -0.16384000000000000000e5
-2645 4 8 20 -0.16384000000000000000e5
-2646 3 6 35 -0.32768000000000000000e5
-2646 3 20 32 0.32768000000000000000e5
-2647 1 32 47 -0.32768000000000000000e5
-2647 1 37 52 0.32768000000000000000e5
-2647 3 20 34 0.32768000000000000000e5
-2648 1 1 48 0.16384000000000000000e5
-2648 1 2 49 0.16384000000000000000e5
-2648 1 3 50 0.32768000000000000000e5
-2648 1 11 42 -0.65536000000000000000e5
-2648 1 12 43 -0.13107200000000000000e6
-2648 1 17 48 0.13107200000000000000e6
-2648 1 23 38 0.16384000000000000000e5
-2648 1 47 50 0.32768000000000000000e5
-2648 2 2 32 0.16384000000000000000e5
-2648 2 8 22 -0.65536000000000000000e5
-2648 2 12 26 0.65536000000000000000e5
-2648 2 16 30 0.32768000000000000000e5
-2648 3 2 31 0.65536000000000000000e5
-2648 3 14 27 0.13107200000000000000e6
-2648 3 17 30 0.32768000000000000000e5
-2648 3 20 33 0.32768000000000000000e5
-2648 3 20 35 0.32768000000000000000e5
-2648 4 4 16 0.65536000000000000000e5
-2649 1 5 52 -0.16384000000000000000e5
-2649 1 10 41 -0.16384000000000000000e5
-2649 1 17 48 0.32768000000000000000e5
-2649 1 28 43 -0.16384000000000000000e5
-2649 2 8 22 -0.16384000000000000000e5
-2649 3 21 21 0.32768000000000000000e5
-2649 4 4 16 0.16384000000000000000e5
-2649 4 7 19 0.16384000000000000000e5
-2650 1 10 41 0.32768000000000000000e5
-2650 1 11 42 0.32768000000000000000e5
-2650 1 17 48 -0.65536000000000000000e5
-2650 1 28 43 0.32768000000000000000e5
-2650 2 8 22 0.32768000000000000000e5
-2650 3 14 27 -0.65536000000000000000e5
-2650 3 21 22 0.32768000000000000000e5
-2650 4 4 16 -0.32768000000000000000e5
-2651 1 5 52 -0.16384000000000000000e5
-2651 1 11 42 0.16384000000000000000e5
-2651 2 12 26 -0.16384000000000000000e5
-2651 2 20 34 0.16384000000000000000e5
-2651 3 2 31 -0.16384000000000000000e5
-2651 3 14 27 -0.32768000000000000000e5
-2651 3 21 23 0.32768000000000000000e5
-2651 4 7 19 0.16384000000000000000e5
-2651 4 8 20 0.16384000000000000000e5
-2652 3 14 27 -0.32768000000000000000e5
-2652 3 21 24 0.32768000000000000000e5
-2653 1 13 52 0.32768000000000000000e5
-2653 1 28 35 -0.32768000000000000000e5
-2653 3 21 25 0.32768000000000000000e5
-2654 1 3 50 -0.32768000000000000000e5
-2654 1 7 54 0.32768000000000000000e5
-2654 3 21 26 0.32768000000000000000e5
-2655 3 17 30 -0.32768000000000000000e5
-2655 3 21 27 0.32768000000000000000e5
-2656 3 21 28 0.32768000000000000000e5
-2656 3 22 27 -0.32768000000000000000e5
-2657 1 5 52 0.32768000000000000000e5
-2657 1 17 48 -0.65536000000000000000e5
-2657 1 28 43 0.32768000000000000000e5
-2657 1 32 47 0.32768000000000000000e5
-2657 2 8 22 0.32768000000000000000e5
-2657 3 21 29 0.32768000000000000000e5
-2657 4 4 16 -0.32768000000000000000e5
-2657 4 7 19 -0.32768000000000000000e5
-2658 3 18 31 -0.32768000000000000000e5
-2658 3 21 30 0.32768000000000000000e5
-2659 3 21 31 0.32768000000000000000e5
-2659 3 24 29 -0.32768000000000000000e5
-2660 3 20 33 -0.32768000000000000000e5
-2660 3 21 32 0.32768000000000000000e5
-2661 1 24 55 0.32768000000000000000e5
-2661 1 26 41 -0.32768000000000000000e5
-2661 3 21 33 0.32768000000000000000e5
-2661 3 22 27 0.32768000000000000000e5
-2662 1 1 48 -0.16384000000000000000e5
-2662 1 2 49 -0.16384000000000000000e5
-2662 1 3 50 -0.32768000000000000000e5
-2662 1 11 42 0.65536000000000000000e5
-2662 1 12 43 0.13107200000000000000e6
-2662 1 17 48 -0.13107200000000000000e6
-2662 1 23 38 -0.16384000000000000000e5
-2662 1 47 50 -0.32768000000000000000e5
-2662 2 2 32 -0.16384000000000000000e5
-2662 2 8 22 0.65536000000000000000e5
-2662 2 12 26 -0.65536000000000000000e5
-2662 2 16 30 -0.32768000000000000000e5
-2662 2 21 35 0.32768000000000000000e5
-2662 2 29 35 -0.32768000000000000000e5
-2662 3 2 31 -0.65536000000000000000e5
-2662 3 14 27 -0.13107200000000000000e6
-2662 3 17 30 -0.32768000000000000000e5
-2662 3 20 33 -0.32768000000000000000e5
-2662 3 21 35 0.32768000000000000000e5
-2662 3 22 35 0.32768000000000000000e5
-2662 3 29 34 -0.65536000000000000000e5
-2662 4 4 16 -0.65536000000000000000e5
-2663 1 5 52 0.16384000000000000000e5
-2663 1 11 42 -0.16384000000000000000e5
-2663 3 22 22 0.32768000000000000000e5
-2664 3 14 27 -0.32768000000000000000e5
-2664 3 22 23 0.32768000000000000000e5
-2665 1 14 45 0.65536000000000000000e5
-2665 1 17 48 -0.32768000000000000000e5
-2665 1 18 25 -0.32768000000000000000e5
-2665 1 18 49 -0.32768000000000000000e5
-2665 2 24 30 -0.32768000000000000000e5
-2665 3 14 19 0.32768000000000000000e5
-2665 3 15 28 -0.65536000000000000000e5
-2665 3 22 24 0.32768000000000000000e5
-2666 3 15 28 -0.32768000000000000000e5
-2666 3 22 25 0.32768000000000000000e5
-2667 3 17 30 -0.32768000000000000000e5
-2667 3 22 26 0.32768000000000000000e5
-2668 3 5 34 -0.32768000000000000000e5
-2668 3 22 28 0.32768000000000000000e5
-2669 3 18 31 -0.32768000000000000000e5
-2669 3 22 29 0.32768000000000000000e5
-2670 1 5 52 -0.32768000000000000000e5
-2670 1 33 48 0.32768000000000000000e5
-2670 3 22 30 0.32768000000000000000e5
-2671 1 14 45 -0.65536000000000000000e5
-2671 1 17 48 0.32768000000000000000e5
-2671 1 18 49 0.32768000000000000000e5
-2671 1 34 49 0.32768000000000000000e5
-2671 2 24 30 0.32768000000000000000e5
-2671 3 15 28 0.65536000000000000000e5
-2671 3 22 31 0.32768000000000000000e5
-2672 1 24 55 0.32768000000000000000e5
-2672 1 26 41 -0.32768000000000000000e5
-2672 3 22 27 0.32768000000000000000e5
-2672 3 22 32 0.32768000000000000000e5
-2673 1 24 55 -0.32768000000000000000e5
-2673 1 26 41 0.32768000000000000000e5
-2673 2 4 34 0.32768000000000000000e5
-2673 2 21 35 -0.32768000000000000000e5
-2673 3 5 34 0.32768000000000000000e5
-2673 3 17 30 0.32768000000000000000e5
-2673 3 18 31 -0.65536000000000000000e5
-2673 3 20 33 0.32768000000000000000e5
-2673 3 21 34 -0.65536000000000000000e5
-2673 3 22 33 0.32768000000000000000e5
-2674 1 33 48 -0.32768000000000000000e5
-2674 1 43 50 0.32768000000000000000e5
-2674 3 22 34 0.32768000000000000000e5
-2675 1 13 44 -0.16384000000000000000e5
-2675 1 34 41 0.16384000000000000000e5
-2675 3 23 23 0.32768000000000000000e5
-2676 1 13 52 0.32768000000000000000e5
-2676 1 28 35 -0.32768000000000000000e5
-2676 3 23 24 0.32768000000000000000e5
-2677 1 19 42 -0.32768000000000000000e5
-2677 1 19 50 0.32768000000000000000e5
-2677 3 23 25 0.32768000000000000000e5
-2678 1 11 42 -0.32768000000000000000e5
-2678 1 12 43 -0.65536000000000000000e5
-2678 1 17 48 0.65536000000000000000e5
-2678 1 37 44 0.32768000000000000000e5
-2678 2 8 22 -0.32768000000000000000e5
-2678 2 12 26 0.32768000000000000000e5
-2678 3 2 31 0.32768000000000000000e5
-2678 3 14 27 0.65536000000000000000e5
-2678 3 23 26 0.32768000000000000000e5
-2678 4 4 16 0.32768000000000000000e5
-2679 1 5 52 0.32768000000000000000e5
-2679 1 17 48 -0.65536000000000000000e5
-2679 1 28 43 0.32768000000000000000e5
-2679 1 32 47 0.32768000000000000000e5
-2679 2 8 22 0.32768000000000000000e5
-2679 3 23 27 0.32768000000000000000e5
-2679 4 4 16 -0.32768000000000000000e5
-2679 4 7 19 -0.32768000000000000000e5
-2680 3 18 31 -0.32768000000000000000e5
-2680 3 23 28 0.32768000000000000000e5
-2681 1 5 52 0.16384000000000000000e5
-2681 1 11 42 -0.16384000000000000000e5
-2681 1 12 43 -0.32768000000000000000e5
-2681 1 28 43 0.16384000000000000000e5
-2681 1 32 47 0.16384000000000000000e5
-2681 1 37 44 0.16384000000000000000e5
-2681 2 12 26 0.16384000000000000000e5
-2681 3 2 31 0.16384000000000000000e5
-2681 3 14 27 0.32768000000000000000e5
-2681 3 18 31 -0.16384000000000000000e5
-2681 3 23 29 0.32768000000000000000e5
-2681 4 7 19 -0.16384000000000000000e5
-2681 4 8 20 -0.16384000000000000000e5
-2682 3 23 30 0.32768000000000000000e5
-2682 3 24 29 -0.32768000000000000000e5
-2683 1 13 52 -0.32768000000000000000e5
-2683 1 16 55 0.32768000000000000000e5
-2683 3 23 31 0.32768000000000000000e5
-2684 1 32 47 -0.32768000000000000000e5
-2684 1 37 52 0.32768000000000000000e5
-2684 3 23 32 0.32768000000000000000e5
-2685 3 21 34 -0.32768000000000000000e5
-2685 3 23 33 0.32768000000000000000e5
-2686 1 32 47 -0.16384000000000000000e5
-2686 1 33 48 -0.16384000000000000000e5
-2686 1 37 52 0.16384000000000000000e5
-2686 1 43 50 0.16384000000000000000e5
-2686 3 21 34 -0.16384000000000000000e5
-2686 3 23 34 0.32768000000000000000e5
-2686 4 16 20 -0.16384000000000000000e5
-2687 3 23 35 0.32768000000000000000e5
-2687 3 29 34 -0.32768000000000000000e5
-2688 3 15 28 -0.16384000000000000000e5
-2688 3 24 24 0.32768000000000000000e5
-2689 1 5 52 0.32768000000000000000e5
-2689 1 17 48 -0.65536000000000000000e5
-2689 1 28 43 0.32768000000000000000e5
-2689 1 32 47 0.32768000000000000000e5
-2689 2 8 22 0.32768000000000000000e5
-2689 3 24 26 0.32768000000000000000e5
-2689 4 4 16 -0.32768000000000000000e5
-2689 4 7 19 -0.32768000000000000000e5
-2690 3 18 31 -0.32768000000000000000e5
-2690 3 24 27 0.32768000000000000000e5
-2691 1 5 52 -0.32768000000000000000e5
-2691 1 33 48 0.32768000000000000000e5
-2691 3 24 28 0.32768000000000000000e5
-2692 1 14 45 -0.65536000000000000000e5
-2692 1 17 48 0.32768000000000000000e5
-2692 1 18 49 0.32768000000000000000e5
-2692 1 34 49 0.32768000000000000000e5
-2692 2 24 30 0.32768000000000000000e5
-2692 3 15 28 0.65536000000000000000e5
-2692 3 24 30 0.32768000000000000000e5
-2693 1 14 45 -0.32768000000000000000e5
-2693 1 35 50 0.32768000000000000000e5
-2693 3 15 28 0.32768000000000000000e5
-2693 3 24 31 0.32768000000000000000e5
-2694 3 21 34 -0.32768000000000000000e5
-2694 3 24 32 0.32768000000000000000e5
-2695 1 33 48 -0.32768000000000000000e5
-2695 1 43 50 0.32768000000000000000e5
-2695 3 24 33 0.32768000000000000000e5
-2696 1 34 49 -0.32768000000000000000e5
-2696 1 44 51 0.32768000000000000000e5
-2696 3 24 34 0.32768000000000000000e5
-2697 1 43 50 -0.32768000000000000000e5
-2697 1 50 51 0.32768000000000000000e5
-2697 3 24 35 0.32768000000000000000e5
-2698 1 17 32 -0.81920000000000000000e4
-2698 1 18 33 -0.81920000000000000000e4
-2698 1 19 50 0.81920000000000000000e4
-2698 1 20 51 0.81920000000000000000e4
-2698 2 14 24 -0.81920000000000000000e4
-2698 2 25 31 0.81920000000000000000e4
-2698 3 12 25 -0.81920000000000000000e4
-2698 3 15 24 0.16384000000000000000e5
-2698 3 24 25 -0.81920000000000000000e4
-2698 3 25 25 0.32768000000000000000e5
-2699 1 5 52 0.16384000000000000000e5
-2699 1 11 42 -0.16384000000000000000e5
-2699 1 12 43 -0.32768000000000000000e5
-2699 1 28 43 0.16384000000000000000e5
-2699 1 32 47 0.16384000000000000000e5
-2699 1 37 44 0.16384000000000000000e5
-2699 2 12 26 0.16384000000000000000e5
-2699 3 2 31 0.16384000000000000000e5
-2699 3 14 27 0.32768000000000000000e5
-2699 3 18 31 -0.16384000000000000000e5
-2699 3 25 26 0.32768000000000000000e5
-2699 4 7 19 -0.16384000000000000000e5
-2699 4 8 20 -0.16384000000000000000e5
-2700 3 24 29 -0.32768000000000000000e5
-2700 3 25 27 0.32768000000000000000e5
-2701 1 14 45 -0.65536000000000000000e5
-2701 1 17 48 0.32768000000000000000e5
-2701 1 18 49 0.32768000000000000000e5
-2701 1 34 49 0.32768000000000000000e5
-2701 2 24 30 0.32768000000000000000e5
-2701 3 15 28 0.65536000000000000000e5
-2701 3 25 28 0.32768000000000000000e5
-2702 1 13 52 -0.32768000000000000000e5
-2702 1 16 55 0.32768000000000000000e5
-2702 3 25 29 0.32768000000000000000e5
-2703 1 14 45 -0.32768000000000000000e5
-2703 1 35 50 0.32768000000000000000e5
-2703 3 15 28 0.32768000000000000000e5
-2703 3 25 30 0.32768000000000000000e5
-2704 1 16 55 0.16384000000000000000e5
-2704 1 29 36 -0.32768000000000000000e5
-2704 1 35 50 0.16384000000000000000e5
-2704 1 43 46 0.16384000000000000000e5
-2704 2 31 31 0.32768000000000000000e5
-2704 3 24 25 0.32768000000000000000e5
-2704 3 25 31 0.32768000000000000000e5
-2705 1 32 47 -0.16384000000000000000e5
-2705 1 33 48 -0.16384000000000000000e5
-2705 1 37 52 0.16384000000000000000e5
-2705 1 43 50 0.16384000000000000000e5
-2705 3 21 34 -0.16384000000000000000e5
-2705 3 25 32 0.32768000000000000000e5
-2705 4 16 20 -0.16384000000000000000e5
-2706 1 34 49 -0.32768000000000000000e5
-2706 1 44 51 0.32768000000000000000e5
-2706 3 25 33 0.32768000000000000000e5
-2707 1 44 51 -0.32768000000000000000e5
-2707 1 46 53 0.32768000000000000000e5
-2707 3 25 35 0.32768000000000000000e5
-2708 1 2 49 0.16384000000000000000e5
-2708 1 7 54 -0.32768000000000000000e5
-2708 1 22 53 0.16384000000000000000e5
-2708 1 24 39 0.16384000000000000000e5
-2708 2 3 33 0.16384000000000000000e5
-2708 2 18 32 -0.16384000000000000000e5
-2708 2 26 32 0.16384000000000000000e5
-2708 3 4 33 0.16384000000000000000e5
-2708 3 17 30 -0.32768000000000000000e5
-2708 3 26 26 0.32768000000000000000e5
-2708 4 17 17 0.32768000000000000000e5
-2709 1 2 49 -0.32768000000000000000e5
-2709 1 7 54 0.65536000000000000000e5
-2709 1 22 53 -0.32768000000000000000e5
-2709 1 23 54 -0.32768000000000000000e5
-2709 2 26 32 -0.32768000000000000000e5
-2709 3 3 32 0.32768000000000000000e5
-2709 3 6 35 -0.65536000000000000000e5
-2709 3 26 27 0.32768000000000000000e5
-2710 1 23 54 0.32768000000000000000e5
-2710 1 24 39 -0.32768000000000000000e5
-2710 2 3 33 -0.32768000000000000000e5
-2710 2 18 32 0.32768000000000000000e5
-2710 3 3 32 -0.32768000000000000000e5
-2710 3 4 33 -0.32768000000000000000e5
-2710 3 17 30 0.65536000000000000000e5
-2710 3 26 28 0.32768000000000000000e5
-2711 3 6 35 -0.32768000000000000000e5
-2711 3 26 29 0.32768000000000000000e5
-2712 3 20 33 -0.32768000000000000000e5
-2712 3 26 30 0.32768000000000000000e5
-2713 1 32 47 -0.32768000000000000000e5
-2713 1 37 52 0.32768000000000000000e5
-2713 3 26 31 0.32768000000000000000e5
-2714 1 7 54 -0.65536000000000000000e5
-2714 1 22 53 0.32768000000000000000e5
-2714 1 23 54 0.32768000000000000000e5
-2714 1 38 53 -0.32768000000000000000e5
-2714 1 47 50 0.65536000000000000000e5
-2714 1 47 54 -0.32768000000000000000e5
-2714 2 26 32 0.32768000000000000000e5
-2714 2 32 32 -0.65536000000000000000e5
-2714 3 6 35 0.65536000000000000000e5
-2714 3 26 32 0.32768000000000000000e5
-2714 3 32 33 -0.32768000000000000000e5
-2715 1 23 54 -0.32768000000000000000e5
-2715 1 38 53 0.32768000000000000000e5
-2715 3 26 33 0.32768000000000000000e5
-2716 1 1 48 0.16384000000000000000e5
-2716 1 2 49 0.16384000000000000000e5
-2716 1 3 50 0.32768000000000000000e5
-2716 1 11 42 -0.65536000000000000000e5
-2716 1 12 43 -0.13107200000000000000e6
-2716 1 17 48 0.13107200000000000000e6
-2716 1 23 38 0.16384000000000000000e5
-2716 1 47 50 0.32768000000000000000e5
-2716 2 2 32 0.16384000000000000000e5
-2716 2 8 22 -0.65536000000000000000e5
-2716 2 12 26 0.65536000000000000000e5
-2716 2 16 30 0.32768000000000000000e5
-2716 3 2 31 0.65536000000000000000e5
-2716 3 14 27 0.13107200000000000000e6
-2716 3 17 30 0.32768000000000000000e5
-2716 3 20 33 0.32768000000000000000e5
-2716 3 26 34 0.32768000000000000000e5
-2716 4 4 16 0.65536000000000000000e5
-2717 1 37 56 0.32768000000000000000e5
-2717 1 38 53 -0.32768000000000000000e5
-2717 3 26 35 0.32768000000000000000e5
-2718 1 23 54 0.16384000000000000000e5
-2718 1 24 39 -0.16384000000000000000e5
-2718 2 3 33 -0.16384000000000000000e5
-2718 2 18 32 0.16384000000000000000e5
-2718 3 3 32 -0.16384000000000000000e5
-2718 3 4 33 -0.16384000000000000000e5
-2718 3 17 30 0.32768000000000000000e5
-2718 3 27 27 0.32768000000000000000e5
-2719 3 19 32 -0.32768000000000000000e5
-2719 3 27 28 0.32768000000000000000e5
-2720 3 20 33 -0.32768000000000000000e5
-2720 3 27 29 0.32768000000000000000e5
-2721 1 24 55 0.32768000000000000000e5
-2721 1 26 41 -0.32768000000000000000e5
-2721 3 22 27 0.32768000000000000000e5
-2721 3 27 30 0.32768000000000000000e5
-2722 3 21 34 -0.32768000000000000000e5
-2722 3 27 31 0.32768000000000000000e5
-2723 1 23 54 -0.32768000000000000000e5
-2723 1 38 53 0.32768000000000000000e5
-2723 3 27 32 0.32768000000000000000e5
-2724 1 1 48 0.32768000000000000000e5
-2724 1 2 49 0.65536000000000000000e5
-2724 1 3 50 0.65536000000000000000e5
-2724 1 11 42 -0.13107200000000000000e6
-2724 1 12 43 -0.26214400000000000000e6
-2724 1 17 48 0.26214400000000000000e6
-2724 1 23 38 0.32768000000000000000e5
-2724 1 24 39 0.32768000000000000000e5
-2724 1 47 54 0.32768000000000000000e5
-2724 2 2 32 0.32768000000000000000e5
-2724 2 3 33 0.32768000000000000000e5
-2724 2 8 22 -0.13107200000000000000e6
-2724 2 12 26 0.13107200000000000000e6
-2724 2 16 30 0.65536000000000000000e5
-2724 3 2 31 0.13107200000000000000e6
-2724 3 4 33 0.32768000000000000000e5
-2724 3 14 27 0.26214400000000000000e6
-2724 3 19 32 0.32768000000000000000e5
-2724 3 27 33 0.32768000000000000000e5
-2724 3 32 33 0.32768000000000000000e5
-2724 4 4 16 0.13107200000000000000e6
-2725 1 1 48 -0.16384000000000000000e5
-2725 1 2 49 -0.16384000000000000000e5
-2725 1 3 50 -0.32768000000000000000e5
-2725 1 11 42 0.65536000000000000000e5
-2725 1 12 43 0.13107200000000000000e6
-2725 1 17 48 -0.13107200000000000000e6
-2725 1 23 38 -0.16384000000000000000e5
-2725 1 47 50 -0.32768000000000000000e5
-2725 2 2 32 -0.16384000000000000000e5
-2725 2 8 22 0.65536000000000000000e5
-2725 2 12 26 -0.65536000000000000000e5
-2725 2 16 30 -0.32768000000000000000e5
-2725 2 21 35 0.32768000000000000000e5
-2725 2 29 35 -0.32768000000000000000e5
-2725 3 2 31 -0.65536000000000000000e5
-2725 3 14 27 -0.13107200000000000000e6
-2725 3 17 30 -0.32768000000000000000e5
-2725 3 20 33 -0.32768000000000000000e5
-2725 3 22 35 0.32768000000000000000e5
-2725 3 27 34 0.32768000000000000000e5
-2725 3 29 34 -0.65536000000000000000e5
-2725 4 4 16 -0.65536000000000000000e5
-2726 3 27 35 0.32768000000000000000e5
-2726 3 32 33 -0.32768000000000000000e5
-2727 1 6 53 -0.16384000000000000000e5
-2727 1 25 56 0.16384000000000000000e5
-2727 3 28 28 0.32768000000000000000e5
-2727 3 28 33 0.16384000000000000000e5
-2728 1 24 55 0.32768000000000000000e5
-2728 1 26 41 -0.32768000000000000000e5
-2728 3 22 27 0.32768000000000000000e5
-2728 3 28 29 0.32768000000000000000e5
-2729 1 24 55 -0.32768000000000000000e5
-2729 1 26 41 0.32768000000000000000e5
-2729 2 4 34 0.32768000000000000000e5
-2729 2 21 35 -0.32768000000000000000e5
-2729 3 5 34 0.32768000000000000000e5
-2729 3 17 30 0.32768000000000000000e5
-2729 3 18 31 -0.65536000000000000000e5
-2729 3 20 33 0.32768000000000000000e5
-2729 3 21 34 -0.65536000000000000000e5
-2729 3 28 30 0.32768000000000000000e5
-2730 1 33 48 -0.32768000000000000000e5
-2730 1 43 50 0.32768000000000000000e5
-2730 3 28 31 0.32768000000000000000e5
-2731 1 1 48 0.32768000000000000000e5
-2731 1 2 49 0.65536000000000000000e5
-2731 1 3 50 0.65536000000000000000e5
-2731 1 11 42 -0.13107200000000000000e6
-2731 1 12 43 -0.26214400000000000000e6
-2731 1 17 48 0.26214400000000000000e6
-2731 1 23 38 0.32768000000000000000e5
-2731 1 24 39 0.32768000000000000000e5
-2731 1 47 54 0.32768000000000000000e5
-2731 2 2 32 0.32768000000000000000e5
-2731 2 3 33 0.32768000000000000000e5
-2731 2 8 22 -0.13107200000000000000e6
-2731 2 12 26 0.13107200000000000000e6
-2731 2 16 30 0.65536000000000000000e5
-2731 3 2 31 0.13107200000000000000e6
-2731 3 4 33 0.32768000000000000000e5
-2731 3 14 27 0.26214400000000000000e6
-2731 3 19 32 0.32768000000000000000e5
-2731 3 28 32 0.32768000000000000000e5
-2731 3 32 33 0.32768000000000000000e5
-2731 4 4 16 0.13107200000000000000e6
-2732 3 22 35 -0.32768000000000000000e5
-2732 3 28 34 0.32768000000000000000e5
-2733 1 1 48 0.32768000000000000000e5
-2733 1 2 49 0.32768000000000000000e5
-2733 1 3 50 0.65536000000000000000e5
-2733 1 11 42 -0.13107200000000000000e6
-2733 1 12 43 -0.26214400000000000000e6
-2733 1 17 48 0.26214400000000000000e6
-2733 1 23 38 0.32768000000000000000e5
-2733 1 24 55 -0.65536000000000000000e5
-2733 1 37 56 -0.32768000000000000000e5
-2733 1 38 53 0.32768000000000000000e5
-2733 1 41 56 0.65536000000000000000e5
-2733 1 47 50 0.65536000000000000000e5
-2733 2 2 32 0.32768000000000000000e5
-2733 2 8 22 -0.13107200000000000000e6
-2733 2 12 26 0.13107200000000000000e6
-2733 2 16 30 0.65536000000000000000e5
-2733 2 21 35 -0.65536000000000000000e5
-2733 2 29 35 0.65536000000000000000e5
-2733 3 2 31 0.13107200000000000000e6
-2733 3 14 27 0.26214400000000000000e6
-2733 3 17 30 0.65536000000000000000e5
-2733 3 20 33 0.65536000000000000000e5
-2733 3 22 35 -0.65536000000000000000e5
-2733 3 28 35 0.32768000000000000000e5
-2733 3 29 34 0.13107200000000000000e6
-2733 3 32 33 0.32768000000000000000e5
-2733 4 4 16 0.13107200000000000000e6
-2733 4 20 20 0.65536000000000000000e5
-2734 1 32 47 -0.16384000000000000000e5
-2734 1 37 52 0.16384000000000000000e5
-2734 3 29 29 0.32768000000000000000e5
-2735 3 21 34 -0.32768000000000000000e5
-2735 3 29 30 0.32768000000000000000e5
-2736 1 32 47 -0.16384000000000000000e5
-2736 1 33 48 -0.16384000000000000000e5
-2736 1 37 52 0.16384000000000000000e5
-2736 1 43 50 0.16384000000000000000e5
-2736 3 21 34 -0.16384000000000000000e5
-2736 3 29 31 0.32768000000000000000e5
-2736 4 16 20 -0.16384000000000000000e5
-2737 1 1 48 0.16384000000000000000e5
-2737 1 2 49 0.16384000000000000000e5
-2737 1 3 50 0.32768000000000000000e5
-2737 1 11 42 -0.65536000000000000000e5
-2737 1 12 43 -0.13107200000000000000e6
-2737 1 17 48 0.13107200000000000000e6
-2737 1 23 38 0.16384000000000000000e5
-2737 1 47 50 0.32768000000000000000e5
-2737 2 2 32 0.16384000000000000000e5
-2737 2 8 22 -0.65536000000000000000e5
-2737 2 12 26 0.65536000000000000000e5
-2737 2 16 30 0.32768000000000000000e5
-2737 3 2 31 0.65536000000000000000e5
-2737 3 14 27 0.13107200000000000000e6
-2737 3 17 30 0.32768000000000000000e5
-2737 3 20 33 0.32768000000000000000e5
-2737 3 29 32 0.32768000000000000000e5
-2737 4 4 16 0.65536000000000000000e5
-2738 1 1 48 -0.16384000000000000000e5
-2738 1 2 49 -0.16384000000000000000e5
-2738 1 3 50 -0.32768000000000000000e5
-2738 1 11 42 0.65536000000000000000e5
-2738 1 12 43 0.13107200000000000000e6
-2738 1 17 48 -0.13107200000000000000e6
-2738 1 23 38 -0.16384000000000000000e5
-2738 1 47 50 -0.32768000000000000000e5
-2738 2 2 32 -0.16384000000000000000e5
-2738 2 8 22 0.65536000000000000000e5
-2738 2 12 26 -0.65536000000000000000e5
-2738 2 16 30 -0.32768000000000000000e5
-2738 2 21 35 0.32768000000000000000e5
-2738 2 29 35 -0.32768000000000000000e5
-2738 3 2 31 -0.65536000000000000000e5
-2738 3 14 27 -0.13107200000000000000e6
-2738 3 17 30 -0.32768000000000000000e5
-2738 3 20 33 -0.32768000000000000000e5
-2738 3 22 35 0.32768000000000000000e5
-2738 3 29 33 0.32768000000000000000e5
-2738 3 29 34 -0.65536000000000000000e5
-2738 4 4 16 -0.65536000000000000000e5
-2739 1 1 48 0.16384000000000000000e5
-2739 1 2 49 0.16384000000000000000e5
-2739 1 3 50 0.32768000000000000000e5
-2739 1 11 42 -0.65536000000000000000e5
-2739 1 12 43 -0.13107200000000000000e6
-2739 1 17 48 0.13107200000000000000e6
-2739 1 23 38 0.16384000000000000000e5
-2739 1 24 55 -0.32768000000000000000e5
-2739 1 41 56 0.32768000000000000000e5
-2739 1 47 50 0.32768000000000000000e5
-2739 2 2 32 0.16384000000000000000e5
-2739 2 8 22 -0.65536000000000000000e5
-2739 2 12 26 0.65536000000000000000e5
-2739 2 16 30 0.32768000000000000000e5
-2739 2 21 35 -0.32768000000000000000e5
-2739 2 29 35 0.32768000000000000000e5
-2739 3 2 31 0.65536000000000000000e5
-2739 3 14 27 0.13107200000000000000e6
-2739 3 17 30 0.32768000000000000000e5
-2739 3 20 33 0.32768000000000000000e5
-2739 3 22 35 -0.32768000000000000000e5
-2739 3 29 34 0.65536000000000000000e5
-2739 3 29 35 0.32768000000000000000e5
-2739 4 4 16 0.65536000000000000000e5
-2740 1 33 48 -0.16384000000000000000e5
-2740 1 43 50 0.16384000000000000000e5
-2740 3 30 30 0.32768000000000000000e5
-2741 1 34 49 -0.32768000000000000000e5
-2741 1 44 51 0.32768000000000000000e5
-2741 3 30 31 0.32768000000000000000e5
-2742 1 1 48 -0.16384000000000000000e5
-2742 1 2 49 -0.16384000000000000000e5
-2742 1 3 50 -0.32768000000000000000e5
-2742 1 11 42 0.65536000000000000000e5
-2742 1 12 43 0.13107200000000000000e6
-2742 1 17 48 -0.13107200000000000000e6
-2742 1 23 38 -0.16384000000000000000e5
-2742 1 47 50 -0.32768000000000000000e5
-2742 2 2 32 -0.16384000000000000000e5
-2742 2 8 22 0.65536000000000000000e5
-2742 2 12 26 -0.65536000000000000000e5
-2742 2 16 30 -0.32768000000000000000e5
-2742 2 21 35 0.32768000000000000000e5
-2742 2 29 35 -0.32768000000000000000e5
-2742 3 2 31 -0.65536000000000000000e5
-2742 3 14 27 -0.13107200000000000000e6
-2742 3 17 30 -0.32768000000000000000e5
-2742 3 20 33 -0.32768000000000000000e5
-2742 3 22 35 0.32768000000000000000e5
-2742 3 29 34 -0.65536000000000000000e5
-2742 3 30 32 0.32768000000000000000e5
-2742 4 4 16 -0.65536000000000000000e5
-2743 3 22 35 -0.32768000000000000000e5
-2743 3 30 33 0.32768000000000000000e5
-2744 1 43 50 -0.32768000000000000000e5
-2744 1 50 51 0.32768000000000000000e5
-2744 3 30 34 0.32768000000000000000e5
-2745 3 25 34 -0.16384000000000000000e5
-2745 3 31 31 0.32768000000000000000e5
-2746 3 29 34 -0.32768000000000000000e5
-2746 3 31 32 0.32768000000000000000e5
-2747 1 43 50 -0.32768000000000000000e5
-2747 1 50 51 0.32768000000000000000e5
-2747 3 31 33 0.32768000000000000000e5
-2748 1 44 51 -0.32768000000000000000e5
-2748 1 46 53 0.32768000000000000000e5
-2748 3 31 34 0.32768000000000000000e5
-2749 1 50 51 -0.32768000000000000000e5
-2749 1 52 53 0.32768000000000000000e5
-2749 3 31 35 0.32768000000000000000e5
-2750 1 37 56 0.16384000000000000000e5
-2750 1 38 53 -0.16384000000000000000e5
-2750 3 32 32 0.32768000000000000000e5
-2751 1 1 48 0.16384000000000000000e5
-2751 1 2 49 0.16384000000000000000e5
-2751 1 3 50 0.32768000000000000000e5
-2751 1 11 42 -0.65536000000000000000e5
-2751 1 12 43 -0.13107200000000000000e6
-2751 1 17 48 0.13107200000000000000e6
-2751 1 23 38 0.16384000000000000000e5
-2751 1 24 55 -0.32768000000000000000e5
-2751 1 41 56 0.32768000000000000000e5
-2751 1 47 50 0.32768000000000000000e5
-2751 2 2 32 0.16384000000000000000e5
-2751 2 8 22 -0.65536000000000000000e5
-2751 2 12 26 0.65536000000000000000e5
-2751 2 16 30 0.32768000000000000000e5
-2751 2 21 35 -0.32768000000000000000e5
-2751 2 29 35 0.32768000000000000000e5
-2751 3 2 31 0.65536000000000000000e5
-2751 3 14 27 0.13107200000000000000e6
-2751 3 17 30 0.32768000000000000000e5
-2751 3 20 33 0.32768000000000000000e5
-2751 3 22 35 -0.32768000000000000000e5
-2751 3 29 34 0.65536000000000000000e5
-2751 3 32 34 0.32768000000000000000e5
-2751 4 4 16 0.65536000000000000000e5
-2752 1 1 48 0.32768000000000000000e5
-2752 1 2 49 0.32768000000000000000e5
-2752 1 3 50 0.65536000000000000000e5
-2752 1 11 42 -0.13107200000000000000e6
-2752 1 12 43 -0.26214400000000000000e6
-2752 1 17 48 0.26214400000000000000e6
-2752 1 23 38 0.32768000000000000000e5
-2752 1 24 55 -0.65536000000000000000e5
-2752 1 28 43 0.13107200000000000000e6
-2752 1 47 54 -0.32768000000000000000e5
-2752 1 49 56 -0.32768000000000000000e5
-2752 1 53 54 -0.32768000000000000000e5
-2752 2 2 32 0.32768000000000000000e5
-2752 2 8 22 -0.13107200000000000000e6
-2752 2 12 26 0.13107200000000000000e6
-2752 2 16 30 0.65536000000000000000e5
-2752 2 21 35 -0.65536000000000000000e5
-2752 2 35 35 -0.65536000000000000000e5
-2752 3 2 31 0.13107200000000000000e6
-2752 3 14 27 0.26214400000000000000e6
-2752 3 17 30 0.65536000000000000000e5
-2752 3 18 31 -0.13107200000000000000e6
-2752 3 20 33 0.65536000000000000000e5
-2752 3 21 34 -0.13107200000000000000e6
-2752 3 22 35 -0.65536000000000000000e5
-2752 3 30 35 -0.65536000000000000000e5
-2752 3 32 35 0.32768000000000000000e5
-2752 3 34 35 -0.65536000000000000000e5
-2752 4 4 16 0.13107200000000000000e6
-2753 1 1 48 0.16384000000000000000e5
-2753 1 2 49 0.16384000000000000000e5
-2753 1 3 50 0.32768000000000000000e5
-2753 1 11 42 -0.65536000000000000000e5
-2753 1 12 43 -0.13107200000000000000e6
-2753 1 17 48 0.13107200000000000000e6
-2753 1 23 38 0.16384000000000000000e5
-2753 1 24 55 -0.32768000000000000000e5
-2753 1 37 56 -0.16384000000000000000e5
-2753 1 38 53 0.16384000000000000000e5
-2753 1 41 56 0.32768000000000000000e5
-2753 1 47 50 0.32768000000000000000e5
-2753 2 2 32 0.16384000000000000000e5
-2753 2 8 22 -0.65536000000000000000e5
-2753 2 12 26 0.65536000000000000000e5
-2753 2 16 30 0.32768000000000000000e5
-2753 2 21 35 -0.32768000000000000000e5
-2753 2 29 35 0.32768000000000000000e5
-2753 3 2 31 0.65536000000000000000e5
-2753 3 14 27 0.13107200000000000000e6
-2753 3 17 30 0.32768000000000000000e5
-2753 3 20 33 0.32768000000000000000e5
-2753 3 22 35 -0.32768000000000000000e5
-2753 3 29 34 0.65536000000000000000e5
-2753 3 32 33 0.16384000000000000000e5
-2753 3 33 33 0.32768000000000000000e5
-2753 4 4 16 0.65536000000000000000e5
-2753 4 20 20 0.32768000000000000000e5
-2754 3 30 35 -0.32768000000000000000e5
-2754 3 33 34 0.32768000000000000000e5
-2755 1 1 48 -0.32768000000000000000e5
-2755 1 2 49 -0.32768000000000000000e5
-2755 1 3 50 -0.65536000000000000000e5
-2755 1 11 42 0.13107200000000000000e6
-2755 1 12 43 0.26214400000000000000e6
-2755 1 17 48 -0.26214400000000000000e6
-2755 1 23 38 -0.32768000000000000000e5
-2755 1 24 55 0.65536000000000000000e5
-2755 1 25 56 -0.32768000000000000000e5
-2755 1 37 56 0.32768000000000000000e5
-2755 1 38 53 -0.32768000000000000000e5
-2755 1 41 56 -0.65536000000000000000e5
-2755 1 47 50 -0.65536000000000000000e5
-2755 1 53 54 0.32768000000000000000e5
-2755 2 2 32 -0.32768000000000000000e5
-2755 2 8 22 0.13107200000000000000e6
-2755 2 12 26 -0.13107200000000000000e6
-2755 2 16 30 -0.65536000000000000000e5
-2755 2 21 35 0.65536000000000000000e5
-2755 2 29 35 -0.65536000000000000000e5
-2755 3 2 31 -0.13107200000000000000e6
-2755 3 14 27 -0.26214400000000000000e6
-2755 3 17 30 -0.65536000000000000000e5
-2755 3 20 33 -0.65536000000000000000e5
-2755 3 22 35 0.65536000000000000000e5
-2755 3 29 34 -0.13107200000000000000e6
-2755 3 32 33 -0.32768000000000000000e5
-2755 3 33 35 0.32768000000000000000e5
-2755 4 4 16 -0.13107200000000000000e6
-2755 4 20 20 -0.65536000000000000000e5
-2756 1 50 51 -0.16384000000000000000e5
-2756 1 52 53 0.16384000000000000000e5
-2756 3 34 34 0.32768000000000000000e5
-2757 1 53 54 -0.16384000000000000000e5
-2757 1 53 56 0.16384000000000000000e5
-2757 3 35 35 0.32768000000000000000e5
-2758 2 1 3 -0.32768000000000000000e5
-2758 2 2 16 0.32768000000000000000e5
-2758 4 1 2 0.32768000000000000000e5
-2759 4 1 3 0.32768000000000000000e5
-2759 4 2 2 -0.65536000000000000000e5
-2760 2 2 4 -0.32768000000000000000e5
-2760 2 3 17 0.32768000000000000000e5
-2760 4 1 4 0.32768000000000000000e5
-2761 1 1 40 0.16384000000000000000e5
-2761 1 1 48 -0.16384000000000000000e5
-2761 1 2 5 -0.16384000000000000000e5
-2761 1 2 9 0.32768000000000000000e5
-2761 1 2 17 -0.13107200000000000000e6
-2761 1 2 33 -0.65536000000000000000e5
-2761 1 2 49 -0.16384000000000000000e5
-2761 1 3 18 -0.26214400000000000000e6
-2761 1 4 19 -0.26214400000000000000e6
-2761 1 4 35 -0.26214400000000000000e6
-2761 1 6 13 0.65536000000000000000e5
-2761 1 8 23 -0.65536000000000000000e5
-2761 1 8 39 -0.32768000000000000000e5
-2761 1 11 42 0.65536000000000000000e5
-2761 1 18 25 -0.13107200000000000000e6
-2761 1 20 27 0.52428800000000000000e6
-2761 1 23 38 -0.16384000000000000000e5
-2761 2 1 3 0.16384000000000000000e5
-2761 2 2 8 -0.32768000000000000000e5
-2761 2 2 16 -0.16384000000000000000e5
-2761 2 2 32 -0.16384000000000000000e5
-2761 2 4 10 -0.65536000000000000000e5
-2761 2 6 12 -0.13107200000000000000e6
-2761 2 8 22 0.65536000000000000000e5
-2761 2 9 23 -0.13107200000000000000e6
-2761 2 10 24 -0.26214400000000000000e6
-2761 3 1 2 0.16384000000000000000e5
-2761 3 1 30 -0.32768000000000000000e5
-2761 3 2 15 0.26214400000000000000e6
-2761 3 3 8 -0.32768000000000000000e5
-2761 3 3 16 -0.16384000000000000000e5
-2761 3 4 17 -0.16384000000000000000e5
-2761 3 6 7 -0.65536000000000000000e5
-2761 3 6 19 -0.32768000000000000000e5
-2761 3 8 13 0.26214400000000000000e6
-2761 3 9 22 0.65536000000000000000e5
-2761 4 1 6 0.32768000000000000000e5
-2761 4 1 13 -0.16384000000000000000e5
-2761 4 2 2 -0.32768000000000000000e5
-2761 4 4 8 0.65536000000000000000e5
-2762 1 1 48 -0.16384000000000000000e5
-2762 1 2 33 -0.65536000000000000000e5
-2762 1 2 49 -0.16384000000000000000e5
-2762 1 3 34 0.13107200000000000000e6
-2762 1 7 38 -0.32768000000000000000e5
-2762 1 8 39 -0.32768000000000000000e5
-2762 1 10 41 -0.65536000000000000000e5
-2762 1 23 38 -0.16384000000000000000e5
-2762 2 2 8 -0.32768000000000000000e5
-2762 2 2 32 -0.16384000000000000000e5
-2762 2 7 21 -0.65536000000000000000e5
-2762 3 1 30 -0.32768000000000000000e5
-2762 3 7 20 -0.65536000000000000000e5
-2762 3 8 21 -0.65536000000000000000e5
-2762 4 1 7 0.32768000000000000000e5
-2762 4 2 14 0.32768000000000000000e5
-2763 4 1 8 0.32768000000000000000e5
-2763 4 5 5 -0.65536000000000000000e5
-2764 1 2 17 -0.65536000000000000000e5
-2764 1 3 18 -0.65536000000000000000e5
-2764 1 3 34 -0.65536000000000000000e5
-2764 1 4 19 -0.13107200000000000000e6
-2764 1 20 27 0.26214400000000000000e6
-2764 1 28 35 -0.13107200000000000000e6
-2764 2 4 10 -0.32768000000000000000e5
-2764 2 6 12 -0.65536000000000000000e5
-2764 2 7 21 0.32768000000000000000e5
-2764 2 10 24 -0.13107200000000000000e6
-2764 3 1 14 -0.65536000000000000000e5
-2764 3 2 15 0.13107200000000000000e6
-2764 3 5 10 -0.32768000000000000000e5
-2764 3 6 7 0.32768000000000000000e5
-2764 3 8 13 0.13107200000000000000e6
-2764 3 11 24 -0.13107200000000000000e6
-2764 4 1 9 0.32768000000000000000e5
-2765 1 1 8 0.81920000000000000000e4
-2765 1 1 40 0.40960000000000000000e4
-2765 1 2 5 -0.40960000000000000000e4
-2765 1 2 9 0.16384000000000000000e5
-2765 1 2 17 -0.65536000000000000000e5
-2765 1 3 18 -0.98304000000000000000e5
-2765 1 3 34 -0.65536000000000000000e5
-2765 1 4 19 -0.13107200000000000000e6
-2765 1 4 35 -0.65536000000000000000e5
-2765 1 6 13 0.16384000000000000000e5
-2765 1 7 22 -0.81920000000000000000e4
-2765 1 7 38 0.81920000000000000000e4
-2765 1 8 23 -0.24576000000000000000e5
-2765 1 10 41 0.16384000000000000000e5
-2765 1 11 42 0.16384000000000000000e5
-2765 1 13 16 -0.13107200000000000000e6
-2765 1 16 31 0.13107200000000000000e6
-2765 1 18 25 -0.32768000000000000000e5
-2765 1 20 27 0.26214400000000000000e6
-2765 1 28 35 -0.65536000000000000000e5
-2765 2 1 3 0.40960000000000000000e4
-2765 2 2 16 -0.40960000000000000000e4
-2765 2 4 10 -0.16384000000000000000e5
-2765 2 6 12 -0.65536000000000000000e5
-2765 2 7 21 0.16384000000000000000e5
-2765 2 8 22 0.16384000000000000000e5
-2765 2 9 23 -0.32768000000000000000e5
-2765 2 10 24 -0.13107200000000000000e6
-2765 3 1 2 0.40960000000000000000e4
-2765 3 1 14 0.32768000000000000000e5
-2765 3 2 15 0.19660800000000000000e6
-2765 3 3 16 -0.40960000000000000000e4
-2765 3 4 17 -0.40960000000000000000e4
-2765 3 6 7 0.16384000000000000000e5
-2765 3 6 19 -0.81920000000000000000e4
-2765 3 7 20 0.16384000000000000000e5
-2765 3 8 13 0.19660800000000000000e6
-2765 3 8 21 0.16384000000000000000e5
-2765 3 9 22 0.16384000000000000000e5
-2765 3 11 24 -0.65536000000000000000e5
-2765 4 1 5 0.81920000000000000000e4
-2765 4 1 10 0.32768000000000000000e5
-2765 4 1 13 -0.40960000000000000000e4
-2765 4 2 2 -0.81920000000000000000e4
-2765 4 2 14 -0.81920000000000000000e4
-2765 4 4 8 0.16384000000000000000e5
-2765 4 5 5 0.32768000000000000000e5
-2765 4 8 8 0.13107200000000000000e6
-2766 2 2 16 -0.32768000000000000000e5
-2766 2 16 16 0.65536000000000000000e5
-2766 4 1 11 0.32768000000000000000e5
-2767 1 1 24 0.32768000000000000000e5
-2767 1 1 40 0.32768000000000000000e5
-2767 1 2 33 0.13107200000000000000e6
-2767 1 2 49 0.32768000000000000000e5
-2767 1 3 34 -0.26214400000000000000e6
-2767 1 3 50 -0.65536000000000000000e5
-2767 1 5 52 0.13107200000000000000e6
-2767 1 6 37 0.32768000000000000000e5
-2767 1 7 38 0.13107200000000000000e6
-2767 1 8 23 -0.13107200000000000000e6
-2767 1 10 41 0.13107200000000000000e6
-2767 1 11 42 -0.13107200000000000000e6
-2767 1 12 43 -0.26214400000000000000e6
-2767 1 16 47 0.26214400000000000000e6
-2767 1 22 37 -0.32768000000000000000e5
-2767 1 28 43 0.13107200000000000000e6
-2767 2 2 32 0.32768000000000000000e5
-2767 2 3 17 -0.32768000000000000000e5
-2767 2 4 26 0.32768000000000000000e5
-2767 2 7 21 0.13107200000000000000e6
-2767 2 10 32 -0.13107200000000000000e6
-2767 2 12 26 0.13107200000000000000e6
-2767 3 1 30 0.13107200000000000000e6
-2767 3 2 31 0.13107200000000000000e6
-2767 3 4 17 -0.32768000000000000000e5
-2767 3 6 19 -0.65536000000000000000e5
-2767 3 7 20 0.26214400000000000000e6
-2767 3 8 21 0.13107200000000000000e6
-2767 3 14 27 0.26214400000000000000e6
-2767 4 1 12 0.32768000000000000000e5
-2767 4 2 14 -0.65536000000000000000e5
-2767 4 5 17 0.65536000000000000000e5
-2767 4 7 19 -0.13107200000000000000e6
-2767 4 11 11 0.65536000000000000000e5
-2768 1 1 24 0.16384000000000000000e5
-2768 1 1 32 -0.65536000000000000000e5
-2768 1 1 40 0.16384000000000000000e5
-2768 1 2 17 0.13107200000000000000e6
-2768 1 2 33 0.13107200000000000000e6
-2768 1 2 49 0.16384000000000000000e5
-2768 1 3 34 -0.26214400000000000000e6
-2768 1 3 50 -0.32768000000000000000e5
-2768 1 5 52 0.65536000000000000000e5
-2768 1 6 37 0.16384000000000000000e5
-2768 1 10 41 0.13107200000000000000e6
-2768 1 11 42 -0.13107200000000000000e6
-2768 1 12 43 -0.26214400000000000000e6
-2768 1 16 47 0.13107200000000000000e6
-2768 1 17 48 0.13107200000000000000e6
-2768 1 22 37 -0.16384000000000000000e5
-2768 1 28 43 0.65536000000000000000e5
-2768 2 1 31 -0.65536000000000000000e5
-2768 2 2 16 0.16384000000000000000e5
-2768 2 2 32 0.16384000000000000000e5
-2768 2 3 17 -0.16384000000000000000e5
-2768 2 4 26 0.16384000000000000000e5
-2768 2 7 21 0.13107200000000000000e6
-2768 2 8 22 -0.65536000000000000000e5
-2768 2 10 32 -0.65536000000000000000e5
-2768 2 12 26 0.13107200000000000000e6
-2768 2 16 16 -0.32768000000000000000e5
-2768 3 1 14 -0.13107200000000000000e6
-2768 3 1 16 0.16384000000000000000e5
-2768 3 1 30 0.65536000000000000000e5
-2768 3 2 31 0.65536000000000000000e5
-2768 3 3 16 0.16384000000000000000e5
-2768 3 6 19 -0.32768000000000000000e5
-2768 3 6 23 -0.13107200000000000000e6
-2768 3 7 20 0.19660800000000000000e6
-2768 3 8 21 0.13107200000000000000e6
-2768 3 14 27 0.26214400000000000000e6
-2768 4 1 13 0.16384000000000000000e5
-2768 4 1 14 0.32768000000000000000e5
-2768 4 2 14 -0.32768000000000000000e5
-2768 4 4 16 0.65536000000000000000e5
-2768 4 5 17 0.32768000000000000000e5
-2768 4 7 19 -0.65536000000000000000e5
-2768 4 11 11 0.32768000000000000000e5
-2769 4 1 15 0.32768000000000000000e5
-2769 4 2 14 -0.32768000000000000000e5
-2770 1 1 32 0.32768000000000000000e5
-2770 1 2 17 -0.65536000000000000000e5
-2770 1 3 34 0.65536000000000000000e5
-2770 1 10 41 -0.32768000000000000000e5
-2770 2 1 31 0.32768000000000000000e5
-2770 2 7 21 -0.32768000000000000000e5
-2770 3 1 14 0.65536000000000000000e5
-2770 3 8 21 -0.32768000000000000000e5
-2770 4 1 16 0.32768000000000000000e5
-2771 4 1 17 0.32768000000000000000e5
-2771 4 11 11 -0.65536000000000000000e5
-2772 2 2 32 0.32768000000000000000e5
-2772 2 3 17 -0.32768000000000000000e5
-2772 4 1 13 0.32768000000000000000e5
-2772 4 1 18 0.32768000000000000000e5
-2773 4 1 19 0.32768000000000000000e5
-2773 4 5 17 -0.32768000000000000000e5
-2774 2 1 35 0.32768000000000000000e5
-2774 2 2 32 -0.32768000000000000000e5
-2774 4 1 20 0.32768000000000000000e5
-2775 2 2 4 -0.32768000000000000000e5
-2775 2 3 17 0.32768000000000000000e5
-2775 4 2 3 0.32768000000000000000e5
-2776 1 1 40 -0.32768000000000000000e5
-2776 1 1 48 0.32768000000000000000e5
-2776 1 2 5 0.32768000000000000000e5
-2776 1 2 49 0.32768000000000000000e5
-2776 1 5 52 -0.13107200000000000000e6
-2776 1 7 38 -0.65536000000000000000e5
-2776 1 8 23 0.65536000000000000000e5
-2776 1 11 42 -0.13107200000000000000e6
-2776 1 12 43 -0.26214400000000000000e6
-2776 1 17 48 0.52428800000000000000e6
-2776 1 23 38 0.32768000000000000000e5
-2776 1 26 41 -0.65536000000000000000e5
-2776 1 28 43 -0.13107200000000000000e6
-2776 2 2 32 0.32768000000000000000e5
-2776 2 3 5 -0.32768000000000000000e5
-2776 2 3 9 -0.65536000000000000000e5
-2776 2 4 18 0.32768000000000000000e5
-2776 2 8 22 -0.26214400000000000000e6
-2776 2 12 26 0.13107200000000000000e6
-2776 2 16 30 0.65536000000000000000e5
-2776 3 2 31 0.13107200000000000000e6
-2776 3 3 8 -0.13107200000000000000e6
-2776 3 3 16 0.32768000000000000000e5
-2776 3 4 5 -0.32768000000000000000e5
-2776 3 4 9 -0.65536000000000000000e5
-2776 3 4 17 0.32768000000000000000e5
-2776 3 5 10 0.13107200000000000000e6
-2776 3 6 19 0.65536000000000000000e5
-2776 3 7 20 -0.13107200000000000000e6
-2776 3 14 27 0.26214400000000000000e6
-2776 4 1 13 0.32768000000000000000e5
-2776 4 2 4 0.32768000000000000000e5
-2776 4 2 14 0.65536000000000000000e5
-2776 4 3 15 0.65536000000000000000e5
-2776 4 4 16 0.26214400000000000000e6
-2776 4 6 18 0.65536000000000000000e5
-2776 4 7 19 0.13107200000000000000e6
-2777 1 1 40 0.16384000000000000000e5
-2777 1 1 48 -0.16384000000000000000e5
-2777 1 2 5 -0.16384000000000000000e5
-2777 1 2 9 0.32768000000000000000e5
-2777 1 2 17 -0.13107200000000000000e6
-2777 1 2 33 -0.65536000000000000000e5
-2777 1 2 49 -0.16384000000000000000e5
-2777 1 3 18 -0.26214400000000000000e6
-2777 1 4 19 -0.26214400000000000000e6
-2777 1 4 35 -0.26214400000000000000e6
-2777 1 6 13 0.65536000000000000000e5
-2777 1 8 23 -0.65536000000000000000e5
-2777 1 8 39 -0.32768000000000000000e5
-2777 1 11 42 0.65536000000000000000e5
-2777 1 18 25 -0.13107200000000000000e6
-2777 1 20 27 0.52428800000000000000e6
-2777 1 23 38 -0.16384000000000000000e5
-2777 2 1 3 0.16384000000000000000e5
-2777 2 2 8 -0.32768000000000000000e5
-2777 2 2 16 -0.16384000000000000000e5
-2777 2 2 32 -0.16384000000000000000e5
-2777 2 4 10 -0.65536000000000000000e5
-2777 2 6 12 -0.13107200000000000000e6
-2777 2 8 22 0.65536000000000000000e5
-2777 2 9 23 -0.13107200000000000000e6
-2777 2 10 24 -0.26214400000000000000e6
-2777 3 1 2 0.16384000000000000000e5
-2777 3 1 30 -0.32768000000000000000e5
-2777 3 2 15 0.26214400000000000000e6
-2777 3 3 8 -0.32768000000000000000e5
-2777 3 3 16 -0.16384000000000000000e5
-2777 3 4 17 -0.16384000000000000000e5
-2777 3 6 7 -0.65536000000000000000e5
-2777 3 6 19 -0.32768000000000000000e5
-2777 3 8 13 0.26214400000000000000e6
-2777 3 9 22 0.65536000000000000000e5
-2777 4 1 13 -0.16384000000000000000e5
-2777 4 2 2 -0.32768000000000000000e5
-2777 4 2 5 0.32768000000000000000e5
-2777 4 4 8 0.65536000000000000000e5
-2778 1 1 48 -0.16384000000000000000e5
-2778 1 2 33 -0.65536000000000000000e5
-2778 1 2 49 -0.16384000000000000000e5
-2778 1 3 34 0.13107200000000000000e6
-2778 1 7 38 -0.32768000000000000000e5
-2778 1 8 39 -0.32768000000000000000e5
-2778 1 10 41 -0.65536000000000000000e5
-2778 1 23 38 -0.16384000000000000000e5
-2778 2 2 8 -0.32768000000000000000e5
-2778 2 2 32 -0.16384000000000000000e5
-2778 2 7 21 -0.65536000000000000000e5
-2778 3 1 30 -0.32768000000000000000e5
-2778 3 7 20 -0.65536000000000000000e5
-2778 3 8 21 -0.65536000000000000000e5
-2778 4 2 6 0.32768000000000000000e5
-2778 4 2 14 0.32768000000000000000e5
-2779 1 2 9 -0.32768000000000000000e5
-2779 1 2 17 -0.13107200000000000000e6
-2779 1 2 33 -0.65536000000000000000e5
-2779 1 3 18 -0.39321600000000000000e6
-2779 1 4 19 -0.26214400000000000000e6
-2779 1 4 35 -0.52428800000000000000e6
-2779 1 5 52 -0.65536000000000000000e5
-2779 1 6 13 0.13107200000000000000e6
-2779 1 7 38 -0.32768000000000000000e5
-2779 1 8 23 0.32768000000000000000e5
-2779 1 8 39 -0.32768000000000000000e5
-2779 1 10 41 0.65536000000000000000e5
-2779 1 11 42 0.65536000000000000000e5
-2779 1 12 43 -0.13107200000000000000e6
-2779 1 17 48 0.26214400000000000000e6
-2779 1 18 25 -0.26214400000000000000e6
-2779 1 20 27 0.52428800000000000000e6
-2779 1 26 41 -0.32768000000000000000e5
-2779 1 28 35 0.26214400000000000000e6
-2779 1 28 43 -0.65536000000000000000e5
-2779 2 2 8 -0.32768000000000000000e5
-2779 2 3 9 -0.32768000000000000000e5
-2779 2 4 10 -0.65536000000000000000e5
-2779 2 6 12 -0.13107200000000000000e6
-2779 2 9 23 -0.26214400000000000000e6
-2779 2 10 24 -0.26214400000000000000e6
-2779 2 12 26 0.65536000000000000000e5
-2779 2 16 30 0.32768000000000000000e5
-2779 3 1 30 -0.32768000000000000000e5
-2779 3 2 15 0.26214400000000000000e6
-2779 3 2 31 0.65536000000000000000e5
-2779 3 3 8 -0.32768000000000000000e5
-2779 3 4 9 -0.32768000000000000000e5
-2779 3 5 10 0.13107200000000000000e6
-2779 3 7 20 -0.65536000000000000000e5
-2779 3 8 13 0.26214400000000000000e6
-2779 3 8 21 0.65536000000000000000e5
-2779 3 9 22 0.13107200000000000000e6
-2779 3 11 24 0.26214400000000000000e6
-2779 3 14 27 0.13107200000000000000e6
-2779 4 2 7 0.32768000000000000000e5
-2779 4 2 14 0.32768000000000000000e5
-2779 4 3 15 0.32768000000000000000e5
-2779 4 4 8 0.13107200000000000000e6
-2779 4 4 16 0.13107200000000000000e6
-2779 4 6 18 0.32768000000000000000e5
-2779 4 7 19 0.65536000000000000000e5
-2780 1 2 17 -0.65536000000000000000e5
-2780 1 3 18 -0.65536000000000000000e5
-2780 1 3 34 -0.65536000000000000000e5
-2780 1 4 19 -0.13107200000000000000e6
-2780 1 20 27 0.26214400000000000000e6
-2780 1 28 35 -0.13107200000000000000e6
-2780 2 4 10 -0.32768000000000000000e5
-2780 2 6 12 -0.65536000000000000000e5
-2780 2 7 21 0.32768000000000000000e5
-2780 2 10 24 -0.13107200000000000000e6
-2780 3 1 14 -0.65536000000000000000e5
-2780 3 2 15 0.13107200000000000000e6
-2780 3 5 10 -0.32768000000000000000e5
-2780 3 6 7 0.32768000000000000000e5
-2780 3 8 13 0.13107200000000000000e6
-2780 3 11 24 -0.13107200000000000000e6
-2780 4 2 8 0.32768000000000000000e5
-2781 2 4 10 -0.32768000000000000000e5
-2781 2 7 21 0.32768000000000000000e5
-2781 4 2 9 0.32768000000000000000e5
-2782 1 2 17 -0.32768000000000000000e5
-2782 1 3 34 -0.32768000000000000000e5
-2782 1 4 19 -0.65536000000000000000e5
-2782 1 4 35 0.32768000000000000000e5
-2782 1 18 25 0.32768000000000000000e5
-2782 1 20 27 0.13107200000000000000e6
-2782 1 28 35 -0.13107200000000000000e6
-2782 2 6 12 -0.32768000000000000000e5
-2782 2 9 23 0.32768000000000000000e5
-2782 2 10 24 -0.65536000000000000000e5
-2782 3 1 14 0.32768000000000000000e5
-2782 3 8 13 0.65536000000000000000e5
-2782 3 11 24 -0.13107200000000000000e6
-2782 4 2 10 0.32768000000000000000e5
-2783 1 1 24 0.32768000000000000000e5
-2783 1 1 40 0.32768000000000000000e5
-2783 1 2 33 0.13107200000000000000e6
-2783 1 2 49 0.32768000000000000000e5
-2783 1 3 34 -0.26214400000000000000e6
-2783 1 3 50 -0.65536000000000000000e5
-2783 1 5 52 0.13107200000000000000e6
-2783 1 6 37 0.32768000000000000000e5
-2783 1 7 38 0.13107200000000000000e6
-2783 1 8 23 -0.13107200000000000000e6
-2783 1 10 41 0.13107200000000000000e6
-2783 1 11 42 -0.13107200000000000000e6
-2783 1 12 43 -0.26214400000000000000e6
-2783 1 16 47 0.26214400000000000000e6
-2783 1 22 37 -0.32768000000000000000e5
-2783 1 28 43 0.13107200000000000000e6
-2783 2 2 32 0.32768000000000000000e5
-2783 2 3 17 -0.32768000000000000000e5
-2783 2 4 26 0.32768000000000000000e5
-2783 2 7 21 0.13107200000000000000e6
-2783 2 10 32 -0.13107200000000000000e6
-2783 2 12 26 0.13107200000000000000e6
-2783 3 1 30 0.13107200000000000000e6
-2783 3 2 31 0.13107200000000000000e6
-2783 3 4 17 -0.32768000000000000000e5
-2783 3 6 19 -0.65536000000000000000e5
-2783 3 7 20 0.26214400000000000000e6
-2783 3 8 21 0.13107200000000000000e6
-2783 3 14 27 0.26214400000000000000e6
-2783 4 2 11 0.32768000000000000000e5
-2783 4 2 14 -0.65536000000000000000e5
-2783 4 5 17 0.65536000000000000000e5
-2783 4 7 19 -0.13107200000000000000e6
-2783 4 11 11 0.65536000000000000000e5
-2784 4 1 13 -0.32768000000000000000e5
-2784 4 2 12 0.32768000000000000000e5
-2785 1 3 26 0.32768000000000000000e5
-2785 1 6 37 -0.32768000000000000000e5
-2785 1 7 38 0.65536000000000000000e5
-2785 1 8 23 -0.65536000000000000000e5
-2785 3 3 16 -0.32768000000000000000e5
-2785 3 6 19 -0.13107200000000000000e6
-2785 3 7 20 0.13107200000000000000e6
-2785 4 1 13 -0.32768000000000000000e5
-2785 4 2 13 0.32768000000000000000e5
-2785 4 2 14 -0.65536000000000000000e5
-2786 1 2 33 -0.65536000000000000000e5
-2786 1 7 38 0.32768000000000000000e5
-2786 1 8 23 -0.32768000000000000000e5
-2786 1 9 40 0.32768000000000000000e5
-2786 1 10 25 -0.32768000000000000000e5
-2786 1 11 42 0.65536000000000000000e5
-2786 1 12 43 0.13107200000000000000e6
-2786 1 17 48 -0.13107200000000000000e6
-2786 2 8 22 0.65536000000000000000e5
-2786 2 12 26 -0.65536000000000000000e5
-2786 3 6 19 -0.32768000000000000000e5
-2786 3 7 20 0.65536000000000000000e5
-2786 3 8 21 0.65536000000000000000e5
-2786 3 14 27 -0.13107200000000000000e6
-2786 4 2 14 -0.32768000000000000000e5
-2786 4 2 15 0.32768000000000000000e5
-2786 4 3 15 -0.32768000000000000000e5
-2786 4 4 16 -0.65536000000000000000e5
-2787 1 2 33 0.32768000000000000000e5
-2787 1 3 34 -0.65536000000000000000e5
-2787 1 11 42 -0.32768000000000000000e5
-2787 1 12 43 -0.65536000000000000000e5
-2787 1 16 47 0.65536000000000000000e5
-2787 1 17 48 0.65536000000000000000e5
-2787 2 8 22 -0.32768000000000000000e5
-2787 2 12 26 0.32768000000000000000e5
-2787 3 7 20 0.32768000000000000000e5
-2787 3 8 21 0.32768000000000000000e5
-2787 3 13 26 0.65536000000000000000e5
-2787 3 14 27 0.65536000000000000000e5
-2787 4 2 16 0.32768000000000000000e5
-2787 4 4 16 0.32768000000000000000e5
-2788 2 2 32 0.32768000000000000000e5
-2788 2 3 17 -0.32768000000000000000e5
-2788 4 1 13 0.32768000000000000000e5
-2788 4 2 17 0.32768000000000000000e5
-2789 1 2 49 -0.32768000000000000000e5
-2789 1 3 50 0.65536000000000000000e5
-2789 1 23 38 -0.32768000000000000000e5
-2789 1 24 39 -0.32768000000000000000e5
-2789 2 4 26 -0.32768000000000000000e5
-2789 4 2 18 0.32768000000000000000e5
-2790 1 5 52 0.65536000000000000000e5
-2790 1 9 40 -0.32768000000000000000e5
-2790 1 10 41 0.65536000000000000000e5
-2790 1 17 48 -0.13107200000000000000e6
-2790 1 26 41 0.32768000000000000000e5
-2790 1 28 43 0.65536000000000000000e5
-2790 2 8 22 0.65536000000000000000e5
-2790 3 1 30 0.32768000000000000000e5
-2790 3 2 31 -0.65536000000000000000e5
-2790 4 2 19 0.32768000000000000000e5
-2790 4 4 16 -0.65536000000000000000e5
-2790 4 6 18 -0.32768000000000000000e5
-2790 4 7 19 -0.65536000000000000000e5
-2791 1 2 49 0.32768000000000000000e5
-2791 1 3 50 -0.65536000000000000000e5
-2791 1 23 38 0.32768000000000000000e5
-2791 1 24 39 0.32768000000000000000e5
-2791 2 26 32 0.32768000000000000000e5
-2791 4 2 20 0.32768000000000000000e5
-2791 4 17 17 0.65536000000000000000e5
-2792 1 1 40 -0.16384000000000000000e5
-2792 1 1 48 0.16384000000000000000e5
-2792 1 2 5 0.16384000000000000000e5
-2792 1 2 49 0.16384000000000000000e5
-2792 1 5 52 -0.65536000000000000000e5
-2792 1 7 38 -0.32768000000000000000e5
-2792 1 8 23 0.32768000000000000000e5
-2792 1 11 42 -0.65536000000000000000e5
-2792 1 12 43 -0.13107200000000000000e6
-2792 1 17 48 0.26214400000000000000e6
-2792 1 23 38 0.16384000000000000000e5
-2792 1 26 41 -0.32768000000000000000e5
-2792 1 28 43 -0.65536000000000000000e5
-2792 2 2 32 0.16384000000000000000e5
-2792 2 3 5 -0.16384000000000000000e5
-2792 2 3 9 -0.32768000000000000000e5
-2792 2 4 18 0.16384000000000000000e5
-2792 2 8 22 -0.13107200000000000000e6
-2792 2 12 26 0.65536000000000000000e5
-2792 2 16 30 0.32768000000000000000e5
-2792 3 2 31 0.65536000000000000000e5
-2792 3 3 8 -0.65536000000000000000e5
-2792 3 3 16 0.16384000000000000000e5
-2792 3 4 5 -0.16384000000000000000e5
-2792 3 4 9 -0.32768000000000000000e5
-2792 3 4 17 0.16384000000000000000e5
-2792 3 5 10 0.65536000000000000000e5
-2792 3 6 19 0.32768000000000000000e5
-2792 3 7 20 -0.65536000000000000000e5
-2792 3 14 27 0.13107200000000000000e6
-2792 4 1 13 0.16384000000000000000e5
-2792 4 2 14 0.32768000000000000000e5
-2792 4 3 3 0.32768000000000000000e5
-2792 4 3 15 0.32768000000000000000e5
-2792 4 4 16 0.13107200000000000000e6
-2792 4 6 18 0.32768000000000000000e5
-2792 4 7 19 0.65536000000000000000e5
-2793 2 3 5 -0.32768000000000000000e5
-2793 2 4 18 0.32768000000000000000e5
-2793 4 3 4 0.32768000000000000000e5
-2794 1 1 48 -0.16384000000000000000e5
-2794 1 2 33 -0.65536000000000000000e5
-2794 1 2 49 -0.16384000000000000000e5
-2794 1 3 34 0.13107200000000000000e6
-2794 1 7 38 -0.32768000000000000000e5
-2794 1 8 39 -0.32768000000000000000e5
-2794 1 10 41 -0.65536000000000000000e5
-2794 1 23 38 -0.16384000000000000000e5
-2794 2 2 8 -0.32768000000000000000e5
-2794 2 2 32 -0.16384000000000000000e5
-2794 2 7 21 -0.65536000000000000000e5
-2794 3 1 30 -0.32768000000000000000e5
-2794 3 7 20 -0.65536000000000000000e5
-2794 3 8 21 -0.65536000000000000000e5
-2794 4 2 14 0.32768000000000000000e5
-2794 4 3 5 0.32768000000000000000e5
-2795 1 2 9 -0.32768000000000000000e5
-2795 1 2 17 -0.13107200000000000000e6
-2795 1 2 33 -0.65536000000000000000e5
-2795 1 3 18 -0.39321600000000000000e6
-2795 1 4 19 -0.26214400000000000000e6
-2795 1 4 35 -0.52428800000000000000e6
-2795 1 5 52 -0.65536000000000000000e5
-2795 1 6 13 0.13107200000000000000e6
-2795 1 7 38 -0.32768000000000000000e5
-2795 1 8 23 0.32768000000000000000e5
-2795 1 8 39 -0.32768000000000000000e5
-2795 1 10 41 0.65536000000000000000e5
-2795 1 11 42 0.65536000000000000000e5
-2795 1 12 43 -0.13107200000000000000e6
-2795 1 17 48 0.26214400000000000000e6
-2795 1 18 25 -0.26214400000000000000e6
-2795 1 20 27 0.52428800000000000000e6
-2795 1 26 41 -0.32768000000000000000e5
-2795 1 28 35 0.26214400000000000000e6
-2795 1 28 43 -0.65536000000000000000e5
-2795 2 2 8 -0.32768000000000000000e5
-2795 2 3 9 -0.32768000000000000000e5
-2795 2 4 10 -0.65536000000000000000e5
-2795 2 6 12 -0.13107200000000000000e6
-2795 2 9 23 -0.26214400000000000000e6
-2795 2 10 24 -0.26214400000000000000e6
-2795 2 12 26 0.65536000000000000000e5
-2795 2 16 30 0.32768000000000000000e5
-2795 3 1 30 -0.32768000000000000000e5
-2795 3 2 15 0.26214400000000000000e6
-2795 3 2 31 0.65536000000000000000e5
-2795 3 3 8 -0.32768000000000000000e5
-2795 3 4 9 -0.32768000000000000000e5
-2795 3 5 10 0.13107200000000000000e6
-2795 3 7 20 -0.65536000000000000000e5
-2795 3 8 13 0.26214400000000000000e6
-2795 3 8 21 0.65536000000000000000e5
-2795 3 9 22 0.13107200000000000000e6
-2795 3 11 24 0.26214400000000000000e6
-2795 3 14 27 0.13107200000000000000e6
-2795 4 2 14 0.32768000000000000000e5
-2795 4 3 6 0.32768000000000000000e5
-2795 4 3 15 0.32768000000000000000e5
-2795 4 4 8 0.13107200000000000000e6
-2795 4 4 16 0.13107200000000000000e6
-2795 4 6 18 0.32768000000000000000e5
-2795 4 7 19 0.65536000000000000000e5
-2796 1 1 48 0.16384000000000000000e5
-2796 1 2 49 0.16384000000000000000e5
-2796 1 5 52 -0.65536000000000000000e5
-2796 1 11 42 -0.65536000000000000000e5
-2796 1 12 43 -0.13107200000000000000e6
-2796 1 17 48 0.26214400000000000000e6
-2796 1 23 38 0.16384000000000000000e5
-2796 1 26 41 -0.32768000000000000000e5
-2796 1 28 43 -0.65536000000000000000e5
-2796 2 2 32 0.16384000000000000000e5
-2796 2 3 9 -0.32768000000000000000e5
-2796 2 8 22 -0.13107200000000000000e6
-2796 2 12 26 0.65536000000000000000e5
-2796 2 16 30 0.32768000000000000000e5
-2796 3 2 31 0.65536000000000000000e5
-2796 3 14 27 0.13107200000000000000e6
-2796 4 3 7 0.32768000000000000000e5
-2796 4 3 15 0.32768000000000000000e5
-2796 4 4 16 0.13107200000000000000e6
-2796 4 6 18 0.32768000000000000000e5
-2796 4 7 19 0.65536000000000000000e5
-2797 2 4 10 -0.32768000000000000000e5
-2797 2 7 21 0.32768000000000000000e5
-2797 4 3 8 0.32768000000000000000e5
-2798 4 3 9 0.32768000000000000000e5
-2798 4 4 8 -0.32768000000000000000e5
-2799 1 2 17 -0.32768000000000000000e5
-2799 1 3 18 -0.32768000000000000000e5
-2799 1 3 34 -0.32768000000000000000e5
-2799 1 4 19 -0.65536000000000000000e5
-2799 1 10 17 0.65536000000000000000e5
-2799 1 11 14 -0.32768000000000000000e5
-2799 1 18 25 0.32768000000000000000e5
-2799 1 20 27 0.13107200000000000000e6
-2799 1 28 35 -0.13107200000000000000e6
-2799 2 6 12 -0.32768000000000000000e5
-2799 2 9 11 -0.32768000000000000000e5
-2799 2 9 23 0.32768000000000000000e5
-2799 2 10 24 -0.65536000000000000000e5
-2799 3 2 15 0.65536000000000000000e5
-2799 3 11 24 -0.13107200000000000000e6
-2799 4 3 10 0.32768000000000000000e5
-2800 4 1 13 -0.32768000000000000000e5
-2800 4 3 11 0.32768000000000000000e5
-2801 1 3 26 0.32768000000000000000e5
-2801 1 6 37 -0.32768000000000000000e5
-2801 1 7 38 0.65536000000000000000e5
-2801 1 8 23 -0.65536000000000000000e5
-2801 3 3 16 -0.32768000000000000000e5
-2801 3 6 19 -0.13107200000000000000e6
-2801 3 7 20 0.13107200000000000000e6
-2801 4 1 13 -0.32768000000000000000e5
-2801 4 2 14 -0.65536000000000000000e5
-2801 4 3 12 0.32768000000000000000e5
-2802 1 3 26 0.32768000000000000000e5
-2802 1 6 37 -0.32768000000000000000e5
-2802 1 9 40 -0.65536000000000000000e5
-2802 1 10 25 0.65536000000000000000e5
-2802 3 4 17 0.32768000000000000000e5
-2802 3 5 18 0.32768000000000000000e5
-2802 3 6 19 0.65536000000000000000e5
-2802 3 8 21 -0.13107200000000000000e6
-2802 4 3 13 0.32768000000000000000e5
-2802 4 3 15 0.65536000000000000000e5
-2803 1 2 33 -0.65536000000000000000e5
-2803 1 7 38 0.32768000000000000000e5
-2803 1 8 23 -0.32768000000000000000e5
-2803 1 9 40 0.32768000000000000000e5
-2803 1 10 25 -0.32768000000000000000e5
-2803 1 11 42 0.65536000000000000000e5
-2803 1 12 43 0.13107200000000000000e6
-2803 1 17 48 -0.13107200000000000000e6
-2803 2 8 22 0.65536000000000000000e5
-2803 2 12 26 -0.65536000000000000000e5
-2803 3 6 19 -0.32768000000000000000e5
-2803 3 7 20 0.65536000000000000000e5
-2803 3 8 21 0.65536000000000000000e5
-2803 3 14 27 -0.13107200000000000000e6
-2803 4 2 14 -0.32768000000000000000e5
-2803 4 3 14 0.32768000000000000000e5
-2803 4 3 15 -0.32768000000000000000e5
-2803 4 4 16 -0.65536000000000000000e5
-2804 1 2 33 0.32768000000000000000e5
-2804 1 4 35 0.13107200000000000000e6
-2804 1 11 42 -0.32768000000000000000e5
-2804 1 18 25 0.65536000000000000000e5
-2804 1 28 35 -0.13107200000000000000e6
-2804 2 8 22 -0.32768000000000000000e5
-2804 2 9 23 0.65536000000000000000e5
-2804 2 12 26 0.32768000000000000000e5
-2804 3 9 22 -0.32768000000000000000e5
-2804 3 11 24 -0.13107200000000000000e6
-2804 4 3 16 0.32768000000000000000e5
-2805 1 2 49 -0.32768000000000000000e5
-2805 1 3 50 0.65536000000000000000e5
-2805 1 23 38 -0.32768000000000000000e5
-2805 1 24 39 -0.32768000000000000000e5
-2805 2 4 26 -0.32768000000000000000e5
-2805 4 3 17 0.32768000000000000000e5
-2806 1 3 26 -0.32768000000000000000e5
-2806 1 6 37 0.32768000000000000000e5
-2806 1 9 40 0.65536000000000000000e5
-2806 1 10 25 -0.65536000000000000000e5
-2806 2 3 33 0.32768000000000000000e5
-2806 2 4 18 -0.32768000000000000000e5
-2806 3 4 17 -0.32768000000000000000e5
-2806 3 5 18 -0.32768000000000000000e5
-2806 3 6 19 -0.65536000000000000000e5
-2806 3 8 21 0.13107200000000000000e6
-2806 4 3 15 -0.65536000000000000000e5
-2806 4 3 18 0.32768000000000000000e5
-2807 4 3 19 0.32768000000000000000e5
-2807 4 6 18 -0.32768000000000000000e5
-2808 2 3 33 -0.32768000000000000000e5
-2808 2 18 32 0.32768000000000000000e5
-2808 4 3 20 0.32768000000000000000e5
-2809 1 2 9 -0.32768000000000000000e5
-2809 1 2 17 -0.13107200000000000000e6
-2809 1 2 33 -0.65536000000000000000e5
-2809 1 3 18 -0.39321600000000000000e6
-2809 1 4 19 -0.26214400000000000000e6
-2809 1 4 35 -0.52428800000000000000e6
-2809 1 5 52 -0.65536000000000000000e5
-2809 1 6 13 0.13107200000000000000e6
-2809 1 7 38 -0.32768000000000000000e5
-2809 1 8 23 0.32768000000000000000e5
-2809 1 8 39 -0.32768000000000000000e5
-2809 1 10 41 0.65536000000000000000e5
-2809 1 11 42 0.65536000000000000000e5
-2809 1 12 43 -0.13107200000000000000e6
-2809 1 17 48 0.26214400000000000000e6
-2809 1 18 25 -0.26214400000000000000e6
-2809 1 20 27 0.52428800000000000000e6
-2809 1 26 41 -0.32768000000000000000e5
-2809 1 28 35 0.26214400000000000000e6
-2809 1 28 43 -0.65536000000000000000e5
-2809 2 2 8 -0.32768000000000000000e5
-2809 2 3 9 -0.32768000000000000000e5
-2809 2 4 10 -0.65536000000000000000e5
-2809 2 6 12 -0.13107200000000000000e6
-2809 2 9 23 -0.26214400000000000000e6
-2809 2 10 24 -0.26214400000000000000e6
-2809 2 12 26 0.65536000000000000000e5
-2809 2 16 30 0.32768000000000000000e5
-2809 3 1 30 -0.32768000000000000000e5
-2809 3 2 15 0.26214400000000000000e6
-2809 3 2 31 0.65536000000000000000e5
-2809 3 3 8 -0.32768000000000000000e5
-2809 3 4 9 -0.32768000000000000000e5
-2809 3 5 10 0.13107200000000000000e6
-2809 3 7 20 -0.65536000000000000000e5
-2809 3 8 13 0.26214400000000000000e6
-2809 3 8 21 0.65536000000000000000e5
-2809 3 9 22 0.13107200000000000000e6
-2809 3 11 24 0.26214400000000000000e6
-2809 3 14 27 0.13107200000000000000e6
-2809 4 2 14 0.32768000000000000000e5
-2809 4 3 15 0.32768000000000000000e5
-2809 4 4 5 0.32768000000000000000e5
-2809 4 4 8 0.13107200000000000000e6
-2809 4 4 16 0.13107200000000000000e6
-2809 4 6 18 0.32768000000000000000e5
-2809 4 7 19 0.65536000000000000000e5
-2810 1 1 48 0.16384000000000000000e5
-2810 1 2 49 0.16384000000000000000e5
-2810 1 5 52 -0.65536000000000000000e5
-2810 1 11 42 -0.65536000000000000000e5
-2810 1 12 43 -0.13107200000000000000e6
-2810 1 17 48 0.26214400000000000000e6
-2810 1 23 38 0.16384000000000000000e5
-2810 1 26 41 -0.32768000000000000000e5
-2810 1 28 43 -0.65536000000000000000e5
-2810 2 2 32 0.16384000000000000000e5
-2810 2 3 9 -0.32768000000000000000e5
-2810 2 8 22 -0.13107200000000000000e6
-2810 2 12 26 0.65536000000000000000e5
-2810 2 16 30 0.32768000000000000000e5
-2810 3 2 31 0.65536000000000000000e5
-2810 3 14 27 0.13107200000000000000e6
-2810 4 3 15 0.32768000000000000000e5
-2810 4 4 6 0.32768000000000000000e5
-2810 4 4 16 0.13107200000000000000e6
-2810 4 6 18 0.32768000000000000000e5
-2810 4 7 19 0.65536000000000000000e5
-2811 1 1 48 0.16384000000000000000e5
-2811 1 2 49 0.16384000000000000000e5
-2811 1 3 18 -0.13107200000000000000e6
-2811 1 4 35 0.13107200000000000000e6
-2811 1 5 52 -0.65536000000000000000e5
-2811 1 6 11 -0.32768000000000000000e5
-2811 1 6 13 -0.13107200000000000000e6
-2811 1 6 29 -0.32768000000000000000e5
-2811 1 10 17 0.26214400000000000000e6
-2811 1 10 25 -0.32768000000000000000e5
-2811 1 10 41 -0.13107200000000000000e6
-2811 1 11 14 -0.13107200000000000000e6
-2811 1 11 42 -0.13107200000000000000e6
-2811 1 12 43 -0.13107200000000000000e6
-2811 1 17 48 0.26214400000000000000e6
-2811 1 23 38 0.16384000000000000000e5
-2811 1 26 41 -0.32768000000000000000e5
-2811 1 28 43 -0.65536000000000000000e5
-2811 2 2 32 0.16384000000000000000e5
-2811 2 3 9 -0.32768000000000000000e5
-2811 2 5 9 -0.32768000000000000000e5
-2811 2 5 11 -0.65536000000000000000e5
-2811 2 8 22 -0.19660800000000000000e6
-2811 2 9 11 -0.13107200000000000000e6
-2811 2 12 26 0.65536000000000000000e5
-2811 2 16 30 0.32768000000000000000e5
-2811 3 2 31 0.65536000000000000000e5
-2811 3 3 8 -0.32768000000000000000e5
-2811 3 4 9 -0.32768000000000000000e5
-2811 3 8 21 -0.13107200000000000000e6
-2811 3 9 22 -0.65536000000000000000e5
-2811 3 14 27 0.13107200000000000000e6
-2811 4 3 15 0.32768000000000000000e5
-2811 4 4 7 0.32768000000000000000e5
-2811 4 4 16 0.13107200000000000000e6
-2811 4 6 18 0.32768000000000000000e5
-2811 4 7 19 0.65536000000000000000e5
-2812 2 5 11 -0.32768000000000000000e5
-2812 2 8 22 0.32768000000000000000e5
-2812 4 4 9 0.32768000000000000000e5
-2813 2 9 11 -0.32768000000000000000e5
-2813 2 9 23 0.32768000000000000000e5
-2813 4 4 10 0.32768000000000000000e5
-2814 1 3 26 0.32768000000000000000e5
-2814 1 6 37 -0.32768000000000000000e5
-2814 1 7 38 0.65536000000000000000e5
-2814 1 8 23 -0.65536000000000000000e5
-2814 3 3 16 -0.32768000000000000000e5
-2814 3 6 19 -0.13107200000000000000e6
-2814 3 7 20 0.13107200000000000000e6
-2814 4 1 13 -0.32768000000000000000e5
-2814 4 2 14 -0.65536000000000000000e5
-2814 4 4 11 0.32768000000000000000e5
-2815 1 3 26 0.32768000000000000000e5
-2815 1 6 37 -0.32768000000000000000e5
-2815 1 9 40 -0.65536000000000000000e5
-2815 1 10 25 0.65536000000000000000e5
-2815 3 4 17 0.32768000000000000000e5
-2815 3 5 18 0.32768000000000000000e5
-2815 3 6 19 0.65536000000000000000e5
-2815 3 8 21 -0.13107200000000000000e6
-2815 4 3 15 0.65536000000000000000e5
-2815 4 4 12 0.32768000000000000000e5
-2816 1 1 40 0.32768000000000000000e5
-2816 1 1 48 -0.32768000000000000000e5
-2816 1 2 49 -0.32768000000000000000e5
-2816 1 5 52 0.13107200000000000000e6
-2816 1 6 25 0.32768000000000000000e5
-2816 1 6 37 0.32768000000000000000e5
-2816 1 8 39 -0.13107200000000000000e6
-2816 1 10 25 -0.13107200000000000000e6
-2816 1 10 41 0.13107200000000000000e6
-2816 1 11 42 0.13107200000000000000e6
-2816 1 12 43 0.26214400000000000000e6
-2816 1 17 48 -0.52428800000000000000e6
-2816 1 23 38 -0.32768000000000000000e5
-2816 1 26 41 0.65536000000000000000e5
-2816 1 28 43 0.13107200000000000000e6
-2816 2 2 32 -0.32768000000000000000e5
-2816 2 4 18 -0.32768000000000000000e5
-2816 2 4 26 0.32768000000000000000e5
-2816 2 5 27 0.32768000000000000000e5
-2816 2 8 22 0.26214400000000000000e6
-2816 2 12 26 -0.13107200000000000000e6
-2816 2 16 30 -0.65536000000000000000e5
-2816 3 2 31 -0.13107200000000000000e6
-2816 3 4 17 -0.32768000000000000000e5
-2816 3 6 19 -0.65536000000000000000e5
-2816 3 8 21 0.13107200000000000000e6
-2816 3 14 27 -0.26214400000000000000e6
-2816 4 3 15 -0.65536000000000000000e5
-2816 4 4 13 0.32768000000000000000e5
-2816 4 4 16 -0.26214400000000000000e6
-2816 4 6 18 -0.65536000000000000000e5
-2816 4 7 19 -0.13107200000000000000e6
-2817 4 3 15 -0.32768000000000000000e5
-2817 4 4 14 0.32768000000000000000e5
-2818 1 4 35 -0.13107200000000000000e6
-2818 1 6 29 0.32768000000000000000e5
-2818 1 17 48 0.13107200000000000000e6
-2818 1 26 29 -0.32768000000000000000e5
-2818 3 6 19 -0.32768000000000000000e5
-2818 3 8 21 0.13107200000000000000e6
-2818 3 9 22 0.65536000000000000000e5
-2818 3 14 27 0.13107200000000000000e6
-2818 4 3 15 -0.32768000000000000000e5
-2818 4 4 15 0.32768000000000000000e5
-2818 4 4 16 0.65536000000000000000e5
-2819 1 3 26 -0.32768000000000000000e5
-2819 1 6 37 0.32768000000000000000e5
-2819 1 9 40 0.65536000000000000000e5
-2819 1 10 25 -0.65536000000000000000e5
-2819 2 3 33 0.32768000000000000000e5
-2819 2 4 18 -0.32768000000000000000e5
-2819 3 4 17 -0.32768000000000000000e5
-2819 3 5 18 -0.32768000000000000000e5
-2819 3 6 19 -0.65536000000000000000e5
-2819 3 8 21 0.13107200000000000000e6
-2819 4 3 15 -0.65536000000000000000e5
-2819 4 4 17 0.32768000000000000000e5
-2820 1 1 48 0.32768000000000000000e5
-2820 1 2 49 0.65536000000000000000e5
-2820 1 3 50 0.65536000000000000000e5
-2820 1 11 42 -0.13107200000000000000e6
-2820 1 12 43 -0.26214400000000000000e6
-2820 1 17 48 0.26214400000000000000e6
-2820 1 23 38 0.32768000000000000000e5
-2820 1 25 40 -0.32768000000000000000e5
-2820 1 26 41 0.65536000000000000000e5
-2820 2 2 32 0.32768000000000000000e5
-2820 2 3 33 0.32768000000000000000e5
-2820 2 5 27 -0.32768000000000000000e5
-2820 2 8 22 -0.13107200000000000000e6
-2820 2 12 26 0.13107200000000000000e6
-2820 2 16 30 0.65536000000000000000e5
-2820 3 2 31 0.13107200000000000000e6
-2820 3 14 27 0.26214400000000000000e6
-2820 4 4 16 0.13107200000000000000e6
-2820 4 4 18 0.32768000000000000000e5
-2821 1 1 48 -0.16384000000000000000e5
-2821 1 2 49 -0.16384000000000000000e5
-2821 1 5 52 0.65536000000000000000e5
-2821 1 8 39 -0.32768000000000000000e5
-2821 1 10 41 0.13107200000000000000e6
-2821 1 11 42 0.13107200000000000000e6
-2821 1 12 43 0.13107200000000000000e6
-2821 1 17 48 -0.39321600000000000000e6
-2821 1 23 38 -0.16384000000000000000e5
-2821 1 26 29 0.32768000000000000000e5
-2821 1 26 41 0.32768000000000000000e5
-2821 1 28 43 0.65536000000000000000e5
-2821 2 2 32 -0.16384000000000000000e5
-2821 2 4 34 0.32768000000000000000e5
-2821 2 8 22 0.19660800000000000000e6
-2821 2 12 26 -0.65536000000000000000e5
-2821 2 16 30 -0.32768000000000000000e5
-2821 3 2 31 -0.65536000000000000000e5
-2821 3 14 27 -0.26214400000000000000e6
-2821 4 4 16 -0.19660800000000000000e6
-2821 4 4 19 0.32768000000000000000e5
-2821 4 6 18 -0.32768000000000000000e5
-2821 4 7 19 -0.65536000000000000000e5
-2822 1 6 53 -0.32768000000000000000e5
-2822 1 25 40 0.32768000000000000000e5
-2822 2 3 33 -0.32768000000000000000e5
-2822 2 18 32 0.32768000000000000000e5
-2822 3 3 32 -0.32768000000000000000e5
-2822 3 17 30 0.65536000000000000000e5
-2822 3 22 27 -0.65536000000000000000e5
-2822 4 4 20 0.32768000000000000000e5
-2823 1 2 17 -0.65536000000000000000e5
-2823 1 3 18 -0.65536000000000000000e5
-2823 1 3 34 -0.65536000000000000000e5
-2823 1 4 19 -0.13107200000000000000e6
-2823 1 20 27 0.26214400000000000000e6
-2823 1 28 35 -0.13107200000000000000e6
-2823 2 4 10 -0.32768000000000000000e5
-2823 2 6 12 -0.65536000000000000000e5
-2823 2 7 21 0.32768000000000000000e5
-2823 2 10 24 -0.13107200000000000000e6
-2823 3 1 14 -0.65536000000000000000e5
-2823 3 2 15 0.13107200000000000000e6
-2823 3 5 10 -0.32768000000000000000e5
-2823 3 6 7 0.32768000000000000000e5
-2823 3 8 13 0.13107200000000000000e6
-2823 3 11 24 -0.13107200000000000000e6
-2823 4 5 6 0.32768000000000000000e5
-2824 2 4 10 -0.32768000000000000000e5
-2824 2 7 21 0.32768000000000000000e5
-2824 4 5 7 0.32768000000000000000e5
-2825 1 1 8 0.81920000000000000000e4
-2825 1 1 40 0.40960000000000000000e4
-2825 1 2 5 -0.40960000000000000000e4
-2825 1 2 9 0.16384000000000000000e5
-2825 1 2 17 -0.65536000000000000000e5
-2825 1 3 18 -0.98304000000000000000e5
-2825 1 3 34 -0.65536000000000000000e5
-2825 1 4 19 -0.13107200000000000000e6
-2825 1 4 35 -0.65536000000000000000e5
-2825 1 6 13 0.16384000000000000000e5
-2825 1 7 22 -0.81920000000000000000e4
-2825 1 7 38 0.81920000000000000000e4
-2825 1 8 23 -0.24576000000000000000e5
-2825 1 10 41 0.16384000000000000000e5
-2825 1 11 42 0.16384000000000000000e5
-2825 1 13 16 -0.13107200000000000000e6
-2825 1 16 31 0.13107200000000000000e6
-2825 1 18 25 -0.32768000000000000000e5
-2825 1 20 27 0.26214400000000000000e6
-2825 1 28 35 -0.65536000000000000000e5
-2825 2 1 3 0.40960000000000000000e4
-2825 2 2 16 -0.40960000000000000000e4
-2825 2 4 10 -0.16384000000000000000e5
-2825 2 6 12 -0.65536000000000000000e5
-2825 2 7 21 0.16384000000000000000e5
-2825 2 8 22 0.16384000000000000000e5
-2825 2 9 23 -0.32768000000000000000e5
-2825 2 10 24 -0.13107200000000000000e6
-2825 3 1 2 0.40960000000000000000e4
-2825 3 1 14 0.32768000000000000000e5
-2825 3 2 15 0.19660800000000000000e6
-2825 3 3 16 -0.40960000000000000000e4
-2825 3 4 17 -0.40960000000000000000e4
-2825 3 6 7 0.16384000000000000000e5
-2825 3 6 19 -0.81920000000000000000e4
-2825 3 7 20 0.16384000000000000000e5
-2825 3 8 13 0.19660800000000000000e6
-2825 3 8 21 0.16384000000000000000e5
-2825 3 9 22 0.16384000000000000000e5
-2825 3 11 24 -0.65536000000000000000e5
-2825 4 1 5 0.81920000000000000000e4
-2825 4 1 13 -0.40960000000000000000e4
-2825 4 2 2 -0.81920000000000000000e4
-2825 4 2 14 -0.81920000000000000000e4
-2825 4 4 8 0.16384000000000000000e5
-2825 4 5 5 0.32768000000000000000e5
-2825 4 5 8 0.32768000000000000000e5
-2825 4 8 8 0.13107200000000000000e6
-2826 1 2 17 -0.32768000000000000000e5
-2826 1 3 34 -0.32768000000000000000e5
-2826 1 4 19 -0.65536000000000000000e5
-2826 1 4 35 0.32768000000000000000e5
-2826 1 18 25 0.32768000000000000000e5
-2826 1 20 27 0.13107200000000000000e6
-2826 1 28 35 -0.13107200000000000000e6
-2826 2 6 12 -0.32768000000000000000e5
-2826 2 9 23 0.32768000000000000000e5
-2826 2 10 24 -0.65536000000000000000e5
-2826 3 1 14 0.32768000000000000000e5
-2826 3 8 13 0.65536000000000000000e5
-2826 3 11 24 -0.13107200000000000000e6
-2826 4 5 9 0.32768000000000000000e5
-2827 4 5 10 0.32768000000000000000e5
-2827 4 8 8 -0.65536000000000000000e5
-2828 1 1 24 0.16384000000000000000e5
-2828 1 1 32 -0.65536000000000000000e5
-2828 1 1 40 0.16384000000000000000e5
-2828 1 2 17 0.13107200000000000000e6
-2828 1 2 33 0.13107200000000000000e6
-2828 1 2 49 0.16384000000000000000e5
-2828 1 3 34 -0.26214400000000000000e6
-2828 1 3 50 -0.32768000000000000000e5
-2828 1 5 52 0.65536000000000000000e5
-2828 1 6 37 0.16384000000000000000e5
-2828 1 10 41 0.13107200000000000000e6
-2828 1 11 42 -0.13107200000000000000e6
-2828 1 12 43 -0.26214400000000000000e6
-2828 1 16 47 0.13107200000000000000e6
-2828 1 17 48 0.13107200000000000000e6
-2828 1 22 37 -0.16384000000000000000e5
-2828 1 28 43 0.65536000000000000000e5
-2828 2 1 31 -0.65536000000000000000e5
-2828 2 2 16 0.16384000000000000000e5
-2828 2 2 32 0.16384000000000000000e5
-2828 2 3 17 -0.16384000000000000000e5
-2828 2 4 26 0.16384000000000000000e5
-2828 2 7 21 0.13107200000000000000e6
-2828 2 8 22 -0.65536000000000000000e5
-2828 2 10 32 -0.65536000000000000000e5
-2828 2 12 26 0.13107200000000000000e6
-2828 2 16 16 -0.32768000000000000000e5
-2828 3 1 14 -0.13107200000000000000e6
-2828 3 1 16 0.16384000000000000000e5
-2828 3 1 30 0.65536000000000000000e5
-2828 3 2 31 0.65536000000000000000e5
-2828 3 3 16 0.16384000000000000000e5
-2828 3 6 19 -0.32768000000000000000e5
-2828 3 6 23 -0.13107200000000000000e6
-2828 3 7 20 0.19660800000000000000e6
-2828 3 8 21 0.13107200000000000000e6
-2828 3 14 27 0.26214400000000000000e6
-2828 4 1 13 0.16384000000000000000e5
-2828 4 2 14 -0.32768000000000000000e5
-2828 4 4 16 0.65536000000000000000e5
-2828 4 5 11 0.32768000000000000000e5
-2828 4 5 17 0.32768000000000000000e5
-2828 4 7 19 -0.65536000000000000000e5
-2828 4 11 11 0.32768000000000000000e5
-2829 4 2 14 -0.32768000000000000000e5
-2829 4 5 12 0.32768000000000000000e5
-2830 1 2 33 -0.65536000000000000000e5
-2830 1 7 38 0.32768000000000000000e5
-2830 1 8 23 -0.32768000000000000000e5
-2830 1 9 40 0.32768000000000000000e5
-2830 1 10 25 -0.32768000000000000000e5
-2830 1 11 42 0.65536000000000000000e5
-2830 1 12 43 0.13107200000000000000e6
-2830 1 17 48 -0.13107200000000000000e6
-2830 2 8 22 0.65536000000000000000e5
-2830 2 12 26 -0.65536000000000000000e5
-2830 3 6 19 -0.32768000000000000000e5
-2830 3 7 20 0.65536000000000000000e5
-2830 3 8 21 0.65536000000000000000e5
-2830 3 14 27 -0.13107200000000000000e6
-2830 4 2 14 -0.32768000000000000000e5
-2830 4 3 15 -0.32768000000000000000e5
-2830 4 4 16 -0.65536000000000000000e5
-2830 4 5 13 0.32768000000000000000e5
-2831 1 1 32 0.32768000000000000000e5
-2831 1 2 17 -0.65536000000000000000e5
-2831 1 3 34 0.65536000000000000000e5
-2831 1 10 41 -0.32768000000000000000e5
-2831 2 1 31 0.32768000000000000000e5
-2831 2 7 21 -0.32768000000000000000e5
-2831 3 1 14 0.65536000000000000000e5
-2831 3 8 21 -0.32768000000000000000e5
-2831 4 5 14 0.32768000000000000000e5
-2832 1 2 33 0.32768000000000000000e5
-2832 1 3 34 -0.65536000000000000000e5
-2832 1 11 42 -0.32768000000000000000e5
-2832 1 12 43 -0.65536000000000000000e5
-2832 1 16 47 0.65536000000000000000e5
-2832 1 17 48 0.65536000000000000000e5
-2832 2 8 22 -0.32768000000000000000e5
-2832 2 12 26 0.32768000000000000000e5
-2832 3 7 20 0.32768000000000000000e5
-2832 3 8 21 0.32768000000000000000e5
-2832 3 13 26 0.65536000000000000000e5
-2832 3 14 27 0.65536000000000000000e5
-2832 4 4 16 0.32768000000000000000e5
-2832 4 5 15 0.32768000000000000000e5
-2833 1 3 34 0.32768000000000000000e5
-2833 1 4 35 -0.32768000000000000000e5
-2833 1 12 43 -0.32768000000000000000e5
-2833 1 16 47 -0.32768000000000000000e5
-2833 1 18 25 -0.32768000000000000000e5
-2833 1 28 35 0.65536000000000000000e5
-2833 2 9 23 -0.32768000000000000000e5
-2833 3 6 23 0.32768000000000000000e5
-2833 3 10 23 -0.65536000000000000000e5
-2833 3 11 24 0.65536000000000000000e5
-2833 3 13 26 -0.32768000000000000000e5
-2833 4 5 16 0.32768000000000000000e5
-2834 1 5 52 0.65536000000000000000e5
-2834 1 9 40 -0.32768000000000000000e5
-2834 1 10 41 0.65536000000000000000e5
-2834 1 17 48 -0.13107200000000000000e6
-2834 1 26 41 0.32768000000000000000e5
-2834 1 28 43 0.65536000000000000000e5
-2834 2 8 22 0.65536000000000000000e5
-2834 3 1 30 0.32768000000000000000e5
-2834 3 2 31 -0.65536000000000000000e5
-2834 4 4 16 -0.65536000000000000000e5
-2834 4 5 18 0.32768000000000000000e5
-2834 4 6 18 -0.32768000000000000000e5
-2834 4 7 19 -0.65536000000000000000e5
-2835 1 2 33 -0.32768000000000000000e5
-2835 1 3 34 0.65536000000000000000e5
-2835 1 11 42 0.32768000000000000000e5
-2835 1 12 43 0.65536000000000000000e5
-2835 1 16 47 -0.65536000000000000000e5
-2835 1 17 48 -0.65536000000000000000e5
-2835 2 7 21 -0.32768000000000000000e5
-2835 2 8 22 0.32768000000000000000e5
-2835 2 10 32 0.32768000000000000000e5
-2835 2 12 26 -0.32768000000000000000e5
-2835 3 7 20 -0.32768000000000000000e5
-2835 3 8 21 -0.32768000000000000000e5
-2835 3 13 26 -0.65536000000000000000e5
-2835 3 14 27 -0.65536000000000000000e5
-2835 4 4 16 -0.32768000000000000000e5
-2835 4 5 19 0.32768000000000000000e5
-2836 1 3 50 0.32768000000000000000e5
-2836 1 7 54 -0.32768000000000000000e5
-2836 1 11 42 -0.65536000000000000000e5
-2836 1 12 43 -0.13107200000000000000e6
-2836 1 17 48 0.13107200000000000000e6
-2836 1 37 44 0.65536000000000000000e5
-2836 2 8 22 -0.65536000000000000000e5
-2836 2 12 26 0.65536000000000000000e5
-2836 3 2 31 0.65536000000000000000e5
-2836 3 14 27 0.13107200000000000000e6
-2836 3 16 29 0.32768000000000000000e5
-2836 3 17 30 0.32768000000000000000e5
-2836 4 4 16 0.65536000000000000000e5
-2836 4 5 20 0.32768000000000000000e5
-2837 2 4 10 -0.16384000000000000000e5
-2837 2 7 21 0.16384000000000000000e5
-2837 4 6 6 0.32768000000000000000e5
-2838 4 4 8 -0.32768000000000000000e5
-2838 4 6 7 0.32768000000000000000e5
-2839 1 2 17 -0.32768000000000000000e5
-2839 1 3 34 -0.32768000000000000000e5
-2839 1 4 19 -0.65536000000000000000e5
-2839 1 4 35 0.32768000000000000000e5
-2839 1 18 25 0.32768000000000000000e5
-2839 1 20 27 0.13107200000000000000e6
-2839 1 28 35 -0.13107200000000000000e6
-2839 2 6 12 -0.32768000000000000000e5
-2839 2 9 23 0.32768000000000000000e5
-2839 2 10 24 -0.65536000000000000000e5
-2839 3 1 14 0.32768000000000000000e5
-2839 3 8 13 0.65536000000000000000e5
-2839 3 11 24 -0.13107200000000000000e6
-2839 4 6 8 0.32768000000000000000e5
-2840 1 2 17 -0.32768000000000000000e5
-2840 1 3 18 -0.32768000000000000000e5
-2840 1 3 34 -0.32768000000000000000e5
-2840 1 4 19 -0.65536000000000000000e5
-2840 1 10 17 0.65536000000000000000e5
-2840 1 11 14 -0.32768000000000000000e5
-2840 1 18 25 0.32768000000000000000e5
-2840 1 20 27 0.13107200000000000000e6
-2840 1 28 35 -0.13107200000000000000e6
-2840 2 6 12 -0.32768000000000000000e5
-2840 2 9 11 -0.32768000000000000000e5
-2840 2 9 23 0.32768000000000000000e5
-2840 2 10 24 -0.65536000000000000000e5
-2840 3 2 15 0.65536000000000000000e5
-2840 3 11 24 -0.13107200000000000000e6
-2840 4 6 9 0.32768000000000000000e5
-2841 4 2 14 -0.32768000000000000000e5
-2841 4 6 11 0.32768000000000000000e5
-2842 1 2 33 -0.65536000000000000000e5
-2842 1 7 38 0.32768000000000000000e5
-2842 1 8 23 -0.32768000000000000000e5
-2842 1 9 40 0.32768000000000000000e5
-2842 1 10 25 -0.32768000000000000000e5
-2842 1 11 42 0.65536000000000000000e5
-2842 1 12 43 0.13107200000000000000e6
-2842 1 17 48 -0.13107200000000000000e6
-2842 2 8 22 0.65536000000000000000e5
-2842 2 12 26 -0.65536000000000000000e5
-2842 3 6 19 -0.32768000000000000000e5
-2842 3 7 20 0.65536000000000000000e5
-2842 3 8 21 0.65536000000000000000e5
-2842 3 14 27 -0.13107200000000000000e6
-2842 4 2 14 -0.32768000000000000000e5
-2842 4 3 15 -0.32768000000000000000e5
-2842 4 4 16 -0.65536000000000000000e5
-2842 4 6 12 0.32768000000000000000e5
-2843 4 3 15 -0.32768000000000000000e5
-2843 4 6 13 0.32768000000000000000e5
-2844 1 2 33 0.32768000000000000000e5
-2844 1 3 34 -0.65536000000000000000e5
-2844 1 11 42 -0.32768000000000000000e5
-2844 1 12 43 -0.65536000000000000000e5
-2844 1 16 47 0.65536000000000000000e5
-2844 1 17 48 0.65536000000000000000e5
-2844 2 8 22 -0.32768000000000000000e5
-2844 2 12 26 0.32768000000000000000e5
-2844 3 7 20 0.32768000000000000000e5
-2844 3 8 21 0.32768000000000000000e5
-2844 3 13 26 0.65536000000000000000e5
-2844 3 14 27 0.65536000000000000000e5
-2844 4 4 16 0.32768000000000000000e5
-2844 4 6 14 0.32768000000000000000e5
-2845 1 2 33 0.32768000000000000000e5
-2845 1 4 35 0.13107200000000000000e6
-2845 1 11 42 -0.32768000000000000000e5
-2845 1 18 25 0.65536000000000000000e5
-2845 1 28 35 -0.13107200000000000000e6
-2845 2 8 22 -0.32768000000000000000e5
-2845 2 9 23 0.65536000000000000000e5
-2845 2 12 26 0.32768000000000000000e5
-2845 3 9 22 -0.32768000000000000000e5
-2845 3 11 24 -0.13107200000000000000e6
-2845 4 6 15 0.32768000000000000000e5
-2846 1 3 34 0.32768000000000000000e5
-2846 1 4 19 -0.65536000000000000000e5
-2846 1 12 43 -0.32768000000000000000e5
-2846 1 13 44 0.65536000000000000000e5
-2846 1 16 47 -0.32768000000000000000e5
-2846 1 17 48 -0.32768000000000000000e5
-2846 1 18 25 -0.32768000000000000000e5
-2846 1 28 35 0.65536000000000000000e5
-2846 2 9 23 -0.32768000000000000000e5
-2846 3 8 13 0.65536000000000000000e5
-2846 3 11 24 0.65536000000000000000e5
-2846 3 13 26 -0.32768000000000000000e5
-2846 3 14 27 -0.32768000000000000000e5
-2846 4 6 16 0.32768000000000000000e5
-2847 1 5 52 0.65536000000000000000e5
-2847 1 9 40 -0.32768000000000000000e5
-2847 1 10 41 0.65536000000000000000e5
-2847 1 17 48 -0.13107200000000000000e6
-2847 1 26 41 0.32768000000000000000e5
-2847 1 28 43 0.65536000000000000000e5
-2847 2 8 22 0.65536000000000000000e5
-2847 3 1 30 0.32768000000000000000e5
-2847 3 2 31 -0.65536000000000000000e5
-2847 4 4 16 -0.65536000000000000000e5
-2847 4 6 17 0.32768000000000000000e5
-2847 4 6 18 -0.32768000000000000000e5
-2847 4 7 19 -0.65536000000000000000e5
-2848 2 12 26 -0.32768000000000000000e5
-2848 2 20 34 0.32768000000000000000e5
-2848 4 6 19 0.32768000000000000000e5
-2848 4 8 20 0.32768000000000000000e5
-2849 1 3 50 0.32768000000000000000e5
-2849 1 5 52 0.65536000000000000000e5
-2849 1 7 54 -0.32768000000000000000e5
-2849 1 17 48 -0.13107200000000000000e6
-2849 1 28 43 0.65536000000000000000e5
-2849 1 32 47 0.65536000000000000000e5
-2849 2 8 22 0.65536000000000000000e5
-2849 3 17 30 0.32768000000000000000e5
-2849 3 22 27 0.32768000000000000000e5
-2849 4 4 16 -0.65536000000000000000e5
-2849 4 6 20 0.32768000000000000000e5
-2849 4 7 19 -0.65536000000000000000e5
-2850 2 5 11 -0.16384000000000000000e5
-2850 2 8 22 0.16384000000000000000e5
-2850 4 7 7 0.32768000000000000000e5
-2851 1 2 17 -0.32768000000000000000e5
-2851 1 3 18 -0.32768000000000000000e5
-2851 1 3 34 -0.32768000000000000000e5
-2851 1 4 19 -0.65536000000000000000e5
-2851 1 10 17 0.65536000000000000000e5
-2851 1 11 14 -0.32768000000000000000e5
-2851 1 18 25 0.32768000000000000000e5
-2851 1 20 27 0.13107200000000000000e6
-2851 1 28 35 -0.13107200000000000000e6
-2851 2 6 12 -0.32768000000000000000e5
-2851 2 9 11 -0.32768000000000000000e5
-2851 2 9 23 0.32768000000000000000e5
-2851 2 10 24 -0.65536000000000000000e5
-2851 3 2 15 0.65536000000000000000e5
-2851 3 11 24 -0.13107200000000000000e6
-2851 4 7 8 0.32768000000000000000e5
-2852 2 9 11 -0.32768000000000000000e5
-2852 2 9 23 0.32768000000000000000e5
-2852 4 7 9 0.32768000000000000000e5
-2853 1 4 19 -0.32768000000000000000e5
-2853 1 5 36 -0.32768000000000000000e5
-2853 1 17 32 0.65536000000000000000e5
-2853 1 28 35 -0.32768000000000000000e5
-2853 2 8 14 -0.32768000000000000000e5
-2853 3 8 13 0.32768000000000000000e5
-2853 3 11 24 -0.32768000000000000000e5
-2853 4 7 10 0.32768000000000000000e5
-2854 1 2 33 -0.65536000000000000000e5
-2854 1 7 38 0.32768000000000000000e5
-2854 1 8 23 -0.32768000000000000000e5
-2854 1 9 40 0.32768000000000000000e5
-2854 1 10 25 -0.32768000000000000000e5
-2854 1 11 42 0.65536000000000000000e5
-2854 1 12 43 0.13107200000000000000e6
-2854 1 17 48 -0.13107200000000000000e6
-2854 2 8 22 0.65536000000000000000e5
-2854 2 12 26 -0.65536000000000000000e5
-2854 3 6 19 -0.32768000000000000000e5
-2854 3 7 20 0.65536000000000000000e5
-2854 3 8 21 0.65536000000000000000e5
-2854 3 14 27 -0.13107200000000000000e6
-2854 4 2 14 -0.32768000000000000000e5
-2854 4 3 15 -0.32768000000000000000e5
-2854 4 4 16 -0.65536000000000000000e5
-2854 4 7 11 0.32768000000000000000e5
-2855 4 3 15 -0.32768000000000000000e5
-2855 4 7 12 0.32768000000000000000e5
-2856 1 4 35 -0.13107200000000000000e6
-2856 1 6 29 0.32768000000000000000e5
-2856 1 17 48 0.13107200000000000000e6
-2856 1 26 29 -0.32768000000000000000e5
-2856 3 6 19 -0.32768000000000000000e5
-2856 3 8 21 0.13107200000000000000e6
-2856 3 9 22 0.65536000000000000000e5
-2856 3 14 27 0.13107200000000000000e6
-2856 4 3 15 -0.32768000000000000000e5
-2856 4 4 16 0.65536000000000000000e5
-2856 4 7 13 0.32768000000000000000e5
-2857 1 2 33 0.32768000000000000000e5
-2857 1 4 35 0.13107200000000000000e6
-2857 1 11 42 -0.32768000000000000000e5
-2857 1 18 25 0.65536000000000000000e5
-2857 1 28 35 -0.13107200000000000000e6
-2857 2 8 22 -0.32768000000000000000e5
-2857 2 9 23 0.65536000000000000000e5
-2857 2 12 26 0.32768000000000000000e5
-2857 3 9 22 -0.32768000000000000000e5
-2857 3 11 24 -0.13107200000000000000e6
-2857 4 7 14 0.32768000000000000000e5
-2858 4 4 16 -0.32768000000000000000e5
-2858 4 7 15 0.32768000000000000000e5
-2859 1 12 43 -0.32768000000000000000e5
-2859 1 17 48 -0.32768000000000000000e5
-2859 1 18 25 -0.32768000000000000000e5
-2859 1 28 35 0.65536000000000000000e5
-2859 2 9 23 -0.32768000000000000000e5
-2859 3 14 19 0.32768000000000000000e5
-2859 3 14 27 -0.32768000000000000000e5
-2859 4 7 16 0.32768000000000000000e5
-2860 4 6 18 -0.32768000000000000000e5
-2860 4 7 17 0.32768000000000000000e5
-2861 1 1 48 -0.16384000000000000000e5
-2861 1 2 49 -0.16384000000000000000e5
-2861 1 5 52 0.65536000000000000000e5
-2861 1 8 39 -0.32768000000000000000e5
-2861 1 10 41 0.13107200000000000000e6
-2861 1 11 42 0.13107200000000000000e6
-2861 1 12 43 0.13107200000000000000e6
-2861 1 17 48 -0.39321600000000000000e6
-2861 1 23 38 -0.16384000000000000000e5
-2861 1 26 29 0.32768000000000000000e5
-2861 1 26 41 0.32768000000000000000e5
-2861 1 28 43 0.65536000000000000000e5
-2861 2 2 32 -0.16384000000000000000e5
-2861 2 4 34 0.32768000000000000000e5
-2861 2 8 22 0.19660800000000000000e6
-2861 2 12 26 -0.65536000000000000000e5
-2861 2 16 30 -0.32768000000000000000e5
-2861 3 2 31 -0.65536000000000000000e5
-2861 3 14 27 -0.26214400000000000000e6
-2861 4 4 16 -0.19660800000000000000e6
-2861 4 6 18 -0.32768000000000000000e5
-2861 4 7 18 0.32768000000000000000e5
-2861 4 7 19 -0.65536000000000000000e5
-2862 3 5 34 0.32768000000000000000e5
-2862 3 17 30 0.32768000000000000000e5
-2862 3 18 31 -0.65536000000000000000e5
-2862 3 22 27 0.32768000000000000000e5
-2862 4 7 20 0.32768000000000000000e5
-2863 4 6 10 -0.32768000000000000000e5
-2863 4 8 9 0.32768000000000000000e5
-2864 1 4 19 0.16384000000000000000e5
-2864 1 5 20 0.16384000000000000000e5
-2864 1 10 17 0.32768000000000000000e5
-2864 1 13 16 0.32768000000000000000e5
-2864 1 16 31 -0.32768000000000000000e5
-2864 1 17 32 -0.32768000000000000000e5
-2864 1 28 35 -0.16384000000000000000e5
-2864 2 8 14 0.16384000000000000000e5
-2864 3 2 15 0.16384000000000000000e5
-2864 3 8 13 0.16384000000000000000e5
-2864 3 10 15 -0.65536000000000000000e5
-2864 3 11 24 -0.16384000000000000000e5
-2864 4 6 10 0.16384000000000000000e5
-2864 4 8 10 0.32768000000000000000e5
-2865 1 1 32 0.32768000000000000000e5
-2865 1 2 17 -0.65536000000000000000e5
-2865 1 3 34 0.65536000000000000000e5
-2865 1 10 41 -0.32768000000000000000e5
-2865 2 1 31 0.32768000000000000000e5
-2865 2 7 21 -0.32768000000000000000e5
-2865 3 1 14 0.65536000000000000000e5
-2865 3 8 21 -0.32768000000000000000e5
-2865 4 8 11 0.32768000000000000000e5
-2866 1 2 33 0.32768000000000000000e5
-2866 1 3 34 -0.65536000000000000000e5
-2866 1 11 42 -0.32768000000000000000e5
-2866 1 12 43 -0.65536000000000000000e5
-2866 1 16 47 0.65536000000000000000e5
-2866 1 17 48 0.65536000000000000000e5
-2866 2 8 22 -0.32768000000000000000e5
-2866 2 12 26 0.32768000000000000000e5
-2866 3 7 20 0.32768000000000000000e5
-2866 3 8 21 0.32768000000000000000e5
-2866 3 13 26 0.65536000000000000000e5
-2866 3 14 27 0.65536000000000000000e5
-2866 4 4 16 0.32768000000000000000e5
-2866 4 8 12 0.32768000000000000000e5
-2867 1 2 33 0.32768000000000000000e5
-2867 1 4 35 0.13107200000000000000e6
-2867 1 11 42 -0.32768000000000000000e5
-2867 1 18 25 0.65536000000000000000e5
-2867 1 28 35 -0.13107200000000000000e6
-2867 2 8 22 -0.32768000000000000000e5
-2867 2 9 23 0.65536000000000000000e5
-2867 2 12 26 0.32768000000000000000e5
-2867 3 9 22 -0.32768000000000000000e5
-2867 3 11 24 -0.13107200000000000000e6
-2867 4 8 13 0.32768000000000000000e5
-2868 1 3 34 0.32768000000000000000e5
-2868 1 4 35 -0.32768000000000000000e5
-2868 1 12 43 -0.32768000000000000000e5
-2868 1 16 47 -0.32768000000000000000e5
-2868 1 18 25 -0.32768000000000000000e5
-2868 1 28 35 0.65536000000000000000e5
-2868 2 9 23 -0.32768000000000000000e5
-2868 3 6 23 0.32768000000000000000e5
-2868 3 10 23 -0.65536000000000000000e5
-2868 3 11 24 0.65536000000000000000e5
-2868 3 13 26 -0.32768000000000000000e5
-2868 4 8 14 0.32768000000000000000e5
-2869 1 3 34 0.32768000000000000000e5
-2869 1 4 19 -0.65536000000000000000e5
-2869 1 12 43 -0.32768000000000000000e5
-2869 1 13 44 0.65536000000000000000e5
-2869 1 16 47 -0.32768000000000000000e5
-2869 1 17 48 -0.32768000000000000000e5
-2869 1 18 25 -0.32768000000000000000e5
-2869 1 28 35 0.65536000000000000000e5
-2869 2 9 23 -0.32768000000000000000e5
-2869 3 8 13 0.65536000000000000000e5
-2869 3 11 24 0.65536000000000000000e5
-2869 3 13 26 -0.32768000000000000000e5
-2869 3 14 27 -0.32768000000000000000e5
-2869 4 8 15 0.32768000000000000000e5
-2870 4 8 16 0.32768000000000000000e5
-2870 4 10 14 -0.32768000000000000000e5
-2871 1 2 33 -0.32768000000000000000e5
-2871 1 3 34 0.65536000000000000000e5
-2871 1 11 42 0.32768000000000000000e5
-2871 1 12 43 0.65536000000000000000e5
-2871 1 16 47 -0.65536000000000000000e5
-2871 1 17 48 -0.65536000000000000000e5
-2871 2 7 21 -0.32768000000000000000e5
-2871 2 8 22 0.32768000000000000000e5
-2871 2 10 32 0.32768000000000000000e5
-2871 2 12 26 -0.32768000000000000000e5
-2871 3 7 20 -0.32768000000000000000e5
-2871 3 8 21 -0.32768000000000000000e5
-2871 3 13 26 -0.65536000000000000000e5
-2871 3 14 27 -0.65536000000000000000e5
-2871 4 4 16 -0.32768000000000000000e5
-2871 4 8 17 0.32768000000000000000e5
-2872 2 12 26 -0.32768000000000000000e5
-2872 2 20 34 0.32768000000000000000e5
-2872 4 8 18 0.32768000000000000000e5
-2872 4 8 20 0.32768000000000000000e5
-2873 1 5 52 0.16384000000000000000e5
-2873 1 11 42 -0.16384000000000000000e5
-2873 1 13 44 -0.65536000000000000000e5
-2873 1 34 41 0.65536000000000000000e5
-2873 2 12 26 0.16384000000000000000e5
-2873 2 20 34 -0.16384000000000000000e5
-2873 3 2 31 0.16384000000000000000e5
-2873 3 13 26 0.32768000000000000000e5
-2873 3 14 27 0.65536000000000000000e5
-2873 4 7 19 -0.16384000000000000000e5
-2873 4 8 19 0.32768000000000000000e5
-2873 4 8 20 -0.16384000000000000000e5
-2874 1 4 19 -0.16384000000000000000e5
-2874 1 5 36 -0.16384000000000000000e5
-2874 1 17 32 0.32768000000000000000e5
-2874 1 28 35 -0.16384000000000000000e5
-2874 2 8 14 -0.16384000000000000000e5
-2874 3 8 13 0.16384000000000000000e5
-2874 3 11 24 -0.16384000000000000000e5
-2874 4 9 9 0.32768000000000000000e5
-2875 1 6 21 -0.32768000000000000000e5
-2875 1 10 17 0.16384000000000000000e5
-2875 1 10 21 0.65536000000000000000e5
-2875 1 13 20 -0.65536000000000000000e5
-2875 1 20 27 0.32768000000000000000e5
-2875 1 28 35 -0.16384000000000000000e5
-2875 2 9 15 -0.32768000000000000000e5
-2875 2 11 25 0.32768000000000000000e5
-2875 3 2 15 0.16384000000000000000e5
-2875 3 8 13 0.16384000000000000000e5
-2875 3 11 24 -0.16384000000000000000e5
-2875 4 6 10 0.16384000000000000000e5
-2875 4 9 10 0.32768000000000000000e5
-2876 1 2 33 0.32768000000000000000e5
-2876 1 3 34 -0.65536000000000000000e5
-2876 1 11 42 -0.32768000000000000000e5
-2876 1 12 43 -0.65536000000000000000e5
-2876 1 16 47 0.65536000000000000000e5
-2876 1 17 48 0.65536000000000000000e5
-2876 2 8 22 -0.32768000000000000000e5
-2876 2 12 26 0.32768000000000000000e5
-2876 3 7 20 0.32768000000000000000e5
-2876 3 8 21 0.32768000000000000000e5
-2876 3 13 26 0.65536000000000000000e5
-2876 3 14 27 0.65536000000000000000e5
-2876 4 4 16 0.32768000000000000000e5
-2876 4 9 11 0.32768000000000000000e5
-2877 1 2 33 0.32768000000000000000e5
-2877 1 4 35 0.13107200000000000000e6
-2877 1 11 42 -0.32768000000000000000e5
-2877 1 18 25 0.65536000000000000000e5
-2877 1 28 35 -0.13107200000000000000e6
-2877 2 8 22 -0.32768000000000000000e5
-2877 2 9 23 0.65536000000000000000e5
-2877 2 12 26 0.32768000000000000000e5
-2877 3 9 22 -0.32768000000000000000e5
-2877 3 11 24 -0.13107200000000000000e6
-2877 4 9 12 0.32768000000000000000e5
-2878 4 4 16 -0.32768000000000000000e5
-2878 4 9 13 0.32768000000000000000e5
-2879 1 3 34 0.32768000000000000000e5
-2879 1 4 19 -0.65536000000000000000e5
-2879 1 12 43 -0.32768000000000000000e5
-2879 1 13 44 0.65536000000000000000e5
-2879 1 16 47 -0.32768000000000000000e5
-2879 1 17 48 -0.32768000000000000000e5
-2879 1 18 25 -0.32768000000000000000e5
-2879 1 28 35 0.65536000000000000000e5
-2879 2 9 23 -0.32768000000000000000e5
-2879 3 8 13 0.65536000000000000000e5
-2879 3 11 24 0.65536000000000000000e5
-2879 3 13 26 -0.32768000000000000000e5
-2879 3 14 27 -0.32768000000000000000e5
-2879 4 9 14 0.32768000000000000000e5
-2880 1 12 43 -0.32768000000000000000e5
-2880 1 17 48 -0.32768000000000000000e5
-2880 1 18 25 -0.32768000000000000000e5
-2880 1 28 35 0.65536000000000000000e5
-2880 2 9 23 -0.32768000000000000000e5
-2880 3 14 19 0.32768000000000000000e5
-2880 3 14 27 -0.32768000000000000000e5
-2880 4 9 15 0.32768000000000000000e5
-2881 1 4 19 0.32768000000000000000e5
-2881 1 5 36 0.32768000000000000000e5
-2881 1 13 44 -0.32768000000000000000e5
-2881 1 14 45 -0.32768000000000000000e5
-2881 1 17 32 -0.65536000000000000000e5
-2881 1 19 42 0.65536000000000000000e5
-2881 3 8 13 -0.32768000000000000000e5
-2881 3 11 24 0.32768000000000000000e5
-2881 4 9 16 0.32768000000000000000e5
-2882 2 12 26 -0.32768000000000000000e5
-2882 2 20 34 0.32768000000000000000e5
-2882 4 8 20 0.32768000000000000000e5
-2882 4 9 17 0.32768000000000000000e5
-2883 4 7 19 -0.32768000000000000000e5
-2883 4 9 18 0.32768000000000000000e5
-2884 1 5 52 0.16384000000000000000e5
-2884 1 11 42 -0.16384000000000000000e5
-2884 1 13 52 0.65536000000000000000e5
-2884 1 14 45 -0.65536000000000000000e5
-2884 1 17 48 0.32768000000000000000e5
-2884 1 18 25 0.32768000000000000000e5
-2884 1 18 49 0.32768000000000000000e5
-2884 1 28 35 -0.65536000000000000000e5
-2884 2 12 26 0.16384000000000000000e5
-2884 2 20 34 -0.16384000000000000000e5
-2884 2 24 30 0.32768000000000000000e5
-2884 3 2 31 0.16384000000000000000e5
-2884 3 14 19 -0.32768000000000000000e5
-2884 3 14 27 0.65536000000000000000e5
-2884 3 15 28 0.65536000000000000000e5
-2884 4 7 19 -0.16384000000000000000e5
-2884 4 8 20 -0.16384000000000000000e5
-2884 4 9 19 0.32768000000000000000e5
-2885 1 17 48 0.65536000000000000000e5
-2885 1 28 43 -0.32768000000000000000e5
-2885 1 32 47 -0.32768000000000000000e5
-2885 1 33 48 -0.32768000000000000000e5
-2885 2 8 22 -0.32768000000000000000e5
-2885 3 18 31 0.32768000000000000000e5
-2885 3 24 29 -0.65536000000000000000e5
-2885 4 4 16 0.32768000000000000000e5
-2885 4 7 19 0.32768000000000000000e5
-2885 4 9 20 0.32768000000000000000e5
-2886 1 3 34 0.32768000000000000000e5
-2886 1 4 35 -0.32768000000000000000e5
-2886 1 12 43 -0.32768000000000000000e5
-2886 1 16 47 -0.32768000000000000000e5
-2886 1 18 25 -0.32768000000000000000e5
-2886 1 28 35 0.65536000000000000000e5
-2886 2 9 23 -0.32768000000000000000e5
-2886 3 6 23 0.32768000000000000000e5
-2886 3 10 23 -0.65536000000000000000e5
-2886 3 11 24 0.65536000000000000000e5
-2886 3 13 26 -0.32768000000000000000e5
-2886 4 10 11 0.32768000000000000000e5
-2887 1 3 34 0.32768000000000000000e5
-2887 1 4 19 -0.65536000000000000000e5
-2887 1 12 43 -0.32768000000000000000e5
-2887 1 13 44 0.65536000000000000000e5
-2887 1 16 47 -0.32768000000000000000e5
-2887 1 17 48 -0.32768000000000000000e5
-2887 1 18 25 -0.32768000000000000000e5
-2887 1 28 35 0.65536000000000000000e5
-2887 2 9 23 -0.32768000000000000000e5
-2887 3 8 13 0.65536000000000000000e5
-2887 3 11 24 0.65536000000000000000e5
-2887 3 13 26 -0.32768000000000000000e5
-2887 3 14 27 -0.32768000000000000000e5
-2887 4 10 12 0.32768000000000000000e5
-2888 1 12 43 -0.32768000000000000000e5
-2888 1 17 48 -0.32768000000000000000e5
-2888 1 18 25 -0.32768000000000000000e5
-2888 1 28 35 0.65536000000000000000e5
-2888 2 9 23 -0.32768000000000000000e5
-2888 3 14 19 0.32768000000000000000e5
-2888 3 14 27 -0.32768000000000000000e5
-2888 4 10 13 0.32768000000000000000e5
-2889 1 4 19 0.32768000000000000000e5
-2889 1 5 36 0.32768000000000000000e5
-2889 1 13 44 -0.32768000000000000000e5
-2889 1 14 45 -0.32768000000000000000e5
-2889 1 17 32 -0.65536000000000000000e5
-2889 1 19 42 0.65536000000000000000e5
-2889 3 8 13 -0.32768000000000000000e5
-2889 3 11 24 0.32768000000000000000e5
-2889 4 10 15 0.32768000000000000000e5
-2890 2 11 25 -0.32768000000000000000e5
-2890 2 15 29 0.32768000000000000000e5
-2890 4 10 16 0.32768000000000000000e5
-2891 1 5 52 0.16384000000000000000e5
-2891 1 11 42 -0.16384000000000000000e5
-2891 1 13 44 -0.65536000000000000000e5
-2891 1 34 41 0.65536000000000000000e5
-2891 2 12 26 0.16384000000000000000e5
-2891 2 20 34 -0.16384000000000000000e5
-2891 3 2 31 0.16384000000000000000e5
-2891 3 13 26 0.32768000000000000000e5
-2891 3 14 27 0.65536000000000000000e5
-2891 4 7 19 -0.16384000000000000000e5
-2891 4 8 20 -0.16384000000000000000e5
-2891 4 10 17 0.32768000000000000000e5
-2892 1 5 52 0.16384000000000000000e5
-2892 1 11 42 -0.16384000000000000000e5
-2892 1 13 52 0.65536000000000000000e5
-2892 1 14 45 -0.65536000000000000000e5
-2892 1 17 48 0.32768000000000000000e5
-2892 1 18 25 0.32768000000000000000e5
-2892 1 18 49 0.32768000000000000000e5
-2892 1 28 35 -0.65536000000000000000e5
-2892 2 12 26 0.16384000000000000000e5
-2892 2 20 34 -0.16384000000000000000e5
-2892 2 24 30 0.32768000000000000000e5
-2892 3 2 31 0.16384000000000000000e5
-2892 3 14 19 -0.32768000000000000000e5
-2892 3 14 27 0.65536000000000000000e5
-2892 3 15 28 0.65536000000000000000e5
-2892 4 7 19 -0.16384000000000000000e5
-2892 4 8 20 -0.16384000000000000000e5
-2892 4 10 18 0.32768000000000000000e5
-2893 1 13 44 0.32768000000000000000e5
-2893 1 13 52 -0.32768000000000000000e5
-2893 1 19 42 -0.65536000000000000000e5
-2893 1 19 50 0.65536000000000000000e5
-2893 1 28 35 0.32768000000000000000e5
-2893 1 34 41 -0.32768000000000000000e5
-2893 3 15 28 0.32768000000000000000e5
-2893 4 10 19 0.32768000000000000000e5
-2894 1 5 52 -0.16384000000000000000e5
-2894 1 11 42 0.16384000000000000000e5
-2894 1 12 43 0.32768000000000000000e5
-2894 1 13 52 -0.65536000000000000000e5
-2894 1 14 45 0.65536000000000000000e5
-2894 1 16 55 0.65536000000000000000e5
-2894 1 17 48 -0.32768000000000000000e5
-2894 1 18 49 -0.32768000000000000000e5
-2894 1 28 43 -0.16384000000000000000e5
-2894 1 32 47 -0.16384000000000000000e5
-2894 1 34 49 -0.32768000000000000000e5
-2894 1 37 44 -0.16384000000000000000e5
-2894 2 12 26 -0.16384000000000000000e5
-2894 2 24 30 -0.32768000000000000000e5
-2894 3 2 31 -0.16384000000000000000e5
-2894 3 14 27 -0.32768000000000000000e5
-2894 3 15 28 -0.65536000000000000000e5
-2894 3 18 31 0.16384000000000000000e5
-2894 3 24 29 0.32768000000000000000e5
-2894 4 7 19 0.16384000000000000000e5
-2894 4 8 20 0.16384000000000000000e5
-2894 4 10 20 0.32768000000000000000e5
-2895 2 2 32 0.32768000000000000000e5
-2895 2 3 17 -0.32768000000000000000e5
-2895 4 1 13 0.32768000000000000000e5
-2895 4 11 12 0.32768000000000000000e5
-2896 1 2 49 -0.32768000000000000000e5
-2896 1 3 50 0.65536000000000000000e5
-2896 1 23 38 -0.32768000000000000000e5
-2896 1 24 39 -0.32768000000000000000e5
-2896 2 4 26 -0.32768000000000000000e5
-2896 4 11 13 0.32768000000000000000e5
-2897 4 5 17 -0.32768000000000000000e5
-2897 4 11 14 0.32768000000000000000e5
-2898 1 5 52 0.65536000000000000000e5
-2898 1 9 40 -0.32768000000000000000e5
-2898 1 10 41 0.65536000000000000000e5
-2898 1 17 48 -0.13107200000000000000e6
-2898 1 26 41 0.32768000000000000000e5
-2898 1 28 43 0.65536000000000000000e5
-2898 2 8 22 0.65536000000000000000e5
-2898 3 1 30 0.32768000000000000000e5
-2898 3 2 31 -0.65536000000000000000e5
-2898 4 4 16 -0.65536000000000000000e5
-2898 4 6 18 -0.32768000000000000000e5
-2898 4 7 19 -0.65536000000000000000e5
-2898 4 11 15 0.32768000000000000000e5
-2899 1 2 33 -0.32768000000000000000e5
-2899 1 3 34 0.65536000000000000000e5
-2899 1 11 42 0.32768000000000000000e5
-2899 1 12 43 0.65536000000000000000e5
-2899 1 16 47 -0.65536000000000000000e5
-2899 1 17 48 -0.65536000000000000000e5
-2899 2 7 21 -0.32768000000000000000e5
-2899 2 8 22 0.32768000000000000000e5
-2899 2 10 32 0.32768000000000000000e5
-2899 2 12 26 -0.32768000000000000000e5
-2899 3 7 20 -0.32768000000000000000e5
-2899 3 8 21 -0.32768000000000000000e5
-2899 3 13 26 -0.65536000000000000000e5
-2899 3 14 27 -0.65536000000000000000e5
-2899 4 4 16 -0.32768000000000000000e5
-2899 4 11 16 0.32768000000000000000e5
-2900 2 1 35 0.32768000000000000000e5
-2900 2 2 32 -0.32768000000000000000e5
-2900 4 11 17 0.32768000000000000000e5
-2901 1 2 49 0.32768000000000000000e5
-2901 1 3 50 -0.65536000000000000000e5
-2901 1 23 38 0.32768000000000000000e5
-2901 1 24 39 0.32768000000000000000e5
-2901 2 26 32 0.32768000000000000000e5
-2901 4 11 18 0.32768000000000000000e5
-2901 4 17 17 0.65536000000000000000e5
-2902 1 3 50 0.32768000000000000000e5
-2902 1 7 54 -0.32768000000000000000e5
-2902 1 11 42 -0.65536000000000000000e5
-2902 1 12 43 -0.13107200000000000000e6
-2902 1 17 48 0.13107200000000000000e6
-2902 1 37 44 0.65536000000000000000e5
-2902 2 8 22 -0.65536000000000000000e5
-2902 2 12 26 0.65536000000000000000e5
-2902 3 2 31 0.65536000000000000000e5
-2902 3 14 27 0.13107200000000000000e6
-2902 3 16 29 0.32768000000000000000e5
-2902 3 17 30 0.32768000000000000000e5
-2902 4 4 16 0.65536000000000000000e5
-2902 4 11 19 0.32768000000000000000e5
-2903 4 11 20 0.32768000000000000000e5
-2903 4 17 17 -0.65536000000000000000e5
-2904 1 2 49 -0.16384000000000000000e5
-2904 1 3 50 0.32768000000000000000e5
-2904 1 23 38 -0.16384000000000000000e5
-2904 1 24 39 -0.16384000000000000000e5
-2904 2 4 26 -0.16384000000000000000e5
-2904 4 12 12 0.32768000000000000000e5
-2905 1 3 26 -0.32768000000000000000e5
-2905 1 6 37 0.32768000000000000000e5
-2905 1 9 40 0.65536000000000000000e5
-2905 1 10 25 -0.65536000000000000000e5
-2905 2 3 33 0.32768000000000000000e5
-2905 2 4 18 -0.32768000000000000000e5
-2905 3 4 17 -0.32768000000000000000e5
-2905 3 5 18 -0.32768000000000000000e5
-2905 3 6 19 -0.65536000000000000000e5
-2905 3 8 21 0.13107200000000000000e6
-2905 4 3 15 -0.65536000000000000000e5
-2905 4 12 13 0.32768000000000000000e5
-2906 1 5 52 0.65536000000000000000e5
-2906 1 9 40 -0.32768000000000000000e5
-2906 1 10 41 0.65536000000000000000e5
-2906 1 17 48 -0.13107200000000000000e6
-2906 1 26 41 0.32768000000000000000e5
-2906 1 28 43 0.65536000000000000000e5
-2906 2 8 22 0.65536000000000000000e5
-2906 3 1 30 0.32768000000000000000e5
-2906 3 2 31 -0.65536000000000000000e5
-2906 4 4 16 -0.65536000000000000000e5
-2906 4 6 18 -0.32768000000000000000e5
-2906 4 7 19 -0.65536000000000000000e5
-2906 4 12 14 0.32768000000000000000e5
-2907 4 6 18 -0.32768000000000000000e5
-2907 4 12 15 0.32768000000000000000e5
-2908 2 12 26 -0.32768000000000000000e5
-2908 2 20 34 0.32768000000000000000e5
-2908 4 8 20 0.32768000000000000000e5
-2908 4 12 16 0.32768000000000000000e5
-2909 1 2 49 0.32768000000000000000e5
-2909 1 3 50 -0.65536000000000000000e5
-2909 1 23 38 0.32768000000000000000e5
-2909 1 24 39 0.32768000000000000000e5
-2909 2 26 32 0.32768000000000000000e5
-2909 4 12 17 0.32768000000000000000e5
-2909 4 17 17 0.65536000000000000000e5
-2910 2 3 33 -0.32768000000000000000e5
-2910 2 18 32 0.32768000000000000000e5
-2910 4 12 18 0.32768000000000000000e5
-2911 1 3 50 0.32768000000000000000e5
-2911 1 5 52 0.65536000000000000000e5
-2911 1 7 54 -0.32768000000000000000e5
-2911 1 17 48 -0.13107200000000000000e6
-2911 1 28 43 0.65536000000000000000e5
-2911 1 32 47 0.65536000000000000000e5
-2911 2 8 22 0.65536000000000000000e5
-2911 3 17 30 0.32768000000000000000e5
-2911 3 22 27 0.32768000000000000000e5
-2911 4 4 16 -0.65536000000000000000e5
-2911 4 7 19 -0.65536000000000000000e5
-2911 4 12 19 0.32768000000000000000e5
-2912 1 2 49 0.32768000000000000000e5
-2912 1 7 54 -0.65536000000000000000e5
-2912 1 22 53 0.32768000000000000000e5
-2912 1 24 39 0.32768000000000000000e5
-2912 2 3 33 0.32768000000000000000e5
-2912 2 18 32 -0.32768000000000000000e5
-2912 2 26 32 0.32768000000000000000e5
-2912 3 4 33 0.32768000000000000000e5
-2912 3 6 35 0.65536000000000000000e5
-2912 3 17 30 -0.65536000000000000000e5
-2912 3 19 32 0.32768000000000000000e5
-2912 3 20 33 -0.65536000000000000000e5
-2912 4 12 20 0.32768000000000000000e5
-2913 1 1 48 0.16384000000000000000e5
-2913 1 2 49 0.32768000000000000000e5
-2913 1 3 50 0.32768000000000000000e5
-2913 1 11 42 -0.65536000000000000000e5
-2913 1 12 43 -0.13107200000000000000e6
-2913 1 17 48 0.13107200000000000000e6
-2913 1 23 38 0.16384000000000000000e5
-2913 1 25 40 -0.16384000000000000000e5
-2913 1 26 41 0.32768000000000000000e5
-2913 2 2 32 0.16384000000000000000e5
-2913 2 3 33 0.16384000000000000000e5
-2913 2 5 27 -0.16384000000000000000e5
-2913 2 8 22 -0.65536000000000000000e5
-2913 2 12 26 0.65536000000000000000e5
-2913 2 16 30 0.32768000000000000000e5
-2913 3 2 31 0.65536000000000000000e5
-2913 3 14 27 0.13107200000000000000e6
-2913 4 4 16 0.65536000000000000000e5
-2913 4 13 13 0.32768000000000000000e5
-2914 4 6 18 -0.32768000000000000000e5
-2914 4 13 14 0.32768000000000000000e5
-2915 1 1 48 -0.16384000000000000000e5
-2915 1 2 49 -0.16384000000000000000e5
-2915 1 5 52 0.65536000000000000000e5
-2915 1 8 39 -0.32768000000000000000e5
-2915 1 10 41 0.13107200000000000000e6
-2915 1 11 42 0.13107200000000000000e6
-2915 1 12 43 0.13107200000000000000e6
-2915 1 17 48 -0.39321600000000000000e6
-2915 1 23 38 -0.16384000000000000000e5
-2915 1 26 29 0.32768000000000000000e5
-2915 1 26 41 0.32768000000000000000e5
-2915 1 28 43 0.65536000000000000000e5
-2915 2 2 32 -0.16384000000000000000e5
-2915 2 4 34 0.32768000000000000000e5
-2915 2 8 22 0.19660800000000000000e6
-2915 2 12 26 -0.65536000000000000000e5
-2915 2 16 30 -0.32768000000000000000e5
-2915 3 2 31 -0.65536000000000000000e5
-2915 3 14 27 -0.26214400000000000000e6
-2915 4 4 16 -0.19660800000000000000e6
-2915 4 6 18 -0.32768000000000000000e5
-2915 4 7 19 -0.65536000000000000000e5
-2915 4 13 15 0.32768000000000000000e5
-2916 4 7 19 -0.32768000000000000000e5
-2916 4 13 16 0.32768000000000000000e5
-2917 2 3 33 -0.32768000000000000000e5
-2917 2 18 32 0.32768000000000000000e5
-2917 4 13 17 0.32768000000000000000e5
-2918 1 6 53 -0.32768000000000000000e5
-2918 1 25 40 0.32768000000000000000e5
-2918 2 3 33 -0.32768000000000000000e5
-2918 2 18 32 0.32768000000000000000e5
-2918 3 3 32 -0.32768000000000000000e5
-2918 3 17 30 0.65536000000000000000e5
-2918 3 22 27 -0.65536000000000000000e5
-2918 4 13 18 0.32768000000000000000e5
-2919 3 5 34 0.32768000000000000000e5
-2919 3 17 30 0.32768000000000000000e5
-2919 3 18 31 -0.65536000000000000000e5
-2919 3 22 27 0.32768000000000000000e5
-2919 4 13 19 0.32768000000000000000e5
-2920 1 6 53 0.32768000000000000000e5
-2920 1 23 54 -0.32768000000000000000e5
-2920 1 24 39 0.32768000000000000000e5
-2920 1 24 55 0.65536000000000000000e5
-2920 1 25 56 -0.32768000000000000000e5
-2920 1 26 41 -0.65536000000000000000e5
-2920 2 3 33 0.32768000000000000000e5
-2920 2 18 32 -0.32768000000000000000e5
-2920 3 3 32 0.32768000000000000000e5
-2920 3 4 33 0.32768000000000000000e5
-2920 3 17 30 -0.65536000000000000000e5
-2920 3 19 32 0.32768000000000000000e5
-2920 3 22 27 0.65536000000000000000e5
-2920 3 28 33 -0.32768000000000000000e5
-2920 4 13 20 0.32768000000000000000e5
-2921 1 2 33 -0.16384000000000000000e5
-2921 1 3 34 0.32768000000000000000e5
-2921 1 11 42 0.16384000000000000000e5
-2921 1 12 43 0.32768000000000000000e5
-2921 1 16 47 -0.32768000000000000000e5
-2921 1 17 48 -0.32768000000000000000e5
-2921 2 7 21 -0.16384000000000000000e5
-2921 2 8 22 0.16384000000000000000e5
-2921 2 10 32 0.16384000000000000000e5
-2921 2 12 26 -0.16384000000000000000e5
-2921 3 7 20 -0.16384000000000000000e5
-2921 3 8 21 -0.16384000000000000000e5
-2921 3 13 26 -0.32768000000000000000e5
-2921 3 14 27 -0.32768000000000000000e5
-2921 4 4 16 -0.16384000000000000000e5
-2921 4 14 14 0.32768000000000000000e5
-2922 2 12 26 -0.32768000000000000000e5
-2922 2 20 34 0.32768000000000000000e5
-2922 4 8 20 0.32768000000000000000e5
-2922 4 14 15 0.32768000000000000000e5
-2923 1 5 52 0.16384000000000000000e5
-2923 1 11 42 -0.16384000000000000000e5
-2923 1 13 44 -0.65536000000000000000e5
-2923 1 34 41 0.65536000000000000000e5
-2923 2 12 26 0.16384000000000000000e5
-2923 2 20 34 -0.16384000000000000000e5
-2923 3 2 31 0.16384000000000000000e5
-2923 3 13 26 0.32768000000000000000e5
-2923 3 14 27 0.65536000000000000000e5
-2923 4 7 19 -0.16384000000000000000e5
-2923 4 8 20 -0.16384000000000000000e5
-2923 4 14 16 0.32768000000000000000e5
-2924 1 3 50 0.32768000000000000000e5
-2924 1 7 54 -0.32768000000000000000e5
-2924 1 11 42 -0.65536000000000000000e5
-2924 1 12 43 -0.13107200000000000000e6
-2924 1 17 48 0.13107200000000000000e6
-2924 1 37 44 0.65536000000000000000e5
-2924 2 8 22 -0.65536000000000000000e5
-2924 2 12 26 0.65536000000000000000e5
-2924 3 2 31 0.65536000000000000000e5
-2924 3 14 27 0.13107200000000000000e6
-2924 3 16 29 0.32768000000000000000e5
-2924 3 17 30 0.32768000000000000000e5
-2924 4 4 16 0.65536000000000000000e5
-2924 4 14 17 0.32768000000000000000e5
-2925 1 3 50 0.32768000000000000000e5
-2925 1 5 52 0.65536000000000000000e5
-2925 1 7 54 -0.32768000000000000000e5
-2925 1 17 48 -0.13107200000000000000e6
-2925 1 28 43 0.65536000000000000000e5
-2925 1 32 47 0.65536000000000000000e5
-2925 2 8 22 0.65536000000000000000e5
-2925 3 17 30 0.32768000000000000000e5
-2925 3 22 27 0.32768000000000000000e5
-2925 4 4 16 -0.65536000000000000000e5
-2925 4 7 19 -0.65536000000000000000e5
-2925 4 14 18 0.32768000000000000000e5
-2926 4 8 20 -0.32768000000000000000e5
-2926 4 14 19 0.32768000000000000000e5
-2927 1 24 55 -0.32768000000000000000e5
-2927 1 26 41 0.32768000000000000000e5
-2927 1 32 47 -0.65536000000000000000e5
-2927 1 37 52 0.65536000000000000000e5
-2927 3 6 35 0.32768000000000000000e5
-2927 3 20 33 0.32768000000000000000e5
-2927 3 22 27 -0.32768000000000000000e5
-2927 4 14 20 0.32768000000000000000e5
-2928 4 7 19 -0.16384000000000000000e5
-2928 4 15 15 0.32768000000000000000e5
-2929 1 5 52 0.16384000000000000000e5
-2929 1 11 42 -0.16384000000000000000e5
-2929 1 13 52 0.65536000000000000000e5
-2929 1 14 45 -0.65536000000000000000e5
-2929 1 17 48 0.32768000000000000000e5
-2929 1 18 25 0.32768000000000000000e5
-2929 1 18 49 0.32768000000000000000e5
-2929 1 28 35 -0.65536000000000000000e5
-2929 2 12 26 0.16384000000000000000e5
-2929 2 20 34 -0.16384000000000000000e5
-2929 2 24 30 0.32768000000000000000e5
-2929 3 2 31 0.16384000000000000000e5
-2929 3 14 19 -0.32768000000000000000e5
-2929 3 14 27 0.65536000000000000000e5
-2929 3 15 28 0.65536000000000000000e5
-2929 4 7 19 -0.16384000000000000000e5
-2929 4 8 20 -0.16384000000000000000e5
-2929 4 15 16 0.32768000000000000000e5
-2930 1 3 50 0.32768000000000000000e5
-2930 1 5 52 0.65536000000000000000e5
-2930 1 7 54 -0.32768000000000000000e5
-2930 1 17 48 -0.13107200000000000000e6
-2930 1 28 43 0.65536000000000000000e5
-2930 1 32 47 0.65536000000000000000e5
-2930 2 8 22 0.65536000000000000000e5
-2930 3 17 30 0.32768000000000000000e5
-2930 3 22 27 0.32768000000000000000e5
-2930 4 4 16 -0.65536000000000000000e5
-2930 4 7 19 -0.65536000000000000000e5
-2930 4 15 17 0.32768000000000000000e5
-2931 3 5 34 0.32768000000000000000e5
-2931 3 17 30 0.32768000000000000000e5
-2931 3 18 31 -0.65536000000000000000e5
-2931 3 22 27 0.32768000000000000000e5
-2931 4 15 18 0.32768000000000000000e5
-2932 1 17 48 0.65536000000000000000e5
-2932 1 28 43 -0.32768000000000000000e5
-2932 1 32 47 -0.32768000000000000000e5
-2932 1 33 48 -0.32768000000000000000e5
-2932 2 8 22 -0.32768000000000000000e5
-2932 3 18 31 0.32768000000000000000e5
-2932 3 24 29 -0.65536000000000000000e5
-2932 4 4 16 0.32768000000000000000e5
-2932 4 7 19 0.32768000000000000000e5
-2932 4 15 19 0.32768000000000000000e5
-2933 2 4 34 -0.32768000000000000000e5
-2933 2 21 35 0.32768000000000000000e5
-2933 3 5 34 -0.32768000000000000000e5
-2933 3 17 30 -0.32768000000000000000e5
-2933 3 18 31 0.65536000000000000000e5
-2933 3 22 27 -0.32768000000000000000e5
-2933 4 15 20 0.32768000000000000000e5
-2934 1 13 44 0.16384000000000000000e5
-2934 1 13 52 -0.16384000000000000000e5
-2934 1 19 42 -0.32768000000000000000e5
-2934 1 19 50 0.32768000000000000000e5
-2934 1 28 35 0.16384000000000000000e5
-2934 1 34 41 -0.16384000000000000000e5
-2934 3 15 28 0.16384000000000000000e5
-2934 4 16 16 0.32768000000000000000e5
-2935 4 8 20 -0.32768000000000000000e5
-2935 4 16 17 0.32768000000000000000e5
-2936 1 17 48 0.65536000000000000000e5
-2936 1 28 43 -0.32768000000000000000e5
-2936 1 32 47 -0.32768000000000000000e5
-2936 1 33 48 -0.32768000000000000000e5
-2936 2 8 22 -0.32768000000000000000e5
-2936 3 18 31 0.32768000000000000000e5
-2936 3 24 29 -0.65536000000000000000e5
-2936 4 4 16 0.32768000000000000000e5
-2936 4 7 19 0.32768000000000000000e5
-2936 4 16 18 0.32768000000000000000e5
-2937 1 5 52 -0.16384000000000000000e5
-2937 1 11 42 0.16384000000000000000e5
-2937 1 12 43 0.32768000000000000000e5
-2937 1 13 52 -0.65536000000000000000e5
-2937 1 14 45 0.65536000000000000000e5
-2937 1 16 55 0.65536000000000000000e5
-2937 1 17 48 -0.32768000000000000000e5
-2937 1 18 49 -0.32768000000000000000e5
-2937 1 28 43 -0.16384000000000000000e5
-2937 1 32 47 -0.16384000000000000000e5
-2937 1 34 49 -0.32768000000000000000e5
-2937 1 37 44 -0.16384000000000000000e5
-2937 2 12 26 -0.16384000000000000000e5
-2937 2 24 30 -0.32768000000000000000e5
-2937 3 2 31 -0.16384000000000000000e5
-2937 3 14 27 -0.32768000000000000000e5
-2937 3 15 28 -0.65536000000000000000e5
-2937 3 18 31 0.16384000000000000000e5
-2937 3 24 29 0.32768000000000000000e5
-2937 4 7 19 0.16384000000000000000e5
-2937 4 8 20 0.16384000000000000000e5
-2937 4 16 19 0.32768000000000000000e5
-2938 1 2 49 0.32768000000000000000e5
-2938 1 7 54 -0.65536000000000000000e5
-2938 1 22 53 0.32768000000000000000e5
-2938 1 24 39 0.32768000000000000000e5
-2938 2 3 33 0.32768000000000000000e5
-2938 2 18 32 -0.32768000000000000000e5
-2938 2 26 32 0.32768000000000000000e5
-2938 3 4 33 0.32768000000000000000e5
-2938 3 6 35 0.65536000000000000000e5
-2938 3 17 30 -0.65536000000000000000e5
-2938 3 19 32 0.32768000000000000000e5
-2938 3 20 33 -0.65536000000000000000e5
-2938 4 17 18 0.32768000000000000000e5
-2939 1 24 55 -0.32768000000000000000e5
-2939 1 26 41 0.32768000000000000000e5
-2939 1 32 47 -0.65536000000000000000e5
-2939 1 37 52 0.65536000000000000000e5
-2939 3 6 35 0.32768000000000000000e5
-2939 3 20 33 0.32768000000000000000e5
-2939 3 22 27 -0.32768000000000000000e5
-2939 4 17 19 0.32768000000000000000e5
-2940 1 2 49 -0.32768000000000000000e5
-2940 1 7 54 0.65536000000000000000e5
-2940 1 22 53 -0.32768000000000000000e5
-2940 1 24 39 -0.32768000000000000000e5
-2940 2 3 33 -0.32768000000000000000e5
-2940 2 26 32 -0.32768000000000000000e5
-2940 2 32 32 0.65536000000000000000e5
-2940 3 4 33 -0.32768000000000000000e5
-2940 3 6 35 -0.65536000000000000000e5
-2940 3 17 30 0.65536000000000000000e5
-2940 3 19 32 -0.32768000000000000000e5
-2940 3 20 33 0.65536000000000000000e5
-2940 4 17 20 0.32768000000000000000e5
-2941 1 6 53 0.16384000000000000000e5
-2941 1 23 54 -0.16384000000000000000e5
-2941 1 24 39 0.16384000000000000000e5
-2941 1 24 55 0.32768000000000000000e5
-2941 1 25 56 -0.16384000000000000000e5
-2941 1 26 41 -0.32768000000000000000e5
-2941 2 3 33 0.16384000000000000000e5
-2941 2 18 32 -0.16384000000000000000e5
-2941 3 3 32 0.16384000000000000000e5
-2941 3 4 33 0.16384000000000000000e5
-2941 3 17 30 -0.32768000000000000000e5
-2941 3 19 32 0.16384000000000000000e5
-2941 3 22 27 0.32768000000000000000e5
-2941 3 28 33 -0.16384000000000000000e5
-2941 4 18 18 0.32768000000000000000e5
-2942 2 4 34 -0.32768000000000000000e5
-2942 2 21 35 0.32768000000000000000e5
-2942 3 5 34 -0.32768000000000000000e5
-2942 3 17 30 -0.32768000000000000000e5
-2942 3 18 31 0.65536000000000000000e5
-2942 3 22 27 -0.32768000000000000000e5
-2942 4 18 19 0.32768000000000000000e5
-2943 1 1 48 -0.65536000000000000000e5
-2943 1 2 49 -0.98304000000000000000e5
-2943 1 3 50 -0.13107200000000000000e6
-2943 1 11 42 0.26214400000000000000e6
-2943 1 12 43 0.52428800000000000000e6
-2943 1 17 48 -0.52428800000000000000e6
-2943 1 23 38 -0.65536000000000000000e5
-2943 1 23 54 0.32768000000000000000e5
-2943 1 24 39 -0.32768000000000000000e5
-2943 1 38 53 -0.32768000000000000000e5
-2943 1 47 50 -0.65536000000000000000e5
-2943 1 47 54 -0.32768000000000000000e5
-2943 2 2 32 -0.65536000000000000000e5
-2943 2 3 33 -0.32768000000000000000e5
-2943 2 8 22 0.26214400000000000000e6
-2943 2 12 26 -0.26214400000000000000e6
-2943 2 16 30 -0.13107200000000000000e6
-2943 2 21 35 0.65536000000000000000e5
-2943 2 29 35 -0.65536000000000000000e5
-2943 3 2 31 -0.26214400000000000000e6
-2943 3 4 33 -0.32768000000000000000e5
-2943 3 14 27 -0.52428800000000000000e6
-2943 3 17 30 -0.65536000000000000000e5
-2943 3 19 32 -0.32768000000000000000e5
-2943 3 20 33 -0.65536000000000000000e5
-2943 3 22 35 0.65536000000000000000e5
-2943 3 28 33 0.32768000000000000000e5
-2943 3 29 34 -0.13107200000000000000e6
-2943 3 32 33 -0.32768000000000000000e5
-2943 4 4 16 -0.26214400000000000000e6
-2943 4 18 20 0.32768000000000000000e5
-2944 4 16 20 -0.16384000000000000000e5
-2944 4 19 19 0.32768000000000000000e5
-2945 2 21 35 -0.32768000000000000000e5
-2945 2 29 35 0.32768000000000000000e5
-2945 4 19 20 0.32768000000000000000e5
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-4310
-4
-56 35 56 35
--0.13107200000000000000e6 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.65536000000000000000e5 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.39321600000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 0.0 -0.65536000000000000000e5 -0.13107200000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 -0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.39321600000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.39321600000000000000e6 -0.52428800000000000000e6 -0.13107200000000000000e6 -0.65536000000000000000e5 0.65536000000000000000e5 0.0 0.13107200000000000000e6 0.0 0.0 0.16384000000000000000e6 0.0 0.0 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 -0.65536000000000000000e6 0.26214400000000000000e6 0.10485760000000000000e7 0.26214400000000000000e6 0.0 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.10485760000000000000e7 0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.65536000000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.10485760000000000000e7 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 -0.13107200000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.13107200000000000000e6 0.0 -0.65536000000000000000e5 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 -0.13107200000000000000e6 -0.13107200000000000000e6 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.65536000000000000000e5 -0.16384000000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.32768000000000000000e6 0.0 0.0 -0.13107200000000000000e6 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.32768000000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.0 -0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.65536000000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.13107200000000000000e6 -0.13107200000000000000e7 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 -0.10485760000000000000e7 -0.52428800000000000000e6 0.0 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 -0.10485760000000000000e7 0.0 0.0 0.0 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.26214400000000000000e6 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.65536000000000000000e5 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.26214400000000000000e6 -0.65536000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.65536000000000000000e5 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.16384000000000000000e6 0.65536000000000000000e5 -0.52428800000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.65536000000000000000e6 0.0 0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 -0.65536000000000000000e6 0.0 0.0 0.32768000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 -0.13107200000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.13107200000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.26214400000000000000e6 0.0 -0.26214400000000000000e6 -0.26214400000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 -0.26214400000000000000e6 0.26214400000000000000e6 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.65536000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.65536000000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.52428800000000000000e6 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.52428800000000000000e6 0.0 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 0.0 -0.26214400000000000000e6 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.13107200000000000000e6 0.0 0.0 0.0 0.0 0.0 0.26214400000000000000e6 0.0 0.0 0.13107200000000000000e6 0.0
-0 1 1 8 -0.65536000000000000000e5
-0 1 2 5 -0.32768000000000000000e5
-0 1 2 9 0.65536000000000000000e5
-0 1 2 25 0.32768000000000000000e5
-0 1 7 22 0.65536000000000000000e5
-0 1 8 23 -0.65536000000000000000e5
-0 2 1 1 -0.65536000000000000000e5
-0 3 1 22 -0.32768000000000000000e5
-0 3 2 3 -0.32768000000000000000e5
-0 4 1 1 0.65536000000000000000e5
-0 4 2 2 -0.65536000000000000000e5
-1 1 40 55 0.65536000000000000000e5
-1 1 55 56 -0.65536000000000000000e5
-1 3 49 50 -0.65536000000000000000e5
-1 3 53 54 -0.32768000000000000000e5
-1 3 53 56 -0.32768000000000000000e5
-1 3 54 56 -0.32768000000000000000e5
-1 3 56 56 -0.65536000000000000000e5
-2 1 1 48 0.16384000000000000000e5
-2 1 2 49 0.16384000000000000000e5
-2 1 8 39 0.32768000000000000000e5
-2 1 9 40 0.32768000000000000000e5
-2 1 10 41 -0.65536000000000000000e5
-2 1 12 43 -0.13107200000000000000e6
-2 1 23 38 0.16384000000000000000e5
-2 1 26 41 -0.32768000000000000000e5
-2 1 28 43 0.13107200000000000000e6
-2 1 32 47 0.13107200000000000000e6
-2 1 33 48 -0.65536000000000000000e5
-2 1 55 56 0.32768000000000000000e5
-2 2 2 32 0.16384000000000000000e5
-2 2 4 34 -0.32768000000000000000e5
-2 2 16 30 0.32768000000000000000e5
-2 2 20 34 0.65536000000000000000e5
-2 2 28 34 0.32768000000000000000e5
-2 3 5 50 -0.32768000000000000000e5
-2 3 9 38 0.32768000000000000000e5
-2 3 10 55 0.65536000000000000000e5
-2 3 14 51 0.13107200000000000000e6
-2 3 22 35 0.13107200000000000000e6
-2 3 26 55 -0.32768000000000000000e5
-2 3 27 40 -0.32768000000000000000e5
-2 3 28 41 0.13107200000000000000e6
-2 3 29 42 -0.65536000000000000000e5
-2 3 30 43 -0.65536000000000000000e5
-2 3 39 52 0.65536000000000000000e5
-2 3 40 55 -0.32768000000000000000e5
-2 3 42 55 0.65536000000000000000e5
-2 3 43 56 -0.32768000000000000000e5
-2 3 50 55 0.65536000000000000000e5
-2 3 51 56 -0.32768000000000000000e5
-2 3 55 56 -0.32768000000000000000e5
-2 4 2 30 0.32768000000000000000e5
-2 4 6 34 0.65536000000000000000e5
-2 4 19 31 -0.65536000000000000000e5
-2 4 21 33 0.32768000000000000000e5
-3 1 40 55 0.65536000000000000000e5
-3 1 54 55 -0.65536000000000000000e5
-3 3 49 50 -0.65536000000000000000e5
-3 3 53 54 -0.32768000000000000000e5
-3 3 54 56 -0.32768000000000000000e5
-4 1 1 48 -0.32768000000000000000e5
-4 1 2 49 -0.32768000000000000000e5
-4 1 8 39 -0.65536000000000000000e5
-4 1 9 40 -0.65536000000000000000e5
-4 1 10 41 0.13107200000000000000e6
-4 1 12 43 0.26214400000000000000e6
-4 1 23 38 -0.32768000000000000000e5
-4 1 24 55 0.65536000000000000000e5
-4 1 26 41 0.65536000000000000000e5
-4 1 28 43 -0.26214400000000000000e6
-4 1 32 47 -0.26214400000000000000e6
-4 1 49 56 0.32768000000000000000e5
-4 1 53 56 0.32768000000000000000e5
-4 2 2 32 -0.32768000000000000000e5
-4 2 4 34 0.65536000000000000000e5
-4 2 16 30 -0.65536000000000000000e5
-4 2 20 34 -0.13107200000000000000e6
-4 3 5 50 0.65536000000000000000e5
-4 3 9 38 -0.65536000000000000000e5
-4 3 22 35 -0.26214400000000000000e6
-4 3 22 51 -0.65536000000000000000e5
-4 3 23 52 0.13107200000000000000e6
-4 3 27 40 0.65536000000000000000e5
-4 3 28 41 -0.26214400000000000000e6
-4 3 38 51 0.65536000000000000000e5
-4 3 41 54 0.65536000000000000000e5
-4 3 41 56 0.65536000000000000000e5
-4 3 53 54 -0.32768000000000000000e5
-4 3 53 56 -0.32768000000000000000e5
-4 4 2 30 -0.65536000000000000000e5
-4 4 6 34 -0.13107200000000000000e6
-4 4 7 35 -0.65536000000000000000e5
-5 1 18 49 0.65536000000000000000e5
-5 1 52 55 -0.65536000000000000000e5
-5 3 14 51 -0.65536000000000000000e5
-5 3 35 48 -0.65536000000000000000e5
-5 3 45 50 -0.65536000000000000000e5
-5 3 50 55 -0.32768000000000000000e5
-5 3 55 55 -0.65536000000000000000e5
-6 1 1 48 0.16384000000000000000e5
-6 1 2 49 0.16384000000000000000e5
-6 1 8 39 0.32768000000000000000e5
-6 1 9 40 0.32768000000000000000e5
-6 1 10 41 -0.65536000000000000000e5
-6 1 12 43 -0.13107200000000000000e6
-6 1 23 38 0.16384000000000000000e5
-6 1 26 41 -0.32768000000000000000e5
-6 1 28 43 0.13107200000000000000e6
-6 1 32 47 0.13107200000000000000e6
-6 1 33 48 -0.65536000000000000000e5
-6 1 54 55 0.32768000000000000000e5
-6 2 2 32 0.16384000000000000000e5
-6 2 4 34 -0.32768000000000000000e5
-6 2 16 30 0.32768000000000000000e5
-6 2 20 34 0.65536000000000000000e5
-6 2 28 34 0.32768000000000000000e5
-6 3 5 50 -0.32768000000000000000e5
-6 3 9 38 0.32768000000000000000e5
-6 3 10 55 0.65536000000000000000e5
-6 3 14 51 0.13107200000000000000e6
-6 3 22 35 0.13107200000000000000e6
-6 3 26 55 -0.32768000000000000000e5
-6 3 27 40 -0.32768000000000000000e5
-6 3 28 41 0.13107200000000000000e6
-6 3 29 42 -0.65536000000000000000e5
-6 3 30 43 -0.65536000000000000000e5
-6 3 39 52 0.65536000000000000000e5
-6 3 40 55 -0.32768000000000000000e5
-6 3 42 55 0.65536000000000000000e5
-6 3 43 56 -0.32768000000000000000e5
-6 3 51 56 -0.32768000000000000000e5
-6 4 2 30 0.32768000000000000000e5
-6 4 6 34 0.65536000000000000000e5
-6 4 19 31 -0.65536000000000000000e5
-6 4 21 33 0.32768000000000000000e5
-7 1 40 55 -0.32768000000000000000e5
-7 1 41 56 -0.32768000000000000000e5
-7 1 55 56 0.32768000000000000000e5
-7 2 28 34 -0.32768000000000000000e5
-7 3 27 56 -0.32768000000000000000e5
-7 3 41 54 -0.32768000000000000000e5
-7 3 41 56 -0.32768000000000000000e5
-7 3 47 52 0.65536000000000000000e5
-7 4 29 33 0.32768000000000000000e5
-8 1 1 48 -0.65536000000000000000e5
-8 1 2 49 -0.98304000000000000000e5
-8 1 6 53 0.32768000000000000000e5
-8 1 8 39 -0.13107200000000000000e6
-8 1 9 40 -0.13107200000000000000e6
-8 1 10 41 0.26214400000000000000e6
-8 1 12 43 0.52428800000000000000e6
-8 1 23 38 -0.65536000000000000000e5
-8 1 24 39 -0.32768000000000000000e5
-8 1 26 41 0.19660800000000000000e6
-8 1 28 43 -0.39321600000000000000e6
-8 1 32 47 -0.52428800000000000000e6
-8 1 47 54 -0.32768000000000000000e5
-8 1 49 56 0.32768000000000000000e5
-8 2 2 32 -0.65536000000000000000e5
-8 2 3 33 -0.32768000000000000000e5
-8 2 4 34 0.65536000000000000000e5
-8 2 5 35 0.32768000000000000000e5
-8 2 16 30 -0.13107200000000000000e6
-8 2 20 34 -0.26214400000000000000e6
-8 2 33 35 -0.32768000000000000000e5
-8 3 5 50 0.65536000000000000000e5
-8 3 9 38 -0.13107200000000000000e6
-8 3 22 35 -0.52428800000000000000e6
-8 3 25 38 -0.32768000000000000000e5
-8 3 25 54 0.32768000000000000000e5
-8 3 28 41 -0.52428800000000000000e6
-8 3 39 40 0.32768000000000000000e5
-8 3 40 53 0.32768000000000000000e5
-8 3 48 53 -0.32768000000000000000e5
-8 3 53 54 -0.32768000000000000000e5
-8 4 2 30 -0.13107200000000000000e6
-8 4 6 34 -0.26214400000000000000e6
-9 1 1 48 0.65536000000000000000e5
-9 1 2 49 0.98304000000000000000e5
-9 1 6 53 -0.32768000000000000000e5
-9 1 8 39 0.13107200000000000000e6
-9 1 9 40 0.13107200000000000000e6
-9 1 10 41 -0.26214400000000000000e6
-9 1 12 43 -0.52428800000000000000e6
-9 1 23 38 0.65536000000000000000e5
-9 1 24 39 0.32768000000000000000e5
-9 1 26 41 -0.19660800000000000000e6
-9 1 28 43 0.39321600000000000000e6
-9 1 32 47 0.52428800000000000000e6
-9 1 41 56 -0.65536000000000000000e5
-9 1 47 54 0.32768000000000000000e5
-9 1 49 56 -0.32768000000000000000e5
-9 1 53 56 0.32768000000000000000e5
-9 2 2 32 0.65536000000000000000e5
-9 2 3 33 0.32768000000000000000e5
-9 2 4 34 -0.65536000000000000000e5
-9 2 5 35 -0.32768000000000000000e5
-9 2 16 30 0.13107200000000000000e6
-9 2 20 34 0.26214400000000000000e6
-9 2 33 35 0.32768000000000000000e5
-9 2 35 35 -0.65536000000000000000e5
-9 3 5 50 -0.65536000000000000000e5
-9 3 9 38 0.13107200000000000000e6
-9 3 22 35 0.52428800000000000000e6
-9 3 25 38 0.32768000000000000000e5
-9 3 25 54 -0.32768000000000000000e5
-9 3 28 41 0.52428800000000000000e6
-9 3 39 40 -0.32768000000000000000e5
-9 3 40 53 -0.32768000000000000000e5
-9 3 41 56 -0.65536000000000000000e5
-9 3 48 53 0.32768000000000000000e5
-9 4 2 30 0.13107200000000000000e6
-9 4 6 34 0.26214400000000000000e6
-10 1 18 49 -0.32768000000000000000e5
-10 1 34 49 0.32768000000000000000e5
-10 1 44 51 -0.32768000000000000000e5
-10 1 52 55 0.32768000000000000000e5
-10 3 14 43 -0.32768000000000000000e5
-10 3 15 44 0.65536000000000000000e5
-10 3 17 30 0.65536000000000000000e5
-10 3 19 56 0.65536000000000000000e5
-10 3 32 45 0.65536000000000000000e5
-10 3 35 40 -0.32768000000000000000e5
-10 3 35 48 0.32768000000000000000e5
-10 3 35 56 -0.32768000000000000000e5
-10 3 43 52 -0.32768000000000000000e5
-10 3 52 55 -0.32768000000000000000e5
-10 4 25 33 0.32768000000000000000e5
-11 1 1 48 0.81920000000000000000e4
-11 1 2 49 0.81920000000000000000e4
-11 1 8 39 0.16384000000000000000e5
-11 1 9 40 0.16384000000000000000e5
-11 1 10 41 -0.32768000000000000000e5
-11 1 12 43 -0.65536000000000000000e5
-11 1 23 38 0.81920000000000000000e4
-11 1 24 55 -0.16384000000000000000e5
-11 1 26 41 -0.16384000000000000000e5
-11 1 28 43 0.65536000000000000000e5
-11 1 32 47 0.65536000000000000000e5
-11 1 33 40 0.32768000000000000000e5
-11 1 40 55 0.16384000000000000000e5
-11 1 41 56 0.16384000000000000000e5
-11 1 46 53 -0.65536000000000000000e5
-11 2 2 32 0.81920000000000000000e4
-11 2 4 34 -0.16384000000000000000e5
-11 2 16 30 0.16384000000000000000e5
-11 2 20 34 0.32768000000000000000e5
-11 2 28 34 0.16384000000000000000e5
-11 3 5 50 -0.16384000000000000000e5
-11 3 9 38 0.16384000000000000000e5
-11 3 10 55 -0.32768000000000000000e5
-11 3 14 51 -0.65536000000000000000e5
-11 3 22 35 0.65536000000000000000e5
-11 3 22 51 0.16384000000000000000e5
-11 3 23 52 -0.32768000000000000000e5
-11 3 27 40 -0.16384000000000000000e5
-11 3 27 56 0.16384000000000000000e5
-11 3 28 41 0.65536000000000000000e5
-11 3 29 42 0.32768000000000000000e5
-11 3 30 43 0.32768000000000000000e5
-11 3 38 51 -0.16384000000000000000e5
-11 3 39 52 -0.32768000000000000000e5
-11 3 42 55 -0.32768000000000000000e5
-11 3 47 52 -0.32768000000000000000e5
-11 3 50 55 -0.32768000000000000000e5
-11 4 2 30 0.16384000000000000000e5
-11 4 6 34 0.32768000000000000000e5
-11 4 7 35 0.16384000000000000000e5
-11 4 19 31 0.32768000000000000000e5
-11 4 29 33 -0.16384000000000000000e5
-12 1 1 48 0.16384000000000000000e5
-12 1 2 49 0.16384000000000000000e5
-12 1 8 39 0.32768000000000000000e5
-12 1 9 40 0.32768000000000000000e5
-12 1 10 41 -0.65536000000000000000e5
-12 1 12 43 -0.13107200000000000000e6
-12 1 23 38 0.16384000000000000000e5
-12 1 26 41 -0.32768000000000000000e5
-12 1 28 43 0.13107200000000000000e6
-12 1 32 47 0.13107200000000000000e6
-12 1 33 48 -0.65536000000000000000e5
-12 1 40 55 0.32768000000000000000e5
-12 2 2 32 0.16384000000000000000e5
-12 2 4 34 -0.32768000000000000000e5
-12 2 16 30 0.32768000000000000000e5
-12 2 20 34 0.65536000000000000000e5
-12 2 28 34 0.32768000000000000000e5
-12 3 5 50 -0.32768000000000000000e5
-12 3 9 38 0.32768000000000000000e5
-12 3 10 55 0.65536000000000000000e5
-12 3 14 51 0.13107200000000000000e6
-12 3 22 35 0.13107200000000000000e6
-12 3 26 55 -0.32768000000000000000e5
-12 3 27 40 -0.32768000000000000000e5
-12 3 28 41 0.13107200000000000000e6
-12 3 29 42 -0.65536000000000000000e5
-12 3 30 43 -0.65536000000000000000e5
-12 3 39 52 0.65536000000000000000e5
-12 3 40 55 -0.32768000000000000000e5
-12 3 43 56 -0.32768000000000000000e5
-12 3 49 50 -0.32768000000000000000e5
-12 4 2 30 0.32768000000000000000e5
-12 4 6 34 0.65536000000000000000e5
-12 4 19 31 -0.65536000000000000000e5
-12 4 21 33 0.32768000000000000000e5
-13 1 40 55 -0.32768000000000000000e5
-13 1 41 56 -0.32768000000000000000e5
-13 1 54 55 0.32768000000000000000e5
-13 2 28 34 -0.32768000000000000000e5
-13 3 27 56 -0.32768000000000000000e5
-13 3 41 54 -0.32768000000000000000e5
-13 4 29 33 0.32768000000000000000e5
-14 1 1 48 0.32768000000000000000e5
-14 1 2 49 0.32768000000000000000e5
-14 1 6 53 0.16384000000000000000e5
-14 1 8 39 0.65536000000000000000e5
-14 1 9 40 0.65536000000000000000e5
-14 1 10 41 -0.13107200000000000000e6
-14 1 12 43 -0.26214400000000000000e6
-14 1 23 38 0.32768000000000000000e5
-14 1 24 55 -0.65536000000000000000e5
-14 1 25 40 -0.16384000000000000000e5
-14 1 26 41 -0.65536000000000000000e5
-14 1 28 43 0.19660800000000000000e6
-14 1 32 47 0.26214400000000000000e6
-14 1 33 48 -0.65536000000000000000e5
-14 1 40 55 0.32768000000000000000e5
-14 1 41 56 0.65536000000000000000e5
-14 1 44 51 0.13107200000000000000e6
-14 1 46 53 -0.13107200000000000000e6
-14 2 2 32 0.32768000000000000000e5
-14 2 4 34 -0.32768000000000000000e5
-14 2 16 30 0.65536000000000000000e5
-14 2 20 34 0.13107200000000000000e6
-14 2 21 35 -0.32768000000000000000e5
-14 2 28 34 0.32768000000000000000e5
-14 3 5 50 -0.32768000000000000000e5
-14 3 9 38 0.65536000000000000000e5
-14 3 10 55 -0.65536000000000000000e5
-14 3 22 35 0.26214400000000000000e6
-14 3 22 51 0.65536000000000000000e5
-14 3 23 52 -0.65536000000000000000e5
-14 3 24 37 0.16384000000000000000e5
-14 3 27 56 0.32768000000000000000e5
-14 3 28 41 0.26214400000000000000e6
-14 3 35 48 0.13107200000000000000e6
-14 3 38 51 -0.65536000000000000000e5
-14 3 39 52 -0.65536000000000000000e5
-14 3 40 45 -0.65536000000000000000e5
-14 3 41 54 -0.32768000000000000000e5
-14 3 41 56 -0.32768000000000000000e5
-14 4 2 30 0.65536000000000000000e5
-14 4 4 32 -0.16384000000000000000e5
-14 4 6 34 0.13107200000000000000e6
-14 4 7 35 0.32768000000000000000e5
-14 4 16 28 0.16384000000000000000e5
-14 4 22 34 -0.65536000000000000000e5
-14 4 23 35 -0.65536000000000000000e5
-14 4 29 33 -0.32768000000000000000e5
-15 1 1 48 0.98304000000000000000e5
-15 1 2 49 0.16384000000000000000e6
-15 1 6 53 -0.65536000000000000000e5
-15 1 8 39 0.19660800000000000000e6
-15 1 9 40 0.19660800000000000000e6
-15 1 10 41 -0.39321600000000000000e6
-15 1 12 43 -0.78643200000000000000e6
-15 1 23 38 0.98304000000000000000e5
-15 1 24 39 0.65536000000000000000e5
-15 1 24 55 0.65536000000000000000e5
-15 1 26 41 -0.32768000000000000000e6
-15 1 28 43 0.52428800000000000000e6
-15 1 32 47 0.78643200000000000000e6
-15 1 47 54 0.32768000000000000000e5
-15 1 49 56 -0.32768000000000000000e5
-15 1 53 56 0.32768000000000000000e5
-15 1 54 55 0.65536000000000000000e5
-15 1 55 56 -0.65536000000000000000e5
-15 2 2 32 0.98304000000000000000e5
-15 2 3 33 0.65536000000000000000e5
-15 2 4 34 -0.65536000000000000000e5
-15 2 5 35 -0.65536000000000000000e5
-15 2 16 30 0.19660800000000000000e6
-15 2 20 34 0.39321600000000000000e6
-15 2 33 35 0.32768000000000000000e5
-15 3 5 50 -0.65536000000000000000e5
-15 3 9 38 0.19660800000000000000e6
-15 3 22 35 0.78643200000000000000e6
-15 3 22 51 -0.65536000000000000000e5
-15 3 23 52 0.13107200000000000000e6
-15 3 25 38 0.65536000000000000000e5
-15 3 25 54 -0.65536000000000000000e5
-15 3 27 40 0.65536000000000000000e5
-15 3 28 41 0.78643200000000000000e6
-15 3 38 51 0.65536000000000000000e5
-15 3 39 40 -0.65536000000000000000e5
-15 3 40 53 -0.65536000000000000000e5
-15 3 41 54 0.65536000000000000000e5
-15 3 48 53 0.32768000000000000000e5
-15 3 49 50 -0.65536000000000000000e5
-15 3 53 54 -0.32768000000000000000e5
-15 4 2 30 0.19660800000000000000e6
-15 4 6 34 0.39321600000000000000e6
-15 4 7 35 -0.65536000000000000000e5
-15 4 35 35 -0.65536000000000000000e5
-16 1 1 48 -0.65536000000000000000e5
-16 1 2 49 -0.98304000000000000000e5
-16 1 6 53 0.32768000000000000000e5
-16 1 8 39 -0.13107200000000000000e6
-16 1 9 40 -0.13107200000000000000e6
-16 1 10 41 0.26214400000000000000e6
-16 1 12 43 0.52428800000000000000e6
-16 1 23 38 -0.65536000000000000000e5
-16 1 24 39 -0.32768000000000000000e5
-16 1 26 41 0.19660800000000000000e6
-16 1 28 43 -0.39321600000000000000e6
-16 1 32 47 -0.52428800000000000000e6
-16 1 47 54 -0.32768000000000000000e5
-16 1 49 56 0.32768000000000000000e5
-16 2 2 32 -0.65536000000000000000e5
-16 2 3 33 -0.32768000000000000000e5
-16 2 4 34 0.65536000000000000000e5
-16 2 5 35 0.32768000000000000000e5
-16 2 16 30 -0.13107200000000000000e6
-16 2 20 34 -0.26214400000000000000e6
-16 2 33 35 -0.32768000000000000000e5
-16 3 5 50 0.65536000000000000000e5
-16 3 9 38 -0.13107200000000000000e6
-16 3 22 35 -0.52428800000000000000e6
-16 3 25 38 -0.32768000000000000000e5
-16 3 25 54 0.32768000000000000000e5
-16 3 28 41 -0.52428800000000000000e6
-16 3 39 40 0.32768000000000000000e5
-16 3 40 53 0.32768000000000000000e5
-16 3 41 54 -0.65536000000000000000e5
-16 4 2 30 -0.13107200000000000000e6
-16 4 6 34 -0.26214400000000000000e6
-17 1 1 48 -0.32768000000000000000e5
-17 1 2 49 -0.65536000000000000000e5
-17 1 6 53 0.32768000000000000000e5
-17 1 8 39 -0.65536000000000000000e5
-17 1 9 40 -0.65536000000000000000e5
-17 1 10 41 0.13107200000000000000e6
-17 1 12 43 0.26214400000000000000e6
-17 1 23 38 -0.32768000000000000000e5
-17 1 24 39 -0.32768000000000000000e5
-17 1 24 55 -0.65536000000000000000e5
-17 1 26 41 0.13107200000000000000e6
-17 1 28 43 -0.13107200000000000000e6
-17 1 32 47 -0.26214400000000000000e6
-17 1 41 56 -0.65536000000000000000e5
-17 2 2 32 -0.32768000000000000000e5
-17 2 3 33 -0.32768000000000000000e5
-17 2 5 35 0.32768000000000000000e5
-17 2 16 30 -0.65536000000000000000e5
-17 2 20 34 -0.13107200000000000000e6
-17 2 33 35 -0.32768000000000000000e5
-17 3 9 38 -0.65536000000000000000e5
-17 3 22 35 -0.26214400000000000000e6
-17 3 22 51 0.65536000000000000000e5
-17 3 23 52 -0.13107200000000000000e6
-17 3 25 38 -0.32768000000000000000e5
-17 3 25 54 0.32768000000000000000e5
-17 3 27 40 -0.65536000000000000000e5
-17 3 27 56 -0.65536000000000000000e5
-17 3 28 41 -0.26214400000000000000e6
-17 3 38 51 -0.65536000000000000000e5
-17 3 39 40 0.32768000000000000000e5
-17 3 40 53 0.32768000000000000000e5
-17 3 41 54 -0.65536000000000000000e5
-17 3 48 53 -0.32768000000000000000e5
-17 4 2 30 -0.65536000000000000000e5
-17 4 6 34 -0.13107200000000000000e6
-17 4 7 35 0.65536000000000000000e5
-18 1 1 48 0.13107200000000000000e6
-18 1 2 49 0.19660800000000000000e6
-18 1 6 53 -0.32768000000000000000e5
-18 1 8 39 0.26214400000000000000e6
-18 1 9 40 0.26214400000000000000e6
-18 1 10 41 -0.52428800000000000000e6
-18 1 12 43 -0.10485760000000000000e7
-18 1 23 38 0.13107200000000000000e6
-18 1 24 39 0.65536000000000000000e5
-18 1 24 55 0.65536000000000000000e5
-18 1 25 40 -0.32768000000000000000e5
-18 1 25 56 0.32768000000000000000e5
-18 1 26 41 -0.39321600000000000000e6
-18 1 28 43 0.65536000000000000000e6
-18 1 32 47 0.10485760000000000000e7
-18 1 38 53 0.32768000000000000000e5
-18 1 40 47 0.32768000000000000000e5
-18 1 47 54 0.32768000000000000000e5
-18 1 49 56 -0.32768000000000000000e5
-18 2 2 32 0.13107200000000000000e6
-18 2 3 33 0.65536000000000000000e5
-18 2 4 34 -0.65536000000000000000e5
-18 2 5 35 -0.65536000000000000000e5
-18 2 16 30 0.26214400000000000000e6
-18 2 20 34 0.52428800000000000000e6
-18 2 33 35 0.65536000000000000000e5
-18 2 35 35 -0.65536000000000000000e5
-18 3 5 50 -0.65536000000000000000e5
-18 3 9 38 0.26214400000000000000e6
-18 3 22 35 0.10485760000000000000e7
-18 3 23 52 0.13107200000000000000e6
-18 3 24 37 0.32768000000000000000e5
-18 3 24 53 -0.32768000000000000000e5
-18 3 25 38 0.65536000000000000000e5
-18 3 25 54 -0.65536000000000000000e5
-18 3 27 40 0.13107200000000000000e6
-18 3 27 56 -0.65536000000000000000e5
-18 3 28 41 0.10485760000000000000e7
-18 3 37 50 0.65536000000000000000e5
-18 3 38 51 0.65536000000000000000e5
-18 3 39 40 -0.65536000000000000000e5
-18 3 40 53 -0.65536000000000000000e5
-18 3 41 54 0.65536000000000000000e5
-18 3 41 56 -0.65536000000000000000e5
-18 3 48 53 0.32768000000000000000e5
-18 4 2 30 0.26214400000000000000e6
-18 4 4 32 -0.32768000000000000000e5
-18 4 6 34 0.52428800000000000000e6
-18 4 7 35 -0.65536000000000000000e5
-18 4 16 28 0.32768000000000000000e5
-18 4 32 32 0.65536000000000000000e5
-19 1 20 51 0.65536000000000000000e5
-19 1 36 51 -0.65536000000000000000e5
-19 3 19 56 -0.32768000000000000000e5
-19 3 36 49 0.32768000000000000000e5
-19 3 41 46 0.32768000000000000000e5
-19 3 46 51 -0.32768000000000000000e5
-19 3 46 55 -0.32768000000000000000e5
-19 4 15 35 0.32768000000000000000e5
-20 1 34 49 0.32768000000000000000e5
-20 1 44 51 -0.32768000000000000000e5
-20 3 14 43 -0.32768000000000000000e5
-20 3 14 51 -0.32768000000000000000e5
-20 3 15 44 0.65536000000000000000e5
-20 3 17 30 0.65536000000000000000e5
-20 3 32 45 0.65536000000000000000e5
-20 3 35 40 -0.32768000000000000000e5
-20 3 35 56 -0.32768000000000000000e5
-20 3 43 52 -0.32768000000000000000e5
-20 3 45 50 -0.32768000000000000000e5
-20 4 25 33 0.32768000000000000000e5
-21 1 14 45 -0.13107200000000000000e6
-21 1 17 48 0.32768000000000000000e5
-21 1 18 49 0.32768000000000000000e5
-21 1 34 49 0.32768000000000000000e5
-21 1 46 53 0.32768000000000000000e5
-21 1 52 55 0.32768000000000000000e5
-21 2 14 28 0.32768000000000000000e5
-21 3 14 43 0.32768000000000000000e5
-21 3 15 44 -0.65536000000000000000e5
-21 3 16 45 0.13107200000000000000e6
-21 3 18 47 0.32768000000000000000e5
-21 3 19 48 0.65536000000000000000e5
-21 3 22 35 -0.32768000000000000000e5
-21 3 41 46 0.65536000000000000000e5
-21 4 14 26 -0.32768000000000000000e5
-21 4 15 27 -0.65536000000000000000e5
-22 3 42 55 0.32768000000000000000e5
-22 3 45 50 -0.65536000000000000000e5
-22 3 45 56 0.32768000000000000000e5
-23 1 1 48 0.81920000000000000000e4
-23 1 2 49 0.81920000000000000000e4
-23 1 8 39 0.16384000000000000000e5
-23 1 9 40 0.16384000000000000000e5
-23 1 10 41 -0.32768000000000000000e5
-23 1 12 43 -0.65536000000000000000e5
-23 1 23 38 0.81920000000000000000e4
-23 1 24 55 -0.16384000000000000000e5
-23 1 26 41 -0.16384000000000000000e5
-23 1 28 43 0.65536000000000000000e5
-23 1 32 47 0.65536000000000000000e5
-23 1 33 40 0.32768000000000000000e5
-23 1 40 55 0.16384000000000000000e5
-23 1 41 56 0.16384000000000000000e5
-23 1 44 51 -0.65536000000000000000e5
-23 2 2 32 0.81920000000000000000e4
-23 2 4 34 -0.16384000000000000000e5
-23 2 16 30 0.16384000000000000000e5
-23 2 20 34 0.32768000000000000000e5
-23 2 28 34 0.16384000000000000000e5
-23 3 5 50 -0.16384000000000000000e5
-23 3 9 38 0.16384000000000000000e5
-23 3 10 55 -0.32768000000000000000e5
-23 3 14 51 -0.65536000000000000000e5
-23 3 22 35 0.65536000000000000000e5
-23 3 22 51 0.16384000000000000000e5
-23 3 23 52 -0.32768000000000000000e5
-23 3 27 40 -0.16384000000000000000e5
-23 3 27 56 0.16384000000000000000e5
-23 3 28 41 0.65536000000000000000e5
-23 3 29 42 0.32768000000000000000e5
-23 3 30 43 0.32768000000000000000e5
-23 3 38 51 -0.16384000000000000000e5
-23 3 39 52 -0.32768000000000000000e5
-23 3 42 55 -0.32768000000000000000e5
-23 4 2 30 0.16384000000000000000e5
-23 4 6 34 0.32768000000000000000e5
-23 4 7 35 0.16384000000000000000e5
-23 4 19 31 0.32768000000000000000e5
-23 4 29 33 -0.16384000000000000000e5
-24 1 17 48 -0.65536000000000000000e5
-24 1 28 43 0.32768000000000000000e5
-24 1 33 48 0.32768000000000000000e5
-24 1 44 51 -0.65536000000000000000e5
-24 1 46 53 0.65536000000000000000e5
-24 3 10 55 0.32768000000000000000e5
-24 3 23 52 -0.32768000000000000000e5
-24 3 28 41 0.32768000000000000000e5
-24 3 29 42 0.32768000000000000000e5
-24 3 34 47 0.65536000000000000000e5
-24 3 35 48 -0.65536000000000000000e5
-24 3 39 52 0.32768000000000000000e5
-24 3 40 45 0.32768000000000000000e5
-24 3 47 52 -0.32768000000000000000e5
-24 4 22 34 0.32768000000000000000e5
-24 4 23 27 0.32768000000000000000e5
-24 4 23 35 0.32768000000000000000e5
-25 1 1 48 0.16384000000000000000e5
-25 1 2 49 0.16384000000000000000e5
-25 1 8 39 0.32768000000000000000e5
-25 1 9 40 0.32768000000000000000e5
-25 1 10 41 -0.65536000000000000000e5
-25 1 12 43 -0.13107200000000000000e6
-25 1 23 38 0.16384000000000000000e5
-25 1 26 41 -0.32768000000000000000e5
-25 1 28 43 0.13107200000000000000e6
-25 1 32 47 0.13107200000000000000e6
-25 1 33 48 -0.65536000000000000000e5
-25 1 40 55 0.32768000000000000000e5
-25 2 2 32 0.16384000000000000000e5
-25 2 4 34 -0.32768000000000000000e5
-25 2 16 30 0.32768000000000000000e5
-25 2 20 34 0.65536000000000000000e5
-25 2 28 34 0.32768000000000000000e5
-25 3 5 50 -0.32768000000000000000e5
-25 3 9 38 0.32768000000000000000e5
-25 3 10 55 0.65536000000000000000e5
-25 3 14 51 0.13107200000000000000e6
-25 3 22 35 0.13107200000000000000e6
-25 3 26 55 -0.32768000000000000000e5
-25 3 27 40 -0.32768000000000000000e5
-25 3 28 41 0.13107200000000000000e6
-25 3 29 42 -0.65536000000000000000e5
-25 3 30 43 -0.65536000000000000000e5
-25 3 40 55 -0.32768000000000000000e5
-25 4 2 30 0.32768000000000000000e5
-25 4 6 34 0.65536000000000000000e5
-25 4 19 31 -0.65536000000000000000e5
-25 4 21 33 0.32768000000000000000e5
-26 1 1 48 0.16384000000000000000e5
-26 1 2 49 0.16384000000000000000e5
-26 1 8 39 0.32768000000000000000e5
-26 1 9 40 0.32768000000000000000e5
-26 1 10 41 -0.65536000000000000000e5
-26 1 12 43 -0.13107200000000000000e6
-26 1 23 38 0.16384000000000000000e5
-26 1 24 55 -0.32768000000000000000e5
-26 1 26 41 -0.32768000000000000000e5
-26 1 28 43 0.13107200000000000000e6
-26 1 32 47 0.13107200000000000000e6
-26 1 33 48 -0.65536000000000000000e5
-26 1 40 55 0.32768000000000000000e5
-26 2 2 32 0.16384000000000000000e5
-26 2 4 34 -0.32768000000000000000e5
-26 2 16 30 0.32768000000000000000e5
-26 2 20 34 0.65536000000000000000e5
-26 3 5 50 -0.32768000000000000000e5
-26 3 9 38 0.32768000000000000000e5
-26 3 10 55 -0.65536000000000000000e5
-26 3 22 35 0.13107200000000000000e6
-26 3 22 51 0.32768000000000000000e5
-26 3 23 52 -0.65536000000000000000e5
-26 3 27 40 -0.32768000000000000000e5
-26 3 28 41 0.13107200000000000000e6
-26 3 35 48 0.13107200000000000000e6
-26 3 38 51 -0.32768000000000000000e5
-26 3 40 45 -0.65536000000000000000e5
-26 3 49 50 -0.32768000000000000000e5
-26 4 2 30 0.32768000000000000000e5
-26 4 6 34 0.65536000000000000000e5
-26 4 7 35 0.32768000000000000000e5
-26 4 22 34 -0.65536000000000000000e5
-27 1 1 48 0.16384000000000000000e5
-27 1 2 49 0.16384000000000000000e5
-27 1 6 53 0.16384000000000000000e5
-27 1 8 39 0.32768000000000000000e5
-27 1 9 40 0.32768000000000000000e5
-27 1 10 41 -0.65536000000000000000e5
-27 1 12 43 -0.13107200000000000000e6
-27 1 23 38 0.16384000000000000000e5
-27 1 24 55 -0.32768000000000000000e5
-27 1 25 40 -0.16384000000000000000e5
-27 1 26 41 -0.32768000000000000000e5
-27 1 28 43 0.65536000000000000000e5
-27 1 32 47 0.13107200000000000000e6
-27 1 41 56 0.32768000000000000000e5
-27 2 2 32 0.16384000000000000000e5
-27 2 16 30 0.32768000000000000000e5
-27 2 20 34 0.65536000000000000000e5
-27 2 21 35 -0.32768000000000000000e5
-27 3 9 38 0.32768000000000000000e5
-27 3 22 35 0.13107200000000000000e6
-27 3 22 51 0.32768000000000000000e5
-27 3 24 37 0.16384000000000000000e5
-27 3 27 40 0.32768000000000000000e5
-27 3 27 56 0.32768000000000000000e5
-27 3 28 41 0.13107200000000000000e6
-27 3 38 51 -0.32768000000000000000e5
-27 3 41 54 -0.32768000000000000000e5
-27 4 2 30 0.32768000000000000000e5
-27 4 4 32 -0.16384000000000000000e5
-27 4 6 34 0.65536000000000000000e5
-27 4 16 28 0.16384000000000000000e5
-28 1 1 48 -0.16384000000000000000e5
-28 1 2 49 -0.16384000000000000000e5
-28 1 6 53 -0.16384000000000000000e5
-28 1 8 39 -0.32768000000000000000e5
-28 1 9 40 -0.32768000000000000000e5
-28 1 10 41 0.65536000000000000000e5
-28 1 12 43 0.13107200000000000000e6
-28 1 23 38 -0.16384000000000000000e5
-28 1 25 40 0.16384000000000000000e5
-28 1 26 41 0.32768000000000000000e5
-28 1 28 43 -0.65536000000000000000e5
-28 1 32 47 -0.13107200000000000000e6
-28 1 37 52 -0.65536000000000000000e5
-28 1 41 56 0.32768000000000000000e5
-28 2 2 32 -0.16384000000000000000e5
-28 2 16 30 -0.32768000000000000000e5
-28 2 20 34 -0.65536000000000000000e5
-28 3 9 38 -0.32768000000000000000e5
-28 3 22 35 -0.13107200000000000000e6
-28 3 22 51 -0.32768000000000000000e5
-28 3 24 37 -0.16384000000000000000e5
-28 3 27 40 -0.32768000000000000000e5
-28 3 28 41 -0.13107200000000000000e6
-28 3 37 50 -0.32768000000000000000e5
-28 4 2 30 -0.32768000000000000000e5
-28 4 4 32 0.16384000000000000000e5
-28 4 6 34 -0.65536000000000000000e5
-28 4 16 28 -0.16384000000000000000e5
-29 1 1 48 0.13107200000000000000e6
-29 1 2 49 0.19660800000000000000e6
-29 1 6 53 -0.65536000000000000000e5
-29 1 8 39 0.26214400000000000000e6
-29 1 9 40 0.26214400000000000000e6
-29 1 10 41 -0.52428800000000000000e6
-29 1 12 43 -0.10485760000000000000e7
-29 1 23 38 0.13107200000000000000e6
-29 1 24 39 0.65536000000000000000e5
-29 1 24 55 0.65536000000000000000e5
-29 1 26 41 -0.39321600000000000000e6
-29 1 28 43 0.78643200000000000000e6
-29 1 32 47 0.10485760000000000000e7
-29 1 33 48 -0.13107200000000000000e6
-29 1 40 55 0.65536000000000000000e5
-29 1 47 54 0.32768000000000000000e5
-29 1 49 56 -0.32768000000000000000e5
-29 1 53 56 0.32768000000000000000e5
-29 1 54 55 0.65536000000000000000e5
-29 1 55 56 -0.65536000000000000000e5
-29 2 2 32 0.13107200000000000000e6
-29 2 3 33 0.65536000000000000000e5
-29 2 4 34 -0.13107200000000000000e6
-29 2 5 35 -0.65536000000000000000e5
-29 2 16 30 0.26214400000000000000e6
-29 2 20 34 0.52428800000000000000e6
-29 2 28 34 0.65536000000000000000e5
-29 2 33 35 0.32768000000000000000e5
-29 3 5 50 -0.13107200000000000000e6
-29 3 9 38 0.26214400000000000000e6
-29 3 10 55 -0.13107200000000000000e6
-29 3 22 35 0.10485760000000000000e7
-29 3 25 38 0.65536000000000000000e5
-29 3 25 54 -0.65536000000000000000e5
-29 3 28 41 0.10485760000000000000e7
-29 3 35 48 0.26214400000000000000e6
-29 3 38 51 0.65536000000000000000e5
-29 3 39 40 -0.65536000000000000000e5
-29 3 40 45 -0.13107200000000000000e6
-29 3 40 53 -0.32768000000000000000e5
-29 3 41 54 0.65536000000000000000e5
-29 3 48 53 0.32768000000000000000e5
-29 3 49 50 -0.65536000000000000000e5
-29 3 49 54 0.32768000000000000000e5
-29 3 53 54 -0.32768000000000000000e5
-29 4 2 30 0.26214400000000000000e6
-29 4 6 34 0.52428800000000000000e6
-29 4 22 34 -0.13107200000000000000e6
-29 4 35 35 -0.65536000000000000000e5
-30 1 1 48 0.32768000000000000000e5
-30 1 2 49 0.65536000000000000000e5
-30 1 6 53 -0.32768000000000000000e5
-30 1 8 39 0.65536000000000000000e5
-30 1 9 40 0.65536000000000000000e5
-30 1 10 41 -0.13107200000000000000e6
-30 1 12 43 -0.26214400000000000000e6
-30 1 23 38 0.32768000000000000000e5
-30 1 24 39 0.32768000000000000000e5
-30 1 24 55 0.65536000000000000000e5
-30 1 25 56 0.32768000000000000000e5
-30 1 26 41 -0.13107200000000000000e6
-30 1 28 43 0.13107200000000000000e6
-30 1 32 47 0.26214400000000000000e6
-30 2 2 32 0.32768000000000000000e5
-30 2 3 33 0.32768000000000000000e5
-30 2 5 35 -0.32768000000000000000e5
-30 2 16 30 0.65536000000000000000e5
-30 2 20 34 0.13107200000000000000e6
-30 3 9 38 0.65536000000000000000e5
-30 3 22 35 0.26214400000000000000e6
-30 3 22 51 -0.65536000000000000000e5
-30 3 23 52 0.13107200000000000000e6
-30 3 25 38 0.32768000000000000000e5
-30 3 25 54 -0.32768000000000000000e5
-30 3 27 40 0.65536000000000000000e5
-30 3 28 41 0.26214400000000000000e6
-30 3 39 40 -0.32768000000000000000e5
-30 3 40 53 -0.32768000000000000000e5
-30 4 2 30 0.65536000000000000000e5
-30 4 6 34 0.13107200000000000000e6
-30 4 7 35 -0.65536000000000000000e5
-31 1 1 48 -0.32768000000000000000e5
-31 1 2 49 -0.65536000000000000000e5
-31 1 6 53 0.32768000000000000000e5
-31 1 8 39 -0.65536000000000000000e5
-31 1 9 40 -0.65536000000000000000e5
-31 1 10 41 0.13107200000000000000e6
-31 1 12 43 0.26214400000000000000e6
-31 1 23 38 -0.32768000000000000000e5
-31 1 24 39 -0.32768000000000000000e5
-31 1 24 55 -0.13107200000000000000e6
-31 1 26 41 0.13107200000000000000e6
-31 1 28 43 -0.13107200000000000000e6
-31 1 32 47 -0.26214400000000000000e6
-31 1 40 47 0.32768000000000000000e5
-31 1 47 54 -0.32768000000000000000e5
-31 2 2 32 -0.32768000000000000000e5
-31 2 3 33 -0.32768000000000000000e5
-31 2 5 35 0.32768000000000000000e5
-31 2 16 30 -0.65536000000000000000e5
-31 2 20 34 -0.13107200000000000000e6
-31 2 33 35 -0.32768000000000000000e5
-31 3 9 38 -0.65536000000000000000e5
-31 3 22 35 -0.26214400000000000000e6
-31 3 22 51 0.65536000000000000000e5
-31 3 23 52 -0.13107200000000000000e6
-31 3 24 53 -0.32768000000000000000e5
-31 3 25 38 -0.32768000000000000000e5
-31 3 25 54 0.32768000000000000000e5
-31 3 27 40 -0.65536000000000000000e5
-31 3 28 41 -0.26214400000000000000e6
-31 3 38 51 -0.65536000000000000000e5
-31 3 39 40 0.32768000000000000000e5
-31 3 40 53 0.32768000000000000000e5
-31 3 41 54 -0.65536000000000000000e5
-31 4 2 30 -0.65536000000000000000e5
-31 4 6 34 -0.13107200000000000000e6
-31 4 7 35 0.65536000000000000000e5
-32 1 1 48 0.32768000000000000000e5
-32 1 2 49 0.32768000000000000000e5
-32 1 6 53 0.32768000000000000000e5
-32 1 8 39 0.65536000000000000000e5
-32 1 9 40 0.65536000000000000000e5
-32 1 10 41 -0.13107200000000000000e6
-32 1 12 43 -0.26214400000000000000e6
-32 1 23 38 0.32768000000000000000e5
-32 1 25 40 -0.32768000000000000000e5
-32 1 26 41 -0.65536000000000000000e5
-32 1 28 43 0.13107200000000000000e6
-32 1 32 47 0.26214400000000000000e6
-32 1 38 53 0.32768000000000000000e5
-32 1 47 54 0.32768000000000000000e5
-32 2 2 32 0.32768000000000000000e5
-32 2 16 30 0.65536000000000000000e5
-32 2 20 34 0.13107200000000000000e6
-32 3 9 38 0.65536000000000000000e5
-32 3 22 35 0.26214400000000000000e6
-32 3 22 51 0.65536000000000000000e5
-32 3 24 37 0.32768000000000000000e5
-32 3 27 40 0.65536000000000000000e5
-32 3 28 41 0.26214400000000000000e6
-32 4 2 30 0.65536000000000000000e5
-32 4 4 32 -0.32768000000000000000e5
-32 4 6 34 0.13107200000000000000e6
-32 4 16 28 0.32768000000000000000e5
-33 1 2 49 0.32768000000000000000e5
-33 1 6 53 -0.98304000000000000000e5
-33 1 8 39 -0.65536000000000000000e5
-33 1 9 40 -0.65536000000000000000e5
-33 1 10 41 0.13107200000000000000e6
-33 1 24 39 0.32768000000000000000e5
-33 1 24 55 0.13107200000000000000e6
-33 1 25 40 0.65536000000000000000e5
-33 1 25 56 0.32768000000000000000e5
-33 1 26 41 -0.65536000000000000000e5
-33 1 37 52 -0.13107200000000000000e6
-33 2 3 33 0.32768000000000000000e5
-33 2 5 35 -0.32768000000000000000e5
-33 2 32 32 -0.65536000000000000000e5
-33 2 33 35 0.32768000000000000000e5
-33 3 9 38 -0.65536000000000000000e5
-33 3 22 51 -0.19660800000000000000e6
-33 3 23 52 0.13107200000000000000e6
-33 3 24 37 -0.65536000000000000000e5
-33 3 25 38 0.32768000000000000000e5
-33 3 25 54 -0.32768000000000000000e5
-33 3 27 40 -0.65536000000000000000e5
-33 3 27 56 -0.65536000000000000000e5
-33 3 37 50 -0.65536000000000000000e5
-33 3 38 51 0.65536000000000000000e5
-33 3 39 40 -0.32768000000000000000e5
-33 3 40 53 -0.32768000000000000000e5
-33 3 41 54 0.65536000000000000000e5
-33 4 2 30 -0.65536000000000000000e5
-33 4 4 32 0.65536000000000000000e5
-33 4 7 35 -0.65536000000000000000e5
-33 4 16 28 -0.65536000000000000000e5
-33 4 17 29 -0.65536000000000000000e5
-33 4 20 32 -0.65536000000000000000e5
-33 4 32 32 0.65536000000000000000e5
-34 1 11 18 -0.32768000000000000000e5
-34 1 20 51 0.65536000000000000000e5
-34 1 36 51 -0.65536000000000000000e5
-34 1 45 52 0.32768000000000000000e5
-34 3 6 19 0.32768000000000000000e5
-34 3 15 44 0.32768000000000000000e5
-34 3 17 30 0.32768000000000000000e5
-34 3 32 45 0.32768000000000000000e5
-34 3 46 51 -0.32768000000000000000e5
-35 1 13 20 -0.13107200000000000000e6
-35 1 14 45 0.65536000000000000000e5
-35 1 17 32 0.65536000000000000000e5
-35 1 17 48 -0.16384000000000000000e5
-35 1 18 49 -0.16384000000000000000e5
-35 1 20 27 0.65536000000000000000e5
-35 1 34 49 -0.16384000000000000000e5
-35 1 45 52 0.32768000000000000000e5
-35 2 11 25 0.65536000000000000000e5
-35 2 14 28 -0.16384000000000000000e5
-35 3 8 21 0.13107200000000000000e6
-35 3 14 43 -0.16384000000000000000e5
-35 3 15 44 0.32768000000000000000e5
-35 3 18 31 0.65536000000000000000e5
-35 3 18 47 -0.16384000000000000000e5
-35 3 19 48 -0.32768000000000000000e5
-35 3 19 56 -0.32768000000000000000e5
-35 3 22 35 0.16384000000000000000e5
-35 3 36 41 0.65536000000000000000e5
-35 3 41 46 -0.32768000000000000000e5
-35 4 14 26 0.16384000000000000000e5
-35 4 15 27 0.32768000000000000000e5
-36 1 11 18 -0.65536000000000000000e5
-36 1 34 49 0.32768000000000000000e5
-36 1 44 51 -0.32768000000000000000e5
-36 1 45 52 0.65536000000000000000e5
-36 3 6 19 0.65536000000000000000e5
-36 3 14 43 -0.32768000000000000000e5
-36 3 14 51 -0.32768000000000000000e5
-36 3 15 44 0.13107200000000000000e6
-36 3 17 30 0.13107200000000000000e6
-36 3 32 45 0.13107200000000000000e6
-36 3 35 40 -0.32768000000000000000e5
-36 3 43 52 -0.32768000000000000000e5
-36 4 25 33 0.32768000000000000000e5
-37 1 14 45 -0.13107200000000000000e6
-37 1 17 48 0.32768000000000000000e5
-37 1 18 49 0.65536000000000000000e5
-37 1 34 49 0.32768000000000000000e5
-37 1 44 51 0.32768000000000000000e5
-37 2 14 28 0.32768000000000000000e5
-37 3 14 43 0.32768000000000000000e5
-37 3 14 51 -0.32768000000000000000e5
-37 3 15 44 -0.65536000000000000000e5
-37 3 16 45 0.13107200000000000000e6
-37 3 18 47 0.32768000000000000000e5
-37 3 19 48 0.65536000000000000000e5
-37 3 22 35 -0.32768000000000000000e5
-37 3 35 48 -0.32768000000000000000e5
-37 3 45 50 -0.32768000000000000000e5
-37 4 14 26 -0.32768000000000000000e5
-37 4 15 27 -0.65536000000000000000e5
-38 1 4 35 -0.32768000000000000000e5
-38 1 6 53 -0.40960000000000000000e4
-38 1 12 43 -0.32768000000000000000e5
-38 1 17 48 0.32768000000000000000e5
-38 1 25 40 0.40960000000000000000e4
-38 1 34 49 -0.32768000000000000000e5
-38 1 46 53 0.32768000000000000000e5
-38 2 4 34 -0.81920000000000000000e4
-38 2 9 23 -0.32768000000000000000e5
-38 2 21 35 0.81920000000000000000e4
-38 3 5 34 -0.32768000000000000000e5
-38 3 5 50 -0.81920000000000000000e4
-38 3 13 42 0.32768000000000000000e5
-38 3 14 27 -0.32768000000000000000e5
-38 3 16 29 0.65536000000000000000e5
-38 3 18 47 -0.32768000000000000000e5
-38 3 22 35 0.32768000000000000000e5
-38 3 24 37 -0.40960000000000000000e4
-38 3 27 40 -0.16384000000000000000e5
-38 3 28 41 -0.16384000000000000000e5
-38 3 29 42 -0.16384000000000000000e5
-38 3 31 44 0.65536000000000000000e5
-38 3 34 47 -0.32768000000000000000e5
-38 4 4 32 0.40960000000000000000e4
-38 4 7 35 0.81920000000000000000e4
-38 4 14 26 0.32768000000000000000e5
-38 4 16 28 -0.40960000000000000000e4
-38 4 23 27 -0.16384000000000000000e5
-39 1 18 49 0.65536000000000000000e5
-39 1 52 55 -0.65536000000000000000e5
-39 3 14 51 -0.65536000000000000000e5
-39 3 35 48 -0.13107200000000000000e6
-39 3 39 52 0.32768000000000000000e5
-39 3 45 50 -0.13107200000000000000e6
-39 3 45 56 0.32768000000000000000e5
-39 3 47 52 -0.32768000000000000000e5
-39 4 31 35 -0.32768000000000000000e5
-40 1 33 40 0.32768000000000000000e5
-40 1 33 48 0.32768000000000000000e5
-40 1 34 49 -0.65536000000000000000e5
-40 3 14 51 -0.65536000000000000000e5
-40 3 29 42 0.32768000000000000000e5
-40 3 30 43 0.32768000000000000000e5
-40 3 35 48 -0.65536000000000000000e5
-40 3 39 52 -0.32768000000000000000e5
-40 3 40 45 0.32768000000000000000e5
-40 4 19 31 0.32768000000000000000e5
-40 4 22 34 0.32768000000000000000e5
-41 1 1 48 0.81920000000000000000e4
-41 1 2 49 0.81920000000000000000e4
-41 1 8 39 0.16384000000000000000e5
-41 1 9 40 0.16384000000000000000e5
-41 1 10 41 -0.32768000000000000000e5
-41 1 12 43 -0.65536000000000000000e5
-41 1 17 48 -0.65536000000000000000e5
-41 1 23 38 0.81920000000000000000e4
-41 1 24 55 -0.16384000000000000000e5
-41 1 26 41 -0.16384000000000000000e5
-41 1 28 43 0.98304000000000000000e5
-41 1 32 47 0.65536000000000000000e5
-41 1 40 55 0.16384000000000000000e5
-41 1 41 56 0.16384000000000000000e5
-41 2 2 32 0.81920000000000000000e4
-41 2 4 34 -0.16384000000000000000e5
-41 2 16 30 0.16384000000000000000e5
-41 2 20 34 0.32768000000000000000e5
-41 2 28 34 0.16384000000000000000e5
-41 3 5 50 -0.16384000000000000000e5
-41 3 9 38 0.16384000000000000000e5
-41 3 22 35 0.65536000000000000000e5
-41 3 22 51 0.16384000000000000000e5
-41 3 23 52 -0.65536000000000000000e5
-41 3 27 40 -0.16384000000000000000e5
-41 3 27 56 0.16384000000000000000e5
-41 3 28 41 0.98304000000000000000e5
-41 3 29 42 0.32768000000000000000e5
-41 3 38 51 -0.16384000000000000000e5
-41 4 2 30 0.16384000000000000000e5
-41 4 6 34 0.32768000000000000000e5
-41 4 7 35 0.16384000000000000000e5
-41 4 23 27 0.32768000000000000000e5
-41 4 29 33 -0.16384000000000000000e5
-42 1 1 48 -0.81920000000000000000e4
-42 1 2 49 -0.81920000000000000000e4
-42 1 6 53 -0.81920000000000000000e4
-42 1 8 39 -0.16384000000000000000e5
-42 1 9 40 -0.16384000000000000000e5
-42 1 10 41 0.32768000000000000000e5
-42 1 23 38 -0.81920000000000000000e4
-42 1 24 55 0.16384000000000000000e5
-42 1 25 40 0.81920000000000000000e4
-42 1 26 41 0.16384000000000000000e5
-42 1 28 43 -0.32768000000000000000e5
-42 1 32 47 -0.65536000000000000000e5
-42 1 33 48 0.32768000000000000000e5
-42 1 37 52 0.32768000000000000000e5
-42 1 40 55 -0.16384000000000000000e5
-42 1 41 56 -0.16384000000000000000e5
-42 1 44 51 -0.65536000000000000000e5
-42 1 46 53 0.65536000000000000000e5
-42 2 2 32 -0.81920000000000000000e4
-42 2 16 30 -0.16384000000000000000e5
-42 2 20 34 -0.32768000000000000000e5
-42 2 21 35 0.16384000000000000000e5
-42 2 28 34 -0.16384000000000000000e5
-42 3 7 52 0.65536000000000000000e5
-42 3 9 38 -0.16384000000000000000e5
-42 3 10 55 0.32768000000000000000e5
-42 3 22 51 -0.16384000000000000000e5
-42 3 24 37 -0.81920000000000000000e4
-42 3 27 40 -0.16384000000000000000e5
-42 3 27 56 -0.16384000000000000000e5
-42 3 28 41 -0.65536000000000000000e5
-42 3 35 48 -0.65536000000000000000e5
-42 3 38 51 0.16384000000000000000e5
-42 3 39 52 0.32768000000000000000e5
-42 3 40 45 0.32768000000000000000e5
-42 4 2 30 -0.16384000000000000000e5
-42 4 4 32 0.81920000000000000000e4
-42 4 6 34 -0.32768000000000000000e5
-42 4 16 28 -0.81920000000000000000e4
-42 4 22 34 0.32768000000000000000e5
-42 4 23 35 0.32768000000000000000e5
-42 4 29 33 0.16384000000000000000e5
-43 3 10 55 0.65536000000000000000e5
-43 3 14 51 0.13107200000000000000e6
-43 3 22 51 -0.32768000000000000000e5
-43 3 23 52 0.65536000000000000000e5
-43 3 26 55 -0.32768000000000000000e5
-43 3 29 42 -0.65536000000000000000e5
-43 3 30 43 -0.65536000000000000000e5
-43 3 35 48 -0.13107200000000000000e6
-43 3 40 45 0.65536000000000000000e5
-43 4 7 35 -0.32768000000000000000e5
-43 4 19 31 -0.65536000000000000000e5
-43 4 21 33 0.32768000000000000000e5
-43 4 22 34 0.65536000000000000000e5
-44 1 1 48 0.16384000000000000000e5
-44 1 2 49 0.16384000000000000000e5
-44 1 8 39 0.32768000000000000000e5
-44 1 9 40 0.32768000000000000000e5
-44 1 10 41 -0.65536000000000000000e5
-44 1 12 43 -0.13107200000000000000e6
-44 1 23 38 0.16384000000000000000e5
-44 1 24 55 -0.32768000000000000000e5
-44 1 26 41 -0.32768000000000000000e5
-44 1 28 43 0.13107200000000000000e6
-44 1 32 47 0.13107200000000000000e6
-44 1 33 48 -0.65536000000000000000e5
-44 1 40 55 0.32768000000000000000e5
-44 2 2 32 0.16384000000000000000e5
-44 2 4 34 -0.32768000000000000000e5
-44 2 16 30 0.32768000000000000000e5
-44 2 20 34 0.65536000000000000000e5
-44 3 5 50 -0.32768000000000000000e5
-44 3 9 38 0.32768000000000000000e5
-44 3 22 35 0.13107200000000000000e6
-44 3 22 51 0.32768000000000000000e5
-44 3 23 52 -0.65536000000000000000e5
-44 3 27 40 -0.32768000000000000000e5
-44 3 28 41 0.13107200000000000000e6
-44 4 2 30 0.32768000000000000000e5
-44 4 6 34 0.65536000000000000000e5
-44 4 7 35 0.32768000000000000000e5
-45 1 1 48 0.16384000000000000000e5
-45 1 2 49 0.16384000000000000000e5
-45 1 6 53 0.16384000000000000000e5
-45 1 8 39 0.32768000000000000000e5
-45 1 9 40 0.32768000000000000000e5
-45 1 10 41 -0.65536000000000000000e5
-45 1 12 43 -0.13107200000000000000e6
-45 1 23 38 0.16384000000000000000e5
-45 1 25 40 -0.16384000000000000000e5
-45 1 26 41 -0.32768000000000000000e5
-45 1 28 43 0.65536000000000000000e5
-45 1 32 47 0.13107200000000000000e6
-45 2 2 32 0.16384000000000000000e5
-45 2 16 30 0.32768000000000000000e5
-45 2 20 34 0.65536000000000000000e5
-45 2 21 35 -0.32768000000000000000e5
-45 3 9 38 0.32768000000000000000e5
-45 3 22 35 0.13107200000000000000e6
-45 3 22 51 0.32768000000000000000e5
-45 3 23 52 -0.65536000000000000000e5
-45 3 24 37 0.16384000000000000000e5
-45 3 27 40 0.32768000000000000000e5
-45 3 28 41 0.13107200000000000000e6
-45 3 38 51 -0.32768000000000000000e5
-45 4 2 30 0.32768000000000000000e5
-45 4 4 32 -0.16384000000000000000e5
-45 4 6 34 0.65536000000000000000e5
-45 4 16 28 0.16384000000000000000e5
-46 1 1 48 -0.16384000000000000000e5
-46 1 2 49 -0.16384000000000000000e5
-46 1 6 53 -0.16384000000000000000e5
-46 1 8 39 -0.32768000000000000000e5
-46 1 9 40 -0.32768000000000000000e5
-46 1 10 41 0.65536000000000000000e5
-46 1 12 43 0.13107200000000000000e6
-46 1 23 38 -0.16384000000000000000e5
-46 1 25 40 0.16384000000000000000e5
-46 1 26 41 0.32768000000000000000e5
-46 1 28 43 -0.65536000000000000000e5
-46 1 32 47 -0.19660800000000000000e6
-46 1 41 56 0.32768000000000000000e5
-46 2 2 32 -0.16384000000000000000e5
-46 2 16 30 -0.32768000000000000000e5
-46 2 20 34 -0.65536000000000000000e5
-46 3 9 38 -0.32768000000000000000e5
-46 3 22 35 -0.13107200000000000000e6
-46 3 22 51 -0.32768000000000000000e5
-46 3 24 37 -0.16384000000000000000e5
-46 3 27 40 -0.32768000000000000000e5
-46 3 27 56 0.32768000000000000000e5
-46 3 28 41 -0.13107200000000000000e6
-46 4 2 30 -0.32768000000000000000e5
-46 4 4 32 0.16384000000000000000e5
-46 4 6 34 -0.65536000000000000000e5
-46 4 16 28 -0.16384000000000000000e5
-47 1 1 48 -0.16384000000000000000e5
-47 1 2 49 -0.16384000000000000000e5
-47 1 6 53 -0.16384000000000000000e5
-47 1 23 38 -0.16384000000000000000e5
-47 1 24 55 -0.32768000000000000000e5
-47 1 25 40 0.16384000000000000000e5
-47 1 26 41 0.32768000000000000000e5
-47 1 32 47 -0.65536000000000000000e5
-47 1 37 52 0.65536000000000000000e5
-47 2 2 32 -0.16384000000000000000e5
-47 2 4 34 -0.32768000000000000000e5
-47 2 16 30 -0.32768000000000000000e5
-47 2 21 35 0.32768000000000000000e5
-47 3 5 50 -0.32768000000000000000e5
-47 3 7 52 0.13107200000000000000e6
-47 3 24 37 -0.16384000000000000000e5
-47 3 27 40 -0.65536000000000000000e5
-47 3 28 41 -0.13107200000000000000e6
-47 3 37 50 -0.32768000000000000000e5
-47 4 4 32 0.16384000000000000000e5
-47 4 6 34 -0.65536000000000000000e5
-47 4 7 35 0.32768000000000000000e5
-47 4 16 28 -0.16384000000000000000e5
-47 4 17 29 0.32768000000000000000e5
-47 4 20 32 0.32768000000000000000e5
-48 1 1 48 0.98304000000000000000e5
-48 1 2 49 0.13107200000000000000e6
-48 1 6 53 -0.32768000000000000000e5
-48 1 8 39 0.19660800000000000000e6
-48 1 9 40 0.19660800000000000000e6
-48 1 10 41 -0.39321600000000000000e6
-48 1 12 43 -0.78643200000000000000e6
-48 1 23 38 0.98304000000000000000e5
-48 1 24 39 0.32768000000000000000e5
-48 1 25 56 -0.32768000000000000000e5
-48 1 26 41 -0.26214400000000000000e6
-48 1 28 43 0.65536000000000000000e6
-48 1 32 47 0.78643200000000000000e6
-48 1 33 48 -0.13107200000000000000e6
-48 1 40 55 0.65536000000000000000e5
-48 1 49 56 -0.32768000000000000000e5
-48 1 53 56 0.32768000000000000000e5
-48 1 54 55 0.65536000000000000000e5
-48 1 55 56 -0.65536000000000000000e5
-48 2 2 32 0.98304000000000000000e5
-48 2 3 33 0.32768000000000000000e5
-48 2 4 34 -0.13107200000000000000e6
-48 2 5 35 -0.32768000000000000000e5
-48 2 16 30 0.19660800000000000000e6
-48 2 20 34 0.39321600000000000000e6
-48 2 28 34 0.65536000000000000000e5
-48 3 5 50 -0.13107200000000000000e6
-48 3 9 38 0.19660800000000000000e6
-48 3 22 35 0.78643200000000000000e6
-48 3 25 38 0.32768000000000000000e5
-48 3 27 40 -0.65536000000000000000e5
-48 3 28 41 0.78643200000000000000e6
-48 3 39 40 -0.32768000000000000000e5
-48 3 40 53 -0.32768000000000000000e5
-48 3 48 53 0.32768000000000000000e5
-48 3 49 54 0.32768000000000000000e5
-48 3 53 54 -0.32768000000000000000e5
-48 4 2 30 0.19660800000000000000e6
-48 4 6 34 0.39321600000000000000e6
-48 4 21 33 0.65536000000000000000e5
-48 4 33 33 -0.65536000000000000000e5
-48 4 35 35 -0.65536000000000000000e5
-49 1 1 48 0.32768000000000000000e5
-49 1 2 49 0.65536000000000000000e5
-49 1 6 53 -0.32768000000000000000e5
-49 1 8 39 0.65536000000000000000e5
-49 1 9 40 0.65536000000000000000e5
-49 1 10 41 -0.13107200000000000000e6
-49 1 12 43 -0.26214400000000000000e6
-49 1 23 38 0.32768000000000000000e5
-49 1 24 39 0.32768000000000000000e5
-49 1 25 56 0.32768000000000000000e5
-49 1 26 41 -0.65536000000000000000e5
-49 1 28 43 0.13107200000000000000e6
-49 1 32 47 0.26214400000000000000e6
-49 2 2 32 0.32768000000000000000e5
-49 2 3 33 0.32768000000000000000e5
-49 2 5 35 -0.32768000000000000000e5
-49 2 16 30 0.65536000000000000000e5
-49 2 20 34 0.13107200000000000000e6
-49 3 9 38 0.65536000000000000000e5
-49 3 22 35 0.26214400000000000000e6
-49 3 24 53 -0.32768000000000000000e5
-49 3 25 38 0.32768000000000000000e5
-49 3 25 54 -0.65536000000000000000e5
-49 3 28 41 0.26214400000000000000e6
-49 3 38 51 0.65536000000000000000e5
-49 3 39 40 -0.32768000000000000000e5
-49 4 2 30 0.65536000000000000000e5
-49 4 6 34 0.13107200000000000000e6
-49 4 28 32 -0.32768000000000000000e5
-50 1 25 56 0.32768000000000000000e5
-50 1 26 41 -0.65536000000000000000e5
-50 1 40 47 0.32768000000000000000e5
-50 3 27 40 0.65536000000000000000e5
-51 1 1 48 0.32768000000000000000e5
-51 1 2 49 0.32768000000000000000e5
-51 1 6 53 0.32768000000000000000e5
-51 1 8 39 0.65536000000000000000e5
-51 1 9 40 0.65536000000000000000e5
-51 1 10 41 -0.13107200000000000000e6
-51 1 12 43 -0.26214400000000000000e6
-51 1 23 38 0.32768000000000000000e5
-51 1 23 54 0.32768000000000000000e5
-51 1 25 40 -0.32768000000000000000e5
-51 1 26 41 -0.65536000000000000000e5
-51 1 28 43 0.13107200000000000000e6
-51 1 32 47 0.26214400000000000000e6
-51 1 40 47 0.32768000000000000000e5
-51 2 2 32 0.32768000000000000000e5
-51 2 16 30 0.65536000000000000000e5
-51 2 20 34 0.13107200000000000000e6
-51 3 9 38 0.65536000000000000000e5
-51 3 22 35 0.26214400000000000000e6
-51 3 24 37 0.32768000000000000000e5
-51 3 24 53 -0.32768000000000000000e5
-51 3 27 40 0.65536000000000000000e5
-51 3 28 41 0.26214400000000000000e6
-51 4 2 30 0.65536000000000000000e5
-51 4 4 32 -0.32768000000000000000e5
-51 4 6 34 0.13107200000000000000e6
-51 4 16 28 0.32768000000000000000e5
-52 1 22 53 -0.32768000000000000000e5
-52 1 23 54 -0.32768000000000000000e5
-52 1 24 55 -0.65536000000000000000e5
-52 1 26 41 0.65536000000000000000e5
-52 1 32 47 -0.13107200000000000000e6
-52 1 37 52 0.13107200000000000000e6
-52 1 38 53 0.32768000000000000000e5
-52 2 26 32 -0.32768000000000000000e5
-52 3 22 51 0.65536000000000000000e5
-52 3 27 40 -0.65536000000000000000e5
-52 4 20 32 0.65536000000000000000e5
-53 1 1 48 -0.65536000000000000000e5
-53 1 2 49 -0.65536000000000000000e5
-53 1 6 53 -0.65536000000000000000e5
-53 1 8 39 -0.65536000000000000000e5
-53 1 9 40 -0.65536000000000000000e5
-53 1 10 41 0.13107200000000000000e6
-53 1 12 43 0.26214400000000000000e6
-53 1 22 53 0.32768000000000000000e5
-53 1 23 38 -0.65536000000000000000e5
-53 1 25 40 0.65536000000000000000e5
-53 1 26 41 0.65536000000000000000e5
-53 1 28 43 -0.13107200000000000000e6
-53 1 32 47 -0.26214400000000000000e6
-53 1 38 53 -0.32768000000000000000e5
-53 1 40 47 -0.32768000000000000000e5
-53 2 2 32 -0.65536000000000000000e5
-53 2 4 34 -0.65536000000000000000e5
-53 2 16 30 -0.13107200000000000000e6
-53 2 16 34 0.65536000000000000000e5
-53 2 20 34 -0.13107200000000000000e6
-53 2 21 35 0.65536000000000000000e5
-53 2 32 32 -0.65536000000000000000e5
-53 3 5 50 -0.65536000000000000000e5
-53 3 7 52 0.26214400000000000000e6
-53 3 9 38 -0.65536000000000000000e5
-53 3 22 35 -0.26214400000000000000e6
-53 3 22 51 -0.65536000000000000000e5
-53 3 24 37 -0.65536000000000000000e5
-53 3 24 53 0.32768000000000000000e5
-53 3 27 40 -0.13107200000000000000e6
-53 3 28 41 -0.52428800000000000000e6
-53 3 37 50 -0.65536000000000000000e5
-53 4 2 30 -0.65536000000000000000e5
-53 4 4 32 0.65536000000000000000e5
-53 4 6 34 -0.26214400000000000000e6
-53 4 7 35 0.65536000000000000000e5
-53 4 16 28 -0.65536000000000000000e5
-53 4 17 29 0.65536000000000000000e5
-54 1 20 35 0.65536000000000000000e5
-54 1 21 52 -0.65536000000000000000e5
-54 3 17 46 -0.32768000000000000000e5
-54 3 21 50 -0.32768000000000000000e5
-54 3 21 55 -0.32768000000000000000e5
-54 3 36 45 -0.32768000000000000000e5
-55 1 11 18 0.16384000000000000000e5
-55 1 45 52 -0.16384000000000000000e5
-55 3 6 19 -0.16384000000000000000e5
-55 3 15 44 -0.16384000000000000000e5
-55 3 17 30 -0.16384000000000000000e5
-55 3 21 50 -0.65536000000000000000e5
-55 3 21 56 0.32768000000000000000e5
-55 3 32 45 -0.16384000000000000000e5
-55 3 36 49 0.16384000000000000000e5
-55 3 41 46 0.16384000000000000000e5
-55 4 15 35 0.16384000000000000000e5
-56 1 11 18 -0.16384000000000000000e5
-56 1 19 50 -0.32768000000000000000e5
-56 1 20 51 -0.32768000000000000000e5
-56 1 36 51 0.32768000000000000000e5
-56 1 45 52 0.16384000000000000000e5
-56 2 25 31 -0.32768000000000000000e5
-56 3 6 19 0.16384000000000000000e5
-56 3 15 44 0.16384000000000000000e5
-56 3 17 30 0.16384000000000000000e5
-56 3 32 45 0.16384000000000000000e5
-56 3 36 41 -0.32768000000000000000e5
-56 3 36 49 -0.16384000000000000000e5
-56 3 41 46 -0.16384000000000000000e5
-56 4 15 35 -0.16384000000000000000e5
-57 1 13 20 -0.13107200000000000000e6
-57 1 14 45 0.65536000000000000000e5
-57 1 17 32 0.65536000000000000000e5
-57 1 17 48 -0.16384000000000000000e5
-57 1 18 49 -0.16384000000000000000e5
-57 1 20 27 0.65536000000000000000e5
-57 1 34 49 -0.16384000000000000000e5
-57 1 45 52 0.32768000000000000000e5
-57 2 11 25 0.65536000000000000000e5
-57 2 14 28 -0.16384000000000000000e5
-57 3 8 21 0.13107200000000000000e6
-57 3 14 43 -0.16384000000000000000e5
-57 3 15 44 0.32768000000000000000e5
-57 3 18 31 0.65536000000000000000e5
-57 3 18 47 -0.16384000000000000000e5
-57 3 19 48 -0.32768000000000000000e5
-57 3 22 35 0.16384000000000000000e5
-57 4 14 26 0.16384000000000000000e5
-57 4 15 27 0.32768000000000000000e5
-58 1 4 35 0.16384000000000000000e5
-58 1 12 43 0.16384000000000000000e5
-58 1 14 45 0.65536000000000000000e5
-58 1 17 48 -0.16384000000000000000e5
-58 1 18 49 -0.16384000000000000000e5
-58 1 19 50 -0.65536000000000000000e5
-58 2 9 23 0.16384000000000000000e5
-58 2 14 28 -0.16384000000000000000e5
-58 3 5 34 0.16384000000000000000e5
-58 3 13 42 -0.16384000000000000000e5
-58 3 14 27 0.16384000000000000000e5
-58 3 14 43 -0.16384000000000000000e5
-58 3 15 44 0.32768000000000000000e5
-58 3 16 29 -0.32768000000000000000e5
-58 3 16 45 -0.65536000000000000000e5
-58 3 19 48 -0.32768000000000000000e5
-58 3 31 44 -0.32768000000000000000e5
-58 3 41 46 -0.32768000000000000000e5
-58 4 15 27 0.32768000000000000000e5
-59 1 11 18 -0.65536000000000000000e5
-59 1 34 49 0.32768000000000000000e5
-59 1 44 51 -0.32768000000000000000e5
-59 1 45 52 0.65536000000000000000e5
-59 3 6 19 0.65536000000000000000e5
-59 3 14 43 -0.32768000000000000000e5
-59 3 14 51 -0.32768000000000000000e5
-59 3 15 44 0.13107200000000000000e6
-59 3 17 30 0.13107200000000000000e6
-59 3 32 45 0.65536000000000000000e5
-59 3 35 40 -0.32768000000000000000e5
-59 3 35 48 0.32768000000000000000e5
-59 4 25 33 0.32768000000000000000e5
-60 1 14 45 -0.13107200000000000000e6
-60 1 17 48 0.32768000000000000000e5
-60 1 18 49 0.65536000000000000000e5
-60 1 34 49 0.65536000000000000000e5
-60 2 14 28 0.32768000000000000000e5
-60 3 14 43 0.32768000000000000000e5
-60 3 14 51 -0.32768000000000000000e5
-60 3 15 44 -0.65536000000000000000e5
-60 3 16 45 0.13107200000000000000e6
-60 3 18 47 0.32768000000000000000e5
-60 3 22 35 -0.32768000000000000000e5
-60 3 35 48 -0.32768000000000000000e5
-60 4 14 26 -0.32768000000000000000e5
-60 4 15 27 -0.65536000000000000000e5
-61 1 4 35 -0.32768000000000000000e5
-61 1 6 53 -0.40960000000000000000e4
-61 1 12 43 -0.32768000000000000000e5
-61 1 17 48 0.32768000000000000000e5
-61 1 25 40 0.40960000000000000000e4
-61 1 34 49 -0.32768000000000000000e5
-61 1 44 51 0.32768000000000000000e5
-61 2 4 34 -0.81920000000000000000e4
-61 2 9 23 -0.32768000000000000000e5
-61 2 21 35 0.81920000000000000000e4
-61 3 5 34 -0.32768000000000000000e5
-61 3 5 50 -0.81920000000000000000e4
-61 3 13 42 0.32768000000000000000e5
-61 3 14 27 -0.32768000000000000000e5
-61 3 16 29 0.65536000000000000000e5
-61 3 18 47 -0.32768000000000000000e5
-61 3 22 35 0.32768000000000000000e5
-61 3 24 37 -0.40960000000000000000e4
-61 3 27 40 -0.16384000000000000000e5
-61 3 28 41 -0.16384000000000000000e5
-61 3 29 42 -0.16384000000000000000e5
-61 4 4 32 0.40960000000000000000e4
-61 4 7 35 0.81920000000000000000e4
-61 4 14 26 0.32768000000000000000e5
-61 4 16 28 -0.40960000000000000000e4
-61 4 23 27 -0.16384000000000000000e5
-62 1 6 53 -0.40960000000000000000e4
-62 1 12 43 0.32768000000000000000e5
-62 1 17 48 0.32768000000000000000e5
-62 1 25 40 0.40960000000000000000e4
-62 1 34 41 -0.65536000000000000000e5
-62 2 4 34 -0.81920000000000000000e4
-62 2 21 35 0.81920000000000000000e4
-62 3 5 50 -0.81920000000000000000e4
-62 3 7 52 -0.32768000000000000000e5
-62 3 22 35 -0.32768000000000000000e5
-62 3 24 37 -0.40960000000000000000e4
-62 3 27 40 -0.16384000000000000000e5
-62 3 28 41 -0.16384000000000000000e5
-62 3 29 42 -0.16384000000000000000e5
-62 3 34 47 -0.32768000000000000000e5
-62 4 4 32 0.40960000000000000000e4
-62 4 7 35 0.81920000000000000000e4
-62 4 16 28 -0.40960000000000000000e4
-62 4 23 27 -0.16384000000000000000e5
-63 1 1 48 0.81920000000000000000e4
-63 1 2 49 0.81920000000000000000e4
-63 1 8 39 0.16384000000000000000e5
-63 1 9 40 0.16384000000000000000e5
-63 1 10 41 -0.32768000000000000000e5
-63 1 12 43 -0.65536000000000000000e5
-63 1 18 49 0.65536000000000000000e5
-63 1 23 38 0.81920000000000000000e4
-63 1 24 55 -0.16384000000000000000e5
-63 1 26 41 -0.16384000000000000000e5
-63 1 28 43 0.65536000000000000000e5
-63 1 32 47 0.65536000000000000000e5
-63 1 33 48 -0.32768000000000000000e5
-63 1 40 55 0.16384000000000000000e5
-63 1 41 56 0.16384000000000000000e5
-63 1 52 55 -0.65536000000000000000e5
-63 2 2 32 0.81920000000000000000e4
-63 2 4 34 -0.16384000000000000000e5
-63 2 16 30 0.16384000000000000000e5
-63 2 20 34 0.32768000000000000000e5
-63 2 28 34 0.16384000000000000000e5
-63 3 5 50 -0.16384000000000000000e5
-63 3 9 38 0.16384000000000000000e5
-63 3 14 51 -0.13107200000000000000e6
-63 3 22 35 0.65536000000000000000e5
-63 3 22 51 0.16384000000000000000e5
-63 3 23 52 -0.32768000000000000000e5
-63 3 27 40 -0.16384000000000000000e5
-63 3 27 56 0.16384000000000000000e5
-63 3 28 41 0.65536000000000000000e5
-63 3 35 48 -0.65536000000000000000e5
-63 3 38 51 -0.16384000000000000000e5
-63 3 40 45 -0.32768000000000000000e5
-63 3 45 50 -0.65536000000000000000e5
-63 3 45 56 0.32768000000000000000e5
-63 3 47 52 -0.32768000000000000000e5
-63 4 2 30 0.16384000000000000000e5
-63 4 6 34 0.32768000000000000000e5
-63 4 7 35 0.16384000000000000000e5
-63 4 22 34 -0.32768000000000000000e5
-63 4 29 33 -0.16384000000000000000e5
-63 4 30 34 -0.32768000000000000000e5
-63 4 31 35 -0.32768000000000000000e5
-64 1 33 40 0.32768000000000000000e5
-64 1 33 48 0.32768000000000000000e5
-64 1 34 49 -0.65536000000000000000e5
-64 3 10 55 -0.32768000000000000000e5
-64 3 14 51 -0.65536000000000000000e5
-64 3 18 47 -0.65536000000000000000e5
-64 3 29 42 0.32768000000000000000e5
-64 3 30 43 0.32768000000000000000e5
-64 4 19 31 0.32768000000000000000e5
-65 1 6 53 -0.81920000000000000000e4
-65 1 17 48 -0.65536000000000000000e5
-65 1 25 40 0.81920000000000000000e4
-65 1 28 43 0.32768000000000000000e5
-65 1 33 48 0.32768000000000000000e5
-65 2 4 34 -0.16384000000000000000e5
-65 2 21 35 0.16384000000000000000e5
-65 3 5 50 -0.16384000000000000000e5
-65 3 10 55 0.32768000000000000000e5
-65 3 24 37 -0.81920000000000000000e4
-65 3 27 40 -0.32768000000000000000e5
-65 3 35 48 -0.65536000000000000000e5
-65 3 40 45 0.32768000000000000000e5
-65 4 4 32 0.81920000000000000000e4
-65 4 7 35 0.16384000000000000000e5
-65 4 16 28 -0.81920000000000000000e4
-65 4 22 34 0.32768000000000000000e5
-66 1 6 53 -0.81920000000000000000e4
-66 1 12 43 -0.65536000000000000000e5
-66 1 25 40 0.81920000000000000000e4
-66 1 28 43 0.32768000000000000000e5
-66 1 32 47 0.32768000000000000000e5
-66 2 4 34 -0.16384000000000000000e5
-66 2 21 35 0.16384000000000000000e5
-66 3 5 50 -0.16384000000000000000e5
-66 3 22 35 0.65536000000000000000e5
-66 3 23 52 -0.32768000000000000000e5
-66 3 24 37 -0.81920000000000000000e4
-66 3 27 40 -0.32768000000000000000e5
-66 4 4 32 0.81920000000000000000e4
-66 4 7 35 0.16384000000000000000e5
-66 4 16 28 -0.81920000000000000000e4
-67 1 6 53 0.81920000000000000000e4
-67 1 12 43 0.65536000000000000000e5
-67 1 16 47 -0.65536000000000000000e5
-67 1 25 40 -0.81920000000000000000e4
-67 1 28 43 -0.32768000000000000000e5
-67 1 32 47 -0.32768000000000000000e5
-67 1 37 52 0.32768000000000000000e5
-67 2 4 34 0.16384000000000000000e5
-67 2 20 34 -0.32768000000000000000e5
-67 2 21 35 -0.16384000000000000000e5
-67 3 5 50 0.16384000000000000000e5
-67 3 7 52 -0.65536000000000000000e5
-67 3 22 35 -0.65536000000000000000e5
-67 3 24 37 0.81920000000000000000e4
-67 3 27 40 0.32768000000000000000e5
-67 4 4 32 -0.81920000000000000000e4
-67 4 7 35 -0.16384000000000000000e5
-67 4 16 28 0.81920000000000000000e4
-68 1 26 41 -0.32768000000000000000e5
-68 2 28 34 -0.32768000000000000000e5
-68 3 10 55 0.65536000000000000000e5
-68 3 22 51 -0.32768000000000000000e5
-68 3 23 52 0.65536000000000000000e5
-68 3 27 40 0.32768000000000000000e5
-68 3 29 42 -0.65536000000000000000e5
-68 3 35 48 -0.13107200000000000000e6
-68 3 40 45 0.65536000000000000000e5
-68 4 7 35 -0.32768000000000000000e5
-68 4 22 34 0.65536000000000000000e5
-69 1 1 48 0.16384000000000000000e5
-69 1 2 49 0.16384000000000000000e5
-69 1 8 39 0.32768000000000000000e5
-69 1 9 40 0.32768000000000000000e5
-69 1 10 41 -0.65536000000000000000e5
-69 1 12 43 -0.13107200000000000000e6
-69 1 23 38 0.16384000000000000000e5
-69 1 24 55 -0.32768000000000000000e5
-69 1 28 43 0.65536000000000000000e5
-69 1 32 47 0.13107200000000000000e6
-69 2 2 32 0.16384000000000000000e5
-69 2 4 34 -0.32768000000000000000e5
-69 2 16 30 0.32768000000000000000e5
-69 2 20 34 0.65536000000000000000e5
-69 3 5 50 -0.32768000000000000000e5
-69 3 9 38 0.32768000000000000000e5
-69 3 22 35 0.13107200000000000000e6
-69 3 22 51 0.32768000000000000000e5
-69 3 23 52 -0.65536000000000000000e5
-69 3 27 40 -0.65536000000000000000e5
-69 3 28 41 0.13107200000000000000e6
-69 4 2 30 0.32768000000000000000e5
-69 4 6 34 0.65536000000000000000e5
-69 4 7 35 0.32768000000000000000e5
-70 1 1 48 -0.16384000000000000000e5
-70 1 2 49 -0.16384000000000000000e5
-70 1 6 53 -0.16384000000000000000e5
-70 1 8 39 -0.32768000000000000000e5
-70 1 9 40 -0.32768000000000000000e5
-70 1 10 41 0.65536000000000000000e5
-70 1 12 43 0.13107200000000000000e6
-70 1 23 38 -0.16384000000000000000e5
-70 1 24 55 0.32768000000000000000e5
-70 1 25 40 0.16384000000000000000e5
-70 1 26 41 0.32768000000000000000e5
-70 1 28 43 -0.65536000000000000000e5
-70 1 32 47 -0.19660800000000000000e6
-70 2 2 32 -0.16384000000000000000e5
-70 2 16 30 -0.32768000000000000000e5
-70 2 20 34 -0.65536000000000000000e5
-70 3 9 38 -0.32768000000000000000e5
-70 3 22 35 -0.13107200000000000000e6
-70 3 24 37 -0.16384000000000000000e5
-70 3 27 40 -0.32768000000000000000e5
-70 3 28 41 -0.19660800000000000000e6
-70 4 2 30 -0.32768000000000000000e5
-70 4 4 32 0.16384000000000000000e5
-70 4 6 34 -0.65536000000000000000e5
-70 4 16 28 -0.16384000000000000000e5
-71 1 1 48 -0.16384000000000000000e5
-71 1 2 49 -0.16384000000000000000e5
-71 1 23 38 -0.16384000000000000000e5
-71 2 2 32 -0.16384000000000000000e5
-71 2 16 30 -0.32768000000000000000e5
-71 3 22 51 -0.32768000000000000000e5
-71 3 27 40 0.32768000000000000000e5
-71 3 28 41 -0.65536000000000000000e5
-71 4 17 29 0.32768000000000000000e5
-72 1 1 48 0.16384000000000000000e5
-72 1 2 33 0.65536000000000000000e5
-72 1 2 49 0.16384000000000000000e5
-72 1 3 34 -0.13107200000000000000e6
-72 1 6 53 0.32768000000000000000e5
-72 1 8 39 0.32768000000000000000e5
-72 1 10 41 0.65536000000000000000e5
-72 1 23 38 0.16384000000000000000e5
-72 1 24 55 -0.32768000000000000000e5
-72 1 25 40 -0.32768000000000000000e5
-72 1 26 41 0.32768000000000000000e5
-72 1 32 47 -0.65536000000000000000e5
-72 1 37 52 0.65536000000000000000e5
-72 2 2 32 0.16384000000000000000e5
-72 2 4 34 0.32768000000000000000e5
-72 2 7 21 0.65536000000000000000e5
-72 2 16 30 0.32768000000000000000e5
-72 2 16 34 -0.32768000000000000000e5
-72 2 21 35 -0.32768000000000000000e5
-72 3 2 31 0.65536000000000000000e5
-72 3 3 32 0.65536000000000000000e5
-72 3 5 50 0.32768000000000000000e5
-72 3 7 52 -0.13107200000000000000e6
-72 3 8 37 0.32768000000000000000e5
-72 3 22 27 0.32768000000000000000e5
-72 3 22 51 0.32768000000000000000e5
-72 3 24 37 0.32768000000000000000e5
-72 3 27 40 0.65536000000000000000e5
-72 3 28 41 0.65536000000000000000e5
-72 4 1 29 0.32768000000000000000e5
-72 4 4 32 -0.32768000000000000000e5
-72 4 6 34 0.65536000000000000000e5
-72 4 7 35 -0.32768000000000000000e5
-72 4 16 28 0.32768000000000000000e5
-72 4 20 32 0.32768000000000000000e5
-73 1 1 48 0.65536000000000000000e5
-73 1 2 49 0.98304000000000000000e5
-73 1 6 53 -0.32768000000000000000e5
-73 1 8 39 0.13107200000000000000e6
-73 1 9 40 0.13107200000000000000e6
-73 1 10 41 -0.26214400000000000000e6
-73 1 12 43 -0.52428800000000000000e6
-73 1 23 38 0.65536000000000000000e5
-73 1 24 39 0.32768000000000000000e5
-73 1 25 56 -0.32768000000000000000e5
-73 1 26 41 -0.19660800000000000000e6
-73 1 28 43 0.39321600000000000000e6
-73 1 32 47 0.52428800000000000000e6
-73 1 49 56 -0.32768000000000000000e5
-73 1 53 56 0.32768000000000000000e5
-73 1 54 55 0.65536000000000000000e5
-73 1 55 56 -0.65536000000000000000e5
-73 2 2 32 0.65536000000000000000e5
-73 2 3 33 0.32768000000000000000e5
-73 2 4 34 -0.65536000000000000000e5
-73 2 5 35 -0.32768000000000000000e5
-73 2 16 30 0.13107200000000000000e6
-73 2 20 34 0.26214400000000000000e6
-73 3 9 38 0.13107200000000000000e6
-73 3 10 55 0.13107200000000000000e6
-73 3 22 35 0.52428800000000000000e6
-73 3 22 51 -0.65536000000000000000e5
-73 3 23 52 0.13107200000000000000e6
-73 3 24 53 0.32768000000000000000e5
-73 3 25 38 0.32768000000000000000e5
-73 3 27 40 0.65536000000000000000e5
-73 3 28 41 0.52428800000000000000e6
-73 3 29 42 -0.13107200000000000000e6
-73 3 35 48 -0.26214400000000000000e6
-73 3 38 51 -0.65536000000000000000e5
-73 3 40 45 0.13107200000000000000e6
-73 3 40 53 -0.32768000000000000000e5
-73 3 48 53 0.32768000000000000000e5
-73 3 49 54 0.32768000000000000000e5
-73 3 53 54 -0.32768000000000000000e5
-73 4 2 30 0.13107200000000000000e6
-73 4 6 34 0.26214400000000000000e6
-73 4 7 35 -0.65536000000000000000e5
-73 4 18 30 0.65536000000000000000e5
-73 4 19 35 -0.32768000000000000000e5
-73 4 21 33 0.65536000000000000000e5
-73 4 22 34 0.13107200000000000000e6
-73 4 28 32 0.32768000000000000000e5
-73 4 33 33 -0.65536000000000000000e5
-73 4 35 35 -0.65536000000000000000e5
-74 1 1 48 0.32768000000000000000e5
-74 1 2 49 0.65536000000000000000e5
-74 1 8 39 0.65536000000000000000e5
-74 1 9 40 0.65536000000000000000e5
-74 1 10 41 -0.13107200000000000000e6
-74 1 12 43 -0.26214400000000000000e6
-74 1 23 38 0.32768000000000000000e5
-74 1 24 39 0.32768000000000000000e5
-74 1 26 41 -0.65536000000000000000e5
-74 1 28 43 0.13107200000000000000e6
-74 1 32 47 0.26214400000000000000e6
-74 2 2 32 0.32768000000000000000e5
-74 2 3 33 0.32768000000000000000e5
-74 2 5 35 -0.32768000000000000000e5
-74 2 16 30 0.65536000000000000000e5
-74 2 20 34 0.13107200000000000000e6
-74 3 5 50 -0.65536000000000000000e5
-74 3 9 38 0.65536000000000000000e5
-74 3 22 35 0.26214400000000000000e6
-74 3 25 38 0.32768000000000000000e5
-74 3 28 41 0.26214400000000000000e6
-74 3 39 40 -0.32768000000000000000e5
-74 4 2 30 0.65536000000000000000e5
-74 4 6 34 0.13107200000000000000e6
-75 1 1 48 -0.32768000000000000000e5
-75 1 2 49 -0.65536000000000000000e5
-75 1 8 39 -0.65536000000000000000e5
-75 1 9 40 -0.65536000000000000000e5
-75 1 10 41 0.13107200000000000000e6
-75 1 12 43 0.26214400000000000000e6
-75 1 23 38 -0.32768000000000000000e5
-75 1 24 39 -0.32768000000000000000e5
-75 1 25 56 0.32768000000000000000e5
-75 1 28 43 -0.13107200000000000000e6
-75 1 32 47 -0.26214400000000000000e6
-75 2 2 32 -0.32768000000000000000e5
-75 2 3 33 -0.32768000000000000000e5
-75 2 16 30 -0.65536000000000000000e5
-75 2 20 34 -0.13107200000000000000e6
-75 3 9 38 -0.65536000000000000000e5
-75 3 22 35 -0.26214400000000000000e6
-75 3 24 53 -0.32768000000000000000e5
-75 3 25 38 -0.32768000000000000000e5
-75 3 25 54 -0.32768000000000000000e5
-75 3 28 41 -0.26214400000000000000e6
-75 3 38 51 0.65536000000000000000e5
-75 4 2 30 -0.65536000000000000000e5
-75 4 6 34 -0.13107200000000000000e6
-75 4 28 32 -0.32768000000000000000e5
-76 1 1 48 0.32768000000000000000e5
-76 1 2 49 0.32768000000000000000e5
-76 1 6 53 -0.32768000000000000000e5
-76 1 8 39 0.65536000000000000000e5
-76 1 9 40 0.65536000000000000000e5
-76 1 10 41 -0.13107200000000000000e6
-76 1 12 43 -0.26214400000000000000e6
-76 1 23 38 0.32768000000000000000e5
-76 1 24 39 0.32768000000000000000e5
-76 1 25 40 0.32768000000000000000e5
-76 1 26 41 -0.65536000000000000000e5
-76 1 28 43 0.13107200000000000000e6
-76 1 32 47 0.26214400000000000000e6
-76 1 40 47 0.32768000000000000000e5
-76 2 2 32 0.32768000000000000000e5
-76 2 16 30 0.65536000000000000000e5
-76 2 20 34 0.13107200000000000000e6
-76 3 9 38 0.65536000000000000000e5
-76 3 22 35 0.26214400000000000000e6
-76 3 25 38 0.32768000000000000000e5
-76 3 27 40 -0.65536000000000000000e5
-76 3 28 41 0.26214400000000000000e6
-76 4 2 30 0.65536000000000000000e5
-76 4 4 32 0.32768000000000000000e5
-76 4 6 34 0.13107200000000000000e6
-77 1 2 49 0.32768000000000000000e5
-77 1 8 39 -0.65536000000000000000e5
-77 1 9 40 -0.65536000000000000000e5
-77 1 10 41 0.13107200000000000000e6
-77 1 23 54 0.32768000000000000000e5
-77 1 26 41 0.65536000000000000000e5
-77 1 32 47 -0.13107200000000000000e6
-77 3 9 38 -0.65536000000000000000e5
-77 3 24 37 -0.32768000000000000000e5
-77 3 28 41 -0.13107200000000000000e6
-77 4 2 30 -0.65536000000000000000e5
-78 1 1 48 -0.32768000000000000000e5
-78 1 2 49 -0.32768000000000000000e5
-78 1 6 53 0.32768000000000000000e5
-78 1 8 39 0.65536000000000000000e5
-78 1 9 40 0.65536000000000000000e5
-78 1 10 41 -0.13107200000000000000e6
-78 1 22 53 -0.32768000000000000000e5
-78 1 23 54 -0.32768000000000000000e5
-78 1 24 55 -0.65536000000000000000e5
-78 1 25 40 -0.32768000000000000000e5
-78 1 37 52 0.13107200000000000000e6
-78 2 2 32 -0.32768000000000000000e5
-78 2 26 32 -0.32768000000000000000e5
-78 3 2 47 -0.32768000000000000000e5
-78 3 9 38 0.65536000000000000000e5
-78 3 22 51 0.65536000000000000000e5
-78 3 24 37 0.32768000000000000000e5
-78 3 27 40 0.65536000000000000000e5
-78 4 2 30 0.65536000000000000000e5
-78 4 4 32 -0.32768000000000000000e5
-78 4 16 28 0.32768000000000000000e5
-78 4 17 29 0.65536000000000000000e5
-78 4 20 32 0.65536000000000000000e5
-79 1 1 48 0.32768000000000000000e5
-79 1 6 53 0.32768000000000000000e5
-79 1 7 38 -0.65536000000000000000e5
-79 1 22 53 0.32768000000000000000e5
-79 1 25 40 -0.32768000000000000000e5
-79 2 1 35 -0.32768000000000000000e5
-79 2 2 32 0.32768000000000000000e5
-79 2 4 34 0.65536000000000000000e5
-79 2 16 30 0.65536000000000000000e5
-79 2 16 34 -0.65536000000000000000e5
-79 2 21 35 -0.65536000000000000000e5
-79 3 2 47 0.32768000000000000000e5
-79 3 5 50 0.65536000000000000000e5
-79 3 7 52 -0.26214400000000000000e6
-79 3 22 27 0.65536000000000000000e5
-79 3 24 37 0.65536000000000000000e5
-79 3 27 40 0.65536000000000000000e5
-79 3 28 41 0.26214400000000000000e6
-79 4 4 32 -0.32768000000000000000e5
-79 4 6 34 0.13107200000000000000e6
-79 4 7 35 -0.65536000000000000000e5
-79 4 16 28 0.32768000000000000000e5
-79 4 17 29 -0.65536000000000000000e5
-80 1 6 21 -0.81920000000000000000e4
-80 1 17 32 -0.81920000000000000000e4
-80 1 19 50 0.81920000000000000000e4
-80 1 20 51 0.81920000000000000000e4
-80 2 9 15 -0.81920000000000000000e4
-80 2 25 31 0.81920000000000000000e4
-80 3 7 20 0.81920000000000000000e4
-80 3 8 21 -0.16384000000000000000e5
-80 3 14 19 0.16384000000000000000e5
-80 3 16 45 -0.81920000000000000000e4
-80 3 17 46 -0.16384000000000000000e5
-80 3 18 31 -0.81920000000000000000e4
-80 3 19 32 0.16384000000000000000e5
-80 3 20 45 -0.16384000000000000000e5
-80 3 21 34 0.65536000000000000000e5
-80 3 21 52 -0.32768000000000000000e5
-80 4 10 14 0.81920000000000000000e4
-80 4 25 25 -0.32768000000000000000e5
-81 1 6 21 -0.16384000000000000000e5
-81 1 17 32 -0.16384000000000000000e5
-81 1 19 50 0.16384000000000000000e5
-81 1 20 35 0.65536000000000000000e5
-81 1 20 51 0.16384000000000000000e5
-81 1 21 52 -0.65536000000000000000e5
-81 2 9 15 -0.16384000000000000000e5
-81 2 25 31 0.16384000000000000000e5
-81 3 7 20 0.16384000000000000000e5
-81 3 8 21 -0.32768000000000000000e5
-81 3 14 19 0.32768000000000000000e5
-81 3 16 45 -0.16384000000000000000e5
-81 3 17 46 -0.65536000000000000000e5
-81 3 18 31 -0.16384000000000000000e5
-81 3 19 32 0.32768000000000000000e5
-81 3 20 45 -0.32768000000000000000e5
-81 3 36 45 -0.32768000000000000000e5
-81 4 10 14 0.16384000000000000000e5
-81 4 25 25 -0.65536000000000000000e5
-82 1 13 20 0.32768000000000000000e5
-82 1 17 32 -0.16384000000000000000e5
-82 1 19 50 0.16384000000000000000e5
-82 1 20 27 -0.16384000000000000000e5
-82 1 20 51 0.16384000000000000000e5
-82 1 21 44 -0.65536000000000000000e5
-82 1 33 36 0.32768000000000000000e5
-82 2 11 25 -0.16384000000000000000e5
-82 2 25 31 0.16384000000000000000e5
-82 3 8 21 -0.32768000000000000000e5
-82 3 16 45 -0.16384000000000000000e5
-82 3 17 46 -0.32768000000000000000e5
-82 3 18 31 -0.16384000000000000000e5
-82 3 21 50 -0.32768000000000000000e5
-83 1 11 18 0.16384000000000000000e5
-83 1 20 51 0.32768000000000000000e5
-83 1 36 51 -0.32768000000000000000e5
-83 1 45 52 -0.16384000000000000000e5
-83 3 6 19 -0.16384000000000000000e5
-83 3 15 44 -0.16384000000000000000e5
-83 3 17 30 -0.16384000000000000000e5
-83 3 17 46 -0.65536000000000000000e5
-83 3 21 50 -0.65536000000000000000e5
-83 3 21 56 0.32768000000000000000e5
-83 3 32 45 -0.16384000000000000000e5
-83 3 36 49 0.16384000000000000000e5
-83 3 41 46 0.16384000000000000000e5
-83 3 45 46 0.32768000000000000000e5
-83 4 15 35 0.16384000000000000000e5
-84 1 6 21 -0.32768000000000000000e5
-84 1 17 32 -0.32768000000000000000e5
-84 1 36 51 0.32768000000000000000e5
-84 2 9 15 -0.32768000000000000000e5
-84 3 7 20 0.32768000000000000000e5
-84 3 8 21 -0.65536000000000000000e5
-84 3 14 19 0.65536000000000000000e5
-84 3 16 45 -0.32768000000000000000e5
-84 3 18 31 -0.32768000000000000000e5
-84 3 19 32 0.65536000000000000000e5
-84 4 10 14 0.32768000000000000000e5
-85 1 3 18 -0.81920000000000000000e4
-85 1 4 19 0.16384000000000000000e5
-85 1 5 36 0.16384000000000000000e5
-85 1 12 43 0.81920000000000000000e4
-85 1 13 44 -0.16384000000000000000e5
-85 1 14 45 -0.16384000000000000000e5
-85 1 17 32 -0.32768000000000000000e5
-85 1 19 50 0.32768000000000000000e5
-85 1 20 27 -0.32768000000000000000e5
-85 2 15 29 -0.32768000000000000000e5
-85 3 3 16 -0.81920000000000000000e4
-85 3 4 17 -0.81920000000000000000e4
-85 3 7 36 0.32768000000000000000e5
-85 3 14 27 0.81920000000000000000e4
-85 3 16 29 0.16384000000000000000e5
-85 3 16 45 -0.32768000000000000000e5
-85 3 36 41 -0.32768000000000000000e5
-85 4 2 14 -0.81920000000000000000e4
-85 4 11 23 0.16384000000000000000e5
-86 1 15 46 -0.65536000000000000000e5
-86 1 20 51 0.65536000000000000000e5
-86 3 32 45 0.32768000000000000000e5
-86 3 36 49 0.32768000000000000000e5
-87 1 11 18 0.32768000000000000000e5
-87 1 13 20 -0.13107200000000000000e6
-87 1 14 45 0.65536000000000000000e5
-87 1 17 32 0.65536000000000000000e5
-87 1 17 48 -0.16384000000000000000e5
-87 1 18 49 -0.16384000000000000000e5
-87 1 20 27 0.65536000000000000000e5
-87 1 34 49 -0.16384000000000000000e5
-87 2 11 25 0.65536000000000000000e5
-87 2 14 28 -0.16384000000000000000e5
-87 3 6 19 -0.32768000000000000000e5
-87 3 8 21 0.13107200000000000000e6
-87 3 14 43 -0.16384000000000000000e5
-87 3 16 45 -0.65536000000000000000e5
-87 3 17 30 -0.32768000000000000000e5
-87 3 18 31 0.65536000000000000000e5
-87 3 18 47 -0.16384000000000000000e5
-87 3 22 35 0.16384000000000000000e5
-87 3 32 45 -0.32768000000000000000e5
-87 4 14 26 0.16384000000000000000e5
-87 4 15 27 0.32768000000000000000e5
-88 1 3 18 -0.16384000000000000000e5
-88 1 4 19 0.32768000000000000000e5
-88 1 4 35 0.16384000000000000000e5
-88 1 5 36 0.32768000000000000000e5
-88 1 12 43 0.32768000000000000000e5
-88 1 13 44 -0.32768000000000000000e5
-88 1 14 45 0.32768000000000000000e5
-88 1 17 32 -0.65536000000000000000e5
-88 1 17 48 -0.16384000000000000000e5
-88 1 18 49 -0.16384000000000000000e5
-88 2 9 23 0.16384000000000000000e5
-88 2 14 28 -0.16384000000000000000e5
-88 3 3 16 -0.16384000000000000000e5
-88 3 4 17 -0.16384000000000000000e5
-88 3 5 34 0.16384000000000000000e5
-88 3 13 42 -0.16384000000000000000e5
-88 3 14 27 0.32768000000000000000e5
-88 3 14 43 -0.16384000000000000000e5
-88 3 15 44 0.32768000000000000000e5
-88 3 16 45 -0.65536000000000000000e5
-88 3 19 48 -0.32768000000000000000e5
-88 4 2 14 -0.16384000000000000000e5
-88 4 11 23 0.32768000000000000000e5
-88 4 15 27 0.32768000000000000000e5
-89 1 4 35 0.16384000000000000000e5
-89 1 12 43 0.16384000000000000000e5
-89 1 20 27 -0.65536000000000000000e5
-89 1 34 41 0.32768000000000000000e5
-89 1 34 49 0.16384000000000000000e5
-89 2 9 23 0.16384000000000000000e5
-89 3 5 34 0.16384000000000000000e5
-89 3 7 36 0.65536000000000000000e5
-89 3 13 42 -0.16384000000000000000e5
-89 3 14 27 0.16384000000000000000e5
-89 3 16 29 -0.32768000000000000000e5
-89 3 18 47 0.16384000000000000000e5
-89 3 22 35 -0.16384000000000000000e5
-89 3 31 44 -0.32768000000000000000e5
-89 4 14 26 -0.16384000000000000000e5
-90 3 14 43 -0.32768000000000000000e5
-90 3 17 30 0.65536000000000000000e5
-90 3 35 40 -0.32768000000000000000e5
-91 1 14 45 -0.65536000000000000000e5
-91 1 18 49 0.32768000000000000000e5
-91 1 34 49 0.32768000000000000000e5
-91 3 14 51 -0.32768000000000000000e5
-91 3 18 47 0.32768000000000000000e5
-92 1 4 35 -0.32768000000000000000e5
-92 1 12 43 -0.32768000000000000000e5
-92 1 14 45 -0.65536000000000000000e5
-92 1 17 48 0.65536000000000000000e5
-92 1 18 49 0.32768000000000000000e5
-92 1 34 49 0.32768000000000000000e5
-92 2 9 23 -0.32768000000000000000e5
-92 2 14 28 0.32768000000000000000e5
-92 3 5 34 -0.32768000000000000000e5
-92 3 13 42 0.32768000000000000000e5
-92 3 14 27 -0.32768000000000000000e5
-92 3 14 43 0.32768000000000000000e5
-92 3 16 29 0.65536000000000000000e5
-93 1 6 53 -0.40960000000000000000e4
-93 1 12 43 0.32768000000000000000e5
-93 1 13 44 -0.65536000000000000000e5
-93 1 17 48 0.32768000000000000000e5
-93 1 25 40 0.40960000000000000000e4
-93 2 4 34 -0.81920000000000000000e4
-93 2 21 35 0.81920000000000000000e4
-93 3 5 50 -0.81920000000000000000e4
-93 3 22 35 -0.32768000000000000000e5
-93 3 24 37 -0.40960000000000000000e4
-93 3 27 40 -0.16384000000000000000e5
-93 3 28 41 -0.16384000000000000000e5
-93 3 29 42 -0.16384000000000000000e5
-93 4 4 32 0.40960000000000000000e4
-93 4 7 35 0.81920000000000000000e4
-93 4 16 28 -0.40960000000000000000e4
-93 4 23 27 -0.16384000000000000000e5
-94 1 12 43 0.32768000000000000000e5
-94 1 16 47 0.32768000000000000000e5
-94 1 27 34 -0.65536000000000000000e5
-94 3 7 52 -0.32768000000000000000e5
-94 3 22 35 -0.32768000000000000000e5
-95 1 1 48 0.81920000000000000000e4
-95 1 2 49 0.81920000000000000000e4
-95 1 8 39 0.16384000000000000000e5
-95 1 9 40 0.16384000000000000000e5
-95 1 10 41 -0.32768000000000000000e5
-95 1 12 43 -0.65536000000000000000e5
-95 1 18 49 0.65536000000000000000e5
-95 1 23 38 0.81920000000000000000e4
-95 1 24 55 -0.16384000000000000000e5
-95 1 26 41 -0.16384000000000000000e5
-95 1 28 43 0.65536000000000000000e5
-95 1 32 47 0.65536000000000000000e5
-95 1 33 48 -0.32768000000000000000e5
-95 1 40 55 0.16384000000000000000e5
-95 1 41 56 0.16384000000000000000e5
-95 1 52 55 -0.65536000000000000000e5
-95 2 2 32 0.81920000000000000000e4
-95 2 4 34 -0.16384000000000000000e5
-95 2 16 30 0.16384000000000000000e5
-95 2 20 34 0.32768000000000000000e5
-95 2 28 34 0.16384000000000000000e5
-95 3 5 50 -0.16384000000000000000e5
-95 3 9 38 0.16384000000000000000e5
-95 3 14 43 -0.65536000000000000000e5
-95 3 14 51 -0.65536000000000000000e5
-95 3 22 35 0.65536000000000000000e5
-95 3 22 51 0.16384000000000000000e5
-95 3 23 52 -0.32768000000000000000e5
-95 3 27 40 -0.16384000000000000000e5
-95 3 27 56 0.16384000000000000000e5
-95 3 28 41 0.65536000000000000000e5
-95 3 29 42 -0.32768000000000000000e5
-95 3 30 43 -0.32768000000000000000e5
-95 3 35 48 -0.65536000000000000000e5
-95 3 38 51 -0.16384000000000000000e5
-95 3 45 50 -0.65536000000000000000e5
-95 3 45 56 0.32768000000000000000e5
-95 3 47 52 -0.32768000000000000000e5
-95 4 2 30 0.16384000000000000000e5
-95 4 6 34 0.32768000000000000000e5
-95 4 7 35 0.16384000000000000000e5
-95 4 19 31 -0.32768000000000000000e5
-95 4 22 34 -0.32768000000000000000e5
-95 4 29 33 -0.16384000000000000000e5
-95 4 30 34 -0.32768000000000000000e5
-95 4 31 35 -0.32768000000000000000e5
-96 1 14 45 -0.13107200000000000000e6
-96 1 17 48 0.65536000000000000000e5
-96 1 18 49 0.65536000000000000000e5
-96 1 33 40 0.32768000000000000000e5
-96 1 33 48 0.32768000000000000000e5
-96 2 14 28 0.65536000000000000000e5
-96 3 13 42 0.65536000000000000000e5
-96 3 14 43 0.65536000000000000000e5
-96 3 14 51 -0.65536000000000000000e5
-96 3 29 42 0.65536000000000000000e5
-96 3 30 43 0.32768000000000000000e5
-96 4 19 31 0.32768000000000000000e5
-97 1 17 48 -0.65536000000000000000e5
-97 1 28 43 0.32768000000000000000e5
-97 1 33 48 0.32768000000000000000e5
-97 3 13 42 -0.65536000000000000000e5
-98 1 6 53 -0.81920000000000000000e4
-98 1 12 43 -0.65536000000000000000e5
-98 1 25 40 0.81920000000000000000e4
-98 1 28 43 0.32768000000000000000e5
-98 1 32 47 0.32768000000000000000e5
-98 2 4 34 -0.16384000000000000000e5
-98 2 21 35 0.16384000000000000000e5
-98 3 5 50 -0.16384000000000000000e5
-98 3 24 37 -0.81920000000000000000e4
-98 3 27 40 -0.32768000000000000000e5
-98 3 28 41 0.32768000000000000000e5
-98 4 4 32 0.81920000000000000000e4
-98 4 7 35 0.16384000000000000000e5
-98 4 16 28 -0.81920000000000000000e4
-99 1 12 43 0.65536000000000000000e5
-99 1 16 47 -0.65536000000000000000e5
-99 1 28 43 -0.32768000000000000000e5
-99 2 20 34 -0.32768000000000000000e5
-99 3 12 41 -0.65536000000000000000e5
-99 3 22 35 -0.65536000000000000000e5
-99 3 28 41 -0.32768000000000000000e5
-99 4 6 34 -0.32768000000000000000e5
-100 1 2 33 -0.32768000000000000000e5
-100 1 3 34 0.65536000000000000000e5
-100 1 6 53 0.81920000000000000000e4
-100 1 9 40 0.16384000000000000000e5
-100 1 10 41 -0.65536000000000000000e5
-100 1 12 43 0.65536000000000000000e5
-100 1 16 23 -0.65536000000000000000e5
-100 1 25 40 -0.81920000000000000000e4
-100 1 26 41 -0.16384000000000000000e5
-100 1 28 43 -0.32768000000000000000e5
-100 2 4 34 0.16384000000000000000e5
-100 2 7 21 -0.32768000000000000000e5
-100 2 20 34 -0.32768000000000000000e5
-100 2 21 35 -0.16384000000000000000e5
-100 3 1 34 0.65536000000000000000e5
-100 3 2 31 -0.32768000000000000000e5
-100 3 3 32 -0.32768000000000000000e5
-100 3 5 50 0.16384000000000000000e5
-100 3 7 52 -0.65536000000000000000e5
-100 3 8 37 -0.16384000000000000000e5
-100 3 9 38 0.16384000000000000000e5
-100 3 22 27 -0.16384000000000000000e5
-100 3 22 35 -0.65536000000000000000e5
-100 3 24 37 0.81920000000000000000e4
-100 3 27 40 0.32768000000000000000e5
-100 3 28 41 0.32768000000000000000e5
-100 4 1 29 -0.16384000000000000000e5
-100 4 2 30 0.16384000000000000000e5
-100 4 4 32 -0.81920000000000000000e4
-100 4 7 35 -0.16384000000000000000e5
-100 4 16 28 0.81920000000000000000e4
-101 1 26 33 -0.65536000000000000000e5
-101 1 33 40 0.65536000000000000000e5
-101 3 5 50 -0.32768000000000000000e5
-101 3 6 55 0.32768000000000000000e5
-101 3 27 40 -0.32768000000000000000e5
-101 3 29 42 0.65536000000000000000e5
-101 4 18 30 -0.32768000000000000000e5
-102 1 11 42 -0.65536000000000000000e5
-102 1 26 41 -0.32768000000000000000e5
-102 1 33 48 0.65536000000000000000e5
-102 2 28 34 -0.32768000000000000000e5
-102 3 5 50 0.32768000000000000000e5
-102 3 27 40 0.32768000000000000000e5
-102 4 21 33 -0.32768000000000000000e5
-103 1 1 48 0.16384000000000000000e5
-103 1 2 49 0.16384000000000000000e5
-103 1 8 39 0.32768000000000000000e5
-103 1 9 40 0.32768000000000000000e5
-103 1 11 42 0.65536000000000000000e5
-103 1 12 43 -0.13107200000000000000e6
-103 1 23 38 0.16384000000000000000e5
-103 1 26 41 -0.32768000000000000000e5
-103 1 28 43 0.65536000000000000000e5
-103 1 32 47 0.65536000000000000000e5
-103 1 33 48 -0.65536000000000000000e5
-103 2 2 32 0.16384000000000000000e5
-103 2 4 34 -0.32768000000000000000e5
-103 2 16 30 0.32768000000000000000e5
-103 2 20 34 0.65536000000000000000e5
-103 3 5 50 -0.32768000000000000000e5
-103 3 9 38 0.32768000000000000000e5
-103 3 13 42 -0.13107200000000000000e6
-103 3 22 35 0.13107200000000000000e6
-103 3 28 41 0.65536000000000000000e5
-103 3 29 42 -0.65536000000000000000e5
-103 4 2 30 0.32768000000000000000e5
-103 4 3 31 0.65536000000000000000e5
-103 4 6 34 0.65536000000000000000e5
-104 1 1 48 -0.16384000000000000000e5
-104 1 2 49 -0.16384000000000000000e5
-104 1 8 39 -0.32768000000000000000e5
-104 1 9 40 -0.32768000000000000000e5
-104 1 12 43 0.13107200000000000000e6
-104 1 23 38 -0.16384000000000000000e5
-104 1 26 41 0.65536000000000000000e5
-104 1 28 43 -0.65536000000000000000e5
-104 1 32 47 -0.13107200000000000000e6
-104 2 2 32 -0.16384000000000000000e5
-104 2 16 30 -0.32768000000000000000e5
-104 2 20 34 -0.65536000000000000000e5
-104 3 9 38 -0.32768000000000000000e5
-104 3 22 35 -0.13107200000000000000e6
-104 3 27 40 -0.32768000000000000000e5
-104 3 28 41 -0.13107200000000000000e6
-104 4 2 30 -0.32768000000000000000e5
-104 4 6 34 -0.65536000000000000000e5
-105 1 1 48 -0.16384000000000000000e5
-105 1 2 49 -0.16384000000000000000e5
-105 1 6 53 -0.16384000000000000000e5
-105 1 11 42 -0.65536000000000000000e5
-105 1 23 38 -0.16384000000000000000e5
-105 1 25 40 0.16384000000000000000e5
-105 1 33 48 0.65536000000000000000e5
-105 2 2 32 -0.16384000000000000000e5
-105 2 12 26 0.65536000000000000000e5
-105 2 16 30 -0.32768000000000000000e5
-105 2 20 34 -0.65536000000000000000e5
-105 3 13 42 0.13107200000000000000e6
-105 3 22 35 -0.13107200000000000000e6
-105 3 24 37 -0.16384000000000000000e5
-105 3 27 40 -0.32768000000000000000e5
-105 3 29 42 0.65536000000000000000e5
-105 4 3 31 -0.65536000000000000000e5
-105 4 4 32 0.16384000000000000000e5
-105 4 6 34 -0.65536000000000000000e5
-105 4 16 28 -0.16384000000000000000e5
-106 1 1 48 0.16384000000000000000e5
-106 1 2 33 0.65536000000000000000e5
-106 1 2 49 0.16384000000000000000e5
-106 1 3 34 -0.13107200000000000000e6
-106 1 6 53 0.16384000000000000000e5
-106 1 8 39 0.32768000000000000000e5
-106 1 9 40 0.32768000000000000000e5
-106 1 23 38 0.16384000000000000000e5
-106 1 25 40 -0.16384000000000000000e5
-106 1 26 41 -0.32768000000000000000e5
-106 1 32 47 0.65536000000000000000e5
-106 2 2 32 0.16384000000000000000e5
-106 2 7 21 0.65536000000000000000e5
-106 3 2 31 0.65536000000000000000e5
-106 3 3 32 0.65536000000000000000e5
-106 3 9 38 0.32768000000000000000e5
-106 3 24 37 0.16384000000000000000e5
-106 3 27 40 0.65536000000000000000e5
-106 4 2 30 0.32768000000000000000e5
-106 4 4 32 -0.16384000000000000000e5
-106 4 16 28 0.16384000000000000000e5
-106 4 17 29 0.32768000000000000000e5
-107 1 1 48 0.16384000000000000000e5
-107 1 2 33 -0.65536000000000000000e5
-107 1 2 49 0.16384000000000000000e5
-107 1 3 34 0.13107200000000000000e6
-107 1 6 53 0.16384000000000000000e5
-107 1 7 38 0.32768000000000000000e5
-107 1 10 41 -0.65536000000000000000e5
-107 1 11 42 0.65536000000000000000e5
-107 1 12 43 0.13107200000000000000e6
-107 1 16 23 -0.13107200000000000000e6
-107 1 23 38 0.16384000000000000000e5
-107 1 25 40 -0.16384000000000000000e5
-107 1 28 43 -0.65536000000000000000e5
-107 1 32 47 -0.65536000000000000000e5
-107 1 33 48 -0.65536000000000000000e5
-107 2 1 31 0.65536000000000000000e5
-107 2 2 32 0.16384000000000000000e5
-107 2 4 34 0.32768000000000000000e5
-107 2 7 21 -0.65536000000000000000e5
-107 2 12 26 -0.65536000000000000000e5
-107 2 16 30 0.32768000000000000000e5
-107 2 16 34 -0.32768000000000000000e5
-107 2 21 35 -0.32768000000000000000e5
-107 3 1 34 0.13107200000000000000e6
-107 3 2 31 -0.65536000000000000000e5
-107 3 3 32 -0.65536000000000000000e5
-107 3 5 50 0.32768000000000000000e5
-107 3 7 52 -0.13107200000000000000e6
-107 3 13 42 -0.13107200000000000000e6
-107 3 22 27 -0.32768000000000000000e5
-107 3 24 37 0.16384000000000000000e5
-107 3 27 40 0.32768000000000000000e5
-107 3 28 41 0.65536000000000000000e5
-107 3 29 42 -0.65536000000000000000e5
-107 4 3 31 0.65536000000000000000e5
-107 4 4 32 -0.16384000000000000000e5
-107 4 6 34 0.65536000000000000000e5
-107 4 7 35 -0.32768000000000000000e5
-107 4 16 28 0.16384000000000000000e5
-107 4 17 29 -0.32768000000000000000e5
-108 1 1 48 0.65536000000000000000e5
-108 1 2 49 0.98304000000000000000e5
-108 1 6 53 -0.65536000000000000000e5
-108 1 8 39 0.13107200000000000000e6
-108 1 9 40 0.19660800000000000000e6
-108 1 10 41 -0.26214400000000000000e6
-108 1 11 42 -0.13107200000000000000e6
-108 1 12 43 -0.52428800000000000000e6
-108 1 23 38 0.65536000000000000000e5
-108 1 24 39 0.32768000000000000000e5
-108 1 26 41 -0.26214400000000000000e6
-108 1 28 43 0.39321600000000000000e6
-108 1 32 47 0.52428800000000000000e6
-108 1 33 48 0.13107200000000000000e6
-108 1 49 56 -0.32768000000000000000e5
-108 1 53 56 0.32768000000000000000e5
-108 1 54 55 0.65536000000000000000e5
-108 1 55 56 -0.65536000000000000000e5
-108 2 2 32 0.65536000000000000000e5
-108 2 3 33 0.32768000000000000000e5
-108 2 4 34 -0.65536000000000000000e5
-108 2 5 35 -0.32768000000000000000e5
-108 2 16 30 0.13107200000000000000e6
-108 2 20 34 0.26214400000000000000e6
-108 3 9 38 0.13107200000000000000e6
-108 3 10 39 0.65536000000000000000e5
-108 3 22 35 0.52428800000000000000e6
-108 3 25 38 0.32768000000000000000e5
-108 3 25 54 -0.32768000000000000000e5
-108 3 26 39 0.32768000000000000000e5
-108 3 27 40 0.65536000000000000000e5
-108 3 28 41 0.52428800000000000000e6
-108 3 39 40 -0.32768000000000000000e5
-108 3 40 53 -0.32768000000000000000e5
-108 3 48 53 0.32768000000000000000e5
-108 3 49 54 0.32768000000000000000e5
-108 3 53 54 -0.32768000000000000000e5
-108 4 2 30 0.13107200000000000000e6
-108 4 6 34 0.26214400000000000000e6
-108 4 18 22 0.65536000000000000000e5
-108 4 18 30 0.65536000000000000000e5
-108 4 19 35 -0.32768000000000000000e5
-108 4 28 28 -0.65536000000000000000e5
-108 4 33 33 -0.65536000000000000000e5
-108 4 35 35 -0.65536000000000000000e5
-109 1 1 48 0.32768000000000000000e5
-109 1 2 49 0.65536000000000000000e5
-109 1 6 53 -0.32768000000000000000e5
-109 1 8 39 0.65536000000000000000e5
-109 1 9 40 0.65536000000000000000e5
-109 1 10 41 -0.13107200000000000000e6
-109 1 12 43 -0.26214400000000000000e6
-109 1 23 38 0.32768000000000000000e5
-109 1 24 39 0.32768000000000000000e5
-109 1 25 40 0.32768000000000000000e5
-109 1 26 41 -0.65536000000000000000e5
-109 1 28 43 0.13107200000000000000e6
-109 1 32 47 0.26214400000000000000e6
-109 2 2 32 0.32768000000000000000e5
-109 2 3 33 0.32768000000000000000e5
-109 2 5 35 -0.32768000000000000000e5
-109 2 16 30 0.65536000000000000000e5
-109 2 20 34 0.13107200000000000000e6
-109 3 5 50 -0.65536000000000000000e5
-109 3 9 38 0.65536000000000000000e5
-109 3 10 39 -0.65536000000000000000e5
-109 3 22 35 0.26214400000000000000e6
-109 3 25 38 0.32768000000000000000e5
-109 3 28 41 0.26214400000000000000e6
-109 4 2 30 0.65536000000000000000e5
-109 4 6 34 0.13107200000000000000e6
-110 1 1 48 -0.32768000000000000000e5
-110 1 2 49 -0.65536000000000000000e5
-110 1 6 53 0.32768000000000000000e5
-110 1 8 39 -0.65536000000000000000e5
-110 1 9 40 -0.13107200000000000000e6
-110 1 10 41 0.13107200000000000000e6
-110 1 12 43 0.26214400000000000000e6
-110 1 23 38 -0.32768000000000000000e5
-110 1 24 39 -0.32768000000000000000e5
-110 1 26 41 0.65536000000000000000e5
-110 1 28 43 -0.13107200000000000000e6
-110 1 32 47 -0.26214400000000000000e6
-110 2 2 32 -0.32768000000000000000e5
-110 2 3 33 -0.32768000000000000000e5
-110 2 16 30 -0.65536000000000000000e5
-110 2 20 34 -0.13107200000000000000e6
-110 3 9 38 -0.65536000000000000000e5
-110 3 22 35 -0.26214400000000000000e6
-110 3 28 41 -0.26214400000000000000e6
-110 4 2 30 -0.65536000000000000000e5
-110 4 6 34 -0.13107200000000000000e6
-111 1 2 49 -0.32768000000000000000e5
-111 2 3 33 -0.32768000000000000000e5
-111 3 9 38 -0.65536000000000000000e5
-111 3 25 38 -0.32768000000000000000e5
-112 1 2 49 0.32768000000000000000e5
-112 1 6 53 -0.32768000000000000000e5
-112 1 8 39 -0.65536000000000000000e5
-112 1 24 39 0.32768000000000000000e5
-112 1 25 40 0.32768000000000000000e5
-112 3 25 38 0.32768000000000000000e5
-112 3 27 40 -0.65536000000000000000e5
-112 4 4 32 0.32768000000000000000e5
-113 1 1 48 -0.32768000000000000000e5
-113 2 2 32 -0.32768000000000000000e5
-113 3 8 37 -0.65536000000000000000e5
-113 3 24 37 -0.32768000000000000000e5
-114 1 1 48 0.32768000000000000000e5
-114 1 7 38 -0.65536000000000000000e5
-114 1 23 38 0.32768000000000000000e5
-114 3 2 47 -0.32768000000000000000e5
-115 1 1 8 0.65536000000000000000e5
-115 1 1 24 0.32768000000000000000e5
-115 1 1 32 0.13107200000000000000e6
-115 1 1 40 0.32768000000000000000e5
-115 1 1 48 -0.32768000000000000000e5
-115 1 2 9 0.65536000000000000000e5
-115 1 2 33 -0.39321600000000000000e6
-115 1 2 49 -0.65536000000000000000e5
-115 1 3 34 0.52428800000000000000e6
-115 1 4 11 0.65536000000000000000e5
-115 1 6 53 0.32768000000000000000e5
-115 1 8 23 -0.65536000000000000000e5
-115 1 8 39 -0.65536000000000000000e5
-115 1 9 40 -0.65536000000000000000e5
-115 1 10 41 -0.26214400000000000000e6
-115 1 11 42 0.13107200000000000000e6
-115 1 12 27 -0.26214400000000000000e6
-115 1 12 43 0.52428800000000000000e6
-115 1 23 38 -0.98304000000000000000e5
-115 1 25 40 -0.32768000000000000000e5
-115 1 26 41 0.65536000000000000000e5
-115 1 28 43 -0.26214400000000000000e6
-115 1 32 47 -0.39321600000000000000e6
-115 1 33 48 -0.13107200000000000000e6
-115 2 1 7 0.65536000000000000000e5
-115 2 1 35 -0.32768000000000000000e5
-115 2 2 8 -0.65536000000000000000e5
-115 2 2 16 0.32768000000000000000e5
-115 2 2 32 -0.32768000000000000000e5
-115 2 3 9 0.65536000000000000000e5
-115 2 4 34 0.65536000000000000000e5
-115 2 6 20 0.13107200000000000000e6
-115 2 7 21 -0.26214400000000000000e6
-115 2 12 26 -0.13107200000000000000e6
-115 2 16 16 -0.65536000000000000000e5
-115 2 16 34 -0.65536000000000000000e5
-115 2 20 34 -0.13107200000000000000e6
-115 2 21 35 -0.65536000000000000000e5
-115 3 1 14 0.26214400000000000000e6
-115 3 1 22 0.32768000000000000000e5
-115 3 1 30 0.65536000000000000000e5
-115 3 1 38 0.32768000000000000000e5
-115 3 2 7 0.13107200000000000000e6
-115 3 2 15 -0.13107200000000000000e6
-115 3 2 23 0.32768000000000000000e5
-115 3 2 47 0.32768000000000000000e5
-115 3 3 32 -0.39321600000000000000e6
-115 3 4 9 0.65536000000000000000e5
-115 3 5 50 0.65536000000000000000e5
-115 3 7 12 -0.26214400000000000000e6
-115 3 7 52 -0.26214400000000000000e6
-115 3 8 37 -0.65536000000000000000e5
-115 3 10 23 0.13107200000000000000e6
-115 3 13 42 -0.26214400000000000000e6
-115 3 22 27 -0.65536000000000000000e5
-115 3 22 35 -0.26214400000000000000e6
-115 3 24 37 0.65536000000000000000e5
-115 3 27 40 0.65536000000000000000e5
-115 3 28 41 -0.13107200000000000000e6
-115 3 29 42 -0.13107200000000000000e6
-115 4 2 6 0.65536000000000000000e5
-115 4 2 30 -0.65536000000000000000e5
-115 4 3 31 0.13107200000000000000e6
-115 4 4 32 -0.32768000000000000000e5
-115 4 6 6 0.26214400000000000000e6
-115 4 6 18 0.65536000000000000000e5
-115 4 7 35 -0.65536000000000000000e5
-115 4 16 16 0.65536000000000000000e5
-115 4 16 28 0.32768000000000000000e5
-115 4 17 29 -0.65536000000000000000e5
-116 1 20 21 0.65536000000000000000e5
-116 1 21 36 -0.65536000000000000000e5
-116 3 21 34 -0.32768000000000000000e5
-116 3 21 46 -0.32768000000000000000e5
-117 1 14 21 -0.32768000000000000000e5
-117 1 19 34 -0.32768000000000000000e5
-117 1 20 35 -0.32768000000000000000e5
-117 1 21 44 0.32768000000000000000e5
-117 1 21 52 0.32768000000000000000e5
-117 2 15 25 -0.32768000000000000000e5
-117 3 8 21 0.16384000000000000000e5
-117 3 15 20 -0.16384000000000000000e5
-117 3 18 19 0.32768000000000000000e5
-117 4 11 15 0.16384000000000000000e5
-117 4 14 14 -0.32768000000000000000e5
-118 1 6 21 0.16384000000000000000e5
-118 1 13 20 0.32768000000000000000e5
-118 1 14 21 -0.65536000000000000000e5
-118 1 20 27 -0.16384000000000000000e5
-118 1 33 36 0.32768000000000000000e5
-118 2 9 15 0.16384000000000000000e5
-118 2 11 25 -0.16384000000000000000e5
-118 3 7 20 -0.16384000000000000000e5
-118 3 8 21 0.32768000000000000000e5
-118 3 14 19 -0.32768000000000000000e5
-118 3 15 20 -0.32768000000000000000e5
-118 3 17 46 -0.32768000000000000000e5
-118 3 18 19 0.65536000000000000000e5
-118 3 19 32 -0.32768000000000000000e5
-118 4 10 14 -0.16384000000000000000e5
-118 4 11 15 0.32768000000000000000e5
-118 4 14 14 -0.65536000000000000000e5
-119 1 3 18 0.40960000000000000000e4
-119 1 4 19 -0.81920000000000000000e4
-119 1 5 36 -0.81920000000000000000e4
-119 1 12 43 -0.40960000000000000000e4
-119 1 13 20 0.65536000000000000000e5
-119 1 13 44 0.81920000000000000000e4
-119 1 14 45 0.81920000000000000000e4
-119 1 17 32 -0.16384000000000000000e5
-119 1 19 34 -0.65536000000000000000e5
-119 1 19 50 0.16384000000000000000e5
-119 1 20 27 -0.16384000000000000000e5
-119 1 20 51 0.16384000000000000000e5
-119 2 11 25 -0.32768000000000000000e5
-119 2 15 29 0.16384000000000000000e5
-119 2 25 31 0.16384000000000000000e5
-119 3 3 16 0.40960000000000000000e4
-119 3 4 17 0.40960000000000000000e4
-119 3 7 36 -0.16384000000000000000e5
-119 3 8 21 -0.65536000000000000000e5
-119 3 14 27 -0.40960000000000000000e4
-119 3 16 29 -0.81920000000000000000e4
-119 3 16 45 -0.16384000000000000000e5
-119 3 18 31 -0.32768000000000000000e5
-119 4 2 14 0.40960000000000000000e4
-119 4 11 23 -0.81920000000000000000e4
-120 1 3 18 -0.81920000000000000000e4
-120 1 4 19 0.16384000000000000000e5
-120 1 5 36 0.16384000000000000000e5
-120 1 11 18 0.16384000000000000000e5
-120 1 12 43 0.81920000000000000000e4
-120 1 13 44 -0.16384000000000000000e5
-120 1 14 21 -0.13107200000000000000e6
-120 1 14 45 -0.16384000000000000000e5
-120 1 15 46 0.32768000000000000000e5
-120 1 21 44 0.13107200000000000000e6
-120 1 36 51 -0.32768000000000000000e5
-120 1 45 52 -0.16384000000000000000e5
-120 2 11 25 0.32768000000000000000e5
-120 2 15 29 -0.32768000000000000000e5
-120 3 3 16 -0.81920000000000000000e4
-120 3 4 17 -0.81920000000000000000e4
-120 3 6 19 -0.16384000000000000000e5
-120 3 7 36 0.32768000000000000000e5
-120 3 8 21 0.65536000000000000000e5
-120 3 14 27 0.81920000000000000000e4
-120 3 15 20 -0.65536000000000000000e5
-120 3 15 44 -0.16384000000000000000e5
-120 3 16 29 0.16384000000000000000e5
-120 3 17 30 -0.16384000000000000000e5
-120 3 17 46 -0.65536000000000000000e5
-120 3 18 19 0.13107200000000000000e6
-120 3 18 31 0.32768000000000000000e5
-120 3 19 32 0.65536000000000000000e5
-120 3 21 50 -0.65536000000000000000e5
-120 3 21 56 0.32768000000000000000e5
-120 3 32 45 -0.16384000000000000000e5
-120 3 33 46 0.32768000000000000000e5
-120 3 36 49 0.16384000000000000000e5
-120 3 41 46 0.16384000000000000000e5
-120 3 45 46 0.32768000000000000000e5
-120 4 2 14 -0.81920000000000000000e4
-120 4 11 15 0.65536000000000000000e5
-120 4 11 23 0.16384000000000000000e5
-120 4 13 25 0.65536000000000000000e5
-120 4 14 14 -0.13107200000000000000e6
-120 4 15 35 0.16384000000000000000e5
-121 1 6 21 -0.32768000000000000000e5
-121 1 17 32 -0.32768000000000000000e5
-121 1 20 51 0.32768000000000000000e5
-121 2 9 15 -0.32768000000000000000e5
-121 3 7 20 0.32768000000000000000e5
-121 3 8 21 -0.65536000000000000000e5
-121 3 14 19 0.65536000000000000000e5
-121 3 18 31 -0.32768000000000000000e5
-121 4 10 14 0.32768000000000000000e5
-122 1 3 18 0.81920000000000000000e4
-122 1 4 19 -0.16384000000000000000e5
-122 1 5 36 -0.16384000000000000000e5
-122 1 12 43 -0.81920000000000000000e4
-122 1 13 44 0.16384000000000000000e5
-122 1 14 45 0.16384000000000000000e5
-122 1 20 27 -0.32768000000000000000e5
-122 2 11 25 -0.32768000000000000000e5
-122 3 3 16 0.81920000000000000000e4
-122 3 4 17 0.81920000000000000000e4
-122 3 14 27 -0.81920000000000000000e4
-122 3 16 29 -0.16384000000000000000e5
-122 3 16 45 -0.32768000000000000000e5
-122 3 18 31 -0.32768000000000000000e5
-122 4 2 14 0.81920000000000000000e4
-122 4 11 23 -0.16384000000000000000e5
-123 1 2 17 -0.16384000000000000000e5
-123 1 3 18 -0.16384000000000000000e5
-123 1 3 34 -0.81920000000000000000e4
-123 1 4 19 -0.16384000000000000000e5
-123 1 5 20 -0.16384000000000000000e5
-123 1 5 36 0.16384000000000000000e5
-123 1 10 17 -0.16384000000000000000e5
-123 1 12 43 0.81920000000000000000e4
-123 1 16 23 0.81920000000000000000e4
-123 1 16 31 -0.32768000000000000000e5
-123 1 17 32 -0.32768000000000000000e5
-123 1 19 50 0.32768000000000000000e5
-123 1 20 27 0.32768000000000000000e5
-123 2 6 12 -0.81920000000000000000e4
-123 2 10 24 -0.16384000000000000000e5
-123 2 11 13 -0.32768000000000000000e5
-123 3 3 16 -0.24576000000000000000e5
-123 3 4 17 -0.81920000000000000000e4
-123 3 7 12 -0.81920000000000000000e4
-123 3 7 20 -0.32768000000000000000e5
-123 3 7 36 -0.32768000000000000000e5
-123 3 8 21 -0.65536000000000000000e5
-123 3 12 21 0.13107200000000000000e6
-123 3 14 19 -0.65536000000000000000e5
-123 3 14 27 0.81920000000000000000e4
-123 4 1 13 -0.81920000000000000000e4
-123 4 2 14 -0.81920000000000000000e4
-123 4 3 15 -0.16384000000000000000e5
-123 4 10 10 -0.32768000000000000000e5
-123 4 13 13 -0.13107200000000000000e6
-124 1 18 33 -0.65536000000000000000e5
-124 1 20 51 0.65536000000000000000e5
-124 3 15 44 0.32768000000000000000e5
-124 3 20 49 0.32768000000000000000e5
-124 3 32 45 0.32768000000000000000e5
-124 3 36 49 0.32768000000000000000e5
-125 1 11 18 0.32768000000000000000e5
-125 1 13 20 -0.13107200000000000000e6
-125 1 14 45 0.32768000000000000000e5
-125 1 17 32 0.65536000000000000000e5
-125 1 20 27 0.65536000000000000000e5
-125 2 11 25 0.65536000000000000000e5
-125 3 6 19 -0.32768000000000000000e5
-125 3 8 21 0.13107200000000000000e6
-125 3 15 44 -0.32768000000000000000e5
-125 3 17 30 -0.32768000000000000000e5
-126 1 4 35 0.16384000000000000000e5
-126 1 12 43 0.16384000000000000000e5
-126 1 14 45 0.98304000000000000000e5
-126 1 17 32 -0.65536000000000000000e5
-126 1 17 48 -0.32768000000000000000e5
-126 1 18 49 -0.32768000000000000000e5
-126 1 34 49 -0.16384000000000000000e5
-126 2 9 23 0.16384000000000000000e5
-126 2 14 28 -0.32768000000000000000e5
-126 3 5 34 0.16384000000000000000e5
-126 3 13 42 -0.16384000000000000000e5
-126 3 14 27 0.16384000000000000000e5
-126 3 14 43 -0.32768000000000000000e5
-126 3 15 44 0.32768000000000000000e5
-126 3 16 29 -0.32768000000000000000e5
-126 3 16 45 -0.65536000000000000000e5
-126 3 18 47 -0.16384000000000000000e5
-126 3 22 35 0.16384000000000000000e5
-126 4 14 26 0.16384000000000000000e5
-126 4 15 27 0.32768000000000000000e5
-127 1 4 35 0.16384000000000000000e5
-127 1 12 43 0.16384000000000000000e5
-127 1 13 44 0.32768000000000000000e5
-127 1 20 27 -0.65536000000000000000e5
-127 1 34 49 0.16384000000000000000e5
-127 2 9 23 0.16384000000000000000e5
-127 3 5 34 0.16384000000000000000e5
-127 3 13 42 -0.16384000000000000000e5
-127 3 14 27 0.16384000000000000000e5
-127 3 16 29 -0.32768000000000000000e5
-127 3 18 47 0.16384000000000000000e5
-127 3 22 35 -0.16384000000000000000e5
-127 4 14 26 -0.16384000000000000000e5
-128 1 16 31 -0.65536000000000000000e5
-128 1 27 34 0.32768000000000000000e5
-128 1 34 41 0.32768000000000000000e5
-129 1 5 36 -0.65536000000000000000e5
-129 1 14 45 0.65536000000000000000e5
-129 1 17 48 -0.32768000000000000000e5
-129 2 14 28 -0.32768000000000000000e5
-129 3 13 42 -0.32768000000000000000e5
-129 3 14 43 -0.32768000000000000000e5
-130 1 4 35 -0.32768000000000000000e5
-130 1 12 43 -0.32768000000000000000e5
-130 1 14 45 -0.65536000000000000000e5
-130 1 17 48 0.65536000000000000000e5
-130 1 18 49 0.32768000000000000000e5
-130 1 34 49 0.32768000000000000000e5
-130 2 9 23 -0.32768000000000000000e5
-130 2 14 28 0.32768000000000000000e5
-130 3 5 34 -0.32768000000000000000e5
-130 3 13 42 0.65536000000000000000e5
-130 3 14 27 -0.32768000000000000000e5
-130 3 14 43 0.32768000000000000000e5
-130 3 18 47 0.32768000000000000000e5
-131 1 3 18 0.32768000000000000000e5
-131 1 4 19 -0.65536000000000000000e5
-131 1 17 48 0.32768000000000000000e5
-131 3 3 16 0.32768000000000000000e5
-131 3 4 17 0.32768000000000000000e5
-131 3 14 27 -0.32768000000000000000e5
-131 4 2 14 0.32768000000000000000e5
-132 1 3 18 -0.32768000000000000000e5
-132 1 4 19 0.65536000000000000000e5
-132 1 4 35 0.32768000000000000000e5
-132 1 12 43 0.98304000000000000000e5
-132 1 14 45 0.65536000000000000000e5
-132 1 16 47 0.32768000000000000000e5
-132 1 17 48 -0.32768000000000000000e5
-132 1 18 49 -0.32768000000000000000e5
-132 1 20 27 -0.13107200000000000000e6
-132 2 9 23 0.32768000000000000000e5
-132 2 10 24 0.65536000000000000000e5
-132 2 14 28 -0.32768000000000000000e5
-132 3 3 16 -0.32768000000000000000e5
-132 3 4 17 -0.32768000000000000000e5
-132 3 5 34 0.32768000000000000000e5
-132 3 12 41 0.32768000000000000000e5
-132 3 13 42 -0.32768000000000000000e5
-132 3 14 27 0.65536000000000000000e5
-132 3 14 43 -0.32768000000000000000e5
-132 3 22 35 -0.32768000000000000000e5
-132 4 2 14 -0.32768000000000000000e5
-133 1 4 35 -0.32768000000000000000e5
-133 1 12 43 -0.32768000000000000000e5
-133 1 14 45 -0.65536000000000000000e5
-133 1 16 23 0.32768000000000000000e5
-133 1 16 31 -0.13107200000000000000e6
-133 1 16 47 0.32768000000000000000e5
-133 1 17 48 0.32768000000000000000e5
-133 1 18 49 0.32768000000000000000e5
-133 1 20 27 0.13107200000000000000e6
-133 2 7 13 0.65536000000000000000e5
-133 2 9 23 -0.32768000000000000000e5
-133 2 10 24 -0.65536000000000000000e5
-133 2 14 28 0.32768000000000000000e5
-133 3 1 34 -0.32768000000000000000e5
-133 3 5 34 -0.32768000000000000000e5
-133 3 13 42 0.32768000000000000000e5
-133 3 14 27 -0.32768000000000000000e5
-133 3 14 43 0.32768000000000000000e5
-133 4 10 10 -0.13107200000000000000e6
-134 1 1 48 0.81920000000000000000e4
-134 1 2 49 0.81920000000000000000e4
-134 1 8 39 0.16384000000000000000e5
-134 1 9 40 0.16384000000000000000e5
-134 1 10 41 -0.32768000000000000000e5
-134 1 12 43 -0.65536000000000000000e5
-134 1 15 30 -0.65536000000000000000e5
-134 1 18 49 0.13107200000000000000e6
-134 1 23 38 0.81920000000000000000e4
-134 1 24 55 -0.16384000000000000000e5
-134 1 26 33 0.32768000000000000000e5
-134 1 26 41 -0.16384000000000000000e5
-134 1 28 43 0.65536000000000000000e5
-134 1 32 47 0.65536000000000000000e5
-134 1 33 40 -0.32768000000000000000e5
-134 1 33 48 -0.32768000000000000000e5
-134 1 40 55 0.16384000000000000000e5
-134 1 41 56 0.16384000000000000000e5
-134 1 52 55 -0.65536000000000000000e5
-134 2 2 32 0.81920000000000000000e4
-134 2 4 34 -0.16384000000000000000e5
-134 2 16 30 0.16384000000000000000e5
-134 2 20 34 0.32768000000000000000e5
-134 2 28 34 0.16384000000000000000e5
-134 3 5 50 -0.16384000000000000000e5
-134 3 9 38 0.16384000000000000000e5
-134 3 14 51 -0.65536000000000000000e5
-134 3 22 35 0.65536000000000000000e5
-134 3 22 51 0.16384000000000000000e5
-134 3 23 52 -0.32768000000000000000e5
-134 3 27 40 -0.16384000000000000000e5
-134 3 27 56 0.16384000000000000000e5
-134 3 28 41 0.65536000000000000000e5
-134 3 29 42 -0.32768000000000000000e5
-134 3 35 48 -0.65536000000000000000e5
-134 3 38 51 -0.16384000000000000000e5
-134 3 45 50 -0.65536000000000000000e5
-134 3 45 56 0.32768000000000000000e5
-134 3 47 52 -0.32768000000000000000e5
-134 4 2 30 0.16384000000000000000e5
-134 4 6 34 0.32768000000000000000e5
-134 4 7 35 0.16384000000000000000e5
-134 4 19 31 -0.32768000000000000000e5
-134 4 22 34 -0.32768000000000000000e5
-134 4 29 33 -0.16384000000000000000e5
-134 4 30 34 -0.32768000000000000000e5
-134 4 31 35 -0.32768000000000000000e5
-135 1 11 42 0.32768000000000000000e5
-135 1 14 45 -0.13107200000000000000e6
-135 1 17 48 0.65536000000000000000e5
-135 1 18 49 0.65536000000000000000e5
-135 1 33 40 0.32768000000000000000e5
-135 2 14 28 0.65536000000000000000e5
-135 3 5 34 -0.65536000000000000000e5
-135 3 13 42 0.65536000000000000000e5
-135 3 14 43 0.65536000000000000000e5
-136 1 4 35 -0.65536000000000000000e5
-136 1 10 41 -0.32768000000000000000e5
-136 1 11 42 -0.32768000000000000000e5
-136 1 28 43 0.32768000000000000000e5
-136 1 32 47 0.32768000000000000000e5
-136 1 33 48 0.65536000000000000000e5
-136 3 13 42 0.65536000000000000000e5
-136 3 28 41 0.32768000000000000000e5
-136 3 29 42 0.65536000000000000000e5
-136 4 3 31 -0.32768000000000000000e5
-137 1 10 41 0.32768000000000000000e5
-137 1 12 43 -0.65536000000000000000e5
-137 1 28 43 0.32768000000000000000e5
-137 3 14 27 -0.65536000000000000000e5
-138 1 3 34 -0.65536000000000000000e5
-138 1 11 42 0.32768000000000000000e5
-138 1 12 43 0.65536000000000000000e5
-138 1 28 43 -0.32768000000000000000e5
-138 1 33 48 -0.32768000000000000000e5
-138 2 12 26 -0.32768000000000000000e5
-138 3 13 42 -0.65536000000000000000e5
-138 3 29 42 -0.32768000000000000000e5
-138 4 3 31 0.32768000000000000000e5
-139 1 2 33 -0.32768000000000000000e5
-139 1 3 34 0.65536000000000000000e5
-139 1 10 41 -0.32768000000000000000e5
-139 1 12 43 0.65536000000000000000e5
-139 1 16 23 -0.65536000000000000000e5
-139 1 28 43 -0.32768000000000000000e5
-139 1 32 47 -0.32768000000000000000e5
-139 2 7 21 -0.32768000000000000000e5
-139 2 20 34 -0.32768000000000000000e5
-139 3 2 31 -0.32768000000000000000e5
-139 3 3 32 -0.32768000000000000000e5
-139 3 22 35 -0.65536000000000000000e5
-139 3 28 41 -0.32768000000000000000e5
-139 4 6 34 -0.32768000000000000000e5
-140 1 9 40 0.16384000000000000000e5
-140 1 10 41 -0.32768000000000000000e5
-140 1 11 42 -0.32768000000000000000e5
-140 1 12 27 -0.65536000000000000000e5
-140 1 12 43 -0.65536000000000000000e5
-140 1 16 23 0.65536000000000000000e5
-140 1 26 41 -0.16384000000000000000e5
-140 1 28 43 0.32768000000000000000e5
-140 1 32 47 0.65536000000000000000e5
-140 1 33 48 0.32768000000000000000e5
-140 2 1 31 -0.32768000000000000000e5
-140 2 12 26 0.32768000000000000000e5
-140 3 1 34 -0.65536000000000000000e5
-140 3 8 37 -0.16384000000000000000e5
-140 3 9 38 0.16384000000000000000e5
-140 3 13 42 0.65536000000000000000e5
-140 3 22 27 -0.16384000000000000000e5
-140 3 28 41 0.65536000000000000000e5
-140 3 29 42 0.32768000000000000000e5
-140 4 1 29 -0.16384000000000000000e5
-140 4 2 30 0.16384000000000000000e5
-140 4 3 31 -0.32768000000000000000e5
-141 1 2 33 -0.65536000000000000000e5
-141 1 9 40 -0.32768000000000000000e5
-141 1 11 42 0.13107200000000000000e6
-141 1 12 43 0.13107200000000000000e6
-141 1 26 33 -0.65536000000000000000e5
-141 1 26 41 0.32768000000000000000e5
-141 1 28 43 -0.65536000000000000000e5
-141 1 32 47 -0.65536000000000000000e5
-141 1 33 40 0.65536000000000000000e5
-141 1 33 48 -0.13107200000000000000e6
-141 2 12 26 -0.65536000000000000000e5
-141 3 3 32 -0.65536000000000000000e5
-141 3 4 33 0.65536000000000000000e5
-141 3 5 34 -0.13107200000000000000e6
-141 3 5 50 -0.32768000000000000000e5
-141 3 6 51 0.32768000000000000000e5
-141 3 6 55 0.32768000000000000000e5
-141 3 10 39 -0.32768000000000000000e5
-141 3 13 42 -0.13107200000000000000e6
-141 3 14 27 0.13107200000000000000e6
-141 3 27 40 -0.32768000000000000000e5
-141 3 28 41 -0.65536000000000000000e5
-141 3 29 42 -0.65536000000000000000e5
-141 4 3 31 0.65536000000000000000e5
-141 4 8 20 -0.65536000000000000000e5
-141 4 9 21 0.65536000000000000000e5
-141 4 18 22 -0.32768000000000000000e5
-141 4 18 30 -0.32768000000000000000e5
-142 1 11 42 -0.65536000000000000000e5
-142 1 26 41 -0.32768000000000000000e5
-142 1 33 48 0.65536000000000000000e5
-142 2 28 34 -0.32768000000000000000e5
-142 3 4 33 -0.65536000000000000000e5
-142 3 10 39 0.32768000000000000000e5
-142 3 29 42 0.65536000000000000000e5
-142 4 18 30 -0.32768000000000000000e5
-142 4 21 33 -0.32768000000000000000e5
-143 1 1 48 0.16384000000000000000e5
-143 1 2 33 0.65536000000000000000e5
-143 1 2 49 0.16384000000000000000e5
-143 1 8 39 0.32768000000000000000e5
-143 1 9 40 0.65536000000000000000e5
-143 1 12 43 -0.26214400000000000000e6
-143 1 23 38 0.16384000000000000000e5
-143 1 26 41 -0.65536000000000000000e5
-143 1 28 43 0.13107200000000000000e6
-143 1 32 47 0.13107200000000000000e6
-143 2 2 32 0.16384000000000000000e5
-143 2 4 34 -0.32768000000000000000e5
-143 2 12 26 0.65536000000000000000e5
-143 2 16 30 0.32768000000000000000e5
-143 2 20 34 0.65536000000000000000e5
-143 3 3 32 0.65536000000000000000e5
-143 3 9 38 0.32768000000000000000e5
-143 3 14 27 -0.13107200000000000000e6
-143 3 22 35 0.13107200000000000000e6
-143 3 28 41 0.13107200000000000000e6
-143 4 2 30 0.32768000000000000000e5
-143 4 6 34 0.65536000000000000000e5
-143 4 8 20 0.65536000000000000000e5
-144 1 1 48 -0.16384000000000000000e5
-144 1 2 49 -0.16384000000000000000e5
-144 1 8 39 -0.32768000000000000000e5
-144 1 9 40 -0.32768000000000000000e5
-144 1 12 43 0.13107200000000000000e6
-144 1 23 38 -0.16384000000000000000e5
-144 1 26 41 0.65536000000000000000e5
-144 1 28 43 -0.65536000000000000000e5
-144 1 32 47 -0.13107200000000000000e6
-144 2 2 32 -0.16384000000000000000e5
-144 2 16 30 -0.32768000000000000000e5
-144 2 20 34 -0.65536000000000000000e5
-144 3 3 32 -0.65536000000000000000e5
-144 3 22 35 -0.13107200000000000000e6
-144 3 28 41 -0.13107200000000000000e6
-144 4 2 30 -0.32768000000000000000e5
-144 4 6 34 -0.65536000000000000000e5
-145 1 1 48 -0.16384000000000000000e5
-145 1 2 33 -0.65536000000000000000e5
-145 1 2 49 -0.16384000000000000000e5
-145 1 9 40 -0.32768000000000000000e5
-145 1 10 41 0.65536000000000000000e5
-145 1 12 43 0.13107200000000000000e6
-145 1 23 38 -0.16384000000000000000e5
-145 1 26 41 0.32768000000000000000e5
-145 1 28 43 -0.65536000000000000000e5
-145 1 32 47 -0.13107200000000000000e6
-145 2 2 32 -0.16384000000000000000e5
-145 2 16 30 -0.32768000000000000000e5
-145 2 20 34 -0.65536000000000000000e5
-145 3 9 38 -0.32768000000000000000e5
-145 3 22 35 -0.13107200000000000000e6
-145 3 28 41 -0.13107200000000000000e6
-145 4 2 30 -0.32768000000000000000e5
-145 4 6 34 -0.65536000000000000000e5
-146 1 1 48 0.16384000000000000000e5
-146 1 2 33 0.65536000000000000000e5
-146 1 2 49 0.16384000000000000000e5
-146 1 3 34 -0.13107200000000000000e6
-146 1 8 39 0.32768000000000000000e5
-146 1 9 40 0.32768000000000000000e5
-146 1 23 38 0.16384000000000000000e5
-146 1 26 41 -0.32768000000000000000e5
-146 1 32 47 0.65536000000000000000e5
-146 2 2 32 0.16384000000000000000e5
-146 2 7 21 0.65536000000000000000e5
-146 3 3 32 0.65536000000000000000e5
-146 3 8 37 0.32768000000000000000e5
-146 3 9 38 0.32768000000000000000e5
-146 3 28 41 0.65536000000000000000e5
-146 4 2 30 0.32768000000000000000e5
-147 1 1 32 -0.65536000000000000000e5
-147 1 1 48 0.16384000000000000000e5
-147 1 2 49 0.16384000000000000000e5
-147 1 7 38 0.32768000000000000000e5
-147 1 23 38 0.16384000000000000000e5
-147 2 2 32 0.16384000000000000000e5
-148 1 1 8 -0.32768000000000000000e5
-148 1 1 24 -0.16384000000000000000e5
-148 1 1 40 -0.16384000000000000000e5
-148 1 1 48 0.32768000000000000000e5
-148 1 2 9 -0.32768000000000000000e5
-148 1 2 33 0.13107200000000000000e6
-148 1 2 49 0.32768000000000000000e5
-148 1 3 34 -0.13107200000000000000e6
-148 1 4 11 -0.32768000000000000000e5
-148 1 7 38 0.32768000000000000000e5
-148 1 8 23 0.32768000000000000000e5
-148 1 8 39 0.32768000000000000000e5
-148 1 9 40 0.32768000000000000000e5
-148 1 10 41 0.65536000000000000000e5
-148 1 11 42 -0.65536000000000000000e5
-148 1 12 43 -0.26214400000000000000e6
-148 1 22 37 0.16384000000000000000e5
-148 1 23 38 0.49152000000000000000e5
-148 1 26 41 -0.32768000000000000000e5
-148 1 28 43 0.13107200000000000000e6
-148 1 32 47 0.19660800000000000000e6
-148 1 33 48 0.65536000000000000000e5
-148 2 1 7 -0.32768000000000000000e5
-148 2 2 8 0.32768000000000000000e5
-148 2 2 16 -0.16384000000000000000e5
-148 2 2 32 0.32768000000000000000e5
-148 2 3 9 -0.32768000000000000000e5
-148 2 7 21 0.65536000000000000000e5
-148 2 12 26 0.65536000000000000000e5
-148 2 16 16 0.32768000000000000000e5
-148 2 16 30 0.32768000000000000000e5
-148 2 20 34 0.65536000000000000000e5
-148 3 1 14 -0.13107200000000000000e6
-148 3 1 22 -0.16384000000000000000e5
-148 3 1 30 -0.32768000000000000000e5
-148 3 1 38 -0.16384000000000000000e5
-148 3 2 7 -0.65536000000000000000e5
-148 3 2 15 0.65536000000000000000e5
-148 3 2 23 -0.16384000000000000000e5
-148 3 3 32 0.13107200000000000000e6
-148 3 4 9 -0.32768000000000000000e5
-148 3 7 12 0.13107200000000000000e6
-148 3 8 37 0.32768000000000000000e5
-148 3 10 23 -0.65536000000000000000e5
-148 3 13 42 0.13107200000000000000e6
-148 3 22 35 0.13107200000000000000e6
-148 3 28 41 0.19660800000000000000e6
-148 3 29 42 0.65536000000000000000e5
-148 4 2 6 -0.32768000000000000000e5
-148 4 2 30 0.32768000000000000000e5
-148 4 3 31 -0.65536000000000000000e5
-148 4 6 6 -0.13107200000000000000e6
-148 4 6 18 -0.32768000000000000000e5
-148 4 6 34 0.65536000000000000000e5
-148 4 16 16 -0.32768000000000000000e5
-149 1 1 40 0.32768000000000000000e5
-149 1 2 33 -0.26214400000000000000e6
-149 1 6 37 0.32768000000000000000e5
-149 1 9 40 0.65536000000000000000e5
-149 1 10 25 -0.13107200000000000000e6
-149 1 11 26 -0.65536000000000000000e5
-149 1 11 42 0.26214400000000000000e6
-149 1 12 43 0.52428800000000000000e6
-149 1 23 38 -0.32768000000000000000e5
-149 1 25 40 -0.32768000000000000000e5
-149 1 26 41 -0.65536000000000000000e5
-149 1 28 43 -0.26214400000000000000e6
-149 1 32 47 -0.26214400000000000000e6
-149 1 33 48 -0.13107200000000000000e6
-149 1 49 56 -0.32768000000000000000e5
-149 1 53 56 0.32768000000000000000e5
-149 1 54 55 0.65536000000000000000e5
-149 1 55 56 -0.65536000000000000000e5
-149 2 2 32 -0.32768000000000000000e5
-149 2 3 17 0.32768000000000000000e5
-149 2 5 19 -0.32768000000000000000e5
-149 2 5 27 0.32768000000000000000e5
-149 2 12 26 -0.26214400000000000000e6
-149 2 28 34 -0.65536000000000000000e5
-149 3 1 30 0.13107200000000000000e6
-149 3 1 38 0.32768000000000000000e5
-149 3 2 23 0.32768000000000000000e5
-149 3 2 39 0.32768000000000000000e5
-149 3 3 32 -0.13107200000000000000e6
-149 3 5 26 -0.32768000000000000000e5
-149 3 8 37 -0.65536000000000000000e5
-149 3 10 39 0.65536000000000000000e5
-149 3 13 42 -0.52428800000000000000e6
-149 3 14 27 0.26214400000000000000e6
-149 3 25 54 -0.32768000000000000000e5
-149 3 26 39 -0.32768000000000000000e5
-149 3 28 41 -0.26214400000000000000e6
-149 3 29 42 -0.13107200000000000000e6
-149 3 39 40 -0.32768000000000000000e5
-149 3 40 53 -0.32768000000000000000e5
-149 3 48 53 0.32768000000000000000e5
-149 3 49 54 0.32768000000000000000e5
-149 3 53 54 -0.32768000000000000000e5
-149 4 3 31 0.26214400000000000000e6
-149 4 4 16 -0.32768000000000000000e5
-149 4 5 17 0.32768000000000000000e5
-149 4 5 33 -0.32768000000000000000e5
-149 4 6 18 0.65536000000000000000e5
-149 4 7 19 -0.65536000000000000000e5
-149 4 8 20 -0.13107200000000000000e6
-149 4 18 30 -0.65536000000000000000e5
-149 4 19 35 -0.32768000000000000000e5
-149 4 21 33 -0.65536000000000000000e5
-149 4 28 28 -0.65536000000000000000e5
-149 4 33 33 -0.65536000000000000000e5
-149 4 35 35 -0.65536000000000000000e5
-150 1 1 48 0.65536000000000000000e5
-150 1 2 33 0.13107200000000000000e6
-150 1 2 49 0.13107200000000000000e6
-150 1 6 37 -0.32768000000000000000e5
-150 1 6 53 -0.32768000000000000000e5
-150 1 8 39 0.13107200000000000000e6
-150 1 9 40 0.13107200000000000000e6
-150 1 10 25 0.65536000000000000000e5
-150 1 10 41 -0.26214400000000000000e6
-150 1 11 42 -0.13107200000000000000e6
-150 1 12 43 -0.78643200000000000000e6
-150 1 23 38 0.65536000000000000000e5
-150 1 24 39 0.65536000000000000000e5
-150 1 26 41 -0.13107200000000000000e6
-150 1 28 43 0.39321600000000000000e6
-150 1 32 47 0.65536000000000000000e6
-150 1 33 48 0.13107200000000000000e6
-150 2 2 32 0.65536000000000000000e5
-150 2 3 33 0.65536000000000000000e5
-150 2 5 27 -0.32768000000000000000e5
-150 2 5 35 -0.32768000000000000000e5
-150 2 12 26 0.13107200000000000000e6
-150 2 16 30 0.13107200000000000000e6
-150 2 20 34 0.26214400000000000000e6
-150 3 3 32 0.13107200000000000000e6
-150 3 3 40 -0.32768000000000000000e5
-150 3 5 50 -0.65536000000000000000e5
-150 3 9 38 0.13107200000000000000e6
-150 3 10 23 0.65536000000000000000e5
-150 3 10 39 -0.65536000000000000000e5
-150 3 13 42 0.26214400000000000000e6
-150 3 14 27 -0.26214400000000000000e6
-150 3 22 35 0.52428800000000000000e6
-150 3 25 38 0.32768000000000000000e5
-150 3 26 39 0.32768000000000000000e5
-150 3 28 41 0.65536000000000000000e6
-150 3 29 42 0.13107200000000000000e6
-150 4 2 30 0.13107200000000000000e6
-150 4 3 31 -0.13107200000000000000e6
-150 4 6 34 0.26214400000000000000e6
-150 4 7 19 0.65536000000000000000e5
-150 4 8 20 0.13107200000000000000e6
-151 1 1 48 -0.32768000000000000000e5
-151 1 2 49 -0.65536000000000000000e5
-151 1 8 39 -0.65536000000000000000e5
-151 1 9 40 -0.65536000000000000000e5
-151 1 10 25 -0.65536000000000000000e5
-151 1 10 41 0.13107200000000000000e6
-151 1 12 43 0.26214400000000000000e6
-151 1 23 38 -0.32768000000000000000e5
-151 1 24 39 -0.32768000000000000000e5
-151 1 25 40 0.32768000000000000000e5
-151 1 26 41 0.65536000000000000000e5
-151 1 28 43 -0.13107200000000000000e6
-151 1 32 47 -0.26214400000000000000e6
-151 2 2 32 -0.32768000000000000000e5
-151 2 3 33 -0.32768000000000000000e5
-151 2 16 30 -0.65536000000000000000e5
-151 2 20 34 -0.13107200000000000000e6
-151 3 3 40 0.32768000000000000000e5
-151 3 9 38 -0.65536000000000000000e5
-151 3 22 35 -0.26214400000000000000e6
-151 3 28 41 -0.26214400000000000000e6
-151 4 2 30 -0.65536000000000000000e5
-151 4 6 34 -0.13107200000000000000e6
-152 1 2 49 -0.32768000000000000000e5
-152 1 6 37 0.32768000000000000000e5
-152 1 24 39 -0.32768000000000000000e5
-152 2 3 33 -0.32768000000000000000e5
-152 3 9 38 -0.65536000000000000000e5
-152 3 10 23 -0.65536000000000000000e5
-153 1 2 49 0.32768000000000000000e5
-153 1 8 39 -0.65536000000000000000e5
-153 1 24 39 0.32768000000000000000e5
-153 3 1 30 -0.65536000000000000000e5
-153 3 2 39 0.32768000000000000000e5
-154 1 1 40 0.32768000000000000000e5
-154 1 1 48 -0.32768000000000000000e5
-154 1 2 33 -0.13107200000000000000e6
-154 1 11 42 0.13107200000000000000e6
-154 1 12 43 0.26214400000000000000e6
-154 1 23 38 -0.32768000000000000000e5
-154 1 28 43 -0.13107200000000000000e6
-154 1 32 47 -0.13107200000000000000e6
-154 1 33 48 -0.13107200000000000000e6
-154 2 2 32 -0.32768000000000000000e5
-154 2 12 26 -0.13107200000000000000e6
-154 3 1 30 0.65536000000000000000e5
-154 3 8 37 -0.65536000000000000000e5
-154 3 10 23 0.65536000000000000000e5
-154 3 13 42 -0.26214400000000000000e6
-154 3 28 41 -0.13107200000000000000e6
-154 3 29 42 -0.13107200000000000000e6
-154 4 3 31 0.13107200000000000000e6
-154 4 6 18 0.65536000000000000000e5
-155 1 1 48 0.32768000000000000000e5
-155 1 8 23 -0.65536000000000000000e5
-155 1 23 38 0.32768000000000000000e5
-155 3 1 38 0.32768000000000000000e5
-156 1 1 8 0.65536000000000000000e5
-156 1 1 32 0.13107200000000000000e6
-156 1 1 40 -0.32768000000000000000e5
-156 1 1 48 -0.32768000000000000000e5
-156 1 2 9 0.65536000000000000000e5
-156 1 2 33 -0.39321600000000000000e6
-156 1 2 49 -0.65536000000000000000e5
-156 1 3 34 0.52428800000000000000e6
-156 1 4 11 0.65536000000000000000e5
-156 1 8 23 -0.65536000000000000000e5
-156 1 8 39 -0.65536000000000000000e5
-156 1 9 40 -0.65536000000000000000e5
-156 1 10 41 -0.26214400000000000000e6
-156 1 11 42 0.13107200000000000000e6
-156 1 12 27 -0.26214400000000000000e6
-156 1 12 43 0.52428800000000000000e6
-156 1 22 37 0.32768000000000000000e5
-156 1 23 38 -0.32768000000000000000e5
-156 1 26 41 0.65536000000000000000e5
-156 1 28 43 -0.26214400000000000000e6
-156 1 32 47 -0.39321600000000000000e6
-156 1 33 48 -0.13107200000000000000e6
-156 2 1 7 0.65536000000000000000e5
-156 2 2 8 -0.65536000000000000000e5
-156 2 2 32 -0.65536000000000000000e5
-156 2 3 9 0.65536000000000000000e5
-156 2 6 20 0.13107200000000000000e6
-156 2 7 21 -0.26214400000000000000e6
-156 2 12 26 -0.13107200000000000000e6
-156 2 16 30 -0.65536000000000000000e5
-156 2 20 34 -0.13107200000000000000e6
-156 3 1 14 0.26214400000000000000e6
-156 3 1 30 0.65536000000000000000e5
-156 3 1 38 -0.32768000000000000000e5
-156 3 2 7 0.13107200000000000000e6
-156 3 2 15 -0.13107200000000000000e6
-156 3 3 32 -0.39321600000000000000e6
-156 3 4 9 0.65536000000000000000e5
-156 3 7 12 -0.26214400000000000000e6
-156 3 8 37 -0.65536000000000000000e5
-156 3 10 23 0.13107200000000000000e6
-156 3 13 42 -0.26214400000000000000e6
-156 3 22 27 0.65536000000000000000e5
-156 3 22 35 -0.26214400000000000000e6
-156 3 28 41 -0.39321600000000000000e6
-156 3 29 42 -0.13107200000000000000e6
-156 4 2 6 0.65536000000000000000e5
-156 4 2 30 -0.65536000000000000000e5
-156 4 3 31 0.13107200000000000000e6
-156 4 6 6 0.26214400000000000000e6
-156 4 6 18 0.65536000000000000000e5
-156 4 6 34 -0.13107200000000000000e6
-156 4 16 16 -0.65536000000000000000e5
-157 1 1 8 -0.65536000000000000000e5
-157 1 1 24 -0.32768000000000000000e5
-157 1 1 32 -0.13107200000000000000e6
-157 1 1 48 0.32768000000000000000e5
-157 1 2 9 -0.65536000000000000000e5
-157 1 2 33 0.39321600000000000000e6
-157 1 2 49 0.65536000000000000000e5
-157 1 3 34 -0.52428800000000000000e6
-157 1 4 11 -0.65536000000000000000e5
-157 1 7 22 -0.65536000000000000000e5
-157 1 8 23 0.65536000000000000000e5
-157 1 8 39 0.65536000000000000000e5
-157 1 9 40 0.65536000000000000000e5
-157 1 10 41 0.26214400000000000000e6
-157 1 11 42 -0.13107200000000000000e6
-157 1 12 27 0.26214400000000000000e6
-157 1 12 43 -0.52428800000000000000e6
-157 1 22 37 0.32768000000000000000e5
-157 1 23 38 0.65536000000000000000e5
-157 1 26 41 -0.65536000000000000000e5
-157 1 28 43 0.26214400000000000000e6
-157 1 32 47 0.39321600000000000000e6
-157 1 33 48 0.13107200000000000000e6
-157 2 1 7 -0.65536000000000000000e5
-157 2 2 8 0.65536000000000000000e5
-157 2 2 16 -0.32768000000000000000e5
-157 2 2 32 0.65536000000000000000e5
-157 2 3 9 -0.65536000000000000000e5
-157 2 6 20 -0.13107200000000000000e6
-157 2 7 21 0.26214400000000000000e6
-157 2 12 26 0.13107200000000000000e6
-157 2 16 30 0.65536000000000000000e5
-157 2 20 34 0.13107200000000000000e6
-157 3 1 14 -0.26214400000000000000e6
-157 3 1 22 -0.32768000000000000000e5
-157 3 1 30 -0.65536000000000000000e5
-157 3 1 38 -0.32768000000000000000e5
-157 3 2 7 -0.13107200000000000000e6
-157 3 2 15 0.13107200000000000000e6
-157 3 2 23 -0.32768000000000000000e5
-157 3 3 32 0.39321600000000000000e6
-157 3 4 9 -0.65536000000000000000e5
-157 3 7 12 0.26214400000000000000e6
-157 3 8 37 0.65536000000000000000e5
-157 3 10 23 -0.13107200000000000000e6
-157 3 13 42 0.26214400000000000000e6
-157 3 22 35 0.26214400000000000000e6
-157 3 28 41 0.39321600000000000000e6
-157 3 29 42 0.13107200000000000000e6
-157 4 2 6 -0.65536000000000000000e5
-157 4 2 30 0.65536000000000000000e5
-157 4 3 31 -0.13107200000000000000e6
-157 4 6 6 -0.26214400000000000000e6
-157 4 6 18 -0.65536000000000000000e5
-157 4 6 34 0.13107200000000000000e6
-158 1 14 21 -0.16384000000000000000e5
-158 1 16 19 -0.16384000000000000000e5
-158 1 19 34 -0.16384000000000000000e5
-158 2 13 15 -0.16384000000000000000e5
-158 2 15 15 -0.65536000000000000000e5
-158 3 12 21 -0.16384000000000000000e5
-158 3 16 21 -0.32768000000000000000e5
-158 3 19 20 -0.32768000000000000000e5
-158 3 21 34 -0.32768000000000000000e5
-159 1 6 21 -0.81920000000000000000e4
-159 1 17 32 -0.81920000000000000000e4
-159 1 19 50 0.81920000000000000000e4
-159 1 20 35 0.32768000000000000000e5
-159 1 20 51 0.81920000000000000000e4
-159 1 21 52 -0.32768000000000000000e5
-159 2 9 15 -0.81920000000000000000e4
-159 2 25 31 0.81920000000000000000e4
-159 3 7 20 0.81920000000000000000e4
-159 3 8 21 -0.16384000000000000000e5
-159 3 14 19 0.16384000000000000000e5
-159 3 16 45 -0.81920000000000000000e4
-159 3 17 46 -0.16384000000000000000e5
-159 3 18 31 -0.81920000000000000000e4
-159 3 19 20 -0.65536000000000000000e5
-159 3 19 32 0.16384000000000000000e5
-159 3 20 45 -0.16384000000000000000e5
-159 3 35 36 0.32768000000000000000e5
-159 4 10 14 0.81920000000000000000e4
-159 4 25 25 -0.32768000000000000000e5
-160 1 6 21 0.81920000000000000000e4
-160 1 17 32 0.81920000000000000000e4
-160 1 19 34 -0.32768000000000000000e5
-160 1 19 50 -0.81920000000000000000e4
-160 1 20 35 -0.32768000000000000000e5
-160 1 20 51 -0.81920000000000000000e4
-160 1 21 52 0.32768000000000000000e5
-160 2 9 15 0.81920000000000000000e4
-160 2 15 25 -0.32768000000000000000e5
-160 2 25 31 -0.81920000000000000000e4
-160 3 7 20 -0.81920000000000000000e4
-160 3 8 21 0.16384000000000000000e5
-160 3 14 19 -0.16384000000000000000e5
-160 3 16 21 -0.65536000000000000000e5
-160 3 16 45 0.81920000000000000000e4
-160 3 17 46 0.16384000000000000000e5
-160 3 18 31 0.81920000000000000000e4
-160 3 19 32 -0.16384000000000000000e5
-160 3 20 45 0.16384000000000000000e5
-160 4 10 14 -0.81920000000000000000e4
-160 4 25 25 0.32768000000000000000e5
-161 1 14 21 -0.32768000000000000000e5
-161 1 16 19 -0.32768000000000000000e5
-161 1 21 44 0.32768000000000000000e5
-161 2 13 15 -0.32768000000000000000e5
-161 3 12 21 -0.32768000000000000000e5
-162 1 3 18 0.40960000000000000000e4
-162 1 4 19 -0.81920000000000000000e4
-162 1 5 36 -0.81920000000000000000e4
-162 1 12 43 -0.40960000000000000000e4
-162 1 13 44 0.81920000000000000000e4
-162 1 14 21 0.65536000000000000000e5
-162 1 14 45 0.81920000000000000000e4
-162 1 21 44 -0.65536000000000000000e5
-162 2 11 25 -0.16384000000000000000e5
-162 2 15 29 0.16384000000000000000e5
-162 3 3 16 0.40960000000000000000e4
-162 3 4 17 0.40960000000000000000e4
-162 3 7 36 -0.16384000000000000000e5
-162 3 8 21 -0.32768000000000000000e5
-162 3 14 27 -0.40960000000000000000e4
-162 3 15 20 0.32768000000000000000e5
-162 3 16 29 -0.81920000000000000000e4
-162 3 18 19 -0.13107200000000000000e6
-162 3 18 31 -0.16384000000000000000e5
-162 3 19 32 -0.32768000000000000000e5
-162 3 20 45 0.32768000000000000000e5
-162 4 2 14 0.40960000000000000000e4
-162 4 11 15 -0.32768000000000000000e5
-162 4 11 23 -0.81920000000000000000e4
-162 4 13 25 -0.32768000000000000000e5
-162 4 14 14 0.65536000000000000000e5
-163 1 6 21 0.16384000000000000000e5
-163 1 13 20 0.32768000000000000000e5
-163 1 14 21 -0.65536000000000000000e5
-163 1 20 27 -0.16384000000000000000e5
-163 1 33 36 0.32768000000000000000e5
-163 2 9 15 0.16384000000000000000e5
-163 2 11 25 -0.16384000000000000000e5
-163 3 7 20 -0.16384000000000000000e5
-163 3 14 19 -0.32768000000000000000e5
-163 4 10 14 -0.16384000000000000000e5
-164 1 6 21 0.16384000000000000000e5
-164 1 13 20 0.65536000000000000000e5
-164 1 19 34 -0.65536000000000000000e5
-164 1 20 27 -0.16384000000000000000e5
-164 2 9 15 0.16384000000000000000e5
-164 2 11 25 -0.16384000000000000000e5
-164 3 7 20 -0.16384000000000000000e5
-164 3 8 21 -0.32768000000000000000e5
-164 3 12 21 -0.65536000000000000000e5
-164 3 14 19 -0.32768000000000000000e5
-164 3 19 32 -0.32768000000000000000e5
-164 4 10 14 -0.16384000000000000000e5
-165 1 2 17 0.81920000000000000000e4
-165 1 3 18 0.12288000000000000000e5
-165 1 3 34 0.40960000000000000000e4
-165 1 5 20 0.81920000000000000000e4
-165 1 5 36 -0.16384000000000000000e5
-165 1 10 17 0.81920000000000000000e4
-165 1 12 43 -0.81920000000000000000e4
-165 1 13 20 0.32768000000000000000e5
-165 1 13 44 0.81920000000000000000e4
-165 1 14 45 0.81920000000000000000e4
-165 1 16 19 -0.65536000000000000000e5
-165 1 16 23 -0.40960000000000000000e4
-165 1 16 31 0.16384000000000000000e5
-165 1 17 32 0.16384000000000000000e5
-165 2 6 12 0.40960000000000000000e4
-165 2 10 24 0.81920000000000000000e4
-165 2 11 13 0.16384000000000000000e5
-165 2 11 25 -0.16384000000000000000e5
-165 2 15 29 0.16384000000000000000e5
-165 3 3 16 0.16384000000000000000e5
-165 3 4 17 0.81920000000000000000e4
-165 3 7 12 0.40960000000000000000e4
-165 3 7 20 0.16384000000000000000e5
-165 3 7 36 -0.16384000000000000000e5
-165 3 12 21 -0.65536000000000000000e5
-165 3 14 19 0.32768000000000000000e5
-165 3 14 27 -0.81920000000000000000e4
-165 3 16 29 -0.81920000000000000000e4
-165 3 18 31 -0.16384000000000000000e5
-165 4 1 13 0.40960000000000000000e4
-165 4 2 14 0.81920000000000000000e4
-165 4 3 15 0.81920000000000000000e4
-165 4 10 10 0.16384000000000000000e5
-165 4 11 23 -0.81920000000000000000e4
-165 4 13 13 0.65536000000000000000e5
-166 1 3 18 -0.81920000000000000000e4
-166 1 4 19 0.16384000000000000000e5
-166 1 5 36 0.16384000000000000000e5
-166 1 11 18 0.16384000000000000000e5
-166 1 12 43 0.81920000000000000000e4
-166 1 13 44 -0.16384000000000000000e5
-166 1 14 21 -0.13107200000000000000e6
-166 1 14 45 -0.16384000000000000000e5
-166 1 18 33 0.32768000000000000000e5
-166 1 21 44 0.13107200000000000000e6
-166 1 36 51 -0.32768000000000000000e5
-166 1 45 52 -0.16384000000000000000e5
-166 2 11 25 0.32768000000000000000e5
-166 2 15 29 -0.32768000000000000000e5
-166 3 3 16 -0.81920000000000000000e4
-166 3 4 17 -0.81920000000000000000e4
-166 3 6 19 -0.16384000000000000000e5
-166 3 7 36 0.32768000000000000000e5
-166 3 8 21 0.65536000000000000000e5
-166 3 14 19 0.65536000000000000000e5
-166 3 14 27 0.81920000000000000000e4
-166 3 15 44 -0.16384000000000000000e5
-166 3 15 46 0.32768000000000000000e5
-166 3 16 29 0.16384000000000000000e5
-166 3 17 30 -0.16384000000000000000e5
-166 3 17 46 -0.65536000000000000000e5
-166 3 18 31 0.32768000000000000000e5
-166 3 19 32 0.65536000000000000000e5
-166 3 21 50 -0.65536000000000000000e5
-166 3 21 56 0.32768000000000000000e5
-166 3 32 45 -0.16384000000000000000e5
-166 3 33 46 0.32768000000000000000e5
-166 3 36 49 0.16384000000000000000e5
-166 3 41 46 0.16384000000000000000e5
-166 3 45 46 0.32768000000000000000e5
-166 4 2 14 -0.81920000000000000000e4
-166 4 11 15 0.65536000000000000000e5
-166 4 11 23 0.16384000000000000000e5
-166 4 13 25 0.65536000000000000000e5
-166 4 15 35 0.16384000000000000000e5
-167 1 6 21 -0.32768000000000000000e5
-167 1 15 46 0.32768000000000000000e5
-167 1 17 32 -0.32768000000000000000e5
-167 2 9 15 -0.32768000000000000000e5
-167 3 7 20 0.32768000000000000000e5
-167 3 8 21 -0.65536000000000000000e5
-167 4 10 14 0.32768000000000000000e5
-168 1 20 27 -0.32768000000000000000e5
-168 2 11 25 -0.32768000000000000000e5
-168 3 8 21 -0.65536000000000000000e5
-168 3 18 31 -0.32768000000000000000e5
-169 1 2 17 -0.16384000000000000000e5
-169 1 3 18 -0.81920000000000000000e4
-169 1 3 34 -0.81920000000000000000e4
-169 1 4 19 -0.32768000000000000000e5
-169 1 5 20 -0.16384000000000000000e5
-169 1 10 17 -0.16384000000000000000e5
-169 1 13 44 0.16384000000000000000e5
-169 1 14 45 0.16384000000000000000e5
-169 1 16 23 0.81920000000000000000e4
-169 1 16 31 -0.32768000000000000000e5
-169 1 20 27 0.32768000000000000000e5
-169 2 6 12 -0.81920000000000000000e4
-169 2 10 24 -0.16384000000000000000e5
-169 2 11 13 -0.32768000000000000000e5
-169 3 3 16 -0.16384000000000000000e5
-169 3 7 12 -0.81920000000000000000e4
-169 3 7 20 -0.32768000000000000000e5
-169 3 16 29 -0.16384000000000000000e5
-169 4 1 13 -0.81920000000000000000e4
-169 4 3 15 -0.16384000000000000000e5
-169 4 10 10 -0.32768000000000000000e5
-169 4 11 23 -0.16384000000000000000e5
-170 1 12 19 -0.65536000000000000000e5
-170 1 16 31 0.32768000000000000000e5
-170 1 20 27 0.32768000000000000000e5
-170 3 7 36 -0.32768000000000000000e5
-171 1 6 21 -0.65536000000000000000e5
-171 1 20 51 0.65536000000000000000e5
-171 3 15 44 0.32768000000000000000e5
-171 3 17 30 0.32768000000000000000e5
-171 3 20 49 0.32768000000000000000e5
-171 3 30 35 0.32768000000000000000e5
-171 3 32 45 0.32768000000000000000e5
-171 3 36 49 0.32768000000000000000e5
-172 1 3 18 0.16384000000000000000e5
-172 1 4 35 -0.16384000000000000000e5
-172 1 5 20 0.32768000000000000000e5
-172 1 10 17 0.32768000000000000000e5
-172 1 11 18 0.32768000000000000000e5
-172 1 12 43 -0.32768000000000000000e5
-172 1 13 20 -0.13107200000000000000e6
-172 1 14 45 -0.32768000000000000000e5
-172 1 17 32 0.65536000000000000000e5
-172 1 17 48 0.16384000000000000000e5
-172 1 18 49 0.16384000000000000000e5
-172 1 20 27 0.65536000000000000000e5
-172 2 9 23 -0.16384000000000000000e5
-172 2 11 25 0.65536000000000000000e5
-172 2 14 28 0.16384000000000000000e5
-172 3 3 16 0.16384000000000000000e5
-172 3 4 17 0.16384000000000000000e5
-172 3 5 34 -0.16384000000000000000e5
-172 3 6 19 -0.32768000000000000000e5
-172 3 7 20 0.65536000000000000000e5
-172 3 13 42 0.16384000000000000000e5
-172 3 14 27 -0.32768000000000000000e5
-172 3 14 43 0.16384000000000000000e5
-172 3 17 30 -0.32768000000000000000e5
-172 4 2 14 0.16384000000000000000e5
-172 4 3 15 0.32768000000000000000e5
-172 4 10 14 0.65536000000000000000e5
-173 1 3 18 -0.16384000000000000000e5
-173 1 4 35 0.32768000000000000000e5
-173 1 5 20 -0.32768000000000000000e5
-173 1 5 36 0.32768000000000000000e5
-173 1 10 17 -0.32768000000000000000e5
-173 1 12 43 0.49152000000000000000e5
-173 1 14 45 0.98304000000000000000e5
-173 1 17 32 -0.65536000000000000000e5
-173 1 17 48 -0.32768000000000000000e5
-173 1 18 49 -0.32768000000000000000e5
-173 2 9 23 0.32768000000000000000e5
-173 2 14 28 -0.32768000000000000000e5
-173 3 3 16 -0.16384000000000000000e5
-173 3 4 17 -0.16384000000000000000e5
-173 3 5 34 0.32768000000000000000e5
-173 3 13 42 -0.32768000000000000000e5
-173 3 14 27 0.49152000000000000000e5
-173 3 14 43 -0.32768000000000000000e5
-173 4 2 14 -0.16384000000000000000e5
-173 4 3 15 -0.32768000000000000000e5
-174 1 3 18 -0.16384000000000000000e5
-174 1 4 19 0.32768000000000000000e5
-174 1 4 35 0.16384000000000000000e5
-174 1 12 43 0.32768000000000000000e5
-174 1 14 45 0.32768000000000000000e5
-174 1 17 48 -0.16384000000000000000e5
-174 1 18 49 -0.16384000000000000000e5
-174 1 20 27 -0.65536000000000000000e5
-174 2 9 23 0.16384000000000000000e5
-174 2 14 28 -0.16384000000000000000e5
-174 3 3 16 -0.16384000000000000000e5
-174 3 4 17 -0.16384000000000000000e5
-174 3 5 34 0.16384000000000000000e5
-174 3 7 20 -0.65536000000000000000e5
-174 3 13 42 -0.16384000000000000000e5
-174 3 14 27 0.32768000000000000000e5
-174 3 14 43 -0.16384000000000000000e5
-174 3 16 29 -0.32768000000000000000e5
-174 4 2 14 -0.16384000000000000000e5
-175 1 2 17 -0.32768000000000000000e5
-175 1 3 34 -0.16384000000000000000e5
-175 1 4 19 -0.65536000000000000000e5
-175 1 4 35 -0.32768000000000000000e5
-175 1 12 43 -0.49152000000000000000e5
-175 1 13 44 0.32768000000000000000e5
-175 1 14 45 -0.65536000000000000000e5
-175 1 16 23 0.16384000000000000000e5
-175 1 16 31 -0.65536000000000000000e5
-175 1 17 48 0.32768000000000000000e5
-175 1 18 49 0.32768000000000000000e5
-175 1 20 27 0.13107200000000000000e6
-175 2 6 12 -0.16384000000000000000e5
-175 2 9 23 -0.32768000000000000000e5
-175 2 10 24 -0.65536000000000000000e5
-175 2 14 28 0.32768000000000000000e5
-175 3 3 16 -0.16384000000000000000e5
-175 3 4 17 0.16384000000000000000e5
-175 3 5 34 -0.32768000000000000000e5
-175 3 7 12 -0.16384000000000000000e5
-175 3 13 42 0.32768000000000000000e5
-175 3 14 27 -0.49152000000000000000e5
-175 3 14 43 0.32768000000000000000e5
-175 4 1 13 -0.16384000000000000000e5
-175 4 2 14 0.16384000000000000000e5
-175 4 10 10 -0.65536000000000000000e5
-176 1 2 17 -0.32768000000000000000e5
-176 1 3 18 -0.16384000000000000000e5
-176 1 3 34 -0.16384000000000000000e5
-176 1 7 16 -0.32768000000000000000e5
-176 1 16 23 0.16384000000000000000e5
-176 1 27 34 0.32768000000000000000e5
-176 2 1 15 -0.32768000000000000000e5
-176 2 6 12 -0.16384000000000000000e5
-176 3 3 16 -0.32768000000000000000e5
-176 3 7 12 -0.16384000000000000000e5
-176 4 1 13 -0.16384000000000000000e5
-177 1 15 30 0.32768000000000000000e5
-177 1 18 49 -0.32768000000000000000e5
-177 3 6 19 -0.65536000000000000000e5
-177 3 14 43 -0.32768000000000000000e5
-177 3 26 35 0.32768000000000000000e5
-178 1 5 20 -0.65536000000000000000e5
-178 1 14 45 0.65536000000000000000e5
-178 1 17 48 -0.32768000000000000000e5
-178 2 14 28 -0.32768000000000000000e5
-178 3 5 34 0.32768000000000000000e5
-178 3 13 42 -0.32768000000000000000e5
-179 1 4 35 0.32768000000000000000e5
-179 1 10 17 -0.65536000000000000000e5
-179 1 14 45 0.65536000000000000000e5
-179 1 17 48 -0.32768000000000000000e5
-179 1 18 49 -0.32768000000000000000e5
-179 2 14 28 -0.32768000000000000000e5
-179 3 13 42 -0.32768000000000000000e5
-179 3 14 43 -0.32768000000000000000e5
-180 1 4 19 -0.65536000000000000000e5
-180 1 12 43 0.32768000000000000000e5
-180 1 17 48 0.32768000000000000000e5
-180 3 13 42 0.32768000000000000000e5
-180 3 14 27 0.32768000000000000000e5
-181 1 2 17 -0.32768000000000000000e5
-181 1 3 18 -0.32768000000000000000e5
-181 1 12 43 0.32768000000000000000e5
-181 2 6 12 -0.32768000000000000000e5
-181 3 3 16 -0.32768000000000000000e5
-182 1 2 17 -0.32768000000000000000e5
-182 1 4 35 -0.32768000000000000000e5
-182 1 12 43 -0.32768000000000000000e5
-182 1 14 45 -0.65536000000000000000e5
-182 1 16 23 0.65536000000000000000e5
-182 1 16 31 -0.13107200000000000000e6
-182 1 16 47 0.32768000000000000000e5
-182 1 17 48 0.32768000000000000000e5
-182 1 18 49 0.32768000000000000000e5
-182 1 20 27 0.13107200000000000000e6
-182 2 7 13 0.65536000000000000000e5
-182 2 9 23 -0.32768000000000000000e5
-182 2 10 24 -0.65536000000000000000e5
-182 2 14 28 0.32768000000000000000e5
-182 3 3 16 -0.32768000000000000000e5
-182 3 5 34 -0.32768000000000000000e5
-182 3 7 12 -0.32768000000000000000e5
-182 3 12 41 0.32768000000000000000e5
-182 3 13 42 0.32768000000000000000e5
-182 3 14 27 -0.32768000000000000000e5
-182 3 14 43 0.32768000000000000000e5
-182 4 1 13 -0.32768000000000000000e5
-182 4 10 10 -0.13107200000000000000e6
-183 1 7 16 -0.65536000000000000000e5
-183 1 12 27 0.32768000000000000000e5
-183 1 16 23 0.32768000000000000000e5
-183 3 1 34 -0.32768000000000000000e5
-184 1 1 48 0.81920000000000000000e4
-184 1 2 33 0.32768000000000000000e5
-184 1 2 49 0.81920000000000000000e4
-184 1 8 39 0.16384000000000000000e5
-184 1 9 40 0.16384000000000000000e5
-184 1 10 41 -0.32768000000000000000e5
-184 1 11 42 -0.65536000000000000000e5
-184 1 12 43 -0.13107200000000000000e6
-184 1 15 30 -0.65536000000000000000e5
-184 1 18 49 0.13107200000000000000e6
-184 1 23 38 0.81920000000000000000e4
-184 1 24 55 -0.16384000000000000000e5
-184 1 26 41 -0.16384000000000000000e5
-184 1 28 43 0.98304000000000000000e5
-184 1 32 47 0.98304000000000000000e5
-184 1 33 48 0.32768000000000000000e5
-184 1 40 55 0.16384000000000000000e5
-184 1 41 56 0.16384000000000000000e5
-184 1 52 55 -0.65536000000000000000e5
-184 2 2 32 0.81920000000000000000e4
-184 2 4 34 -0.16384000000000000000e5
-184 2 12 26 0.32768000000000000000e5
-184 2 16 30 0.16384000000000000000e5
-184 2 20 34 0.32768000000000000000e5
-184 2 28 34 0.16384000000000000000e5
-184 3 3 32 0.32768000000000000000e5
-184 3 4 33 -0.32768000000000000000e5
-184 3 5 18 -0.65536000000000000000e5
-184 3 5 34 0.65536000000000000000e5
-184 3 5 50 -0.16384000000000000000e5
-184 3 9 38 0.16384000000000000000e5
-184 3 13 42 0.65536000000000000000e5
-184 3 14 27 -0.65536000000000000000e5
-184 3 14 43 0.65536000000000000000e5
-184 3 14 51 -0.65536000000000000000e5
-184 3 22 35 0.65536000000000000000e5
-184 3 22 51 0.16384000000000000000e5
-184 3 23 52 -0.32768000000000000000e5
-184 3 27 40 -0.16384000000000000000e5
-184 3 27 56 0.16384000000000000000e5
-184 3 28 41 0.98304000000000000000e5
-184 3 29 42 0.32768000000000000000e5
-184 3 35 48 -0.65536000000000000000e5
-184 3 38 51 -0.16384000000000000000e5
-184 3 45 50 -0.65536000000000000000e5
-184 3 45 56 0.32768000000000000000e5
-184 3 47 52 -0.32768000000000000000e5
-184 4 2 30 0.16384000000000000000e5
-184 4 3 31 -0.32768000000000000000e5
-184 4 6 34 0.32768000000000000000e5
-184 4 7 35 0.16384000000000000000e5
-184 4 8 20 0.32768000000000000000e5
-184 4 9 21 -0.32768000000000000000e5
-184 4 19 31 -0.32768000000000000000e5
-184 4 22 22 -0.65536000000000000000e5
-184 4 22 34 -0.32768000000000000000e5
-184 4 29 33 -0.16384000000000000000e5
-184 4 30 34 -0.32768000000000000000e5
-184 4 31 35 -0.32768000000000000000e5
-185 1 5 20 -0.13107200000000000000e6
-185 1 5 36 0.13107200000000000000e6
-185 1 11 42 0.32768000000000000000e5
-185 1 14 45 -0.13107200000000000000e6
-185 1 17 48 0.65536000000000000000e5
-185 1 18 49 0.65536000000000000000e5
-185 1 26 33 0.32768000000000000000e5
-185 2 14 28 0.65536000000000000000e5
-185 3 4 17 0.65536000000000000000e5
-185 3 4 33 0.32768000000000000000e5
-185 3 5 18 0.65536000000000000000e5
-185 3 5 34 -0.65536000000000000000e5
-185 3 13 42 0.65536000000000000000e5
-185 3 14 43 0.65536000000000000000e5
-185 4 8 12 0.65536000000000000000e5
-186 1 2 33 -0.32768000000000000000e5
-186 1 4 35 -0.65536000000000000000e5
-186 1 10 41 -0.32768000000000000000e5
-186 1 11 42 0.32768000000000000000e5
-186 1 12 43 0.65536000000000000000e5
-186 2 12 26 -0.32768000000000000000e5
-186 3 3 32 -0.32768000000000000000e5
-186 3 4 17 -0.65536000000000000000e5
-186 3 14 27 0.65536000000000000000e5
-186 4 8 20 -0.32768000000000000000e5
-187 1 3 18 -0.65536000000000000000e5
-187 1 11 42 -0.32768000000000000000e5
-187 1 28 43 0.32768000000000000000e5
-187 1 32 47 0.32768000000000000000e5
-187 1 33 48 0.32768000000000000000e5
-187 3 3 32 0.32768000000000000000e5
-187 3 13 42 0.65536000000000000000e5
-187 3 28 41 0.32768000000000000000e5
-187 3 29 42 0.32768000000000000000e5
-187 4 3 31 -0.32768000000000000000e5
-188 1 2 33 0.32768000000000000000e5
-188 1 3 34 -0.65536000000000000000e5
-188 1 10 41 0.32768000000000000000e5
-188 3 3 16 -0.65536000000000000000e5
-189 1 2 17 -0.65536000000000000000e5
-189 1 2 33 -0.32768000000000000000e5
-189 1 3 34 0.65536000000000000000e5
-189 1 10 41 -0.32768000000000000000e5
-189 1 11 42 0.32768000000000000000e5
-189 1 12 43 0.65536000000000000000e5
-189 1 28 43 -0.32768000000000000000e5
-189 1 32 47 -0.32768000000000000000e5
-189 1 33 48 -0.32768000000000000000e5
-189 2 7 21 -0.32768000000000000000e5
-189 2 12 26 -0.32768000000000000000e5
-189 3 3 32 -0.32768000000000000000e5
-189 3 13 42 -0.65536000000000000000e5
-189 3 28 41 -0.32768000000000000000e5
-189 3 29 42 -0.32768000000000000000e5
-189 4 3 31 0.32768000000000000000e5
-190 1 1 32 0.32768000000000000000e5
-190 1 2 33 -0.32768000000000000000e5
-190 1 3 34 0.65536000000000000000e5
-190 1 10 41 -0.32768000000000000000e5
-190 1 12 27 -0.65536000000000000000e5
-190 2 7 21 -0.32768000000000000000e5
-190 3 2 31 -0.32768000000000000000e5
-190 3 3 32 -0.32768000000000000000e5
-190 3 7 12 -0.65536000000000000000e5
-191 1 1 16 -0.65536000000000000000e5
-191 1 1 32 -0.32768000000000000000e5
-191 1 2 33 0.65536000000000000000e5
-191 1 3 34 -0.13107200000000000000e6
-191 1 10 41 0.65536000000000000000e5
-191 1 11 42 -0.32768000000000000000e5
-191 1 12 27 0.65536000000000000000e5
-191 1 12 43 -0.65536000000000000000e5
-191 1 16 23 0.65536000000000000000e5
-191 1 28 43 0.32768000000000000000e5
-191 1 32 47 0.32768000000000000000e5
-191 1 33 48 0.32768000000000000000e5
-191 2 1 31 -0.32768000000000000000e5
-191 2 6 20 -0.32768000000000000000e5
-191 2 7 21 0.65536000000000000000e5
-191 2 12 26 0.32768000000000000000e5
-191 3 1 34 -0.65536000000000000000e5
-191 3 2 31 0.32768000000000000000e5
-191 3 3 32 0.65536000000000000000e5
-191 3 13 42 0.65536000000000000000e5
-191 3 28 41 0.32768000000000000000e5
-191 3 29 42 0.32768000000000000000e5
-191 4 3 31 -0.32768000000000000000e5
-192 1 1 48 0.16384000000000000000e5
-192 1 2 33 -0.65536000000000000000e5
-192 1 2 49 0.16384000000000000000e5
-192 1 8 39 0.32768000000000000000e5
-192 1 9 40 0.32768000000000000000e5
-192 1 10 41 -0.65536000000000000000e5
-192 1 11 26 0.32768000000000000000e5
-192 1 11 42 0.65536000000000000000e5
-192 1 23 38 0.16384000000000000000e5
-192 1 26 33 -0.65536000000000000000e5
-192 1 26 41 -0.32768000000000000000e5
-192 1 28 43 0.65536000000000000000e5
-192 1 32 47 0.65536000000000000000e5
-192 1 33 40 0.65536000000000000000e5
-192 1 33 48 -0.13107200000000000000e6
-192 2 2 32 0.16384000000000000000e5
-192 2 4 34 -0.32768000000000000000e5
-192 2 12 26 -0.65536000000000000000e5
-192 2 16 30 0.32768000000000000000e5
-192 2 20 34 0.65536000000000000000e5
-192 2 28 34 0.32768000000000000000e5
-192 3 3 32 -0.65536000000000000000e5
-192 3 4 33 0.65536000000000000000e5
-192 3 5 34 -0.13107200000000000000e6
-192 3 5 50 -0.32768000000000000000e5
-192 3 6 51 0.32768000000000000000e5
-192 3 6 55 0.32768000000000000000e5
-192 3 9 38 0.32768000000000000000e5
-192 3 10 11 -0.65536000000000000000e5
-192 3 11 40 0.32768000000000000000e5
-192 3 13 42 -0.13107200000000000000e6
-192 3 14 27 0.13107200000000000000e6
-192 3 22 35 0.13107200000000000000e6
-192 3 27 40 -0.32768000000000000000e5
-192 3 28 41 0.65536000000000000000e5
-192 3 29 42 -0.65536000000000000000e5
-192 4 2 30 0.32768000000000000000e5
-192 4 3 31 0.65536000000000000000e5
-192 4 6 34 0.65536000000000000000e5
-192 4 8 20 -0.65536000000000000000e5
-192 4 9 21 0.65536000000000000000e5
-192 4 21 33 0.32768000000000000000e5
-193 1 2 33 -0.65536000000000000000e5
-193 1 4 35 -0.13107200000000000000e6
-193 1 6 13 0.65536000000000000000e5
-193 1 10 25 -0.32768000000000000000e5
-193 1 10 41 0.65536000000000000000e5
-193 1 11 42 0.13107200000000000000e6
-193 1 12 43 0.13107200000000000000e6
-193 1 28 43 -0.65536000000000000000e5
-193 1 32 47 -0.65536000000000000000e5
-193 1 33 48 -0.65536000000000000000e5
-193 2 5 11 0.65536000000000000000e5
-193 2 12 26 -0.65536000000000000000e5
-193 2 28 34 -0.32768000000000000000e5
-193 3 2 15 0.65536000000000000000e5
-193 3 4 17 -0.13107200000000000000e6
-193 3 10 23 -0.32768000000000000000e5
-193 3 13 42 -0.13107200000000000000e6
-193 3 14 27 0.13107200000000000000e6
-193 3 28 41 -0.65536000000000000000e5
-193 3 29 42 -0.65536000000000000000e5
-193 4 3 31 0.65536000000000000000e5
-193 4 7 19 -0.32768000000000000000e5
-193 4 8 20 -0.65536000000000000000e5
-193 4 18 22 -0.32768000000000000000e5
-193 4 18 30 -0.32768000000000000000e5
-193 4 21 33 -0.32768000000000000000e5
-194 1 1 48 0.16384000000000000000e5
-194 1 2 49 0.16384000000000000000e5
-194 1 6 13 -0.65536000000000000000e5
-194 1 8 39 0.32768000000000000000e5
-194 1 9 40 0.32768000000000000000e5
-194 1 10 25 0.32768000000000000000e5
-194 1 10 41 -0.65536000000000000000e5
-194 1 12 43 -0.13107200000000000000e6
-194 1 23 38 0.16384000000000000000e5
-194 1 26 41 -0.65536000000000000000e5
-194 1 28 43 0.13107200000000000000e6
-194 1 32 47 0.13107200000000000000e6
-194 2 2 32 0.16384000000000000000e5
-194 2 4 34 -0.32768000000000000000e5
-194 2 16 30 0.32768000000000000000e5
-194 2 20 34 0.65536000000000000000e5
-194 3 9 38 0.32768000000000000000e5
-194 3 10 39 0.32768000000000000000e5
-194 3 22 35 0.13107200000000000000e6
-194 3 28 41 0.13107200000000000000e6
-194 4 2 30 0.32768000000000000000e5
-194 4 6 34 0.65536000000000000000e5
-195 1 1 48 -0.16384000000000000000e5
-195 1 2 49 -0.16384000000000000000e5
-195 1 8 39 -0.32768000000000000000e5
-195 1 12 43 0.13107200000000000000e6
-195 1 23 38 -0.16384000000000000000e5
-195 1 26 41 0.32768000000000000000e5
-195 1 28 43 -0.65536000000000000000e5
-195 1 32 47 -0.13107200000000000000e6
-195 2 2 32 -0.16384000000000000000e5
-195 2 16 30 -0.32768000000000000000e5
-195 2 20 34 -0.65536000000000000000e5
-195 3 2 15 -0.65536000000000000000e5
-195 3 3 32 -0.65536000000000000000e5
-195 3 10 23 0.32768000000000000000e5
-195 3 22 35 -0.13107200000000000000e6
-195 3 28 41 -0.13107200000000000000e6
-195 4 2 30 -0.32768000000000000000e5
-195 4 6 34 -0.65536000000000000000e5
-196 1 1 48 -0.16384000000000000000e5
-196 1 2 33 -0.65536000000000000000e5
-196 1 2 49 -0.16384000000000000000e5
-196 1 9 40 -0.32768000000000000000e5
-196 1 10 41 0.65536000000000000000e5
-196 1 12 43 0.13107200000000000000e6
-196 1 23 38 -0.16384000000000000000e5
-196 1 26 41 0.32768000000000000000e5
-196 1 28 43 -0.65536000000000000000e5
-196 1 32 47 -0.13107200000000000000e6
-196 2 2 32 -0.16384000000000000000e5
-196 2 4 10 0.65536000000000000000e5
-196 2 7 21 -0.65536000000000000000e5
-196 2 16 30 -0.32768000000000000000e5
-196 2 20 34 -0.65536000000000000000e5
-196 3 1 14 0.65536000000000000000e5
-196 3 1 30 0.32768000000000000000e5
-196 3 2 15 0.65536000000000000000e5
-196 3 3 16 -0.13107200000000000000e6
-196 3 22 35 -0.13107200000000000000e6
-196 3 28 41 -0.13107200000000000000e6
-196 4 2 30 -0.32768000000000000000e5
-196 4 6 34 -0.65536000000000000000e5
-197 1 1 48 0.16384000000000000000e5
-197 1 2 33 0.13107200000000000000e6
-197 1 2 49 0.16384000000000000000e5
-197 1 3 34 -0.13107200000000000000e6
-197 1 8 39 0.32768000000000000000e5
-197 1 10 41 0.65536000000000000000e5
-197 1 11 42 -0.65536000000000000000e5
-197 1 12 43 -0.13107200000000000000e6
-197 1 23 38 0.16384000000000000000e5
-197 1 28 43 0.65536000000000000000e5
-197 1 32 47 0.65536000000000000000e5
-197 1 33 48 0.65536000000000000000e5
-197 2 2 32 0.16384000000000000000e5
-197 2 7 21 0.65536000000000000000e5
-197 2 12 26 0.65536000000000000000e5
-197 3 1 14 -0.65536000000000000000e5
-197 3 1 30 -0.32768000000000000000e5
-197 3 3 32 0.65536000000000000000e5
-197 3 8 37 0.32768000000000000000e5
-197 3 10 23 -0.32768000000000000000e5
-197 3 13 42 0.13107200000000000000e6
-197 3 28 41 0.65536000000000000000e5
-197 3 29 42 0.65536000000000000000e5
-197 4 3 31 -0.65536000000000000000e5
-197 4 6 18 -0.32768000000000000000e5
-198 1 1 32 -0.65536000000000000000e5
-198 1 1 48 0.49152000000000000000e5
-198 1 2 33 0.13107200000000000000e6
-198 1 2 49 0.49152000000000000000e5
-198 1 3 34 -0.13107200000000000000e6
-198 1 4 11 -0.32768000000000000000e5
-198 1 8 23 0.65536000000000000000e5
-198 1 8 39 0.32768000000000000000e5
-198 1 9 40 0.32768000000000000000e5
-198 1 10 41 0.65536000000000000000e5
-198 1 11 42 -0.65536000000000000000e5
-198 1 12 43 -0.26214400000000000000e6
-198 1 23 38 0.49152000000000000000e5
-198 1 26 41 -0.32768000000000000000e5
-198 1 28 43 0.13107200000000000000e6
-198 1 32 47 0.19660800000000000000e6
-198 1 33 48 0.65536000000000000000e5
-198 2 2 8 0.32768000000000000000e5
-198 2 2 32 0.49152000000000000000e5
-198 2 3 9 -0.32768000000000000000e5
-198 2 7 21 0.65536000000000000000e5
-198 2 12 26 0.65536000000000000000e5
-198 2 16 30 0.32768000000000000000e5
-198 2 20 34 0.65536000000000000000e5
-198 3 1 14 -0.65536000000000000000e5
-198 3 1 30 -0.32768000000000000000e5
-198 3 2 7 -0.32768000000000000000e5
-198 3 2 15 0.65536000000000000000e5
-198 3 3 32 0.13107200000000000000e6
-198 3 4 9 -0.32768000000000000000e5
-198 3 8 37 0.65536000000000000000e5
-198 3 10 23 -0.65536000000000000000e5
-198 3 13 42 0.13107200000000000000e6
-198 3 22 35 0.13107200000000000000e6
-198 3 28 41 0.19660800000000000000e6
-198 3 29 42 0.65536000000000000000e5
-198 4 2 6 -0.32768000000000000000e5
-198 4 2 30 0.32768000000000000000e5
-198 4 3 31 -0.65536000000000000000e5
-198 4 6 18 -0.32768000000000000000e5
-198 4 6 34 0.65536000000000000000e5
-199 1 1 8 -0.32768000000000000000e5
-199 1 2 9 -0.32768000000000000000e5
-199 1 7 38 0.32768000000000000000e5
-199 2 1 7 -0.32768000000000000000e5
-199 3 2 7 -0.32768000000000000000e5
-200 1 1 8 -0.32768000000000000000e5
-200 1 1 12 -0.65536000000000000000e5
-200 1 1 24 -0.16384000000000000000e5
-200 1 1 32 -0.65536000000000000000e5
-200 1 1 40 -0.16384000000000000000e5
-200 1 1 48 0.32768000000000000000e5
-200 1 2 9 -0.32768000000000000000e5
-200 1 2 33 0.19660800000000000000e6
-200 1 2 49 0.32768000000000000000e5
-200 1 3 34 -0.26214400000000000000e6
-200 1 4 11 -0.32768000000000000000e5
-200 1 7 22 0.32768000000000000000e5
-200 1 8 23 0.32768000000000000000e5
-200 1 8 39 0.32768000000000000000e5
-200 1 9 40 0.32768000000000000000e5
-200 1 10 41 0.13107200000000000000e6
-200 1 11 42 -0.65536000000000000000e5
-200 1 12 27 0.13107200000000000000e6
-200 1 12 43 -0.26214400000000000000e6
-200 1 22 37 0.16384000000000000000e5
-200 1 23 38 0.49152000000000000000e5
-200 1 26 41 -0.32768000000000000000e5
-200 1 28 43 0.13107200000000000000e6
-200 1 32 47 0.19660800000000000000e6
-200 1 33 48 0.65536000000000000000e5
-200 2 1 7 -0.32768000000000000000e5
-200 2 2 8 0.32768000000000000000e5
-200 2 2 16 -0.16384000000000000000e5
-200 2 2 32 0.32768000000000000000e5
-200 2 3 9 -0.32768000000000000000e5
-200 2 6 20 -0.65536000000000000000e5
-200 2 7 21 0.13107200000000000000e6
-200 2 12 26 0.65536000000000000000e5
-200 2 16 16 0.32768000000000000000e5
-200 2 16 30 0.32768000000000000000e5
-200 2 20 34 0.65536000000000000000e5
-200 3 1 14 -0.13107200000000000000e6
-200 3 1 22 -0.16384000000000000000e5
-200 3 1 30 -0.32768000000000000000e5
-200 3 1 38 -0.16384000000000000000e5
-200 3 2 7 -0.65536000000000000000e5
-200 3 2 15 0.65536000000000000000e5
-200 3 2 23 -0.16384000000000000000e5
-200 3 3 32 0.19660800000000000000e6
-200 3 4 9 -0.32768000000000000000e5
-200 3 7 12 0.13107200000000000000e6
-200 3 8 37 0.32768000000000000000e5
-200 3 10 23 -0.65536000000000000000e5
-200 3 13 42 0.13107200000000000000e6
-200 3 22 27 0.32768000000000000000e5
-200 3 22 35 0.13107200000000000000e6
-200 3 28 41 0.19660800000000000000e6
-200 3 29 42 0.65536000000000000000e5
-200 4 2 6 -0.32768000000000000000e5
-200 4 2 30 0.32768000000000000000e5
-200 4 3 31 -0.65536000000000000000e5
-200 4 6 6 -0.13107200000000000000e6
-200 4 6 18 -0.32768000000000000000e5
-200 4 6 34 0.65536000000000000000e5
-200 4 16 16 -0.32768000000000000000e5
-201 1 2 33 0.13107200000000000000e6
-201 1 4 11 -0.65536000000000000000e5
-201 1 6 13 0.13107200000000000000e6
-201 1 6 37 0.32768000000000000000e5
-201 1 6 53 -0.32768000000000000000e5
-201 1 9 40 -0.13107200000000000000e6
-201 1 10 25 0.65536000000000000000e5
-201 1 10 41 0.13107200000000000000e6
-201 1 11 26 -0.65536000000000000000e5
-201 1 11 42 0.13107200000000000000e6
-201 1 12 43 -0.26214400000000000000e6
-201 1 49 56 -0.32768000000000000000e5
-201 1 53 56 0.32768000000000000000e5
-201 1 54 55 0.65536000000000000000e5
-201 1 55 56 -0.65536000000000000000e5
-201 2 5 27 0.32768000000000000000e5
-201 2 5 35 -0.32768000000000000000e5
-201 2 12 26 0.13107200000000000000e6
-201 2 28 34 -0.65536000000000000000e5
-201 3 3 32 0.13107200000000000000e6
-201 3 3 40 0.32768000000000000000e5
-201 3 4 9 -0.65536000000000000000e5
-201 3 5 26 0.32768000000000000000e5
-201 3 5 50 -0.65536000000000000000e5
-201 3 6 11 0.65536000000000000000e5
-201 3 10 11 -0.13107200000000000000e6
-201 3 10 39 -0.65536000000000000000e5
-201 3 14 27 -0.26214400000000000000e6
-201 3 25 38 0.32768000000000000000e5
-201 3 25 54 -0.32768000000000000000e5
-201 3 39 40 -0.32768000000000000000e5
-201 3 40 53 -0.32768000000000000000e5
-201 3 48 53 0.32768000000000000000e5
-201 3 49 54 0.32768000000000000000e5
-201 3 53 54 -0.32768000000000000000e5
-201 4 4 8 -0.65536000000000000000e5
-201 4 5 9 0.65536000000000000000e5
-201 4 5 33 -0.32768000000000000000e5
-201 4 8 20 0.13107200000000000000e6
-201 4 18 22 -0.65536000000000000000e5
-201 4 18 30 -0.65536000000000000000e5
-201 4 19 19 -0.65536000000000000000e5
-201 4 19 35 -0.32768000000000000000e5
-201 4 21 33 -0.65536000000000000000e5
-201 4 28 28 -0.65536000000000000000e5
-201 4 33 33 -0.65536000000000000000e5
-201 4 35 35 -0.65536000000000000000e5
-202 1 1 40 0.32768000000000000000e5
-202 1 1 48 0.32768000000000000000e5
-202 1 2 25 -0.32768000000000000000e5
-202 1 2 33 -0.13107200000000000000e6
-202 1 2 49 0.65536000000000000000e5
-202 1 4 11 0.65536000000000000000e5
-202 1 6 13 -0.13107200000000000000e6
-202 1 6 37 0.32768000000000000000e5
-202 1 8 39 0.65536000000000000000e5
-202 1 9 40 0.65536000000000000000e5
-202 1 10 25 -0.65536000000000000000e5
-202 1 10 41 -0.26214400000000000000e6
-202 1 23 38 0.32768000000000000000e5
-202 1 26 41 -0.65536000000000000000e5
-202 1 28 43 0.13107200000000000000e6
-202 1 32 47 0.26214400000000000000e6
-202 2 2 32 0.32768000000000000000e5
-202 2 4 18 0.32768000000000000000e5
-202 2 5 19 -0.32768000000000000000e5
-202 2 12 26 -0.13107200000000000000e6
-202 2 16 30 0.65536000000000000000e5
-202 2 20 34 0.13107200000000000000e6
-202 3 1 30 0.65536000000000000000e5
-202 3 2 39 0.32768000000000000000e5
-202 3 3 32 -0.13107200000000000000e6
-202 3 4 9 0.65536000000000000000e5
-202 3 5 26 -0.32768000000000000000e5
-202 3 10 23 -0.65536000000000000000e5
-202 3 14 27 0.26214400000000000000e6
-202 3 22 35 0.26214400000000000000e6
-202 3 28 41 0.26214400000000000000e6
-202 4 2 30 0.65536000000000000000e5
-202 4 4 8 0.65536000000000000000e5
-202 4 4 16 -0.32768000000000000000e5
-202 4 6 34 0.13107200000000000000e6
-202 4 8 20 -0.13107200000000000000e6
-203 1 1 40 -0.32768000000000000000e5
-203 1 2 25 0.32768000000000000000e5
-203 1 4 11 -0.65536000000000000000e5
-203 1 6 37 -0.65536000000000000000e5
-203 1 9 40 0.65536000000000000000e5
-203 1 24 39 0.32768000000000000000e5
-203 2 3 33 0.32768000000000000000e5
-203 2 4 18 -0.32768000000000000000e5
-203 2 5 27 -0.32768000000000000000e5
-203 3 1 30 -0.65536000000000000000e5
-203 3 2 39 -0.32768000000000000000e5
-203 3 3 40 -0.32768000000000000000e5
-203 3 9 38 0.65536000000000000000e5
-203 3 10 23 0.65536000000000000000e5
-203 4 4 16 0.32768000000000000000e5
-204 1 1 40 0.32768000000000000000e5
-204 1 2 33 -0.13107200000000000000e6
-204 1 2 49 -0.32768000000000000000e5
-204 1 6 37 0.32768000000000000000e5
-204 1 11 42 0.13107200000000000000e6
-204 1 12 43 0.26214400000000000000e6
-204 1 23 38 -0.32768000000000000000e5
-204 1 24 39 -0.32768000000000000000e5
-204 1 28 43 -0.13107200000000000000e6
-204 1 32 47 -0.13107200000000000000e6
-204 1 33 48 -0.13107200000000000000e6
-204 2 2 32 -0.32768000000000000000e5
-204 2 3 17 0.32768000000000000000e5
-204 2 3 33 -0.32768000000000000000e5
-204 2 12 26 -0.13107200000000000000e6
-204 3 1 30 0.13107200000000000000e6
-204 3 1 38 0.32768000000000000000e5
-204 3 2 23 0.32768000000000000000e5
-204 3 2 39 0.32768000000000000000e5
-204 3 3 40 0.32768000000000000000e5
-204 3 4 9 -0.65536000000000000000e5
-204 3 8 37 -0.65536000000000000000e5
-204 3 9 38 -0.65536000000000000000e5
-204 3 13 42 -0.26214400000000000000e6
-204 3 28 41 -0.13107200000000000000e6
-204 3 29 42 -0.13107200000000000000e6
-204 4 3 31 0.13107200000000000000e6
-204 4 4 16 -0.32768000000000000000e5
-204 4 6 18 0.65536000000000000000e5
-205 1 1 48 -0.32768000000000000000e5
-205 1 2 25 -0.32768000000000000000e5
-205 1 2 33 0.13107200000000000000e6
-205 1 4 11 0.65536000000000000000e5
-205 1 6 37 0.32768000000000000000e5
-205 1 8 39 -0.65536000000000000000e5
-205 1 9 40 -0.65536000000000000000e5
-205 1 11 42 -0.13107200000000000000e6
-205 1 26 41 0.65536000000000000000e5
-205 1 32 47 -0.13107200000000000000e6
-205 1 33 48 0.13107200000000000000e6
-205 2 3 9 0.65536000000000000000e5
-205 2 3 17 -0.32768000000000000000e5
-205 2 12 26 0.13107200000000000000e6
-205 2 16 30 -0.65536000000000000000e5
-205 2 20 34 -0.13107200000000000000e6
-205 3 1 30 -0.65536000000000000000e5
-205 3 1 38 -0.32768000000000000000e5
-205 3 2 15 -0.13107200000000000000e6
-205 3 2 23 -0.32768000000000000000e5
-205 3 3 32 -0.13107200000000000000e6
-205 3 4 9 0.65536000000000000000e5
-205 3 8 37 0.65536000000000000000e5
-205 3 13 42 0.26214400000000000000e6
-205 3 22 35 -0.26214400000000000000e6
-205 3 28 41 -0.13107200000000000000e6
-205 3 29 42 0.13107200000000000000e6
-205 4 2 30 -0.65536000000000000000e5
-205 4 3 31 -0.13107200000000000000e6
-205 4 6 18 -0.65536000000000000000e5
-205 4 6 34 -0.13107200000000000000e6
-206 1 1 48 0.32768000000000000000e5
-206 1 2 9 0.65536000000000000000e5
-206 1 2 25 0.32768000000000000000e5
-206 1 2 33 0.13107200000000000000e6
-206 1 2 49 0.65536000000000000000e5
-206 1 3 34 -0.26214400000000000000e6
-206 1 4 11 -0.65536000000000000000e5
-206 1 8 39 0.65536000000000000000e5
-206 1 9 40 0.65536000000000000000e5
-206 1 10 41 0.13107200000000000000e6
-206 1 12 43 -0.26214400000000000000e6
-206 1 23 38 0.32768000000000000000e5
-206 1 26 41 -0.65536000000000000000e5
-206 1 28 43 0.13107200000000000000e6
-206 1 32 47 0.26214400000000000000e6
-206 2 2 8 0.65536000000000000000e5
-206 2 2 32 0.32768000000000000000e5
-206 2 3 9 -0.65536000000000000000e5
-206 2 7 21 0.13107200000000000000e6
-206 2 16 30 0.65536000000000000000e5
-206 2 20 34 0.13107200000000000000e6
-206 3 1 14 -0.13107200000000000000e6
-206 3 2 15 0.13107200000000000000e6
-206 3 2 39 0.32768000000000000000e5
-206 3 3 32 0.26214400000000000000e6
-206 3 4 9 -0.65536000000000000000e5
-206 3 10 23 -0.65536000000000000000e5
-206 3 22 35 0.26214400000000000000e6
-206 3 28 41 0.26214400000000000000e6
-206 4 2 30 0.65536000000000000000e5
-206 4 6 34 0.13107200000000000000e6
-207 1 1 40 0.32768000000000000000e5
-207 1 1 48 0.32768000000000000000e5
-207 1 2 9 -0.65536000000000000000e5
-207 3 1 38 0.32768000000000000000e5
-207 3 2 23 0.32768000000000000000e5
-208 1 1 8 0.65536000000000000000e5
-208 1 1 24 0.32768000000000000000e5
-208 1 1 32 0.13107200000000000000e6
-208 1 1 48 -0.32768000000000000000e5
-208 1 2 9 0.65536000000000000000e5
-208 1 2 33 -0.39321600000000000000e6
-208 1 2 49 -0.65536000000000000000e5
-208 1 3 34 0.52428800000000000000e6
-208 1 4 11 0.65536000000000000000e5
-208 1 8 23 -0.65536000000000000000e5
-208 1 8 39 -0.65536000000000000000e5
-208 1 9 40 -0.65536000000000000000e5
-208 1 10 41 -0.26214400000000000000e6
-208 1 11 42 0.13107200000000000000e6
-208 1 12 27 -0.26214400000000000000e6
-208 1 12 43 0.52428800000000000000e6
-208 1 23 38 -0.65536000000000000000e5
-208 1 26 41 0.65536000000000000000e5
-208 1 28 43 -0.26214400000000000000e6
-208 1 32 47 -0.39321600000000000000e6
-208 1 33 48 -0.13107200000000000000e6
-208 2 1 7 0.65536000000000000000e5
-208 2 2 8 -0.65536000000000000000e5
-208 2 2 32 -0.65536000000000000000e5
-208 2 3 9 0.65536000000000000000e5
-208 2 6 20 0.13107200000000000000e6
-208 2 7 21 -0.26214400000000000000e6
-208 2 12 26 -0.13107200000000000000e6
-208 2 16 30 -0.65536000000000000000e5
-208 2 20 34 -0.13107200000000000000e6
-208 3 1 14 0.26214400000000000000e6
-208 3 1 30 0.65536000000000000000e5
-208 3 1 38 0.32768000000000000000e5
-208 3 2 7 0.65536000000000000000e5
-208 3 2 15 -0.13107200000000000000e6
-208 3 3 32 -0.39321600000000000000e6
-208 3 4 9 0.65536000000000000000e5
-208 3 7 12 -0.26214400000000000000e6
-208 3 8 37 -0.65536000000000000000e5
-208 3 10 23 0.13107200000000000000e6
-208 3 13 42 -0.26214400000000000000e6
-208 3 22 35 -0.26214400000000000000e6
-208 3 28 41 -0.39321600000000000000e6
-208 3 29 42 -0.13107200000000000000e6
-208 4 2 6 0.65536000000000000000e5
-208 4 2 30 -0.65536000000000000000e5
-208 4 3 31 0.13107200000000000000e6
-208 4 6 6 0.26214400000000000000e6
-208 4 6 18 0.65536000000000000000e5
-208 4 6 34 -0.13107200000000000000e6
-209 1 1 8 -0.13107200000000000000e6
-209 1 1 24 -0.32768000000000000000e5
-209 1 1 32 -0.13107200000000000000e6
-209 1 1 40 -0.32768000000000000000e5
-209 1 1 48 0.32768000000000000000e5
-209 1 2 9 -0.65536000000000000000e5
-209 1 2 33 0.39321600000000000000e6
-209 1 2 49 0.65536000000000000000e5
-209 1 3 34 -0.52428800000000000000e6
-209 1 4 11 -0.65536000000000000000e5
-209 1 8 23 0.65536000000000000000e5
-209 1 8 39 0.65536000000000000000e5
-209 1 9 40 0.65536000000000000000e5
-209 1 10 41 0.26214400000000000000e6
-209 1 11 42 -0.13107200000000000000e6
-209 1 12 27 0.26214400000000000000e6
-209 1 12 43 -0.52428800000000000000e6
-209 1 22 37 0.32768000000000000000e5
-209 1 23 38 0.98304000000000000000e5
-209 1 26 41 -0.65536000000000000000e5
-209 1 28 43 0.26214400000000000000e6
-209 1 32 47 0.39321600000000000000e6
-209 1 33 48 0.13107200000000000000e6
-209 2 1 7 -0.65536000000000000000e5
-209 2 2 8 0.65536000000000000000e5
-209 2 2 16 -0.32768000000000000000e5
-209 2 2 32 0.65536000000000000000e5
-209 2 3 9 -0.65536000000000000000e5
-209 2 6 20 -0.13107200000000000000e6
-209 2 7 21 0.26214400000000000000e6
-209 2 12 26 0.13107200000000000000e6
-209 2 16 30 0.65536000000000000000e5
-209 2 20 34 0.13107200000000000000e6
-209 3 1 14 -0.26214400000000000000e6
-209 3 1 30 -0.65536000000000000000e5
-209 3 1 38 -0.65536000000000000000e5
-209 3 2 7 -0.13107200000000000000e6
-209 3 2 15 0.13107200000000000000e6
-209 3 2 23 -0.32768000000000000000e5
-209 3 3 32 0.39321600000000000000e6
-209 3 4 9 -0.65536000000000000000e5
-209 3 7 12 0.26214400000000000000e6
-209 3 8 37 0.65536000000000000000e5
-209 3 10 23 -0.13107200000000000000e6
-209 3 13 42 0.26214400000000000000e6
-209 3 22 27 0.65536000000000000000e5
-209 3 22 35 0.26214400000000000000e6
-209 3 28 41 0.39321600000000000000e6
-209 3 29 42 0.13107200000000000000e6
-209 4 2 6 -0.65536000000000000000e5
-209 4 2 30 0.65536000000000000000e5
-209 4 3 31 -0.13107200000000000000e6
-209 4 6 6 -0.26214400000000000000e6
-209 4 6 18 -0.65536000000000000000e5
-209 4 6 34 0.13107200000000000000e6
-209 4 16 16 -0.65536000000000000000e5
-210 1 1 1 0.65536000000000000000e5
-210 1 1 8 0.65536000000000000000e5
-210 1 2 5 0.32768000000000000000e5
-210 1 2 9 -0.65536000000000000000e5
-210 1 2 25 -0.32768000000000000000e5
-210 1 7 22 -0.65536000000000000000e5
-210 1 8 23 0.65536000000000000000e5
-210 2 1 1 0.65536000000000000000e5
-210 3 1 22 0.32768000000000000000e5
-210 3 2 3 0.32768000000000000000e5
-210 4 1 1 -0.65536000000000000000e5
-210 4 2 2 0.65536000000000000000e5
-211 1 1 3 0.65536000000000000000e5
-211 1 1 8 0.13107200000000000000e6
-211 1 1 24 0.65536000000000000000e5
-211 1 1 32 0.26214400000000000000e6
-211 1 1 48 -0.65536000000000000000e5
-211 1 2 9 0.13107200000000000000e6
-211 1 2 33 -0.78643200000000000000e6
-211 1 2 49 -0.13107200000000000000e6
-211 1 3 34 0.10485760000000000000e7
-211 1 4 11 0.13107200000000000000e6
-211 1 8 23 -0.13107200000000000000e6
-211 1 8 39 -0.13107200000000000000e6
-211 1 9 40 -0.13107200000000000000e6
-211 1 10 41 -0.52428800000000000000e6
-211 1 11 42 0.26214400000000000000e6
-211 1 12 27 -0.52428800000000000000e6
-211 1 12 43 0.10485760000000000000e7
-211 1 23 38 -0.13107200000000000000e6
-211 1 26 41 0.13107200000000000000e6
-211 1 28 43 -0.52428800000000000000e6
-211 1 32 47 -0.78643200000000000000e6
-211 1 33 48 -0.26214400000000000000e6
-211 2 1 7 0.13107200000000000000e6
-211 2 2 8 -0.13107200000000000000e6
-211 2 2 16 0.65536000000000000000e5
-211 2 2 32 -0.13107200000000000000e6
-211 2 3 9 0.13107200000000000000e6
-211 2 6 20 0.26214400000000000000e6
-211 2 7 21 -0.52428800000000000000e6
-211 2 12 26 -0.26214400000000000000e6
-211 2 16 30 -0.13107200000000000000e6
-211 2 20 34 -0.26214400000000000000e6
-211 3 1 2 -0.65536000000000000000e5
-211 3 1 14 0.52428800000000000000e6
-211 3 1 30 0.13107200000000000000e6
-211 3 1 38 0.65536000000000000000e5
-211 3 2 7 0.26214400000000000000e6
-211 3 2 15 -0.26214400000000000000e6
-211 3 2 23 0.65536000000000000000e5
-211 3 3 32 -0.78643200000000000000e6
-211 3 4 9 0.13107200000000000000e6
-211 3 7 12 -0.52428800000000000000e6
-211 3 8 37 -0.13107200000000000000e6
-211 3 10 23 0.26214400000000000000e6
-211 3 13 42 -0.52428800000000000000e6
-211 3 22 35 -0.52428800000000000000e6
-211 3 28 41 -0.78643200000000000000e6
-211 3 29 42 -0.26214400000000000000e6
-211 4 2 6 0.13107200000000000000e6
-211 4 2 30 -0.13107200000000000000e6
-211 4 3 31 0.26214400000000000000e6
-211 4 6 6 0.52428800000000000000e6
-211 4 6 18 0.13107200000000000000e6
-211 4 6 34 -0.26214400000000000000e6
-212 1 1 4 0.65536000000000000000e5
-212 1 1 24 -0.65536000000000000000e5
-212 1 2 5 0.65536000000000000000e5
-212 1 2 9 -0.13107200000000000000e6
-212 1 2 25 -0.65536000000000000000e5
-212 1 8 23 0.13107200000000000000e6
-212 3 2 3 0.65536000000000000000e5
-212 4 2 2 0.13107200000000000000e6
-213 1 1 5 0.65536000000000000000e5
-213 1 1 48 -0.65536000000000000000e5
-213 3 1 38 -0.65536000000000000000e5
-213 3 2 3 -0.65536000000000000000e5
-213 3 2 23 -0.65536000000000000000e5
-214 1 1 6 0.65536000000000000000e5
-214 1 2 5 -0.65536000000000000000e5
-215 1 1 2 -0.32768000000000000000e5
-215 1 1 7 0.65536000000000000000e5
-215 1 1 8 0.13107200000000000000e6
-215 1 1 24 0.32768000000000000000e5
-215 1 1 32 0.13107200000000000000e6
-215 1 1 48 -0.32768000000000000000e5
-215 1 2 5 0.32768000000000000000e5
-215 1 2 25 -0.32768000000000000000e5
-215 1 2 33 -0.39321600000000000000e6
-215 1 2 49 -0.65536000000000000000e5
-215 1 3 34 0.52428800000000000000e6
-215 1 4 11 0.65536000000000000000e5
-215 1 7 22 -0.65536000000000000000e5
-215 1 8 39 -0.65536000000000000000e5
-215 1 9 40 -0.65536000000000000000e5
-215 1 10 41 -0.26214400000000000000e6
-215 1 11 42 0.13107200000000000000e6
-215 1 12 27 -0.26214400000000000000e6
-215 1 12 43 0.52428800000000000000e6
-215 1 23 38 -0.65536000000000000000e5
-215 1 26 41 0.65536000000000000000e5
-215 1 28 43 -0.26214400000000000000e6
-215 1 32 47 -0.39321600000000000000e6
-215 1 33 48 -0.13107200000000000000e6
-215 2 1 7 0.65536000000000000000e5
-215 2 2 8 -0.65536000000000000000e5
-215 2 2 16 0.32768000000000000000e5
-215 2 2 32 -0.65536000000000000000e5
-215 2 3 9 0.65536000000000000000e5
-215 2 6 20 0.13107200000000000000e6
-215 2 7 21 -0.26214400000000000000e6
-215 2 12 26 -0.13107200000000000000e6
-215 2 16 30 -0.65536000000000000000e5
-215 2 20 34 -0.13107200000000000000e6
-215 3 1 2 -0.32768000000000000000e5
-215 3 1 14 0.26214400000000000000e6
-215 3 1 22 0.32768000000000000000e5
-215 3 1 30 0.65536000000000000000e5
-215 3 1 38 0.32768000000000000000e5
-215 3 2 3 0.32768000000000000000e5
-215 3 2 7 0.13107200000000000000e6
-215 3 2 15 -0.13107200000000000000e6
-215 3 2 23 0.32768000000000000000e5
-215 3 3 32 -0.39321600000000000000e6
-215 3 4 9 0.65536000000000000000e5
-215 3 7 12 -0.26214400000000000000e6
-215 3 8 37 -0.65536000000000000000e5
-215 3 10 23 0.13107200000000000000e6
-215 3 13 42 -0.26214400000000000000e6
-215 3 22 35 -0.26214400000000000000e6
-215 3 28 41 -0.39321600000000000000e6
-215 3 29 42 -0.13107200000000000000e6
-215 4 1 1 -0.65536000000000000000e5
-215 4 2 2 0.65536000000000000000e5
-215 4 2 6 0.65536000000000000000e5
-215 4 2 30 -0.65536000000000000000e5
-215 4 3 31 0.13107200000000000000e6
-215 4 6 6 0.26214400000000000000e6
-215 4 6 18 0.65536000000000000000e5
-215 4 6 34 -0.13107200000000000000e6
-216 1 1 8 0.65536000000000000000e5
-216 1 1 9 0.65536000000000000000e5
-216 1 1 32 0.13107200000000000000e6
-216 1 1 48 -0.65536000000000000000e5
-216 1 2 9 0.65536000000000000000e5
-216 1 2 33 -0.39321600000000000000e6
-216 1 2 49 -0.65536000000000000000e5
-216 1 3 34 0.52428800000000000000e6
-216 1 4 11 0.65536000000000000000e5
-216 1 8 23 -0.65536000000000000000e5
-216 1 8 39 -0.65536000000000000000e5
-216 1 9 40 -0.65536000000000000000e5
-216 1 10 41 -0.26214400000000000000e6
-216 1 11 42 0.13107200000000000000e6
-216 1 12 27 -0.26214400000000000000e6
-216 1 12 43 0.52428800000000000000e6
-216 1 23 38 -0.65536000000000000000e5
-216 1 26 41 0.65536000000000000000e5
-216 1 28 43 -0.26214400000000000000e6
-216 1 32 47 -0.39321600000000000000e6
-216 1 33 48 -0.13107200000000000000e6
-216 2 1 7 0.65536000000000000000e5
-216 2 2 8 -0.65536000000000000000e5
-216 2 2 32 -0.65536000000000000000e5
-216 2 3 9 0.65536000000000000000e5
-216 2 6 20 0.13107200000000000000e6
-216 2 7 21 -0.26214400000000000000e6
-216 2 12 26 -0.13107200000000000000e6
-216 2 16 30 -0.65536000000000000000e5
-216 2 20 34 -0.13107200000000000000e6
-216 3 1 14 0.26214400000000000000e6
-216 3 1 30 0.65536000000000000000e5
-216 3 2 7 0.65536000000000000000e5
-216 3 2 15 -0.13107200000000000000e6
-216 3 3 32 -0.39321600000000000000e6
-216 3 4 9 0.65536000000000000000e5
-216 3 7 12 -0.26214400000000000000e6
-216 3 8 37 -0.65536000000000000000e5
-216 3 10 23 0.13107200000000000000e6
-216 3 13 42 -0.26214400000000000000e6
-216 3 22 35 -0.26214400000000000000e6
-216 3 28 41 -0.39321600000000000000e6
-216 3 29 42 -0.13107200000000000000e6
-216 4 2 6 0.65536000000000000000e5
-216 4 2 30 -0.65536000000000000000e5
-216 4 3 31 0.13107200000000000000e6
-216 4 6 6 0.26214400000000000000e6
-216 4 6 18 0.65536000000000000000e5
-216 4 6 34 -0.13107200000000000000e6
-217 1 1 10 0.65536000000000000000e5
-217 1 2 9 -0.65536000000000000000e5
-218 1 1 11 0.65536000000000000000e5
-218 1 1 48 0.32768000000000000000e5
-218 1 2 9 0.65536000000000000000e5
-218 1 2 33 0.13107200000000000000e6
-218 1 2 49 0.32768000000000000000e5
-218 1 3 34 -0.26214400000000000000e6
-218 1 4 11 -0.65536000000000000000e5
-218 1 8 39 0.65536000000000000000e5
-218 1 9 40 0.65536000000000000000e5
-218 1 10 41 0.13107200000000000000e6
-218 1 12 43 -0.26214400000000000000e6
-218 1 23 38 0.32768000000000000000e5
-218 1 26 41 -0.65536000000000000000e5
-218 1 28 43 0.13107200000000000000e6
-218 1 32 47 0.26214400000000000000e6
-218 2 2 8 0.65536000000000000000e5
-218 2 2 32 0.32768000000000000000e5
-218 2 3 9 -0.65536000000000000000e5
-218 2 7 21 0.13107200000000000000e6
-218 2 16 30 0.65536000000000000000e5
-218 2 20 34 0.13107200000000000000e6
-218 3 1 14 -0.13107200000000000000e6
-218 3 2 15 0.13107200000000000000e6
-218 3 3 32 0.26214400000000000000e6
-218 3 4 9 -0.65536000000000000000e5
-218 3 10 23 -0.65536000000000000000e5
-218 3 22 35 0.26214400000000000000e6
-218 3 28 41 0.26214400000000000000e6
-218 4 2 30 0.65536000000000000000e5
-218 4 6 34 0.13107200000000000000e6
-219 1 1 13 0.65536000000000000000e5
-219 1 1 32 0.65536000000000000000e5
-219 1 1 48 -0.32768000000000000000e5
-219 1 2 33 -0.19660800000000000000e6
-219 1 2 49 -0.32768000000000000000e5
-219 1 3 34 0.26214400000000000000e6
-219 1 4 11 0.32768000000000000000e5
-219 1 8 23 -0.32768000000000000000e5
-219 1 8 39 -0.32768000000000000000e5
-219 1 9 40 -0.32768000000000000000e5
-219 1 10 41 -0.13107200000000000000e6
-219 1 11 42 0.65536000000000000000e5
-219 1 12 27 -0.13107200000000000000e6
-219 1 12 43 0.26214400000000000000e6
-219 1 23 38 -0.32768000000000000000e5
-219 1 26 41 0.32768000000000000000e5
-219 1 28 43 -0.13107200000000000000e6
-219 1 32 47 -0.19660800000000000000e6
-219 1 33 48 -0.65536000000000000000e5
-219 2 2 8 -0.32768000000000000000e5
-219 2 2 32 -0.32768000000000000000e5
-219 2 3 9 0.32768000000000000000e5
-219 2 6 20 0.65536000000000000000e5
-219 2 7 21 -0.13107200000000000000e6
-219 2 12 26 -0.65536000000000000000e5
-219 2 16 30 -0.32768000000000000000e5
-219 2 20 34 -0.65536000000000000000e5
-219 3 1 14 0.13107200000000000000e6
-219 3 1 30 0.32768000000000000000e5
-219 3 2 7 0.32768000000000000000e5
-219 3 2 15 -0.65536000000000000000e5
-219 3 3 32 -0.19660800000000000000e6
-219 3 4 9 0.32768000000000000000e5
-219 3 7 12 -0.13107200000000000000e6
-219 3 8 37 -0.32768000000000000000e5
-219 3 10 23 0.65536000000000000000e5
-219 3 13 42 -0.13107200000000000000e6
-219 3 22 35 -0.13107200000000000000e6
-219 3 28 41 -0.19660800000000000000e6
-219 3 29 42 -0.65536000000000000000e5
-219 4 2 6 0.32768000000000000000e5
-219 4 2 30 -0.32768000000000000000e5
-219 4 3 31 0.65536000000000000000e5
-219 4 6 6 0.13107200000000000000e6
-219 4 6 18 0.32768000000000000000e5
-219 4 6 34 -0.65536000000000000000e5
-220 1 1 14 0.65536000000000000000e5
-220 1 1 32 -0.65536000000000000000e5
-220 1 1 48 0.32768000000000000000e5
-220 1 2 33 0.13107200000000000000e6
-220 1 2 49 0.32768000000000000000e5
-220 1 3 34 -0.13107200000000000000e6
-220 1 4 11 -0.32768000000000000000e5
-220 1 8 23 0.32768000000000000000e5
-220 1 8 39 0.32768000000000000000e5
-220 1 9 40 0.32768000000000000000e5
-220 1 10 41 0.65536000000000000000e5
-220 1 11 42 -0.65536000000000000000e5
-220 1 12 43 -0.26214400000000000000e6
-220 1 23 38 0.32768000000000000000e5
-220 1 26 41 -0.32768000000000000000e5
-220 1 28 43 0.13107200000000000000e6
-220 1 32 47 0.19660800000000000000e6
-220 1 33 48 0.65536000000000000000e5
-220 2 2 8 0.32768000000000000000e5
-220 2 2 32 0.32768000000000000000e5
-220 2 3 9 -0.32768000000000000000e5
-220 2 7 21 0.65536000000000000000e5
-220 2 12 26 0.65536000000000000000e5
-220 2 16 30 0.32768000000000000000e5
-220 2 20 34 0.65536000000000000000e5
-220 3 1 14 -0.65536000000000000000e5
-220 3 1 30 -0.32768000000000000000e5
-220 3 2 7 -0.32768000000000000000e5
-220 3 2 15 0.65536000000000000000e5
-220 3 3 32 0.13107200000000000000e6
-220 3 4 9 -0.32768000000000000000e5
-220 3 8 37 0.32768000000000000000e5
-220 3 10 23 -0.65536000000000000000e5
-220 3 13 42 0.13107200000000000000e6
-220 3 22 35 0.13107200000000000000e6
-220 3 28 41 0.19660800000000000000e6
-220 3 29 42 0.65536000000000000000e5
-220 4 2 6 -0.32768000000000000000e5
-220 4 2 30 0.32768000000000000000e5
-220 4 3 31 -0.65536000000000000000e5
-220 4 6 18 -0.32768000000000000000e5
-220 4 6 34 0.65536000000000000000e5
-221 1 1 15 0.65536000000000000000e5
-221 1 2 33 0.65536000000000000000e5
-221 1 3 34 -0.13107200000000000000e6
-221 1 10 41 0.65536000000000000000e5
-221 2 7 21 0.65536000000000000000e5
-221 3 1 14 -0.65536000000000000000e5
-221 3 3 32 0.65536000000000000000e5
-222 1 1 17 0.65536000000000000000e5
-222 1 12 27 -0.65536000000000000000e5
-222 3 7 12 -0.65536000000000000000e5
-223 1 1 18 0.65536000000000000000e5
-223 1 2 17 -0.65536000000000000000e5
-224 1 1 19 0.65536000000000000000e5
-224 1 7 16 -0.65536000000000000000e5
-225 1 1 20 0.65536000000000000000e5
-225 1 2 17 -0.32768000000000000000e5
-225 1 4 35 -0.32768000000000000000e5
-225 1 12 43 -0.32768000000000000000e5
-225 1 14 45 -0.65536000000000000000e5
-225 1 16 23 0.32768000000000000000e5
-225 1 16 31 -0.13107200000000000000e6
-225 1 17 48 0.32768000000000000000e5
-225 1 18 49 0.32768000000000000000e5
-225 1 20 27 0.13107200000000000000e6
-225 2 7 13 0.65536000000000000000e5
-225 2 9 23 -0.32768000000000000000e5
-225 2 10 24 -0.65536000000000000000e5
-225 2 14 28 0.32768000000000000000e5
-225 3 3 16 -0.32768000000000000000e5
-225 3 5 34 -0.32768000000000000000e5
-225 3 7 12 -0.32768000000000000000e5
-225 3 13 42 0.32768000000000000000e5
-225 3 14 27 -0.32768000000000000000e5
-225 3 14 43 0.32768000000000000000e5
-225 4 1 13 -0.32768000000000000000e5
-225 4 10 10 -0.13107200000000000000e6
-226 1 1 21 0.65536000000000000000e5
-226 1 2 17 -0.32768000000000000000e5
-226 1 3 18 -0.16384000000000000000e5
-226 1 3 34 -0.16384000000000000000e5
-226 1 4 35 -0.16384000000000000000e5
-226 1 7 16 -0.32768000000000000000e5
-226 1 12 43 -0.16384000000000000000e5
-226 1 14 45 -0.32768000000000000000e5
-226 1 16 23 0.16384000000000000000e5
-226 1 16 31 -0.65536000000000000000e5
-226 1 17 48 0.16384000000000000000e5
-226 1 18 49 0.16384000000000000000e5
-226 1 20 27 0.65536000000000000000e5
-226 2 1 15 -0.32768000000000000000e5
-226 2 6 12 -0.16384000000000000000e5
-226 2 7 13 0.32768000000000000000e5
-226 2 9 23 -0.16384000000000000000e5
-226 2 10 24 -0.32768000000000000000e5
-226 2 14 28 0.16384000000000000000e5
-226 3 3 16 -0.32768000000000000000e5
-226 3 5 34 -0.16384000000000000000e5
-226 3 7 12 -0.16384000000000000000e5
-226 3 13 42 0.16384000000000000000e5
-226 3 14 27 -0.16384000000000000000e5
-226 3 14 43 0.16384000000000000000e5
-226 4 1 13 -0.16384000000000000000e5
-226 4 10 10 -0.65536000000000000000e5
-227 1 1 2 -0.65536000000000000000e5
-227 1 1 8 0.13107200000000000000e6
-227 1 1 22 0.65536000000000000000e5
-227 1 2 5 0.65536000000000000000e5
-227 1 2 9 -0.13107200000000000000e6
-227 1 2 25 -0.65536000000000000000e5
-227 1 7 22 -0.13107200000000000000e6
-227 1 8 23 0.13107200000000000000e6
-227 3 1 2 -0.65536000000000000000e5
-227 3 2 3 0.65536000000000000000e5
-227 4 1 1 -0.13107200000000000000e6
-227 4 2 2 0.13107200000000000000e6
-228 1 1 8 0.13107200000000000000e6
-228 1 1 23 0.65536000000000000000e5
-228 1 1 24 0.65536000000000000000e5
-228 1 1 32 0.26214400000000000000e6
-228 1 1 48 -0.65536000000000000000e5
-228 1 2 9 0.13107200000000000000e6
-228 1 2 33 -0.78643200000000000000e6
-228 1 2 49 -0.13107200000000000000e6
-228 1 3 34 0.10485760000000000000e7
-228 1 4 11 0.13107200000000000000e6
-228 1 8 23 -0.13107200000000000000e6
-228 1 8 39 -0.13107200000000000000e6
-228 1 9 40 -0.13107200000000000000e6
-228 1 10 41 -0.52428800000000000000e6
-228 1 11 42 0.26214400000000000000e6
-228 1 12 27 -0.52428800000000000000e6
-228 1 12 43 0.10485760000000000000e7
-228 1 23 38 -0.13107200000000000000e6
-228 1 26 41 0.13107200000000000000e6
-228 1 28 43 -0.52428800000000000000e6
-228 1 32 47 -0.78643200000000000000e6
-228 1 33 48 -0.26214400000000000000e6
-228 2 1 7 0.13107200000000000000e6
-228 2 2 8 -0.13107200000000000000e6
-228 2 2 16 0.65536000000000000000e5
-228 2 2 32 -0.13107200000000000000e6
-228 2 3 9 0.13107200000000000000e6
-228 2 6 20 0.26214400000000000000e6
-228 2 7 21 -0.52428800000000000000e6
-228 2 12 26 -0.26214400000000000000e6
-228 2 16 30 -0.13107200000000000000e6
-228 2 20 34 -0.26214400000000000000e6
-228 3 1 14 0.52428800000000000000e6
-228 3 1 30 0.13107200000000000000e6
-228 3 1 38 0.65536000000000000000e5
-228 3 2 7 0.26214400000000000000e6
-228 3 2 15 -0.26214400000000000000e6
-228 3 2 23 0.65536000000000000000e5
-228 3 3 32 -0.78643200000000000000e6
-228 3 4 9 0.13107200000000000000e6
-228 3 7 12 -0.52428800000000000000e6
-228 3 8 37 -0.13107200000000000000e6
-228 3 10 23 0.26214400000000000000e6
-228 3 13 42 -0.52428800000000000000e6
-228 3 22 35 -0.52428800000000000000e6
-228 3 28 41 -0.78643200000000000000e6
-228 3 29 42 -0.26214400000000000000e6
-228 4 2 6 0.13107200000000000000e6
-228 4 2 30 -0.13107200000000000000e6
-228 4 3 31 0.26214400000000000000e6
-228 4 6 6 0.52428800000000000000e6
-228 4 6 18 0.13107200000000000000e6
-228 4 6 34 -0.26214400000000000000e6
-229 1 1 25 0.65536000000000000000e5
-229 1 1 48 -0.65536000000000000000e5
-229 3 1 38 -0.65536000000000000000e5
-229 3 2 23 -0.65536000000000000000e5
-230 1 1 26 0.65536000000000000000e5
-230 1 2 25 -0.65536000000000000000e5
-231 1 1 27 0.65536000000000000000e5
-231 1 7 22 -0.65536000000000000000e5
-232 1 1 8 0.65536000000000000000e5
-232 1 1 28 0.65536000000000000000e5
-232 1 1 32 0.13107200000000000000e6
-232 1 1 48 -0.65536000000000000000e5
-232 1 2 9 0.65536000000000000000e5
-232 1 2 33 -0.39321600000000000000e6
-232 1 2 49 -0.65536000000000000000e5
-232 1 3 34 0.52428800000000000000e6
-232 1 4 11 0.65536000000000000000e5
-232 1 8 23 -0.65536000000000000000e5
-232 1 8 39 -0.65536000000000000000e5
-232 1 9 40 -0.65536000000000000000e5
-232 1 10 41 -0.26214400000000000000e6
-232 1 11 42 0.13107200000000000000e6
-232 1 12 27 -0.26214400000000000000e6
-232 1 12 43 0.52428800000000000000e6
-232 1 23 38 -0.65536000000000000000e5
-232 1 26 41 0.65536000000000000000e5
-232 1 28 43 -0.26214400000000000000e6
-232 1 32 47 -0.39321600000000000000e6
-232 1 33 48 -0.13107200000000000000e6
-232 2 1 7 0.65536000000000000000e5
-232 2 2 8 -0.65536000000000000000e5
-232 2 2 32 -0.65536000000000000000e5
-232 2 3 9 0.65536000000000000000e5
-232 2 6 20 0.13107200000000000000e6
-232 2 7 21 -0.26214400000000000000e6
-232 2 12 26 -0.13107200000000000000e6
-232 2 16 30 -0.65536000000000000000e5
-232 2 20 34 -0.13107200000000000000e6
-232 3 1 14 0.26214400000000000000e6
-232 3 1 30 0.65536000000000000000e5
-232 3 2 7 0.13107200000000000000e6
-232 3 2 15 -0.13107200000000000000e6
-232 3 3 32 -0.39321600000000000000e6
-232 3 4 9 0.65536000000000000000e5
-232 3 7 12 -0.26214400000000000000e6
-232 3 8 37 -0.65536000000000000000e5
-232 3 10 23 0.13107200000000000000e6
-232 3 13 42 -0.26214400000000000000e6
-232 3 22 35 -0.26214400000000000000e6
-232 3 28 41 -0.39321600000000000000e6
-232 3 29 42 -0.13107200000000000000e6
-232 4 2 6 0.65536000000000000000e5
-232 4 2 30 -0.65536000000000000000e5
-232 4 3 31 0.13107200000000000000e6
-232 4 6 6 0.26214400000000000000e6
-232 4 6 18 0.65536000000000000000e5
-232 4 6 34 -0.13107200000000000000e6
-233 1 1 29 0.65536000000000000000e5
-233 1 8 23 -0.65536000000000000000e5
-234 1 1 30 0.65536000000000000000e5
-234 1 1 48 -0.32768000000000000000e5
-234 1 2 33 -0.13107200000000000000e6
-234 1 2 49 -0.32768000000000000000e5
-234 1 11 42 0.13107200000000000000e6
-234 1 12 43 0.26214400000000000000e6
-234 1 23 38 -0.32768000000000000000e5
-234 1 28 43 -0.13107200000000000000e6
-234 1 32 47 -0.13107200000000000000e6
-234 1 33 48 -0.13107200000000000000e6
-234 2 2 32 -0.32768000000000000000e5
-234 2 12 26 -0.13107200000000000000e6
-234 3 1 30 0.65536000000000000000e5
-234 3 8 37 -0.65536000000000000000e5
-234 3 10 23 0.65536000000000000000e5
-234 3 13 42 -0.26214400000000000000e6
-234 3 28 41 -0.13107200000000000000e6
-234 3 29 42 -0.13107200000000000000e6
-234 4 3 31 0.13107200000000000000e6
-234 4 6 18 0.65536000000000000000e5
-235 1 1 31 0.65536000000000000000e5
-235 1 1 32 0.65536000000000000000e5
-235 1 2 33 -0.65536000000000000000e5
-235 1 3 34 0.13107200000000000000e6
-235 1 10 41 -0.65536000000000000000e5
-235 1 12 27 -0.13107200000000000000e6
-235 2 6 20 0.65536000000000000000e5
-235 2 7 21 -0.65536000000000000000e5
-235 3 3 32 -0.65536000000000000000e5
-236 1 1 33 0.65536000000000000000e5
-236 1 2 33 0.65536000000000000000e5
-236 1 3 34 -0.13107200000000000000e6
-236 1 10 41 0.65536000000000000000e5
-236 2 7 21 0.65536000000000000000e5
-236 3 3 32 0.65536000000000000000e5
-237 1 1 34 0.65536000000000000000e5
-237 1 12 27 -0.65536000000000000000e5
-238 1 1 35 0.65536000000000000000e5
-238 1 16 23 -0.65536000000000000000e5
-239 1 1 36 0.65536000000000000000e5
-239 1 4 35 -0.32768000000000000000e5
-239 1 12 43 -0.32768000000000000000e5
-239 1 14 45 -0.65536000000000000000e5
-239 1 16 31 -0.13107200000000000000e6
-239 1 17 48 0.32768000000000000000e5
-239 1 18 49 0.32768000000000000000e5
-239 1 20 27 0.13107200000000000000e6
-239 2 7 13 0.65536000000000000000e5
-239 2 9 23 -0.32768000000000000000e5
-239 2 10 24 -0.65536000000000000000e5
-239 2 14 28 0.32768000000000000000e5
-239 3 5 34 -0.32768000000000000000e5
-239 3 13 42 0.32768000000000000000e5
-239 3 14 27 -0.32768000000000000000e5
-239 3 14 43 0.32768000000000000000e5
-239 4 10 10 -0.13107200000000000000e6
-240 1 1 8 0.13107200000000000000e6
-240 1 1 24 0.65536000000000000000e5
-240 1 1 32 0.26214400000000000000e6
-240 1 1 37 0.65536000000000000000e5
-240 1 1 48 -0.65536000000000000000e5
-240 1 2 9 0.13107200000000000000e6
-240 1 2 33 -0.78643200000000000000e6
-240 1 2 49 -0.13107200000000000000e6
-240 1 3 34 0.10485760000000000000e7
-240 1 4 11 0.13107200000000000000e6
-240 1 8 23 -0.13107200000000000000e6
-240 1 8 39 -0.13107200000000000000e6
-240 1 9 40 -0.13107200000000000000e6
-240 1 10 41 -0.52428800000000000000e6
-240 1 11 42 0.26214400000000000000e6
-240 1 12 27 -0.52428800000000000000e6
-240 1 12 43 0.10485760000000000000e7
-240 1 23 38 -0.13107200000000000000e6
-240 1 26 41 0.13107200000000000000e6
-240 1 28 43 -0.52428800000000000000e6
-240 1 32 47 -0.78643200000000000000e6
-240 1 33 48 -0.26214400000000000000e6
-240 2 1 7 0.13107200000000000000e6
-240 2 2 8 -0.13107200000000000000e6
-240 2 2 16 0.65536000000000000000e5
-240 2 2 32 -0.13107200000000000000e6
-240 2 3 9 0.13107200000000000000e6
-240 2 6 20 0.26214400000000000000e6
-240 2 7 21 -0.52428800000000000000e6
-240 2 12 26 -0.26214400000000000000e6
-240 2 16 30 -0.13107200000000000000e6
-240 2 20 34 -0.26214400000000000000e6
-240 3 1 14 0.52428800000000000000e6
-240 3 1 22 0.65536000000000000000e5
-240 3 1 30 0.13107200000000000000e6
-240 3 1 38 0.65536000000000000000e5
-240 3 2 7 0.26214400000000000000e6
-240 3 2 15 -0.26214400000000000000e6
-240 3 2 23 0.65536000000000000000e5
-240 3 3 32 -0.78643200000000000000e6
-240 3 4 9 0.13107200000000000000e6
-240 3 7 12 -0.52428800000000000000e6
-240 3 8 37 -0.13107200000000000000e6
-240 3 10 23 0.26214400000000000000e6
-240 3 13 42 -0.52428800000000000000e6
-240 3 22 35 -0.52428800000000000000e6
-240 3 28 41 -0.78643200000000000000e6
-240 3 29 42 -0.26214400000000000000e6
-240 4 2 6 0.13107200000000000000e6
-240 4 2 30 -0.13107200000000000000e6
-240 4 3 31 0.26214400000000000000e6
-240 4 6 6 0.52428800000000000000e6
-240 4 6 18 0.13107200000000000000e6
-240 4 6 34 -0.26214400000000000000e6
-241 1 1 38 0.65536000000000000000e5
-241 1 1 40 0.65536000000000000000e5
-241 1 22 37 -0.65536000000000000000e5
-241 1 23 38 -0.65536000000000000000e5
-241 3 1 38 0.65536000000000000000e5
-241 3 22 27 -0.13107200000000000000e6
-241 4 16 16 0.13107200000000000000e6
-242 1 1 39 0.65536000000000000000e5
-242 1 1 48 -0.65536000000000000000e5
-242 3 1 38 -0.65536000000000000000e5
-243 1 1 8 0.65536000000000000000e5
-243 1 1 24 0.32768000000000000000e5
-243 1 1 32 0.13107200000000000000e6
-243 1 1 40 0.32768000000000000000e5
-243 1 1 41 0.65536000000000000000e5
-243 1 1 48 -0.65536000000000000000e5
-243 1 2 9 0.65536000000000000000e5
-243 1 2 33 -0.39321600000000000000e6
-243 1 2 49 -0.65536000000000000000e5
-243 1 3 34 0.52428800000000000000e6
-243 1 4 11 0.65536000000000000000e5
-243 1 8 23 -0.65536000000000000000e5
-243 1 8 39 -0.65536000000000000000e5
-243 1 9 40 -0.65536000000000000000e5
-243 1 10 41 -0.26214400000000000000e6
-243 1 11 42 0.13107200000000000000e6
-243 1 12 27 -0.26214400000000000000e6
-243 1 12 43 0.52428800000000000000e6
-243 1 22 37 -0.32768000000000000000e5
-243 1 23 38 -0.98304000000000000000e5
-243 1 26 41 0.65536000000000000000e5
-243 1 28 43 -0.26214400000000000000e6
-243 1 32 47 -0.39321600000000000000e6
-243 1 33 48 -0.13107200000000000000e6
-243 2 1 7 0.65536000000000000000e5
-243 2 2 8 -0.65536000000000000000e5
-243 2 2 16 0.32768000000000000000e5
-243 2 2 32 -0.65536000000000000000e5
-243 2 3 9 0.65536000000000000000e5
-243 2 6 20 0.13107200000000000000e6
-243 2 7 21 -0.26214400000000000000e6
-243 2 12 26 -0.13107200000000000000e6
-243 2 16 16 -0.65536000000000000000e5
-243 2 16 30 -0.65536000000000000000e5
-243 2 20 34 -0.13107200000000000000e6
-243 3 1 14 0.26214400000000000000e6
-243 3 1 22 0.32768000000000000000e5
-243 3 1 30 0.65536000000000000000e5
-243 3 1 38 0.32768000000000000000e5
-243 3 2 7 0.13107200000000000000e6
-243 3 2 15 -0.13107200000000000000e6
-243 3 2 23 0.32768000000000000000e5
-243 3 3 32 -0.39321600000000000000e6
-243 3 4 9 0.65536000000000000000e5
-243 3 7 12 -0.26214400000000000000e6
-243 3 8 37 -0.65536000000000000000e5
-243 3 10 23 0.13107200000000000000e6
-243 3 13 42 -0.26214400000000000000e6
-243 3 22 27 -0.65536000000000000000e5
-243 3 22 35 -0.26214400000000000000e6
-243 3 28 41 -0.39321600000000000000e6
-243 3 29 42 -0.13107200000000000000e6
-243 4 2 6 0.65536000000000000000e5
-243 4 2 30 -0.65536000000000000000e5
-243 4 3 31 0.13107200000000000000e6
-243 4 6 6 0.26214400000000000000e6
-243 4 6 18 0.65536000000000000000e5
-243 4 6 34 -0.13107200000000000000e6
-243 4 16 16 0.65536000000000000000e5
-244 1 1 42 0.65536000000000000000e5
-244 1 7 38 -0.65536000000000000000e5
-245 1 1 43 0.65536000000000000000e5
-245 1 1 48 -0.32768000000000000000e5
-245 1 2 49 -0.32768000000000000000e5
-245 1 23 38 -0.32768000000000000000e5
-245 2 2 32 -0.32768000000000000000e5
-245 3 8 37 -0.65536000000000000000e5
-246 1 1 44 0.65536000000000000000e5
-246 1 2 33 -0.65536000000000000000e5
-246 1 3 34 0.13107200000000000000e6
-246 1 10 41 -0.65536000000000000000e5
-246 1 11 42 0.65536000000000000000e5
-246 1 12 43 0.13107200000000000000e6
-246 1 16 23 -0.13107200000000000000e6
-246 1 28 43 -0.65536000000000000000e5
-246 1 32 47 -0.65536000000000000000e5
-246 1 33 48 -0.65536000000000000000e5
-246 2 1 31 0.65536000000000000000e5
-246 2 7 21 -0.65536000000000000000e5
-246 2 12 26 -0.65536000000000000000e5
-246 3 1 34 0.13107200000000000000e6
-246 3 2 31 -0.65536000000000000000e5
-246 3 3 32 -0.65536000000000000000e5
-246 3 13 42 -0.13107200000000000000e6
-246 3 28 41 -0.65536000000000000000e5
-246 3 29 42 -0.65536000000000000000e5
-246 4 3 31 0.65536000000000000000e5
-247 1 1 45 0.65536000000000000000e5
-247 1 2 33 0.65536000000000000000e5
-247 1 3 34 -0.13107200000000000000e6
-247 1 10 41 0.65536000000000000000e5
-247 2 7 21 0.65536000000000000000e5
-247 3 2 31 0.65536000000000000000e5
-247 3 3 32 0.65536000000000000000e5
-248 1 1 46 0.65536000000000000000e5
-248 1 16 23 -0.65536000000000000000e5
-248 3 1 34 0.65536000000000000000e5
-249 1 1 47 0.65536000000000000000e5
-249 1 22 37 -0.65536000000000000000e5
-250 1 1 49 0.65536000000000000000e5
-250 1 23 38 -0.65536000000000000000e5
-251 1 1 50 0.65536000000000000000e5
-251 1 7 38 -0.65536000000000000000e5
-251 3 22 27 0.65536000000000000000e5
-252 1 1 48 -0.32768000000000000000e5
-252 1 1 51 0.65536000000000000000e5
-252 1 2 49 -0.32768000000000000000e5
-252 1 23 38 -0.32768000000000000000e5
-252 2 2 32 -0.32768000000000000000e5
-253 1 1 52 0.65536000000000000000e5
-253 1 2 33 0.65536000000000000000e5
-253 1 3 34 -0.13107200000000000000e6
-253 1 9 40 -0.32768000000000000000e5
-253 1 10 41 0.13107200000000000000e6
-253 1 26 41 0.32768000000000000000e5
-253 1 32 47 -0.65536000000000000000e5
-253 2 7 21 0.65536000000000000000e5
-253 3 2 31 0.65536000000000000000e5
-253 3 3 32 0.65536000000000000000e5
-253 3 8 37 0.32768000000000000000e5
-253 3 9 38 -0.32768000000000000000e5
-253 3 22 27 0.32768000000000000000e5
-253 3 28 41 -0.65536000000000000000e5
-253 4 1 29 0.32768000000000000000e5
-253 4 2 30 -0.32768000000000000000e5
-254 1 1 48 -0.65536000000000000000e5
-254 1 1 53 0.65536000000000000000e5
-254 1 6 53 -0.65536000000000000000e5
-254 1 25 40 0.65536000000000000000e5
-254 2 1 35 0.65536000000000000000e5
-254 2 2 32 -0.65536000000000000000e5
-254 2 4 34 -0.13107200000000000000e6
-254 2 16 30 -0.13107200000000000000e6
-254 2 16 34 0.13107200000000000000e6
-254 2 21 35 0.13107200000000000000e6
-254 3 2 47 -0.65536000000000000000e5
-254 3 5 50 -0.13107200000000000000e6
-254 3 7 52 0.52428800000000000000e6
-254 3 24 37 -0.13107200000000000000e6
-254 3 27 40 -0.13107200000000000000e6
-254 3 28 41 -0.52428800000000000000e6
-254 4 4 32 0.65536000000000000000e5
-254 4 6 34 -0.26214400000000000000e6
-254 4 7 35 0.13107200000000000000e6
-254 4 16 28 -0.65536000000000000000e5
-254 4 17 29 0.13107200000000000000e6
-255 1 1 54 0.65536000000000000000e5
-255 1 23 38 -0.65536000000000000000e5
-255 3 2 47 0.65536000000000000000e5
-256 1 1 48 -0.32768000000000000000e5
-256 1 1 55 0.65536000000000000000e5
-256 1 2 49 -0.32768000000000000000e5
-256 1 6 53 -0.32768000000000000000e5
-256 1 23 38 -0.32768000000000000000e5
-256 1 25 40 0.32768000000000000000e5
-256 2 2 32 -0.32768000000000000000e5
-256 2 4 34 -0.65536000000000000000e5
-256 2 16 30 -0.65536000000000000000e5
-256 2 16 34 0.65536000000000000000e5
-256 2 21 35 0.65536000000000000000e5
-256 3 5 50 -0.65536000000000000000e5
-256 3 7 52 0.26214400000000000000e6
-256 3 24 37 -0.32768000000000000000e5
-256 3 27 40 -0.65536000000000000000e5
-256 3 28 41 -0.26214400000000000000e6
-256 4 4 32 0.32768000000000000000e5
-256 4 6 34 -0.13107200000000000000e6
-256 4 7 35 0.65536000000000000000e5
-256 4 16 28 -0.32768000000000000000e5
-256 4 17 29 0.65536000000000000000e5
-257 1 1 56 0.65536000000000000000e5
-257 1 22 53 -0.65536000000000000000e5
-258 1 1 8 0.65536000000000000000e5
-258 1 1 24 0.32768000000000000000e5
-258 1 1 32 0.13107200000000000000e6
-258 1 1 48 -0.32768000000000000000e5
-258 1 2 2 0.65536000000000000000e5
-258 1 2 9 0.65536000000000000000e5
-258 1 2 33 -0.39321600000000000000e6
-258 1 2 49 -0.65536000000000000000e5
-258 1 3 34 0.52428800000000000000e6
-258 1 4 11 0.65536000000000000000e5
-258 1 8 23 -0.65536000000000000000e5
-258 1 8 39 -0.65536000000000000000e5
-258 1 9 40 -0.65536000000000000000e5
-258 1 10 41 -0.26214400000000000000e6
-258 1 11 42 0.13107200000000000000e6
-258 1 12 27 -0.26214400000000000000e6
-258 1 12 43 0.52428800000000000000e6
-258 1 23 38 -0.65536000000000000000e5
-258 1 26 41 0.65536000000000000000e5
-258 1 28 43 -0.26214400000000000000e6
-258 1 32 47 -0.39321600000000000000e6
-258 1 33 48 -0.13107200000000000000e6
-258 2 1 7 0.65536000000000000000e5
-258 2 2 8 -0.65536000000000000000e5
-258 2 2 16 0.32768000000000000000e5
-258 2 2 32 -0.65536000000000000000e5
-258 2 3 9 0.65536000000000000000e5
-258 2 6 20 0.13107200000000000000e6
-258 2 7 21 -0.26214400000000000000e6
-258 2 12 26 -0.13107200000000000000e6
-258 2 16 30 -0.65536000000000000000e5
-258 2 20 34 -0.13107200000000000000e6
-258 3 1 2 -0.32768000000000000000e5
-258 3 1 14 0.26214400000000000000e6
-258 3 1 30 0.65536000000000000000e5
-258 3 1 38 0.32768000000000000000e5
-258 3 2 7 0.13107200000000000000e6
-258 3 2 15 -0.13107200000000000000e6
-258 3 2 23 0.32768000000000000000e5
-258 3 3 32 -0.39321600000000000000e6
-258 3 4 9 0.65536000000000000000e5
-258 3 7 12 -0.26214400000000000000e6
-258 3 8 37 -0.65536000000000000000e5
-258 3 10 23 0.13107200000000000000e6
-258 3 13 42 -0.26214400000000000000e6
-258 3 22 35 -0.26214400000000000000e6
-258 3 28 41 -0.39321600000000000000e6
-258 3 29 42 -0.13107200000000000000e6
-258 4 2 6 0.65536000000000000000e5
-258 4 2 30 -0.65536000000000000000e5
-258 4 3 31 0.13107200000000000000e6
-258 4 6 6 0.26214400000000000000e6
-258 4 6 18 0.65536000000000000000e5
-258 4 6 34 -0.13107200000000000000e6
-259 1 1 24 -0.65536000000000000000e5
-259 1 2 3 0.65536000000000000000e5
-259 1 2 5 0.65536000000000000000e5
-259 1 2 9 -0.13107200000000000000e6
-259 1 2 25 -0.65536000000000000000e5
-259 1 8 23 0.13107200000000000000e6
-259 3 2 3 0.65536000000000000000e5
-259 4 2 2 0.13107200000000000000e6
-260 1 1 48 -0.65536000000000000000e5
-260 1 2 4 0.65536000000000000000e5
-260 3 1 38 -0.65536000000000000000e5
-260 3 2 3 -0.65536000000000000000e5
-260 3 2 23 -0.65536000000000000000e5
-261 1 2 6 0.65536000000000000000e5
-261 1 2 25 0.65536000000000000000e5
-261 1 2 33 -0.26214400000000000000e6
-261 1 2 49 -0.65536000000000000000e5
-261 1 11 42 0.26214400000000000000e6
-261 1 12 43 0.52428800000000000000e6
-261 1 23 38 -0.65536000000000000000e5
-261 1 28 43 -0.26214400000000000000e6
-261 1 32 47 -0.26214400000000000000e6
-261 1 33 48 -0.26214400000000000000e6
-261 2 2 32 -0.65536000000000000000e5
-261 2 3 17 0.65536000000000000000e5
-261 2 12 26 -0.26214400000000000000e6
-261 3 1 6 -0.65536000000000000000e5
-261 3 1 30 0.13107200000000000000e6
-261 3 1 38 0.65536000000000000000e5
-261 3 2 23 0.65536000000000000000e5
-261 3 8 37 -0.13107200000000000000e6
-261 3 10 23 0.13107200000000000000e6
-261 3 13 42 -0.52428800000000000000e6
-261 3 28 41 -0.26214400000000000000e6
-261 3 29 42 -0.26214400000000000000e6
-261 4 3 31 0.26214400000000000000e6
-261 4 6 18 0.13107200000000000000e6
-262 1 1 8 -0.65536000000000000000e5
-262 1 2 7 0.65536000000000000000e5
-263 1 1 8 0.65536000000000000000e5
-263 1 1 32 0.13107200000000000000e6
-263 1 1 48 -0.65536000000000000000e5
-263 1 2 8 0.65536000000000000000e5
-263 1 2 9 0.65536000000000000000e5
-263 1 2 33 -0.39321600000000000000e6
-263 1 2 49 -0.65536000000000000000e5
-263 1 3 34 0.52428800000000000000e6
-263 1 4 11 0.65536000000000000000e5
-263 1 8 23 -0.65536000000000000000e5
-263 1 8 39 -0.65536000000000000000e5
-263 1 9 40 -0.65536000000000000000e5
-263 1 10 41 -0.26214400000000000000e6
-263 1 11 42 0.13107200000000000000e6
-263 1 12 27 -0.26214400000000000000e6
-263 1 12 43 0.52428800000000000000e6
-263 1 23 38 -0.65536000000000000000e5
-263 1 26 41 0.65536000000000000000e5
-263 1 28 43 -0.26214400000000000000e6
-263 1 32 47 -0.39321600000000000000e6
-263 1 33 48 -0.13107200000000000000e6
-263 2 1 7 0.65536000000000000000e5
-263 2 2 8 -0.65536000000000000000e5
-263 2 2 32 -0.65536000000000000000e5
-263 2 3 9 0.65536000000000000000e5
-263 2 6 20 0.13107200000000000000e6
-263 2 7 21 -0.26214400000000000000e6
-263 2 12 26 -0.13107200000000000000e6
-263 2 16 30 -0.65536000000000000000e5
-263 2 20 34 -0.13107200000000000000e6
-263 3 1 14 0.26214400000000000000e6
-263 3 1 30 0.65536000000000000000e5
-263 3 2 7 0.65536000000000000000e5
-263 3 2 15 -0.13107200000000000000e6
-263 3 3 32 -0.39321600000000000000e6
-263 3 4 9 0.65536000000000000000e5
-263 3 7 12 -0.26214400000000000000e6
-263 3 8 37 -0.65536000000000000000e5
-263 3 10 23 0.13107200000000000000e6
-263 3 13 42 -0.26214400000000000000e6
-263 3 22 35 -0.26214400000000000000e6
-263 3 28 41 -0.39321600000000000000e6
-263 3 29 42 -0.13107200000000000000e6
-263 4 2 6 0.65536000000000000000e5
-263 4 2 30 -0.65536000000000000000e5
-263 4 3 31 0.13107200000000000000e6
-263 4 6 6 0.26214400000000000000e6
-263 4 6 18 0.65536000000000000000e5
-263 4 6 34 -0.13107200000000000000e6
-264 1 1 48 0.32768000000000000000e5
-264 1 2 9 0.65536000000000000000e5
-264 1 2 10 0.65536000000000000000e5
-264 1 2 33 0.13107200000000000000e6
-264 1 2 49 0.32768000000000000000e5
-264 1 3 34 -0.26214400000000000000e6
-264 1 4 11 -0.65536000000000000000e5
-264 1 8 39 0.65536000000000000000e5
-264 1 9 40 0.65536000000000000000e5
-264 1 10 41 0.13107200000000000000e6
-264 1 12 43 -0.26214400000000000000e6
-264 1 23 38 0.32768000000000000000e5
-264 1 26 41 -0.65536000000000000000e5
-264 1 28 43 0.13107200000000000000e6
-264 1 32 47 0.26214400000000000000e6
-264 2 2 8 0.65536000000000000000e5
-264 2 2 32 0.32768000000000000000e5
-264 2 3 9 -0.65536000000000000000e5
-264 2 7 21 0.13107200000000000000e6
-264 2 16 30 0.65536000000000000000e5
-264 2 20 34 0.13107200000000000000e6
-264 3 1 14 -0.13107200000000000000e6
-264 3 2 15 0.13107200000000000000e6
-264 3 3 32 0.26214400000000000000e6
-264 3 4 9 -0.65536000000000000000e5
-264 3 10 23 -0.65536000000000000000e5
-264 3 22 35 0.26214400000000000000e6
-264 3 28 41 0.26214400000000000000e6
-264 4 2 30 0.65536000000000000000e5
-264 4 6 34 0.13107200000000000000e6
-265 1 1 48 -0.32768000000000000000e5
-265 1 2 11 0.65536000000000000000e5
-265 1 2 49 -0.32768000000000000000e5
-265 1 4 11 0.65536000000000000000e5
-265 1 8 39 -0.65536000000000000000e5
-265 1 9 40 -0.65536000000000000000e5
-265 1 12 43 0.26214400000000000000e6
-265 1 23 38 -0.32768000000000000000e5
-265 1 26 41 0.65536000000000000000e5
-265 1 28 43 -0.13107200000000000000e6
-265 1 32 47 -0.26214400000000000000e6
-265 2 2 32 -0.32768000000000000000e5
-265 2 3 9 0.65536000000000000000e5
-265 2 16 30 -0.65536000000000000000e5
-265 2 20 34 -0.13107200000000000000e6
-265 3 2 15 -0.13107200000000000000e6
-265 3 3 32 -0.13107200000000000000e6
-265 3 4 9 0.65536000000000000000e5
-265 3 10 23 0.65536000000000000000e5
-265 3 22 35 -0.26214400000000000000e6
-265 3 28 41 -0.26214400000000000000e6
-265 4 2 30 -0.65536000000000000000e5
-265 4 6 34 -0.13107200000000000000e6
-266 1 1 32 0.65536000000000000000e5
-266 1 1 48 -0.32768000000000000000e5
-266 1 2 12 0.65536000000000000000e5
-266 1 2 33 -0.19660800000000000000e6
-266 1 2 49 -0.32768000000000000000e5
-266 1 3 34 0.26214400000000000000e6
-266 1 4 11 0.32768000000000000000e5
-266 1 8 23 -0.32768000000000000000e5
-266 1 8 39 -0.32768000000000000000e5
-266 1 9 40 -0.32768000000000000000e5
-266 1 10 41 -0.13107200000000000000e6
-266 1 11 42 0.65536000000000000000e5
-266 1 12 27 -0.13107200000000000000e6
-266 1 12 43 0.26214400000000000000e6
-266 1 23 38 -0.32768000000000000000e5
-266 1 26 41 0.32768000000000000000e5
-266 1 28 43 -0.13107200000000000000e6
-266 1 32 47 -0.19660800000000000000e6
-266 1 33 48 -0.65536000000000000000e5
-266 2 2 8 -0.32768000000000000000e5
-266 2 2 32 -0.32768000000000000000e5
-266 2 3 9 0.32768000000000000000e5
-266 2 6 20 0.65536000000000000000e5
-266 2 7 21 -0.13107200000000000000e6
-266 2 12 26 -0.65536000000000000000e5
-266 2 16 30 -0.32768000000000000000e5
-266 2 20 34 -0.65536000000000000000e5
-266 3 1 14 0.13107200000000000000e6
-266 3 1 30 0.32768000000000000000e5
-266 3 2 7 0.32768000000000000000e5
-266 3 2 15 -0.65536000000000000000e5
-266 3 3 32 -0.19660800000000000000e6
-266 3 4 9 0.32768000000000000000e5
-266 3 7 12 -0.13107200000000000000e6
-266 3 8 37 -0.32768000000000000000e5
-266 3 10 23 0.65536000000000000000e5
-266 3 13 42 -0.13107200000000000000e6
-266 3 22 35 -0.13107200000000000000e6
-266 3 28 41 -0.19660800000000000000e6
-266 3 29 42 -0.65536000000000000000e5
-266 4 2 6 0.32768000000000000000e5
-266 4 2 30 -0.32768000000000000000e5
-266 4 3 31 0.65536000000000000000e5
-266 4 6 6 0.13107200000000000000e6
-266 4 6 18 0.32768000000000000000e5
-266 4 6 34 -0.65536000000000000000e5
-267 1 1 32 -0.65536000000000000000e5
-267 1 1 48 0.32768000000000000000e5
-267 1 2 13 0.65536000000000000000e5
-267 1 2 33 0.13107200000000000000e6
-267 1 2 49 0.32768000000000000000e5
-267 1 3 34 -0.13107200000000000000e6
-267 1 4 11 -0.32768000000000000000e5
-267 1 8 23 0.32768000000000000000e5
-267 1 8 39 0.32768000000000000000e5
-267 1 9 40 0.32768000000000000000e5
-267 1 10 41 0.65536000000000000000e5
-267 1 11 42 -0.65536000000000000000e5
-267 1 12 43 -0.26214400000000000000e6
-267 1 23 38 0.32768000000000000000e5
-267 1 26 41 -0.32768000000000000000e5
-267 1 28 43 0.13107200000000000000e6
-267 1 32 47 0.19660800000000000000e6
-267 1 33 48 0.65536000000000000000e5
-267 2 2 8 0.32768000000000000000e5
-267 2 2 32 0.32768000000000000000e5
-267 2 3 9 -0.32768000000000000000e5
-267 2 7 21 0.65536000000000000000e5
-267 2 12 26 0.65536000000000000000e5
-267 2 16 30 0.32768000000000000000e5
-267 2 20 34 0.65536000000000000000e5
-267 3 1 14 -0.65536000000000000000e5
-267 3 1 30 -0.32768000000000000000e5
-267 3 2 7 -0.32768000000000000000e5
-267 3 2 15 0.65536000000000000000e5
-267 3 3 32 0.13107200000000000000e6
-267 3 4 9 -0.32768000000000000000e5
-267 3 8 37 0.32768000000000000000e5
-267 3 10 23 -0.65536000000000000000e5
-267 3 13 42 0.13107200000000000000e6
-267 3 22 35 0.13107200000000000000e6
-267 3 28 41 0.19660800000000000000e6
-267 3 29 42 0.65536000000000000000e5
-267 4 2 6 -0.32768000000000000000e5
-267 4 2 30 0.32768000000000000000e5
-267 4 3 31 -0.65536000000000000000e5
-267 4 6 18 -0.32768000000000000000e5
-267 4 6 34 0.65536000000000000000e5
-268 1 2 14 0.65536000000000000000e5
-268 1 2 33 0.65536000000000000000e5
-268 1 3 34 -0.13107200000000000000e6
-268 1 10 41 0.65536000000000000000e5
-268 2 7 21 0.65536000000000000000e5
-268 3 1 14 -0.65536000000000000000e5
-268 3 3 32 0.65536000000000000000e5
-269 1 2 15 0.65536000000000000000e5
-269 1 2 33 -0.65536000000000000000e5
-269 2 4 10 0.65536000000000000000e5
-269 2 7 21 -0.65536000000000000000e5
-269 3 1 14 0.65536000000000000000e5
-269 3 2 15 0.65536000000000000000e5
-269 3 3 16 -0.13107200000000000000e6
-270 1 2 16 0.65536000000000000000e5
-270 1 12 27 -0.65536000000000000000e5
-270 3 7 12 -0.65536000000000000000e5
-271 1 2 18 0.65536000000000000000e5
-271 1 3 34 -0.65536000000000000000e5
-271 3 3 16 -0.65536000000000000000e5
-272 1 2 17 -0.32768000000000000000e5
-272 1 2 19 0.65536000000000000000e5
-272 1 4 35 -0.32768000000000000000e5
-272 1 12 43 -0.32768000000000000000e5
-272 1 14 45 -0.65536000000000000000e5
-272 1 16 23 0.32768000000000000000e5
-272 1 16 31 -0.13107200000000000000e6
-272 1 17 48 0.32768000000000000000e5
-272 1 18 49 0.32768000000000000000e5
-272 1 20 27 0.13107200000000000000e6
-272 2 7 13 0.65536000000000000000e5
-272 2 9 23 -0.32768000000000000000e5
-272 2 10 24 -0.65536000000000000000e5
-272 2 14 28 0.32768000000000000000e5
-272 3 3 16 -0.32768000000000000000e5
-272 3 5 34 -0.32768000000000000000e5
-272 3 7 12 -0.32768000000000000000e5
-272 3 13 42 0.32768000000000000000e5
-272 3 14 27 -0.32768000000000000000e5
-272 3 14 43 0.32768000000000000000e5
-272 4 1 13 -0.32768000000000000000e5
-272 4 10 10 -0.13107200000000000000e6
-273 1 2 17 -0.32768000000000000000e5
-273 1 2 20 0.65536000000000000000e5
-273 1 3 18 -0.32768000000000000000e5
-273 1 3 34 -0.32768000000000000000e5
-273 2 6 12 -0.32768000000000000000e5
-273 3 3 16 -0.32768000000000000000e5
-274 1 2 17 -0.32768000000000000000e5
-274 1 2 21 0.65536000000000000000e5
-274 1 3 18 -0.16384000000000000000e5
-274 1 3 34 -0.16384000000000000000e5
-274 1 4 19 -0.32768000000000000000e5
-274 1 4 35 -0.16384000000000000000e5
-274 1 12 43 -0.16384000000000000000e5
-274 1 14 45 -0.32768000000000000000e5
-274 1 16 23 0.16384000000000000000e5
-274 1 16 31 -0.65536000000000000000e5
-274 1 17 48 0.16384000000000000000e5
-274 1 18 49 0.16384000000000000000e5
-274 1 20 27 0.65536000000000000000e5
-274 2 6 12 -0.16384000000000000000e5
-274 2 9 23 -0.16384000000000000000e5
-274 2 10 24 -0.32768000000000000000e5
-274 2 14 28 0.16384000000000000000e5
-274 3 3 16 -0.32768000000000000000e5
-274 3 5 34 -0.16384000000000000000e5
-274 3 7 12 -0.16384000000000000000e5
-274 3 13 42 0.16384000000000000000e5
-274 3 14 27 -0.16384000000000000000e5
-274 3 14 43 0.16384000000000000000e5
-274 4 1 13 -0.16384000000000000000e5
-274 4 10 10 -0.65536000000000000000e5
-275 1 1 8 0.13107200000000000000e6
-275 1 1 24 0.65536000000000000000e5
-275 1 1 32 0.26214400000000000000e6
-275 1 1 48 -0.65536000000000000000e5
-275 1 2 9 0.13107200000000000000e6
-275 1 2 22 0.65536000000000000000e5
-275 1 2 33 -0.78643200000000000000e6
-275 1 2 49 -0.13107200000000000000e6
-275 1 3 34 0.10485760000000000000e7
-275 1 4 11 0.13107200000000000000e6
-275 1 8 23 -0.13107200000000000000e6
-275 1 8 39 -0.13107200000000000000e6
-275 1 9 40 -0.13107200000000000000e6
-275 1 10 41 -0.52428800000000000000e6
-275 1 11 42 0.26214400000000000000e6
-275 1 12 27 -0.52428800000000000000e6
-275 1 12 43 0.10485760000000000000e7
-275 1 23 38 -0.13107200000000000000e6
-275 1 26 41 0.13107200000000000000e6
-275 1 28 43 -0.52428800000000000000e6
-275 1 32 47 -0.78643200000000000000e6
-275 1 33 48 -0.26214400000000000000e6
-275 2 1 7 0.13107200000000000000e6
-275 2 2 8 -0.13107200000000000000e6
-275 2 2 16 0.65536000000000000000e5
-275 2 2 32 -0.13107200000000000000e6
-275 2 3 9 0.13107200000000000000e6
-275 2 6 20 0.26214400000000000000e6
-275 2 7 21 -0.52428800000000000000e6
-275 2 12 26 -0.26214400000000000000e6
-275 2 16 30 -0.13107200000000000000e6
-275 2 20 34 -0.26214400000000000000e6
-275 3 1 14 0.52428800000000000000e6
-275 3 1 30 0.13107200000000000000e6
-275 3 1 38 0.65536000000000000000e5
-275 3 2 7 0.26214400000000000000e6
-275 3 2 15 -0.26214400000000000000e6
-275 3 2 23 0.65536000000000000000e5
-275 3 3 32 -0.78643200000000000000e6
-275 3 4 9 0.13107200000000000000e6
-275 3 7 12 -0.52428800000000000000e6
-275 3 8 37 -0.13107200000000000000e6
-275 3 10 23 0.26214400000000000000e6
-275 3 13 42 -0.52428800000000000000e6
-275 3 22 35 -0.52428800000000000000e6
-275 3 28 41 -0.78643200000000000000e6
-275 3 29 42 -0.26214400000000000000e6
-275 4 2 6 0.13107200000000000000e6
-275 4 2 30 -0.13107200000000000000e6
-275 4 3 31 0.26214400000000000000e6
-275 4 6 6 0.52428800000000000000e6
-275 4 6 18 0.13107200000000000000e6
-275 4 6 34 -0.26214400000000000000e6
-276 1 1 24 -0.65536000000000000000e5
-276 1 2 23 0.65536000000000000000e5
-277 1 1 48 -0.65536000000000000000e5
-277 1 2 24 0.65536000000000000000e5
-277 3 1 38 -0.65536000000000000000e5
-277 3 2 23 -0.65536000000000000000e5
-278 1 2 25 0.65536000000000000000e5
-278 1 2 26 0.65536000000000000000e5
-278 1 2 33 -0.26214400000000000000e6
-278 1 2 49 -0.65536000000000000000e5
-278 1 11 42 0.26214400000000000000e6
-278 1 12 43 0.52428800000000000000e6
-278 1 23 38 -0.65536000000000000000e5
-278 1 28 43 -0.26214400000000000000e6
-278 1 32 47 -0.26214400000000000000e6
-278 1 33 48 -0.26214400000000000000e6
-278 2 2 32 -0.65536000000000000000e5
-278 2 3 17 0.65536000000000000000e5
-278 2 12 26 -0.26214400000000000000e6
-278 3 1 30 0.13107200000000000000e6
-278 3 1 38 0.65536000000000000000e5
-278 3 2 23 0.65536000000000000000e5
-278 3 8 37 -0.13107200000000000000e6
-278 3 10 23 0.13107200000000000000e6
-278 3 13 42 -0.52428800000000000000e6
-278 3 28 41 -0.26214400000000000000e6
-278 3 29 42 -0.26214400000000000000e6
-278 4 3 31 0.26214400000000000000e6
-278 4 6 18 0.13107200000000000000e6
-279 1 1 8 0.65536000000000000000e5
-279 1 1 32 0.13107200000000000000e6
-279 1 1 48 -0.65536000000000000000e5
-279 1 2 9 0.65536000000000000000e5
-279 1 2 27 0.65536000000000000000e5
-279 1 2 33 -0.39321600000000000000e6
-279 1 2 49 -0.65536000000000000000e5
-279 1 3 34 0.52428800000000000000e6
-279 1 4 11 0.65536000000000000000e5
-279 1 8 23 -0.65536000000000000000e5
-279 1 8 39 -0.65536000000000000000e5
-279 1 9 40 -0.65536000000000000000e5
-279 1 10 41 -0.26214400000000000000e6
-279 1 11 42 0.13107200000000000000e6
-279 1 12 27 -0.26214400000000000000e6
-279 1 12 43 0.52428800000000000000e6
-279 1 23 38 -0.65536000000000000000e5
-279 1 26 41 0.65536000000000000000e5
-279 1 28 43 -0.26214400000000000000e6
-279 1 32 47 -0.39321600000000000000e6
-279 1 33 48 -0.13107200000000000000e6
-279 2 1 7 0.65536000000000000000e5
-279 2 2 8 -0.65536000000000000000e5
-279 2 2 32 -0.65536000000000000000e5
-279 2 3 9 0.65536000000000000000e5
-279 2 6 20 0.13107200000000000000e6
-279 2 7 21 -0.26214400000000000000e6
-279 2 12 26 -0.13107200000000000000e6
-279 2 16 30 -0.65536000000000000000e5
-279 2 20 34 -0.13107200000000000000e6
-279 3 1 14 0.26214400000000000000e6
-279 3 1 30 0.65536000000000000000e5
-279 3 2 7 0.13107200000000000000e6
-279 3 2 15 -0.13107200000000000000e6
-279 3 3 32 -0.39321600000000000000e6
-279 3 4 9 0.65536000000000000000e5
-279 3 7 12 -0.26214400000000000000e6
-279 3 8 37 -0.65536000000000000000e5
-279 3 10 23 0.13107200000000000000e6
-279 3 13 42 -0.26214400000000000000e6
-279 3 22 35 -0.26214400000000000000e6
-279 3 28 41 -0.39321600000000000000e6
-279 3 29 42 -0.13107200000000000000e6
-279 4 2 6 0.65536000000000000000e5
-279 4 2 30 -0.65536000000000000000e5
-279 4 3 31 0.13107200000000000000e6
-279 4 6 6 0.26214400000000000000e6
-279 4 6 18 0.65536000000000000000e5
-279 4 6 34 -0.13107200000000000000e6
-280 1 2 28 0.65536000000000000000e5
-280 1 8 23 -0.65536000000000000000e5
-281 1 1 48 -0.32768000000000000000e5
-281 1 2 29 0.65536000000000000000e5
-281 1 2 33 -0.13107200000000000000e6
-281 1 2 49 -0.32768000000000000000e5
-281 1 11 42 0.13107200000000000000e6
-281 1 12 43 0.26214400000000000000e6
-281 1 23 38 -0.32768000000000000000e5
-281 1 28 43 -0.13107200000000000000e6
-281 1 32 47 -0.13107200000000000000e6
-281 1 33 48 -0.13107200000000000000e6
-281 2 2 32 -0.32768000000000000000e5
-281 2 12 26 -0.13107200000000000000e6
-281 3 1 30 0.65536000000000000000e5
-281 3 8 37 -0.65536000000000000000e5
-281 3 10 23 0.65536000000000000000e5
-281 3 13 42 -0.26214400000000000000e6
-281 3 28 41 -0.13107200000000000000e6
-281 3 29 42 -0.13107200000000000000e6
-281 4 3 31 0.13107200000000000000e6
-281 4 6 18 0.65536000000000000000e5
-282 1 2 30 0.65536000000000000000e5
-282 1 8 39 -0.65536000000000000000e5
-282 3 1 30 -0.65536000000000000000e5
-283 1 1 32 -0.65536000000000000000e5
-283 1 2 31 0.65536000000000000000e5
-284 1 2 32 0.65536000000000000000e5
-284 1 2 33 0.65536000000000000000e5
-284 1 3 34 -0.13107200000000000000e6
-284 1 10 41 0.65536000000000000000e5
-284 2 7 21 0.65536000000000000000e5
-284 3 3 32 0.65536000000000000000e5
-285 1 2 34 0.65536000000000000000e5
-285 1 16 23 -0.65536000000000000000e5
-286 1 2 35 0.65536000000000000000e5
-286 1 3 34 -0.65536000000000000000e5
-287 1 2 36 0.65536000000000000000e5
-287 1 3 18 -0.32768000000000000000e5
-287 1 4 19 0.65536000000000000000e5
-287 1 4 35 0.32768000000000000000e5
-287 1 12 43 0.65536000000000000000e5
-287 1 14 45 0.65536000000000000000e5
-287 1 17 48 -0.32768000000000000000e5
-287 1 18 49 -0.32768000000000000000e5
-287 1 20 27 -0.13107200000000000000e6
-287 2 9 23 0.32768000000000000000e5
-287 2 10 24 0.65536000000000000000e5
-287 2 14 28 -0.32768000000000000000e5
-287 3 3 16 -0.32768000000000000000e5
-287 3 4 17 -0.32768000000000000000e5
-287 3 5 34 0.32768000000000000000e5
-287 3 13 42 -0.32768000000000000000e5
-287 3 14 27 0.65536000000000000000e5
-287 3 14 43 -0.32768000000000000000e5
-287 4 2 14 -0.32768000000000000000e5
-288 1 1 40 0.65536000000000000000e5
-288 1 2 37 0.65536000000000000000e5
-288 1 22 37 -0.65536000000000000000e5
-288 1 23 38 -0.65536000000000000000e5
-288 3 1 38 0.65536000000000000000e5
-288 3 22 27 -0.13107200000000000000e6
-288 4 16 16 0.13107200000000000000e6
-289 1 1 48 -0.65536000000000000000e5
-289 1 2 38 0.65536000000000000000e5
-289 3 1 38 -0.65536000000000000000e5
-290 1 1 40 -0.65536000000000000000e5
-290 1 2 39 0.65536000000000000000e5
-291 1 2 40 0.65536000000000000000e5
-291 1 2 49 -0.65536000000000000000e5
-291 3 2 39 -0.65536000000000000000e5
-292 1 2 41 0.65536000000000000000e5
-292 1 7 38 -0.65536000000000000000e5
-293 1 1 48 -0.32768000000000000000e5
-293 1 2 42 0.65536000000000000000e5
-293 1 2 49 -0.32768000000000000000e5
-293 1 23 38 -0.32768000000000000000e5
-293 2 2 32 -0.32768000000000000000e5
-293 3 8 37 -0.65536000000000000000e5
-294 1 2 43 0.65536000000000000000e5
-294 1 8 39 -0.65536000000000000000e5
-295 1 2 33 0.65536000000000000000e5
-295 1 2 44 0.65536000000000000000e5
-295 1 3 34 -0.13107200000000000000e6
-295 1 10 41 0.65536000000000000000e5
-295 2 7 21 0.65536000000000000000e5
-295 3 2 31 0.65536000000000000000e5
-295 3 3 32 0.65536000000000000000e5
-296 1 2 45 0.65536000000000000000e5
-296 1 11 42 -0.65536000000000000000e5
-296 1 12 43 -0.13107200000000000000e6
-296 1 28 43 0.65536000000000000000e5
-296 1 32 47 0.65536000000000000000e5
-296 1 33 48 0.65536000000000000000e5
-296 2 12 26 0.65536000000000000000e5
-296 3 13 42 0.13107200000000000000e6
-296 3 28 41 0.65536000000000000000e5
-296 3 29 42 0.65536000000000000000e5
-296 4 3 31 -0.65536000000000000000e5
-297 1 2 46 0.65536000000000000000e5
-297 1 16 47 -0.65536000000000000000e5
-297 3 12 41 -0.65536000000000000000e5
-298 1 1 48 -0.65536000000000000000e5
-298 1 2 47 0.65536000000000000000e5
-299 1 2 48 0.65536000000000000000e5
-299 1 23 38 -0.65536000000000000000e5
-300 1 1 48 -0.32768000000000000000e5
-300 1 2 49 -0.32768000000000000000e5
-300 1 2 50 0.65536000000000000000e5
-300 1 23 38 -0.32768000000000000000e5
-300 2 2 32 -0.32768000000000000000e5
-301 1 2 51 0.65536000000000000000e5
-301 1 8 39 -0.65536000000000000000e5
-301 1 9 40 -0.65536000000000000000e5
-301 1 10 41 0.13107200000000000000e6
-301 1 26 41 0.65536000000000000000e5
-301 1 32 47 -0.13107200000000000000e6
-301 3 9 38 -0.65536000000000000000e5
-301 3 28 41 -0.13107200000000000000e6
-301 4 2 30 -0.65536000000000000000e5
-302 1 2 52 0.65536000000000000000e5
-302 1 12 43 -0.13107200000000000000e6
-302 1 28 43 0.65536000000000000000e5
-302 1 32 47 0.65536000000000000000e5
-302 2 20 34 0.65536000000000000000e5
-302 3 22 35 0.13107200000000000000e6
-302 3 28 41 0.65536000000000000000e5
-302 4 6 34 0.65536000000000000000e5
-303 1 2 53 0.65536000000000000000e5
-303 1 23 38 -0.65536000000000000000e5
-303 3 2 47 0.65536000000000000000e5
-304 1 2 49 -0.65536000000000000000e5
-304 1 2 54 0.65536000000000000000e5
-304 3 24 37 0.65536000000000000000e5
-305 1 2 55 0.65536000000000000000e5
-305 1 6 53 -0.32768000000000000000e5
-305 1 8 39 -0.65536000000000000000e5
-305 1 9 40 -0.65536000000000000000e5
-305 1 10 41 0.13107200000000000000e6
-305 1 25 40 0.32768000000000000000e5
-305 1 26 41 0.65536000000000000000e5
-305 1 32 47 -0.13107200000000000000e6
-305 3 9 38 -0.65536000000000000000e5
-305 3 24 37 -0.32768000000000000000e5
-305 3 27 40 -0.13107200000000000000e6
-305 4 2 30 -0.65536000000000000000e5
-305 4 4 32 0.32768000000000000000e5
-305 4 16 28 -0.32768000000000000000e5
-305 4 17 29 -0.65536000000000000000e5
-306 1 2 56 0.65536000000000000000e5
-306 1 6 53 -0.65536000000000000000e5
-306 1 8 39 -0.13107200000000000000e6
-306 1 9 40 -0.13107200000000000000e6
-306 1 10 41 0.26214400000000000000e6
-306 1 22 53 0.65536000000000000000e5
-306 1 23 54 0.65536000000000000000e5
-306 1 24 55 0.13107200000000000000e6
-306 1 25 40 0.65536000000000000000e5
-306 1 37 52 -0.26214400000000000000e6
-306 2 26 32 0.65536000000000000000e5
-306 3 9 38 -0.13107200000000000000e6
-306 3 22 51 -0.13107200000000000000e6
-306 3 24 37 -0.65536000000000000000e5
-306 3 27 40 -0.13107200000000000000e6
-306 4 2 30 -0.13107200000000000000e6
-306 4 4 32 0.65536000000000000000e5
-306 4 16 28 -0.65536000000000000000e5
-306 4 17 29 -0.13107200000000000000e6
-306 4 20 32 -0.13107200000000000000e6
-307 1 1 48 -0.32768000000000000000e5
-307 1 3 3 0.65536000000000000000e5
-307 3 1 38 -0.32768000000000000000e5
-307 3 2 3 -0.32768000000000000000e5
-307 3 2 23 -0.32768000000000000000e5
-308 1 2 5 -0.65536000000000000000e5
-308 1 3 4 0.65536000000000000000e5
-309 1 2 25 0.65536000000000000000e5
-309 1 2 33 -0.26214400000000000000e6
-309 1 2 49 -0.65536000000000000000e5
-309 1 3 5 0.65536000000000000000e5
-309 1 11 42 0.26214400000000000000e6
-309 1 12 43 0.52428800000000000000e6
-309 1 23 38 -0.65536000000000000000e5
-309 1 28 43 -0.26214400000000000000e6
-309 1 32 47 -0.26214400000000000000e6
-309 1 33 48 -0.26214400000000000000e6
-309 2 2 32 -0.65536000000000000000e5
-309 2 3 17 0.65536000000000000000e5
-309 2 12 26 -0.26214400000000000000e6
-309 3 1 6 -0.65536000000000000000e5
-309 3 1 30 0.13107200000000000000e6
-309 3 1 38 0.65536000000000000000e5
-309 3 2 23 0.65536000000000000000e5
-309 3 8 37 -0.13107200000000000000e6
-309 3 10 23 0.13107200000000000000e6
-309 3 13 42 -0.52428800000000000000e6
-309 3 28 41 -0.26214400000000000000e6
-309 3 29 42 -0.26214400000000000000e6
-309 4 3 31 0.26214400000000000000e6
-309 4 6 18 0.13107200000000000000e6
-310 1 1 40 -0.65536000000000000000e5
-310 1 1 48 -0.65536000000000000000e5
-310 1 2 5 0.65536000000000000000e5
-310 1 2 25 -0.65536000000000000000e5
-310 1 2 33 0.26214400000000000000e6
-310 1 2 49 -0.65536000000000000000e5
-310 1 3 6 0.65536000000000000000e5
-310 1 4 11 0.13107200000000000000e6
-310 1 6 37 -0.65536000000000000000e5
-310 1 9 40 -0.13107200000000000000e6
-310 1 11 42 -0.26214400000000000000e6
-310 1 26 41 0.13107200000000000000e6
-310 1 32 47 -0.26214400000000000000e6
-310 1 33 48 0.26214400000000000000e6
-310 2 3 9 0.13107200000000000000e6
-310 2 3 17 -0.65536000000000000000e5
-310 2 12 26 0.26214400000000000000e6
-310 2 16 30 -0.13107200000000000000e6
-310 2 20 34 -0.26214400000000000000e6
-310 3 1 6 0.65536000000000000000e5
-310 3 1 30 -0.13107200000000000000e6
-310 3 1 38 -0.65536000000000000000e5
-310 3 2 15 -0.26214400000000000000e6
-310 3 2 23 -0.65536000000000000000e5
-310 3 2 39 -0.65536000000000000000e5
-310 3 3 32 -0.26214400000000000000e6
-310 3 4 9 0.13107200000000000000e6
-310 3 8 37 0.13107200000000000000e6
-310 3 13 42 0.52428800000000000000e6
-310 3 22 35 -0.52428800000000000000e6
-310 3 28 41 -0.26214400000000000000e6
-310 3 29 42 0.26214400000000000000e6
-310 4 1 5 0.65536000000000000000e5
-310 4 2 30 -0.13107200000000000000e6
-310 4 3 31 -0.26214400000000000000e6
-310 4 4 16 0.65536000000000000000e5
-310 4 6 18 -0.13107200000000000000e6
-310 4 6 34 -0.26214400000000000000e6
-311 1 1 8 0.65536000000000000000e5
-311 1 1 32 0.13107200000000000000e6
-311 1 1 48 -0.65536000000000000000e5
-311 1 2 9 0.65536000000000000000e5
-311 1 2 33 -0.39321600000000000000e6
-311 1 2 49 -0.65536000000000000000e5
-311 1 3 7 0.65536000000000000000e5
-311 1 3 34 0.52428800000000000000e6
-311 1 4 11 0.65536000000000000000e5
-311 1 8 23 -0.65536000000000000000e5
-311 1 8 39 -0.65536000000000000000e5
-311 1 9 40 -0.65536000000000000000e5
-311 1 10 41 -0.26214400000000000000e6
-311 1 11 42 0.13107200000000000000e6
-311 1 12 27 -0.26214400000000000000e6
-311 1 12 43 0.52428800000000000000e6
-311 1 23 38 -0.65536000000000000000e5
-311 1 26 41 0.65536000000000000000e5
-311 1 28 43 -0.26214400000000000000e6
-311 1 32 47 -0.39321600000000000000e6
-311 1 33 48 -0.13107200000000000000e6
-311 2 1 7 0.65536000000000000000e5
-311 2 2 8 -0.65536000000000000000e5
-311 2 2 32 -0.65536000000000000000e5
-311 2 3 9 0.65536000000000000000e5
-311 2 6 20 0.13107200000000000000e6
-311 2 7 21 -0.26214400000000000000e6
-311 2 12 26 -0.13107200000000000000e6
-311 2 16 30 -0.65536000000000000000e5
-311 2 20 34 -0.13107200000000000000e6
-311 3 1 14 0.26214400000000000000e6
-311 3 1 30 0.65536000000000000000e5
-311 3 2 7 0.65536000000000000000e5
-311 3 2 15 -0.13107200000000000000e6
-311 3 3 32 -0.39321600000000000000e6
-311 3 4 9 0.65536000000000000000e5
-311 3 7 12 -0.26214400000000000000e6
-311 3 8 37 -0.65536000000000000000e5
-311 3 10 23 0.13107200000000000000e6
-311 3 13 42 -0.26214400000000000000e6
-311 3 22 35 -0.26214400000000000000e6
-311 3 28 41 -0.39321600000000000000e6
-311 3 29 42 -0.13107200000000000000e6
-311 4 2 6 0.65536000000000000000e5
-311 4 2 30 -0.65536000000000000000e5
-311 4 3 31 0.13107200000000000000e6
-311 4 6 6 0.26214400000000000000e6
-311 4 6 18 0.65536000000000000000e5
-311 4 6 34 -0.13107200000000000000e6
-312 1 2 9 -0.65536000000000000000e5
-312 1 3 8 0.65536000000000000000e5
-313 1 1 48 0.32768000000000000000e5
-313 1 2 9 0.65536000000000000000e5
-313 1 2 33 0.13107200000000000000e6
-313 1 2 49 0.32768000000000000000e5
-313 1 3 9 0.65536000000000000000e5
-313 1 3 34 -0.26214400000000000000e6
-313 1 4 11 -0.65536000000000000000e5
-313 1 8 39 0.65536000000000000000e5
-313 1 9 40 0.65536000000000000000e5
-313 1 10 41 0.13107200000000000000e6
-313 1 12 43 -0.26214400000000000000e6
-313 1 23 38 0.32768000000000000000e5
-313 1 26 41 -0.65536000000000000000e5
-313 1 28 43 0.13107200000000000000e6
-313 1 32 47 0.26214400000000000000e6
-313 2 2 8 0.65536000000000000000e5
-313 2 2 32 0.32768000000000000000e5
-313 2 3 9 -0.65536000000000000000e5
-313 2 7 21 0.13107200000000000000e6
-313 2 16 30 0.65536000000000000000e5
-313 2 20 34 0.13107200000000000000e6
-313 3 1 14 -0.13107200000000000000e6
-313 3 2 15 0.13107200000000000000e6
-313 3 3 32 0.26214400000000000000e6
-313 3 4 9 -0.65536000000000000000e5
-313 3 10 23 -0.65536000000000000000e5
-313 3 22 35 0.26214400000000000000e6
-313 3 28 41 0.26214400000000000000e6
-313 4 2 30 0.65536000000000000000e5
-313 4 6 34 0.13107200000000000000e6
-314 1 1 48 -0.32768000000000000000e5
-314 1 2 49 -0.32768000000000000000e5
-314 1 3 10 0.65536000000000000000e5
-314 1 4 11 0.65536000000000000000e5
-314 1 8 39 -0.65536000000000000000e5
-314 1 9 40 -0.65536000000000000000e5
-314 1 12 43 0.26214400000000000000e6
-314 1 23 38 -0.32768000000000000000e5
-314 1 26 41 0.65536000000000000000e5
-314 1 28 43 -0.13107200000000000000e6
-314 1 32 47 -0.26214400000000000000e6
-314 2 2 32 -0.32768000000000000000e5
-314 2 3 9 0.65536000000000000000e5
-314 2 16 30 -0.65536000000000000000e5
-314 2 20 34 -0.13107200000000000000e6
-314 3 2 15 -0.13107200000000000000e6
-314 3 3 32 -0.13107200000000000000e6
-314 3 4 9 0.65536000000000000000e5
-314 3 10 23 0.65536000000000000000e5
-314 3 22 35 -0.26214400000000000000e6
-314 3 28 41 -0.26214400000000000000e6
-314 4 2 30 -0.65536000000000000000e5
-314 4 6 34 -0.13107200000000000000e6
-315 1 1 48 0.32768000000000000000e5
-315 1 2 49 0.32768000000000000000e5
-315 1 3 11 0.65536000000000000000e5
-315 1 8 39 0.65536000000000000000e5
-315 1 9 40 0.65536000000000000000e5
-315 1 10 41 -0.13107200000000000000e6
-315 1 12 43 -0.26214400000000000000e6
-315 1 23 38 0.32768000000000000000e5
-315 1 26 41 -0.65536000000000000000e5
-315 1 28 43 0.13107200000000000000e6
-315 1 32 47 0.26214400000000000000e6
-315 2 2 32 0.32768000000000000000e5
-315 2 16 30 0.65536000000000000000e5
-315 2 20 34 0.13107200000000000000e6
-315 3 4 9 -0.65536000000000000000e5
-315 3 10 23 -0.65536000000000000000e5
-315 3 22 35 0.26214400000000000000e6
-315 3 28 41 0.26214400000000000000e6
-315 4 2 30 0.65536000000000000000e5
-315 4 6 34 0.13107200000000000000e6
-316 1 1 32 -0.65536000000000000000e5
-316 1 1 48 0.32768000000000000000e5
-316 1 2 33 0.13107200000000000000e6
-316 1 2 49 0.32768000000000000000e5
-316 1 3 12 0.65536000000000000000e5
-316 1 3 34 -0.13107200000000000000e6
-316 1 4 11 -0.32768000000000000000e5
-316 1 8 23 0.32768000000000000000e5
-316 1 8 39 0.32768000000000000000e5
-316 1 9 40 0.32768000000000000000e5
-316 1 10 41 0.65536000000000000000e5
-316 1 11 42 -0.65536000000000000000e5
-316 1 12 43 -0.26214400000000000000e6
-316 1 23 38 0.32768000000000000000e5
-316 1 26 41 -0.32768000000000000000e5
-316 1 28 43 0.13107200000000000000e6
-316 1 32 47 0.19660800000000000000e6
-316 1 33 48 0.65536000000000000000e5
-316 2 2 8 0.32768000000000000000e5
-316 2 2 32 0.32768000000000000000e5
-316 2 3 9 -0.32768000000000000000e5
-316 2 7 21 0.65536000000000000000e5
-316 2 12 26 0.65536000000000000000e5
-316 2 16 30 0.32768000000000000000e5
-316 2 20 34 0.65536000000000000000e5
-316 3 1 14 -0.65536000000000000000e5
-316 3 1 30 -0.32768000000000000000e5
-316 3 2 7 -0.32768000000000000000e5
-316 3 2 15 0.65536000000000000000e5
-316 3 3 32 0.13107200000000000000e6
-316 3 4 9 -0.32768000000000000000e5
-316 3 8 37 0.32768000000000000000e5
-316 3 10 23 -0.65536000000000000000e5
-316 3 13 42 0.13107200000000000000e6
-316 3 22 35 0.13107200000000000000e6
-316 3 28 41 0.19660800000000000000e6
-316 3 29 42 0.65536000000000000000e5
-316 4 2 6 -0.32768000000000000000e5
-316 4 2 30 0.32768000000000000000e5
-316 4 3 31 -0.65536000000000000000e5
-316 4 6 18 -0.32768000000000000000e5
-316 4 6 34 0.65536000000000000000e5
-317 1 2 33 0.65536000000000000000e5
-317 1 3 13 0.65536000000000000000e5
-317 1 3 34 -0.13107200000000000000e6
-317 1 10 41 0.65536000000000000000e5
-317 2 7 21 0.65536000000000000000e5
-317 3 1 14 -0.65536000000000000000e5
-317 3 3 32 0.65536000000000000000e5
-318 1 2 33 -0.65536000000000000000e5
-318 1 3 14 0.65536000000000000000e5
-318 2 4 10 0.65536000000000000000e5
-318 2 7 21 -0.65536000000000000000e5
-318 3 1 14 0.65536000000000000000e5
-318 3 2 15 0.65536000000000000000e5
-318 3 3 16 -0.13107200000000000000e6
-319 1 3 15 0.65536000000000000000e5
-319 1 10 41 -0.65536000000000000000e5
-319 3 2 15 -0.65536000000000000000e5
-319 3 3 32 -0.65536000000000000000e5
-320 1 2 17 -0.65536000000000000000e5
-320 1 3 16 0.65536000000000000000e5
-321 1 3 17 0.65536000000000000000e5
-321 1 3 34 -0.65536000000000000000e5
-321 3 3 16 -0.65536000000000000000e5
-322 1 2 17 -0.32768000000000000000e5
-322 1 3 18 -0.32768000000000000000e5
-322 1 3 19 0.65536000000000000000e5
-322 1 3 34 -0.32768000000000000000e5
-322 2 6 12 -0.32768000000000000000e5
-322 3 3 16 -0.32768000000000000000e5
-323 1 3 20 0.65536000000000000000e5
-323 1 4 19 -0.65536000000000000000e5
-324 1 3 21 0.65536000000000000000e5
-324 1 20 27 -0.65536000000000000000e5
-324 3 7 20 -0.65536000000000000000e5
-325 1 1 24 -0.65536000000000000000e5
-325 1 3 22 0.65536000000000000000e5
-326 1 1 48 -0.65536000000000000000e5
-326 1 3 23 0.65536000000000000000e5
-326 3 1 38 -0.65536000000000000000e5
-326 3 2 23 -0.65536000000000000000e5
-327 1 2 25 -0.65536000000000000000e5
-327 1 3 24 0.65536000000000000000e5
-328 1 2 25 0.65536000000000000000e5
-328 1 2 33 -0.26214400000000000000e6
-328 1 2 49 -0.65536000000000000000e5
-328 1 3 25 0.65536000000000000000e5
-328 1 11 42 0.26214400000000000000e6
-328 1 12 43 0.52428800000000000000e6
-328 1 23 38 -0.65536000000000000000e5
-328 1 28 43 -0.26214400000000000000e6
-328 1 32 47 -0.26214400000000000000e6
-328 1 33 48 -0.26214400000000000000e6
-328 2 2 32 -0.65536000000000000000e5
-328 2 3 17 0.65536000000000000000e5
-328 2 12 26 -0.26214400000000000000e6
-328 3 1 30 0.13107200000000000000e6
-328 3 1 38 0.65536000000000000000e5
-328 3 2 23 0.65536000000000000000e5
-328 3 8 37 -0.13107200000000000000e6
-328 3 10 23 0.13107200000000000000e6
-328 3 13 42 -0.52428800000000000000e6
-328 3 28 41 -0.26214400000000000000e6
-328 3 29 42 -0.26214400000000000000e6
-328 4 3 31 0.26214400000000000000e6
-328 4 6 18 0.13107200000000000000e6
-329 1 1 40 -0.65536000000000000000e5
-329 1 2 33 0.26214400000000000000e6
-329 1 3 26 0.65536000000000000000e5
-329 1 6 37 -0.65536000000000000000e5
-329 1 11 42 -0.26214400000000000000e6
-329 1 12 43 -0.52428800000000000000e6
-329 1 23 38 0.65536000000000000000e5
-329 1 28 43 0.26214400000000000000e6
-329 1 32 47 0.26214400000000000000e6
-329 1 33 48 0.26214400000000000000e6
-329 2 2 32 0.65536000000000000000e5
-329 2 3 17 -0.65536000000000000000e5
-329 2 12 26 0.26214400000000000000e6
-329 3 1 30 -0.26214400000000000000e6
-329 3 1 38 -0.65536000000000000000e5
-329 3 2 23 -0.65536000000000000000e5
-329 3 2 39 -0.65536000000000000000e5
-329 3 8 37 0.13107200000000000000e6
-329 3 10 23 -0.13107200000000000000e6
-329 3 13 42 0.52428800000000000000e6
-329 3 28 41 0.26214400000000000000e6
-329 3 29 42 0.26214400000000000000e6
-329 4 3 31 -0.26214400000000000000e6
-329 4 4 16 0.65536000000000000000e5
-329 4 6 18 -0.13107200000000000000e6
-330 1 3 27 0.65536000000000000000e5
-330 1 8 23 -0.65536000000000000000e5
-331 1 1 48 -0.32768000000000000000e5
-331 1 2 33 -0.13107200000000000000e6
-331 1 2 49 -0.32768000000000000000e5
-331 1 3 28 0.65536000000000000000e5
-331 1 11 42 0.13107200000000000000e6
-331 1 12 43 0.26214400000000000000e6
-331 1 23 38 -0.32768000000000000000e5
-331 1 28 43 -0.13107200000000000000e6
-331 1 32 47 -0.13107200000000000000e6
-331 1 33 48 -0.13107200000000000000e6
-331 2 2 32 -0.32768000000000000000e5
-331 2 12 26 -0.13107200000000000000e6
-331 3 1 30 0.65536000000000000000e5
-331 3 8 37 -0.65536000000000000000e5
-331 3 10 23 0.65536000000000000000e5
-331 3 13 42 -0.26214400000000000000e6
-331 3 28 41 -0.13107200000000000000e6
-331 3 29 42 -0.13107200000000000000e6
-331 4 3 31 0.13107200000000000000e6
-331 4 6 18 0.65536000000000000000e5
-332 1 3 29 0.65536000000000000000e5
-332 1 8 39 -0.65536000000000000000e5
-332 3 1 30 -0.65536000000000000000e5
-333 1 1 48 0.32768000000000000000e5
-333 1 2 49 0.32768000000000000000e5
-333 1 3 30 0.65536000000000000000e5
-333 1 8 39 0.65536000000000000000e5
-333 1 9 40 0.65536000000000000000e5
-333 1 10 41 -0.13107200000000000000e6
-333 1 12 43 -0.26214400000000000000e6
-333 1 23 38 0.32768000000000000000e5
-333 1 26 41 -0.65536000000000000000e5
-333 1 28 43 0.13107200000000000000e6
-333 1 32 47 0.26214400000000000000e6
-333 2 2 32 0.32768000000000000000e5
-333 2 16 30 0.65536000000000000000e5
-333 2 20 34 0.13107200000000000000e6
-333 3 10 23 -0.65536000000000000000e5
-333 3 22 35 0.26214400000000000000e6
-333 3 28 41 0.26214400000000000000e6
-333 4 2 30 0.65536000000000000000e5
-333 4 6 34 0.13107200000000000000e6
-334 1 2 33 0.65536000000000000000e5
-334 1 3 31 0.65536000000000000000e5
-334 1 3 34 -0.13107200000000000000e6
-334 1 10 41 0.65536000000000000000e5
-334 2 7 21 0.65536000000000000000e5
-334 3 3 32 0.65536000000000000000e5
-335 1 2 33 -0.65536000000000000000e5
-335 1 3 32 0.65536000000000000000e5
-336 1 3 33 0.65536000000000000000e5
-336 1 10 41 -0.65536000000000000000e5
-336 3 3 32 -0.65536000000000000000e5
-337 1 3 35 0.65536000000000000000e5
-337 1 12 43 -0.65536000000000000000e5
-337 3 14 27 -0.65536000000000000000e5
-338 1 3 18 0.32768000000000000000e5
-338 1 3 36 0.65536000000000000000e5
-338 1 4 19 -0.65536000000000000000e5
-338 1 12 43 -0.32768000000000000000e5
-338 3 3 16 0.32768000000000000000e5
-338 3 4 17 0.32768000000000000000e5
-338 3 14 27 -0.32768000000000000000e5
-338 4 2 14 0.32768000000000000000e5
-339 1 1 48 -0.65536000000000000000e5
-339 1 3 37 0.65536000000000000000e5
-339 3 1 38 -0.65536000000000000000e5
-340 1 1 40 -0.65536000000000000000e5
-340 1 3 38 0.65536000000000000000e5
-341 1 2 49 -0.65536000000000000000e5
-341 1 3 39 0.65536000000000000000e5
-341 3 2 39 -0.65536000000000000000e5
-342 1 3 40 0.65536000000000000000e5
-342 1 6 37 -0.65536000000000000000e5
-343 1 1 48 -0.32768000000000000000e5
-343 1 2 49 -0.32768000000000000000e5
-343 1 3 41 0.65536000000000000000e5
-343 1 23 38 -0.32768000000000000000e5
-343 2 2 32 -0.32768000000000000000e5
-343 3 8 37 -0.65536000000000000000e5
-344 1 3 42 0.65536000000000000000e5
-344 1 8 39 -0.65536000000000000000e5
-345 1 1 48 0.32768000000000000000e5
-345 1 2 49 0.32768000000000000000e5
-345 1 3 43 0.65536000000000000000e5
-345 1 8 39 0.65536000000000000000e5
-345 1 9 40 0.65536000000000000000e5
-345 1 10 41 -0.13107200000000000000e6
-345 1 12 43 -0.26214400000000000000e6
-345 1 23 38 0.32768000000000000000e5
-345 1 26 41 -0.65536000000000000000e5
-345 1 28 43 0.13107200000000000000e6
-345 1 32 47 0.26214400000000000000e6
-345 2 2 32 0.32768000000000000000e5
-345 2 16 30 0.65536000000000000000e5
-345 2 20 34 0.13107200000000000000e6
-345 3 22 35 0.26214400000000000000e6
-345 3 28 41 0.26214400000000000000e6
-345 4 2 30 0.65536000000000000000e5
-345 4 6 34 0.13107200000000000000e6
-346 1 3 44 0.65536000000000000000e5
-346 1 11 42 -0.65536000000000000000e5
-346 1 12 43 -0.13107200000000000000e6
-346 1 28 43 0.65536000000000000000e5
-346 1 32 47 0.65536000000000000000e5
-346 1 33 48 0.65536000000000000000e5
-346 2 12 26 0.65536000000000000000e5
-346 3 13 42 0.13107200000000000000e6
-346 3 28 41 0.65536000000000000000e5
-346 3 29 42 0.65536000000000000000e5
-346 4 3 31 -0.65536000000000000000e5
-347 1 3 45 0.65536000000000000000e5
-347 1 10 41 -0.65536000000000000000e5
-348 1 3 46 0.65536000000000000000e5
-348 1 12 43 -0.65536000000000000000e5
-349 1 3 47 0.65536000000000000000e5
-349 1 23 38 -0.65536000000000000000e5
-350 1 2 49 -0.65536000000000000000e5
-350 1 3 48 0.65536000000000000000e5
-351 1 3 49 0.65536000000000000000e5
-351 1 24 39 -0.65536000000000000000e5
-352 1 3 50 0.65536000000000000000e5
-352 1 8 39 -0.65536000000000000000e5
-352 1 9 40 -0.65536000000000000000e5
-352 1 10 41 0.13107200000000000000e6
-352 1 26 41 0.65536000000000000000e5
-352 1 32 47 -0.13107200000000000000e6
-352 3 9 38 -0.65536000000000000000e5
-352 3 28 41 -0.13107200000000000000e6
-352 4 2 30 -0.65536000000000000000e5
-353 1 1 48 0.32768000000000000000e5
-353 1 2 49 0.32768000000000000000e5
-353 1 3 51 0.65536000000000000000e5
-353 1 8 39 0.65536000000000000000e5
-353 1 9 40 0.65536000000000000000e5
-353 1 10 41 -0.13107200000000000000e6
-353 1 12 43 -0.26214400000000000000e6
-353 1 23 38 0.32768000000000000000e5
-353 1 26 41 -0.65536000000000000000e5
-353 1 28 43 0.13107200000000000000e6
-353 1 32 47 0.26214400000000000000e6
-353 2 2 32 0.32768000000000000000e5
-353 2 16 30 0.65536000000000000000e5
-353 2 20 34 0.13107200000000000000e6
-353 3 9 38 0.65536000000000000000e5
-353 3 22 35 0.26214400000000000000e6
-353 3 28 41 0.26214400000000000000e6
-353 4 2 30 0.65536000000000000000e5
-353 4 6 34 0.13107200000000000000e6
-354 1 3 52 0.65536000000000000000e5
-354 1 32 47 -0.65536000000000000000e5
-354 3 28 41 -0.65536000000000000000e5
-355 1 2 49 -0.65536000000000000000e5
-355 1 3 53 0.65536000000000000000e5
-355 3 24 37 0.65536000000000000000e5
-356 1 3 54 0.65536000000000000000e5
-356 1 6 53 0.65536000000000000000e5
-356 1 24 39 -0.65536000000000000000e5
-356 1 25 40 -0.65536000000000000000e5
-356 3 25 38 -0.65536000000000000000e5
-356 3 27 40 0.13107200000000000000e6
-356 4 4 32 -0.65536000000000000000e5
-357 1 1 48 0.32768000000000000000e5
-357 1 2 49 0.32768000000000000000e5
-357 1 3 55 0.65536000000000000000e5
-357 1 6 53 0.32768000000000000000e5
-357 1 8 39 0.65536000000000000000e5
-357 1 9 40 0.65536000000000000000e5
-357 1 10 41 -0.13107200000000000000e6
-357 1 12 43 -0.26214400000000000000e6
-357 1 23 38 0.32768000000000000000e5
-357 1 25 40 -0.32768000000000000000e5
-357 1 26 41 -0.65536000000000000000e5
-357 1 28 43 0.13107200000000000000e6
-357 1 32 47 0.26214400000000000000e6
-357 2 2 32 0.32768000000000000000e5
-357 2 16 30 0.65536000000000000000e5
-357 2 20 34 0.13107200000000000000e6
-357 3 9 38 0.65536000000000000000e5
-357 3 22 35 0.26214400000000000000e6
-357 3 24 37 0.32768000000000000000e5
-357 3 27 40 0.65536000000000000000e5
-357 3 28 41 0.26214400000000000000e6
-357 4 2 30 0.65536000000000000000e5
-357 4 4 32 -0.32768000000000000000e5
-357 4 6 34 0.13107200000000000000e6
-357 4 16 28 0.32768000000000000000e5
-358 1 3 56 0.65536000000000000000e5
-358 1 23 54 -0.65536000000000000000e5
-359 1 2 25 0.32768000000000000000e5
-359 1 2 33 -0.13107200000000000000e6
-359 1 2 49 -0.32768000000000000000e5
-359 1 4 4 0.65536000000000000000e5
-359 1 11 42 0.13107200000000000000e6
-359 1 12 43 0.26214400000000000000e6
-359 1 23 38 -0.32768000000000000000e5
-359 1 28 43 -0.13107200000000000000e6
-359 1 32 47 -0.13107200000000000000e6
-359 1 33 48 -0.13107200000000000000e6
-359 2 2 32 -0.32768000000000000000e5
-359 2 3 17 0.32768000000000000000e5
-359 2 12 26 -0.13107200000000000000e6
-359 3 1 6 -0.32768000000000000000e5
-359 3 1 30 0.65536000000000000000e5
-359 3 1 38 0.32768000000000000000e5
-359 3 2 23 0.32768000000000000000e5
-359 3 8 37 -0.65536000000000000000e5
-359 3 10 23 0.65536000000000000000e5
-359 3 13 42 -0.26214400000000000000e6
-359 3 28 41 -0.13107200000000000000e6
-359 3 29 42 -0.13107200000000000000e6
-359 4 3 31 0.13107200000000000000e6
-359 4 6 18 0.65536000000000000000e5
-360 1 1 40 -0.65536000000000000000e5
-360 1 1 48 -0.65536000000000000000e5
-360 1 2 5 0.65536000000000000000e5
-360 1 2 25 -0.65536000000000000000e5
-360 1 2 33 0.26214400000000000000e6
-360 1 2 49 -0.65536000000000000000e5
-360 1 4 5 0.65536000000000000000e5
-360 1 4 11 0.13107200000000000000e6
-360 1 6 37 -0.65536000000000000000e5
-360 1 9 40 -0.13107200000000000000e6
-360 1 11 42 -0.26214400000000000000e6
-360 1 26 41 0.13107200000000000000e6
-360 1 32 47 -0.26214400000000000000e6
-360 1 33 48 0.26214400000000000000e6
-360 2 3 9 0.13107200000000000000e6
-360 2 3 17 -0.65536000000000000000e5
-360 2 12 26 0.26214400000000000000e6
-360 2 16 30 -0.13107200000000000000e6
-360 2 20 34 -0.26214400000000000000e6
-360 3 1 6 0.65536000000000000000e5
-360 3 1 30 -0.13107200000000000000e6
-360 3 1 38 -0.65536000000000000000e5
-360 3 2 15 -0.26214400000000000000e6
-360 3 2 23 -0.65536000000000000000e5
-360 3 2 39 -0.65536000000000000000e5
-360 3 3 32 -0.26214400000000000000e6
-360 3 4 9 0.13107200000000000000e6
-360 3 8 37 0.13107200000000000000e6
-360 3 13 42 0.52428800000000000000e6
-360 3 22 35 -0.52428800000000000000e6
-360 3 28 41 -0.26214400000000000000e6
-360 3 29 42 0.26214400000000000000e6
-360 4 1 5 0.65536000000000000000e5
-360 4 2 30 -0.13107200000000000000e6
-360 4 3 31 -0.26214400000000000000e6
-360 4 4 16 0.65536000000000000000e5
-360 4 6 18 -0.13107200000000000000e6
-360 4 6 34 -0.26214400000000000000e6
-361 1 1 40 0.65536000000000000000e5
-361 1 1 48 0.65536000000000000000e5
-361 1 2 25 -0.65536000000000000000e5
-361 1 2 49 0.13107200000000000000e6
-361 1 4 6 0.65536000000000000000e5
-361 1 6 37 0.65536000000000000000e5
-361 1 8 39 0.13107200000000000000e6
-361 1 9 40 0.13107200000000000000e6
-361 1 10 41 -0.26214400000000000000e6
-361 1 12 43 -0.52428800000000000000e6
-361 1 23 38 0.65536000000000000000e5
-361 1 26 41 -0.13107200000000000000e6
-361 1 28 43 0.26214400000000000000e6
-361 1 32 47 0.52428800000000000000e6
-361 2 2 32 0.65536000000000000000e5
-361 2 4 18 0.65536000000000000000e5
-361 2 16 30 0.13107200000000000000e6
-361 2 20 34 0.26214400000000000000e6
-361 3 1 30 0.13107200000000000000e6
-361 3 2 39 0.65536000000000000000e5
-361 3 4 5 -0.65536000000000000000e5
-361 3 10 23 -0.13107200000000000000e6
-361 3 22 35 0.52428800000000000000e6
-361 3 28 41 0.52428800000000000000e6
-361 4 2 30 0.13107200000000000000e6
-361 4 4 16 -0.65536000000000000000e5
-361 4 6 34 0.26214400000000000000e6
-362 1 2 9 -0.65536000000000000000e5
-362 1 4 7 0.65536000000000000000e5
-363 1 1 48 0.32768000000000000000e5
-363 1 2 9 0.65536000000000000000e5
-363 1 2 33 0.13107200000000000000e6
-363 1 2 49 0.32768000000000000000e5
-363 1 3 34 -0.26214400000000000000e6
-363 1 4 8 0.65536000000000000000e5
-363 1 4 11 -0.65536000000000000000e5
-363 1 8 39 0.65536000000000000000e5
-363 1 9 40 0.65536000000000000000e5
-363 1 10 41 0.13107200000000000000e6
-363 1 12 43 -0.26214400000000000000e6
-363 1 23 38 0.32768000000000000000e5
-363 1 26 41 -0.65536000000000000000e5
-363 1 28 43 0.13107200000000000000e6
-363 1 32 47 0.26214400000000000000e6
-363 2 2 8 0.65536000000000000000e5
-363 2 2 32 0.32768000000000000000e5
-363 2 3 9 -0.65536000000000000000e5
-363 2 7 21 0.13107200000000000000e6
-363 2 16 30 0.65536000000000000000e5
-363 2 20 34 0.13107200000000000000e6
-363 3 1 14 -0.13107200000000000000e6
-363 3 2 15 0.13107200000000000000e6
-363 3 3 32 0.26214400000000000000e6
-363 3 4 9 -0.65536000000000000000e5
-363 3 10 23 -0.65536000000000000000e5
-363 3 22 35 0.26214400000000000000e6
-363 3 28 41 0.26214400000000000000e6
-363 4 2 30 0.65536000000000000000e5
-363 4 6 34 0.13107200000000000000e6
-364 1 1 48 -0.32768000000000000000e5
-364 1 2 49 -0.32768000000000000000e5
-364 1 4 9 0.65536000000000000000e5
-364 1 4 11 0.65536000000000000000e5
-364 1 8 39 -0.65536000000000000000e5
-364 1 9 40 -0.65536000000000000000e5
-364 1 12 43 0.26214400000000000000e6
-364 1 23 38 -0.32768000000000000000e5
-364 1 26 41 0.65536000000000000000e5
-364 1 28 43 -0.13107200000000000000e6
-364 1 32 47 -0.26214400000000000000e6
-364 2 2 32 -0.32768000000000000000e5
-364 2 3 9 0.65536000000000000000e5
-364 2 16 30 -0.65536000000000000000e5
-364 2 20 34 -0.13107200000000000000e6
-364 3 2 15 -0.13107200000000000000e6
-364 3 3 32 -0.13107200000000000000e6
-364 3 4 9 0.65536000000000000000e5
-364 3 10 23 0.65536000000000000000e5
-364 3 22 35 -0.26214400000000000000e6
-364 3 28 41 -0.26214400000000000000e6
-364 4 2 30 -0.65536000000000000000e5
-364 4 6 34 -0.13107200000000000000e6
-365 1 1 48 0.32768000000000000000e5
-365 1 2 49 0.32768000000000000000e5
-365 1 4 10 0.65536000000000000000e5
-365 1 8 39 0.65536000000000000000e5
-365 1 9 40 0.65536000000000000000e5
-365 1 10 41 -0.13107200000000000000e6
-365 1 12 43 -0.26214400000000000000e6
-365 1 23 38 0.32768000000000000000e5
-365 1 26 41 -0.65536000000000000000e5
-365 1 28 43 0.13107200000000000000e6
-365 1 32 47 0.26214400000000000000e6
-365 2 2 32 0.32768000000000000000e5
-365 2 16 30 0.65536000000000000000e5
-365 2 20 34 0.13107200000000000000e6
-365 3 4 9 -0.65536000000000000000e5
-365 3 10 23 -0.65536000000000000000e5
-365 3 22 35 0.26214400000000000000e6
-365 3 28 41 0.26214400000000000000e6
-365 4 2 30 0.65536000000000000000e5
-365 4 6 34 0.13107200000000000000e6
-366 1 2 33 0.65536000000000000000e5
-366 1 3 34 -0.13107200000000000000e6
-366 1 4 12 0.65536000000000000000e5
-366 1 10 41 0.65536000000000000000e5
-366 2 7 21 0.65536000000000000000e5
-366 3 1 14 -0.65536000000000000000e5
-366 3 3 32 0.65536000000000000000e5
-367 1 2 33 -0.65536000000000000000e5
-367 1 4 13 0.65536000000000000000e5
-367 2 4 10 0.65536000000000000000e5
-367 2 7 21 -0.65536000000000000000e5
-367 3 1 14 0.65536000000000000000e5
-367 3 2 15 0.65536000000000000000e5
-367 3 3 16 -0.13107200000000000000e6
-368 1 4 14 0.65536000000000000000e5
-368 1 10 41 -0.65536000000000000000e5
-368 3 2 15 -0.65536000000000000000e5
-368 3 3 32 -0.65536000000000000000e5
-369 1 4 15 0.65536000000000000000e5
-369 1 6 13 -0.65536000000000000000e5
-370 1 3 34 -0.65536000000000000000e5
-370 1 4 16 0.65536000000000000000e5
-370 3 3 16 -0.65536000000000000000e5
-371 1 3 18 -0.65536000000000000000e5
-371 1 4 17 0.65536000000000000000e5
-372 1 4 18 0.65536000000000000000e5
-372 1 4 35 -0.65536000000000000000e5
-372 3 4 17 -0.65536000000000000000e5
-373 1 4 20 0.65536000000000000000e5
-373 1 10 17 -0.65536000000000000000e5
-374 1 3 18 -0.16384000000000000000e5
-374 1 4 21 0.65536000000000000000e5
-374 1 4 35 0.16384000000000000000e5
-374 1 5 20 -0.32768000000000000000e5
-374 1 5 36 0.32768000000000000000e5
-374 1 10 17 -0.32768000000000000000e5
-374 1 12 43 0.32768000000000000000e5
-374 1 14 45 0.32768000000000000000e5
-374 1 17 32 -0.65536000000000000000e5
-374 1 17 48 -0.16384000000000000000e5
-374 1 18 49 -0.16384000000000000000e5
-374 2 9 23 0.16384000000000000000e5
-374 2 14 28 -0.16384000000000000000e5
-374 3 3 16 -0.16384000000000000000e5
-374 3 4 17 -0.16384000000000000000e5
-374 3 5 34 0.16384000000000000000e5
-374 3 13 42 -0.16384000000000000000e5
-374 3 14 27 0.32768000000000000000e5
-374 3 14 43 -0.16384000000000000000e5
-374 4 2 14 -0.16384000000000000000e5
-374 4 3 15 -0.32768000000000000000e5
-375 1 1 48 -0.65536000000000000000e5
-375 1 4 22 0.65536000000000000000e5
-375 3 1 38 -0.65536000000000000000e5
-375 3 2 23 -0.65536000000000000000e5
-376 1 2 25 -0.65536000000000000000e5
-376 1 4 23 0.65536000000000000000e5
-377 1 2 25 0.65536000000000000000e5
-377 1 2 33 -0.26214400000000000000e6
-377 1 2 49 -0.65536000000000000000e5
-377 1 4 24 0.65536000000000000000e5
-377 1 11 42 0.26214400000000000000e6
-377 1 12 43 0.52428800000000000000e6
-377 1 23 38 -0.65536000000000000000e5
-377 1 28 43 -0.26214400000000000000e6
-377 1 32 47 -0.26214400000000000000e6
-377 1 33 48 -0.26214400000000000000e6
-377 2 2 32 -0.65536000000000000000e5
-377 2 3 17 0.65536000000000000000e5
-377 2 12 26 -0.26214400000000000000e6
-377 3 1 30 0.13107200000000000000e6
-377 3 1 38 0.65536000000000000000e5
-377 3 2 23 0.65536000000000000000e5
-377 3 8 37 -0.13107200000000000000e6
-377 3 10 23 0.13107200000000000000e6
-377 3 13 42 -0.52428800000000000000e6
-377 3 28 41 -0.26214400000000000000e6
-377 3 29 42 -0.26214400000000000000e6
-377 4 3 31 0.26214400000000000000e6
-377 4 6 18 0.13107200000000000000e6
-378 1 1 40 -0.65536000000000000000e5
-378 1 2 33 0.26214400000000000000e6
-378 1 4 25 0.65536000000000000000e5
-378 1 6 37 -0.65536000000000000000e5
-378 1 11 42 -0.26214400000000000000e6
-378 1 12 43 -0.52428800000000000000e6
-378 1 23 38 0.65536000000000000000e5
-378 1 28 43 0.26214400000000000000e6
-378 1 32 47 0.26214400000000000000e6
-378 1 33 48 0.26214400000000000000e6
-378 2 2 32 0.65536000000000000000e5
-378 2 3 17 -0.65536000000000000000e5
-378 2 12 26 0.26214400000000000000e6
-378 3 1 30 -0.26214400000000000000e6
-378 3 1 38 -0.65536000000000000000e5
-378 3 2 23 -0.65536000000000000000e5
-378 3 2 39 -0.65536000000000000000e5
-378 3 8 37 0.13107200000000000000e6
-378 3 10 23 -0.13107200000000000000e6
-378 3 13 42 0.52428800000000000000e6
-378 3 28 41 0.26214400000000000000e6
-378 3 29 42 0.26214400000000000000e6
-378 4 3 31 -0.26214400000000000000e6
-378 4 4 16 0.65536000000000000000e5
-378 4 6 18 -0.13107200000000000000e6
-379 1 1 40 0.65536000000000000000e5
-379 1 1 48 0.65536000000000000000e5
-379 1 2 25 -0.65536000000000000000e5
-379 1 2 49 0.13107200000000000000e6
-379 1 4 26 0.65536000000000000000e5
-379 1 6 37 0.65536000000000000000e5
-379 1 8 39 0.13107200000000000000e6
-379 1 9 40 0.13107200000000000000e6
-379 1 10 41 -0.26214400000000000000e6
-379 1 12 43 -0.52428800000000000000e6
-379 1 23 38 0.65536000000000000000e5
-379 1 26 41 -0.13107200000000000000e6
-379 1 28 43 0.26214400000000000000e6
-379 1 32 47 0.52428800000000000000e6
-379 2 2 32 0.65536000000000000000e5
-379 2 4 18 0.65536000000000000000e5
-379 2 16 30 0.13107200000000000000e6
-379 2 20 34 0.26214400000000000000e6
-379 3 1 30 0.13107200000000000000e6
-379 3 2 39 0.65536000000000000000e5
-379 3 10 23 -0.13107200000000000000e6
-379 3 22 35 0.52428800000000000000e6
-379 3 28 41 0.52428800000000000000e6
-379 4 2 30 0.13107200000000000000e6
-379 4 4 16 -0.65536000000000000000e5
-379 4 6 34 0.26214400000000000000e6
-380 1 1 48 -0.32768000000000000000e5
-380 1 2 33 -0.13107200000000000000e6
-380 1 2 49 -0.32768000000000000000e5
-380 1 4 27 0.65536000000000000000e5
-380 1 11 42 0.13107200000000000000e6
-380 1 12 43 0.26214400000000000000e6
-380 1 23 38 -0.32768000000000000000e5
-380 1 28 43 -0.13107200000000000000e6
-380 1 32 47 -0.13107200000000000000e6
-380 1 33 48 -0.13107200000000000000e6
-380 2 2 32 -0.32768000000000000000e5
-380 2 12 26 -0.13107200000000000000e6
-380 3 1 30 0.65536000000000000000e5
-380 3 8 37 -0.65536000000000000000e5
-380 3 10 23 0.65536000000000000000e5
-380 3 13 42 -0.26214400000000000000e6
-380 3 28 41 -0.13107200000000000000e6
-380 3 29 42 -0.13107200000000000000e6
-380 4 3 31 0.13107200000000000000e6
-380 4 6 18 0.65536000000000000000e5
-381 1 4 28 0.65536000000000000000e5
-381 1 8 39 -0.65536000000000000000e5
-381 3 1 30 -0.65536000000000000000e5
-382 1 1 48 0.32768000000000000000e5
-382 1 2 49 0.32768000000000000000e5
-382 1 4 29 0.65536000000000000000e5
-382 1 8 39 0.65536000000000000000e5
-382 1 9 40 0.65536000000000000000e5
-382 1 10 41 -0.13107200000000000000e6
-382 1 12 43 -0.26214400000000000000e6
-382 1 23 38 0.32768000000000000000e5
-382 1 26 41 -0.65536000000000000000e5
-382 1 28 43 0.13107200000000000000e6
-382 1 32 47 0.26214400000000000000e6
-382 2 2 32 0.32768000000000000000e5
-382 2 16 30 0.65536000000000000000e5
-382 2 20 34 0.13107200000000000000e6
-382 3 10 23 -0.65536000000000000000e5
-382 3 22 35 0.26214400000000000000e6
-382 3 28 41 0.26214400000000000000e6
-382 4 2 30 0.65536000000000000000e5
-382 4 6 34 0.13107200000000000000e6
-383 1 4 30 0.65536000000000000000e5
-383 1 10 25 -0.65536000000000000000e5
-384 1 2 33 -0.65536000000000000000e5
-384 1 4 31 0.65536000000000000000e5
-385 1 4 32 0.65536000000000000000e5
-385 1 10 41 -0.65536000000000000000e5
-385 3 3 32 -0.65536000000000000000e5
-386 1 2 33 0.65536000000000000000e5
-386 1 4 33 0.65536000000000000000e5
-386 1 10 41 0.65536000000000000000e5
-386 1 12 43 -0.13107200000000000000e6
-386 2 12 26 0.65536000000000000000e5
-386 3 3 32 0.65536000000000000000e5
-386 3 14 27 -0.13107200000000000000e6
-386 4 8 20 0.65536000000000000000e5
-387 1 4 34 0.65536000000000000000e5
-387 1 12 43 -0.65536000000000000000e5
-387 3 14 27 -0.65536000000000000000e5
-388 1 4 35 -0.32768000000000000000e5
-388 1 4 36 0.65536000000000000000e5
-388 1 12 43 -0.32768000000000000000e5
-388 1 14 45 -0.65536000000000000000e5
-388 1 17 48 0.32768000000000000000e5
-388 1 18 49 0.32768000000000000000e5
-388 2 9 23 -0.32768000000000000000e5
-388 2 14 28 0.32768000000000000000e5
-388 3 5 34 -0.32768000000000000000e5
-388 3 13 42 0.32768000000000000000e5
-388 3 14 27 -0.32768000000000000000e5
-388 3 14 43 0.32768000000000000000e5
-389 1 1 40 -0.65536000000000000000e5
-389 1 4 37 0.65536000000000000000e5
-390 1 2 49 -0.65536000000000000000e5
-390 1 4 38 0.65536000000000000000e5
-390 3 2 39 -0.65536000000000000000e5
-391 1 4 39 0.65536000000000000000e5
-391 1 6 37 -0.65536000000000000000e5
-392 1 1 48 0.65536000000000000000e5
-392 1 2 49 0.13107200000000000000e6
-392 1 4 40 0.65536000000000000000e5
-392 1 8 39 0.13107200000000000000e6
-392 1 9 40 0.13107200000000000000e6
-392 1 10 41 -0.26214400000000000000e6
-392 1 12 43 -0.52428800000000000000e6
-392 1 23 38 0.65536000000000000000e5
-392 1 24 39 0.65536000000000000000e5
-392 1 26 41 -0.13107200000000000000e6
-392 1 28 43 0.26214400000000000000e6
-392 1 32 47 0.52428800000000000000e6
-392 2 2 32 0.65536000000000000000e5
-392 2 3 33 0.65536000000000000000e5
-392 2 16 30 0.13107200000000000000e6
-392 2 20 34 0.26214400000000000000e6
-392 3 3 40 -0.65536000000000000000e5
-392 3 9 38 0.13107200000000000000e6
-392 3 22 35 0.52428800000000000000e6
-392 3 28 41 0.52428800000000000000e6
-392 4 2 30 0.13107200000000000000e6
-392 4 6 34 0.26214400000000000000e6
-393 1 4 41 0.65536000000000000000e5
-393 1 8 39 -0.65536000000000000000e5
-394 1 1 48 0.32768000000000000000e5
-394 1 2 49 0.32768000000000000000e5
-394 1 4 42 0.65536000000000000000e5
-394 1 8 39 0.65536000000000000000e5
-394 1 9 40 0.65536000000000000000e5
-394 1 10 41 -0.13107200000000000000e6
-394 1 12 43 -0.26214400000000000000e6
-394 1 23 38 0.32768000000000000000e5
-394 1 26 41 -0.65536000000000000000e5
-394 1 28 43 0.13107200000000000000e6
-394 1 32 47 0.26214400000000000000e6
-394 2 2 32 0.32768000000000000000e5
-394 2 16 30 0.65536000000000000000e5
-394 2 20 34 0.13107200000000000000e6
-394 3 22 35 0.26214400000000000000e6
-394 3 28 41 0.26214400000000000000e6
-394 4 2 30 0.65536000000000000000e5
-394 4 6 34 0.13107200000000000000e6
-395 1 4 43 0.65536000000000000000e5
-395 1 9 40 -0.65536000000000000000e5
-396 1 4 44 0.65536000000000000000e5
-396 1 10 41 -0.65536000000000000000e5
-397 1 4 45 0.65536000000000000000e5
-397 1 10 41 0.65536000000000000000e5
-397 1 11 42 0.65536000000000000000e5
-397 1 28 43 -0.65536000000000000000e5
-397 1 32 47 -0.65536000000000000000e5
-397 1 33 48 -0.65536000000000000000e5
-397 3 13 42 -0.13107200000000000000e6
-397 3 28 41 -0.65536000000000000000e5
-397 3 29 42 -0.65536000000000000000e5
-397 4 3 31 0.65536000000000000000e5
-398 1 4 46 0.65536000000000000000e5
-398 1 17 48 -0.65536000000000000000e5
-398 3 13 42 -0.65536000000000000000e5
-399 1 2 49 -0.65536000000000000000e5
-399 1 4 47 0.65536000000000000000e5
-400 1 4 48 0.65536000000000000000e5
-400 1 24 39 -0.65536000000000000000e5
-401 1 1 48 0.65536000000000000000e5
-401 1 2 49 0.13107200000000000000e6
-401 1 4 49 0.65536000000000000000e5
-401 1 8 39 0.13107200000000000000e6
-401 1 9 40 0.13107200000000000000e6
-401 1 10 41 -0.26214400000000000000e6
-401 1 12 43 -0.52428800000000000000e6
-401 1 23 38 0.65536000000000000000e5
-401 1 24 39 0.65536000000000000000e5
-401 1 26 41 -0.13107200000000000000e6
-401 1 28 43 0.26214400000000000000e6
-401 1 32 47 0.52428800000000000000e6
-401 2 2 32 0.65536000000000000000e5
-401 2 3 33 0.65536000000000000000e5
-401 2 16 30 0.13107200000000000000e6
-401 2 20 34 0.26214400000000000000e6
-401 3 9 38 0.13107200000000000000e6
-401 3 22 35 0.52428800000000000000e6
-401 3 28 41 0.52428800000000000000e6
-401 4 2 30 0.13107200000000000000e6
-401 4 6 34 0.26214400000000000000e6
-402 1 1 48 0.32768000000000000000e5
-402 1 2 49 0.32768000000000000000e5
-402 1 4 50 0.65536000000000000000e5
-402 1 8 39 0.65536000000000000000e5
-402 1 9 40 0.65536000000000000000e5
-402 1 10 41 -0.13107200000000000000e6
-402 1 12 43 -0.26214400000000000000e6
-402 1 23 38 0.32768000000000000000e5
-402 1 26 41 -0.65536000000000000000e5
-402 1 28 43 0.13107200000000000000e6
-402 1 32 47 0.26214400000000000000e6
-402 2 2 32 0.32768000000000000000e5
-402 2 16 30 0.65536000000000000000e5
-402 2 20 34 0.13107200000000000000e6
-402 3 9 38 0.65536000000000000000e5
-402 3 22 35 0.26214400000000000000e6
-402 3 28 41 0.26214400000000000000e6
-402 4 2 30 0.65536000000000000000e5
-402 4 6 34 0.13107200000000000000e6
-403 1 4 51 0.65536000000000000000e5
-403 1 26 41 -0.65536000000000000000e5
-404 1 4 52 0.65536000000000000000e5
-404 1 28 43 -0.65536000000000000000e5
-405 1 4 53 0.65536000000000000000e5
-405 1 6 53 0.65536000000000000000e5
-405 1 24 39 -0.65536000000000000000e5
-405 1 25 40 -0.65536000000000000000e5
-405 3 25 38 -0.65536000000000000000e5
-405 3 27 40 0.13107200000000000000e6
-405 4 4 32 -0.65536000000000000000e5
-406 1 1 48 0.65536000000000000000e5
-406 1 2 49 0.13107200000000000000e6
-406 1 4 54 0.65536000000000000000e5
-406 1 8 39 0.13107200000000000000e6
-406 1 9 40 0.13107200000000000000e6
-406 1 10 41 -0.26214400000000000000e6
-406 1 12 43 -0.52428800000000000000e6
-406 1 23 38 0.65536000000000000000e5
-406 1 24 39 0.65536000000000000000e5
-406 1 26 41 -0.13107200000000000000e6
-406 1 28 43 0.26214400000000000000e6
-406 1 32 47 0.52428800000000000000e6
-406 2 2 32 0.65536000000000000000e5
-406 2 3 33 0.65536000000000000000e5
-406 2 16 30 0.13107200000000000000e6
-406 2 20 34 0.26214400000000000000e6
-406 3 9 38 0.13107200000000000000e6
-406 3 22 35 0.52428800000000000000e6
-406 3 25 38 0.65536000000000000000e5
-406 3 28 41 0.52428800000000000000e6
-406 4 2 30 0.13107200000000000000e6
-406 4 6 34 0.26214400000000000000e6
-407 1 4 55 0.65536000000000000000e5
-407 1 26 41 -0.65536000000000000000e5
-407 3 27 40 0.65536000000000000000e5
-408 1 4 56 0.65536000000000000000e5
-408 1 40 47 -0.65536000000000000000e5
-409 1 1 40 0.32768000000000000000e5
-409 1 1 48 0.32768000000000000000e5
-409 1 2 25 -0.32768000000000000000e5
-409 1 2 49 0.65536000000000000000e5
-409 1 5 5 0.65536000000000000000e5
-409 1 6 37 0.32768000000000000000e5
-409 1 8 39 0.65536000000000000000e5
-409 1 9 40 0.65536000000000000000e5
-409 1 10 41 -0.13107200000000000000e6
-409 1 12 43 -0.26214400000000000000e6
-409 1 23 38 0.32768000000000000000e5
-409 1 26 41 -0.65536000000000000000e5
-409 1 28 43 0.13107200000000000000e6
-409 1 32 47 0.26214400000000000000e6
-409 2 2 32 0.32768000000000000000e5
-409 2 4 18 0.32768000000000000000e5
-409 2 16 30 0.65536000000000000000e5
-409 2 20 34 0.13107200000000000000e6
-409 3 1 30 0.65536000000000000000e5
-409 3 2 39 0.32768000000000000000e5
-409 3 4 5 -0.32768000000000000000e5
-409 3 10 23 -0.65536000000000000000e5
-409 3 22 35 0.26214400000000000000e6
-409 3 28 41 0.26214400000000000000e6
-409 4 2 30 0.65536000000000000000e5
-409 4 4 16 -0.32768000000000000000e5
-409 4 6 34 0.13107200000000000000e6
-410 1 2 5 -0.65536000000000000000e5
-410 1 2 25 0.13107200000000000000e6
-410 1 2 33 -0.26214400000000000000e6
-410 1 2 49 -0.65536000000000000000e5
-410 1 4 11 -0.26214400000000000000e6
-410 1 5 6 0.65536000000000000000e5
-410 1 8 39 -0.13107200000000000000e6
-410 1 10 41 0.26214400000000000000e6
-410 1 11 42 0.26214400000000000000e6
-410 1 12 43 0.52428800000000000000e6
-410 1 23 38 -0.65536000000000000000e5
-410 1 28 43 -0.26214400000000000000e6
-410 1 32 47 -0.26214400000000000000e6
-410 1 33 48 -0.26214400000000000000e6
-410 2 2 32 -0.65536000000000000000e5
-410 2 3 9 -0.13107200000000000000e6
-410 2 3 17 0.65536000000000000000e5
-410 2 4 18 -0.65536000000000000000e5
-410 2 5 27 0.65536000000000000000e5
-410 2 12 26 -0.26214400000000000000e6
-410 3 1 6 -0.65536000000000000000e5
-410 3 1 38 0.65536000000000000000e5
-410 3 2 15 0.26214400000000000000e6
-410 3 2 23 0.65536000000000000000e5
-410 3 3 32 0.26214400000000000000e6
-410 3 4 5 0.65536000000000000000e5
-410 3 4 9 -0.13107200000000000000e6
-410 3 8 37 -0.13107200000000000000e6
-410 3 10 23 0.13107200000000000000e6
-410 3 13 42 -0.52428800000000000000e6
-410 3 28 41 -0.26214400000000000000e6
-410 3 29 42 -0.26214400000000000000e6
-410 4 1 5 -0.65536000000000000000e5
-410 4 3 31 0.26214400000000000000e6
-410 4 4 4 0.13107200000000000000e6
-410 4 5 17 0.65536000000000000000e5
-410 4 6 18 0.13107200000000000000e6
-411 1 1 48 0.32768000000000000000e5
-411 1 2 9 0.65536000000000000000e5
-411 1 2 33 0.13107200000000000000e6
-411 1 2 49 0.32768000000000000000e5
-411 1 3 34 -0.26214400000000000000e6
-411 1 4 11 -0.65536000000000000000e5
-411 1 5 7 0.65536000000000000000e5
-411 1 8 39 0.65536000000000000000e5
-411 1 9 40 0.65536000000000000000e5
-411 1 10 41 0.13107200000000000000e6
-411 1 12 43 -0.26214400000000000000e6
-411 1 23 38 0.32768000000000000000e5
-411 1 26 41 -0.65536000000000000000e5
-411 1 28 43 0.13107200000000000000e6
-411 1 32 47 0.26214400000000000000e6
-411 2 2 8 0.65536000000000000000e5
-411 2 2 32 0.32768000000000000000e5
-411 2 3 9 -0.65536000000000000000e5
-411 2 7 21 0.13107200000000000000e6
-411 2 16 30 0.65536000000000000000e5
-411 2 20 34 0.13107200000000000000e6
-411 3 1 14 -0.13107200000000000000e6
-411 3 2 15 0.13107200000000000000e6
-411 3 3 32 0.26214400000000000000e6
-411 3 4 9 -0.65536000000000000000e5
-411 3 10 23 -0.65536000000000000000e5
-411 3 22 35 0.26214400000000000000e6
-411 3 28 41 0.26214400000000000000e6
-411 4 2 30 0.65536000000000000000e5
-411 4 6 34 0.13107200000000000000e6
-412 1 1 48 -0.32768000000000000000e5
-412 1 2 49 -0.32768000000000000000e5
-412 1 4 11 0.65536000000000000000e5
-412 1 5 8 0.65536000000000000000e5
-412 1 8 39 -0.65536000000000000000e5
-412 1 9 40 -0.65536000000000000000e5
-412 1 12 43 0.26214400000000000000e6
-412 1 23 38 -0.32768000000000000000e5
-412 1 26 41 0.65536000000000000000e5
-412 1 28 43 -0.13107200000000000000e6
-412 1 32 47 -0.26214400000000000000e6
-412 2 2 32 -0.32768000000000000000e5
-412 2 3 9 0.65536000000000000000e5
-412 2 16 30 -0.65536000000000000000e5
-412 2 20 34 -0.13107200000000000000e6
-412 3 2 15 -0.13107200000000000000e6
-412 3 3 32 -0.13107200000000000000e6
-412 3 4 9 0.65536000000000000000e5
-412 3 10 23 0.65536000000000000000e5
-412 3 22 35 -0.26214400000000000000e6
-412 3 28 41 -0.26214400000000000000e6
-412 4 2 30 -0.65536000000000000000e5
-412 4 6 34 -0.13107200000000000000e6
-413 1 1 48 0.32768000000000000000e5
-413 1 2 49 0.32768000000000000000e5
-413 1 5 9 0.65536000000000000000e5
-413 1 8 39 0.65536000000000000000e5
-413 1 9 40 0.65536000000000000000e5
-413 1 10 41 -0.13107200000000000000e6
-413 1 12 43 -0.26214400000000000000e6
-413 1 23 38 0.32768000000000000000e5
-413 1 26 41 -0.65536000000000000000e5
-413 1 28 43 0.13107200000000000000e6
-413 1 32 47 0.26214400000000000000e6
-413 2 2 32 0.32768000000000000000e5
-413 2 16 30 0.65536000000000000000e5
-413 2 20 34 0.13107200000000000000e6
-413 3 4 9 -0.65536000000000000000e5
-413 3 10 23 -0.65536000000000000000e5
-413 3 22 35 0.26214400000000000000e6
-413 3 28 41 0.26214400000000000000e6
-413 4 2 30 0.65536000000000000000e5
-413 4 6 34 0.13107200000000000000e6
-414 1 4 11 -0.65536000000000000000e5
-414 1 5 10 0.65536000000000000000e5
-415 1 1 48 -0.32768000000000000000e5
-415 1 2 49 -0.32768000000000000000e5
-415 1 4 11 0.65536000000000000000e5
-415 1 5 11 0.65536000000000000000e5
-415 1 6 13 -0.13107200000000000000e6
-415 1 8 39 -0.65536000000000000000e5
-415 1 9 40 -0.13107200000000000000e6
-415 1 11 42 -0.13107200000000000000e6
-415 1 12 43 0.26214400000000000000e6
-415 1 23 38 -0.32768000000000000000e5
-415 1 26 41 0.13107200000000000000e6
-415 1 28 43 -0.13107200000000000000e6
-415 1 32 47 -0.13107200000000000000e6
-415 1 33 48 0.13107200000000000000e6
-415 2 2 32 -0.32768000000000000000e5
-415 2 4 34 0.65536000000000000000e5
-415 2 16 30 -0.65536000000000000000e5
-415 2 20 34 -0.13107200000000000000e6
-415 3 4 9 0.65536000000000000000e5
-415 3 9 38 -0.65536000000000000000e5
-415 3 10 23 0.65536000000000000000e5
-415 3 10 39 -0.65536000000000000000e5
-415 3 13 42 0.26214400000000000000e6
-415 3 22 35 -0.26214400000000000000e6
-415 3 28 41 -0.13107200000000000000e6
-415 3 29 42 0.13107200000000000000e6
-415 4 2 30 -0.65536000000000000000e5
-415 4 3 31 -0.13107200000000000000e6
-415 4 4 8 0.65536000000000000000e5
-415 4 6 34 -0.13107200000000000000e6
-415 4 7 19 0.65536000000000000000e5
-416 1 2 33 -0.65536000000000000000e5
-416 1 5 12 0.65536000000000000000e5
-416 2 4 10 0.65536000000000000000e5
-416 2 7 21 -0.65536000000000000000e5
-416 3 1 14 0.65536000000000000000e5
-416 3 2 15 0.65536000000000000000e5
-416 3 3 16 -0.13107200000000000000e6
-417 1 5 13 0.65536000000000000000e5
-417 1 10 41 -0.65536000000000000000e5
-417 3 2 15 -0.65536000000000000000e5
-417 3 3 32 -0.65536000000000000000e5
-418 1 5 14 0.65536000000000000000e5
-418 1 6 13 -0.65536000000000000000e5
-419 1 4 35 -0.13107200000000000000e6
-419 1 5 15 0.65536000000000000000e5
-419 1 6 13 0.65536000000000000000e5
-419 1 10 41 0.65536000000000000000e5
-419 2 5 11 0.65536000000000000000e5
-419 3 2 15 0.65536000000000000000e5
-419 3 3 32 0.65536000000000000000e5
-419 3 4 17 -0.13107200000000000000e6
-420 1 3 18 -0.65536000000000000000e5
-420 1 5 16 0.65536000000000000000e5
-421 1 4 35 -0.65536000000000000000e5
-421 1 5 17 0.65536000000000000000e5
-421 3 4 17 -0.65536000000000000000e5
-422 1 5 18 0.65536000000000000000e5
-422 1 5 20 -0.13107200000000000000e6
-422 1 5 36 0.13107200000000000000e6
-422 1 14 45 -0.13107200000000000000e6
-422 1 17 48 0.65536000000000000000e5
-422 1 18 49 0.65536000000000000000e5
-422 2 14 28 0.65536000000000000000e5
-422 3 4 17 0.65536000000000000000e5
-422 3 5 18 0.65536000000000000000e5
-422 3 5 34 -0.65536000000000000000e5
-422 3 13 42 0.65536000000000000000e5
-422 3 14 43 0.65536000000000000000e5
-422 4 8 12 0.65536000000000000000e5
-423 1 5 19 0.65536000000000000000e5
-423 1 10 17 -0.65536000000000000000e5
-424 1 3 18 0.16384000000000000000e5
-424 1 4 35 -0.16384000000000000000e5
-424 1 5 20 0.32768000000000000000e5
-424 1 5 21 0.65536000000000000000e5
-424 1 5 36 -0.32768000000000000000e5
-424 1 10 17 0.32768000000000000000e5
-424 1 12 43 -0.32768000000000000000e5
-424 1 13 20 -0.13107200000000000000e6
-424 1 14 45 -0.32768000000000000000e5
-424 1 17 32 0.65536000000000000000e5
-424 1 17 48 0.16384000000000000000e5
-424 1 18 49 0.16384000000000000000e5
-424 1 20 27 0.65536000000000000000e5
-424 2 9 23 -0.16384000000000000000e5
-424 2 11 25 0.65536000000000000000e5
-424 2 14 28 0.16384000000000000000e5
-424 3 3 16 0.16384000000000000000e5
-424 3 4 17 0.16384000000000000000e5
-424 3 5 34 -0.16384000000000000000e5
-424 3 7 20 0.65536000000000000000e5
-424 3 13 42 0.16384000000000000000e5
-424 3 14 27 -0.32768000000000000000e5
-424 3 14 43 0.16384000000000000000e5
-424 4 2 14 0.16384000000000000000e5
-424 4 3 15 0.32768000000000000000e5
-424 4 10 14 0.65536000000000000000e5
-425 1 2 25 -0.65536000000000000000e5
-425 1 5 22 0.65536000000000000000e5
-426 1 2 25 0.65536000000000000000e5
-426 1 2 33 -0.26214400000000000000e6
-426 1 2 49 -0.65536000000000000000e5
-426 1 5 23 0.65536000000000000000e5
-426 1 11 42 0.26214400000000000000e6
-426 1 12 43 0.52428800000000000000e6
-426 1 23 38 -0.65536000000000000000e5
-426 1 28 43 -0.26214400000000000000e6
-426 1 32 47 -0.26214400000000000000e6
-426 1 33 48 -0.26214400000000000000e6
-426 2 2 32 -0.65536000000000000000e5
-426 2 3 17 0.65536000000000000000e5
-426 2 12 26 -0.26214400000000000000e6
-426 3 1 30 0.13107200000000000000e6
-426 3 1 38 0.65536000000000000000e5
-426 3 2 23 0.65536000000000000000e5
-426 3 8 37 -0.13107200000000000000e6
-426 3 10 23 0.13107200000000000000e6
-426 3 13 42 -0.52428800000000000000e6
-426 3 28 41 -0.26214400000000000000e6
-426 3 29 42 -0.26214400000000000000e6
-426 4 3 31 0.26214400000000000000e6
-426 4 6 18 0.13107200000000000000e6
-427 1 1 40 -0.65536000000000000000e5
-427 1 2 33 0.26214400000000000000e6
-427 1 5 24 0.65536000000000000000e5
-427 1 6 37 -0.65536000000000000000e5
-427 1 11 42 -0.26214400000000000000e6
-427 1 12 43 -0.52428800000000000000e6
-427 1 23 38 0.65536000000000000000e5
-427 1 28 43 0.26214400000000000000e6
-427 1 32 47 0.26214400000000000000e6
-427 1 33 48 0.26214400000000000000e6
-427 2 2 32 0.65536000000000000000e5
-427 2 3 17 -0.65536000000000000000e5
-427 2 12 26 0.26214400000000000000e6
-427 3 1 30 -0.26214400000000000000e6
-427 3 1 38 -0.65536000000000000000e5
-427 3 2 23 -0.65536000000000000000e5
-427 3 2 39 -0.65536000000000000000e5
-427 3 8 37 0.13107200000000000000e6
-427 3 10 23 -0.13107200000000000000e6
-427 3 13 42 0.52428800000000000000e6
-427 3 28 41 0.26214400000000000000e6
-427 3 29 42 0.26214400000000000000e6
-427 4 3 31 -0.26214400000000000000e6
-427 4 4 16 0.65536000000000000000e5
-427 4 6 18 -0.13107200000000000000e6
-428 1 1 40 0.65536000000000000000e5
-428 1 1 48 0.65536000000000000000e5
-428 1 2 25 -0.65536000000000000000e5
-428 1 2 49 0.13107200000000000000e6
-428 1 5 25 0.65536000000000000000e5
-428 1 6 37 0.65536000000000000000e5
-428 1 8 39 0.13107200000000000000e6
-428 1 9 40 0.13107200000000000000e6
-428 1 10 41 -0.26214400000000000000e6
-428 1 12 43 -0.52428800000000000000e6
-428 1 23 38 0.65536000000000000000e5
-428 1 26 41 -0.13107200000000000000e6
-428 1 28 43 0.26214400000000000000e6
-428 1 32 47 0.52428800000000000000e6
-428 2 2 32 0.65536000000000000000e5
-428 2 4 18 0.65536000000000000000e5
-428 2 16 30 0.13107200000000000000e6
-428 2 20 34 0.26214400000000000000e6
-428 3 1 30 0.13107200000000000000e6
-428 3 2 39 0.65536000000000000000e5
-428 3 10 23 -0.13107200000000000000e6
-428 3 22 35 0.52428800000000000000e6
-428 3 28 41 0.52428800000000000000e6
-428 4 2 30 0.13107200000000000000e6
-428 4 4 16 -0.65536000000000000000e5
-428 4 6 34 0.26214400000000000000e6
-429 1 1 48 -0.65536000000000000000e5
-429 1 2 25 0.65536000000000000000e5
-429 1 2 33 -0.26214400000000000000e6
-429 1 2 49 -0.13107200000000000000e6
-429 1 5 26 0.65536000000000000000e5
-429 1 8 39 -0.13107200000000000000e6
-429 1 9 40 -0.13107200000000000000e6
-429 1 10 25 -0.13107200000000000000e6
-429 1 10 41 0.26214400000000000000e6
-429 1 11 42 0.26214400000000000000e6
-429 1 12 43 0.10485760000000000000e7
-429 1 23 38 -0.13107200000000000000e6
-429 1 26 41 0.13107200000000000000e6
-429 1 28 43 -0.52428800000000000000e6
-429 1 32 47 -0.78643200000000000000e6
-429 1 33 48 -0.26214400000000000000e6
-429 2 2 32 -0.13107200000000000000e6
-429 2 3 17 0.65536000000000000000e5
-429 2 4 18 -0.65536000000000000000e5
-429 2 5 27 0.65536000000000000000e5
-429 2 12 26 -0.26214400000000000000e6
-429 2 16 30 -0.13107200000000000000e6
-429 2 20 34 -0.26214400000000000000e6
-429 3 1 30 0.13107200000000000000e6
-429 3 1 38 0.65536000000000000000e5
-429 3 2 23 0.65536000000000000000e5
-429 3 8 37 -0.13107200000000000000e6
-429 3 10 23 0.26214400000000000000e6
-429 3 13 42 -0.52428800000000000000e6
-429 3 22 35 -0.52428800000000000000e6
-429 3 28 41 -0.78643200000000000000e6
-429 3 29 42 -0.26214400000000000000e6
-429 4 2 30 -0.13107200000000000000e6
-429 4 3 31 0.26214400000000000000e6
-429 4 5 17 0.65536000000000000000e5
-429 4 6 18 0.13107200000000000000e6
-429 4 6 34 -0.26214400000000000000e6
-430 1 5 27 0.65536000000000000000e5
-430 1 8 39 -0.65536000000000000000e5
-430 3 1 30 -0.65536000000000000000e5
-431 1 1 48 0.32768000000000000000e5
-431 1 2 49 0.32768000000000000000e5
-431 1 5 28 0.65536000000000000000e5
-431 1 8 39 0.65536000000000000000e5
-431 1 9 40 0.65536000000000000000e5
-431 1 10 41 -0.13107200000000000000e6
-431 1 12 43 -0.26214400000000000000e6
-431 1 23 38 0.32768000000000000000e5
-431 1 26 41 -0.65536000000000000000e5
-431 1 28 43 0.13107200000000000000e6
-431 1 32 47 0.26214400000000000000e6
-431 2 2 32 0.32768000000000000000e5
-431 2 16 30 0.65536000000000000000e5
-431 2 20 34 0.13107200000000000000e6
-431 3 10 23 -0.65536000000000000000e5
-431 3 22 35 0.26214400000000000000e6
-431 3 28 41 0.26214400000000000000e6
-431 4 2 30 0.65536000000000000000e5
-431 4 6 34 0.13107200000000000000e6
-432 1 5 29 0.65536000000000000000e5
-432 1 10 25 -0.65536000000000000000e5
-433 1 1 48 -0.32768000000000000000e5
-433 1 2 33 0.13107200000000000000e6
-433 1 2 49 -0.32768000000000000000e5
-433 1 5 30 0.65536000000000000000e5
-433 1 8 39 -0.65536000000000000000e5
-433 1 9 40 -0.13107200000000000000e6
-433 1 10 25 0.65536000000000000000e5
-433 1 10 41 0.13107200000000000000e6
-433 1 11 42 -0.13107200000000000000e6
-433 1 23 38 -0.32768000000000000000e5
-433 1 26 41 0.13107200000000000000e6
-433 1 28 43 -0.13107200000000000000e6
-433 1 32 47 -0.13107200000000000000e6
-433 1 33 48 0.13107200000000000000e6
-433 2 2 32 -0.32768000000000000000e5
-433 2 4 34 0.65536000000000000000e5
-433 2 12 26 0.13107200000000000000e6
-433 2 16 30 -0.65536000000000000000e5
-433 2 20 34 -0.13107200000000000000e6
-433 3 3 32 0.13107200000000000000e6
-433 3 9 38 -0.65536000000000000000e5
-433 3 10 23 0.65536000000000000000e5
-433 3 10 39 -0.65536000000000000000e5
-433 3 13 42 0.26214400000000000000e6
-433 3 14 27 -0.26214400000000000000e6
-433 3 22 35 -0.26214400000000000000e6
-433 3 28 41 -0.13107200000000000000e6
-433 3 29 42 0.13107200000000000000e6
-433 4 2 30 -0.65536000000000000000e5
-433 4 3 31 -0.13107200000000000000e6
-433 4 6 34 -0.13107200000000000000e6
-433 4 7 19 0.65536000000000000000e5
-433 4 8 20 0.13107200000000000000e6
-434 1 5 31 0.65536000000000000000e5
-434 1 10 41 -0.65536000000000000000e5
-434 3 3 32 -0.65536000000000000000e5
-435 1 2 33 0.65536000000000000000e5
-435 1 5 32 0.65536000000000000000e5
-435 1 10 41 0.65536000000000000000e5
-435 1 12 43 -0.13107200000000000000e6
-435 2 12 26 0.65536000000000000000e5
-435 3 3 32 0.65536000000000000000e5
-435 3 14 27 -0.13107200000000000000e6
-435 4 8 20 0.65536000000000000000e5
-436 1 5 33 0.65536000000000000000e5
-436 1 11 42 -0.65536000000000000000e5
-436 3 4 33 -0.65536000000000000000e5
-437 1 4 35 -0.65536000000000000000e5
-437 1 5 34 0.65536000000000000000e5
-438 1 5 35 0.65536000000000000000e5
-438 1 14 45 -0.13107200000000000000e6
-438 1 17 48 0.65536000000000000000e5
-438 1 18 49 0.65536000000000000000e5
-438 2 14 28 0.65536000000000000000e5
-438 3 5 34 -0.65536000000000000000e5
-438 3 13 42 0.65536000000000000000e5
-438 3 14 43 0.65536000000000000000e5
-439 1 2 49 -0.65536000000000000000e5
-439 1 5 37 0.65536000000000000000e5
-439 3 2 39 -0.65536000000000000000e5
-440 1 5 38 0.65536000000000000000e5
-440 1 6 37 -0.65536000000000000000e5
-441 1 1 48 0.65536000000000000000e5
-441 1 2 49 0.13107200000000000000e6
-441 1 5 39 0.65536000000000000000e5
-441 1 8 39 0.13107200000000000000e6
-441 1 9 40 0.13107200000000000000e6
-441 1 10 41 -0.26214400000000000000e6
-441 1 12 43 -0.52428800000000000000e6
-441 1 23 38 0.65536000000000000000e5
-441 1 24 39 0.65536000000000000000e5
-441 1 26 41 -0.13107200000000000000e6
-441 1 28 43 0.26214400000000000000e6
-441 1 32 47 0.52428800000000000000e6
-441 2 2 32 0.65536000000000000000e5
-441 2 3 33 0.65536000000000000000e5
-441 2 16 30 0.13107200000000000000e6
-441 2 20 34 0.26214400000000000000e6
-441 3 3 40 -0.65536000000000000000e5
-441 3 9 38 0.13107200000000000000e6
-441 3 22 35 0.52428800000000000000e6
-441 3 28 41 0.52428800000000000000e6
-441 4 2 30 0.13107200000000000000e6
-441 4 6 34 0.26214400000000000000e6
-442 1 1 48 -0.65536000000000000000e5
-442 1 2 49 -0.13107200000000000000e6
-442 1 5 40 0.65536000000000000000e5
-442 1 6 37 0.65536000000000000000e5
-442 1 8 39 -0.13107200000000000000e6
-442 1 9 40 -0.26214400000000000000e6
-442 1 10 41 0.26214400000000000000e6
-442 1 12 43 0.52428800000000000000e6
-442 1 23 38 -0.65536000000000000000e5
-442 1 24 39 -0.65536000000000000000e5
-442 1 26 41 0.13107200000000000000e6
-442 1 28 43 -0.26214400000000000000e6
-442 1 32 47 -0.52428800000000000000e6
-442 2 2 32 -0.65536000000000000000e5
-442 2 3 33 -0.65536000000000000000e5
-442 2 5 27 0.65536000000000000000e5
-442 2 16 30 -0.13107200000000000000e6
-442 2 20 34 -0.26214400000000000000e6
-442 3 3 40 0.65536000000000000000e5
-442 3 9 38 -0.13107200000000000000e6
-442 3 22 35 -0.52428800000000000000e6
-442 3 28 41 -0.52428800000000000000e6
-442 4 2 30 -0.13107200000000000000e6
-442 4 6 34 -0.26214400000000000000e6
-443 1 1 48 0.32768000000000000000e5
-443 1 2 49 0.32768000000000000000e5
-443 1 5 41 0.65536000000000000000e5
-443 1 8 39 0.65536000000000000000e5
-443 1 9 40 0.65536000000000000000e5
-443 1 10 41 -0.13107200000000000000e6
-443 1 12 43 -0.26214400000000000000e6
-443 1 23 38 0.32768000000000000000e5
-443 1 26 41 -0.65536000000000000000e5
-443 1 28 43 0.13107200000000000000e6
-443 1 32 47 0.26214400000000000000e6
-443 2 2 32 0.32768000000000000000e5
-443 2 16 30 0.65536000000000000000e5
-443 2 20 34 0.13107200000000000000e6
-443 3 22 35 0.26214400000000000000e6
-443 3 28 41 0.26214400000000000000e6
-443 4 2 30 0.65536000000000000000e5
-443 4 6 34 0.13107200000000000000e6
-444 1 5 42 0.65536000000000000000e5
-444 1 9 40 -0.65536000000000000000e5
-445 1 1 48 -0.32768000000000000000e5
-445 1 2 49 -0.32768000000000000000e5
-445 1 5 43 0.65536000000000000000e5
-445 1 8 39 -0.65536000000000000000e5
-445 1 9 40 -0.65536000000000000000e5
-445 1 10 41 0.13107200000000000000e6
-445 1 12 43 0.26214400000000000000e6
-445 1 23 38 -0.32768000000000000000e5
-445 1 26 41 0.13107200000000000000e6
-445 1 28 43 -0.26214400000000000000e6
-445 1 32 47 -0.26214400000000000000e6
-445 2 2 32 -0.32768000000000000000e5
-445 2 4 34 0.65536000000000000000e5
-445 2 16 30 -0.65536000000000000000e5
-445 2 20 34 -0.13107200000000000000e6
-445 3 9 38 -0.65536000000000000000e5
-445 3 10 39 -0.65536000000000000000e5
-445 3 22 35 -0.26214400000000000000e6
-445 3 28 41 -0.26214400000000000000e6
-445 4 2 30 -0.65536000000000000000e5
-445 4 6 34 -0.13107200000000000000e6
-446 1 5 44 0.65536000000000000000e5
-446 1 10 41 0.65536000000000000000e5
-446 1 11 42 0.65536000000000000000e5
-446 1 28 43 -0.65536000000000000000e5
-446 1 32 47 -0.65536000000000000000e5
-446 1 33 48 -0.65536000000000000000e5
-446 3 13 42 -0.13107200000000000000e6
-446 3 28 41 -0.65536000000000000000e5
-446 3 29 42 -0.65536000000000000000e5
-446 4 3 31 0.65536000000000000000e5
-447 1 5 45 0.65536000000000000000e5
-447 1 11 42 -0.65536000000000000000e5
-448 1 5 46 0.65536000000000000000e5
-448 1 14 45 -0.13107200000000000000e6
-448 1 17 48 0.65536000000000000000e5
-448 1 18 49 0.65536000000000000000e5
-448 2 14 28 0.65536000000000000000e5
-448 3 13 42 0.65536000000000000000e5
-448 3 14 43 0.65536000000000000000e5
-449 1 5 47 0.65536000000000000000e5
-449 1 24 39 -0.65536000000000000000e5
-450 1 1 48 0.65536000000000000000e5
-450 1 2 49 0.13107200000000000000e6
-450 1 5 48 0.65536000000000000000e5
-450 1 8 39 0.13107200000000000000e6
-450 1 9 40 0.13107200000000000000e6
-450 1 10 41 -0.26214400000000000000e6
-450 1 12 43 -0.52428800000000000000e6
-450 1 23 38 0.65536000000000000000e5
-450 1 24 39 0.65536000000000000000e5
-450 1 26 41 -0.13107200000000000000e6
-450 1 28 43 0.26214400000000000000e6
-450 1 32 47 0.52428800000000000000e6
-450 2 2 32 0.65536000000000000000e5
-450 2 3 33 0.65536000000000000000e5
-450 2 16 30 0.13107200000000000000e6
-450 2 20 34 0.26214400000000000000e6
-450 3 9 38 0.13107200000000000000e6
-450 3 22 35 0.52428800000000000000e6
-450 3 28 41 0.52428800000000000000e6
-450 4 2 30 0.13107200000000000000e6
-450 4 6 34 0.26214400000000000000e6
-451 1 5 49 0.65536000000000000000e5
-451 1 25 40 -0.65536000000000000000e5
-452 1 5 50 0.65536000000000000000e5
-452 1 26 41 -0.65536000000000000000e5
-453 1 1 48 -0.32768000000000000000e5
-453 1 2 49 -0.32768000000000000000e5
-453 1 5 51 0.65536000000000000000e5
-453 1 8 39 -0.65536000000000000000e5
-453 1 9 40 -0.65536000000000000000e5
-453 1 10 41 0.13107200000000000000e6
-453 1 12 43 0.26214400000000000000e6
-453 1 23 38 -0.32768000000000000000e5
-453 1 26 41 0.13107200000000000000e6
-453 1 28 43 -0.26214400000000000000e6
-453 1 32 47 -0.26214400000000000000e6
-453 2 2 32 -0.32768000000000000000e5
-453 2 4 34 0.65536000000000000000e5
-453 2 16 30 -0.65536000000000000000e5
-453 2 20 34 -0.13107200000000000000e6
-453 3 9 38 -0.65536000000000000000e5
-453 3 22 35 -0.26214400000000000000e6
-453 3 28 41 -0.26214400000000000000e6
-453 4 2 30 -0.65536000000000000000e5
-453 4 6 34 -0.13107200000000000000e6
-454 1 5 52 0.65536000000000000000e5
-454 1 33 48 -0.65536000000000000000e5
-454 3 29 42 -0.65536000000000000000e5
-455 1 1 48 0.65536000000000000000e5
-455 1 2 49 0.13107200000000000000e6
-455 1 5 53 0.65536000000000000000e5
-455 1 8 39 0.13107200000000000000e6
-455 1 9 40 0.13107200000000000000e6
-455 1 10 41 -0.26214400000000000000e6
-455 1 12 43 -0.52428800000000000000e6
-455 1 23 38 0.65536000000000000000e5
-455 1 24 39 0.65536000000000000000e5
-455 1 26 41 -0.13107200000000000000e6
-455 1 28 43 0.26214400000000000000e6
-455 1 32 47 0.52428800000000000000e6
-455 2 2 32 0.65536000000000000000e5
-455 2 3 33 0.65536000000000000000e5
-455 2 16 30 0.13107200000000000000e6
-455 2 20 34 0.26214400000000000000e6
-455 3 9 38 0.13107200000000000000e6
-455 3 22 35 0.52428800000000000000e6
-455 3 25 38 0.65536000000000000000e5
-455 3 28 41 0.52428800000000000000e6
-455 4 2 30 0.13107200000000000000e6
-455 4 6 34 0.26214400000000000000e6
-456 1 5 54 0.65536000000000000000e5
-456 1 6 53 -0.65536000000000000000e5
-457 1 1 48 -0.32768000000000000000e5
-457 1 2 49 -0.32768000000000000000e5
-457 1 5 55 0.65536000000000000000e5
-457 1 8 39 -0.65536000000000000000e5
-457 1 9 40 -0.65536000000000000000e5
-457 1 10 41 0.13107200000000000000e6
-457 1 12 43 0.26214400000000000000e6
-457 1 23 38 -0.32768000000000000000e5
-457 1 26 41 0.13107200000000000000e6
-457 1 28 43 -0.26214400000000000000e6
-457 1 32 47 -0.26214400000000000000e6
-457 2 2 32 -0.32768000000000000000e5
-457 2 4 34 0.65536000000000000000e5
-457 2 16 30 -0.65536000000000000000e5
-457 2 20 34 -0.13107200000000000000e6
-457 3 5 50 0.65536000000000000000e5
-457 3 9 38 -0.65536000000000000000e5
-457 3 22 35 -0.26214400000000000000e6
-457 3 28 41 -0.26214400000000000000e6
-457 4 2 30 -0.65536000000000000000e5
-457 4 6 34 -0.13107200000000000000e6
-458 1 5 56 0.65536000000000000000e5
-458 1 25 56 -0.65536000000000000000e5
-458 3 24 53 0.65536000000000000000e5
-458 3 25 54 0.65536000000000000000e5
-458 3 38 51 -0.13107200000000000000e6
-458 4 28 32 0.65536000000000000000e5
-459 1 1 40 -0.32768000000000000000e5
-459 1 1 48 -0.32768000000000000000e5
-459 1 2 33 0.26214400000000000000e6
-459 1 2 49 -0.32768000000000000000e5
-459 1 6 6 0.65536000000000000000e5
-459 1 6 37 -0.32768000000000000000e5
-459 1 8 39 -0.65536000000000000000e5
-459 1 9 40 -0.13107200000000000000e6
-459 1 10 25 0.13107200000000000000e6
-459 1 10 41 0.13107200000000000000e6
-459 1 11 42 -0.26214400000000000000e6
-459 1 12 43 -0.26214400000000000000e6
-459 1 26 41 0.13107200000000000000e6
-459 1 33 48 0.26214400000000000000e6
-459 2 3 17 -0.32768000000000000000e5
-459 2 4 34 0.65536000000000000000e5
-459 2 5 19 0.32768000000000000000e5
-459 2 5 27 -0.32768000000000000000e5
-459 2 12 26 0.26214400000000000000e6
-459 2 16 30 -0.65536000000000000000e5
-459 2 20 34 -0.13107200000000000000e6
-459 3 1 30 -0.13107200000000000000e6
-459 3 1 38 -0.32768000000000000000e5
-459 3 2 23 -0.32768000000000000000e5
-459 3 2 39 -0.32768000000000000000e5
-459 3 3 32 0.13107200000000000000e6
-459 3 5 6 -0.32768000000000000000e5
-459 3 8 37 0.65536000000000000000e5
-459 3 9 38 -0.65536000000000000000e5
-459 3 10 39 -0.65536000000000000000e5
-459 3 13 42 0.52428800000000000000e6
-459 3 14 27 -0.26214400000000000000e6
-459 3 22 35 -0.26214400000000000000e6
-459 3 29 42 0.26214400000000000000e6
-459 4 2 30 -0.65536000000000000000e5
-459 4 3 31 -0.26214400000000000000e6
-459 4 4 16 0.32768000000000000000e5
-459 4 5 17 -0.32768000000000000000e5
-459 4 6 18 -0.65536000000000000000e5
-459 4 6 34 -0.13107200000000000000e6
-459 4 7 19 0.65536000000000000000e5
-459 4 8 20 0.13107200000000000000e6
-460 1 1 48 -0.32768000000000000000e5
-460 1 2 49 -0.32768000000000000000e5
-460 1 4 11 0.65536000000000000000e5
-460 1 6 7 0.65536000000000000000e5
-460 1 8 39 -0.65536000000000000000e5
-460 1 9 40 -0.65536000000000000000e5
-460 1 12 43 0.26214400000000000000e6
-460 1 23 38 -0.32768000000000000000e5
-460 1 26 41 0.65536000000000000000e5
-460 1 28 43 -0.13107200000000000000e6
-460 1 32 47 -0.26214400000000000000e6
-460 2 2 32 -0.32768000000000000000e5
-460 2 3 9 0.65536000000000000000e5
-460 2 16 30 -0.65536000000000000000e5
-460 2 20 34 -0.13107200000000000000e6
-460 3 2 15 -0.13107200000000000000e6
-460 3 3 32 -0.13107200000000000000e6
-460 3 4 9 0.65536000000000000000e5
-460 3 10 23 0.65536000000000000000e5
-460 3 22 35 -0.26214400000000000000e6
-460 3 28 41 -0.26214400000000000000e6
-460 4 2 30 -0.65536000000000000000e5
-460 4 6 34 -0.13107200000000000000e6
-461 1 1 48 0.32768000000000000000e5
-461 1 2 49 0.32768000000000000000e5
-461 1 6 8 0.65536000000000000000e5
-461 1 8 39 0.65536000000000000000e5
-461 1 9 40 0.65536000000000000000e5
-461 1 10 41 -0.13107200000000000000e6
-461 1 12 43 -0.26214400000000000000e6
-461 1 23 38 0.32768000000000000000e5
-461 1 26 41 -0.65536000000000000000e5
-461 1 28 43 0.13107200000000000000e6
-461 1 32 47 0.26214400000000000000e6
-461 2 2 32 0.32768000000000000000e5
-461 2 16 30 0.65536000000000000000e5
-461 2 20 34 0.13107200000000000000e6
-461 3 4 9 -0.65536000000000000000e5
-461 3 10 23 -0.65536000000000000000e5
-461 3 22 35 0.26214400000000000000e6
-461 3 28 41 0.26214400000000000000e6
-461 4 2 30 0.65536000000000000000e5
-461 4 6 34 0.13107200000000000000e6
-462 1 4 11 -0.65536000000000000000e5
-462 1 6 9 0.65536000000000000000e5
-463 1 1 48 -0.32768000000000000000e5
-463 1 2 49 -0.32768000000000000000e5
-463 1 4 11 0.65536000000000000000e5
-463 1 6 10 0.65536000000000000000e5
-463 1 6 13 -0.13107200000000000000e6
-463 1 8 39 -0.65536000000000000000e5
-463 1 9 40 -0.13107200000000000000e6
-463 1 11 42 -0.13107200000000000000e6
-463 1 12 43 0.26214400000000000000e6
-463 1 23 38 -0.32768000000000000000e5
-463 1 26 41 0.13107200000000000000e6
-463 1 28 43 -0.13107200000000000000e6
-463 1 32 47 -0.13107200000000000000e6
-463 1 33 48 0.13107200000000000000e6
-463 2 2 32 -0.32768000000000000000e5
-463 2 4 34 0.65536000000000000000e5
-463 2 16 30 -0.65536000000000000000e5
-463 2 20 34 -0.13107200000000000000e6
-463 3 4 9 0.65536000000000000000e5
-463 3 9 38 -0.65536000000000000000e5
-463 3 10 23 0.65536000000000000000e5
-463 3 10 39 -0.65536000000000000000e5
-463 3 13 42 0.26214400000000000000e6
-463 3 22 35 -0.26214400000000000000e6
-463 3 28 41 -0.13107200000000000000e6
-463 3 29 42 0.13107200000000000000e6
-463 4 2 30 -0.65536000000000000000e5
-463 4 3 31 -0.13107200000000000000e6
-463 4 4 8 0.65536000000000000000e5
-463 4 6 34 -0.13107200000000000000e6
-463 4 7 19 0.65536000000000000000e5
-464 1 2 33 0.13107200000000000000e6
-464 1 4 11 -0.65536000000000000000e5
-464 1 6 11 0.65536000000000000000e5
-464 1 6 13 0.13107200000000000000e6
-464 1 10 25 0.65536000000000000000e5
-464 1 10 41 0.13107200000000000000e6
-464 1 11 26 -0.65536000000000000000e5
-464 1 12 43 -0.26214400000000000000e6
-464 2 12 26 0.13107200000000000000e6
-464 3 3 32 0.13107200000000000000e6
-464 3 4 9 -0.65536000000000000000e5
-464 3 6 11 0.65536000000000000000e5
-464 3 10 11 -0.13107200000000000000e6
-464 3 14 27 -0.26214400000000000000e6
-464 4 4 8 -0.65536000000000000000e5
-464 4 5 9 0.65536000000000000000e5
-464 4 8 20 0.13107200000000000000e6
-465 1 6 12 0.65536000000000000000e5
-465 1 10 41 -0.65536000000000000000e5
-465 3 2 15 -0.65536000000000000000e5
-465 3 3 32 -0.65536000000000000000e5
-466 1 4 35 -0.13107200000000000000e6
-466 1 6 13 0.65536000000000000000e5
-466 1 6 14 0.65536000000000000000e5
-466 1 10 41 0.65536000000000000000e5
-466 2 5 11 0.65536000000000000000e5
-466 3 2 15 0.65536000000000000000e5
-466 3 3 32 0.65536000000000000000e5
-466 3 4 17 -0.13107200000000000000e6
-467 1 2 33 -0.65536000000000000000e5
-467 1 6 15 0.65536000000000000000e5
-467 1 11 42 0.65536000000000000000e5
-467 1 12 43 0.13107200000000000000e6
-467 1 26 33 -0.65536000000000000000e5
-467 1 28 43 -0.65536000000000000000e5
-467 1 32 47 -0.65536000000000000000e5
-467 1 33 48 -0.65536000000000000000e5
-467 2 12 26 -0.65536000000000000000e5
-467 3 3 32 -0.65536000000000000000e5
-467 3 4 33 0.65536000000000000000e5
-467 3 5 34 -0.13107200000000000000e6
-467 3 10 11 -0.65536000000000000000e5
-467 3 13 42 -0.13107200000000000000e6
-467 3 14 27 0.13107200000000000000e6
-467 3 28 41 -0.65536000000000000000e5
-467 3 29 42 -0.65536000000000000000e5
-467 4 3 31 0.65536000000000000000e5
-467 4 8 20 -0.65536000000000000000e5
-467 4 9 21 0.65536000000000000000e5
-468 1 4 35 -0.65536000000000000000e5
-468 1 6 16 0.65536000000000000000e5
-468 3 4 17 -0.65536000000000000000e5
-469 1 5 20 -0.13107200000000000000e6
-469 1 5 36 0.13107200000000000000e6
-469 1 6 17 0.65536000000000000000e5
-469 1 14 45 -0.13107200000000000000e6
-469 1 17 48 0.65536000000000000000e5
-469 1 18 49 0.65536000000000000000e5
-469 2 14 28 0.65536000000000000000e5
-469 3 4 17 0.65536000000000000000e5
-469 3 5 18 0.65536000000000000000e5
-469 3 5 34 -0.65536000000000000000e5
-469 3 13 42 0.65536000000000000000e5
-469 3 14 43 0.65536000000000000000e5
-469 4 8 12 0.65536000000000000000e5
-470 1 6 18 0.65536000000000000000e5
-470 1 15 30 -0.65536000000000000000e5
-470 3 5 18 -0.65536000000000000000e5
-471 1 5 20 -0.65536000000000000000e5
-471 1 6 19 0.65536000000000000000e5
-472 1 6 20 0.65536000000000000000e5
-472 1 11 18 -0.65536000000000000000e5
-473 1 2 25 0.65536000000000000000e5
-473 1 2 33 -0.26214400000000000000e6
-473 1 2 49 -0.65536000000000000000e5
-473 1 6 22 0.65536000000000000000e5
-473 1 11 42 0.26214400000000000000e6
-473 1 12 43 0.52428800000000000000e6
-473 1 23 38 -0.65536000000000000000e5
-473 1 28 43 -0.26214400000000000000e6
-473 1 32 47 -0.26214400000000000000e6
-473 1 33 48 -0.26214400000000000000e6
-473 2 2 32 -0.65536000000000000000e5
-473 2 3 17 0.65536000000000000000e5
-473 2 12 26 -0.26214400000000000000e6
-473 3 1 30 0.13107200000000000000e6
-473 3 1 38 0.65536000000000000000e5
-473 3 2 23 0.65536000000000000000e5
-473 3 8 37 -0.13107200000000000000e6
-473 3 10 23 0.13107200000000000000e6
-473 3 13 42 -0.52428800000000000000e6
-473 3 28 41 -0.26214400000000000000e6
-473 3 29 42 -0.26214400000000000000e6
-473 4 3 31 0.26214400000000000000e6
-473 4 6 18 0.13107200000000000000e6
-474 1 1 40 -0.65536000000000000000e5
-474 1 2 33 0.26214400000000000000e6
-474 1 6 23 0.65536000000000000000e5
-474 1 6 37 -0.65536000000000000000e5
-474 1 11 42 -0.26214400000000000000e6
-474 1 12 43 -0.52428800000000000000e6
-474 1 23 38 0.65536000000000000000e5
-474 1 28 43 0.26214400000000000000e6
-474 1 32 47 0.26214400000000000000e6
-474 1 33 48 0.26214400000000000000e6
-474 2 2 32 0.65536000000000000000e5
-474 2 3 17 -0.65536000000000000000e5
-474 2 12 26 0.26214400000000000000e6
-474 3 1 30 -0.26214400000000000000e6
-474 3 1 38 -0.65536000000000000000e5
-474 3 2 23 -0.65536000000000000000e5
-474 3 2 39 -0.65536000000000000000e5
-474 3 8 37 0.13107200000000000000e6
-474 3 10 23 -0.13107200000000000000e6
-474 3 13 42 0.52428800000000000000e6
-474 3 28 41 0.26214400000000000000e6
-474 3 29 42 0.26214400000000000000e6
-474 4 3 31 -0.26214400000000000000e6
-474 4 4 16 0.65536000000000000000e5
-474 4 6 18 -0.13107200000000000000e6
-475 1 1 40 0.65536000000000000000e5
-475 1 1 48 0.65536000000000000000e5
-475 1 2 25 -0.65536000000000000000e5
-475 1 2 49 0.13107200000000000000e6
-475 1 6 24 0.65536000000000000000e5
-475 1 6 37 0.65536000000000000000e5
-475 1 8 39 0.13107200000000000000e6
-475 1 9 40 0.13107200000000000000e6
-475 1 10 41 -0.26214400000000000000e6
-475 1 12 43 -0.52428800000000000000e6
-475 1 23 38 0.65536000000000000000e5
-475 1 26 41 -0.13107200000000000000e6
-475 1 28 43 0.26214400000000000000e6
-475 1 32 47 0.52428800000000000000e6
-475 2 2 32 0.65536000000000000000e5
-475 2 4 18 0.65536000000000000000e5
-475 2 16 30 0.13107200000000000000e6
-475 2 20 34 0.26214400000000000000e6
-475 3 1 30 0.13107200000000000000e6
-475 3 2 39 0.65536000000000000000e5
-475 3 10 23 -0.13107200000000000000e6
-475 3 22 35 0.52428800000000000000e6
-475 3 28 41 0.52428800000000000000e6
-475 4 2 30 0.13107200000000000000e6
-475 4 4 16 -0.65536000000000000000e5
-475 4 6 34 0.26214400000000000000e6
-476 1 1 48 -0.65536000000000000000e5
-476 1 2 25 0.65536000000000000000e5
-476 1 2 33 -0.26214400000000000000e6
-476 1 2 49 -0.13107200000000000000e6
-476 1 6 25 0.65536000000000000000e5
-476 1 8 39 -0.13107200000000000000e6
-476 1 9 40 -0.13107200000000000000e6
-476 1 10 25 -0.13107200000000000000e6
-476 1 10 41 0.26214400000000000000e6
-476 1 11 42 0.26214400000000000000e6
-476 1 12 43 0.10485760000000000000e7
-476 1 23 38 -0.13107200000000000000e6
-476 1 26 41 0.13107200000000000000e6
-476 1 28 43 -0.52428800000000000000e6
-476 1 32 47 -0.78643200000000000000e6
-476 1 33 48 -0.26214400000000000000e6
-476 2 2 32 -0.13107200000000000000e6
-476 2 3 17 0.65536000000000000000e5
-476 2 4 18 -0.65536000000000000000e5
-476 2 5 27 0.65536000000000000000e5
-476 2 12 26 -0.26214400000000000000e6
-476 2 16 30 -0.13107200000000000000e6
-476 2 20 34 -0.26214400000000000000e6
-476 3 1 30 0.13107200000000000000e6
-476 3 1 38 0.65536000000000000000e5
-476 3 2 23 0.65536000000000000000e5
-476 3 8 37 -0.13107200000000000000e6
-476 3 10 23 0.26214400000000000000e6
-476 3 13 42 -0.52428800000000000000e6
-476 3 22 35 -0.52428800000000000000e6
-476 3 28 41 -0.78643200000000000000e6
-476 3 29 42 -0.26214400000000000000e6
-476 4 2 30 -0.13107200000000000000e6
-476 4 3 31 0.26214400000000000000e6
-476 4 5 17 0.65536000000000000000e5
-476 4 6 18 0.13107200000000000000e6
-476 4 6 34 -0.26214400000000000000e6
-477 1 1 40 -0.65536000000000000000e5
-477 1 1 48 -0.65536000000000000000e5
-477 1 2 33 0.52428800000000000000e6
-477 1 2 49 -0.65536000000000000000e5
-477 1 6 26 0.65536000000000000000e5
-477 1 6 37 -0.65536000000000000000e5
-477 1 8 39 -0.13107200000000000000e6
-477 1 9 40 -0.26214400000000000000e6
-477 1 10 25 0.26214400000000000000e6
-477 1 10 41 0.26214400000000000000e6
-477 1 11 42 -0.52428800000000000000e6
-477 1 12 43 -0.52428800000000000000e6
-477 1 26 41 0.26214400000000000000e6
-477 1 33 48 0.52428800000000000000e6
-477 2 3 17 -0.65536000000000000000e5
-477 2 4 34 0.13107200000000000000e6
-477 2 5 19 0.65536000000000000000e5
-477 2 5 27 -0.65536000000000000000e5
-477 2 12 26 0.52428800000000000000e6
-477 2 16 30 -0.13107200000000000000e6
-477 2 20 34 -0.26214400000000000000e6
-477 3 1 30 -0.26214400000000000000e6
-477 3 1 38 -0.65536000000000000000e5
-477 3 2 23 -0.65536000000000000000e5
-477 3 2 39 -0.65536000000000000000e5
-477 3 3 32 0.26214400000000000000e6
-477 3 8 37 0.13107200000000000000e6
-477 3 9 38 -0.13107200000000000000e6
-477 3 10 39 -0.13107200000000000000e6
-477 3 13 42 0.10485760000000000000e7
-477 3 14 27 -0.52428800000000000000e6
-477 3 22 35 -0.52428800000000000000e6
-477 3 29 42 0.52428800000000000000e6
-477 4 2 30 -0.13107200000000000000e6
-477 4 3 31 -0.52428800000000000000e6
-477 4 4 16 0.65536000000000000000e5
-477 4 5 17 -0.65536000000000000000e5
-477 4 6 18 -0.13107200000000000000e6
-477 4 6 34 -0.26214400000000000000e6
-477 4 7 19 0.13107200000000000000e6
-477 4 8 20 0.26214400000000000000e6
-478 1 1 48 0.32768000000000000000e5
-478 1 2 49 0.32768000000000000000e5
-478 1 6 27 0.65536000000000000000e5
-478 1 8 39 0.65536000000000000000e5
-478 1 9 40 0.65536000000000000000e5
-478 1 10 41 -0.13107200000000000000e6
-478 1 12 43 -0.26214400000000000000e6
-478 1 23 38 0.32768000000000000000e5
-478 1 26 41 -0.65536000000000000000e5
-478 1 28 43 0.13107200000000000000e6
-478 1 32 47 0.26214400000000000000e6
-478 2 2 32 0.32768000000000000000e5
-478 2 16 30 0.65536000000000000000e5
-478 2 20 34 0.13107200000000000000e6
-478 3 10 23 -0.65536000000000000000e5
-478 3 22 35 0.26214400000000000000e6
-478 3 28 41 0.26214400000000000000e6
-478 4 2 30 0.65536000000000000000e5
-478 4 6 34 0.13107200000000000000e6
-479 1 6 28 0.65536000000000000000e5
-479 1 10 25 -0.65536000000000000000e5
-480 1 1 48 -0.32768000000000000000e5
-480 1 2 33 0.13107200000000000000e6
-480 1 2 49 -0.32768000000000000000e5
-480 1 6 29 0.65536000000000000000e5
-480 1 8 39 -0.65536000000000000000e5
-480 1 9 40 -0.13107200000000000000e6
-480 1 10 25 0.65536000000000000000e5
-480 1 10 41 0.13107200000000000000e6
-480 1 11 42 -0.13107200000000000000e6
-480 1 23 38 -0.32768000000000000000e5
-480 1 26 41 0.13107200000000000000e6
-480 1 28 43 -0.13107200000000000000e6
-480 1 32 47 -0.13107200000000000000e6
-480 1 33 48 0.13107200000000000000e6
-480 2 2 32 -0.32768000000000000000e5
-480 2 4 34 0.65536000000000000000e5
-480 2 12 26 0.13107200000000000000e6
-480 2 16 30 -0.65536000000000000000e5
-480 2 20 34 -0.13107200000000000000e6
-480 3 3 32 0.13107200000000000000e6
-480 3 9 38 -0.65536000000000000000e5
-480 3 10 23 0.65536000000000000000e5
-480 3 10 39 -0.65536000000000000000e5
-480 3 13 42 0.26214400000000000000e6
-480 3 14 27 -0.26214400000000000000e6
-480 3 22 35 -0.26214400000000000000e6
-480 3 28 41 -0.13107200000000000000e6
-480 3 29 42 0.13107200000000000000e6
-480 4 2 30 -0.65536000000000000000e5
-480 4 3 31 -0.13107200000000000000e6
-480 4 6 34 -0.13107200000000000000e6
-480 4 7 19 0.65536000000000000000e5
-480 4 8 20 0.13107200000000000000e6
-481 1 6 30 0.65536000000000000000e5
-481 1 11 26 -0.65536000000000000000e5
-482 1 2 33 0.65536000000000000000e5
-482 1 6 31 0.65536000000000000000e5
-482 1 10 41 0.65536000000000000000e5
-482 1 12 43 -0.13107200000000000000e6
-482 2 12 26 0.65536000000000000000e5
-482 3 3 32 0.65536000000000000000e5
-482 3 14 27 -0.13107200000000000000e6
-482 4 8 20 0.65536000000000000000e5
-483 1 6 32 0.65536000000000000000e5
-483 1 11 42 -0.65536000000000000000e5
-483 3 4 33 -0.65536000000000000000e5
-484 1 2 33 -0.65536000000000000000e5
-484 1 6 33 0.65536000000000000000e5
-484 1 11 42 0.65536000000000000000e5
-484 1 12 43 0.13107200000000000000e6
-484 1 26 33 -0.65536000000000000000e5
-484 1 28 43 -0.65536000000000000000e5
-484 1 32 47 -0.65536000000000000000e5
-484 1 33 48 -0.65536000000000000000e5
-484 2 12 26 -0.65536000000000000000e5
-484 3 3 32 -0.65536000000000000000e5
-484 3 4 33 0.65536000000000000000e5
-484 3 5 34 -0.13107200000000000000e6
-484 3 13 42 -0.13107200000000000000e6
-484 3 14 27 0.13107200000000000000e6
-484 3 28 41 -0.65536000000000000000e5
-484 3 29 42 -0.65536000000000000000e5
-484 4 3 31 0.65536000000000000000e5
-484 4 8 20 -0.65536000000000000000e5
-484 4 9 21 0.65536000000000000000e5
-485 1 6 34 0.65536000000000000000e5
-485 1 14 45 -0.13107200000000000000e6
-485 1 17 48 0.65536000000000000000e5
-485 1 18 49 0.65536000000000000000e5
-485 2 14 28 0.65536000000000000000e5
-485 3 5 34 -0.65536000000000000000e5
-485 3 13 42 0.65536000000000000000e5
-485 3 14 43 0.65536000000000000000e5
-486 1 6 35 0.65536000000000000000e5
-486 1 15 30 -0.65536000000000000000e5
-487 1 6 36 0.65536000000000000000e5
-487 1 11 18 -0.65536000000000000000e5
-487 3 6 19 0.65536000000000000000e5
-488 1 1 48 0.65536000000000000000e5
-488 1 2 49 0.13107200000000000000e6
-488 1 6 38 0.65536000000000000000e5
-488 1 8 39 0.13107200000000000000e6
-488 1 9 40 0.13107200000000000000e6
-488 1 10 41 -0.26214400000000000000e6
-488 1 12 43 -0.52428800000000000000e6
-488 1 23 38 0.65536000000000000000e5
-488 1 24 39 0.65536000000000000000e5
-488 1 26 41 -0.13107200000000000000e6
-488 1 28 43 0.26214400000000000000e6
-488 1 32 47 0.52428800000000000000e6
-488 2 2 32 0.65536000000000000000e5
-488 2 3 33 0.65536000000000000000e5
-488 2 16 30 0.13107200000000000000e6
-488 2 20 34 0.26214400000000000000e6
-488 3 3 40 -0.65536000000000000000e5
-488 3 9 38 0.13107200000000000000e6
-488 3 22 35 0.52428800000000000000e6
-488 3 28 41 0.52428800000000000000e6
-488 4 2 30 0.13107200000000000000e6
-488 4 6 34 0.26214400000000000000e6
-489 1 1 48 -0.65536000000000000000e5
-489 1 2 49 -0.13107200000000000000e6
-489 1 6 37 0.65536000000000000000e5
-489 1 6 39 0.65536000000000000000e5
-489 1 8 39 -0.13107200000000000000e6
-489 1 9 40 -0.26214400000000000000e6
-489 1 10 41 0.26214400000000000000e6
-489 1 12 43 0.52428800000000000000e6
-489 1 23 38 -0.65536000000000000000e5
-489 1 24 39 -0.65536000000000000000e5
-489 1 26 41 0.13107200000000000000e6
-489 1 28 43 -0.26214400000000000000e6
-489 1 32 47 -0.52428800000000000000e6
-489 2 2 32 -0.65536000000000000000e5
-489 2 3 33 -0.65536000000000000000e5
-489 2 5 27 0.65536000000000000000e5
-489 2 16 30 -0.13107200000000000000e6
-489 2 20 34 -0.26214400000000000000e6
-489 3 3 40 0.65536000000000000000e5
-489 3 9 38 -0.13107200000000000000e6
-489 3 22 35 -0.52428800000000000000e6
-489 3 28 41 -0.52428800000000000000e6
-489 4 2 30 -0.13107200000000000000e6
-489 4 6 34 -0.26214400000000000000e6
-490 1 1 40 -0.65536000000000000000e5
-490 1 1 48 -0.65536000000000000000e5
-490 1 2 33 0.52428800000000000000e6
-490 1 2 49 -0.65536000000000000000e5
-490 1 6 37 -0.65536000000000000000e5
-490 1 6 40 0.65536000000000000000e5
-490 1 8 39 -0.13107200000000000000e6
-490 1 9 40 -0.26214400000000000000e6
-490 1 10 25 0.26214400000000000000e6
-490 1 10 41 0.26214400000000000000e6
-490 1 11 42 -0.52428800000000000000e6
-490 1 12 43 -0.52428800000000000000e6
-490 1 26 41 0.26214400000000000000e6
-490 1 33 48 0.52428800000000000000e6
-490 2 3 17 -0.65536000000000000000e5
-490 2 4 34 0.13107200000000000000e6
-490 2 5 19 0.65536000000000000000e5
-490 2 5 27 -0.65536000000000000000e5
-490 2 12 26 0.52428800000000000000e6
-490 2 16 30 -0.13107200000000000000e6
-490 2 20 34 -0.26214400000000000000e6
-490 3 1 30 -0.26214400000000000000e6
-490 3 1 38 -0.65536000000000000000e5
-490 3 2 23 -0.65536000000000000000e5
-490 3 2 39 -0.65536000000000000000e5
-490 3 3 32 0.26214400000000000000e6
-490 3 5 26 0.65536000000000000000e5
-490 3 8 37 0.13107200000000000000e6
-490 3 9 38 -0.13107200000000000000e6
-490 3 10 39 -0.13107200000000000000e6
-490 3 13 42 0.10485760000000000000e7
-490 3 14 27 -0.52428800000000000000e6
-490 3 22 35 -0.52428800000000000000e6
-490 3 29 42 0.52428800000000000000e6
-490 4 2 30 -0.13107200000000000000e6
-490 4 3 31 -0.52428800000000000000e6
-490 4 4 16 0.65536000000000000000e5
-490 4 5 17 -0.65536000000000000000e5
-490 4 6 18 -0.13107200000000000000e6
-490 4 6 34 -0.26214400000000000000e6
-490 4 7 19 0.13107200000000000000e6
-490 4 8 20 0.26214400000000000000e6
-491 1 6 41 0.65536000000000000000e5
-491 1 9 40 -0.65536000000000000000e5
-492 1 1 48 -0.32768000000000000000e5
-492 1 2 49 -0.32768000000000000000e5
-492 1 6 42 0.65536000000000000000e5
-492 1 8 39 -0.65536000000000000000e5
-492 1 9 40 -0.65536000000000000000e5
-492 1 10 41 0.13107200000000000000e6
-492 1 12 43 0.26214400000000000000e6
-492 1 23 38 -0.32768000000000000000e5
-492 1 26 41 0.13107200000000000000e6
-492 1 28 43 -0.26214400000000000000e6
-492 1 32 47 -0.26214400000000000000e6
-492 2 2 32 -0.32768000000000000000e5
-492 2 4 34 0.65536000000000000000e5
-492 2 16 30 -0.65536000000000000000e5
-492 2 20 34 -0.13107200000000000000e6
-492 3 9 38 -0.65536000000000000000e5
-492 3 10 39 -0.65536000000000000000e5
-492 3 22 35 -0.26214400000000000000e6
-492 3 28 41 -0.26214400000000000000e6
-492 4 2 30 -0.65536000000000000000e5
-492 4 6 34 -0.13107200000000000000e6
-493 1 1 48 0.32768000000000000000e5
-493 1 2 49 0.32768000000000000000e5
-493 1 6 43 0.65536000000000000000e5
-493 1 8 39 0.65536000000000000000e5
-493 1 9 40 0.13107200000000000000e6
-493 1 10 41 -0.13107200000000000000e6
-493 1 11 42 -0.13107200000000000000e6
-493 1 12 43 -0.26214400000000000000e6
-493 1 23 38 0.32768000000000000000e5
-493 1 26 41 -0.13107200000000000000e6
-493 1 28 43 0.26214400000000000000e6
-493 1 32 47 0.26214400000000000000e6
-493 2 2 32 0.32768000000000000000e5
-493 2 4 34 -0.65536000000000000000e5
-493 2 16 30 0.65536000000000000000e5
-493 2 20 34 0.13107200000000000000e6
-493 2 28 34 0.65536000000000000000e5
-493 3 9 38 0.65536000000000000000e5
-493 3 10 39 0.65536000000000000000e5
-493 3 22 35 0.26214400000000000000e6
-493 3 28 41 0.26214400000000000000e6
-493 4 2 30 0.65536000000000000000e5
-493 4 6 34 0.13107200000000000000e6
-493 4 18 22 0.65536000000000000000e5
-493 4 18 30 0.65536000000000000000e5
-493 4 21 33 0.65536000000000000000e5
-494 1 6 44 0.65536000000000000000e5
-494 1 11 42 -0.65536000000000000000e5
-495 1 6 45 0.65536000000000000000e5
-495 1 26 33 -0.65536000000000000000e5
-496 1 6 46 0.65536000000000000000e5
-496 1 18 49 -0.65536000000000000000e5
-496 3 14 43 -0.65536000000000000000e5
-497 1 1 48 0.65536000000000000000e5
-497 1 2 49 0.13107200000000000000e6
-497 1 6 47 0.65536000000000000000e5
-497 1 8 39 0.13107200000000000000e6
-497 1 9 40 0.13107200000000000000e6
-497 1 10 41 -0.26214400000000000000e6
-497 1 12 43 -0.52428800000000000000e6
-497 1 23 38 0.65536000000000000000e5
-497 1 24 39 0.65536000000000000000e5
-497 1 26 41 -0.13107200000000000000e6
-497 1 28 43 0.26214400000000000000e6
-497 1 32 47 0.52428800000000000000e6
-497 2 2 32 0.65536000000000000000e5
-497 2 3 33 0.65536000000000000000e5
-497 2 16 30 0.13107200000000000000e6
-497 2 20 34 0.26214400000000000000e6
-497 3 9 38 0.13107200000000000000e6
-497 3 22 35 0.52428800000000000000e6
-497 3 28 41 0.52428800000000000000e6
-497 4 2 30 0.13107200000000000000e6
-497 4 6 34 0.26214400000000000000e6
-498 1 6 48 0.65536000000000000000e5
-498 1 25 40 -0.65536000000000000000e5
-499 1 1 48 -0.13107200000000000000e6
-499 1 2 49 -0.19660800000000000000e6
-499 1 6 49 0.65536000000000000000e5
-499 1 6 53 0.65536000000000000000e5
-499 1 8 39 -0.26214400000000000000e6
-499 1 9 40 -0.26214400000000000000e6
-499 1 10 41 0.52428800000000000000e6
-499 1 12 43 0.10485760000000000000e7
-499 1 23 38 -0.13107200000000000000e6
-499 1 24 39 -0.65536000000000000000e5
-499 1 26 41 0.39321600000000000000e6
-499 1 28 43 -0.78643200000000000000e6
-499 1 32 47 -0.10485760000000000000e7
-499 2 2 32 -0.13107200000000000000e6
-499 2 3 33 -0.65536000000000000000e5
-499 2 4 34 0.13107200000000000000e6
-499 2 5 35 0.65536000000000000000e5
-499 2 16 30 -0.26214400000000000000e6
-499 2 20 34 -0.52428800000000000000e6
-499 3 5 50 0.13107200000000000000e6
-499 3 9 38 -0.26214400000000000000e6
-499 3 22 35 -0.10485760000000000000e7
-499 3 25 38 -0.65536000000000000000e5
-499 3 26 39 -0.65536000000000000000e5
-499 3 28 41 -0.10485760000000000000e7
-499 4 2 30 -0.26214400000000000000e6
-499 4 6 34 -0.52428800000000000000e6
-500 1 1 48 -0.32768000000000000000e5
-500 1 2 49 -0.32768000000000000000e5
-500 1 6 50 0.65536000000000000000e5
-500 1 8 39 -0.65536000000000000000e5
-500 1 9 40 -0.65536000000000000000e5
-500 1 10 41 0.13107200000000000000e6
-500 1 12 43 0.26214400000000000000e6
-500 1 23 38 -0.32768000000000000000e5
-500 1 26 41 0.13107200000000000000e6
-500 1 28 43 -0.26214400000000000000e6
-500 1 32 47 -0.26214400000000000000e6
-500 2 2 32 -0.32768000000000000000e5
-500 2 4 34 0.65536000000000000000e5
-500 2 16 30 -0.65536000000000000000e5
-500 2 20 34 -0.13107200000000000000e6
-500 3 9 38 -0.65536000000000000000e5
-500 3 22 35 -0.26214400000000000000e6
-500 3 28 41 -0.26214400000000000000e6
-500 4 2 30 -0.65536000000000000000e5
-500 4 6 34 -0.13107200000000000000e6
-501 1 1 48 0.32768000000000000000e5
-501 1 2 49 0.32768000000000000000e5
-501 1 6 51 0.65536000000000000000e5
-501 1 8 39 0.65536000000000000000e5
-501 1 9 40 0.65536000000000000000e5
-501 1 10 41 -0.13107200000000000000e6
-501 1 12 43 -0.26214400000000000000e6
-501 1 23 38 0.32768000000000000000e5
-501 1 26 41 -0.65536000000000000000e5
-501 1 28 43 0.26214400000000000000e6
-501 1 32 47 0.26214400000000000000e6
-501 1 33 48 -0.13107200000000000000e6
-501 2 2 32 0.32768000000000000000e5
-501 2 4 34 -0.65536000000000000000e5
-501 2 16 30 0.65536000000000000000e5
-501 2 20 34 0.13107200000000000000e6
-501 2 28 34 0.65536000000000000000e5
-501 3 9 38 0.65536000000000000000e5
-501 3 22 35 0.26214400000000000000e6
-501 3 28 41 0.26214400000000000000e6
-501 3 29 42 -0.13107200000000000000e6
-501 4 2 30 0.65536000000000000000e5
-501 4 6 34 0.13107200000000000000e6
-501 4 18 30 0.65536000000000000000e5
-501 4 21 33 0.65536000000000000000e5
-502 1 6 52 0.65536000000000000000e5
-502 1 33 40 -0.65536000000000000000e5
-503 1 1 48 -0.13107200000000000000e6
-503 1 2 49 -0.19660800000000000000e6
-503 1 6 53 0.65536000000000000000e5
-503 1 6 54 0.65536000000000000000e5
-503 1 8 39 -0.26214400000000000000e6
-503 1 9 40 -0.26214400000000000000e6
-503 1 10 41 0.52428800000000000000e6
-503 1 12 43 0.10485760000000000000e7
-503 1 23 38 -0.13107200000000000000e6
-503 1 24 39 -0.65536000000000000000e5
-503 1 26 41 0.39321600000000000000e6
-503 1 28 43 -0.78643200000000000000e6
-503 1 32 47 -0.10485760000000000000e7
-503 2 2 32 -0.13107200000000000000e6
-503 2 3 33 -0.65536000000000000000e5
-503 2 4 34 0.13107200000000000000e6
-503 2 5 35 0.65536000000000000000e5
-503 2 16 30 -0.26214400000000000000e6
-503 2 20 34 -0.52428800000000000000e6
-503 3 5 50 0.13107200000000000000e6
-503 3 9 38 -0.26214400000000000000e6
-503 3 22 35 -0.10485760000000000000e7
-503 3 25 38 -0.65536000000000000000e5
-503 3 28 41 -0.10485760000000000000e7
-503 4 2 30 -0.26214400000000000000e6
-503 4 6 34 -0.52428800000000000000e6
-504 1 1 48 0.32768000000000000000e5
-504 1 2 49 0.32768000000000000000e5
-504 1 6 55 0.65536000000000000000e5
-504 1 8 39 0.65536000000000000000e5
-504 1 9 40 0.65536000000000000000e5
-504 1 10 41 -0.13107200000000000000e6
-504 1 12 43 -0.26214400000000000000e6
-504 1 23 38 0.32768000000000000000e5
-504 1 26 41 -0.65536000000000000000e5
-504 1 28 43 0.26214400000000000000e6
-504 1 32 47 0.26214400000000000000e6
-504 1 33 48 -0.13107200000000000000e6
-504 2 2 32 0.32768000000000000000e5
-504 2 4 34 -0.65536000000000000000e5
-504 2 16 30 0.65536000000000000000e5
-504 2 20 34 0.13107200000000000000e6
-504 2 28 34 0.65536000000000000000e5
-504 3 5 50 -0.65536000000000000000e5
-504 3 9 38 0.65536000000000000000e5
-504 3 22 35 0.26214400000000000000e6
-504 3 27 40 -0.65536000000000000000e5
-504 3 28 41 0.26214400000000000000e6
-504 4 2 30 0.65536000000000000000e5
-504 4 6 34 0.13107200000000000000e6
-504 4 21 33 0.65536000000000000000e5
-505 1 1 48 -0.13107200000000000000e6
-505 1 2 49 -0.19660800000000000000e6
-505 1 6 53 0.65536000000000000000e5
-505 1 6 56 0.65536000000000000000e5
-505 1 8 39 -0.26214400000000000000e6
-505 1 9 40 -0.26214400000000000000e6
-505 1 10 41 0.52428800000000000000e6
-505 1 12 43 0.10485760000000000000e7
-505 1 23 38 -0.13107200000000000000e6
-505 1 24 39 -0.65536000000000000000e5
-505 1 26 41 0.39321600000000000000e6
-505 1 28 43 -0.78643200000000000000e6
-505 1 32 47 -0.10485760000000000000e7
-505 2 2 32 -0.13107200000000000000e6
-505 2 3 33 -0.65536000000000000000e5
-505 2 4 34 0.13107200000000000000e6
-505 2 5 35 0.65536000000000000000e5
-505 2 16 30 -0.26214400000000000000e6
-505 2 20 34 -0.52428800000000000000e6
-505 3 5 50 0.13107200000000000000e6
-505 3 9 38 -0.26214400000000000000e6
-505 3 22 35 -0.10485760000000000000e7
-505 3 25 38 -0.65536000000000000000e5
-505 3 28 41 -0.10485760000000000000e7
-505 3 39 40 0.65536000000000000000e5
-505 4 2 30 -0.26214400000000000000e6
-505 4 6 34 -0.52428800000000000000e6
-506 1 1 12 -0.32768000000000000000e5
-506 1 7 7 0.65536000000000000000e5
-507 1 1 32 0.65536000000000000000e5
-507 1 1 48 -0.32768000000000000000e5
-507 1 2 33 -0.19660800000000000000e6
-507 1 2 49 -0.32768000000000000000e5
-507 1 3 34 0.26214400000000000000e6
-507 1 4 11 0.32768000000000000000e5
-507 1 7 8 0.65536000000000000000e5
-507 1 8 23 -0.32768000000000000000e5
-507 1 8 39 -0.32768000000000000000e5
-507 1 9 40 -0.32768000000000000000e5
-507 1 10 41 -0.13107200000000000000e6
-507 1 11 42 0.65536000000000000000e5
-507 1 12 27 -0.13107200000000000000e6
-507 1 12 43 0.26214400000000000000e6
-507 1 23 38 -0.32768000000000000000e5
-507 1 26 41 0.32768000000000000000e5
-507 1 28 43 -0.13107200000000000000e6
-507 1 32 47 -0.19660800000000000000e6
-507 1 33 48 -0.65536000000000000000e5
-507 2 2 8 -0.32768000000000000000e5
-507 2 2 32 -0.32768000000000000000e5
-507 2 3 9 0.32768000000000000000e5
-507 2 6 20 0.65536000000000000000e5
-507 2 7 21 -0.13107200000000000000e6
-507 2 12 26 -0.65536000000000000000e5
-507 2 16 30 -0.32768000000000000000e5
-507 2 20 34 -0.65536000000000000000e5
-507 3 1 14 0.13107200000000000000e6
-507 3 1 30 0.32768000000000000000e5
-507 3 2 7 0.32768000000000000000e5
-507 3 2 15 -0.65536000000000000000e5
-507 3 3 32 -0.19660800000000000000e6
-507 3 4 9 0.32768000000000000000e5
-507 3 7 12 -0.13107200000000000000e6
-507 3 8 37 -0.32768000000000000000e5
-507 3 10 23 0.65536000000000000000e5
-507 3 13 42 -0.13107200000000000000e6
-507 3 22 35 -0.13107200000000000000e6
-507 3 28 41 -0.19660800000000000000e6
-507 3 29 42 -0.65536000000000000000e5
-507 4 2 6 0.32768000000000000000e5
-507 4 2 30 -0.32768000000000000000e5
-507 4 3 31 0.65536000000000000000e5
-507 4 6 6 0.13107200000000000000e6
-507 4 6 18 0.32768000000000000000e5
-507 4 6 34 -0.65536000000000000000e5
-508 1 1 32 -0.65536000000000000000e5
-508 1 1 48 0.32768000000000000000e5
-508 1 2 33 0.13107200000000000000e6
-508 1 2 49 0.32768000000000000000e5
-508 1 3 34 -0.13107200000000000000e6
-508 1 4 11 -0.32768000000000000000e5
-508 1 7 9 0.65536000000000000000e5
-508 1 8 23 0.32768000000000000000e5
-508 1 8 39 0.32768000000000000000e5
-508 1 9 40 0.32768000000000000000e5
-508 1 10 41 0.65536000000000000000e5
-508 1 11 42 -0.65536000000000000000e5
-508 1 12 43 -0.26214400000000000000e6
-508 1 23 38 0.32768000000000000000e5
-508 1 26 41 -0.32768000000000000000e5
-508 1 28 43 0.13107200000000000000e6
-508 1 32 47 0.19660800000000000000e6
-508 1 33 48 0.65536000000000000000e5
-508 2 2 8 0.32768000000000000000e5
-508 2 2 32 0.32768000000000000000e5
-508 2 3 9 -0.32768000000000000000e5
-508 2 7 21 0.65536000000000000000e5
-508 2 12 26 0.65536000000000000000e5
-508 2 16 30 0.32768000000000000000e5
-508 2 20 34 0.65536000000000000000e5
-508 3 1 14 -0.65536000000000000000e5
-508 3 1 30 -0.32768000000000000000e5
-508 3 2 7 -0.32768000000000000000e5
-508 3 2 15 0.65536000000000000000e5
-508 3 3 32 0.13107200000000000000e6
-508 3 4 9 -0.32768000000000000000e5
-508 3 8 37 0.32768000000000000000e5
-508 3 10 23 -0.65536000000000000000e5
-508 3 13 42 0.13107200000000000000e6
-508 3 22 35 0.13107200000000000000e6
-508 3 28 41 0.19660800000000000000e6
-508 3 29 42 0.65536000000000000000e5
-508 4 2 6 -0.32768000000000000000e5
-508 4 2 30 0.32768000000000000000e5
-508 4 3 31 -0.65536000000000000000e5
-508 4 6 18 -0.32768000000000000000e5
-508 4 6 34 0.65536000000000000000e5
-509 1 2 33 0.65536000000000000000e5
-509 1 3 34 -0.13107200000000000000e6
-509 1 7 10 0.65536000000000000000e5
-509 1 10 41 0.65536000000000000000e5
-509 2 7 21 0.65536000000000000000e5
-509 3 1 14 -0.65536000000000000000e5
-509 3 3 32 0.65536000000000000000e5
-510 1 2 33 -0.65536000000000000000e5
-510 1 7 11 0.65536000000000000000e5
-510 2 4 10 0.65536000000000000000e5
-510 2 7 21 -0.65536000000000000000e5
-510 3 1 14 0.65536000000000000000e5
-510 3 2 15 0.65536000000000000000e5
-510 3 3 16 -0.13107200000000000000e6
-511 1 1 16 -0.65536000000000000000e5
-511 1 7 12 0.65536000000000000000e5
-512 1 7 13 0.65536000000000000000e5
-512 1 12 27 -0.65536000000000000000e5
-512 3 7 12 -0.65536000000000000000e5
-513 1 2 17 -0.65536000000000000000e5
-513 1 7 14 0.65536000000000000000e5
-514 1 3 34 -0.65536000000000000000e5
-514 1 7 15 0.65536000000000000000e5
-514 3 3 16 -0.65536000000000000000e5
-515 1 2 17 -0.32768000000000000000e5
-515 1 4 35 -0.32768000000000000000e5
-515 1 7 17 0.65536000000000000000e5
-515 1 12 43 -0.32768000000000000000e5
-515 1 14 45 -0.65536000000000000000e5
-515 1 16 23 0.32768000000000000000e5
-515 1 16 31 -0.13107200000000000000e6
-515 1 17 48 0.32768000000000000000e5
-515 1 18 49 0.32768000000000000000e5
-515 1 20 27 0.13107200000000000000e6
-515 2 7 13 0.65536000000000000000e5
-515 2 9 23 -0.32768000000000000000e5
-515 2 10 24 -0.65536000000000000000e5
-515 2 14 28 0.32768000000000000000e5
-515 3 3 16 -0.32768000000000000000e5
-515 3 5 34 -0.32768000000000000000e5
-515 3 7 12 -0.32768000000000000000e5
-515 3 13 42 0.32768000000000000000e5
-515 3 14 27 -0.32768000000000000000e5
-515 3 14 43 0.32768000000000000000e5
-515 4 1 13 -0.32768000000000000000e5
-515 4 10 10 -0.13107200000000000000e6
-516 1 2 17 -0.32768000000000000000e5
-516 1 3 18 -0.32768000000000000000e5
-516 1 3 34 -0.32768000000000000000e5
-516 1 7 18 0.65536000000000000000e5
-516 2 6 12 -0.32768000000000000000e5
-516 3 3 16 -0.32768000000000000000e5
-517 1 2 17 -0.32768000000000000000e5
-517 1 3 18 -0.16384000000000000000e5
-517 1 3 34 -0.16384000000000000000e5
-517 1 4 35 -0.16384000000000000000e5
-517 1 7 16 -0.32768000000000000000e5
-517 1 7 19 0.65536000000000000000e5
-517 1 12 43 -0.16384000000000000000e5
-517 1 14 45 -0.32768000000000000000e5
-517 1 16 23 0.16384000000000000000e5
-517 1 16 31 -0.65536000000000000000e5
-517 1 17 48 0.16384000000000000000e5
-517 1 18 49 0.16384000000000000000e5
-517 1 20 27 0.65536000000000000000e5
-517 2 1 15 -0.32768000000000000000e5
-517 2 6 12 -0.16384000000000000000e5
-517 2 7 13 0.32768000000000000000e5
-517 2 9 23 -0.16384000000000000000e5
-517 2 10 24 -0.32768000000000000000e5
-517 2 14 28 0.16384000000000000000e5
-517 3 3 16 -0.32768000000000000000e5
-517 3 5 34 -0.16384000000000000000e5
-517 3 7 12 -0.16384000000000000000e5
-517 3 13 42 0.16384000000000000000e5
-517 3 14 27 -0.16384000000000000000e5
-517 3 14 43 0.16384000000000000000e5
-517 4 1 13 -0.16384000000000000000e5
-517 4 10 10 -0.65536000000000000000e5
-518 1 2 17 -0.32768000000000000000e5
-518 1 3 18 -0.16384000000000000000e5
-518 1 3 34 -0.16384000000000000000e5
-518 1 4 19 -0.32768000000000000000e5
-518 1 4 35 -0.16384000000000000000e5
-518 1 7 20 0.65536000000000000000e5
-518 1 12 43 -0.16384000000000000000e5
-518 1 14 45 -0.32768000000000000000e5
-518 1 16 23 0.16384000000000000000e5
-518 1 16 31 -0.65536000000000000000e5
-518 1 17 48 0.16384000000000000000e5
-518 1 18 49 0.16384000000000000000e5
-518 1 20 27 0.65536000000000000000e5
-518 2 6 12 -0.16384000000000000000e5
-518 2 9 23 -0.16384000000000000000e5
-518 2 10 24 -0.32768000000000000000e5
-518 2 14 28 0.16384000000000000000e5
-518 3 3 16 -0.32768000000000000000e5
-518 3 5 34 -0.16384000000000000000e5
-518 3 7 12 -0.16384000000000000000e5
-518 3 13 42 0.16384000000000000000e5
-518 3 14 27 -0.16384000000000000000e5
-518 3 14 43 0.16384000000000000000e5
-518 4 1 13 -0.16384000000000000000e5
-518 4 10 10 -0.65536000000000000000e5
-519 1 7 21 0.65536000000000000000e5
-519 1 12 19 -0.65536000000000000000e5
-520 1 1 8 0.65536000000000000000e5
-520 1 1 32 0.13107200000000000000e6
-520 1 1 48 -0.65536000000000000000e5
-520 1 2 9 0.65536000000000000000e5
-520 1 2 33 -0.39321600000000000000e6
-520 1 2 49 -0.65536000000000000000e5
-520 1 3 34 0.52428800000000000000e6
-520 1 4 11 0.65536000000000000000e5
-520 1 7 23 0.65536000000000000000e5
-520 1 8 23 -0.65536000000000000000e5
-520 1 8 39 -0.65536000000000000000e5
-520 1 9 40 -0.65536000000000000000e5
-520 1 10 41 -0.26214400000000000000e6
-520 1 11 42 0.13107200000000000000e6
-520 1 12 27 -0.26214400000000000000e6
-520 1 12 43 0.52428800000000000000e6
-520 1 23 38 -0.65536000000000000000e5
-520 1 26 41 0.65536000000000000000e5
-520 1 28 43 -0.26214400000000000000e6
-520 1 32 47 -0.39321600000000000000e6
-520 1 33 48 -0.13107200000000000000e6
-520 2 1 7 0.65536000000000000000e5
-520 2 2 8 -0.65536000000000000000e5
-520 2 2 32 -0.65536000000000000000e5
-520 2 3 9 0.65536000000000000000e5
-520 2 6 20 0.13107200000000000000e6
-520 2 7 21 -0.26214400000000000000e6
-520 2 12 26 -0.13107200000000000000e6
-520 2 16 30 -0.65536000000000000000e5
-520 2 20 34 -0.13107200000000000000e6
-520 3 1 14 0.26214400000000000000e6
-520 3 1 30 0.65536000000000000000e5
-520 3 2 7 0.13107200000000000000e6
-520 3 2 15 -0.13107200000000000000e6
-520 3 3 32 -0.39321600000000000000e6
-520 3 4 9 0.65536000000000000000e5
-520 3 7 12 -0.26214400000000000000e6
-520 3 8 37 -0.65536000000000000000e5
-520 3 10 23 0.13107200000000000000e6
-520 3 13 42 -0.26214400000000000000e6
-520 3 22 35 -0.26214400000000000000e6
-520 3 28 41 -0.39321600000000000000e6
-520 3 29 42 -0.13107200000000000000e6
-520 4 2 6 0.65536000000000000000e5
-520 4 2 30 -0.65536000000000000000e5
-520 4 3 31 0.13107200000000000000e6
-520 4 6 6 0.26214400000000000000e6
-520 4 6 18 0.65536000000000000000e5
-520 4 6 34 -0.13107200000000000000e6
-521 1 7 24 0.65536000000000000000e5
-521 1 8 23 -0.65536000000000000000e5
-522 1 1 48 -0.32768000000000000000e5
-522 1 2 33 -0.13107200000000000000e6
-522 1 2 49 -0.32768000000000000000e5
-522 1 7 25 0.65536000000000000000e5
-522 1 11 42 0.13107200000000000000e6
-522 1 12 43 0.26214400000000000000e6
-522 1 23 38 -0.32768000000000000000e5
-522 1 28 43 -0.13107200000000000000e6
-522 1 32 47 -0.13107200000000000000e6
-522 1 33 48 -0.13107200000000000000e6
-522 2 2 32 -0.32768000000000000000e5
-522 2 12 26 -0.13107200000000000000e6
-522 3 1 30 0.65536000000000000000e5
-522 3 8 37 -0.65536000000000000000e5
-522 3 10 23 0.65536000000000000000e5
-522 3 13 42 -0.26214400000000000000e6
-522 3 28 41 -0.13107200000000000000e6
-522 3 29 42 -0.13107200000000000000e6
-522 4 3 31 0.13107200000000000000e6
-522 4 6 18 0.65536000000000000000e5
-523 1 7 26 0.65536000000000000000e5
-523 1 8 39 -0.65536000000000000000e5
-523 3 1 30 -0.65536000000000000000e5
-524 1 1 32 0.65536000000000000000e5
-524 1 2 33 -0.65536000000000000000e5
-524 1 3 34 0.13107200000000000000e6
-524 1 7 27 0.65536000000000000000e5
-524 1 10 41 -0.65536000000000000000e5
-524 1 12 27 -0.13107200000000000000e6
-524 2 6 20 0.65536000000000000000e5
-524 2 7 21 -0.65536000000000000000e5
-524 3 3 32 -0.65536000000000000000e5
-525 1 1 32 -0.65536000000000000000e5
-525 1 7 28 0.65536000000000000000e5
-526 1 2 33 0.65536000000000000000e5
-526 1 3 34 -0.13107200000000000000e6
-526 1 7 29 0.65536000000000000000e5
-526 1 10 41 0.65536000000000000000e5
-526 2 7 21 0.65536000000000000000e5
-526 3 3 32 0.65536000000000000000e5
-527 1 2 33 -0.65536000000000000000e5
-527 1 7 30 0.65536000000000000000e5
-528 1 7 31 0.65536000000000000000e5
-528 1 12 27 -0.65536000000000000000e5
-529 1 7 32 0.65536000000000000000e5
-529 1 16 23 -0.65536000000000000000e5
-530 1 3 34 -0.65536000000000000000e5
-530 1 7 33 0.65536000000000000000e5
-531 1 4 35 -0.32768000000000000000e5
-531 1 7 34 0.65536000000000000000e5
-531 1 12 43 -0.32768000000000000000e5
-531 1 14 45 -0.65536000000000000000e5
-531 1 16 31 -0.13107200000000000000e6
-531 1 17 48 0.32768000000000000000e5
-531 1 18 49 0.32768000000000000000e5
-531 1 20 27 0.13107200000000000000e6
-531 2 7 13 0.65536000000000000000e5
-531 2 9 23 -0.32768000000000000000e5
-531 2 10 24 -0.65536000000000000000e5
-531 2 14 28 0.32768000000000000000e5
-531 3 5 34 -0.32768000000000000000e5
-531 3 13 42 0.32768000000000000000e5
-531 3 14 27 -0.32768000000000000000e5
-531 3 14 43 0.32768000000000000000e5
-531 4 10 10 -0.13107200000000000000e6
-532 1 3 18 -0.32768000000000000000e5
-532 1 4 19 0.65536000000000000000e5
-532 1 4 35 0.32768000000000000000e5
-532 1 7 35 0.65536000000000000000e5
-532 1 12 43 0.65536000000000000000e5
-532 1 14 45 0.65536000000000000000e5
-532 1 17 48 -0.32768000000000000000e5
-532 1 18 49 -0.32768000000000000000e5
-532 1 20 27 -0.13107200000000000000e6
-532 2 9 23 0.32768000000000000000e5
-532 2 10 24 0.65536000000000000000e5
-532 2 14 28 -0.32768000000000000000e5
-532 3 3 16 -0.32768000000000000000e5
-532 3 4 17 -0.32768000000000000000e5
-532 3 5 34 0.32768000000000000000e5
-532 3 13 42 -0.32768000000000000000e5
-532 3 14 27 0.65536000000000000000e5
-532 3 14 43 -0.32768000000000000000e5
-532 4 2 14 -0.32768000000000000000e5
-533 1 7 36 0.65536000000000000000e5
-533 1 16 31 -0.65536000000000000000e5
-534 1 1 8 0.65536000000000000000e5
-534 1 1 24 0.32768000000000000000e5
-534 1 1 32 0.13107200000000000000e6
-534 1 1 40 0.32768000000000000000e5
-534 1 1 48 -0.65536000000000000000e5
-534 1 2 9 0.65536000000000000000e5
-534 1 2 33 -0.39321600000000000000e6
-534 1 2 49 -0.65536000000000000000e5
-534 1 3 34 0.52428800000000000000e6
-534 1 4 11 0.65536000000000000000e5
-534 1 7 37 0.65536000000000000000e5
-534 1 8 23 -0.65536000000000000000e5
-534 1 8 39 -0.65536000000000000000e5
-534 1 9 40 -0.65536000000000000000e5
-534 1 10 41 -0.26214400000000000000e6
-534 1 11 42 0.13107200000000000000e6
-534 1 12 27 -0.26214400000000000000e6
-534 1 12 43 0.52428800000000000000e6
-534 1 22 37 -0.32768000000000000000e5
-534 1 23 38 -0.98304000000000000000e5
-534 1 26 41 0.65536000000000000000e5
-534 1 28 43 -0.26214400000000000000e6
-534 1 32 47 -0.39321600000000000000e6
-534 1 33 48 -0.13107200000000000000e6
-534 2 1 7 0.65536000000000000000e5
-534 2 2 8 -0.65536000000000000000e5
-534 2 2 16 0.32768000000000000000e5
-534 2 2 32 -0.65536000000000000000e5
-534 2 3 9 0.65536000000000000000e5
-534 2 6 20 0.13107200000000000000e6
-534 2 7 21 -0.26214400000000000000e6
-534 2 12 26 -0.13107200000000000000e6
-534 2 16 16 -0.65536000000000000000e5
-534 2 16 30 -0.65536000000000000000e5
-534 2 20 34 -0.13107200000000000000e6
-534 3 1 14 0.26214400000000000000e6
-534 3 1 22 0.32768000000000000000e5
-534 3 1 30 0.65536000000000000000e5
-534 3 1 38 0.32768000000000000000e5
-534 3 2 7 0.13107200000000000000e6
-534 3 2 15 -0.13107200000000000000e6
-534 3 2 23 0.32768000000000000000e5
-534 3 3 32 -0.39321600000000000000e6
-534 3 4 9 0.65536000000000000000e5
-534 3 7 12 -0.26214400000000000000e6
-534 3 8 37 -0.65536000000000000000e5
-534 3 10 23 0.13107200000000000000e6
-534 3 13 42 -0.26214400000000000000e6
-534 3 22 27 -0.65536000000000000000e5
-534 3 22 35 -0.26214400000000000000e6
-534 3 28 41 -0.39321600000000000000e6
-534 3 29 42 -0.13107200000000000000e6
-534 4 2 6 0.65536000000000000000e5
-534 4 2 30 -0.65536000000000000000e5
-534 4 3 31 0.13107200000000000000e6
-534 4 6 6 0.26214400000000000000e6
-534 4 6 18 0.65536000000000000000e5
-534 4 6 34 -0.13107200000000000000e6
-534 4 16 16 0.65536000000000000000e5
-535 1 1 48 -0.32768000000000000000e5
-535 1 2 49 -0.32768000000000000000e5
-535 1 7 39 0.65536000000000000000e5
-535 1 23 38 -0.32768000000000000000e5
-535 2 2 32 -0.32768000000000000000e5
-535 3 8 37 -0.65536000000000000000e5
-536 1 7 40 0.65536000000000000000e5
-536 1 8 39 -0.65536000000000000000e5
-537 1 2 33 -0.65536000000000000000e5
-537 1 3 34 0.13107200000000000000e6
-537 1 7 41 0.65536000000000000000e5
-537 1 10 41 -0.65536000000000000000e5
-537 1 11 42 0.65536000000000000000e5
-537 1 12 43 0.13107200000000000000e6
-537 1 16 23 -0.13107200000000000000e6
-537 1 28 43 -0.65536000000000000000e5
-537 1 32 47 -0.65536000000000000000e5
-537 1 33 48 -0.65536000000000000000e5
-537 2 1 31 0.65536000000000000000e5
-537 2 7 21 -0.65536000000000000000e5
-537 2 12 26 -0.65536000000000000000e5
-537 3 1 34 0.13107200000000000000e6
-537 3 2 31 -0.65536000000000000000e5
-537 3 3 32 -0.65536000000000000000e5
-537 3 13 42 -0.13107200000000000000e6
-537 3 28 41 -0.65536000000000000000e5
-537 3 29 42 -0.65536000000000000000e5
-537 4 3 31 0.65536000000000000000e5
-538 1 2 33 0.65536000000000000000e5
-538 1 3 34 -0.13107200000000000000e6
-538 1 7 42 0.65536000000000000000e5
-538 1 10 41 0.65536000000000000000e5
-538 2 7 21 0.65536000000000000000e5
-538 3 2 31 0.65536000000000000000e5
-538 3 3 32 0.65536000000000000000e5
-539 1 7 43 0.65536000000000000000e5
-539 1 11 42 -0.65536000000000000000e5
-539 1 12 43 -0.13107200000000000000e6
-539 1 28 43 0.65536000000000000000e5
-539 1 32 47 0.65536000000000000000e5
-539 1 33 48 0.65536000000000000000e5
-539 2 12 26 0.65536000000000000000e5
-539 3 13 42 0.13107200000000000000e6
-539 3 28 41 0.65536000000000000000e5
-539 3 29 42 0.65536000000000000000e5
-539 4 3 31 -0.65536000000000000000e5
-540 1 7 44 0.65536000000000000000e5
-540 1 16 23 -0.65536000000000000000e5
-540 3 1 34 0.65536000000000000000e5
-541 1 7 45 0.65536000000000000000e5
-541 1 16 47 -0.65536000000000000000e5
-541 3 12 41 -0.65536000000000000000e5
-542 1 7 46 0.65536000000000000000e5
-542 1 27 34 -0.65536000000000000000e5
-543 1 7 38 -0.65536000000000000000e5
-543 1 7 47 0.65536000000000000000e5
-543 3 22 27 0.65536000000000000000e5
-544 1 1 48 -0.32768000000000000000e5
-544 1 2 49 -0.32768000000000000000e5
-544 1 7 48 0.65536000000000000000e5
-544 1 23 38 -0.32768000000000000000e5
-544 2 2 32 -0.32768000000000000000e5
-545 1 7 49 0.65536000000000000000e5
-545 1 8 39 -0.65536000000000000000e5
-545 1 9 40 -0.65536000000000000000e5
-545 1 10 41 0.13107200000000000000e6
-545 1 26 41 0.65536000000000000000e5
-545 1 32 47 -0.13107200000000000000e6
-545 3 9 38 -0.65536000000000000000e5
-545 3 28 41 -0.13107200000000000000e6
-545 4 2 30 -0.65536000000000000000e5
-546 1 2 33 0.65536000000000000000e5
-546 1 3 34 -0.13107200000000000000e6
-546 1 7 50 0.65536000000000000000e5
-546 1 9 40 -0.32768000000000000000e5
-546 1 10 41 0.13107200000000000000e6
-546 1 26 41 0.32768000000000000000e5
-546 1 32 47 -0.65536000000000000000e5
-546 2 7 21 0.65536000000000000000e5
-546 3 2 31 0.65536000000000000000e5
-546 3 3 32 0.65536000000000000000e5
-546 3 8 37 0.32768000000000000000e5
-546 3 9 38 -0.32768000000000000000e5
-546 3 22 27 0.32768000000000000000e5
-546 3 28 41 -0.65536000000000000000e5
-546 4 1 29 0.32768000000000000000e5
-546 4 2 30 -0.32768000000000000000e5
-547 1 7 51 0.65536000000000000000e5
-547 1 12 43 -0.13107200000000000000e6
-547 1 28 43 0.65536000000000000000e5
-547 1 32 47 0.65536000000000000000e5
-547 2 20 34 0.65536000000000000000e5
-547 3 22 35 0.13107200000000000000e6
-547 3 28 41 0.65536000000000000000e5
-547 4 6 34 0.65536000000000000000e5
-548 1 7 52 0.65536000000000000000e5
-548 1 16 47 -0.65536000000000000000e5
-549 1 1 48 -0.32768000000000000000e5
-549 1 2 49 -0.32768000000000000000e5
-549 1 6 53 -0.32768000000000000000e5
-549 1 7 53 0.65536000000000000000e5
-549 1 23 38 -0.32768000000000000000e5
-549 1 25 40 0.32768000000000000000e5
-549 2 2 32 -0.32768000000000000000e5
-549 2 4 34 -0.65536000000000000000e5
-549 2 16 30 -0.65536000000000000000e5
-549 2 16 34 0.65536000000000000000e5
-549 2 21 35 0.65536000000000000000e5
-549 3 5 50 -0.65536000000000000000e5
-549 3 7 52 0.26214400000000000000e6
-549 3 24 37 -0.32768000000000000000e5
-549 3 27 40 -0.65536000000000000000e5
-549 3 28 41 -0.26214400000000000000e6
-549 4 4 32 0.32768000000000000000e5
-549 4 6 34 -0.13107200000000000000e6
-549 4 7 35 0.65536000000000000000e5
-549 4 16 28 -0.32768000000000000000e5
-549 4 17 29 0.65536000000000000000e5
-550 1 6 53 -0.32768000000000000000e5
-550 1 7 54 0.65536000000000000000e5
-550 1 8 39 -0.65536000000000000000e5
-550 1 9 40 -0.65536000000000000000e5
-550 1 10 41 0.13107200000000000000e6
-550 1 25 40 0.32768000000000000000e5
-550 1 26 41 0.65536000000000000000e5
-550 1 32 47 -0.13107200000000000000e6
-550 3 9 38 -0.65536000000000000000e5
-550 3 24 37 -0.32768000000000000000e5
-550 3 27 40 -0.13107200000000000000e6
-550 4 2 30 -0.65536000000000000000e5
-550 4 4 32 0.32768000000000000000e5
-550 4 16 28 -0.32768000000000000000e5
-550 4 17 29 -0.65536000000000000000e5
-551 1 6 53 -0.16384000000000000000e5
-551 1 7 55 0.65536000000000000000e5
-551 1 12 43 -0.13107200000000000000e6
-551 1 25 40 0.16384000000000000000e5
-551 1 28 43 0.65536000000000000000e5
-551 1 32 47 0.65536000000000000000e5
-551 2 4 34 -0.32768000000000000000e5
-551 2 20 34 0.65536000000000000000e5
-551 2 21 35 0.32768000000000000000e5
-551 3 5 50 -0.32768000000000000000e5
-551 3 7 52 0.13107200000000000000e6
-551 3 22 35 0.13107200000000000000e6
-551 3 24 37 -0.16384000000000000000e5
-551 3 27 40 -0.65536000000000000000e5
-551 4 4 32 0.16384000000000000000e5
-551 4 7 35 0.32768000000000000000e5
-551 4 16 28 -0.16384000000000000000e5
-552 1 6 53 -0.32768000000000000000e5
-552 1 7 56 0.65536000000000000000e5
-552 1 8 39 -0.65536000000000000000e5
-552 1 9 40 -0.65536000000000000000e5
-552 1 10 41 0.13107200000000000000e6
-552 1 24 55 0.65536000000000000000e5
-552 1 25 40 0.32768000000000000000e5
-552 1 37 52 -0.13107200000000000000e6
-552 3 9 38 -0.65536000000000000000e5
-552 3 22 51 -0.65536000000000000000e5
-552 3 24 37 -0.32768000000000000000e5
-552 3 27 40 -0.65536000000000000000e5
-552 4 2 30 -0.65536000000000000000e5
-552 4 4 32 0.32768000000000000000e5
-552 4 16 28 -0.32768000000000000000e5
-552 4 17 29 -0.65536000000000000000e5
-552 4 20 32 -0.65536000000000000000e5
-553 1 1 32 -0.32768000000000000000e5
-553 1 1 48 0.16384000000000000000e5
-553 1 2 33 0.65536000000000000000e5
-553 1 2 49 0.16384000000000000000e5
-553 1 3 34 -0.65536000000000000000e5
-553 1 4 11 -0.16384000000000000000e5
-553 1 8 8 0.65536000000000000000e5
-553 1 8 23 0.16384000000000000000e5
-553 1 8 39 0.16384000000000000000e5
-553 1 9 40 0.16384000000000000000e5
-553 1 10 41 0.32768000000000000000e5
-553 1 11 42 -0.32768000000000000000e5
-553 1 12 43 -0.13107200000000000000e6
-553 1 23 38 0.16384000000000000000e5
-553 1 26 41 -0.16384000000000000000e5
-553 1 28 43 0.65536000000000000000e5
-553 1 32 47 0.98304000000000000000e5
-553 1 33 48 0.32768000000000000000e5
-553 2 2 8 0.16384000000000000000e5
-553 2 2 32 0.16384000000000000000e5
-553 2 3 9 -0.16384000000000000000e5
-553 2 7 21 0.32768000000000000000e5
-553 2 12 26 0.32768000000000000000e5
-553 2 16 30 0.16384000000000000000e5
-553 2 20 34 0.32768000000000000000e5
-553 3 1 14 -0.32768000000000000000e5
-553 3 1 30 -0.16384000000000000000e5
-553 3 2 7 -0.16384000000000000000e5
-553 3 2 15 0.32768000000000000000e5
-553 3 3 32 0.65536000000000000000e5
-553 3 4 9 -0.16384000000000000000e5
-553 3 8 37 0.16384000000000000000e5
-553 3 10 23 -0.32768000000000000000e5
-553 3 13 42 0.65536000000000000000e5
-553 3 22 35 0.65536000000000000000e5
-553 3 28 41 0.98304000000000000000e5
-553 3 29 42 0.32768000000000000000e5
-553 4 2 6 -0.16384000000000000000e5
-553 4 2 30 0.16384000000000000000e5
-553 4 3 31 -0.32768000000000000000e5
-553 4 6 18 -0.16384000000000000000e5
-553 4 6 34 0.32768000000000000000e5
-554 1 2 33 0.65536000000000000000e5
-554 1 3 34 -0.13107200000000000000e6
-554 1 8 9 0.65536000000000000000e5
-554 1 10 41 0.65536000000000000000e5
-554 2 7 21 0.65536000000000000000e5
-554 3 1 14 -0.65536000000000000000e5
-554 3 3 32 0.65536000000000000000e5
-555 1 2 33 -0.65536000000000000000e5
-555 1 8 10 0.65536000000000000000e5
-555 2 4 10 0.65536000000000000000e5
-555 2 7 21 -0.65536000000000000000e5
-555 3 1 14 0.65536000000000000000e5
-555 3 2 15 0.65536000000000000000e5
-555 3 3 16 -0.13107200000000000000e6
-556 1 8 11 0.65536000000000000000e5
-556 1 10 41 -0.65536000000000000000e5
-556 3 2 15 -0.65536000000000000000e5
-556 3 3 32 -0.65536000000000000000e5
-557 1 8 12 0.65536000000000000000e5
-557 1 12 27 -0.65536000000000000000e5
-557 3 7 12 -0.65536000000000000000e5
-558 1 2 17 -0.65536000000000000000e5
-558 1 8 13 0.65536000000000000000e5
-559 1 3 34 -0.65536000000000000000e5
-559 1 8 14 0.65536000000000000000e5
-559 3 3 16 -0.65536000000000000000e5
-560 1 3 18 -0.65536000000000000000e5
-560 1 8 15 0.65536000000000000000e5
-561 1 2 17 -0.32768000000000000000e5
-561 1 4 35 -0.32768000000000000000e5
-561 1 8 16 0.65536000000000000000e5
-561 1 12 43 -0.32768000000000000000e5
-561 1 14 45 -0.65536000000000000000e5
-561 1 16 23 0.32768000000000000000e5
-561 1 16 31 -0.13107200000000000000e6
-561 1 17 48 0.32768000000000000000e5
-561 1 18 49 0.32768000000000000000e5
-561 1 20 27 0.13107200000000000000e6
-561 2 7 13 0.65536000000000000000e5
-561 2 9 23 -0.32768000000000000000e5
-561 2 10 24 -0.65536000000000000000e5
-561 2 14 28 0.32768000000000000000e5
-561 3 3 16 -0.32768000000000000000e5
-561 3 5 34 -0.32768000000000000000e5
-561 3 7 12 -0.32768000000000000000e5
-561 3 13 42 0.32768000000000000000e5
-561 3 14 27 -0.32768000000000000000e5
-561 3 14 43 0.32768000000000000000e5
-561 4 1 13 -0.32768000000000000000e5
-561 4 10 10 -0.13107200000000000000e6
-562 1 2 17 -0.32768000000000000000e5
-562 1 3 18 -0.32768000000000000000e5
-562 1 3 34 -0.32768000000000000000e5
-562 1 8 17 0.65536000000000000000e5
-562 2 6 12 -0.32768000000000000000e5
-562 3 3 16 -0.32768000000000000000e5
-563 1 4 19 -0.65536000000000000000e5
-563 1 8 18 0.65536000000000000000e5
-564 1 2 17 -0.32768000000000000000e5
-564 1 3 18 -0.16384000000000000000e5
-564 1 3 34 -0.16384000000000000000e5
-564 1 4 19 -0.32768000000000000000e5
-564 1 4 35 -0.16384000000000000000e5
-564 1 8 19 0.65536000000000000000e5
-564 1 12 43 -0.16384000000000000000e5
-564 1 14 45 -0.32768000000000000000e5
-564 1 16 23 0.16384000000000000000e5
-564 1 16 31 -0.65536000000000000000e5
-564 1 17 48 0.16384000000000000000e5
-564 1 18 49 0.16384000000000000000e5
-564 1 20 27 0.65536000000000000000e5
-564 2 6 12 -0.16384000000000000000e5
-564 2 9 23 -0.16384000000000000000e5
-564 2 10 24 -0.32768000000000000000e5
-564 2 14 28 0.16384000000000000000e5
-564 3 3 16 -0.32768000000000000000e5
-564 3 5 34 -0.16384000000000000000e5
-564 3 7 12 -0.16384000000000000000e5
-564 3 13 42 0.16384000000000000000e5
-564 3 14 27 -0.16384000000000000000e5
-564 3 14 43 0.16384000000000000000e5
-564 4 1 13 -0.16384000000000000000e5
-564 4 10 10 -0.65536000000000000000e5
-565 1 8 20 0.65536000000000000000e5
-565 1 20 27 -0.65536000000000000000e5
-565 3 7 20 -0.65536000000000000000e5
-566 1 2 17 -0.16384000000000000000e5
-566 1 3 18 -0.16384000000000000000e5
-566 1 3 34 -0.81920000000000000000e4
-566 1 4 19 -0.16384000000000000000e5
-566 1 5 20 -0.16384000000000000000e5
-566 1 5 36 0.16384000000000000000e5
-566 1 8 21 0.65536000000000000000e5
-566 1 10 17 -0.16384000000000000000e5
-566 1 12 43 0.81920000000000000000e4
-566 1 16 23 0.81920000000000000000e4
-566 1 16 31 -0.32768000000000000000e5
-566 1 17 32 -0.32768000000000000000e5
-566 2 6 12 -0.81920000000000000000e4
-566 2 10 24 -0.16384000000000000000e5
-566 2 11 13 -0.32768000000000000000e5
-566 3 3 16 -0.24576000000000000000e5
-566 3 4 17 -0.81920000000000000000e4
-566 3 7 12 -0.81920000000000000000e4
-566 3 7 20 -0.32768000000000000000e5
-566 3 14 27 0.81920000000000000000e4
-566 4 1 13 -0.81920000000000000000e4
-566 4 2 14 -0.81920000000000000000e4
-566 4 3 15 -0.16384000000000000000e5
-566 4 10 10 -0.32768000000000000000e5
-567 1 1 8 0.65536000000000000000e5
-567 1 1 32 0.13107200000000000000e6
-567 1 1 48 -0.65536000000000000000e5
-567 1 2 9 0.65536000000000000000e5
-567 1 2 33 -0.39321600000000000000e6
-567 1 2 49 -0.65536000000000000000e5
-567 1 3 34 0.52428800000000000000e6
-567 1 4 11 0.65536000000000000000e5
-567 1 8 22 0.65536000000000000000e5
-567 1 8 23 -0.65536000000000000000e5
-567 1 8 39 -0.65536000000000000000e5
-567 1 9 40 -0.65536000000000000000e5
-567 1 10 41 -0.26214400000000000000e6
-567 1 11 42 0.13107200000000000000e6
-567 1 12 27 -0.26214400000000000000e6
-567 1 12 43 0.52428800000000000000e6
-567 1 23 38 -0.65536000000000000000e5
-567 1 26 41 0.65536000000000000000e5
-567 1 28 43 -0.26214400000000000000e6
-567 1 32 47 -0.39321600000000000000e6
-567 1 33 48 -0.13107200000000000000e6
-567 2 1 7 0.65536000000000000000e5
-567 2 2 8 -0.65536000000000000000e5
-567 2 2 32 -0.65536000000000000000e5
-567 2 3 9 0.65536000000000000000e5
-567 2 6 20 0.13107200000000000000e6
-567 2 7 21 -0.26214400000000000000e6
-567 2 12 26 -0.13107200000000000000e6
-567 2 16 30 -0.65536000000000000000e5
-567 2 20 34 -0.13107200000000000000e6
-567 3 1 14 0.26214400000000000000e6
-567 3 1 30 0.65536000000000000000e5
-567 3 2 7 0.13107200000000000000e6
-567 3 2 15 -0.13107200000000000000e6
-567 3 3 32 -0.39321600000000000000e6
-567 3 4 9 0.65536000000000000000e5
-567 3 7 12 -0.26214400000000000000e6
-567 3 8 37 -0.65536000000000000000e5
-567 3 10 23 0.13107200000000000000e6
-567 3 13 42 -0.26214400000000000000e6
-567 3 22 35 -0.26214400000000000000e6
-567 3 28 41 -0.39321600000000000000e6
-567 3 29 42 -0.13107200000000000000e6
-567 4 2 6 0.65536000000000000000e5
-567 4 2 30 -0.65536000000000000000e5
-567 4 3 31 0.13107200000000000000e6
-567 4 6 6 0.26214400000000000000e6
-567 4 6 18 0.65536000000000000000e5
-567 4 6 34 -0.13107200000000000000e6
-568 1 1 48 -0.32768000000000000000e5
-568 1 2 33 -0.13107200000000000000e6
-568 1 2 49 -0.32768000000000000000e5
-568 1 8 24 0.65536000000000000000e5
-568 1 11 42 0.13107200000000000000e6
-568 1 12 43 0.26214400000000000000e6
-568 1 23 38 -0.32768000000000000000e5
-568 1 28 43 -0.13107200000000000000e6
-568 1 32 47 -0.13107200000000000000e6
-568 1 33 48 -0.13107200000000000000e6
-568 2 2 32 -0.32768000000000000000e5
-568 2 12 26 -0.13107200000000000000e6
-568 3 1 30 0.65536000000000000000e5
-568 3 8 37 -0.65536000000000000000e5
-568 3 10 23 0.65536000000000000000e5
-568 3 13 42 -0.26214400000000000000e6
-568 3 28 41 -0.13107200000000000000e6
-568 3 29 42 -0.13107200000000000000e6
-568 4 3 31 0.13107200000000000000e6
-568 4 6 18 0.65536000000000000000e5
-569 1 8 25 0.65536000000000000000e5
-569 1 8 39 -0.65536000000000000000e5
-569 3 1 30 -0.65536000000000000000e5
-570 1 1 48 0.32768000000000000000e5
-570 1 2 49 0.32768000000000000000e5
-570 1 8 26 0.65536000000000000000e5
-570 1 8 39 0.65536000000000000000e5
-570 1 9 40 0.65536000000000000000e5
-570 1 10 41 -0.13107200000000000000e6
-570 1 12 43 -0.26214400000000000000e6
-570 1 23 38 0.32768000000000000000e5
-570 1 26 41 -0.65536000000000000000e5
-570 1 28 43 0.13107200000000000000e6
-570 1 32 47 0.26214400000000000000e6
-570 2 2 32 0.32768000000000000000e5
-570 2 16 30 0.65536000000000000000e5
-570 2 20 34 0.13107200000000000000e6
-570 3 10 23 -0.65536000000000000000e5
-570 3 22 35 0.26214400000000000000e6
-570 3 28 41 0.26214400000000000000e6
-570 4 2 30 0.65536000000000000000e5
-570 4 6 34 0.13107200000000000000e6
-571 1 1 32 -0.65536000000000000000e5
-571 1 8 27 0.65536000000000000000e5
-572 1 2 33 0.65536000000000000000e5
-572 1 3 34 -0.13107200000000000000e6
-572 1 8 28 0.65536000000000000000e5
-572 1 10 41 0.65536000000000000000e5
-572 2 7 21 0.65536000000000000000e5
-572 3 3 32 0.65536000000000000000e5
-573 1 2 33 -0.65536000000000000000e5
-573 1 8 29 0.65536000000000000000e5
-574 1 8 30 0.65536000000000000000e5
-574 1 10 41 -0.65536000000000000000e5
-574 3 3 32 -0.65536000000000000000e5
-575 1 8 31 0.65536000000000000000e5
-575 1 16 23 -0.65536000000000000000e5
-576 1 3 34 -0.65536000000000000000e5
-576 1 8 32 0.65536000000000000000e5
-577 1 8 33 0.65536000000000000000e5
-577 1 12 43 -0.65536000000000000000e5
-577 3 14 27 -0.65536000000000000000e5
-578 1 3 18 -0.32768000000000000000e5
-578 1 4 19 0.65536000000000000000e5
-578 1 4 35 0.32768000000000000000e5
-578 1 8 34 0.65536000000000000000e5
-578 1 12 43 0.65536000000000000000e5
-578 1 14 45 0.65536000000000000000e5
-578 1 17 48 -0.32768000000000000000e5
-578 1 18 49 -0.32768000000000000000e5
-578 1 20 27 -0.13107200000000000000e6
-578 2 9 23 0.32768000000000000000e5
-578 2 10 24 0.65536000000000000000e5
-578 2 14 28 -0.32768000000000000000e5
-578 3 3 16 -0.32768000000000000000e5
-578 3 4 17 -0.32768000000000000000e5
-578 3 5 34 0.32768000000000000000e5
-578 3 13 42 -0.32768000000000000000e5
-578 3 14 27 0.65536000000000000000e5
-578 3 14 43 -0.32768000000000000000e5
-578 4 2 14 -0.32768000000000000000e5
-579 1 3 18 0.32768000000000000000e5
-579 1 4 19 -0.65536000000000000000e5
-579 1 8 35 0.65536000000000000000e5
-579 1 12 43 -0.32768000000000000000e5
-579 3 3 16 0.32768000000000000000e5
-579 3 4 17 0.32768000000000000000e5
-579 3 14 27 -0.32768000000000000000e5
-579 4 2 14 0.32768000000000000000e5
-580 1 8 36 0.65536000000000000000e5
-580 1 20 27 -0.65536000000000000000e5
-581 1 7 38 -0.65536000000000000000e5
-581 1 8 37 0.65536000000000000000e5
-582 1 1 48 -0.32768000000000000000e5
-582 1 2 49 -0.32768000000000000000e5
-582 1 8 38 0.65536000000000000000e5
-582 1 23 38 -0.32768000000000000000e5
-582 2 2 32 -0.32768000000000000000e5
-582 3 8 37 -0.65536000000000000000e5
-583 1 1 48 0.32768000000000000000e5
-583 1 2 49 0.32768000000000000000e5
-583 1 8 39 0.65536000000000000000e5
-583 1 8 40 0.65536000000000000000e5
-583 1 9 40 0.65536000000000000000e5
-583 1 10 41 -0.13107200000000000000e6
-583 1 12 43 -0.26214400000000000000e6
-583 1 23 38 0.32768000000000000000e5
-583 1 26 41 -0.65536000000000000000e5
-583 1 28 43 0.13107200000000000000e6
-583 1 32 47 0.26214400000000000000e6
-583 2 2 32 0.32768000000000000000e5
-583 2 16 30 0.65536000000000000000e5
-583 2 20 34 0.13107200000000000000e6
-583 3 22 35 0.26214400000000000000e6
-583 3 28 41 0.26214400000000000000e6
-583 4 2 30 0.65536000000000000000e5
-583 4 6 34 0.13107200000000000000e6
-584 1 2 33 0.65536000000000000000e5
-584 1 3 34 -0.13107200000000000000e6
-584 1 8 41 0.65536000000000000000e5
-584 1 10 41 0.65536000000000000000e5
-584 2 7 21 0.65536000000000000000e5
-584 3 2 31 0.65536000000000000000e5
-584 3 3 32 0.65536000000000000000e5
-585 1 8 42 0.65536000000000000000e5
-585 1 11 42 -0.65536000000000000000e5
-585 1 12 43 -0.13107200000000000000e6
-585 1 28 43 0.65536000000000000000e5
-585 1 32 47 0.65536000000000000000e5
-585 1 33 48 0.65536000000000000000e5
-585 2 12 26 0.65536000000000000000e5
-585 3 13 42 0.13107200000000000000e6
-585 3 28 41 0.65536000000000000000e5
-585 3 29 42 0.65536000000000000000e5
-585 4 3 31 -0.65536000000000000000e5
-586 1 8 43 0.65536000000000000000e5
-586 1 10 41 -0.65536000000000000000e5
-587 1 8 44 0.65536000000000000000e5
-587 1 16 47 -0.65536000000000000000e5
-587 3 12 41 -0.65536000000000000000e5
-588 1 8 45 0.65536000000000000000e5
-588 1 12 43 -0.65536000000000000000e5
-589 1 8 46 0.65536000000000000000e5
-589 1 13 44 -0.65536000000000000000e5
-590 1 1 48 -0.32768000000000000000e5
-590 1 2 49 -0.32768000000000000000e5
-590 1 8 47 0.65536000000000000000e5
-590 1 23 38 -0.32768000000000000000e5
-590 2 2 32 -0.32768000000000000000e5
-591 1 8 39 -0.65536000000000000000e5
-591 1 8 48 0.65536000000000000000e5
-591 1 9 40 -0.65536000000000000000e5
-591 1 10 41 0.13107200000000000000e6
-591 1 26 41 0.65536000000000000000e5
-591 1 32 47 -0.13107200000000000000e6
-591 3 9 38 -0.65536000000000000000e5
-591 3 28 41 -0.13107200000000000000e6
-591 4 2 30 -0.65536000000000000000e5
-592 1 1 48 0.32768000000000000000e5
-592 1 2 49 0.32768000000000000000e5
-592 1 8 39 0.65536000000000000000e5
-592 1 8 49 0.65536000000000000000e5
-592 1 9 40 0.65536000000000000000e5
-592 1 10 41 -0.13107200000000000000e6
-592 1 12 43 -0.26214400000000000000e6
-592 1 23 38 0.32768000000000000000e5
-592 1 26 41 -0.65536000000000000000e5
-592 1 28 43 0.13107200000000000000e6
-592 1 32 47 0.26214400000000000000e6
-592 2 2 32 0.32768000000000000000e5
-592 2 16 30 0.65536000000000000000e5
-592 2 20 34 0.13107200000000000000e6
-592 3 9 38 0.65536000000000000000e5
-592 3 22 35 0.26214400000000000000e6
-592 3 28 41 0.26214400000000000000e6
-592 4 2 30 0.65536000000000000000e5
-592 4 6 34 0.13107200000000000000e6
-593 1 8 50 0.65536000000000000000e5
-593 1 12 43 -0.13107200000000000000e6
-593 1 28 43 0.65536000000000000000e5
-593 1 32 47 0.65536000000000000000e5
-593 2 20 34 0.65536000000000000000e5
-593 3 22 35 0.13107200000000000000e6
-593 3 28 41 0.65536000000000000000e5
-593 4 6 34 0.65536000000000000000e5
-594 1 8 51 0.65536000000000000000e5
-594 1 32 47 -0.65536000000000000000e5
-594 3 28 41 -0.65536000000000000000e5
-595 1 8 52 0.65536000000000000000e5
-595 1 12 43 -0.65536000000000000000e5
-595 3 22 35 0.65536000000000000000e5
-596 1 6 53 -0.32768000000000000000e5
-596 1 8 39 -0.65536000000000000000e5
-596 1 8 53 0.65536000000000000000e5
-596 1 9 40 -0.65536000000000000000e5
-596 1 10 41 0.13107200000000000000e6
-596 1 25 40 0.32768000000000000000e5
-596 1 26 41 0.65536000000000000000e5
-596 1 32 47 -0.13107200000000000000e6
-596 3 9 38 -0.65536000000000000000e5
-596 3 24 37 -0.32768000000000000000e5
-596 3 27 40 -0.13107200000000000000e6
-596 4 2 30 -0.65536000000000000000e5
-596 4 4 32 0.32768000000000000000e5
-596 4 16 28 -0.32768000000000000000e5
-596 4 17 29 -0.65536000000000000000e5
-597 1 1 48 0.32768000000000000000e5
-597 1 2 49 0.32768000000000000000e5
-597 1 6 53 0.32768000000000000000e5
-597 1 8 39 0.65536000000000000000e5
-597 1 8 54 0.65536000000000000000e5
-597 1 9 40 0.65536000000000000000e5
-597 1 10 41 -0.13107200000000000000e6
-597 1 12 43 -0.26214400000000000000e6
-597 1 23 38 0.32768000000000000000e5
-597 1 25 40 -0.32768000000000000000e5
-597 1 26 41 -0.65536000000000000000e5
-597 1 28 43 0.13107200000000000000e6
-597 1 32 47 0.26214400000000000000e6
-597 2 2 32 0.32768000000000000000e5
-597 2 16 30 0.65536000000000000000e5
-597 2 20 34 0.13107200000000000000e6
-597 3 9 38 0.65536000000000000000e5
-597 3 22 35 0.26214400000000000000e6
-597 3 24 37 0.32768000000000000000e5
-597 3 27 40 0.65536000000000000000e5
-597 3 28 41 0.26214400000000000000e6
-597 4 2 30 0.65536000000000000000e5
-597 4 4 32 -0.32768000000000000000e5
-597 4 6 34 0.13107200000000000000e6
-597 4 16 28 0.32768000000000000000e5
-598 1 8 55 0.65536000000000000000e5
-598 1 32 47 -0.65536000000000000000e5
-599 1 1 48 0.32768000000000000000e5
-599 1 2 49 0.32768000000000000000e5
-599 1 6 53 0.32768000000000000000e5
-599 1 8 39 0.65536000000000000000e5
-599 1 8 56 0.65536000000000000000e5
-599 1 9 40 0.65536000000000000000e5
-599 1 10 41 -0.13107200000000000000e6
-599 1 12 43 -0.26214400000000000000e6
-599 1 23 38 0.32768000000000000000e5
-599 1 25 40 -0.32768000000000000000e5
-599 1 26 41 -0.65536000000000000000e5
-599 1 28 43 0.13107200000000000000e6
-599 1 32 47 0.26214400000000000000e6
-599 2 2 32 0.32768000000000000000e5
-599 2 16 30 0.65536000000000000000e5
-599 2 20 34 0.13107200000000000000e6
-599 3 9 38 0.65536000000000000000e5
-599 3 22 35 0.26214400000000000000e6
-599 3 22 51 0.65536000000000000000e5
-599 3 24 37 0.32768000000000000000e5
-599 3 27 40 0.65536000000000000000e5
-599 3 28 41 0.26214400000000000000e6
-599 4 2 30 0.65536000000000000000e5
-599 4 4 32 -0.32768000000000000000e5
-599 4 6 34 0.13107200000000000000e6
-599 4 16 28 0.32768000000000000000e5
-600 1 2 33 -0.32768000000000000000e5
-600 1 9 9 0.65536000000000000000e5
-600 2 4 10 0.32768000000000000000e5
-600 2 7 21 -0.32768000000000000000e5
-600 3 1 14 0.32768000000000000000e5
-600 3 2 15 0.32768000000000000000e5
-600 3 3 16 -0.65536000000000000000e5
-601 1 9 10 0.65536000000000000000e5
-601 1 10 41 -0.65536000000000000000e5
-601 3 2 15 -0.65536000000000000000e5
-601 3 3 32 -0.65536000000000000000e5
-602 1 6 13 -0.65536000000000000000e5
-602 1 9 11 0.65536000000000000000e5
-603 1 2 17 -0.65536000000000000000e5
-603 1 9 12 0.65536000000000000000e5
-604 1 3 34 -0.65536000000000000000e5
-604 1 9 13 0.65536000000000000000e5
-604 3 3 16 -0.65536000000000000000e5
-605 1 3 18 -0.65536000000000000000e5
-605 1 9 14 0.65536000000000000000e5
-606 1 4 35 -0.65536000000000000000e5
-606 1 9 15 0.65536000000000000000e5
-606 3 4 17 -0.65536000000000000000e5
-607 1 2 17 -0.32768000000000000000e5
-607 1 3 18 -0.32768000000000000000e5
-607 1 3 34 -0.32768000000000000000e5
-607 1 9 16 0.65536000000000000000e5
-607 2 6 12 -0.32768000000000000000e5
-607 3 3 16 -0.32768000000000000000e5
-608 1 4 19 -0.65536000000000000000e5
-608 1 9 17 0.65536000000000000000e5
-609 1 9 18 0.65536000000000000000e5
-609 1 10 17 -0.65536000000000000000e5
-610 1 9 19 0.65536000000000000000e5
-610 1 20 27 -0.65536000000000000000e5
-610 3 7 20 -0.65536000000000000000e5
-611 1 3 18 -0.16384000000000000000e5
-611 1 4 35 0.16384000000000000000e5
-611 1 5 20 -0.32768000000000000000e5
-611 1 5 36 0.32768000000000000000e5
-611 1 9 20 0.65536000000000000000e5
-611 1 10 17 -0.32768000000000000000e5
-611 1 12 43 0.32768000000000000000e5
-611 1 14 45 0.32768000000000000000e5
-611 1 17 32 -0.65536000000000000000e5
-611 1 17 48 -0.16384000000000000000e5
-611 1 18 49 -0.16384000000000000000e5
-611 2 9 23 0.16384000000000000000e5
-611 2 14 28 -0.16384000000000000000e5
-611 3 3 16 -0.16384000000000000000e5
-611 3 4 17 -0.16384000000000000000e5
-611 3 5 34 0.16384000000000000000e5
-611 3 13 42 -0.16384000000000000000e5
-611 3 14 27 0.32768000000000000000e5
-611 3 14 43 -0.16384000000000000000e5
-611 4 2 14 -0.16384000000000000000e5
-611 4 3 15 -0.32768000000000000000e5
-612 1 9 21 0.65536000000000000000e5
-612 1 13 20 -0.65536000000000000000e5
-613 1 8 23 -0.65536000000000000000e5
-613 1 9 22 0.65536000000000000000e5
-614 1 1 48 -0.32768000000000000000e5
-614 1 2 33 -0.13107200000000000000e6
-614 1 2 49 -0.32768000000000000000e5
-614 1 9 23 0.65536000000000000000e5
-614 1 11 42 0.13107200000000000000e6
-614 1 12 43 0.26214400000000000000e6
-614 1 23 38 -0.32768000000000000000e5
-614 1 28 43 -0.13107200000000000000e6
-614 1 32 47 -0.13107200000000000000e6
-614 1 33 48 -0.13107200000000000000e6
-614 2 2 32 -0.32768000000000000000e5
-614 2 12 26 -0.13107200000000000000e6
-614 3 1 30 0.65536000000000000000e5
-614 3 8 37 -0.65536000000000000000e5
-614 3 10 23 0.65536000000000000000e5
-614 3 13 42 -0.26214400000000000000e6
-614 3 28 41 -0.13107200000000000000e6
-614 3 29 42 -0.13107200000000000000e6
-614 4 3 31 0.13107200000000000000e6
-614 4 6 18 0.65536000000000000000e5
-615 1 8 39 -0.65536000000000000000e5
-615 1 9 24 0.65536000000000000000e5
-615 3 1 30 -0.65536000000000000000e5
-616 1 1 48 0.32768000000000000000e5
-616 1 2 49 0.32768000000000000000e5
-616 1 8 39 0.65536000000000000000e5
-616 1 9 25 0.65536000000000000000e5
-616 1 9 40 0.65536000000000000000e5
-616 1 10 41 -0.13107200000000000000e6
-616 1 12 43 -0.26214400000000000000e6
-616 1 23 38 0.32768000000000000000e5
-616 1 26 41 -0.65536000000000000000e5
-616 1 28 43 0.13107200000000000000e6
-616 1 32 47 0.26214400000000000000e6
-616 2 2 32 0.32768000000000000000e5
-616 2 16 30 0.65536000000000000000e5
-616 2 20 34 0.13107200000000000000e6
-616 3 10 23 -0.65536000000000000000e5
-616 3 22 35 0.26214400000000000000e6
-616 3 28 41 0.26214400000000000000e6
-616 4 2 30 0.65536000000000000000e5
-616 4 6 34 0.13107200000000000000e6
-617 1 9 26 0.65536000000000000000e5
-617 1 10 25 -0.65536000000000000000e5
-618 1 2 33 0.65536000000000000000e5
-618 1 3 34 -0.13107200000000000000e6
-618 1 9 27 0.65536000000000000000e5
-618 1 10 41 0.65536000000000000000e5
-618 2 7 21 0.65536000000000000000e5
-618 3 3 32 0.65536000000000000000e5
-619 1 2 33 -0.65536000000000000000e5
-619 1 9 28 0.65536000000000000000e5
-620 1 9 29 0.65536000000000000000e5
-620 1 10 41 -0.65536000000000000000e5
-620 3 3 32 -0.65536000000000000000e5
-621 1 2 33 0.65536000000000000000e5
-621 1 9 30 0.65536000000000000000e5
-621 1 10 41 0.65536000000000000000e5
-621 1 12 43 -0.13107200000000000000e6
-621 2 12 26 0.65536000000000000000e5
-621 3 3 32 0.65536000000000000000e5
-621 3 14 27 -0.13107200000000000000e6
-621 4 8 20 0.65536000000000000000e5
-622 1 3 34 -0.65536000000000000000e5
-622 1 9 31 0.65536000000000000000e5
-623 1 9 32 0.65536000000000000000e5
-623 1 12 43 -0.65536000000000000000e5
-623 3 14 27 -0.65536000000000000000e5
-624 1 4 35 -0.65536000000000000000e5
-624 1 9 33 0.65536000000000000000e5
-625 1 3 18 0.32768000000000000000e5
-625 1 4 19 -0.65536000000000000000e5
-625 1 9 34 0.65536000000000000000e5
-625 1 12 43 -0.32768000000000000000e5
-625 3 3 16 0.32768000000000000000e5
-625 3 4 17 0.32768000000000000000e5
-625 3 14 27 -0.32768000000000000000e5
-625 4 2 14 0.32768000000000000000e5
-626 1 4 35 -0.32768000000000000000e5
-626 1 9 35 0.65536000000000000000e5
-626 1 12 43 -0.32768000000000000000e5
-626 1 14 45 -0.65536000000000000000e5
-626 1 17 48 0.32768000000000000000e5
-626 1 18 49 0.32768000000000000000e5
-626 2 9 23 -0.32768000000000000000e5
-626 2 14 28 0.32768000000000000000e5
-626 3 5 34 -0.32768000000000000000e5
-626 3 13 42 0.32768000000000000000e5
-626 3 14 27 -0.32768000000000000000e5
-626 3 14 43 0.32768000000000000000e5
-627 1 9 36 0.65536000000000000000e5
-627 1 17 32 -0.65536000000000000000e5
-628 1 1 48 -0.32768000000000000000e5
-628 1 2 49 -0.32768000000000000000e5
-628 1 9 37 0.65536000000000000000e5
-628 1 23 38 -0.32768000000000000000e5
-628 2 2 32 -0.32768000000000000000e5
-628 3 8 37 -0.65536000000000000000e5
-629 1 8 39 -0.65536000000000000000e5
-629 1 9 38 0.65536000000000000000e5
-630 1 1 48 0.32768000000000000000e5
-630 1 2 49 0.32768000000000000000e5
-630 1 8 39 0.65536000000000000000e5
-630 1 9 39 0.65536000000000000000e5
-630 1 9 40 0.65536000000000000000e5
-630 1 10 41 -0.13107200000000000000e6
-630 1 12 43 -0.26214400000000000000e6
-630 1 23 38 0.32768000000000000000e5
-630 1 26 41 -0.65536000000000000000e5
-630 1 28 43 0.13107200000000000000e6
-630 1 32 47 0.26214400000000000000e6
-630 2 2 32 0.32768000000000000000e5
-630 2 16 30 0.65536000000000000000e5
-630 2 20 34 0.13107200000000000000e6
-630 3 22 35 0.26214400000000000000e6
-630 3 28 41 0.26214400000000000000e6
-630 4 2 30 0.65536000000000000000e5
-630 4 6 34 0.13107200000000000000e6
-631 1 9 41 0.65536000000000000000e5
-631 1 11 42 -0.65536000000000000000e5
-631 1 12 43 -0.13107200000000000000e6
-631 1 28 43 0.65536000000000000000e5
-631 1 32 47 0.65536000000000000000e5
-631 1 33 48 0.65536000000000000000e5
-631 2 12 26 0.65536000000000000000e5
-631 3 13 42 0.13107200000000000000e6
-631 3 28 41 0.65536000000000000000e5
-631 3 29 42 0.65536000000000000000e5
-631 4 3 31 -0.65536000000000000000e5
-632 1 9 42 0.65536000000000000000e5
-632 1 10 41 -0.65536000000000000000e5
-633 1 9 43 0.65536000000000000000e5
-633 1 10 41 0.65536000000000000000e5
-633 1 11 42 0.65536000000000000000e5
-633 1 28 43 -0.65536000000000000000e5
-633 1 32 47 -0.65536000000000000000e5
-633 1 33 48 -0.65536000000000000000e5
-633 3 13 42 -0.13107200000000000000e6
-633 3 28 41 -0.65536000000000000000e5
-633 3 29 42 -0.65536000000000000000e5
-633 4 3 31 0.65536000000000000000e5
-634 1 9 44 0.65536000000000000000e5
-634 1 12 43 -0.65536000000000000000e5
-635 1 9 45 0.65536000000000000000e5
-635 1 17 48 -0.65536000000000000000e5
-635 3 13 42 -0.65536000000000000000e5
-636 1 4 35 -0.32768000000000000000e5
-636 1 9 46 0.65536000000000000000e5
-636 1 12 43 -0.32768000000000000000e5
-636 1 14 45 -0.65536000000000000000e5
-636 1 17 48 0.32768000000000000000e5
-636 1 18 49 0.32768000000000000000e5
-636 2 9 23 -0.32768000000000000000e5
-636 2 14 28 0.32768000000000000000e5
-636 3 5 34 -0.32768000000000000000e5
-636 3 13 42 0.32768000000000000000e5
-636 3 14 27 -0.32768000000000000000e5
-636 3 14 43 0.32768000000000000000e5
-636 3 16 29 0.65536000000000000000e5
-637 1 8 39 -0.65536000000000000000e5
-637 1 9 40 -0.65536000000000000000e5
-637 1 9 47 0.65536000000000000000e5
-637 1 10 41 0.13107200000000000000e6
-637 1 26 41 0.65536000000000000000e5
-637 1 32 47 -0.13107200000000000000e6
-637 3 9 38 -0.65536000000000000000e5
-637 3 28 41 -0.13107200000000000000e6
-637 4 2 30 -0.65536000000000000000e5
-638 1 1 48 0.32768000000000000000e5
-638 1 2 49 0.32768000000000000000e5
-638 1 8 39 0.65536000000000000000e5
-638 1 9 40 0.65536000000000000000e5
-638 1 9 48 0.65536000000000000000e5
-638 1 10 41 -0.13107200000000000000e6
-638 1 12 43 -0.26214400000000000000e6
-638 1 23 38 0.32768000000000000000e5
-638 1 26 41 -0.65536000000000000000e5
-638 1 28 43 0.13107200000000000000e6
-638 1 32 47 0.26214400000000000000e6
-638 2 2 32 0.32768000000000000000e5
-638 2 16 30 0.65536000000000000000e5
-638 2 20 34 0.13107200000000000000e6
-638 3 9 38 0.65536000000000000000e5
-638 3 22 35 0.26214400000000000000e6
-638 3 28 41 0.26214400000000000000e6
-638 4 2 30 0.65536000000000000000e5
-638 4 6 34 0.13107200000000000000e6
-639 1 9 49 0.65536000000000000000e5
-639 1 26 41 -0.65536000000000000000e5
-640 1 9 50 0.65536000000000000000e5
-640 1 32 47 -0.65536000000000000000e5
-640 3 28 41 -0.65536000000000000000e5
-641 1 9 51 0.65536000000000000000e5
-641 1 28 43 -0.65536000000000000000e5
-642 1 9 52 0.65536000000000000000e5
-642 1 17 48 -0.65536000000000000000e5
-643 1 1 48 0.32768000000000000000e5
-643 1 2 49 0.32768000000000000000e5
-643 1 6 53 0.32768000000000000000e5
-643 1 8 39 0.65536000000000000000e5
-643 1 9 40 0.65536000000000000000e5
-643 1 9 53 0.65536000000000000000e5
-643 1 10 41 -0.13107200000000000000e6
-643 1 12 43 -0.26214400000000000000e6
-643 1 23 38 0.32768000000000000000e5
-643 1 25 40 -0.32768000000000000000e5
-643 1 26 41 -0.65536000000000000000e5
-643 1 28 43 0.13107200000000000000e6
-643 1 32 47 0.26214400000000000000e6
-643 2 2 32 0.32768000000000000000e5
-643 2 16 30 0.65536000000000000000e5
-643 2 20 34 0.13107200000000000000e6
-643 3 9 38 0.65536000000000000000e5
-643 3 22 35 0.26214400000000000000e6
-643 3 24 37 0.32768000000000000000e5
-643 3 27 40 0.65536000000000000000e5
-643 3 28 41 0.26214400000000000000e6
-643 4 2 30 0.65536000000000000000e5
-643 4 4 32 -0.32768000000000000000e5
-643 4 6 34 0.13107200000000000000e6
-643 4 16 28 0.32768000000000000000e5
-644 1 9 54 0.65536000000000000000e5
-644 1 26 41 -0.65536000000000000000e5
-644 3 27 40 0.65536000000000000000e5
-645 1 6 53 0.16384000000000000000e5
-645 1 9 55 0.65536000000000000000e5
-645 1 25 40 -0.16384000000000000000e5
-645 1 28 43 -0.65536000000000000000e5
-645 2 4 34 0.32768000000000000000e5
-645 2 21 35 -0.32768000000000000000e5
-645 3 5 50 0.32768000000000000000e5
-645 3 24 37 0.16384000000000000000e5
-645 3 27 40 0.65536000000000000000e5
-645 4 4 32 -0.16384000000000000000e5
-645 4 7 35 -0.32768000000000000000e5
-645 4 16 28 0.16384000000000000000e5
-646 1 9 56 0.65536000000000000000e5
-646 1 24 55 -0.65536000000000000000e5
-647 1 6 13 -0.32768000000000000000e5
-647 1 10 10 0.65536000000000000000e5
-648 1 4 35 -0.13107200000000000000e6
-648 1 6 13 0.65536000000000000000e5
-648 1 10 11 0.65536000000000000000e5
-648 1 10 41 0.65536000000000000000e5
-648 2 5 11 0.65536000000000000000e5
-648 3 2 15 0.65536000000000000000e5
-648 3 3 32 0.65536000000000000000e5
-648 3 4 17 -0.13107200000000000000e6
-649 1 3 34 -0.65536000000000000000e5
-649 1 10 12 0.65536000000000000000e5
-649 3 3 16 -0.65536000000000000000e5
-650 1 3 18 -0.65536000000000000000e5
-650 1 10 13 0.65536000000000000000e5
-651 1 4 35 -0.65536000000000000000e5
-651 1 10 14 0.65536000000000000000e5
-651 3 4 17 -0.65536000000000000000e5
-652 1 5 20 -0.13107200000000000000e6
-652 1 5 36 0.13107200000000000000e6
-652 1 10 15 0.65536000000000000000e5
-652 1 14 45 -0.13107200000000000000e6
-652 1 17 48 0.65536000000000000000e5
-652 1 18 49 0.65536000000000000000e5
-652 2 14 28 0.65536000000000000000e5
-652 3 4 17 0.65536000000000000000e5
-652 3 5 18 0.65536000000000000000e5
-652 3 5 34 -0.65536000000000000000e5
-652 3 13 42 0.65536000000000000000e5
-652 3 14 43 0.65536000000000000000e5
-652 4 8 12 0.65536000000000000000e5
-653 1 4 19 -0.65536000000000000000e5
-653 1 10 16 0.65536000000000000000e5
-654 1 5 20 -0.65536000000000000000e5
-654 1 10 18 0.65536000000000000000e5
-655 1 3 18 -0.16384000000000000000e5
-655 1 4 35 0.16384000000000000000e5
-655 1 5 20 -0.32768000000000000000e5
-655 1 5 36 0.32768000000000000000e5
-655 1 10 17 -0.32768000000000000000e5
-655 1 10 19 0.65536000000000000000e5
-655 1 12 43 0.32768000000000000000e5
-655 1 14 45 0.32768000000000000000e5
-655 1 17 32 -0.65536000000000000000e5
-655 1 17 48 -0.16384000000000000000e5
-655 1 18 49 -0.16384000000000000000e5
-655 2 9 23 0.16384000000000000000e5
-655 2 14 28 -0.16384000000000000000e5
-655 3 3 16 -0.16384000000000000000e5
-655 3 4 17 -0.16384000000000000000e5
-655 3 5 34 0.16384000000000000000e5
-655 3 13 42 -0.16384000000000000000e5
-655 3 14 27 0.32768000000000000000e5
-655 3 14 43 -0.16384000000000000000e5
-655 4 2 14 -0.16384000000000000000e5
-655 4 3 15 -0.32768000000000000000e5
-656 1 3 18 0.16384000000000000000e5
-656 1 4 35 -0.16384000000000000000e5
-656 1 5 20 0.32768000000000000000e5
-656 1 5 36 -0.32768000000000000000e5
-656 1 10 17 0.32768000000000000000e5
-656 1 10 20 0.65536000000000000000e5
-656 1 12 43 -0.32768000000000000000e5
-656 1 13 20 -0.13107200000000000000e6
-656 1 14 45 -0.32768000000000000000e5
-656 1 17 32 0.65536000000000000000e5
-656 1 17 48 0.16384000000000000000e5
-656 1 18 49 0.16384000000000000000e5
-656 1 20 27 0.65536000000000000000e5
-656 2 9 23 -0.16384000000000000000e5
-656 2 11 25 0.65536000000000000000e5
-656 2 14 28 0.16384000000000000000e5
-656 3 3 16 0.16384000000000000000e5
-656 3 4 17 0.16384000000000000000e5
-656 3 5 34 -0.16384000000000000000e5
-656 3 7 20 0.65536000000000000000e5
-656 3 13 42 0.16384000000000000000e5
-656 3 14 27 -0.32768000000000000000e5
-656 3 14 43 0.16384000000000000000e5
-656 4 2 14 0.16384000000000000000e5
-656 4 3 15 0.32768000000000000000e5
-656 4 10 14 0.65536000000000000000e5
-657 1 6 21 -0.32768000000000000000e5
-657 1 10 21 0.65536000000000000000e5
-657 1 13 20 -0.65536000000000000000e5
-657 1 20 27 0.32768000000000000000e5
-657 2 9 15 -0.32768000000000000000e5
-657 2 11 25 0.32768000000000000000e5
-657 3 7 20 0.32768000000000000000e5
-657 4 10 14 0.32768000000000000000e5
-658 1 1 48 -0.32768000000000000000e5
-658 1 2 33 -0.13107200000000000000e6
-658 1 2 49 -0.32768000000000000000e5
-658 1 10 22 0.65536000000000000000e5
-658 1 11 42 0.13107200000000000000e6
-658 1 12 43 0.26214400000000000000e6
-658 1 23 38 -0.32768000000000000000e5
-658 1 28 43 -0.13107200000000000000e6
-658 1 32 47 -0.13107200000000000000e6
-658 1 33 48 -0.13107200000000000000e6
-658 2 2 32 -0.32768000000000000000e5
-658 2 12 26 -0.13107200000000000000e6
-658 3 1 30 0.65536000000000000000e5
-658 3 8 37 -0.65536000000000000000e5
-658 3 10 23 0.65536000000000000000e5
-658 3 13 42 -0.26214400000000000000e6
-658 3 28 41 -0.13107200000000000000e6
-658 3 29 42 -0.13107200000000000000e6
-658 4 3 31 0.13107200000000000000e6
-658 4 6 18 0.65536000000000000000e5
-659 1 8 39 -0.65536000000000000000e5
-659 1 10 23 0.65536000000000000000e5
-659 3 1 30 -0.65536000000000000000e5
-660 1 1 48 0.32768000000000000000e5
-660 1 2 49 0.32768000000000000000e5
-660 1 8 39 0.65536000000000000000e5
-660 1 9 40 0.65536000000000000000e5
-660 1 10 24 0.65536000000000000000e5
-660 1 10 41 -0.13107200000000000000e6
-660 1 12 43 -0.26214400000000000000e6
-660 1 23 38 0.32768000000000000000e5
-660 1 26 41 -0.65536000000000000000e5
-660 1 28 43 0.13107200000000000000e6
-660 1 32 47 0.26214400000000000000e6
-660 2 2 32 0.32768000000000000000e5
-660 2 16 30 0.65536000000000000000e5
-660 2 20 34 0.13107200000000000000e6
-660 3 10 23 -0.65536000000000000000e5
-660 3 22 35 0.26214400000000000000e6
-660 3 28 41 0.26214400000000000000e6
-660 4 2 30 0.65536000000000000000e5
-660 4 6 34 0.13107200000000000000e6
-661 1 1 48 -0.32768000000000000000e5
-661 1 2 33 0.13107200000000000000e6
-661 1 2 49 -0.32768000000000000000e5
-661 1 8 39 -0.65536000000000000000e5
-661 1 9 40 -0.13107200000000000000e6
-661 1 10 25 0.65536000000000000000e5
-661 1 10 26 0.65536000000000000000e5
-661 1 10 41 0.13107200000000000000e6
-661 1 11 42 -0.13107200000000000000e6
-661 1 23 38 -0.32768000000000000000e5
-661 1 26 41 0.13107200000000000000e6
-661 1 28 43 -0.13107200000000000000e6
-661 1 32 47 -0.13107200000000000000e6
-661 1 33 48 0.13107200000000000000e6
-661 2 2 32 -0.32768000000000000000e5
-661 2 4 34 0.65536000000000000000e5
-661 2 12 26 0.13107200000000000000e6
-661 2 16 30 -0.65536000000000000000e5
-661 2 20 34 -0.13107200000000000000e6
-661 3 3 32 0.13107200000000000000e6
-661 3 9 38 -0.65536000000000000000e5
-661 3 10 23 0.65536000000000000000e5
-661 3 10 39 -0.65536000000000000000e5
-661 3 13 42 0.26214400000000000000e6
-661 3 14 27 -0.26214400000000000000e6
-661 3 22 35 -0.26214400000000000000e6
-661 3 28 41 -0.13107200000000000000e6
-661 3 29 42 0.13107200000000000000e6
-661 4 2 30 -0.65536000000000000000e5
-661 4 3 31 -0.13107200000000000000e6
-661 4 6 34 -0.13107200000000000000e6
-661 4 7 19 0.65536000000000000000e5
-661 4 8 20 0.13107200000000000000e6
-662 1 2 33 -0.65536000000000000000e5
-662 1 10 27 0.65536000000000000000e5
-663 1 10 28 0.65536000000000000000e5
-663 1 10 41 -0.65536000000000000000e5
-663 3 3 32 -0.65536000000000000000e5
-664 1 2 33 0.65536000000000000000e5
-664 1 10 29 0.65536000000000000000e5
-664 1 10 41 0.65536000000000000000e5
-664 1 12 43 -0.13107200000000000000e6
-664 2 12 26 0.65536000000000000000e5
-664 3 3 32 0.65536000000000000000e5
-664 3 14 27 -0.13107200000000000000e6
-664 4 8 20 0.65536000000000000000e5
-665 1 10 30 0.65536000000000000000e5
-665 1 11 42 -0.65536000000000000000e5
-665 3 4 33 -0.65536000000000000000e5
-666 1 10 31 0.65536000000000000000e5
-666 1 12 43 -0.65536000000000000000e5
-666 3 14 27 -0.65536000000000000000e5
-667 1 4 35 -0.65536000000000000000e5
-667 1 10 32 0.65536000000000000000e5
-668 1 10 33 0.65536000000000000000e5
-668 1 14 45 -0.13107200000000000000e6
-668 1 17 48 0.65536000000000000000e5
-668 1 18 49 0.65536000000000000000e5
-668 2 14 28 0.65536000000000000000e5
-668 3 5 34 -0.65536000000000000000e5
-668 3 13 42 0.65536000000000000000e5
-668 3 14 43 0.65536000000000000000e5
-669 1 4 35 -0.32768000000000000000e5
-669 1 10 34 0.65536000000000000000e5
-669 1 12 43 -0.32768000000000000000e5
-669 1 14 45 -0.65536000000000000000e5
-669 1 17 48 0.32768000000000000000e5
-669 1 18 49 0.32768000000000000000e5
-669 2 9 23 -0.32768000000000000000e5
-669 2 14 28 0.32768000000000000000e5
-669 3 5 34 -0.32768000000000000000e5
-669 3 13 42 0.32768000000000000000e5
-669 3 14 27 -0.32768000000000000000e5
-669 3 14 43 0.32768000000000000000e5
-670 1 5 36 -0.65536000000000000000e5
-670 1 10 35 0.65536000000000000000e5
-671 1 10 36 0.65536000000000000000e5
-671 1 13 20 -0.13107200000000000000e6
-671 1 17 32 0.65536000000000000000e5
-671 1 20 27 0.65536000000000000000e5
-671 2 11 25 0.65536000000000000000e5
-671 3 8 21 0.13107200000000000000e6
-672 1 8 39 -0.65536000000000000000e5
-672 1 10 37 0.65536000000000000000e5
-673 1 1 48 0.32768000000000000000e5
-673 1 2 49 0.32768000000000000000e5
-673 1 8 39 0.65536000000000000000e5
-673 1 9 40 0.65536000000000000000e5
-673 1 10 38 0.65536000000000000000e5
-673 1 10 41 -0.13107200000000000000e6
-673 1 12 43 -0.26214400000000000000e6
-673 1 23 38 0.32768000000000000000e5
-673 1 26 41 -0.65536000000000000000e5
-673 1 28 43 0.13107200000000000000e6
-673 1 32 47 0.26214400000000000000e6
-673 2 2 32 0.32768000000000000000e5
-673 2 16 30 0.65536000000000000000e5
-673 2 20 34 0.13107200000000000000e6
-673 3 22 35 0.26214400000000000000e6
-673 3 28 41 0.26214400000000000000e6
-673 4 2 30 0.65536000000000000000e5
-673 4 6 34 0.13107200000000000000e6
-674 1 9 40 -0.65536000000000000000e5
-674 1 10 39 0.65536000000000000000e5
-675 1 1 48 -0.32768000000000000000e5
-675 1 2 49 -0.32768000000000000000e5
-675 1 8 39 -0.65536000000000000000e5
-675 1 9 40 -0.65536000000000000000e5
-675 1 10 40 0.65536000000000000000e5
-675 1 10 41 0.13107200000000000000e6
-675 1 12 43 0.26214400000000000000e6
-675 1 23 38 -0.32768000000000000000e5
-675 1 26 41 0.13107200000000000000e6
-675 1 28 43 -0.26214400000000000000e6
-675 1 32 47 -0.26214400000000000000e6
-675 2 2 32 -0.32768000000000000000e5
-675 2 4 34 0.65536000000000000000e5
-675 2 16 30 -0.65536000000000000000e5
-675 2 20 34 -0.13107200000000000000e6
-675 3 9 38 -0.65536000000000000000e5
-675 3 10 39 -0.65536000000000000000e5
-675 3 22 35 -0.26214400000000000000e6
-675 3 28 41 -0.26214400000000000000e6
-675 4 2 30 -0.65536000000000000000e5
-675 4 6 34 -0.13107200000000000000e6
-676 1 10 41 0.65536000000000000000e5
-676 1 10 42 0.65536000000000000000e5
-676 1 11 42 0.65536000000000000000e5
-676 1 28 43 -0.65536000000000000000e5
-676 1 32 47 -0.65536000000000000000e5
-676 1 33 48 -0.65536000000000000000e5
-676 3 13 42 -0.13107200000000000000e6
-676 3 28 41 -0.65536000000000000000e5
-676 3 29 42 -0.65536000000000000000e5
-676 4 3 31 0.65536000000000000000e5
-677 1 10 43 0.65536000000000000000e5
-677 1 11 42 -0.65536000000000000000e5
-678 1 10 44 0.65536000000000000000e5
-678 1 17 48 -0.65536000000000000000e5
-678 3 13 42 -0.65536000000000000000e5
-679 1 10 45 0.65536000000000000000e5
-679 1 14 45 -0.13107200000000000000e6
-679 1 17 48 0.65536000000000000000e5
-679 1 18 49 0.65536000000000000000e5
-679 2 14 28 0.65536000000000000000e5
-679 3 13 42 0.65536000000000000000e5
-679 3 14 43 0.65536000000000000000e5
-680 1 10 46 0.65536000000000000000e5
-680 1 14 45 -0.65536000000000000000e5
-681 1 1 48 0.32768000000000000000e5
-681 1 2 49 0.32768000000000000000e5
-681 1 8 39 0.65536000000000000000e5
-681 1 9 40 0.65536000000000000000e5
-681 1 10 41 -0.13107200000000000000e6
-681 1 10 47 0.65536000000000000000e5
-681 1 12 43 -0.26214400000000000000e6
-681 1 23 38 0.32768000000000000000e5
-681 1 26 41 -0.65536000000000000000e5
-681 1 28 43 0.13107200000000000000e6
-681 1 32 47 0.26214400000000000000e6
-681 2 2 32 0.32768000000000000000e5
-681 2 16 30 0.65536000000000000000e5
-681 2 20 34 0.13107200000000000000e6
-681 3 9 38 0.65536000000000000000e5
-681 3 22 35 0.26214400000000000000e6
-681 3 28 41 0.26214400000000000000e6
-681 4 2 30 0.65536000000000000000e5
-681 4 6 34 0.13107200000000000000e6
-682 1 10 48 0.65536000000000000000e5
-682 1 26 41 -0.65536000000000000000e5
-683 1 1 48 -0.32768000000000000000e5
-683 1 2 49 -0.32768000000000000000e5
-683 1 8 39 -0.65536000000000000000e5
-683 1 9 40 -0.65536000000000000000e5
-683 1 10 41 0.13107200000000000000e6
-683 1 10 49 0.65536000000000000000e5
-683 1 12 43 0.26214400000000000000e6
-683 1 23 38 -0.32768000000000000000e5
-683 1 26 41 0.13107200000000000000e6
-683 1 28 43 -0.26214400000000000000e6
-683 1 32 47 -0.26214400000000000000e6
-683 2 2 32 -0.32768000000000000000e5
-683 2 4 34 0.65536000000000000000e5
-683 2 16 30 -0.65536000000000000000e5
-683 2 20 34 -0.13107200000000000000e6
-683 3 9 38 -0.65536000000000000000e5
-683 3 22 35 -0.26214400000000000000e6
-683 3 28 41 -0.26214400000000000000e6
-683 4 2 30 -0.65536000000000000000e5
-683 4 6 34 -0.13107200000000000000e6
-684 1 10 50 0.65536000000000000000e5
-684 1 28 43 -0.65536000000000000000e5
-685 1 10 51 0.65536000000000000000e5
-685 1 33 48 -0.65536000000000000000e5
-685 3 29 42 -0.65536000000000000000e5
-686 1 10 52 0.65536000000000000000e5
-686 1 34 49 -0.65536000000000000000e5
-686 3 18 47 -0.65536000000000000000e5
-687 1 10 53 0.65536000000000000000e5
-687 1 26 41 -0.65536000000000000000e5
-687 3 27 40 0.65536000000000000000e5
-688 1 1 48 -0.32768000000000000000e5
-688 1 2 49 -0.32768000000000000000e5
-688 1 8 39 -0.65536000000000000000e5
-688 1 9 40 -0.65536000000000000000e5
-688 1 10 41 0.13107200000000000000e6
-688 1 10 54 0.65536000000000000000e5
-688 1 12 43 0.26214400000000000000e6
-688 1 23 38 -0.32768000000000000000e5
-688 1 26 41 0.13107200000000000000e6
-688 1 28 43 -0.26214400000000000000e6
-688 1 32 47 -0.26214400000000000000e6
-688 2 2 32 -0.32768000000000000000e5
-688 2 4 34 0.65536000000000000000e5
-688 2 16 30 -0.65536000000000000000e5
-688 2 20 34 -0.13107200000000000000e6
-688 3 5 50 0.65536000000000000000e5
-688 3 9 38 -0.65536000000000000000e5
-688 3 22 35 -0.26214400000000000000e6
-688 3 28 41 -0.26214400000000000000e6
-688 4 2 30 -0.65536000000000000000e5
-688 4 6 34 -0.13107200000000000000e6
-689 1 10 55 0.65536000000000000000e5
-689 1 33 48 -0.65536000000000000000e5
-690 1 1 48 -0.32768000000000000000e5
-690 1 2 49 -0.32768000000000000000e5
-690 1 8 39 -0.65536000000000000000e5
-690 1 9 40 -0.65536000000000000000e5
-690 1 10 41 0.13107200000000000000e6
-690 1 10 56 0.65536000000000000000e5
-690 1 12 43 0.26214400000000000000e6
-690 1 23 38 -0.32768000000000000000e5
-690 1 24 55 0.65536000000000000000e5
-690 1 26 41 0.65536000000000000000e5
-690 1 28 43 -0.26214400000000000000e6
-690 1 32 47 -0.26214400000000000000e6
-690 2 2 32 -0.32768000000000000000e5
-690 2 4 34 0.65536000000000000000e5
-690 2 16 30 -0.65536000000000000000e5
-690 2 20 34 -0.13107200000000000000e6
-690 3 5 50 0.65536000000000000000e5
-690 3 9 38 -0.65536000000000000000e5
-690 3 22 35 -0.26214400000000000000e6
-690 3 22 51 -0.65536000000000000000e5
-690 3 23 52 0.13107200000000000000e6
-690 3 27 40 0.65536000000000000000e5
-690 3 28 41 -0.26214400000000000000e6
-690 4 2 30 -0.65536000000000000000e5
-690 4 6 34 -0.13107200000000000000e6
-690 4 7 35 -0.65536000000000000000e5
-691 1 2 33 -0.32768000000000000000e5
-691 1 11 11 0.65536000000000000000e5
-691 1 11 42 0.32768000000000000000e5
-691 1 12 43 0.65536000000000000000e5
-691 1 26 33 -0.32768000000000000000e5
-691 1 28 43 -0.32768000000000000000e5
-691 1 32 47 -0.32768000000000000000e5
-691 1 33 48 -0.32768000000000000000e5
-691 2 12 26 -0.32768000000000000000e5
-691 3 3 32 -0.32768000000000000000e5
-691 3 4 33 0.32768000000000000000e5
-691 3 5 34 -0.65536000000000000000e5
-691 3 10 11 -0.32768000000000000000e5
-691 3 13 42 -0.65536000000000000000e5
-691 3 14 27 0.65536000000000000000e5
-691 3 28 41 -0.32768000000000000000e5
-691 3 29 42 -0.32768000000000000000e5
-691 4 3 31 0.32768000000000000000e5
-691 4 8 20 -0.32768000000000000000e5
-691 4 9 21 0.32768000000000000000e5
-692 1 3 18 -0.65536000000000000000e5
-692 1 11 12 0.65536000000000000000e5
-693 1 4 35 -0.65536000000000000000e5
-693 1 11 13 0.65536000000000000000e5
-693 3 4 17 -0.65536000000000000000e5
-694 1 5 20 -0.13107200000000000000e6
-694 1 5 36 0.13107200000000000000e6
-694 1 11 14 0.65536000000000000000e5
-694 1 14 45 -0.13107200000000000000e6
-694 1 17 48 0.65536000000000000000e5
-694 1 18 49 0.65536000000000000000e5
-694 2 14 28 0.65536000000000000000e5
-694 3 4 17 0.65536000000000000000e5
-694 3 5 18 0.65536000000000000000e5
-694 3 5 34 -0.65536000000000000000e5
-694 3 13 42 0.65536000000000000000e5
-694 3 14 43 0.65536000000000000000e5
-694 4 8 12 0.65536000000000000000e5
-695 1 11 15 0.65536000000000000000e5
-695 1 15 30 -0.65536000000000000000e5
-695 3 5 18 -0.65536000000000000000e5
-696 1 10 17 -0.65536000000000000000e5
-696 1 11 16 0.65536000000000000000e5
-697 1 5 20 -0.65536000000000000000e5
-697 1 11 17 0.65536000000000000000e5
-698 1 3 18 0.16384000000000000000e5
-698 1 4 35 -0.16384000000000000000e5
-698 1 5 20 0.32768000000000000000e5
-698 1 5 36 -0.32768000000000000000e5
-698 1 10 17 0.32768000000000000000e5
-698 1 11 19 0.65536000000000000000e5
-698 1 12 43 -0.32768000000000000000e5
-698 1 13 20 -0.13107200000000000000e6
-698 1 14 45 -0.32768000000000000000e5
-698 1 17 32 0.65536000000000000000e5
-698 1 17 48 0.16384000000000000000e5
-698 1 18 49 0.16384000000000000000e5
-698 1 20 27 0.65536000000000000000e5
-698 2 9 23 -0.16384000000000000000e5
-698 2 11 25 0.65536000000000000000e5
-698 2 14 28 0.16384000000000000000e5
-698 3 3 16 0.16384000000000000000e5
-698 3 4 17 0.16384000000000000000e5
-698 3 5 34 -0.16384000000000000000e5
-698 3 7 20 0.65536000000000000000e5
-698 3 13 42 0.16384000000000000000e5
-698 3 14 27 -0.32768000000000000000e5
-698 3 14 43 0.16384000000000000000e5
-698 4 2 14 0.16384000000000000000e5
-698 4 3 15 0.32768000000000000000e5
-698 4 10 14 0.65536000000000000000e5
-699 1 6 21 -0.65536000000000000000e5
-699 1 11 20 0.65536000000000000000e5
-700 1 3 18 -0.81920000000000000000e4
-700 1 4 19 0.16384000000000000000e5
-700 1 5 36 0.16384000000000000000e5
-700 1 11 21 0.65536000000000000000e5
-700 1 12 43 0.81920000000000000000e4
-700 1 13 44 -0.16384000000000000000e5
-700 1 14 21 -0.13107200000000000000e6
-700 1 14 45 -0.16384000000000000000e5
-700 1 21 44 0.13107200000000000000e6
-700 1 33 36 -0.65536000000000000000e5
-700 2 11 25 0.32768000000000000000e5
-700 2 15 29 -0.32768000000000000000e5
-700 3 3 16 -0.81920000000000000000e4
-700 3 4 17 -0.81920000000000000000e4
-700 3 7 36 0.32768000000000000000e5
-700 3 8 21 0.65536000000000000000e5
-700 3 14 19 0.65536000000000000000e5
-700 3 14 27 0.81920000000000000000e4
-700 3 16 29 0.16384000000000000000e5
-700 3 18 31 0.32768000000000000000e5
-700 3 19 32 0.65536000000000000000e5
-700 4 2 14 -0.81920000000000000000e4
-700 4 11 15 0.65536000000000000000e5
-700 4 11 23 0.16384000000000000000e5
-700 4 13 25 0.65536000000000000000e5
-701 1 8 39 -0.65536000000000000000e5
-701 1 11 22 0.65536000000000000000e5
-701 3 1 30 -0.65536000000000000000e5
-702 1 1 48 0.32768000000000000000e5
-702 1 2 49 0.32768000000000000000e5
-702 1 8 39 0.65536000000000000000e5
-702 1 9 40 0.65536000000000000000e5
-702 1 10 41 -0.13107200000000000000e6
-702 1 11 23 0.65536000000000000000e5
-702 1 12 43 -0.26214400000000000000e6
-702 1 23 38 0.32768000000000000000e5
-702 1 26 41 -0.65536000000000000000e5
-702 1 28 43 0.13107200000000000000e6
-702 1 32 47 0.26214400000000000000e6
-702 2 2 32 0.32768000000000000000e5
-702 2 16 30 0.65536000000000000000e5
-702 2 20 34 0.13107200000000000000e6
-702 3 10 23 -0.65536000000000000000e5
-702 3 22 35 0.26214400000000000000e6
-702 3 28 41 0.26214400000000000000e6
-702 4 2 30 0.65536000000000000000e5
-702 4 6 34 0.13107200000000000000e6
-703 1 10 25 -0.65536000000000000000e5
-703 1 11 24 0.65536000000000000000e5
-704 1 1 48 -0.32768000000000000000e5
-704 1 2 33 0.13107200000000000000e6
-704 1 2 49 -0.32768000000000000000e5
-704 1 8 39 -0.65536000000000000000e5
-704 1 9 40 -0.13107200000000000000e6
-704 1 10 25 0.65536000000000000000e5
-704 1 10 41 0.13107200000000000000e6
-704 1 11 25 0.65536000000000000000e5
-704 1 11 42 -0.13107200000000000000e6
-704 1 23 38 -0.32768000000000000000e5
-704 1 26 41 0.13107200000000000000e6
-704 1 28 43 -0.13107200000000000000e6
-704 1 32 47 -0.13107200000000000000e6
-704 1 33 48 0.13107200000000000000e6
-704 2 2 32 -0.32768000000000000000e5
-704 2 4 34 0.65536000000000000000e5
-704 2 12 26 0.13107200000000000000e6
-704 2 16 30 -0.65536000000000000000e5
-704 2 20 34 -0.13107200000000000000e6
-704 3 3 32 0.13107200000000000000e6
-704 3 9 38 -0.65536000000000000000e5
-704 3 10 23 0.65536000000000000000e5
-704 3 10 39 -0.65536000000000000000e5
-704 3 13 42 0.26214400000000000000e6
-704 3 14 27 -0.26214400000000000000e6
-704 3 22 35 -0.26214400000000000000e6
-704 3 28 41 -0.13107200000000000000e6
-704 3 29 42 0.13107200000000000000e6
-704 4 2 30 -0.65536000000000000000e5
-704 4 3 31 -0.13107200000000000000e6
-704 4 6 34 -0.13107200000000000000e6
-704 4 7 19 0.65536000000000000000e5
-704 4 8 20 0.13107200000000000000e6
-705 1 10 41 -0.65536000000000000000e5
-705 1 11 27 0.65536000000000000000e5
-705 3 3 32 -0.65536000000000000000e5
-706 1 2 33 0.65536000000000000000e5
-706 1 10 41 0.65536000000000000000e5
-706 1 11 28 0.65536000000000000000e5
-706 1 12 43 -0.13107200000000000000e6
-706 2 12 26 0.65536000000000000000e5
-706 3 3 32 0.65536000000000000000e5
-706 3 14 27 -0.13107200000000000000e6
-706 4 8 20 0.65536000000000000000e5
-707 1 11 29 0.65536000000000000000e5
-707 1 11 42 -0.65536000000000000000e5
-707 3 4 33 -0.65536000000000000000e5
-708 1 2 33 -0.65536000000000000000e5
-708 1 11 30 0.65536000000000000000e5
-708 1 11 42 0.65536000000000000000e5
-708 1 12 43 0.13107200000000000000e6
-708 1 26 33 -0.65536000000000000000e5
-708 1 28 43 -0.65536000000000000000e5
-708 1 32 47 -0.65536000000000000000e5
-708 1 33 48 -0.65536000000000000000e5
-708 2 12 26 -0.65536000000000000000e5
-708 3 3 32 -0.65536000000000000000e5
-708 3 4 33 0.65536000000000000000e5
-708 3 5 34 -0.13107200000000000000e6
-708 3 13 42 -0.13107200000000000000e6
-708 3 14 27 0.13107200000000000000e6
-708 3 28 41 -0.65536000000000000000e5
-708 3 29 42 -0.65536000000000000000e5
-708 4 3 31 0.65536000000000000000e5
-708 4 8 20 -0.65536000000000000000e5
-708 4 9 21 0.65536000000000000000e5
-709 1 4 35 -0.65536000000000000000e5
-709 1 11 31 0.65536000000000000000e5
-710 1 11 32 0.65536000000000000000e5
-710 1 14 45 -0.13107200000000000000e6
-710 1 17 48 0.65536000000000000000e5
-710 1 18 49 0.65536000000000000000e5
-710 2 14 28 0.65536000000000000000e5
-710 3 5 34 -0.65536000000000000000e5
-710 3 13 42 0.65536000000000000000e5
-710 3 14 43 0.65536000000000000000e5
-711 1 11 33 0.65536000000000000000e5
-711 1 15 30 -0.65536000000000000000e5
-712 1 5 36 -0.65536000000000000000e5
-712 1 11 34 0.65536000000000000000e5
-713 1 11 18 -0.65536000000000000000e5
-713 1 11 35 0.65536000000000000000e5
-713 3 6 19 0.65536000000000000000e5
-714 1 11 36 0.65536000000000000000e5
-714 1 18 33 -0.65536000000000000000e5
-715 1 1 48 0.32768000000000000000e5
-715 1 2 49 0.32768000000000000000e5
-715 1 8 39 0.65536000000000000000e5
-715 1 9 40 0.65536000000000000000e5
-715 1 10 41 -0.13107200000000000000e6
-715 1 11 37 0.65536000000000000000e5
-715 1 12 43 -0.26214400000000000000e6
-715 1 23 38 0.32768000000000000000e5
-715 1 26 41 -0.65536000000000000000e5
-715 1 28 43 0.13107200000000000000e6
-715 1 32 47 0.26214400000000000000e6
-715 2 2 32 0.32768000000000000000e5
-715 2 16 30 0.65536000000000000000e5
-715 2 20 34 0.13107200000000000000e6
-715 3 22 35 0.26214400000000000000e6
-715 3 28 41 0.26214400000000000000e6
-715 4 2 30 0.65536000000000000000e5
-715 4 6 34 0.13107200000000000000e6
-716 1 9 40 -0.65536000000000000000e5
-716 1 11 38 0.65536000000000000000e5
-717 1 1 48 -0.32768000000000000000e5
-717 1 2 49 -0.32768000000000000000e5
-717 1 8 39 -0.65536000000000000000e5
-717 1 9 40 -0.65536000000000000000e5
-717 1 10 41 0.13107200000000000000e6
-717 1 11 39 0.65536000000000000000e5
-717 1 12 43 0.26214400000000000000e6
-717 1 23 38 -0.32768000000000000000e5
-717 1 26 41 0.13107200000000000000e6
-717 1 28 43 -0.26214400000000000000e6
-717 1 32 47 -0.26214400000000000000e6
-717 2 2 32 -0.32768000000000000000e5
-717 2 4 34 0.65536000000000000000e5
-717 2 16 30 -0.65536000000000000000e5
-717 2 20 34 -0.13107200000000000000e6
-717 3 9 38 -0.65536000000000000000e5
-717 3 10 39 -0.65536000000000000000e5
-717 3 22 35 -0.26214400000000000000e6
-717 3 28 41 -0.26214400000000000000e6
-717 4 2 30 -0.65536000000000000000e5
-717 4 6 34 -0.13107200000000000000e6
-718 1 1 48 0.32768000000000000000e5
-718 1 2 49 0.32768000000000000000e5
-718 1 8 39 0.65536000000000000000e5
-718 1 9 40 0.13107200000000000000e6
-718 1 10 41 -0.13107200000000000000e6
-718 1 11 40 0.65536000000000000000e5
-718 1 11 42 -0.13107200000000000000e6
-718 1 12 43 -0.26214400000000000000e6
-718 1 23 38 0.32768000000000000000e5
-718 1 26 41 -0.13107200000000000000e6
-718 1 28 43 0.26214400000000000000e6
-718 1 32 47 0.26214400000000000000e6
-718 2 2 32 0.32768000000000000000e5
-718 2 4 34 -0.65536000000000000000e5
-718 2 16 30 0.65536000000000000000e5
-718 2 20 34 0.13107200000000000000e6
-718 2 28 34 0.65536000000000000000e5
-718 3 9 38 0.65536000000000000000e5
-718 3 10 39 0.65536000000000000000e5
-718 3 22 35 0.26214400000000000000e6
-718 3 28 41 0.26214400000000000000e6
-718 4 2 30 0.65536000000000000000e5
-718 4 6 34 0.13107200000000000000e6
-718 4 18 22 0.65536000000000000000e5
-718 4 18 30 0.65536000000000000000e5
-718 4 21 33 0.65536000000000000000e5
-719 1 10 41 0.65536000000000000000e5
-719 1 11 41 0.65536000000000000000e5
-719 1 11 42 0.65536000000000000000e5
-719 1 28 43 -0.65536000000000000000e5
-719 1 32 47 -0.65536000000000000000e5
-719 1 33 48 -0.65536000000000000000e5
-719 3 13 42 -0.13107200000000000000e6
-719 3 28 41 -0.65536000000000000000e5
-719 3 29 42 -0.65536000000000000000e5
-719 4 3 31 0.65536000000000000000e5
-720 1 11 43 0.65536000000000000000e5
-720 1 26 33 -0.65536000000000000000e5
-721 1 11 44 0.65536000000000000000e5
-721 1 14 45 -0.13107200000000000000e6
-721 1 17 48 0.65536000000000000000e5
-721 1 18 49 0.65536000000000000000e5
-721 2 14 28 0.65536000000000000000e5
-721 3 13 42 0.65536000000000000000e5
-721 3 14 43 0.65536000000000000000e5
-722 1 11 45 0.65536000000000000000e5
-722 1 18 49 -0.65536000000000000000e5
-722 3 14 43 -0.65536000000000000000e5
-723 1 11 18 -0.65536000000000000000e5
-723 1 11 46 0.65536000000000000000e5
-723 3 6 19 0.65536000000000000000e5
-723 3 17 30 0.65536000000000000000e5
-724 1 11 47 0.65536000000000000000e5
-724 1 26 41 -0.65536000000000000000e5
-725 1 1 48 -0.32768000000000000000e5
-725 1 2 49 -0.32768000000000000000e5
-725 1 8 39 -0.65536000000000000000e5
-725 1 9 40 -0.65536000000000000000e5
-725 1 10 41 0.13107200000000000000e6
-725 1 11 48 0.65536000000000000000e5
-725 1 12 43 0.26214400000000000000e6
-725 1 23 38 -0.32768000000000000000e5
-725 1 26 41 0.13107200000000000000e6
-725 1 28 43 -0.26214400000000000000e6
-725 1 32 47 -0.26214400000000000000e6
-725 2 2 32 -0.32768000000000000000e5
-725 2 4 34 0.65536000000000000000e5
-725 2 16 30 -0.65536000000000000000e5
-725 2 20 34 -0.13107200000000000000e6
-725 3 9 38 -0.65536000000000000000e5
-725 3 22 35 -0.26214400000000000000e6
-725 3 28 41 -0.26214400000000000000e6
-725 4 2 30 -0.65536000000000000000e5
-725 4 6 34 -0.13107200000000000000e6
-726 1 1 48 0.32768000000000000000e5
-726 1 2 49 0.32768000000000000000e5
-726 1 8 39 0.65536000000000000000e5
-726 1 9 40 0.65536000000000000000e5
-726 1 10 41 -0.13107200000000000000e6
-726 1 11 49 0.65536000000000000000e5
-726 1 12 43 -0.26214400000000000000e6
-726 1 23 38 0.32768000000000000000e5
-726 1 26 41 -0.65536000000000000000e5
-726 1 28 43 0.26214400000000000000e6
-726 1 32 47 0.26214400000000000000e6
-726 1 33 48 -0.13107200000000000000e6
-726 2 2 32 0.32768000000000000000e5
-726 2 4 34 -0.65536000000000000000e5
-726 2 16 30 0.65536000000000000000e5
-726 2 20 34 0.13107200000000000000e6
-726 2 28 34 0.65536000000000000000e5
-726 3 9 38 0.65536000000000000000e5
-726 3 22 35 0.26214400000000000000e6
-726 3 28 41 0.26214400000000000000e6
-726 3 29 42 -0.13107200000000000000e6
-726 4 2 30 0.65536000000000000000e5
-726 4 6 34 0.13107200000000000000e6
-726 4 18 30 0.65536000000000000000e5
-726 4 21 33 0.65536000000000000000e5
-727 1 11 50 0.65536000000000000000e5
-727 1 33 48 -0.65536000000000000000e5
-727 3 29 42 -0.65536000000000000000e5
-728 1 11 51 0.65536000000000000000e5
-728 1 33 40 -0.65536000000000000000e5
-729 1 11 52 0.65536000000000000000e5
-729 1 18 49 -0.65536000000000000000e5
-730 1 1 48 -0.32768000000000000000e5
-730 1 2 49 -0.32768000000000000000e5
-730 1 8 39 -0.65536000000000000000e5
-730 1 9 40 -0.65536000000000000000e5
-730 1 10 41 0.13107200000000000000e6
-730 1 11 53 0.65536000000000000000e5
-730 1 12 43 0.26214400000000000000e6
-730 1 23 38 -0.32768000000000000000e5
-730 1 26 41 0.13107200000000000000e6
-730 1 28 43 -0.26214400000000000000e6
-730 1 32 47 -0.26214400000000000000e6
-730 2 2 32 -0.32768000000000000000e5
-730 2 4 34 0.65536000000000000000e5
-730 2 16 30 -0.65536000000000000000e5
-730 2 20 34 -0.13107200000000000000e6
-730 3 5 50 0.65536000000000000000e5
-730 3 9 38 -0.65536000000000000000e5
-730 3 22 35 -0.26214400000000000000e6
-730 3 28 41 -0.26214400000000000000e6
-730 4 2 30 -0.65536000000000000000e5
-730 4 6 34 -0.13107200000000000000e6
-731 1 1 48 0.32768000000000000000e5
-731 1 2 49 0.32768000000000000000e5
-731 1 8 39 0.65536000000000000000e5
-731 1 9 40 0.65536000000000000000e5
-731 1 10 41 -0.13107200000000000000e6
-731 1 11 54 0.65536000000000000000e5
-731 1 12 43 -0.26214400000000000000e6
-731 1 23 38 0.32768000000000000000e5
-731 1 26 41 -0.65536000000000000000e5
-731 1 28 43 0.26214400000000000000e6
-731 1 32 47 0.26214400000000000000e6
-731 1 33 48 -0.13107200000000000000e6
-731 2 2 32 0.32768000000000000000e5
-731 2 4 34 -0.65536000000000000000e5
-731 2 16 30 0.65536000000000000000e5
-731 2 20 34 0.13107200000000000000e6
-731 2 28 34 0.65536000000000000000e5
-731 3 5 50 -0.65536000000000000000e5
-731 3 9 38 0.65536000000000000000e5
-731 3 22 35 0.26214400000000000000e6
-731 3 27 40 -0.65536000000000000000e5
-731 3 28 41 0.26214400000000000000e6
-731 4 2 30 0.65536000000000000000e5
-731 4 6 34 0.13107200000000000000e6
-731 4 21 33 0.65536000000000000000e5
-732 1 11 55 0.65536000000000000000e5
-732 1 33 40 -0.65536000000000000000e5
-732 3 14 51 0.13107200000000000000e6
-732 3 29 42 -0.65536000000000000000e5
-732 3 30 43 -0.65536000000000000000e5
-732 4 19 31 -0.65536000000000000000e5
-733 1 1 48 0.32768000000000000000e5
-733 1 2 49 0.32768000000000000000e5
-733 1 8 39 0.65536000000000000000e5
-733 1 9 40 0.65536000000000000000e5
-733 1 10 41 -0.13107200000000000000e6
-733 1 11 56 0.65536000000000000000e5
-733 1 12 43 -0.26214400000000000000e6
-733 1 23 38 0.32768000000000000000e5
-733 1 26 41 -0.65536000000000000000e5
-733 1 28 43 0.26214400000000000000e6
-733 1 32 47 0.26214400000000000000e6
-733 1 33 48 -0.13107200000000000000e6
-733 2 2 32 0.32768000000000000000e5
-733 2 4 34 -0.65536000000000000000e5
-733 2 16 30 0.65536000000000000000e5
-733 2 20 34 0.13107200000000000000e6
-733 2 28 34 0.65536000000000000000e5
-733 3 5 50 -0.65536000000000000000e5
-733 3 9 38 0.65536000000000000000e5
-733 3 10 55 -0.13107200000000000000e6
-733 3 22 35 0.26214400000000000000e6
-733 3 22 51 0.65536000000000000000e5
-733 3 23 52 -0.13107200000000000000e6
-733 3 27 40 -0.65536000000000000000e5
-733 3 28 41 0.26214400000000000000e6
-733 3 35 48 0.26214400000000000000e6
-733 3 40 45 -0.13107200000000000000e6
-733 4 2 30 0.65536000000000000000e5
-733 4 6 34 0.13107200000000000000e6
-733 4 7 35 0.65536000000000000000e5
-733 4 22 34 -0.13107200000000000000e6
-734 1 7 16 -0.32768000000000000000e5
-734 1 12 12 0.65536000000000000000e5
-735 1 2 17 -0.32768000000000000000e5
-735 1 4 35 -0.32768000000000000000e5
-735 1 12 13 0.65536000000000000000e5
-735 1 12 43 -0.32768000000000000000e5
-735 1 14 45 -0.65536000000000000000e5
-735 1 16 23 0.32768000000000000000e5
-735 1 16 31 -0.13107200000000000000e6
-735 1 17 48 0.32768000000000000000e5
-735 1 18 49 0.32768000000000000000e5
-735 1 20 27 0.13107200000000000000e6
-735 2 7 13 0.65536000000000000000e5
-735 2 9 23 -0.32768000000000000000e5
-735 2 10 24 -0.65536000000000000000e5
-735 2 14 28 0.32768000000000000000e5
-735 3 3 16 -0.32768000000000000000e5
-735 3 5 34 -0.32768000000000000000e5
-735 3 7 12 -0.32768000000000000000e5
-735 3 13 42 0.32768000000000000000e5
-735 3 14 27 -0.32768000000000000000e5
-735 3 14 43 0.32768000000000000000e5
-735 4 1 13 -0.32768000000000000000e5
-735 4 10 10 -0.13107200000000000000e6
-736 1 2 17 -0.32768000000000000000e5
-736 1 3 18 -0.32768000000000000000e5
-736 1 3 34 -0.32768000000000000000e5
-736 1 12 14 0.65536000000000000000e5
-736 2 6 12 -0.32768000000000000000e5
-736 3 3 16 -0.32768000000000000000e5
-737 1 4 19 -0.65536000000000000000e5
-737 1 12 15 0.65536000000000000000e5
-738 1 2 17 -0.32768000000000000000e5
-738 1 3 18 -0.16384000000000000000e5
-738 1 3 34 -0.16384000000000000000e5
-738 1 4 35 -0.16384000000000000000e5
-738 1 7 16 -0.32768000000000000000e5
-738 1 12 16 0.65536000000000000000e5
-738 1 12 43 -0.16384000000000000000e5
-738 1 14 45 -0.32768000000000000000e5
-738 1 16 23 0.16384000000000000000e5
-738 1 16 31 -0.65536000000000000000e5
-738 1 17 48 0.16384000000000000000e5
-738 1 18 49 0.16384000000000000000e5
-738 1 20 27 0.65536000000000000000e5
-738 2 1 15 -0.32768000000000000000e5
-738 2 6 12 -0.16384000000000000000e5
-738 2 7 13 0.32768000000000000000e5
-738 2 9 23 -0.16384000000000000000e5
-738 2 10 24 -0.32768000000000000000e5
-738 2 14 28 0.16384000000000000000e5
-738 3 3 16 -0.32768000000000000000e5
-738 3 5 34 -0.16384000000000000000e5
-738 3 7 12 -0.16384000000000000000e5
-738 3 13 42 0.16384000000000000000e5
-738 3 14 27 -0.16384000000000000000e5
-738 3 14 43 0.16384000000000000000e5
-738 4 1 13 -0.16384000000000000000e5
-738 4 10 10 -0.65536000000000000000e5
-739 1 2 17 -0.32768000000000000000e5
-739 1 3 18 -0.16384000000000000000e5
-739 1 3 34 -0.16384000000000000000e5
-739 1 4 19 -0.32768000000000000000e5
-739 1 4 35 -0.16384000000000000000e5
-739 1 12 17 0.65536000000000000000e5
-739 1 12 43 -0.16384000000000000000e5
-739 1 14 45 -0.32768000000000000000e5
-739 1 16 23 0.16384000000000000000e5
-739 1 16 31 -0.65536000000000000000e5
-739 1 17 48 0.16384000000000000000e5
-739 1 18 49 0.16384000000000000000e5
-739 1 20 27 0.65536000000000000000e5
-739 2 6 12 -0.16384000000000000000e5
-739 2 9 23 -0.16384000000000000000e5
-739 2 10 24 -0.32768000000000000000e5
-739 2 14 28 0.16384000000000000000e5
-739 3 3 16 -0.32768000000000000000e5
-739 3 5 34 -0.16384000000000000000e5
-739 3 7 12 -0.16384000000000000000e5
-739 3 13 42 0.16384000000000000000e5
-739 3 14 27 -0.16384000000000000000e5
-739 3 14 43 0.16384000000000000000e5
-739 4 1 13 -0.16384000000000000000e5
-739 4 10 10 -0.65536000000000000000e5
-740 1 12 18 0.65536000000000000000e5
-740 1 20 27 -0.65536000000000000000e5
-740 3 7 20 -0.65536000000000000000e5
-741 1 2 17 -0.16384000000000000000e5
-741 1 3 18 -0.16384000000000000000e5
-741 1 3 34 -0.81920000000000000000e4
-741 1 4 19 -0.16384000000000000000e5
-741 1 5 20 -0.16384000000000000000e5
-741 1 5 36 0.16384000000000000000e5
-741 1 10 17 -0.16384000000000000000e5
-741 1 12 20 0.65536000000000000000e5
-741 1 12 43 0.81920000000000000000e4
-741 1 16 23 0.81920000000000000000e4
-741 1 16 31 -0.32768000000000000000e5
-741 1 17 32 -0.32768000000000000000e5
-741 2 6 12 -0.81920000000000000000e4
-741 2 10 24 -0.16384000000000000000e5
-741 2 11 13 -0.32768000000000000000e5
-741 3 3 16 -0.24576000000000000000e5
-741 3 4 17 -0.81920000000000000000e4
-741 3 7 12 -0.81920000000000000000e4
-741 3 7 20 -0.32768000000000000000e5
-741 3 14 27 0.81920000000000000000e4
-741 4 1 13 -0.81920000000000000000e4
-741 4 2 14 -0.81920000000000000000e4
-741 4 3 15 -0.16384000000000000000e5
-741 4 10 10 -0.32768000000000000000e5
-742 1 12 21 0.65536000000000000000e5
-742 1 16 19 -0.65536000000000000000e5
-743 1 1 32 0.65536000000000000000e5
-743 1 2 33 -0.65536000000000000000e5
-743 1 3 34 0.13107200000000000000e6
-743 1 10 41 -0.65536000000000000000e5
-743 1 12 22 0.65536000000000000000e5
-743 1 12 27 -0.13107200000000000000e6
-743 2 6 20 0.65536000000000000000e5
-743 2 7 21 -0.65536000000000000000e5
-743 3 3 32 -0.65536000000000000000e5
-744 1 1 32 -0.65536000000000000000e5
-744 1 12 23 0.65536000000000000000e5
-745 1 2 33 0.65536000000000000000e5
-745 1 3 34 -0.13107200000000000000e6
-745 1 10 41 0.65536000000000000000e5
-745 1 12 24 0.65536000000000000000e5
-745 2 7 21 0.65536000000000000000e5
-745 3 3 32 0.65536000000000000000e5
-746 1 2 33 -0.65536000000000000000e5
-746 1 12 25 0.65536000000000000000e5
-747 1 10 41 -0.65536000000000000000e5
-747 1 12 26 0.65536000000000000000e5
-747 3 3 32 -0.65536000000000000000e5
-748 1 12 28 0.65536000000000000000e5
-748 1 16 23 -0.65536000000000000000e5
-749 1 3 34 -0.65536000000000000000e5
-749 1 12 29 0.65536000000000000000e5
-750 1 12 30 0.65536000000000000000e5
-750 1 12 43 -0.65536000000000000000e5
-750 3 14 27 -0.65536000000000000000e5
-751 1 4 35 -0.32768000000000000000e5
-751 1 12 31 0.65536000000000000000e5
-751 1 12 43 -0.32768000000000000000e5
-751 1 14 45 -0.65536000000000000000e5
-751 1 16 31 -0.13107200000000000000e6
-751 1 17 48 0.32768000000000000000e5
-751 1 18 49 0.32768000000000000000e5
-751 1 20 27 0.13107200000000000000e6
-751 2 7 13 0.65536000000000000000e5
-751 2 9 23 -0.32768000000000000000e5
-751 2 10 24 -0.65536000000000000000e5
-751 2 14 28 0.32768000000000000000e5
-751 3 5 34 -0.32768000000000000000e5
-751 3 13 42 0.32768000000000000000e5
-751 3 14 27 -0.32768000000000000000e5
-751 3 14 43 0.32768000000000000000e5
-751 4 10 10 -0.13107200000000000000e6
-752 1 3 18 -0.32768000000000000000e5
-752 1 4 19 0.65536000000000000000e5
-752 1 4 35 0.32768000000000000000e5
-752 1 12 32 0.65536000000000000000e5
-752 1 12 43 0.65536000000000000000e5
-752 1 14 45 0.65536000000000000000e5
-752 1 17 48 -0.32768000000000000000e5
-752 1 18 49 -0.32768000000000000000e5
-752 1 20 27 -0.13107200000000000000e6
-752 2 9 23 0.32768000000000000000e5
-752 2 10 24 0.65536000000000000000e5
-752 2 14 28 -0.32768000000000000000e5
-752 3 3 16 -0.32768000000000000000e5
-752 3 4 17 -0.32768000000000000000e5
-752 3 5 34 0.32768000000000000000e5
-752 3 13 42 -0.32768000000000000000e5
-752 3 14 27 0.65536000000000000000e5
-752 3 14 43 -0.32768000000000000000e5
-752 4 2 14 -0.32768000000000000000e5
-753 1 3 18 0.32768000000000000000e5
-753 1 4 19 -0.65536000000000000000e5
-753 1 12 33 0.65536000000000000000e5
-753 1 12 43 -0.32768000000000000000e5
-753 3 3 16 0.32768000000000000000e5
-753 3 4 17 0.32768000000000000000e5
-753 3 14 27 -0.32768000000000000000e5
-753 4 2 14 0.32768000000000000000e5
-754 1 12 34 0.65536000000000000000e5
-754 1 16 31 -0.65536000000000000000e5
-755 1 12 35 0.65536000000000000000e5
-755 1 20 27 -0.65536000000000000000e5
-756 1 2 17 -0.16384000000000000000e5
-756 1 3 18 -0.16384000000000000000e5
-756 1 3 34 -0.81920000000000000000e4
-756 1 4 19 -0.16384000000000000000e5
-756 1 5 20 -0.16384000000000000000e5
-756 1 5 36 0.16384000000000000000e5
-756 1 10 17 -0.16384000000000000000e5
-756 1 12 36 0.65536000000000000000e5
-756 1 12 43 0.81920000000000000000e4
-756 1 16 23 0.81920000000000000000e4
-756 1 16 31 -0.32768000000000000000e5
-756 1 17 32 -0.32768000000000000000e5
-756 2 6 12 -0.81920000000000000000e4
-756 2 10 24 -0.16384000000000000000e5
-756 2 11 13 -0.32768000000000000000e5
-756 3 3 16 -0.24576000000000000000e5
-756 3 4 17 -0.81920000000000000000e4
-756 3 7 12 -0.81920000000000000000e4
-756 3 7 20 -0.32768000000000000000e5
-756 3 8 21 -0.65536000000000000000e5
-756 3 12 21 0.13107200000000000000e6
-756 3 14 19 -0.65536000000000000000e5
-756 3 14 27 0.81920000000000000000e4
-756 4 1 13 -0.81920000000000000000e4
-756 4 2 14 -0.81920000000000000000e4
-756 4 3 15 -0.16384000000000000000e5
-756 4 10 10 -0.32768000000000000000e5
-756 4 13 13 -0.13107200000000000000e6
-757 1 2 33 -0.65536000000000000000e5
-757 1 3 34 0.13107200000000000000e6
-757 1 10 41 -0.65536000000000000000e5
-757 1 11 42 0.65536000000000000000e5
-757 1 12 37 0.65536000000000000000e5
-757 1 12 43 0.13107200000000000000e6
-757 1 16 23 -0.13107200000000000000e6
-757 1 28 43 -0.65536000000000000000e5
-757 1 32 47 -0.65536000000000000000e5
-757 1 33 48 -0.65536000000000000000e5
-757 2 1 31 0.65536000000000000000e5
-757 2 7 21 -0.65536000000000000000e5
-757 2 12 26 -0.65536000000000000000e5
-757 3 1 34 0.13107200000000000000e6
-757 3 2 31 -0.65536000000000000000e5
-757 3 3 32 -0.65536000000000000000e5
-757 3 13 42 -0.13107200000000000000e6
-757 3 28 41 -0.65536000000000000000e5
-757 3 29 42 -0.65536000000000000000e5
-757 4 3 31 0.65536000000000000000e5
-758 1 2 33 0.65536000000000000000e5
-758 1 3 34 -0.13107200000000000000e6
-758 1 10 41 0.65536000000000000000e5
-758 1 12 38 0.65536000000000000000e5
-758 2 7 21 0.65536000000000000000e5
-758 3 2 31 0.65536000000000000000e5
-758 3 3 32 0.65536000000000000000e5
-759 1 11 42 -0.65536000000000000000e5
-759 1 12 39 0.65536000000000000000e5
-759 1 12 43 -0.13107200000000000000e6
-759 1 28 43 0.65536000000000000000e5
-759 1 32 47 0.65536000000000000000e5
-759 1 33 48 0.65536000000000000000e5
-759 2 12 26 0.65536000000000000000e5
-759 3 13 42 0.13107200000000000000e6
-759 3 28 41 0.65536000000000000000e5
-759 3 29 42 0.65536000000000000000e5
-759 4 3 31 -0.65536000000000000000e5
-760 1 10 41 -0.65536000000000000000e5
-760 1 12 40 0.65536000000000000000e5
-761 1 12 41 0.65536000000000000000e5
-761 1 16 23 -0.65536000000000000000e5
-761 3 1 34 0.65536000000000000000e5
-762 1 12 42 0.65536000000000000000e5
-762 1 16 47 -0.65536000000000000000e5
-762 3 12 41 -0.65536000000000000000e5
-763 1 12 44 0.65536000000000000000e5
-763 1 27 34 -0.65536000000000000000e5
-764 1 12 45 0.65536000000000000000e5
-764 1 13 44 -0.65536000000000000000e5
-765 1 12 46 0.65536000000000000000e5
-765 1 20 27 -0.65536000000000000000e5
-765 3 7 36 0.65536000000000000000e5
-766 1 2 33 0.65536000000000000000e5
-766 1 3 34 -0.13107200000000000000e6
-766 1 9 40 -0.32768000000000000000e5
-766 1 10 41 0.13107200000000000000e6
-766 1 12 47 0.65536000000000000000e5
-766 1 26 41 0.32768000000000000000e5
-766 1 32 47 -0.65536000000000000000e5
-766 2 7 21 0.65536000000000000000e5
-766 3 2 31 0.65536000000000000000e5
-766 3 3 32 0.65536000000000000000e5
-766 3 8 37 0.32768000000000000000e5
-766 3 9 38 -0.32768000000000000000e5
-766 3 22 27 0.32768000000000000000e5
-766 3 28 41 -0.65536000000000000000e5
-766 4 1 29 0.32768000000000000000e5
-766 4 2 30 -0.32768000000000000000e5
-767 1 12 43 -0.13107200000000000000e6
-767 1 12 48 0.65536000000000000000e5
-767 1 28 43 0.65536000000000000000e5
-767 1 32 47 0.65536000000000000000e5
-767 2 20 34 0.65536000000000000000e5
-767 3 22 35 0.13107200000000000000e6
-767 3 28 41 0.65536000000000000000e5
-767 4 6 34 0.65536000000000000000e5
-768 1 12 49 0.65536000000000000000e5
-768 1 32 47 -0.65536000000000000000e5
-768 3 28 41 -0.65536000000000000000e5
-769 1 12 50 0.65536000000000000000e5
-769 1 16 47 -0.65536000000000000000e5
-770 1 12 43 -0.65536000000000000000e5
-770 1 12 51 0.65536000000000000000e5
-770 3 22 35 0.65536000000000000000e5
-771 1 12 52 0.65536000000000000000e5
-771 1 34 41 -0.65536000000000000000e5
-772 1 6 53 -0.16384000000000000000e5
-772 1 12 43 -0.13107200000000000000e6
-772 1 12 53 0.65536000000000000000e5
-772 1 25 40 0.16384000000000000000e5
-772 1 28 43 0.65536000000000000000e5
-772 1 32 47 0.65536000000000000000e5
-772 2 4 34 -0.32768000000000000000e5
-772 2 20 34 0.65536000000000000000e5
-772 2 21 35 0.32768000000000000000e5
-772 3 5 50 -0.32768000000000000000e5
-772 3 7 52 0.13107200000000000000e6
-772 3 22 35 0.13107200000000000000e6
-772 3 24 37 -0.16384000000000000000e5
-772 3 27 40 -0.65536000000000000000e5
-772 4 4 32 0.16384000000000000000e5
-772 4 7 35 0.32768000000000000000e5
-772 4 16 28 -0.16384000000000000000e5
-773 1 12 54 0.65536000000000000000e5
-773 1 32 47 -0.65536000000000000000e5
-774 1 12 43 -0.65536000000000000000e5
-774 1 12 55 0.65536000000000000000e5
-774 3 7 52 0.65536000000000000000e5
-774 3 22 35 0.65536000000000000000e5
-775 1 12 56 0.65536000000000000000e5
-775 1 37 52 -0.65536000000000000000e5
-776 1 2 17 -0.16384000000000000000e5
-776 1 3 18 -0.16384000000000000000e5
-776 1 3 34 -0.16384000000000000000e5
-776 1 13 13 0.65536000000000000000e5
-776 2 6 12 -0.16384000000000000000e5
-776 3 3 16 -0.16384000000000000000e5
-777 1 4 19 -0.65536000000000000000e5
-777 1 13 14 0.65536000000000000000e5
-778 1 10 17 -0.65536000000000000000e5
-778 1 13 15 0.65536000000000000000e5
-779 1 2 17 -0.32768000000000000000e5
-779 1 3 18 -0.16384000000000000000e5
-779 1 3 34 -0.16384000000000000000e5
-779 1 4 19 -0.32768000000000000000e5
-779 1 4 35 -0.16384000000000000000e5
-779 1 12 43 -0.16384000000000000000e5
-779 1 13 16 0.65536000000000000000e5
-779 1 14 45 -0.32768000000000000000e5
-779 1 16 23 0.16384000000000000000e5
-779 1 16 31 -0.65536000000000000000e5
-779 1 17 48 0.16384000000000000000e5
-779 1 18 49 0.16384000000000000000e5
-779 1 20 27 0.65536000000000000000e5
-779 2 6 12 -0.16384000000000000000e5
-779 2 9 23 -0.16384000000000000000e5
-779 2 10 24 -0.32768000000000000000e5
-779 2 14 28 0.16384000000000000000e5
-779 3 3 16 -0.32768000000000000000e5
-779 3 5 34 -0.16384000000000000000e5
-779 3 7 12 -0.16384000000000000000e5
-779 3 13 42 0.16384000000000000000e5
-779 3 14 27 -0.16384000000000000000e5
-779 3 14 43 0.16384000000000000000e5
-779 4 1 13 -0.16384000000000000000e5
-779 4 10 10 -0.65536000000000000000e5
-780 1 13 17 0.65536000000000000000e5
-780 1 20 27 -0.65536000000000000000e5
-780 3 7 20 -0.65536000000000000000e5
-781 1 3 18 -0.16384000000000000000e5
-781 1 4 35 0.16384000000000000000e5
-781 1 5 20 -0.32768000000000000000e5
-781 1 5 36 0.32768000000000000000e5
-781 1 10 17 -0.32768000000000000000e5
-781 1 12 43 0.32768000000000000000e5
-781 1 13 18 0.65536000000000000000e5
-781 1 14 45 0.32768000000000000000e5
-781 1 17 32 -0.65536000000000000000e5
-781 1 17 48 -0.16384000000000000000e5
-781 1 18 49 -0.16384000000000000000e5
-781 2 9 23 0.16384000000000000000e5
-781 2 14 28 -0.16384000000000000000e5
-781 3 3 16 -0.16384000000000000000e5
-781 3 4 17 -0.16384000000000000000e5
-781 3 5 34 0.16384000000000000000e5
-781 3 13 42 -0.16384000000000000000e5
-781 3 14 27 0.32768000000000000000e5
-781 3 14 43 -0.16384000000000000000e5
-781 4 2 14 -0.16384000000000000000e5
-781 4 3 15 -0.32768000000000000000e5
-782 1 2 17 -0.16384000000000000000e5
-782 1 3 18 -0.16384000000000000000e5
-782 1 3 34 -0.81920000000000000000e4
-782 1 4 19 -0.16384000000000000000e5
-782 1 5 20 -0.16384000000000000000e5
-782 1 5 36 0.16384000000000000000e5
-782 1 10 17 -0.16384000000000000000e5
-782 1 12 43 0.81920000000000000000e4
-782 1 13 19 0.65536000000000000000e5
-782 1 16 23 0.81920000000000000000e4
-782 1 16 31 -0.32768000000000000000e5
-782 1 17 32 -0.32768000000000000000e5
-782 2 6 12 -0.81920000000000000000e4
-782 2 10 24 -0.16384000000000000000e5
-782 2 11 13 -0.32768000000000000000e5
-782 3 3 16 -0.24576000000000000000e5
-782 3 4 17 -0.81920000000000000000e4
-782 3 7 12 -0.81920000000000000000e4
-782 3 7 20 -0.32768000000000000000e5
-782 3 14 27 0.81920000000000000000e4
-782 4 1 13 -0.81920000000000000000e4
-782 4 2 14 -0.81920000000000000000e4
-782 4 3 15 -0.16384000000000000000e5
-782 4 10 10 -0.32768000000000000000e5
-783 1 13 21 0.65536000000000000000e5
-783 1 19 34 -0.65536000000000000000e5
-783 3 12 21 -0.65536000000000000000e5
-784 1 1 32 -0.65536000000000000000e5
-784 1 13 22 0.65536000000000000000e5
-785 1 2 33 0.65536000000000000000e5
-785 1 3 34 -0.13107200000000000000e6
-785 1 10 41 0.65536000000000000000e5
-785 1 13 23 0.65536000000000000000e5
-785 2 7 21 0.65536000000000000000e5
-785 3 3 32 0.65536000000000000000e5
-786 1 2 33 -0.65536000000000000000e5
-786 1 13 24 0.65536000000000000000e5
-787 1 10 41 -0.65536000000000000000e5
-787 1 13 25 0.65536000000000000000e5
-787 3 3 32 -0.65536000000000000000e5
-788 1 2 33 0.65536000000000000000e5
-788 1 10 41 0.65536000000000000000e5
-788 1 12 43 -0.13107200000000000000e6
-788 1 13 26 0.65536000000000000000e5
-788 2 12 26 0.65536000000000000000e5
-788 3 3 32 0.65536000000000000000e5
-788 3 14 27 -0.13107200000000000000e6
-788 4 8 20 0.65536000000000000000e5
-789 1 13 27 0.65536000000000000000e5
-789 1 16 23 -0.65536000000000000000e5
-790 1 3 34 -0.65536000000000000000e5
-790 1 13 28 0.65536000000000000000e5
-791 1 12 43 -0.65536000000000000000e5
-791 1 13 29 0.65536000000000000000e5
-791 3 14 27 -0.65536000000000000000e5
-792 1 4 35 -0.65536000000000000000e5
-792 1 13 30 0.65536000000000000000e5
-793 1 3 18 -0.32768000000000000000e5
-793 1 4 19 0.65536000000000000000e5
-793 1 4 35 0.32768000000000000000e5
-793 1 12 43 0.65536000000000000000e5
-793 1 13 31 0.65536000000000000000e5
-793 1 14 45 0.65536000000000000000e5
-793 1 17 48 -0.32768000000000000000e5
-793 1 18 49 -0.32768000000000000000e5
-793 1 20 27 -0.13107200000000000000e6
-793 2 9 23 0.32768000000000000000e5
-793 2 10 24 0.65536000000000000000e5
-793 2 14 28 -0.32768000000000000000e5
-793 3 3 16 -0.32768000000000000000e5
-793 3 4 17 -0.32768000000000000000e5
-793 3 5 34 0.32768000000000000000e5
-793 3 13 42 -0.32768000000000000000e5
-793 3 14 27 0.65536000000000000000e5
-793 3 14 43 -0.32768000000000000000e5
-793 4 2 14 -0.32768000000000000000e5
-794 1 3 18 0.32768000000000000000e5
-794 1 4 19 -0.65536000000000000000e5
-794 1 12 43 -0.32768000000000000000e5
-794 1 13 32 0.65536000000000000000e5
-794 3 3 16 0.32768000000000000000e5
-794 3 4 17 0.32768000000000000000e5
-794 3 14 27 -0.32768000000000000000e5
-794 4 2 14 0.32768000000000000000e5
-795 1 4 35 -0.32768000000000000000e5
-795 1 12 43 -0.32768000000000000000e5
-795 1 13 33 0.65536000000000000000e5
-795 1 14 45 -0.65536000000000000000e5
-795 1 17 48 0.32768000000000000000e5
-795 1 18 49 0.32768000000000000000e5
-795 2 9 23 -0.32768000000000000000e5
-795 2 14 28 0.32768000000000000000e5
-795 3 5 34 -0.32768000000000000000e5
-795 3 13 42 0.32768000000000000000e5
-795 3 14 27 -0.32768000000000000000e5
-795 3 14 43 0.32768000000000000000e5
-796 1 13 34 0.65536000000000000000e5
-796 1 20 27 -0.65536000000000000000e5
-797 1 13 35 0.65536000000000000000e5
-797 1 17 32 -0.65536000000000000000e5
-798 1 13 20 -0.65536000000000000000e5
-798 1 13 36 0.65536000000000000000e5
-798 3 8 21 0.65536000000000000000e5
-799 1 2 33 0.65536000000000000000e5
-799 1 3 34 -0.13107200000000000000e6
-799 1 10 41 0.65536000000000000000e5
-799 1 13 37 0.65536000000000000000e5
-799 2 7 21 0.65536000000000000000e5
-799 3 2 31 0.65536000000000000000e5
-799 3 3 32 0.65536000000000000000e5
-800 1 11 42 -0.65536000000000000000e5
-800 1 12 43 -0.13107200000000000000e6
-800 1 13 38 0.65536000000000000000e5
-800 1 28 43 0.65536000000000000000e5
-800 1 32 47 0.65536000000000000000e5
-800 1 33 48 0.65536000000000000000e5
-800 2 12 26 0.65536000000000000000e5
-800 3 13 42 0.13107200000000000000e6
-800 3 28 41 0.65536000000000000000e5
-800 3 29 42 0.65536000000000000000e5
-800 4 3 31 -0.65536000000000000000e5
-801 1 10 41 -0.65536000000000000000e5
-801 1 13 39 0.65536000000000000000e5
-802 1 10 41 0.65536000000000000000e5
-802 1 11 42 0.65536000000000000000e5
-802 1 13 40 0.65536000000000000000e5
-802 1 28 43 -0.65536000000000000000e5
-802 1 32 47 -0.65536000000000000000e5
-802 1 33 48 -0.65536000000000000000e5
-802 3 13 42 -0.13107200000000000000e6
-802 3 28 41 -0.65536000000000000000e5
-802 3 29 42 -0.65536000000000000000e5
-802 4 3 31 0.65536000000000000000e5
-803 1 13 41 0.65536000000000000000e5
-803 1 16 47 -0.65536000000000000000e5
-803 3 12 41 -0.65536000000000000000e5
-804 1 12 43 -0.65536000000000000000e5
-804 1 13 42 0.65536000000000000000e5
-805 1 13 43 0.65536000000000000000e5
-805 1 17 48 -0.65536000000000000000e5
-805 3 13 42 -0.65536000000000000000e5
-806 1 4 35 -0.32768000000000000000e5
-806 1 12 43 -0.32768000000000000000e5
-806 1 13 45 0.65536000000000000000e5
-806 1 14 45 -0.65536000000000000000e5
-806 1 17 48 0.32768000000000000000e5
-806 1 18 49 0.32768000000000000000e5
-806 2 9 23 -0.32768000000000000000e5
-806 2 14 28 0.32768000000000000000e5
-806 3 5 34 -0.32768000000000000000e5
-806 3 13 42 0.32768000000000000000e5
-806 3 14 27 -0.32768000000000000000e5
-806 3 14 43 0.32768000000000000000e5
-806 3 16 29 0.65536000000000000000e5
-807 1 3 18 -0.16384000000000000000e5
-807 1 4 19 0.32768000000000000000e5
-807 1 5 36 0.32768000000000000000e5
-807 1 12 43 0.16384000000000000000e5
-807 1 13 44 -0.32768000000000000000e5
-807 1 13 46 0.65536000000000000000e5
-807 1 14 45 -0.32768000000000000000e5
-807 1 17 32 -0.65536000000000000000e5
-807 3 3 16 -0.16384000000000000000e5
-807 3 4 17 -0.16384000000000000000e5
-807 3 14 27 0.16384000000000000000e5
-807 3 16 29 0.32768000000000000000e5
-807 4 2 14 -0.16384000000000000000e5
-807 4 11 23 0.32768000000000000000e5
-808 1 12 43 -0.13107200000000000000e6
-808 1 13 47 0.65536000000000000000e5
-808 1 28 43 0.65536000000000000000e5
-808 1 32 47 0.65536000000000000000e5
-808 2 20 34 0.65536000000000000000e5
-808 3 22 35 0.13107200000000000000e6
-808 3 28 41 0.65536000000000000000e5
-808 4 6 34 0.65536000000000000000e5
-809 1 13 48 0.65536000000000000000e5
-809 1 32 47 -0.65536000000000000000e5
-809 3 28 41 -0.65536000000000000000e5
-810 1 13 49 0.65536000000000000000e5
-810 1 28 43 -0.65536000000000000000e5
-811 1 12 43 -0.65536000000000000000e5
-811 1 13 50 0.65536000000000000000e5
-811 3 22 35 0.65536000000000000000e5
-812 1 13 51 0.65536000000000000000e5
-812 1 17 48 -0.65536000000000000000e5
-813 1 4 35 -0.32768000000000000000e5
-813 1 12 43 -0.32768000000000000000e5
-813 1 13 52 0.65536000000000000000e5
-813 1 34 49 -0.32768000000000000000e5
-813 2 9 23 -0.32768000000000000000e5
-813 3 5 34 -0.32768000000000000000e5
-813 3 13 42 0.32768000000000000000e5
-813 3 14 27 -0.32768000000000000000e5
-813 3 16 29 0.65536000000000000000e5
-813 3 18 47 -0.32768000000000000000e5
-813 3 22 35 0.32768000000000000000e5
-813 4 14 26 0.32768000000000000000e5
-814 1 13 53 0.65536000000000000000e5
-814 1 32 47 -0.65536000000000000000e5
-815 1 6 53 0.16384000000000000000e5
-815 1 13 54 0.65536000000000000000e5
-815 1 25 40 -0.16384000000000000000e5
-815 1 28 43 -0.65536000000000000000e5
-815 2 4 34 0.32768000000000000000e5
-815 2 21 35 -0.32768000000000000000e5
-815 3 5 50 0.32768000000000000000e5
-815 3 24 37 0.16384000000000000000e5
-815 3 27 40 0.65536000000000000000e5
-815 4 4 32 -0.16384000000000000000e5
-815 4 7 35 -0.32768000000000000000e5
-815 4 16 28 0.16384000000000000000e5
-816 1 6 53 0.81920000000000000000e4
-816 1 13 55 0.65536000000000000000e5
-816 1 17 48 -0.65536000000000000000e5
-816 1 25 40 -0.81920000000000000000e4
-816 2 4 34 0.16384000000000000000e5
-816 2 21 35 -0.16384000000000000000e5
-816 3 5 50 0.16384000000000000000e5
-816 3 24 37 0.81920000000000000000e4
-816 3 27 40 0.32768000000000000000e5
-816 3 28 41 0.32768000000000000000e5
-816 3 29 42 0.32768000000000000000e5
-816 4 4 32 -0.81920000000000000000e4
-816 4 7 35 -0.16384000000000000000e5
-816 4 16 28 0.81920000000000000000e4
-816 4 23 27 0.32768000000000000000e5
-817 1 6 53 0.16384000000000000000e5
-817 1 13 56 0.65536000000000000000e5
-817 1 25 40 -0.16384000000000000000e5
-817 1 28 43 -0.65536000000000000000e5
-817 2 4 34 0.32768000000000000000e5
-817 2 21 35 -0.32768000000000000000e5
-817 3 5 50 0.32768000000000000000e5
-817 3 23 52 0.65536000000000000000e5
-817 3 24 37 0.16384000000000000000e5
-817 3 27 40 0.65536000000000000000e5
-817 4 4 32 -0.16384000000000000000e5
-817 4 7 35 -0.32768000000000000000e5
-817 4 16 28 0.16384000000000000000e5
-818 1 10 17 -0.32768000000000000000e5
-818 1 14 14 0.65536000000000000000e5
-819 1 5 20 -0.65536000000000000000e5
-819 1 14 15 0.65536000000000000000e5
-820 1 14 16 0.65536000000000000000e5
-820 1 20 27 -0.65536000000000000000e5
-820 3 7 20 -0.65536000000000000000e5
-821 1 3 18 -0.16384000000000000000e5
-821 1 4 35 0.16384000000000000000e5
-821 1 5 20 -0.32768000000000000000e5
-821 1 5 36 0.32768000000000000000e5
-821 1 10 17 -0.32768000000000000000e5
-821 1 12 43 0.32768000000000000000e5
-821 1 14 17 0.65536000000000000000e5
-821 1 14 45 0.32768000000000000000e5
-821 1 17 32 -0.65536000000000000000e5
-821 1 17 48 -0.16384000000000000000e5
-821 1 18 49 -0.16384000000000000000e5
-821 2 9 23 0.16384000000000000000e5
-821 2 14 28 -0.16384000000000000000e5
-821 3 3 16 -0.16384000000000000000e5
-821 3 4 17 -0.16384000000000000000e5
-821 3 5 34 0.16384000000000000000e5
-821 3 13 42 -0.16384000000000000000e5
-821 3 14 27 0.32768000000000000000e5
-821 3 14 43 -0.16384000000000000000e5
-821 4 2 14 -0.16384000000000000000e5
-821 4 3 15 -0.32768000000000000000e5
-822 1 3 18 0.16384000000000000000e5
-822 1 4 35 -0.16384000000000000000e5
-822 1 5 20 0.32768000000000000000e5
-822 1 5 36 -0.32768000000000000000e5
-822 1 10 17 0.32768000000000000000e5
-822 1 12 43 -0.32768000000000000000e5
-822 1 13 20 -0.13107200000000000000e6
-822 1 14 18 0.65536000000000000000e5
-822 1 14 45 -0.32768000000000000000e5
-822 1 17 32 0.65536000000000000000e5
-822 1 17 48 0.16384000000000000000e5
-822 1 18 49 0.16384000000000000000e5
-822 1 20 27 0.65536000000000000000e5
-822 2 9 23 -0.16384000000000000000e5
-822 2 11 25 0.65536000000000000000e5
-822 2 14 28 0.16384000000000000000e5
-822 3 3 16 0.16384000000000000000e5
-822 3 4 17 0.16384000000000000000e5
-822 3 5 34 -0.16384000000000000000e5
-822 3 7 20 0.65536000000000000000e5
-822 3 13 42 0.16384000000000000000e5
-822 3 14 27 -0.32768000000000000000e5
-822 3 14 43 0.16384000000000000000e5
-822 4 2 14 0.16384000000000000000e5
-822 4 3 15 0.32768000000000000000e5
-822 4 10 14 0.65536000000000000000e5
-823 1 13 20 -0.65536000000000000000e5
-823 1 14 19 0.65536000000000000000e5
-824 1 6 21 -0.32768000000000000000e5
-824 1 13 20 -0.65536000000000000000e5
-824 1 14 20 0.65536000000000000000e5
-824 1 20 27 0.32768000000000000000e5
-824 2 9 15 -0.32768000000000000000e5
-824 2 11 25 0.32768000000000000000e5
-824 3 7 20 0.32768000000000000000e5
-824 4 10 14 0.32768000000000000000e5
-825 1 2 33 0.65536000000000000000e5
-825 1 3 34 -0.13107200000000000000e6
-825 1 10 41 0.65536000000000000000e5
-825 1 14 22 0.65536000000000000000e5
-825 2 7 21 0.65536000000000000000e5
-825 3 3 32 0.65536000000000000000e5
-826 1 2 33 -0.65536000000000000000e5
-826 1 14 23 0.65536000000000000000e5
-827 1 10 41 -0.65536000000000000000e5
-827 1 14 24 0.65536000000000000000e5
-827 3 3 32 -0.65536000000000000000e5
-828 1 2 33 0.65536000000000000000e5
-828 1 10 41 0.65536000000000000000e5
-828 1 12 43 -0.13107200000000000000e6
-828 1 14 25 0.65536000000000000000e5
-828 2 12 26 0.65536000000000000000e5
-828 3 3 32 0.65536000000000000000e5
-828 3 14 27 -0.13107200000000000000e6
-828 4 8 20 0.65536000000000000000e5
-829 1 11 42 -0.65536000000000000000e5
-829 1 14 26 0.65536000000000000000e5
-829 3 4 33 -0.65536000000000000000e5
-830 1 3 34 -0.65536000000000000000e5
-830 1 14 27 0.65536000000000000000e5
-831 1 12 43 -0.65536000000000000000e5
-831 1 14 28 0.65536000000000000000e5
-831 3 14 27 -0.65536000000000000000e5
-832 1 4 35 -0.65536000000000000000e5
-832 1 14 29 0.65536000000000000000e5
-833 1 14 30 0.65536000000000000000e5
-833 1 14 45 -0.13107200000000000000e6
-833 1 17 48 0.65536000000000000000e5
-833 1 18 49 0.65536000000000000000e5
-833 2 14 28 0.65536000000000000000e5
-833 3 5 34 -0.65536000000000000000e5
-833 3 13 42 0.65536000000000000000e5
-833 3 14 43 0.65536000000000000000e5
-834 1 3 18 0.32768000000000000000e5
-834 1 4 19 -0.65536000000000000000e5
-834 1 12 43 -0.32768000000000000000e5
-834 1 14 31 0.65536000000000000000e5
-834 3 3 16 0.32768000000000000000e5
-834 3 4 17 0.32768000000000000000e5
-834 3 14 27 -0.32768000000000000000e5
-834 4 2 14 0.32768000000000000000e5
-835 1 4 35 -0.32768000000000000000e5
-835 1 12 43 -0.32768000000000000000e5
-835 1 14 32 0.65536000000000000000e5
-835 1 14 45 -0.65536000000000000000e5
-835 1 17 48 0.32768000000000000000e5
-835 1 18 49 0.32768000000000000000e5
-835 2 9 23 -0.32768000000000000000e5
-835 2 14 28 0.32768000000000000000e5
-835 3 5 34 -0.32768000000000000000e5
-835 3 13 42 0.32768000000000000000e5
-835 3 14 27 -0.32768000000000000000e5
-835 3 14 43 0.32768000000000000000e5
-836 1 5 36 -0.65536000000000000000e5
-836 1 14 33 0.65536000000000000000e5
-837 1 14 34 0.65536000000000000000e5
-837 1 17 32 -0.65536000000000000000e5
-838 1 13 20 -0.13107200000000000000e6
-838 1 14 35 0.65536000000000000000e5
-838 1 17 32 0.65536000000000000000e5
-838 1 20 27 0.65536000000000000000e5
-838 2 11 25 0.65536000000000000000e5
-838 3 8 21 0.13107200000000000000e6
-839 1 6 21 -0.32768000000000000000e5
-839 1 13 20 -0.65536000000000000000e5
-839 1 14 36 0.65536000000000000000e5
-839 1 20 27 0.32768000000000000000e5
-839 2 9 15 -0.32768000000000000000e5
-839 2 11 25 0.32768000000000000000e5
-839 3 7 20 0.32768000000000000000e5
-839 3 14 19 0.65536000000000000000e5
-839 4 10 14 0.32768000000000000000e5
-840 1 11 42 -0.65536000000000000000e5
-840 1 12 43 -0.13107200000000000000e6
-840 1 14 37 0.65536000000000000000e5
-840 1 28 43 0.65536000000000000000e5
-840 1 32 47 0.65536000000000000000e5
-840 1 33 48 0.65536000000000000000e5
-840 2 12 26 0.65536000000000000000e5
-840 3 13 42 0.13107200000000000000e6
-840 3 28 41 0.65536000000000000000e5
-840 3 29 42 0.65536000000000000000e5
-840 4 3 31 -0.65536000000000000000e5
-841 1 10 41 -0.65536000000000000000e5
-841 1 14 38 0.65536000000000000000e5
-842 1 10 41 0.65536000000000000000e5
-842 1 11 42 0.65536000000000000000e5
-842 1 14 39 0.65536000000000000000e5
-842 1 28 43 -0.65536000000000000000e5
-842 1 32 47 -0.65536000000000000000e5
-842 1 33 48 -0.65536000000000000000e5
-842 3 13 42 -0.13107200000000000000e6
-842 3 28 41 -0.65536000000000000000e5
-842 3 29 42 -0.65536000000000000000e5
-842 4 3 31 0.65536000000000000000e5
-843 1 11 42 -0.65536000000000000000e5
-843 1 14 40 0.65536000000000000000e5
-844 1 12 43 -0.65536000000000000000e5
-844 1 14 41 0.65536000000000000000e5
-845 1 14 42 0.65536000000000000000e5
-845 1 17 48 -0.65536000000000000000e5
-845 3 13 42 -0.65536000000000000000e5
-846 1 14 43 0.65536000000000000000e5
-846 1 14 45 -0.13107200000000000000e6
-846 1 17 48 0.65536000000000000000e5
-846 1 18 49 0.65536000000000000000e5
-846 2 14 28 0.65536000000000000000e5
-846 3 13 42 0.65536000000000000000e5
-846 3 14 43 0.65536000000000000000e5
-847 1 4 35 -0.32768000000000000000e5
-847 1 12 43 -0.32768000000000000000e5
-847 1 14 44 0.65536000000000000000e5
-847 1 14 45 -0.65536000000000000000e5
-847 1 17 48 0.32768000000000000000e5
-847 1 18 49 0.32768000000000000000e5
-847 2 9 23 -0.32768000000000000000e5
-847 2 14 28 0.32768000000000000000e5
-847 3 5 34 -0.32768000000000000000e5
-847 3 13 42 0.32768000000000000000e5
-847 3 14 27 -0.32768000000000000000e5
-847 3 14 43 0.32768000000000000000e5
-847 3 16 29 0.65536000000000000000e5
-848 1 13 20 -0.13107200000000000000e6
-848 1 14 46 0.65536000000000000000e5
-848 1 17 32 0.65536000000000000000e5
-848 1 20 27 0.65536000000000000000e5
-848 2 11 25 0.65536000000000000000e5
-848 3 8 21 0.13107200000000000000e6
-848 3 18 31 0.65536000000000000000e5
-849 1 14 47 0.65536000000000000000e5
-849 1 32 47 -0.65536000000000000000e5
-849 3 28 41 -0.65536000000000000000e5
-850 1 14 48 0.65536000000000000000e5
-850 1 28 43 -0.65536000000000000000e5
-851 1 14 49 0.65536000000000000000e5
-851 1 33 48 -0.65536000000000000000e5
-851 3 29 42 -0.65536000000000000000e5
-852 1 14 50 0.65536000000000000000e5
-852 1 17 48 -0.65536000000000000000e5
-853 1 14 51 0.65536000000000000000e5
-853 1 34 49 -0.65536000000000000000e5
-853 3 18 47 -0.65536000000000000000e5
-854 1 14 45 -0.13107200000000000000e6
-854 1 14 52 0.65536000000000000000e5
-854 1 17 48 0.32768000000000000000e5
-854 1 18 49 0.32768000000000000000e5
-854 1 34 49 0.32768000000000000000e5
-854 2 14 28 0.32768000000000000000e5
-854 3 14 43 0.32768000000000000000e5
-854 3 15 44 -0.65536000000000000000e5
-854 3 16 45 0.13107200000000000000e6
-854 3 18 47 0.32768000000000000000e5
-854 3 22 35 -0.32768000000000000000e5
-854 4 14 26 -0.32768000000000000000e5
-854 4 15 27 -0.65536000000000000000e5
-855 1 6 53 0.16384000000000000000e5
-855 1 14 53 0.65536000000000000000e5
-855 1 25 40 -0.16384000000000000000e5
-855 1 28 43 -0.65536000000000000000e5
-855 2 4 34 0.32768000000000000000e5
-855 2 21 35 -0.32768000000000000000e5
-855 3 5 50 0.32768000000000000000e5
-855 3 24 37 0.16384000000000000000e5
-855 3 27 40 0.65536000000000000000e5
-855 4 4 32 -0.16384000000000000000e5
-855 4 7 35 -0.32768000000000000000e5
-855 4 16 28 0.16384000000000000000e5
-856 1 14 54 0.65536000000000000000e5
-856 1 33 48 -0.65536000000000000000e5
-857 1 14 55 0.65536000000000000000e5
-857 1 34 49 -0.65536000000000000000e5
-858 1 14 56 0.65536000000000000000e5
-858 1 33 48 -0.65536000000000000000e5
-858 3 10 55 -0.65536000000000000000e5
-858 3 35 48 0.13107200000000000000e6
-858 3 40 45 -0.65536000000000000000e5
-858 4 22 34 -0.65536000000000000000e5
-859 1 11 18 -0.32768000000000000000e5
-859 1 15 15 0.65536000000000000000e5
-860 1 3 18 -0.16384000000000000000e5
-860 1 4 35 0.16384000000000000000e5
-860 1 5 20 -0.32768000000000000000e5
-860 1 5 36 0.32768000000000000000e5
-860 1 10 17 -0.32768000000000000000e5
-860 1 12 43 0.32768000000000000000e5
-860 1 14 45 0.32768000000000000000e5
-860 1 15 16 0.65536000000000000000e5
-860 1 17 32 -0.65536000000000000000e5
-860 1 17 48 -0.16384000000000000000e5
-860 1 18 49 -0.16384000000000000000e5
-860 2 9 23 0.16384000000000000000e5
-860 2 14 28 -0.16384000000000000000e5
-860 3 3 16 -0.16384000000000000000e5
-860 3 4 17 -0.16384000000000000000e5
-860 3 5 34 0.16384000000000000000e5
-860 3 13 42 -0.16384000000000000000e5
-860 3 14 27 0.32768000000000000000e5
-860 3 14 43 -0.16384000000000000000e5
-860 4 2 14 -0.16384000000000000000e5
-860 4 3 15 -0.32768000000000000000e5
-861 1 3 18 0.16384000000000000000e5
-861 1 4 35 -0.16384000000000000000e5
-861 1 5 20 0.32768000000000000000e5
-861 1 5 36 -0.32768000000000000000e5
-861 1 10 17 0.32768000000000000000e5
-861 1 12 43 -0.32768000000000000000e5
-861 1 13 20 -0.13107200000000000000e6
-861 1 14 45 -0.32768000000000000000e5
-861 1 15 17 0.65536000000000000000e5
-861 1 17 32 0.65536000000000000000e5
-861 1 17 48 0.16384000000000000000e5
-861 1 18 49 0.16384000000000000000e5
-861 1 20 27 0.65536000000000000000e5
-861 2 9 23 -0.16384000000000000000e5
-861 2 11 25 0.65536000000000000000e5
-861 2 14 28 0.16384000000000000000e5
-861 3 3 16 0.16384000000000000000e5
-861 3 4 17 0.16384000000000000000e5
-861 3 5 34 -0.16384000000000000000e5
-861 3 7 20 0.65536000000000000000e5
-861 3 13 42 0.16384000000000000000e5
-861 3 14 27 -0.32768000000000000000e5
-861 3 14 43 0.16384000000000000000e5
-861 4 2 14 0.16384000000000000000e5
-861 4 3 15 0.32768000000000000000e5
-861 4 10 14 0.65536000000000000000e5
-862 1 6 21 -0.65536000000000000000e5
-862 1 15 18 0.65536000000000000000e5
-863 1 6 21 -0.32768000000000000000e5
-863 1 13 20 -0.65536000000000000000e5
-863 1 15 19 0.65536000000000000000e5
-863 1 20 27 0.32768000000000000000e5
-863 2 9 15 -0.32768000000000000000e5
-863 2 11 25 0.32768000000000000000e5
-863 3 7 20 0.32768000000000000000e5
-863 4 10 14 0.32768000000000000000e5
-864 1 3 18 -0.81920000000000000000e4
-864 1 4 19 0.16384000000000000000e5
-864 1 5 36 0.16384000000000000000e5
-864 1 12 43 0.81920000000000000000e4
-864 1 13 44 -0.16384000000000000000e5
-864 1 14 21 -0.13107200000000000000e6
-864 1 14 45 -0.16384000000000000000e5
-864 1 15 20 0.65536000000000000000e5
-864 1 21 44 0.13107200000000000000e6
-864 1 33 36 -0.65536000000000000000e5
-864 2 11 25 0.32768000000000000000e5
-864 2 15 29 -0.32768000000000000000e5
-864 3 3 16 -0.81920000000000000000e4
-864 3 4 17 -0.81920000000000000000e4
-864 3 7 36 0.32768000000000000000e5
-864 3 8 21 0.65536000000000000000e5
-864 3 14 19 0.65536000000000000000e5
-864 3 14 27 0.81920000000000000000e4
-864 3 16 29 0.16384000000000000000e5
-864 3 18 31 0.32768000000000000000e5
-864 3 19 32 0.65536000000000000000e5
-864 4 2 14 -0.81920000000000000000e4
-864 4 11 15 0.65536000000000000000e5
-864 4 11 23 0.16384000000000000000e5
-864 4 13 25 0.65536000000000000000e5
-865 1 15 21 0.65536000000000000000e5
-865 1 20 35 -0.65536000000000000000e5
-865 3 18 19 -0.65536000000000000000e5
-866 1 2 33 -0.65536000000000000000e5
-866 1 15 22 0.65536000000000000000e5
-867 1 10 41 -0.65536000000000000000e5
-867 1 15 23 0.65536000000000000000e5
-867 3 3 32 -0.65536000000000000000e5
-868 1 2 33 0.65536000000000000000e5
-868 1 10 41 0.65536000000000000000e5
-868 1 12 43 -0.13107200000000000000e6
-868 1 15 24 0.65536000000000000000e5
-868 2 12 26 0.65536000000000000000e5
-868 3 3 32 0.65536000000000000000e5
-868 3 14 27 -0.13107200000000000000e6
-868 4 8 20 0.65536000000000000000e5
-869 1 11 42 -0.65536000000000000000e5
-869 1 15 25 0.65536000000000000000e5
-869 3 4 33 -0.65536000000000000000e5
-870 1 2 33 -0.65536000000000000000e5
-870 1 11 42 0.65536000000000000000e5
-870 1 12 43 0.13107200000000000000e6
-870 1 15 26 0.65536000000000000000e5
-870 1 26 33 -0.65536000000000000000e5
-870 1 28 43 -0.65536000000000000000e5
-870 1 32 47 -0.65536000000000000000e5
-870 1 33 48 -0.65536000000000000000e5
-870 2 12 26 -0.65536000000000000000e5
-870 3 3 32 -0.65536000000000000000e5
-870 3 4 33 0.65536000000000000000e5
-870 3 5 34 -0.13107200000000000000e6
-870 3 13 42 -0.13107200000000000000e6
-870 3 14 27 0.13107200000000000000e6
-870 3 28 41 -0.65536000000000000000e5
-870 3 29 42 -0.65536000000000000000e5
-870 4 3 31 0.65536000000000000000e5
-870 4 8 20 -0.65536000000000000000e5
-870 4 9 21 0.65536000000000000000e5
-871 1 12 43 -0.65536000000000000000e5
-871 1 15 27 0.65536000000000000000e5
-871 3 14 27 -0.65536000000000000000e5
-872 1 4 35 -0.65536000000000000000e5
-872 1 15 28 0.65536000000000000000e5
-873 1 14 45 -0.13107200000000000000e6
-873 1 15 29 0.65536000000000000000e5
-873 1 17 48 0.65536000000000000000e5
-873 1 18 49 0.65536000000000000000e5
-873 2 14 28 0.65536000000000000000e5
-873 3 5 34 -0.65536000000000000000e5
-873 3 13 42 0.65536000000000000000e5
-873 3 14 43 0.65536000000000000000e5
-874 1 4 35 -0.32768000000000000000e5
-874 1 12 43 -0.32768000000000000000e5
-874 1 14 45 -0.65536000000000000000e5
-874 1 15 31 0.65536000000000000000e5
-874 1 17 48 0.32768000000000000000e5
-874 1 18 49 0.32768000000000000000e5
-874 2 9 23 -0.32768000000000000000e5
-874 2 14 28 0.32768000000000000000e5
-874 3 5 34 -0.32768000000000000000e5
-874 3 13 42 0.32768000000000000000e5
-874 3 14 27 -0.32768000000000000000e5
-874 3 14 43 0.32768000000000000000e5
-875 1 5 36 -0.65536000000000000000e5
-875 1 15 32 0.65536000000000000000e5
-876 1 11 18 -0.65536000000000000000e5
-876 1 15 33 0.65536000000000000000e5
-876 3 6 19 0.65536000000000000000e5
-877 1 13 20 -0.13107200000000000000e6
-877 1 15 34 0.65536000000000000000e5
-877 1 17 32 0.65536000000000000000e5
-877 1 20 27 0.65536000000000000000e5
-877 2 11 25 0.65536000000000000000e5
-877 3 8 21 0.13107200000000000000e6
-878 1 15 35 0.65536000000000000000e5
-878 1 18 33 -0.65536000000000000000e5
-879 1 3 18 -0.81920000000000000000e4
-879 1 4 19 0.16384000000000000000e5
-879 1 5 36 0.16384000000000000000e5
-879 1 12 43 0.81920000000000000000e4
-879 1 13 44 -0.16384000000000000000e5
-879 1 14 21 -0.13107200000000000000e6
-879 1 14 45 -0.16384000000000000000e5
-879 1 15 36 0.65536000000000000000e5
-879 1 21 44 0.13107200000000000000e6
-879 1 33 36 -0.65536000000000000000e5
-879 2 11 25 0.32768000000000000000e5
-879 2 15 29 -0.32768000000000000000e5
-879 3 3 16 -0.81920000000000000000e4
-879 3 4 17 -0.81920000000000000000e4
-879 3 7 36 0.32768000000000000000e5
-879 3 8 21 0.65536000000000000000e5
-879 3 14 27 0.81920000000000000000e4
-879 3 15 20 -0.65536000000000000000e5
-879 3 16 29 0.16384000000000000000e5
-879 3 18 19 0.13107200000000000000e6
-879 3 18 31 0.32768000000000000000e5
-879 3 19 32 0.65536000000000000000e5
-879 4 2 14 -0.81920000000000000000e4
-879 4 11 15 0.65536000000000000000e5
-879 4 11 23 0.16384000000000000000e5
-879 4 13 25 0.65536000000000000000e5
-879 4 14 14 -0.13107200000000000000e6
-880 1 10 41 -0.65536000000000000000e5
-880 1 15 37 0.65536000000000000000e5
-881 1 10 41 0.65536000000000000000e5
-881 1 11 42 0.65536000000000000000e5
-881 1 15 38 0.65536000000000000000e5
-881 1 28 43 -0.65536000000000000000e5
-881 1 32 47 -0.65536000000000000000e5
-881 1 33 48 -0.65536000000000000000e5
-881 3 13 42 -0.13107200000000000000e6
-881 3 28 41 -0.65536000000000000000e5
-881 3 29 42 -0.65536000000000000000e5
-881 4 3 31 0.65536000000000000000e5
-882 1 11 42 -0.65536000000000000000e5
-882 1 15 39 0.65536000000000000000e5
-883 1 15 40 0.65536000000000000000e5
-883 1 26 33 -0.65536000000000000000e5
-884 1 15 41 0.65536000000000000000e5
-884 1 17 48 -0.65536000000000000000e5
-884 3 13 42 -0.65536000000000000000e5
-885 1 14 45 -0.13107200000000000000e6
-885 1 15 42 0.65536000000000000000e5
-885 1 17 48 0.65536000000000000000e5
-885 1 18 49 0.65536000000000000000e5
-885 2 14 28 0.65536000000000000000e5
-885 3 13 42 0.65536000000000000000e5
-885 3 14 43 0.65536000000000000000e5
-886 1 15 43 0.65536000000000000000e5
-886 1 18 49 -0.65536000000000000000e5
-886 3 14 43 -0.65536000000000000000e5
-887 1 14 45 -0.65536000000000000000e5
-887 1 15 44 0.65536000000000000000e5
-888 1 11 18 -0.65536000000000000000e5
-888 1 15 45 0.65536000000000000000e5
-888 3 6 19 0.65536000000000000000e5
-888 3 17 30 0.65536000000000000000e5
-889 1 15 47 0.65536000000000000000e5
-889 1 28 43 -0.65536000000000000000e5
-890 1 15 48 0.65536000000000000000e5
-890 1 33 48 -0.65536000000000000000e5
-890 3 29 42 -0.65536000000000000000e5
-891 1 15 49 0.65536000000000000000e5
-891 1 33 40 -0.65536000000000000000e5
-892 1 15 50 0.65536000000000000000e5
-892 1 34 49 -0.65536000000000000000e5
-892 3 18 47 -0.65536000000000000000e5
-893 1 15 51 0.65536000000000000000e5
-893 1 18 49 -0.65536000000000000000e5
-894 1 11 18 -0.65536000000000000000e5
-894 1 15 52 0.65536000000000000000e5
-894 3 6 19 0.65536000000000000000e5
-894 3 15 44 0.65536000000000000000e5
-894 3 17 30 0.65536000000000000000e5
-895 1 15 53 0.65536000000000000000e5
-895 1 33 48 -0.65536000000000000000e5
-896 1 15 54 0.65536000000000000000e5
-896 1 33 40 -0.65536000000000000000e5
-896 3 14 51 0.13107200000000000000e6
-896 3 29 42 -0.65536000000000000000e5
-896 3 30 43 -0.65536000000000000000e5
-896 4 19 31 -0.65536000000000000000e5
-897 1 15 55 0.65536000000000000000e5
-897 1 18 49 -0.65536000000000000000e5
-897 3 14 51 0.65536000000000000000e5
-898 1 15 56 0.65536000000000000000e5
-898 1 33 40 -0.65536000000000000000e5
-898 3 10 55 0.65536000000000000000e5
-898 3 14 51 0.13107200000000000000e6
-898 3 29 42 -0.65536000000000000000e5
-898 3 30 43 -0.65536000000000000000e5
-898 4 19 31 -0.65536000000000000000e5
-899 1 12 19 -0.32768000000000000000e5
-899 1 16 16 0.65536000000000000000e5
-900 1 2 17 -0.16384000000000000000e5
-900 1 3 18 -0.16384000000000000000e5
-900 1 3 34 -0.81920000000000000000e4
-900 1 4 19 -0.16384000000000000000e5
-900 1 5 20 -0.16384000000000000000e5
-900 1 5 36 0.16384000000000000000e5
-900 1 10 17 -0.16384000000000000000e5
-900 1 12 43 0.81920000000000000000e4
-900 1 16 17 0.65536000000000000000e5
-900 1 16 23 0.81920000000000000000e4
-900 1 16 31 -0.32768000000000000000e5
-900 1 17 32 -0.32768000000000000000e5
-900 2 6 12 -0.81920000000000000000e4
-900 2 10 24 -0.16384000000000000000e5
-900 2 11 13 -0.32768000000000000000e5
-900 3 3 16 -0.24576000000000000000e5
-900 3 4 17 -0.81920000000000000000e4
-900 3 7 12 -0.81920000000000000000e4
-900 3 7 20 -0.32768000000000000000e5
-900 3 14 27 0.81920000000000000000e4
-900 4 1 13 -0.81920000000000000000e4
-900 4 2 14 -0.81920000000000000000e4
-900 4 3 15 -0.16384000000000000000e5
-900 4 10 10 -0.32768000000000000000e5
-901 1 13 20 -0.65536000000000000000e5
-901 1 16 18 0.65536000000000000000e5
-902 1 16 20 0.65536000000000000000e5
-902 1 19 34 -0.65536000000000000000e5
-902 3 12 21 -0.65536000000000000000e5
-903 1 14 21 -0.32768000000000000000e5
-903 1 16 19 -0.32768000000000000000e5
-903 1 16 21 0.65536000000000000000e5
-903 1 19 34 -0.32768000000000000000e5
-903 2 13 15 -0.32768000000000000000e5
-903 3 12 21 -0.32768000000000000000e5
-904 1 12 27 -0.65536000000000000000e5
-904 1 16 22 0.65536000000000000000e5
-905 1 3 34 -0.65536000000000000000e5
-905 1 16 24 0.65536000000000000000e5
-906 1 12 43 -0.65536000000000000000e5
-906 1 16 25 0.65536000000000000000e5
-906 3 14 27 -0.65536000000000000000e5
-907 1 4 35 -0.65536000000000000000e5
-907 1 16 26 0.65536000000000000000e5
-908 1 4 35 -0.32768000000000000000e5
-908 1 12 43 -0.32768000000000000000e5
-908 1 14 45 -0.65536000000000000000e5
-908 1 16 27 0.65536000000000000000e5
-908 1 16 31 -0.13107200000000000000e6
-908 1 17 48 0.32768000000000000000e5
-908 1 18 49 0.32768000000000000000e5
-908 1 20 27 0.13107200000000000000e6
-908 2 7 13 0.65536000000000000000e5
-908 2 9 23 -0.32768000000000000000e5
-908 2 10 24 -0.65536000000000000000e5
-908 2 14 28 0.32768000000000000000e5
-908 3 5 34 -0.32768000000000000000e5
-908 3 13 42 0.32768000000000000000e5
-908 3 14 27 -0.32768000000000000000e5
-908 3 14 43 0.32768000000000000000e5
-908 4 10 10 -0.13107200000000000000e6
-909 1 3 18 -0.32768000000000000000e5
-909 1 4 19 0.65536000000000000000e5
-909 1 4 35 0.32768000000000000000e5
-909 1 12 43 0.65536000000000000000e5
-909 1 14 45 0.65536000000000000000e5
-909 1 16 28 0.65536000000000000000e5
-909 1 17 48 -0.32768000000000000000e5
-909 1 18 49 -0.32768000000000000000e5
-909 1 20 27 -0.13107200000000000000e6
-909 2 9 23 0.32768000000000000000e5
-909 2 10 24 0.65536000000000000000e5
-909 2 14 28 -0.32768000000000000000e5
-909 3 3 16 -0.32768000000000000000e5
-909 3 4 17 -0.32768000000000000000e5
-909 3 5 34 0.32768000000000000000e5
-909 3 13 42 -0.32768000000000000000e5
-909 3 14 27 0.65536000000000000000e5
-909 3 14 43 -0.32768000000000000000e5
-909 4 2 14 -0.32768000000000000000e5
-910 1 3 18 0.32768000000000000000e5
-910 1 4 19 -0.65536000000000000000e5
-910 1 12 43 -0.32768000000000000000e5
-910 1 16 29 0.65536000000000000000e5
-910 3 3 16 0.32768000000000000000e5
-910 3 4 17 0.32768000000000000000e5
-910 3 14 27 -0.32768000000000000000e5
-910 4 2 14 0.32768000000000000000e5
-911 1 4 35 -0.32768000000000000000e5
-911 1 12 43 -0.32768000000000000000e5
-911 1 14 45 -0.65536000000000000000e5
-911 1 16 30 0.65536000000000000000e5
-911 1 17 48 0.32768000000000000000e5
-911 1 18 49 0.32768000000000000000e5
-911 2 9 23 -0.32768000000000000000e5
-911 2 14 28 0.32768000000000000000e5
-911 3 5 34 -0.32768000000000000000e5
-911 3 13 42 0.32768000000000000000e5
-911 3 14 27 -0.32768000000000000000e5
-911 3 14 43 0.32768000000000000000e5
-912 1 16 32 0.65536000000000000000e5
-912 1 20 27 -0.65536000000000000000e5
-913 1 16 33 0.65536000000000000000e5
-913 1 17 32 -0.65536000000000000000e5
-914 1 2 17 -0.16384000000000000000e5
-914 1 3 18 -0.16384000000000000000e5
-914 1 3 34 -0.81920000000000000000e4
-914 1 4 19 -0.16384000000000000000e5
-914 1 5 20 -0.16384000000000000000e5
-914 1 5 36 0.16384000000000000000e5
-914 1 10 17 -0.16384000000000000000e5
-914 1 12 43 0.81920000000000000000e4
-914 1 16 23 0.81920000000000000000e4
-914 1 16 31 -0.32768000000000000000e5
-914 1 16 34 0.65536000000000000000e5
-914 1 17 32 -0.32768000000000000000e5
-914 2 6 12 -0.81920000000000000000e4
-914 2 10 24 -0.16384000000000000000e5
-914 2 11 13 -0.32768000000000000000e5
-914 3 3 16 -0.24576000000000000000e5
-914 3 4 17 -0.81920000000000000000e4
-914 3 7 12 -0.81920000000000000000e4
-914 3 7 20 -0.32768000000000000000e5
-914 3 8 21 -0.65536000000000000000e5
-914 3 12 21 0.13107200000000000000e6
-914 3 14 19 -0.65536000000000000000e5
-914 3 14 27 0.81920000000000000000e4
-914 4 1 13 -0.81920000000000000000e4
-914 4 2 14 -0.81920000000000000000e4
-914 4 3 15 -0.16384000000000000000e5
-914 4 10 10 -0.32768000000000000000e5
-914 4 13 13 -0.13107200000000000000e6
-915 1 13 20 -0.65536000000000000000e5
-915 1 16 35 0.65536000000000000000e5
-915 3 8 21 0.65536000000000000000e5
-916 1 16 36 0.65536000000000000000e5
-916 1 19 34 -0.65536000000000000000e5
-917 1 16 23 -0.65536000000000000000e5
-917 1 16 37 0.65536000000000000000e5
-917 3 1 34 0.65536000000000000000e5
-918 1 16 38 0.65536000000000000000e5
-918 1 16 47 -0.65536000000000000000e5
-918 3 12 41 -0.65536000000000000000e5
-919 1 12 43 -0.65536000000000000000e5
-919 1 16 39 0.65536000000000000000e5
-920 1 16 40 0.65536000000000000000e5
-920 1 17 48 -0.65536000000000000000e5
-920 3 13 42 -0.65536000000000000000e5
-921 1 16 41 0.65536000000000000000e5
-921 1 27 34 -0.65536000000000000000e5
-922 1 13 44 -0.65536000000000000000e5
-922 1 16 42 0.65536000000000000000e5
-923 1 4 35 -0.32768000000000000000e5
-923 1 12 43 -0.32768000000000000000e5
-923 1 14 45 -0.65536000000000000000e5
-923 1 16 43 0.65536000000000000000e5
-923 1 17 48 0.32768000000000000000e5
-923 1 18 49 0.32768000000000000000e5
-923 2 9 23 -0.32768000000000000000e5
-923 2 14 28 0.32768000000000000000e5
-923 3 5 34 -0.32768000000000000000e5
-923 3 13 42 0.32768000000000000000e5
-923 3 14 27 -0.32768000000000000000e5
-923 3 14 43 0.32768000000000000000e5
-923 3 16 29 0.65536000000000000000e5
-924 1 16 44 0.65536000000000000000e5
-924 1 20 27 -0.65536000000000000000e5
-924 3 7 36 0.65536000000000000000e5
-925 1 3 18 -0.16384000000000000000e5
-925 1 4 19 0.32768000000000000000e5
-925 1 5 36 0.32768000000000000000e5
-925 1 12 43 0.16384000000000000000e5
-925 1 13 44 -0.32768000000000000000e5
-925 1 14 45 -0.32768000000000000000e5
-925 1 16 45 0.65536000000000000000e5
-925 1 17 32 -0.65536000000000000000e5
-925 3 3 16 -0.16384000000000000000e5
-925 3 4 17 -0.16384000000000000000e5
-925 3 14 27 0.16384000000000000000e5
-925 3 16 29 0.32768000000000000000e5
-925 4 2 14 -0.16384000000000000000e5
-925 4 11 23 0.32768000000000000000e5
-926 1 3 18 -0.81920000000000000000e4
-926 1 4 19 0.16384000000000000000e5
-926 1 5 36 0.16384000000000000000e5
-926 1 12 43 0.81920000000000000000e4
-926 1 13 20 -0.65536000000000000000e5
-926 1 13 44 -0.16384000000000000000e5
-926 1 14 45 -0.16384000000000000000e5
-926 1 16 46 0.65536000000000000000e5
-926 2 11 25 0.32768000000000000000e5
-926 2 15 29 -0.32768000000000000000e5
-926 3 3 16 -0.81920000000000000000e4
-926 3 4 17 -0.81920000000000000000e4
-926 3 7 36 0.32768000000000000000e5
-926 3 8 21 0.65536000000000000000e5
-926 3 14 27 0.81920000000000000000e4
-926 3 16 29 0.16384000000000000000e5
-926 3 18 31 0.32768000000000000000e5
-926 4 2 14 -0.81920000000000000000e4
-926 4 11 23 0.16384000000000000000e5
-927 1 12 43 -0.65536000000000000000e5
-927 1 16 48 0.65536000000000000000e5
-927 3 22 35 0.65536000000000000000e5
-928 1 16 49 0.65536000000000000000e5
-928 1 17 48 -0.65536000000000000000e5
-929 1 16 50 0.65536000000000000000e5
-929 1 34 41 -0.65536000000000000000e5
-930 1 4 35 -0.32768000000000000000e5
-930 1 12 43 -0.32768000000000000000e5
-930 1 16 51 0.65536000000000000000e5
-930 1 34 49 -0.32768000000000000000e5
-930 2 9 23 -0.32768000000000000000e5
-930 3 5 34 -0.32768000000000000000e5
-930 3 13 42 0.32768000000000000000e5
-930 3 14 27 -0.32768000000000000000e5
-930 3 16 29 0.65536000000000000000e5
-930 3 18 47 -0.32768000000000000000e5
-930 3 22 35 0.32768000000000000000e5
-930 4 14 26 0.32768000000000000000e5
-931 1 16 52 0.65536000000000000000e5
-931 1 19 50 -0.65536000000000000000e5
-932 1 12 43 -0.65536000000000000000e5
-932 1 16 53 0.65536000000000000000e5
-932 3 7 52 0.65536000000000000000e5
-932 3 22 35 0.65536000000000000000e5
-933 1 6 53 0.81920000000000000000e4
-933 1 16 54 0.65536000000000000000e5
-933 1 17 48 -0.65536000000000000000e5
-933 1 25 40 -0.81920000000000000000e4
-933 2 4 34 0.16384000000000000000e5
-933 2 21 35 -0.16384000000000000000e5
-933 3 5 50 0.16384000000000000000e5
-933 3 24 37 0.81920000000000000000e4
-933 3 27 40 0.32768000000000000000e5
-933 3 28 41 0.32768000000000000000e5
-933 3 29 42 0.32768000000000000000e5
-933 4 4 32 -0.81920000000000000000e4
-933 4 7 35 -0.16384000000000000000e5
-933 4 16 28 0.81920000000000000000e4
-933 4 23 27 0.32768000000000000000e5
-934 1 4 35 -0.32768000000000000000e5
-934 1 12 43 -0.32768000000000000000e5
-934 1 16 55 0.65536000000000000000e5
-934 1 34 49 -0.32768000000000000000e5
-934 2 9 23 -0.32768000000000000000e5
-934 3 5 34 -0.32768000000000000000e5
-934 3 13 42 0.32768000000000000000e5
-934 3 14 27 -0.32768000000000000000e5
-934 3 16 29 0.65536000000000000000e5
-934 3 18 47 -0.32768000000000000000e5
-934 3 22 35 0.32768000000000000000e5
-934 3 31 44 0.65536000000000000000e5
-934 4 14 26 0.32768000000000000000e5
-935 1 6 53 0.81920000000000000000e4
-935 1 16 56 0.65536000000000000000e5
-935 1 17 48 -0.65536000000000000000e5
-935 1 25 40 -0.81920000000000000000e4
-935 2 4 34 0.16384000000000000000e5
-935 2 21 35 -0.16384000000000000000e5
-935 3 5 50 0.16384000000000000000e5
-935 3 24 37 0.81920000000000000000e4
-935 3 27 40 0.32768000000000000000e5
-935 3 28 41 0.32768000000000000000e5
-935 3 29 42 0.32768000000000000000e5
-935 3 34 47 0.65536000000000000000e5
-935 4 4 32 -0.81920000000000000000e4
-935 4 7 35 -0.16384000000000000000e5
-935 4 16 28 0.81920000000000000000e4
-935 4 23 27 0.32768000000000000000e5
-936 1 13 20 -0.32768000000000000000e5
-936 1 17 17 0.65536000000000000000e5
-937 1 6 21 -0.32768000000000000000e5
-937 1 13 20 -0.65536000000000000000e5
-937 1 17 18 0.65536000000000000000e5
-937 1 20 27 0.32768000000000000000e5
-937 2 9 15 -0.32768000000000000000e5
-937 2 11 25 0.32768000000000000000e5
-937 3 7 20 0.32768000000000000000e5
-937 4 10 14 0.32768000000000000000e5
-938 1 17 19 0.65536000000000000000e5
-938 1 19 34 -0.65536000000000000000e5
-938 3 12 21 -0.65536000000000000000e5
-939 1 14 21 -0.65536000000000000000e5
-939 1 17 20 0.65536000000000000000e5
-940 1 14 21 -0.32768000000000000000e5
-940 1 17 21 0.65536000000000000000e5
-940 1 19 34 -0.32768000000000000000e5
-940 1 20 35 -0.32768000000000000000e5
-940 2 15 25 -0.32768000000000000000e5
-940 3 8 21 0.16384000000000000000e5
-940 3 15 20 -0.16384000000000000000e5
-940 3 16 21 -0.65536000000000000000e5
-940 3 18 19 0.32768000000000000000e5
-940 4 11 15 0.16384000000000000000e5
-940 4 14 14 -0.32768000000000000000e5
-941 1 16 23 -0.65536000000000000000e5
-941 1 17 22 0.65536000000000000000e5
-942 1 3 34 -0.65536000000000000000e5
-942 1 17 23 0.65536000000000000000e5
-943 1 12 43 -0.65536000000000000000e5
-943 1 17 24 0.65536000000000000000e5
-943 3 14 27 -0.65536000000000000000e5
-944 1 4 35 -0.65536000000000000000e5
-944 1 17 25 0.65536000000000000000e5
-945 1 14 45 -0.13107200000000000000e6
-945 1 17 26 0.65536000000000000000e5
-945 1 17 48 0.65536000000000000000e5
-945 1 18 49 0.65536000000000000000e5
-945 2 14 28 0.65536000000000000000e5
-945 3 5 34 -0.65536000000000000000e5
-945 3 13 42 0.65536000000000000000e5
-945 3 14 43 0.65536000000000000000e5
-946 1 3 18 -0.32768000000000000000e5
-946 1 4 19 0.65536000000000000000e5
-946 1 4 35 0.32768000000000000000e5
-946 1 12 43 0.65536000000000000000e5
-946 1 14 45 0.65536000000000000000e5
-946 1 17 27 0.65536000000000000000e5
-946 1 17 48 -0.32768000000000000000e5
-946 1 18 49 -0.32768000000000000000e5
-946 1 20 27 -0.13107200000000000000e6
-946 2 9 23 0.32768000000000000000e5
-946 2 10 24 0.65536000000000000000e5
-946 2 14 28 -0.32768000000000000000e5
-946 3 3 16 -0.32768000000000000000e5
-946 3 4 17 -0.32768000000000000000e5
-946 3 5 34 0.32768000000000000000e5
-946 3 13 42 -0.32768000000000000000e5
-946 3 14 27 0.65536000000000000000e5
-946 3 14 43 -0.32768000000000000000e5
-946 4 2 14 -0.32768000000000000000e5
-947 1 3 18 0.32768000000000000000e5
-947 1 4 19 -0.65536000000000000000e5
-947 1 12 43 -0.32768000000000000000e5
-947 1 17 28 0.65536000000000000000e5
-947 3 3 16 0.32768000000000000000e5
-947 3 4 17 0.32768000000000000000e5
-947 3 14 27 -0.32768000000000000000e5
-947 4 2 14 0.32768000000000000000e5
-948 1 4 35 -0.32768000000000000000e5
-948 1 12 43 -0.32768000000000000000e5
-948 1 14 45 -0.65536000000000000000e5
-948 1 17 29 0.65536000000000000000e5
-948 1 17 48 0.32768000000000000000e5
-948 1 18 49 0.32768000000000000000e5
-948 2 9 23 -0.32768000000000000000e5
-948 2 14 28 0.32768000000000000000e5
-948 3 5 34 -0.32768000000000000000e5
-948 3 13 42 0.32768000000000000000e5
-948 3 14 27 -0.32768000000000000000e5
-948 3 14 43 0.32768000000000000000e5
-949 1 5 36 -0.65536000000000000000e5
-949 1 17 30 0.65536000000000000000e5
-950 1 17 31 0.65536000000000000000e5
-950 1 20 27 -0.65536000000000000000e5
-951 1 13 20 -0.13107200000000000000e6
-951 1 17 32 0.65536000000000000000e5
-951 1 17 33 0.65536000000000000000e5
-951 1 20 27 0.65536000000000000000e5
-951 2 11 25 0.65536000000000000000e5
-951 3 8 21 0.13107200000000000000e6
-952 1 13 20 -0.65536000000000000000e5
-952 1 17 34 0.65536000000000000000e5
-952 3 8 21 0.65536000000000000000e5
-953 1 6 21 -0.32768000000000000000e5
-953 1 13 20 -0.65536000000000000000e5
-953 1 17 35 0.65536000000000000000e5
-953 1 20 27 0.32768000000000000000e5
-953 2 9 15 -0.32768000000000000000e5
-953 2 11 25 0.32768000000000000000e5
-953 3 7 20 0.32768000000000000000e5
-953 3 14 19 0.65536000000000000000e5
-953 4 10 14 0.32768000000000000000e5
-954 1 14 21 -0.65536000000000000000e5
-954 1 17 36 0.65536000000000000000e5
-954 3 8 21 0.32768000000000000000e5
-954 3 15 20 -0.32768000000000000000e5
-954 3 18 19 0.65536000000000000000e5
-954 4 11 15 0.32768000000000000000e5
-954 4 14 14 -0.65536000000000000000e5
-955 1 16 47 -0.65536000000000000000e5
-955 1 17 37 0.65536000000000000000e5
-955 3 12 41 -0.65536000000000000000e5
-956 1 12 43 -0.65536000000000000000e5
-956 1 17 38 0.65536000000000000000e5
-957 1 17 39 0.65536000000000000000e5
-957 1 17 48 -0.65536000000000000000e5
-957 3 13 42 -0.65536000000000000000e5
-958 1 14 45 -0.13107200000000000000e6
-958 1 17 40 0.65536000000000000000e5
-958 1 17 48 0.65536000000000000000e5
-958 1 18 49 0.65536000000000000000e5
-958 2 14 28 0.65536000000000000000e5
-958 3 13 42 0.65536000000000000000e5
-958 3 14 43 0.65536000000000000000e5
-959 1 13 44 -0.65536000000000000000e5
-959 1 17 41 0.65536000000000000000e5
-960 1 4 35 -0.32768000000000000000e5
-960 1 12 43 -0.32768000000000000000e5
-960 1 14 45 -0.65536000000000000000e5
-960 1 17 42 0.65536000000000000000e5
-960 1 17 48 0.32768000000000000000e5
-960 1 18 49 0.32768000000000000000e5
-960 2 9 23 -0.32768000000000000000e5
-960 2 14 28 0.32768000000000000000e5
-960 3 5 34 -0.32768000000000000000e5
-960 3 13 42 0.32768000000000000000e5
-960 3 14 27 -0.32768000000000000000e5
-960 3 14 43 0.32768000000000000000e5
-960 3 16 29 0.65536000000000000000e5
-961 1 14 45 -0.65536000000000000000e5
-961 1 17 43 0.65536000000000000000e5
-962 1 3 18 -0.16384000000000000000e5
-962 1 4 19 0.32768000000000000000e5
-962 1 5 36 0.32768000000000000000e5
-962 1 12 43 0.16384000000000000000e5
-962 1 13 44 -0.32768000000000000000e5
-962 1 14 45 -0.32768000000000000000e5
-962 1 17 32 -0.65536000000000000000e5
-962 1 17 44 0.65536000000000000000e5
-962 3 3 16 -0.16384000000000000000e5
-962 3 4 17 -0.16384000000000000000e5
-962 3 14 27 0.16384000000000000000e5
-962 3 16 29 0.32768000000000000000e5
-962 4 2 14 -0.16384000000000000000e5
-962 4 11 23 0.32768000000000000000e5
-963 1 13 20 -0.13107200000000000000e6
-963 1 17 32 0.65536000000000000000e5
-963 1 17 45 0.65536000000000000000e5
-963 1 20 27 0.65536000000000000000e5
-963 2 11 25 0.65536000000000000000e5
-963 3 8 21 0.13107200000000000000e6
-963 3 18 31 0.65536000000000000000e5
-964 1 6 21 -0.32768000000000000000e5
-964 1 13 20 -0.65536000000000000000e5
-964 1 17 46 0.65536000000000000000e5
-964 1 20 27 0.32768000000000000000e5
-964 2 9 15 -0.32768000000000000000e5
-964 2 11 25 0.32768000000000000000e5
-964 3 7 20 0.32768000000000000000e5
-964 3 14 19 0.65536000000000000000e5
-964 3 19 32 0.65536000000000000000e5
-964 4 10 14 0.32768000000000000000e5
-965 1 12 43 -0.65536000000000000000e5
-965 1 17 47 0.65536000000000000000e5
-965 3 22 35 0.65536000000000000000e5
-966 1 17 49 0.65536000000000000000e5
-966 1 34 49 -0.65536000000000000000e5
-966 3 18 47 -0.65536000000000000000e5
-967 1 4 35 -0.32768000000000000000e5
-967 1 12 43 -0.32768000000000000000e5
-967 1 17 50 0.65536000000000000000e5
-967 1 34 49 -0.32768000000000000000e5
-967 2 9 23 -0.32768000000000000000e5
-967 3 5 34 -0.32768000000000000000e5
-967 3 13 42 0.32768000000000000000e5
-967 3 14 27 -0.32768000000000000000e5
-967 3 16 29 0.65536000000000000000e5
-967 3 18 47 -0.32768000000000000000e5
-967 3 22 35 0.32768000000000000000e5
-967 4 14 26 0.32768000000000000000e5
-968 1 14 45 -0.13107200000000000000e6
-968 1 17 48 0.32768000000000000000e5
-968 1 17 51 0.65536000000000000000e5
-968 1 18 49 0.32768000000000000000e5
-968 1 34 49 0.32768000000000000000e5
-968 2 14 28 0.32768000000000000000e5
-968 3 14 43 0.32768000000000000000e5
-968 3 15 44 -0.65536000000000000000e5
-968 3 16 45 0.13107200000000000000e6
-968 3 18 47 0.32768000000000000000e5
-968 3 22 35 -0.32768000000000000000e5
-968 4 14 26 -0.32768000000000000000e5
-968 4 15 27 -0.65536000000000000000e5
-969 1 13 20 -0.13107200000000000000e6
-969 1 17 32 0.65536000000000000000e5
-969 1 17 52 0.65536000000000000000e5
-969 1 20 27 0.65536000000000000000e5
-969 2 11 25 0.65536000000000000000e5
-969 3 8 21 0.13107200000000000000e6
-969 3 16 45 0.65536000000000000000e5
-969 3 18 31 0.65536000000000000000e5
-970 1 6 53 0.81920000000000000000e4
-970 1 17 48 -0.65536000000000000000e5
-970 1 17 53 0.65536000000000000000e5
-970 1 25 40 -0.81920000000000000000e4
-970 2 4 34 0.16384000000000000000e5
-970 2 21 35 -0.16384000000000000000e5
-970 3 5 50 0.16384000000000000000e5
-970 3 24 37 0.81920000000000000000e4
-970 3 27 40 0.32768000000000000000e5
-970 3 28 41 0.32768000000000000000e5
-970 3 29 42 0.32768000000000000000e5
-970 4 4 32 -0.81920000000000000000e4
-970 4 7 35 -0.16384000000000000000e5
-970 4 16 28 0.81920000000000000000e4
-970 4 23 27 0.32768000000000000000e5
-971 1 17 54 0.65536000000000000000e5
-971 1 34 49 -0.65536000000000000000e5
-972 1 14 45 -0.13107200000000000000e6
-972 1 17 48 0.32768000000000000000e5
-972 1 17 55 0.65536000000000000000e5
-972 1 18 49 0.32768000000000000000e5
-972 1 34 49 0.32768000000000000000e5
-972 2 14 28 0.32768000000000000000e5
-972 3 14 43 0.32768000000000000000e5
-972 3 15 44 -0.65536000000000000000e5
-972 3 16 45 0.13107200000000000000e6
-972 3 18 47 0.32768000000000000000e5
-972 3 19 48 0.65536000000000000000e5
-972 3 22 35 -0.32768000000000000000e5
-972 4 14 26 -0.32768000000000000000e5
-972 4 15 27 -0.65536000000000000000e5
-973 1 17 56 0.65536000000000000000e5
-973 1 44 51 -0.65536000000000000000e5
-974 1 3 18 -0.40960000000000000000e4
-974 1 4 19 0.81920000000000000000e4
-974 1 5 36 0.81920000000000000000e4
-974 1 12 43 0.40960000000000000000e4
-974 1 13 44 -0.81920000000000000000e4
-974 1 14 21 -0.65536000000000000000e5
-974 1 14 45 -0.81920000000000000000e4
-974 1 18 18 0.65536000000000000000e5
-974 1 21 44 0.65536000000000000000e5
-974 1 33 36 -0.32768000000000000000e5
-974 2 11 25 0.16384000000000000000e5
-974 2 15 29 -0.16384000000000000000e5
-974 3 3 16 -0.40960000000000000000e4
-974 3 4 17 -0.40960000000000000000e4
-974 3 7 36 0.16384000000000000000e5
-974 3 8 21 0.32768000000000000000e5
-974 3 14 19 0.32768000000000000000e5
-974 3 14 27 0.40960000000000000000e4
-974 3 16 29 0.81920000000000000000e4
-974 3 18 31 0.16384000000000000000e5
-974 3 19 32 0.32768000000000000000e5
-974 4 2 14 -0.40960000000000000000e4
-974 4 11 15 0.32768000000000000000e5
-974 4 11 23 0.81920000000000000000e4
-974 4 13 25 0.32768000000000000000e5
-975 1 14 21 -0.65536000000000000000e5
-975 1 18 19 0.65536000000000000000e5
-976 1 18 20 0.65536000000000000000e5
-976 1 20 35 -0.65536000000000000000e5
-976 3 18 19 -0.65536000000000000000e5
-977 1 3 34 -0.65536000000000000000e5
-977 1 18 22 0.65536000000000000000e5
-978 1 12 43 -0.65536000000000000000e5
-978 1 18 23 0.65536000000000000000e5
-978 3 14 27 -0.65536000000000000000e5
-979 1 4 35 -0.65536000000000000000e5
-979 1 18 24 0.65536000000000000000e5
-980 1 14 45 -0.13107200000000000000e6
-980 1 17 48 0.65536000000000000000e5
-980 1 18 25 0.65536000000000000000e5
-980 1 18 49 0.65536000000000000000e5
-980 2 14 28 0.65536000000000000000e5
-980 3 5 34 -0.65536000000000000000e5
-980 3 13 42 0.65536000000000000000e5
-980 3 14 43 0.65536000000000000000e5
-981 1 15 30 -0.65536000000000000000e5
-981 1 18 26 0.65536000000000000000e5
-982 1 3 18 0.32768000000000000000e5
-982 1 4 19 -0.65536000000000000000e5
-982 1 12 43 -0.32768000000000000000e5
-982 1 18 27 0.65536000000000000000e5
-982 3 3 16 0.32768000000000000000e5
-982 3 4 17 0.32768000000000000000e5
-982 3 14 27 -0.32768000000000000000e5
-982 4 2 14 0.32768000000000000000e5
-983 1 4 35 -0.32768000000000000000e5
-983 1 12 43 -0.32768000000000000000e5
-983 1 14 45 -0.65536000000000000000e5
-983 1 17 48 0.32768000000000000000e5
-983 1 18 28 0.65536000000000000000e5
-983 1 18 49 0.32768000000000000000e5
-983 2 9 23 -0.32768000000000000000e5
-983 2 14 28 0.32768000000000000000e5
-983 3 5 34 -0.32768000000000000000e5
-983 3 13 42 0.32768000000000000000e5
-983 3 14 27 -0.32768000000000000000e5
-983 3 14 43 0.32768000000000000000e5
-984 1 5 36 -0.65536000000000000000e5
-984 1 18 29 0.65536000000000000000e5
-985 1 11 18 -0.65536000000000000000e5
-985 1 18 30 0.65536000000000000000e5
-985 3 6 19 0.65536000000000000000e5
-986 1 17 32 -0.65536000000000000000e5
-986 1 18 31 0.65536000000000000000e5
-987 1 13 20 -0.13107200000000000000e6
-987 1 17 32 0.65536000000000000000e5
-987 1 18 32 0.65536000000000000000e5
-987 1 20 27 0.65536000000000000000e5
-987 2 11 25 0.65536000000000000000e5
-987 3 8 21 0.13107200000000000000e6
-988 1 6 21 -0.32768000000000000000e5
-988 1 13 20 -0.65536000000000000000e5
-988 1 18 34 0.65536000000000000000e5
-988 1 20 27 0.32768000000000000000e5
-988 2 9 15 -0.32768000000000000000e5
-988 2 11 25 0.32768000000000000000e5
-988 3 7 20 0.32768000000000000000e5
-988 3 14 19 0.65536000000000000000e5
-988 4 10 14 0.32768000000000000000e5
-989 1 3 18 -0.81920000000000000000e4
-989 1 4 19 0.16384000000000000000e5
-989 1 5 36 0.16384000000000000000e5
-989 1 12 43 0.81920000000000000000e4
-989 1 13 44 -0.16384000000000000000e5
-989 1 14 21 -0.13107200000000000000e6
-989 1 14 45 -0.16384000000000000000e5
-989 1 18 35 0.65536000000000000000e5
-989 1 21 44 0.13107200000000000000e6
-989 1 33 36 -0.65536000000000000000e5
-989 2 11 25 0.32768000000000000000e5
-989 2 15 29 -0.32768000000000000000e5
-989 3 3 16 -0.81920000000000000000e4
-989 3 4 17 -0.81920000000000000000e4
-989 3 7 36 0.32768000000000000000e5
-989 3 8 21 0.65536000000000000000e5
-989 3 14 27 0.81920000000000000000e4
-989 3 15 20 -0.65536000000000000000e5
-989 3 16 29 0.16384000000000000000e5
-989 3 18 19 0.13107200000000000000e6
-989 3 18 31 0.32768000000000000000e5
-989 3 19 32 0.65536000000000000000e5
-989 4 2 14 -0.81920000000000000000e4
-989 4 11 15 0.65536000000000000000e5
-989 4 11 23 0.16384000000000000000e5
-989 4 13 25 0.65536000000000000000e5
-989 4 14 14 -0.13107200000000000000e6
-990 1 18 36 0.65536000000000000000e5
-990 1 20 35 -0.65536000000000000000e5
-991 1 12 43 -0.65536000000000000000e5
-991 1 18 37 0.65536000000000000000e5
-992 1 17 48 -0.65536000000000000000e5
-992 1 18 38 0.65536000000000000000e5
-992 3 13 42 -0.65536000000000000000e5
-993 1 14 45 -0.13107200000000000000e6
-993 1 17 48 0.65536000000000000000e5
-993 1 18 39 0.65536000000000000000e5
-993 1 18 49 0.65536000000000000000e5
-993 2 14 28 0.65536000000000000000e5
-993 3 13 42 0.65536000000000000000e5
-993 3 14 43 0.65536000000000000000e5
-994 1 18 40 0.65536000000000000000e5
-994 1 18 49 -0.65536000000000000000e5
-994 3 14 43 -0.65536000000000000000e5
-995 1 4 35 -0.32768000000000000000e5
-995 1 12 43 -0.32768000000000000000e5
-995 1 14 45 -0.65536000000000000000e5
-995 1 17 48 0.32768000000000000000e5
-995 1 18 41 0.65536000000000000000e5
-995 1 18 49 0.32768000000000000000e5
-995 2 9 23 -0.32768000000000000000e5
-995 2 14 28 0.32768000000000000000e5
-995 3 5 34 -0.32768000000000000000e5
-995 3 13 42 0.32768000000000000000e5
-995 3 14 27 -0.32768000000000000000e5
-995 3 14 43 0.32768000000000000000e5
-995 3 16 29 0.65536000000000000000e5
-996 1 14 45 -0.65536000000000000000e5
-996 1 18 42 0.65536000000000000000e5
-997 1 11 18 -0.65536000000000000000e5
-997 1 18 43 0.65536000000000000000e5
-997 3 6 19 0.65536000000000000000e5
-997 3 17 30 0.65536000000000000000e5
-998 1 13 20 -0.13107200000000000000e6
-998 1 17 32 0.65536000000000000000e5
-998 1 18 44 0.65536000000000000000e5
-998 1 20 27 0.65536000000000000000e5
-998 2 11 25 0.65536000000000000000e5
-998 3 8 21 0.13107200000000000000e6
-998 3 18 31 0.65536000000000000000e5
-999 1 15 46 -0.65536000000000000000e5
-999 1 18 45 0.65536000000000000000e5
-1000 1 18 46 0.65536000000000000000e5
-1000 1 33 36 -0.65536000000000000000e5
-1001 1 17 48 -0.65536000000000000000e5
-1001 1 18 47 0.65536000000000000000e5
-1002 1 18 48 0.65536000000000000000e5
-1002 1 34 49 -0.65536000000000000000e5
-1002 3 18 47 -0.65536000000000000000e5
-1003 1 14 45 -0.13107200000000000000e6
-1003 1 17 48 0.32768000000000000000e5
-1003 1 18 49 0.32768000000000000000e5
-1003 1 18 50 0.65536000000000000000e5
-1003 1 34 49 0.32768000000000000000e5
-1003 2 14 28 0.32768000000000000000e5
-1003 3 14 43 0.32768000000000000000e5
-1003 3 15 44 -0.65536000000000000000e5
-1003 3 16 45 0.13107200000000000000e6
-1003 3 18 47 0.32768000000000000000e5
-1003 3 22 35 -0.32768000000000000000e5
-1003 4 14 26 -0.32768000000000000000e5
-1003 4 15 27 -0.65536000000000000000e5
-1004 1 11 18 -0.65536000000000000000e5
-1004 1 18 51 0.65536000000000000000e5
-1004 3 6 19 0.65536000000000000000e5
-1004 3 15 44 0.65536000000000000000e5
-1004 3 17 30 0.65536000000000000000e5
-1005 1 18 52 0.65536000000000000000e5
-1005 1 20 51 -0.65536000000000000000e5
-1006 1 18 53 0.65536000000000000000e5
-1006 1 34 49 -0.65536000000000000000e5
-1007 1 18 49 -0.65536000000000000000e5
-1007 1 18 54 0.65536000000000000000e5
-1007 3 14 51 0.65536000000000000000e5
-1008 1 11 18 -0.65536000000000000000e5
-1008 1 18 55 0.65536000000000000000e5
-1008 3 6 19 0.65536000000000000000e5
-1008 3 15 44 0.65536000000000000000e5
-1008 3 17 30 0.65536000000000000000e5
-1008 3 32 45 0.65536000000000000000e5
-1009 1 18 49 -0.65536000000000000000e5
-1009 1 18 56 0.65536000000000000000e5
-1009 3 14 51 0.65536000000000000000e5
-1009 3 35 48 0.65536000000000000000e5
-1010 1 14 21 -0.16384000000000000000e5
-1010 1 16 19 -0.16384000000000000000e5
-1010 1 19 19 0.65536000000000000000e5
-1010 1 19 34 -0.16384000000000000000e5
-1010 2 13 15 -0.16384000000000000000e5
-1010 3 12 21 -0.16384000000000000000e5
-1011 1 14 21 -0.32768000000000000000e5
-1011 1 19 20 0.65536000000000000000e5
-1011 1 19 34 -0.32768000000000000000e5
-1011 1 20 35 -0.32768000000000000000e5
-1011 2 15 25 -0.32768000000000000000e5
-1011 3 8 21 0.16384000000000000000e5
-1011 3 15 20 -0.16384000000000000000e5
-1011 3 16 21 -0.65536000000000000000e5
-1011 3 18 19 0.32768000000000000000e5
-1011 4 11 15 0.16384000000000000000e5
-1011 4 14 14 -0.32768000000000000000e5
-1012 1 14 21 -0.32768000000000000000e5
-1012 1 16 19 -0.16384000000000000000e5
-1012 1 18 21 -0.32768000000000000000e5
-1012 1 19 21 0.65536000000000000000e5
-1012 1 19 34 -0.32768000000000000000e5
-1012 1 20 35 -0.16384000000000000000e5
-1012 2 13 15 -0.16384000000000000000e5
-1012 2 15 15 -0.65536000000000000000e5
-1012 2 15 25 -0.16384000000000000000e5
-1012 3 8 21 0.81920000000000000000e4
-1012 3 12 21 -0.16384000000000000000e5
-1012 3 15 20 -0.81920000000000000000e4
-1012 3 16 21 -0.32768000000000000000e5
-1012 3 18 19 0.16384000000000000000e5
-1012 4 11 15 0.81920000000000000000e4
-1012 4 14 14 -0.16384000000000000000e5
-1013 1 4 35 -0.32768000000000000000e5
-1013 1 12 43 -0.32768000000000000000e5
-1013 1 14 45 -0.65536000000000000000e5
-1013 1 16 31 -0.13107200000000000000e6
-1013 1 17 48 0.32768000000000000000e5
-1013 1 18 49 0.32768000000000000000e5
-1013 1 19 22 0.65536000000000000000e5
-1013 1 20 27 0.13107200000000000000e6
-1013 2 7 13 0.65536000000000000000e5
-1013 2 9 23 -0.32768000000000000000e5
-1013 2 10 24 -0.65536000000000000000e5
-1013 2 14 28 0.32768000000000000000e5
-1013 3 5 34 -0.32768000000000000000e5
-1013 3 13 42 0.32768000000000000000e5
-1013 3 14 27 -0.32768000000000000000e5
-1013 3 14 43 0.32768000000000000000e5
-1013 4 10 10 -0.13107200000000000000e6
-1014 1 3 18 -0.32768000000000000000e5
-1014 1 4 19 0.65536000000000000000e5
-1014 1 4 35 0.32768000000000000000e5
-1014 1 12 43 0.65536000000000000000e5
-1014 1 14 45 0.65536000000000000000e5
-1014 1 17 48 -0.32768000000000000000e5
-1014 1 18 49 -0.32768000000000000000e5
-1014 1 19 23 0.65536000000000000000e5
-1014 1 20 27 -0.13107200000000000000e6
-1014 2 9 23 0.32768000000000000000e5
-1014 2 10 24 0.65536000000000000000e5
-1014 2 14 28 -0.32768000000000000000e5
-1014 3 3 16 -0.32768000000000000000e5
-1014 3 4 17 -0.32768000000000000000e5
-1014 3 5 34 0.32768000000000000000e5
-1014 3 13 42 -0.32768000000000000000e5
-1014 3 14 27 0.65536000000000000000e5
-1014 3 14 43 -0.32768000000000000000e5
-1014 4 2 14 -0.32768000000000000000e5
-1015 1 3 18 0.32768000000000000000e5
-1015 1 4 19 -0.65536000000000000000e5
-1015 1 12 43 -0.32768000000000000000e5
-1015 1 19 24 0.65536000000000000000e5
-1015 3 3 16 0.32768000000000000000e5
-1015 3 4 17 0.32768000000000000000e5
-1015 3 14 27 -0.32768000000000000000e5
-1015 4 2 14 0.32768000000000000000e5
-1016 1 4 35 -0.32768000000000000000e5
-1016 1 12 43 -0.32768000000000000000e5
-1016 1 14 45 -0.65536000000000000000e5
-1016 1 17 48 0.32768000000000000000e5
-1016 1 18 49 0.32768000000000000000e5
-1016 1 19 25 0.65536000000000000000e5
-1016 2 9 23 -0.32768000000000000000e5
-1016 2 14 28 0.32768000000000000000e5
-1016 3 5 34 -0.32768000000000000000e5
-1016 3 13 42 0.32768000000000000000e5
-1016 3 14 27 -0.32768000000000000000e5
-1016 3 14 43 0.32768000000000000000e5
-1017 1 5 36 -0.65536000000000000000e5
-1017 1 19 26 0.65536000000000000000e5
-1018 1 16 31 -0.65536000000000000000e5
-1018 1 19 27 0.65536000000000000000e5
-1019 1 19 28 0.65536000000000000000e5
-1019 1 20 27 -0.65536000000000000000e5
-1020 1 17 32 -0.65536000000000000000e5
-1020 1 19 29 0.65536000000000000000e5
-1021 1 13 20 -0.13107200000000000000e6
-1021 1 17 32 0.65536000000000000000e5
-1021 1 19 30 0.65536000000000000000e5
-1021 1 20 27 0.65536000000000000000e5
-1021 2 11 25 0.65536000000000000000e5
-1021 3 8 21 0.13107200000000000000e6
-1022 1 2 17 -0.16384000000000000000e5
-1022 1 3 18 -0.16384000000000000000e5
-1022 1 3 34 -0.81920000000000000000e4
-1022 1 4 19 -0.16384000000000000000e5
-1022 1 5 20 -0.16384000000000000000e5
-1022 1 5 36 0.16384000000000000000e5
-1022 1 10 17 -0.16384000000000000000e5
-1022 1 12 43 0.81920000000000000000e4
-1022 1 16 23 0.81920000000000000000e4
-1022 1 16 31 -0.32768000000000000000e5
-1022 1 17 32 -0.32768000000000000000e5
-1022 1 19 31 0.65536000000000000000e5
-1022 2 6 12 -0.81920000000000000000e4
-1022 2 10 24 -0.16384000000000000000e5
-1022 2 11 13 -0.32768000000000000000e5
-1022 3 3 16 -0.24576000000000000000e5
-1022 3 4 17 -0.81920000000000000000e4
-1022 3 7 12 -0.81920000000000000000e4
-1022 3 7 20 -0.32768000000000000000e5
-1022 3 8 21 -0.65536000000000000000e5
-1022 3 12 21 0.13107200000000000000e6
-1022 3 14 19 -0.65536000000000000000e5
-1022 3 14 27 0.81920000000000000000e4
-1022 4 1 13 -0.81920000000000000000e4
-1022 4 2 14 -0.81920000000000000000e4
-1022 4 3 15 -0.16384000000000000000e5
-1022 4 10 10 -0.32768000000000000000e5
-1022 4 13 13 -0.13107200000000000000e6
-1023 1 13 20 -0.65536000000000000000e5
-1023 1 19 32 0.65536000000000000000e5
-1023 3 8 21 0.65536000000000000000e5
-1024 1 6 21 -0.32768000000000000000e5
-1024 1 13 20 -0.65536000000000000000e5
-1024 1 19 33 0.65536000000000000000e5
-1024 1 20 27 0.32768000000000000000e5
-1024 2 9 15 -0.32768000000000000000e5
-1024 2 11 25 0.32768000000000000000e5
-1024 3 7 20 0.32768000000000000000e5
-1024 3 14 19 0.65536000000000000000e5
-1024 4 10 14 0.32768000000000000000e5
-1025 1 14 21 -0.65536000000000000000e5
-1025 1 19 35 0.65536000000000000000e5
-1025 3 8 21 0.32768000000000000000e5
-1025 3 15 20 -0.32768000000000000000e5
-1025 3 18 19 0.65536000000000000000e5
-1025 4 11 15 0.32768000000000000000e5
-1025 4 14 14 -0.65536000000000000000e5
-1026 1 14 21 -0.32768000000000000000e5
-1026 1 19 34 -0.32768000000000000000e5
-1026 1 19 36 0.65536000000000000000e5
-1026 1 20 35 -0.32768000000000000000e5
-1026 2 15 25 -0.32768000000000000000e5
-1026 3 8 21 0.16384000000000000000e5
-1026 3 15 20 -0.16384000000000000000e5
-1026 3 18 19 0.32768000000000000000e5
-1026 4 11 15 0.16384000000000000000e5
-1026 4 14 14 -0.32768000000000000000e5
-1027 1 19 37 0.65536000000000000000e5
-1027 1 27 34 -0.65536000000000000000e5
-1028 1 13 44 -0.65536000000000000000e5
-1028 1 19 38 0.65536000000000000000e5
-1029 1 4 35 -0.32768000000000000000e5
-1029 1 12 43 -0.32768000000000000000e5
-1029 1 14 45 -0.65536000000000000000e5
-1029 1 17 48 0.32768000000000000000e5
-1029 1 18 49 0.32768000000000000000e5
-1029 1 19 39 0.65536000000000000000e5
-1029 2 9 23 -0.32768000000000000000e5
-1029 2 14 28 0.32768000000000000000e5
-1029 3 5 34 -0.32768000000000000000e5
-1029 3 13 42 0.32768000000000000000e5
-1029 3 14 27 -0.32768000000000000000e5
-1029 3 14 43 0.32768000000000000000e5
-1029 3 16 29 0.65536000000000000000e5
-1030 1 14 45 -0.65536000000000000000e5
-1030 1 19 40 0.65536000000000000000e5
-1031 1 19 41 0.65536000000000000000e5
-1031 1 20 27 -0.65536000000000000000e5
-1031 3 7 36 0.65536000000000000000e5
-1032 1 3 18 -0.16384000000000000000e5
-1032 1 4 19 0.32768000000000000000e5
-1032 1 5 36 0.32768000000000000000e5
-1032 1 12 43 0.16384000000000000000e5
-1032 1 13 44 -0.32768000000000000000e5
-1032 1 14 45 -0.32768000000000000000e5
-1032 1 17 32 -0.65536000000000000000e5
-1032 1 19 42 0.65536000000000000000e5
-1032 3 3 16 -0.16384000000000000000e5
-1032 3 4 17 -0.16384000000000000000e5
-1032 3 14 27 0.16384000000000000000e5
-1032 3 16 29 0.32768000000000000000e5
-1032 4 2 14 -0.16384000000000000000e5
-1032 4 11 23 0.32768000000000000000e5
-1033 1 13 20 -0.13107200000000000000e6
-1033 1 17 32 0.65536000000000000000e5
-1033 1 19 43 0.65536000000000000000e5
-1033 1 20 27 0.65536000000000000000e5
-1033 2 11 25 0.65536000000000000000e5
-1033 3 8 21 0.13107200000000000000e6
-1033 3 18 31 0.65536000000000000000e5
-1034 1 3 18 -0.81920000000000000000e4
-1034 1 4 19 0.16384000000000000000e5
-1034 1 5 36 0.16384000000000000000e5
-1034 1 12 43 0.81920000000000000000e4
-1034 1 13 20 -0.65536000000000000000e5
-1034 1 13 44 -0.16384000000000000000e5
-1034 1 14 45 -0.16384000000000000000e5
-1034 1 19 44 0.65536000000000000000e5
-1034 2 11 25 0.32768000000000000000e5
-1034 2 15 29 -0.32768000000000000000e5
-1034 3 3 16 -0.81920000000000000000e4
-1034 3 4 17 -0.81920000000000000000e4
-1034 3 7 36 0.32768000000000000000e5
-1034 3 8 21 0.65536000000000000000e5
-1034 3 14 27 0.81920000000000000000e4
-1034 3 16 29 0.16384000000000000000e5
-1034 3 18 31 0.32768000000000000000e5
-1034 4 2 14 -0.81920000000000000000e4
-1034 4 11 23 0.16384000000000000000e5
-1035 1 6 21 -0.32768000000000000000e5
-1035 1 13 20 -0.65536000000000000000e5
-1035 1 19 45 0.65536000000000000000e5
-1035 1 20 27 0.32768000000000000000e5
-1035 2 9 15 -0.32768000000000000000e5
-1035 2 11 25 0.32768000000000000000e5
-1035 3 7 20 0.32768000000000000000e5
-1035 3 14 19 0.65536000000000000000e5
-1035 3 19 32 0.65536000000000000000e5
-1035 4 10 14 0.32768000000000000000e5
-1036 1 19 46 0.65536000000000000000e5
-1036 1 21 44 -0.65536000000000000000e5
-1037 1 19 47 0.65536000000000000000e5
-1037 1 34 41 -0.65536000000000000000e5
-1038 1 4 35 -0.32768000000000000000e5
-1038 1 12 43 -0.32768000000000000000e5
-1038 1 19 48 0.65536000000000000000e5
-1038 1 34 49 -0.32768000000000000000e5
-1038 2 9 23 -0.32768000000000000000e5
-1038 3 5 34 -0.32768000000000000000e5
-1038 3 13 42 0.32768000000000000000e5
-1038 3 14 27 -0.32768000000000000000e5
-1038 3 16 29 0.65536000000000000000e5
-1038 3 18 47 -0.32768000000000000000e5
-1038 3 22 35 0.32768000000000000000e5
-1038 4 14 26 0.32768000000000000000e5
-1039 1 14 45 -0.13107200000000000000e6
-1039 1 17 48 0.32768000000000000000e5
-1039 1 18 49 0.32768000000000000000e5
-1039 1 19 49 0.65536000000000000000e5
-1039 1 34 49 0.32768000000000000000e5
-1039 2 14 28 0.32768000000000000000e5
-1039 3 14 43 0.32768000000000000000e5
-1039 3 15 44 -0.65536000000000000000e5
-1039 3 16 45 0.13107200000000000000e6
-1039 3 18 47 0.32768000000000000000e5
-1039 3 22 35 -0.32768000000000000000e5
-1039 4 14 26 -0.32768000000000000000e5
-1039 4 15 27 -0.65536000000000000000e5
-1040 1 13 20 -0.13107200000000000000e6
-1040 1 17 32 0.65536000000000000000e5
-1040 1 19 51 0.65536000000000000000e5
-1040 1 20 27 0.65536000000000000000e5
-1040 2 11 25 0.65536000000000000000e5
-1040 3 8 21 0.13107200000000000000e6
-1040 3 16 45 0.65536000000000000000e5
-1040 3 18 31 0.65536000000000000000e5
-1041 1 13 20 -0.65536000000000000000e5
-1041 1 17 32 0.32768000000000000000e5
-1041 1 19 50 -0.32768000000000000000e5
-1041 1 19 52 0.65536000000000000000e5
-1041 1 20 27 0.32768000000000000000e5
-1041 1 20 51 -0.32768000000000000000e5
-1041 2 11 25 0.32768000000000000000e5
-1041 2 25 31 -0.32768000000000000000e5
-1041 3 8 21 0.65536000000000000000e5
-1041 3 16 45 0.32768000000000000000e5
-1041 3 18 31 0.32768000000000000000e5
-1042 1 4 35 -0.32768000000000000000e5
-1042 1 12 43 -0.32768000000000000000e5
-1042 1 19 53 0.65536000000000000000e5
-1042 1 34 49 -0.32768000000000000000e5
-1042 2 9 23 -0.32768000000000000000e5
-1042 3 5 34 -0.32768000000000000000e5
-1042 3 13 42 0.32768000000000000000e5
-1042 3 14 27 -0.32768000000000000000e5
-1042 3 16 29 0.65536000000000000000e5
-1042 3 18 47 -0.32768000000000000000e5
-1042 3 22 35 0.32768000000000000000e5
-1042 3 31 44 0.65536000000000000000e5
-1042 4 14 26 0.32768000000000000000e5
-1043 1 14 45 -0.13107200000000000000e6
-1043 1 17 48 0.32768000000000000000e5
-1043 1 18 49 0.32768000000000000000e5
-1043 1 19 54 0.65536000000000000000e5
-1043 1 34 49 0.32768000000000000000e5
-1043 2 14 28 0.32768000000000000000e5
-1043 3 14 43 0.32768000000000000000e5
-1043 3 15 44 -0.65536000000000000000e5
-1043 3 16 45 0.13107200000000000000e6
-1043 3 18 47 0.32768000000000000000e5
-1043 3 19 48 0.65536000000000000000e5
-1043 3 22 35 -0.32768000000000000000e5
-1043 4 14 26 -0.32768000000000000000e5
-1043 4 15 27 -0.65536000000000000000e5
-1044 1 13 20 -0.13107200000000000000e6
-1044 1 17 32 0.65536000000000000000e5
-1044 1 19 55 0.65536000000000000000e5
-1044 1 20 27 0.65536000000000000000e5
-1044 2 11 25 0.65536000000000000000e5
-1044 3 8 21 0.13107200000000000000e6
-1044 3 16 45 0.65536000000000000000e5
-1044 3 18 31 0.65536000000000000000e5
-1044 3 36 41 0.65536000000000000000e5
-1045 1 14 45 -0.13107200000000000000e6
-1045 1 17 48 0.32768000000000000000e5
-1045 1 18 49 0.32768000000000000000e5
-1045 1 19 56 0.65536000000000000000e5
-1045 1 34 49 0.32768000000000000000e5
-1045 2 14 28 0.32768000000000000000e5
-1045 3 14 43 0.32768000000000000000e5
-1045 3 15 44 -0.65536000000000000000e5
-1045 3 16 45 0.13107200000000000000e6
-1045 3 18 47 0.32768000000000000000e5
-1045 3 19 48 0.65536000000000000000e5
-1045 3 22 35 -0.32768000000000000000e5
-1045 3 41 46 0.65536000000000000000e5
-1045 4 14 26 -0.32768000000000000000e5
-1045 4 15 27 -0.65536000000000000000e5
-1046 1 18 21 -0.32768000000000000000e5
-1046 1 20 20 0.65536000000000000000e5
-1047 1 3 18 -0.32768000000000000000e5
-1047 1 4 19 0.65536000000000000000e5
-1047 1 4 35 0.32768000000000000000e5
-1047 1 12 43 0.65536000000000000000e5
-1047 1 14 45 0.65536000000000000000e5
-1047 1 17 48 -0.32768000000000000000e5
-1047 1 18 49 -0.32768000000000000000e5
-1047 1 20 22 0.65536000000000000000e5
-1047 1 20 27 -0.13107200000000000000e6
-1047 2 9 23 0.32768000000000000000e5
-1047 2 10 24 0.65536000000000000000e5
-1047 2 14 28 -0.32768000000000000000e5
-1047 3 3 16 -0.32768000000000000000e5
-1047 3 4 17 -0.32768000000000000000e5
-1047 3 5 34 0.32768000000000000000e5
-1047 3 13 42 -0.32768000000000000000e5
-1047 3 14 27 0.65536000000000000000e5
-1047 3 14 43 -0.32768000000000000000e5
-1047 4 2 14 -0.32768000000000000000e5
-1048 1 3 18 0.32768000000000000000e5
-1048 1 4 19 -0.65536000000000000000e5
-1048 1 12 43 -0.32768000000000000000e5
-1048 1 20 23 0.65536000000000000000e5
-1048 3 3 16 0.32768000000000000000e5
-1048 3 4 17 0.32768000000000000000e5
-1048 3 14 27 -0.32768000000000000000e5
-1048 4 2 14 0.32768000000000000000e5
-1049 1 4 35 -0.32768000000000000000e5
-1049 1 12 43 -0.32768000000000000000e5
-1049 1 14 45 -0.65536000000000000000e5
-1049 1 17 48 0.32768000000000000000e5
-1049 1 18 49 0.32768000000000000000e5
-1049 1 20 24 0.65536000000000000000e5
-1049 2 9 23 -0.32768000000000000000e5
-1049 2 14 28 0.32768000000000000000e5
-1049 3 5 34 -0.32768000000000000000e5
-1049 3 13 42 0.32768000000000000000e5
-1049 3 14 27 -0.32768000000000000000e5
-1049 3 14 43 0.32768000000000000000e5
-1050 1 5 36 -0.65536000000000000000e5
-1050 1 20 25 0.65536000000000000000e5
-1051 1 11 18 -0.65536000000000000000e5
-1051 1 20 26 0.65536000000000000000e5
-1051 3 6 19 0.65536000000000000000e5
-1052 1 17 32 -0.65536000000000000000e5
-1052 1 20 28 0.65536000000000000000e5
-1053 1 13 20 -0.13107200000000000000e6
-1053 1 17 32 0.65536000000000000000e5
-1053 1 20 27 0.65536000000000000000e5
-1053 1 20 29 0.65536000000000000000e5
-1053 2 11 25 0.65536000000000000000e5
-1053 3 8 21 0.13107200000000000000e6
-1054 1 18 33 -0.65536000000000000000e5
-1054 1 20 30 0.65536000000000000000e5
-1055 1 13 20 -0.65536000000000000000e5
-1055 1 20 31 0.65536000000000000000e5
-1055 3 8 21 0.65536000000000000000e5
-1056 1 6 21 -0.32768000000000000000e5
-1056 1 13 20 -0.65536000000000000000e5
-1056 1 20 27 0.32768000000000000000e5
-1056 1 20 32 0.65536000000000000000e5
-1056 2 9 15 -0.32768000000000000000e5
-1056 2 11 25 0.32768000000000000000e5
-1056 3 7 20 0.32768000000000000000e5
-1056 3 14 19 0.65536000000000000000e5
-1056 4 10 14 0.32768000000000000000e5
-1057 1 3 18 -0.81920000000000000000e4
-1057 1 4 19 0.16384000000000000000e5
-1057 1 5 36 0.16384000000000000000e5
-1057 1 12 43 0.81920000000000000000e4
-1057 1 13 44 -0.16384000000000000000e5
-1057 1 14 21 -0.13107200000000000000e6
-1057 1 14 45 -0.16384000000000000000e5
-1057 1 20 33 0.65536000000000000000e5
-1057 1 21 44 0.13107200000000000000e6
-1057 1 33 36 -0.65536000000000000000e5
-1057 2 11 25 0.32768000000000000000e5
-1057 2 15 29 -0.32768000000000000000e5
-1057 3 3 16 -0.81920000000000000000e4
-1057 3 4 17 -0.81920000000000000000e4
-1057 3 7 36 0.32768000000000000000e5
-1057 3 8 21 0.65536000000000000000e5
-1057 3 14 27 0.81920000000000000000e4
-1057 3 15 20 -0.65536000000000000000e5
-1057 3 16 29 0.16384000000000000000e5
-1057 3 18 19 0.13107200000000000000e6
-1057 3 18 31 0.32768000000000000000e5
-1057 3 19 32 0.65536000000000000000e5
-1057 4 2 14 -0.81920000000000000000e4
-1057 4 11 15 0.65536000000000000000e5
-1057 4 11 23 0.16384000000000000000e5
-1057 4 13 25 0.65536000000000000000e5
-1057 4 14 14 -0.13107200000000000000e6
-1058 1 14 21 -0.65536000000000000000e5
-1058 1 20 34 0.65536000000000000000e5
-1058 3 8 21 0.32768000000000000000e5
-1058 3 15 20 -0.32768000000000000000e5
-1058 3 18 19 0.65536000000000000000e5
-1058 4 11 15 0.32768000000000000000e5
-1058 4 14 14 -0.65536000000000000000e5
-1059 1 18 21 -0.65536000000000000000e5
-1059 1 20 36 0.65536000000000000000e5
-1059 3 19 20 0.65536000000000000000e5
-1060 1 13 44 -0.65536000000000000000e5
-1060 1 20 37 0.65536000000000000000e5
-1061 1 4 35 -0.32768000000000000000e5
-1061 1 12 43 -0.32768000000000000000e5
-1061 1 14 45 -0.65536000000000000000e5
-1061 1 17 48 0.32768000000000000000e5
-1061 1 18 49 0.32768000000000000000e5
-1061 1 20 38 0.65536000000000000000e5
-1061 2 9 23 -0.32768000000000000000e5
-1061 2 14 28 0.32768000000000000000e5
-1061 3 5 34 -0.32768000000000000000e5
-1061 3 13 42 0.32768000000000000000e5
-1061 3 14 27 -0.32768000000000000000e5
-1061 3 14 43 0.32768000000000000000e5
-1061 3 16 29 0.65536000000000000000e5
-1062 1 14 45 -0.65536000000000000000e5
-1062 1 20 39 0.65536000000000000000e5
-1063 1 11 18 -0.65536000000000000000e5
-1063 1 20 40 0.65536000000000000000e5
-1063 3 6 19 0.65536000000000000000e5
-1063 3 17 30 0.65536000000000000000e5
-1064 1 3 18 -0.16384000000000000000e5
-1064 1 4 19 0.32768000000000000000e5
-1064 1 5 36 0.32768000000000000000e5
-1064 1 12 43 0.16384000000000000000e5
-1064 1 13 44 -0.32768000000000000000e5
-1064 1 14 45 -0.32768000000000000000e5
-1064 1 17 32 -0.65536000000000000000e5
-1064 1 20 41 0.65536000000000000000e5
-1064 3 3 16 -0.16384000000000000000e5
-1064 3 4 17 -0.16384000000000000000e5
-1064 3 14 27 0.16384000000000000000e5
-1064 3 16 29 0.32768000000000000000e5
-1064 4 2 14 -0.16384000000000000000e5
-1064 4 11 23 0.32768000000000000000e5
-1065 1 13 20 -0.13107200000000000000e6
-1065 1 17 32 0.65536000000000000000e5
-1065 1 20 27 0.65536000000000000000e5
-1065 1 20 42 0.65536000000000000000e5
-1065 2 11 25 0.65536000000000000000e5
-1065 3 8 21 0.13107200000000000000e6
-1065 3 18 31 0.65536000000000000000e5
-1066 1 15 46 -0.65536000000000000000e5
-1066 1 20 43 0.65536000000000000000e5
-1067 1 6 21 -0.32768000000000000000e5
-1067 1 13 20 -0.65536000000000000000e5
-1067 1 20 27 0.32768000000000000000e5
-1067 1 20 44 0.65536000000000000000e5
-1067 2 9 15 -0.32768000000000000000e5
-1067 2 11 25 0.32768000000000000000e5
-1067 3 7 20 0.32768000000000000000e5
-1067 3 14 19 0.65536000000000000000e5
-1067 3 19 32 0.65536000000000000000e5
-1067 4 10 14 0.32768000000000000000e5
-1068 1 20 45 0.65536000000000000000e5
-1068 1 33 36 -0.65536000000000000000e5
-1069 1 6 21 -0.16384000000000000000e5
-1069 1 17 32 -0.16384000000000000000e5
-1069 1 19 50 0.16384000000000000000e5
-1069 1 20 46 0.65536000000000000000e5
-1069 1 20 51 0.16384000000000000000e5
-1069 1 21 52 -0.65536000000000000000e5
-1069 2 9 15 -0.16384000000000000000e5
-1069 2 25 31 0.16384000000000000000e5
-1069 3 7 20 0.16384000000000000000e5
-1069 3 8 21 -0.32768000000000000000e5
-1069 3 14 19 0.32768000000000000000e5
-1069 3 16 45 -0.16384000000000000000e5
-1069 3 17 46 -0.32768000000000000000e5
-1069 3 18 31 -0.16384000000000000000e5
-1069 3 19 32 0.32768000000000000000e5
-1069 3 20 45 -0.32768000000000000000e5
-1069 4 10 14 0.16384000000000000000e5
-1069 4 25 25 -0.65536000000000000000e5
-1070 1 4 35 -0.32768000000000000000e5
-1070 1 12 43 -0.32768000000000000000e5
-1070 1 20 47 0.65536000000000000000e5
-1070 1 34 49 -0.32768000000000000000e5
-1070 2 9 23 -0.32768000000000000000e5
-1070 3 5 34 -0.32768000000000000000e5
-1070 3 13 42 0.32768000000000000000e5
-1070 3 14 27 -0.32768000000000000000e5
-1070 3 16 29 0.65536000000000000000e5
-1070 3 18 47 -0.32768000000000000000e5
-1070 3 22 35 0.32768000000000000000e5
-1070 4 14 26 0.32768000000000000000e5
-1071 1 14 45 -0.13107200000000000000e6
-1071 1 17 48 0.32768000000000000000e5
-1071 1 18 49 0.32768000000000000000e5
-1071 1 20 48 0.65536000000000000000e5
-1071 1 34 49 0.32768000000000000000e5
-1071 2 14 28 0.32768000000000000000e5
-1071 3 14 43 0.32768000000000000000e5
-1071 3 15 44 -0.65536000000000000000e5
-1071 3 16 45 0.13107200000000000000e6
-1071 3 18 47 0.32768000000000000000e5
-1071 3 22 35 -0.32768000000000000000e5
-1071 4 14 26 -0.32768000000000000000e5
-1071 4 15 27 -0.65536000000000000000e5
-1072 1 11 18 -0.65536000000000000000e5
-1072 1 20 49 0.65536000000000000000e5
-1072 3 6 19 0.65536000000000000000e5
-1072 3 15 44 0.65536000000000000000e5
-1072 3 17 30 0.65536000000000000000e5
-1073 1 13 20 -0.13107200000000000000e6
-1073 1 17 32 0.65536000000000000000e5
-1073 1 20 27 0.65536000000000000000e5
-1073 1 20 50 0.65536000000000000000e5
-1073 2 11 25 0.65536000000000000000e5
-1073 3 8 21 0.13107200000000000000e6
-1073 3 16 45 0.65536000000000000000e5
-1073 3 18 31 0.65536000000000000000e5
-1074 1 20 52 0.65536000000000000000e5
-1074 1 33 36 -0.65536000000000000000e5
-1074 3 17 46 0.65536000000000000000e5
-1075 1 14 45 -0.13107200000000000000e6
-1075 1 17 48 0.32768000000000000000e5
-1075 1 18 49 0.32768000000000000000e5
-1075 1 20 53 0.65536000000000000000e5
-1075 1 34 49 0.32768000000000000000e5
-1075 2 14 28 0.32768000000000000000e5
-1075 3 14 43 0.32768000000000000000e5
-1075 3 15 44 -0.65536000000000000000e5
-1075 3 16 45 0.13107200000000000000e6
-1075 3 18 47 0.32768000000000000000e5
-1075 3 19 48 0.65536000000000000000e5
-1075 3 22 35 -0.32768000000000000000e5
-1075 4 14 26 -0.32768000000000000000e5
-1075 4 15 27 -0.65536000000000000000e5
-1076 1 11 18 -0.65536000000000000000e5
-1076 1 20 54 0.65536000000000000000e5
-1076 3 6 19 0.65536000000000000000e5
-1076 3 15 44 0.65536000000000000000e5
-1076 3 17 30 0.65536000000000000000e5
-1076 3 32 45 0.65536000000000000000e5
-1077 1 20 55 0.65536000000000000000e5
-1077 1 36 51 -0.65536000000000000000e5
-1078 1 20 56 0.65536000000000000000e5
-1078 1 45 52 -0.65536000000000000000e5
-1079 1 16 31 -0.65536000000000000000e5
-1079 1 21 22 0.65536000000000000000e5
-1080 1 20 27 -0.65536000000000000000e5
-1080 1 21 23 0.65536000000000000000e5
-1081 1 17 32 -0.65536000000000000000e5
-1081 1 21 24 0.65536000000000000000e5
-1082 1 13 20 -0.13107200000000000000e6
-1082 1 17 32 0.65536000000000000000e5
-1082 1 20 27 0.65536000000000000000e5
-1082 1 21 25 0.65536000000000000000e5
-1082 2 11 25 0.65536000000000000000e5
-1082 3 8 21 0.13107200000000000000e6
-1083 1 18 33 -0.65536000000000000000e5
-1083 1 21 26 0.65536000000000000000e5
-1084 1 2 17 -0.16384000000000000000e5
-1084 1 3 18 -0.16384000000000000000e5
-1084 1 3 34 -0.81920000000000000000e4
-1084 1 4 19 -0.16384000000000000000e5
-1084 1 5 20 -0.16384000000000000000e5
-1084 1 5 36 0.16384000000000000000e5
-1084 1 10 17 -0.16384000000000000000e5
-1084 1 12 43 0.81920000000000000000e4
-1084 1 16 23 0.81920000000000000000e4
-1084 1 16 31 -0.32768000000000000000e5
-1084 1 17 32 -0.32768000000000000000e5
-1084 1 21 27 0.65536000000000000000e5
-1084 2 6 12 -0.81920000000000000000e4
-1084 2 10 24 -0.16384000000000000000e5
-1084 2 11 13 -0.32768000000000000000e5
-1084 3 3 16 -0.24576000000000000000e5
-1084 3 4 17 -0.81920000000000000000e4
-1084 3 7 12 -0.81920000000000000000e4
-1084 3 7 20 -0.32768000000000000000e5
-1084 3 8 21 -0.65536000000000000000e5
-1084 3 12 21 0.13107200000000000000e6
-1084 3 14 19 -0.65536000000000000000e5
-1084 3 14 27 0.81920000000000000000e4
-1084 4 1 13 -0.81920000000000000000e4
-1084 4 2 14 -0.81920000000000000000e4
-1084 4 3 15 -0.16384000000000000000e5
-1084 4 10 10 -0.32768000000000000000e5
-1084 4 13 13 -0.13107200000000000000e6
-1085 1 13 20 -0.65536000000000000000e5
-1085 1 21 28 0.65536000000000000000e5
-1085 3 8 21 0.65536000000000000000e5
-1086 1 6 21 -0.32768000000000000000e5
-1086 1 13 20 -0.65536000000000000000e5
-1086 1 20 27 0.32768000000000000000e5
-1086 1 21 29 0.65536000000000000000e5
-1086 2 9 15 -0.32768000000000000000e5
-1086 2 11 25 0.32768000000000000000e5
-1086 3 7 20 0.32768000000000000000e5
-1086 3 14 19 0.65536000000000000000e5
-1086 4 10 14 0.32768000000000000000e5
-1087 1 3 18 -0.81920000000000000000e4
-1087 1 4 19 0.16384000000000000000e5
-1087 1 5 36 0.16384000000000000000e5
-1087 1 12 43 0.81920000000000000000e4
-1087 1 13 44 -0.16384000000000000000e5
-1087 1 14 21 -0.13107200000000000000e6
-1087 1 14 45 -0.16384000000000000000e5
-1087 1 21 30 0.65536000000000000000e5
-1087 1 21 44 0.13107200000000000000e6
-1087 1 33 36 -0.65536000000000000000e5
-1087 2 11 25 0.32768000000000000000e5
-1087 2 15 29 -0.32768000000000000000e5
-1087 3 3 16 -0.81920000000000000000e4
-1087 3 4 17 -0.81920000000000000000e4
-1087 3 7 36 0.32768000000000000000e5
-1087 3 8 21 0.65536000000000000000e5
-1087 3 14 27 0.81920000000000000000e4
-1087 3 15 20 -0.65536000000000000000e5
-1087 3 16 29 0.16384000000000000000e5
-1087 3 18 19 0.13107200000000000000e6
-1087 3 18 31 0.32768000000000000000e5
-1087 3 19 32 0.65536000000000000000e5
-1087 4 2 14 -0.81920000000000000000e4
-1087 4 11 15 0.65536000000000000000e5
-1087 4 11 23 0.16384000000000000000e5
-1087 4 13 25 0.65536000000000000000e5
-1087 4 14 14 -0.13107200000000000000e6
-1088 1 19 34 -0.65536000000000000000e5
-1088 1 21 31 0.65536000000000000000e5
-1089 1 14 21 -0.65536000000000000000e5
-1089 1 21 32 0.65536000000000000000e5
-1089 3 8 21 0.32768000000000000000e5
-1089 3 15 20 -0.32768000000000000000e5
-1089 3 18 19 0.65536000000000000000e5
-1089 4 11 15 0.32768000000000000000e5
-1089 4 14 14 -0.65536000000000000000e5
-1090 1 20 35 -0.65536000000000000000e5
-1090 1 21 33 0.65536000000000000000e5
-1091 1 14 21 -0.32768000000000000000e5
-1091 1 19 34 -0.32768000000000000000e5
-1091 1 20 35 -0.32768000000000000000e5
-1091 1 21 34 0.65536000000000000000e5
-1091 2 15 25 -0.32768000000000000000e5
-1091 3 8 21 0.16384000000000000000e5
-1091 3 15 20 -0.16384000000000000000e5
-1091 3 18 19 0.32768000000000000000e5
-1091 4 11 15 0.16384000000000000000e5
-1091 4 14 14 -0.32768000000000000000e5
-1092 1 18 21 -0.65536000000000000000e5
-1092 1 21 35 0.65536000000000000000e5
-1092 3 19 20 0.65536000000000000000e5
-1093 1 20 27 -0.65536000000000000000e5
-1093 1 21 37 0.65536000000000000000e5
-1093 3 7 36 0.65536000000000000000e5
-1094 1 3 18 -0.16384000000000000000e5
-1094 1 4 19 0.32768000000000000000e5
-1094 1 5 36 0.32768000000000000000e5
-1094 1 12 43 0.16384000000000000000e5
-1094 1 13 44 -0.32768000000000000000e5
-1094 1 14 45 -0.32768000000000000000e5
-1094 1 17 32 -0.65536000000000000000e5
-1094 1 21 38 0.65536000000000000000e5
-1094 3 3 16 -0.16384000000000000000e5
-1094 3 4 17 -0.16384000000000000000e5
-1094 3 14 27 0.16384000000000000000e5
-1094 3 16 29 0.32768000000000000000e5
-1094 4 2 14 -0.16384000000000000000e5
-1094 4 11 23 0.32768000000000000000e5
-1095 1 13 20 -0.13107200000000000000e6
-1095 1 17 32 0.65536000000000000000e5
-1095 1 20 27 0.65536000000000000000e5
-1095 1 21 39 0.65536000000000000000e5
-1095 2 11 25 0.65536000000000000000e5
-1095 3 8 21 0.13107200000000000000e6
-1095 3 18 31 0.65536000000000000000e5
-1096 1 15 46 -0.65536000000000000000e5
-1096 1 21 40 0.65536000000000000000e5
-1097 1 3 18 -0.81920000000000000000e4
-1097 1 4 19 0.16384000000000000000e5
-1097 1 5 36 0.16384000000000000000e5
-1097 1 12 43 0.81920000000000000000e4
-1097 1 13 20 -0.65536000000000000000e5
-1097 1 13 44 -0.16384000000000000000e5
-1097 1 14 45 -0.16384000000000000000e5
-1097 1 21 41 0.65536000000000000000e5
-1097 2 11 25 0.32768000000000000000e5
-1097 2 15 29 -0.32768000000000000000e5
-1097 3 3 16 -0.81920000000000000000e4
-1097 3 4 17 -0.81920000000000000000e4
-1097 3 7 36 0.32768000000000000000e5
-1097 3 8 21 0.65536000000000000000e5
-1097 3 14 27 0.81920000000000000000e4
-1097 3 16 29 0.16384000000000000000e5
-1097 3 18 31 0.32768000000000000000e5
-1097 4 2 14 -0.81920000000000000000e4
-1097 4 11 23 0.16384000000000000000e5
-1098 1 6 21 -0.32768000000000000000e5
-1098 1 13 20 -0.65536000000000000000e5
-1098 1 20 27 0.32768000000000000000e5
-1098 1 21 42 0.65536000000000000000e5
-1098 2 9 15 -0.32768000000000000000e5
-1098 2 11 25 0.32768000000000000000e5
-1098 3 7 20 0.32768000000000000000e5
-1098 3 14 19 0.65536000000000000000e5
-1098 3 19 32 0.65536000000000000000e5
-1098 4 10 14 0.32768000000000000000e5
-1099 1 21 43 0.65536000000000000000e5
-1099 1 33 36 -0.65536000000000000000e5
-1100 1 6 21 -0.16384000000000000000e5
-1100 1 17 32 -0.16384000000000000000e5
-1100 1 19 50 0.16384000000000000000e5
-1100 1 20 51 0.16384000000000000000e5
-1100 1 21 45 0.65536000000000000000e5
-1100 1 21 52 -0.65536000000000000000e5
-1100 2 9 15 -0.16384000000000000000e5
-1100 2 25 31 0.16384000000000000000e5
-1100 3 7 20 0.16384000000000000000e5
-1100 3 8 21 -0.32768000000000000000e5
-1100 3 14 19 0.32768000000000000000e5
-1100 3 16 45 -0.16384000000000000000e5
-1100 3 17 46 -0.32768000000000000000e5
-1100 3 18 31 -0.16384000000000000000e5
-1100 3 19 32 0.32768000000000000000e5
-1100 3 20 45 -0.32768000000000000000e5
-1100 4 10 14 0.16384000000000000000e5
-1100 4 25 25 -0.65536000000000000000e5
-1101 1 18 21 -0.65536000000000000000e5
-1101 1 21 46 0.65536000000000000000e5
-1101 3 19 20 0.65536000000000000000e5
-1101 3 21 34 0.65536000000000000000e5
-1102 1 19 50 -0.65536000000000000000e5
-1102 1 21 47 0.65536000000000000000e5
-1103 1 13 20 -0.13107200000000000000e6
-1103 1 17 32 0.65536000000000000000e5
-1103 1 20 27 0.65536000000000000000e5
-1103 1 21 48 0.65536000000000000000e5
-1103 2 11 25 0.65536000000000000000e5
-1103 3 8 21 0.13107200000000000000e6
-1103 3 16 45 0.65536000000000000000e5
-1103 3 18 31 0.65536000000000000000e5
-1104 1 20 51 -0.65536000000000000000e5
-1104 1 21 49 0.65536000000000000000e5
-1105 1 13 20 -0.65536000000000000000e5
-1105 1 17 32 0.32768000000000000000e5
-1105 1 19 50 -0.32768000000000000000e5
-1105 1 20 27 0.32768000000000000000e5
-1105 1 20 51 -0.32768000000000000000e5
-1105 1 21 50 0.65536000000000000000e5
-1105 2 11 25 0.32768000000000000000e5
-1105 2 25 31 -0.32768000000000000000e5
-1105 3 8 21 0.65536000000000000000e5
-1105 3 16 45 0.32768000000000000000e5
-1105 3 18 31 0.32768000000000000000e5
-1106 1 21 51 0.65536000000000000000e5
-1106 1 33 36 -0.65536000000000000000e5
-1106 3 17 46 0.65536000000000000000e5
-1107 1 13 20 -0.13107200000000000000e6
-1107 1 17 32 0.65536000000000000000e5
-1107 1 20 27 0.65536000000000000000e5
-1107 1 21 53 0.65536000000000000000e5
-1107 2 11 25 0.65536000000000000000e5
-1107 3 8 21 0.13107200000000000000e6
-1107 3 16 45 0.65536000000000000000e5
-1107 3 18 31 0.65536000000000000000e5
-1107 3 36 41 0.65536000000000000000e5
-1108 1 21 54 0.65536000000000000000e5
-1108 1 36 51 -0.65536000000000000000e5
-1109 1 21 55 0.65536000000000000000e5
-1109 1 33 36 -0.65536000000000000000e5
-1109 3 17 46 0.65536000000000000000e5
-1109 3 21 50 0.65536000000000000000e5
-1110 1 11 18 0.32768000000000000000e5
-1110 1 21 56 0.65536000000000000000e5
-1110 1 36 51 -0.65536000000000000000e5
-1110 1 45 52 -0.32768000000000000000e5
-1110 3 6 19 -0.32768000000000000000e5
-1110 3 15 44 -0.32768000000000000000e5
-1110 3 17 30 -0.32768000000000000000e5
-1110 3 32 45 -0.32768000000000000000e5
-1110 3 36 49 0.32768000000000000000e5
-1110 3 41 46 0.32768000000000000000e5
-1110 4 15 35 0.32768000000000000000e5
-1111 1 1 8 0.65536000000000000000e5
-1111 1 1 24 0.32768000000000000000e5
-1111 1 1 32 0.13107200000000000000e6
-1111 1 1 48 -0.32768000000000000000e5
-1111 1 2 9 0.65536000000000000000e5
-1111 1 2 33 -0.39321600000000000000e6
-1111 1 2 49 -0.65536000000000000000e5
-1111 1 3 34 0.52428800000000000000e6
-1111 1 4 11 0.65536000000000000000e5
-1111 1 8 23 -0.65536000000000000000e5
-1111 1 8 39 -0.65536000000000000000e5
-1111 1 9 40 -0.65536000000000000000e5
-1111 1 10 41 -0.26214400000000000000e6
-1111 1 11 42 0.13107200000000000000e6
-1111 1 12 27 -0.26214400000000000000e6
-1111 1 12 43 0.52428800000000000000e6
-1111 1 22 22 0.65536000000000000000e5
-1111 1 23 38 -0.65536000000000000000e5
-1111 1 26 41 0.65536000000000000000e5
-1111 1 28 43 -0.26214400000000000000e6
-1111 1 32 47 -0.39321600000000000000e6
-1111 1 33 48 -0.13107200000000000000e6
-1111 2 1 7 0.65536000000000000000e5
-1111 2 2 8 -0.65536000000000000000e5
-1111 2 2 16 0.32768000000000000000e5
-1111 2 2 32 -0.65536000000000000000e5
-1111 2 3 9 0.65536000000000000000e5
-1111 2 6 20 0.13107200000000000000e6
-1111 2 7 21 -0.26214400000000000000e6
-1111 2 12 26 -0.13107200000000000000e6
-1111 2 16 30 -0.65536000000000000000e5
-1111 2 20 34 -0.13107200000000000000e6
-1111 3 1 14 0.26214400000000000000e6
-1111 3 1 22 0.32768000000000000000e5
-1111 3 1 30 0.65536000000000000000e5
-1111 3 1 38 0.32768000000000000000e5
-1111 3 2 7 0.13107200000000000000e6
-1111 3 2 15 -0.13107200000000000000e6
-1111 3 2 23 0.32768000000000000000e5
-1111 3 3 32 -0.39321600000000000000e6
-1111 3 4 9 0.65536000000000000000e5
-1111 3 7 12 -0.26214400000000000000e6
-1111 3 8 37 -0.65536000000000000000e5
-1111 3 10 23 0.13107200000000000000e6
-1111 3 13 42 -0.26214400000000000000e6
-1111 3 22 35 -0.26214400000000000000e6
-1111 3 28 41 -0.39321600000000000000e6
-1111 3 29 42 -0.13107200000000000000e6
-1111 4 2 6 0.65536000000000000000e5
-1111 4 2 30 -0.65536000000000000000e5
-1111 4 3 31 0.13107200000000000000e6
-1111 4 6 6 0.26214400000000000000e6
-1111 4 6 18 0.65536000000000000000e5
-1111 4 6 34 -0.13107200000000000000e6
-1112 1 1 40 0.65536000000000000000e5
-1112 1 22 23 0.65536000000000000000e5
-1112 1 22 37 -0.65536000000000000000e5
-1112 1 23 38 -0.65536000000000000000e5
-1112 3 1 38 0.65536000000000000000e5
-1112 3 22 27 -0.13107200000000000000e6
-1112 4 16 16 0.13107200000000000000e6
-1113 1 1 48 -0.65536000000000000000e5
-1113 1 22 24 0.65536000000000000000e5
-1113 3 1 38 -0.65536000000000000000e5
-1114 1 1 40 -0.65536000000000000000e5
-1114 1 22 25 0.65536000000000000000e5
-1115 1 2 49 -0.65536000000000000000e5
-1115 1 22 26 0.65536000000000000000e5
-1115 3 2 39 -0.65536000000000000000e5
-1116 1 1 8 0.65536000000000000000e5
-1116 1 1 24 0.32768000000000000000e5
-1116 1 1 32 0.13107200000000000000e6
-1116 1 1 40 0.32768000000000000000e5
-1116 1 1 48 -0.65536000000000000000e5
-1116 1 2 9 0.65536000000000000000e5
-1116 1 2 33 -0.39321600000000000000e6
-1116 1 2 49 -0.65536000000000000000e5
-1116 1 3 34 0.52428800000000000000e6
-1116 1 4 11 0.65536000000000000000e5
-1116 1 8 23 -0.65536000000000000000e5
-1116 1 8 39 -0.65536000000000000000e5
-1116 1 9 40 -0.65536000000000000000e5
-1116 1 10 41 -0.26214400000000000000e6
-1116 1 11 42 0.13107200000000000000e6
-1116 1 12 27 -0.26214400000000000000e6
-1116 1 12 43 0.52428800000000000000e6
-1116 1 22 27 0.65536000000000000000e5
-1116 1 22 37 -0.32768000000000000000e5
-1116 1 23 38 -0.98304000000000000000e5
-1116 1 26 41 0.65536000000000000000e5
-1116 1 28 43 -0.26214400000000000000e6
-1116 1 32 47 -0.39321600000000000000e6
-1116 1 33 48 -0.13107200000000000000e6
-1116 2 1 7 0.65536000000000000000e5
-1116 2 2 8 -0.65536000000000000000e5
-1116 2 2 16 0.32768000000000000000e5
-1116 2 2 32 -0.65536000000000000000e5
-1116 2 3 9 0.65536000000000000000e5
-1116 2 6 20 0.13107200000000000000e6
-1116 2 7 21 -0.26214400000000000000e6
-1116 2 12 26 -0.13107200000000000000e6
-1116 2 16 16 -0.65536000000000000000e5
-1116 2 16 30 -0.65536000000000000000e5
-1116 2 20 34 -0.13107200000000000000e6
-1116 3 1 14 0.26214400000000000000e6
-1116 3 1 22 0.32768000000000000000e5
-1116 3 1 30 0.65536000000000000000e5
-1116 3 1 38 0.32768000000000000000e5
-1116 3 2 7 0.13107200000000000000e6
-1116 3 2 15 -0.13107200000000000000e6
-1116 3 2 23 0.32768000000000000000e5
-1116 3 3 32 -0.39321600000000000000e6
-1116 3 4 9 0.65536000000000000000e5
-1116 3 7 12 -0.26214400000000000000e6
-1116 3 8 37 -0.65536000000000000000e5
-1116 3 10 23 0.13107200000000000000e6
-1116 3 13 42 -0.26214400000000000000e6
-1116 3 22 27 -0.65536000000000000000e5
-1116 3 22 35 -0.26214400000000000000e6
-1116 3 28 41 -0.39321600000000000000e6
-1116 3 29 42 -0.13107200000000000000e6
-1116 4 2 6 0.65536000000000000000e5
-1116 4 2 30 -0.65536000000000000000e5
-1116 4 3 31 0.13107200000000000000e6
-1116 4 6 6 0.26214400000000000000e6
-1116 4 6 18 0.65536000000000000000e5
-1116 4 6 34 -0.13107200000000000000e6
-1116 4 16 16 0.65536000000000000000e5
-1117 1 7 38 -0.65536000000000000000e5
-1117 1 22 28 0.65536000000000000000e5
-1118 1 1 48 -0.32768000000000000000e5
-1118 1 2 49 -0.32768000000000000000e5
-1118 1 22 29 0.65536000000000000000e5
-1118 1 23 38 -0.32768000000000000000e5
-1118 2 2 32 -0.32768000000000000000e5
-1118 3 8 37 -0.65536000000000000000e5
-1119 1 8 39 -0.65536000000000000000e5
-1119 1 22 30 0.65536000000000000000e5
-1120 1 2 33 -0.65536000000000000000e5
-1120 1 3 34 0.13107200000000000000e6
-1120 1 10 41 -0.65536000000000000000e5
-1120 1 11 42 0.65536000000000000000e5
-1120 1 12 43 0.13107200000000000000e6
-1120 1 16 23 -0.13107200000000000000e6
-1120 1 22 31 0.65536000000000000000e5
-1120 1 28 43 -0.65536000000000000000e5
-1120 1 32 47 -0.65536000000000000000e5
-1120 1 33 48 -0.65536000000000000000e5
-1120 2 1 31 0.65536000000000000000e5
-1120 2 7 21 -0.65536000000000000000e5
-1120 2 12 26 -0.65536000000000000000e5
-1120 3 1 34 0.13107200000000000000e6
-1120 3 2 31 -0.65536000000000000000e5
-1120 3 3 32 -0.65536000000000000000e5
-1120 3 13 42 -0.13107200000000000000e6
-1120 3 28 41 -0.65536000000000000000e5
-1120 3 29 42 -0.65536000000000000000e5
-1120 4 3 31 0.65536000000000000000e5
-1121 1 2 33 0.65536000000000000000e5
-1121 1 3 34 -0.13107200000000000000e6
-1121 1 10 41 0.65536000000000000000e5
-1121 1 22 32 0.65536000000000000000e5
-1121 2 7 21 0.65536000000000000000e5
-1121 3 2 31 0.65536000000000000000e5
-1121 3 3 32 0.65536000000000000000e5
-1122 1 11 42 -0.65536000000000000000e5
-1122 1 12 43 -0.13107200000000000000e6
-1122 1 22 33 0.65536000000000000000e5
-1122 1 28 43 0.65536000000000000000e5
-1122 1 32 47 0.65536000000000000000e5
-1122 1 33 48 0.65536000000000000000e5
-1122 2 12 26 0.65536000000000000000e5
-1122 3 13 42 0.13107200000000000000e6
-1122 3 28 41 0.65536000000000000000e5
-1122 3 29 42 0.65536000000000000000e5
-1122 4 3 31 -0.65536000000000000000e5
-1123 1 16 23 -0.65536000000000000000e5
-1123 1 22 34 0.65536000000000000000e5
-1123 3 1 34 0.65536000000000000000e5
-1124 1 16 47 -0.65536000000000000000e5
-1124 1 22 35 0.65536000000000000000e5
-1124 3 12 41 -0.65536000000000000000e5
-1125 1 22 36 0.65536000000000000000e5
-1125 1 27 34 -0.65536000000000000000e5
-1126 1 1 48 -0.65536000000000000000e5
-1126 1 22 38 0.65536000000000000000e5
-1127 1 22 39 0.65536000000000000000e5
-1127 1 23 38 -0.65536000000000000000e5
-1128 1 2 49 -0.65536000000000000000e5
-1128 1 22 40 0.65536000000000000000e5
-1129 1 7 38 -0.65536000000000000000e5
-1129 1 22 41 0.65536000000000000000e5
-1129 3 22 27 0.65536000000000000000e5
-1130 1 1 48 -0.32768000000000000000e5
-1130 1 2 49 -0.32768000000000000000e5
-1130 1 22 42 0.65536000000000000000e5
-1130 1 23 38 -0.32768000000000000000e5
-1130 2 2 32 -0.32768000000000000000e5
-1131 1 8 39 -0.65536000000000000000e5
-1131 1 9 40 -0.65536000000000000000e5
-1131 1 10 41 0.13107200000000000000e6
-1131 1 22 43 0.65536000000000000000e5
-1131 1 26 41 0.65536000000000000000e5
-1131 1 32 47 -0.13107200000000000000e6
-1131 3 9 38 -0.65536000000000000000e5
-1131 3 28 41 -0.13107200000000000000e6
-1131 4 2 30 -0.65536000000000000000e5
-1132 1 2 33 0.65536000000000000000e5
-1132 1 3 34 -0.13107200000000000000e6
-1132 1 9 40 -0.32768000000000000000e5
-1132 1 10 41 0.13107200000000000000e6
-1132 1 22 44 0.65536000000000000000e5
-1132 1 26 41 0.32768000000000000000e5
-1132 1 32 47 -0.65536000000000000000e5
-1132 2 7 21 0.65536000000000000000e5
-1132 3 2 31 0.65536000000000000000e5
-1132 3 3 32 0.65536000000000000000e5
-1132 3 8 37 0.32768000000000000000e5
-1132 3 9 38 -0.32768000000000000000e5
-1132 3 22 27 0.32768000000000000000e5
-1132 3 28 41 -0.65536000000000000000e5
-1132 4 1 29 0.32768000000000000000e5
-1132 4 2 30 -0.32768000000000000000e5
-1133 1 12 43 -0.13107200000000000000e6
-1133 1 22 45 0.65536000000000000000e5
-1133 1 28 43 0.65536000000000000000e5
-1133 1 32 47 0.65536000000000000000e5
-1133 2 20 34 0.65536000000000000000e5
-1133 3 22 35 0.13107200000000000000e6
-1133 3 28 41 0.65536000000000000000e5
-1133 4 6 34 0.65536000000000000000e5
-1134 1 16 47 -0.65536000000000000000e5
-1134 1 22 46 0.65536000000000000000e5
-1135 1 1 48 -0.65536000000000000000e5
-1135 1 6 53 -0.65536000000000000000e5
-1135 1 22 47 0.65536000000000000000e5
-1135 1 25 40 0.65536000000000000000e5
-1135 2 1 35 0.65536000000000000000e5
-1135 2 2 32 -0.65536000000000000000e5
-1135 2 4 34 -0.13107200000000000000e6
-1135 2 16 30 -0.13107200000000000000e6
-1135 2 16 34 0.13107200000000000000e6
-1135 2 21 35 0.13107200000000000000e6
-1135 3 2 47 -0.65536000000000000000e5
-1135 3 5 50 -0.13107200000000000000e6
-1135 3 7 52 0.52428800000000000000e6
-1135 3 24 37 -0.13107200000000000000e6
-1135 3 27 40 -0.13107200000000000000e6
-1135 3 28 41 -0.52428800000000000000e6
-1135 4 4 32 0.65536000000000000000e5
-1135 4 6 34 -0.26214400000000000000e6
-1135 4 7 35 0.13107200000000000000e6
-1135 4 16 28 -0.65536000000000000000e5
-1135 4 17 29 0.13107200000000000000e6
-1136 1 22 48 0.65536000000000000000e5
-1136 1 23 38 -0.65536000000000000000e5
-1136 3 2 47 0.65536000000000000000e5
-1137 1 2 49 -0.65536000000000000000e5
-1137 1 22 49 0.65536000000000000000e5
-1137 3 24 37 0.65536000000000000000e5
-1138 1 1 48 -0.32768000000000000000e5
-1138 1 2 49 -0.32768000000000000000e5
-1138 1 6 53 -0.32768000000000000000e5
-1138 1 22 50 0.65536000000000000000e5
-1138 1 23 38 -0.32768000000000000000e5
-1138 1 25 40 0.32768000000000000000e5
-1138 2 2 32 -0.32768000000000000000e5
-1138 2 4 34 -0.65536000000000000000e5
-1138 2 16 30 -0.65536000000000000000e5
-1138 2 16 34 0.65536000000000000000e5
-1138 2 21 35 0.65536000000000000000e5
-1138 3 5 50 -0.65536000000000000000e5
-1138 3 7 52 0.26214400000000000000e6
-1138 3 24 37 -0.32768000000000000000e5
-1138 3 27 40 -0.65536000000000000000e5
-1138 3 28 41 -0.26214400000000000000e6
-1138 4 4 32 0.32768000000000000000e5
-1138 4 6 34 -0.13107200000000000000e6
-1138 4 7 35 0.65536000000000000000e5
-1138 4 16 28 -0.32768000000000000000e5
-1138 4 17 29 0.65536000000000000000e5
-1139 1 6 53 -0.32768000000000000000e5
-1139 1 8 39 -0.65536000000000000000e5
-1139 1 9 40 -0.65536000000000000000e5
-1139 1 10 41 0.13107200000000000000e6
-1139 1 22 51 0.65536000000000000000e5
-1139 1 25 40 0.32768000000000000000e5
-1139 1 26 41 0.65536000000000000000e5
-1139 1 32 47 -0.13107200000000000000e6
-1139 3 9 38 -0.65536000000000000000e5
-1139 3 24 37 -0.32768000000000000000e5
-1139 3 27 40 -0.13107200000000000000e6
-1139 4 2 30 -0.65536000000000000000e5
-1139 4 4 32 0.32768000000000000000e5
-1139 4 16 28 -0.32768000000000000000e5
-1139 4 17 29 -0.65536000000000000000e5
-1140 1 6 53 -0.16384000000000000000e5
-1140 1 12 43 -0.13107200000000000000e6
-1140 1 22 52 0.65536000000000000000e5
-1140 1 25 40 0.16384000000000000000e5
-1140 1 28 43 0.65536000000000000000e5
-1140 1 32 47 0.65536000000000000000e5
-1140 2 4 34 -0.32768000000000000000e5
-1140 2 20 34 0.65536000000000000000e5
-1140 2 21 35 0.32768000000000000000e5
-1140 3 5 50 -0.32768000000000000000e5
-1140 3 7 52 0.13107200000000000000e6
-1140 3 22 35 0.13107200000000000000e6
-1140 3 24 37 -0.16384000000000000000e5
-1140 3 27 40 -0.65536000000000000000e5
-1140 4 4 32 0.16384000000000000000e5
-1140 4 7 35 0.32768000000000000000e5
-1140 4 16 28 -0.16384000000000000000e5
-1141 1 6 53 -0.65536000000000000000e5
-1141 1 8 39 -0.13107200000000000000e6
-1141 1 9 40 -0.13107200000000000000e6
-1141 1 10 41 0.26214400000000000000e6
-1141 1 22 53 0.65536000000000000000e5
-1141 1 22 54 0.65536000000000000000e5
-1141 1 23 54 0.65536000000000000000e5
-1141 1 24 55 0.13107200000000000000e6
-1141 1 25 40 0.65536000000000000000e5
-1141 1 37 52 -0.26214400000000000000e6
-1141 2 26 32 0.65536000000000000000e5
-1141 3 9 38 -0.13107200000000000000e6
-1141 3 22 51 -0.13107200000000000000e6
-1141 3 24 37 -0.65536000000000000000e5
-1141 3 27 40 -0.13107200000000000000e6
-1141 4 2 30 -0.13107200000000000000e6
-1141 4 4 32 0.65536000000000000000e5
-1141 4 16 28 -0.65536000000000000000e5
-1141 4 17 29 -0.13107200000000000000e6
-1141 4 20 32 -0.13107200000000000000e6
-1142 1 6 53 -0.32768000000000000000e5
-1142 1 8 39 -0.65536000000000000000e5
-1142 1 9 40 -0.65536000000000000000e5
-1142 1 10 41 0.13107200000000000000e6
-1142 1 22 55 0.65536000000000000000e5
-1142 1 24 55 0.65536000000000000000e5
-1142 1 25 40 0.32768000000000000000e5
-1142 1 37 52 -0.13107200000000000000e6
-1142 3 9 38 -0.65536000000000000000e5
-1142 3 22 51 -0.65536000000000000000e5
-1142 3 24 37 -0.32768000000000000000e5
-1142 3 27 40 -0.65536000000000000000e5
-1142 4 2 30 -0.65536000000000000000e5
-1142 4 4 32 0.32768000000000000000e5
-1142 4 16 28 -0.32768000000000000000e5
-1142 4 17 29 -0.65536000000000000000e5
-1142 4 20 32 -0.65536000000000000000e5
-1143 1 1 48 0.65536000000000000000e5
-1143 1 2 49 0.65536000000000000000e5
-1143 1 6 53 0.65536000000000000000e5
-1143 1 8 39 0.13107200000000000000e6
-1143 1 9 40 0.13107200000000000000e6
-1143 1 10 41 -0.26214400000000000000e6
-1143 1 12 43 -0.52428800000000000000e6
-1143 1 22 56 0.65536000000000000000e5
-1143 1 23 38 0.65536000000000000000e5
-1143 1 25 40 -0.65536000000000000000e5
-1143 1 26 41 -0.13107200000000000000e6
-1143 1 28 43 0.26214400000000000000e6
-1143 1 32 47 0.52428800000000000000e6
-1143 1 38 53 0.65536000000000000000e5
-1143 1 40 47 0.65536000000000000000e5
-1143 2 2 32 0.65536000000000000000e5
-1143 2 16 30 0.13107200000000000000e6
-1143 2 20 34 0.26214400000000000000e6
-1143 2 32 32 0.13107200000000000000e6
-1143 3 9 38 0.13107200000000000000e6
-1143 3 22 35 0.52428800000000000000e6
-1143 3 22 51 0.13107200000000000000e6
-1143 3 24 37 0.65536000000000000000e5
-1143 3 24 53 -0.65536000000000000000e5
-1143 3 27 40 0.13107200000000000000e6
-1143 3 28 41 0.52428800000000000000e6
-1143 3 37 50 0.13107200000000000000e6
-1143 4 2 30 0.13107200000000000000e6
-1143 4 4 32 -0.65536000000000000000e5
-1143 4 6 34 0.26214400000000000000e6
-1143 4 16 28 0.65536000000000000000e5
-1144 1 1 48 -0.32768000000000000000e5
-1144 1 23 23 0.65536000000000000000e5
-1144 3 1 38 -0.32768000000000000000e5
-1145 1 1 40 -0.65536000000000000000e5
-1145 1 23 24 0.65536000000000000000e5
-1146 1 2 49 -0.65536000000000000000e5
-1146 1 23 25 0.65536000000000000000e5
-1146 3 2 39 -0.65536000000000000000e5
-1147 1 6 37 -0.65536000000000000000e5
-1147 1 23 26 0.65536000000000000000e5
-1148 1 7 38 -0.65536000000000000000e5
-1148 1 23 27 0.65536000000000000000e5
-1149 1 1 48 -0.32768000000000000000e5
-1149 1 2 49 -0.32768000000000000000e5
-1149 1 23 28 0.65536000000000000000e5
-1149 1 23 38 -0.32768000000000000000e5
-1149 2 2 32 -0.32768000000000000000e5
-1149 3 8 37 -0.65536000000000000000e5
-1150 1 8 39 -0.65536000000000000000e5
-1150 1 23 29 0.65536000000000000000e5
-1151 1 1 48 0.32768000000000000000e5
-1151 1 2 49 0.32768000000000000000e5
-1151 1 8 39 0.65536000000000000000e5
-1151 1 9 40 0.65536000000000000000e5
-1151 1 10 41 -0.13107200000000000000e6
-1151 1 12 43 -0.26214400000000000000e6
-1151 1 23 30 0.65536000000000000000e5
-1151 1 23 38 0.32768000000000000000e5
-1151 1 26 41 -0.65536000000000000000e5
-1151 1 28 43 0.13107200000000000000e6
-1151 1 32 47 0.26214400000000000000e6
-1151 2 2 32 0.32768000000000000000e5
-1151 2 16 30 0.65536000000000000000e5
-1151 2 20 34 0.13107200000000000000e6
-1151 3 22 35 0.26214400000000000000e6
-1151 3 28 41 0.26214400000000000000e6
-1151 4 2 30 0.65536000000000000000e5
-1151 4 6 34 0.13107200000000000000e6
-1152 1 2 33 0.65536000000000000000e5
-1152 1 3 34 -0.13107200000000000000e6
-1152 1 10 41 0.65536000000000000000e5
-1152 1 23 31 0.65536000000000000000e5
-1152 2 7 21 0.65536000000000000000e5
-1152 3 2 31 0.65536000000000000000e5
-1152 3 3 32 0.65536000000000000000e5
-1153 1 11 42 -0.65536000000000000000e5
-1153 1 12 43 -0.13107200000000000000e6
-1153 1 23 32 0.65536000000000000000e5
-1153 1 28 43 0.65536000000000000000e5
-1153 1 32 47 0.65536000000000000000e5
-1153 1 33 48 0.65536000000000000000e5
-1153 2 12 26 0.65536000000000000000e5
-1153 3 13 42 0.13107200000000000000e6
-1153 3 28 41 0.65536000000000000000e5
-1153 3 29 42 0.65536000000000000000e5
-1153 4 3 31 -0.65536000000000000000e5
-1154 1 10 41 -0.65536000000000000000e5
-1154 1 23 33 0.65536000000000000000e5
-1155 1 16 47 -0.65536000000000000000e5
-1155 1 23 34 0.65536000000000000000e5
-1155 3 12 41 -0.65536000000000000000e5
-1156 1 12 43 -0.65536000000000000000e5
-1156 1 23 35 0.65536000000000000000e5
-1157 1 13 44 -0.65536000000000000000e5
-1157 1 23 36 0.65536000000000000000e5
-1158 1 1 48 -0.65536000000000000000e5
-1158 1 23 37 0.65536000000000000000e5
-1159 1 2 49 -0.65536000000000000000e5
-1159 1 23 39 0.65536000000000000000e5
-1160 1 23 40 0.65536000000000000000e5
-1160 1 24 39 -0.65536000000000000000e5
-1161 1 1 48 -0.32768000000000000000e5
-1161 1 2 49 -0.32768000000000000000e5
-1161 1 23 38 -0.32768000000000000000e5
-1161 1 23 41 0.65536000000000000000e5
-1161 2 2 32 -0.32768000000000000000e5
-1162 1 8 39 -0.65536000000000000000e5
-1162 1 9 40 -0.65536000000000000000e5
-1162 1 10 41 0.13107200000000000000e6
-1162 1 23 42 0.65536000000000000000e5
-1162 1 26 41 0.65536000000000000000e5
-1162 1 32 47 -0.13107200000000000000e6
-1162 3 9 38 -0.65536000000000000000e5
-1162 3 28 41 -0.13107200000000000000e6
-1162 4 2 30 -0.65536000000000000000e5
-1163 1 1 48 0.32768000000000000000e5
-1163 1 2 49 0.32768000000000000000e5
-1163 1 8 39 0.65536000000000000000e5
-1163 1 9 40 0.65536000000000000000e5
-1163 1 10 41 -0.13107200000000000000e6
-1163 1 12 43 -0.26214400000000000000e6
-1163 1 23 38 0.32768000000000000000e5
-1163 1 23 43 0.65536000000000000000e5
-1163 1 26 41 -0.65536000000000000000e5
-1163 1 28 43 0.13107200000000000000e6
-1163 1 32 47 0.26214400000000000000e6
-1163 2 2 32 0.32768000000000000000e5
-1163 2 16 30 0.65536000000000000000e5
-1163 2 20 34 0.13107200000000000000e6
-1163 3 9 38 0.65536000000000000000e5
-1163 3 22 35 0.26214400000000000000e6
-1163 3 28 41 0.26214400000000000000e6
-1163 4 2 30 0.65536000000000000000e5
-1163 4 6 34 0.13107200000000000000e6
-1164 1 12 43 -0.13107200000000000000e6
-1164 1 23 44 0.65536000000000000000e5
-1164 1 28 43 0.65536000000000000000e5
-1164 1 32 47 0.65536000000000000000e5
-1164 2 20 34 0.65536000000000000000e5
-1164 3 22 35 0.13107200000000000000e6
-1164 3 28 41 0.65536000000000000000e5
-1164 4 6 34 0.65536000000000000000e5
-1165 1 23 45 0.65536000000000000000e5
-1165 1 32 47 -0.65536000000000000000e5
-1165 3 28 41 -0.65536000000000000000e5
-1166 1 12 43 -0.65536000000000000000e5
-1166 1 23 46 0.65536000000000000000e5
-1166 3 22 35 0.65536000000000000000e5
-1167 1 23 38 -0.65536000000000000000e5
-1167 1 23 47 0.65536000000000000000e5
-1167 3 2 47 0.65536000000000000000e5
-1168 1 2 49 -0.65536000000000000000e5
-1168 1 23 48 0.65536000000000000000e5
-1168 3 24 37 0.65536000000000000000e5
-1169 1 6 53 0.65536000000000000000e5
-1169 1 23 49 0.65536000000000000000e5
-1169 1 24 39 -0.65536000000000000000e5
-1169 1 25 40 -0.65536000000000000000e5
-1169 3 25 38 -0.65536000000000000000e5
-1169 3 27 40 0.13107200000000000000e6
-1169 4 4 32 -0.65536000000000000000e5
-1170 1 6 53 -0.32768000000000000000e5
-1170 1 8 39 -0.65536000000000000000e5
-1170 1 9 40 -0.65536000000000000000e5
-1170 1 10 41 0.13107200000000000000e6
-1170 1 23 50 0.65536000000000000000e5
-1170 1 25 40 0.32768000000000000000e5
-1170 1 26 41 0.65536000000000000000e5
-1170 1 32 47 -0.13107200000000000000e6
-1170 3 9 38 -0.65536000000000000000e5
-1170 3 24 37 -0.32768000000000000000e5
-1170 3 27 40 -0.13107200000000000000e6
-1170 4 2 30 -0.65536000000000000000e5
-1170 4 4 32 0.32768000000000000000e5
-1170 4 16 28 -0.32768000000000000000e5
-1170 4 17 29 -0.65536000000000000000e5
-1171 1 1 48 0.32768000000000000000e5
-1171 1 2 49 0.32768000000000000000e5
-1171 1 6 53 0.32768000000000000000e5
-1171 1 8 39 0.65536000000000000000e5
-1171 1 9 40 0.65536000000000000000e5
-1171 1 10 41 -0.13107200000000000000e6
-1171 1 12 43 -0.26214400000000000000e6
-1171 1 23 38 0.32768000000000000000e5
-1171 1 23 51 0.65536000000000000000e5
-1171 1 25 40 -0.32768000000000000000e5
-1171 1 26 41 -0.65536000000000000000e5
-1171 1 28 43 0.13107200000000000000e6
-1171 1 32 47 0.26214400000000000000e6
-1171 2 2 32 0.32768000000000000000e5
-1171 2 16 30 0.65536000000000000000e5
-1171 2 20 34 0.13107200000000000000e6
-1171 3 9 38 0.65536000000000000000e5
-1171 3 22 35 0.26214400000000000000e6
-1171 3 24 37 0.32768000000000000000e5
-1171 3 27 40 0.65536000000000000000e5
-1171 3 28 41 0.26214400000000000000e6
-1171 4 2 30 0.65536000000000000000e5
-1171 4 4 32 -0.32768000000000000000e5
-1171 4 6 34 0.13107200000000000000e6
-1171 4 16 28 0.32768000000000000000e5
-1172 1 23 52 0.65536000000000000000e5
-1172 1 32 47 -0.65536000000000000000e5
-1173 1 6 53 -0.65536000000000000000e5
-1173 1 8 39 -0.13107200000000000000e6
-1173 1 9 40 -0.13107200000000000000e6
-1173 1 10 41 0.26214400000000000000e6
-1173 1 22 53 0.65536000000000000000e5
-1173 1 23 53 0.65536000000000000000e5
-1173 1 23 54 0.65536000000000000000e5
-1173 1 24 55 0.13107200000000000000e6
-1173 1 25 40 0.65536000000000000000e5
-1173 1 37 52 -0.26214400000000000000e6
-1173 2 26 32 0.65536000000000000000e5
-1173 3 9 38 -0.13107200000000000000e6
-1173 3 22 51 -0.13107200000000000000e6
-1173 3 24 37 -0.65536000000000000000e5
-1173 3 27 40 -0.13107200000000000000e6
-1173 4 2 30 -0.13107200000000000000e6
-1173 4 4 32 0.65536000000000000000e5
-1173 4 16 28 -0.65536000000000000000e5
-1173 4 17 29 -0.13107200000000000000e6
-1173 4 20 32 -0.13107200000000000000e6
-1174 1 1 48 0.32768000000000000000e5
-1174 1 2 49 0.32768000000000000000e5
-1174 1 6 53 0.32768000000000000000e5
-1174 1 8 39 0.65536000000000000000e5
-1174 1 9 40 0.65536000000000000000e5
-1174 1 10 41 -0.13107200000000000000e6
-1174 1 12 43 -0.26214400000000000000e6
-1174 1 23 38 0.32768000000000000000e5
-1174 1 23 55 0.65536000000000000000e5
-1174 1 25 40 -0.32768000000000000000e5
-1174 1 26 41 -0.65536000000000000000e5
-1174 1 28 43 0.13107200000000000000e6
-1174 1 32 47 0.26214400000000000000e6
-1174 2 2 32 0.32768000000000000000e5
-1174 2 16 30 0.65536000000000000000e5
-1174 2 20 34 0.13107200000000000000e6
-1174 3 9 38 0.65536000000000000000e5
-1174 3 22 35 0.26214400000000000000e6
-1174 3 22 51 0.65536000000000000000e5
-1174 3 24 37 0.32768000000000000000e5
-1174 3 27 40 0.65536000000000000000e5
-1174 3 28 41 0.26214400000000000000e6
-1174 4 2 30 0.65536000000000000000e5
-1174 4 4 32 -0.32768000000000000000e5
-1174 4 6 34 0.13107200000000000000e6
-1174 4 16 28 0.32768000000000000000e5
-1175 1 23 56 0.65536000000000000000e5
-1175 1 38 53 -0.65536000000000000000e5
-1176 1 2 49 -0.32768000000000000000e5
-1176 1 24 24 0.65536000000000000000e5
-1176 3 2 39 -0.32768000000000000000e5
-1177 1 6 37 -0.65536000000000000000e5
-1177 1 24 25 0.65536000000000000000e5
-1178 1 1 48 0.65536000000000000000e5
-1178 1 2 49 0.13107200000000000000e6
-1178 1 8 39 0.13107200000000000000e6
-1178 1 9 40 0.13107200000000000000e6
-1178 1 10 41 -0.26214400000000000000e6
-1178 1 12 43 -0.52428800000000000000e6
-1178 1 23 38 0.65536000000000000000e5
-1178 1 24 26 0.65536000000000000000e5
-1178 1 24 39 0.65536000000000000000e5
-1178 1 26 41 -0.13107200000000000000e6
-1178 1 28 43 0.26214400000000000000e6
-1178 1 32 47 0.52428800000000000000e6
-1178 2 2 32 0.65536000000000000000e5
-1178 2 3 33 0.65536000000000000000e5
-1178 2 16 30 0.13107200000000000000e6
-1178 2 20 34 0.26214400000000000000e6
-1178 3 3 40 -0.65536000000000000000e5
-1178 3 9 38 0.13107200000000000000e6
-1178 3 22 35 0.52428800000000000000e6
-1178 3 28 41 0.52428800000000000000e6
-1178 4 2 30 0.13107200000000000000e6
-1178 4 6 34 0.26214400000000000000e6
-1179 1 1 48 -0.32768000000000000000e5
-1179 1 2 49 -0.32768000000000000000e5
-1179 1 23 38 -0.32768000000000000000e5
-1179 1 24 27 0.65536000000000000000e5
-1179 2 2 32 -0.32768000000000000000e5
-1179 3 8 37 -0.65536000000000000000e5
-1180 1 8 39 -0.65536000000000000000e5
-1180 1 24 28 0.65536000000000000000e5
-1181 1 1 48 0.32768000000000000000e5
-1181 1 2 49 0.32768000000000000000e5
-1181 1 8 39 0.65536000000000000000e5
-1181 1 9 40 0.65536000000000000000e5
-1181 1 10 41 -0.13107200000000000000e6
-1181 1 12 43 -0.26214400000000000000e6
-1181 1 23 38 0.32768000000000000000e5
-1181 1 24 29 0.65536000000000000000e5
-1181 1 26 41 -0.65536000000000000000e5
-1181 1 28 43 0.13107200000000000000e6
-1181 1 32 47 0.26214400000000000000e6
-1181 2 2 32 0.32768000000000000000e5
-1181 2 16 30 0.65536000000000000000e5
-1181 2 20 34 0.13107200000000000000e6
-1181 3 22 35 0.26214400000000000000e6
-1181 3 28 41 0.26214400000000000000e6
-1181 4 2 30 0.65536000000000000000e5
-1181 4 6 34 0.13107200000000000000e6
-1182 1 9 40 -0.65536000000000000000e5
-1182 1 24 30 0.65536000000000000000e5
-1183 1 11 42 -0.65536000000000000000e5
-1183 1 12 43 -0.13107200000000000000e6
-1183 1 24 31 0.65536000000000000000e5
-1183 1 28 43 0.65536000000000000000e5
-1183 1 32 47 0.65536000000000000000e5
-1183 1 33 48 0.65536000000000000000e5
-1183 2 12 26 0.65536000000000000000e5
-1183 3 13 42 0.13107200000000000000e6
-1183 3 28 41 0.65536000000000000000e5
-1183 3 29 42 0.65536000000000000000e5
-1183 4 3 31 -0.65536000000000000000e5
-1184 1 10 41 -0.65536000000000000000e5
-1184 1 24 32 0.65536000000000000000e5
-1185 1 10 41 0.65536000000000000000e5
-1185 1 11 42 0.65536000000000000000e5
-1185 1 24 33 0.65536000000000000000e5
-1185 1 28 43 -0.65536000000000000000e5
-1185 1 32 47 -0.65536000000000000000e5
-1185 1 33 48 -0.65536000000000000000e5
-1185 3 13 42 -0.13107200000000000000e6
-1185 3 28 41 -0.65536000000000000000e5
-1185 3 29 42 -0.65536000000000000000e5
-1185 4 3 31 0.65536000000000000000e5
-1186 1 12 43 -0.65536000000000000000e5
-1186 1 24 34 0.65536000000000000000e5
-1187 1 17 48 -0.65536000000000000000e5
-1187 1 24 35 0.65536000000000000000e5
-1187 3 13 42 -0.65536000000000000000e5
-1188 1 4 35 -0.32768000000000000000e5
-1188 1 12 43 -0.32768000000000000000e5
-1188 1 14 45 -0.65536000000000000000e5
-1188 1 17 48 0.32768000000000000000e5
-1188 1 18 49 0.32768000000000000000e5
-1188 1 24 36 0.65536000000000000000e5
-1188 2 9 23 -0.32768000000000000000e5
-1188 2 14 28 0.32768000000000000000e5
-1188 3 5 34 -0.32768000000000000000e5
-1188 3 13 42 0.32768000000000000000e5
-1188 3 14 27 -0.32768000000000000000e5
-1188 3 14 43 0.32768000000000000000e5
-1188 3 16 29 0.65536000000000000000e5
-1189 1 23 38 -0.65536000000000000000e5
-1189 1 24 37 0.65536000000000000000e5
-1190 1 2 49 -0.65536000000000000000e5
-1190 1 24 38 0.65536000000000000000e5
-1191 1 1 48 0.65536000000000000000e5
-1191 1 2 49 0.13107200000000000000e6
-1191 1 8 39 0.13107200000000000000e6
-1191 1 9 40 0.13107200000000000000e6
-1191 1 10 41 -0.26214400000000000000e6
-1191 1 12 43 -0.52428800000000000000e6
-1191 1 23 38 0.65536000000000000000e5
-1191 1 24 39 0.65536000000000000000e5
-1191 1 24 40 0.65536000000000000000e5
-1191 1 26 41 -0.13107200000000000000e6
-1191 1 28 43 0.26214400000000000000e6
-1191 1 32 47 0.52428800000000000000e6
-1191 2 2 32 0.65536000000000000000e5
-1191 2 3 33 0.65536000000000000000e5
-1191 2 16 30 0.13107200000000000000e6
-1191 2 20 34 0.26214400000000000000e6
-1191 3 9 38 0.13107200000000000000e6
-1191 3 22 35 0.52428800000000000000e6
-1191 3 28 41 0.52428800000000000000e6
-1191 4 2 30 0.13107200000000000000e6
-1191 4 6 34 0.26214400000000000000e6
-1192 1 8 39 -0.65536000000000000000e5
-1192 1 9 40 -0.65536000000000000000e5
-1192 1 10 41 0.13107200000000000000e6
-1192 1 24 41 0.65536000000000000000e5
-1192 1 26 41 0.65536000000000000000e5
-1192 1 32 47 -0.13107200000000000000e6
-1192 3 9 38 -0.65536000000000000000e5
-1192 3 28 41 -0.13107200000000000000e6
-1192 4 2 30 -0.65536000000000000000e5
-1193 1 1 48 0.32768000000000000000e5
-1193 1 2 49 0.32768000000000000000e5
-1193 1 8 39 0.65536000000000000000e5
-1193 1 9 40 0.65536000000000000000e5
-1193 1 10 41 -0.13107200000000000000e6
-1193 1 12 43 -0.26214400000000000000e6
-1193 1 23 38 0.32768000000000000000e5
-1193 1 24 42 0.65536000000000000000e5
-1193 1 26 41 -0.65536000000000000000e5
-1193 1 28 43 0.13107200000000000000e6
-1193 1 32 47 0.26214400000000000000e6
-1193 2 2 32 0.32768000000000000000e5
-1193 2 16 30 0.65536000000000000000e5
-1193 2 20 34 0.13107200000000000000e6
-1193 3 9 38 0.65536000000000000000e5
-1193 3 22 35 0.26214400000000000000e6
-1193 3 28 41 0.26214400000000000000e6
-1193 4 2 30 0.65536000000000000000e5
-1193 4 6 34 0.13107200000000000000e6
-1194 1 24 43 0.65536000000000000000e5
-1194 1 26 41 -0.65536000000000000000e5
-1195 1 24 44 0.65536000000000000000e5
-1195 1 32 47 -0.65536000000000000000e5
-1195 3 28 41 -0.65536000000000000000e5
-1196 1 24 45 0.65536000000000000000e5
-1196 1 28 43 -0.65536000000000000000e5
-1197 1 17 48 -0.65536000000000000000e5
-1197 1 24 46 0.65536000000000000000e5
-1198 1 2 49 -0.65536000000000000000e5
-1198 1 24 47 0.65536000000000000000e5
-1198 3 24 37 0.65536000000000000000e5
-1199 1 6 53 0.65536000000000000000e5
-1199 1 24 39 -0.65536000000000000000e5
-1199 1 24 48 0.65536000000000000000e5
-1199 1 25 40 -0.65536000000000000000e5
-1199 3 25 38 -0.65536000000000000000e5
-1199 3 27 40 0.13107200000000000000e6
-1199 4 4 32 -0.65536000000000000000e5
-1200 1 1 48 0.65536000000000000000e5
-1200 1 2 49 0.13107200000000000000e6
-1200 1 8 39 0.13107200000000000000e6
-1200 1 9 40 0.13107200000000000000e6
-1200 1 10 41 -0.26214400000000000000e6
-1200 1 12 43 -0.52428800000000000000e6
-1200 1 23 38 0.65536000000000000000e5
-1200 1 24 39 0.65536000000000000000e5
-1200 1 24 49 0.65536000000000000000e5
-1200 1 26 41 -0.13107200000000000000e6
-1200 1 28 43 0.26214400000000000000e6
-1200 1 32 47 0.52428800000000000000e6
-1200 2 2 32 0.65536000000000000000e5
-1200 2 3 33 0.65536000000000000000e5
-1200 2 16 30 0.13107200000000000000e6
-1200 2 20 34 0.26214400000000000000e6
-1200 3 9 38 0.13107200000000000000e6
-1200 3 22 35 0.52428800000000000000e6
-1200 3 25 38 0.65536000000000000000e5
-1200 3 28 41 0.52428800000000000000e6
-1200 4 2 30 0.13107200000000000000e6
-1200 4 6 34 0.26214400000000000000e6
-1201 1 1 48 0.32768000000000000000e5
-1201 1 2 49 0.32768000000000000000e5
-1201 1 6 53 0.32768000000000000000e5
-1201 1 8 39 0.65536000000000000000e5
-1201 1 9 40 0.65536000000000000000e5
-1201 1 10 41 -0.13107200000000000000e6
-1201 1 12 43 -0.26214400000000000000e6
-1201 1 23 38 0.32768000000000000000e5
-1201 1 24 50 0.65536000000000000000e5
-1201 1 25 40 -0.32768000000000000000e5
-1201 1 26 41 -0.65536000000000000000e5
-1201 1 28 43 0.13107200000000000000e6
-1201 1 32 47 0.26214400000000000000e6
-1201 2 2 32 0.32768000000000000000e5
-1201 2 16 30 0.65536000000000000000e5
-1201 2 20 34 0.13107200000000000000e6
-1201 3 9 38 0.65536000000000000000e5
-1201 3 22 35 0.26214400000000000000e6
-1201 3 24 37 0.32768000000000000000e5
-1201 3 27 40 0.65536000000000000000e5
-1201 3 28 41 0.26214400000000000000e6
-1201 4 2 30 0.65536000000000000000e5
-1201 4 4 32 -0.32768000000000000000e5
-1201 4 6 34 0.13107200000000000000e6
-1201 4 16 28 0.32768000000000000000e5
-1202 1 24 51 0.65536000000000000000e5
-1202 1 26 41 -0.65536000000000000000e5
-1202 3 27 40 0.65536000000000000000e5
-1203 1 6 53 0.16384000000000000000e5
-1203 1 24 52 0.65536000000000000000e5
-1203 1 25 40 -0.16384000000000000000e5
-1203 1 28 43 -0.65536000000000000000e5
-1203 2 4 34 0.32768000000000000000e5
-1203 2 21 35 -0.32768000000000000000e5
-1203 3 5 50 0.32768000000000000000e5
-1203 3 24 37 0.16384000000000000000e5
-1203 3 27 40 0.65536000000000000000e5
-1203 4 4 32 -0.16384000000000000000e5
-1203 4 7 35 -0.32768000000000000000e5
-1203 4 16 28 0.16384000000000000000e5
-1204 1 23 54 -0.65536000000000000000e5
-1204 1 24 53 0.65536000000000000000e5
-1205 1 24 54 0.65536000000000000000e5
-1205 1 40 47 -0.65536000000000000000e5
-1206 1 24 56 0.65536000000000000000e5
-1206 1 40 47 -0.65536000000000000000e5
-1206 3 24 53 0.65536000000000000000e5
-1207 1 1 48 0.32768000000000000000e5
-1207 1 2 49 0.65536000000000000000e5
-1207 1 8 39 0.65536000000000000000e5
-1207 1 9 40 0.65536000000000000000e5
-1207 1 10 41 -0.13107200000000000000e6
-1207 1 12 43 -0.26214400000000000000e6
-1207 1 23 38 0.32768000000000000000e5
-1207 1 24 39 0.32768000000000000000e5
-1207 1 25 25 0.65536000000000000000e5
-1207 1 26 41 -0.65536000000000000000e5
-1207 1 28 43 0.13107200000000000000e6
-1207 1 32 47 0.26214400000000000000e6
-1207 2 2 32 0.32768000000000000000e5
-1207 2 3 33 0.32768000000000000000e5
-1207 2 16 30 0.65536000000000000000e5
-1207 2 20 34 0.13107200000000000000e6
-1207 3 3 40 -0.32768000000000000000e5
-1207 3 9 38 0.65536000000000000000e5
-1207 3 22 35 0.26214400000000000000e6
-1207 3 28 41 0.26214400000000000000e6
-1207 4 2 30 0.65536000000000000000e5
-1207 4 6 34 0.13107200000000000000e6
-1208 1 1 48 -0.65536000000000000000e5
-1208 1 2 49 -0.13107200000000000000e6
-1208 1 6 37 0.65536000000000000000e5
-1208 1 8 39 -0.13107200000000000000e6
-1208 1 9 40 -0.26214400000000000000e6
-1208 1 10 41 0.26214400000000000000e6
-1208 1 12 43 0.52428800000000000000e6
-1208 1 23 38 -0.65536000000000000000e5
-1208 1 24 39 -0.65536000000000000000e5
-1208 1 25 26 0.65536000000000000000e5
-1208 1 26 41 0.13107200000000000000e6
-1208 1 28 43 -0.26214400000000000000e6
-1208 1 32 47 -0.52428800000000000000e6
-1208 2 2 32 -0.65536000000000000000e5
-1208 2 3 33 -0.65536000000000000000e5
-1208 2 5 27 0.65536000000000000000e5
-1208 2 16 30 -0.13107200000000000000e6
-1208 2 20 34 -0.26214400000000000000e6
-1208 3 3 40 0.65536000000000000000e5
-1208 3 9 38 -0.13107200000000000000e6
-1208 3 22 35 -0.52428800000000000000e6
-1208 3 28 41 -0.52428800000000000000e6
-1208 4 2 30 -0.13107200000000000000e6
-1208 4 6 34 -0.26214400000000000000e6
-1209 1 8 39 -0.65536000000000000000e5
-1209 1 25 27 0.65536000000000000000e5
-1210 1 1 48 0.32768000000000000000e5
-1210 1 2 49 0.32768000000000000000e5
-1210 1 8 39 0.65536000000000000000e5
-1210 1 9 40 0.65536000000000000000e5
-1210 1 10 41 -0.13107200000000000000e6
-1210 1 12 43 -0.26214400000000000000e6
-1210 1 23 38 0.32768000000000000000e5
-1210 1 25 28 0.65536000000000000000e5
-1210 1 26 41 -0.65536000000000000000e5
-1210 1 28 43 0.13107200000000000000e6
-1210 1 32 47 0.26214400000000000000e6
-1210 2 2 32 0.32768000000000000000e5
-1210 2 16 30 0.65536000000000000000e5
-1210 2 20 34 0.13107200000000000000e6
-1210 3 22 35 0.26214400000000000000e6
-1210 3 28 41 0.26214400000000000000e6
-1210 4 2 30 0.65536000000000000000e5
-1210 4 6 34 0.13107200000000000000e6
-1211 1 9 40 -0.65536000000000000000e5
-1211 1 25 29 0.65536000000000000000e5
-1212 1 1 48 -0.32768000000000000000e5
-1212 1 2 49 -0.32768000000000000000e5
-1212 1 8 39 -0.65536000000000000000e5
-1212 1 9 40 -0.65536000000000000000e5
-1212 1 10 41 0.13107200000000000000e6
-1212 1 12 43 0.26214400000000000000e6
-1212 1 23 38 -0.32768000000000000000e5
-1212 1 25 30 0.65536000000000000000e5
-1212 1 26 41 0.13107200000000000000e6
-1212 1 28 43 -0.26214400000000000000e6
-1212 1 32 47 -0.26214400000000000000e6
-1212 2 2 32 -0.32768000000000000000e5
-1212 2 4 34 0.65536000000000000000e5
-1212 2 16 30 -0.65536000000000000000e5
-1212 2 20 34 -0.13107200000000000000e6
-1212 3 9 38 -0.65536000000000000000e5
-1212 3 10 39 -0.65536000000000000000e5
-1212 3 22 35 -0.26214400000000000000e6
-1212 3 28 41 -0.26214400000000000000e6
-1212 4 2 30 -0.65536000000000000000e5
-1212 4 6 34 -0.13107200000000000000e6
-1213 1 10 41 -0.65536000000000000000e5
-1213 1 25 31 0.65536000000000000000e5
-1214 1 10 41 0.65536000000000000000e5
-1214 1 11 42 0.65536000000000000000e5
-1214 1 25 32 0.65536000000000000000e5
-1214 1 28 43 -0.65536000000000000000e5
-1214 1 32 47 -0.65536000000000000000e5
-1214 1 33 48 -0.65536000000000000000e5
-1214 3 13 42 -0.13107200000000000000e6
-1214 3 28 41 -0.65536000000000000000e5
-1214 3 29 42 -0.65536000000000000000e5
-1214 4 3 31 0.65536000000000000000e5
-1215 1 11 42 -0.65536000000000000000e5
-1215 1 25 33 0.65536000000000000000e5
-1216 1 17 48 -0.65536000000000000000e5
-1216 1 25 34 0.65536000000000000000e5
-1216 3 13 42 -0.65536000000000000000e5
-1217 1 14 45 -0.13107200000000000000e6
-1217 1 17 48 0.65536000000000000000e5
-1217 1 18 49 0.65536000000000000000e5
-1217 1 25 35 0.65536000000000000000e5
-1217 2 14 28 0.65536000000000000000e5
-1217 3 13 42 0.65536000000000000000e5
-1217 3 14 43 0.65536000000000000000e5
-1218 1 14 45 -0.65536000000000000000e5
-1218 1 25 36 0.65536000000000000000e5
-1219 1 2 49 -0.65536000000000000000e5
-1219 1 25 37 0.65536000000000000000e5
-1220 1 24 39 -0.65536000000000000000e5
-1220 1 25 38 0.65536000000000000000e5
-1221 1 1 48 0.65536000000000000000e5
-1221 1 2 49 0.13107200000000000000e6
-1221 1 8 39 0.13107200000000000000e6
-1221 1 9 40 0.13107200000000000000e6
-1221 1 10 41 -0.26214400000000000000e6
-1221 1 12 43 -0.52428800000000000000e6
-1221 1 23 38 0.65536000000000000000e5
-1221 1 24 39 0.65536000000000000000e5
-1221 1 25 39 0.65536000000000000000e5
-1221 1 26 41 -0.13107200000000000000e6
-1221 1 28 43 0.26214400000000000000e6
-1221 1 32 47 0.52428800000000000000e6
-1221 2 2 32 0.65536000000000000000e5
-1221 2 3 33 0.65536000000000000000e5
-1221 2 16 30 0.13107200000000000000e6
-1221 2 20 34 0.26214400000000000000e6
-1221 3 9 38 0.13107200000000000000e6
-1221 3 22 35 0.52428800000000000000e6
-1221 3 28 41 0.52428800000000000000e6
-1221 4 2 30 0.13107200000000000000e6
-1221 4 6 34 0.26214400000000000000e6
-1222 1 1 48 0.32768000000000000000e5
-1222 1 2 49 0.32768000000000000000e5
-1222 1 8 39 0.65536000000000000000e5
-1222 1 9 40 0.65536000000000000000e5
-1222 1 10 41 -0.13107200000000000000e6
-1222 1 12 43 -0.26214400000000000000e6
-1222 1 23 38 0.32768000000000000000e5
-1222 1 25 41 0.65536000000000000000e5
-1222 1 26 41 -0.65536000000000000000e5
-1222 1 28 43 0.13107200000000000000e6
-1222 1 32 47 0.26214400000000000000e6
-1222 2 2 32 0.32768000000000000000e5
-1222 2 16 30 0.65536000000000000000e5
-1222 2 20 34 0.13107200000000000000e6
-1222 3 9 38 0.65536000000000000000e5
-1222 3 22 35 0.26214400000000000000e6
-1222 3 28 41 0.26214400000000000000e6
-1222 4 2 30 0.65536000000000000000e5
-1222 4 6 34 0.13107200000000000000e6
-1223 1 25 42 0.65536000000000000000e5
-1223 1 26 41 -0.65536000000000000000e5
-1224 1 1 48 -0.32768000000000000000e5
-1224 1 2 49 -0.32768000000000000000e5
-1224 1 8 39 -0.65536000000000000000e5
-1224 1 9 40 -0.65536000000000000000e5
-1224 1 10 41 0.13107200000000000000e6
-1224 1 12 43 0.26214400000000000000e6
-1224 1 23 38 -0.32768000000000000000e5
-1224 1 25 43 0.65536000000000000000e5
-1224 1 26 41 0.13107200000000000000e6
-1224 1 28 43 -0.26214400000000000000e6
-1224 1 32 47 -0.26214400000000000000e6
-1224 2 2 32 -0.32768000000000000000e5
-1224 2 4 34 0.65536000000000000000e5
-1224 2 16 30 -0.65536000000000000000e5
-1224 2 20 34 -0.13107200000000000000e6
-1224 3 9 38 -0.65536000000000000000e5
-1224 3 22 35 -0.26214400000000000000e6
-1224 3 28 41 -0.26214400000000000000e6
-1224 4 2 30 -0.65536000000000000000e5
-1224 4 6 34 -0.13107200000000000000e6
-1225 1 25 44 0.65536000000000000000e5
-1225 1 28 43 -0.65536000000000000000e5
-1226 1 25 45 0.65536000000000000000e5
-1226 1 33 48 -0.65536000000000000000e5
-1226 3 29 42 -0.65536000000000000000e5
-1227 1 25 46 0.65536000000000000000e5
-1227 1 34 49 -0.65536000000000000000e5
-1227 3 18 47 -0.65536000000000000000e5
-1228 1 6 53 0.65536000000000000000e5
-1228 1 24 39 -0.65536000000000000000e5
-1228 1 25 40 -0.65536000000000000000e5
-1228 1 25 47 0.65536000000000000000e5
-1228 3 25 38 -0.65536000000000000000e5
-1228 3 27 40 0.13107200000000000000e6
-1228 4 4 32 -0.65536000000000000000e5
-1229 1 1 48 0.65536000000000000000e5
-1229 1 2 49 0.13107200000000000000e6
-1229 1 8 39 0.13107200000000000000e6
-1229 1 9 40 0.13107200000000000000e6
-1229 1 10 41 -0.26214400000000000000e6
-1229 1 12 43 -0.52428800000000000000e6
-1229 1 23 38 0.65536000000000000000e5
-1229 1 24 39 0.65536000000000000000e5
-1229 1 25 48 0.65536000000000000000e5
-1229 1 26 41 -0.13107200000000000000e6
-1229 1 28 43 0.26214400000000000000e6
-1229 1 32 47 0.52428800000000000000e6
-1229 2 2 32 0.65536000000000000000e5
-1229 2 3 33 0.65536000000000000000e5
-1229 2 16 30 0.13107200000000000000e6
-1229 2 20 34 0.26214400000000000000e6
-1229 3 9 38 0.13107200000000000000e6
-1229 3 22 35 0.52428800000000000000e6
-1229 3 25 38 0.65536000000000000000e5
-1229 3 28 41 0.52428800000000000000e6
-1229 4 2 30 0.13107200000000000000e6
-1229 4 6 34 0.26214400000000000000e6
-1230 1 6 53 -0.65536000000000000000e5
-1230 1 25 49 0.65536000000000000000e5
-1231 1 25 50 0.65536000000000000000e5
-1231 1 26 41 -0.65536000000000000000e5
-1231 3 27 40 0.65536000000000000000e5
-1232 1 1 48 -0.32768000000000000000e5
-1232 1 2 49 -0.32768000000000000000e5
-1232 1 8 39 -0.65536000000000000000e5
-1232 1 9 40 -0.65536000000000000000e5
-1232 1 10 41 0.13107200000000000000e6
-1232 1 12 43 0.26214400000000000000e6
-1232 1 23 38 -0.32768000000000000000e5
-1232 1 25 51 0.65536000000000000000e5
-1232 1 26 41 0.13107200000000000000e6
-1232 1 28 43 -0.26214400000000000000e6
-1232 1 32 47 -0.26214400000000000000e6
-1232 2 2 32 -0.32768000000000000000e5
-1232 2 4 34 0.65536000000000000000e5
-1232 2 16 30 -0.65536000000000000000e5
-1232 2 20 34 -0.13107200000000000000e6
-1232 3 5 50 0.65536000000000000000e5
-1232 3 9 38 -0.65536000000000000000e5
-1232 3 22 35 -0.26214400000000000000e6
-1232 3 28 41 -0.26214400000000000000e6
-1232 4 2 30 -0.65536000000000000000e5
-1232 4 6 34 -0.13107200000000000000e6
-1233 1 25 52 0.65536000000000000000e5
-1233 1 33 48 -0.65536000000000000000e5
-1234 1 25 53 0.65536000000000000000e5
-1234 1 40 47 -0.65536000000000000000e5
-1235 1 25 54 0.65536000000000000000e5
-1235 1 25 56 -0.65536000000000000000e5
-1235 3 24 53 0.65536000000000000000e5
-1235 3 25 54 0.65536000000000000000e5
-1235 3 38 51 -0.13107200000000000000e6
-1235 4 28 32 0.65536000000000000000e5
-1236 1 1 48 -0.32768000000000000000e5
-1236 1 2 49 -0.32768000000000000000e5
-1236 1 8 39 -0.65536000000000000000e5
-1236 1 9 40 -0.65536000000000000000e5
-1236 1 10 41 0.13107200000000000000e6
-1236 1 12 43 0.26214400000000000000e6
-1236 1 23 38 -0.32768000000000000000e5
-1236 1 24 55 0.65536000000000000000e5
-1236 1 25 55 0.65536000000000000000e5
-1236 1 26 41 0.65536000000000000000e5
-1236 1 28 43 -0.26214400000000000000e6
-1236 1 32 47 -0.26214400000000000000e6
-1236 2 2 32 -0.32768000000000000000e5
-1236 2 4 34 0.65536000000000000000e5
-1236 2 16 30 -0.65536000000000000000e5
-1236 2 20 34 -0.13107200000000000000e6
-1236 3 5 50 0.65536000000000000000e5
-1236 3 9 38 -0.65536000000000000000e5
-1236 3 22 35 -0.26214400000000000000e6
-1236 3 22 51 -0.65536000000000000000e5
-1236 3 23 52 0.13107200000000000000e6
-1236 3 27 40 0.65536000000000000000e5
-1236 3 28 41 -0.26214400000000000000e6
-1236 4 2 30 -0.65536000000000000000e5
-1236 4 6 34 -0.13107200000000000000e6
-1236 4 7 35 -0.65536000000000000000e5
-1237 1 1 40 -0.32768000000000000000e5
-1237 1 1 48 -0.32768000000000000000e5
-1237 1 2 33 0.26214400000000000000e6
-1237 1 2 49 -0.32768000000000000000e5
-1237 1 6 37 -0.32768000000000000000e5
-1237 1 8 39 -0.65536000000000000000e5
-1237 1 9 40 -0.13107200000000000000e6
-1237 1 10 25 0.13107200000000000000e6
-1237 1 10 41 0.13107200000000000000e6
-1237 1 11 42 -0.26214400000000000000e6
-1237 1 12 43 -0.26214400000000000000e6
-1237 1 26 26 0.65536000000000000000e5
-1237 1 26 41 0.13107200000000000000e6
-1237 1 33 48 0.26214400000000000000e6
-1237 2 3 17 -0.32768000000000000000e5
-1237 2 4 34 0.65536000000000000000e5
-1237 2 5 19 0.32768000000000000000e5
-1237 2 5 27 -0.32768000000000000000e5
-1237 2 12 26 0.26214400000000000000e6
-1237 2 16 30 -0.65536000000000000000e5
-1237 2 20 34 -0.13107200000000000000e6
-1237 3 1 30 -0.13107200000000000000e6
-1237 3 1 38 -0.32768000000000000000e5
-1237 3 2 23 -0.32768000000000000000e5
-1237 3 2 39 -0.32768000000000000000e5
-1237 3 3 32 0.13107200000000000000e6
-1237 3 5 26 0.32768000000000000000e5
-1237 3 8 37 0.65536000000000000000e5
-1237 3 9 38 -0.65536000000000000000e5
-1237 3 10 39 -0.65536000000000000000e5
-1237 3 13 42 0.52428800000000000000e6
-1237 3 14 27 -0.26214400000000000000e6
-1237 3 22 35 -0.26214400000000000000e6
-1237 3 29 42 0.26214400000000000000e6
-1237 4 2 30 -0.65536000000000000000e5
-1237 4 3 31 -0.26214400000000000000e6
-1237 4 4 16 0.32768000000000000000e5
-1237 4 5 17 -0.32768000000000000000e5
-1237 4 6 18 -0.65536000000000000000e5
-1237 4 6 34 -0.13107200000000000000e6
-1237 4 7 19 0.65536000000000000000e5
-1237 4 8 20 0.13107200000000000000e6
-1238 1 1 48 0.32768000000000000000e5
-1238 1 2 49 0.32768000000000000000e5
-1238 1 8 39 0.65536000000000000000e5
-1238 1 9 40 0.65536000000000000000e5
-1238 1 10 41 -0.13107200000000000000e6
-1238 1 12 43 -0.26214400000000000000e6
-1238 1 23 38 0.32768000000000000000e5
-1238 1 26 27 0.65536000000000000000e5
-1238 1 26 41 -0.65536000000000000000e5
-1238 1 28 43 0.13107200000000000000e6
-1238 1 32 47 0.26214400000000000000e6
-1238 2 2 32 0.32768000000000000000e5
-1238 2 16 30 0.65536000000000000000e5
-1238 2 20 34 0.13107200000000000000e6
-1238 3 22 35 0.26214400000000000000e6
-1238 3 28 41 0.26214400000000000000e6
-1238 4 2 30 0.65536000000000000000e5
-1238 4 6 34 0.13107200000000000000e6
-1239 1 9 40 -0.65536000000000000000e5
-1239 1 26 28 0.65536000000000000000e5
-1240 1 1 48 -0.32768000000000000000e5
-1240 1 2 49 -0.32768000000000000000e5
-1240 1 8 39 -0.65536000000000000000e5
-1240 1 9 40 -0.65536000000000000000e5
-1240 1 10 41 0.13107200000000000000e6
-1240 1 12 43 0.26214400000000000000e6
-1240 1 23 38 -0.32768000000000000000e5
-1240 1 26 29 0.65536000000000000000e5
-1240 1 26 41 0.13107200000000000000e6
-1240 1 28 43 -0.26214400000000000000e6
-1240 1 32 47 -0.26214400000000000000e6
-1240 2 2 32 -0.32768000000000000000e5
-1240 2 4 34 0.65536000000000000000e5
-1240 2 16 30 -0.65536000000000000000e5
-1240 2 20 34 -0.13107200000000000000e6
-1240 3 9 38 -0.65536000000000000000e5
-1240 3 10 39 -0.65536000000000000000e5
-1240 3 22 35 -0.26214400000000000000e6
-1240 3 28 41 -0.26214400000000000000e6
-1240 4 2 30 -0.65536000000000000000e5
-1240 4 6 34 -0.13107200000000000000e6
-1241 1 1 48 0.32768000000000000000e5
-1241 1 2 49 0.32768000000000000000e5
-1241 1 8 39 0.65536000000000000000e5
-1241 1 9 40 0.13107200000000000000e6
-1241 1 10 41 -0.13107200000000000000e6
-1241 1 11 42 -0.13107200000000000000e6
-1241 1 12 43 -0.26214400000000000000e6
-1241 1 23 38 0.32768000000000000000e5
-1241 1 26 30 0.65536000000000000000e5
-1241 1 26 41 -0.13107200000000000000e6
-1241 1 28 43 0.26214400000000000000e6
-1241 1 32 47 0.26214400000000000000e6
-1241 2 2 32 0.32768000000000000000e5
-1241 2 4 34 -0.65536000000000000000e5
-1241 2 16 30 0.65536000000000000000e5
-1241 2 20 34 0.13107200000000000000e6
-1241 2 28 34 0.65536000000000000000e5
-1241 3 9 38 0.65536000000000000000e5
-1241 3 10 39 0.65536000000000000000e5
-1241 3 22 35 0.26214400000000000000e6
-1241 3 28 41 0.26214400000000000000e6
-1241 4 2 30 0.65536000000000000000e5
-1241 4 6 34 0.13107200000000000000e6
-1241 4 18 22 0.65536000000000000000e5
-1241 4 18 30 0.65536000000000000000e5
-1241 4 21 33 0.65536000000000000000e5
-1242 1 10 41 0.65536000000000000000e5
-1242 1 11 42 0.65536000000000000000e5
-1242 1 26 31 0.65536000000000000000e5
-1242 1 28 43 -0.65536000000000000000e5
-1242 1 32 47 -0.65536000000000000000e5
-1242 1 33 48 -0.65536000000000000000e5
-1242 3 13 42 -0.13107200000000000000e6
-1242 3 28 41 -0.65536000000000000000e5
-1242 3 29 42 -0.65536000000000000000e5
-1242 4 3 31 0.65536000000000000000e5
-1243 1 11 42 -0.65536000000000000000e5
-1243 1 26 32 0.65536000000000000000e5
-1244 1 14 45 -0.13107200000000000000e6
-1244 1 17 48 0.65536000000000000000e5
-1244 1 18 49 0.65536000000000000000e5
-1244 1 26 34 0.65536000000000000000e5
-1244 2 14 28 0.65536000000000000000e5
-1244 3 13 42 0.65536000000000000000e5
-1244 3 14 43 0.65536000000000000000e5
-1245 1 18 49 -0.65536000000000000000e5
-1245 1 26 35 0.65536000000000000000e5
-1245 3 14 43 -0.65536000000000000000e5
-1246 1 11 18 -0.65536000000000000000e5
-1246 1 26 36 0.65536000000000000000e5
-1246 3 6 19 0.65536000000000000000e5
-1246 3 17 30 0.65536000000000000000e5
-1247 1 24 39 -0.65536000000000000000e5
-1247 1 26 37 0.65536000000000000000e5
-1248 1 1 48 0.65536000000000000000e5
-1248 1 2 49 0.13107200000000000000e6
-1248 1 8 39 0.13107200000000000000e6
-1248 1 9 40 0.13107200000000000000e6
-1248 1 10 41 -0.26214400000000000000e6
-1248 1 12 43 -0.52428800000000000000e6
-1248 1 23 38 0.65536000000000000000e5
-1248 1 24 39 0.65536000000000000000e5
-1248 1 26 38 0.65536000000000000000e5
-1248 1 26 41 -0.13107200000000000000e6
-1248 1 28 43 0.26214400000000000000e6
-1248 1 32 47 0.52428800000000000000e6
-1248 2 2 32 0.65536000000000000000e5
-1248 2 3 33 0.65536000000000000000e5
-1248 2 16 30 0.13107200000000000000e6
-1248 2 20 34 0.26214400000000000000e6
-1248 3 9 38 0.13107200000000000000e6
-1248 3 22 35 0.52428800000000000000e6
-1248 3 28 41 0.52428800000000000000e6
-1248 4 2 30 0.13107200000000000000e6
-1248 4 6 34 0.26214400000000000000e6
-1249 1 25 40 -0.65536000000000000000e5
-1249 1 26 39 0.65536000000000000000e5
-1250 1 1 48 -0.13107200000000000000e6
-1250 1 2 49 -0.19660800000000000000e6
-1250 1 6 53 0.65536000000000000000e5
-1250 1 8 39 -0.26214400000000000000e6
-1250 1 9 40 -0.26214400000000000000e6
-1250 1 10 41 0.52428800000000000000e6
-1250 1 12 43 0.10485760000000000000e7
-1250 1 23 38 -0.13107200000000000000e6
-1250 1 24 39 -0.65536000000000000000e5
-1250 1 26 40 0.65536000000000000000e5
-1250 1 26 41 0.39321600000000000000e6
-1250 1 28 43 -0.78643200000000000000e6
-1250 1 32 47 -0.10485760000000000000e7
-1250 2 2 32 -0.13107200000000000000e6
-1250 2 3 33 -0.65536000000000000000e5
-1250 2 4 34 0.13107200000000000000e6
-1250 2 5 35 0.65536000000000000000e5
-1250 2 16 30 -0.26214400000000000000e6
-1250 2 20 34 -0.52428800000000000000e6
-1250 3 5 50 0.13107200000000000000e6
-1250 3 9 38 -0.26214400000000000000e6
-1250 3 22 35 -0.10485760000000000000e7
-1250 3 25 38 -0.65536000000000000000e5
-1250 3 26 39 -0.65536000000000000000e5
-1250 3 28 41 -0.10485760000000000000e7
-1250 4 2 30 -0.26214400000000000000e6
-1250 4 6 34 -0.52428800000000000000e6
-1251 1 1 48 -0.32768000000000000000e5
-1251 1 2 49 -0.32768000000000000000e5
-1251 1 8 39 -0.65536000000000000000e5
-1251 1 9 40 -0.65536000000000000000e5
-1251 1 10 41 0.13107200000000000000e6
-1251 1 12 43 0.26214400000000000000e6
-1251 1 23 38 -0.32768000000000000000e5
-1251 1 26 41 0.13107200000000000000e6
-1251 1 26 42 0.65536000000000000000e5
-1251 1 28 43 -0.26214400000000000000e6
-1251 1 32 47 -0.26214400000000000000e6
-1251 2 2 32 -0.32768000000000000000e5
-1251 2 4 34 0.65536000000000000000e5
-1251 2 16 30 -0.65536000000000000000e5
-1251 2 20 34 -0.13107200000000000000e6
-1251 3 9 38 -0.65536000000000000000e5
-1251 3 22 35 -0.26214400000000000000e6
-1251 3 28 41 -0.26214400000000000000e6
-1251 4 2 30 -0.65536000000000000000e5
-1251 4 6 34 -0.13107200000000000000e6
-1252 1 1 48 0.32768000000000000000e5
-1252 1 2 49 0.32768000000000000000e5
-1252 1 8 39 0.65536000000000000000e5
-1252 1 9 40 0.65536000000000000000e5
-1252 1 10 41 -0.13107200000000000000e6
-1252 1 12 43 -0.26214400000000000000e6
-1252 1 23 38 0.32768000000000000000e5
-1252 1 26 41 -0.65536000000000000000e5
-1252 1 26 43 0.65536000000000000000e5
-1252 1 28 43 0.26214400000000000000e6
-1252 1 32 47 0.26214400000000000000e6
-1252 1 33 48 -0.13107200000000000000e6
-1252 2 2 32 0.32768000000000000000e5
-1252 2 4 34 -0.65536000000000000000e5
-1252 2 16 30 0.65536000000000000000e5
-1252 2 20 34 0.13107200000000000000e6
-1252 2 28 34 0.65536000000000000000e5
-1252 3 9 38 0.65536000000000000000e5
-1252 3 22 35 0.26214400000000000000e6
-1252 3 28 41 0.26214400000000000000e6
-1252 3 29 42 -0.13107200000000000000e6
-1252 4 2 30 0.65536000000000000000e5
-1252 4 6 34 0.13107200000000000000e6
-1252 4 18 30 0.65536000000000000000e5
-1252 4 21 33 0.65536000000000000000e5
-1253 1 26 44 0.65536000000000000000e5
-1253 1 33 48 -0.65536000000000000000e5
-1253 3 29 42 -0.65536000000000000000e5
-1254 1 26 45 0.65536000000000000000e5
-1254 1 33 40 -0.65536000000000000000e5
-1255 1 18 49 -0.65536000000000000000e5
-1255 1 26 46 0.65536000000000000000e5
-1256 1 1 48 0.65536000000000000000e5
-1256 1 2 49 0.13107200000000000000e6
-1256 1 8 39 0.13107200000000000000e6
-1256 1 9 40 0.13107200000000000000e6
-1256 1 10 41 -0.26214400000000000000e6
-1256 1 12 43 -0.52428800000000000000e6
-1256 1 23 38 0.65536000000000000000e5
-1256 1 24 39 0.65536000000000000000e5
-1256 1 26 41 -0.13107200000000000000e6
-1256 1 26 47 0.65536000000000000000e5
-1256 1 28 43 0.26214400000000000000e6
-1256 1 32 47 0.52428800000000000000e6
-1256 2 2 32 0.65536000000000000000e5
-1256 2 3 33 0.65536000000000000000e5
-1256 2 16 30 0.13107200000000000000e6
-1256 2 20 34 0.26214400000000000000e6
-1256 3 9 38 0.13107200000000000000e6
-1256 3 22 35 0.52428800000000000000e6
-1256 3 25 38 0.65536000000000000000e5
-1256 3 28 41 0.52428800000000000000e6
-1256 4 2 30 0.13107200000000000000e6
-1256 4 6 34 0.26214400000000000000e6
-1257 1 6 53 -0.65536000000000000000e5
-1257 1 26 48 0.65536000000000000000e5
-1258 1 1 48 -0.13107200000000000000e6
-1258 1 2 49 -0.19660800000000000000e6
-1258 1 6 53 0.65536000000000000000e5
-1258 1 8 39 -0.26214400000000000000e6
-1258 1 9 40 -0.26214400000000000000e6
-1258 1 10 41 0.52428800000000000000e6
-1258 1 12 43 0.10485760000000000000e7
-1258 1 23 38 -0.13107200000000000000e6
-1258 1 24 39 -0.65536000000000000000e5
-1258 1 26 41 0.39321600000000000000e6
-1258 1 26 49 0.65536000000000000000e5
-1258 1 28 43 -0.78643200000000000000e6
-1258 1 32 47 -0.10485760000000000000e7
-1258 2 2 32 -0.13107200000000000000e6
-1258 2 3 33 -0.65536000000000000000e5
-1258 2 4 34 0.13107200000000000000e6
-1258 2 5 35 0.65536000000000000000e5
-1258 2 16 30 -0.26214400000000000000e6
-1258 2 20 34 -0.52428800000000000000e6
-1258 3 5 50 0.13107200000000000000e6
-1258 3 9 38 -0.26214400000000000000e6
-1258 3 22 35 -0.10485760000000000000e7
-1258 3 25 38 -0.65536000000000000000e5
-1258 3 28 41 -0.10485760000000000000e7
-1258 4 2 30 -0.26214400000000000000e6
-1258 4 6 34 -0.52428800000000000000e6
-1259 1 1 48 -0.32768000000000000000e5
-1259 1 2 49 -0.32768000000000000000e5
-1259 1 8 39 -0.65536000000000000000e5
-1259 1 9 40 -0.65536000000000000000e5
-1259 1 10 41 0.13107200000000000000e6
-1259 1 12 43 0.26214400000000000000e6
-1259 1 23 38 -0.32768000000000000000e5
-1259 1 26 41 0.13107200000000000000e6
-1259 1 26 50 0.65536000000000000000e5
-1259 1 28 43 -0.26214400000000000000e6
-1259 1 32 47 -0.26214400000000000000e6
-1259 2 2 32 -0.32768000000000000000e5
-1259 2 4 34 0.65536000000000000000e5
-1259 2 16 30 -0.65536000000000000000e5
-1259 2 20 34 -0.13107200000000000000e6
-1259 3 5 50 0.65536000000000000000e5
-1259 3 9 38 -0.65536000000000000000e5
-1259 3 22 35 -0.26214400000000000000e6
-1259 3 28 41 -0.26214400000000000000e6
-1259 4 2 30 -0.65536000000000000000e5
-1259 4 6 34 -0.13107200000000000000e6
-1260 1 1 48 0.32768000000000000000e5
-1260 1 2 49 0.32768000000000000000e5
-1260 1 8 39 0.65536000000000000000e5
-1260 1 9 40 0.65536000000000000000e5
-1260 1 10 41 -0.13107200000000000000e6
-1260 1 12 43 -0.26214400000000000000e6
-1260 1 23 38 0.32768000000000000000e5
-1260 1 26 41 -0.65536000000000000000e5
-1260 1 26 51 0.65536000000000000000e5
-1260 1 28 43 0.26214400000000000000e6
-1260 1 32 47 0.26214400000000000000e6
-1260 1 33 48 -0.13107200000000000000e6
-1260 2 2 32 0.32768000000000000000e5
-1260 2 4 34 -0.65536000000000000000e5
-1260 2 16 30 0.65536000000000000000e5
-1260 2 20 34 0.13107200000000000000e6
-1260 2 28 34 0.65536000000000000000e5
-1260 3 5 50 -0.65536000000000000000e5
-1260 3 9 38 0.65536000000000000000e5
-1260 3 22 35 0.26214400000000000000e6
-1260 3 27 40 -0.65536000000000000000e5
-1260 3 28 41 0.26214400000000000000e6
-1260 4 2 30 0.65536000000000000000e5
-1260 4 6 34 0.13107200000000000000e6
-1260 4 21 33 0.65536000000000000000e5
-1261 1 26 52 0.65536000000000000000e5
-1261 1 33 40 -0.65536000000000000000e5
-1261 3 14 51 0.13107200000000000000e6
-1261 3 29 42 -0.65536000000000000000e5
-1261 3 30 43 -0.65536000000000000000e5
-1261 4 19 31 -0.65536000000000000000e5
-1262 1 25 56 -0.65536000000000000000e5
-1262 1 26 53 0.65536000000000000000e5
-1262 3 24 53 0.65536000000000000000e5
-1262 3 25 54 0.65536000000000000000e5
-1262 3 38 51 -0.13107200000000000000e6
-1262 4 28 32 0.65536000000000000000e5
-1263 1 1 48 -0.13107200000000000000e6
-1263 1 2 49 -0.19660800000000000000e6
-1263 1 6 53 0.65536000000000000000e5
-1263 1 8 39 -0.26214400000000000000e6
-1263 1 9 40 -0.26214400000000000000e6
-1263 1 10 41 0.52428800000000000000e6
-1263 1 12 43 0.10485760000000000000e7
-1263 1 23 38 -0.13107200000000000000e6
-1263 1 24 39 -0.65536000000000000000e5
-1263 1 26 41 0.39321600000000000000e6
-1263 1 26 54 0.65536000000000000000e5
-1263 1 28 43 -0.78643200000000000000e6
-1263 1 32 47 -0.10485760000000000000e7
-1263 2 2 32 -0.13107200000000000000e6
-1263 2 3 33 -0.65536000000000000000e5
-1263 2 4 34 0.13107200000000000000e6
-1263 2 5 35 0.65536000000000000000e5
-1263 2 16 30 -0.26214400000000000000e6
-1263 2 20 34 -0.52428800000000000000e6
-1263 3 5 50 0.13107200000000000000e6
-1263 3 9 38 -0.26214400000000000000e6
-1263 3 22 35 -0.10485760000000000000e7
-1263 3 25 38 -0.65536000000000000000e5
-1263 3 28 41 -0.10485760000000000000e7
-1263 3 39 40 0.65536000000000000000e5
-1263 4 2 30 -0.26214400000000000000e6
-1263 4 6 34 -0.52428800000000000000e6
-1264 1 1 48 0.32768000000000000000e5
-1264 1 2 49 0.32768000000000000000e5
-1264 1 8 39 0.65536000000000000000e5
-1264 1 9 40 0.65536000000000000000e5
-1264 1 10 41 -0.13107200000000000000e6
-1264 1 12 43 -0.26214400000000000000e6
-1264 1 23 38 0.32768000000000000000e5
-1264 1 26 41 -0.65536000000000000000e5
-1264 1 26 55 0.65536000000000000000e5
-1264 1 28 43 0.26214400000000000000e6
-1264 1 32 47 0.26214400000000000000e6
-1264 1 33 48 -0.13107200000000000000e6
-1264 2 2 32 0.32768000000000000000e5
-1264 2 4 34 -0.65536000000000000000e5
-1264 2 16 30 0.65536000000000000000e5
-1264 2 20 34 0.13107200000000000000e6
-1264 2 28 34 0.65536000000000000000e5
-1264 3 5 50 -0.65536000000000000000e5
-1264 3 9 38 0.65536000000000000000e5
-1264 3 10 55 -0.13107200000000000000e6
-1264 3 22 35 0.26214400000000000000e6
-1264 3 22 51 0.65536000000000000000e5
-1264 3 23 52 -0.13107200000000000000e6
-1264 3 27 40 -0.65536000000000000000e5
-1264 3 28 41 0.26214400000000000000e6
-1264 3 35 48 0.26214400000000000000e6
-1264 3 40 45 -0.13107200000000000000e6
-1264 4 2 30 0.65536000000000000000e5
-1264 4 6 34 0.13107200000000000000e6
-1264 4 7 35 0.65536000000000000000e5
-1264 4 22 34 -0.13107200000000000000e6
-1265 1 1 48 -0.13107200000000000000e6
-1265 1 2 49 -0.19660800000000000000e6
-1265 1 6 53 0.65536000000000000000e5
-1265 1 8 39 -0.26214400000000000000e6
-1265 1 9 40 -0.26214400000000000000e6
-1265 1 10 41 0.52428800000000000000e6
-1265 1 12 43 0.10485760000000000000e7
-1265 1 23 38 -0.13107200000000000000e6
-1265 1 24 39 -0.65536000000000000000e5
-1265 1 26 41 0.39321600000000000000e6
-1265 1 26 56 0.65536000000000000000e5
-1265 1 28 43 -0.78643200000000000000e6
-1265 1 32 47 -0.10485760000000000000e7
-1265 2 2 32 -0.13107200000000000000e6
-1265 2 3 33 -0.65536000000000000000e5
-1265 2 4 34 0.13107200000000000000e6
-1265 2 5 35 0.65536000000000000000e5
-1265 2 16 30 -0.26214400000000000000e6
-1265 2 20 34 -0.52428800000000000000e6
-1265 3 5 50 0.13107200000000000000e6
-1265 3 9 38 -0.26214400000000000000e6
-1265 3 22 35 -0.10485760000000000000e7
-1265 3 25 38 -0.65536000000000000000e5
-1265 3 25 54 0.65536000000000000000e5
-1265 3 28 41 -0.10485760000000000000e7
-1265 3 39 40 0.65536000000000000000e5
-1265 4 2 30 -0.26214400000000000000e6
-1265 4 6 34 -0.52428800000000000000e6
-1266 1 2 33 -0.32768000000000000000e5
-1266 1 3 34 0.65536000000000000000e5
-1266 1 10 41 -0.32768000000000000000e5
-1266 1 11 42 0.32768000000000000000e5
-1266 1 12 43 0.65536000000000000000e5
-1266 1 16 23 -0.65536000000000000000e5
-1266 1 27 27 0.65536000000000000000e5
-1266 1 28 43 -0.32768000000000000000e5
-1266 1 32 47 -0.32768000000000000000e5
-1266 1 33 48 -0.32768000000000000000e5
-1266 2 1 31 0.32768000000000000000e5
-1266 2 7 21 -0.32768000000000000000e5
-1266 2 12 26 -0.32768000000000000000e5
-1266 3 1 34 0.65536000000000000000e5
-1266 3 2 31 -0.32768000000000000000e5
-1266 3 3 32 -0.32768000000000000000e5
-1266 3 13 42 -0.65536000000000000000e5
-1266 3 28 41 -0.32768000000000000000e5
-1266 3 29 42 -0.32768000000000000000e5
-1266 4 3 31 0.32768000000000000000e5
-1267 1 2 33 0.65536000000000000000e5
-1267 1 3 34 -0.13107200000000000000e6
-1267 1 10 41 0.65536000000000000000e5
-1267 1 27 28 0.65536000000000000000e5
-1267 2 7 21 0.65536000000000000000e5
-1267 3 2 31 0.65536000000000000000e5
-1267 3 3 32 0.65536000000000000000e5
-1268 1 11 42 -0.65536000000000000000e5
-1268 1 12 43 -0.13107200000000000000e6
-1268 1 27 29 0.65536000000000000000e5
-1268 1 28 43 0.65536000000000000000e5
-1268 1 32 47 0.65536000000000000000e5
-1268 1 33 48 0.65536000000000000000e5
-1268 2 12 26 0.65536000000000000000e5
-1268 3 13 42 0.13107200000000000000e6
-1268 3 28 41 0.65536000000000000000e5
-1268 3 29 42 0.65536000000000000000e5
-1268 4 3 31 -0.65536000000000000000e5
-1269 1 10 41 -0.65536000000000000000e5
-1269 1 27 30 0.65536000000000000000e5
-1270 1 16 23 -0.65536000000000000000e5
-1270 1 27 31 0.65536000000000000000e5
-1270 3 1 34 0.65536000000000000000e5
-1271 1 16 47 -0.65536000000000000000e5
-1271 1 27 32 0.65536000000000000000e5
-1271 3 12 41 -0.65536000000000000000e5
-1272 1 12 43 -0.65536000000000000000e5
-1272 1 27 33 0.65536000000000000000e5
-1273 1 13 44 -0.65536000000000000000e5
-1273 1 27 35 0.65536000000000000000e5
-1274 1 20 27 -0.65536000000000000000e5
-1274 1 27 36 0.65536000000000000000e5
-1274 3 7 36 0.65536000000000000000e5
-1275 1 7 38 -0.65536000000000000000e5
-1275 1 27 37 0.65536000000000000000e5
-1275 3 22 27 0.65536000000000000000e5
-1276 1 1 48 -0.32768000000000000000e5
-1276 1 2 49 -0.32768000000000000000e5
-1276 1 23 38 -0.32768000000000000000e5
-1276 1 27 38 0.65536000000000000000e5
-1276 2 2 32 -0.32768000000000000000e5
-1277 1 8 39 -0.65536000000000000000e5
-1277 1 9 40 -0.65536000000000000000e5
-1277 1 10 41 0.13107200000000000000e6
-1277 1 26 41 0.65536000000000000000e5
-1277 1 27 39 0.65536000000000000000e5
-1277 1 32 47 -0.13107200000000000000e6
-1277 3 9 38 -0.65536000000000000000e5
-1277 3 28 41 -0.13107200000000000000e6
-1277 4 2 30 -0.65536000000000000000e5
-1278 1 1 48 0.32768000000000000000e5
-1278 1 2 49 0.32768000000000000000e5
-1278 1 8 39 0.65536000000000000000e5
-1278 1 9 40 0.65536000000000000000e5
-1278 1 10 41 -0.13107200000000000000e6
-1278 1 12 43 -0.26214400000000000000e6
-1278 1 23 38 0.32768000000000000000e5
-1278 1 26 41 -0.65536000000000000000e5
-1278 1 27 40 0.65536000000000000000e5
-1278 1 28 43 0.13107200000000000000e6
-1278 1 32 47 0.26214400000000000000e6
-1278 2 2 32 0.32768000000000000000e5
-1278 2 16 30 0.65536000000000000000e5
-1278 2 20 34 0.13107200000000000000e6
-1278 3 9 38 0.65536000000000000000e5
-1278 3 22 35 0.26214400000000000000e6
-1278 3 28 41 0.26214400000000000000e6
-1278 4 2 30 0.65536000000000000000e5
-1278 4 6 34 0.13107200000000000000e6
-1279 1 2 33 0.65536000000000000000e5
-1279 1 3 34 -0.13107200000000000000e6
-1279 1 9 40 -0.32768000000000000000e5
-1279 1 10 41 0.13107200000000000000e6
-1279 1 26 41 0.32768000000000000000e5
-1279 1 27 41 0.65536000000000000000e5
-1279 1 32 47 -0.65536000000000000000e5
-1279 2 7 21 0.65536000000000000000e5
-1279 3 2 31 0.65536000000000000000e5
-1279 3 3 32 0.65536000000000000000e5
-1279 3 8 37 0.32768000000000000000e5
-1279 3 9 38 -0.32768000000000000000e5
-1279 3 22 27 0.32768000000000000000e5
-1279 3 28 41 -0.65536000000000000000e5
-1279 4 1 29 0.32768000000000000000e5
-1279 4 2 30 -0.32768000000000000000e5
-1280 1 12 43 -0.13107200000000000000e6
-1280 1 27 42 0.65536000000000000000e5
-1280 1 28 43 0.65536000000000000000e5
-1280 1 32 47 0.65536000000000000000e5
-1280 2 20 34 0.65536000000000000000e5
-1280 3 22 35 0.13107200000000000000e6
-1280 3 28 41 0.65536000000000000000e5
-1280 4 6 34 0.65536000000000000000e5
-1281 1 27 43 0.65536000000000000000e5
-1281 1 32 47 -0.65536000000000000000e5
-1281 3 28 41 -0.65536000000000000000e5
-1282 1 16 47 -0.65536000000000000000e5
-1282 1 27 44 0.65536000000000000000e5
-1283 1 12 43 -0.65536000000000000000e5
-1283 1 27 45 0.65536000000000000000e5
-1283 3 22 35 0.65536000000000000000e5
-1284 1 27 46 0.65536000000000000000e5
-1284 1 34 41 -0.65536000000000000000e5
-1285 1 1 48 -0.32768000000000000000e5
-1285 1 2 49 -0.32768000000000000000e5
-1285 1 6 53 -0.32768000000000000000e5
-1285 1 23 38 -0.32768000000000000000e5
-1285 1 25 40 0.32768000000000000000e5
-1285 1 27 47 0.65536000000000000000e5
-1285 2 2 32 -0.32768000000000000000e5
-1285 2 4 34 -0.65536000000000000000e5
-1285 2 16 30 -0.65536000000000000000e5
-1285 2 16 34 0.65536000000000000000e5
-1285 2 21 35 0.65536000000000000000e5
-1285 3 5 50 -0.65536000000000000000e5
-1285 3 7 52 0.26214400000000000000e6
-1285 3 24 37 -0.32768000000000000000e5
-1285 3 27 40 -0.65536000000000000000e5
-1285 3 28 41 -0.26214400000000000000e6
-1285 4 4 32 0.32768000000000000000e5
-1285 4 6 34 -0.13107200000000000000e6
-1285 4 7 35 0.65536000000000000000e5
-1285 4 16 28 -0.32768000000000000000e5
-1285 4 17 29 0.65536000000000000000e5
-1286 1 6 53 -0.32768000000000000000e5
-1286 1 8 39 -0.65536000000000000000e5
-1286 1 9 40 -0.65536000000000000000e5
-1286 1 10 41 0.13107200000000000000e6
-1286 1 25 40 0.32768000000000000000e5
-1286 1 26 41 0.65536000000000000000e5
-1286 1 27 48 0.65536000000000000000e5
-1286 1 32 47 -0.13107200000000000000e6
-1286 3 9 38 -0.65536000000000000000e5
-1286 3 24 37 -0.32768000000000000000e5
-1286 3 27 40 -0.13107200000000000000e6
-1286 4 2 30 -0.65536000000000000000e5
-1286 4 4 32 0.32768000000000000000e5
-1286 4 16 28 -0.32768000000000000000e5
-1286 4 17 29 -0.65536000000000000000e5
-1287 1 1 48 0.32768000000000000000e5
-1287 1 2 49 0.32768000000000000000e5
-1287 1 6 53 0.32768000000000000000e5
-1287 1 8 39 0.65536000000000000000e5
-1287 1 9 40 0.65536000000000000000e5
-1287 1 10 41 -0.13107200000000000000e6
-1287 1 12 43 -0.26214400000000000000e6
-1287 1 23 38 0.32768000000000000000e5
-1287 1 25 40 -0.32768000000000000000e5
-1287 1 26 41 -0.65536000000000000000e5
-1287 1 27 49 0.65536000000000000000e5
-1287 1 28 43 0.13107200000000000000e6
-1287 1 32 47 0.26214400000000000000e6
-1287 2 2 32 0.32768000000000000000e5
-1287 2 16 30 0.65536000000000000000e5
-1287 2 20 34 0.13107200000000000000e6
-1287 3 9 38 0.65536000000000000000e5
-1287 3 22 35 0.26214400000000000000e6
-1287 3 24 37 0.32768000000000000000e5
-1287 3 27 40 0.65536000000000000000e5
-1287 3 28 41 0.26214400000000000000e6
-1287 4 2 30 0.65536000000000000000e5
-1287 4 4 32 -0.32768000000000000000e5
-1287 4 6 34 0.13107200000000000000e6
-1287 4 16 28 0.32768000000000000000e5
-1288 1 6 53 -0.16384000000000000000e5
-1288 1 12 43 -0.13107200000000000000e6
-1288 1 25 40 0.16384000000000000000e5
-1288 1 27 50 0.65536000000000000000e5
-1288 1 28 43 0.65536000000000000000e5
-1288 1 32 47 0.65536000000000000000e5
-1288 2 4 34 -0.32768000000000000000e5
-1288 2 20 34 0.65536000000000000000e5
-1288 2 21 35 0.32768000000000000000e5
-1288 3 5 50 -0.32768000000000000000e5
-1288 3 7 52 0.13107200000000000000e6
-1288 3 22 35 0.13107200000000000000e6
-1288 3 24 37 -0.16384000000000000000e5
-1288 3 27 40 -0.65536000000000000000e5
-1288 4 4 32 0.16384000000000000000e5
-1288 4 7 35 0.32768000000000000000e5
-1288 4 16 28 -0.16384000000000000000e5
-1289 1 27 51 0.65536000000000000000e5
-1289 1 32 47 -0.65536000000000000000e5
-1290 1 12 43 -0.65536000000000000000e5
-1290 1 27 52 0.65536000000000000000e5
-1290 3 7 52 0.65536000000000000000e5
-1290 3 22 35 0.65536000000000000000e5
-1291 1 6 53 -0.32768000000000000000e5
-1291 1 8 39 -0.65536000000000000000e5
-1291 1 9 40 -0.65536000000000000000e5
-1291 1 10 41 0.13107200000000000000e6
-1291 1 24 55 0.65536000000000000000e5
-1291 1 25 40 0.32768000000000000000e5
-1291 1 27 53 0.65536000000000000000e5
-1291 1 37 52 -0.13107200000000000000e6
-1291 3 9 38 -0.65536000000000000000e5
-1291 3 22 51 -0.65536000000000000000e5
-1291 3 24 37 -0.32768000000000000000e5
-1291 3 27 40 -0.65536000000000000000e5
-1291 4 2 30 -0.65536000000000000000e5
-1291 4 4 32 0.32768000000000000000e5
-1291 4 16 28 -0.32768000000000000000e5
-1291 4 17 29 -0.65536000000000000000e5
-1291 4 20 32 -0.65536000000000000000e5
-1292 1 1 48 0.32768000000000000000e5
-1292 1 2 49 0.32768000000000000000e5
-1292 1 6 53 0.32768000000000000000e5
-1292 1 8 39 0.65536000000000000000e5
-1292 1 9 40 0.65536000000000000000e5
-1292 1 10 41 -0.13107200000000000000e6
-1292 1 12 43 -0.26214400000000000000e6
-1292 1 23 38 0.32768000000000000000e5
-1292 1 25 40 -0.32768000000000000000e5
-1292 1 26 41 -0.65536000000000000000e5
-1292 1 27 54 0.65536000000000000000e5
-1292 1 28 43 0.13107200000000000000e6
-1292 1 32 47 0.26214400000000000000e6
-1292 2 2 32 0.32768000000000000000e5
-1292 2 16 30 0.65536000000000000000e5
-1292 2 20 34 0.13107200000000000000e6
-1292 3 9 38 0.65536000000000000000e5
-1292 3 22 35 0.26214400000000000000e6
-1292 3 22 51 0.65536000000000000000e5
-1292 3 24 37 0.32768000000000000000e5
-1292 3 27 40 0.65536000000000000000e5
-1292 3 28 41 0.26214400000000000000e6
-1292 4 2 30 0.65536000000000000000e5
-1292 4 4 32 -0.32768000000000000000e5
-1292 4 6 34 0.13107200000000000000e6
-1292 4 16 28 0.32768000000000000000e5
-1293 1 27 55 0.65536000000000000000e5
-1293 1 37 52 -0.65536000000000000000e5
-1294 1 1 48 0.32768000000000000000e5
-1294 1 2 49 0.32768000000000000000e5
-1294 1 6 53 0.32768000000000000000e5
-1294 1 8 39 0.65536000000000000000e5
-1294 1 9 40 0.65536000000000000000e5
-1294 1 10 41 -0.13107200000000000000e6
-1294 1 12 43 -0.26214400000000000000e6
-1294 1 23 38 0.32768000000000000000e5
-1294 1 25 40 -0.32768000000000000000e5
-1294 1 26 41 -0.65536000000000000000e5
-1294 1 27 56 0.65536000000000000000e5
-1294 1 28 43 0.13107200000000000000e6
-1294 1 32 47 0.26214400000000000000e6
-1294 2 2 32 0.32768000000000000000e5
-1294 2 16 30 0.65536000000000000000e5
-1294 2 20 34 0.13107200000000000000e6
-1294 3 9 38 0.65536000000000000000e5
-1294 3 22 35 0.26214400000000000000e6
-1294 3 22 51 0.65536000000000000000e5
-1294 3 24 37 0.32768000000000000000e5
-1294 3 27 40 0.65536000000000000000e5
-1294 3 28 41 0.26214400000000000000e6
-1294 3 37 50 0.65536000000000000000e5
-1294 4 2 30 0.65536000000000000000e5
-1294 4 4 32 -0.32768000000000000000e5
-1294 4 6 34 0.13107200000000000000e6
-1294 4 16 28 0.32768000000000000000e5
-1295 1 11 42 -0.32768000000000000000e5
-1295 1 12 43 -0.65536000000000000000e5
-1295 1 28 28 0.65536000000000000000e5
-1295 1 28 43 0.32768000000000000000e5
-1295 1 32 47 0.32768000000000000000e5
-1295 1 33 48 0.32768000000000000000e5
-1295 2 12 26 0.32768000000000000000e5
-1295 3 13 42 0.65536000000000000000e5
-1295 3 28 41 0.32768000000000000000e5
-1295 3 29 42 0.32768000000000000000e5
-1295 4 3 31 -0.32768000000000000000e5
-1296 1 10 41 -0.65536000000000000000e5
-1296 1 28 29 0.65536000000000000000e5
-1297 1 10 41 0.65536000000000000000e5
-1297 1 11 42 0.65536000000000000000e5
-1297 1 28 30 0.65536000000000000000e5
-1297 1 28 43 -0.65536000000000000000e5
-1297 1 32 47 -0.65536000000000000000e5
-1297 1 33 48 -0.65536000000000000000e5
-1297 3 13 42 -0.13107200000000000000e6
-1297 3 28 41 -0.65536000000000000000e5
-1297 3 29 42 -0.65536000000000000000e5
-1297 4 3 31 0.65536000000000000000e5
-1298 1 16 47 -0.65536000000000000000e5
-1298 1 28 31 0.65536000000000000000e5
-1298 3 12 41 -0.65536000000000000000e5
-1299 1 12 43 -0.65536000000000000000e5
-1299 1 28 32 0.65536000000000000000e5
-1300 1 17 48 -0.65536000000000000000e5
-1300 1 28 33 0.65536000000000000000e5
-1300 3 13 42 -0.65536000000000000000e5
-1301 1 13 44 -0.65536000000000000000e5
-1301 1 28 34 0.65536000000000000000e5
-1302 1 4 35 -0.32768000000000000000e5
-1302 1 12 43 -0.32768000000000000000e5
-1302 1 14 45 -0.65536000000000000000e5
-1302 1 17 48 0.32768000000000000000e5
-1302 1 18 49 0.32768000000000000000e5
-1302 1 28 35 0.65536000000000000000e5
-1302 2 9 23 -0.32768000000000000000e5
-1302 2 14 28 0.32768000000000000000e5
-1302 3 5 34 -0.32768000000000000000e5
-1302 3 13 42 0.32768000000000000000e5
-1302 3 14 27 -0.32768000000000000000e5
-1302 3 14 43 0.32768000000000000000e5
-1302 3 16 29 0.65536000000000000000e5
-1303 1 3 18 -0.16384000000000000000e5
-1303 1 4 19 0.32768000000000000000e5
-1303 1 5 36 0.32768000000000000000e5
-1303 1 12 43 0.16384000000000000000e5
-1303 1 13 44 -0.32768000000000000000e5
-1303 1 14 45 -0.32768000000000000000e5
-1303 1 17 32 -0.65536000000000000000e5
-1303 1 28 36 0.65536000000000000000e5
-1303 3 3 16 -0.16384000000000000000e5
-1303 3 4 17 -0.16384000000000000000e5
-1303 3 14 27 0.16384000000000000000e5
-1303 3 16 29 0.32768000000000000000e5
-1303 4 2 14 -0.16384000000000000000e5
-1303 4 11 23 0.32768000000000000000e5
-1304 1 1 48 -0.32768000000000000000e5
-1304 1 2 49 -0.32768000000000000000e5
-1304 1 23 38 -0.32768000000000000000e5
-1304 1 28 37 0.65536000000000000000e5
-1304 2 2 32 -0.32768000000000000000e5
-1305 1 8 39 -0.65536000000000000000e5
-1305 1 9 40 -0.65536000000000000000e5
-1305 1 10 41 0.13107200000000000000e6
-1305 1 26 41 0.65536000000000000000e5
-1305 1 28 38 0.65536000000000000000e5
-1305 1 32 47 -0.13107200000000000000e6
-1305 3 9 38 -0.65536000000000000000e5
-1305 3 28 41 -0.13107200000000000000e6
-1305 4 2 30 -0.65536000000000000000e5
-1306 1 1 48 0.32768000000000000000e5
-1306 1 2 49 0.32768000000000000000e5
-1306 1 8 39 0.65536000000000000000e5
-1306 1 9 40 0.65536000000000000000e5
-1306 1 10 41 -0.13107200000000000000e6
-1306 1 12 43 -0.26214400000000000000e6
-1306 1 23 38 0.32768000000000000000e5
-1306 1 26 41 -0.65536000000000000000e5
-1306 1 28 39 0.65536000000000000000e5
-1306 1 28 43 0.13107200000000000000e6
-1306 1 32 47 0.26214400000000000000e6
-1306 2 2 32 0.32768000000000000000e5
-1306 2 16 30 0.65536000000000000000e5
-1306 2 20 34 0.13107200000000000000e6
-1306 3 9 38 0.65536000000000000000e5
-1306 3 22 35 0.26214400000000000000e6
-1306 3 28 41 0.26214400000000000000e6
-1306 4 2 30 0.65536000000000000000e5
-1306 4 6 34 0.13107200000000000000e6
-1307 1 26 41 -0.65536000000000000000e5
-1307 1 28 40 0.65536000000000000000e5
-1308 1 12 43 -0.13107200000000000000e6
-1308 1 28 41 0.65536000000000000000e5
-1308 1 28 43 0.65536000000000000000e5
-1308 1 32 47 0.65536000000000000000e5
-1308 2 20 34 0.65536000000000000000e5
-1308 3 22 35 0.13107200000000000000e6
-1308 3 28 41 0.65536000000000000000e5
-1308 4 6 34 0.65536000000000000000e5
-1309 1 28 42 0.65536000000000000000e5
-1309 1 32 47 -0.65536000000000000000e5
-1309 3 28 41 -0.65536000000000000000e5
-1310 1 12 43 -0.65536000000000000000e5
-1310 1 28 44 0.65536000000000000000e5
-1310 3 22 35 0.65536000000000000000e5
-1311 1 17 48 -0.65536000000000000000e5
-1311 1 28 45 0.65536000000000000000e5
-1312 1 4 35 -0.32768000000000000000e5
-1312 1 12 43 -0.32768000000000000000e5
-1312 1 28 46 0.65536000000000000000e5
-1312 1 34 49 -0.32768000000000000000e5
-1312 2 9 23 -0.32768000000000000000e5
-1312 3 5 34 -0.32768000000000000000e5
-1312 3 13 42 0.32768000000000000000e5
-1312 3 14 27 -0.32768000000000000000e5
-1312 3 16 29 0.65536000000000000000e5
-1312 3 18 47 -0.32768000000000000000e5
-1312 3 22 35 0.32768000000000000000e5
-1312 4 14 26 0.32768000000000000000e5
-1313 1 6 53 -0.32768000000000000000e5
-1313 1 8 39 -0.65536000000000000000e5
-1313 1 9 40 -0.65536000000000000000e5
-1313 1 10 41 0.13107200000000000000e6
-1313 1 25 40 0.32768000000000000000e5
-1313 1 26 41 0.65536000000000000000e5
-1313 1 28 47 0.65536000000000000000e5
-1313 1 32 47 -0.13107200000000000000e6
-1313 3 9 38 -0.65536000000000000000e5
-1313 3 24 37 -0.32768000000000000000e5
-1313 3 27 40 -0.13107200000000000000e6
-1313 4 2 30 -0.65536000000000000000e5
-1313 4 4 32 0.32768000000000000000e5
-1313 4 16 28 -0.32768000000000000000e5
-1313 4 17 29 -0.65536000000000000000e5
-1314 1 1 48 0.32768000000000000000e5
-1314 1 2 49 0.32768000000000000000e5
-1314 1 6 53 0.32768000000000000000e5
-1314 1 8 39 0.65536000000000000000e5
-1314 1 9 40 0.65536000000000000000e5
-1314 1 10 41 -0.13107200000000000000e6
-1314 1 12 43 -0.26214400000000000000e6
-1314 1 23 38 0.32768000000000000000e5
-1314 1 25 40 -0.32768000000000000000e5
-1314 1 26 41 -0.65536000000000000000e5
-1314 1 28 43 0.13107200000000000000e6
-1314 1 28 48 0.65536000000000000000e5
-1314 1 32 47 0.26214400000000000000e6
-1314 2 2 32 0.32768000000000000000e5
-1314 2 16 30 0.65536000000000000000e5
-1314 2 20 34 0.13107200000000000000e6
-1314 3 9 38 0.65536000000000000000e5
-1314 3 22 35 0.26214400000000000000e6
-1314 3 24 37 0.32768000000000000000e5
-1314 3 27 40 0.65536000000000000000e5
-1314 3 28 41 0.26214400000000000000e6
-1314 4 2 30 0.65536000000000000000e5
-1314 4 4 32 -0.32768000000000000000e5
-1314 4 6 34 0.13107200000000000000e6
-1314 4 16 28 0.32768000000000000000e5
-1315 1 26 41 -0.65536000000000000000e5
-1315 1 28 49 0.65536000000000000000e5
-1315 3 27 40 0.65536000000000000000e5
-1316 1 28 50 0.65536000000000000000e5
-1316 1 32 47 -0.65536000000000000000e5
-1317 1 6 53 0.16384000000000000000e5
-1317 1 25 40 -0.16384000000000000000e5
-1317 1 28 43 -0.65536000000000000000e5
-1317 1 28 51 0.65536000000000000000e5
-1317 2 4 34 0.32768000000000000000e5
-1317 2 21 35 -0.32768000000000000000e5
-1317 3 5 50 0.32768000000000000000e5
-1317 3 24 37 0.16384000000000000000e5
-1317 3 27 40 0.65536000000000000000e5
-1317 4 4 32 -0.16384000000000000000e5
-1317 4 7 35 -0.32768000000000000000e5
-1317 4 16 28 0.16384000000000000000e5
-1318 1 6 53 0.81920000000000000000e4
-1318 1 17 48 -0.65536000000000000000e5
-1318 1 25 40 -0.81920000000000000000e4
-1318 1 28 52 0.65536000000000000000e5
-1318 2 4 34 0.16384000000000000000e5
-1318 2 21 35 -0.16384000000000000000e5
-1318 3 5 50 0.16384000000000000000e5
-1318 3 24 37 0.81920000000000000000e4
-1318 3 27 40 0.32768000000000000000e5
-1318 3 28 41 0.32768000000000000000e5
-1318 3 29 42 0.32768000000000000000e5
-1318 4 4 32 -0.81920000000000000000e4
-1318 4 7 35 -0.16384000000000000000e5
-1318 4 16 28 0.81920000000000000000e4
-1318 4 23 27 0.32768000000000000000e5
-1319 1 1 48 0.32768000000000000000e5
-1319 1 2 49 0.32768000000000000000e5
-1319 1 6 53 0.32768000000000000000e5
-1319 1 8 39 0.65536000000000000000e5
-1319 1 9 40 0.65536000000000000000e5
-1319 1 10 41 -0.13107200000000000000e6
-1319 1 12 43 -0.26214400000000000000e6
-1319 1 23 38 0.32768000000000000000e5
-1319 1 25 40 -0.32768000000000000000e5
-1319 1 26 41 -0.65536000000000000000e5
-1319 1 28 43 0.13107200000000000000e6
-1319 1 28 53 0.65536000000000000000e5
-1319 1 32 47 0.26214400000000000000e6
-1319 2 2 32 0.32768000000000000000e5
-1319 2 16 30 0.65536000000000000000e5
-1319 2 20 34 0.13107200000000000000e6
-1319 3 9 38 0.65536000000000000000e5
-1319 3 22 35 0.26214400000000000000e6
-1319 3 22 51 0.65536000000000000000e5
-1319 3 24 37 0.32768000000000000000e5
-1319 3 27 40 0.65536000000000000000e5
-1319 3 28 41 0.26214400000000000000e6
-1319 4 2 30 0.65536000000000000000e5
-1319 4 4 32 -0.32768000000000000000e5
-1319 4 6 34 0.13107200000000000000e6
-1319 4 16 28 0.32768000000000000000e5
-1320 1 24 55 -0.65536000000000000000e5
-1320 1 28 54 0.65536000000000000000e5
-1321 1 6 53 0.16384000000000000000e5
-1321 1 25 40 -0.16384000000000000000e5
-1321 1 28 43 -0.65536000000000000000e5
-1321 1 28 55 0.65536000000000000000e5
-1321 2 4 34 0.32768000000000000000e5
-1321 2 21 35 -0.32768000000000000000e5
-1321 3 5 50 0.32768000000000000000e5
-1321 3 23 52 0.65536000000000000000e5
-1321 3 24 37 0.16384000000000000000e5
-1321 3 27 40 0.65536000000000000000e5
-1321 4 4 32 -0.16384000000000000000e5
-1321 4 7 35 -0.32768000000000000000e5
-1321 4 16 28 0.16384000000000000000e5
-1322 1 28 56 0.65536000000000000000e5
-1322 1 41 56 -0.65536000000000000000e5
-1322 3 27 56 -0.65536000000000000000e5
-1323 1 10 41 0.32768000000000000000e5
-1323 1 11 42 0.32768000000000000000e5
-1323 1 28 43 -0.32768000000000000000e5
-1323 1 29 29 0.65536000000000000000e5
-1323 1 32 47 -0.32768000000000000000e5
-1323 1 33 48 -0.32768000000000000000e5
-1323 3 13 42 -0.65536000000000000000e5
-1323 3 28 41 -0.32768000000000000000e5
-1323 3 29 42 -0.32768000000000000000e5
-1323 4 3 31 0.32768000000000000000e5
-1324 1 11 42 -0.65536000000000000000e5
-1324 1 29 30 0.65536000000000000000e5
-1325 1 12 43 -0.65536000000000000000e5
-1325 1 29 31 0.65536000000000000000e5
-1326 1 17 48 -0.65536000000000000000e5
-1326 1 29 32 0.65536000000000000000e5
-1326 3 13 42 -0.65536000000000000000e5
-1327 1 14 45 -0.13107200000000000000e6
-1327 1 17 48 0.65536000000000000000e5
-1327 1 18 49 0.65536000000000000000e5
-1327 1 29 33 0.65536000000000000000e5
-1327 2 14 28 0.65536000000000000000e5
-1327 3 13 42 0.65536000000000000000e5
-1327 3 14 43 0.65536000000000000000e5
-1328 1 4 35 -0.32768000000000000000e5
-1328 1 12 43 -0.32768000000000000000e5
-1328 1 14 45 -0.65536000000000000000e5
-1328 1 17 48 0.32768000000000000000e5
-1328 1 18 49 0.32768000000000000000e5
-1328 1 29 34 0.65536000000000000000e5
-1328 2 9 23 -0.32768000000000000000e5
-1328 2 14 28 0.32768000000000000000e5
-1328 3 5 34 -0.32768000000000000000e5
-1328 3 13 42 0.32768000000000000000e5
-1328 3 14 27 -0.32768000000000000000e5
-1328 3 14 43 0.32768000000000000000e5
-1328 3 16 29 0.65536000000000000000e5
-1329 1 14 45 -0.65536000000000000000e5
-1329 1 29 35 0.65536000000000000000e5
-1330 1 13 20 -0.13107200000000000000e6
-1330 1 17 32 0.65536000000000000000e5
-1330 1 20 27 0.65536000000000000000e5
-1330 1 29 36 0.65536000000000000000e5
-1330 2 11 25 0.65536000000000000000e5
-1330 3 8 21 0.13107200000000000000e6
-1330 3 18 31 0.65536000000000000000e5
-1331 1 8 39 -0.65536000000000000000e5
-1331 1 9 40 -0.65536000000000000000e5
-1331 1 10 41 0.13107200000000000000e6
-1331 1 26 41 0.65536000000000000000e5
-1331 1 29 37 0.65536000000000000000e5
-1331 1 32 47 -0.13107200000000000000e6
-1331 3 9 38 -0.65536000000000000000e5
-1331 3 28 41 -0.13107200000000000000e6
-1331 4 2 30 -0.65536000000000000000e5
-1332 1 1 48 0.32768000000000000000e5
-1332 1 2 49 0.32768000000000000000e5
-1332 1 8 39 0.65536000000000000000e5
-1332 1 9 40 0.65536000000000000000e5
-1332 1 10 41 -0.13107200000000000000e6
-1332 1 12 43 -0.26214400000000000000e6
-1332 1 23 38 0.32768000000000000000e5
-1332 1 26 41 -0.65536000000000000000e5
-1332 1 28 43 0.13107200000000000000e6
-1332 1 29 38 0.65536000000000000000e5
-1332 1 32 47 0.26214400000000000000e6
-1332 2 2 32 0.32768000000000000000e5
-1332 2 16 30 0.65536000000000000000e5
-1332 2 20 34 0.13107200000000000000e6
-1332 3 9 38 0.65536000000000000000e5
-1332 3 22 35 0.26214400000000000000e6
-1332 3 28 41 0.26214400000000000000e6
-1332 4 2 30 0.65536000000000000000e5
-1332 4 6 34 0.13107200000000000000e6
-1333 1 26 41 -0.65536000000000000000e5
-1333 1 29 39 0.65536000000000000000e5
-1334 1 1 48 -0.32768000000000000000e5
-1334 1 2 49 -0.32768000000000000000e5
-1334 1 8 39 -0.65536000000000000000e5
-1334 1 9 40 -0.65536000000000000000e5
-1334 1 10 41 0.13107200000000000000e6
-1334 1 12 43 0.26214400000000000000e6
-1334 1 23 38 -0.32768000000000000000e5
-1334 1 26 41 0.13107200000000000000e6
-1334 1 28 43 -0.26214400000000000000e6
-1334 1 29 40 0.65536000000000000000e5
-1334 1 32 47 -0.26214400000000000000e6
-1334 2 2 32 -0.32768000000000000000e5
-1334 2 4 34 0.65536000000000000000e5
-1334 2 16 30 -0.65536000000000000000e5
-1334 2 20 34 -0.13107200000000000000e6
-1334 3 9 38 -0.65536000000000000000e5
-1334 3 22 35 -0.26214400000000000000e6
-1334 3 28 41 -0.26214400000000000000e6
-1334 4 2 30 -0.65536000000000000000e5
-1334 4 6 34 -0.13107200000000000000e6
-1335 1 29 41 0.65536000000000000000e5
-1335 1 32 47 -0.65536000000000000000e5
-1335 3 28 41 -0.65536000000000000000e5
-1336 1 28 43 -0.65536000000000000000e5
-1336 1 29 42 0.65536000000000000000e5
-1337 1 29 43 0.65536000000000000000e5
-1337 1 33 48 -0.65536000000000000000e5
-1337 3 29 42 -0.65536000000000000000e5
-1338 1 17 48 -0.65536000000000000000e5
-1338 1 29 44 0.65536000000000000000e5
-1339 1 29 45 0.65536000000000000000e5
-1339 1 34 49 -0.65536000000000000000e5
-1339 3 18 47 -0.65536000000000000000e5
-1340 1 14 45 -0.13107200000000000000e6
-1340 1 17 48 0.32768000000000000000e5
-1340 1 18 49 0.32768000000000000000e5
-1340 1 29 46 0.65536000000000000000e5
-1340 1 34 49 0.32768000000000000000e5
-1340 2 14 28 0.32768000000000000000e5
-1340 3 14 43 0.32768000000000000000e5
-1340 3 15 44 -0.65536000000000000000e5
-1340 3 16 45 0.13107200000000000000e6
-1340 3 18 47 0.32768000000000000000e5
-1340 3 22 35 -0.32768000000000000000e5
-1340 4 14 26 -0.32768000000000000000e5
-1340 4 15 27 -0.65536000000000000000e5
-1341 1 1 48 0.32768000000000000000e5
-1341 1 2 49 0.32768000000000000000e5
-1341 1 6 53 0.32768000000000000000e5
-1341 1 8 39 0.65536000000000000000e5
-1341 1 9 40 0.65536000000000000000e5
-1341 1 10 41 -0.13107200000000000000e6
-1341 1 12 43 -0.26214400000000000000e6
-1341 1 23 38 0.32768000000000000000e5
-1341 1 25 40 -0.32768000000000000000e5
-1341 1 26 41 -0.65536000000000000000e5
-1341 1 28 43 0.13107200000000000000e6
-1341 1 29 47 0.65536000000000000000e5
-1341 1 32 47 0.26214400000000000000e6
-1341 2 2 32 0.32768000000000000000e5
-1341 2 16 30 0.65536000000000000000e5
-1341 2 20 34 0.13107200000000000000e6
-1341 3 9 38 0.65536000000000000000e5
-1341 3 22 35 0.26214400000000000000e6
-1341 3 24 37 0.32768000000000000000e5
-1341 3 27 40 0.65536000000000000000e5
-1341 3 28 41 0.26214400000000000000e6
-1341 4 2 30 0.65536000000000000000e5
-1341 4 4 32 -0.32768000000000000000e5
-1341 4 6 34 0.13107200000000000000e6
-1341 4 16 28 0.32768000000000000000e5
-1342 1 26 41 -0.65536000000000000000e5
-1342 1 29 48 0.65536000000000000000e5
-1342 3 27 40 0.65536000000000000000e5
-1343 1 1 48 -0.32768000000000000000e5
-1343 1 2 49 -0.32768000000000000000e5
-1343 1 8 39 -0.65536000000000000000e5
-1343 1 9 40 -0.65536000000000000000e5
-1343 1 10 41 0.13107200000000000000e6
-1343 1 12 43 0.26214400000000000000e6
-1343 1 23 38 -0.32768000000000000000e5
-1343 1 26 41 0.13107200000000000000e6
-1343 1 28 43 -0.26214400000000000000e6
-1343 1 29 49 0.65536000000000000000e5
-1343 1 32 47 -0.26214400000000000000e6
-1343 2 2 32 -0.32768000000000000000e5
-1343 2 4 34 0.65536000000000000000e5
-1343 2 16 30 -0.65536000000000000000e5
-1343 2 20 34 -0.13107200000000000000e6
-1343 3 5 50 0.65536000000000000000e5
-1343 3 9 38 -0.65536000000000000000e5
-1343 3 22 35 -0.26214400000000000000e6
-1343 3 28 41 -0.26214400000000000000e6
-1343 4 2 30 -0.65536000000000000000e5
-1343 4 6 34 -0.13107200000000000000e6
-1344 1 6 53 0.16384000000000000000e5
-1344 1 25 40 -0.16384000000000000000e5
-1344 1 28 43 -0.65536000000000000000e5
-1344 1 29 50 0.65536000000000000000e5
-1344 2 4 34 0.32768000000000000000e5
-1344 2 21 35 -0.32768000000000000000e5
-1344 3 5 50 0.32768000000000000000e5
-1344 3 24 37 0.16384000000000000000e5
-1344 3 27 40 0.65536000000000000000e5
-1344 4 4 32 -0.16384000000000000000e5
-1344 4 7 35 -0.32768000000000000000e5
-1344 4 16 28 0.16384000000000000000e5
-1345 1 29 51 0.65536000000000000000e5
-1345 1 33 48 -0.65536000000000000000e5
-1346 1 29 52 0.65536000000000000000e5
-1346 1 34 49 -0.65536000000000000000e5
-1347 1 24 55 -0.65536000000000000000e5
-1347 1 29 53 0.65536000000000000000e5
-1348 1 1 48 -0.32768000000000000000e5
-1348 1 2 49 -0.32768000000000000000e5
-1348 1 8 39 -0.65536000000000000000e5
-1348 1 9 40 -0.65536000000000000000e5
-1348 1 10 41 0.13107200000000000000e6
-1348 1 12 43 0.26214400000000000000e6
-1348 1 23 38 -0.32768000000000000000e5
-1348 1 24 55 0.65536000000000000000e5
-1348 1 26 41 0.65536000000000000000e5
-1348 1 28 43 -0.26214400000000000000e6
-1348 1 29 54 0.65536000000000000000e5
-1348 1 32 47 -0.26214400000000000000e6
-1348 2 2 32 -0.32768000000000000000e5
-1348 2 4 34 0.65536000000000000000e5
-1348 2 16 30 -0.65536000000000000000e5
-1348 2 20 34 -0.13107200000000000000e6
-1348 3 5 50 0.65536000000000000000e5
-1348 3 9 38 -0.65536000000000000000e5
-1348 3 22 35 -0.26214400000000000000e6
-1348 3 22 51 -0.65536000000000000000e5
-1348 3 23 52 0.13107200000000000000e6
-1348 3 27 40 0.65536000000000000000e5
-1348 3 28 41 -0.26214400000000000000e6
-1348 4 2 30 -0.65536000000000000000e5
-1348 4 6 34 -0.13107200000000000000e6
-1348 4 7 35 -0.65536000000000000000e5
-1349 1 29 55 0.65536000000000000000e5
-1349 1 33 48 -0.65536000000000000000e5
-1349 3 10 55 -0.65536000000000000000e5
-1349 3 35 48 0.13107200000000000000e6
-1349 3 40 45 -0.65536000000000000000e5
-1349 4 22 34 -0.65536000000000000000e5
-1350 1 1 48 -0.32768000000000000000e5
-1350 1 2 49 -0.32768000000000000000e5
-1350 1 8 39 -0.65536000000000000000e5
-1350 1 9 40 -0.65536000000000000000e5
-1350 1 10 41 0.13107200000000000000e6
-1350 1 12 43 0.26214400000000000000e6
-1350 1 23 38 -0.32768000000000000000e5
-1350 1 24 55 0.65536000000000000000e5
-1350 1 26 41 0.65536000000000000000e5
-1350 1 28 43 -0.26214400000000000000e6
-1350 1 29 56 0.65536000000000000000e5
-1350 1 32 47 -0.26214400000000000000e6
-1350 2 2 32 -0.32768000000000000000e5
-1350 2 4 34 0.65536000000000000000e5
-1350 2 16 30 -0.65536000000000000000e5
-1350 2 20 34 -0.13107200000000000000e6
-1350 3 5 50 0.65536000000000000000e5
-1350 3 9 38 -0.65536000000000000000e5
-1350 3 22 35 -0.26214400000000000000e6
-1350 3 22 51 -0.65536000000000000000e5
-1350 3 23 52 0.13107200000000000000e6
-1350 3 27 40 0.65536000000000000000e5
-1350 3 28 41 -0.26214400000000000000e6
-1350 3 38 51 0.65536000000000000000e5
-1350 4 2 30 -0.65536000000000000000e5
-1350 4 6 34 -0.13107200000000000000e6
-1350 4 7 35 -0.65536000000000000000e5
-1351 1 26 33 -0.32768000000000000000e5
-1351 1 30 30 0.65536000000000000000e5
-1352 1 17 48 -0.65536000000000000000e5
-1352 1 30 31 0.65536000000000000000e5
-1352 3 13 42 -0.65536000000000000000e5
-1353 1 14 45 -0.13107200000000000000e6
-1353 1 17 48 0.65536000000000000000e5
-1353 1 18 49 0.65536000000000000000e5
-1353 1 30 32 0.65536000000000000000e5
-1353 2 14 28 0.65536000000000000000e5
-1353 3 13 42 0.65536000000000000000e5
-1353 3 14 43 0.65536000000000000000e5
-1354 1 18 49 -0.65536000000000000000e5
-1354 1 30 33 0.65536000000000000000e5
-1354 3 14 43 -0.65536000000000000000e5
-1355 1 14 45 -0.65536000000000000000e5
-1355 1 30 34 0.65536000000000000000e5
-1356 1 11 18 -0.65536000000000000000e5
-1356 1 30 35 0.65536000000000000000e5
-1356 3 6 19 0.65536000000000000000e5
-1356 3 17 30 0.65536000000000000000e5
-1357 1 15 46 -0.65536000000000000000e5
-1357 1 30 36 0.65536000000000000000e5
-1358 1 1 48 0.32768000000000000000e5
-1358 1 2 49 0.32768000000000000000e5
-1358 1 8 39 0.65536000000000000000e5
-1358 1 9 40 0.65536000000000000000e5
-1358 1 10 41 -0.13107200000000000000e6
-1358 1 12 43 -0.26214400000000000000e6
-1358 1 23 38 0.32768000000000000000e5
-1358 1 26 41 -0.65536000000000000000e5
-1358 1 28 43 0.13107200000000000000e6
-1358 1 30 37 0.65536000000000000000e5
-1358 1 32 47 0.26214400000000000000e6
-1358 2 2 32 0.32768000000000000000e5
-1358 2 16 30 0.65536000000000000000e5
-1358 2 20 34 0.13107200000000000000e6
-1358 3 9 38 0.65536000000000000000e5
-1358 3 22 35 0.26214400000000000000e6
-1358 3 28 41 0.26214400000000000000e6
-1358 4 2 30 0.65536000000000000000e5
-1358 4 6 34 0.13107200000000000000e6
-1359 1 26 41 -0.65536000000000000000e5
-1359 1 30 38 0.65536000000000000000e5
-1360 1 1 48 -0.32768000000000000000e5
-1360 1 2 49 -0.32768000000000000000e5
-1360 1 8 39 -0.65536000000000000000e5
-1360 1 9 40 -0.65536000000000000000e5
-1360 1 10 41 0.13107200000000000000e6
-1360 1 12 43 0.26214400000000000000e6
-1360 1 23 38 -0.32768000000000000000e5
-1360 1 26 41 0.13107200000000000000e6
-1360 1 28 43 -0.26214400000000000000e6
-1360 1 30 39 0.65536000000000000000e5
-1360 1 32 47 -0.26214400000000000000e6
-1360 2 2 32 -0.32768000000000000000e5
-1360 2 4 34 0.65536000000000000000e5
-1360 2 16 30 -0.65536000000000000000e5
-1360 2 20 34 -0.13107200000000000000e6
-1360 3 9 38 -0.65536000000000000000e5
-1360 3 22 35 -0.26214400000000000000e6
-1360 3 28 41 -0.26214400000000000000e6
-1360 4 2 30 -0.65536000000000000000e5
-1360 4 6 34 -0.13107200000000000000e6
-1361 1 1 48 0.32768000000000000000e5
-1361 1 2 49 0.32768000000000000000e5
-1361 1 8 39 0.65536000000000000000e5
-1361 1 9 40 0.65536000000000000000e5
-1361 1 10 41 -0.13107200000000000000e6
-1361 1 12 43 -0.26214400000000000000e6
-1361 1 23 38 0.32768000000000000000e5
-1361 1 26 41 -0.65536000000000000000e5
-1361 1 28 43 0.26214400000000000000e6
-1361 1 30 40 0.65536000000000000000e5
-1361 1 32 47 0.26214400000000000000e6
-1361 1 33 48 -0.13107200000000000000e6
-1361 2 2 32 0.32768000000000000000e5
-1361 2 4 34 -0.65536000000000000000e5
-1361 2 16 30 0.65536000000000000000e5
-1361 2 20 34 0.13107200000000000000e6
-1361 2 28 34 0.65536000000000000000e5
-1361 3 9 38 0.65536000000000000000e5
-1361 3 22 35 0.26214400000000000000e6
-1361 3 28 41 0.26214400000000000000e6
-1361 3 29 42 -0.13107200000000000000e6
-1361 4 2 30 0.65536000000000000000e5
-1361 4 6 34 0.13107200000000000000e6
-1361 4 18 30 0.65536000000000000000e5
-1361 4 21 33 0.65536000000000000000e5
-1362 1 28 43 -0.65536000000000000000e5
-1362 1 30 41 0.65536000000000000000e5
-1363 1 30 42 0.65536000000000000000e5
-1363 1 33 48 -0.65536000000000000000e5
-1363 3 29 42 -0.65536000000000000000e5
-1364 1 30 43 0.65536000000000000000e5
-1364 1 33 40 -0.65536000000000000000e5
-1365 1 30 44 0.65536000000000000000e5
-1365 1 34 49 -0.65536000000000000000e5
-1365 3 18 47 -0.65536000000000000000e5
-1366 1 18 49 -0.65536000000000000000e5
-1366 1 30 45 0.65536000000000000000e5
-1367 1 11 18 -0.65536000000000000000e5
-1367 1 30 46 0.65536000000000000000e5
-1367 3 6 19 0.65536000000000000000e5
-1367 3 15 44 0.65536000000000000000e5
-1367 3 17 30 0.65536000000000000000e5
-1368 1 26 41 -0.65536000000000000000e5
-1368 1 30 47 0.65536000000000000000e5
-1368 3 27 40 0.65536000000000000000e5
-1369 1 1 48 -0.32768000000000000000e5
-1369 1 2 49 -0.32768000000000000000e5
-1369 1 8 39 -0.65536000000000000000e5
-1369 1 9 40 -0.65536000000000000000e5
-1369 1 10 41 0.13107200000000000000e6
-1369 1 12 43 0.26214400000000000000e6
-1369 1 23 38 -0.32768000000000000000e5
-1369 1 26 41 0.13107200000000000000e6
-1369 1 28 43 -0.26214400000000000000e6
-1369 1 30 48 0.65536000000000000000e5
-1369 1 32 47 -0.26214400000000000000e6
-1369 2 2 32 -0.32768000000000000000e5
-1369 2 4 34 0.65536000000000000000e5
-1369 2 16 30 -0.65536000000000000000e5
-1369 2 20 34 -0.13107200000000000000e6
-1369 3 5 50 0.65536000000000000000e5
-1369 3 9 38 -0.65536000000000000000e5
-1369 3 22 35 -0.26214400000000000000e6
-1369 3 28 41 -0.26214400000000000000e6
-1369 4 2 30 -0.65536000000000000000e5
-1369 4 6 34 -0.13107200000000000000e6
-1370 1 1 48 0.32768000000000000000e5
-1370 1 2 49 0.32768000000000000000e5
-1370 1 8 39 0.65536000000000000000e5
-1370 1 9 40 0.65536000000000000000e5
-1370 1 10 41 -0.13107200000000000000e6
-1370 1 12 43 -0.26214400000000000000e6
-1370 1 23 38 0.32768000000000000000e5
-1370 1 26 41 -0.65536000000000000000e5
-1370 1 28 43 0.26214400000000000000e6
-1370 1 30 49 0.65536000000000000000e5
-1370 1 32 47 0.26214400000000000000e6
-1370 1 33 48 -0.13107200000000000000e6
-1370 2 2 32 0.32768000000000000000e5
-1370 2 4 34 -0.65536000000000000000e5
-1370 2 16 30 0.65536000000000000000e5
-1370 2 20 34 0.13107200000000000000e6
-1370 2 28 34 0.65536000000000000000e5
-1370 3 5 50 -0.65536000000000000000e5
-1370 3 9 38 0.65536000000000000000e5
-1370 3 22 35 0.26214400000000000000e6
-1370 3 27 40 -0.65536000000000000000e5
-1370 3 28 41 0.26214400000000000000e6
-1370 4 2 30 0.65536000000000000000e5
-1370 4 6 34 0.13107200000000000000e6
-1370 4 21 33 0.65536000000000000000e5
-1371 1 30 50 0.65536000000000000000e5
-1371 1 33 48 -0.65536000000000000000e5
-1372 1 30 51 0.65536000000000000000e5
-1372 1 33 40 -0.65536000000000000000e5
-1372 3 14 51 0.13107200000000000000e6
-1372 3 29 42 -0.65536000000000000000e5
-1372 3 30 43 -0.65536000000000000000e5
-1372 4 19 31 -0.65536000000000000000e5
-1373 1 18 49 -0.65536000000000000000e5
-1373 1 30 52 0.65536000000000000000e5
-1373 3 14 51 0.65536000000000000000e5
-1374 1 1 48 -0.32768000000000000000e5
-1374 1 2 49 -0.32768000000000000000e5
-1374 1 8 39 -0.65536000000000000000e5
-1374 1 9 40 -0.65536000000000000000e5
-1374 1 10 41 0.13107200000000000000e6
-1374 1 12 43 0.26214400000000000000e6
-1374 1 23 38 -0.32768000000000000000e5
-1374 1 24 55 0.65536000000000000000e5
-1374 1 26 41 0.65536000000000000000e5
-1374 1 28 43 -0.26214400000000000000e6
-1374 1 30 53 0.65536000000000000000e5
-1374 1 32 47 -0.26214400000000000000e6
-1374 2 2 32 -0.32768000000000000000e5
-1374 2 4 34 0.65536000000000000000e5
-1374 2 16 30 -0.65536000000000000000e5
-1374 2 20 34 -0.13107200000000000000e6
-1374 3 5 50 0.65536000000000000000e5
-1374 3 9 38 -0.65536000000000000000e5
-1374 3 22 35 -0.26214400000000000000e6
-1374 3 22 51 -0.65536000000000000000e5
-1374 3 23 52 0.13107200000000000000e6
-1374 3 27 40 0.65536000000000000000e5
-1374 3 28 41 -0.26214400000000000000e6
-1374 4 2 30 -0.65536000000000000000e5
-1374 4 6 34 -0.13107200000000000000e6
-1374 4 7 35 -0.65536000000000000000e5
-1375 1 1 48 0.32768000000000000000e5
-1375 1 2 49 0.32768000000000000000e5
-1375 1 8 39 0.65536000000000000000e5
-1375 1 9 40 0.65536000000000000000e5
-1375 1 10 41 -0.13107200000000000000e6
-1375 1 12 43 -0.26214400000000000000e6
-1375 1 23 38 0.32768000000000000000e5
-1375 1 26 41 -0.65536000000000000000e5
-1375 1 28 43 0.26214400000000000000e6
-1375 1 30 54 0.65536000000000000000e5
-1375 1 32 47 0.26214400000000000000e6
-1375 1 33 48 -0.13107200000000000000e6
-1375 2 2 32 0.32768000000000000000e5
-1375 2 4 34 -0.65536000000000000000e5
-1375 2 16 30 0.65536000000000000000e5
-1375 2 20 34 0.13107200000000000000e6
-1375 2 28 34 0.65536000000000000000e5
-1375 3 5 50 -0.65536000000000000000e5
-1375 3 9 38 0.65536000000000000000e5
-1375 3 10 55 -0.13107200000000000000e6
-1375 3 22 35 0.26214400000000000000e6
-1375 3 22 51 0.65536000000000000000e5
-1375 3 23 52 -0.13107200000000000000e6
-1375 3 27 40 -0.65536000000000000000e5
-1375 3 28 41 0.26214400000000000000e6
-1375 3 35 48 0.26214400000000000000e6
-1375 3 40 45 -0.13107200000000000000e6
-1375 4 2 30 0.65536000000000000000e5
-1375 4 6 34 0.13107200000000000000e6
-1375 4 7 35 0.65536000000000000000e5
-1375 4 22 34 -0.13107200000000000000e6
-1376 1 30 55 0.65536000000000000000e5
-1376 1 33 40 -0.65536000000000000000e5
-1376 3 10 55 0.65536000000000000000e5
-1376 3 14 51 0.13107200000000000000e6
-1376 3 29 42 -0.65536000000000000000e5
-1376 3 30 43 -0.65536000000000000000e5
-1376 4 19 31 -0.65536000000000000000e5
-1377 1 30 56 0.65536000000000000000e5
-1377 1 40 55 -0.65536000000000000000e5
-1378 1 27 34 -0.32768000000000000000e5
-1378 1 31 31 0.65536000000000000000e5
-1379 1 13 44 -0.65536000000000000000e5
-1379 1 31 32 0.65536000000000000000e5
-1380 1 4 35 -0.32768000000000000000e5
-1380 1 12 43 -0.32768000000000000000e5
-1380 1 14 45 -0.65536000000000000000e5
-1380 1 17 48 0.32768000000000000000e5
-1380 1 18 49 0.32768000000000000000e5
-1380 1 31 33 0.65536000000000000000e5
-1380 2 9 23 -0.32768000000000000000e5
-1380 2 14 28 0.32768000000000000000e5
-1380 3 5 34 -0.32768000000000000000e5
-1380 3 13 42 0.32768000000000000000e5
-1380 3 14 27 -0.32768000000000000000e5
-1380 3 14 43 0.32768000000000000000e5
-1380 3 16 29 0.65536000000000000000e5
-1381 1 20 27 -0.65536000000000000000e5
-1381 1 31 34 0.65536000000000000000e5
-1381 3 7 36 0.65536000000000000000e5
-1382 1 3 18 -0.16384000000000000000e5
-1382 1 4 19 0.32768000000000000000e5
-1382 1 5 36 0.32768000000000000000e5
-1382 1 12 43 0.16384000000000000000e5
-1382 1 13 44 -0.32768000000000000000e5
-1382 1 14 45 -0.32768000000000000000e5
-1382 1 17 32 -0.65536000000000000000e5
-1382 1 31 35 0.65536000000000000000e5
-1382 3 3 16 -0.16384000000000000000e5
-1382 3 4 17 -0.16384000000000000000e5
-1382 3 14 27 0.16384000000000000000e5
-1382 3 16 29 0.32768000000000000000e5
-1382 4 2 14 -0.16384000000000000000e5
-1382 4 11 23 0.32768000000000000000e5
-1383 1 3 18 -0.81920000000000000000e4
-1383 1 4 19 0.16384000000000000000e5
-1383 1 5 36 0.16384000000000000000e5
-1383 1 12 43 0.81920000000000000000e4
-1383 1 13 20 -0.65536000000000000000e5
-1383 1 13 44 -0.16384000000000000000e5
-1383 1 14 45 -0.16384000000000000000e5
-1383 1 31 36 0.65536000000000000000e5
-1383 2 11 25 0.32768000000000000000e5
-1383 2 15 29 -0.32768000000000000000e5
-1383 3 3 16 -0.81920000000000000000e4
-1383 3 4 17 -0.81920000000000000000e4
-1383 3 7 36 0.32768000000000000000e5
-1383 3 8 21 0.65536000000000000000e5
-1383 3 14 27 0.81920000000000000000e4
-1383 3 16 29 0.16384000000000000000e5
-1383 3 18 31 0.32768000000000000000e5
-1383 4 2 14 -0.81920000000000000000e4
-1383 4 11 23 0.16384000000000000000e5
-1384 1 2 33 0.65536000000000000000e5
-1384 1 3 34 -0.13107200000000000000e6
-1384 1 9 40 -0.32768000000000000000e5
-1384 1 10 41 0.13107200000000000000e6
-1384 1 26 41 0.32768000000000000000e5
-1384 1 31 37 0.65536000000000000000e5
-1384 1 32 47 -0.65536000000000000000e5
-1384 2 7 21 0.65536000000000000000e5
-1384 3 2 31 0.65536000000000000000e5
-1384 3 3 32 0.65536000000000000000e5
-1384 3 8 37 0.32768000000000000000e5
-1384 3 9 38 -0.32768000000000000000e5
-1384 3 22 27 0.32768000000000000000e5
-1384 3 28 41 -0.65536000000000000000e5
-1384 4 1 29 0.32768000000000000000e5
-1384 4 2 30 -0.32768000000000000000e5
-1385 1 12 43 -0.13107200000000000000e6
-1385 1 28 43 0.65536000000000000000e5
-1385 1 31 38 0.65536000000000000000e5
-1385 1 32 47 0.65536000000000000000e5
-1385 2 20 34 0.65536000000000000000e5
-1385 3 22 35 0.13107200000000000000e6
-1385 3 28 41 0.65536000000000000000e5
-1385 4 6 34 0.65536000000000000000e5
-1386 1 31 39 0.65536000000000000000e5
-1386 1 32 47 -0.65536000000000000000e5
-1386 3 28 41 -0.65536000000000000000e5
-1387 1 28 43 -0.65536000000000000000e5
-1387 1 31 40 0.65536000000000000000e5
-1388 1 16 47 -0.65536000000000000000e5
-1388 1 31 41 0.65536000000000000000e5
-1389 1 12 43 -0.65536000000000000000e5
-1389 1 31 42 0.65536000000000000000e5
-1389 3 22 35 0.65536000000000000000e5
-1390 1 17 48 -0.65536000000000000000e5
-1390 1 31 43 0.65536000000000000000e5
-1391 1 31 44 0.65536000000000000000e5
-1391 1 34 41 -0.65536000000000000000e5
-1392 1 4 35 -0.32768000000000000000e5
-1392 1 12 43 -0.32768000000000000000e5
-1392 1 31 45 0.65536000000000000000e5
-1392 1 34 49 -0.32768000000000000000e5
-1392 2 9 23 -0.32768000000000000000e5
-1392 3 5 34 -0.32768000000000000000e5
-1392 3 13 42 0.32768000000000000000e5
-1392 3 14 27 -0.32768000000000000000e5
-1392 3 16 29 0.65536000000000000000e5
-1392 3 18 47 -0.32768000000000000000e5
-1392 3 22 35 0.32768000000000000000e5
-1392 4 14 26 0.32768000000000000000e5
-1393 1 19 50 -0.65536000000000000000e5
-1393 1 31 46 0.65536000000000000000e5
-1394 1 6 53 -0.16384000000000000000e5
-1394 1 12 43 -0.13107200000000000000e6
-1394 1 25 40 0.16384000000000000000e5
-1394 1 28 43 0.65536000000000000000e5
-1394 1 31 47 0.65536000000000000000e5
-1394 1 32 47 0.65536000000000000000e5
-1394 2 4 34 -0.32768000000000000000e5
-1394 2 20 34 0.65536000000000000000e5
-1394 2 21 35 0.32768000000000000000e5
-1394 3 5 50 -0.32768000000000000000e5
-1394 3 7 52 0.13107200000000000000e6
-1394 3 22 35 0.13107200000000000000e6
-1394 3 24 37 -0.16384000000000000000e5
-1394 3 27 40 -0.65536000000000000000e5
-1394 4 4 32 0.16384000000000000000e5
-1394 4 7 35 0.32768000000000000000e5
-1394 4 16 28 -0.16384000000000000000e5
-1395 1 31 48 0.65536000000000000000e5
-1395 1 32 47 -0.65536000000000000000e5
-1396 1 6 53 0.16384000000000000000e5
-1396 1 25 40 -0.16384000000000000000e5
-1396 1 28 43 -0.65536000000000000000e5
-1396 1 31 49 0.65536000000000000000e5
-1396 2 4 34 0.32768000000000000000e5
-1396 2 21 35 -0.32768000000000000000e5
-1396 3 5 50 0.32768000000000000000e5
-1396 3 24 37 0.16384000000000000000e5
-1396 3 27 40 0.65536000000000000000e5
-1396 4 4 32 -0.16384000000000000000e5
-1396 4 7 35 -0.32768000000000000000e5
-1396 4 16 28 0.16384000000000000000e5
-1397 1 12 43 -0.65536000000000000000e5
-1397 1 31 50 0.65536000000000000000e5
-1397 3 7 52 0.65536000000000000000e5
-1397 3 22 35 0.65536000000000000000e5
-1398 1 6 53 0.81920000000000000000e4
-1398 1 17 48 -0.65536000000000000000e5
-1398 1 25 40 -0.81920000000000000000e4
-1398 1 31 51 0.65536000000000000000e5
-1398 2 4 34 0.16384000000000000000e5
-1398 2 21 35 -0.16384000000000000000e5
-1398 3 5 50 0.16384000000000000000e5
-1398 3 24 37 0.81920000000000000000e4
-1398 3 27 40 0.32768000000000000000e5
-1398 3 28 41 0.32768000000000000000e5
-1398 3 29 42 0.32768000000000000000e5
-1398 4 4 32 -0.81920000000000000000e4
-1398 4 7 35 -0.16384000000000000000e5
-1398 4 16 28 0.81920000000000000000e4
-1398 4 23 27 0.32768000000000000000e5
-1399 1 4 35 -0.32768000000000000000e5
-1399 1 12 43 -0.32768000000000000000e5
-1399 1 31 52 0.65536000000000000000e5
-1399 1 34 49 -0.32768000000000000000e5
-1399 2 9 23 -0.32768000000000000000e5
-1399 3 5 34 -0.32768000000000000000e5
-1399 3 13 42 0.32768000000000000000e5
-1399 3 14 27 -0.32768000000000000000e5
-1399 3 16 29 0.65536000000000000000e5
-1399 3 18 47 -0.32768000000000000000e5
-1399 3 22 35 0.32768000000000000000e5
-1399 3 31 44 0.65536000000000000000e5
-1399 4 14 26 0.32768000000000000000e5
-1400 1 31 53 0.65536000000000000000e5
-1400 1 37 52 -0.65536000000000000000e5
-1401 1 6 53 0.16384000000000000000e5
-1401 1 25 40 -0.16384000000000000000e5
-1401 1 28 43 -0.65536000000000000000e5
-1401 1 31 54 0.65536000000000000000e5
-1401 2 4 34 0.32768000000000000000e5
-1401 2 21 35 -0.32768000000000000000e5
-1401 3 5 50 0.32768000000000000000e5
-1401 3 23 52 0.65536000000000000000e5
-1401 3 24 37 0.16384000000000000000e5
-1401 3 27 40 0.65536000000000000000e5
-1401 4 4 32 -0.16384000000000000000e5
-1401 4 7 35 -0.32768000000000000000e5
-1401 4 16 28 0.16384000000000000000e5
-1402 1 6 53 0.81920000000000000000e4
-1402 1 17 48 -0.65536000000000000000e5
-1402 1 25 40 -0.81920000000000000000e4
-1402 1 31 55 0.65536000000000000000e5
-1402 2 4 34 0.16384000000000000000e5
-1402 2 21 35 -0.16384000000000000000e5
-1402 3 5 50 0.16384000000000000000e5
-1402 3 24 37 0.81920000000000000000e4
-1402 3 27 40 0.32768000000000000000e5
-1402 3 28 41 0.32768000000000000000e5
-1402 3 29 42 0.32768000000000000000e5
-1402 3 34 47 0.65536000000000000000e5
-1402 4 4 32 -0.81920000000000000000e4
-1402 4 7 35 -0.16384000000000000000e5
-1402 4 16 28 0.81920000000000000000e4
-1402 4 23 27 0.32768000000000000000e5
-1403 1 1 48 0.16384000000000000000e5
-1403 1 2 49 0.16384000000000000000e5
-1403 1 6 53 0.16384000000000000000e5
-1403 1 8 39 0.32768000000000000000e5
-1403 1 9 40 0.32768000000000000000e5
-1403 1 10 41 -0.65536000000000000000e5
-1403 1 12 43 -0.13107200000000000000e6
-1403 1 23 38 0.16384000000000000000e5
-1403 1 24 55 -0.32768000000000000000e5
-1403 1 25 40 -0.16384000000000000000e5
-1403 1 26 41 -0.32768000000000000000e5
-1403 1 28 43 0.65536000000000000000e5
-1403 1 31 56 0.65536000000000000000e5
-1403 1 32 47 0.13107200000000000000e6
-1403 1 33 48 -0.65536000000000000000e5
-1403 1 40 55 0.32768000000000000000e5
-1403 1 41 56 0.32768000000000000000e5
-1403 1 44 51 0.13107200000000000000e6
-1403 1 46 53 -0.13107200000000000000e6
-1403 2 2 32 0.16384000000000000000e5
-1403 2 16 30 0.32768000000000000000e5
-1403 2 20 34 0.65536000000000000000e5
-1403 2 21 35 -0.32768000000000000000e5
-1403 2 28 34 0.32768000000000000000e5
-1403 3 9 38 0.32768000000000000000e5
-1403 3 10 55 -0.65536000000000000000e5
-1403 3 22 35 0.13107200000000000000e6
-1403 3 22 51 0.32768000000000000000e5
-1403 3 24 37 0.16384000000000000000e5
-1403 3 27 40 0.32768000000000000000e5
-1403 3 27 56 0.32768000000000000000e5
-1403 3 28 41 0.13107200000000000000e6
-1403 3 35 48 0.13107200000000000000e6
-1403 3 38 51 -0.32768000000000000000e5
-1403 3 39 52 -0.65536000000000000000e5
-1403 3 40 45 -0.65536000000000000000e5
-1403 4 2 30 0.32768000000000000000e5
-1403 4 4 32 -0.16384000000000000000e5
-1403 4 6 34 0.65536000000000000000e5
-1403 4 16 28 0.16384000000000000000e5
-1403 4 22 34 -0.65536000000000000000e5
-1403 4 23 35 -0.65536000000000000000e5
-1403 4 29 33 -0.32768000000000000000e5
-1404 1 4 35 -0.16384000000000000000e5
-1404 1 12 43 -0.16384000000000000000e5
-1404 1 14 45 -0.32768000000000000000e5
-1404 1 17 48 0.16384000000000000000e5
-1404 1 18 49 0.16384000000000000000e5
-1404 1 32 32 0.65536000000000000000e5
-1404 2 9 23 -0.16384000000000000000e5
-1404 2 14 28 0.16384000000000000000e5
-1404 3 5 34 -0.16384000000000000000e5
-1404 3 13 42 0.16384000000000000000e5
-1404 3 14 27 -0.16384000000000000000e5
-1404 3 14 43 0.16384000000000000000e5
-1404 3 16 29 0.32768000000000000000e5
-1405 1 14 45 -0.65536000000000000000e5
-1405 1 32 33 0.65536000000000000000e5
-1406 1 3 18 -0.16384000000000000000e5
-1406 1 4 19 0.32768000000000000000e5
-1406 1 5 36 0.32768000000000000000e5
-1406 1 12 43 0.16384000000000000000e5
-1406 1 13 44 -0.32768000000000000000e5
-1406 1 14 45 -0.32768000000000000000e5
-1406 1 17 32 -0.65536000000000000000e5
-1406 1 32 34 0.65536000000000000000e5
-1406 3 3 16 -0.16384000000000000000e5
-1406 3 4 17 -0.16384000000000000000e5
-1406 3 14 27 0.16384000000000000000e5
-1406 3 16 29 0.32768000000000000000e5
-1406 4 2 14 -0.16384000000000000000e5
-1406 4 11 23 0.32768000000000000000e5
-1407 1 13 20 -0.13107200000000000000e6
-1407 1 17 32 0.65536000000000000000e5
-1407 1 20 27 0.65536000000000000000e5
-1407 1 32 35 0.65536000000000000000e5
-1407 2 11 25 0.65536000000000000000e5
-1407 3 8 21 0.13107200000000000000e6
-1407 3 18 31 0.65536000000000000000e5
-1408 1 6 21 -0.32768000000000000000e5
-1408 1 13 20 -0.65536000000000000000e5
-1408 1 20 27 0.32768000000000000000e5
-1408 1 32 36 0.65536000000000000000e5
-1408 2 9 15 -0.32768000000000000000e5
-1408 2 11 25 0.32768000000000000000e5
-1408 3 7 20 0.32768000000000000000e5
-1408 3 14 19 0.65536000000000000000e5
-1408 3 19 32 0.65536000000000000000e5
-1408 4 10 14 0.32768000000000000000e5
-1409 1 12 43 -0.13107200000000000000e6
-1409 1 28 43 0.65536000000000000000e5
-1409 1 32 37 0.65536000000000000000e5
-1409 1 32 47 0.65536000000000000000e5
-1409 2 20 34 0.65536000000000000000e5
-1409 3 22 35 0.13107200000000000000e6
-1409 3 28 41 0.65536000000000000000e5
-1409 4 6 34 0.65536000000000000000e5
-1410 1 32 38 0.65536000000000000000e5
-1410 1 32 47 -0.65536000000000000000e5
-1410 3 28 41 -0.65536000000000000000e5
-1411 1 28 43 -0.65536000000000000000e5
-1411 1 32 39 0.65536000000000000000e5
-1412 1 32 40 0.65536000000000000000e5
-1412 1 33 48 -0.65536000000000000000e5
-1412 3 29 42 -0.65536000000000000000e5
-1413 1 12 43 -0.65536000000000000000e5
-1413 1 32 41 0.65536000000000000000e5
-1413 3 22 35 0.65536000000000000000e5
-1414 1 17 48 -0.65536000000000000000e5
-1414 1 32 42 0.65536000000000000000e5
-1415 1 32 43 0.65536000000000000000e5
-1415 1 34 49 -0.65536000000000000000e5
-1415 3 18 47 -0.65536000000000000000e5
-1416 1 4 35 -0.32768000000000000000e5
-1416 1 12 43 -0.32768000000000000000e5
-1416 1 32 44 0.65536000000000000000e5
-1416 1 34 49 -0.32768000000000000000e5
-1416 2 9 23 -0.32768000000000000000e5
-1416 3 5 34 -0.32768000000000000000e5
-1416 3 13 42 0.32768000000000000000e5
-1416 3 14 27 -0.32768000000000000000e5
-1416 3 16 29 0.65536000000000000000e5
-1416 3 18 47 -0.32768000000000000000e5
-1416 3 22 35 0.32768000000000000000e5
-1416 4 14 26 0.32768000000000000000e5
-1417 1 14 45 -0.13107200000000000000e6
-1417 1 17 48 0.32768000000000000000e5
-1417 1 18 49 0.32768000000000000000e5
-1417 1 32 45 0.65536000000000000000e5
-1417 1 34 49 0.32768000000000000000e5
-1417 2 14 28 0.32768000000000000000e5
-1417 3 14 43 0.32768000000000000000e5
-1417 3 15 44 -0.65536000000000000000e5
-1417 3 16 45 0.13107200000000000000e6
-1417 3 18 47 0.32768000000000000000e5
-1417 3 22 35 -0.32768000000000000000e5
-1417 4 14 26 -0.32768000000000000000e5
-1417 4 15 27 -0.65536000000000000000e5
-1418 1 13 20 -0.13107200000000000000e6
-1418 1 17 32 0.65536000000000000000e5
-1418 1 20 27 0.65536000000000000000e5
-1418 1 32 46 0.65536000000000000000e5
-1418 2 11 25 0.65536000000000000000e5
-1418 3 8 21 0.13107200000000000000e6
-1418 3 16 45 0.65536000000000000000e5
-1418 3 18 31 0.65536000000000000000e5
-1419 1 6 53 0.16384000000000000000e5
-1419 1 25 40 -0.16384000000000000000e5
-1419 1 28 43 -0.65536000000000000000e5
-1419 1 32 48 0.65536000000000000000e5
-1419 2 4 34 0.32768000000000000000e5
-1419 2 21 35 -0.32768000000000000000e5
-1419 3 5 50 0.32768000000000000000e5
-1419 3 24 37 0.16384000000000000000e5
-1419 3 27 40 0.65536000000000000000e5
-1419 4 4 32 -0.16384000000000000000e5
-1419 4 7 35 -0.32768000000000000000e5
-1419 4 16 28 0.16384000000000000000e5
-1420 1 32 49 0.65536000000000000000e5
-1420 1 33 48 -0.65536000000000000000e5
-1421 1 6 53 0.81920000000000000000e4
-1421 1 17 48 -0.65536000000000000000e5
-1421 1 25 40 -0.81920000000000000000e4
-1421 1 32 50 0.65536000000000000000e5
-1421 2 4 34 0.16384000000000000000e5
-1421 2 21 35 -0.16384000000000000000e5
-1421 3 5 50 0.16384000000000000000e5
-1421 3 24 37 0.81920000000000000000e4
-1421 3 27 40 0.32768000000000000000e5
-1421 3 28 41 0.32768000000000000000e5
-1421 3 29 42 0.32768000000000000000e5
-1421 4 4 32 -0.81920000000000000000e4
-1421 4 7 35 -0.16384000000000000000e5
-1421 4 16 28 0.81920000000000000000e4
-1421 4 23 27 0.32768000000000000000e5
-1422 1 32 51 0.65536000000000000000e5
-1422 1 34 49 -0.65536000000000000000e5
-1423 1 14 45 -0.13107200000000000000e6
-1423 1 17 48 0.32768000000000000000e5
-1423 1 18 49 0.32768000000000000000e5
-1423 1 32 52 0.65536000000000000000e5
-1423 1 34 49 0.32768000000000000000e5
-1423 2 14 28 0.32768000000000000000e5
-1423 3 14 43 0.32768000000000000000e5
-1423 3 15 44 -0.65536000000000000000e5
-1423 3 16 45 0.13107200000000000000e6
-1423 3 18 47 0.32768000000000000000e5
-1423 3 19 48 0.65536000000000000000e5
-1423 3 22 35 -0.32768000000000000000e5
-1423 4 14 26 -0.32768000000000000000e5
-1423 4 15 27 -0.65536000000000000000e5
-1424 1 6 53 0.16384000000000000000e5
-1424 1 25 40 -0.16384000000000000000e5
-1424 1 28 43 -0.65536000000000000000e5
-1424 1 32 53 0.65536000000000000000e5
-1424 2 4 34 0.32768000000000000000e5
-1424 2 21 35 -0.32768000000000000000e5
-1424 3 5 50 0.32768000000000000000e5
-1424 3 23 52 0.65536000000000000000e5
-1424 3 24 37 0.16384000000000000000e5
-1424 3 27 40 0.65536000000000000000e5
-1424 4 4 32 -0.16384000000000000000e5
-1424 4 7 35 -0.32768000000000000000e5
-1424 4 16 28 0.16384000000000000000e5
-1425 1 32 54 0.65536000000000000000e5
-1425 1 33 48 -0.65536000000000000000e5
-1425 3 10 55 -0.65536000000000000000e5
-1425 3 35 48 0.13107200000000000000e6
-1425 3 40 45 -0.65536000000000000000e5
-1425 4 22 34 -0.65536000000000000000e5
-1426 1 32 55 0.65536000000000000000e5
-1426 1 44 51 -0.65536000000000000000e5
-1427 1 1 48 -0.16384000000000000000e5
-1427 1 2 49 -0.16384000000000000000e5
-1427 1 8 39 -0.32768000000000000000e5
-1427 1 9 40 -0.32768000000000000000e5
-1427 1 10 41 0.65536000000000000000e5
-1427 1 12 43 0.13107200000000000000e6
-1427 1 23 38 -0.16384000000000000000e5
-1427 1 24 55 0.32768000000000000000e5
-1427 1 26 41 0.32768000000000000000e5
-1427 1 28 43 -0.13107200000000000000e6
-1427 1 32 47 -0.13107200000000000000e6
-1427 1 32 56 0.65536000000000000000e5
-1427 1 40 55 -0.32768000000000000000e5
-1427 1 41 56 -0.32768000000000000000e5
-1427 2 2 32 -0.16384000000000000000e5
-1427 2 4 34 0.32768000000000000000e5
-1427 2 16 30 -0.32768000000000000000e5
-1427 2 20 34 -0.65536000000000000000e5
-1427 2 28 34 -0.32768000000000000000e5
-1427 3 5 50 0.32768000000000000000e5
-1427 3 9 38 -0.32768000000000000000e5
-1427 3 22 35 -0.13107200000000000000e6
-1427 3 22 51 -0.32768000000000000000e5
-1427 3 23 52 0.65536000000000000000e5
-1427 3 27 40 0.32768000000000000000e5
-1427 3 27 56 -0.32768000000000000000e5
-1427 3 28 41 -0.13107200000000000000e6
-1427 3 38 51 0.32768000000000000000e5
-1427 4 2 30 -0.32768000000000000000e5
-1427 4 6 34 -0.65536000000000000000e5
-1427 4 7 35 -0.32768000000000000000e5
-1427 4 29 33 0.32768000000000000000e5
-1428 1 11 18 -0.32768000000000000000e5
-1428 1 33 33 0.65536000000000000000e5
-1428 3 6 19 0.32768000000000000000e5
-1428 3 17 30 0.32768000000000000000e5
-1429 1 13 20 -0.13107200000000000000e6
-1429 1 17 32 0.65536000000000000000e5
-1429 1 20 27 0.65536000000000000000e5
-1429 1 33 34 0.65536000000000000000e5
-1429 2 11 25 0.65536000000000000000e5
-1429 3 8 21 0.13107200000000000000e6
-1429 3 18 31 0.65536000000000000000e5
-1430 1 15 46 -0.65536000000000000000e5
-1430 1 33 35 0.65536000000000000000e5
-1431 1 32 47 -0.65536000000000000000e5
-1431 1 33 37 0.65536000000000000000e5
-1431 3 28 41 -0.65536000000000000000e5
-1432 1 28 43 -0.65536000000000000000e5
-1432 1 33 38 0.65536000000000000000e5
-1433 1 33 39 0.65536000000000000000e5
-1433 1 33 48 -0.65536000000000000000e5
-1433 3 29 42 -0.65536000000000000000e5
-1434 1 17 48 -0.65536000000000000000e5
-1434 1 33 41 0.65536000000000000000e5
-1435 1 33 42 0.65536000000000000000e5
-1435 1 34 49 -0.65536000000000000000e5
-1435 3 18 47 -0.65536000000000000000e5
-1436 1 18 49 -0.65536000000000000000e5
-1436 1 33 43 0.65536000000000000000e5
-1437 1 14 45 -0.13107200000000000000e6
-1437 1 17 48 0.32768000000000000000e5
-1437 1 18 49 0.32768000000000000000e5
-1437 1 33 44 0.65536000000000000000e5
-1437 1 34 49 0.32768000000000000000e5
-1437 2 14 28 0.32768000000000000000e5
-1437 3 14 43 0.32768000000000000000e5
-1437 3 15 44 -0.65536000000000000000e5
-1437 3 16 45 0.13107200000000000000e6
-1437 3 18 47 0.32768000000000000000e5
-1437 3 22 35 -0.32768000000000000000e5
-1437 4 14 26 -0.32768000000000000000e5
-1437 4 15 27 -0.65536000000000000000e5
-1438 1 11 18 -0.65536000000000000000e5
-1438 1 33 45 0.65536000000000000000e5
-1438 3 6 19 0.65536000000000000000e5
-1438 3 15 44 0.65536000000000000000e5
-1438 3 17 30 0.65536000000000000000e5
-1439 1 20 51 -0.65536000000000000000e5
-1439 1 33 46 0.65536000000000000000e5
-1440 1 6 53 0.16384000000000000000e5
-1440 1 25 40 -0.16384000000000000000e5
-1440 1 28 43 -0.65536000000000000000e5
-1440 1 33 47 0.65536000000000000000e5
-1440 2 4 34 0.32768000000000000000e5
-1440 2 21 35 -0.32768000000000000000e5
-1440 3 5 50 0.32768000000000000000e5
-1440 3 24 37 0.16384000000000000000e5
-1440 3 27 40 0.65536000000000000000e5
-1440 4 4 32 -0.16384000000000000000e5
-1440 4 7 35 -0.32768000000000000000e5
-1440 4 16 28 0.16384000000000000000e5
-1441 1 33 40 -0.65536000000000000000e5
-1441 1 33 49 0.65536000000000000000e5
-1441 3 14 51 0.13107200000000000000e6
-1441 3 29 42 -0.65536000000000000000e5
-1441 3 30 43 -0.65536000000000000000e5
-1441 4 19 31 -0.65536000000000000000e5
-1442 1 33 50 0.65536000000000000000e5
-1442 1 34 49 -0.65536000000000000000e5
-1443 1 18 49 -0.65536000000000000000e5
-1443 1 33 51 0.65536000000000000000e5
-1443 3 14 51 0.65536000000000000000e5
-1444 1 11 18 -0.65536000000000000000e5
-1444 1 33 52 0.65536000000000000000e5
-1444 3 6 19 0.65536000000000000000e5
-1444 3 15 44 0.65536000000000000000e5
-1444 3 17 30 0.65536000000000000000e5
-1444 3 32 45 0.65536000000000000000e5
-1445 1 33 48 -0.65536000000000000000e5
-1445 1 33 53 0.65536000000000000000e5
-1445 3 10 55 -0.65536000000000000000e5
-1445 3 35 48 0.13107200000000000000e6
-1445 3 40 45 -0.65536000000000000000e5
-1445 4 22 34 -0.65536000000000000000e5
-1446 1 33 40 -0.65536000000000000000e5
-1446 1 33 54 0.65536000000000000000e5
-1446 3 10 55 0.65536000000000000000e5
-1446 3 14 51 0.13107200000000000000e6
-1446 3 29 42 -0.65536000000000000000e5
-1446 3 30 43 -0.65536000000000000000e5
-1446 4 19 31 -0.65536000000000000000e5
-1447 1 18 49 -0.65536000000000000000e5
-1447 1 33 55 0.65536000000000000000e5
-1447 3 14 51 0.65536000000000000000e5
-1447 3 35 48 0.65536000000000000000e5
-1448 1 33 40 -0.65536000000000000000e5
-1448 1 33 56 0.65536000000000000000e5
-1448 3 10 55 0.65536000000000000000e5
-1448 3 14 51 0.13107200000000000000e6
-1448 3 29 42 -0.65536000000000000000e5
-1448 3 30 43 -0.65536000000000000000e5
-1448 3 39 52 0.65536000000000000000e5
-1448 4 19 31 -0.65536000000000000000e5
-1449 1 3 18 -0.40960000000000000000e4
-1449 1 4 19 0.81920000000000000000e4
-1449 1 5 36 0.81920000000000000000e4
-1449 1 12 43 0.40960000000000000000e4
-1449 1 13 20 -0.32768000000000000000e5
-1449 1 13 44 -0.81920000000000000000e4
-1449 1 14 45 -0.81920000000000000000e4
-1449 1 34 34 0.65536000000000000000e5
-1449 2 11 25 0.16384000000000000000e5
-1449 2 15 29 -0.16384000000000000000e5
-1449 3 3 16 -0.40960000000000000000e4
-1449 3 4 17 -0.40960000000000000000e4
-1449 3 7 36 0.16384000000000000000e5
-1449 3 8 21 0.32768000000000000000e5
-1449 3 14 27 0.40960000000000000000e4
-1449 3 16 29 0.81920000000000000000e4
-1449 3 18 31 0.16384000000000000000e5
-1449 4 2 14 -0.40960000000000000000e4
-1449 4 11 23 0.81920000000000000000e4
-1450 1 6 21 -0.32768000000000000000e5
-1450 1 13 20 -0.65536000000000000000e5
-1450 1 20 27 0.32768000000000000000e5
-1450 1 34 35 0.65536000000000000000e5
-1450 2 9 15 -0.32768000000000000000e5
-1450 2 11 25 0.32768000000000000000e5
-1450 3 7 20 0.32768000000000000000e5
-1450 3 14 19 0.65536000000000000000e5
-1450 3 19 32 0.65536000000000000000e5
-1450 4 10 14 0.32768000000000000000e5
-1451 1 21 44 -0.65536000000000000000e5
-1451 1 34 36 0.65536000000000000000e5
-1452 1 16 47 -0.65536000000000000000e5
-1452 1 34 37 0.65536000000000000000e5
-1453 1 12 43 -0.65536000000000000000e5
-1453 1 34 38 0.65536000000000000000e5
-1453 3 22 35 0.65536000000000000000e5
-1454 1 17 48 -0.65536000000000000000e5
-1454 1 34 39 0.65536000000000000000e5
-1455 1 34 40 0.65536000000000000000e5
-1455 1 34 49 -0.65536000000000000000e5
-1455 3 18 47 -0.65536000000000000000e5
-1456 1 4 35 -0.32768000000000000000e5
-1456 1 12 43 -0.32768000000000000000e5
-1456 1 34 42 0.65536000000000000000e5
-1456 1 34 49 -0.32768000000000000000e5
-1456 2 9 23 -0.32768000000000000000e5
-1456 3 5 34 -0.32768000000000000000e5
-1456 3 13 42 0.32768000000000000000e5
-1456 3 14 27 -0.32768000000000000000e5
-1456 3 16 29 0.65536000000000000000e5
-1456 3 18 47 -0.32768000000000000000e5
-1456 3 22 35 0.32768000000000000000e5
-1456 4 14 26 0.32768000000000000000e5
-1457 1 14 45 -0.13107200000000000000e6
-1457 1 17 48 0.32768000000000000000e5
-1457 1 18 49 0.32768000000000000000e5
-1457 1 34 43 0.65536000000000000000e5
-1457 1 34 49 0.32768000000000000000e5
-1457 2 14 28 0.32768000000000000000e5
-1457 3 14 43 0.32768000000000000000e5
-1457 3 15 44 -0.65536000000000000000e5
-1457 3 16 45 0.13107200000000000000e6
-1457 3 18 47 0.32768000000000000000e5
-1457 3 22 35 -0.32768000000000000000e5
-1457 4 14 26 -0.32768000000000000000e5
-1457 4 15 27 -0.65536000000000000000e5
-1458 1 19 50 -0.65536000000000000000e5
-1458 1 34 44 0.65536000000000000000e5
-1459 1 13 20 -0.13107200000000000000e6
-1459 1 17 32 0.65536000000000000000e5
-1459 1 20 27 0.65536000000000000000e5
-1459 1 34 45 0.65536000000000000000e5
-1459 2 11 25 0.65536000000000000000e5
-1459 3 8 21 0.13107200000000000000e6
-1459 3 16 45 0.65536000000000000000e5
-1459 3 18 31 0.65536000000000000000e5
-1460 1 13 20 -0.65536000000000000000e5
-1460 1 17 32 0.32768000000000000000e5
-1460 1 19 50 -0.32768000000000000000e5
-1460 1 20 27 0.32768000000000000000e5
-1460 1 20 51 -0.32768000000000000000e5
-1460 1 34 46 0.65536000000000000000e5
-1460 2 11 25 0.32768000000000000000e5
-1460 2 25 31 -0.32768000000000000000e5
-1460 3 8 21 0.65536000000000000000e5
-1460 3 16 45 0.32768000000000000000e5
-1460 3 18 31 0.32768000000000000000e5
-1461 1 12 43 -0.65536000000000000000e5
-1461 1 34 47 0.65536000000000000000e5
-1461 3 7 52 0.65536000000000000000e5
-1461 3 22 35 0.65536000000000000000e5
-1462 1 6 53 0.81920000000000000000e4
-1462 1 17 48 -0.65536000000000000000e5
-1462 1 25 40 -0.81920000000000000000e4
-1462 1 34 48 0.65536000000000000000e5
-1462 2 4 34 0.16384000000000000000e5
-1462 2 21 35 -0.16384000000000000000e5
-1462 3 5 50 0.16384000000000000000e5
-1462 3 24 37 0.81920000000000000000e4
-1462 3 27 40 0.32768000000000000000e5
-1462 3 28 41 0.32768000000000000000e5
-1462 3 29 42 0.32768000000000000000e5
-1462 4 4 32 -0.81920000000000000000e4
-1462 4 7 35 -0.16384000000000000000e5
-1462 4 16 28 0.81920000000000000000e4
-1462 4 23 27 0.32768000000000000000e5
-1463 1 4 35 -0.32768000000000000000e5
-1463 1 12 43 -0.32768000000000000000e5
-1463 1 34 49 -0.32768000000000000000e5
-1463 1 34 50 0.65536000000000000000e5
-1463 2 9 23 -0.32768000000000000000e5
-1463 3 5 34 -0.32768000000000000000e5
-1463 3 13 42 0.32768000000000000000e5
-1463 3 14 27 -0.32768000000000000000e5
-1463 3 16 29 0.65536000000000000000e5
-1463 3 18 47 -0.32768000000000000000e5
-1463 3 22 35 0.32768000000000000000e5
-1463 3 31 44 0.65536000000000000000e5
-1463 4 14 26 0.32768000000000000000e5
-1464 1 14 45 -0.13107200000000000000e6
-1464 1 17 48 0.32768000000000000000e5
-1464 1 18 49 0.32768000000000000000e5
-1464 1 34 49 0.32768000000000000000e5
-1464 1 34 51 0.65536000000000000000e5
-1464 2 14 28 0.32768000000000000000e5
-1464 3 14 43 0.32768000000000000000e5
-1464 3 15 44 -0.65536000000000000000e5
-1464 3 16 45 0.13107200000000000000e6
-1464 3 18 47 0.32768000000000000000e5
-1464 3 19 48 0.65536000000000000000e5
-1464 3 22 35 -0.32768000000000000000e5
-1464 4 14 26 -0.32768000000000000000e5
-1464 4 15 27 -0.65536000000000000000e5
-1465 1 13 20 -0.13107200000000000000e6
-1465 1 17 32 0.65536000000000000000e5
-1465 1 20 27 0.65536000000000000000e5
-1465 1 34 52 0.65536000000000000000e5
-1465 2 11 25 0.65536000000000000000e5
-1465 3 8 21 0.13107200000000000000e6
-1465 3 16 45 0.65536000000000000000e5
-1465 3 18 31 0.65536000000000000000e5
-1465 3 36 41 0.65536000000000000000e5
-1466 1 6 53 0.81920000000000000000e4
-1466 1 17 48 -0.65536000000000000000e5
-1466 1 25 40 -0.81920000000000000000e4
-1466 1 34 53 0.65536000000000000000e5
-1466 2 4 34 0.16384000000000000000e5
-1466 2 21 35 -0.16384000000000000000e5
-1466 3 5 50 0.16384000000000000000e5
-1466 3 24 37 0.81920000000000000000e4
-1466 3 27 40 0.32768000000000000000e5
-1466 3 28 41 0.32768000000000000000e5
-1466 3 29 42 0.32768000000000000000e5
-1466 3 34 47 0.65536000000000000000e5
-1466 4 4 32 -0.81920000000000000000e4
-1466 4 7 35 -0.16384000000000000000e5
-1466 4 16 28 0.81920000000000000000e4
-1466 4 23 27 0.32768000000000000000e5
-1467 1 34 54 0.65536000000000000000e5
-1467 1 44 51 -0.65536000000000000000e5
-1468 1 14 45 -0.13107200000000000000e6
-1468 1 17 48 0.32768000000000000000e5
-1468 1 18 49 0.32768000000000000000e5
-1468 1 34 49 0.32768000000000000000e5
-1468 1 34 55 0.65536000000000000000e5
-1468 2 14 28 0.32768000000000000000e5
-1468 3 14 43 0.32768000000000000000e5
-1468 3 15 44 -0.65536000000000000000e5
-1468 3 16 45 0.13107200000000000000e6
-1468 3 18 47 0.32768000000000000000e5
-1468 3 19 48 0.65536000000000000000e5
-1468 3 22 35 -0.32768000000000000000e5
-1468 3 41 46 0.65536000000000000000e5
-1468 4 14 26 -0.32768000000000000000e5
-1468 4 15 27 -0.65536000000000000000e5
-1469 1 34 56 0.65536000000000000000e5
-1469 1 46 53 -0.65536000000000000000e5
-1470 1 33 36 -0.32768000000000000000e5
-1470 1 35 35 0.65536000000000000000e5
-1471 1 6 21 -0.16384000000000000000e5
-1471 1 17 32 -0.16384000000000000000e5
-1471 1 19 50 0.16384000000000000000e5
-1471 1 20 51 0.16384000000000000000e5
-1471 1 21 52 -0.65536000000000000000e5
-1471 1 35 36 0.65536000000000000000e5
-1471 2 9 15 -0.16384000000000000000e5
-1471 2 25 31 0.16384000000000000000e5
-1471 3 7 20 0.16384000000000000000e5
-1471 3 8 21 -0.32768000000000000000e5
-1471 3 14 19 0.32768000000000000000e5
-1471 3 16 45 -0.16384000000000000000e5
-1471 3 17 46 -0.32768000000000000000e5
-1471 3 18 31 -0.16384000000000000000e5
-1471 3 19 32 0.32768000000000000000e5
-1471 3 20 45 -0.32768000000000000000e5
-1471 4 10 14 0.16384000000000000000e5
-1471 4 25 25 -0.65536000000000000000e5
-1472 1 12 43 -0.65536000000000000000e5
-1472 1 35 37 0.65536000000000000000e5
-1472 3 22 35 0.65536000000000000000e5
-1473 1 17 48 -0.65536000000000000000e5
-1473 1 35 38 0.65536000000000000000e5
-1474 1 34 49 -0.65536000000000000000e5
-1474 1 35 39 0.65536000000000000000e5
-1474 3 18 47 -0.65536000000000000000e5
-1475 1 18 49 -0.65536000000000000000e5
-1475 1 35 40 0.65536000000000000000e5
-1476 1 4 35 -0.32768000000000000000e5
-1476 1 12 43 -0.32768000000000000000e5
-1476 1 34 49 -0.32768000000000000000e5
-1476 1 35 41 0.65536000000000000000e5
-1476 2 9 23 -0.32768000000000000000e5
-1476 3 5 34 -0.32768000000000000000e5
-1476 3 13 42 0.32768000000000000000e5
-1476 3 14 27 -0.32768000000000000000e5
-1476 3 16 29 0.65536000000000000000e5
-1476 3 18 47 -0.32768000000000000000e5
-1476 3 22 35 0.32768000000000000000e5
-1476 4 14 26 0.32768000000000000000e5
-1477 1 14 45 -0.13107200000000000000e6
-1477 1 17 48 0.32768000000000000000e5
-1477 1 18 49 0.32768000000000000000e5
-1477 1 34 49 0.32768000000000000000e5
-1477 1 35 42 0.65536000000000000000e5
-1477 2 14 28 0.32768000000000000000e5
-1477 3 14 43 0.32768000000000000000e5
-1477 3 15 44 -0.65536000000000000000e5
-1477 3 16 45 0.13107200000000000000e6
-1477 3 18 47 0.32768000000000000000e5
-1477 3 22 35 -0.32768000000000000000e5
-1477 4 14 26 -0.32768000000000000000e5
-1477 4 15 27 -0.65536000000000000000e5
-1478 1 11 18 -0.65536000000000000000e5
-1478 1 35 43 0.65536000000000000000e5
-1478 3 6 19 0.65536000000000000000e5
-1478 3 15 44 0.65536000000000000000e5
-1478 3 17 30 0.65536000000000000000e5
-1479 1 13 20 -0.13107200000000000000e6
-1479 1 17 32 0.65536000000000000000e5
-1479 1 20 27 0.65536000000000000000e5
-1479 1 35 44 0.65536000000000000000e5
-1479 2 11 25 0.65536000000000000000e5
-1479 3 8 21 0.13107200000000000000e6
-1479 3 16 45 0.65536000000000000000e5
-1479 3 18 31 0.65536000000000000000e5
-1480 1 20 51 -0.65536000000000000000e5
-1480 1 35 45 0.65536000000000000000e5
-1481 1 33 36 -0.65536000000000000000e5
-1481 1 35 46 0.65536000000000000000e5
-1481 3 17 46 0.65536000000000000000e5
-1482 1 6 53 0.81920000000000000000e4
-1482 1 17 48 -0.65536000000000000000e5
-1482 1 25 40 -0.81920000000000000000e4
-1482 1 35 47 0.65536000000000000000e5
-1482 2 4 34 0.16384000000000000000e5
-1482 2 21 35 -0.16384000000000000000e5
-1482 3 5 50 0.16384000000000000000e5
-1482 3 24 37 0.81920000000000000000e4
-1482 3 27 40 0.32768000000000000000e5
-1482 3 28 41 0.32768000000000000000e5
-1482 3 29 42 0.32768000000000000000e5
-1482 4 4 32 -0.81920000000000000000e4
-1482 4 7 35 -0.16384000000000000000e5
-1482 4 16 28 0.81920000000000000000e4
-1482 4 23 27 0.32768000000000000000e5
-1483 1 34 49 -0.65536000000000000000e5
-1483 1 35 48 0.65536000000000000000e5
-1484 1 18 49 -0.65536000000000000000e5
-1484 1 35 49 0.65536000000000000000e5
-1484 3 14 51 0.65536000000000000000e5
-1485 1 14 45 -0.13107200000000000000e6
-1485 1 17 48 0.32768000000000000000e5
-1485 1 18 49 0.32768000000000000000e5
-1485 1 34 49 0.32768000000000000000e5
-1485 1 35 50 0.65536000000000000000e5
-1485 2 14 28 0.32768000000000000000e5
-1485 3 14 43 0.32768000000000000000e5
-1485 3 15 44 -0.65536000000000000000e5
-1485 3 16 45 0.13107200000000000000e6
-1485 3 18 47 0.32768000000000000000e5
-1485 3 19 48 0.65536000000000000000e5
-1485 3 22 35 -0.32768000000000000000e5
-1485 4 14 26 -0.32768000000000000000e5
-1485 4 15 27 -0.65536000000000000000e5
-1486 1 11 18 -0.65536000000000000000e5
-1486 1 35 51 0.65536000000000000000e5
-1486 3 6 19 0.65536000000000000000e5
-1486 3 15 44 0.65536000000000000000e5
-1486 3 17 30 0.65536000000000000000e5
-1486 3 32 45 0.65536000000000000000e5
-1487 1 35 52 0.65536000000000000000e5
-1487 1 36 51 -0.65536000000000000000e5
-1488 1 35 53 0.65536000000000000000e5
-1488 1 44 51 -0.65536000000000000000e5
-1489 1 18 49 -0.65536000000000000000e5
-1489 1 35 54 0.65536000000000000000e5
-1489 3 14 51 0.65536000000000000000e5
-1489 3 35 48 0.65536000000000000000e5
-1490 1 35 55 0.65536000000000000000e5
-1490 1 45 52 -0.65536000000000000000e5
-1491 1 18 49 -0.65536000000000000000e5
-1491 1 35 56 0.65536000000000000000e5
-1491 3 14 51 0.65536000000000000000e5
-1491 3 35 48 0.65536000000000000000e5
-1491 3 45 50 0.65536000000000000000e5
-1492 1 18 21 -0.32768000000000000000e5
-1492 1 36 36 0.65536000000000000000e5
-1492 3 19 20 0.32768000000000000000e5
-1492 3 21 34 0.32768000000000000000e5
-1493 1 34 41 -0.65536000000000000000e5
-1493 1 36 37 0.65536000000000000000e5
-1494 1 4 35 -0.32768000000000000000e5
-1494 1 12 43 -0.32768000000000000000e5
-1494 1 34 49 -0.32768000000000000000e5
-1494 1 36 38 0.65536000000000000000e5
-1494 2 9 23 -0.32768000000000000000e5
-1494 3 5 34 -0.32768000000000000000e5
-1494 3 13 42 0.32768000000000000000e5
-1494 3 14 27 -0.32768000000000000000e5
-1494 3 16 29 0.65536000000000000000e5
-1494 3 18 47 -0.32768000000000000000e5
-1494 3 22 35 0.32768000000000000000e5
-1494 4 14 26 0.32768000000000000000e5
-1495 1 14 45 -0.13107200000000000000e6
-1495 1 17 48 0.32768000000000000000e5
-1495 1 18 49 0.32768000000000000000e5
-1495 1 34 49 0.32768000000000000000e5
-1495 1 36 39 0.65536000000000000000e5
-1495 2 14 28 0.32768000000000000000e5
-1495 3 14 43 0.32768000000000000000e5
-1495 3 15 44 -0.65536000000000000000e5
-1495 3 16 45 0.13107200000000000000e6
-1495 3 18 47 0.32768000000000000000e5
-1495 3 22 35 -0.32768000000000000000e5
-1495 4 14 26 -0.32768000000000000000e5
-1495 4 15 27 -0.65536000000000000000e5
-1496 1 11 18 -0.65536000000000000000e5
-1496 1 36 40 0.65536000000000000000e5
-1496 3 6 19 0.65536000000000000000e5
-1496 3 15 44 0.65536000000000000000e5
-1496 3 17 30 0.65536000000000000000e5
-1497 1 19 50 -0.65536000000000000000e5
-1497 1 36 41 0.65536000000000000000e5
-1498 1 13 20 -0.13107200000000000000e6
-1498 1 17 32 0.65536000000000000000e5
-1498 1 20 27 0.65536000000000000000e5
-1498 1 36 42 0.65536000000000000000e5
-1498 2 11 25 0.65536000000000000000e5
-1498 3 8 21 0.13107200000000000000e6
-1498 3 16 45 0.65536000000000000000e5
-1498 3 18 31 0.65536000000000000000e5
-1499 1 20 51 -0.65536000000000000000e5
-1499 1 36 43 0.65536000000000000000e5
-1500 1 13 20 -0.65536000000000000000e5
-1500 1 17 32 0.32768000000000000000e5
-1500 1 19 50 -0.32768000000000000000e5
-1500 1 20 27 0.32768000000000000000e5
-1500 1 20 51 -0.32768000000000000000e5
-1500 1 36 44 0.65536000000000000000e5
-1500 2 11 25 0.32768000000000000000e5
-1500 2 25 31 -0.32768000000000000000e5
-1500 3 8 21 0.65536000000000000000e5
-1500 3 16 45 0.32768000000000000000e5
-1500 3 18 31 0.32768000000000000000e5
-1501 1 33 36 -0.65536000000000000000e5
-1501 1 36 45 0.65536000000000000000e5
-1501 3 17 46 0.65536000000000000000e5
-1502 1 21 52 -0.65536000000000000000e5
-1502 1 36 46 0.65536000000000000000e5
-1503 1 4 35 -0.32768000000000000000e5
-1503 1 12 43 -0.32768000000000000000e5
-1503 1 34 49 -0.32768000000000000000e5
-1503 1 36 47 0.65536000000000000000e5
-1503 2 9 23 -0.32768000000000000000e5
-1503 3 5 34 -0.32768000000000000000e5
-1503 3 13 42 0.32768000000000000000e5
-1503 3 14 27 -0.32768000000000000000e5
-1503 3 16 29 0.65536000000000000000e5
-1503 3 18 47 -0.32768000000000000000e5
-1503 3 22 35 0.32768000000000000000e5
-1503 3 31 44 0.65536000000000000000e5
-1503 4 14 26 0.32768000000000000000e5
-1504 1 14 45 -0.13107200000000000000e6
-1504 1 17 48 0.32768000000000000000e5
-1504 1 18 49 0.32768000000000000000e5
-1504 1 34 49 0.32768000000000000000e5
-1504 1 36 48 0.65536000000000000000e5
-1504 2 14 28 0.32768000000000000000e5
-1504 3 14 43 0.32768000000000000000e5
-1504 3 15 44 -0.65536000000000000000e5
-1504 3 16 45 0.13107200000000000000e6
-1504 3 18 47 0.32768000000000000000e5
-1504 3 19 48 0.65536000000000000000e5
-1504 3 22 35 -0.32768000000000000000e5
-1504 4 14 26 -0.32768000000000000000e5
-1504 4 15 27 -0.65536000000000000000e5
-1505 1 11 18 -0.65536000000000000000e5
-1505 1 36 49 0.65536000000000000000e5
-1505 3 6 19 0.65536000000000000000e5
-1505 3 15 44 0.65536000000000000000e5
-1505 3 17 30 0.65536000000000000000e5
-1505 3 32 45 0.65536000000000000000e5
-1506 1 13 20 -0.13107200000000000000e6
-1506 1 17 32 0.65536000000000000000e5
-1506 1 20 27 0.65536000000000000000e5
-1506 1 36 50 0.65536000000000000000e5
-1506 2 11 25 0.65536000000000000000e5
-1506 3 8 21 0.13107200000000000000e6
-1506 3 16 45 0.65536000000000000000e5
-1506 3 18 31 0.65536000000000000000e5
-1506 3 36 41 0.65536000000000000000e5
-1507 1 33 36 -0.65536000000000000000e5
-1507 1 36 52 0.65536000000000000000e5
-1507 3 17 46 0.65536000000000000000e5
-1507 3 21 50 0.65536000000000000000e5
-1508 1 14 45 -0.13107200000000000000e6
-1508 1 17 48 0.32768000000000000000e5
-1508 1 18 49 0.32768000000000000000e5
-1508 1 34 49 0.32768000000000000000e5
-1508 1 36 53 0.65536000000000000000e5
-1508 2 14 28 0.32768000000000000000e5
-1508 3 14 43 0.32768000000000000000e5
-1508 3 15 44 -0.65536000000000000000e5
-1508 3 16 45 0.13107200000000000000e6
-1508 3 18 47 0.32768000000000000000e5
-1508 3 19 48 0.65536000000000000000e5
-1508 3 22 35 -0.32768000000000000000e5
-1508 3 41 46 0.65536000000000000000e5
-1508 4 14 26 -0.32768000000000000000e5
-1508 4 15 27 -0.65536000000000000000e5
-1509 1 36 54 0.65536000000000000000e5
-1509 1 45 52 -0.65536000000000000000e5
-1510 1 11 18 0.32768000000000000000e5
-1510 1 36 51 -0.65536000000000000000e5
-1510 1 36 55 0.65536000000000000000e5
-1510 1 45 52 -0.32768000000000000000e5
-1510 3 6 19 -0.32768000000000000000e5
-1510 3 15 44 -0.32768000000000000000e5
-1510 3 17 30 -0.32768000000000000000e5
-1510 3 32 45 -0.32768000000000000000e5
-1510 3 36 49 0.32768000000000000000e5
-1510 3 41 46 0.32768000000000000000e5
-1510 4 15 35 0.32768000000000000000e5
-1511 1 36 56 0.65536000000000000000e5
-1511 1 45 52 -0.65536000000000000000e5
-1511 3 19 56 0.65536000000000000000e5
-1512 1 1 48 -0.32768000000000000000e5
-1512 1 6 53 -0.32768000000000000000e5
-1512 1 25 40 0.32768000000000000000e5
-1512 1 37 37 0.65536000000000000000e5
-1512 2 1 35 0.32768000000000000000e5
-1512 2 2 32 -0.32768000000000000000e5
-1512 2 4 34 -0.65536000000000000000e5
-1512 2 16 30 -0.65536000000000000000e5
-1512 2 16 34 0.65536000000000000000e5
-1512 2 21 35 0.65536000000000000000e5
-1512 3 2 47 -0.32768000000000000000e5
-1512 3 5 50 -0.65536000000000000000e5
-1512 3 7 52 0.26214400000000000000e6
-1512 3 24 37 -0.65536000000000000000e5
-1512 3 27 40 -0.65536000000000000000e5
-1512 3 28 41 -0.26214400000000000000e6
-1512 4 4 32 0.32768000000000000000e5
-1512 4 6 34 -0.13107200000000000000e6
-1512 4 7 35 0.65536000000000000000e5
-1512 4 16 28 -0.32768000000000000000e5
-1512 4 17 29 0.65536000000000000000e5
-1513 1 23 38 -0.65536000000000000000e5
-1513 1 37 38 0.65536000000000000000e5
-1513 3 2 47 0.65536000000000000000e5
-1514 1 2 49 -0.65536000000000000000e5
-1514 1 37 39 0.65536000000000000000e5
-1514 3 24 37 0.65536000000000000000e5
-1515 1 6 53 0.65536000000000000000e5
-1515 1 24 39 -0.65536000000000000000e5
-1515 1 25 40 -0.65536000000000000000e5
-1515 1 37 40 0.65536000000000000000e5
-1515 3 25 38 -0.65536000000000000000e5
-1515 3 27 40 0.13107200000000000000e6
-1515 4 4 32 -0.65536000000000000000e5
-1516 1 1 48 -0.32768000000000000000e5
-1516 1 2 49 -0.32768000000000000000e5
-1516 1 6 53 -0.32768000000000000000e5
-1516 1 23 38 -0.32768000000000000000e5
-1516 1 25 40 0.32768000000000000000e5
-1516 1 37 41 0.65536000000000000000e5
-1516 2 2 32 -0.32768000000000000000e5
-1516 2 4 34 -0.65536000000000000000e5
-1516 2 16 30 -0.65536000000000000000e5
-1516 2 16 34 0.65536000000000000000e5
-1516 2 21 35 0.65536000000000000000e5
-1516 3 5 50 -0.65536000000000000000e5
-1516 3 7 52 0.26214400000000000000e6
-1516 3 24 37 -0.32768000000000000000e5
-1516 3 27 40 -0.65536000000000000000e5
-1516 3 28 41 -0.26214400000000000000e6
-1516 4 4 32 0.32768000000000000000e5
-1516 4 6 34 -0.13107200000000000000e6
-1516 4 7 35 0.65536000000000000000e5
-1516 4 16 28 -0.32768000000000000000e5
-1516 4 17 29 0.65536000000000000000e5
-1517 1 6 53 -0.32768000000000000000e5
-1517 1 8 39 -0.65536000000000000000e5
-1517 1 9 40 -0.65536000000000000000e5
-1517 1 10 41 0.13107200000000000000e6
-1517 1 25 40 0.32768000000000000000e5
-1517 1 26 41 0.65536000000000000000e5
-1517 1 32 47 -0.13107200000000000000e6
-1517 1 37 42 0.65536000000000000000e5
-1517 3 9 38 -0.65536000000000000000e5
-1517 3 24 37 -0.32768000000000000000e5
-1517 3 27 40 -0.13107200000000000000e6
-1517 4 2 30 -0.65536000000000000000e5
-1517 4 4 32 0.32768000000000000000e5
-1517 4 16 28 -0.32768000000000000000e5
-1517 4 17 29 -0.65536000000000000000e5
-1518 1 1 48 0.32768000000000000000e5
-1518 1 2 49 0.32768000000000000000e5
-1518 1 6 53 0.32768000000000000000e5
-1518 1 8 39 0.65536000000000000000e5
-1518 1 9 40 0.65536000000000000000e5
-1518 1 10 41 -0.13107200000000000000e6
-1518 1 12 43 -0.26214400000000000000e6
-1518 1 23 38 0.32768000000000000000e5
-1518 1 25 40 -0.32768000000000000000e5
-1518 1 26 41 -0.65536000000000000000e5
-1518 1 28 43 0.13107200000000000000e6
-1518 1 32 47 0.26214400000000000000e6
-1518 1 37 43 0.65536000000000000000e5
-1518 2 2 32 0.32768000000000000000e5
-1518 2 16 30 0.65536000000000000000e5
-1518 2 20 34 0.13107200000000000000e6
-1518 3 9 38 0.65536000000000000000e5
-1518 3 22 35 0.26214400000000000000e6
-1518 3 24 37 0.32768000000000000000e5
-1518 3 27 40 0.65536000000000000000e5
-1518 3 28 41 0.26214400000000000000e6
-1518 4 2 30 0.65536000000000000000e5
-1518 4 4 32 -0.32768000000000000000e5
-1518 4 6 34 0.13107200000000000000e6
-1518 4 16 28 0.32768000000000000000e5
-1519 1 6 53 -0.16384000000000000000e5
-1519 1 12 43 -0.13107200000000000000e6
-1519 1 25 40 0.16384000000000000000e5
-1519 1 28 43 0.65536000000000000000e5
-1519 1 32 47 0.65536000000000000000e5
-1519 1 37 44 0.65536000000000000000e5
-1519 2 4 34 -0.32768000000000000000e5
-1519 2 20 34 0.65536000000000000000e5
-1519 2 21 35 0.32768000000000000000e5
-1519 3 5 50 -0.32768000000000000000e5
-1519 3 7 52 0.13107200000000000000e6
-1519 3 22 35 0.13107200000000000000e6
-1519 3 24 37 -0.16384000000000000000e5
-1519 3 27 40 -0.65536000000000000000e5
-1519 4 4 32 0.16384000000000000000e5
-1519 4 7 35 0.32768000000000000000e5
-1519 4 16 28 -0.16384000000000000000e5
-1520 1 32 47 -0.65536000000000000000e5
-1520 1 37 45 0.65536000000000000000e5
-1521 1 12 43 -0.65536000000000000000e5
-1521 1 37 46 0.65536000000000000000e5
-1521 3 7 52 0.65536000000000000000e5
-1521 3 22 35 0.65536000000000000000e5
-1522 1 22 53 -0.65536000000000000000e5
-1522 1 37 47 0.65536000000000000000e5
-1523 1 6 53 -0.65536000000000000000e5
-1523 1 8 39 -0.13107200000000000000e6
-1523 1 9 40 -0.13107200000000000000e6
-1523 1 10 41 0.26214400000000000000e6
-1523 1 22 53 0.65536000000000000000e5
-1523 1 23 54 0.65536000000000000000e5
-1523 1 24 55 0.13107200000000000000e6
-1523 1 25 40 0.65536000000000000000e5
-1523 1 37 48 0.65536000000000000000e5
-1523 1 37 52 -0.26214400000000000000e6
-1523 2 26 32 0.65536000000000000000e5
-1523 3 9 38 -0.13107200000000000000e6
-1523 3 22 51 -0.13107200000000000000e6
-1523 3 24 37 -0.65536000000000000000e5
-1523 3 27 40 -0.13107200000000000000e6
-1523 4 2 30 -0.13107200000000000000e6
-1523 4 4 32 0.65536000000000000000e5
-1523 4 16 28 -0.65536000000000000000e5
-1523 4 17 29 -0.13107200000000000000e6
-1523 4 20 32 -0.13107200000000000000e6
-1524 1 23 54 -0.65536000000000000000e5
-1524 1 37 49 0.65536000000000000000e5
-1525 1 6 53 -0.32768000000000000000e5
-1525 1 8 39 -0.65536000000000000000e5
-1525 1 9 40 -0.65536000000000000000e5
-1525 1 10 41 0.13107200000000000000e6
-1525 1 24 55 0.65536000000000000000e5
-1525 1 25 40 0.32768000000000000000e5
-1525 1 37 50 0.65536000000000000000e5
-1525 1 37 52 -0.13107200000000000000e6
-1525 3 9 38 -0.65536000000000000000e5
-1525 3 22 51 -0.65536000000000000000e5
-1525 3 24 37 -0.32768000000000000000e5
-1525 3 27 40 -0.65536000000000000000e5
-1525 4 2 30 -0.65536000000000000000e5
-1525 4 4 32 0.32768000000000000000e5
-1525 4 16 28 -0.32768000000000000000e5
-1525 4 17 29 -0.65536000000000000000e5
-1525 4 20 32 -0.65536000000000000000e5
-1526 1 1 48 0.32768000000000000000e5
-1526 1 2 49 0.32768000000000000000e5
-1526 1 6 53 0.32768000000000000000e5
-1526 1 8 39 0.65536000000000000000e5
-1526 1 9 40 0.65536000000000000000e5
-1526 1 10 41 -0.13107200000000000000e6
-1526 1 12 43 -0.26214400000000000000e6
-1526 1 23 38 0.32768000000000000000e5
-1526 1 25 40 -0.32768000000000000000e5
-1526 1 26 41 -0.65536000000000000000e5
-1526 1 28 43 0.13107200000000000000e6
-1526 1 32 47 0.26214400000000000000e6
-1526 1 37 51 0.65536000000000000000e5
-1526 2 2 32 0.32768000000000000000e5
-1526 2 16 30 0.65536000000000000000e5
-1526 2 20 34 0.13107200000000000000e6
-1526 3 9 38 0.65536000000000000000e5
-1526 3 22 35 0.26214400000000000000e6
-1526 3 22 51 0.65536000000000000000e5
-1526 3 24 37 0.32768000000000000000e5
-1526 3 27 40 0.65536000000000000000e5
-1526 3 28 41 0.26214400000000000000e6
-1526 4 2 30 0.65536000000000000000e5
-1526 4 4 32 -0.32768000000000000000e5
-1526 4 6 34 0.13107200000000000000e6
-1526 4 16 28 0.32768000000000000000e5
-1527 1 1 48 0.65536000000000000000e5
-1527 1 2 49 0.65536000000000000000e5
-1527 1 6 53 0.65536000000000000000e5
-1527 1 8 39 0.13107200000000000000e6
-1527 1 9 40 0.13107200000000000000e6
-1527 1 10 41 -0.26214400000000000000e6
-1527 1 12 43 -0.52428800000000000000e6
-1527 1 23 38 0.65536000000000000000e5
-1527 1 25 40 -0.65536000000000000000e5
-1527 1 26 41 -0.13107200000000000000e6
-1527 1 28 43 0.26214400000000000000e6
-1527 1 32 47 0.52428800000000000000e6
-1527 1 37 53 0.65536000000000000000e5
-1527 1 38 53 0.65536000000000000000e5
-1527 1 40 47 0.65536000000000000000e5
-1527 2 2 32 0.65536000000000000000e5
-1527 2 16 30 0.13107200000000000000e6
-1527 2 20 34 0.26214400000000000000e6
-1527 2 32 32 0.13107200000000000000e6
-1527 3 9 38 0.13107200000000000000e6
-1527 3 22 35 0.52428800000000000000e6
-1527 3 22 51 0.13107200000000000000e6
-1527 3 24 37 0.65536000000000000000e5
-1527 3 24 53 -0.65536000000000000000e5
-1527 3 27 40 0.13107200000000000000e6
-1527 3 28 41 0.52428800000000000000e6
-1527 3 37 50 0.13107200000000000000e6
-1527 4 2 30 0.13107200000000000000e6
-1527 4 4 32 -0.65536000000000000000e5
-1527 4 6 34 0.26214400000000000000e6
-1527 4 16 28 0.65536000000000000000e5
-1528 1 37 54 0.65536000000000000000e5
-1528 1 38 53 -0.65536000000000000000e5
-1529 1 1 48 0.32768000000000000000e5
-1529 1 2 49 0.32768000000000000000e5
-1529 1 6 53 0.32768000000000000000e5
-1529 1 8 39 0.65536000000000000000e5
-1529 1 9 40 0.65536000000000000000e5
-1529 1 10 41 -0.13107200000000000000e6
-1529 1 12 43 -0.26214400000000000000e6
-1529 1 23 38 0.32768000000000000000e5
-1529 1 25 40 -0.32768000000000000000e5
-1529 1 26 41 -0.65536000000000000000e5
-1529 1 28 43 0.13107200000000000000e6
-1529 1 32 47 0.26214400000000000000e6
-1529 1 37 55 0.65536000000000000000e5
-1529 2 2 32 0.32768000000000000000e5
-1529 2 16 30 0.65536000000000000000e5
-1529 2 20 34 0.13107200000000000000e6
-1529 3 9 38 0.65536000000000000000e5
-1529 3 22 35 0.26214400000000000000e6
-1529 3 22 51 0.65536000000000000000e5
-1529 3 24 37 0.32768000000000000000e5
-1529 3 27 40 0.65536000000000000000e5
-1529 3 28 41 0.26214400000000000000e6
-1529 3 37 50 0.65536000000000000000e5
-1529 4 2 30 0.65536000000000000000e5
-1529 4 4 32 -0.32768000000000000000e5
-1529 4 6 34 0.13107200000000000000e6
-1529 4 16 28 0.32768000000000000000e5
-1530 1 1 48 -0.65536000000000000000e5
-1530 1 2 49 -0.13107200000000000000e6
-1530 1 6 53 0.65536000000000000000e5
-1530 1 8 39 -0.13107200000000000000e6
-1530 1 9 40 -0.13107200000000000000e6
-1530 1 10 41 0.26214400000000000000e6
-1530 1 12 43 0.52428800000000000000e6
-1530 1 23 38 -0.65536000000000000000e5
-1530 1 24 39 -0.65536000000000000000e5
-1530 1 24 55 -0.13107200000000000000e6
-1530 1 25 56 -0.65536000000000000000e5
-1530 1 26 41 0.26214400000000000000e6
-1530 1 28 43 -0.26214400000000000000e6
-1530 1 32 47 -0.52428800000000000000e6
-1530 1 37 56 0.65536000000000000000e5
-1530 1 38 53 -0.65536000000000000000e5
-1530 1 40 47 -0.65536000000000000000e5
-1530 2 2 32 -0.65536000000000000000e5
-1530 2 3 33 -0.65536000000000000000e5
-1530 2 5 35 0.65536000000000000000e5
-1530 2 16 30 -0.13107200000000000000e6
-1530 2 20 34 -0.26214400000000000000e6
-1530 2 33 35 -0.65536000000000000000e5
-1530 3 9 38 -0.13107200000000000000e6
-1530 3 22 35 -0.52428800000000000000e6
-1530 3 22 51 0.13107200000000000000e6
-1530 3 23 52 -0.26214400000000000000e6
-1530 3 24 53 0.65536000000000000000e5
-1530 3 25 38 -0.65536000000000000000e5
-1530 3 25 54 0.65536000000000000000e5
-1530 3 27 40 -0.13107200000000000000e6
-1530 3 27 56 0.13107200000000000000e6
-1530 3 28 41 -0.52428800000000000000e6
-1530 3 38 51 -0.13107200000000000000e6
-1530 3 39 40 0.65536000000000000000e5
-1530 3 40 53 0.65536000000000000000e5
-1530 3 41 54 -0.13107200000000000000e6
-1530 4 2 30 -0.13107200000000000000e6
-1530 4 6 34 -0.26214400000000000000e6
-1530 4 7 35 0.13107200000000000000e6
-1530 4 32 32 -0.13107200000000000000e6
-1531 1 2 49 -0.32768000000000000000e5
-1531 1 38 38 0.65536000000000000000e5
-1531 3 24 37 0.32768000000000000000e5
-1532 1 6 53 0.65536000000000000000e5
-1532 1 24 39 -0.65536000000000000000e5
-1532 1 25 40 -0.65536000000000000000e5
-1532 1 38 39 0.65536000000000000000e5
-1532 3 25 38 -0.65536000000000000000e5
-1532 3 27 40 0.13107200000000000000e6
-1532 4 4 32 -0.65536000000000000000e5
-1533 1 1 48 0.65536000000000000000e5
-1533 1 2 49 0.13107200000000000000e6
-1533 1 8 39 0.13107200000000000000e6
-1533 1 9 40 0.13107200000000000000e6
-1533 1 10 41 -0.26214400000000000000e6
-1533 1 12 43 -0.52428800000000000000e6
-1533 1 23 38 0.65536000000000000000e5
-1533 1 24 39 0.65536000000000000000e5
-1533 1 26 41 -0.13107200000000000000e6
-1533 1 28 43 0.26214400000000000000e6
-1533 1 32 47 0.52428800000000000000e6
-1533 1 38 40 0.65536000000000000000e5
-1533 2 2 32 0.65536000000000000000e5
-1533 2 3 33 0.65536000000000000000e5
-1533 2 16 30 0.13107200000000000000e6
-1533 2 20 34 0.26214400000000000000e6
-1533 3 9 38 0.13107200000000000000e6
-1533 3 22 35 0.52428800000000000000e6
-1533 3 25 38 0.65536000000000000000e5
-1533 3 28 41 0.52428800000000000000e6
-1533 4 2 30 0.13107200000000000000e6
-1533 4 6 34 0.26214400000000000000e6
-1534 1 6 53 -0.32768000000000000000e5
-1534 1 8 39 -0.65536000000000000000e5
-1534 1 9 40 -0.65536000000000000000e5
-1534 1 10 41 0.13107200000000000000e6
-1534 1 25 40 0.32768000000000000000e5
-1534 1 26 41 0.65536000000000000000e5
-1534 1 32 47 -0.13107200000000000000e6
-1534 1 38 41 0.65536000000000000000e5
-1534 3 9 38 -0.65536000000000000000e5
-1534 3 24 37 -0.32768000000000000000e5
-1534 3 27 40 -0.13107200000000000000e6
-1534 4 2 30 -0.65536000000000000000e5
-1534 4 4 32 0.32768000000000000000e5
-1534 4 16 28 -0.32768000000000000000e5
-1534 4 17 29 -0.65536000000000000000e5
-1535 1 1 48 0.32768000000000000000e5
-1535 1 2 49 0.32768000000000000000e5
-1535 1 6 53 0.32768000000000000000e5
-1535 1 8 39 0.65536000000000000000e5
-1535 1 9 40 0.65536000000000000000e5
-1535 1 10 41 -0.13107200000000000000e6
-1535 1 12 43 -0.26214400000000000000e6
-1535 1 23 38 0.32768000000000000000e5
-1535 1 25 40 -0.32768000000000000000e5
-1535 1 26 41 -0.65536000000000000000e5
-1535 1 28 43 0.13107200000000000000e6
-1535 1 32 47 0.26214400000000000000e6
-1535 1 38 42 0.65536000000000000000e5
-1535 2 2 32 0.32768000000000000000e5
-1535 2 16 30 0.65536000000000000000e5
-1535 2 20 34 0.13107200000000000000e6
-1535 3 9 38 0.65536000000000000000e5
-1535 3 22 35 0.26214400000000000000e6
-1535 3 24 37 0.32768000000000000000e5
-1535 3 27 40 0.65536000000000000000e5
-1535 3 28 41 0.26214400000000000000e6
-1535 4 2 30 0.65536000000000000000e5
-1535 4 4 32 -0.32768000000000000000e5
-1535 4 6 34 0.13107200000000000000e6
-1535 4 16 28 0.32768000000000000000e5
-1536 1 26 41 -0.65536000000000000000e5
-1536 1 38 43 0.65536000000000000000e5
-1536 3 27 40 0.65536000000000000000e5
-1537 1 32 47 -0.65536000000000000000e5
-1537 1 38 44 0.65536000000000000000e5
-1538 1 6 53 0.16384000000000000000e5
-1538 1 25 40 -0.16384000000000000000e5
-1538 1 28 43 -0.65536000000000000000e5
-1538 1 38 45 0.65536000000000000000e5
-1538 2 4 34 0.32768000000000000000e5
-1538 2 21 35 -0.32768000000000000000e5
-1538 3 5 50 0.32768000000000000000e5
-1538 3 24 37 0.16384000000000000000e5
-1538 3 27 40 0.65536000000000000000e5
-1538 4 4 32 -0.16384000000000000000e5
-1538 4 7 35 -0.32768000000000000000e5
-1538 4 16 28 0.16384000000000000000e5
-1539 1 6 53 0.81920000000000000000e4
-1539 1 17 48 -0.65536000000000000000e5
-1539 1 25 40 -0.81920000000000000000e4
-1539 1 38 46 0.65536000000000000000e5
-1539 2 4 34 0.16384000000000000000e5
-1539 2 21 35 -0.16384000000000000000e5
-1539 3 5 50 0.16384000000000000000e5
-1539 3 24 37 0.81920000000000000000e4
-1539 3 27 40 0.32768000000000000000e5
-1539 3 28 41 0.32768000000000000000e5
-1539 3 29 42 0.32768000000000000000e5
-1539 4 4 32 -0.81920000000000000000e4
-1539 4 7 35 -0.16384000000000000000e5
-1539 4 16 28 0.81920000000000000000e4
-1539 4 23 27 0.32768000000000000000e5
-1540 1 6 53 -0.65536000000000000000e5
-1540 1 8 39 -0.13107200000000000000e6
-1540 1 9 40 -0.13107200000000000000e6
-1540 1 10 41 0.26214400000000000000e6
-1540 1 22 53 0.65536000000000000000e5
-1540 1 23 54 0.65536000000000000000e5
-1540 1 24 55 0.13107200000000000000e6
-1540 1 25 40 0.65536000000000000000e5
-1540 1 37 52 -0.26214400000000000000e6
-1540 1 38 47 0.65536000000000000000e5
-1540 2 26 32 0.65536000000000000000e5
-1540 3 9 38 -0.13107200000000000000e6
-1540 3 22 51 -0.13107200000000000000e6
-1540 3 24 37 -0.65536000000000000000e5
-1540 3 27 40 -0.13107200000000000000e6
-1540 4 2 30 -0.13107200000000000000e6
-1540 4 4 32 0.65536000000000000000e5
-1540 4 16 28 -0.65536000000000000000e5
-1540 4 17 29 -0.13107200000000000000e6
-1540 4 20 32 -0.13107200000000000000e6
-1541 1 23 54 -0.65536000000000000000e5
-1541 1 38 48 0.65536000000000000000e5
-1542 1 38 49 0.65536000000000000000e5
-1542 1 40 47 -0.65536000000000000000e5
-1543 1 1 48 0.32768000000000000000e5
-1543 1 2 49 0.32768000000000000000e5
-1543 1 6 53 0.32768000000000000000e5
-1543 1 8 39 0.65536000000000000000e5
-1543 1 9 40 0.65536000000000000000e5
-1543 1 10 41 -0.13107200000000000000e6
-1543 1 12 43 -0.26214400000000000000e6
-1543 1 23 38 0.32768000000000000000e5
-1543 1 25 40 -0.32768000000000000000e5
-1543 1 26 41 -0.65536000000000000000e5
-1543 1 28 43 0.13107200000000000000e6
-1543 1 32 47 0.26214400000000000000e6
-1543 1 38 50 0.65536000000000000000e5
-1543 2 2 32 0.32768000000000000000e5
-1543 2 16 30 0.65536000000000000000e5
-1543 2 20 34 0.13107200000000000000e6
-1543 3 9 38 0.65536000000000000000e5
-1543 3 22 35 0.26214400000000000000e6
-1543 3 22 51 0.65536000000000000000e5
-1543 3 24 37 0.32768000000000000000e5
-1543 3 27 40 0.65536000000000000000e5
-1543 3 28 41 0.26214400000000000000e6
-1543 4 2 30 0.65536000000000000000e5
-1543 4 4 32 -0.32768000000000000000e5
-1543 4 6 34 0.13107200000000000000e6
-1543 4 16 28 0.32768000000000000000e5
-1544 1 24 55 -0.65536000000000000000e5
-1544 1 38 51 0.65536000000000000000e5
-1545 1 6 53 0.16384000000000000000e5
-1545 1 25 40 -0.16384000000000000000e5
-1545 1 28 43 -0.65536000000000000000e5
-1545 1 38 52 0.65536000000000000000e5
-1545 2 4 34 0.32768000000000000000e5
-1545 2 21 35 -0.32768000000000000000e5
-1545 3 5 50 0.32768000000000000000e5
-1545 3 23 52 0.65536000000000000000e5
-1545 3 24 37 0.16384000000000000000e5
-1545 3 27 40 0.65536000000000000000e5
-1545 4 4 32 -0.16384000000000000000e5
-1545 4 7 35 -0.32768000000000000000e5
-1545 4 16 28 0.16384000000000000000e5
-1546 1 38 54 0.65536000000000000000e5
-1546 1 40 47 -0.65536000000000000000e5
-1546 3 24 53 0.65536000000000000000e5
-1547 1 38 55 0.65536000000000000000e5
-1547 1 41 56 -0.65536000000000000000e5
-1547 3 27 56 -0.65536000000000000000e5
-1548 1 38 56 0.65536000000000000000e5
-1548 1 47 54 -0.65536000000000000000e5
-1549 1 1 48 0.32768000000000000000e5
-1549 1 2 49 0.65536000000000000000e5
-1549 1 8 39 0.65536000000000000000e5
-1549 1 9 40 0.65536000000000000000e5
-1549 1 10 41 -0.13107200000000000000e6
-1549 1 12 43 -0.26214400000000000000e6
-1549 1 23 38 0.32768000000000000000e5
-1549 1 24 39 0.32768000000000000000e5
-1549 1 26 41 -0.65536000000000000000e5
-1549 1 28 43 0.13107200000000000000e6
-1549 1 32 47 0.26214400000000000000e6
-1549 1 39 39 0.65536000000000000000e5
-1549 2 2 32 0.32768000000000000000e5
-1549 2 3 33 0.32768000000000000000e5
-1549 2 16 30 0.65536000000000000000e5
-1549 2 20 34 0.13107200000000000000e6
-1549 3 9 38 0.65536000000000000000e5
-1549 3 22 35 0.26214400000000000000e6
-1549 3 25 38 0.32768000000000000000e5
-1549 3 28 41 0.26214400000000000000e6
-1549 4 2 30 0.65536000000000000000e5
-1549 4 6 34 0.13107200000000000000e6
-1550 1 6 53 -0.65536000000000000000e5
-1550 1 39 40 0.65536000000000000000e5
-1551 1 1 48 0.32768000000000000000e5
-1551 1 2 49 0.32768000000000000000e5
-1551 1 6 53 0.32768000000000000000e5
-1551 1 8 39 0.65536000000000000000e5
-1551 1 9 40 0.65536000000000000000e5
-1551 1 10 41 -0.13107200000000000000e6
-1551 1 12 43 -0.26214400000000000000e6
-1551 1 23 38 0.32768000000000000000e5
-1551 1 25 40 -0.32768000000000000000e5
-1551 1 26 41 -0.65536000000000000000e5
-1551 1 28 43 0.13107200000000000000e6
-1551 1 32 47 0.26214400000000000000e6
-1551 1 39 41 0.65536000000000000000e5
-1551 2 2 32 0.32768000000000000000e5
-1551 2 16 30 0.65536000000000000000e5
-1551 2 20 34 0.13107200000000000000e6
-1551 3 9 38 0.65536000000000000000e5
-1551 3 22 35 0.26214400000000000000e6
-1551 3 24 37 0.32768000000000000000e5
-1551 3 27 40 0.65536000000000000000e5
-1551 3 28 41 0.26214400000000000000e6
-1551 4 2 30 0.65536000000000000000e5
-1551 4 4 32 -0.32768000000000000000e5
-1551 4 6 34 0.13107200000000000000e6
-1551 4 16 28 0.32768000000000000000e5
-1552 1 26 41 -0.65536000000000000000e5
-1552 1 39 42 0.65536000000000000000e5
-1552 3 27 40 0.65536000000000000000e5
-1553 1 1 48 -0.32768000000000000000e5
-1553 1 2 49 -0.32768000000000000000e5
-1553 1 8 39 -0.65536000000000000000e5
-1553 1 9 40 -0.65536000000000000000e5
-1553 1 10 41 0.13107200000000000000e6
-1553 1 12 43 0.26214400000000000000e6
-1553 1 23 38 -0.32768000000000000000e5
-1553 1 26 41 0.13107200000000000000e6
-1553 1 28 43 -0.26214400000000000000e6
-1553 1 32 47 -0.26214400000000000000e6
-1553 1 39 43 0.65536000000000000000e5
-1553 2 2 32 -0.32768000000000000000e5
-1553 2 4 34 0.65536000000000000000e5
-1553 2 16 30 -0.65536000000000000000e5
-1553 2 20 34 -0.13107200000000000000e6
-1553 3 5 50 0.65536000000000000000e5
-1553 3 9 38 -0.65536000000000000000e5
-1553 3 22 35 -0.26214400000000000000e6
-1553 3 28 41 -0.26214400000000000000e6
-1553 4 2 30 -0.65536000000000000000e5
-1553 4 6 34 -0.13107200000000000000e6
-1554 1 6 53 0.16384000000000000000e5
-1554 1 25 40 -0.16384000000000000000e5
-1554 1 28 43 -0.65536000000000000000e5
-1554 1 39 44 0.65536000000000000000e5
-1554 2 4 34 0.32768000000000000000e5
-1554 2 21 35 -0.32768000000000000000e5
-1554 3 5 50 0.32768000000000000000e5
-1554 3 24 37 0.16384000000000000000e5
-1554 3 27 40 0.65536000000000000000e5
-1554 4 4 32 -0.16384000000000000000e5
-1554 4 7 35 -0.32768000000000000000e5
-1554 4 16 28 0.16384000000000000000e5
-1555 1 33 48 -0.65536000000000000000e5
-1555 1 39 45 0.65536000000000000000e5
-1556 1 34 49 -0.65536000000000000000e5
-1556 1 39 46 0.65536000000000000000e5
-1557 1 23 54 -0.65536000000000000000e5
-1557 1 39 47 0.65536000000000000000e5
-1558 1 39 48 0.65536000000000000000e5
-1558 1 40 47 -0.65536000000000000000e5
-1559 1 25 56 -0.65536000000000000000e5
-1559 1 39 49 0.65536000000000000000e5
-1559 3 24 53 0.65536000000000000000e5
-1559 3 25 54 0.65536000000000000000e5
-1559 3 38 51 -0.13107200000000000000e6
-1559 4 28 32 0.65536000000000000000e5
-1560 1 24 55 -0.65536000000000000000e5
-1560 1 39 50 0.65536000000000000000e5
-1561 1 1 48 -0.32768000000000000000e5
-1561 1 2 49 -0.32768000000000000000e5
-1561 1 8 39 -0.65536000000000000000e5
-1561 1 9 40 -0.65536000000000000000e5
-1561 1 10 41 0.13107200000000000000e6
-1561 1 12 43 0.26214400000000000000e6
-1561 1 23 38 -0.32768000000000000000e5
-1561 1 24 55 0.65536000000000000000e5
-1561 1 26 41 0.65536000000000000000e5
-1561 1 28 43 -0.26214400000000000000e6
-1561 1 32 47 -0.26214400000000000000e6
-1561 1 39 51 0.65536000000000000000e5
-1561 2 2 32 -0.32768000000000000000e5
-1561 2 4 34 0.65536000000000000000e5
-1561 2 16 30 -0.65536000000000000000e5
-1561 2 20 34 -0.13107200000000000000e6
-1561 3 5 50 0.65536000000000000000e5
-1561 3 9 38 -0.65536000000000000000e5
-1561 3 22 35 -0.26214400000000000000e6
-1561 3 22 51 -0.65536000000000000000e5
-1561 3 23 52 0.13107200000000000000e6
-1561 3 27 40 0.65536000000000000000e5
-1561 3 28 41 -0.26214400000000000000e6
-1561 4 2 30 -0.65536000000000000000e5
-1561 4 6 34 -0.13107200000000000000e6
-1561 4 7 35 -0.65536000000000000000e5
-1562 1 33 48 -0.65536000000000000000e5
-1562 1 39 52 0.65536000000000000000e5
-1562 3 10 55 -0.65536000000000000000e5
-1562 3 35 48 0.13107200000000000000e6
-1562 3 40 45 -0.65536000000000000000e5
-1562 4 22 34 -0.65536000000000000000e5
-1563 1 39 53 0.65536000000000000000e5
-1563 1 40 47 -0.65536000000000000000e5
-1563 3 24 53 0.65536000000000000000e5
-1564 1 25 56 -0.65536000000000000000e5
-1564 1 39 54 0.65536000000000000000e5
-1565 1 1 48 -0.32768000000000000000e5
-1565 1 2 49 -0.32768000000000000000e5
-1565 1 8 39 -0.65536000000000000000e5
-1565 1 9 40 -0.65536000000000000000e5
-1565 1 10 41 0.13107200000000000000e6
-1565 1 12 43 0.26214400000000000000e6
-1565 1 23 38 -0.32768000000000000000e5
-1565 1 24 55 0.65536000000000000000e5
-1565 1 26 41 0.65536000000000000000e5
-1565 1 28 43 -0.26214400000000000000e6
-1565 1 32 47 -0.26214400000000000000e6
-1565 1 39 55 0.65536000000000000000e5
-1565 2 2 32 -0.32768000000000000000e5
-1565 2 4 34 0.65536000000000000000e5
-1565 2 16 30 -0.65536000000000000000e5
-1565 2 20 34 -0.13107200000000000000e6
-1565 3 5 50 0.65536000000000000000e5
-1565 3 9 38 -0.65536000000000000000e5
-1565 3 22 35 -0.26214400000000000000e6
-1565 3 22 51 -0.65536000000000000000e5
-1565 3 23 52 0.13107200000000000000e6
-1565 3 27 40 0.65536000000000000000e5
-1565 3 28 41 -0.26214400000000000000e6
-1565 3 38 51 0.65536000000000000000e5
-1565 4 2 30 -0.65536000000000000000e5
-1565 4 6 34 -0.13107200000000000000e6
-1565 4 7 35 -0.65536000000000000000e5
-1566 1 1 48 0.65536000000000000000e5
-1566 1 2 49 0.13107200000000000000e6
-1566 1 6 53 -0.65536000000000000000e5
-1566 1 8 39 0.13107200000000000000e6
-1566 1 9 40 0.13107200000000000000e6
-1566 1 10 41 -0.26214400000000000000e6
-1566 1 12 43 -0.52428800000000000000e6
-1566 1 23 38 0.65536000000000000000e5
-1566 1 24 39 0.65536000000000000000e5
-1566 1 24 55 0.13107200000000000000e6
-1566 1 26 41 -0.26214400000000000000e6
-1566 1 28 43 0.26214400000000000000e6
-1566 1 32 47 0.52428800000000000000e6
-1566 1 39 56 0.65536000000000000000e5
-1566 1 47 54 0.65536000000000000000e5
-1566 2 2 32 0.65536000000000000000e5
-1566 2 3 33 0.65536000000000000000e5
-1566 2 5 35 -0.65536000000000000000e5
-1566 2 16 30 0.13107200000000000000e6
-1566 2 20 34 0.26214400000000000000e6
-1566 2 33 35 0.65536000000000000000e5
-1566 3 9 38 0.13107200000000000000e6
-1566 3 22 35 0.52428800000000000000e6
-1566 3 22 51 -0.13107200000000000000e6
-1566 3 23 52 0.26214400000000000000e6
-1566 3 25 38 0.65536000000000000000e5
-1566 3 25 54 -0.65536000000000000000e5
-1566 3 27 40 0.13107200000000000000e6
-1566 3 28 41 0.52428800000000000000e6
-1566 3 38 51 0.13107200000000000000e6
-1566 3 39 40 -0.65536000000000000000e5
-1566 3 40 53 -0.65536000000000000000e5
-1566 3 41 54 0.13107200000000000000e6
-1566 4 2 30 0.13107200000000000000e6
-1566 4 6 34 0.26214400000000000000e6
-1566 4 7 35 -0.13107200000000000000e6
-1567 1 1 48 -0.65536000000000000000e5
-1567 1 2 49 -0.98304000000000000000e5
-1567 1 6 53 0.32768000000000000000e5
-1567 1 8 39 -0.13107200000000000000e6
-1567 1 9 40 -0.13107200000000000000e6
-1567 1 10 41 0.26214400000000000000e6
-1567 1 12 43 0.52428800000000000000e6
-1567 1 23 38 -0.65536000000000000000e5
-1567 1 24 39 -0.32768000000000000000e5
-1567 1 26 41 0.19660800000000000000e6
-1567 1 28 43 -0.39321600000000000000e6
-1567 1 32 47 -0.52428800000000000000e6
-1567 1 40 40 0.65536000000000000000e5
-1567 2 2 32 -0.65536000000000000000e5
-1567 2 3 33 -0.32768000000000000000e5
-1567 2 4 34 0.65536000000000000000e5
-1567 2 5 35 0.32768000000000000000e5
-1567 2 16 30 -0.13107200000000000000e6
-1567 2 20 34 -0.26214400000000000000e6
-1567 3 5 50 0.65536000000000000000e5
-1567 3 9 38 -0.13107200000000000000e6
-1567 3 22 35 -0.52428800000000000000e6
-1567 3 25 38 -0.32768000000000000000e5
-1567 3 28 41 -0.52428800000000000000e6
-1567 4 2 30 -0.13107200000000000000e6
-1567 4 6 34 -0.26214400000000000000e6
-1568 1 26 41 -0.65536000000000000000e5
-1568 1 40 41 0.65536000000000000000e5
-1568 3 27 40 0.65536000000000000000e5
-1569 1 1 48 -0.32768000000000000000e5
-1569 1 2 49 -0.32768000000000000000e5
-1569 1 8 39 -0.65536000000000000000e5
-1569 1 9 40 -0.65536000000000000000e5
-1569 1 10 41 0.13107200000000000000e6
-1569 1 12 43 0.26214400000000000000e6
-1569 1 23 38 -0.32768000000000000000e5
-1569 1 26 41 0.13107200000000000000e6
-1569 1 28 43 -0.26214400000000000000e6
-1569 1 32 47 -0.26214400000000000000e6
-1569 1 40 42 0.65536000000000000000e5
-1569 2 2 32 -0.32768000000000000000e5
-1569 2 4 34 0.65536000000000000000e5
-1569 2 16 30 -0.65536000000000000000e5
-1569 2 20 34 -0.13107200000000000000e6
-1569 3 5 50 0.65536000000000000000e5
-1569 3 9 38 -0.65536000000000000000e5
-1569 3 22 35 -0.26214400000000000000e6
-1569 3 28 41 -0.26214400000000000000e6
-1569 4 2 30 -0.65536000000000000000e5
-1569 4 6 34 -0.13107200000000000000e6
-1570 1 1 48 0.32768000000000000000e5
-1570 1 2 49 0.32768000000000000000e5
-1570 1 8 39 0.65536000000000000000e5
-1570 1 9 40 0.65536000000000000000e5
-1570 1 10 41 -0.13107200000000000000e6
-1570 1 12 43 -0.26214400000000000000e6
-1570 1 23 38 0.32768000000000000000e5
-1570 1 26 41 -0.65536000000000000000e5
-1570 1 28 43 0.26214400000000000000e6
-1570 1 32 47 0.26214400000000000000e6
-1570 1 33 48 -0.13107200000000000000e6
-1570 1 40 43 0.65536000000000000000e5
-1570 2 2 32 0.32768000000000000000e5
-1570 2 4 34 -0.65536000000000000000e5
-1570 2 16 30 0.65536000000000000000e5
-1570 2 20 34 0.13107200000000000000e6
-1570 2 28 34 0.65536000000000000000e5
-1570 3 5 50 -0.65536000000000000000e5
-1570 3 9 38 0.65536000000000000000e5
-1570 3 22 35 0.26214400000000000000e6
-1570 3 27 40 -0.65536000000000000000e5
-1570 3 28 41 0.26214400000000000000e6
-1570 4 2 30 0.65536000000000000000e5
-1570 4 6 34 0.13107200000000000000e6
-1570 4 21 33 0.65536000000000000000e5
-1571 1 33 48 -0.65536000000000000000e5
-1571 1 40 44 0.65536000000000000000e5
-1572 1 33 40 -0.65536000000000000000e5
-1572 1 40 45 0.65536000000000000000e5
-1572 3 14 51 0.13107200000000000000e6
-1572 3 29 42 -0.65536000000000000000e5
-1572 3 30 43 -0.65536000000000000000e5
-1572 4 19 31 -0.65536000000000000000e5
-1573 1 18 49 -0.65536000000000000000e5
-1573 1 40 46 0.65536000000000000000e5
-1573 3 14 51 0.65536000000000000000e5
-1574 1 25 56 -0.65536000000000000000e5
-1574 1 40 48 0.65536000000000000000e5
-1574 3 24 53 0.65536000000000000000e5
-1574 3 25 54 0.65536000000000000000e5
-1574 3 38 51 -0.13107200000000000000e6
-1574 4 28 32 0.65536000000000000000e5
-1575 1 1 48 -0.13107200000000000000e6
-1575 1 2 49 -0.19660800000000000000e6
-1575 1 6 53 0.65536000000000000000e5
-1575 1 8 39 -0.26214400000000000000e6
-1575 1 9 40 -0.26214400000000000000e6
-1575 1 10 41 0.52428800000000000000e6
-1575 1 12 43 0.10485760000000000000e7
-1575 1 23 38 -0.13107200000000000000e6
-1575 1 24 39 -0.65536000000000000000e5
-1575 1 26 41 0.39321600000000000000e6
-1575 1 28 43 -0.78643200000000000000e6
-1575 1 32 47 -0.10485760000000000000e7
-1575 1 40 49 0.65536000000000000000e5
-1575 2 2 32 -0.13107200000000000000e6
-1575 2 3 33 -0.65536000000000000000e5
-1575 2 4 34 0.13107200000000000000e6
-1575 2 5 35 0.65536000000000000000e5
-1575 2 16 30 -0.26214400000000000000e6
-1575 2 20 34 -0.52428800000000000000e6
-1575 3 5 50 0.13107200000000000000e6
-1575 3 9 38 -0.26214400000000000000e6
-1575 3 22 35 -0.10485760000000000000e7
-1575 3 25 38 -0.65536000000000000000e5
-1575 3 28 41 -0.10485760000000000000e7
-1575 3 39 40 0.65536000000000000000e5
-1575 4 2 30 -0.26214400000000000000e6
-1575 4 6 34 -0.52428800000000000000e6
-1576 1 1 48 -0.32768000000000000000e5
-1576 1 2 49 -0.32768000000000000000e5
-1576 1 8 39 -0.65536000000000000000e5
-1576 1 9 40 -0.65536000000000000000e5
-1576 1 10 41 0.13107200000000000000e6
-1576 1 12 43 0.26214400000000000000e6
-1576 1 23 38 -0.32768000000000000000e5
-1576 1 24 55 0.65536000000000000000e5
-1576 1 26 41 0.65536000000000000000e5
-1576 1 28 43 -0.26214400000000000000e6
-1576 1 32 47 -0.26214400000000000000e6
-1576 1 40 50 0.65536000000000000000e5
-1576 2 2 32 -0.32768000000000000000e5
-1576 2 4 34 0.65536000000000000000e5
-1576 2 16 30 -0.65536000000000000000e5
-1576 2 20 34 -0.13107200000000000000e6
-1576 3 5 50 0.65536000000000000000e5
-1576 3 9 38 -0.65536000000000000000e5
-1576 3 22 35 -0.26214400000000000000e6
-1576 3 22 51 -0.65536000000000000000e5
-1576 3 23 52 0.13107200000000000000e6
-1576 3 27 40 0.65536000000000000000e5
-1576 3 28 41 -0.26214400000000000000e6
-1576 4 2 30 -0.65536000000000000000e5
-1576 4 6 34 -0.13107200000000000000e6
-1576 4 7 35 -0.65536000000000000000e5
-1577 1 1 48 0.32768000000000000000e5
-1577 1 2 49 0.32768000000000000000e5
-1577 1 8 39 0.65536000000000000000e5
-1577 1 9 40 0.65536000000000000000e5
-1577 1 10 41 -0.13107200000000000000e6
-1577 1 12 43 -0.26214400000000000000e6
-1577 1 23 38 0.32768000000000000000e5
-1577 1 26 41 -0.65536000000000000000e5
-1577 1 28 43 0.26214400000000000000e6
-1577 1 32 47 0.26214400000000000000e6
-1577 1 33 48 -0.13107200000000000000e6
-1577 1 40 51 0.65536000000000000000e5
-1577 2 2 32 0.32768000000000000000e5
-1577 2 4 34 -0.65536000000000000000e5
-1577 2 16 30 0.65536000000000000000e5
-1577 2 20 34 0.13107200000000000000e6
-1577 2 28 34 0.65536000000000000000e5
-1577 3 5 50 -0.65536000000000000000e5
-1577 3 9 38 0.65536000000000000000e5
-1577 3 10 55 -0.13107200000000000000e6
-1577 3 22 35 0.26214400000000000000e6
-1577 3 22 51 0.65536000000000000000e5
-1577 3 23 52 -0.13107200000000000000e6
-1577 3 27 40 -0.65536000000000000000e5
-1577 3 28 41 0.26214400000000000000e6
-1577 3 35 48 0.26214400000000000000e6
-1577 3 40 45 -0.13107200000000000000e6
-1577 4 2 30 0.65536000000000000000e5
-1577 4 6 34 0.13107200000000000000e6
-1577 4 7 35 0.65536000000000000000e5
-1577 4 22 34 -0.13107200000000000000e6
-1578 1 33 40 -0.65536000000000000000e5
-1578 1 40 52 0.65536000000000000000e5
-1578 3 10 55 0.65536000000000000000e5
-1578 3 14 51 0.13107200000000000000e6
-1578 3 29 42 -0.65536000000000000000e5
-1578 3 30 43 -0.65536000000000000000e5
-1578 4 19 31 -0.65536000000000000000e5
-1579 1 25 56 -0.65536000000000000000e5
-1579 1 40 53 0.65536000000000000000e5
-1580 1 1 48 -0.13107200000000000000e6
-1580 1 2 49 -0.19660800000000000000e6
-1580 1 6 53 0.65536000000000000000e5
-1580 1 8 39 -0.26214400000000000000e6
-1580 1 9 40 -0.26214400000000000000e6
-1580 1 10 41 0.52428800000000000000e6
-1580 1 12 43 0.10485760000000000000e7
-1580 1 23 38 -0.13107200000000000000e6
-1580 1 24 39 -0.65536000000000000000e5
-1580 1 26 41 0.39321600000000000000e6
-1580 1 28 43 -0.78643200000000000000e6
-1580 1 32 47 -0.10485760000000000000e7
-1580 1 40 54 0.65536000000000000000e5
-1580 2 2 32 -0.13107200000000000000e6
-1580 2 3 33 -0.65536000000000000000e5
-1580 2 4 34 0.13107200000000000000e6
-1580 2 5 35 0.65536000000000000000e5
-1580 2 16 30 -0.26214400000000000000e6
-1580 2 20 34 -0.52428800000000000000e6
-1580 3 5 50 0.13107200000000000000e6
-1580 3 9 38 -0.26214400000000000000e6
-1580 3 22 35 -0.10485760000000000000e7
-1580 3 25 38 -0.65536000000000000000e5
-1580 3 25 54 0.65536000000000000000e5
-1580 3 28 41 -0.10485760000000000000e7
-1580 3 39 40 0.65536000000000000000e5
-1580 4 2 30 -0.26214400000000000000e6
-1580 4 6 34 -0.52428800000000000000e6
-1581 1 1 48 -0.13107200000000000000e6
-1581 1 2 49 -0.19660800000000000000e6
-1581 1 6 53 0.65536000000000000000e5
-1581 1 8 39 -0.26214400000000000000e6
-1581 1 9 40 -0.26214400000000000000e6
-1581 1 10 41 0.52428800000000000000e6
-1581 1 12 43 0.10485760000000000000e7
-1581 1 23 38 -0.13107200000000000000e6
-1581 1 24 39 -0.65536000000000000000e5
-1581 1 26 41 0.39321600000000000000e6
-1581 1 28 43 -0.78643200000000000000e6
-1581 1 32 47 -0.10485760000000000000e7
-1581 1 40 56 0.65536000000000000000e5
-1581 2 2 32 -0.13107200000000000000e6
-1581 2 3 33 -0.65536000000000000000e5
-1581 2 4 34 0.13107200000000000000e6
-1581 2 5 35 0.65536000000000000000e5
-1581 2 16 30 -0.26214400000000000000e6
-1581 2 20 34 -0.52428800000000000000e6
-1581 3 5 50 0.13107200000000000000e6
-1581 3 9 38 -0.26214400000000000000e6
-1581 3 22 35 -0.10485760000000000000e7
-1581 3 25 38 -0.65536000000000000000e5
-1581 3 25 54 0.65536000000000000000e5
-1581 3 28 41 -0.10485760000000000000e7
-1581 3 39 40 0.65536000000000000000e5
-1581 3 40 53 0.65536000000000000000e5
-1581 4 2 30 -0.26214400000000000000e6
-1581 4 6 34 -0.52428800000000000000e6
-1582 1 6 53 -0.81920000000000000000e4
-1582 1 12 43 -0.65536000000000000000e5
-1582 1 25 40 0.81920000000000000000e4
-1582 1 28 43 0.32768000000000000000e5
-1582 1 32 47 0.32768000000000000000e5
-1582 1 41 41 0.65536000000000000000e5
-1582 2 4 34 -0.16384000000000000000e5
-1582 2 20 34 0.32768000000000000000e5
-1582 2 21 35 0.16384000000000000000e5
-1582 3 5 50 -0.16384000000000000000e5
-1582 3 7 52 0.65536000000000000000e5
-1582 3 22 35 0.65536000000000000000e5
-1582 3 24 37 -0.81920000000000000000e4
-1582 3 27 40 -0.32768000000000000000e5
-1582 4 4 32 0.81920000000000000000e4
-1582 4 7 35 0.16384000000000000000e5
-1582 4 16 28 -0.81920000000000000000e4
-1583 1 32 47 -0.65536000000000000000e5
-1583 1 41 42 0.65536000000000000000e5
-1584 1 6 53 0.16384000000000000000e5
-1584 1 25 40 -0.16384000000000000000e5
-1584 1 28 43 -0.65536000000000000000e5
-1584 1 41 43 0.65536000000000000000e5
-1584 2 4 34 0.32768000000000000000e5
-1584 2 21 35 -0.32768000000000000000e5
-1584 3 5 50 0.32768000000000000000e5
-1584 3 24 37 0.16384000000000000000e5
-1584 3 27 40 0.65536000000000000000e5
-1584 4 4 32 -0.16384000000000000000e5
-1584 4 7 35 -0.32768000000000000000e5
-1584 4 16 28 0.16384000000000000000e5
-1585 1 12 43 -0.65536000000000000000e5
-1585 1 41 44 0.65536000000000000000e5
-1585 3 7 52 0.65536000000000000000e5
-1585 3 22 35 0.65536000000000000000e5
-1586 1 6 53 0.81920000000000000000e4
-1586 1 17 48 -0.65536000000000000000e5
-1586 1 25 40 -0.81920000000000000000e4
-1586 1 41 45 0.65536000000000000000e5
-1586 2 4 34 0.16384000000000000000e5
-1586 2 21 35 -0.16384000000000000000e5
-1586 3 5 50 0.16384000000000000000e5
-1586 3 24 37 0.81920000000000000000e4
-1586 3 27 40 0.32768000000000000000e5
-1586 3 28 41 0.32768000000000000000e5
-1586 3 29 42 0.32768000000000000000e5
-1586 4 4 32 -0.81920000000000000000e4
-1586 4 7 35 -0.16384000000000000000e5
-1586 4 16 28 0.81920000000000000000e4
-1586 4 23 27 0.32768000000000000000e5
-1587 1 4 35 -0.32768000000000000000e5
-1587 1 12 43 -0.32768000000000000000e5
-1587 1 34 49 -0.32768000000000000000e5
-1587 1 41 46 0.65536000000000000000e5
-1587 2 9 23 -0.32768000000000000000e5
-1587 3 5 34 -0.32768000000000000000e5
-1587 3 13 42 0.32768000000000000000e5
-1587 3 14 27 -0.32768000000000000000e5
-1587 3 16 29 0.65536000000000000000e5
-1587 3 18 47 -0.32768000000000000000e5
-1587 3 22 35 0.32768000000000000000e5
-1587 3 31 44 0.65536000000000000000e5
-1587 4 14 26 0.32768000000000000000e5
-1588 1 6 53 -0.32768000000000000000e5
-1588 1 8 39 -0.65536000000000000000e5
-1588 1 9 40 -0.65536000000000000000e5
-1588 1 10 41 0.13107200000000000000e6
-1588 1 24 55 0.65536000000000000000e5
-1588 1 25 40 0.32768000000000000000e5
-1588 1 37 52 -0.13107200000000000000e6
-1588 1 41 47 0.65536000000000000000e5
-1588 3 9 38 -0.65536000000000000000e5
-1588 3 22 51 -0.65536000000000000000e5
-1588 3 24 37 -0.32768000000000000000e5
-1588 3 27 40 -0.65536000000000000000e5
-1588 4 2 30 -0.65536000000000000000e5
-1588 4 4 32 0.32768000000000000000e5
-1588 4 16 28 -0.32768000000000000000e5
-1588 4 17 29 -0.65536000000000000000e5
-1588 4 20 32 -0.65536000000000000000e5
-1589 1 1 48 0.32768000000000000000e5
-1589 1 2 49 0.32768000000000000000e5
-1589 1 6 53 0.32768000000000000000e5
-1589 1 8 39 0.65536000000000000000e5
-1589 1 9 40 0.65536000000000000000e5
-1589 1 10 41 -0.13107200000000000000e6
-1589 1 12 43 -0.26214400000000000000e6
-1589 1 23 38 0.32768000000000000000e5
-1589 1 25 40 -0.32768000000000000000e5
-1589 1 26 41 -0.65536000000000000000e5
-1589 1 28 43 0.13107200000000000000e6
-1589 1 32 47 0.26214400000000000000e6
-1589 1 41 48 0.65536000000000000000e5
-1589 2 2 32 0.32768000000000000000e5
-1589 2 16 30 0.65536000000000000000e5
-1589 2 20 34 0.13107200000000000000e6
-1589 3 9 38 0.65536000000000000000e5
-1589 3 22 35 0.26214400000000000000e6
-1589 3 22 51 0.65536000000000000000e5
-1589 3 24 37 0.32768000000000000000e5
-1589 3 27 40 0.65536000000000000000e5
-1589 3 28 41 0.26214400000000000000e6
-1589 4 2 30 0.65536000000000000000e5
-1589 4 4 32 -0.32768000000000000000e5
-1589 4 6 34 0.13107200000000000000e6
-1589 4 16 28 0.32768000000000000000e5
-1590 1 24 55 -0.65536000000000000000e5
-1590 1 41 49 0.65536000000000000000e5
-1591 1 37 52 -0.65536000000000000000e5
-1591 1 41 50 0.65536000000000000000e5
-1592 1 6 53 0.16384000000000000000e5
-1592 1 25 40 -0.16384000000000000000e5
-1592 1 28 43 -0.65536000000000000000e5
-1592 1 41 51 0.65536000000000000000e5
-1592 2 4 34 0.32768000000000000000e5
-1592 2 21 35 -0.32768000000000000000e5
-1592 3 5 50 0.32768000000000000000e5
-1592 3 23 52 0.65536000000000000000e5
-1592 3 24 37 0.16384000000000000000e5
-1592 3 27 40 0.65536000000000000000e5
-1592 4 4 32 -0.16384000000000000000e5
-1592 4 7 35 -0.32768000000000000000e5
-1592 4 16 28 0.16384000000000000000e5
-1593 1 6 53 0.81920000000000000000e4
-1593 1 17 48 -0.65536000000000000000e5
-1593 1 25 40 -0.81920000000000000000e4
-1593 1 41 52 0.65536000000000000000e5
-1593 2 4 34 0.16384000000000000000e5
-1593 2 21 35 -0.16384000000000000000e5
-1593 3 5 50 0.16384000000000000000e5
-1593 3 24 37 0.81920000000000000000e4
-1593 3 27 40 0.32768000000000000000e5
-1593 3 28 41 0.32768000000000000000e5
-1593 3 29 42 0.32768000000000000000e5
-1593 3 34 47 0.65536000000000000000e5
-1593 4 4 32 -0.81920000000000000000e4
-1593 4 7 35 -0.16384000000000000000e5
-1593 4 16 28 0.81920000000000000000e4
-1593 4 23 27 0.32768000000000000000e5
-1594 1 1 48 0.32768000000000000000e5
-1594 1 2 49 0.32768000000000000000e5
-1594 1 6 53 0.32768000000000000000e5
-1594 1 8 39 0.65536000000000000000e5
-1594 1 9 40 0.65536000000000000000e5
-1594 1 10 41 -0.13107200000000000000e6
-1594 1 12 43 -0.26214400000000000000e6
-1594 1 23 38 0.32768000000000000000e5
-1594 1 25 40 -0.32768000000000000000e5
-1594 1 26 41 -0.65536000000000000000e5
-1594 1 28 43 0.13107200000000000000e6
-1594 1 32 47 0.26214400000000000000e6
-1594 1 41 53 0.65536000000000000000e5
-1594 2 2 32 0.32768000000000000000e5
-1594 2 16 30 0.65536000000000000000e5
-1594 2 20 34 0.13107200000000000000e6
-1594 3 9 38 0.65536000000000000000e5
-1594 3 22 35 0.26214400000000000000e6
-1594 3 22 51 0.65536000000000000000e5
-1594 3 24 37 0.32768000000000000000e5
-1594 3 27 40 0.65536000000000000000e5
-1594 3 28 41 0.26214400000000000000e6
-1594 3 37 50 0.65536000000000000000e5
-1594 4 2 30 0.65536000000000000000e5
-1594 4 4 32 -0.32768000000000000000e5
-1594 4 6 34 0.13107200000000000000e6
-1594 4 16 28 0.32768000000000000000e5
-1595 1 41 54 0.65536000000000000000e5
-1595 1 41 56 -0.65536000000000000000e5
-1595 3 27 56 -0.65536000000000000000e5
-1596 1 1 48 0.16384000000000000000e5
-1596 1 2 49 0.16384000000000000000e5
-1596 1 6 53 0.16384000000000000000e5
-1596 1 8 39 0.32768000000000000000e5
-1596 1 9 40 0.32768000000000000000e5
-1596 1 10 41 -0.65536000000000000000e5
-1596 1 12 43 -0.13107200000000000000e6
-1596 1 23 38 0.16384000000000000000e5
-1596 1 24 55 -0.32768000000000000000e5
-1596 1 25 40 -0.16384000000000000000e5
-1596 1 26 41 -0.32768000000000000000e5
-1596 1 28 43 0.65536000000000000000e5
-1596 1 32 47 0.13107200000000000000e6
-1596 1 33 48 -0.65536000000000000000e5
-1596 1 40 55 0.32768000000000000000e5
-1596 1 41 55 0.65536000000000000000e5
-1596 1 41 56 0.32768000000000000000e5
-1596 1 44 51 0.13107200000000000000e6
-1596 1 46 53 -0.13107200000000000000e6
-1596 2 2 32 0.16384000000000000000e5
-1596 2 16 30 0.32768000000000000000e5
-1596 2 20 34 0.65536000000000000000e5
-1596 2 21 35 -0.32768000000000000000e5
-1596 2 28 34 0.32768000000000000000e5
-1596 3 9 38 0.32768000000000000000e5
-1596 3 10 55 -0.65536000000000000000e5
-1596 3 22 35 0.13107200000000000000e6
-1596 3 22 51 0.32768000000000000000e5
-1596 3 24 37 0.16384000000000000000e5
-1596 3 27 40 0.32768000000000000000e5
-1596 3 27 56 0.32768000000000000000e5
-1596 3 28 41 0.13107200000000000000e6
-1596 3 35 48 0.13107200000000000000e6
-1596 3 38 51 -0.32768000000000000000e5
-1596 3 39 52 -0.65536000000000000000e5
-1596 3 40 45 -0.65536000000000000000e5
-1596 4 2 30 0.32768000000000000000e5
-1596 4 4 32 -0.16384000000000000000e5
-1596 4 6 34 0.65536000000000000000e5
-1596 4 16 28 0.16384000000000000000e5
-1596 4 22 34 -0.65536000000000000000e5
-1596 4 23 35 -0.65536000000000000000e5
-1596 4 29 33 -0.32768000000000000000e5
-1597 1 6 53 0.81920000000000000000e4
-1597 1 25 40 -0.81920000000000000000e4
-1597 1 28 43 -0.32768000000000000000e5
-1597 1 42 42 0.65536000000000000000e5
-1597 2 4 34 0.16384000000000000000e5
-1597 2 21 35 -0.16384000000000000000e5
-1597 3 5 50 0.16384000000000000000e5
-1597 3 24 37 0.81920000000000000000e4
-1597 3 27 40 0.32768000000000000000e5
-1597 4 4 32 -0.81920000000000000000e4
-1597 4 7 35 -0.16384000000000000000e5
-1597 4 16 28 0.81920000000000000000e4
-1598 1 33 48 -0.65536000000000000000e5
-1598 1 42 43 0.65536000000000000000e5
-1599 1 6 53 0.81920000000000000000e4
-1599 1 17 48 -0.65536000000000000000e5
-1599 1 25 40 -0.81920000000000000000e4
-1599 1 42 44 0.65536000000000000000e5
-1599 2 4 34 0.16384000000000000000e5
-1599 2 21 35 -0.16384000000000000000e5
-1599 3 5 50 0.16384000000000000000e5
-1599 3 24 37 0.81920000000000000000e4
-1599 3 27 40 0.32768000000000000000e5
-1599 3 28 41 0.32768000000000000000e5
-1599 3 29 42 0.32768000000000000000e5
-1599 4 4 32 -0.81920000000000000000e4
-1599 4 7 35 -0.16384000000000000000e5
-1599 4 16 28 0.81920000000000000000e4
-1599 4 23 27 0.32768000000000000000e5
-1600 1 34 49 -0.65536000000000000000e5
-1600 1 42 45 0.65536000000000000000e5
-1601 1 14 45 -0.13107200000000000000e6
-1601 1 17 48 0.32768000000000000000e5
-1601 1 18 49 0.32768000000000000000e5
-1601 1 34 49 0.32768000000000000000e5
-1601 1 42 46 0.65536000000000000000e5
-1601 2 14 28 0.32768000000000000000e5
-1601 3 14 43 0.32768000000000000000e5
-1601 3 15 44 -0.65536000000000000000e5
-1601 3 16 45 0.13107200000000000000e6
-1601 3 18 47 0.32768000000000000000e5
-1601 3 19 48 0.65536000000000000000e5
-1601 3 22 35 -0.32768000000000000000e5
-1601 4 14 26 -0.32768000000000000000e5
-1601 4 15 27 -0.65536000000000000000e5
-1602 1 1 48 0.32768000000000000000e5
-1602 1 2 49 0.32768000000000000000e5
-1602 1 6 53 0.32768000000000000000e5
-1602 1 8 39 0.65536000000000000000e5
-1602 1 9 40 0.65536000000000000000e5
-1602 1 10 41 -0.13107200000000000000e6
-1602 1 12 43 -0.26214400000000000000e6
-1602 1 23 38 0.32768000000000000000e5
-1602 1 25 40 -0.32768000000000000000e5
-1602 1 26 41 -0.65536000000000000000e5
-1602 1 28 43 0.13107200000000000000e6
-1602 1 32 47 0.26214400000000000000e6
-1602 1 42 47 0.65536000000000000000e5
-1602 2 2 32 0.32768000000000000000e5
-1602 2 16 30 0.65536000000000000000e5
-1602 2 20 34 0.13107200000000000000e6
-1602 3 9 38 0.65536000000000000000e5
-1602 3 22 35 0.26214400000000000000e6
-1602 3 22 51 0.65536000000000000000e5
-1602 3 24 37 0.32768000000000000000e5
-1602 3 27 40 0.65536000000000000000e5
-1602 3 28 41 0.26214400000000000000e6
-1602 4 2 30 0.65536000000000000000e5
-1602 4 4 32 -0.32768000000000000000e5
-1602 4 6 34 0.13107200000000000000e6
-1602 4 16 28 0.32768000000000000000e5
-1603 1 24 55 -0.65536000000000000000e5
-1603 1 42 48 0.65536000000000000000e5
-1604 1 1 48 -0.32768000000000000000e5
-1604 1 2 49 -0.32768000000000000000e5
-1604 1 8 39 -0.65536000000000000000e5
-1604 1 9 40 -0.65536000000000000000e5
-1604 1 10 41 0.13107200000000000000e6
-1604 1 12 43 0.26214400000000000000e6
-1604 1 23 38 -0.32768000000000000000e5
-1604 1 24 55 0.65536000000000000000e5
-1604 1 26 41 0.65536000000000000000e5
-1604 1 28 43 -0.26214400000000000000e6
-1604 1 32 47 -0.26214400000000000000e6
-1604 1 42 49 0.65536000000000000000e5
-1604 2 2 32 -0.32768000000000000000e5
-1604 2 4 34 0.65536000000000000000e5
-1604 2 16 30 -0.65536000000000000000e5
-1604 2 20 34 -0.13107200000000000000e6
-1604 3 5 50 0.65536000000000000000e5
-1604 3 9 38 -0.65536000000000000000e5
-1604 3 22 35 -0.26214400000000000000e6
-1604 3 22 51 -0.65536000000000000000e5
-1604 3 23 52 0.13107200000000000000e6
-1604 3 27 40 0.65536000000000000000e5
-1604 3 28 41 -0.26214400000000000000e6
-1604 4 2 30 -0.65536000000000000000e5
-1604 4 6 34 -0.13107200000000000000e6
-1604 4 7 35 -0.65536000000000000000e5
-1605 1 6 53 0.16384000000000000000e5
-1605 1 25 40 -0.16384000000000000000e5
-1605 1 28 43 -0.65536000000000000000e5
-1605 1 42 50 0.65536000000000000000e5
-1605 2 4 34 0.32768000000000000000e5
-1605 2 21 35 -0.32768000000000000000e5
-1605 3 5 50 0.32768000000000000000e5
-1605 3 23 52 0.65536000000000000000e5
-1605 3 24 37 0.16384000000000000000e5
-1605 3 27 40 0.65536000000000000000e5
-1605 4 4 32 -0.16384000000000000000e5
-1605 4 7 35 -0.32768000000000000000e5
-1605 4 16 28 0.16384000000000000000e5
-1606 1 33 48 -0.65536000000000000000e5
-1606 1 42 51 0.65536000000000000000e5
-1606 3 10 55 -0.65536000000000000000e5
-1606 3 35 48 0.13107200000000000000e6
-1606 3 40 45 -0.65536000000000000000e5
-1606 4 22 34 -0.65536000000000000000e5
-1607 1 42 52 0.65536000000000000000e5
-1607 1 44 51 -0.65536000000000000000e5
-1608 1 41 56 -0.65536000000000000000e5
-1608 1 42 53 0.65536000000000000000e5
-1608 3 27 56 -0.65536000000000000000e5
-1609 1 1 48 -0.32768000000000000000e5
-1609 1 2 49 -0.32768000000000000000e5
-1609 1 8 39 -0.65536000000000000000e5
-1609 1 9 40 -0.65536000000000000000e5
-1609 1 10 41 0.13107200000000000000e6
-1609 1 12 43 0.26214400000000000000e6
-1609 1 23 38 -0.32768000000000000000e5
-1609 1 24 55 0.65536000000000000000e5
-1609 1 26 41 0.65536000000000000000e5
-1609 1 28 43 -0.26214400000000000000e6
-1609 1 32 47 -0.26214400000000000000e6
-1609 1 42 54 0.65536000000000000000e5
-1609 2 2 32 -0.32768000000000000000e5
-1609 2 4 34 0.65536000000000000000e5
-1609 2 16 30 -0.65536000000000000000e5
-1609 2 20 34 -0.13107200000000000000e6
-1609 3 5 50 0.65536000000000000000e5
-1609 3 9 38 -0.65536000000000000000e5
-1609 3 22 35 -0.26214400000000000000e6
-1609 3 22 51 -0.65536000000000000000e5
-1609 3 23 52 0.13107200000000000000e6
-1609 3 27 40 0.65536000000000000000e5
-1609 3 28 41 -0.26214400000000000000e6
-1609 3 38 51 0.65536000000000000000e5
-1609 4 2 30 -0.65536000000000000000e5
-1609 4 6 34 -0.13107200000000000000e6
-1609 4 7 35 -0.65536000000000000000e5
-1610 1 1 48 -0.16384000000000000000e5
-1610 1 2 49 -0.16384000000000000000e5
-1610 1 8 39 -0.32768000000000000000e5
-1610 1 9 40 -0.32768000000000000000e5
-1610 1 10 41 0.65536000000000000000e5
-1610 1 12 43 0.13107200000000000000e6
-1610 1 23 38 -0.16384000000000000000e5
-1610 1 24 55 0.32768000000000000000e5
-1610 1 26 41 0.32768000000000000000e5
-1610 1 28 43 -0.13107200000000000000e6
-1610 1 32 47 -0.13107200000000000000e6
-1610 1 40 55 -0.32768000000000000000e5
-1610 1 41 56 -0.32768000000000000000e5
-1610 1 42 55 0.65536000000000000000e5
-1610 2 2 32 -0.16384000000000000000e5
-1610 2 4 34 0.32768000000000000000e5
-1610 2 16 30 -0.32768000000000000000e5
-1610 2 20 34 -0.65536000000000000000e5
-1610 2 28 34 -0.32768000000000000000e5
-1610 3 5 50 0.32768000000000000000e5
-1610 3 9 38 -0.32768000000000000000e5
-1610 3 22 35 -0.13107200000000000000e6
-1610 3 22 51 -0.32768000000000000000e5
-1610 3 23 52 0.65536000000000000000e5
-1610 3 27 40 0.32768000000000000000e5
-1610 3 27 56 -0.32768000000000000000e5
-1610 3 28 41 -0.13107200000000000000e6
-1610 3 38 51 0.32768000000000000000e5
-1610 4 2 30 -0.32768000000000000000e5
-1610 4 6 34 -0.65536000000000000000e5
-1610 4 7 35 -0.32768000000000000000e5
-1610 4 29 33 0.32768000000000000000e5
-1611 1 1 48 -0.32768000000000000000e5
-1611 1 2 49 -0.32768000000000000000e5
-1611 1 8 39 -0.65536000000000000000e5
-1611 1 9 40 -0.65536000000000000000e5
-1611 1 10 41 0.13107200000000000000e6
-1611 1 12 43 0.26214400000000000000e6
-1611 1 23 38 -0.32768000000000000000e5
-1611 1 24 55 0.65536000000000000000e5
-1611 1 26 41 0.65536000000000000000e5
-1611 1 28 43 -0.26214400000000000000e6
-1611 1 32 47 -0.26214400000000000000e6
-1611 1 42 56 0.65536000000000000000e5
-1611 2 2 32 -0.32768000000000000000e5
-1611 2 4 34 0.65536000000000000000e5
-1611 2 16 30 -0.65536000000000000000e5
-1611 2 20 34 -0.13107200000000000000e6
-1611 3 5 50 0.65536000000000000000e5
-1611 3 9 38 -0.65536000000000000000e5
-1611 3 22 35 -0.26214400000000000000e6
-1611 3 22 51 -0.65536000000000000000e5
-1611 3 23 52 0.13107200000000000000e6
-1611 3 27 40 0.65536000000000000000e5
-1611 3 28 41 -0.26214400000000000000e6
-1611 3 38 51 0.65536000000000000000e5
-1611 3 41 54 0.65536000000000000000e5
-1611 4 2 30 -0.65536000000000000000e5
-1611 4 6 34 -0.13107200000000000000e6
-1611 4 7 35 -0.65536000000000000000e5
-1612 1 33 40 -0.32768000000000000000e5
-1612 1 43 43 0.65536000000000000000e5
-1612 3 14 51 0.65536000000000000000e5
-1612 3 29 42 -0.32768000000000000000e5
-1612 3 30 43 -0.32768000000000000000e5
-1612 4 19 31 -0.32768000000000000000e5
-1613 1 34 49 -0.65536000000000000000e5
-1613 1 43 44 0.65536000000000000000e5
-1614 1 18 49 -0.65536000000000000000e5
-1614 1 43 45 0.65536000000000000000e5
-1614 3 14 51 0.65536000000000000000e5
-1615 1 11 18 -0.65536000000000000000e5
-1615 1 43 46 0.65536000000000000000e5
-1615 3 6 19 0.65536000000000000000e5
-1615 3 15 44 0.65536000000000000000e5
-1615 3 17 30 0.65536000000000000000e5
-1615 3 32 45 0.65536000000000000000e5
-1616 1 24 55 -0.65536000000000000000e5
-1616 1 43 47 0.65536000000000000000e5
-1617 1 1 48 -0.32768000000000000000e5
-1617 1 2 49 -0.32768000000000000000e5
-1617 1 8 39 -0.65536000000000000000e5
-1617 1 9 40 -0.65536000000000000000e5
-1617 1 10 41 0.13107200000000000000e6
-1617 1 12 43 0.26214400000000000000e6
-1617 1 23 38 -0.32768000000000000000e5
-1617 1 24 55 0.65536000000000000000e5
-1617 1 26 41 0.65536000000000000000e5
-1617 1 28 43 -0.26214400000000000000e6
-1617 1 32 47 -0.26214400000000000000e6
-1617 1 43 48 0.65536000000000000000e5
-1617 2 2 32 -0.32768000000000000000e5
-1617 2 4 34 0.65536000000000000000e5
-1617 2 16 30 -0.65536000000000000000e5
-1617 2 20 34 -0.13107200000000000000e6
-1617 3 5 50 0.65536000000000000000e5
-1617 3 9 38 -0.65536000000000000000e5
-1617 3 22 35 -0.26214400000000000000e6
-1617 3 22 51 -0.65536000000000000000e5
-1617 3 23 52 0.13107200000000000000e6
-1617 3 27 40 0.65536000000000000000e5
-1617 3 28 41 -0.26214400000000000000e6
-1617 4 2 30 -0.65536000000000000000e5
-1617 4 6 34 -0.13107200000000000000e6
-1617 4 7 35 -0.65536000000000000000e5
-1618 1 1 48 0.32768000000000000000e5
-1618 1 2 49 0.32768000000000000000e5
-1618 1 8 39 0.65536000000000000000e5
-1618 1 9 40 0.65536000000000000000e5
-1618 1 10 41 -0.13107200000000000000e6
-1618 1 12 43 -0.26214400000000000000e6
-1618 1 23 38 0.32768000000000000000e5
-1618 1 26 41 -0.65536000000000000000e5
-1618 1 28 43 0.26214400000000000000e6
-1618 1 32 47 0.26214400000000000000e6
-1618 1 33 48 -0.13107200000000000000e6
-1618 1 43 49 0.65536000000000000000e5
-1618 2 2 32 0.32768000000000000000e5
-1618 2 4 34 -0.65536000000000000000e5
-1618 2 16 30 0.65536000000000000000e5
-1618 2 20 34 0.13107200000000000000e6
-1618 2 28 34 0.65536000000000000000e5
-1618 3 5 50 -0.65536000000000000000e5
-1618 3 9 38 0.65536000000000000000e5
-1618 3 10 55 -0.13107200000000000000e6
-1618 3 22 35 0.26214400000000000000e6
-1618 3 22 51 0.65536000000000000000e5
-1618 3 23 52 -0.13107200000000000000e6
-1618 3 27 40 -0.65536000000000000000e5
-1618 3 28 41 0.26214400000000000000e6
-1618 3 35 48 0.26214400000000000000e6
-1618 3 40 45 -0.13107200000000000000e6
-1618 4 2 30 0.65536000000000000000e5
-1618 4 6 34 0.13107200000000000000e6
-1618 4 7 35 0.65536000000000000000e5
-1618 4 22 34 -0.13107200000000000000e6
-1619 1 33 48 -0.65536000000000000000e5
-1619 1 43 50 0.65536000000000000000e5
-1619 3 10 55 -0.65536000000000000000e5
-1619 3 35 48 0.13107200000000000000e6
-1619 3 40 45 -0.65536000000000000000e5
-1619 4 22 34 -0.65536000000000000000e5
-1620 1 33 40 -0.65536000000000000000e5
-1620 1 43 51 0.65536000000000000000e5
-1620 3 10 55 0.65536000000000000000e5
-1620 3 14 51 0.13107200000000000000e6
-1620 3 29 42 -0.65536000000000000000e5
-1620 3 30 43 -0.65536000000000000000e5
-1620 4 19 31 -0.65536000000000000000e5
-1621 1 18 49 -0.65536000000000000000e5
-1621 1 43 52 0.65536000000000000000e5
-1621 3 14 51 0.65536000000000000000e5
-1621 3 35 48 0.65536000000000000000e5
-1622 1 1 48 -0.32768000000000000000e5
-1622 1 2 49 -0.32768000000000000000e5
-1622 1 8 39 -0.65536000000000000000e5
-1622 1 9 40 -0.65536000000000000000e5
-1622 1 10 41 0.13107200000000000000e6
-1622 1 12 43 0.26214400000000000000e6
-1622 1 23 38 -0.32768000000000000000e5
-1622 1 24 55 0.65536000000000000000e5
-1622 1 26 41 0.65536000000000000000e5
-1622 1 28 43 -0.26214400000000000000e6
-1622 1 32 47 -0.26214400000000000000e6
-1622 1 43 53 0.65536000000000000000e5
-1622 2 2 32 -0.32768000000000000000e5
-1622 2 4 34 0.65536000000000000000e5
-1622 2 16 30 -0.65536000000000000000e5
-1622 2 20 34 -0.13107200000000000000e6
-1622 3 5 50 0.65536000000000000000e5
-1622 3 9 38 -0.65536000000000000000e5
-1622 3 22 35 -0.26214400000000000000e6
-1622 3 22 51 -0.65536000000000000000e5
-1622 3 23 52 0.13107200000000000000e6
-1622 3 27 40 0.65536000000000000000e5
-1622 3 28 41 -0.26214400000000000000e6
-1622 3 38 51 0.65536000000000000000e5
-1622 4 2 30 -0.65536000000000000000e5
-1622 4 6 34 -0.13107200000000000000e6
-1622 4 7 35 -0.65536000000000000000e5
-1623 1 40 55 -0.65536000000000000000e5
-1623 1 43 54 0.65536000000000000000e5
-1624 1 33 40 -0.65536000000000000000e5
-1624 1 43 55 0.65536000000000000000e5
-1624 3 10 55 0.65536000000000000000e5
-1624 3 14 51 0.13107200000000000000e6
-1624 3 29 42 -0.65536000000000000000e5
-1624 3 30 43 -0.65536000000000000000e5
-1624 3 39 52 0.65536000000000000000e5
-1624 4 19 31 -0.65536000000000000000e5
-1625 1 40 55 -0.65536000000000000000e5
-1625 1 43 56 0.65536000000000000000e5
-1625 3 49 50 0.65536000000000000000e5
-1626 1 4 35 -0.16384000000000000000e5
-1626 1 12 43 -0.16384000000000000000e5
-1626 1 34 49 -0.16384000000000000000e5
-1626 1 44 44 0.65536000000000000000e5
-1626 2 9 23 -0.16384000000000000000e5
-1626 3 5 34 -0.16384000000000000000e5
-1626 3 13 42 0.16384000000000000000e5
-1626 3 14 27 -0.16384000000000000000e5
-1626 3 16 29 0.32768000000000000000e5
-1626 3 18 47 -0.16384000000000000000e5
-1626 3 22 35 0.16384000000000000000e5
-1626 3 31 44 0.32768000000000000000e5
-1626 4 14 26 0.16384000000000000000e5
-1627 1 14 45 -0.13107200000000000000e6
-1627 1 17 48 0.32768000000000000000e5
-1627 1 18 49 0.32768000000000000000e5
-1627 1 34 49 0.32768000000000000000e5
-1627 1 44 45 0.65536000000000000000e5
-1627 2 14 28 0.32768000000000000000e5
-1627 3 14 43 0.32768000000000000000e5
-1627 3 15 44 -0.65536000000000000000e5
-1627 3 16 45 0.13107200000000000000e6
-1627 3 18 47 0.32768000000000000000e5
-1627 3 19 48 0.65536000000000000000e5
-1627 3 22 35 -0.32768000000000000000e5
-1627 4 14 26 -0.32768000000000000000e5
-1627 4 15 27 -0.65536000000000000000e5
-1628 1 13 20 -0.13107200000000000000e6
-1628 1 17 32 0.65536000000000000000e5
-1628 1 20 27 0.65536000000000000000e5
-1628 1 44 46 0.65536000000000000000e5
-1628 2 11 25 0.65536000000000000000e5
-1628 3 8 21 0.13107200000000000000e6
-1628 3 16 45 0.65536000000000000000e5
-1628 3 18 31 0.65536000000000000000e5
-1628 3 36 41 0.65536000000000000000e5
-1629 1 37 52 -0.65536000000000000000e5
-1629 1 44 47 0.65536000000000000000e5
-1630 1 6 53 0.16384000000000000000e5
-1630 1 25 40 -0.16384000000000000000e5
-1630 1 28 43 -0.65536000000000000000e5
-1630 1 44 48 0.65536000000000000000e5
-1630 2 4 34 0.32768000000000000000e5
-1630 2 21 35 -0.32768000000000000000e5
-1630 3 5 50 0.32768000000000000000e5
-1630 3 23 52 0.65536000000000000000e5
-1630 3 24 37 0.16384000000000000000e5
-1630 3 27 40 0.65536000000000000000e5
-1630 4 4 32 -0.16384000000000000000e5
-1630 4 7 35 -0.32768000000000000000e5
-1630 4 16 28 0.16384000000000000000e5
-1631 1 33 48 -0.65536000000000000000e5
-1631 1 44 49 0.65536000000000000000e5
-1631 3 10 55 -0.65536000000000000000e5
-1631 3 35 48 0.13107200000000000000e6
-1631 3 40 45 -0.65536000000000000000e5
-1631 4 22 34 -0.65536000000000000000e5
-1632 1 6 53 0.81920000000000000000e4
-1632 1 17 48 -0.65536000000000000000e5
-1632 1 25 40 -0.81920000000000000000e4
-1632 1 44 50 0.65536000000000000000e5
-1632 2 4 34 0.16384000000000000000e5
-1632 2 21 35 -0.16384000000000000000e5
-1632 3 5 50 0.16384000000000000000e5
-1632 3 24 37 0.81920000000000000000e4
-1632 3 27 40 0.32768000000000000000e5
-1632 3 28 41 0.32768000000000000000e5
-1632 3 29 42 0.32768000000000000000e5
-1632 3 34 47 0.65536000000000000000e5
-1632 4 4 32 -0.81920000000000000000e4
-1632 4 7 35 -0.16384000000000000000e5
-1632 4 16 28 0.81920000000000000000e4
-1632 4 23 27 0.32768000000000000000e5
-1633 1 14 45 -0.13107200000000000000e6
-1633 1 17 48 0.32768000000000000000e5
-1633 1 18 49 0.32768000000000000000e5
-1633 1 34 49 0.32768000000000000000e5
-1633 1 44 52 0.65536000000000000000e5
-1633 2 14 28 0.32768000000000000000e5
-1633 3 14 43 0.32768000000000000000e5
-1633 3 15 44 -0.65536000000000000000e5
-1633 3 16 45 0.13107200000000000000e6
-1633 3 18 47 0.32768000000000000000e5
-1633 3 19 48 0.65536000000000000000e5
-1633 3 22 35 -0.32768000000000000000e5
-1633 3 41 46 0.65536000000000000000e5
-1633 4 14 26 -0.32768000000000000000e5
-1633 4 15 27 -0.65536000000000000000e5
-1634 1 1 48 0.16384000000000000000e5
-1634 1 2 49 0.16384000000000000000e5
-1634 1 6 53 0.16384000000000000000e5
-1634 1 8 39 0.32768000000000000000e5
-1634 1 9 40 0.32768000000000000000e5
-1634 1 10 41 -0.65536000000000000000e5
-1634 1 12 43 -0.13107200000000000000e6
-1634 1 23 38 0.16384000000000000000e5
-1634 1 24 55 -0.32768000000000000000e5
-1634 1 25 40 -0.16384000000000000000e5
-1634 1 26 41 -0.32768000000000000000e5
-1634 1 28 43 0.65536000000000000000e5
-1634 1 32 47 0.13107200000000000000e6
-1634 1 33 48 -0.65536000000000000000e5
-1634 1 40 55 0.32768000000000000000e5
-1634 1 41 56 0.32768000000000000000e5
-1634 1 44 51 0.13107200000000000000e6
-1634 1 44 53 0.65536000000000000000e5
-1634 1 46 53 -0.13107200000000000000e6
-1634 2 2 32 0.16384000000000000000e5
-1634 2 16 30 0.32768000000000000000e5
-1634 2 20 34 0.65536000000000000000e5
-1634 2 21 35 -0.32768000000000000000e5
-1634 2 28 34 0.32768000000000000000e5
-1634 3 9 38 0.32768000000000000000e5
-1634 3 10 55 -0.65536000000000000000e5
-1634 3 22 35 0.13107200000000000000e6
-1634 3 22 51 0.32768000000000000000e5
-1634 3 24 37 0.16384000000000000000e5
-1634 3 27 40 0.32768000000000000000e5
-1634 3 27 56 0.32768000000000000000e5
-1634 3 28 41 0.13107200000000000000e6
-1634 3 35 48 0.13107200000000000000e6
-1634 3 38 51 -0.32768000000000000000e5
-1634 3 39 52 -0.65536000000000000000e5
-1634 3 40 45 -0.65536000000000000000e5
-1634 4 2 30 0.32768000000000000000e5
-1634 4 4 32 -0.16384000000000000000e5
-1634 4 6 34 0.65536000000000000000e5
-1634 4 16 28 0.16384000000000000000e5
-1634 4 22 34 -0.65536000000000000000e5
-1634 4 23 35 -0.65536000000000000000e5
-1634 4 29 33 -0.32768000000000000000e5
-1635 1 1 48 -0.16384000000000000000e5
-1635 1 2 49 -0.16384000000000000000e5
-1635 1 8 39 -0.32768000000000000000e5
-1635 1 9 40 -0.32768000000000000000e5
-1635 1 10 41 0.65536000000000000000e5
-1635 1 12 43 0.13107200000000000000e6
-1635 1 23 38 -0.16384000000000000000e5
-1635 1 24 55 0.32768000000000000000e5
-1635 1 26 41 0.32768000000000000000e5
-1635 1 28 43 -0.13107200000000000000e6
-1635 1 32 47 -0.13107200000000000000e6
-1635 1 40 55 -0.32768000000000000000e5
-1635 1 41 56 -0.32768000000000000000e5
-1635 1 44 54 0.65536000000000000000e5
-1635 2 2 32 -0.16384000000000000000e5
-1635 2 4 34 0.32768000000000000000e5
-1635 2 16 30 -0.32768000000000000000e5
-1635 2 20 34 -0.65536000000000000000e5
-1635 2 28 34 -0.32768000000000000000e5
-1635 3 5 50 0.32768000000000000000e5
-1635 3 9 38 -0.32768000000000000000e5
-1635 3 22 35 -0.13107200000000000000e6
-1635 3 22 51 -0.32768000000000000000e5
-1635 3 23 52 0.65536000000000000000e5
-1635 3 27 40 0.32768000000000000000e5
-1635 3 27 56 -0.32768000000000000000e5
-1635 3 28 41 -0.13107200000000000000e6
-1635 3 38 51 0.32768000000000000000e5
-1635 4 2 30 -0.32768000000000000000e5
-1635 4 6 34 -0.65536000000000000000e5
-1635 4 7 35 -0.32768000000000000000e5
-1635 4 29 33 0.32768000000000000000e5
-1636 1 44 55 0.65536000000000000000e5
-1636 1 46 53 -0.65536000000000000000e5
-1637 1 1 48 -0.16384000000000000000e5
-1637 1 2 49 -0.16384000000000000000e5
-1637 1 8 39 -0.32768000000000000000e5
-1637 1 9 40 -0.32768000000000000000e5
-1637 1 10 41 0.65536000000000000000e5
-1637 1 12 43 0.13107200000000000000e6
-1637 1 23 38 -0.16384000000000000000e5
-1637 1 24 55 0.32768000000000000000e5
-1637 1 26 41 0.32768000000000000000e5
-1637 1 28 43 -0.13107200000000000000e6
-1637 1 32 47 -0.13107200000000000000e6
-1637 1 40 55 -0.32768000000000000000e5
-1637 1 41 56 -0.32768000000000000000e5
-1637 1 44 56 0.65536000000000000000e5
-1637 2 2 32 -0.16384000000000000000e5
-1637 2 4 34 0.32768000000000000000e5
-1637 2 16 30 -0.32768000000000000000e5
-1637 2 20 34 -0.65536000000000000000e5
-1637 2 28 34 -0.32768000000000000000e5
-1637 3 5 50 0.32768000000000000000e5
-1637 3 9 38 -0.32768000000000000000e5
-1637 3 22 35 -0.13107200000000000000e6
-1637 3 22 51 -0.32768000000000000000e5
-1637 3 23 52 0.65536000000000000000e5
-1637 3 27 40 0.32768000000000000000e5
-1637 3 27 56 -0.32768000000000000000e5
-1637 3 28 41 -0.13107200000000000000e6
-1637 3 38 51 0.32768000000000000000e5
-1637 3 47 52 0.65536000000000000000e5
-1637 4 2 30 -0.32768000000000000000e5
-1637 4 6 34 -0.65536000000000000000e5
-1637 4 7 35 -0.32768000000000000000e5
-1637 4 29 33 0.32768000000000000000e5
-1638 1 11 18 -0.32768000000000000000e5
-1638 1 45 45 0.65536000000000000000e5
-1638 3 6 19 0.32768000000000000000e5
-1638 3 15 44 0.32768000000000000000e5
-1638 3 17 30 0.32768000000000000000e5
-1638 3 32 45 0.32768000000000000000e5
-1639 1 36 51 -0.65536000000000000000e5
-1639 1 45 46 0.65536000000000000000e5
-1640 1 6 53 0.16384000000000000000e5
-1640 1 25 40 -0.16384000000000000000e5
-1640 1 28 43 -0.65536000000000000000e5
-1640 1 45 47 0.65536000000000000000e5
-1640 2 4 34 0.32768000000000000000e5
-1640 2 21 35 -0.32768000000000000000e5
-1640 3 5 50 0.32768000000000000000e5
-1640 3 23 52 0.65536000000000000000e5
-1640 3 24 37 0.16384000000000000000e5
-1640 3 27 40 0.65536000000000000000e5
-1640 4 4 32 -0.16384000000000000000e5
-1640 4 7 35 -0.32768000000000000000e5
-1640 4 16 28 0.16384000000000000000e5
-1641 1 33 48 -0.65536000000000000000e5
-1641 1 45 48 0.65536000000000000000e5
-1641 3 10 55 -0.65536000000000000000e5
-1641 3 35 48 0.13107200000000000000e6
-1641 3 40 45 -0.65536000000000000000e5
-1641 4 22 34 -0.65536000000000000000e5
-1642 1 33 40 -0.65536000000000000000e5
-1642 1 45 49 0.65536000000000000000e5
-1642 3 10 55 0.65536000000000000000e5
-1642 3 14 51 0.13107200000000000000e6
-1642 3 29 42 -0.65536000000000000000e5
-1642 3 30 43 -0.65536000000000000000e5
-1642 4 19 31 -0.65536000000000000000e5
-1643 1 44 51 -0.65536000000000000000e5
-1643 1 45 50 0.65536000000000000000e5
-1644 1 18 49 -0.65536000000000000000e5
-1644 1 45 51 0.65536000000000000000e5
-1644 3 14 51 0.65536000000000000000e5
-1644 3 35 48 0.65536000000000000000e5
-1645 1 1 48 -0.16384000000000000000e5
-1645 1 2 49 -0.16384000000000000000e5
-1645 1 8 39 -0.32768000000000000000e5
-1645 1 9 40 -0.32768000000000000000e5
-1645 1 10 41 0.65536000000000000000e5
-1645 1 12 43 0.13107200000000000000e6
-1645 1 23 38 -0.16384000000000000000e5
-1645 1 24 55 0.32768000000000000000e5
-1645 1 26 41 0.32768000000000000000e5
-1645 1 28 43 -0.13107200000000000000e6
-1645 1 32 47 -0.13107200000000000000e6
-1645 1 40 55 -0.32768000000000000000e5
-1645 1 41 56 -0.32768000000000000000e5
-1645 1 45 53 0.65536000000000000000e5
-1645 2 2 32 -0.16384000000000000000e5
-1645 2 4 34 0.32768000000000000000e5
-1645 2 16 30 -0.32768000000000000000e5
-1645 2 20 34 -0.65536000000000000000e5
-1645 2 28 34 -0.32768000000000000000e5
-1645 3 5 50 0.32768000000000000000e5
-1645 3 9 38 -0.32768000000000000000e5
-1645 3 22 35 -0.13107200000000000000e6
-1645 3 22 51 -0.32768000000000000000e5
-1645 3 23 52 0.65536000000000000000e5
-1645 3 27 40 0.32768000000000000000e5
-1645 3 27 56 -0.32768000000000000000e5
-1645 3 28 41 -0.13107200000000000000e6
-1645 3 38 51 0.32768000000000000000e5
-1645 4 2 30 -0.32768000000000000000e5
-1645 4 6 34 -0.65536000000000000000e5
-1645 4 7 35 -0.32768000000000000000e5
-1645 4 29 33 0.32768000000000000000e5
-1646 1 33 40 -0.65536000000000000000e5
-1646 1 45 54 0.65536000000000000000e5
-1646 3 10 55 0.65536000000000000000e5
-1646 3 14 51 0.13107200000000000000e6
-1646 3 29 42 -0.65536000000000000000e5
-1646 3 30 43 -0.65536000000000000000e5
-1646 3 39 52 0.65536000000000000000e5
-1646 4 19 31 -0.65536000000000000000e5
-1647 1 18 49 -0.65536000000000000000e5
-1647 1 45 55 0.65536000000000000000e5
-1647 3 14 51 0.65536000000000000000e5
-1647 3 35 48 0.65536000000000000000e5
-1647 3 45 50 0.65536000000000000000e5
-1648 1 33 40 -0.65536000000000000000e5
-1648 1 45 56 0.65536000000000000000e5
-1648 3 10 55 0.65536000000000000000e5
-1648 3 14 51 0.13107200000000000000e6
-1648 3 29 42 -0.65536000000000000000e5
-1648 3 30 43 -0.65536000000000000000e5
-1648 3 39 52 0.65536000000000000000e5
-1648 3 42 55 0.65536000000000000000e5
-1648 4 19 31 -0.65536000000000000000e5
-1649 1 33 36 -0.32768000000000000000e5
-1649 1 46 46 0.65536000000000000000e5
-1649 3 17 46 0.32768000000000000000e5
-1649 3 21 50 0.32768000000000000000e5
-1650 1 6 53 0.81920000000000000000e4
-1650 1 17 48 -0.65536000000000000000e5
-1650 1 25 40 -0.81920000000000000000e4
-1650 1 46 47 0.65536000000000000000e5
-1650 2 4 34 0.16384000000000000000e5
-1650 2 21 35 -0.16384000000000000000e5
-1650 3 5 50 0.16384000000000000000e5
-1650 3 24 37 0.81920000000000000000e4
-1650 3 27 40 0.32768000000000000000e5
-1650 3 28 41 0.32768000000000000000e5
-1650 3 29 42 0.32768000000000000000e5
-1650 3 34 47 0.65536000000000000000e5
-1650 4 4 32 -0.81920000000000000000e4
-1650 4 7 35 -0.16384000000000000000e5
-1650 4 16 28 0.81920000000000000000e4
-1650 4 23 27 0.32768000000000000000e5
-1651 1 44 51 -0.65536000000000000000e5
-1651 1 46 48 0.65536000000000000000e5
-1652 1 18 49 -0.65536000000000000000e5
-1652 1 46 49 0.65536000000000000000e5
-1652 3 14 51 0.65536000000000000000e5
-1652 3 35 48 0.65536000000000000000e5
-1653 1 14 45 -0.13107200000000000000e6
-1653 1 17 48 0.32768000000000000000e5
-1653 1 18 49 0.32768000000000000000e5
-1653 1 34 49 0.32768000000000000000e5
-1653 1 46 50 0.65536000000000000000e5
-1653 2 14 28 0.32768000000000000000e5
-1653 3 14 43 0.32768000000000000000e5
-1653 3 15 44 -0.65536000000000000000e5
-1653 3 16 45 0.13107200000000000000e6
-1653 3 18 47 0.32768000000000000000e5
-1653 3 19 48 0.65536000000000000000e5
-1653 3 22 35 -0.32768000000000000000e5
-1653 3 41 46 0.65536000000000000000e5
-1653 4 14 26 -0.32768000000000000000e5
-1653 4 15 27 -0.65536000000000000000e5
-1654 1 45 52 -0.65536000000000000000e5
-1654 1 46 51 0.65536000000000000000e5
-1655 1 11 18 0.32768000000000000000e5
-1655 1 36 51 -0.65536000000000000000e5
-1655 1 45 52 -0.32768000000000000000e5
-1655 1 46 52 0.65536000000000000000e5
-1655 3 6 19 -0.32768000000000000000e5
-1655 3 15 44 -0.32768000000000000000e5
-1655 3 17 30 -0.32768000000000000000e5
-1655 3 32 45 -0.32768000000000000000e5
-1655 3 36 49 0.32768000000000000000e5
-1655 3 41 46 0.32768000000000000000e5
-1655 4 15 35 0.32768000000000000000e5
-1656 1 18 49 -0.65536000000000000000e5
-1656 1 46 54 0.65536000000000000000e5
-1656 3 14 51 0.65536000000000000000e5
-1656 3 35 48 0.65536000000000000000e5
-1656 3 45 50 0.65536000000000000000e5
-1657 1 45 52 -0.65536000000000000000e5
-1657 1 46 55 0.65536000000000000000e5
-1657 3 19 56 0.65536000000000000000e5
-1658 1 46 56 0.65536000000000000000e5
-1658 1 52 55 -0.65536000000000000000e5
-1659 1 1 48 0.32768000000000000000e5
-1659 1 2 49 0.32768000000000000000e5
-1659 1 6 53 0.32768000000000000000e5
-1659 1 8 39 0.65536000000000000000e5
-1659 1 9 40 0.65536000000000000000e5
-1659 1 10 41 -0.13107200000000000000e6
-1659 1 12 43 -0.26214400000000000000e6
-1659 1 23 38 0.32768000000000000000e5
-1659 1 25 40 -0.32768000000000000000e5
-1659 1 26 41 -0.65536000000000000000e5
-1659 1 28 43 0.13107200000000000000e6
-1659 1 32 47 0.26214400000000000000e6
-1659 1 38 53 0.32768000000000000000e5
-1659 1 40 47 0.32768000000000000000e5
-1659 1 47 47 0.65536000000000000000e5
-1659 2 2 32 0.32768000000000000000e5
-1659 2 16 30 0.65536000000000000000e5
-1659 2 20 34 0.13107200000000000000e6
-1659 2 32 32 0.65536000000000000000e5
-1659 3 9 38 0.65536000000000000000e5
-1659 3 22 35 0.26214400000000000000e6
-1659 3 22 51 0.65536000000000000000e5
-1659 3 24 37 0.32768000000000000000e5
-1659 3 24 53 -0.32768000000000000000e5
-1659 3 27 40 0.65536000000000000000e5
-1659 3 28 41 0.26214400000000000000e6
-1659 3 37 50 0.65536000000000000000e5
-1659 4 2 30 0.65536000000000000000e5
-1659 4 4 32 -0.32768000000000000000e5
-1659 4 6 34 0.13107200000000000000e6
-1659 4 16 28 0.32768000000000000000e5
-1660 1 38 53 -0.65536000000000000000e5
-1660 1 47 48 0.65536000000000000000e5
-1661 1 40 47 -0.65536000000000000000e5
-1661 1 47 49 0.65536000000000000000e5
-1661 3 24 53 0.65536000000000000000e5
-1662 1 1 48 0.32768000000000000000e5
-1662 1 2 49 0.32768000000000000000e5
-1662 1 6 53 0.32768000000000000000e5
-1662 1 8 39 0.65536000000000000000e5
-1662 1 9 40 0.65536000000000000000e5
-1662 1 10 41 -0.13107200000000000000e6
-1662 1 12 43 -0.26214400000000000000e6
-1662 1 23 38 0.32768000000000000000e5
-1662 1 25 40 -0.32768000000000000000e5
-1662 1 26 41 -0.65536000000000000000e5
-1662 1 28 43 0.13107200000000000000e6
-1662 1 32 47 0.26214400000000000000e6
-1662 1 47 50 0.65536000000000000000e5
-1662 2 2 32 0.32768000000000000000e5
-1662 2 16 30 0.65536000000000000000e5
-1662 2 20 34 0.13107200000000000000e6
-1662 3 9 38 0.65536000000000000000e5
-1662 3 22 35 0.26214400000000000000e6
-1662 3 22 51 0.65536000000000000000e5
-1662 3 24 37 0.32768000000000000000e5
-1662 3 27 40 0.65536000000000000000e5
-1662 3 28 41 0.26214400000000000000e6
-1662 3 37 50 0.65536000000000000000e5
-1662 4 2 30 0.65536000000000000000e5
-1662 4 4 32 -0.32768000000000000000e5
-1662 4 6 34 0.13107200000000000000e6
-1662 4 16 28 0.32768000000000000000e5
-1663 1 41 56 -0.65536000000000000000e5
-1663 1 47 51 0.65536000000000000000e5
-1663 3 27 56 -0.65536000000000000000e5
-1664 1 1 48 0.16384000000000000000e5
-1664 1 2 49 0.16384000000000000000e5
-1664 1 6 53 0.16384000000000000000e5
-1664 1 8 39 0.32768000000000000000e5
-1664 1 9 40 0.32768000000000000000e5
-1664 1 10 41 -0.65536000000000000000e5
-1664 1 12 43 -0.13107200000000000000e6
-1664 1 23 38 0.16384000000000000000e5
-1664 1 24 55 -0.32768000000000000000e5
-1664 1 25 40 -0.16384000000000000000e5
-1664 1 26 41 -0.32768000000000000000e5
-1664 1 28 43 0.65536000000000000000e5
-1664 1 32 47 0.13107200000000000000e6
-1664 1 33 48 -0.65536000000000000000e5
-1664 1 40 55 0.32768000000000000000e5
-1664 1 41 56 0.32768000000000000000e5
-1664 1 44 51 0.13107200000000000000e6
-1664 1 46 53 -0.13107200000000000000e6
-1664 1 47 52 0.65536000000000000000e5
-1664 2 2 32 0.16384000000000000000e5
-1664 2 16 30 0.32768000000000000000e5
-1664 2 20 34 0.65536000000000000000e5
-1664 2 21 35 -0.32768000000000000000e5
-1664 2 28 34 0.32768000000000000000e5
-1664 3 9 38 0.32768000000000000000e5
-1664 3 10 55 -0.65536000000000000000e5
-1664 3 22 35 0.13107200000000000000e6
-1664 3 22 51 0.32768000000000000000e5
-1664 3 24 37 0.16384000000000000000e5
-1664 3 27 40 0.32768000000000000000e5
-1664 3 27 56 0.32768000000000000000e5
-1664 3 28 41 0.13107200000000000000e6
-1664 3 35 48 0.13107200000000000000e6
-1664 3 38 51 -0.32768000000000000000e5
-1664 3 39 52 -0.65536000000000000000e5
-1664 3 40 45 -0.65536000000000000000e5
-1664 4 2 30 0.32768000000000000000e5
-1664 4 4 32 -0.16384000000000000000e5
-1664 4 6 34 0.65536000000000000000e5
-1664 4 16 28 0.16384000000000000000e5
-1664 4 22 34 -0.65536000000000000000e5
-1664 4 23 35 -0.65536000000000000000e5
-1664 4 29 33 -0.32768000000000000000e5
-1665 1 1 48 -0.65536000000000000000e5
-1665 1 2 49 -0.13107200000000000000e6
-1665 1 6 53 0.65536000000000000000e5
-1665 1 8 39 -0.13107200000000000000e6
-1665 1 9 40 -0.13107200000000000000e6
-1665 1 10 41 0.26214400000000000000e6
-1665 1 12 43 0.52428800000000000000e6
-1665 1 23 38 -0.65536000000000000000e5
-1665 1 24 39 -0.65536000000000000000e5
-1665 1 24 55 -0.13107200000000000000e6
-1665 1 25 56 -0.65536000000000000000e5
-1665 1 26 41 0.26214400000000000000e6
-1665 1 28 43 -0.26214400000000000000e6
-1665 1 32 47 -0.52428800000000000000e6
-1665 1 38 53 -0.65536000000000000000e5
-1665 1 40 47 -0.65536000000000000000e5
-1665 1 47 53 0.65536000000000000000e5
-1665 2 2 32 -0.65536000000000000000e5
-1665 2 3 33 -0.65536000000000000000e5
-1665 2 5 35 0.65536000000000000000e5
-1665 2 16 30 -0.13107200000000000000e6
-1665 2 20 34 -0.26214400000000000000e6
-1665 2 33 35 -0.65536000000000000000e5
-1665 3 9 38 -0.13107200000000000000e6
-1665 3 22 35 -0.52428800000000000000e6
-1665 3 22 51 0.13107200000000000000e6
-1665 3 23 52 -0.26214400000000000000e6
-1665 3 24 53 0.65536000000000000000e5
-1665 3 25 38 -0.65536000000000000000e5
-1665 3 25 54 0.65536000000000000000e5
-1665 3 27 40 -0.13107200000000000000e6
-1665 3 27 56 0.13107200000000000000e6
-1665 3 28 41 -0.52428800000000000000e6
-1665 3 38 51 -0.13107200000000000000e6
-1665 3 39 40 0.65536000000000000000e5
-1665 3 40 53 0.65536000000000000000e5
-1665 3 41 54 -0.13107200000000000000e6
-1665 4 2 30 -0.13107200000000000000e6
-1665 4 6 34 -0.26214400000000000000e6
-1665 4 7 35 0.13107200000000000000e6
-1665 4 32 32 -0.13107200000000000000e6
-1666 1 41 56 -0.65536000000000000000e5
-1666 1 47 55 0.65536000000000000000e5
-1667 1 1 48 -0.13107200000000000000e6
-1667 1 2 49 -0.19660800000000000000e6
-1667 1 6 53 0.65536000000000000000e5
-1667 1 8 39 -0.26214400000000000000e6
-1667 1 9 40 -0.26214400000000000000e6
-1667 1 10 41 0.52428800000000000000e6
-1667 1 12 43 0.10485760000000000000e7
-1667 1 23 38 -0.13107200000000000000e6
-1667 1 24 39 -0.65536000000000000000e5
-1667 1 26 41 0.39321600000000000000e6
-1667 1 28 43 -0.78643200000000000000e6
-1667 1 32 47 -0.10485760000000000000e7
-1667 1 47 54 -0.65536000000000000000e5
-1667 1 47 56 0.65536000000000000000e5
-1667 1 49 56 0.65536000000000000000e5
-1667 2 2 32 -0.13107200000000000000e6
-1667 2 3 33 -0.65536000000000000000e5
-1667 2 4 34 0.13107200000000000000e6
-1667 2 5 35 0.65536000000000000000e5
-1667 2 16 30 -0.26214400000000000000e6
-1667 2 20 34 -0.52428800000000000000e6
-1667 2 33 35 -0.65536000000000000000e5
-1667 2 35 35 0.13107200000000000000e6
-1667 3 5 50 0.13107200000000000000e6
-1667 3 9 38 -0.26214400000000000000e6
-1667 3 22 35 -0.10485760000000000000e7
-1667 3 25 38 -0.65536000000000000000e5
-1667 3 25 54 0.65536000000000000000e5
-1667 3 28 41 -0.10485760000000000000e7
-1667 3 39 40 0.65536000000000000000e5
-1667 3 40 53 0.65536000000000000000e5
-1667 3 41 56 0.13107200000000000000e6
-1667 3 48 53 -0.65536000000000000000e5
-1667 4 2 30 -0.26214400000000000000e6
-1667 4 6 34 -0.52428800000000000000e6
-1668 1 40 47 -0.32768000000000000000e5
-1668 1 48 48 0.65536000000000000000e5
-1668 3 24 53 0.32768000000000000000e5
-1669 1 25 56 -0.65536000000000000000e5
-1669 1 48 49 0.65536000000000000000e5
-1670 1 41 56 -0.65536000000000000000e5
-1670 1 48 50 0.65536000000000000000e5
-1670 3 27 56 -0.65536000000000000000e5
-1671 1 1 48 -0.32768000000000000000e5
-1671 1 2 49 -0.32768000000000000000e5
-1671 1 8 39 -0.65536000000000000000e5
-1671 1 9 40 -0.65536000000000000000e5
-1671 1 10 41 0.13107200000000000000e6
-1671 1 12 43 0.26214400000000000000e6
-1671 1 23 38 -0.32768000000000000000e5
-1671 1 24 55 0.65536000000000000000e5
-1671 1 26 41 0.65536000000000000000e5
-1671 1 28 43 -0.26214400000000000000e6
-1671 1 32 47 -0.26214400000000000000e6
-1671 1 48 51 0.65536000000000000000e5
-1671 2 2 32 -0.32768000000000000000e5
-1671 2 4 34 0.65536000000000000000e5
-1671 2 16 30 -0.65536000000000000000e5
-1671 2 20 34 -0.13107200000000000000e6
-1671 3 5 50 0.65536000000000000000e5
-1671 3 9 38 -0.65536000000000000000e5
-1671 3 22 35 -0.26214400000000000000e6
-1671 3 22 51 -0.65536000000000000000e5
-1671 3 23 52 0.13107200000000000000e6
-1671 3 27 40 0.65536000000000000000e5
-1671 3 28 41 -0.26214400000000000000e6
-1671 3 38 51 0.65536000000000000000e5
-1671 4 2 30 -0.65536000000000000000e5
-1671 4 6 34 -0.13107200000000000000e6
-1671 4 7 35 -0.65536000000000000000e5
-1672 1 1 48 -0.16384000000000000000e5
-1672 1 2 49 -0.16384000000000000000e5
-1672 1 8 39 -0.32768000000000000000e5
-1672 1 9 40 -0.32768000000000000000e5
-1672 1 10 41 0.65536000000000000000e5
-1672 1 12 43 0.13107200000000000000e6
-1672 1 23 38 -0.16384000000000000000e5
-1672 1 24 55 0.32768000000000000000e5
-1672 1 26 41 0.32768000000000000000e5
-1672 1 28 43 -0.13107200000000000000e6
-1672 1 32 47 -0.13107200000000000000e6
-1672 1 40 55 -0.32768000000000000000e5
-1672 1 41 56 -0.32768000000000000000e5
-1672 1 48 52 0.65536000000000000000e5
-1672 2 2 32 -0.16384000000000000000e5
-1672 2 4 34 0.32768000000000000000e5
-1672 2 16 30 -0.32768000000000000000e5
-1672 2 20 34 -0.65536000000000000000e5
-1672 2 28 34 -0.32768000000000000000e5
-1672 3 5 50 0.32768000000000000000e5
-1672 3 9 38 -0.32768000000000000000e5
-1672 3 22 35 -0.13107200000000000000e6
-1672 3 22 51 -0.32768000000000000000e5
-1672 3 23 52 0.65536000000000000000e5
-1672 3 27 40 0.32768000000000000000e5
-1672 3 27 56 -0.32768000000000000000e5
-1672 3 28 41 -0.13107200000000000000e6
-1672 3 38 51 0.32768000000000000000e5
-1672 4 2 30 -0.32768000000000000000e5
-1672 4 6 34 -0.65536000000000000000e5
-1672 4 7 35 -0.32768000000000000000e5
-1672 4 29 33 0.32768000000000000000e5
-1673 1 47 54 -0.65536000000000000000e5
-1673 1 48 53 0.65536000000000000000e5
-1674 1 1 48 0.65536000000000000000e5
-1674 1 2 49 0.13107200000000000000e6
-1674 1 6 53 -0.65536000000000000000e5
-1674 1 8 39 0.13107200000000000000e6
-1674 1 9 40 0.13107200000000000000e6
-1674 1 10 41 -0.26214400000000000000e6
-1674 1 12 43 -0.52428800000000000000e6
-1674 1 23 38 0.65536000000000000000e5
-1674 1 24 39 0.65536000000000000000e5
-1674 1 24 55 0.13107200000000000000e6
-1674 1 26 41 -0.26214400000000000000e6
-1674 1 28 43 0.26214400000000000000e6
-1674 1 32 47 0.52428800000000000000e6
-1674 1 47 54 0.65536000000000000000e5
-1674 1 48 54 0.65536000000000000000e5
-1674 2 2 32 0.65536000000000000000e5
-1674 2 3 33 0.65536000000000000000e5
-1674 2 5 35 -0.65536000000000000000e5
-1674 2 16 30 0.13107200000000000000e6
-1674 2 20 34 0.26214400000000000000e6
-1674 2 33 35 0.65536000000000000000e5
-1674 3 9 38 0.13107200000000000000e6
-1674 3 22 35 0.52428800000000000000e6
-1674 3 22 51 -0.13107200000000000000e6
-1674 3 23 52 0.26214400000000000000e6
-1674 3 25 38 0.65536000000000000000e5
-1674 3 25 54 -0.65536000000000000000e5
-1674 3 27 40 0.13107200000000000000e6
-1674 3 28 41 0.52428800000000000000e6
-1674 3 38 51 0.13107200000000000000e6
-1674 3 39 40 -0.65536000000000000000e5
-1674 3 40 53 -0.65536000000000000000e5
-1674 3 41 54 0.13107200000000000000e6
-1674 4 2 30 0.13107200000000000000e6
-1674 4 6 34 0.26214400000000000000e6
-1674 4 7 35 -0.13107200000000000000e6
-1675 1 1 48 -0.32768000000000000000e5
-1675 1 2 49 -0.32768000000000000000e5
-1675 1 8 39 -0.65536000000000000000e5
-1675 1 9 40 -0.65536000000000000000e5
-1675 1 10 41 0.13107200000000000000e6
-1675 1 12 43 0.26214400000000000000e6
-1675 1 23 38 -0.32768000000000000000e5
-1675 1 24 55 0.65536000000000000000e5
-1675 1 26 41 0.65536000000000000000e5
-1675 1 28 43 -0.26214400000000000000e6
-1675 1 32 47 -0.26214400000000000000e6
-1675 1 48 55 0.65536000000000000000e5
-1675 2 2 32 -0.32768000000000000000e5
-1675 2 4 34 0.65536000000000000000e5
-1675 2 16 30 -0.65536000000000000000e5
-1675 2 20 34 -0.13107200000000000000e6
-1675 3 5 50 0.65536000000000000000e5
-1675 3 9 38 -0.65536000000000000000e5
-1675 3 22 35 -0.26214400000000000000e6
-1675 3 22 51 -0.65536000000000000000e5
-1675 3 23 52 0.13107200000000000000e6
-1675 3 27 40 0.65536000000000000000e5
-1675 3 28 41 -0.26214400000000000000e6
-1675 3 38 51 0.65536000000000000000e5
-1675 3 41 54 0.65536000000000000000e5
-1675 4 2 30 -0.65536000000000000000e5
-1675 4 6 34 -0.13107200000000000000e6
-1675 4 7 35 -0.65536000000000000000e5
-1676 1 1 48 0.65536000000000000000e5
-1676 1 2 49 0.13107200000000000000e6
-1676 1 6 53 -0.65536000000000000000e5
-1676 1 8 39 0.13107200000000000000e6
-1676 1 9 40 0.13107200000000000000e6
-1676 1 10 41 -0.26214400000000000000e6
-1676 1 12 43 -0.52428800000000000000e6
-1676 1 23 38 0.65536000000000000000e5
-1676 1 24 39 0.65536000000000000000e5
-1676 1 24 55 0.13107200000000000000e6
-1676 1 26 41 -0.26214400000000000000e6
-1676 1 28 43 0.26214400000000000000e6
-1676 1 32 47 0.52428800000000000000e6
-1676 1 47 54 0.65536000000000000000e5
-1676 1 48 56 0.65536000000000000000e5
-1676 2 2 32 0.65536000000000000000e5
-1676 2 3 33 0.65536000000000000000e5
-1676 2 5 35 -0.65536000000000000000e5
-1676 2 16 30 0.13107200000000000000e6
-1676 2 20 34 0.26214400000000000000e6
-1676 2 33 35 0.65536000000000000000e5
-1676 3 9 38 0.13107200000000000000e6
-1676 3 22 35 0.52428800000000000000e6
-1676 3 22 51 -0.13107200000000000000e6
-1676 3 23 52 0.26214400000000000000e6
-1676 3 25 38 0.65536000000000000000e5
-1676 3 25 54 -0.65536000000000000000e5
-1676 3 27 40 0.13107200000000000000e6
-1676 3 28 41 0.52428800000000000000e6
-1676 3 38 51 0.13107200000000000000e6
-1676 3 39 40 -0.65536000000000000000e5
-1676 3 40 53 -0.65536000000000000000e5
-1676 3 41 54 0.13107200000000000000e6
-1676 3 48 53 0.65536000000000000000e5
-1676 4 2 30 0.13107200000000000000e6
-1676 4 6 34 0.26214400000000000000e6
-1676 4 7 35 -0.13107200000000000000e6
-1677 1 1 48 -0.65536000000000000000e5
-1677 1 2 49 -0.98304000000000000000e5
-1677 1 6 53 0.32768000000000000000e5
-1677 1 8 39 -0.13107200000000000000e6
-1677 1 9 40 -0.13107200000000000000e6
-1677 1 10 41 0.26214400000000000000e6
-1677 1 12 43 0.52428800000000000000e6
-1677 1 23 38 -0.65536000000000000000e5
-1677 1 24 39 -0.32768000000000000000e5
-1677 1 26 41 0.19660800000000000000e6
-1677 1 28 43 -0.39321600000000000000e6
-1677 1 32 47 -0.52428800000000000000e6
-1677 1 49 49 0.65536000000000000000e5
-1677 2 2 32 -0.65536000000000000000e5
-1677 2 3 33 -0.32768000000000000000e5
-1677 2 4 34 0.65536000000000000000e5
-1677 2 5 35 0.32768000000000000000e5
-1677 2 16 30 -0.13107200000000000000e6
-1677 2 20 34 -0.26214400000000000000e6
-1677 3 5 50 0.65536000000000000000e5
-1677 3 9 38 -0.13107200000000000000e6
-1677 3 22 35 -0.52428800000000000000e6
-1677 3 25 38 -0.32768000000000000000e5
-1677 3 25 54 0.32768000000000000000e5
-1677 3 28 41 -0.52428800000000000000e6
-1677 3 39 40 0.32768000000000000000e5
-1677 4 2 30 -0.13107200000000000000e6
-1677 4 6 34 -0.26214400000000000000e6
-1678 1 1 48 -0.32768000000000000000e5
-1678 1 2 49 -0.32768000000000000000e5
-1678 1 8 39 -0.65536000000000000000e5
-1678 1 9 40 -0.65536000000000000000e5
-1678 1 10 41 0.13107200000000000000e6
-1678 1 12 43 0.26214400000000000000e6
-1678 1 23 38 -0.32768000000000000000e5
-1678 1 24 55 0.65536000000000000000e5
-1678 1 26 41 0.65536000000000000000e5
-1678 1 28 43 -0.26214400000000000000e6
-1678 1 32 47 -0.26214400000000000000e6
-1678 1 49 50 0.65536000000000000000e5
-1678 2 2 32 -0.32768000000000000000e5
-1678 2 4 34 0.65536000000000000000e5
-1678 2 16 30 -0.65536000000000000000e5
-1678 2 20 34 -0.13107200000000000000e6
-1678 3 5 50 0.65536000000000000000e5
-1678 3 9 38 -0.65536000000000000000e5
-1678 3 22 35 -0.26214400000000000000e6
-1678 3 22 51 -0.65536000000000000000e5
-1678 3 23 52 0.13107200000000000000e6
-1678 3 27 40 0.65536000000000000000e5
-1678 3 28 41 -0.26214400000000000000e6
-1678 3 38 51 0.65536000000000000000e5
-1678 4 2 30 -0.65536000000000000000e5
-1678 4 6 34 -0.13107200000000000000e6
-1678 4 7 35 -0.65536000000000000000e5
-1679 1 40 55 -0.65536000000000000000e5
-1679 1 49 51 0.65536000000000000000e5
-1680 1 33 40 -0.65536000000000000000e5
-1680 1 49 52 0.65536000000000000000e5
-1680 3 10 55 0.65536000000000000000e5
-1680 3 14 51 0.13107200000000000000e6
-1680 3 29 42 -0.65536000000000000000e5
-1680 3 30 43 -0.65536000000000000000e5
-1680 3 39 52 0.65536000000000000000e5
-1680 4 19 31 -0.65536000000000000000e5
-1681 1 1 48 0.65536000000000000000e5
-1681 1 2 49 0.13107200000000000000e6
-1681 1 6 53 -0.65536000000000000000e5
-1681 1 8 39 0.13107200000000000000e6
-1681 1 9 40 0.13107200000000000000e6
-1681 1 10 41 -0.26214400000000000000e6
-1681 1 12 43 -0.52428800000000000000e6
-1681 1 23 38 0.65536000000000000000e5
-1681 1 24 39 0.65536000000000000000e5
-1681 1 24 55 0.13107200000000000000e6
-1681 1 26 41 -0.26214400000000000000e6
-1681 1 28 43 0.26214400000000000000e6
-1681 1 32 47 0.52428800000000000000e6
-1681 1 47 54 0.65536000000000000000e5
-1681 1 49 53 0.65536000000000000000e5
-1681 2 2 32 0.65536000000000000000e5
-1681 2 3 33 0.65536000000000000000e5
-1681 2 5 35 -0.65536000000000000000e5
-1681 2 16 30 0.13107200000000000000e6
-1681 2 20 34 0.26214400000000000000e6
-1681 2 33 35 0.65536000000000000000e5
-1681 3 9 38 0.13107200000000000000e6
-1681 3 22 35 0.52428800000000000000e6
-1681 3 22 51 -0.13107200000000000000e6
-1681 3 23 52 0.26214400000000000000e6
-1681 3 25 38 0.65536000000000000000e5
-1681 3 25 54 -0.65536000000000000000e5
-1681 3 27 40 0.13107200000000000000e6
-1681 3 28 41 0.52428800000000000000e6
-1681 3 38 51 0.13107200000000000000e6
-1681 3 39 40 -0.65536000000000000000e5
-1681 3 40 53 -0.65536000000000000000e5
-1681 3 41 54 0.13107200000000000000e6
-1681 4 2 30 0.13107200000000000000e6
-1681 4 6 34 0.26214400000000000000e6
-1681 4 7 35 -0.13107200000000000000e6
-1682 1 1 48 -0.13107200000000000000e6
-1682 1 2 49 -0.19660800000000000000e6
-1682 1 6 53 0.65536000000000000000e5
-1682 1 8 39 -0.26214400000000000000e6
-1682 1 9 40 -0.26214400000000000000e6
-1682 1 10 41 0.52428800000000000000e6
-1682 1 12 43 0.10485760000000000000e7
-1682 1 23 38 -0.13107200000000000000e6
-1682 1 24 39 -0.65536000000000000000e5
-1682 1 26 41 0.39321600000000000000e6
-1682 1 28 43 -0.78643200000000000000e6
-1682 1 32 47 -0.10485760000000000000e7
-1682 1 49 54 0.65536000000000000000e5
-1682 2 2 32 -0.13107200000000000000e6
-1682 2 3 33 -0.65536000000000000000e5
-1682 2 4 34 0.13107200000000000000e6
-1682 2 5 35 0.65536000000000000000e5
-1682 2 16 30 -0.26214400000000000000e6
-1682 2 20 34 -0.52428800000000000000e6
-1682 3 5 50 0.13107200000000000000e6
-1682 3 9 38 -0.26214400000000000000e6
-1682 3 22 35 -0.10485760000000000000e7
-1682 3 25 38 -0.65536000000000000000e5
-1682 3 25 54 0.65536000000000000000e5
-1682 3 28 41 -0.10485760000000000000e7
-1682 3 39 40 0.65536000000000000000e5
-1682 3 40 53 0.65536000000000000000e5
-1682 4 2 30 -0.26214400000000000000e6
-1682 4 6 34 -0.52428800000000000000e6
-1683 1 40 55 -0.65536000000000000000e5
-1683 1 49 55 0.65536000000000000000e5
-1683 3 49 50 0.65536000000000000000e5
-1684 1 1 48 0.81920000000000000000e4
-1684 1 2 49 0.81920000000000000000e4
-1684 1 6 53 0.81920000000000000000e4
-1684 1 8 39 0.16384000000000000000e5
-1684 1 9 40 0.16384000000000000000e5
-1684 1 10 41 -0.32768000000000000000e5
-1684 1 12 43 -0.65536000000000000000e5
-1684 1 23 38 0.81920000000000000000e4
-1684 1 24 55 -0.16384000000000000000e5
-1684 1 25 40 -0.81920000000000000000e4
-1684 1 26 41 -0.16384000000000000000e5
-1684 1 28 43 0.32768000000000000000e5
-1684 1 32 47 0.65536000000000000000e5
-1684 1 33 48 -0.32768000000000000000e5
-1684 1 40 55 0.16384000000000000000e5
-1684 1 41 56 0.16384000000000000000e5
-1684 1 44 51 0.65536000000000000000e5
-1684 1 46 53 -0.65536000000000000000e5
-1684 1 50 50 0.65536000000000000000e5
-1684 2 2 32 0.81920000000000000000e4
-1684 2 16 30 0.16384000000000000000e5
-1684 2 20 34 0.32768000000000000000e5
-1684 2 21 35 -0.16384000000000000000e5
-1684 2 28 34 0.16384000000000000000e5
-1684 3 9 38 0.16384000000000000000e5
-1684 3 10 55 -0.32768000000000000000e5
-1684 3 22 35 0.65536000000000000000e5
-1684 3 22 51 0.16384000000000000000e5
-1684 3 24 37 0.81920000000000000000e4
-1684 3 27 40 0.16384000000000000000e5
-1684 3 27 56 0.16384000000000000000e5
-1684 3 28 41 0.65536000000000000000e5
-1684 3 35 48 0.65536000000000000000e5
-1684 3 38 51 -0.16384000000000000000e5
-1684 3 39 52 -0.32768000000000000000e5
-1684 3 40 45 -0.32768000000000000000e5
-1684 4 2 30 0.16384000000000000000e5
-1684 4 4 32 -0.81920000000000000000e4
-1684 4 6 34 0.32768000000000000000e5
-1684 4 16 28 0.81920000000000000000e4
-1684 4 22 34 -0.32768000000000000000e5
-1684 4 23 35 -0.32768000000000000000e5
-1684 4 29 33 -0.16384000000000000000e5
-1685 1 1 48 -0.16384000000000000000e5
-1685 1 2 49 -0.16384000000000000000e5
-1685 1 8 39 -0.32768000000000000000e5
-1685 1 9 40 -0.32768000000000000000e5
-1685 1 10 41 0.65536000000000000000e5
-1685 1 12 43 0.13107200000000000000e6
-1685 1 23 38 -0.16384000000000000000e5
-1685 1 24 55 0.32768000000000000000e5
-1685 1 26 41 0.32768000000000000000e5
-1685 1 28 43 -0.13107200000000000000e6
-1685 1 32 47 -0.13107200000000000000e6
-1685 1 40 55 -0.32768000000000000000e5
-1685 1 41 56 -0.32768000000000000000e5
-1685 1 50 51 0.65536000000000000000e5
-1685 2 2 32 -0.16384000000000000000e5
-1685 2 4 34 0.32768000000000000000e5
-1685 2 16 30 -0.32768000000000000000e5
-1685 2 20 34 -0.65536000000000000000e5
-1685 2 28 34 -0.32768000000000000000e5
-1685 3 5 50 0.32768000000000000000e5
-1685 3 9 38 -0.32768000000000000000e5
-1685 3 22 35 -0.13107200000000000000e6
-1685 3 22 51 -0.32768000000000000000e5
-1685 3 23 52 0.65536000000000000000e5
-1685 3 27 40 0.32768000000000000000e5
-1685 3 27 56 -0.32768000000000000000e5
-1685 3 28 41 -0.13107200000000000000e6
-1685 3 38 51 0.32768000000000000000e5
-1685 4 2 30 -0.32768000000000000000e5
-1685 4 6 34 -0.65536000000000000000e5
-1685 4 7 35 -0.32768000000000000000e5
-1685 4 29 33 0.32768000000000000000e5
-1686 1 46 53 -0.65536000000000000000e5
-1686 1 50 52 0.65536000000000000000e5
-1687 1 41 56 -0.65536000000000000000e5
-1687 1 50 53 0.65536000000000000000e5
-1688 1 1 48 -0.32768000000000000000e5
-1688 1 2 49 -0.32768000000000000000e5
-1688 1 8 39 -0.65536000000000000000e5
-1688 1 9 40 -0.65536000000000000000e5
-1688 1 10 41 0.13107200000000000000e6
-1688 1 12 43 0.26214400000000000000e6
-1688 1 23 38 -0.32768000000000000000e5
-1688 1 24 55 0.65536000000000000000e5
-1688 1 26 41 0.65536000000000000000e5
-1688 1 28 43 -0.26214400000000000000e6
-1688 1 32 47 -0.26214400000000000000e6
-1688 1 50 54 0.65536000000000000000e5
-1688 2 2 32 -0.32768000000000000000e5
-1688 2 4 34 0.65536000000000000000e5
-1688 2 16 30 -0.65536000000000000000e5
-1688 2 20 34 -0.13107200000000000000e6
-1688 3 5 50 0.65536000000000000000e5
-1688 3 9 38 -0.65536000000000000000e5
-1688 3 22 35 -0.26214400000000000000e6
-1688 3 22 51 -0.65536000000000000000e5
-1688 3 23 52 0.13107200000000000000e6
-1688 3 27 40 0.65536000000000000000e5
-1688 3 28 41 -0.26214400000000000000e6
-1688 3 38 51 0.65536000000000000000e5
-1688 3 41 54 0.65536000000000000000e5
-1688 4 2 30 -0.65536000000000000000e5
-1688 4 6 34 -0.13107200000000000000e6
-1688 4 7 35 -0.65536000000000000000e5
-1689 1 1 48 -0.16384000000000000000e5
-1689 1 2 49 -0.16384000000000000000e5
-1689 1 8 39 -0.32768000000000000000e5
-1689 1 9 40 -0.32768000000000000000e5
-1689 1 10 41 0.65536000000000000000e5
-1689 1 12 43 0.13107200000000000000e6
-1689 1 23 38 -0.16384000000000000000e5
-1689 1 24 55 0.32768000000000000000e5
-1689 1 26 41 0.32768000000000000000e5
-1689 1 28 43 -0.13107200000000000000e6
-1689 1 32 47 -0.13107200000000000000e6
-1689 1 40 55 -0.32768000000000000000e5
-1689 1 41 56 -0.32768000000000000000e5
-1689 1 50 55 0.65536000000000000000e5
-1689 2 2 32 -0.16384000000000000000e5
-1689 2 4 34 0.32768000000000000000e5
-1689 2 16 30 -0.32768000000000000000e5
-1689 2 20 34 -0.65536000000000000000e5
-1689 2 28 34 -0.32768000000000000000e5
-1689 3 5 50 0.32768000000000000000e5
-1689 3 9 38 -0.32768000000000000000e5
-1689 3 22 35 -0.13107200000000000000e6
-1689 3 22 51 -0.32768000000000000000e5
-1689 3 23 52 0.65536000000000000000e5
-1689 3 27 40 0.32768000000000000000e5
-1689 3 27 56 -0.32768000000000000000e5
-1689 3 28 41 -0.13107200000000000000e6
-1689 3 38 51 0.32768000000000000000e5
-1689 3 47 52 0.65536000000000000000e5
-1689 4 2 30 -0.32768000000000000000e5
-1689 4 6 34 -0.65536000000000000000e5
-1689 4 7 35 -0.32768000000000000000e5
-1689 4 29 33 0.32768000000000000000e5
-1690 1 1 48 -0.32768000000000000000e5
-1690 1 2 49 -0.32768000000000000000e5
-1690 1 8 39 -0.65536000000000000000e5
-1690 1 9 40 -0.65536000000000000000e5
-1690 1 10 41 0.13107200000000000000e6
-1690 1 12 43 0.26214400000000000000e6
-1690 1 23 38 -0.32768000000000000000e5
-1690 1 24 55 0.65536000000000000000e5
-1690 1 26 41 0.65536000000000000000e5
-1690 1 28 43 -0.26214400000000000000e6
-1690 1 32 47 -0.26214400000000000000e6
-1690 1 50 56 0.65536000000000000000e5
-1690 2 2 32 -0.32768000000000000000e5
-1690 2 4 34 0.65536000000000000000e5
-1690 2 16 30 -0.65536000000000000000e5
-1690 2 20 34 -0.13107200000000000000e6
-1690 3 5 50 0.65536000000000000000e5
-1690 3 9 38 -0.65536000000000000000e5
-1690 3 22 35 -0.26214400000000000000e6
-1690 3 22 51 -0.65536000000000000000e5
-1690 3 23 52 0.13107200000000000000e6
-1690 3 27 40 0.65536000000000000000e5
-1690 3 28 41 -0.26214400000000000000e6
-1690 3 38 51 0.65536000000000000000e5
-1690 3 41 54 0.65536000000000000000e5
-1690 3 41 56 0.65536000000000000000e5
-1690 4 2 30 -0.65536000000000000000e5
-1690 4 6 34 -0.13107200000000000000e6
-1690 4 7 35 -0.65536000000000000000e5
-1691 1 33 40 -0.32768000000000000000e5
-1691 1 51 51 0.65536000000000000000e5
-1691 3 10 55 0.32768000000000000000e5
-1691 3 14 51 0.65536000000000000000e5
-1691 3 29 42 -0.32768000000000000000e5
-1691 3 30 43 -0.32768000000000000000e5
-1691 3 39 52 0.32768000000000000000e5
-1691 4 19 31 -0.32768000000000000000e5
-1692 1 18 49 -0.65536000000000000000e5
-1692 1 51 52 0.65536000000000000000e5
-1692 3 14 51 0.65536000000000000000e5
-1692 3 35 48 0.65536000000000000000e5
-1692 3 45 50 0.65536000000000000000e5
-1693 1 1 48 -0.32768000000000000000e5
-1693 1 2 49 -0.32768000000000000000e5
-1693 1 8 39 -0.65536000000000000000e5
-1693 1 9 40 -0.65536000000000000000e5
-1693 1 10 41 0.13107200000000000000e6
-1693 1 12 43 0.26214400000000000000e6
-1693 1 23 38 -0.32768000000000000000e5
-1693 1 24 55 0.65536000000000000000e5
-1693 1 26 41 0.65536000000000000000e5
-1693 1 28 43 -0.26214400000000000000e6
-1693 1 32 47 -0.26214400000000000000e6
-1693 1 51 53 0.65536000000000000000e5
-1693 2 2 32 -0.32768000000000000000e5
-1693 2 4 34 0.65536000000000000000e5
-1693 2 16 30 -0.65536000000000000000e5
-1693 2 20 34 -0.13107200000000000000e6
-1693 3 5 50 0.65536000000000000000e5
-1693 3 9 38 -0.65536000000000000000e5
-1693 3 22 35 -0.26214400000000000000e6
-1693 3 22 51 -0.65536000000000000000e5
-1693 3 23 52 0.13107200000000000000e6
-1693 3 27 40 0.65536000000000000000e5
-1693 3 28 41 -0.26214400000000000000e6
-1693 3 38 51 0.65536000000000000000e5
-1693 3 41 54 0.65536000000000000000e5
-1693 4 2 30 -0.65536000000000000000e5
-1693 4 6 34 -0.13107200000000000000e6
-1693 4 7 35 -0.65536000000000000000e5
-1694 1 40 55 -0.65536000000000000000e5
-1694 1 51 54 0.65536000000000000000e5
-1694 3 49 50 0.65536000000000000000e5
-1695 1 33 40 -0.65536000000000000000e5
-1695 1 51 55 0.65536000000000000000e5
-1695 3 10 55 0.65536000000000000000e5
-1695 3 14 51 0.13107200000000000000e6
-1695 3 29 42 -0.65536000000000000000e5
-1695 3 30 43 -0.65536000000000000000e5
-1695 3 39 52 0.65536000000000000000e5
-1695 3 42 55 0.65536000000000000000e5
-1695 4 19 31 -0.65536000000000000000e5
-1696 1 51 56 0.65536000000000000000e5
-1696 1 54 55 -0.65536000000000000000e5
-1697 1 45 52 -0.32768000000000000000e5
-1697 1 52 52 0.65536000000000000000e5
-1697 3 19 56 0.32768000000000000000e5
-1698 1 1 48 -0.16384000000000000000e5
-1698 1 2 49 -0.16384000000000000000e5
-1698 1 8 39 -0.32768000000000000000e5
-1698 1 9 40 -0.32768000000000000000e5
-1698 1 10 41 0.65536000000000000000e5
-1698 1 12 43 0.13107200000000000000e6
-1698 1 23 38 -0.16384000000000000000e5
-1698 1 24 55 0.32768000000000000000e5
-1698 1 26 41 0.32768000000000000000e5
-1698 1 28 43 -0.13107200000000000000e6
-1698 1 32 47 -0.13107200000000000000e6
-1698 1 40 55 -0.32768000000000000000e5
-1698 1 41 56 -0.32768000000000000000e5
-1698 1 52 53 0.65536000000000000000e5
-1698 2 2 32 -0.16384000000000000000e5
-1698 2 4 34 0.32768000000000000000e5
-1698 2 16 30 -0.32768000000000000000e5
-1698 2 20 34 -0.65536000000000000000e5
-1698 2 28 34 -0.32768000000000000000e5
-1698 3 5 50 0.32768000000000000000e5
-1698 3 9 38 -0.32768000000000000000e5
-1698 3 22 35 -0.13107200000000000000e6
-1698 3 22 51 -0.32768000000000000000e5
-1698 3 23 52 0.65536000000000000000e5
-1698 3 27 40 0.32768000000000000000e5
-1698 3 27 56 -0.32768000000000000000e5
-1698 3 28 41 -0.13107200000000000000e6
-1698 3 38 51 0.32768000000000000000e5
-1698 3 47 52 0.65536000000000000000e5
-1698 4 2 30 -0.32768000000000000000e5
-1698 4 6 34 -0.65536000000000000000e5
-1698 4 7 35 -0.32768000000000000000e5
-1698 4 29 33 0.32768000000000000000e5
-1699 1 33 40 -0.65536000000000000000e5
-1699 1 52 54 0.65536000000000000000e5
-1699 3 10 55 0.65536000000000000000e5
-1699 3 14 51 0.13107200000000000000e6
-1699 3 29 42 -0.65536000000000000000e5
-1699 3 30 43 -0.65536000000000000000e5
-1699 3 39 52 0.65536000000000000000e5
-1699 3 42 55 0.65536000000000000000e5
-1699 4 19 31 -0.65536000000000000000e5
-1700 1 33 40 -0.65536000000000000000e5
-1700 1 52 56 0.65536000000000000000e5
-1700 3 10 55 0.65536000000000000000e5
-1700 3 14 51 0.13107200000000000000e6
-1700 3 29 42 -0.65536000000000000000e5
-1700 3 30 43 -0.65536000000000000000e5
-1700 3 39 52 0.65536000000000000000e5
-1700 3 42 55 0.65536000000000000000e5
-1700 3 50 55 0.65536000000000000000e5
-1700 4 19 31 -0.65536000000000000000e5
-1701 1 1 48 -0.65536000000000000000e5
-1701 1 2 49 -0.98304000000000000000e5
-1701 1 6 53 0.32768000000000000000e5
-1701 1 8 39 -0.13107200000000000000e6
-1701 1 9 40 -0.13107200000000000000e6
-1701 1 10 41 0.26214400000000000000e6
-1701 1 12 43 0.52428800000000000000e6
-1701 1 23 38 -0.65536000000000000000e5
-1701 1 24 39 -0.32768000000000000000e5
-1701 1 26 41 0.19660800000000000000e6
-1701 1 28 43 -0.39321600000000000000e6
-1701 1 32 47 -0.52428800000000000000e6
-1701 1 47 54 -0.32768000000000000000e5
-1701 1 49 56 0.32768000000000000000e5
-1701 1 53 53 0.65536000000000000000e5
-1701 2 2 32 -0.65536000000000000000e5
-1701 2 3 33 -0.32768000000000000000e5
-1701 2 4 34 0.65536000000000000000e5
-1701 2 5 35 0.32768000000000000000e5
-1701 2 16 30 -0.13107200000000000000e6
-1701 2 20 34 -0.26214400000000000000e6
-1701 2 33 35 -0.32768000000000000000e5
-1701 2 35 35 0.65536000000000000000e5
-1701 3 5 50 0.65536000000000000000e5
-1701 3 9 38 -0.13107200000000000000e6
-1701 3 22 35 -0.52428800000000000000e6
-1701 3 25 38 -0.32768000000000000000e5
-1701 3 25 54 0.32768000000000000000e5
-1701 3 28 41 -0.52428800000000000000e6
-1701 3 39 40 0.32768000000000000000e5
-1701 3 40 53 0.32768000000000000000e5
-1701 3 41 56 0.65536000000000000000e5
-1701 3 48 53 -0.32768000000000000000e5
-1701 4 2 30 -0.13107200000000000000e6
-1701 4 6 34 -0.26214400000000000000e6
-1702 1 1 48 0.65536000000000000000e5
-1702 1 2 49 0.13107200000000000000e6
-1702 1 6 53 -0.65536000000000000000e5
-1702 1 8 39 0.13107200000000000000e6
-1702 1 9 40 0.13107200000000000000e6
-1702 1 10 41 -0.26214400000000000000e6
-1702 1 12 43 -0.52428800000000000000e6
-1702 1 23 38 0.65536000000000000000e5
-1702 1 24 39 0.65536000000000000000e5
-1702 1 24 55 0.13107200000000000000e6
-1702 1 26 41 -0.26214400000000000000e6
-1702 1 28 43 0.26214400000000000000e6
-1702 1 32 47 0.52428800000000000000e6
-1702 1 47 54 0.65536000000000000000e5
-1702 1 53 54 0.65536000000000000000e5
-1702 2 2 32 0.65536000000000000000e5
-1702 2 3 33 0.65536000000000000000e5
-1702 2 5 35 -0.65536000000000000000e5
-1702 2 16 30 0.13107200000000000000e6
-1702 2 20 34 0.26214400000000000000e6
-1702 2 33 35 0.65536000000000000000e5
-1702 3 9 38 0.13107200000000000000e6
-1702 3 22 35 0.52428800000000000000e6
-1702 3 22 51 -0.13107200000000000000e6
-1702 3 23 52 0.26214400000000000000e6
-1702 3 25 38 0.65536000000000000000e5
-1702 3 25 54 -0.65536000000000000000e5
-1702 3 27 40 0.13107200000000000000e6
-1702 3 28 41 0.52428800000000000000e6
-1702 3 38 51 0.13107200000000000000e6
-1702 3 39 40 -0.65536000000000000000e5
-1702 3 40 53 -0.65536000000000000000e5
-1702 3 41 54 0.13107200000000000000e6
-1702 3 48 53 0.65536000000000000000e5
-1702 4 2 30 0.13107200000000000000e6
-1702 4 6 34 0.26214400000000000000e6
-1702 4 7 35 -0.13107200000000000000e6
-1703 1 1 48 -0.32768000000000000000e5
-1703 1 2 49 -0.32768000000000000000e5
-1703 1 8 39 -0.65536000000000000000e5
-1703 1 9 40 -0.65536000000000000000e5
-1703 1 10 41 0.13107200000000000000e6
-1703 1 12 43 0.26214400000000000000e6
-1703 1 23 38 -0.32768000000000000000e5
-1703 1 24 55 0.65536000000000000000e5
-1703 1 26 41 0.65536000000000000000e5
-1703 1 28 43 -0.26214400000000000000e6
-1703 1 32 47 -0.26214400000000000000e6
-1703 1 53 55 0.65536000000000000000e5
-1703 2 2 32 -0.32768000000000000000e5
-1703 2 4 34 0.65536000000000000000e5
-1703 2 16 30 -0.65536000000000000000e5
-1703 2 20 34 -0.13107200000000000000e6
-1703 3 5 50 0.65536000000000000000e5
-1703 3 9 38 -0.65536000000000000000e5
-1703 3 22 35 -0.26214400000000000000e6
-1703 3 22 51 -0.65536000000000000000e5
-1703 3 23 52 0.13107200000000000000e6
-1703 3 27 40 0.65536000000000000000e5
-1703 3 28 41 -0.26214400000000000000e6
-1703 3 38 51 0.65536000000000000000e5
-1703 3 41 54 0.65536000000000000000e5
-1703 3 41 56 0.65536000000000000000e5
-1703 4 2 30 -0.65536000000000000000e5
-1703 4 6 34 -0.13107200000000000000e6
-1703 4 7 35 -0.65536000000000000000e5
-1704 1 49 56 -0.32768000000000000000e5
-1704 1 54 54 0.65536000000000000000e5
-1705 1 49 56 -0.65536000000000000000e5
-1705 1 54 56 0.65536000000000000000e5
-1705 3 53 54 0.65536000000000000000e5
-1706 1 33 40 -0.32768000000000000000e5
-1706 1 55 55 0.65536000000000000000e5
-1706 3 10 55 0.32768000000000000000e5
-1706 3 14 51 0.65536000000000000000e5
-1706 3 29 42 -0.32768000000000000000e5
-1706 3 30 43 -0.32768000000000000000e5
-1706 3 39 52 0.32768000000000000000e5
-1706 3 42 55 0.32768000000000000000e5
-1706 3 50 55 0.32768000000000000000e5
-1706 4 19 31 -0.32768000000000000000e5
-1707 1 49 56 -0.32768000000000000000e5
-1707 1 56 56 0.65536000000000000000e5
-1707 3 53 54 0.32768000000000000000e5
-1707 3 53 56 0.32768000000000000000e5
-1708 1 1 2 0.65536000000000000000e5
-1708 1 1 8 -0.26214400000000000000e6
-1708 1 1 32 -0.26214400000000000000e6
-1708 1 1 48 0.65536000000000000000e5
-1708 1 2 5 -0.65536000000000000000e5
-1708 1 2 25 0.65536000000000000000e5
-1708 1 2 33 0.78643200000000000000e6
-1708 1 2 49 0.13107200000000000000e6
-1708 1 3 34 -0.10485760000000000000e7
-1708 1 4 11 -0.13107200000000000000e6
-1708 1 8 39 0.13107200000000000000e6
-1708 1 9 40 0.13107200000000000000e6
-1708 1 10 41 0.52428800000000000000e6
-1708 1 11 42 -0.26214400000000000000e6
-1708 1 12 27 0.52428800000000000000e6
-1708 1 12 43 -0.10485760000000000000e7
-1708 1 23 38 0.13107200000000000000e6
-1708 1 26 41 -0.13107200000000000000e6
-1708 1 28 43 0.52428800000000000000e6
-1708 1 32 47 0.78643200000000000000e6
-1708 1 33 48 0.26214400000000000000e6
-1708 2 1 2 0.65536000000000000000e5
-1708 2 1 7 -0.13107200000000000000e6
-1708 2 2 8 0.13107200000000000000e6
-1708 2 2 16 -0.65536000000000000000e5
-1708 2 2 32 0.13107200000000000000e6
-1708 2 3 9 -0.13107200000000000000e6
-1708 2 6 20 -0.26214400000000000000e6
-1708 2 7 21 0.52428800000000000000e6
-1708 2 12 26 0.26214400000000000000e6
-1708 2 16 30 0.13107200000000000000e6
-1708 2 20 34 0.26214400000000000000e6
-1708 3 1 2 0.65536000000000000000e5
-1708 3 1 14 -0.52428800000000000000e6
-1708 3 1 30 -0.13107200000000000000e6
-1708 3 1 38 -0.65536000000000000000e5
-1708 3 2 3 -0.65536000000000000000e5
-1708 3 2 7 -0.26214400000000000000e6
-1708 3 2 15 0.26214400000000000000e6
-1708 3 2 23 -0.65536000000000000000e5
-1708 3 3 32 0.78643200000000000000e6
-1708 3 4 9 -0.13107200000000000000e6
-1708 3 7 12 0.52428800000000000000e6
-1708 3 8 37 0.13107200000000000000e6
-1708 3 10 23 -0.26214400000000000000e6
-1708 3 13 42 0.52428800000000000000e6
-1708 3 22 35 0.52428800000000000000e6
-1708 3 28 41 0.78643200000000000000e6
-1708 3 29 42 0.26214400000000000000e6
-1708 4 2 2 -0.13107200000000000000e6
-1708 4 2 6 -0.13107200000000000000e6
-1708 4 2 30 0.13107200000000000000e6
-1708 4 3 31 -0.26214400000000000000e6
-1708 4 6 6 -0.52428800000000000000e6
-1708 4 6 18 -0.13107200000000000000e6
-1708 4 6 34 0.26214400000000000000e6
-1709 1 2 5 -0.65536000000000000000e5
-1709 1 2 9 0.13107200000000000000e6
-1709 1 2 25 0.65536000000000000000e5
-1709 1 8 23 -0.13107200000000000000e6
-1709 2 1 3 0.65536000000000000000e5
-1709 2 2 16 -0.65536000000000000000e5
-1709 3 1 2 0.65536000000000000000e5
-1709 3 2 7 -0.13107200000000000000e6
-1709 4 2 2 -0.13107200000000000000e6
-1710 1 1 24 0.65536000000000000000e5
-1710 1 1 48 0.65536000000000000000e5
-1710 1 2 25 0.65536000000000000000e5
-1710 1 8 23 -0.13107200000000000000e6
-1710 2 1 4 0.65536000000000000000e5
-1710 3 1 38 0.65536000000000000000e5
-1710 3 2 23 0.65536000000000000000e5
-1710 4 2 2 -0.13107200000000000000e6
-1711 1 1 48 0.13107200000000000000e6
-1711 1 2 5 0.65536000000000000000e5
-1711 1 2 9 0.13107200000000000000e6
-1711 1 2 25 -0.65536000000000000000e5
-1711 1 2 33 0.52428800000000000000e6
-1711 1 2 49 0.13107200000000000000e6
-1711 1 3 34 -0.52428800000000000000e6
-1711 1 4 11 -0.13107200000000000000e6
-1711 1 8 39 0.13107200000000000000e6
-1711 1 9 40 0.13107200000000000000e6
-1711 1 10 41 0.26214400000000000000e6
-1711 1 11 42 -0.26214400000000000000e6
-1711 1 12 43 -0.10485760000000000000e7
-1711 1 23 38 0.13107200000000000000e6
-1711 1 26 41 -0.13107200000000000000e6
-1711 1 28 43 0.52428800000000000000e6
-1711 1 32 47 0.78643200000000000000e6
-1711 1 33 48 0.26214400000000000000e6
-1711 2 1 5 0.65536000000000000000e5
-1711 2 2 8 0.13107200000000000000e6
-1711 2 2 32 0.13107200000000000000e6
-1711 2 3 9 -0.13107200000000000000e6
-1711 2 3 17 -0.65536000000000000000e5
-1711 2 7 21 0.26214400000000000000e6
-1711 2 12 26 0.26214400000000000000e6
-1711 2 16 30 0.13107200000000000000e6
-1711 2 20 34 0.26214400000000000000e6
-1711 3 1 6 0.65536000000000000000e5
-1711 3 1 14 -0.26214400000000000000e6
-1711 3 1 30 -0.13107200000000000000e6
-1711 3 2 3 0.65536000000000000000e5
-1711 3 2 15 0.26214400000000000000e6
-1711 3 3 32 0.52428800000000000000e6
-1711 3 4 9 -0.13107200000000000000e6
-1711 3 8 37 0.13107200000000000000e6
-1711 3 10 23 -0.26214400000000000000e6
-1711 3 13 42 0.52428800000000000000e6
-1711 3 22 35 0.52428800000000000000e6
-1711 3 28 41 0.78643200000000000000e6
-1711 3 29 42 0.26214400000000000000e6
-1711 4 2 30 0.13107200000000000000e6
-1711 4 3 31 -0.26214400000000000000e6
-1711 4 6 18 -0.13107200000000000000e6
-1711 4 6 34 0.26214400000000000000e6
-1712 1 1 2 0.32768000000000000000e5
-1712 1 1 8 -0.13107200000000000000e6
-1712 1 1 12 -0.13107200000000000000e6
-1712 1 1 24 -0.32768000000000000000e5
-1712 1 1 32 -0.26214400000000000000e6
-1712 1 1 48 0.98304000000000000000e5
-1712 1 2 5 -0.32768000000000000000e5
-1712 1 2 9 -0.65536000000000000000e5
-1712 1 2 25 0.32768000000000000000e5
-1712 1 2 33 0.78643200000000000000e6
-1712 1 2 49 0.13107200000000000000e6
-1712 1 3 34 -0.10485760000000000000e7
-1712 1 4 11 -0.13107200000000000000e6
-1712 1 7 22 0.65536000000000000000e5
-1712 1 8 23 0.65536000000000000000e5
-1712 1 8 39 0.13107200000000000000e6
-1712 1 9 40 0.13107200000000000000e6
-1712 1 10 41 0.52428800000000000000e6
-1712 1 11 42 -0.26214400000000000000e6
-1712 1 12 27 0.52428800000000000000e6
-1712 1 12 43 -0.10485760000000000000e7
-1712 1 23 38 0.13107200000000000000e6
-1712 1 26 41 -0.13107200000000000000e6
-1712 1 28 43 0.52428800000000000000e6
-1712 1 32 47 0.78643200000000000000e6
-1712 1 33 48 0.26214400000000000000e6
-1712 2 1 6 0.65536000000000000000e5
-1712 2 1 7 -0.13107200000000000000e6
-1712 2 2 8 0.13107200000000000000e6
-1712 2 2 16 -0.32768000000000000000e5
-1712 2 2 32 0.13107200000000000000e6
-1712 2 3 9 -0.13107200000000000000e6
-1712 2 6 20 -0.26214400000000000000e6
-1712 2 7 21 0.52428800000000000000e6
-1712 2 12 26 0.26214400000000000000e6
-1712 2 16 30 0.13107200000000000000e6
-1712 2 20 34 0.26214400000000000000e6
-1712 3 1 2 0.32768000000000000000e5
-1712 3 1 14 -0.52428800000000000000e6
-1712 3 1 22 -0.32768000000000000000e5
-1712 3 1 30 -0.13107200000000000000e6
-1712 3 1 38 -0.32768000000000000000e5
-1712 3 2 3 -0.32768000000000000000e5
-1712 3 2 7 -0.19660800000000000000e6
-1712 3 2 15 0.26214400000000000000e6
-1712 3 2 23 -0.32768000000000000000e5
-1712 3 3 32 0.78643200000000000000e6
-1712 3 4 9 -0.13107200000000000000e6
-1712 3 7 12 0.52428800000000000000e6
-1712 3 8 37 0.13107200000000000000e6
-1712 3 10 23 -0.26214400000000000000e6
-1712 3 13 42 0.52428800000000000000e6
-1712 3 22 35 0.52428800000000000000e6
-1712 3 28 41 0.78643200000000000000e6
-1712 3 29 42 0.26214400000000000000e6
-1712 4 1 1 0.65536000000000000000e5
-1712 4 2 2 -0.65536000000000000000e5
-1712 4 2 6 -0.13107200000000000000e6
-1712 4 2 30 0.13107200000000000000e6
-1712 4 3 31 -0.26214400000000000000e6
-1712 4 6 6 -0.52428800000000000000e6
-1712 4 6 18 -0.13107200000000000000e6
-1712 4 6 34 0.26214400000000000000e6
-1713 1 1 8 -0.65536000000000000000e5
-1713 1 1 32 -0.26214400000000000000e6
-1713 1 1 48 0.98304000000000000000e5
-1713 1 2 9 -0.65536000000000000000e5
-1713 1 2 33 0.52428800000000000000e6
-1713 1 2 49 0.98304000000000000000e5
-1713 1 3 34 -0.52428800000000000000e6
-1713 1 4 11 -0.65536000000000000000e5
-1713 1 8 23 0.13107200000000000000e6
-1713 1 8 39 0.65536000000000000000e5
-1713 1 9 40 0.65536000000000000000e5
-1713 1 10 41 0.26214400000000000000e6
-1713 1 11 42 -0.26214400000000000000e6
-1713 1 12 27 0.26214400000000000000e6
-1713 1 12 43 -0.78643200000000000000e6
-1713 1 23 38 0.98304000000000000000e5
-1713 1 26 41 -0.65536000000000000000e5
-1713 1 28 43 0.39321600000000000000e6
-1713 1 32 47 0.52428800000000000000e6
-1713 1 33 48 0.26214400000000000000e6
-1713 2 1 7 -0.65536000000000000000e5
-1713 2 1 8 0.65536000000000000000e5
-1713 2 2 8 0.65536000000000000000e5
-1713 2 2 32 0.98304000000000000000e5
-1713 2 3 9 -0.65536000000000000000e5
-1713 2 6 20 -0.13107200000000000000e6
-1713 2 7 21 0.26214400000000000000e6
-1713 2 12 26 0.26214400000000000000e6
-1713 2 16 30 0.65536000000000000000e5
-1713 2 20 34 0.13107200000000000000e6
-1713 3 1 14 -0.26214400000000000000e6
-1713 3 1 30 -0.13107200000000000000e6
-1713 3 2 7 -0.13107200000000000000e6
-1713 3 2 15 0.13107200000000000000e6
-1713 3 3 32 0.39321600000000000000e6
-1713 3 4 9 -0.65536000000000000000e5
-1713 3 7 12 0.26214400000000000000e6
-1713 3 8 37 0.13107200000000000000e6
-1713 3 10 23 -0.19660800000000000000e6
-1713 3 13 42 0.52428800000000000000e6
-1713 3 22 35 0.26214400000000000000e6
-1713 3 28 41 0.52428800000000000000e6
-1713 3 29 42 0.26214400000000000000e6
-1713 4 2 6 -0.13107200000000000000e6
-1713 4 2 30 0.65536000000000000000e5
-1713 4 3 31 -0.26214400000000000000e6
-1713 4 6 6 -0.26214400000000000000e6
-1713 4 6 18 -0.13107200000000000000e6
-1713 4 6 34 0.13107200000000000000e6
-1714 2 1 9 0.65536000000000000000e5
-1714 2 2 8 -0.65536000000000000000e5
-1715 1 1 12 0.65536000000000000000e5
-1715 1 1 16 -0.13107200000000000000e6
-1715 1 2 33 0.65536000000000000000e5
-1715 1 3 34 -0.13107200000000000000e6
-1715 1 10 41 0.65536000000000000000e5
-1715 1 12 27 0.13107200000000000000e6
-1715 2 1 10 0.65536000000000000000e5
-1715 2 6 20 -0.65536000000000000000e5
-1715 2 7 21 0.65536000000000000000e5
-1715 3 1 14 -0.65536000000000000000e5
-1715 3 3 32 0.65536000000000000000e5
-1715 3 7 12 0.13107200000000000000e6
-1715 4 6 6 -0.13107200000000000000e6
-1716 2 1 11 0.65536000000000000000e5
-1716 2 6 20 -0.65536000000000000000e5
-1716 4 6 6 -0.13107200000000000000e6
-1717 1 1 32 0.65536000000000000000e5
-1717 1 1 48 -0.32768000000000000000e5
-1717 1 2 17 -0.13107200000000000000e6
-1717 1 2 33 -0.13107200000000000000e6
-1717 1 2 49 -0.32768000000000000000e5
-1717 1 3 34 0.26214400000000000000e6
-1717 1 4 11 0.32768000000000000000e5
-1717 1 8 23 -0.32768000000000000000e5
-1717 1 8 39 -0.32768000000000000000e5
-1717 1 9 40 -0.32768000000000000000e5
-1717 1 10 41 -0.13107200000000000000e6
-1717 1 11 42 0.65536000000000000000e5
-1717 1 12 43 0.26214400000000000000e6
-1717 1 23 38 -0.32768000000000000000e5
-1717 1 26 41 0.32768000000000000000e5
-1717 1 28 43 -0.13107200000000000000e6
-1717 1 32 47 -0.19660800000000000000e6
-1717 1 33 48 -0.65536000000000000000e5
-1717 2 1 12 0.65536000000000000000e5
-1717 2 2 8 -0.32768000000000000000e5
-1717 2 2 32 -0.32768000000000000000e5
-1717 2 3 9 0.32768000000000000000e5
-1717 2 4 10 -0.65536000000000000000e5
-1717 2 7 21 -0.65536000000000000000e5
-1717 2 12 26 -0.65536000000000000000e5
-1717 2 16 30 -0.32768000000000000000e5
-1717 2 20 34 -0.65536000000000000000e5
-1717 3 1 14 0.65536000000000000000e5
-1717 3 1 30 0.32768000000000000000e5
-1717 3 2 7 0.32768000000000000000e5
-1717 3 2 15 -0.13107200000000000000e6
-1717 3 3 16 0.13107200000000000000e6
-1717 3 3 32 -0.19660800000000000000e6
-1717 3 4 9 0.32768000000000000000e5
-1717 3 8 37 -0.32768000000000000000e5
-1717 3 10 23 0.65536000000000000000e5
-1717 3 13 42 -0.13107200000000000000e6
-1717 3 22 35 -0.13107200000000000000e6
-1717 3 28 41 -0.19660800000000000000e6
-1717 3 29 42 -0.65536000000000000000e5
-1717 4 2 6 0.32768000000000000000e5
-1717 4 2 30 -0.32768000000000000000e5
-1717 4 3 31 0.65536000000000000000e5
-1717 4 6 18 0.32768000000000000000e5
-1717 4 6 34 -0.65536000000000000000e5
-1718 1 1 16 0.65536000000000000000e5
-1718 1 2 17 0.65536000000000000000e5
-1718 1 7 16 -0.13107200000000000000e6
-1718 1 12 27 0.65536000000000000000e5
-1718 2 1 13 0.65536000000000000000e5
-1718 3 7 12 0.65536000000000000000e5
-1719 1 3 34 0.65536000000000000000e5
-1719 1 4 35 -0.65536000000000000000e5
-1719 1 12 27 0.65536000000000000000e5
-1719 1 12 43 -0.65536000000000000000e5
-1719 1 14 45 -0.13107200000000000000e6
-1719 1 16 23 0.65536000000000000000e5
-1719 1 16 31 -0.26214400000000000000e6
-1719 1 17 48 0.65536000000000000000e5
-1719 1 18 49 0.65536000000000000000e5
-1719 1 20 27 0.26214400000000000000e6
-1719 2 1 14 0.65536000000000000000e5
-1719 2 7 13 0.13107200000000000000e6
-1719 2 9 23 -0.65536000000000000000e5
-1719 2 10 24 -0.13107200000000000000e6
-1719 2 14 28 0.65536000000000000000e5
-1719 3 5 34 -0.65536000000000000000e5
-1719 3 13 42 0.65536000000000000000e5
-1719 3 14 27 -0.65536000000000000000e5
-1719 3 14 43 0.65536000000000000000e5
-1719 4 1 13 -0.65536000000000000000e5
-1719 4 10 10 -0.26214400000000000000e6
-1720 1 1 2 0.65536000000000000000e5
-1720 1 1 8 -0.26214400000000000000e6
-1720 1 1 32 -0.26214400000000000000e6
-1720 1 1 48 0.65536000000000000000e5
-1720 1 2 5 -0.65536000000000000000e5
-1720 1 2 25 0.65536000000000000000e5
-1720 1 2 33 0.78643200000000000000e6
-1720 1 2 49 0.13107200000000000000e6
-1720 1 3 34 -0.10485760000000000000e7
-1720 1 4 11 -0.13107200000000000000e6
-1720 1 8 39 0.13107200000000000000e6
-1720 1 9 40 0.13107200000000000000e6
-1720 1 10 41 0.52428800000000000000e6
-1720 1 11 42 -0.26214400000000000000e6
-1720 1 12 27 0.52428800000000000000e6
-1720 1 12 43 -0.10485760000000000000e7
-1720 1 23 38 0.13107200000000000000e6
-1720 1 26 41 -0.13107200000000000000e6
-1720 1 28 43 0.52428800000000000000e6
-1720 1 32 47 0.78643200000000000000e6
-1720 1 33 48 0.26214400000000000000e6
-1720 2 1 7 -0.13107200000000000000e6
-1720 2 1 16 0.65536000000000000000e5
-1720 2 2 8 0.13107200000000000000e6
-1720 2 2 16 -0.65536000000000000000e5
-1720 2 2 32 0.13107200000000000000e6
-1720 2 3 9 -0.13107200000000000000e6
-1720 2 6 20 -0.26214400000000000000e6
-1720 2 7 21 0.52428800000000000000e6
-1720 2 12 26 0.26214400000000000000e6
-1720 2 16 30 0.13107200000000000000e6
-1720 2 20 34 0.26214400000000000000e6
-1720 3 1 2 0.65536000000000000000e5
-1720 3 1 14 -0.52428800000000000000e6
-1720 3 1 30 -0.13107200000000000000e6
-1720 3 1 38 -0.65536000000000000000e5
-1720 3 2 3 -0.65536000000000000000e5
-1720 3 2 7 -0.26214400000000000000e6
-1720 3 2 15 0.26214400000000000000e6
-1720 3 2 23 -0.65536000000000000000e5
-1720 3 3 32 0.78643200000000000000e6
-1720 3 4 9 -0.13107200000000000000e6
-1720 3 7 12 0.52428800000000000000e6
-1720 3 8 37 0.13107200000000000000e6
-1720 3 10 23 -0.26214400000000000000e6
-1720 3 13 42 0.52428800000000000000e6
-1720 3 22 35 0.52428800000000000000e6
-1720 3 28 41 0.78643200000000000000e6
-1720 3 29 42 0.26214400000000000000e6
-1720 4 1 1 0.13107200000000000000e6
-1720 4 2 2 -0.13107200000000000000e6
-1720 4 2 6 -0.13107200000000000000e6
-1720 4 2 30 0.13107200000000000000e6
-1720 4 3 31 -0.26214400000000000000e6
-1720 4 6 6 -0.52428800000000000000e6
-1720 4 6 18 -0.13107200000000000000e6
-1720 4 6 34 0.26214400000000000000e6
-1721 2 1 17 0.65536000000000000000e5
-1721 2 2 16 -0.65536000000000000000e5
-1722 1 1 24 0.65536000000000000000e5
-1722 1 1 48 0.65536000000000000000e5
-1722 1 2 25 0.65536000000000000000e5
-1722 1 8 23 -0.13107200000000000000e6
-1722 2 1 18 0.65536000000000000000e5
-1722 3 1 38 0.65536000000000000000e5
-1722 3 2 23 0.65536000000000000000e5
-1723 2 1 19 0.65536000000000000000e5
-1723 2 3 17 -0.65536000000000000000e5
-1724 1 1 8 -0.65536000000000000000e5
-1724 1 1 48 0.65536000000000000000e5
-1724 1 2 9 -0.65536000000000000000e5
-1724 1 2 33 0.26214400000000000000e6
-1724 1 2 49 0.65536000000000000000e5
-1724 1 3 34 -0.26214400000000000000e6
-1724 1 4 11 -0.65536000000000000000e5
-1724 1 7 22 0.65536000000000000000e5
-1724 1 8 23 0.13107200000000000000e6
-1724 1 8 39 0.65536000000000000000e5
-1724 1 9 40 0.65536000000000000000e5
-1724 1 10 41 0.13107200000000000000e6
-1724 1 11 42 -0.13107200000000000000e6
-1724 1 12 43 -0.52428800000000000000e6
-1724 1 23 38 0.65536000000000000000e5
-1724 1 26 41 -0.65536000000000000000e5
-1724 1 28 43 0.26214400000000000000e6
-1724 1 32 47 0.39321600000000000000e6
-1724 1 33 48 0.13107200000000000000e6
-1724 2 1 7 -0.65536000000000000000e5
-1724 2 1 20 0.65536000000000000000e5
-1724 2 2 8 0.65536000000000000000e5
-1724 2 2 32 0.65536000000000000000e5
-1724 2 3 9 -0.65536000000000000000e5
-1724 2 7 21 0.13107200000000000000e6
-1724 2 12 26 0.13107200000000000000e6
-1724 2 16 30 0.65536000000000000000e5
-1724 2 20 34 0.13107200000000000000e6
-1724 3 1 14 -0.26214400000000000000e6
-1724 3 1 30 -0.65536000000000000000e5
-1724 3 2 7 -0.13107200000000000000e6
-1724 3 2 15 0.13107200000000000000e6
-1724 3 3 32 0.26214400000000000000e6
-1724 3 4 9 -0.65536000000000000000e5
-1724 3 7 12 0.26214400000000000000e6
-1724 3 8 37 0.65536000000000000000e5
-1724 3 10 23 -0.13107200000000000000e6
-1724 3 13 42 0.26214400000000000000e6
-1724 3 22 35 0.26214400000000000000e6
-1724 3 28 41 0.39321600000000000000e6
-1724 3 29 42 0.13107200000000000000e6
-1724 4 2 6 -0.65536000000000000000e5
-1724 4 2 30 0.65536000000000000000e5
-1724 4 3 31 -0.13107200000000000000e6
-1724 4 6 6 -0.26214400000000000000e6
-1724 4 6 18 -0.65536000000000000000e5
-1724 4 6 34 0.13107200000000000000e6
-1725 1 1 8 -0.65536000000000000000e5
-1725 1 1 32 -0.26214400000000000000e6
-1725 1 1 48 0.98304000000000000000e5
-1725 1 2 9 -0.65536000000000000000e5
-1725 1 2 33 0.52428800000000000000e6
-1725 1 2 49 0.98304000000000000000e5
-1725 1 3 34 -0.52428800000000000000e6
-1725 1 4 11 -0.65536000000000000000e5
-1725 1 8 23 0.13107200000000000000e6
-1725 1 8 39 0.65536000000000000000e5
-1725 1 9 40 0.65536000000000000000e5
-1725 1 10 41 0.26214400000000000000e6
-1725 1 11 42 -0.26214400000000000000e6
-1725 1 12 27 0.26214400000000000000e6
-1725 1 12 43 -0.78643200000000000000e6
-1725 1 23 38 0.98304000000000000000e5
-1725 1 26 41 -0.65536000000000000000e5
-1725 1 28 43 0.39321600000000000000e6
-1725 1 32 47 0.52428800000000000000e6
-1725 1 33 48 0.26214400000000000000e6
-1725 2 1 7 -0.65536000000000000000e5
-1725 2 1 21 0.65536000000000000000e5
-1725 2 2 8 0.65536000000000000000e5
-1725 2 2 32 0.98304000000000000000e5
-1725 2 3 9 -0.65536000000000000000e5
-1725 2 6 20 -0.13107200000000000000e6
-1725 2 7 21 0.26214400000000000000e6
-1725 2 12 26 0.26214400000000000000e6
-1725 2 16 30 0.65536000000000000000e5
-1725 2 20 34 0.13107200000000000000e6
-1725 3 1 14 -0.26214400000000000000e6
-1725 3 1 30 -0.13107200000000000000e6
-1725 3 2 7 -0.13107200000000000000e6
-1725 3 2 15 0.13107200000000000000e6
-1725 3 3 32 0.39321600000000000000e6
-1725 3 4 9 -0.65536000000000000000e5
-1725 3 7 12 0.26214400000000000000e6
-1725 3 8 37 0.13107200000000000000e6
-1725 3 10 23 -0.19660800000000000000e6
-1725 3 13 42 0.52428800000000000000e6
-1725 3 22 35 0.26214400000000000000e6
-1725 3 28 41 0.52428800000000000000e6
-1725 3 29 42 0.26214400000000000000e6
-1725 4 2 6 -0.65536000000000000000e5
-1725 4 2 30 0.65536000000000000000e5
-1725 4 3 31 -0.26214400000000000000e6
-1725 4 6 6 -0.26214400000000000000e6
-1725 4 6 18 -0.13107200000000000000e6
-1725 4 6 34 0.13107200000000000000e6
-1726 1 1 48 0.32768000000000000000e5
-1726 1 2 33 0.26214400000000000000e6
-1726 1 2 49 0.32768000000000000000e5
-1726 1 3 34 -0.26214400000000000000e6
-1726 1 8 23 0.65536000000000000000e5
-1726 1 8 39 0.65536000000000000000e5
-1726 1 10 41 0.13107200000000000000e6
-1726 1 11 42 -0.13107200000000000000e6
-1726 1 12 43 -0.26214400000000000000e6
-1726 1 23 38 0.32768000000000000000e5
-1726 1 28 43 0.13107200000000000000e6
-1726 1 32 47 0.13107200000000000000e6
-1726 1 33 48 0.13107200000000000000e6
-1726 2 1 22 0.65536000000000000000e5
-1726 2 2 32 0.32768000000000000000e5
-1726 2 7 21 0.13107200000000000000e6
-1726 2 12 26 0.13107200000000000000e6
-1726 3 3 32 0.13107200000000000000e6
-1726 3 8 37 0.65536000000000000000e5
-1726 3 10 23 -0.65536000000000000000e5
-1726 3 13 42 0.26214400000000000000e6
-1726 3 28 41 0.13107200000000000000e6
-1726 3 29 42 0.13107200000000000000e6
-1726 4 3 31 -0.13107200000000000000e6
-1726 4 6 18 -0.65536000000000000000e5
-1727 2 1 23 0.65536000000000000000e5
-1727 2 6 20 -0.65536000000000000000e5
-1728 1 1 32 0.65536000000000000000e5
-1728 1 3 34 0.13107200000000000000e6
-1728 1 10 41 -0.65536000000000000000e5
-1728 1 16 23 -0.13107200000000000000e6
-1728 2 1 24 0.65536000000000000000e5
-1728 2 7 21 -0.65536000000000000000e5
-1728 3 3 32 -0.65536000000000000000e5
-1729 1 3 34 0.65536000000000000000e5
-1729 1 4 35 -0.65536000000000000000e5
-1729 1 12 27 0.65536000000000000000e5
-1729 1 12 43 -0.65536000000000000000e5
-1729 1 14 45 -0.13107200000000000000e6
-1729 1 16 23 0.65536000000000000000e5
-1729 1 16 31 -0.26214400000000000000e6
-1729 1 17 48 0.65536000000000000000e5
-1729 1 18 49 0.65536000000000000000e5
-1729 1 20 27 0.26214400000000000000e6
-1729 2 1 25 0.65536000000000000000e5
-1729 2 7 13 0.13107200000000000000e6
-1729 2 9 23 -0.65536000000000000000e5
-1729 2 10 24 -0.13107200000000000000e6
-1729 2 14 28 0.65536000000000000000e5
-1729 3 5 34 -0.65536000000000000000e5
-1729 3 13 42 0.65536000000000000000e5
-1729 3 14 27 -0.65536000000000000000e5
-1729 3 14 43 0.65536000000000000000e5
-1729 4 10 10 -0.26214400000000000000e6
-1730 2 1 26 0.65536000000000000000e5
-1730 2 16 16 -0.13107200000000000000e6
-1731 1 1 48 0.65536000000000000000e5
-1731 1 7 38 -0.13107200000000000000e6
-1731 1 22 37 0.65536000000000000000e5
-1731 1 23 38 0.65536000000000000000e5
-1731 2 1 27 0.65536000000000000000e5
-1731 3 22 27 0.13107200000000000000e6
-1731 4 16 16 -0.13107200000000000000e6
-1732 1 1 40 0.65536000000000000000e5
-1732 1 23 38 -0.65536000000000000000e5
-1732 2 1 28 0.65536000000000000000e5
-1732 2 2 32 -0.65536000000000000000e5
-1732 3 1 38 0.65536000000000000000e5
-1732 3 2 39 0.65536000000000000000e5
-1732 3 8 37 -0.13107200000000000000e6
-1733 1 1 8 -0.65536000000000000000e5
-1733 1 1 24 -0.32768000000000000000e5
-1733 1 1 32 -0.13107200000000000000e6
-1733 1 1 40 -0.32768000000000000000e5
-1733 1 1 48 0.98304000000000000000e5
-1733 1 2 9 -0.65536000000000000000e5
-1733 1 2 33 0.26214400000000000000e6
-1733 1 2 49 0.98304000000000000000e5
-1733 1 3 34 -0.26214400000000000000e6
-1733 1 4 11 -0.65536000000000000000e5
-1733 1 7 38 0.65536000000000000000e5
-1733 1 8 23 0.65536000000000000000e5
-1733 1 8 39 0.65536000000000000000e5
-1733 1 9 40 0.65536000000000000000e5
-1733 1 10 41 0.13107200000000000000e6
-1733 1 12 27 0.26214400000000000000e6
-1733 1 12 43 -0.26214400000000000000e6
-1733 1 16 23 -0.26214400000000000000e6
-1733 1 22 37 0.32768000000000000000e5
-1733 1 23 38 0.13107200000000000000e6
-1733 1 26 41 -0.65536000000000000000e5
-1733 1 28 43 0.13107200000000000000e6
-1733 1 32 47 0.26214400000000000000e6
-1733 2 1 7 -0.65536000000000000000e5
-1733 2 1 29 0.65536000000000000000e5
-1733 2 1 31 0.13107200000000000000e6
-1733 2 2 8 0.65536000000000000000e5
-1733 2 2 16 -0.32768000000000000000e5
-1733 2 2 32 0.98304000000000000000e5
-1733 2 3 9 -0.65536000000000000000e5
-1733 2 6 20 -0.13107200000000000000e6
-1733 2 7 21 0.13107200000000000000e6
-1733 2 16 16 0.65536000000000000000e5
-1733 2 16 30 0.65536000000000000000e5
-1733 2 20 34 0.13107200000000000000e6
-1733 3 1 14 -0.26214400000000000000e6
-1733 3 1 22 -0.32768000000000000000e5
-1733 3 1 30 -0.65536000000000000000e5
-1733 3 1 34 0.26214400000000000000e6
-1733 3 1 38 -0.32768000000000000000e5
-1733 3 2 7 -0.13107200000000000000e6
-1733 3 2 15 0.13107200000000000000e6
-1733 3 2 23 -0.32768000000000000000e5
-1733 3 2 31 -0.13107200000000000000e6
-1733 3 3 32 0.26214400000000000000e6
-1733 3 4 9 -0.65536000000000000000e5
-1733 3 7 12 0.26214400000000000000e6
-1733 3 8 37 0.13107200000000000000e6
-1733 3 10 23 -0.13107200000000000000e6
-1733 3 22 27 0.65536000000000000000e5
-1733 3 22 35 0.26214400000000000000e6
-1733 3 28 41 0.26214400000000000000e6
-1733 4 2 6 -0.65536000000000000000e5
-1733 4 2 30 0.65536000000000000000e5
-1733 4 6 6 -0.26214400000000000000e6
-1733 4 6 18 -0.65536000000000000000e5
-1733 4 6 34 0.13107200000000000000e6
-1733 4 16 16 -0.65536000000000000000e5
-1734 1 1 48 0.32768000000000000000e5
-1734 1 2 33 0.13107200000000000000e6
-1734 1 2 49 0.32768000000000000000e5
-1734 1 3 34 -0.26214400000000000000e6
-1734 1 7 38 0.65536000000000000000e5
-1734 1 8 39 0.65536000000000000000e5
-1734 1 10 41 0.13107200000000000000e6
-1734 1 23 38 0.32768000000000000000e5
-1734 2 1 30 0.65536000000000000000e5
-1734 2 2 32 0.32768000000000000000e5
-1734 2 7 21 0.13107200000000000000e6
-1734 3 2 31 0.13107200000000000000e6
-1734 3 3 32 0.13107200000000000000e6
-1734 3 8 37 0.65536000000000000000e5
-1735 1 1 48 0.65536000000000000000e5
-1735 1 7 38 -0.13107200000000000000e6
-1735 1 22 37 0.65536000000000000000e5
-1735 1 23 38 0.65536000000000000000e5
-1735 2 1 32 0.65536000000000000000e5
-1735 3 22 27 0.13107200000000000000e6
-1736 2 1 33 0.65536000000000000000e5
-1736 2 2 32 -0.65536000000000000000e5
-1737 1 1 48 0.32768000000000000000e5
-1737 1 2 33 0.13107200000000000000e6
-1737 1 2 49 0.32768000000000000000e5
-1737 1 3 34 -0.26214400000000000000e6
-1737 1 7 38 0.65536000000000000000e5
-1737 1 8 39 0.65536000000000000000e5
-1737 1 10 41 0.13107200000000000000e6
-1737 1 23 38 0.32768000000000000000e5
-1737 2 1 34 0.65536000000000000000e5
-1737 2 2 32 0.32768000000000000000e5
-1737 2 7 21 0.13107200000000000000e6
-1737 3 2 31 0.13107200000000000000e6
-1737 3 3 32 0.13107200000000000000e6
-1737 3 8 37 0.65536000000000000000e5
-1737 4 1 29 0.65536000000000000000e5
-1738 1 2 5 -0.32768000000000000000e5
-1738 1 2 9 0.65536000000000000000e5
-1738 1 2 25 0.32768000000000000000e5
-1738 1 8 23 -0.65536000000000000000e5
-1738 2 2 2 0.65536000000000000000e5
-1738 2 2 16 -0.32768000000000000000e5
-1738 3 1 2 0.32768000000000000000e5
-1738 3 2 7 -0.65536000000000000000e5
-1738 4 2 2 -0.65536000000000000000e5
-1739 1 1 24 0.65536000000000000000e5
-1739 1 1 48 0.65536000000000000000e5
-1739 1 2 25 0.65536000000000000000e5
-1739 1 8 23 -0.13107200000000000000e6
-1739 2 2 3 0.65536000000000000000e5
-1739 3 1 38 0.65536000000000000000e5
-1739 3 2 23 0.65536000000000000000e5
-1739 4 2 2 -0.13107200000000000000e6
-1740 1 1 48 0.13107200000000000000e6
-1740 1 2 5 0.65536000000000000000e5
-1740 1 2 9 0.13107200000000000000e6
-1740 1 2 25 -0.65536000000000000000e5
-1740 1 2 33 0.52428800000000000000e6
-1740 1 2 49 0.13107200000000000000e6
-1740 1 3 34 -0.52428800000000000000e6
-1740 1 4 11 -0.13107200000000000000e6
-1740 1 8 39 0.13107200000000000000e6
-1740 1 9 40 0.13107200000000000000e6
-1740 1 10 41 0.26214400000000000000e6
-1740 1 11 42 -0.26214400000000000000e6
-1740 1 12 43 -0.10485760000000000000e7
-1740 1 23 38 0.13107200000000000000e6
-1740 1 26 41 -0.13107200000000000000e6
-1740 1 28 43 0.52428800000000000000e6
-1740 1 32 47 0.78643200000000000000e6
-1740 1 33 48 0.26214400000000000000e6
-1740 2 2 4 0.65536000000000000000e5
-1740 2 2 8 0.13107200000000000000e6
-1740 2 2 32 0.13107200000000000000e6
-1740 2 3 9 -0.13107200000000000000e6
-1740 2 3 17 -0.65536000000000000000e5
-1740 2 7 21 0.26214400000000000000e6
-1740 2 12 26 0.26214400000000000000e6
-1740 2 16 30 0.13107200000000000000e6
-1740 2 20 34 0.26214400000000000000e6
-1740 3 1 6 0.65536000000000000000e5
-1740 3 1 14 -0.26214400000000000000e6
-1740 3 1 30 -0.13107200000000000000e6
-1740 3 2 3 0.65536000000000000000e5
-1740 3 2 15 0.26214400000000000000e6
-1740 3 3 32 0.52428800000000000000e6
-1740 3 4 9 -0.13107200000000000000e6
-1740 3 8 37 0.13107200000000000000e6
-1740 3 10 23 -0.26214400000000000000e6
-1740 3 13 42 0.52428800000000000000e6
-1740 3 22 35 0.52428800000000000000e6
-1740 3 28 41 0.78643200000000000000e6
-1740 3 29 42 0.26214400000000000000e6
-1740 4 2 30 0.13107200000000000000e6
-1740 4 3 31 -0.26214400000000000000e6
-1740 4 6 18 -0.13107200000000000000e6
-1740 4 6 34 0.26214400000000000000e6
-1741 1 1 40 0.65536000000000000000e5
-1741 1 2 49 0.65536000000000000000e5
-1741 1 6 37 0.65536000000000000000e5
-1741 1 8 39 -0.13107200000000000000e6
-1741 2 2 5 0.65536000000000000000e5
-1741 3 2 39 0.65536000000000000000e5
-1741 4 1 5 -0.65536000000000000000e5
-1741 4 4 16 -0.65536000000000000000e5
-1742 2 1 7 -0.65536000000000000000e5
-1742 2 2 6 0.65536000000000000000e5
-1743 1 1 8 -0.65536000000000000000e5
-1743 1 1 32 -0.26214400000000000000e6
-1743 1 1 48 0.98304000000000000000e5
-1743 1 2 9 -0.65536000000000000000e5
-1743 1 2 33 0.52428800000000000000e6
-1743 1 2 49 0.98304000000000000000e5
-1743 1 3 34 -0.52428800000000000000e6
-1743 1 4 11 -0.65536000000000000000e5
-1743 1 8 23 0.13107200000000000000e6
-1743 1 8 39 0.65536000000000000000e5
-1743 1 9 40 0.65536000000000000000e5
-1743 1 10 41 0.26214400000000000000e6
-1743 1 11 42 -0.26214400000000000000e6
-1743 1 12 27 0.26214400000000000000e6
-1743 1 12 43 -0.78643200000000000000e6
-1743 1 23 38 0.98304000000000000000e5
-1743 1 26 41 -0.65536000000000000000e5
-1743 1 28 43 0.39321600000000000000e6
-1743 1 32 47 0.52428800000000000000e6
-1743 1 33 48 0.26214400000000000000e6
-1743 2 1 7 -0.65536000000000000000e5
-1743 2 2 7 0.65536000000000000000e5
-1743 2 2 8 0.65536000000000000000e5
-1743 2 2 32 0.98304000000000000000e5
-1743 2 3 9 -0.65536000000000000000e5
-1743 2 6 20 -0.13107200000000000000e6
-1743 2 7 21 0.26214400000000000000e6
-1743 2 12 26 0.26214400000000000000e6
-1743 2 16 30 0.65536000000000000000e5
-1743 2 20 34 0.13107200000000000000e6
-1743 3 1 14 -0.26214400000000000000e6
-1743 3 1 30 -0.13107200000000000000e6
-1743 3 2 7 -0.13107200000000000000e6
-1743 3 2 15 0.13107200000000000000e6
-1743 3 3 32 0.39321600000000000000e6
-1743 3 4 9 -0.65536000000000000000e5
-1743 3 7 12 0.26214400000000000000e6
-1743 3 8 37 0.13107200000000000000e6
-1743 3 10 23 -0.19660800000000000000e6
-1743 3 13 42 0.52428800000000000000e6
-1743 3 22 35 0.26214400000000000000e6
-1743 3 28 41 0.52428800000000000000e6
-1743 3 29 42 0.26214400000000000000e6
-1743 4 2 6 -0.13107200000000000000e6
-1743 4 2 30 0.65536000000000000000e5
-1743 4 3 31 -0.26214400000000000000e6
-1743 4 6 6 -0.26214400000000000000e6
-1743 4 6 18 -0.13107200000000000000e6
-1743 4 6 34 0.13107200000000000000e6
-1744 1 1 48 -0.32768000000000000000e5
-1744 1 2 9 -0.65536000000000000000e5
-1744 1 2 33 -0.26214400000000000000e6
-1744 1 2 49 -0.32768000000000000000e5
-1744 1 3 34 0.26214400000000000000e6
-1744 1 8 39 -0.65536000000000000000e5
-1744 1 9 40 -0.65536000000000000000e5
-1744 1 12 43 0.26214400000000000000e6
-1744 1 23 38 -0.32768000000000000000e5
-1744 1 26 41 0.65536000000000000000e5
-1744 1 28 43 -0.13107200000000000000e6
-1744 1 32 47 -0.26214400000000000000e6
-1744 2 2 8 -0.65536000000000000000e5
-1744 2 2 9 0.65536000000000000000e5
-1744 2 2 32 -0.32768000000000000000e5
-1744 2 4 10 0.13107200000000000000e6
-1744 2 7 21 -0.26214400000000000000e6
-1744 2 16 30 -0.65536000000000000000e5
-1744 2 20 34 -0.13107200000000000000e6
-1744 3 1 14 0.26214400000000000000e6
-1744 3 2 15 0.13107200000000000000e6
-1744 3 3 16 -0.26214400000000000000e6
-1744 3 3 32 -0.13107200000000000000e6
-1744 3 4 9 0.65536000000000000000e5
-1744 3 10 23 0.65536000000000000000e5
-1744 3 22 35 -0.26214400000000000000e6
-1744 3 28 41 -0.26214400000000000000e6
-1744 4 2 30 -0.65536000000000000000e5
-1744 4 6 34 -0.13107200000000000000e6
-1745 2 2 10 0.65536000000000000000e5
-1745 2 6 20 -0.65536000000000000000e5
-1745 4 6 6 -0.13107200000000000000e6
-1746 1 1 32 0.65536000000000000000e5
-1746 1 1 48 -0.32768000000000000000e5
-1746 1 2 17 -0.13107200000000000000e6
-1746 1 2 33 -0.13107200000000000000e6
-1746 1 2 49 -0.32768000000000000000e5
-1746 1 3 34 0.26214400000000000000e6
-1746 1 4 11 0.32768000000000000000e5
-1746 1 8 23 -0.32768000000000000000e5
-1746 1 8 39 -0.32768000000000000000e5
-1746 1 9 40 -0.32768000000000000000e5
-1746 1 10 41 -0.13107200000000000000e6
-1746 1 11 42 0.65536000000000000000e5
-1746 1 12 43 0.26214400000000000000e6
-1746 1 23 38 -0.32768000000000000000e5
-1746 1 26 41 0.32768000000000000000e5
-1746 1 28 43 -0.13107200000000000000e6
-1746 1 32 47 -0.19660800000000000000e6
-1746 1 33 48 -0.65536000000000000000e5
-1746 2 2 8 -0.32768000000000000000e5
-1746 2 2 11 0.65536000000000000000e5
-1746 2 2 32 -0.32768000000000000000e5
-1746 2 3 9 0.32768000000000000000e5
-1746 2 4 10 -0.65536000000000000000e5
-1746 2 7 21 -0.65536000000000000000e5
-1746 2 12 26 -0.65536000000000000000e5
-1746 2 16 30 -0.32768000000000000000e5
-1746 2 20 34 -0.65536000000000000000e5
-1746 3 1 14 0.65536000000000000000e5
-1746 3 1 30 0.32768000000000000000e5
-1746 3 2 7 0.32768000000000000000e5
-1746 3 2 15 -0.13107200000000000000e6
-1746 3 3 16 0.13107200000000000000e6
-1746 3 3 32 -0.19660800000000000000e6
-1746 3 4 9 0.32768000000000000000e5
-1746 3 8 37 -0.32768000000000000000e5
-1746 3 10 23 0.65536000000000000000e5
-1746 3 13 42 -0.13107200000000000000e6
-1746 3 22 35 -0.13107200000000000000e6
-1746 3 28 41 -0.19660800000000000000e6
-1746 3 29 42 -0.65536000000000000000e5
-1746 4 2 6 0.32768000000000000000e5
-1746 4 2 30 -0.32768000000000000000e5
-1746 4 3 31 0.65536000000000000000e5
-1746 4 6 18 0.32768000000000000000e5
-1746 4 6 34 -0.65536000000000000000e5
-1747 2 2 12 0.65536000000000000000e5
-1747 2 4 10 -0.65536000000000000000e5
-1748 1 3 34 0.65536000000000000000e5
-1748 1 4 35 -0.65536000000000000000e5
-1748 1 12 27 0.65536000000000000000e5
-1748 1 12 43 -0.65536000000000000000e5
-1748 1 14 45 -0.13107200000000000000e6
-1748 1 16 23 0.65536000000000000000e5
-1748 1 16 31 -0.26214400000000000000e6
-1748 1 17 48 0.65536000000000000000e5
-1748 1 18 49 0.65536000000000000000e5
-1748 1 20 27 0.26214400000000000000e6
-1748 2 2 13 0.65536000000000000000e5
-1748 2 7 13 0.13107200000000000000e6
-1748 2 9 23 -0.65536000000000000000e5
-1748 2 10 24 -0.13107200000000000000e6
-1748 2 14 28 0.65536000000000000000e5
-1748 3 5 34 -0.65536000000000000000e5
-1748 3 13 42 0.65536000000000000000e5
-1748 3 14 27 -0.65536000000000000000e5
-1748 3 14 43 0.65536000000000000000e5
-1748 4 1 13 -0.65536000000000000000e5
-1748 4 10 10 -0.26214400000000000000e6
-1749 2 2 14 0.65536000000000000000e5
-1749 2 6 12 -0.65536000000000000000e5
-1750 2 2 15 0.65536000000000000000e5
-1750 2 7 13 -0.65536000000000000000e5
-1751 1 1 24 0.65536000000000000000e5
-1751 1 1 48 0.65536000000000000000e5
-1751 1 2 25 0.65536000000000000000e5
-1751 1 8 23 -0.13107200000000000000e6
-1751 2 2 17 0.65536000000000000000e5
-1751 3 1 38 0.65536000000000000000e5
-1751 3 2 23 0.65536000000000000000e5
-1752 2 2 18 0.65536000000000000000e5
-1752 2 3 17 -0.65536000000000000000e5
-1753 1 1 40 0.65536000000000000000e5
-1753 1 2 49 0.65536000000000000000e5
-1753 1 6 37 0.65536000000000000000e5
-1753 1 8 39 -0.13107200000000000000e6
-1753 2 2 19 0.65536000000000000000e5
-1753 3 2 39 0.65536000000000000000e5
-1753 4 4 16 -0.65536000000000000000e5
-1754 1 1 8 -0.65536000000000000000e5
-1754 1 1 32 -0.26214400000000000000e6
-1754 1 1 48 0.98304000000000000000e5
-1754 1 2 9 -0.65536000000000000000e5
-1754 1 2 33 0.52428800000000000000e6
-1754 1 2 49 0.98304000000000000000e5
-1754 1 3 34 -0.52428800000000000000e6
-1754 1 4 11 -0.65536000000000000000e5
-1754 1 8 23 0.13107200000000000000e6
-1754 1 8 39 0.65536000000000000000e5
-1754 1 9 40 0.65536000000000000000e5
-1754 1 10 41 0.26214400000000000000e6
-1754 1 11 42 -0.26214400000000000000e6
-1754 1 12 27 0.26214400000000000000e6
-1754 1 12 43 -0.78643200000000000000e6
-1754 1 23 38 0.98304000000000000000e5
-1754 1 26 41 -0.65536000000000000000e5
-1754 1 28 43 0.39321600000000000000e6
-1754 1 32 47 0.52428800000000000000e6
-1754 1 33 48 0.26214400000000000000e6
-1754 2 1 7 -0.65536000000000000000e5
-1754 2 2 8 0.65536000000000000000e5
-1754 2 2 20 0.65536000000000000000e5
-1754 2 2 32 0.98304000000000000000e5
-1754 2 3 9 -0.65536000000000000000e5
-1754 2 6 20 -0.13107200000000000000e6
-1754 2 7 21 0.26214400000000000000e6
-1754 2 12 26 0.26214400000000000000e6
-1754 2 16 30 0.65536000000000000000e5
-1754 2 20 34 0.13107200000000000000e6
-1754 3 1 14 -0.26214400000000000000e6
-1754 3 1 30 -0.13107200000000000000e6
-1754 3 2 7 -0.13107200000000000000e6
-1754 3 2 15 0.13107200000000000000e6
-1754 3 3 32 0.39321600000000000000e6
-1754 3 4 9 -0.65536000000000000000e5
-1754 3 7 12 0.26214400000000000000e6
-1754 3 8 37 0.13107200000000000000e6
-1754 3 10 23 -0.19660800000000000000e6
-1754 3 13 42 0.52428800000000000000e6
-1754 3 22 35 0.26214400000000000000e6
-1754 3 28 41 0.52428800000000000000e6
-1754 3 29 42 0.26214400000000000000e6
-1754 4 2 6 -0.65536000000000000000e5
-1754 4 2 30 0.65536000000000000000e5
-1754 4 3 31 -0.26214400000000000000e6
-1754 4 6 6 -0.26214400000000000000e6
-1754 4 6 18 -0.13107200000000000000e6
-1754 4 6 34 0.13107200000000000000e6
-1755 1 1 48 0.32768000000000000000e5
-1755 1 2 33 0.26214400000000000000e6
-1755 1 2 49 0.32768000000000000000e5
-1755 1 3 34 -0.26214400000000000000e6
-1755 1 8 23 0.65536000000000000000e5
-1755 1 8 39 0.65536000000000000000e5
-1755 1 10 41 0.13107200000000000000e6
-1755 1 11 42 -0.13107200000000000000e6
-1755 1 12 43 -0.26214400000000000000e6
-1755 1 23 38 0.32768000000000000000e5
-1755 1 28 43 0.13107200000000000000e6
-1755 1 32 47 0.13107200000000000000e6
-1755 1 33 48 0.13107200000000000000e6
-1755 2 2 21 0.65536000000000000000e5
-1755 2 2 32 0.32768000000000000000e5
-1755 2 7 21 0.13107200000000000000e6
-1755 2 12 26 0.13107200000000000000e6
-1755 3 3 32 0.13107200000000000000e6
-1755 3 8 37 0.65536000000000000000e5
-1755 3 10 23 -0.65536000000000000000e5
-1755 3 13 42 0.26214400000000000000e6
-1755 3 28 41 0.13107200000000000000e6
-1755 3 29 42 0.13107200000000000000e6
-1755 4 3 31 -0.13107200000000000000e6
-1755 4 6 18 -0.65536000000000000000e5
-1756 1 9 40 -0.65536000000000000000e5
-1756 1 10 41 0.13107200000000000000e6
-1756 1 11 42 -0.13107200000000000000e6
-1756 1 26 41 0.65536000000000000000e5
-1756 1 32 47 -0.13107200000000000000e6
-1756 1 33 48 0.13107200000000000000e6
-1756 2 2 22 0.65536000000000000000e5
-1756 2 12 26 0.13107200000000000000e6
-1756 2 16 30 -0.65536000000000000000e5
-1756 2 20 34 -0.13107200000000000000e6
-1756 3 8 37 0.65536000000000000000e5
-1756 3 13 42 0.26214400000000000000e6
-1756 3 22 35 -0.26214400000000000000e6
-1756 3 28 41 -0.13107200000000000000e6
-1756 3 29 42 0.13107200000000000000e6
-1756 4 2 30 -0.65536000000000000000e5
-1756 4 3 31 -0.13107200000000000000e6
-1756 4 6 18 -0.65536000000000000000e5
-1756 4 6 34 -0.13107200000000000000e6
-1757 1 1 32 0.65536000000000000000e5
-1757 1 3 34 0.13107200000000000000e6
-1757 1 10 41 -0.65536000000000000000e5
-1757 1 16 23 -0.13107200000000000000e6
-1757 2 2 23 0.65536000000000000000e5
-1757 2 7 21 -0.65536000000000000000e5
-1757 3 3 32 -0.65536000000000000000e5
-1758 2 2 24 0.65536000000000000000e5
-1758 2 7 21 -0.65536000000000000000e5
-1759 1 3 18 -0.65536000000000000000e5
-1759 1 3 34 0.65536000000000000000e5
-1759 1 4 19 0.13107200000000000000e6
-1759 1 4 35 0.65536000000000000000e5
-1759 1 12 43 0.19660800000000000000e6
-1759 1 14 45 0.13107200000000000000e6
-1759 1 16 23 0.65536000000000000000e5
-1759 1 17 48 -0.65536000000000000000e5
-1759 1 18 49 -0.65536000000000000000e5
-1759 1 20 27 -0.26214400000000000000e6
-1759 2 2 25 0.65536000000000000000e5
-1759 2 9 23 0.65536000000000000000e5
-1759 2 10 24 0.13107200000000000000e6
-1759 2 14 28 -0.65536000000000000000e5
-1759 3 3 16 -0.65536000000000000000e5
-1759 3 4 17 -0.65536000000000000000e5
-1759 3 5 34 0.65536000000000000000e5
-1759 3 13 42 -0.65536000000000000000e5
-1759 3 14 27 0.19660800000000000000e6
-1759 3 14 43 -0.65536000000000000000e5
-1759 4 2 14 -0.65536000000000000000e5
-1760 1 1 48 0.65536000000000000000e5
-1760 1 7 38 -0.13107200000000000000e6
-1760 1 22 37 0.65536000000000000000e5
-1760 1 23 38 0.65536000000000000000e5
-1760 2 2 26 0.65536000000000000000e5
-1760 3 22 27 0.13107200000000000000e6
-1760 4 16 16 -0.13107200000000000000e6
-1761 1 1 40 0.65536000000000000000e5
-1761 1 23 38 -0.65536000000000000000e5
-1761 2 2 27 0.65536000000000000000e5
-1761 2 2 32 -0.65536000000000000000e5
-1761 3 1 38 0.65536000000000000000e5
-1761 3 2 39 0.65536000000000000000e5
-1761 3 8 37 -0.13107200000000000000e6
-1762 1 1 40 0.65536000000000000000e5
-1762 1 2 49 0.65536000000000000000e5
-1762 1 6 37 0.65536000000000000000e5
-1762 1 8 39 -0.13107200000000000000e6
-1762 2 2 28 0.65536000000000000000e5
-1762 3 2 39 0.65536000000000000000e5
-1763 1 1 48 0.32768000000000000000e5
-1763 1 2 33 0.13107200000000000000e6
-1763 1 2 49 0.32768000000000000000e5
-1763 1 3 34 -0.26214400000000000000e6
-1763 1 7 38 0.65536000000000000000e5
-1763 1 8 39 0.65536000000000000000e5
-1763 1 10 41 0.13107200000000000000e6
-1763 1 23 38 0.32768000000000000000e5
-1763 2 2 29 0.65536000000000000000e5
-1763 2 2 32 0.32768000000000000000e5
-1763 2 7 21 0.13107200000000000000e6
-1763 3 2 31 0.13107200000000000000e6
-1763 3 3 32 0.13107200000000000000e6
-1763 3 8 37 0.65536000000000000000e5
-1764 1 9 40 -0.65536000000000000000e5
-1764 1 10 41 0.13107200000000000000e6
-1764 1 11 42 -0.13107200000000000000e6
-1764 1 26 41 0.65536000000000000000e5
-1764 1 32 47 -0.13107200000000000000e6
-1764 1 33 48 0.13107200000000000000e6
-1764 2 2 30 0.65536000000000000000e5
-1764 2 12 26 0.13107200000000000000e6
-1764 2 16 30 -0.65536000000000000000e5
-1764 2 20 34 -0.13107200000000000000e6
-1764 3 8 37 0.65536000000000000000e5
-1764 3 13 42 0.26214400000000000000e6
-1764 3 22 35 -0.26214400000000000000e6
-1764 3 28 41 -0.13107200000000000000e6
-1764 3 29 42 0.13107200000000000000e6
-1764 4 2 30 -0.65536000000000000000e5
-1764 4 3 31 -0.13107200000000000000e6
-1764 4 6 34 -0.13107200000000000000e6
-1765 1 2 33 -0.65536000000000000000e5
-1765 1 3 34 0.13107200000000000000e6
-1765 1 11 42 0.65536000000000000000e5
-1765 1 12 43 0.13107200000000000000e6
-1765 1 16 47 -0.13107200000000000000e6
-1765 1 28 43 -0.65536000000000000000e5
-1765 1 32 47 -0.65536000000000000000e5
-1765 1 33 48 -0.65536000000000000000e5
-1765 2 2 31 0.65536000000000000000e5
-1765 2 7 21 -0.65536000000000000000e5
-1765 2 12 26 -0.65536000000000000000e5
-1765 3 2 31 -0.65536000000000000000e5
-1765 3 3 32 -0.65536000000000000000e5
-1765 3 12 41 -0.13107200000000000000e6
-1765 3 13 42 -0.13107200000000000000e6
-1765 3 28 41 -0.65536000000000000000e5
-1765 3 29 42 -0.65536000000000000000e5
-1765 4 3 31 0.65536000000000000000e5
-1766 1 2 49 0.65536000000000000000e5
-1766 1 8 39 -0.13107200000000000000e6
-1766 1 9 40 -0.13107200000000000000e6
-1766 1 10 41 0.26214400000000000000e6
-1766 1 23 38 0.65536000000000000000e5
-1766 1 24 39 0.65536000000000000000e5
-1766 1 26 41 0.13107200000000000000e6
-1766 1 32 47 -0.26214400000000000000e6
-1766 2 2 33 0.65536000000000000000e5
-1766 3 9 38 -0.13107200000000000000e6
-1766 3 28 41 -0.26214400000000000000e6
-1766 4 2 30 -0.13107200000000000000e6
-1767 2 2 34 0.65536000000000000000e5
-1767 2 16 30 -0.65536000000000000000e5
-1768 1 2 49 0.65536000000000000000e5
-1768 1 6 53 -0.13107200000000000000e6
-1768 1 8 39 -0.13107200000000000000e6
-1768 1 9 40 -0.13107200000000000000e6
-1768 1 10 41 0.26214400000000000000e6
-1768 1 23 38 0.65536000000000000000e5
-1768 1 24 39 0.65536000000000000000e5
-1768 1 25 40 0.13107200000000000000e6
-1768 1 26 41 0.13107200000000000000e6
-1768 1 32 47 -0.26214400000000000000e6
-1768 2 2 35 0.65536000000000000000e5
-1768 3 2 47 -0.65536000000000000000e5
-1768 3 9 38 -0.13107200000000000000e6
-1768 3 24 37 -0.13107200000000000000e6
-1768 3 25 38 0.65536000000000000000e5
-1768 3 27 40 -0.39321600000000000000e6
-1768 4 2 30 -0.13107200000000000000e6
-1768 4 4 32 0.13107200000000000000e6
-1768 4 16 28 -0.65536000000000000000e5
-1768 4 17 29 -0.13107200000000000000e6
-1769 1 1 48 0.65536000000000000000e5
-1769 1 2 5 0.32768000000000000000e5
-1769 1 2 9 0.65536000000000000000e5
-1769 1 2 25 -0.32768000000000000000e5
-1769 1 2 33 0.26214400000000000000e6
-1769 1 2 49 0.65536000000000000000e5
-1769 1 3 34 -0.26214400000000000000e6
-1769 1 4 11 -0.65536000000000000000e5
-1769 1 8 39 0.65536000000000000000e5
-1769 1 9 40 0.65536000000000000000e5
-1769 1 10 41 0.13107200000000000000e6
-1769 1 11 42 -0.13107200000000000000e6
-1769 1 12 43 -0.52428800000000000000e6
-1769 1 23 38 0.65536000000000000000e5
-1769 1 26 41 -0.65536000000000000000e5
-1769 1 28 43 0.26214400000000000000e6
-1769 1 32 47 0.39321600000000000000e6
-1769 1 33 48 0.13107200000000000000e6
-1769 2 2 8 0.65536000000000000000e5
-1769 2 2 32 0.65536000000000000000e5
-1769 2 3 3 0.65536000000000000000e5
-1769 2 3 9 -0.65536000000000000000e5
-1769 2 3 17 -0.32768000000000000000e5
-1769 2 7 21 0.13107200000000000000e6
-1769 2 12 26 0.13107200000000000000e6
-1769 2 16 30 0.65536000000000000000e5
-1769 2 20 34 0.13107200000000000000e6
-1769 3 1 6 0.32768000000000000000e5
-1769 3 1 14 -0.13107200000000000000e6
-1769 3 1 30 -0.65536000000000000000e5
-1769 3 2 3 0.32768000000000000000e5
-1769 3 2 15 0.13107200000000000000e6
-1769 3 3 32 0.26214400000000000000e6
-1769 3 4 9 -0.65536000000000000000e5
-1769 3 8 37 0.65536000000000000000e5
-1769 3 10 23 -0.13107200000000000000e6
-1769 3 13 42 0.26214400000000000000e6
-1769 3 22 35 0.26214400000000000000e6
-1769 3 28 41 0.39321600000000000000e6
-1769 3 29 42 0.13107200000000000000e6
-1769 4 2 30 0.65536000000000000000e5
-1769 4 3 31 -0.13107200000000000000e6
-1769 4 6 18 -0.65536000000000000000e5
-1769 4 6 34 0.13107200000000000000e6
-1770 1 1 40 0.65536000000000000000e5
-1770 1 2 49 0.65536000000000000000e5
-1770 1 6 37 0.65536000000000000000e5
-1770 1 8 39 -0.13107200000000000000e6
-1770 2 3 4 0.65536000000000000000e5
-1770 3 2 39 0.65536000000000000000e5
-1770 4 1 5 -0.65536000000000000000e5
-1770 4 4 16 -0.65536000000000000000e5
-1771 1 1 48 0.65536000000000000000e5
-1771 1 2 5 -0.65536000000000000000e5
-1771 1 2 25 0.65536000000000000000e5
-1771 1 2 49 0.65536000000000000000e5
-1771 1 4 11 -0.13107200000000000000e6
-1771 1 9 40 0.13107200000000000000e6
-1771 1 12 43 -0.52428800000000000000e6
-1771 1 23 38 0.65536000000000000000e5
-1771 1 26 41 -0.13107200000000000000e6
-1771 1 28 43 0.26214400000000000000e6
-1771 1 32 47 0.52428800000000000000e6
-1771 2 2 32 0.65536000000000000000e5
-1771 2 3 5 0.65536000000000000000e5
-1771 2 3 9 -0.13107200000000000000e6
-1771 2 4 18 -0.65536000000000000000e5
-1771 2 16 30 0.13107200000000000000e6
-1771 2 20 34 0.26214400000000000000e6
-1771 3 1 30 -0.13107200000000000000e6
-1771 3 2 15 0.26214400000000000000e6
-1771 3 3 32 0.26214400000000000000e6
-1771 3 4 5 0.65536000000000000000e5
-1771 3 4 9 -0.26214400000000000000e6
-1771 3 10 23 -0.13107200000000000000e6
-1771 3 22 35 0.52428800000000000000e6
-1771 3 28 41 0.52428800000000000000e6
-1771 4 1 5 -0.65536000000000000000e5
-1771 4 2 30 0.13107200000000000000e6
-1771 4 6 34 0.26214400000000000000e6
-1772 1 1 8 -0.65536000000000000000e5
-1772 1 1 32 -0.26214400000000000000e6
-1772 1 1 48 0.98304000000000000000e5
-1772 1 2 9 -0.65536000000000000000e5
-1772 1 2 33 0.52428800000000000000e6
-1772 1 2 49 0.98304000000000000000e5
-1772 1 3 34 -0.52428800000000000000e6
-1772 1 4 11 -0.65536000000000000000e5
-1772 1 8 23 0.13107200000000000000e6
-1772 1 8 39 0.65536000000000000000e5
-1772 1 9 40 0.65536000000000000000e5
-1772 1 10 41 0.26214400000000000000e6
-1772 1 11 42 -0.26214400000000000000e6
-1772 1 12 27 0.26214400000000000000e6
-1772 1 12 43 -0.78643200000000000000e6
-1772 1 23 38 0.98304000000000000000e5
-1772 1 26 41 -0.65536000000000000000e5
-1772 1 28 43 0.39321600000000000000e6
-1772 1 32 47 0.52428800000000000000e6
-1772 1 33 48 0.26214400000000000000e6
-1772 2 1 7 -0.65536000000000000000e5
-1772 2 2 8 0.65536000000000000000e5
-1772 2 2 32 0.98304000000000000000e5
-1772 2 3 6 0.65536000000000000000e5
-1772 2 3 9 -0.65536000000000000000e5
-1772 2 6 20 -0.13107200000000000000e6
-1772 2 7 21 0.26214400000000000000e6
-1772 2 12 26 0.26214400000000000000e6
-1772 2 16 30 0.65536000000000000000e5
-1772 2 20 34 0.13107200000000000000e6
-1772 3 1 14 -0.26214400000000000000e6
-1772 3 1 30 -0.13107200000000000000e6
-1772 3 2 7 -0.13107200000000000000e6
-1772 3 2 15 0.13107200000000000000e6
-1772 3 3 32 0.39321600000000000000e6
-1772 3 4 9 -0.65536000000000000000e5
-1772 3 7 12 0.26214400000000000000e6
-1772 3 8 37 0.13107200000000000000e6
-1772 3 10 23 -0.19660800000000000000e6
-1772 3 13 42 0.52428800000000000000e6
-1772 3 22 35 0.26214400000000000000e6
-1772 3 28 41 0.52428800000000000000e6
-1772 3 29 42 0.26214400000000000000e6
-1772 4 2 6 -0.13107200000000000000e6
-1772 4 2 30 0.65536000000000000000e5
-1772 4 3 31 -0.26214400000000000000e6
-1772 4 6 6 -0.26214400000000000000e6
-1772 4 6 18 -0.13107200000000000000e6
-1772 4 6 34 0.13107200000000000000e6
-1773 2 2 8 -0.65536000000000000000e5
-1773 2 3 7 0.65536000000000000000e5
-1774 1 1 48 -0.32768000000000000000e5
-1774 1 2 9 -0.65536000000000000000e5
-1774 1 2 33 -0.26214400000000000000e6
-1774 1 2 49 -0.32768000000000000000e5
-1774 1 3 34 0.26214400000000000000e6
-1774 1 8 39 -0.65536000000000000000e5
-1774 1 9 40 -0.65536000000000000000e5
-1774 1 12 43 0.26214400000000000000e6
-1774 1 23 38 -0.32768000000000000000e5
-1774 1 26 41 0.65536000000000000000e5
-1774 1 28 43 -0.13107200000000000000e6
-1774 1 32 47 -0.26214400000000000000e6
-1774 2 2 8 -0.65536000000000000000e5
-1774 2 2 32 -0.32768000000000000000e5
-1774 2 3 8 0.65536000000000000000e5
-1774 2 4 10 0.13107200000000000000e6
-1774 2 7 21 -0.26214400000000000000e6
-1774 2 16 30 -0.65536000000000000000e5
-1774 2 20 34 -0.13107200000000000000e6
-1774 3 1 14 0.26214400000000000000e6
-1774 3 2 15 0.13107200000000000000e6
-1774 3 3 16 -0.26214400000000000000e6
-1774 3 3 32 -0.13107200000000000000e6
-1774 3 4 9 0.65536000000000000000e5
-1774 3 10 23 0.65536000000000000000e5
-1774 3 22 35 -0.26214400000000000000e6
-1774 3 28 41 -0.26214400000000000000e6
-1774 4 2 30 -0.65536000000000000000e5
-1774 4 6 34 -0.13107200000000000000e6
-1775 1 1 32 0.65536000000000000000e5
-1775 1 1 48 -0.32768000000000000000e5
-1775 1 2 17 -0.13107200000000000000e6
-1775 1 2 33 -0.13107200000000000000e6
-1775 1 2 49 -0.32768000000000000000e5
-1775 1 3 34 0.26214400000000000000e6
-1775 1 4 11 0.32768000000000000000e5
-1775 1 8 23 -0.32768000000000000000e5
-1775 1 8 39 -0.32768000000000000000e5
-1775 1 9 40 -0.32768000000000000000e5
-1775 1 10 41 -0.13107200000000000000e6
-1775 1 11 42 0.65536000000000000000e5
-1775 1 12 43 0.26214400000000000000e6
-1775 1 23 38 -0.32768000000000000000e5
-1775 1 26 41 0.32768000000000000000e5
-1775 1 28 43 -0.13107200000000000000e6
-1775 1 32 47 -0.19660800000000000000e6
-1775 1 33 48 -0.65536000000000000000e5
-1775 2 2 8 -0.32768000000000000000e5
-1775 2 2 32 -0.32768000000000000000e5
-1775 2 3 9 0.32768000000000000000e5
-1775 2 3 10 0.65536000000000000000e5
-1775 2 4 10 -0.65536000000000000000e5
-1775 2 7 21 -0.65536000000000000000e5
-1775 2 12 26 -0.65536000000000000000e5
-1775 2 16 30 -0.32768000000000000000e5
-1775 2 20 34 -0.65536000000000000000e5
-1775 3 1 14 0.65536000000000000000e5
-1775 3 1 30 0.32768000000000000000e5
-1775 3 2 7 0.32768000000000000000e5
-1775 3 2 15 -0.13107200000000000000e6
-1775 3 3 16 0.13107200000000000000e6
-1775 3 3 32 -0.19660800000000000000e6
-1775 3 4 9 0.32768000000000000000e5
-1775 3 8 37 -0.32768000000000000000e5
-1775 3 10 23 0.65536000000000000000e5
-1775 3 13 42 -0.13107200000000000000e6
-1775 3 22 35 -0.13107200000000000000e6
-1775 3 28 41 -0.19660800000000000000e6
-1775 3 29 42 -0.65536000000000000000e5
-1775 4 2 6 0.32768000000000000000e5
-1775 4 2 30 -0.32768000000000000000e5
-1775 4 3 31 0.65536000000000000000e5
-1775 4 6 18 0.32768000000000000000e5
-1775 4 6 34 -0.65536000000000000000e5
-1776 2 3 11 0.65536000000000000000e5
-1776 2 4 10 -0.65536000000000000000e5
-1777 1 2 33 0.65536000000000000000e5
-1777 1 3 18 -0.13107200000000000000e6
-1777 1 6 13 0.65536000000000000000e5
-1777 1 10 41 0.65536000000000000000e5
-1777 2 3 12 0.65536000000000000000e5
-1777 2 4 10 -0.65536000000000000000e5
-1777 2 7 21 0.65536000000000000000e5
-1777 3 1 14 -0.65536000000000000000e5
-1777 3 3 16 0.13107200000000000000e6
-1777 3 3 32 0.65536000000000000000e5
-1778 2 3 13 0.65536000000000000000e5
-1778 2 6 12 -0.65536000000000000000e5
-1779 1 3 18 0.65536000000000000000e5
-1779 1 3 34 0.65536000000000000000e5
-1779 1 4 19 -0.13107200000000000000e6
-1779 1 4 35 0.65536000000000000000e5
-1779 2 3 14 0.65536000000000000000e5
-1779 3 3 16 0.65536000000000000000e5
-1779 3 4 17 0.65536000000000000000e5
-1780 1 2 17 0.32768000000000000000e5
-1780 1 3 18 0.32768000000000000000e5
-1780 1 3 34 0.32768000000000000000e5
-1780 1 4 19 0.65536000000000000000e5
-1780 1 10 17 0.65536000000000000000e5
-1780 1 20 27 -0.13107200000000000000e6
-1780 2 3 15 0.65536000000000000000e5
-1780 2 6 12 0.32768000000000000000e5
-1780 3 3 16 0.32768000000000000000e5
-1780 3 7 20 -0.13107200000000000000e6
-1781 1 1 24 0.65536000000000000000e5
-1781 1 1 48 0.65536000000000000000e5
-1781 1 2 25 0.65536000000000000000e5
-1781 1 8 23 -0.13107200000000000000e6
-1781 2 3 16 0.65536000000000000000e5
-1781 3 1 38 0.65536000000000000000e5
-1781 3 2 23 0.65536000000000000000e5
-1782 1 1 40 0.65536000000000000000e5
-1782 1 2 49 0.65536000000000000000e5
-1782 1 6 37 0.65536000000000000000e5
-1782 1 8 39 -0.13107200000000000000e6
-1782 2 3 18 0.65536000000000000000e5
-1782 3 2 39 0.65536000000000000000e5
-1782 4 4 16 -0.65536000000000000000e5
-1783 2 3 19 0.65536000000000000000e5
-1783 2 4 18 -0.65536000000000000000e5
-1784 1 1 48 0.32768000000000000000e5
-1784 1 2 33 0.26214400000000000000e6
-1784 1 2 49 0.32768000000000000000e5
-1784 1 3 34 -0.26214400000000000000e6
-1784 1 8 23 0.65536000000000000000e5
-1784 1 8 39 0.65536000000000000000e5
-1784 1 10 41 0.13107200000000000000e6
-1784 1 11 42 -0.13107200000000000000e6
-1784 1 12 43 -0.26214400000000000000e6
-1784 1 23 38 0.32768000000000000000e5
-1784 1 28 43 0.13107200000000000000e6
-1784 1 32 47 0.13107200000000000000e6
-1784 1 33 48 0.13107200000000000000e6
-1784 2 2 32 0.32768000000000000000e5
-1784 2 3 20 0.65536000000000000000e5
-1784 2 7 21 0.13107200000000000000e6
-1784 2 12 26 0.13107200000000000000e6
-1784 3 3 32 0.13107200000000000000e6
-1784 3 8 37 0.65536000000000000000e5
-1784 3 10 23 -0.65536000000000000000e5
-1784 3 13 42 0.26214400000000000000e6
-1784 3 28 41 0.13107200000000000000e6
-1784 3 29 42 0.13107200000000000000e6
-1784 4 3 31 -0.13107200000000000000e6
-1784 4 6 18 -0.65536000000000000000e5
-1785 1 9 40 -0.65536000000000000000e5
-1785 1 10 41 0.13107200000000000000e6
-1785 1 11 42 -0.13107200000000000000e6
-1785 1 26 41 0.65536000000000000000e5
-1785 1 32 47 -0.13107200000000000000e6
-1785 1 33 48 0.13107200000000000000e6
-1785 2 3 21 0.65536000000000000000e5
-1785 2 12 26 0.13107200000000000000e6
-1785 2 16 30 -0.65536000000000000000e5
-1785 2 20 34 -0.13107200000000000000e6
-1785 3 8 37 0.65536000000000000000e5
-1785 3 13 42 0.26214400000000000000e6
-1785 3 22 35 -0.26214400000000000000e6
-1785 3 28 41 -0.13107200000000000000e6
-1785 3 29 42 0.13107200000000000000e6
-1785 4 2 30 -0.65536000000000000000e5
-1785 4 3 31 -0.13107200000000000000e6
-1785 4 6 18 -0.65536000000000000000e5
-1785 4 6 34 -0.13107200000000000000e6
-1786 1 1 48 -0.32768000000000000000e5
-1786 1 2 49 -0.32768000000000000000e5
-1786 1 9 40 -0.65536000000000000000e5
-1786 1 10 25 0.65536000000000000000e5
-1786 1 12 43 0.26214400000000000000e6
-1786 1 23 38 -0.32768000000000000000e5
-1786 1 26 41 0.65536000000000000000e5
-1786 1 28 43 -0.13107200000000000000e6
-1786 1 32 47 -0.26214400000000000000e6
-1786 2 2 32 -0.32768000000000000000e5
-1786 2 3 22 0.65536000000000000000e5
-1786 2 16 30 -0.65536000000000000000e5
-1786 2 20 34 -0.13107200000000000000e6
-1786 3 1 30 0.65536000000000000000e5
-1786 3 3 32 -0.13107200000000000000e6
-1786 3 10 23 0.65536000000000000000e5
-1786 3 22 35 -0.26214400000000000000e6
-1786 3 28 41 -0.26214400000000000000e6
-1786 4 2 30 -0.65536000000000000000e5
-1786 4 6 34 -0.13107200000000000000e6
-1787 2 3 23 0.65536000000000000000e5
-1787 2 7 21 -0.65536000000000000000e5
-1788 2 3 24 0.65536000000000000000e5
-1788 2 12 26 -0.65536000000000000000e5
-1788 4 8 20 -0.65536000000000000000e5
-1789 1 3 18 0.65536000000000000000e5
-1789 1 3 34 0.65536000000000000000e5
-1789 1 4 19 -0.13107200000000000000e6
-1789 1 4 35 0.65536000000000000000e5
-1789 2 3 25 0.65536000000000000000e5
-1789 3 3 16 0.65536000000000000000e5
-1789 3 4 17 0.65536000000000000000e5
-1789 4 2 14 0.65536000000000000000e5
-1790 1 1 40 0.65536000000000000000e5
-1790 1 23 38 -0.65536000000000000000e5
-1790 2 2 32 -0.65536000000000000000e5
-1790 2 3 26 0.65536000000000000000e5
-1790 3 1 38 0.65536000000000000000e5
-1790 3 2 39 0.65536000000000000000e5
-1790 3 8 37 -0.13107200000000000000e6
-1791 1 1 40 0.65536000000000000000e5
-1791 1 2 49 0.65536000000000000000e5
-1791 1 6 37 0.65536000000000000000e5
-1791 1 8 39 -0.13107200000000000000e6
-1791 2 3 27 0.65536000000000000000e5
-1791 3 2 39 0.65536000000000000000e5
-1792 1 6 37 0.65536000000000000000e5
-1792 1 24 39 -0.65536000000000000000e5
-1792 2 3 28 0.65536000000000000000e5
-1792 2 3 33 -0.65536000000000000000e5
-1792 3 2 39 0.65536000000000000000e5
-1792 3 3 40 0.65536000000000000000e5
-1792 3 9 38 -0.13107200000000000000e6
-1793 1 9 40 -0.65536000000000000000e5
-1793 1 10 41 0.13107200000000000000e6
-1793 1 11 42 -0.13107200000000000000e6
-1793 1 26 41 0.65536000000000000000e5
-1793 1 32 47 -0.13107200000000000000e6
-1793 1 33 48 0.13107200000000000000e6
-1793 2 3 29 0.65536000000000000000e5
-1793 2 12 26 0.13107200000000000000e6
-1793 2 16 30 -0.65536000000000000000e5
-1793 2 20 34 -0.13107200000000000000e6
-1793 3 8 37 0.65536000000000000000e5
-1793 3 13 42 0.26214400000000000000e6
-1793 3 22 35 -0.26214400000000000000e6
-1793 3 28 41 -0.13107200000000000000e6
-1793 3 29 42 0.13107200000000000000e6
-1793 4 2 30 -0.65536000000000000000e5
-1793 4 3 31 -0.13107200000000000000e6
-1793 4 6 34 -0.13107200000000000000e6
-1794 1 1 48 -0.32768000000000000000e5
-1794 1 2 49 -0.32768000000000000000e5
-1794 1 12 43 0.26214400000000000000e6
-1794 1 23 38 -0.32768000000000000000e5
-1794 1 26 41 0.65536000000000000000e5
-1794 1 28 43 -0.13107200000000000000e6
-1794 1 32 47 -0.26214400000000000000e6
-1794 2 2 32 -0.32768000000000000000e5
-1794 2 3 30 0.65536000000000000000e5
-1794 2 16 30 -0.65536000000000000000e5
-1794 2 20 34 -0.13107200000000000000e6
-1794 3 22 35 -0.26214400000000000000e6
-1794 3 28 41 -0.26214400000000000000e6
-1794 4 2 30 -0.65536000000000000000e5
-1794 4 6 34 -0.13107200000000000000e6
-1795 2 3 31 0.65536000000000000000e5
-1795 2 12 26 -0.65536000000000000000e5
-1796 1 2 49 0.65536000000000000000e5
-1796 1 8 39 -0.13107200000000000000e6
-1796 1 9 40 -0.13107200000000000000e6
-1796 1 10 41 0.26214400000000000000e6
-1796 1 23 38 0.65536000000000000000e5
-1796 1 24 39 0.65536000000000000000e5
-1796 1 26 41 0.13107200000000000000e6
-1796 1 32 47 -0.26214400000000000000e6
-1796 2 3 32 0.65536000000000000000e5
-1796 3 9 38 -0.13107200000000000000e6
-1796 3 28 41 -0.26214400000000000000e6
-1796 4 2 30 -0.13107200000000000000e6
-1797 1 1 48 -0.32768000000000000000e5
-1797 1 2 49 -0.32768000000000000000e5
-1797 1 12 43 0.26214400000000000000e6
-1797 1 23 38 -0.32768000000000000000e5
-1797 1 26 41 0.65536000000000000000e5
-1797 1 28 43 -0.13107200000000000000e6
-1797 1 32 47 -0.26214400000000000000e6
-1797 2 2 32 -0.32768000000000000000e5
-1797 2 3 34 0.65536000000000000000e5
-1797 2 16 30 -0.65536000000000000000e5
-1797 2 20 34 -0.13107200000000000000e6
-1797 3 22 35 -0.26214400000000000000e6
-1797 3 28 41 -0.26214400000000000000e6
-1797 4 6 34 -0.13107200000000000000e6
-1798 2 3 33 -0.65536000000000000000e5
-1798 2 3 35 0.65536000000000000000e5
-1798 4 16 28 0.65536000000000000000e5
-1799 1 1 48 0.32768000000000000000e5
-1799 1 2 5 -0.32768000000000000000e5
-1799 1 2 25 0.32768000000000000000e5
-1799 1 2 49 0.32768000000000000000e5
-1799 1 4 11 -0.65536000000000000000e5
-1799 1 9 40 0.65536000000000000000e5
-1799 1 12 43 -0.26214400000000000000e6
-1799 1 23 38 0.32768000000000000000e5
-1799 1 26 41 -0.65536000000000000000e5
-1799 1 28 43 0.13107200000000000000e6
-1799 1 32 47 0.26214400000000000000e6
-1799 2 2 32 0.32768000000000000000e5
-1799 2 3 9 -0.65536000000000000000e5
-1799 2 4 4 0.65536000000000000000e5
-1799 2 4 18 -0.32768000000000000000e5
-1799 2 16 30 0.65536000000000000000e5
-1799 2 20 34 0.13107200000000000000e6
-1799 3 1 30 -0.65536000000000000000e5
-1799 3 2 15 0.13107200000000000000e6
-1799 3 3 32 0.13107200000000000000e6
-1799 3 4 5 0.32768000000000000000e5
-1799 3 4 9 -0.13107200000000000000e6
-1799 3 10 23 -0.65536000000000000000e5
-1799 3 22 35 0.26214400000000000000e6
-1799 3 28 41 0.26214400000000000000e6
-1799 4 1 5 -0.32768000000000000000e5
-1799 4 2 30 0.65536000000000000000e5
-1799 4 6 34 0.13107200000000000000e6
-1800 2 4 5 0.65536000000000000000e5
-1800 2 5 27 -0.65536000000000000000e5
-1800 4 4 4 -0.13107200000000000000e6
-1800 4 5 17 -0.65536000000000000000e5
-1801 2 2 8 -0.65536000000000000000e5
-1801 2 4 6 0.65536000000000000000e5
-1802 1 1 48 -0.32768000000000000000e5
-1802 1 2 9 -0.65536000000000000000e5
-1802 1 2 33 -0.26214400000000000000e6
-1802 1 2 49 -0.32768000000000000000e5
-1802 1 3 34 0.26214400000000000000e6
-1802 1 8 39 -0.65536000000000000000e5
-1802 1 9 40 -0.65536000000000000000e5
-1802 1 12 43 0.26214400000000000000e6
-1802 1 23 38 -0.32768000000000000000e5
-1802 1 26 41 0.65536000000000000000e5
-1802 1 28 43 -0.13107200000000000000e6
-1802 1 32 47 -0.26214400000000000000e6
-1802 2 2 8 -0.65536000000000000000e5
-1802 2 2 32 -0.32768000000000000000e5
-1802 2 4 7 0.65536000000000000000e5
-1802 2 4 10 0.13107200000000000000e6
-1802 2 7 21 -0.26214400000000000000e6
-1802 2 16 30 -0.65536000000000000000e5
-1802 2 20 34 -0.13107200000000000000e6
-1802 3 1 14 0.26214400000000000000e6
-1802 3 2 15 0.13107200000000000000e6
-1802 3 3 16 -0.26214400000000000000e6
-1802 3 3 32 -0.13107200000000000000e6
-1802 3 4 9 0.65536000000000000000e5
-1802 3 10 23 0.65536000000000000000e5
-1802 3 22 35 -0.26214400000000000000e6
-1802 3 28 41 -0.26214400000000000000e6
-1802 4 2 30 -0.65536000000000000000e5
-1802 4 6 34 -0.13107200000000000000e6
-1803 2 3 9 -0.65536000000000000000e5
-1803 2 4 8 0.65536000000000000000e5
-1804 1 9 40 0.65536000000000000000e5
-1804 1 10 41 0.13107200000000000000e6
-1804 1 11 42 0.13107200000000000000e6
-1804 1 26 41 -0.65536000000000000000e5
-1804 1 32 47 -0.13107200000000000000e6
-1804 1 33 48 -0.13107200000000000000e6
-1804 2 4 9 0.65536000000000000000e5
-1804 2 4 34 -0.65536000000000000000e5
-1804 3 9 38 0.65536000000000000000e5
-1804 3 10 39 0.65536000000000000000e5
-1804 3 13 42 -0.26214400000000000000e6
-1804 3 28 41 -0.13107200000000000000e6
-1804 3 29 42 -0.13107200000000000000e6
-1804 4 3 31 0.13107200000000000000e6
-1804 4 4 8 -0.65536000000000000000e5
-1804 4 7 19 -0.65536000000000000000e5
-1805 1 2 33 0.65536000000000000000e5
-1805 1 3 18 -0.13107200000000000000e6
-1805 1 6 13 0.65536000000000000000e5
-1805 1 10 41 0.65536000000000000000e5
-1805 2 4 10 -0.65536000000000000000e5
-1805 2 4 11 0.65536000000000000000e5
-1805 2 7 21 0.65536000000000000000e5
-1805 3 1 14 -0.65536000000000000000e5
-1805 3 3 16 0.13107200000000000000e6
-1805 3 3 32 0.65536000000000000000e5
-1806 2 4 12 0.65536000000000000000e5
-1806 2 5 11 -0.65536000000000000000e5
-1807 1 3 18 0.65536000000000000000e5
-1807 1 3 34 0.65536000000000000000e5
-1807 1 4 19 -0.13107200000000000000e6
-1807 1 4 35 0.65536000000000000000e5
-1807 2 4 13 0.65536000000000000000e5
-1807 3 3 16 0.65536000000000000000e5
-1807 3 4 17 0.65536000000000000000e5
-1808 1 3 18 0.65536000000000000000e5
-1808 1 4 35 0.65536000000000000000e5
-1808 1 5 20 0.13107200000000000000e6
-1808 1 5 36 -0.13107200000000000000e6
-1808 1 10 17 -0.13107200000000000000e6
-1808 1 14 45 0.13107200000000000000e6
-1808 1 17 48 -0.65536000000000000000e5
-1808 1 18 49 -0.65536000000000000000e5
-1808 2 4 14 0.65536000000000000000e5
-1808 2 14 28 -0.65536000000000000000e5
-1808 3 5 18 -0.65536000000000000000e5
-1808 3 5 34 0.65536000000000000000e5
-1808 3 13 42 -0.65536000000000000000e5
-1808 3 14 43 -0.65536000000000000000e5
-1808 4 8 12 -0.65536000000000000000e5
-1809 1 3 18 -0.32768000000000000000e5
-1809 1 4 19 0.65536000000000000000e5
-1809 1 4 35 0.32768000000000000000e5
-1809 1 5 36 0.65536000000000000000e5
-1809 1 12 43 0.65536000000000000000e5
-1809 1 14 45 0.65536000000000000000e5
-1809 1 17 32 -0.13107200000000000000e6
-1809 1 17 48 -0.32768000000000000000e5
-1809 1 18 49 -0.32768000000000000000e5
-1809 2 4 15 0.65536000000000000000e5
-1809 2 9 23 0.32768000000000000000e5
-1809 2 14 28 -0.32768000000000000000e5
-1809 3 3 16 -0.32768000000000000000e5
-1809 3 4 17 -0.32768000000000000000e5
-1809 3 5 34 0.32768000000000000000e5
-1809 3 13 42 -0.32768000000000000000e5
-1809 3 14 27 0.65536000000000000000e5
-1809 3 14 43 -0.32768000000000000000e5
-1809 4 2 14 -0.32768000000000000000e5
-1809 4 3 15 -0.65536000000000000000e5
-1810 2 3 17 -0.65536000000000000000e5
-1810 2 4 16 0.65536000000000000000e5
-1811 1 1 40 0.65536000000000000000e5
-1811 1 2 49 0.65536000000000000000e5
-1811 1 6 37 0.65536000000000000000e5
-1811 1 8 39 -0.13107200000000000000e6
-1811 2 4 17 0.65536000000000000000e5
-1811 3 2 39 0.65536000000000000000e5
-1811 4 4 16 -0.65536000000000000000e5
-1812 2 4 19 0.65536000000000000000e5
-1812 2 5 27 -0.65536000000000000000e5
-1812 4 5 17 -0.65536000000000000000e5
-1813 1 9 40 -0.65536000000000000000e5
-1813 1 10 41 0.13107200000000000000e6
-1813 1 11 42 -0.13107200000000000000e6
-1813 1 26 41 0.65536000000000000000e5
-1813 1 32 47 -0.13107200000000000000e6
-1813 1 33 48 0.13107200000000000000e6
-1813 2 4 20 0.65536000000000000000e5
-1813 2 12 26 0.13107200000000000000e6
-1813 2 16 30 -0.65536000000000000000e5
-1813 2 20 34 -0.13107200000000000000e6
-1813 3 8 37 0.65536000000000000000e5
-1813 3 13 42 0.26214400000000000000e6
-1813 3 22 35 -0.26214400000000000000e6
-1813 3 28 41 -0.13107200000000000000e6
-1813 3 29 42 0.13107200000000000000e6
-1813 4 2 30 -0.65536000000000000000e5
-1813 4 3 31 -0.13107200000000000000e6
-1813 4 6 18 -0.65536000000000000000e5
-1813 4 6 34 -0.13107200000000000000e6
-1814 1 1 48 -0.32768000000000000000e5
-1814 1 2 49 -0.32768000000000000000e5
-1814 1 9 40 -0.65536000000000000000e5
-1814 1 10 25 0.65536000000000000000e5
-1814 1 12 43 0.26214400000000000000e6
-1814 1 23 38 -0.32768000000000000000e5
-1814 1 26 41 0.65536000000000000000e5
-1814 1 28 43 -0.13107200000000000000e6
-1814 1 32 47 -0.26214400000000000000e6
-1814 2 2 32 -0.32768000000000000000e5
-1814 2 4 21 0.65536000000000000000e5
-1814 2 16 30 -0.65536000000000000000e5
-1814 2 20 34 -0.13107200000000000000e6
-1814 3 1 30 0.65536000000000000000e5
-1814 3 3 32 -0.13107200000000000000e6
-1814 3 10 23 0.65536000000000000000e5
-1814 3 22 35 -0.26214400000000000000e6
-1814 3 28 41 -0.26214400000000000000e6
-1814 4 2 30 -0.65536000000000000000e5
-1814 4 6 34 -0.13107200000000000000e6
-1815 1 9 40 0.65536000000000000000e5
-1815 1 10 41 0.13107200000000000000e6
-1815 1 11 42 0.13107200000000000000e6
-1815 1 26 41 -0.65536000000000000000e5
-1815 1 32 47 -0.13107200000000000000e6
-1815 1 33 48 -0.13107200000000000000e6
-1815 2 4 22 0.65536000000000000000e5
-1815 2 4 34 -0.65536000000000000000e5
-1815 3 9 38 0.65536000000000000000e5
-1815 3 10 39 0.65536000000000000000e5
-1815 3 13 42 -0.26214400000000000000e6
-1815 3 28 41 -0.13107200000000000000e6
-1815 3 29 42 -0.13107200000000000000e6
-1815 4 3 31 0.13107200000000000000e6
-1815 4 7 19 -0.65536000000000000000e5
-1816 2 4 23 0.65536000000000000000e5
-1816 2 12 26 -0.65536000000000000000e5
-1816 4 8 20 -0.65536000000000000000e5
-1817 1 2 33 -0.65536000000000000000e5
-1817 1 4 35 -0.13107200000000000000e6
-1817 1 11 42 0.65536000000000000000e5
-1817 1 12 43 0.13107200000000000000e6
-1817 2 4 24 0.65536000000000000000e5
-1817 2 12 26 -0.65536000000000000000e5
-1817 3 4 33 0.65536000000000000000e5
-1817 3 14 27 0.13107200000000000000e6
-1817 4 8 20 -0.65536000000000000000e5
-1818 2 4 25 0.65536000000000000000e5
-1818 2 9 23 -0.65536000000000000000e5
-1819 1 1 40 0.65536000000000000000e5
-1819 1 2 49 0.65536000000000000000e5
-1819 1 6 37 0.65536000000000000000e5
-1819 1 8 39 -0.13107200000000000000e6
-1819 2 4 26 0.65536000000000000000e5
-1819 3 2 39 0.65536000000000000000e5
-1820 1 6 37 0.65536000000000000000e5
-1820 1 24 39 -0.65536000000000000000e5
-1820 2 3 33 -0.65536000000000000000e5
-1820 2 4 27 0.65536000000000000000e5
-1820 3 2 39 0.65536000000000000000e5
-1820 3 3 40 0.65536000000000000000e5
-1820 3 9 38 -0.13107200000000000000e6
-1821 2 4 28 0.65536000000000000000e5
-1821 2 5 27 -0.65536000000000000000e5
-1822 1 1 48 -0.32768000000000000000e5
-1822 1 2 49 -0.32768000000000000000e5
-1822 1 12 43 0.26214400000000000000e6
-1822 1 23 38 -0.32768000000000000000e5
-1822 1 26 41 0.65536000000000000000e5
-1822 1 28 43 -0.13107200000000000000e6
-1822 1 32 47 -0.26214400000000000000e6
-1822 2 2 32 -0.32768000000000000000e5
-1822 2 4 29 0.65536000000000000000e5
-1822 2 16 30 -0.65536000000000000000e5
-1822 2 20 34 -0.13107200000000000000e6
-1822 3 22 35 -0.26214400000000000000e6
-1822 3 28 41 -0.26214400000000000000e6
-1822 4 2 30 -0.65536000000000000000e5
-1822 4 6 34 -0.13107200000000000000e6
-1823 1 9 40 0.65536000000000000000e5
-1823 1 10 41 0.13107200000000000000e6
-1823 1 11 42 0.13107200000000000000e6
-1823 1 26 41 -0.65536000000000000000e5
-1823 1 32 47 -0.13107200000000000000e6
-1823 1 33 48 -0.13107200000000000000e6
-1823 2 4 30 0.65536000000000000000e5
-1823 2 4 34 -0.65536000000000000000e5
-1823 3 9 38 0.65536000000000000000e5
-1823 3 10 39 0.65536000000000000000e5
-1823 3 13 42 -0.26214400000000000000e6
-1823 3 28 41 -0.13107200000000000000e6
-1823 3 29 42 -0.13107200000000000000e6
-1823 4 3 31 0.13107200000000000000e6
-1824 1 17 48 -0.13107200000000000000e6
-1824 1 28 43 0.65536000000000000000e5
-1824 1 32 47 0.65536000000000000000e5
-1824 1 33 48 0.65536000000000000000e5
-1824 2 4 31 0.65536000000000000000e5
-1824 3 28 41 0.65536000000000000000e5
-1824 3 29 42 0.65536000000000000000e5
-1824 4 3 31 -0.65536000000000000000e5
-1825 2 3 33 -0.65536000000000000000e5
-1825 2 4 32 0.65536000000000000000e5
-1826 1 1 48 -0.65536000000000000000e5
-1826 1 2 49 -0.13107200000000000000e6
-1826 1 8 39 -0.13107200000000000000e6
-1826 1 9 40 -0.13107200000000000000e6
-1826 1 10 41 0.26214400000000000000e6
-1826 1 12 43 0.52428800000000000000e6
-1826 1 23 38 -0.65536000000000000000e5
-1826 1 25 40 0.65536000000000000000e5
-1826 1 28 43 -0.26214400000000000000e6
-1826 1 32 47 -0.52428800000000000000e6
-1826 2 2 32 -0.65536000000000000000e5
-1826 2 3 33 -0.65536000000000000000e5
-1826 2 4 33 0.65536000000000000000e5
-1826 2 16 30 -0.13107200000000000000e6
-1826 2 20 34 -0.26214400000000000000e6
-1826 3 9 38 -0.13107200000000000000e6
-1826 3 22 35 -0.52428800000000000000e6
-1826 3 28 41 -0.52428800000000000000e6
-1826 4 2 30 -0.13107200000000000000e6
-1826 4 6 34 -0.26214400000000000000e6
-1827 1 1 48 -0.65536000000000000000e5
-1827 1 2 49 -0.13107200000000000000e6
-1827 1 8 39 -0.13107200000000000000e6
-1827 1 9 40 -0.13107200000000000000e6
-1827 1 10 41 0.26214400000000000000e6
-1827 1 12 43 0.52428800000000000000e6
-1827 1 23 38 -0.65536000000000000000e5
-1827 1 25 40 0.65536000000000000000e5
-1827 1 28 43 -0.26214400000000000000e6
-1827 1 32 47 -0.52428800000000000000e6
-1827 2 2 32 -0.65536000000000000000e5
-1827 2 3 33 -0.65536000000000000000e5
-1827 2 4 35 0.65536000000000000000e5
-1827 2 16 30 -0.13107200000000000000e6
-1827 2 20 34 -0.26214400000000000000e6
-1827 3 9 38 -0.13107200000000000000e6
-1827 3 22 35 -0.52428800000000000000e6
-1827 3 28 41 -0.52428800000000000000e6
-1827 4 2 30 -0.13107200000000000000e6
-1827 4 4 32 0.65536000000000000000e5
-1827 4 6 34 -0.26214400000000000000e6
-1828 1 1 48 -0.32768000000000000000e5
-1828 1 2 5 0.32768000000000000000e5
-1828 1 2 25 -0.32768000000000000000e5
-1828 1 2 33 -0.13107200000000000000e6
-1828 1 2 49 -0.32768000000000000000e5
-1828 1 4 11 0.19660800000000000000e6
-1828 1 6 13 -0.13107200000000000000e6
-1828 1 9 40 -0.65536000000000000000e5
-1828 1 10 25 -0.13107200000000000000e6
-1828 1 10 41 -0.13107200000000000000e6
-1828 1 12 43 0.52428800000000000000e6
-1828 1 23 38 -0.32768000000000000000e5
-1828 1 26 41 0.65536000000000000000e5
-1828 1 28 43 -0.13107200000000000000e6
-1828 1 32 47 -0.26214400000000000000e6
-1828 2 2 32 -0.32768000000000000000e5
-1828 2 3 9 0.65536000000000000000e5
-1828 2 5 5 0.65536000000000000000e5
-1828 2 5 19 -0.32768000000000000000e5
-1828 2 12 26 -0.13107200000000000000e6
-1828 2 16 30 -0.65536000000000000000e5
-1828 2 20 34 -0.13107200000000000000e6
-1828 3 1 6 0.32768000000000000000e5
-1828 3 1 30 0.65536000000000000000e5
-1828 3 2 15 -0.13107200000000000000e6
-1828 3 3 32 -0.26214400000000000000e6
-1828 3 4 9 0.13107200000000000000e6
-1828 3 5 6 0.32768000000000000000e5
-1828 3 10 23 0.65536000000000000000e5
-1828 3 14 27 0.26214400000000000000e6
-1828 3 22 35 -0.26214400000000000000e6
-1828 3 28 41 -0.26214400000000000000e6
-1828 4 1 5 0.32768000000000000000e5
-1828 4 2 30 -0.65536000000000000000e5
-1828 4 4 4 -0.65536000000000000000e5
-1828 4 4 8 0.65536000000000000000e5
-1828 4 6 34 -0.13107200000000000000e6
-1828 4 8 20 -0.13107200000000000000e6
-1829 1 1 48 -0.32768000000000000000e5
-1829 1 2 9 -0.65536000000000000000e5
-1829 1 2 33 -0.26214400000000000000e6
-1829 1 2 49 -0.32768000000000000000e5
-1829 1 3 34 0.26214400000000000000e6
-1829 1 8 39 -0.65536000000000000000e5
-1829 1 9 40 -0.65536000000000000000e5
-1829 1 12 43 0.26214400000000000000e6
-1829 1 23 38 -0.32768000000000000000e5
-1829 1 26 41 0.65536000000000000000e5
-1829 1 28 43 -0.13107200000000000000e6
-1829 1 32 47 -0.26214400000000000000e6
-1829 2 2 8 -0.65536000000000000000e5
-1829 2 2 32 -0.32768000000000000000e5
-1829 2 4 10 0.13107200000000000000e6
-1829 2 5 6 0.65536000000000000000e5
-1829 2 7 21 -0.26214400000000000000e6
-1829 2 16 30 -0.65536000000000000000e5
-1829 2 20 34 -0.13107200000000000000e6
-1829 3 1 14 0.26214400000000000000e6
-1829 3 2 15 0.13107200000000000000e6
-1829 3 3 16 -0.26214400000000000000e6
-1829 3 3 32 -0.13107200000000000000e6
-1829 3 4 9 0.65536000000000000000e5
-1829 3 10 23 0.65536000000000000000e5
-1829 3 22 35 -0.26214400000000000000e6
-1829 3 28 41 -0.26214400000000000000e6
-1829 4 2 30 -0.65536000000000000000e5
-1829 4 6 34 -0.13107200000000000000e6
-1830 2 3 9 -0.65536000000000000000e5
-1830 2 5 7 0.65536000000000000000e5
-1831 1 9 40 0.65536000000000000000e5
-1831 1 10 41 0.13107200000000000000e6
-1831 1 11 42 0.13107200000000000000e6
-1831 1 26 41 -0.65536000000000000000e5
-1831 1 32 47 -0.13107200000000000000e6
-1831 1 33 48 -0.13107200000000000000e6
-1831 2 4 34 -0.65536000000000000000e5
-1831 2 5 8 0.65536000000000000000e5
-1831 3 9 38 0.65536000000000000000e5
-1831 3 10 39 0.65536000000000000000e5
-1831 3 13 42 -0.26214400000000000000e6
-1831 3 28 41 -0.13107200000000000000e6
-1831 3 29 42 -0.13107200000000000000e6
-1831 4 3 31 0.13107200000000000000e6
-1831 4 4 8 -0.65536000000000000000e5
-1831 4 7 19 -0.65536000000000000000e5
-1832 1 1 48 0.32768000000000000000e5
-1832 1 2 33 -0.13107200000000000000e6
-1832 1 2 49 0.32768000000000000000e5
-1832 1 4 11 0.65536000000000000000e5
-1832 1 4 35 -0.26214400000000000000e6
-1832 1 6 13 0.13107200000000000000e6
-1832 1 8 39 0.65536000000000000000e5
-1832 1 9 40 0.13107200000000000000e6
-1832 1 10 25 -0.65536000000000000000e5
-1832 1 11 26 0.65536000000000000000e5
-1832 1 11 42 0.13107200000000000000e6
-1832 1 23 38 0.32768000000000000000e5
-1832 1 26 41 -0.13107200000000000000e6
-1832 1 28 43 0.13107200000000000000e6
-1832 1 32 47 0.13107200000000000000e6
-1832 1 33 48 -0.13107200000000000000e6
-1832 2 2 32 0.32768000000000000000e5
-1832 2 4 34 -0.65536000000000000000e5
-1832 2 5 9 0.65536000000000000000e5
-1832 2 5 11 0.13107200000000000000e6
-1832 2 12 26 -0.13107200000000000000e6
-1832 2 16 30 0.65536000000000000000e5
-1832 2 20 34 0.13107200000000000000e6
-1832 3 2 15 0.13107200000000000000e6
-1832 3 4 17 -0.26214400000000000000e6
-1832 3 6 11 -0.65536000000000000000e5
-1832 3 9 38 0.65536000000000000000e5
-1832 3 10 11 0.13107200000000000000e6
-1832 3 10 23 -0.65536000000000000000e5
-1832 3 10 39 0.65536000000000000000e5
-1832 3 13 42 -0.26214400000000000000e6
-1832 3 14 27 0.26214400000000000000e6
-1832 3 22 35 0.26214400000000000000e6
-1832 3 28 41 0.13107200000000000000e6
-1832 3 29 42 -0.13107200000000000000e6
-1832 4 2 30 0.65536000000000000000e5
-1832 4 3 31 0.13107200000000000000e6
-1832 4 5 9 -0.65536000000000000000e5
-1832 4 6 34 0.13107200000000000000e6
-1832 4 7 19 -0.65536000000000000000e5
-1832 4 8 20 -0.13107200000000000000e6
-1833 1 2 33 0.65536000000000000000e5
-1833 1 3 18 -0.13107200000000000000e6
-1833 1 6 13 0.65536000000000000000e5
-1833 1 10 41 0.65536000000000000000e5
-1833 2 4 10 -0.65536000000000000000e5
-1833 2 5 10 0.65536000000000000000e5
-1833 2 7 21 0.65536000000000000000e5
-1833 3 1 14 -0.65536000000000000000e5
-1833 3 3 16 0.13107200000000000000e6
-1833 3 3 32 0.65536000000000000000e5
-1834 1 2 33 0.65536000000000000000e5
-1834 1 4 35 0.13107200000000000000e6
-1834 1 5 20 -0.26214400000000000000e6
-1834 1 5 36 0.26214400000000000000e6
-1834 1 10 41 -0.65536000000000000000e5
-1834 1 11 42 -0.65536000000000000000e5
-1834 1 12 43 -0.13107200000000000000e6
-1834 1 14 45 -0.26214400000000000000e6
-1834 1 17 48 0.13107200000000000000e6
-1834 1 18 49 0.13107200000000000000e6
-1834 1 26 33 0.65536000000000000000e5
-1834 1 28 43 0.65536000000000000000e5
-1834 1 32 47 0.65536000000000000000e5
-1834 1 33 48 0.65536000000000000000e5
-1834 2 5 11 -0.65536000000000000000e5
-1834 2 5 12 0.65536000000000000000e5
-1834 2 12 26 0.65536000000000000000e5
-1834 2 14 28 0.13107200000000000000e6
-1834 3 2 15 -0.65536000000000000000e5
-1834 3 4 17 0.26214400000000000000e6
-1834 3 4 33 -0.65536000000000000000e5
-1834 3 5 18 0.13107200000000000000e6
-1834 3 10 11 0.65536000000000000000e5
-1834 3 13 42 0.26214400000000000000e6
-1834 3 14 27 -0.13107200000000000000e6
-1834 3 14 43 0.13107200000000000000e6
-1834 3 28 41 0.65536000000000000000e5
-1834 3 29 42 0.65536000000000000000e5
-1834 4 3 31 -0.65536000000000000000e5
-1834 4 8 12 0.13107200000000000000e6
-1834 4 8 20 0.65536000000000000000e5
-1834 4 9 21 -0.65536000000000000000e5
-1835 1 3 18 0.65536000000000000000e5
-1835 1 4 35 0.65536000000000000000e5
-1835 1 5 20 0.13107200000000000000e6
-1835 1 5 36 -0.13107200000000000000e6
-1835 1 10 17 -0.13107200000000000000e6
-1835 1 14 45 0.13107200000000000000e6
-1835 1 17 48 -0.65536000000000000000e5
-1835 1 18 49 -0.65536000000000000000e5
-1835 2 5 13 0.65536000000000000000e5
-1835 2 14 28 -0.65536000000000000000e5
-1835 3 5 18 -0.65536000000000000000e5
-1835 3 5 34 0.65536000000000000000e5
-1835 3 13 42 -0.65536000000000000000e5
-1835 3 14 43 -0.65536000000000000000e5
-1835 4 8 12 -0.65536000000000000000e5
-1836 1 4 35 0.65536000000000000000e5
-1836 1 5 36 -0.13107200000000000000e6
-1836 1 14 45 0.13107200000000000000e6
-1836 1 15 30 0.65536000000000000000e5
-1836 1 17 48 -0.65536000000000000000e5
-1836 1 18 49 -0.65536000000000000000e5
-1836 2 5 14 0.65536000000000000000e5
-1836 2 14 28 -0.65536000000000000000e5
-1836 3 5 34 0.65536000000000000000e5
-1836 3 13 42 -0.65536000000000000000e5
-1836 3 14 43 -0.65536000000000000000e5
-1836 4 8 12 -0.65536000000000000000e5
-1837 1 3 18 0.32768000000000000000e5
-1837 1 4 35 -0.32768000000000000000e5
-1837 1 5 20 0.13107200000000000000e6
-1837 1 5 36 -0.65536000000000000000e5
-1837 1 10 17 0.13107200000000000000e6
-1837 1 11 18 0.65536000000000000000e5
-1837 1 12 43 -0.65536000000000000000e5
-1837 1 13 20 -0.26214400000000000000e6
-1837 1 14 45 -0.65536000000000000000e5
-1837 1 17 32 0.13107200000000000000e6
-1837 1 17 48 0.32768000000000000000e5
-1837 1 18 49 0.32768000000000000000e5
-1837 1 20 27 0.13107200000000000000e6
-1837 2 5 15 0.65536000000000000000e5
-1837 2 9 23 -0.32768000000000000000e5
-1837 2 11 25 0.13107200000000000000e6
-1837 2 14 28 0.32768000000000000000e5
-1837 3 3 16 0.32768000000000000000e5
-1837 3 4 17 0.32768000000000000000e5
-1837 3 5 34 -0.32768000000000000000e5
-1837 3 7 20 0.13107200000000000000e6
-1837 3 13 42 0.32768000000000000000e5
-1837 3 14 27 -0.65536000000000000000e5
-1837 3 14 43 0.32768000000000000000e5
-1837 4 2 14 0.32768000000000000000e5
-1837 4 3 15 0.65536000000000000000e5
-1837 4 10 14 0.13107200000000000000e6
-1838 1 1 40 0.65536000000000000000e5
-1838 1 2 49 0.65536000000000000000e5
-1838 1 6 37 0.65536000000000000000e5
-1838 1 8 39 -0.13107200000000000000e6
-1838 2 5 16 0.65536000000000000000e5
-1838 3 2 39 0.65536000000000000000e5
-1838 4 4 16 -0.65536000000000000000e5
-1839 2 4 18 -0.65536000000000000000e5
-1839 2 5 17 0.65536000000000000000e5
-1840 2 5 18 0.65536000000000000000e5
-1840 2 5 27 -0.65536000000000000000e5
-1840 4 5 17 -0.65536000000000000000e5
-1841 1 1 48 -0.32768000000000000000e5
-1841 1 2 49 -0.32768000000000000000e5
-1841 1 9 40 -0.65536000000000000000e5
-1841 1 10 25 0.65536000000000000000e5
-1841 1 12 43 0.26214400000000000000e6
-1841 1 23 38 -0.32768000000000000000e5
-1841 1 26 41 0.65536000000000000000e5
-1841 1 28 43 -0.13107200000000000000e6
-1841 1 32 47 -0.26214400000000000000e6
-1841 2 2 32 -0.32768000000000000000e5
-1841 2 5 20 0.65536000000000000000e5
-1841 2 16 30 -0.65536000000000000000e5
-1841 2 20 34 -0.13107200000000000000e6
-1841 3 1 30 0.65536000000000000000e5
-1841 3 3 32 -0.13107200000000000000e6
-1841 3 10 23 0.65536000000000000000e5
-1841 3 22 35 -0.26214400000000000000e6
-1841 3 28 41 -0.26214400000000000000e6
-1841 4 2 30 -0.65536000000000000000e5
-1841 4 6 34 -0.13107200000000000000e6
-1842 1 9 40 0.65536000000000000000e5
-1842 1 10 41 0.13107200000000000000e6
-1842 1 11 42 0.13107200000000000000e6
-1842 1 26 41 -0.65536000000000000000e5
-1842 1 32 47 -0.13107200000000000000e6
-1842 1 33 48 -0.13107200000000000000e6
-1842 2 4 34 -0.65536000000000000000e5
-1842 2 5 21 0.65536000000000000000e5
-1842 3 9 38 0.65536000000000000000e5
-1842 3 10 39 0.65536000000000000000e5
-1842 3 13 42 -0.26214400000000000000e6
-1842 3 28 41 -0.13107200000000000000e6
-1842 3 29 42 -0.13107200000000000000e6
-1842 4 3 31 0.13107200000000000000e6
-1842 4 7 19 -0.65536000000000000000e5
-1843 1 1 48 0.32768000000000000000e5
-1843 1 2 33 -0.13107200000000000000e6
-1843 1 2 49 0.32768000000000000000e5
-1843 1 8 39 0.65536000000000000000e5
-1843 1 9 40 0.13107200000000000000e6
-1843 1 10 41 -0.13107200000000000000e6
-1843 1 11 26 0.65536000000000000000e5
-1843 1 23 38 0.32768000000000000000e5
-1843 1 26 41 -0.13107200000000000000e6
-1843 1 28 43 0.13107200000000000000e6
-1843 1 32 47 0.13107200000000000000e6
-1843 1 33 48 -0.13107200000000000000e6
-1843 2 2 32 0.32768000000000000000e5
-1843 2 4 34 -0.65536000000000000000e5
-1843 2 5 22 0.65536000000000000000e5
-1843 2 12 26 -0.13107200000000000000e6
-1843 2 16 30 0.65536000000000000000e5
-1843 2 20 34 0.13107200000000000000e6
-1843 3 3 32 -0.13107200000000000000e6
-1843 3 4 33 -0.13107200000000000000e6
-1843 3 9 38 0.65536000000000000000e5
-1843 3 10 23 -0.65536000000000000000e5
-1843 3 10 39 0.65536000000000000000e5
-1843 3 13 42 -0.26214400000000000000e6
-1843 3 14 27 0.26214400000000000000e6
-1843 3 22 35 0.26214400000000000000e6
-1843 3 28 41 0.13107200000000000000e6
-1843 3 29 42 -0.13107200000000000000e6
-1843 4 2 30 0.65536000000000000000e5
-1843 4 3 31 0.13107200000000000000e6
-1843 4 6 34 0.13107200000000000000e6
-1843 4 7 19 -0.65536000000000000000e5
-1843 4 8 20 -0.13107200000000000000e6
-1844 1 2 33 -0.65536000000000000000e5
-1844 1 4 35 -0.13107200000000000000e6
-1844 1 11 42 0.65536000000000000000e5
-1844 1 12 43 0.13107200000000000000e6
-1844 2 5 23 0.65536000000000000000e5
-1844 2 12 26 -0.65536000000000000000e5
-1844 3 4 33 0.65536000000000000000e5
-1844 3 14 27 0.13107200000000000000e6
-1844 4 8 20 -0.65536000000000000000e5
-1845 1 10 41 -0.65536000000000000000e5
-1845 1 14 45 -0.26214400000000000000e6
-1845 1 17 48 0.13107200000000000000e6
-1845 1 18 49 0.13107200000000000000e6
-1845 1 26 33 0.65536000000000000000e5
-1845 1 28 43 0.65536000000000000000e5
-1845 1 32 47 0.65536000000000000000e5
-1845 1 33 48 0.65536000000000000000e5
-1845 2 5 24 0.65536000000000000000e5
-1845 2 14 28 0.13107200000000000000e6
-1845 3 13 42 0.26214400000000000000e6
-1845 3 14 43 0.13107200000000000000e6
-1845 3 28 41 0.65536000000000000000e5
-1845 3 29 42 0.65536000000000000000e5
-1845 4 3 31 -0.65536000000000000000e5
-1845 4 9 21 -0.65536000000000000000e5
-1846 1 4 35 0.65536000000000000000e5
-1846 1 5 36 -0.13107200000000000000e6
-1846 1 14 45 0.13107200000000000000e6
-1846 1 15 30 0.65536000000000000000e5
-1846 1 17 48 -0.65536000000000000000e5
-1846 1 18 49 -0.65536000000000000000e5
-1846 2 5 25 0.65536000000000000000e5
-1846 2 14 28 -0.65536000000000000000e5
-1846 3 5 34 0.65536000000000000000e5
-1846 3 13 42 -0.65536000000000000000e5
-1846 3 14 43 -0.65536000000000000000e5
-1847 1 6 37 0.65536000000000000000e5
-1847 1 24 39 -0.65536000000000000000e5
-1847 2 3 33 -0.65536000000000000000e5
-1847 2 5 26 0.65536000000000000000e5
-1847 3 2 39 0.65536000000000000000e5
-1847 3 3 40 0.65536000000000000000e5
-1847 3 9 38 -0.13107200000000000000e6
-1848 1 1 40 0.65536000000000000000e5
-1848 1 2 33 -0.52428800000000000000e6
-1848 1 9 40 0.26214400000000000000e6
-1848 1 10 25 -0.26214400000000000000e6
-1848 1 11 42 0.52428800000000000000e6
-1848 1 12 43 0.10485760000000000000e7
-1848 1 23 38 -0.65536000000000000000e5
-1848 1 28 43 -0.52428800000000000000e6
-1848 1 32 47 -0.52428800000000000000e6
-1848 1 33 48 -0.52428800000000000000e6
-1848 2 2 32 -0.65536000000000000000e5
-1848 2 3 17 0.65536000000000000000e5
-1848 2 5 19 -0.65536000000000000000e5
-1848 2 5 28 0.65536000000000000000e5
-1848 2 12 26 -0.52428800000000000000e6
-1848 3 1 30 0.26214400000000000000e6
-1848 3 1 38 0.65536000000000000000e5
-1848 3 2 23 0.65536000000000000000e5
-1848 3 2 39 0.65536000000000000000e5
-1848 3 3 32 -0.26214400000000000000e6
-1848 3 5 26 -0.65536000000000000000e5
-1848 3 8 37 -0.13107200000000000000e6
-1848 3 13 42 -0.10485760000000000000e7
-1848 3 14 27 0.52428800000000000000e6
-1848 3 28 41 -0.52428800000000000000e6
-1848 3 29 42 -0.52428800000000000000e6
-1848 4 3 31 0.52428800000000000000e6
-1848 4 4 16 -0.65536000000000000000e5
-1848 4 5 17 0.65536000000000000000e5
-1848 4 6 18 0.13107200000000000000e6
-1848 4 7 19 -0.13107200000000000000e6
-1848 4 8 20 -0.26214400000000000000e6
-1849 1 9 40 0.65536000000000000000e5
-1849 1 10 41 0.13107200000000000000e6
-1849 1 11 42 0.13107200000000000000e6
-1849 1 26 41 -0.65536000000000000000e5
-1849 1 32 47 -0.13107200000000000000e6
-1849 1 33 48 -0.13107200000000000000e6
-1849 2 4 34 -0.65536000000000000000e5
-1849 2 5 29 0.65536000000000000000e5
-1849 3 9 38 0.65536000000000000000e5
-1849 3 10 39 0.65536000000000000000e5
-1849 3 13 42 -0.26214400000000000000e6
-1849 3 28 41 -0.13107200000000000000e6
-1849 3 29 42 -0.13107200000000000000e6
-1849 4 3 31 0.13107200000000000000e6
-1850 2 5 30 0.65536000000000000000e5
-1850 2 28 34 -0.65536000000000000000e5
-1850 4 18 22 -0.65536000000000000000e5
-1850 4 18 30 -0.65536000000000000000e5
-1850 4 21 33 -0.65536000000000000000e5
-1851 1 10 41 -0.65536000000000000000e5
-1851 1 14 45 -0.26214400000000000000e6
-1851 1 17 48 0.13107200000000000000e6
-1851 1 18 49 0.13107200000000000000e6
-1851 1 26 33 0.65536000000000000000e5
-1851 1 28 43 0.65536000000000000000e5
-1851 1 32 47 0.65536000000000000000e5
-1851 1 33 48 0.65536000000000000000e5
-1851 2 5 31 0.65536000000000000000e5
-1851 2 14 28 0.13107200000000000000e6
-1851 3 13 42 0.26214400000000000000e6
-1851 3 14 43 0.13107200000000000000e6
-1851 3 28 41 0.65536000000000000000e5
-1851 3 29 42 0.65536000000000000000e5
-1851 4 3 31 -0.65536000000000000000e5
-1852 1 1 48 -0.65536000000000000000e5
-1852 1 2 49 -0.13107200000000000000e6
-1852 1 8 39 -0.13107200000000000000e6
-1852 1 9 40 -0.13107200000000000000e6
-1852 1 10 41 0.26214400000000000000e6
-1852 1 12 43 0.52428800000000000000e6
-1852 1 23 38 -0.65536000000000000000e5
-1852 1 25 40 0.65536000000000000000e5
-1852 1 28 43 -0.26214400000000000000e6
-1852 1 32 47 -0.52428800000000000000e6
-1852 2 2 32 -0.65536000000000000000e5
-1852 2 3 33 -0.65536000000000000000e5
-1852 2 5 32 0.65536000000000000000e5
-1852 2 16 30 -0.13107200000000000000e6
-1852 2 20 34 -0.26214400000000000000e6
-1852 3 9 38 -0.13107200000000000000e6
-1852 3 22 35 -0.52428800000000000000e6
-1852 3 28 41 -0.52428800000000000000e6
-1852 4 2 30 -0.13107200000000000000e6
-1852 4 6 34 -0.26214400000000000000e6
-1853 1 6 53 -0.65536000000000000000e5
-1853 1 25 40 0.65536000000000000000e5
-1853 2 5 33 0.65536000000000000000e5
-1853 2 5 35 -0.65536000000000000000e5
-1853 3 5 50 -0.13107200000000000000e6
-1853 3 25 38 0.65536000000000000000e5
-1853 3 26 39 0.65536000000000000000e5
-1854 2 5 34 0.65536000000000000000e5
-1854 2 28 34 -0.65536000000000000000e5
-1854 4 18 30 -0.65536000000000000000e5
-1854 4 21 33 -0.65536000000000000000e5
-1855 1 1 12 0.32768000000000000000e5
-1855 1 1 16 -0.65536000000000000000e5
-1855 1 2 33 0.32768000000000000000e5
-1855 1 3 34 -0.65536000000000000000e5
-1855 1 10 41 0.32768000000000000000e5
-1855 1 12 27 0.65536000000000000000e5
-1855 2 6 6 0.65536000000000000000e5
-1855 2 6 20 -0.32768000000000000000e5
-1855 2 7 21 0.32768000000000000000e5
-1855 3 1 14 -0.32768000000000000000e5
-1855 3 3 32 0.32768000000000000000e5
-1855 3 7 12 0.65536000000000000000e5
-1855 4 6 6 -0.65536000000000000000e5
-1856 2 6 7 0.65536000000000000000e5
-1856 2 6 20 -0.65536000000000000000e5
-1856 4 6 6 -0.13107200000000000000e6
-1857 1 1 32 0.65536000000000000000e5
-1857 1 1 48 -0.32768000000000000000e5
-1857 1 2 17 -0.13107200000000000000e6
-1857 1 2 33 -0.13107200000000000000e6
-1857 1 2 49 -0.32768000000000000000e5
-1857 1 3 34 0.26214400000000000000e6
-1857 1 4 11 0.32768000000000000000e5
-1857 1 8 23 -0.32768000000000000000e5
-1857 1 8 39 -0.32768000000000000000e5
-1857 1 9 40 -0.32768000000000000000e5
-1857 1 10 41 -0.13107200000000000000e6
-1857 1 11 42 0.65536000000000000000e5
-1857 1 12 43 0.26214400000000000000e6
-1857 1 23 38 -0.32768000000000000000e5
-1857 1 26 41 0.32768000000000000000e5
-1857 1 28 43 -0.13107200000000000000e6
-1857 1 32 47 -0.19660800000000000000e6
-1857 1 33 48 -0.65536000000000000000e5
-1857 2 2 8 -0.32768000000000000000e5
-1857 2 2 32 -0.32768000000000000000e5
-1857 2 3 9 0.32768000000000000000e5
-1857 2 4 10 -0.65536000000000000000e5
-1857 2 6 8 0.65536000000000000000e5
-1857 2 7 21 -0.65536000000000000000e5
-1857 2 12 26 -0.65536000000000000000e5
-1857 2 16 30 -0.32768000000000000000e5
-1857 2 20 34 -0.65536000000000000000e5
-1857 3 1 14 0.65536000000000000000e5
-1857 3 1 30 0.32768000000000000000e5
-1857 3 2 7 0.32768000000000000000e5
-1857 3 2 15 -0.13107200000000000000e6
-1857 3 3 16 0.13107200000000000000e6
-1857 3 3 32 -0.19660800000000000000e6
-1857 3 4 9 0.32768000000000000000e5
-1857 3 8 37 -0.32768000000000000000e5
-1857 3 10 23 0.65536000000000000000e5
-1857 3 13 42 -0.13107200000000000000e6
-1857 3 22 35 -0.13107200000000000000e6
-1857 3 28 41 -0.19660800000000000000e6
-1857 3 29 42 -0.65536000000000000000e5
-1857 4 2 6 0.32768000000000000000e5
-1857 4 2 30 -0.32768000000000000000e5
-1857 4 3 31 0.65536000000000000000e5
-1857 4 6 18 0.32768000000000000000e5
-1857 4 6 34 -0.65536000000000000000e5
-1858 2 4 10 -0.65536000000000000000e5
-1858 2 6 9 0.65536000000000000000e5
-1859 1 1 16 0.65536000000000000000e5
-1859 1 2 17 0.65536000000000000000e5
-1859 1 7 16 -0.13107200000000000000e6
-1859 1 12 27 0.65536000000000000000e5
-1859 2 6 10 0.65536000000000000000e5
-1859 3 7 12 0.65536000000000000000e5
-1860 1 3 34 0.65536000000000000000e5
-1860 1 4 35 -0.65536000000000000000e5
-1860 1 12 27 0.65536000000000000000e5
-1860 1 12 43 -0.65536000000000000000e5
-1860 1 14 45 -0.13107200000000000000e6
-1860 1 16 23 0.65536000000000000000e5
-1860 1 16 31 -0.26214400000000000000e6
-1860 1 17 48 0.65536000000000000000e5
-1860 1 18 49 0.65536000000000000000e5
-1860 1 20 27 0.26214400000000000000e6
-1860 2 6 11 0.65536000000000000000e5
-1860 2 7 13 0.13107200000000000000e6
-1860 2 9 23 -0.65536000000000000000e5
-1860 2 10 24 -0.13107200000000000000e6
-1860 2 14 28 0.65536000000000000000e5
-1860 3 5 34 -0.65536000000000000000e5
-1860 3 13 42 0.65536000000000000000e5
-1860 3 14 27 -0.65536000000000000000e5
-1860 3 14 43 0.65536000000000000000e5
-1860 4 1 13 -0.65536000000000000000e5
-1860 4 10 10 -0.26214400000000000000e6
-1861 2 1 15 -0.65536000000000000000e5
-1861 2 6 13 0.65536000000000000000e5
-1862 2 6 14 0.65536000000000000000e5
-1862 2 7 13 -0.65536000000000000000e5
-1863 1 2 17 0.65536000000000000000e5
-1863 1 3 18 0.32768000000000000000e5
-1863 1 3 34 0.32768000000000000000e5
-1863 1 4 19 0.32768000000000000000e5
-1863 1 4 35 0.32768000000000000000e5
-1863 1 7 16 0.32768000000000000000e5
-1863 1 12 19 -0.13107200000000000000e6
-1863 1 12 43 0.32768000000000000000e5
-1863 1 14 45 0.65536000000000000000e5
-1863 1 16 23 -0.32768000000000000000e5
-1863 1 16 31 0.13107200000000000000e6
-1863 1 17 48 -0.32768000000000000000e5
-1863 1 18 49 -0.32768000000000000000e5
-1863 1 20 27 -0.65536000000000000000e5
-1863 2 1 15 0.32768000000000000000e5
-1863 2 6 12 0.32768000000000000000e5
-1863 2 6 15 0.65536000000000000000e5
-1863 2 7 13 -0.32768000000000000000e5
-1863 2 9 23 0.32768000000000000000e5
-1863 2 10 24 0.65536000000000000000e5
-1863 2 14 28 -0.32768000000000000000e5
-1863 3 3 16 0.65536000000000000000e5
-1863 3 5 34 0.32768000000000000000e5
-1863 3 7 12 0.32768000000000000000e5
-1863 3 7 20 0.65536000000000000000e5
-1863 3 13 42 -0.32768000000000000000e5
-1863 3 14 27 0.32768000000000000000e5
-1863 3 14 43 -0.32768000000000000000e5
-1863 4 1 13 0.32768000000000000000e5
-1863 4 10 10 0.13107200000000000000e6
-1864 1 1 8 -0.65536000000000000000e5
-1864 1 1 48 0.65536000000000000000e5
-1864 1 2 9 -0.65536000000000000000e5
-1864 1 2 33 0.26214400000000000000e6
-1864 1 2 49 0.65536000000000000000e5
-1864 1 3 34 -0.26214400000000000000e6
-1864 1 4 11 -0.65536000000000000000e5
-1864 1 7 22 0.65536000000000000000e5
-1864 1 8 23 0.13107200000000000000e6
-1864 1 8 39 0.65536000000000000000e5
-1864 1 9 40 0.65536000000000000000e5
-1864 1 10 41 0.13107200000000000000e6
-1864 1 11 42 -0.13107200000000000000e6
-1864 1 12 43 -0.52428800000000000000e6
-1864 1 23 38 0.65536000000000000000e5
-1864 1 26 41 -0.65536000000000000000e5
-1864 1 28 43 0.26214400000000000000e6
-1864 1 32 47 0.39321600000000000000e6
-1864 1 33 48 0.13107200000000000000e6
-1864 2 1 7 -0.65536000000000000000e5
-1864 2 2 8 0.65536000000000000000e5
-1864 2 2 32 0.65536000000000000000e5
-1864 2 3 9 -0.65536000000000000000e5
-1864 2 6 16 0.65536000000000000000e5
-1864 2 7 21 0.13107200000000000000e6
-1864 2 12 26 0.13107200000000000000e6
-1864 2 16 30 0.65536000000000000000e5
-1864 2 20 34 0.13107200000000000000e6
-1864 3 1 14 -0.26214400000000000000e6
-1864 3 1 30 -0.65536000000000000000e5
-1864 3 2 7 -0.13107200000000000000e6
-1864 3 2 15 0.13107200000000000000e6
-1864 3 3 32 0.26214400000000000000e6
-1864 3 4 9 -0.65536000000000000000e5
-1864 3 7 12 0.26214400000000000000e6
-1864 3 8 37 0.65536000000000000000e5
-1864 3 10 23 -0.13107200000000000000e6
-1864 3 13 42 0.26214400000000000000e6
-1864 3 22 35 0.26214400000000000000e6
-1864 3 28 41 0.39321600000000000000e6
-1864 3 29 42 0.13107200000000000000e6
-1864 4 2 6 -0.65536000000000000000e5
-1864 4 2 30 0.65536000000000000000e5
-1864 4 3 31 -0.13107200000000000000e6
-1864 4 6 6 -0.26214400000000000000e6
-1864 4 6 18 -0.65536000000000000000e5
-1864 4 6 34 0.13107200000000000000e6
-1865 1 1 8 -0.65536000000000000000e5
-1865 1 1 32 -0.26214400000000000000e6
-1865 1 1 48 0.98304000000000000000e5
-1865 1 2 9 -0.65536000000000000000e5
-1865 1 2 33 0.52428800000000000000e6
-1865 1 2 49 0.98304000000000000000e5
-1865 1 3 34 -0.52428800000000000000e6
-1865 1 4 11 -0.65536000000000000000e5
-1865 1 8 23 0.13107200000000000000e6
-1865 1 8 39 0.65536000000000000000e5
-1865 1 9 40 0.65536000000000000000e5
-1865 1 10 41 0.26214400000000000000e6
-1865 1 11 42 -0.26214400000000000000e6
-1865 1 12 27 0.26214400000000000000e6
-1865 1 12 43 -0.78643200000000000000e6
-1865 1 23 38 0.98304000000000000000e5
-1865 1 26 41 -0.65536000000000000000e5
-1865 1 28 43 0.39321600000000000000e6
-1865 1 32 47 0.52428800000000000000e6
-1865 1 33 48 0.26214400000000000000e6
-1865 2 1 7 -0.65536000000000000000e5
-1865 2 2 8 0.65536000000000000000e5
-1865 2 2 32 0.98304000000000000000e5
-1865 2 3 9 -0.65536000000000000000e5
-1865 2 6 17 0.65536000000000000000e5
-1865 2 6 20 -0.13107200000000000000e6
-1865 2 7 21 0.26214400000000000000e6
-1865 2 12 26 0.26214400000000000000e6
-1865 2 16 30 0.65536000000000000000e5
-1865 2 20 34 0.13107200000000000000e6
-1865 3 1 14 -0.26214400000000000000e6
-1865 3 1 30 -0.13107200000000000000e6
-1865 3 2 7 -0.13107200000000000000e6
-1865 3 2 15 0.13107200000000000000e6
-1865 3 3 32 0.39321600000000000000e6
-1865 3 4 9 -0.65536000000000000000e5
-1865 3 7 12 0.26214400000000000000e6
-1865 3 8 37 0.13107200000000000000e6
-1865 3 10 23 -0.19660800000000000000e6
-1865 3 13 42 0.52428800000000000000e6
-1865 3 22 35 0.26214400000000000000e6
-1865 3 28 41 0.52428800000000000000e6
-1865 3 29 42 0.26214400000000000000e6
-1865 4 2 6 -0.65536000000000000000e5
-1865 4 2 30 0.65536000000000000000e5
-1865 4 3 31 -0.26214400000000000000e6
-1865 4 6 6 -0.26214400000000000000e6
-1865 4 6 18 -0.13107200000000000000e6
-1865 4 6 34 0.13107200000000000000e6
-1866 1 1 48 0.32768000000000000000e5
-1866 1 2 33 0.26214400000000000000e6
-1866 1 2 49 0.32768000000000000000e5
-1866 1 3 34 -0.26214400000000000000e6
-1866 1 8 23 0.65536000000000000000e5
-1866 1 8 39 0.65536000000000000000e5
-1866 1 10 41 0.13107200000000000000e6
-1866 1 11 42 -0.13107200000000000000e6
-1866 1 12 43 -0.26214400000000000000e6
-1866 1 23 38 0.32768000000000000000e5
-1866 1 28 43 0.13107200000000000000e6
-1866 1 32 47 0.13107200000000000000e6
-1866 1 33 48 0.13107200000000000000e6
-1866 2 2 32 0.32768000000000000000e5
-1866 2 6 18 0.65536000000000000000e5
-1866 2 7 21 0.13107200000000000000e6
-1866 2 12 26 0.13107200000000000000e6
-1866 3 3 32 0.13107200000000000000e6
-1866 3 8 37 0.65536000000000000000e5
-1866 3 10 23 -0.65536000000000000000e5
-1866 3 13 42 0.26214400000000000000e6
-1866 3 28 41 0.13107200000000000000e6
-1866 3 29 42 0.13107200000000000000e6
-1866 4 3 31 -0.13107200000000000000e6
-1866 4 6 18 -0.65536000000000000000e5
-1867 1 9 40 -0.65536000000000000000e5
-1867 1 10 41 0.13107200000000000000e6
-1867 1 11 42 -0.13107200000000000000e6
-1867 1 26 41 0.65536000000000000000e5
-1867 1 32 47 -0.13107200000000000000e6
-1867 1 33 48 0.13107200000000000000e6
-1867 2 6 19 0.65536000000000000000e5
-1867 2 12 26 0.13107200000000000000e6
-1867 2 16 30 -0.65536000000000000000e5
-1867 2 20 34 -0.13107200000000000000e6
-1867 3 8 37 0.65536000000000000000e5
-1867 3 13 42 0.26214400000000000000e6
-1867 3 22 35 -0.26214400000000000000e6
-1867 3 28 41 -0.13107200000000000000e6
-1867 3 29 42 0.13107200000000000000e6
-1867 4 2 30 -0.65536000000000000000e5
-1867 4 3 31 -0.13107200000000000000e6
-1867 4 6 18 -0.65536000000000000000e5
-1867 4 6 34 -0.13107200000000000000e6
-1868 1 1 32 0.65536000000000000000e5
-1868 1 3 34 0.13107200000000000000e6
-1868 1 10 41 -0.65536000000000000000e5
-1868 1 16 23 -0.13107200000000000000e6
-1868 2 6 21 0.65536000000000000000e5
-1868 2 7 21 -0.65536000000000000000e5
-1868 3 3 32 -0.65536000000000000000e5
-1869 2 6 22 0.65536000000000000000e5
-1869 2 7 21 -0.65536000000000000000e5
-1870 1 3 34 0.65536000000000000000e5
-1870 1 4 35 -0.65536000000000000000e5
-1870 1 12 27 0.65536000000000000000e5
-1870 1 12 43 -0.65536000000000000000e5
-1870 1 14 45 -0.13107200000000000000e6
-1870 1 16 23 0.65536000000000000000e5
-1870 1 16 31 -0.26214400000000000000e6
-1870 1 17 48 0.65536000000000000000e5
-1870 1 18 49 0.65536000000000000000e5
-1870 1 20 27 0.26214400000000000000e6
-1870 2 6 23 0.65536000000000000000e5
-1870 2 7 13 0.13107200000000000000e6
-1870 2 9 23 -0.65536000000000000000e5
-1870 2 10 24 -0.13107200000000000000e6
-1870 2 14 28 0.65536000000000000000e5
-1870 3 5 34 -0.65536000000000000000e5
-1870 3 13 42 0.65536000000000000000e5
-1870 3 14 27 -0.65536000000000000000e5
-1870 3 14 43 0.65536000000000000000e5
-1870 4 10 10 -0.26214400000000000000e6
-1871 1 3 18 -0.65536000000000000000e5
-1871 1 3 34 0.65536000000000000000e5
-1871 1 4 19 0.13107200000000000000e6
-1871 1 4 35 0.65536000000000000000e5
-1871 1 12 43 0.19660800000000000000e6
-1871 1 14 45 0.13107200000000000000e6
-1871 1 16 23 0.65536000000000000000e5
-1871 1 17 48 -0.65536000000000000000e5
-1871 1 18 49 -0.65536000000000000000e5
-1871 1 20 27 -0.26214400000000000000e6
-1871 2 6 24 0.65536000000000000000e5
-1871 2 9 23 0.65536000000000000000e5
-1871 2 10 24 0.13107200000000000000e6
-1871 2 14 28 -0.65536000000000000000e5
-1871 3 3 16 -0.65536000000000000000e5
-1871 3 4 17 -0.65536000000000000000e5
-1871 3 5 34 0.65536000000000000000e5
-1871 3 13 42 -0.65536000000000000000e5
-1871 3 14 27 0.19660800000000000000e6
-1871 3 14 43 -0.65536000000000000000e5
-1871 4 2 14 -0.65536000000000000000e5
-1872 2 6 25 0.65536000000000000000e5
-1872 2 7 13 -0.65536000000000000000e5
-1872 4 10 10 0.13107200000000000000e6
-1873 1 1 8 -0.65536000000000000000e5
-1873 1 1 24 -0.32768000000000000000e5
-1873 1 1 32 -0.13107200000000000000e6
-1873 1 1 40 -0.32768000000000000000e5
-1873 1 1 48 0.98304000000000000000e5
-1873 1 2 9 -0.65536000000000000000e5
-1873 1 2 33 0.26214400000000000000e6
-1873 1 2 49 0.98304000000000000000e5
-1873 1 3 34 -0.26214400000000000000e6
-1873 1 4 11 -0.65536000000000000000e5
-1873 1 7 38 0.65536000000000000000e5
-1873 1 8 23 0.65536000000000000000e5
-1873 1 8 39 0.65536000000000000000e5
-1873 1 9 40 0.65536000000000000000e5
-1873 1 10 41 0.13107200000000000000e6
-1873 1 12 27 0.26214400000000000000e6
-1873 1 12 43 -0.26214400000000000000e6
-1873 1 16 23 -0.26214400000000000000e6
-1873 1 22 37 0.32768000000000000000e5
-1873 1 23 38 0.13107200000000000000e6
-1873 1 26 41 -0.65536000000000000000e5
-1873 1 28 43 0.13107200000000000000e6
-1873 1 32 47 0.26214400000000000000e6
-1873 2 1 7 -0.65536000000000000000e5
-1873 2 1 31 0.13107200000000000000e6
-1873 2 2 8 0.65536000000000000000e5
-1873 2 2 16 -0.32768000000000000000e5
-1873 2 2 32 0.98304000000000000000e5
-1873 2 3 9 -0.65536000000000000000e5
-1873 2 6 20 -0.13107200000000000000e6
-1873 2 6 26 0.65536000000000000000e5
-1873 2 7 21 0.13107200000000000000e6
-1873 2 16 16 0.65536000000000000000e5
-1873 2 16 30 0.65536000000000000000e5
-1873 2 20 34 0.13107200000000000000e6
-1873 3 1 14 -0.26214400000000000000e6
-1873 3 1 22 -0.32768000000000000000e5
-1873 3 1 30 -0.65536000000000000000e5
-1873 3 1 34 0.26214400000000000000e6
-1873 3 1 38 -0.32768000000000000000e5
-1873 3 2 7 -0.13107200000000000000e6
-1873 3 2 15 0.13107200000000000000e6
-1873 3 2 23 -0.32768000000000000000e5
-1873 3 2 31 -0.13107200000000000000e6
-1873 3 3 32 0.26214400000000000000e6
-1873 3 4 9 -0.65536000000000000000e5
-1873 3 7 12 0.26214400000000000000e6
-1873 3 8 37 0.13107200000000000000e6
-1873 3 10 23 -0.13107200000000000000e6
-1873 3 22 27 0.65536000000000000000e5
-1873 3 22 35 0.26214400000000000000e6
-1873 3 28 41 0.26214400000000000000e6
-1873 4 2 6 -0.65536000000000000000e5
-1873 4 2 30 0.65536000000000000000e5
-1873 4 6 6 -0.26214400000000000000e6
-1873 4 6 18 -0.65536000000000000000e5
-1873 4 6 34 0.13107200000000000000e6
-1873 4 16 16 -0.65536000000000000000e5
-1874 1 1 48 0.32768000000000000000e5
-1874 1 2 33 0.13107200000000000000e6
-1874 1 2 49 0.32768000000000000000e5
-1874 1 3 34 -0.26214400000000000000e6
-1874 1 7 38 0.65536000000000000000e5
-1874 1 8 39 0.65536000000000000000e5
-1874 1 10 41 0.13107200000000000000e6
-1874 1 23 38 0.32768000000000000000e5
-1874 2 2 32 0.32768000000000000000e5
-1874 2 6 27 0.65536000000000000000e5
-1874 2 7 21 0.13107200000000000000e6
-1874 3 2 31 0.13107200000000000000e6
-1874 3 3 32 0.13107200000000000000e6
-1874 3 8 37 0.65536000000000000000e5
-1875 1 9 40 -0.65536000000000000000e5
-1875 1 10 41 0.13107200000000000000e6
-1875 1 11 42 -0.13107200000000000000e6
-1875 1 26 41 0.65536000000000000000e5
-1875 1 32 47 -0.13107200000000000000e6
-1875 1 33 48 0.13107200000000000000e6
-1875 2 6 28 0.65536000000000000000e5
-1875 2 12 26 0.13107200000000000000e6
-1875 2 16 30 -0.65536000000000000000e5
-1875 2 20 34 -0.13107200000000000000e6
-1875 3 8 37 0.65536000000000000000e5
-1875 3 13 42 0.26214400000000000000e6
-1875 3 22 35 -0.26214400000000000000e6
-1875 3 28 41 -0.13107200000000000000e6
-1875 3 29 42 0.13107200000000000000e6
-1875 4 2 30 -0.65536000000000000000e5
-1875 4 3 31 -0.13107200000000000000e6
-1875 4 6 34 -0.13107200000000000000e6
-1876 2 1 31 -0.65536000000000000000e5
-1876 2 6 29 0.65536000000000000000e5
-1877 1 2 33 -0.65536000000000000000e5
-1877 1 3 34 0.13107200000000000000e6
-1877 1 11 42 0.65536000000000000000e5
-1877 1 12 43 0.13107200000000000000e6
-1877 1 16 47 -0.13107200000000000000e6
-1877 1 28 43 -0.65536000000000000000e5
-1877 1 32 47 -0.65536000000000000000e5
-1877 1 33 48 -0.65536000000000000000e5
-1877 2 6 30 0.65536000000000000000e5
-1877 2 7 21 -0.65536000000000000000e5
-1877 2 12 26 -0.65536000000000000000e5
-1877 3 2 31 -0.65536000000000000000e5
-1877 3 3 32 -0.65536000000000000000e5
-1877 3 12 41 -0.13107200000000000000e6
-1877 3 13 42 -0.13107200000000000000e6
-1877 3 28 41 -0.65536000000000000000e5
-1877 3 29 42 -0.65536000000000000000e5
-1877 4 3 31 0.65536000000000000000e5
-1878 1 12 43 0.65536000000000000000e5
-1878 1 16 23 0.65536000000000000000e5
-1878 1 16 47 0.65536000000000000000e5
-1878 1 27 34 -0.13107200000000000000e6
-1878 2 6 31 0.65536000000000000000e5
-1878 3 1 34 -0.65536000000000000000e5
-1878 3 12 41 0.65536000000000000000e5
-1879 1 1 48 0.32768000000000000000e5
-1879 1 2 33 0.13107200000000000000e6
-1879 1 2 49 0.32768000000000000000e5
-1879 1 3 34 -0.26214400000000000000e6
-1879 1 7 38 0.65536000000000000000e5
-1879 1 8 39 0.65536000000000000000e5
-1879 1 10 41 0.13107200000000000000e6
-1879 1 23 38 0.32768000000000000000e5
-1879 2 2 32 0.32768000000000000000e5
-1879 2 6 32 0.65536000000000000000e5
-1879 2 7 21 0.13107200000000000000e6
-1879 3 2 31 0.13107200000000000000e6
-1879 3 3 32 0.13107200000000000000e6
-1879 3 8 37 0.65536000000000000000e5
-1879 4 1 29 0.65536000000000000000e5
-1880 2 6 33 0.65536000000000000000e5
-1880 2 16 30 -0.65536000000000000000e5
-1881 1 2 33 -0.65536000000000000000e5
-1881 1 3 34 0.13107200000000000000e6
-1881 1 9 40 0.32768000000000000000e5
-1881 1 10 41 -0.13107200000000000000e6
-1881 1 12 43 0.13107200000000000000e6
-1881 1 16 47 -0.13107200000000000000e6
-1881 1 26 41 -0.32768000000000000000e5
-1881 1 28 43 -0.65536000000000000000e5
-1881 1 32 47 0.65536000000000000000e5
-1881 2 6 34 0.65536000000000000000e5
-1881 2 7 21 -0.65536000000000000000e5
-1881 2 20 34 -0.65536000000000000000e5
-1881 3 2 31 -0.65536000000000000000e5
-1881 3 3 32 -0.65536000000000000000e5
-1881 3 8 37 -0.32768000000000000000e5
-1881 3 9 38 0.32768000000000000000e5
-1881 3 22 27 -0.32768000000000000000e5
-1881 3 22 35 -0.13107200000000000000e6
-1881 3 28 41 0.65536000000000000000e5
-1881 4 1 29 -0.32768000000000000000e5
-1881 4 2 30 0.32768000000000000000e5
-1881 4 6 34 -0.65536000000000000000e5
-1882 2 6 35 0.65536000000000000000e5
-1882 2 16 34 -0.65536000000000000000e5
-1883 1 1 32 0.32768000000000000000e5
-1883 1 1 48 -0.16384000000000000000e5
-1883 1 2 17 -0.65536000000000000000e5
-1883 1 2 33 -0.65536000000000000000e5
-1883 1 2 49 -0.16384000000000000000e5
-1883 1 3 34 0.13107200000000000000e6
-1883 1 4 11 0.16384000000000000000e5
-1883 1 8 23 -0.16384000000000000000e5
-1883 1 8 39 -0.16384000000000000000e5
-1883 1 9 40 -0.16384000000000000000e5
-1883 1 10 41 -0.65536000000000000000e5
-1883 1 11 42 0.32768000000000000000e5
-1883 1 12 43 0.13107200000000000000e6
-1883 1 23 38 -0.16384000000000000000e5
-1883 1 26 41 0.16384000000000000000e5
-1883 1 28 43 -0.65536000000000000000e5
-1883 1 32 47 -0.98304000000000000000e5
-1883 1 33 48 -0.32768000000000000000e5
-1883 2 2 8 -0.16384000000000000000e5
-1883 2 2 32 -0.16384000000000000000e5
-1883 2 3 9 0.16384000000000000000e5
-1883 2 4 10 -0.32768000000000000000e5
-1883 2 7 7 0.65536000000000000000e5
-1883 2 7 21 -0.32768000000000000000e5
-1883 2 12 26 -0.32768000000000000000e5
-1883 2 16 30 -0.16384000000000000000e5
-1883 2 20 34 -0.32768000000000000000e5
-1883 3 1 14 0.32768000000000000000e5
-1883 3 1 30 0.16384000000000000000e5
-1883 3 2 7 0.16384000000000000000e5
-1883 3 2 15 -0.65536000000000000000e5
-1883 3 3 16 0.65536000000000000000e5
-1883 3 3 32 -0.98304000000000000000e5
-1883 3 4 9 0.16384000000000000000e5
-1883 3 8 37 -0.16384000000000000000e5
-1883 3 10 23 0.32768000000000000000e5
-1883 3 13 42 -0.65536000000000000000e5
-1883 3 22 35 -0.65536000000000000000e5
-1883 3 28 41 -0.98304000000000000000e5
-1883 3 29 42 -0.32768000000000000000e5
-1883 4 2 6 0.16384000000000000000e5
-1883 4 2 30 -0.16384000000000000000e5
-1883 4 3 31 0.32768000000000000000e5
-1883 4 6 18 0.16384000000000000000e5
-1883 4 6 34 -0.32768000000000000000e5
-1884 2 4 10 -0.65536000000000000000e5
-1884 2 7 8 0.65536000000000000000e5
-1885 1 2 33 0.65536000000000000000e5
-1885 1 3 18 -0.13107200000000000000e6
-1885 1 6 13 0.65536000000000000000e5
-1885 1 10 41 0.65536000000000000000e5
-1885 2 4 10 -0.65536000000000000000e5
-1885 2 7 9 0.65536000000000000000e5
-1885 2 7 21 0.65536000000000000000e5
-1885 3 1 14 -0.65536000000000000000e5
-1885 3 3 16 0.13107200000000000000e6
-1885 3 3 32 0.65536000000000000000e5
-1886 1 3 34 0.65536000000000000000e5
-1886 1 4 35 -0.65536000000000000000e5
-1886 1 12 27 0.65536000000000000000e5
-1886 1 12 43 -0.65536000000000000000e5
-1886 1 14 45 -0.13107200000000000000e6
-1886 1 16 23 0.65536000000000000000e5
-1886 1 16 31 -0.26214400000000000000e6
-1886 1 17 48 0.65536000000000000000e5
-1886 1 18 49 0.65536000000000000000e5
-1886 1 20 27 0.26214400000000000000e6
-1886 2 7 10 0.65536000000000000000e5
-1886 2 7 13 0.13107200000000000000e6
-1886 2 9 23 -0.65536000000000000000e5
-1886 2 10 24 -0.13107200000000000000e6
-1886 2 14 28 0.65536000000000000000e5
-1886 3 5 34 -0.65536000000000000000e5
-1886 3 13 42 0.65536000000000000000e5
-1886 3 14 27 -0.65536000000000000000e5
-1886 3 14 43 0.65536000000000000000e5
-1886 4 1 13 -0.65536000000000000000e5
-1886 4 10 10 -0.26214400000000000000e6
-1887 2 6 12 -0.65536000000000000000e5
-1887 2 7 11 0.65536000000000000000e5
-1888 1 3 18 0.65536000000000000000e5
-1888 1 3 34 0.65536000000000000000e5
-1888 1 4 19 -0.13107200000000000000e6
-1888 1 4 35 0.65536000000000000000e5
-1888 2 7 12 0.65536000000000000000e5
-1888 3 3 16 0.65536000000000000000e5
-1888 3 4 17 0.65536000000000000000e5
-1889 1 2 17 0.32768000000000000000e5
-1889 1 3 18 0.32768000000000000000e5
-1889 1 3 34 0.32768000000000000000e5
-1889 1 4 19 0.65536000000000000000e5
-1889 1 10 17 0.65536000000000000000e5
-1889 1 20 27 -0.13107200000000000000e6
-1889 2 6 12 0.32768000000000000000e5
-1889 2 7 14 0.65536000000000000000e5
-1889 3 3 16 0.32768000000000000000e5
-1889 3 7 20 -0.13107200000000000000e6
-1890 2 7 15 0.65536000000000000000e5
-1890 2 11 13 -0.65536000000000000000e5
-1891 1 1 8 -0.65536000000000000000e5
-1891 1 1 32 -0.26214400000000000000e6
-1891 1 1 48 0.98304000000000000000e5
-1891 1 2 9 -0.65536000000000000000e5
-1891 1 2 33 0.52428800000000000000e6
-1891 1 2 49 0.98304000000000000000e5
-1891 1 3 34 -0.52428800000000000000e6
-1891 1 4 11 -0.65536000000000000000e5
-1891 1 8 23 0.13107200000000000000e6
-1891 1 8 39 0.65536000000000000000e5
-1891 1 9 40 0.65536000000000000000e5
-1891 1 10 41 0.26214400000000000000e6
-1891 1 11 42 -0.26214400000000000000e6
-1891 1 12 27 0.26214400000000000000e6
-1891 1 12 43 -0.78643200000000000000e6
-1891 1 23 38 0.98304000000000000000e5
-1891 1 26 41 -0.65536000000000000000e5
-1891 1 28 43 0.39321600000000000000e6
-1891 1 32 47 0.52428800000000000000e6
-1891 1 33 48 0.26214400000000000000e6
-1891 2 1 7 -0.65536000000000000000e5
-1891 2 2 8 0.65536000000000000000e5
-1891 2 2 32 0.98304000000000000000e5
-1891 2 3 9 -0.65536000000000000000e5
-1891 2 6 20 -0.13107200000000000000e6
-1891 2 7 16 0.65536000000000000000e5
-1891 2 7 21 0.26214400000000000000e6
-1891 2 12 26 0.26214400000000000000e6
-1891 2 16 30 0.65536000000000000000e5
-1891 2 20 34 0.13107200000000000000e6
-1891 3 1 14 -0.26214400000000000000e6
-1891 3 1 30 -0.13107200000000000000e6
-1891 3 2 7 -0.13107200000000000000e6
-1891 3 2 15 0.13107200000000000000e6
-1891 3 3 32 0.39321600000000000000e6
-1891 3 4 9 -0.65536000000000000000e5
-1891 3 7 12 0.26214400000000000000e6
-1891 3 8 37 0.13107200000000000000e6
-1891 3 10 23 -0.19660800000000000000e6
-1891 3 13 42 0.52428800000000000000e6
-1891 3 22 35 0.26214400000000000000e6
-1891 3 28 41 0.52428800000000000000e6
-1891 3 29 42 0.26214400000000000000e6
-1891 4 2 6 -0.65536000000000000000e5
-1891 4 2 30 0.65536000000000000000e5
-1891 4 3 31 -0.26214400000000000000e6
-1891 4 6 6 -0.26214400000000000000e6
-1891 4 6 18 -0.13107200000000000000e6
-1891 4 6 34 0.13107200000000000000e6
-1892 1 1 48 0.32768000000000000000e5
-1892 1 2 33 0.26214400000000000000e6
-1892 1 2 49 0.32768000000000000000e5
-1892 1 3 34 -0.26214400000000000000e6
-1892 1 8 23 0.65536000000000000000e5
-1892 1 8 39 0.65536000000000000000e5
-1892 1 10 41 0.13107200000000000000e6
-1892 1 11 42 -0.13107200000000000000e6
-1892 1 12 43 -0.26214400000000000000e6
-1892 1 23 38 0.32768000000000000000e5
-1892 1 28 43 0.13107200000000000000e6
-1892 1 32 47 0.13107200000000000000e6
-1892 1 33 48 0.13107200000000000000e6
-1892 2 2 32 0.32768000000000000000e5
-1892 2 7 17 0.65536000000000000000e5
-1892 2 7 21 0.13107200000000000000e6
-1892 2 12 26 0.13107200000000000000e6
-1892 3 3 32 0.13107200000000000000e6
-1892 3 8 37 0.65536000000000000000e5
-1892 3 10 23 -0.65536000000000000000e5
-1892 3 13 42 0.26214400000000000000e6
-1892 3 28 41 0.13107200000000000000e6
-1892 3 29 42 0.13107200000000000000e6
-1892 4 3 31 -0.13107200000000000000e6
-1892 4 6 18 -0.65536000000000000000e5
-1893 1 9 40 -0.65536000000000000000e5
-1893 1 10 41 0.13107200000000000000e6
-1893 1 11 42 -0.13107200000000000000e6
-1893 1 26 41 0.65536000000000000000e5
-1893 1 32 47 -0.13107200000000000000e6
-1893 1 33 48 0.13107200000000000000e6
-1893 2 7 18 0.65536000000000000000e5
-1893 2 12 26 0.13107200000000000000e6
-1893 2 16 30 -0.65536000000000000000e5
-1893 2 20 34 -0.13107200000000000000e6
-1893 3 8 37 0.65536000000000000000e5
-1893 3 13 42 0.26214400000000000000e6
-1893 3 22 35 -0.26214400000000000000e6
-1893 3 28 41 -0.13107200000000000000e6
-1893 3 29 42 0.13107200000000000000e6
-1893 4 2 30 -0.65536000000000000000e5
-1893 4 3 31 -0.13107200000000000000e6
-1893 4 6 18 -0.65536000000000000000e5
-1893 4 6 34 -0.13107200000000000000e6
-1894 1 1 48 -0.32768000000000000000e5
-1894 1 2 49 -0.32768000000000000000e5
-1894 1 9 40 -0.65536000000000000000e5
-1894 1 10 25 0.65536000000000000000e5
-1894 1 12 43 0.26214400000000000000e6
-1894 1 23 38 -0.32768000000000000000e5
-1894 1 26 41 0.65536000000000000000e5
-1894 1 28 43 -0.13107200000000000000e6
-1894 1 32 47 -0.26214400000000000000e6
-1894 2 2 32 -0.32768000000000000000e5
-1894 2 7 19 0.65536000000000000000e5
-1894 2 16 30 -0.65536000000000000000e5
-1894 2 20 34 -0.13107200000000000000e6
-1894 3 1 30 0.65536000000000000000e5
-1894 3 3 32 -0.13107200000000000000e6
-1894 3 10 23 0.65536000000000000000e5
-1894 3 22 35 -0.26214400000000000000e6
-1894 3 28 41 -0.26214400000000000000e6
-1894 4 2 30 -0.65536000000000000000e5
-1894 4 6 34 -0.13107200000000000000e6
-1895 1 1 32 0.65536000000000000000e5
-1895 1 3 34 0.13107200000000000000e6
-1895 1 10 41 -0.65536000000000000000e5
-1895 1 16 23 -0.13107200000000000000e6
-1895 2 7 20 0.65536000000000000000e5
-1895 2 7 21 -0.65536000000000000000e5
-1895 3 3 32 -0.65536000000000000000e5
-1896 2 7 22 0.65536000000000000000e5
-1896 2 12 26 -0.65536000000000000000e5
-1896 4 8 20 -0.65536000000000000000e5
-1897 1 3 18 -0.65536000000000000000e5
-1897 1 3 34 0.65536000000000000000e5
-1897 1 4 19 0.13107200000000000000e6
-1897 1 4 35 0.65536000000000000000e5
-1897 1 12 43 0.19660800000000000000e6
-1897 1 14 45 0.13107200000000000000e6
-1897 1 16 23 0.65536000000000000000e5
-1897 1 17 48 -0.65536000000000000000e5
-1897 1 18 49 -0.65536000000000000000e5
-1897 1 20 27 -0.26214400000000000000e6
-1897 2 7 23 0.65536000000000000000e5
-1897 2 9 23 0.65536000000000000000e5
-1897 2 10 24 0.13107200000000000000e6
-1897 2 14 28 -0.65536000000000000000e5
-1897 3 3 16 -0.65536000000000000000e5
-1897 3 4 17 -0.65536000000000000000e5
-1897 3 5 34 0.65536000000000000000e5
-1897 3 13 42 -0.65536000000000000000e5
-1897 3 14 27 0.19660800000000000000e6
-1897 3 14 43 -0.65536000000000000000e5
-1897 4 2 14 -0.65536000000000000000e5
-1898 1 3 18 0.65536000000000000000e5
-1898 1 3 34 0.65536000000000000000e5
-1898 1 4 19 -0.13107200000000000000e6
-1898 1 4 35 0.65536000000000000000e5
-1898 2 7 24 0.65536000000000000000e5
-1898 3 3 16 0.65536000000000000000e5
-1898 3 4 17 0.65536000000000000000e5
-1898 4 2 14 0.65536000000000000000e5
-1899 2 7 25 0.65536000000000000000e5
-1899 2 10 24 -0.65536000000000000000e5
-1900 1 1 48 0.32768000000000000000e5
-1900 1 2 33 0.13107200000000000000e6
-1900 1 2 49 0.32768000000000000000e5
-1900 1 3 34 -0.26214400000000000000e6
-1900 1 7 38 0.65536000000000000000e5
-1900 1 8 39 0.65536000000000000000e5
-1900 1 10 41 0.13107200000000000000e6
-1900 1 23 38 0.32768000000000000000e5
-1900 2 2 32 0.32768000000000000000e5
-1900 2 7 21 0.13107200000000000000e6
-1900 2 7 26 0.65536000000000000000e5
-1900 3 2 31 0.13107200000000000000e6
-1900 3 3 32 0.13107200000000000000e6
-1900 3 8 37 0.65536000000000000000e5
-1901 1 9 40 -0.65536000000000000000e5
-1901 1 10 41 0.13107200000000000000e6
-1901 1 11 42 -0.13107200000000000000e6
-1901 1 26 41 0.65536000000000000000e5
-1901 1 32 47 -0.13107200000000000000e6
-1901 1 33 48 0.13107200000000000000e6
-1901 2 7 27 0.65536000000000000000e5
-1901 2 12 26 0.13107200000000000000e6
-1901 2 16 30 -0.65536000000000000000e5
-1901 2 20 34 -0.13107200000000000000e6
-1901 3 8 37 0.65536000000000000000e5
-1901 3 13 42 0.26214400000000000000e6
-1901 3 22 35 -0.26214400000000000000e6
-1901 3 28 41 -0.13107200000000000000e6
-1901 3 29 42 0.13107200000000000000e6
-1901 4 2 30 -0.65536000000000000000e5
-1901 4 3 31 -0.13107200000000000000e6
-1901 4 6 34 -0.13107200000000000000e6
-1902 1 1 48 -0.32768000000000000000e5
-1902 1 2 49 -0.32768000000000000000e5
-1902 1 12 43 0.26214400000000000000e6
-1902 1 23 38 -0.32768000000000000000e5
-1902 1 26 41 0.65536000000000000000e5
-1902 1 28 43 -0.13107200000000000000e6
-1902 1 32 47 -0.26214400000000000000e6
-1902 2 2 32 -0.32768000000000000000e5
-1902 2 7 28 0.65536000000000000000e5
-1902 2 16 30 -0.65536000000000000000e5
-1902 2 20 34 -0.13107200000000000000e6
-1902 3 22 35 -0.26214400000000000000e6
-1902 3 28 41 -0.26214400000000000000e6
-1902 4 2 30 -0.65536000000000000000e5
-1902 4 6 34 -0.13107200000000000000e6
-1903 1 2 33 -0.65536000000000000000e5
-1903 1 3 34 0.13107200000000000000e6
-1903 1 11 42 0.65536000000000000000e5
-1903 1 12 43 0.13107200000000000000e6
-1903 1 16 47 -0.13107200000000000000e6
-1903 1 28 43 -0.65536000000000000000e5
-1903 1 32 47 -0.65536000000000000000e5
-1903 1 33 48 -0.65536000000000000000e5
-1903 2 7 21 -0.65536000000000000000e5
-1903 2 7 29 0.65536000000000000000e5
-1903 2 12 26 -0.65536000000000000000e5
-1903 3 2 31 -0.65536000000000000000e5
-1903 3 3 32 -0.65536000000000000000e5
-1903 3 12 41 -0.13107200000000000000e6
-1903 3 13 42 -0.13107200000000000000e6
-1903 3 28 41 -0.65536000000000000000e5
-1903 3 29 42 -0.65536000000000000000e5
-1903 4 3 31 0.65536000000000000000e5
-1904 2 7 30 0.65536000000000000000e5
-1904 2 12 26 -0.65536000000000000000e5
-1905 1 12 43 0.65536000000000000000e5
-1905 1 13 44 -0.13107200000000000000e6
-1905 1 16 47 0.65536000000000000000e5
-1905 1 17 48 0.65536000000000000000e5
-1905 2 7 31 0.65536000000000000000e5
-1905 3 12 41 0.65536000000000000000e5
-1905 3 13 42 0.65536000000000000000e5
-1906 2 7 32 0.65536000000000000000e5
-1906 2 16 30 -0.65536000000000000000e5
-1907 1 1 48 -0.32768000000000000000e5
-1907 1 2 49 -0.32768000000000000000e5
-1907 1 12 43 0.26214400000000000000e6
-1907 1 23 38 -0.32768000000000000000e5
-1907 1 26 41 0.65536000000000000000e5
-1907 1 28 43 -0.13107200000000000000e6
-1907 1 32 47 -0.26214400000000000000e6
-1907 2 2 32 -0.32768000000000000000e5
-1907 2 7 33 0.65536000000000000000e5
-1907 2 16 30 -0.65536000000000000000e5
-1907 2 20 34 -0.13107200000000000000e6
-1907 3 22 35 -0.26214400000000000000e6
-1907 3 28 41 -0.26214400000000000000e6
-1907 4 6 34 -0.13107200000000000000e6
-1908 2 7 34 0.65536000000000000000e5
-1908 2 20 34 -0.65536000000000000000e5
-1908 4 6 34 -0.65536000000000000000e5
-1909 1 1 48 -0.32768000000000000000e5
-1909 1 2 49 -0.32768000000000000000e5
-1909 1 12 43 0.26214400000000000000e6
-1909 1 23 38 -0.32768000000000000000e5
-1909 1 26 41 0.65536000000000000000e5
-1909 1 28 43 -0.13107200000000000000e6
-1909 1 32 47 -0.26214400000000000000e6
-1909 2 2 32 -0.32768000000000000000e5
-1909 2 7 35 0.65536000000000000000e5
-1909 2 16 30 -0.65536000000000000000e5
-1909 2 20 34 -0.13107200000000000000e6
-1909 3 22 35 -0.26214400000000000000e6
-1909 3 28 41 -0.26214400000000000000e6
-1909 4 6 34 -0.13107200000000000000e6
-1909 4 17 29 0.65536000000000000000e5
-1910 1 2 33 0.32768000000000000000e5
-1910 1 3 18 -0.65536000000000000000e5
-1910 1 6 13 0.32768000000000000000e5
-1910 1 10 41 0.32768000000000000000e5
-1910 2 4 10 -0.32768000000000000000e5
-1910 2 7 21 0.32768000000000000000e5
-1910 2 8 8 0.65536000000000000000e5
-1910 3 1 14 -0.32768000000000000000e5
-1910 3 3 16 0.65536000000000000000e5
-1910 3 3 32 0.32768000000000000000e5
-1911 2 5 11 -0.65536000000000000000e5
-1911 2 8 9 0.65536000000000000000e5
-1912 2 6 12 -0.65536000000000000000e5
-1912 2 8 10 0.65536000000000000000e5
-1913 1 3 18 0.65536000000000000000e5
-1913 1 3 34 0.65536000000000000000e5
-1913 1 4 19 -0.13107200000000000000e6
-1913 1 4 35 0.65536000000000000000e5
-1913 2 8 11 0.65536000000000000000e5
-1913 3 3 16 0.65536000000000000000e5
-1913 3 4 17 0.65536000000000000000e5
-1914 1 3 18 0.65536000000000000000e5
-1914 1 4 35 0.65536000000000000000e5
-1914 1 5 20 0.13107200000000000000e6
-1914 1 5 36 -0.13107200000000000000e6
-1914 1 10 17 -0.13107200000000000000e6
-1914 1 14 45 0.13107200000000000000e6
-1914 1 17 48 -0.65536000000000000000e5
-1914 1 18 49 -0.65536000000000000000e5
-1914 2 8 12 0.65536000000000000000e5
-1914 2 14 28 -0.65536000000000000000e5
-1914 3 5 18 -0.65536000000000000000e5
-1914 3 5 34 0.65536000000000000000e5
-1914 3 13 42 -0.65536000000000000000e5
-1914 3 14 43 -0.65536000000000000000e5
-1914 4 8 12 -0.65536000000000000000e5
-1915 1 2 17 0.32768000000000000000e5
-1915 1 3 18 0.32768000000000000000e5
-1915 1 3 34 0.32768000000000000000e5
-1915 1 4 19 0.65536000000000000000e5
-1915 1 10 17 0.65536000000000000000e5
-1915 1 20 27 -0.13107200000000000000e6
-1915 2 6 12 0.32768000000000000000e5
-1915 2 8 13 0.65536000000000000000e5
-1915 3 3 16 0.32768000000000000000e5
-1915 3 7 20 -0.13107200000000000000e6
-1916 1 3 18 -0.32768000000000000000e5
-1916 1 4 19 0.65536000000000000000e5
-1916 1 4 35 0.32768000000000000000e5
-1916 1 5 36 0.65536000000000000000e5
-1916 1 12 43 0.65536000000000000000e5
-1916 1 14 45 0.65536000000000000000e5
-1916 1 17 32 -0.13107200000000000000e6
-1916 1 17 48 -0.32768000000000000000e5
-1916 1 18 49 -0.32768000000000000000e5
-1916 2 8 14 0.65536000000000000000e5
-1916 2 9 23 0.32768000000000000000e5
-1916 2 14 28 -0.32768000000000000000e5
-1916 3 3 16 -0.32768000000000000000e5
-1916 3 4 17 -0.32768000000000000000e5
-1916 3 5 34 0.32768000000000000000e5
-1916 3 13 42 -0.32768000000000000000e5
-1916 3 14 27 0.65536000000000000000e5
-1916 3 14 43 -0.32768000000000000000e5
-1916 4 2 14 -0.32768000000000000000e5
-1916 4 3 15 -0.65536000000000000000e5
-1917 2 8 15 0.65536000000000000000e5
-1917 2 11 25 -0.65536000000000000000e5
-1917 4 10 14 -0.65536000000000000000e5
-1918 1 1 48 0.32768000000000000000e5
-1918 1 2 33 0.26214400000000000000e6
-1918 1 2 49 0.32768000000000000000e5
-1918 1 3 34 -0.26214400000000000000e6
-1918 1 8 23 0.65536000000000000000e5
-1918 1 8 39 0.65536000000000000000e5
-1918 1 10 41 0.13107200000000000000e6
-1918 1 11 42 -0.13107200000000000000e6
-1918 1 12 43 -0.26214400000000000000e6
-1918 1 23 38 0.32768000000000000000e5
-1918 1 28 43 0.13107200000000000000e6
-1918 1 32 47 0.13107200000000000000e6
-1918 1 33 48 0.13107200000000000000e6
-1918 2 2 32 0.32768000000000000000e5
-1918 2 7 21 0.13107200000000000000e6
-1918 2 8 16 0.65536000000000000000e5
-1918 2 12 26 0.13107200000000000000e6
-1918 3 3 32 0.13107200000000000000e6
-1918 3 8 37 0.65536000000000000000e5
-1918 3 10 23 -0.65536000000000000000e5
-1918 3 13 42 0.26214400000000000000e6
-1918 3 28 41 0.13107200000000000000e6
-1918 3 29 42 0.13107200000000000000e6
-1918 4 3 31 -0.13107200000000000000e6
-1918 4 6 18 -0.65536000000000000000e5
-1919 1 9 40 -0.65536000000000000000e5
-1919 1 10 41 0.13107200000000000000e6
-1919 1 11 42 -0.13107200000000000000e6
-1919 1 26 41 0.65536000000000000000e5
-1919 1 32 47 -0.13107200000000000000e6
-1919 1 33 48 0.13107200000000000000e6
-1919 2 8 17 0.65536000000000000000e5
-1919 2 12 26 0.13107200000000000000e6
-1919 2 16 30 -0.65536000000000000000e5
-1919 2 20 34 -0.13107200000000000000e6
-1919 3 8 37 0.65536000000000000000e5
-1919 3 13 42 0.26214400000000000000e6
-1919 3 22 35 -0.26214400000000000000e6
-1919 3 28 41 -0.13107200000000000000e6
-1919 3 29 42 0.13107200000000000000e6
-1919 4 2 30 -0.65536000000000000000e5
-1919 4 3 31 -0.13107200000000000000e6
-1919 4 6 18 -0.65536000000000000000e5
-1919 4 6 34 -0.13107200000000000000e6
-1920 1 1 48 -0.32768000000000000000e5
-1920 1 2 49 -0.32768000000000000000e5
-1920 1 9 40 -0.65536000000000000000e5
-1920 1 10 25 0.65536000000000000000e5
-1920 1 12 43 0.26214400000000000000e6
-1920 1 23 38 -0.32768000000000000000e5
-1920 1 26 41 0.65536000000000000000e5
-1920 1 28 43 -0.13107200000000000000e6
-1920 1 32 47 -0.26214400000000000000e6
-1920 2 2 32 -0.32768000000000000000e5
-1920 2 8 18 0.65536000000000000000e5
-1920 2 16 30 -0.65536000000000000000e5
-1920 2 20 34 -0.13107200000000000000e6
-1920 3 1 30 0.65536000000000000000e5
-1920 3 3 32 -0.13107200000000000000e6
-1920 3 10 23 0.65536000000000000000e5
-1920 3 22 35 -0.26214400000000000000e6
-1920 3 28 41 -0.26214400000000000000e6
-1920 4 2 30 -0.65536000000000000000e5
-1920 4 6 34 -0.13107200000000000000e6
-1921 1 9 40 0.65536000000000000000e5
-1921 1 10 41 0.13107200000000000000e6
-1921 1 11 42 0.13107200000000000000e6
-1921 1 26 41 -0.65536000000000000000e5
-1921 1 32 47 -0.13107200000000000000e6
-1921 1 33 48 -0.13107200000000000000e6
-1921 2 4 34 -0.65536000000000000000e5
-1921 2 8 19 0.65536000000000000000e5
-1921 3 9 38 0.65536000000000000000e5
-1921 3 10 39 0.65536000000000000000e5
-1921 3 13 42 -0.26214400000000000000e6
-1921 3 28 41 -0.13107200000000000000e6
-1921 3 29 42 -0.13107200000000000000e6
-1921 4 3 31 0.13107200000000000000e6
-1921 4 7 19 -0.65536000000000000000e5
-1922 2 7 21 -0.65536000000000000000e5
-1922 2 8 20 0.65536000000000000000e5
-1923 2 8 21 0.65536000000000000000e5
-1923 2 12 26 -0.65536000000000000000e5
-1923 4 8 20 -0.65536000000000000000e5
-1924 1 2 33 -0.65536000000000000000e5
-1924 1 4 35 -0.13107200000000000000e6
-1924 1 11 42 0.65536000000000000000e5
-1924 1 12 43 0.13107200000000000000e6
-1924 2 8 22 0.65536000000000000000e5
-1924 2 12 26 -0.65536000000000000000e5
-1924 3 4 33 0.65536000000000000000e5
-1924 3 14 27 0.13107200000000000000e6
-1924 4 8 20 -0.65536000000000000000e5
-1925 1 3 18 0.65536000000000000000e5
-1925 1 3 34 0.65536000000000000000e5
-1925 1 4 19 -0.13107200000000000000e6
-1925 1 4 35 0.65536000000000000000e5
-1925 2 8 23 0.65536000000000000000e5
-1925 3 3 16 0.65536000000000000000e5
-1925 3 4 17 0.65536000000000000000e5
-1925 4 2 14 0.65536000000000000000e5
-1926 2 8 24 0.65536000000000000000e5
-1926 2 9 23 -0.65536000000000000000e5
-1927 1 3 18 -0.32768000000000000000e5
-1927 1 4 19 0.65536000000000000000e5
-1927 1 4 35 0.32768000000000000000e5
-1927 1 5 36 0.65536000000000000000e5
-1927 1 12 43 0.65536000000000000000e5
-1927 1 14 45 0.65536000000000000000e5
-1927 1 17 32 -0.13107200000000000000e6
-1927 1 17 48 -0.32768000000000000000e5
-1927 1 18 49 -0.32768000000000000000e5
-1927 2 8 25 0.65536000000000000000e5
-1927 2 9 23 0.32768000000000000000e5
-1927 2 14 28 -0.32768000000000000000e5
-1927 3 3 16 -0.32768000000000000000e5
-1927 3 4 17 -0.32768000000000000000e5
-1927 3 5 34 0.32768000000000000000e5
-1927 3 13 42 -0.32768000000000000000e5
-1927 3 14 27 0.65536000000000000000e5
-1927 3 14 43 -0.32768000000000000000e5
-1927 4 2 14 -0.32768000000000000000e5
-1928 1 9 40 -0.65536000000000000000e5
-1928 1 10 41 0.13107200000000000000e6
-1928 1 11 42 -0.13107200000000000000e6
-1928 1 26 41 0.65536000000000000000e5
-1928 1 32 47 -0.13107200000000000000e6
-1928 1 33 48 0.13107200000000000000e6
-1928 2 8 26 0.65536000000000000000e5
-1928 2 12 26 0.13107200000000000000e6
-1928 2 16 30 -0.65536000000000000000e5
-1928 2 20 34 -0.13107200000000000000e6
-1928 3 8 37 0.65536000000000000000e5
-1928 3 13 42 0.26214400000000000000e6
-1928 3 22 35 -0.26214400000000000000e6
-1928 3 28 41 -0.13107200000000000000e6
-1928 3 29 42 0.13107200000000000000e6
-1928 4 2 30 -0.65536000000000000000e5
-1928 4 3 31 -0.13107200000000000000e6
-1928 4 6 34 -0.13107200000000000000e6
-1929 1 1 48 -0.32768000000000000000e5
-1929 1 2 49 -0.32768000000000000000e5
-1929 1 12 43 0.26214400000000000000e6
-1929 1 23 38 -0.32768000000000000000e5
-1929 1 26 41 0.65536000000000000000e5
-1929 1 28 43 -0.13107200000000000000e6
-1929 1 32 47 -0.26214400000000000000e6
-1929 2 2 32 -0.32768000000000000000e5
-1929 2 8 27 0.65536000000000000000e5
-1929 2 16 30 -0.65536000000000000000e5
-1929 2 20 34 -0.13107200000000000000e6
-1929 3 22 35 -0.26214400000000000000e6
-1929 3 28 41 -0.26214400000000000000e6
-1929 4 2 30 -0.65536000000000000000e5
-1929 4 6 34 -0.13107200000000000000e6
-1930 1 9 40 0.65536000000000000000e5
-1930 1 10 41 0.13107200000000000000e6
-1930 1 11 42 0.13107200000000000000e6
-1930 1 26 41 -0.65536000000000000000e5
-1930 1 32 47 -0.13107200000000000000e6
-1930 1 33 48 -0.13107200000000000000e6
-1930 2 4 34 -0.65536000000000000000e5
-1930 2 8 28 0.65536000000000000000e5
-1930 3 9 38 0.65536000000000000000e5
-1930 3 10 39 0.65536000000000000000e5
-1930 3 13 42 -0.26214400000000000000e6
-1930 3 28 41 -0.13107200000000000000e6
-1930 3 29 42 -0.13107200000000000000e6
-1930 4 3 31 0.13107200000000000000e6
-1931 2 8 29 0.65536000000000000000e5
-1931 2 12 26 -0.65536000000000000000e5
-1932 1 17 48 -0.13107200000000000000e6
-1932 1 28 43 0.65536000000000000000e5
-1932 1 32 47 0.65536000000000000000e5
-1932 1 33 48 0.65536000000000000000e5
-1932 2 8 30 0.65536000000000000000e5
-1932 3 28 41 0.65536000000000000000e5
-1932 3 29 42 0.65536000000000000000e5
-1932 4 3 31 -0.65536000000000000000e5
-1933 1 4 35 -0.65536000000000000000e5
-1933 1 17 48 0.65536000000000000000e5
-1933 2 8 31 0.65536000000000000000e5
-1933 2 9 23 -0.65536000000000000000e5
-1933 3 5 34 -0.65536000000000000000e5
-1933 3 13 42 0.65536000000000000000e5
-1933 3 14 27 -0.65536000000000000000e5
-1933 3 16 29 0.13107200000000000000e6
-1934 1 1 48 -0.32768000000000000000e5
-1934 1 2 49 -0.32768000000000000000e5
-1934 1 12 43 0.26214400000000000000e6
-1934 1 23 38 -0.32768000000000000000e5
-1934 1 26 41 0.65536000000000000000e5
-1934 1 28 43 -0.13107200000000000000e6
-1934 1 32 47 -0.26214400000000000000e6
-1934 2 2 32 -0.32768000000000000000e5
-1934 2 8 32 0.65536000000000000000e5
-1934 2 16 30 -0.65536000000000000000e5
-1934 2 20 34 -0.13107200000000000000e6
-1934 3 22 35 -0.26214400000000000000e6
-1934 3 28 41 -0.26214400000000000000e6
-1934 4 6 34 -0.13107200000000000000e6
-1935 2 4 34 -0.65536000000000000000e5
-1935 2 8 33 0.65536000000000000000e5
-1936 1 17 48 -0.13107200000000000000e6
-1936 1 28 43 0.65536000000000000000e5
-1936 1 32 47 0.65536000000000000000e5
-1936 1 33 48 0.65536000000000000000e5
-1936 2 8 34 0.65536000000000000000e5
-1936 3 28 41 0.65536000000000000000e5
-1936 3 29 42 0.65536000000000000000e5
-1937 2 8 35 0.65536000000000000000e5
-1937 2 21 35 -0.65536000000000000000e5
-1937 4 7 35 -0.65536000000000000000e5
-1938 1 2 33 0.32768000000000000000e5
-1938 1 4 35 0.65536000000000000000e5
-1938 1 5 20 -0.13107200000000000000e6
-1938 1 5 36 0.13107200000000000000e6
-1938 1 10 41 -0.32768000000000000000e5
-1938 1 11 42 -0.32768000000000000000e5
-1938 1 12 43 -0.65536000000000000000e5
-1938 1 14 45 -0.13107200000000000000e6
-1938 1 17 48 0.65536000000000000000e5
-1938 1 18 49 0.65536000000000000000e5
-1938 1 26 33 0.32768000000000000000e5
-1938 1 28 43 0.32768000000000000000e5
-1938 1 32 47 0.32768000000000000000e5
-1938 1 33 48 0.32768000000000000000e5
-1938 2 5 11 -0.32768000000000000000e5
-1938 2 9 9 0.65536000000000000000e5
-1938 2 12 26 0.32768000000000000000e5
-1938 2 14 28 0.65536000000000000000e5
-1938 3 2 15 -0.32768000000000000000e5
-1938 3 4 17 0.13107200000000000000e6
-1938 3 4 33 -0.32768000000000000000e5
-1938 3 5 18 0.65536000000000000000e5
-1938 3 10 11 0.32768000000000000000e5
-1938 3 13 42 0.13107200000000000000e6
-1938 3 14 27 -0.65536000000000000000e5
-1938 3 14 43 0.65536000000000000000e5
-1938 3 28 41 0.32768000000000000000e5
-1938 3 29 42 0.32768000000000000000e5
-1938 4 3 31 -0.32768000000000000000e5
-1938 4 8 12 0.65536000000000000000e5
-1938 4 8 20 0.32768000000000000000e5
-1938 4 9 21 -0.32768000000000000000e5
-1939 1 3 18 0.65536000000000000000e5
-1939 1 3 34 0.65536000000000000000e5
-1939 1 4 19 -0.13107200000000000000e6
-1939 1 4 35 0.65536000000000000000e5
-1939 2 9 10 0.65536000000000000000e5
-1939 3 3 16 0.65536000000000000000e5
-1939 3 4 17 0.65536000000000000000e5
-1940 1 3 18 0.65536000000000000000e5
-1940 1 4 35 0.65536000000000000000e5
-1940 1 5 20 0.13107200000000000000e6
-1940 1 5 36 -0.13107200000000000000e6
-1940 1 10 17 -0.13107200000000000000e6
-1940 1 14 45 0.13107200000000000000e6
-1940 1 17 48 -0.65536000000000000000e5
-1940 1 18 49 -0.65536000000000000000e5
-1940 2 9 11 0.65536000000000000000e5
-1940 2 14 28 -0.65536000000000000000e5
-1940 3 5 18 -0.65536000000000000000e5
-1940 3 5 34 0.65536000000000000000e5
-1940 3 13 42 -0.65536000000000000000e5
-1940 3 14 43 -0.65536000000000000000e5
-1940 4 8 12 -0.65536000000000000000e5
-1941 1 4 35 0.65536000000000000000e5
-1941 1 5 36 -0.13107200000000000000e6
-1941 1 14 45 0.13107200000000000000e6
-1941 1 15 30 0.65536000000000000000e5
-1941 1 17 48 -0.65536000000000000000e5
-1941 1 18 49 -0.65536000000000000000e5
-1941 2 9 12 0.65536000000000000000e5
-1941 2 14 28 -0.65536000000000000000e5
-1941 3 5 34 0.65536000000000000000e5
-1941 3 13 42 -0.65536000000000000000e5
-1941 3 14 43 -0.65536000000000000000e5
-1941 4 8 12 -0.65536000000000000000e5
-1942 1 3 18 -0.32768000000000000000e5
-1942 1 4 19 0.65536000000000000000e5
-1942 1 4 35 0.32768000000000000000e5
-1942 1 5 36 0.65536000000000000000e5
-1942 1 12 43 0.65536000000000000000e5
-1942 1 14 45 0.65536000000000000000e5
-1942 1 17 32 -0.13107200000000000000e6
-1942 1 17 48 -0.32768000000000000000e5
-1942 1 18 49 -0.32768000000000000000e5
-1942 2 9 13 0.65536000000000000000e5
-1942 2 9 23 0.32768000000000000000e5
-1942 2 14 28 -0.32768000000000000000e5
-1942 3 3 16 -0.32768000000000000000e5
-1942 3 4 17 -0.32768000000000000000e5
-1942 3 5 34 0.32768000000000000000e5
-1942 3 13 42 -0.32768000000000000000e5
-1942 3 14 27 0.65536000000000000000e5
-1942 3 14 43 -0.32768000000000000000e5
-1942 4 2 14 -0.32768000000000000000e5
-1942 4 3 15 -0.65536000000000000000e5
-1943 1 3 18 0.32768000000000000000e5
-1943 1 4 35 -0.32768000000000000000e5
-1943 1 5 20 0.13107200000000000000e6
-1943 1 5 36 -0.65536000000000000000e5
-1943 1 10 17 0.13107200000000000000e6
-1943 1 11 18 0.65536000000000000000e5
-1943 1 12 43 -0.65536000000000000000e5
-1943 1 13 20 -0.26214400000000000000e6
-1943 1 14 45 -0.65536000000000000000e5
-1943 1 17 32 0.13107200000000000000e6
-1943 1 17 48 0.32768000000000000000e5
-1943 1 18 49 0.32768000000000000000e5
-1943 1 20 27 0.13107200000000000000e6
-1943 2 9 14 0.65536000000000000000e5
-1943 2 9 23 -0.32768000000000000000e5
-1943 2 11 25 0.13107200000000000000e6
-1943 2 14 28 0.32768000000000000000e5
-1943 3 3 16 0.32768000000000000000e5
-1943 3 4 17 0.32768000000000000000e5
-1943 3 5 34 -0.32768000000000000000e5
-1943 3 7 20 0.13107200000000000000e6
-1943 3 13 42 0.32768000000000000000e5
-1943 3 14 27 -0.65536000000000000000e5
-1943 3 14 43 0.32768000000000000000e5
-1943 4 2 14 0.32768000000000000000e5
-1943 4 3 15 0.65536000000000000000e5
-1943 4 10 14 0.13107200000000000000e6
-1944 1 9 40 -0.65536000000000000000e5
-1944 1 10 41 0.13107200000000000000e6
-1944 1 11 42 -0.13107200000000000000e6
-1944 1 26 41 0.65536000000000000000e5
-1944 1 32 47 -0.13107200000000000000e6
-1944 1 33 48 0.13107200000000000000e6
-1944 2 9 16 0.65536000000000000000e5
-1944 2 12 26 0.13107200000000000000e6
-1944 2 16 30 -0.65536000000000000000e5
-1944 2 20 34 -0.13107200000000000000e6
-1944 3 8 37 0.65536000000000000000e5
-1944 3 13 42 0.26214400000000000000e6
-1944 3 22 35 -0.26214400000000000000e6
-1944 3 28 41 -0.13107200000000000000e6
-1944 3 29 42 0.13107200000000000000e6
-1944 4 2 30 -0.65536000000000000000e5
-1944 4 3 31 -0.13107200000000000000e6
-1944 4 6 18 -0.65536000000000000000e5
-1944 4 6 34 -0.13107200000000000000e6
-1945 1 1 48 -0.32768000000000000000e5
-1945 1 2 49 -0.32768000000000000000e5
-1945 1 9 40 -0.65536000000000000000e5
-1945 1 10 25 0.65536000000000000000e5
-1945 1 12 43 0.26214400000000000000e6
-1945 1 23 38 -0.32768000000000000000e5
-1945 1 26 41 0.65536000000000000000e5
-1945 1 28 43 -0.13107200000000000000e6
-1945 1 32 47 -0.26214400000000000000e6
-1945 2 2 32 -0.32768000000000000000e5
-1945 2 9 17 0.65536000000000000000e5
-1945 2 16 30 -0.65536000000000000000e5
-1945 2 20 34 -0.13107200000000000000e6
-1945 3 1 30 0.65536000000000000000e5
-1945 3 3 32 -0.13107200000000000000e6
-1945 3 10 23 0.65536000000000000000e5
-1945 3 22 35 -0.26214400000000000000e6
-1945 3 28 41 -0.26214400000000000000e6
-1945 4 2 30 -0.65536000000000000000e5
-1945 4 6 34 -0.13107200000000000000e6
-1946 1 9 40 0.65536000000000000000e5
-1946 1 10 41 0.13107200000000000000e6
-1946 1 11 42 0.13107200000000000000e6
-1946 1 26 41 -0.65536000000000000000e5
-1946 1 32 47 -0.13107200000000000000e6
-1946 1 33 48 -0.13107200000000000000e6
-1946 2 4 34 -0.65536000000000000000e5
-1946 2 9 18 0.65536000000000000000e5
-1946 3 9 38 0.65536000000000000000e5
-1946 3 10 39 0.65536000000000000000e5
-1946 3 13 42 -0.26214400000000000000e6
-1946 3 28 41 -0.13107200000000000000e6
-1946 3 29 42 -0.13107200000000000000e6
-1946 4 3 31 0.13107200000000000000e6
-1946 4 7 19 -0.65536000000000000000e5
-1947 1 1 48 0.32768000000000000000e5
-1947 1 2 33 -0.13107200000000000000e6
-1947 1 2 49 0.32768000000000000000e5
-1947 1 8 39 0.65536000000000000000e5
-1947 1 9 40 0.13107200000000000000e6
-1947 1 10 41 -0.13107200000000000000e6
-1947 1 11 26 0.65536000000000000000e5
-1947 1 23 38 0.32768000000000000000e5
-1947 1 26 41 -0.13107200000000000000e6
-1947 1 28 43 0.13107200000000000000e6
-1947 1 32 47 0.13107200000000000000e6
-1947 1 33 48 -0.13107200000000000000e6
-1947 2 2 32 0.32768000000000000000e5
-1947 2 4 34 -0.65536000000000000000e5
-1947 2 9 19 0.65536000000000000000e5
-1947 2 12 26 -0.13107200000000000000e6
-1947 2 16 30 0.65536000000000000000e5
-1947 2 20 34 0.13107200000000000000e6
-1947 3 3 32 -0.13107200000000000000e6
-1947 3 4 33 -0.13107200000000000000e6
-1947 3 9 38 0.65536000000000000000e5
-1947 3 10 23 -0.65536000000000000000e5
-1947 3 10 39 0.65536000000000000000e5
-1947 3 13 42 -0.26214400000000000000e6
-1947 3 14 27 0.26214400000000000000e6
-1947 3 22 35 0.26214400000000000000e6
-1947 3 28 41 0.13107200000000000000e6
-1947 3 29 42 -0.13107200000000000000e6
-1947 4 2 30 0.65536000000000000000e5
-1947 4 3 31 0.13107200000000000000e6
-1947 4 6 34 0.13107200000000000000e6
-1947 4 7 19 -0.65536000000000000000e5
-1947 4 8 20 -0.13107200000000000000e6
-1948 2 9 20 0.65536000000000000000e5
-1948 2 12 26 -0.65536000000000000000e5
-1948 4 8 20 -0.65536000000000000000e5
-1949 1 2 33 -0.65536000000000000000e5
-1949 1 4 35 -0.13107200000000000000e6
-1949 1 11 42 0.65536000000000000000e5
-1949 1 12 43 0.13107200000000000000e6
-1949 2 9 21 0.65536000000000000000e5
-1949 2 12 26 -0.65536000000000000000e5
-1949 3 4 33 0.65536000000000000000e5
-1949 3 14 27 0.13107200000000000000e6
-1949 4 8 20 -0.65536000000000000000e5
-1950 1 10 41 -0.65536000000000000000e5
-1950 1 14 45 -0.26214400000000000000e6
-1950 1 17 48 0.13107200000000000000e6
-1950 1 18 49 0.13107200000000000000e6
-1950 1 26 33 0.65536000000000000000e5
-1950 1 28 43 0.65536000000000000000e5
-1950 1 32 47 0.65536000000000000000e5
-1950 1 33 48 0.65536000000000000000e5
-1950 2 9 22 0.65536000000000000000e5
-1950 2 14 28 0.13107200000000000000e6
-1950 3 13 42 0.26214400000000000000e6
-1950 3 14 43 0.13107200000000000000e6
-1950 3 28 41 0.65536000000000000000e5
-1950 3 29 42 0.65536000000000000000e5
-1950 4 3 31 -0.65536000000000000000e5
-1950 4 9 21 -0.65536000000000000000e5
-1951 1 4 35 0.65536000000000000000e5
-1951 1 5 36 -0.13107200000000000000e6
-1951 1 14 45 0.13107200000000000000e6
-1951 1 15 30 0.65536000000000000000e5
-1951 1 17 48 -0.65536000000000000000e5
-1951 1 18 49 -0.65536000000000000000e5
-1951 2 9 24 0.65536000000000000000e5
-1951 2 14 28 -0.65536000000000000000e5
-1951 3 5 34 0.65536000000000000000e5
-1951 3 13 42 -0.65536000000000000000e5
-1951 3 14 43 -0.65536000000000000000e5
-1952 1 4 35 0.32768000000000000000e5
-1952 1 5 36 0.65536000000000000000e5
-1952 1 11 18 0.65536000000000000000e5
-1952 1 12 43 0.32768000000000000000e5
-1952 1 13 20 -0.26214400000000000000e6
-1952 1 14 45 0.65536000000000000000e5
-1952 1 17 32 0.13107200000000000000e6
-1952 1 17 48 -0.32768000000000000000e5
-1952 1 18 49 -0.32768000000000000000e5
-1952 1 20 27 0.13107200000000000000e6
-1952 2 9 23 0.32768000000000000000e5
-1952 2 9 25 0.65536000000000000000e5
-1952 2 11 25 0.13107200000000000000e6
-1952 2 14 28 -0.32768000000000000000e5
-1952 3 5 34 0.32768000000000000000e5
-1952 3 6 19 -0.65536000000000000000e5
-1952 3 8 21 0.26214400000000000000e6
-1952 3 13 42 -0.32768000000000000000e5
-1952 3 14 27 0.32768000000000000000e5
-1952 3 14 43 -0.32768000000000000000e5
-1953 1 1 48 -0.32768000000000000000e5
-1953 1 2 49 -0.32768000000000000000e5
-1953 1 12 43 0.26214400000000000000e6
-1953 1 23 38 -0.32768000000000000000e5
-1953 1 26 41 0.65536000000000000000e5
-1953 1 28 43 -0.13107200000000000000e6
-1953 1 32 47 -0.26214400000000000000e6
-1953 2 2 32 -0.32768000000000000000e5
-1953 2 9 26 0.65536000000000000000e5
-1953 2 16 30 -0.65536000000000000000e5
-1953 2 20 34 -0.13107200000000000000e6
-1953 3 22 35 -0.26214400000000000000e6
-1953 3 28 41 -0.26214400000000000000e6
-1953 4 2 30 -0.65536000000000000000e5
-1953 4 6 34 -0.13107200000000000000e6
-1954 1 9 40 0.65536000000000000000e5
-1954 1 10 41 0.13107200000000000000e6
-1954 1 11 42 0.13107200000000000000e6
-1954 1 26 41 -0.65536000000000000000e5
-1954 1 32 47 -0.13107200000000000000e6
-1954 1 33 48 -0.13107200000000000000e6
-1954 2 4 34 -0.65536000000000000000e5
-1954 2 9 27 0.65536000000000000000e5
-1954 3 9 38 0.65536000000000000000e5
-1954 3 10 39 0.65536000000000000000e5
-1954 3 13 42 -0.26214400000000000000e6
-1954 3 28 41 -0.13107200000000000000e6
-1954 3 29 42 -0.13107200000000000000e6
-1954 4 3 31 0.13107200000000000000e6
-1955 2 9 28 0.65536000000000000000e5
-1955 2 28 34 -0.65536000000000000000e5
-1955 4 18 22 -0.65536000000000000000e5
-1955 4 18 30 -0.65536000000000000000e5
-1955 4 21 33 -0.65536000000000000000e5
-1956 1 17 48 -0.13107200000000000000e6
-1956 1 28 43 0.65536000000000000000e5
-1956 1 32 47 0.65536000000000000000e5
-1956 1 33 48 0.65536000000000000000e5
-1956 2 9 29 0.65536000000000000000e5
-1956 3 28 41 0.65536000000000000000e5
-1956 3 29 42 0.65536000000000000000e5
-1956 4 3 31 -0.65536000000000000000e5
-1957 1 10 41 -0.65536000000000000000e5
-1957 1 14 45 -0.26214400000000000000e6
-1957 1 17 48 0.13107200000000000000e6
-1957 1 18 49 0.13107200000000000000e6
-1957 1 26 33 0.65536000000000000000e5
-1957 1 28 43 0.65536000000000000000e5
-1957 1 32 47 0.65536000000000000000e5
-1957 1 33 48 0.65536000000000000000e5
-1957 2 9 30 0.65536000000000000000e5
-1957 2 14 28 0.13107200000000000000e6
-1957 3 13 42 0.26214400000000000000e6
-1957 3 14 43 0.13107200000000000000e6
-1957 3 28 41 0.65536000000000000000e5
-1957 3 29 42 0.65536000000000000000e5
-1957 4 3 31 -0.65536000000000000000e5
-1958 2 9 31 0.65536000000000000000e5
-1958 2 14 28 -0.65536000000000000000e5
-1959 2 4 34 -0.65536000000000000000e5
-1959 2 9 32 0.65536000000000000000e5
-1960 2 9 33 0.65536000000000000000e5
-1960 2 28 34 -0.65536000000000000000e5
-1960 4 18 30 -0.65536000000000000000e5
-1960 4 21 33 -0.65536000000000000000e5
-1961 1 28 43 0.65536000000000000000e5
-1961 1 33 40 0.65536000000000000000e5
-1961 1 33 48 0.65536000000000000000e5
-1961 1 34 49 -0.13107200000000000000e6
-1961 2 9 34 0.65536000000000000000e5
-1961 3 18 47 -0.13107200000000000000e6
-1961 3 29 42 0.65536000000000000000e5
-1962 2 9 35 0.65536000000000000000e5
-1962 2 28 34 -0.65536000000000000000e5
-1962 4 21 33 -0.65536000000000000000e5
-1963 2 1 15 -0.32768000000000000000e5
-1963 2 10 10 0.65536000000000000000e5
-1964 2 7 13 -0.65536000000000000000e5
-1964 2 10 11 0.65536000000000000000e5
-1965 1 2 17 0.32768000000000000000e5
-1965 1 3 18 0.32768000000000000000e5
-1965 1 3 34 0.32768000000000000000e5
-1965 1 4 19 0.65536000000000000000e5
-1965 1 10 17 0.65536000000000000000e5
-1965 1 20 27 -0.13107200000000000000e6
-1965 2 6 12 0.32768000000000000000e5
-1965 2 10 12 0.65536000000000000000e5
-1965 3 3 16 0.32768000000000000000e5
-1965 3 7 20 -0.13107200000000000000e6
-1966 1 2 17 0.65536000000000000000e5
-1966 1 3 18 0.32768000000000000000e5
-1966 1 3 34 0.32768000000000000000e5
-1966 1 4 19 0.32768000000000000000e5
-1966 1 4 35 0.32768000000000000000e5
-1966 1 7 16 0.32768000000000000000e5
-1966 1 12 19 -0.13107200000000000000e6
-1966 1 12 43 0.32768000000000000000e5
-1966 1 14 45 0.65536000000000000000e5
-1966 1 16 23 -0.32768000000000000000e5
-1966 1 16 31 0.13107200000000000000e6
-1966 1 17 48 -0.32768000000000000000e5
-1966 1 18 49 -0.32768000000000000000e5
-1966 1 20 27 -0.65536000000000000000e5
-1966 2 1 15 0.32768000000000000000e5
-1966 2 6 12 0.32768000000000000000e5
-1966 2 7 13 -0.32768000000000000000e5
-1966 2 9 23 0.32768000000000000000e5
-1966 2 10 13 0.65536000000000000000e5
-1966 2 10 24 0.65536000000000000000e5
-1966 2 14 28 -0.32768000000000000000e5
-1966 3 3 16 0.65536000000000000000e5
-1966 3 5 34 0.32768000000000000000e5
-1966 3 7 12 0.32768000000000000000e5
-1966 3 7 20 0.65536000000000000000e5
-1966 3 13 42 -0.32768000000000000000e5
-1966 3 14 27 0.32768000000000000000e5
-1966 3 14 43 -0.32768000000000000000e5
-1966 4 1 13 0.32768000000000000000e5
-1966 4 10 10 0.13107200000000000000e6
-1967 2 10 14 0.65536000000000000000e5
-1967 2 11 13 -0.65536000000000000000e5
-1968 1 2 17 0.16384000000000000000e5
-1968 1 3 18 0.16384000000000000000e5
-1968 1 3 34 0.81920000000000000000e4
-1968 1 4 19 0.16384000000000000000e5
-1968 1 5 20 0.16384000000000000000e5
-1968 1 5 36 -0.16384000000000000000e5
-1968 1 10 17 0.16384000000000000000e5
-1968 1 12 19 0.65536000000000000000e5
-1968 1 12 43 -0.81920000000000000000e4
-1968 1 13 20 0.65536000000000000000e5
-1968 1 16 19 -0.13107200000000000000e6
-1968 1 16 23 -0.81920000000000000000e4
-1968 1 16 31 0.32768000000000000000e5
-1968 1 17 32 0.32768000000000000000e5
-1968 2 6 12 0.81920000000000000000e4
-1968 2 10 15 0.65536000000000000000e5
-1968 2 10 24 0.16384000000000000000e5
-1968 2 11 13 0.32768000000000000000e5
-1968 3 3 16 0.24576000000000000000e5
-1968 3 4 17 0.81920000000000000000e4
-1968 3 7 12 0.81920000000000000000e4
-1968 3 7 20 0.32768000000000000000e5
-1968 3 14 27 -0.81920000000000000000e4
-1968 4 1 13 0.81920000000000000000e4
-1968 4 2 14 0.81920000000000000000e4
-1968 4 3 15 0.16384000000000000000e5
-1968 4 10 10 0.32768000000000000000e5
-1969 2 6 20 -0.65536000000000000000e5
-1969 2 10 16 0.65536000000000000000e5
-1970 1 1 32 0.65536000000000000000e5
-1970 1 3 34 0.13107200000000000000e6
-1970 1 10 41 -0.65536000000000000000e5
-1970 1 16 23 -0.13107200000000000000e6
-1970 2 7 21 -0.65536000000000000000e5
-1970 2 10 17 0.65536000000000000000e5
-1970 3 3 32 -0.65536000000000000000e5
-1971 2 7 21 -0.65536000000000000000e5
-1971 2 10 18 0.65536000000000000000e5
-1972 2 10 19 0.65536000000000000000e5
-1972 2 12 26 -0.65536000000000000000e5
-1972 4 8 20 -0.65536000000000000000e5
-1973 1 3 34 0.65536000000000000000e5
-1973 1 4 35 -0.65536000000000000000e5
-1973 1 12 27 0.65536000000000000000e5
-1973 1 12 43 -0.65536000000000000000e5
-1973 1 14 45 -0.13107200000000000000e6
-1973 1 16 23 0.65536000000000000000e5
-1973 1 16 31 -0.26214400000000000000e6
-1973 1 17 48 0.65536000000000000000e5
-1973 1 18 49 0.65536000000000000000e5
-1973 1 20 27 0.26214400000000000000e6
-1973 2 7 13 0.13107200000000000000e6
-1973 2 9 23 -0.65536000000000000000e5
-1973 2 10 20 0.65536000000000000000e5
-1973 2 10 24 -0.13107200000000000000e6
-1973 2 14 28 0.65536000000000000000e5
-1973 3 5 34 -0.65536000000000000000e5
-1973 3 13 42 0.65536000000000000000e5
-1973 3 14 27 -0.65536000000000000000e5
-1973 3 14 43 0.65536000000000000000e5
-1973 4 10 10 -0.26214400000000000000e6
-1974 1 3 18 -0.65536000000000000000e5
-1974 1 3 34 0.65536000000000000000e5
-1974 1 4 19 0.13107200000000000000e6
-1974 1 4 35 0.65536000000000000000e5
-1974 1 12 43 0.19660800000000000000e6
-1974 1 14 45 0.13107200000000000000e6
-1974 1 16 23 0.65536000000000000000e5
-1974 1 17 48 -0.65536000000000000000e5
-1974 1 18 49 -0.65536000000000000000e5
-1974 1 20 27 -0.26214400000000000000e6
-1974 2 9 23 0.65536000000000000000e5
-1974 2 10 21 0.65536000000000000000e5
-1974 2 10 24 0.13107200000000000000e6
-1974 2 14 28 -0.65536000000000000000e5
-1974 3 3 16 -0.65536000000000000000e5
-1974 3 4 17 -0.65536000000000000000e5
-1974 3 5 34 0.65536000000000000000e5
-1974 3 13 42 -0.65536000000000000000e5
-1974 3 14 27 0.19660800000000000000e6
-1974 3 14 43 -0.65536000000000000000e5
-1974 4 2 14 -0.65536000000000000000e5
-1975 1 3 18 0.65536000000000000000e5
-1975 1 3 34 0.65536000000000000000e5
-1975 1 4 19 -0.13107200000000000000e6
-1975 1 4 35 0.65536000000000000000e5
-1975 2 10 22 0.65536000000000000000e5
-1975 3 3 16 0.65536000000000000000e5
-1975 3 4 17 0.65536000000000000000e5
-1975 4 2 14 0.65536000000000000000e5
-1976 2 7 13 -0.65536000000000000000e5
-1976 2 10 23 0.65536000000000000000e5
-1976 4 10 10 0.13107200000000000000e6
-1977 1 2 17 -0.32768000000000000000e5
-1977 1 3 18 -0.32768000000000000000e5
-1977 1 3 34 -0.16384000000000000000e5
-1977 1 4 19 -0.32768000000000000000e5
-1977 1 5 20 -0.32768000000000000000e5
-1977 1 5 36 0.32768000000000000000e5
-1977 1 10 17 -0.32768000000000000000e5
-1977 1 12 43 0.16384000000000000000e5
-1977 1 16 23 0.16384000000000000000e5
-1977 1 20 27 0.65536000000000000000e5
-1977 2 6 12 -0.16384000000000000000e5
-1977 2 10 24 -0.32768000000000000000e5
-1977 2 10 25 0.65536000000000000000e5
-1977 2 11 13 -0.65536000000000000000e5
-1977 3 3 16 -0.49152000000000000000e5
-1977 3 4 17 -0.16384000000000000000e5
-1977 3 7 12 -0.16384000000000000000e5
-1977 3 7 20 -0.65536000000000000000e5
-1977 3 8 21 -0.13107200000000000000e6
-1977 3 12 21 0.26214400000000000000e6
-1977 3 14 19 -0.13107200000000000000e6
-1977 3 14 27 0.16384000000000000000e5
-1977 4 1 13 -0.16384000000000000000e5
-1977 4 2 14 -0.16384000000000000000e5
-1977 4 3 15 -0.32768000000000000000e5
-1977 4 10 10 -0.65536000000000000000e5
-1977 4 13 13 -0.26214400000000000000e6
-1978 2 1 31 -0.65536000000000000000e5
-1978 2 10 26 0.65536000000000000000e5
-1979 1 2 33 -0.65536000000000000000e5
-1979 1 3 34 0.13107200000000000000e6
-1979 1 11 42 0.65536000000000000000e5
-1979 1 12 43 0.13107200000000000000e6
-1979 1 16 47 -0.13107200000000000000e6
-1979 1 28 43 -0.65536000000000000000e5
-1979 1 32 47 -0.65536000000000000000e5
-1979 1 33 48 -0.65536000000000000000e5
-1979 2 7 21 -0.65536000000000000000e5
-1979 2 10 27 0.65536000000000000000e5
-1979 2 12 26 -0.65536000000000000000e5
-1979 3 2 31 -0.65536000000000000000e5
-1979 3 3 32 -0.65536000000000000000e5
-1979 3 12 41 -0.13107200000000000000e6
-1979 3 13 42 -0.13107200000000000000e6
-1979 3 28 41 -0.65536000000000000000e5
-1979 3 29 42 -0.65536000000000000000e5
-1979 4 3 31 0.65536000000000000000e5
-1980 2 10 28 0.65536000000000000000e5
-1980 2 12 26 -0.65536000000000000000e5
-1981 1 12 43 0.65536000000000000000e5
-1981 1 16 23 0.65536000000000000000e5
-1981 1 16 47 0.65536000000000000000e5
-1981 1 27 34 -0.13107200000000000000e6
-1981 2 10 29 0.65536000000000000000e5
-1981 3 1 34 -0.65536000000000000000e5
-1981 3 12 41 0.65536000000000000000e5
-1982 1 12 43 0.65536000000000000000e5
-1982 1 13 44 -0.13107200000000000000e6
-1982 1 16 47 0.65536000000000000000e5
-1982 1 17 48 0.65536000000000000000e5
-1982 2 10 30 0.65536000000000000000e5
-1982 3 12 41 0.65536000000000000000e5
-1982 3 13 42 0.65536000000000000000e5
-1983 1 4 35 0.32768000000000000000e5
-1983 1 12 43 0.32768000000000000000e5
-1983 1 13 44 0.65536000000000000000e5
-1983 1 14 45 0.65536000000000000000e5
-1983 1 17 48 -0.32768000000000000000e5
-1983 1 18 49 -0.32768000000000000000e5
-1983 1 20 27 -0.13107200000000000000e6
-1983 1 27 34 0.65536000000000000000e5
-1983 2 9 23 0.32768000000000000000e5
-1983 2 10 31 0.65536000000000000000e5
-1983 2 14 28 -0.32768000000000000000e5
-1983 3 5 34 0.32768000000000000000e5
-1983 3 7 36 0.13107200000000000000e6
-1983 3 13 42 -0.32768000000000000000e5
-1983 3 14 27 0.32768000000000000000e5
-1983 3 14 43 -0.32768000000000000000e5
-1983 3 16 29 -0.65536000000000000000e5
-1984 1 2 33 -0.65536000000000000000e5
-1984 1 3 34 0.13107200000000000000e6
-1984 1 9 40 0.32768000000000000000e5
-1984 1 10 41 -0.13107200000000000000e6
-1984 1 12 43 0.13107200000000000000e6
-1984 1 16 47 -0.13107200000000000000e6
-1984 1 26 41 -0.32768000000000000000e5
-1984 1 28 43 -0.65536000000000000000e5
-1984 1 32 47 0.65536000000000000000e5
-1984 2 7 21 -0.65536000000000000000e5
-1984 2 10 32 0.65536000000000000000e5
-1984 2 20 34 -0.65536000000000000000e5
-1984 3 2 31 -0.65536000000000000000e5
-1984 3 3 32 -0.65536000000000000000e5
-1984 3 8 37 -0.32768000000000000000e5
-1984 3 9 38 0.32768000000000000000e5
-1984 3 22 27 -0.32768000000000000000e5
-1984 3 22 35 -0.13107200000000000000e6
-1984 3 28 41 0.65536000000000000000e5
-1984 4 1 29 -0.32768000000000000000e5
-1984 4 2 30 0.32768000000000000000e5
-1984 4 6 34 -0.65536000000000000000e5
-1985 2 10 33 0.65536000000000000000e5
-1985 2 20 34 -0.65536000000000000000e5
-1985 4 6 34 -0.65536000000000000000e5
-1986 1 12 43 0.65536000000000000000e5
-1986 1 16 47 0.65536000000000000000e5
-1986 1 17 48 0.65536000000000000000e5
-1986 1 34 41 -0.13107200000000000000e6
-1986 2 10 34 0.65536000000000000000e5
-1986 3 22 35 -0.65536000000000000000e5
-1987 2 10 35 0.65536000000000000000e5
-1987 2 20 34 -0.65536000000000000000e5
-1988 1 2 17 0.16384000000000000000e5
-1988 1 3 18 0.16384000000000000000e5
-1988 1 3 34 0.16384000000000000000e5
-1988 1 4 19 0.32768000000000000000e5
-1988 1 10 17 0.32768000000000000000e5
-1988 1 20 27 -0.65536000000000000000e5
-1988 2 6 12 0.16384000000000000000e5
-1988 2 11 11 0.65536000000000000000e5
-1988 3 3 16 0.16384000000000000000e5
-1988 3 7 20 -0.65536000000000000000e5
-1989 1 3 18 -0.32768000000000000000e5
-1989 1 4 19 0.65536000000000000000e5
-1989 1 4 35 0.32768000000000000000e5
-1989 1 5 36 0.65536000000000000000e5
-1989 1 12 43 0.65536000000000000000e5
-1989 1 14 45 0.65536000000000000000e5
-1989 1 17 32 -0.13107200000000000000e6
-1989 1 17 48 -0.32768000000000000000e5
-1989 1 18 49 -0.32768000000000000000e5
-1989 2 9 23 0.32768000000000000000e5
-1989 2 11 12 0.65536000000000000000e5
-1989 2 14 28 -0.32768000000000000000e5
-1989 3 3 16 -0.32768000000000000000e5
-1989 3 4 17 -0.32768000000000000000e5
-1989 3 5 34 0.32768000000000000000e5
-1989 3 13 42 -0.32768000000000000000e5
-1989 3 14 27 0.65536000000000000000e5
-1989 3 14 43 -0.32768000000000000000e5
-1989 4 2 14 -0.32768000000000000000e5
-1989 4 3 15 -0.65536000000000000000e5
-1990 2 11 14 0.65536000000000000000e5
-1990 2 11 25 -0.65536000000000000000e5
-1990 4 10 14 -0.65536000000000000000e5
-1991 1 2 17 0.16384000000000000000e5
-1991 1 3 18 0.16384000000000000000e5
-1991 1 3 34 0.81920000000000000000e4
-1991 1 4 19 0.16384000000000000000e5
-1991 1 5 20 0.16384000000000000000e5
-1991 1 5 36 -0.16384000000000000000e5
-1991 1 6 21 0.32768000000000000000e5
-1991 1 10 17 0.16384000000000000000e5
-1991 1 12 43 -0.81920000000000000000e4
-1991 1 13 20 0.13107200000000000000e6
-1991 1 16 23 -0.81920000000000000000e4
-1991 1 16 31 0.32768000000000000000e5
-1991 1 17 32 0.32768000000000000000e5
-1991 1 19 34 -0.13107200000000000000e6
-1991 1 20 27 -0.32768000000000000000e5
-1991 2 6 12 0.81920000000000000000e4
-1991 2 9 15 0.32768000000000000000e5
-1991 2 10 24 0.16384000000000000000e5
-1991 2 11 13 0.32768000000000000000e5
-1991 2 11 15 0.65536000000000000000e5
-1991 2 11 25 -0.32768000000000000000e5
-1991 3 3 16 0.24576000000000000000e5
-1991 3 4 17 0.81920000000000000000e4
-1991 3 7 12 0.81920000000000000000e4
-1991 3 12 21 -0.13107200000000000000e6
-1991 3 14 27 -0.81920000000000000000e4
-1991 4 1 13 0.81920000000000000000e4
-1991 4 2 14 0.81920000000000000000e4
-1991 4 3 15 0.16384000000000000000e5
-1991 4 10 10 0.32768000000000000000e5
-1991 4 10 14 -0.32768000000000000000e5
-1992 1 1 32 0.65536000000000000000e5
-1992 1 3 34 0.13107200000000000000e6
-1992 1 10 41 -0.65536000000000000000e5
-1992 1 16 23 -0.13107200000000000000e6
-1992 2 7 21 -0.65536000000000000000e5
-1992 2 11 16 0.65536000000000000000e5
-1992 3 3 32 -0.65536000000000000000e5
-1993 2 7 21 -0.65536000000000000000e5
-1993 2 11 17 0.65536000000000000000e5
-1994 2 11 18 0.65536000000000000000e5
-1994 2 12 26 -0.65536000000000000000e5
-1994 4 8 20 -0.65536000000000000000e5
-1995 1 2 33 -0.65536000000000000000e5
-1995 1 4 35 -0.13107200000000000000e6
-1995 1 11 42 0.65536000000000000000e5
-1995 1 12 43 0.13107200000000000000e6
-1995 2 11 19 0.65536000000000000000e5
-1995 2 12 26 -0.65536000000000000000e5
-1995 3 4 33 0.65536000000000000000e5
-1995 3 14 27 0.13107200000000000000e6
-1995 4 8 20 -0.65536000000000000000e5
-1996 1 3 18 -0.65536000000000000000e5
-1996 1 3 34 0.65536000000000000000e5
-1996 1 4 19 0.13107200000000000000e6
-1996 1 4 35 0.65536000000000000000e5
-1996 1 12 43 0.19660800000000000000e6
-1996 1 14 45 0.13107200000000000000e6
-1996 1 16 23 0.65536000000000000000e5
-1996 1 17 48 -0.65536000000000000000e5
-1996 1 18 49 -0.65536000000000000000e5
-1996 1 20 27 -0.26214400000000000000e6
-1996 2 9 23 0.65536000000000000000e5
-1996 2 10 24 0.13107200000000000000e6
-1996 2 11 20 0.65536000000000000000e5
-1996 2 14 28 -0.65536000000000000000e5
-1996 3 3 16 -0.65536000000000000000e5
-1996 3 4 17 -0.65536000000000000000e5
-1996 3 5 34 0.65536000000000000000e5
-1996 3 13 42 -0.65536000000000000000e5
-1996 3 14 27 0.19660800000000000000e6
-1996 3 14 43 -0.65536000000000000000e5
-1996 4 2 14 -0.65536000000000000000e5
-1997 1 3 18 0.65536000000000000000e5
-1997 1 3 34 0.65536000000000000000e5
-1997 1 4 19 -0.13107200000000000000e6
-1997 1 4 35 0.65536000000000000000e5
-1997 2 11 21 0.65536000000000000000e5
-1997 3 3 16 0.65536000000000000000e5
-1997 3 4 17 0.65536000000000000000e5
-1997 4 2 14 0.65536000000000000000e5
-1998 2 9 23 -0.65536000000000000000e5
-1998 2 11 22 0.65536000000000000000e5
-1999 2 10 24 -0.65536000000000000000e5
-1999 2 11 23 0.65536000000000000000e5
-2000 1 3 18 -0.32768000000000000000e5
-2000 1 4 19 0.65536000000000000000e5
-2000 1 4 35 0.32768000000000000000e5
-2000 1 5 36 0.65536000000000000000e5
-2000 1 12 43 0.65536000000000000000e5
-2000 1 14 45 0.65536000000000000000e5
-2000 1 17 32 -0.13107200000000000000e6
-2000 1 17 48 -0.32768000000000000000e5
-2000 1 18 49 -0.32768000000000000000e5
-2000 2 9 23 0.32768000000000000000e5
-2000 2 11 24 0.65536000000000000000e5
-2000 2 14 28 -0.32768000000000000000e5
-2000 3 3 16 -0.32768000000000000000e5
-2000 3 4 17 -0.32768000000000000000e5
-2000 3 5 34 0.32768000000000000000e5
-2000 3 13 42 -0.32768000000000000000e5
-2000 3 14 27 0.65536000000000000000e5
-2000 3 14 43 -0.32768000000000000000e5
-2000 4 2 14 -0.32768000000000000000e5
-2001 1 2 33 -0.65536000000000000000e5
-2001 1 3 34 0.13107200000000000000e6
-2001 1 11 42 0.65536000000000000000e5
-2001 1 12 43 0.13107200000000000000e6
-2001 1 16 47 -0.13107200000000000000e6
-2001 1 28 43 -0.65536000000000000000e5
-2001 1 32 47 -0.65536000000000000000e5
-2001 1 33 48 -0.65536000000000000000e5
-2001 2 7 21 -0.65536000000000000000e5
-2001 2 11 26 0.65536000000000000000e5
-2001 2 12 26 -0.65536000000000000000e5
-2001 3 2 31 -0.65536000000000000000e5
-2001 3 3 32 -0.65536000000000000000e5
-2001 3 12 41 -0.13107200000000000000e6
-2001 3 13 42 -0.13107200000000000000e6
-2001 3 28 41 -0.65536000000000000000e5
-2001 3 29 42 -0.65536000000000000000e5
-2001 4 3 31 0.65536000000000000000e5
-2002 2 11 27 0.65536000000000000000e5
-2002 2 12 26 -0.65536000000000000000e5
-2003 1 17 48 -0.13107200000000000000e6
-2003 1 28 43 0.65536000000000000000e5
-2003 1 32 47 0.65536000000000000000e5
-2003 1 33 48 0.65536000000000000000e5
-2003 2 11 28 0.65536000000000000000e5
-2003 3 28 41 0.65536000000000000000e5
-2003 3 29 42 0.65536000000000000000e5
-2003 4 3 31 -0.65536000000000000000e5
-2004 1 12 43 0.65536000000000000000e5
-2004 1 13 44 -0.13107200000000000000e6
-2004 1 16 47 0.65536000000000000000e5
-2004 1 17 48 0.65536000000000000000e5
-2004 2 11 29 0.65536000000000000000e5
-2004 3 12 41 0.65536000000000000000e5
-2004 3 13 42 0.65536000000000000000e5
-2005 1 4 35 -0.65536000000000000000e5
-2005 1 17 48 0.65536000000000000000e5
-2005 2 9 23 -0.65536000000000000000e5
-2005 2 11 30 0.65536000000000000000e5
-2005 3 5 34 -0.65536000000000000000e5
-2005 3 13 42 0.65536000000000000000e5
-2005 3 14 27 -0.65536000000000000000e5
-2005 3 16 29 0.13107200000000000000e6
-2006 1 3 18 -0.32768000000000000000e5
-2006 1 4 19 0.65536000000000000000e5
-2006 1 4 35 0.32768000000000000000e5
-2006 1 5 36 0.65536000000000000000e5
-2006 1 12 43 0.65536000000000000000e5
-2006 1 14 45 0.65536000000000000000e5
-2006 1 17 32 -0.13107200000000000000e6
-2006 1 17 48 -0.32768000000000000000e5
-2006 1 18 49 -0.32768000000000000000e5
-2006 2 9 23 0.32768000000000000000e5
-2006 2 11 31 0.65536000000000000000e5
-2006 2 14 28 -0.32768000000000000000e5
-2006 3 3 16 -0.32768000000000000000e5
-2006 3 4 17 -0.32768000000000000000e5
-2006 3 5 34 0.32768000000000000000e5
-2006 3 13 42 -0.32768000000000000000e5
-2006 3 14 27 0.65536000000000000000e5
-2006 3 14 43 -0.32768000000000000000e5
-2006 4 2 14 -0.32768000000000000000e5
-2006 4 11 23 0.65536000000000000000e5
-2007 2 11 32 0.65536000000000000000e5
-2007 2 20 34 -0.65536000000000000000e5
-2007 4 6 34 -0.65536000000000000000e5
-2008 1 17 48 -0.13107200000000000000e6
-2008 1 28 43 0.65536000000000000000e5
-2008 1 32 47 0.65536000000000000000e5
-2008 1 33 48 0.65536000000000000000e5
-2008 2 11 33 0.65536000000000000000e5
-2008 3 28 41 0.65536000000000000000e5
-2008 3 29 42 0.65536000000000000000e5
-2009 1 4 35 -0.65536000000000000000e5
-2009 1 17 48 0.65536000000000000000e5
-2009 2 9 23 -0.65536000000000000000e5
-2009 2 11 34 0.65536000000000000000e5
-2009 3 5 34 -0.65536000000000000000e5
-2009 3 13 42 0.65536000000000000000e5
-2009 3 14 27 -0.65536000000000000000e5
-2009 3 16 29 0.13107200000000000000e6
-2009 4 14 26 0.65536000000000000000e5
-2010 1 17 48 -0.13107200000000000000e6
-2010 1 28 43 0.65536000000000000000e5
-2010 1 32 47 0.65536000000000000000e5
-2010 1 33 48 0.65536000000000000000e5
-2010 2 11 35 0.65536000000000000000e5
-2010 3 28 41 0.65536000000000000000e5
-2010 3 29 42 0.65536000000000000000e5
-2010 4 23 27 0.65536000000000000000e5
-2011 1 3 18 0.16384000000000000000e5
-2011 1 4 35 -0.16384000000000000000e5
-2011 1 5 20 0.65536000000000000000e5
-2011 1 5 36 -0.32768000000000000000e5
-2011 1 10 17 0.65536000000000000000e5
-2011 1 11 18 0.32768000000000000000e5
-2011 1 12 43 -0.32768000000000000000e5
-2011 1 13 20 -0.13107200000000000000e6
-2011 1 14 45 -0.32768000000000000000e5
-2011 1 17 32 0.65536000000000000000e5
-2011 1 17 48 0.16384000000000000000e5
-2011 1 18 49 0.16384000000000000000e5
-2011 1 20 27 0.65536000000000000000e5
-2011 2 9 23 -0.16384000000000000000e5
-2011 2 11 25 0.65536000000000000000e5
-2011 2 12 12 0.65536000000000000000e5
-2011 2 14 28 0.16384000000000000000e5
-2011 3 3 16 0.16384000000000000000e5
-2011 3 4 17 0.16384000000000000000e5
-2011 3 5 34 -0.16384000000000000000e5
-2011 3 7 20 0.65536000000000000000e5
-2011 3 13 42 0.16384000000000000000e5
-2011 3 14 27 -0.32768000000000000000e5
-2011 3 14 43 0.16384000000000000000e5
-2011 4 2 14 0.16384000000000000000e5
-2011 4 3 15 0.32768000000000000000e5
-2011 4 10 14 0.65536000000000000000e5
-2012 2 11 25 -0.65536000000000000000e5
-2012 2 12 13 0.65536000000000000000e5
-2012 4 10 14 -0.65536000000000000000e5
-2013 2 9 15 -0.65536000000000000000e5
-2013 2 12 14 0.65536000000000000000e5
-2014 1 3 18 0.81920000000000000000e4
-2014 1 4 19 -0.16384000000000000000e5
-2014 1 5 36 -0.16384000000000000000e5
-2014 1 6 21 0.32768000000000000000e5
-2014 1 12 43 -0.81920000000000000000e4
-2014 1 13 20 0.13107200000000000000e6
-2014 1 13 44 0.16384000000000000000e5
-2014 1 14 45 0.16384000000000000000e5
-2014 1 20 27 -0.32768000000000000000e5
-2014 1 21 44 -0.13107200000000000000e6
-2014 1 33 36 0.65536000000000000000e5
-2014 2 9 15 0.32768000000000000000e5
-2014 2 11 25 -0.65536000000000000000e5
-2014 2 12 15 0.65536000000000000000e5
-2014 2 15 29 0.32768000000000000000e5
-2014 3 3 16 0.81920000000000000000e4
-2014 3 4 17 0.81920000000000000000e4
-2014 3 7 20 -0.32768000000000000000e5
-2014 3 7 36 -0.32768000000000000000e5
-2014 3 8 21 -0.65536000000000000000e5
-2014 3 14 19 -0.65536000000000000000e5
-2014 3 14 27 -0.81920000000000000000e4
-2014 3 16 29 -0.16384000000000000000e5
-2014 3 18 31 -0.32768000000000000000e5
-2014 3 19 32 -0.65536000000000000000e5
-2014 4 2 14 0.81920000000000000000e4
-2014 4 10 14 -0.32768000000000000000e5
-2014 4 11 15 -0.65536000000000000000e5
-2014 4 11 23 -0.16384000000000000000e5
-2014 4 13 25 -0.65536000000000000000e5
-2015 2 7 21 -0.65536000000000000000e5
-2015 2 12 16 0.65536000000000000000e5
-2016 2 12 17 0.65536000000000000000e5
-2016 2 12 26 -0.65536000000000000000e5
-2016 4 8 20 -0.65536000000000000000e5
-2017 1 2 33 -0.65536000000000000000e5
-2017 1 4 35 -0.13107200000000000000e6
-2017 1 11 42 0.65536000000000000000e5
-2017 1 12 43 0.13107200000000000000e6
-2017 2 12 18 0.65536000000000000000e5
-2017 2 12 26 -0.65536000000000000000e5
-2017 3 4 33 0.65536000000000000000e5
-2017 3 14 27 0.13107200000000000000e6
-2017 4 8 20 -0.65536000000000000000e5
-2018 1 10 41 -0.65536000000000000000e5
-2018 1 14 45 -0.26214400000000000000e6
-2018 1 17 48 0.13107200000000000000e6
-2018 1 18 49 0.13107200000000000000e6
-2018 1 26 33 0.65536000000000000000e5
-2018 1 28 43 0.65536000000000000000e5
-2018 1 32 47 0.65536000000000000000e5
-2018 1 33 48 0.65536000000000000000e5
-2018 2 12 19 0.65536000000000000000e5
-2018 2 14 28 0.13107200000000000000e6
-2018 3 13 42 0.26214400000000000000e6
-2018 3 14 43 0.13107200000000000000e6
-2018 3 28 41 0.65536000000000000000e5
-2018 3 29 42 0.65536000000000000000e5
-2018 4 3 31 -0.65536000000000000000e5
-2018 4 9 21 -0.65536000000000000000e5
-2019 1 3 18 0.65536000000000000000e5
-2019 1 3 34 0.65536000000000000000e5
-2019 1 4 19 -0.13107200000000000000e6
-2019 1 4 35 0.65536000000000000000e5
-2019 2 12 20 0.65536000000000000000e5
-2019 3 3 16 0.65536000000000000000e5
-2019 3 4 17 0.65536000000000000000e5
-2019 4 2 14 0.65536000000000000000e5
-2020 2 9 23 -0.65536000000000000000e5
-2020 2 12 21 0.65536000000000000000e5
-2021 1 4 35 0.65536000000000000000e5
-2021 1 5 36 -0.13107200000000000000e6
-2021 1 14 45 0.13107200000000000000e6
-2021 1 15 30 0.65536000000000000000e5
-2021 1 17 48 -0.65536000000000000000e5
-2021 1 18 49 -0.65536000000000000000e5
-2021 2 12 22 0.65536000000000000000e5
-2021 2 14 28 -0.65536000000000000000e5
-2021 3 5 34 0.65536000000000000000e5
-2021 3 13 42 -0.65536000000000000000e5
-2021 3 14 43 -0.65536000000000000000e5
-2022 1 3 18 -0.32768000000000000000e5
-2022 1 4 19 0.65536000000000000000e5
-2022 1 4 35 0.32768000000000000000e5
-2022 1 5 36 0.65536000000000000000e5
-2022 1 12 43 0.65536000000000000000e5
-2022 1 14 45 0.65536000000000000000e5
-2022 1 17 32 -0.13107200000000000000e6
-2022 1 17 48 -0.32768000000000000000e5
-2022 1 18 49 -0.32768000000000000000e5
-2022 2 9 23 0.32768000000000000000e5
-2022 2 12 23 0.65536000000000000000e5
-2022 2 14 28 -0.32768000000000000000e5
-2022 3 3 16 -0.32768000000000000000e5
-2022 3 4 17 -0.32768000000000000000e5
-2022 3 5 34 0.32768000000000000000e5
-2022 3 13 42 -0.32768000000000000000e5
-2022 3 14 27 0.65536000000000000000e5
-2022 3 14 43 -0.32768000000000000000e5
-2022 4 2 14 -0.32768000000000000000e5
-2023 1 4 35 0.32768000000000000000e5
-2023 1 5 36 0.65536000000000000000e5
-2023 1 11 18 0.65536000000000000000e5
-2023 1 12 43 0.32768000000000000000e5
-2023 1 13 20 -0.26214400000000000000e6
-2023 1 14 45 0.65536000000000000000e5
-2023 1 17 32 0.13107200000000000000e6
-2023 1 17 48 -0.32768000000000000000e5
-2023 1 18 49 -0.32768000000000000000e5
-2023 1 20 27 0.13107200000000000000e6
-2023 2 9 23 0.32768000000000000000e5
-2023 2 11 25 0.13107200000000000000e6
-2023 2 12 24 0.65536000000000000000e5
-2023 2 14 28 -0.32768000000000000000e5
-2023 3 5 34 0.32768000000000000000e5
-2023 3 6 19 -0.65536000000000000000e5
-2023 3 8 21 0.26214400000000000000e6
-2023 3 13 42 -0.32768000000000000000e5
-2023 3 14 27 0.32768000000000000000e5
-2023 3 14 43 -0.32768000000000000000e5
-2024 1 6 21 -0.65536000000000000000e5
-2024 1 18 33 0.65536000000000000000e5
-2024 2 9 15 -0.65536000000000000000e5
-2024 2 12 25 0.65536000000000000000e5
-2024 3 7 20 0.65536000000000000000e5
-2024 3 8 21 -0.13107200000000000000e6
-2024 3 14 19 0.13107200000000000000e6
-2024 4 10 14 0.65536000000000000000e5
-2025 1 17 48 -0.13107200000000000000e6
-2025 1 28 43 0.65536000000000000000e5
-2025 1 32 47 0.65536000000000000000e5
-2025 1 33 48 0.65536000000000000000e5
-2025 2 12 27 0.65536000000000000000e5
-2025 3 28 41 0.65536000000000000000e5
-2025 3 29 42 0.65536000000000000000e5
-2025 4 3 31 -0.65536000000000000000e5
-2026 1 10 41 -0.65536000000000000000e5
-2026 1 14 45 -0.26214400000000000000e6
-2026 1 17 48 0.13107200000000000000e6
-2026 1 18 49 0.13107200000000000000e6
-2026 1 26 33 0.65536000000000000000e5
-2026 1 28 43 0.65536000000000000000e5
-2026 1 32 47 0.65536000000000000000e5
-2026 1 33 48 0.65536000000000000000e5
-2026 2 12 28 0.65536000000000000000e5
-2026 2 14 28 0.13107200000000000000e6
-2026 3 13 42 0.26214400000000000000e6
-2026 3 14 43 0.13107200000000000000e6
-2026 3 28 41 0.65536000000000000000e5
-2026 3 29 42 0.65536000000000000000e5
-2026 4 3 31 -0.65536000000000000000e5
-2027 1 4 35 -0.65536000000000000000e5
-2027 1 17 48 0.65536000000000000000e5
-2027 2 9 23 -0.65536000000000000000e5
-2027 2 12 29 0.65536000000000000000e5
-2027 3 5 34 -0.65536000000000000000e5
-2027 3 13 42 0.65536000000000000000e5
-2027 3 14 27 -0.65536000000000000000e5
-2027 3 16 29 0.13107200000000000000e6
-2028 2 12 30 0.65536000000000000000e5
-2028 2 14 28 -0.65536000000000000000e5
-2029 1 4 35 0.32768000000000000000e5
-2029 1 11 18 0.65536000000000000000e5
-2029 1 12 43 0.32768000000000000000e5
-2029 1 13 20 -0.26214400000000000000e6
-2029 1 14 45 0.13107200000000000000e6
-2029 1 17 32 0.13107200000000000000e6
-2029 1 17 48 -0.32768000000000000000e5
-2029 1 18 49 -0.32768000000000000000e5
-2029 1 20 27 0.13107200000000000000e6
-2029 2 9 23 0.32768000000000000000e5
-2029 2 11 25 0.13107200000000000000e6
-2029 2 12 31 0.65536000000000000000e5
-2029 2 14 28 -0.32768000000000000000e5
-2029 3 5 34 0.32768000000000000000e5
-2029 3 6 19 -0.65536000000000000000e5
-2029 3 8 21 0.26214400000000000000e6
-2029 3 13 42 -0.32768000000000000000e5
-2029 3 14 27 0.32768000000000000000e5
-2029 3 14 43 -0.32768000000000000000e5
-2029 3 16 29 -0.65536000000000000000e5
-2029 3 17 30 -0.65536000000000000000e5
-2029 3 18 31 0.13107200000000000000e6
-2030 1 17 48 -0.13107200000000000000e6
-2030 1 28 43 0.65536000000000000000e5
-2030 1 32 47 0.65536000000000000000e5
-2030 1 33 48 0.65536000000000000000e5
-2030 2 12 32 0.65536000000000000000e5
-2030 3 28 41 0.65536000000000000000e5
-2030 3 29 42 0.65536000000000000000e5
-2031 1 28 43 0.65536000000000000000e5
-2031 1 33 40 0.65536000000000000000e5
-2031 1 33 48 0.65536000000000000000e5
-2031 1 34 49 -0.13107200000000000000e6
-2031 2 12 33 0.65536000000000000000e5
-2031 3 18 47 -0.13107200000000000000e6
-2031 3 29 42 0.65536000000000000000e5
-2032 1 14 45 -0.26214400000000000000e6
-2032 1 17 48 0.13107200000000000000e6
-2032 1 18 49 0.13107200000000000000e6
-2032 1 34 49 0.13107200000000000000e6
-2032 2 12 34 0.65536000000000000000e5
-2032 2 14 28 0.65536000000000000000e5
-2032 3 14 43 0.65536000000000000000e5
-2032 3 15 44 -0.13107200000000000000e6
-2032 3 16 45 0.26214400000000000000e6
-2032 3 18 47 0.13107200000000000000e6
-2032 3 22 35 -0.65536000000000000000e5
-2032 4 14 26 -0.65536000000000000000e5
-2032 4 15 27 -0.13107200000000000000e6
-2033 1 6 53 -0.16384000000000000000e5
-2033 1 25 40 0.16384000000000000000e5
-2033 1 28 43 0.65536000000000000000e5
-2033 1 33 40 0.65536000000000000000e5
-2033 1 33 48 0.65536000000000000000e5
-2033 1 34 49 -0.13107200000000000000e6
-2033 2 4 34 -0.32768000000000000000e5
-2033 2 12 35 0.65536000000000000000e5
-2033 2 21 35 0.32768000000000000000e5
-2033 3 5 50 -0.32768000000000000000e5
-2033 3 14 51 -0.13107200000000000000e6
-2033 3 24 37 -0.16384000000000000000e5
-2033 3 27 40 -0.65536000000000000000e5
-2033 3 29 42 0.65536000000000000000e5
-2033 3 30 43 0.65536000000000000000e5
-2033 4 4 32 0.16384000000000000000e5
-2033 4 7 35 0.32768000000000000000e5
-2033 4 16 28 -0.16384000000000000000e5
-2033 4 19 31 0.65536000000000000000e5
-2034 1 2 17 0.81920000000000000000e4
-2034 1 3 18 0.81920000000000000000e4
-2034 1 3 34 0.40960000000000000000e4
-2034 1 4 19 0.81920000000000000000e4
-2034 1 5 20 0.81920000000000000000e4
-2034 1 5 36 -0.81920000000000000000e4
-2034 1 10 17 0.81920000000000000000e4
-2034 1 12 19 0.32768000000000000000e5
-2034 1 12 43 -0.40960000000000000000e4
-2034 1 13 20 0.32768000000000000000e5
-2034 1 16 19 -0.65536000000000000000e5
-2034 1 16 23 -0.40960000000000000000e4
-2034 1 16 31 0.16384000000000000000e5
-2034 1 17 32 0.16384000000000000000e5
-2034 2 6 12 0.40960000000000000000e4
-2034 2 10 24 0.81920000000000000000e4
-2034 2 11 13 0.16384000000000000000e5
-2034 2 13 13 0.65536000000000000000e5
-2034 3 3 16 0.12288000000000000000e5
-2034 3 4 17 0.40960000000000000000e4
-2034 3 7 12 0.40960000000000000000e4
-2034 3 7 20 0.16384000000000000000e5
-2034 3 14 27 -0.40960000000000000000e4
-2034 4 1 13 0.40960000000000000000e4
-2034 4 2 14 0.40960000000000000000e4
-2034 4 3 15 0.81920000000000000000e4
-2034 4 10 10 0.16384000000000000000e5
-2035 1 2 17 0.16384000000000000000e5
-2035 1 3 18 0.16384000000000000000e5
-2035 1 3 34 0.81920000000000000000e4
-2035 1 4 19 0.16384000000000000000e5
-2035 1 5 20 0.16384000000000000000e5
-2035 1 5 36 -0.16384000000000000000e5
-2035 1 6 21 0.32768000000000000000e5
-2035 1 10 17 0.16384000000000000000e5
-2035 1 12 43 -0.81920000000000000000e4
-2035 1 13 20 0.13107200000000000000e6
-2035 1 16 23 -0.81920000000000000000e4
-2035 1 16 31 0.32768000000000000000e5
-2035 1 17 32 0.32768000000000000000e5
-2035 1 19 34 -0.13107200000000000000e6
-2035 1 20 27 -0.32768000000000000000e5
-2035 2 6 12 0.81920000000000000000e4
-2035 2 9 15 0.32768000000000000000e5
-2035 2 10 24 0.16384000000000000000e5
-2035 2 11 13 0.32768000000000000000e5
-2035 2 11 25 -0.32768000000000000000e5
-2035 2 13 14 0.65536000000000000000e5
-2035 3 3 16 0.24576000000000000000e5
-2035 3 4 17 0.81920000000000000000e4
-2035 3 7 12 0.81920000000000000000e4
-2035 3 12 21 -0.13107200000000000000e6
-2035 3 14 27 -0.81920000000000000000e4
-2035 4 1 13 0.81920000000000000000e4
-2035 4 2 14 0.81920000000000000000e4
-2035 4 3 15 0.16384000000000000000e5
-2035 4 10 10 0.32768000000000000000e5
-2035 4 10 14 -0.32768000000000000000e5
-2036 1 3 34 0.65536000000000000000e5
-2036 1 4 35 -0.65536000000000000000e5
-2036 1 12 27 0.65536000000000000000e5
-2036 1 12 43 -0.65536000000000000000e5
-2036 1 14 45 -0.13107200000000000000e6
-2036 1 16 23 0.65536000000000000000e5
-2036 1 16 31 -0.26214400000000000000e6
-2036 1 17 48 0.65536000000000000000e5
-2036 1 18 49 0.65536000000000000000e5
-2036 1 20 27 0.26214400000000000000e6
-2036 2 7 13 0.13107200000000000000e6
-2036 2 9 23 -0.65536000000000000000e5
-2036 2 10 24 -0.13107200000000000000e6
-2036 2 13 16 0.65536000000000000000e5
-2036 2 14 28 0.65536000000000000000e5
-2036 3 5 34 -0.65536000000000000000e5
-2036 3 13 42 0.65536000000000000000e5
-2036 3 14 27 -0.65536000000000000000e5
-2036 3 14 43 0.65536000000000000000e5
-2036 4 10 10 -0.26214400000000000000e6
-2037 1 3 18 -0.65536000000000000000e5
-2037 1 3 34 0.65536000000000000000e5
-2037 1 4 19 0.13107200000000000000e6
-2037 1 4 35 0.65536000000000000000e5
-2037 1 12 43 0.19660800000000000000e6
-2037 1 14 45 0.13107200000000000000e6
-2037 1 16 23 0.65536000000000000000e5
-2037 1 17 48 -0.65536000000000000000e5
-2037 1 18 49 -0.65536000000000000000e5
-2037 1 20 27 -0.26214400000000000000e6
-2037 2 9 23 0.65536000000000000000e5
-2037 2 10 24 0.13107200000000000000e6
-2037 2 13 17 0.65536000000000000000e5
-2037 2 14 28 -0.65536000000000000000e5
-2037 3 3 16 -0.65536000000000000000e5
-2037 3 4 17 -0.65536000000000000000e5
-2037 3 5 34 0.65536000000000000000e5
-2037 3 13 42 -0.65536000000000000000e5
-2037 3 14 27 0.19660800000000000000e6
-2037 3 14 43 -0.65536000000000000000e5
-2037 4 2 14 -0.65536000000000000000e5
-2038 1 3 18 0.65536000000000000000e5
-2038 1 3 34 0.65536000000000000000e5
-2038 1 4 19 -0.13107200000000000000e6
-2038 1 4 35 0.65536000000000000000e5
-2038 2 13 18 0.65536000000000000000e5
-2038 3 3 16 0.65536000000000000000e5
-2038 3 4 17 0.65536000000000000000e5
-2038 4 2 14 0.65536000000000000000e5
-2039 2 9 23 -0.65536000000000000000e5
-2039 2 13 19 0.65536000000000000000e5
-2040 2 7 13 -0.65536000000000000000e5
-2040 2 13 20 0.65536000000000000000e5
-2040 4 10 10 0.13107200000000000000e6
-2041 2 10 24 -0.65536000000000000000e5
-2041 2 13 21 0.65536000000000000000e5
-2042 1 3 18 -0.32768000000000000000e5
-2042 1 4 19 0.65536000000000000000e5
-2042 1 4 35 0.32768000000000000000e5
-2042 1 5 36 0.65536000000000000000e5
-2042 1 12 43 0.65536000000000000000e5
-2042 1 14 45 0.65536000000000000000e5
-2042 1 17 32 -0.13107200000000000000e6
-2042 1 17 48 -0.32768000000000000000e5
-2042 1 18 49 -0.32768000000000000000e5
-2042 2 9 23 0.32768000000000000000e5
-2042 2 13 22 0.65536000000000000000e5
-2042 2 14 28 -0.32768000000000000000e5
-2042 3 3 16 -0.32768000000000000000e5
-2042 3 4 17 -0.32768000000000000000e5
-2042 3 5 34 0.32768000000000000000e5
-2042 3 13 42 -0.32768000000000000000e5
-2042 3 14 27 0.65536000000000000000e5
-2042 3 14 43 -0.32768000000000000000e5
-2042 4 2 14 -0.32768000000000000000e5
-2043 1 2 17 -0.32768000000000000000e5
-2043 1 3 18 -0.32768000000000000000e5
-2043 1 3 34 -0.16384000000000000000e5
-2043 1 4 19 -0.32768000000000000000e5
-2043 1 5 20 -0.32768000000000000000e5
-2043 1 5 36 0.32768000000000000000e5
-2043 1 10 17 -0.32768000000000000000e5
-2043 1 12 43 0.16384000000000000000e5
-2043 1 16 23 0.16384000000000000000e5
-2043 1 20 27 0.65536000000000000000e5
-2043 2 6 12 -0.16384000000000000000e5
-2043 2 10 24 -0.32768000000000000000e5
-2043 2 11 13 -0.65536000000000000000e5
-2043 2 13 23 0.65536000000000000000e5
-2043 3 3 16 -0.49152000000000000000e5
-2043 3 4 17 -0.16384000000000000000e5
-2043 3 7 12 -0.16384000000000000000e5
-2043 3 7 20 -0.65536000000000000000e5
-2043 3 8 21 -0.13107200000000000000e6
-2043 3 12 21 0.26214400000000000000e6
-2043 3 14 19 -0.13107200000000000000e6
-2043 3 14 27 0.16384000000000000000e5
-2043 4 1 13 -0.16384000000000000000e5
-2043 4 2 14 -0.16384000000000000000e5
-2043 4 3 15 -0.32768000000000000000e5
-2043 4 10 10 -0.65536000000000000000e5
-2043 4 13 13 -0.26214400000000000000e6
-2044 2 11 25 -0.65536000000000000000e5
-2044 2 13 24 0.65536000000000000000e5
-2045 1 2 17 0.16384000000000000000e5
-2045 1 3 18 0.16384000000000000000e5
-2045 1 3 34 0.81920000000000000000e4
-2045 1 4 19 0.16384000000000000000e5
-2045 1 5 20 0.16384000000000000000e5
-2045 1 5 36 -0.16384000000000000000e5
-2045 1 6 21 0.32768000000000000000e5
-2045 1 10 17 0.16384000000000000000e5
-2045 1 12 43 -0.81920000000000000000e4
-2045 1 13 20 0.13107200000000000000e6
-2045 1 16 23 -0.81920000000000000000e4
-2045 1 16 31 0.32768000000000000000e5
-2045 1 17 32 0.32768000000000000000e5
-2045 1 19 34 -0.13107200000000000000e6
-2045 1 20 27 -0.32768000000000000000e5
-2045 2 6 12 0.81920000000000000000e4
-2045 2 9 15 0.32768000000000000000e5
-2045 2 10 24 0.16384000000000000000e5
-2045 2 11 13 0.32768000000000000000e5
-2045 2 11 25 -0.32768000000000000000e5
-2045 2 13 25 0.65536000000000000000e5
-2045 3 3 16 0.24576000000000000000e5
-2045 3 4 17 0.81920000000000000000e4
-2045 3 7 12 0.81920000000000000000e4
-2045 3 12 21 -0.13107200000000000000e6
-2045 3 14 27 -0.81920000000000000000e4
-2045 4 1 13 0.81920000000000000000e4
-2045 4 2 14 0.81920000000000000000e4
-2045 4 3 15 0.16384000000000000000e5
-2045 4 10 10 0.32768000000000000000e5
-2045 4 10 14 -0.32768000000000000000e5
-2045 4 13 13 0.13107200000000000000e6
-2046 1 12 43 0.65536000000000000000e5
-2046 1 16 23 0.65536000000000000000e5
-2046 1 16 47 0.65536000000000000000e5
-2046 1 27 34 -0.13107200000000000000e6
-2046 2 13 26 0.65536000000000000000e5
-2046 3 1 34 -0.65536000000000000000e5
-2046 3 12 41 0.65536000000000000000e5
-2047 1 12 43 0.65536000000000000000e5
-2047 1 13 44 -0.13107200000000000000e6
-2047 1 16 47 0.65536000000000000000e5
-2047 1 17 48 0.65536000000000000000e5
-2047 2 13 27 0.65536000000000000000e5
-2047 3 12 41 0.65536000000000000000e5
-2047 3 13 42 0.65536000000000000000e5
-2048 1 4 35 -0.65536000000000000000e5
-2048 1 17 48 0.65536000000000000000e5
-2048 2 9 23 -0.65536000000000000000e5
-2048 2 13 28 0.65536000000000000000e5
-2048 3 5 34 -0.65536000000000000000e5
-2048 3 13 42 0.65536000000000000000e5
-2048 3 14 27 -0.65536000000000000000e5
-2048 3 16 29 0.13107200000000000000e6
-2049 1 4 35 0.32768000000000000000e5
-2049 1 12 43 0.32768000000000000000e5
-2049 1 13 44 0.65536000000000000000e5
-2049 1 14 45 0.65536000000000000000e5
-2049 1 17 48 -0.32768000000000000000e5
-2049 1 18 49 -0.32768000000000000000e5
-2049 1 20 27 -0.13107200000000000000e6
-2049 1 27 34 0.65536000000000000000e5
-2049 2 9 23 0.32768000000000000000e5
-2049 2 13 29 0.65536000000000000000e5
-2049 2 14 28 -0.32768000000000000000e5
-2049 3 5 34 0.32768000000000000000e5
-2049 3 7 36 0.13107200000000000000e6
-2049 3 13 42 -0.32768000000000000000e5
-2049 3 14 27 0.32768000000000000000e5
-2049 3 14 43 -0.32768000000000000000e5
-2049 3 16 29 -0.65536000000000000000e5
-2050 1 3 18 -0.32768000000000000000e5
-2050 1 4 19 0.65536000000000000000e5
-2050 1 4 35 0.32768000000000000000e5
-2050 1 5 36 0.65536000000000000000e5
-2050 1 12 43 0.65536000000000000000e5
-2050 1 14 45 0.65536000000000000000e5
-2050 1 17 32 -0.13107200000000000000e6
-2050 1 17 48 -0.32768000000000000000e5
-2050 1 18 49 -0.32768000000000000000e5
-2050 2 9 23 0.32768000000000000000e5
-2050 2 13 30 0.65536000000000000000e5
-2050 2 14 28 -0.32768000000000000000e5
-2050 3 3 16 -0.32768000000000000000e5
-2050 3 4 17 -0.32768000000000000000e5
-2050 3 5 34 0.32768000000000000000e5
-2050 3 13 42 -0.32768000000000000000e5
-2050 3 14 27 0.65536000000000000000e5
-2050 3 14 43 -0.32768000000000000000e5
-2050 4 2 14 -0.32768000000000000000e5
-2050 4 11 23 0.65536000000000000000e5
-2051 2 13 31 0.65536000000000000000e5
-2051 2 15 29 -0.65536000000000000000e5
-2052 1 12 43 0.65536000000000000000e5
-2052 1 16 47 0.65536000000000000000e5
-2052 1 17 48 0.65536000000000000000e5
-2052 1 34 41 -0.13107200000000000000e6
-2052 2 13 32 0.65536000000000000000e5
-2052 3 22 35 -0.65536000000000000000e5
-2053 1 4 35 -0.65536000000000000000e5
-2053 1 17 48 0.65536000000000000000e5
-2053 2 9 23 -0.65536000000000000000e5
-2053 2 13 33 0.65536000000000000000e5
-2053 3 5 34 -0.65536000000000000000e5
-2053 3 13 42 0.65536000000000000000e5
-2053 3 14 27 -0.65536000000000000000e5
-2053 3 16 29 0.13107200000000000000e6
-2053 4 14 26 0.65536000000000000000e5
-2054 1 4 35 0.32768000000000000000e5
-2054 1 12 43 0.32768000000000000000e5
-2054 1 14 45 0.13107200000000000000e6
-2054 1 17 48 -0.32768000000000000000e5
-2054 1 18 49 -0.32768000000000000000e5
-2054 1 19 50 -0.13107200000000000000e6
-2054 1 34 41 0.65536000000000000000e5
-2054 2 9 23 0.32768000000000000000e5
-2054 2 13 34 0.65536000000000000000e5
-2054 2 14 28 -0.32768000000000000000e5
-2054 3 5 34 0.32768000000000000000e5
-2054 3 13 42 -0.32768000000000000000e5
-2054 3 14 27 0.32768000000000000000e5
-2054 3 14 43 -0.32768000000000000000e5
-2054 3 15 44 0.65536000000000000000e5
-2054 3 16 29 -0.65536000000000000000e5
-2054 3 16 45 -0.13107200000000000000e6
-2054 4 15 27 0.65536000000000000000e5
-2055 1 4 35 -0.65536000000000000000e5
-2055 1 6 53 -0.81920000000000000000e4
-2055 1 17 48 0.65536000000000000000e5
-2055 1 25 40 0.81920000000000000000e4
-2055 2 4 34 -0.16384000000000000000e5
-2055 2 9 23 -0.65536000000000000000e5
-2055 2 13 35 0.65536000000000000000e5
-2055 2 21 35 0.16384000000000000000e5
-2055 3 5 34 -0.65536000000000000000e5
-2055 3 5 50 -0.16384000000000000000e5
-2055 3 7 52 -0.65536000000000000000e5
-2055 3 13 42 0.65536000000000000000e5
-2055 3 14 27 -0.65536000000000000000e5
-2055 3 16 29 0.13107200000000000000e6
-2055 3 18 47 -0.65536000000000000000e5
-2055 3 24 37 -0.81920000000000000000e4
-2055 3 27 40 -0.32768000000000000000e5
-2055 3 28 41 -0.32768000000000000000e5
-2055 3 29 42 -0.32768000000000000000e5
-2055 3 31 44 0.13107200000000000000e6
-2055 4 4 32 0.81920000000000000000e4
-2055 4 7 35 0.16384000000000000000e5
-2055 4 14 26 0.65536000000000000000e5
-2055 4 16 28 -0.81920000000000000000e4
-2055 4 23 27 -0.32768000000000000000e5
-2056 1 3 18 0.40960000000000000000e4
-2056 1 4 19 -0.81920000000000000000e4
-2056 1 5 36 -0.81920000000000000000e4
-2056 1 6 21 0.16384000000000000000e5
-2056 1 12 43 -0.40960000000000000000e4
-2056 1 13 20 0.65536000000000000000e5
-2056 1 13 44 0.81920000000000000000e4
-2056 1 14 45 0.81920000000000000000e4
-2056 1 20 27 -0.16384000000000000000e5
-2056 1 21 44 -0.65536000000000000000e5
-2056 1 33 36 0.32768000000000000000e5
-2056 2 9 15 0.16384000000000000000e5
-2056 2 11 25 -0.32768000000000000000e5
-2056 2 14 14 0.65536000000000000000e5
-2056 2 15 29 0.16384000000000000000e5
-2056 3 3 16 0.40960000000000000000e4
-2056 3 4 17 0.40960000000000000000e4
-2056 3 7 20 -0.16384000000000000000e5
-2056 3 7 36 -0.16384000000000000000e5
-2056 3 8 21 -0.32768000000000000000e5
-2056 3 14 19 -0.32768000000000000000e5
-2056 3 14 27 -0.40960000000000000000e4
-2056 3 16 29 -0.81920000000000000000e4
-2056 3 18 31 -0.16384000000000000000e5
-2056 3 19 32 -0.32768000000000000000e5
-2056 4 2 14 0.40960000000000000000e4
-2056 4 10 14 -0.16384000000000000000e5
-2056 4 11 15 -0.32768000000000000000e5
-2056 4 11 23 -0.81920000000000000000e4
-2056 4 13 25 -0.32768000000000000000e5
-2057 2 14 15 0.65536000000000000000e5
-2057 2 15 25 -0.65536000000000000000e5
-2057 3 8 21 0.32768000000000000000e5
-2057 3 12 21 0.65536000000000000000e5
-2057 3 15 20 -0.32768000000000000000e5
-2057 3 16 21 -0.13107200000000000000e6
-2057 3 18 19 0.13107200000000000000e6
-2057 4 11 15 0.32768000000000000000e5
-2057 4 14 14 -0.65536000000000000000e5
-2058 1 3 18 -0.65536000000000000000e5
-2058 1 3 34 0.65536000000000000000e5
-2058 1 4 19 0.13107200000000000000e6
-2058 1 4 35 0.65536000000000000000e5
-2058 1 12 43 0.19660800000000000000e6
-2058 1 14 45 0.13107200000000000000e6
-2058 1 16 23 0.65536000000000000000e5
-2058 1 17 48 -0.65536000000000000000e5
-2058 1 18 49 -0.65536000000000000000e5
-2058 1 20 27 -0.26214400000000000000e6
-2058 2 9 23 0.65536000000000000000e5
-2058 2 10 24 0.13107200000000000000e6
-2058 2 14 16 0.65536000000000000000e5
-2058 2 14 28 -0.65536000000000000000e5
-2058 3 3 16 -0.65536000000000000000e5
-2058 3 4 17 -0.65536000000000000000e5
-2058 3 5 34 0.65536000000000000000e5
-2058 3 13 42 -0.65536000000000000000e5
-2058 3 14 27 0.19660800000000000000e6
-2058 3 14 43 -0.65536000000000000000e5
-2058 4 2 14 -0.65536000000000000000e5
-2059 1 3 18 0.65536000000000000000e5
-2059 1 3 34 0.65536000000000000000e5
-2059 1 4 19 -0.13107200000000000000e6
-2059 1 4 35 0.65536000000000000000e5
-2059 2 14 17 0.65536000000000000000e5
-2059 3 3 16 0.65536000000000000000e5
-2059 3 4 17 0.65536000000000000000e5
-2059 4 2 14 0.65536000000000000000e5
-2060 2 9 23 -0.65536000000000000000e5
-2060 2 14 18 0.65536000000000000000e5
-2061 1 4 35 0.65536000000000000000e5
-2061 1 5 36 -0.13107200000000000000e6
-2061 1 14 45 0.13107200000000000000e6
-2061 1 15 30 0.65536000000000000000e5
-2061 1 17 48 -0.65536000000000000000e5
-2061 1 18 49 -0.65536000000000000000e5
-2061 2 14 19 0.65536000000000000000e5
-2061 2 14 28 -0.65536000000000000000e5
-2061 3 5 34 0.65536000000000000000e5
-2061 3 13 42 -0.65536000000000000000e5
-2061 3 14 43 -0.65536000000000000000e5
-2062 2 10 24 -0.65536000000000000000e5
-2062 2 14 20 0.65536000000000000000e5
-2063 1 3 18 -0.32768000000000000000e5
-2063 1 4 19 0.65536000000000000000e5
-2063 1 4 35 0.32768000000000000000e5
-2063 1 5 36 0.65536000000000000000e5
-2063 1 12 43 0.65536000000000000000e5
-2063 1 14 45 0.65536000000000000000e5
-2063 1 17 32 -0.13107200000000000000e6
-2063 1 17 48 -0.32768000000000000000e5
-2063 1 18 49 -0.32768000000000000000e5
-2063 2 9 23 0.32768000000000000000e5
-2063 2 14 21 0.65536000000000000000e5
-2063 2 14 28 -0.32768000000000000000e5
-2063 3 3 16 -0.32768000000000000000e5
-2063 3 4 17 -0.32768000000000000000e5
-2063 3 5 34 0.32768000000000000000e5
-2063 3 13 42 -0.32768000000000000000e5
-2063 3 14 27 0.65536000000000000000e5
-2063 3 14 43 -0.32768000000000000000e5
-2063 4 2 14 -0.32768000000000000000e5
-2064 1 4 35 0.32768000000000000000e5
-2064 1 5 36 0.65536000000000000000e5
-2064 1 11 18 0.65536000000000000000e5
-2064 1 12 43 0.32768000000000000000e5
-2064 1 13 20 -0.26214400000000000000e6
-2064 1 14 45 0.65536000000000000000e5
-2064 1 17 32 0.13107200000000000000e6
-2064 1 17 48 -0.32768000000000000000e5
-2064 1 18 49 -0.32768000000000000000e5
-2064 1 20 27 0.13107200000000000000e6
-2064 2 9 23 0.32768000000000000000e5
-2064 2 11 25 0.13107200000000000000e6
-2064 2 14 22 0.65536000000000000000e5
-2064 2 14 28 -0.32768000000000000000e5
-2064 3 5 34 0.32768000000000000000e5
-2064 3 6 19 -0.65536000000000000000e5
-2064 3 8 21 0.26214400000000000000e6
-2064 3 13 42 -0.32768000000000000000e5
-2064 3 14 27 0.32768000000000000000e5
-2064 3 14 43 -0.32768000000000000000e5
-2065 2 11 25 -0.65536000000000000000e5
-2065 2 14 23 0.65536000000000000000e5
-2066 1 6 21 -0.65536000000000000000e5
-2066 1 18 33 0.65536000000000000000e5
-2066 2 9 15 -0.65536000000000000000e5
-2066 2 14 24 0.65536000000000000000e5
-2066 3 7 20 0.65536000000000000000e5
-2066 3 8 21 -0.13107200000000000000e6
-2066 3 14 19 0.13107200000000000000e6
-2066 4 10 14 0.65536000000000000000e5
-2067 1 3 18 0.81920000000000000000e4
-2067 1 4 19 -0.16384000000000000000e5
-2067 1 5 36 -0.16384000000000000000e5
-2067 1 6 21 0.32768000000000000000e5
-2067 1 12 43 -0.81920000000000000000e4
-2067 1 13 20 0.13107200000000000000e6
-2067 1 13 44 0.16384000000000000000e5
-2067 1 14 45 0.16384000000000000000e5
-2067 1 20 27 -0.32768000000000000000e5
-2067 1 21 44 -0.13107200000000000000e6
-2067 1 33 36 0.65536000000000000000e5
-2067 2 9 15 0.32768000000000000000e5
-2067 2 11 25 -0.65536000000000000000e5
-2067 2 14 25 0.65536000000000000000e5
-2067 2 15 29 0.32768000000000000000e5
-2067 3 3 16 0.81920000000000000000e4
-2067 3 4 17 0.81920000000000000000e4
-2067 3 7 20 -0.32768000000000000000e5
-2067 3 7 36 -0.32768000000000000000e5
-2067 3 8 21 -0.65536000000000000000e5
-2067 3 14 19 -0.65536000000000000000e5
-2067 3 14 27 -0.81920000000000000000e4
-2067 3 16 29 -0.16384000000000000000e5
-2067 3 18 31 -0.32768000000000000000e5
-2067 3 19 32 -0.65536000000000000000e5
-2067 4 2 14 0.81920000000000000000e4
-2067 4 10 14 -0.32768000000000000000e5
-2067 4 11 23 -0.16384000000000000000e5
-2067 4 13 25 -0.65536000000000000000e5
-2068 1 12 43 0.65536000000000000000e5
-2068 1 13 44 -0.13107200000000000000e6
-2068 1 16 47 0.65536000000000000000e5
-2068 1 17 48 0.65536000000000000000e5
-2068 2 14 26 0.65536000000000000000e5
-2068 3 12 41 0.65536000000000000000e5
-2068 3 13 42 0.65536000000000000000e5
-2069 1 4 35 -0.65536000000000000000e5
-2069 1 17 48 0.65536000000000000000e5
-2069 2 9 23 -0.65536000000000000000e5
-2069 2 14 27 0.65536000000000000000e5
-2069 3 5 34 -0.65536000000000000000e5
-2069 3 13 42 0.65536000000000000000e5
-2069 3 14 27 -0.65536000000000000000e5
-2069 3 16 29 0.13107200000000000000e6
-2070 1 3 18 -0.32768000000000000000e5
-2070 1 4 19 0.65536000000000000000e5
-2070 1 4 35 0.32768000000000000000e5
-2070 1 5 36 0.65536000000000000000e5
-2070 1 12 43 0.65536000000000000000e5
-2070 1 14 45 0.65536000000000000000e5
-2070 1 17 32 -0.13107200000000000000e6
-2070 1 17 48 -0.32768000000000000000e5
-2070 1 18 49 -0.32768000000000000000e5
-2070 2 9 23 0.32768000000000000000e5
-2070 2 14 28 -0.32768000000000000000e5
-2070 2 14 29 0.65536000000000000000e5
-2070 3 3 16 -0.32768000000000000000e5
-2070 3 4 17 -0.32768000000000000000e5
-2070 3 5 34 0.32768000000000000000e5
-2070 3 13 42 -0.32768000000000000000e5
-2070 3 14 27 0.65536000000000000000e5
-2070 3 14 43 -0.32768000000000000000e5
-2070 4 2 14 -0.32768000000000000000e5
-2070 4 11 23 0.65536000000000000000e5
-2071 1 4 35 0.32768000000000000000e5
-2071 1 11 18 0.65536000000000000000e5
-2071 1 12 43 0.32768000000000000000e5
-2071 1 13 20 -0.26214400000000000000e6
-2071 1 14 45 0.13107200000000000000e6
-2071 1 17 32 0.13107200000000000000e6
-2071 1 17 48 -0.32768000000000000000e5
-2071 1 18 49 -0.32768000000000000000e5
-2071 1 20 27 0.13107200000000000000e6
-2071 2 9 23 0.32768000000000000000e5
-2071 2 11 25 0.13107200000000000000e6
-2071 2 14 28 -0.32768000000000000000e5
-2071 2 14 30 0.65536000000000000000e5
-2071 3 5 34 0.32768000000000000000e5
-2071 3 6 19 -0.65536000000000000000e5
-2071 3 8 21 0.26214400000000000000e6
-2071 3 13 42 -0.32768000000000000000e5
-2071 3 14 27 0.32768000000000000000e5
-2071 3 14 43 -0.32768000000000000000e5
-2071 3 16 29 -0.65536000000000000000e5
-2071 3 17 30 -0.65536000000000000000e5
-2071 3 18 31 0.13107200000000000000e6
-2072 1 3 18 0.16384000000000000000e5
-2072 1 4 19 -0.32768000000000000000e5
-2072 1 5 36 -0.32768000000000000000e5
-2072 1 6 21 -0.65536000000000000000e5
-2072 1 12 43 -0.16384000000000000000e5
-2072 1 13 44 0.32768000000000000000e5
-2072 1 14 45 0.32768000000000000000e5
-2072 1 15 46 0.65536000000000000000e5
-2072 2 9 15 -0.65536000000000000000e5
-2072 2 14 31 0.65536000000000000000e5
-2072 3 3 16 0.16384000000000000000e5
-2072 3 4 17 0.16384000000000000000e5
-2072 3 7 20 0.65536000000000000000e5
-2072 3 8 21 -0.13107200000000000000e6
-2072 3 14 19 0.13107200000000000000e6
-2072 3 14 27 -0.16384000000000000000e5
-2072 3 16 29 -0.32768000000000000000e5
-2072 3 18 31 -0.65536000000000000000e5
-2072 3 19 32 0.13107200000000000000e6
-2072 4 2 14 0.16384000000000000000e5
-2072 4 10 14 0.65536000000000000000e5
-2072 4 11 23 -0.32768000000000000000e5
-2073 1 4 35 -0.65536000000000000000e5
-2073 1 17 48 0.65536000000000000000e5
-2073 2 9 23 -0.65536000000000000000e5
-2073 2 14 32 0.65536000000000000000e5
-2073 3 5 34 -0.65536000000000000000e5
-2073 3 13 42 0.65536000000000000000e5
-2073 3 14 27 -0.65536000000000000000e5
-2073 3 16 29 0.13107200000000000000e6
-2073 4 14 26 0.65536000000000000000e5
-2074 1 14 45 -0.26214400000000000000e6
-2074 1 17 48 0.13107200000000000000e6
-2074 1 18 49 0.13107200000000000000e6
-2074 1 34 49 0.13107200000000000000e6
-2074 2 14 28 0.65536000000000000000e5
-2074 2 14 33 0.65536000000000000000e5
-2074 3 14 43 0.65536000000000000000e5
-2074 3 15 44 -0.13107200000000000000e6
-2074 3 16 45 0.26214400000000000000e6
-2074 3 18 47 0.13107200000000000000e6
-2074 3 22 35 -0.65536000000000000000e5
-2074 4 14 26 -0.65536000000000000000e5
-2074 4 15 27 -0.13107200000000000000e6
-2075 1 4 35 0.32768000000000000000e5
-2075 1 11 18 0.65536000000000000000e5
-2075 1 12 43 0.32768000000000000000e5
-2075 1 13 20 -0.26214400000000000000e6
-2075 1 14 45 0.13107200000000000000e6
-2075 1 17 32 0.13107200000000000000e6
-2075 1 17 48 -0.32768000000000000000e5
-2075 1 18 49 -0.32768000000000000000e5
-2075 1 20 27 0.13107200000000000000e6
-2075 2 9 23 0.32768000000000000000e5
-2075 2 11 25 0.13107200000000000000e6
-2075 2 14 28 -0.32768000000000000000e5
-2075 2 14 34 0.65536000000000000000e5
-2075 3 5 34 0.32768000000000000000e5
-2075 3 6 19 -0.65536000000000000000e5
-2075 3 8 21 0.26214400000000000000e6
-2075 3 13 42 -0.32768000000000000000e5
-2075 3 14 27 0.32768000000000000000e5
-2075 3 14 43 -0.32768000000000000000e5
-2075 3 16 29 -0.65536000000000000000e5
-2075 3 17 30 -0.65536000000000000000e5
-2075 3 18 31 0.13107200000000000000e6
-2075 4 15 27 0.65536000000000000000e5
-2076 1 6 53 -0.81920000000000000000e4
-2076 1 14 45 -0.26214400000000000000e6
-2076 1 17 48 0.13107200000000000000e6
-2076 1 18 49 0.13107200000000000000e6
-2076 1 25 40 0.81920000000000000000e4
-2076 1 34 49 0.13107200000000000000e6
-2076 2 4 34 -0.16384000000000000000e5
-2076 2 14 28 0.65536000000000000000e5
-2076 2 14 35 0.65536000000000000000e5
-2076 2 21 35 0.16384000000000000000e5
-2076 3 5 50 -0.16384000000000000000e5
-2076 3 14 43 0.65536000000000000000e5
-2076 3 14 51 -0.65536000000000000000e5
-2076 3 15 44 -0.13107200000000000000e6
-2076 3 16 45 0.26214400000000000000e6
-2076 3 18 47 0.65536000000000000000e5
-2076 3 19 48 0.13107200000000000000e6
-2076 3 22 35 -0.65536000000000000000e5
-2076 3 24 37 -0.81920000000000000000e4
-2076 3 27 40 -0.32768000000000000000e5
-2076 3 28 41 -0.32768000000000000000e5
-2076 3 29 42 -0.32768000000000000000e5
-2076 4 4 32 0.81920000000000000000e4
-2076 4 7 35 0.16384000000000000000e5
-2076 4 14 26 -0.65536000000000000000e5
-2076 4 15 27 -0.13107200000000000000e6
-2076 4 16 28 -0.81920000000000000000e4
-2076 4 23 27 -0.32768000000000000000e5
-2077 2 7 13 -0.65536000000000000000e5
-2077 2 15 16 0.65536000000000000000e5
-2077 4 10 10 0.13107200000000000000e6
-2078 2 10 24 -0.65536000000000000000e5
-2078 2 15 17 0.65536000000000000000e5
-2079 1 3 18 -0.32768000000000000000e5
-2079 1 4 19 0.65536000000000000000e5
-2079 1 4 35 0.32768000000000000000e5
-2079 1 5 36 0.65536000000000000000e5
-2079 1 12 43 0.65536000000000000000e5
-2079 1 14 45 0.65536000000000000000e5
-2079 1 17 32 -0.13107200000000000000e6
-2079 1 17 48 -0.32768000000000000000e5
-2079 1 18 49 -0.32768000000000000000e5
-2079 2 9 23 0.32768000000000000000e5
-2079 2 14 28 -0.32768000000000000000e5
-2079 2 15 18 0.65536000000000000000e5
-2079 3 3 16 -0.32768000000000000000e5
-2079 3 4 17 -0.32768000000000000000e5
-2079 3 5 34 0.32768000000000000000e5
-2079 3 13 42 -0.32768000000000000000e5
-2079 3 14 27 0.65536000000000000000e5
-2079 3 14 43 -0.32768000000000000000e5
-2079 4 2 14 -0.32768000000000000000e5
-2080 1 4 35 0.32768000000000000000e5
-2080 1 5 36 0.65536000000000000000e5
-2080 1 11 18 0.65536000000000000000e5
-2080 1 12 43 0.32768000000000000000e5
-2080 1 13 20 -0.26214400000000000000e6
-2080 1 14 45 0.65536000000000000000e5
-2080 1 17 32 0.13107200000000000000e6
-2080 1 17 48 -0.32768000000000000000e5
-2080 1 18 49 -0.32768000000000000000e5
-2080 1 20 27 0.13107200000000000000e6
-2080 2 9 23 0.32768000000000000000e5
-2080 2 11 25 0.13107200000000000000e6
-2080 2 14 28 -0.32768000000000000000e5
-2080 2 15 19 0.65536000000000000000e5
-2080 3 5 34 0.32768000000000000000e5
-2080 3 6 19 -0.65536000000000000000e5
-2080 3 8 21 0.26214400000000000000e6
-2080 3 13 42 -0.32768000000000000000e5
-2080 3 14 27 0.32768000000000000000e5
-2080 3 14 43 -0.32768000000000000000e5
-2081 1 2 17 -0.32768000000000000000e5
-2081 1 3 18 -0.32768000000000000000e5
-2081 1 3 34 -0.16384000000000000000e5
-2081 1 4 19 -0.32768000000000000000e5
-2081 1 5 20 -0.32768000000000000000e5
-2081 1 5 36 0.32768000000000000000e5
-2081 1 10 17 -0.32768000000000000000e5
-2081 1 12 43 0.16384000000000000000e5
-2081 1 16 23 0.16384000000000000000e5
-2081 1 20 27 0.65536000000000000000e5
-2081 2 6 12 -0.16384000000000000000e5
-2081 2 10 24 -0.32768000000000000000e5
-2081 2 11 13 -0.65536000000000000000e5
-2081 2 15 20 0.65536000000000000000e5
-2081 3 3 16 -0.49152000000000000000e5
-2081 3 4 17 -0.16384000000000000000e5
-2081 3 7 12 -0.16384000000000000000e5
-2081 3 7 20 -0.65536000000000000000e5
-2081 3 8 21 -0.13107200000000000000e6
-2081 3 12 21 0.26214400000000000000e6
-2081 3 14 19 -0.13107200000000000000e6
-2081 3 14 27 0.16384000000000000000e5
-2081 4 1 13 -0.16384000000000000000e5
-2081 4 2 14 -0.16384000000000000000e5
-2081 4 3 15 -0.32768000000000000000e5
-2081 4 10 10 -0.65536000000000000000e5
-2081 4 13 13 -0.26214400000000000000e6
-2082 2 11 25 -0.65536000000000000000e5
-2082 2 15 21 0.65536000000000000000e5
-2083 1 6 21 -0.65536000000000000000e5
-2083 1 18 33 0.65536000000000000000e5
-2083 2 9 15 -0.65536000000000000000e5
-2083 2 15 22 0.65536000000000000000e5
-2083 3 7 20 0.65536000000000000000e5
-2083 3 8 21 -0.13107200000000000000e6
-2083 3 14 19 0.13107200000000000000e6
-2083 4 10 14 0.65536000000000000000e5
-2084 1 2 17 0.16384000000000000000e5
-2084 1 3 18 0.16384000000000000000e5
-2084 1 3 34 0.81920000000000000000e4
-2084 1 4 19 0.16384000000000000000e5
-2084 1 5 20 0.16384000000000000000e5
-2084 1 5 36 -0.16384000000000000000e5
-2084 1 6 21 0.32768000000000000000e5
-2084 1 10 17 0.16384000000000000000e5
-2084 1 12 43 -0.81920000000000000000e4
-2084 1 13 20 0.13107200000000000000e6
-2084 1 16 23 -0.81920000000000000000e4
-2084 1 16 31 0.32768000000000000000e5
-2084 1 17 32 0.32768000000000000000e5
-2084 1 19 34 -0.13107200000000000000e6
-2084 1 20 27 -0.32768000000000000000e5
-2084 2 6 12 0.81920000000000000000e4
-2084 2 9 15 0.32768000000000000000e5
-2084 2 10 24 0.16384000000000000000e5
-2084 2 11 13 0.32768000000000000000e5
-2084 2 11 25 -0.32768000000000000000e5
-2084 2 15 23 0.65536000000000000000e5
-2084 3 3 16 0.24576000000000000000e5
-2084 3 4 17 0.81920000000000000000e4
-2084 3 7 12 0.81920000000000000000e4
-2084 3 12 21 -0.13107200000000000000e6
-2084 3 14 27 -0.81920000000000000000e4
-2084 4 1 13 0.81920000000000000000e4
-2084 4 2 14 0.81920000000000000000e4
-2084 4 3 15 0.16384000000000000000e5
-2084 4 10 10 0.32768000000000000000e5
-2084 4 10 14 -0.32768000000000000000e5
-2084 4 13 13 0.13107200000000000000e6
-2085 1 3 18 0.81920000000000000000e4
-2085 1 4 19 -0.16384000000000000000e5
-2085 1 5 36 -0.16384000000000000000e5
-2085 1 6 21 0.32768000000000000000e5
-2085 1 12 43 -0.81920000000000000000e4
-2085 1 13 20 0.13107200000000000000e6
-2085 1 13 44 0.16384000000000000000e5
-2085 1 14 45 0.16384000000000000000e5
-2085 1 20 27 -0.32768000000000000000e5
-2085 1 21 44 -0.13107200000000000000e6
-2085 1 33 36 0.65536000000000000000e5
-2085 2 9 15 0.32768000000000000000e5
-2085 2 11 25 -0.65536000000000000000e5
-2085 2 15 24 0.65536000000000000000e5
-2085 2 15 29 0.32768000000000000000e5
-2085 3 3 16 0.81920000000000000000e4
-2085 3 4 17 0.81920000000000000000e4
-2085 3 7 20 -0.32768000000000000000e5
-2085 3 7 36 -0.32768000000000000000e5
-2085 3 8 21 -0.65536000000000000000e5
-2085 3 14 19 -0.65536000000000000000e5
-2085 3 14 27 -0.81920000000000000000e4
-2085 3 16 29 -0.16384000000000000000e5
-2085 3 18 31 -0.32768000000000000000e5
-2085 3 19 32 -0.65536000000000000000e5
-2085 4 2 14 0.81920000000000000000e4
-2085 4 10 14 -0.32768000000000000000e5
-2085 4 11 23 -0.16384000000000000000e5
-2085 4 13 25 -0.65536000000000000000e5
-2086 1 4 35 0.32768000000000000000e5
-2086 1 12 43 0.32768000000000000000e5
-2086 1 13 44 0.65536000000000000000e5
-2086 1 14 45 0.65536000000000000000e5
-2086 1 17 48 -0.32768000000000000000e5
-2086 1 18 49 -0.32768000000000000000e5
-2086 1 20 27 -0.13107200000000000000e6
-2086 1 27 34 0.65536000000000000000e5
-2086 2 9 23 0.32768000000000000000e5
-2086 2 14 28 -0.32768000000000000000e5
-2086 2 15 26 0.65536000000000000000e5
-2086 3 5 34 0.32768000000000000000e5
-2086 3 7 36 0.13107200000000000000e6
-2086 3 13 42 -0.32768000000000000000e5
-2086 3 14 27 0.32768000000000000000e5
-2086 3 14 43 -0.32768000000000000000e5
-2086 3 16 29 -0.65536000000000000000e5
-2087 1 3 18 -0.32768000000000000000e5
-2087 1 4 19 0.65536000000000000000e5
-2087 1 4 35 0.32768000000000000000e5
-2087 1 5 36 0.65536000000000000000e5
-2087 1 12 43 0.65536000000000000000e5
-2087 1 14 45 0.65536000000000000000e5
-2087 1 17 32 -0.13107200000000000000e6
-2087 1 17 48 -0.32768000000000000000e5
-2087 1 18 49 -0.32768000000000000000e5
-2087 2 9 23 0.32768000000000000000e5
-2087 2 14 28 -0.32768000000000000000e5
-2087 2 15 27 0.65536000000000000000e5
-2087 3 3 16 -0.32768000000000000000e5
-2087 3 4 17 -0.32768000000000000000e5
-2087 3 5 34 0.32768000000000000000e5
-2087 3 13 42 -0.32768000000000000000e5
-2087 3 14 27 0.65536000000000000000e5
-2087 3 14 43 -0.32768000000000000000e5
-2087 4 2 14 -0.32768000000000000000e5
-2087 4 11 23 0.65536000000000000000e5
-2088 1 4 35 0.32768000000000000000e5
-2088 1 11 18 0.65536000000000000000e5
-2088 1 12 43 0.32768000000000000000e5
-2088 1 13 20 -0.26214400000000000000e6
-2088 1 14 45 0.13107200000000000000e6
-2088 1 17 32 0.13107200000000000000e6
-2088 1 17 48 -0.32768000000000000000e5
-2088 1 18 49 -0.32768000000000000000e5
-2088 1 20 27 0.13107200000000000000e6
-2088 2 9 23 0.32768000000000000000e5
-2088 2 11 25 0.13107200000000000000e6
-2088 2 14 28 -0.32768000000000000000e5
-2088 2 15 28 0.65536000000000000000e5
-2088 3 5 34 0.32768000000000000000e5
-2088 3 6 19 -0.65536000000000000000e5
-2088 3 8 21 0.26214400000000000000e6
-2088 3 13 42 -0.32768000000000000000e5
-2088 3 14 27 0.32768000000000000000e5
-2088 3 14 43 -0.32768000000000000000e5
-2088 3 16 29 -0.65536000000000000000e5
-2088 3 17 30 -0.65536000000000000000e5
-2088 3 18 31 0.13107200000000000000e6
-2089 1 3 18 0.16384000000000000000e5
-2089 1 4 19 -0.32768000000000000000e5
-2089 1 5 36 -0.32768000000000000000e5
-2089 1 6 21 -0.65536000000000000000e5
-2089 1 12 43 -0.16384000000000000000e5
-2089 1 13 44 0.32768000000000000000e5
-2089 1 14 45 0.32768000000000000000e5
-2089 1 15 46 0.65536000000000000000e5
-2089 2 9 15 -0.65536000000000000000e5
-2089 2 15 30 0.65536000000000000000e5
-2089 3 3 16 0.16384000000000000000e5
-2089 3 4 17 0.16384000000000000000e5
-2089 3 7 20 0.65536000000000000000e5
-2089 3 8 21 -0.13107200000000000000e6
-2089 3 14 19 0.13107200000000000000e6
-2089 3 14 27 -0.16384000000000000000e5
-2089 3 16 29 -0.32768000000000000000e5
-2089 3 18 31 -0.65536000000000000000e5
-2089 3 19 32 0.13107200000000000000e6
-2089 4 2 14 0.16384000000000000000e5
-2089 4 10 14 0.65536000000000000000e5
-2089 4 11 23 -0.32768000000000000000e5
-2090 1 3 18 0.81920000000000000000e4
-2090 1 4 19 -0.16384000000000000000e5
-2090 1 5 36 -0.16384000000000000000e5
-2090 1 6 21 0.32768000000000000000e5
-2090 1 12 43 -0.81920000000000000000e4
-2090 1 13 20 0.13107200000000000000e6
-2090 1 13 44 0.16384000000000000000e5
-2090 1 14 45 0.16384000000000000000e5
-2090 1 20 27 -0.32768000000000000000e5
-2090 1 21 44 -0.13107200000000000000e6
-2090 1 33 36 0.65536000000000000000e5
-2090 2 9 15 0.32768000000000000000e5
-2090 2 11 25 -0.65536000000000000000e5
-2090 2 15 29 0.32768000000000000000e5
-2090 2 15 31 0.65536000000000000000e5
-2090 3 3 16 0.81920000000000000000e4
-2090 3 4 17 0.81920000000000000000e4
-2090 3 7 20 -0.32768000000000000000e5
-2090 3 7 36 -0.32768000000000000000e5
-2090 3 8 21 -0.65536000000000000000e5
-2090 3 14 19 -0.65536000000000000000e5
-2090 3 14 27 -0.81920000000000000000e4
-2090 3 16 29 -0.16384000000000000000e5
-2090 3 18 31 -0.32768000000000000000e5
-2090 3 19 32 -0.65536000000000000000e5
-2090 4 2 14 0.81920000000000000000e4
-2090 4 10 14 -0.32768000000000000000e5
-2090 4 11 23 -0.16384000000000000000e5
-2091 1 4 35 0.32768000000000000000e5
-2091 1 12 43 0.32768000000000000000e5
-2091 1 14 45 0.13107200000000000000e6
-2091 1 17 48 -0.32768000000000000000e5
-2091 1 18 49 -0.32768000000000000000e5
-2091 1 19 50 -0.13107200000000000000e6
-2091 1 34 41 0.65536000000000000000e5
-2091 2 9 23 0.32768000000000000000e5
-2091 2 14 28 -0.32768000000000000000e5
-2091 2 15 32 0.65536000000000000000e5
-2091 3 5 34 0.32768000000000000000e5
-2091 3 13 42 -0.32768000000000000000e5
-2091 3 14 27 0.32768000000000000000e5
-2091 3 14 43 -0.32768000000000000000e5
-2091 3 15 44 0.65536000000000000000e5
-2091 3 16 29 -0.65536000000000000000e5
-2091 3 16 45 -0.13107200000000000000e6
-2091 4 15 27 0.65536000000000000000e5
-2092 1 4 35 0.32768000000000000000e5
-2092 1 11 18 0.65536000000000000000e5
-2092 1 12 43 0.32768000000000000000e5
-2092 1 13 20 -0.26214400000000000000e6
-2092 1 14 45 0.13107200000000000000e6
-2092 1 17 32 0.13107200000000000000e6
-2092 1 17 48 -0.32768000000000000000e5
-2092 1 18 49 -0.32768000000000000000e5
-2092 1 20 27 0.13107200000000000000e6
-2092 2 9 23 0.32768000000000000000e5
-2092 2 11 25 0.13107200000000000000e6
-2092 2 14 28 -0.32768000000000000000e5
-2092 2 15 33 0.65536000000000000000e5
-2092 3 5 34 0.32768000000000000000e5
-2092 3 6 19 -0.65536000000000000000e5
-2092 3 8 21 0.26214400000000000000e6
-2092 3 13 42 -0.32768000000000000000e5
-2092 3 14 27 0.32768000000000000000e5
-2092 3 14 43 -0.32768000000000000000e5
-2092 3 16 29 -0.65536000000000000000e5
-2092 3 17 30 -0.65536000000000000000e5
-2092 3 18 31 0.13107200000000000000e6
-2092 4 15 27 0.65536000000000000000e5
-2093 2 15 34 0.65536000000000000000e5
-2093 2 25 31 -0.65536000000000000000e5
-2094 1 4 35 0.32768000000000000000e5
-2094 1 11 18 0.65536000000000000000e5
-2094 1 12 43 0.32768000000000000000e5
-2094 1 13 20 -0.26214400000000000000e6
-2094 1 14 45 0.13107200000000000000e6
-2094 1 17 32 0.13107200000000000000e6
-2094 1 17 48 -0.32768000000000000000e5
-2094 1 18 49 -0.32768000000000000000e5
-2094 1 20 27 0.13107200000000000000e6
-2094 2 9 23 0.32768000000000000000e5
-2094 2 11 25 0.13107200000000000000e6
-2094 2 14 28 -0.32768000000000000000e5
-2094 2 15 35 0.65536000000000000000e5
-2094 3 5 34 0.32768000000000000000e5
-2094 3 6 19 -0.65536000000000000000e5
-2094 3 8 21 0.26214400000000000000e6
-2094 3 13 42 -0.32768000000000000000e5
-2094 3 14 27 0.32768000000000000000e5
-2094 3 14 43 -0.32768000000000000000e5
-2094 3 16 29 -0.65536000000000000000e5
-2094 3 17 30 -0.65536000000000000000e5
-2094 3 18 31 0.13107200000000000000e6
-2094 3 19 48 -0.65536000000000000000e5
-2094 3 31 44 -0.65536000000000000000e5
-2094 3 32 45 -0.65536000000000000000e5
-2094 3 36 41 0.13107200000000000000e6
-2094 4 15 27 0.65536000000000000000e5
-2095 1 1 48 0.65536000000000000000e5
-2095 1 7 38 -0.13107200000000000000e6
-2095 1 22 37 0.65536000000000000000e5
-2095 1 23 38 0.65536000000000000000e5
-2095 2 16 17 0.65536000000000000000e5
-2095 3 22 27 0.13107200000000000000e6
-2095 4 16 16 -0.13107200000000000000e6
-2096 1 1 40 0.65536000000000000000e5
-2096 1 23 38 -0.65536000000000000000e5
-2096 2 2 32 -0.65536000000000000000e5
-2096 2 16 18 0.65536000000000000000e5
-2096 3 1 38 0.65536000000000000000e5
-2096 3 2 39 0.65536000000000000000e5
-2096 3 8 37 -0.13107200000000000000e6
-2097 1 1 40 0.65536000000000000000e5
-2097 1 2 49 0.65536000000000000000e5
-2097 1 6 37 0.65536000000000000000e5
-2097 1 8 39 -0.13107200000000000000e6
-2097 2 16 19 0.65536000000000000000e5
-2097 3 2 39 0.65536000000000000000e5
-2098 1 1 8 -0.65536000000000000000e5
-2098 1 1 24 -0.32768000000000000000e5
-2098 1 1 32 -0.13107200000000000000e6
-2098 1 1 40 -0.32768000000000000000e5
-2098 1 1 48 0.98304000000000000000e5
-2098 1 2 9 -0.65536000000000000000e5
-2098 1 2 33 0.26214400000000000000e6
-2098 1 2 49 0.98304000000000000000e5
-2098 1 3 34 -0.26214400000000000000e6
-2098 1 4 11 -0.65536000000000000000e5
-2098 1 7 38 0.65536000000000000000e5
-2098 1 8 23 0.65536000000000000000e5
-2098 1 8 39 0.65536000000000000000e5
-2098 1 9 40 0.65536000000000000000e5
-2098 1 10 41 0.13107200000000000000e6
-2098 1 12 27 0.26214400000000000000e6
-2098 1 12 43 -0.26214400000000000000e6
-2098 1 16 23 -0.26214400000000000000e6
-2098 1 22 37 0.32768000000000000000e5
-2098 1 23 38 0.13107200000000000000e6
-2098 1 26 41 -0.65536000000000000000e5
-2098 1 28 43 0.13107200000000000000e6
-2098 1 32 47 0.26214400000000000000e6
-2098 2 1 7 -0.65536000000000000000e5
-2098 2 1 31 0.13107200000000000000e6
-2098 2 2 8 0.65536000000000000000e5
-2098 2 2 16 -0.32768000000000000000e5
-2098 2 2 32 0.98304000000000000000e5
-2098 2 3 9 -0.65536000000000000000e5
-2098 2 6 20 -0.13107200000000000000e6
-2098 2 7 21 0.13107200000000000000e6
-2098 2 16 16 0.65536000000000000000e5
-2098 2 16 20 0.65536000000000000000e5
-2098 2 16 30 0.65536000000000000000e5
-2098 2 20 34 0.13107200000000000000e6
-2098 3 1 14 -0.26214400000000000000e6
-2098 3 1 22 -0.32768000000000000000e5
-2098 3 1 30 -0.65536000000000000000e5
-2098 3 1 34 0.26214400000000000000e6
-2098 3 1 38 -0.32768000000000000000e5
-2098 3 2 7 -0.13107200000000000000e6
-2098 3 2 15 0.13107200000000000000e6
-2098 3 2 23 -0.32768000000000000000e5
-2098 3 2 31 -0.13107200000000000000e6
-2098 3 3 32 0.26214400000000000000e6
-2098 3 4 9 -0.65536000000000000000e5
-2098 3 7 12 0.26214400000000000000e6
-2098 3 8 37 0.13107200000000000000e6
-2098 3 10 23 -0.13107200000000000000e6
-2098 3 22 27 0.65536000000000000000e5
-2098 3 22 35 0.26214400000000000000e6
-2098 3 28 41 0.26214400000000000000e6
-2098 4 2 6 -0.65536000000000000000e5
-2098 4 2 30 0.65536000000000000000e5
-2098 4 6 6 -0.26214400000000000000e6
-2098 4 6 18 -0.65536000000000000000e5
-2098 4 6 34 0.13107200000000000000e6
-2098 4 16 16 -0.65536000000000000000e5
-2099 1 1 48 0.32768000000000000000e5
-2099 1 2 33 0.13107200000000000000e6
-2099 1 2 49 0.32768000000000000000e5
-2099 1 3 34 -0.26214400000000000000e6
-2099 1 7 38 0.65536000000000000000e5
-2099 1 8 39 0.65536000000000000000e5
-2099 1 10 41 0.13107200000000000000e6
-2099 1 23 38 0.32768000000000000000e5
-2099 2 2 32 0.32768000000000000000e5
-2099 2 7 21 0.13107200000000000000e6
-2099 2 16 21 0.65536000000000000000e5
-2099 3 2 31 0.13107200000000000000e6
-2099 3 3 32 0.13107200000000000000e6
-2099 3 8 37 0.65536000000000000000e5
-2100 1 9 40 -0.65536000000000000000e5
-2100 1 10 41 0.13107200000000000000e6
-2100 1 11 42 -0.13107200000000000000e6
-2100 1 26 41 0.65536000000000000000e5
-2100 1 32 47 -0.13107200000000000000e6
-2100 1 33 48 0.13107200000000000000e6
-2100 2 12 26 0.13107200000000000000e6
-2100 2 16 22 0.65536000000000000000e5
-2100 2 16 30 -0.65536000000000000000e5
-2100 2 20 34 -0.13107200000000000000e6
-2100 3 8 37 0.65536000000000000000e5
-2100 3 13 42 0.26214400000000000000e6
-2100 3 22 35 -0.26214400000000000000e6
-2100 3 28 41 -0.13107200000000000000e6
-2100 3 29 42 0.13107200000000000000e6
-2100 4 2 30 -0.65536000000000000000e5
-2100 4 3 31 -0.13107200000000000000e6
-2100 4 6 34 -0.13107200000000000000e6
-2101 2 1 31 -0.65536000000000000000e5
-2101 2 16 23 0.65536000000000000000e5
-2102 1 2 33 -0.65536000000000000000e5
-2102 1 3 34 0.13107200000000000000e6
-2102 1 11 42 0.65536000000000000000e5
-2102 1 12 43 0.13107200000000000000e6
-2102 1 16 47 -0.13107200000000000000e6
-2102 1 28 43 -0.65536000000000000000e5
-2102 1 32 47 -0.65536000000000000000e5
-2102 1 33 48 -0.65536000000000000000e5
-2102 2 7 21 -0.65536000000000000000e5
-2102 2 12 26 -0.65536000000000000000e5
-2102 2 16 24 0.65536000000000000000e5
-2102 3 2 31 -0.65536000000000000000e5
-2102 3 3 32 -0.65536000000000000000e5
-2102 3 12 41 -0.13107200000000000000e6
-2102 3 13 42 -0.13107200000000000000e6
-2102 3 28 41 -0.65536000000000000000e5
-2102 3 29 42 -0.65536000000000000000e5
-2102 4 3 31 0.65536000000000000000e5
-2103 1 12 43 0.65536000000000000000e5
-2103 1 16 23 0.65536000000000000000e5
-2103 1 16 47 0.65536000000000000000e5
-2103 1 27 34 -0.13107200000000000000e6
-2103 2 16 25 0.65536000000000000000e5
-2103 3 1 34 -0.65536000000000000000e5
-2103 3 12 41 0.65536000000000000000e5
-2104 1 1 48 0.65536000000000000000e5
-2104 1 7 38 -0.13107200000000000000e6
-2104 1 22 37 0.65536000000000000000e5
-2104 1 23 38 0.65536000000000000000e5
-2104 2 16 26 0.65536000000000000000e5
-2104 3 22 27 0.13107200000000000000e6
-2105 2 2 32 -0.65536000000000000000e5
-2105 2 16 27 0.65536000000000000000e5
-2106 1 2 49 0.65536000000000000000e5
-2106 1 8 39 -0.13107200000000000000e6
-2106 1 9 40 -0.13107200000000000000e6
-2106 1 10 41 0.26214400000000000000e6
-2106 1 23 38 0.65536000000000000000e5
-2106 1 24 39 0.65536000000000000000e5
-2106 1 26 41 0.13107200000000000000e6
-2106 1 32 47 -0.26214400000000000000e6
-2106 2 16 28 0.65536000000000000000e5
-2106 3 9 38 -0.13107200000000000000e6
-2106 3 28 41 -0.26214400000000000000e6
-2106 4 2 30 -0.13107200000000000000e6
-2107 1 1 48 0.32768000000000000000e5
-2107 1 2 33 0.13107200000000000000e6
-2107 1 2 49 0.32768000000000000000e5
-2107 1 3 34 -0.26214400000000000000e6
-2107 1 7 38 0.65536000000000000000e5
-2107 1 8 39 0.65536000000000000000e5
-2107 1 10 41 0.13107200000000000000e6
-2107 1 23 38 0.32768000000000000000e5
-2107 2 2 32 0.32768000000000000000e5
-2107 2 7 21 0.13107200000000000000e6
-2107 2 16 29 0.65536000000000000000e5
-2107 3 2 31 0.13107200000000000000e6
-2107 3 3 32 0.13107200000000000000e6
-2107 3 8 37 0.65536000000000000000e5
-2107 4 1 29 0.65536000000000000000e5
-2108 1 2 33 -0.65536000000000000000e5
-2108 1 3 34 0.13107200000000000000e6
-2108 1 9 40 0.32768000000000000000e5
-2108 1 10 41 -0.13107200000000000000e6
-2108 1 12 43 0.13107200000000000000e6
-2108 1 16 47 -0.13107200000000000000e6
-2108 1 26 41 -0.32768000000000000000e5
-2108 1 28 43 -0.65536000000000000000e5
-2108 1 32 47 0.65536000000000000000e5
-2108 2 7 21 -0.65536000000000000000e5
-2108 2 16 31 0.65536000000000000000e5
-2108 2 20 34 -0.65536000000000000000e5
-2108 3 2 31 -0.65536000000000000000e5
-2108 3 3 32 -0.65536000000000000000e5
-2108 3 8 37 -0.32768000000000000000e5
-2108 3 9 38 0.32768000000000000000e5
-2108 3 22 27 -0.32768000000000000000e5
-2108 3 22 35 -0.13107200000000000000e6
-2108 3 28 41 0.65536000000000000000e5
-2108 4 1 29 -0.32768000000000000000e5
-2108 4 2 30 0.32768000000000000000e5
-2108 4 6 34 -0.65536000000000000000e5
-2109 2 1 35 -0.65536000000000000000e5
-2109 2 16 32 0.65536000000000000000e5
-2110 1 2 49 0.65536000000000000000e5
-2110 1 6 53 -0.13107200000000000000e6
-2110 1 8 39 -0.13107200000000000000e6
-2110 1 9 40 -0.13107200000000000000e6
-2110 1 10 41 0.26214400000000000000e6
-2110 1 23 38 0.65536000000000000000e5
-2110 1 24 39 0.65536000000000000000e5
-2110 1 25 40 0.13107200000000000000e6
-2110 1 26 41 0.13107200000000000000e6
-2110 1 32 47 -0.26214400000000000000e6
-2110 2 16 33 0.65536000000000000000e5
-2110 3 2 47 -0.65536000000000000000e5
-2110 3 9 38 -0.13107200000000000000e6
-2110 3 24 37 -0.13107200000000000000e6
-2110 3 25 38 0.65536000000000000000e5
-2110 3 27 40 -0.39321600000000000000e6
-2110 4 2 30 -0.13107200000000000000e6
-2110 4 4 32 0.13107200000000000000e6
-2110 4 16 28 -0.65536000000000000000e5
-2110 4 17 29 -0.13107200000000000000e6
-2111 2 16 35 0.65536000000000000000e5
-2111 2 26 32 -0.65536000000000000000e5
-2112 1 1 40 0.32768000000000000000e5
-2112 1 23 38 -0.32768000000000000000e5
-2112 2 2 32 -0.32768000000000000000e5
-2112 2 17 17 0.65536000000000000000e5
-2112 3 1 38 0.32768000000000000000e5
-2112 3 2 39 0.32768000000000000000e5
-2112 3 8 37 -0.65536000000000000000e5
-2113 1 1 40 0.65536000000000000000e5
-2113 1 2 49 0.65536000000000000000e5
-2113 1 6 37 0.65536000000000000000e5
-2113 1 8 39 -0.13107200000000000000e6
-2113 2 17 18 0.65536000000000000000e5
-2113 3 2 39 0.65536000000000000000e5
-2114 1 6 37 0.65536000000000000000e5
-2114 1 24 39 -0.65536000000000000000e5
-2114 2 3 33 -0.65536000000000000000e5
-2114 2 17 19 0.65536000000000000000e5
-2114 3 2 39 0.65536000000000000000e5
-2114 3 3 40 0.65536000000000000000e5
-2114 3 9 38 -0.13107200000000000000e6
-2115 1 1 48 0.32768000000000000000e5
-2115 1 2 33 0.13107200000000000000e6
-2115 1 2 49 0.32768000000000000000e5
-2115 1 3 34 -0.26214400000000000000e6
-2115 1 7 38 0.65536000000000000000e5
-2115 1 8 39 0.65536000000000000000e5
-2115 1 10 41 0.13107200000000000000e6
-2115 1 23 38 0.32768000000000000000e5
-2115 2 2 32 0.32768000000000000000e5
-2115 2 7 21 0.13107200000000000000e6
-2115 2 17 20 0.65536000000000000000e5
-2115 3 2 31 0.13107200000000000000e6
-2115 3 3 32 0.13107200000000000000e6
-2115 3 8 37 0.65536000000000000000e5
-2116 1 9 40 -0.65536000000000000000e5
-2116 1 10 41 0.13107200000000000000e6
-2116 1 11 42 -0.13107200000000000000e6
-2116 1 26 41 0.65536000000000000000e5
-2116 1 32 47 -0.13107200000000000000e6
-2116 1 33 48 0.13107200000000000000e6
-2116 2 12 26 0.13107200000000000000e6
-2116 2 16 30 -0.65536000000000000000e5
-2116 2 17 21 0.65536000000000000000e5
-2116 2 20 34 -0.13107200000000000000e6
-2116 3 8 37 0.65536000000000000000e5
-2116 3 13 42 0.26214400000000000000e6
-2116 3 22 35 -0.26214400000000000000e6
-2116 3 28 41 -0.13107200000000000000e6
-2116 3 29 42 0.13107200000000000000e6
-2116 4 2 30 -0.65536000000000000000e5
-2116 4 3 31 -0.13107200000000000000e6
-2116 4 6 34 -0.13107200000000000000e6
-2117 1 1 48 -0.32768000000000000000e5
-2117 1 2 49 -0.32768000000000000000e5
-2117 1 12 43 0.26214400000000000000e6
-2117 1 23 38 -0.32768000000000000000e5
-2117 1 26 41 0.65536000000000000000e5
-2117 1 28 43 -0.13107200000000000000e6
-2117 1 32 47 -0.26214400000000000000e6
-2117 2 2 32 -0.32768000000000000000e5
-2117 2 16 30 -0.65536000000000000000e5
-2117 2 17 22 0.65536000000000000000e5
-2117 2 20 34 -0.13107200000000000000e6
-2117 3 22 35 -0.26214400000000000000e6
-2117 3 28 41 -0.26214400000000000000e6
-2117 4 2 30 -0.65536000000000000000e5
-2117 4 6 34 -0.13107200000000000000e6
-2118 1 2 33 -0.65536000000000000000e5
-2118 1 3 34 0.13107200000000000000e6
-2118 1 11 42 0.65536000000000000000e5
-2118 1 12 43 0.13107200000000000000e6
-2118 1 16 47 -0.13107200000000000000e6
-2118 1 28 43 -0.65536000000000000000e5
-2118 1 32 47 -0.65536000000000000000e5
-2118 1 33 48 -0.65536000000000000000e5
-2118 2 7 21 -0.65536000000000000000e5
-2118 2 12 26 -0.65536000000000000000e5
-2118 2 17 23 0.65536000000000000000e5
-2118 3 2 31 -0.65536000000000000000e5
-2118 3 3 32 -0.65536000000000000000e5
-2118 3 12 41 -0.13107200000000000000e6
-2118 3 13 42 -0.13107200000000000000e6
-2118 3 28 41 -0.65536000000000000000e5
-2118 3 29 42 -0.65536000000000000000e5
-2118 4 3 31 0.65536000000000000000e5
-2119 2 12 26 -0.65536000000000000000e5
-2119 2 17 24 0.65536000000000000000e5
-2120 1 12 43 0.65536000000000000000e5
-2120 1 13 44 -0.13107200000000000000e6
-2120 1 16 47 0.65536000000000000000e5
-2120 1 17 48 0.65536000000000000000e5
-2120 2 17 25 0.65536000000000000000e5
-2120 3 12 41 0.65536000000000000000e5
-2120 3 13 42 0.65536000000000000000e5
-2121 2 2 32 -0.65536000000000000000e5
-2121 2 17 26 0.65536000000000000000e5
-2122 1 2 49 0.65536000000000000000e5
-2122 1 8 39 -0.13107200000000000000e6
-2122 1 9 40 -0.13107200000000000000e6
-2122 1 10 41 0.26214400000000000000e6
-2122 1 23 38 0.65536000000000000000e5
-2122 1 24 39 0.65536000000000000000e5
-2122 1 26 41 0.13107200000000000000e6
-2122 1 32 47 -0.26214400000000000000e6
-2122 2 17 27 0.65536000000000000000e5
-2122 3 9 38 -0.13107200000000000000e6
-2122 3 28 41 -0.26214400000000000000e6
-2122 4 2 30 -0.13107200000000000000e6
-2123 2 3 33 -0.65536000000000000000e5
-2123 2 17 28 0.65536000000000000000e5
-2124 2 16 30 -0.65536000000000000000e5
-2124 2 17 29 0.65536000000000000000e5
-2125 1 1 48 -0.32768000000000000000e5
-2125 1 2 49 -0.32768000000000000000e5
-2125 1 12 43 0.26214400000000000000e6
-2125 1 23 38 -0.32768000000000000000e5
-2125 1 26 41 0.65536000000000000000e5
-2125 1 28 43 -0.13107200000000000000e6
-2125 1 32 47 -0.26214400000000000000e6
-2125 2 2 32 -0.32768000000000000000e5
-2125 2 16 30 -0.65536000000000000000e5
-2125 2 17 30 0.65536000000000000000e5
-2125 2 20 34 -0.13107200000000000000e6
-2125 3 22 35 -0.26214400000000000000e6
-2125 3 28 41 -0.26214400000000000000e6
-2125 4 6 34 -0.13107200000000000000e6
-2126 2 17 31 0.65536000000000000000e5
-2126 2 20 34 -0.65536000000000000000e5
-2126 4 6 34 -0.65536000000000000000e5
-2127 1 2 49 0.65536000000000000000e5
-2127 1 6 53 -0.13107200000000000000e6
-2127 1 8 39 -0.13107200000000000000e6
-2127 1 9 40 -0.13107200000000000000e6
-2127 1 10 41 0.26214400000000000000e6
-2127 1 23 38 0.65536000000000000000e5
-2127 1 24 39 0.65536000000000000000e5
-2127 1 25 40 0.13107200000000000000e6
-2127 1 26 41 0.13107200000000000000e6
-2127 1 32 47 -0.26214400000000000000e6
-2127 2 17 32 0.65536000000000000000e5
-2127 3 2 47 -0.65536000000000000000e5
-2127 3 9 38 -0.13107200000000000000e6
-2127 3 24 37 -0.13107200000000000000e6
-2127 3 25 38 0.65536000000000000000e5
-2127 3 27 40 -0.39321600000000000000e6
-2127 4 2 30 -0.13107200000000000000e6
-2127 4 4 32 0.13107200000000000000e6
-2127 4 16 28 -0.65536000000000000000e5
-2127 4 17 29 -0.13107200000000000000e6
-2128 2 3 33 -0.65536000000000000000e5
-2128 2 17 33 0.65536000000000000000e5
-2128 4 16 28 0.65536000000000000000e5
-2129 1 1 48 -0.32768000000000000000e5
-2129 1 2 49 -0.32768000000000000000e5
-2129 1 12 43 0.26214400000000000000e6
-2129 1 23 38 -0.32768000000000000000e5
-2129 1 26 41 0.65536000000000000000e5
-2129 1 28 43 -0.13107200000000000000e6
-2129 1 32 47 -0.26214400000000000000e6
-2129 2 2 32 -0.32768000000000000000e5
-2129 2 16 30 -0.65536000000000000000e5
-2129 2 17 34 0.65536000000000000000e5
-2129 2 20 34 -0.13107200000000000000e6
-2129 3 22 35 -0.26214400000000000000e6
-2129 3 28 41 -0.26214400000000000000e6
-2129 4 6 34 -0.13107200000000000000e6
-2129 4 17 29 0.65536000000000000000e5
-2130 1 1 48 0.65536000000000000000e5
-2130 1 2 49 0.65536000000000000000e5
-2130 1 6 53 0.13107200000000000000e6
-2130 1 8 39 0.26214400000000000000e6
-2130 1 9 40 0.26214400000000000000e6
-2130 1 10 41 -0.52428800000000000000e6
-2130 1 12 43 -0.52428800000000000000e6
-2130 1 22 53 -0.65536000000000000000e5
-2130 1 23 38 0.65536000000000000000e5
-2130 1 24 55 -0.13107200000000000000e6
-2130 1 25 40 -0.13107200000000000000e6
-2130 1 26 41 -0.13107200000000000000e6
-2130 1 28 43 0.26214400000000000000e6
-2130 1 32 47 0.52428800000000000000e6
-2130 1 37 52 0.26214400000000000000e6
-2130 1 40 47 0.65536000000000000000e5
-2130 2 2 32 0.65536000000000000000e5
-2130 2 16 30 0.13107200000000000000e6
-2130 2 17 35 0.65536000000000000000e5
-2130 2 20 34 0.26214400000000000000e6
-2130 2 26 32 -0.65536000000000000000e5
-2130 3 9 38 0.26214400000000000000e6
-2130 3 22 35 0.52428800000000000000e6
-2130 3 22 51 0.26214400000000000000e6
-2130 3 24 37 0.13107200000000000000e6
-2130 3 27 40 0.26214400000000000000e6
-2130 3 28 41 0.52428800000000000000e6
-2130 4 2 30 0.26214400000000000000e6
-2130 4 4 32 -0.13107200000000000000e6
-2130 4 6 34 0.26214400000000000000e6
-2130 4 16 28 0.13107200000000000000e6
-2130 4 17 29 0.13107200000000000000e6
-2130 4 20 32 0.13107200000000000000e6
-2131 1 6 37 0.32768000000000000000e5
-2131 1 24 39 -0.32768000000000000000e5
-2131 2 3 33 -0.32768000000000000000e5
-2131 2 18 18 0.65536000000000000000e5
-2131 3 2 39 0.32768000000000000000e5
-2131 3 3 40 0.32768000000000000000e5
-2131 3 9 38 -0.65536000000000000000e5
-2132 2 5 27 -0.65536000000000000000e5
-2132 2 18 19 0.65536000000000000000e5
-2133 1 9 40 -0.65536000000000000000e5
-2133 1 10 41 0.13107200000000000000e6
-2133 1 11 42 -0.13107200000000000000e6
-2133 1 26 41 0.65536000000000000000e5
-2133 1 32 47 -0.13107200000000000000e6
-2133 1 33 48 0.13107200000000000000e6
-2133 2 12 26 0.13107200000000000000e6
-2133 2 16 30 -0.65536000000000000000e5
-2133 2 18 20 0.65536000000000000000e5
-2133 2 20 34 -0.13107200000000000000e6
-2133 3 8 37 0.65536000000000000000e5
-2133 3 13 42 0.26214400000000000000e6
-2133 3 22 35 -0.26214400000000000000e6
-2133 3 28 41 -0.13107200000000000000e6
-2133 3 29 42 0.13107200000000000000e6
-2133 4 2 30 -0.65536000000000000000e5
-2133 4 3 31 -0.13107200000000000000e6
-2133 4 6 34 -0.13107200000000000000e6
-2134 1 1 48 -0.32768000000000000000e5
-2134 1 2 49 -0.32768000000000000000e5
-2134 1 12 43 0.26214400000000000000e6
-2134 1 23 38 -0.32768000000000000000e5
-2134 1 26 41 0.65536000000000000000e5
-2134 1 28 43 -0.13107200000000000000e6
-2134 1 32 47 -0.26214400000000000000e6
-2134 2 2 32 -0.32768000000000000000e5
-2134 2 16 30 -0.65536000000000000000e5
-2134 2 18 21 0.65536000000000000000e5
-2134 2 20 34 -0.13107200000000000000e6
-2134 3 22 35 -0.26214400000000000000e6
-2134 3 28 41 -0.26214400000000000000e6
-2134 4 2 30 -0.65536000000000000000e5
-2134 4 6 34 -0.13107200000000000000e6
-2135 1 9 40 0.65536000000000000000e5
-2135 1 10 41 0.13107200000000000000e6
-2135 1 11 42 0.13107200000000000000e6
-2135 1 26 41 -0.65536000000000000000e5
-2135 1 32 47 -0.13107200000000000000e6
-2135 1 33 48 -0.13107200000000000000e6
-2135 2 4 34 -0.65536000000000000000e5
-2135 2 18 22 0.65536000000000000000e5
-2135 3 9 38 0.65536000000000000000e5
-2135 3 10 39 0.65536000000000000000e5
-2135 3 13 42 -0.26214400000000000000e6
-2135 3 28 41 -0.13107200000000000000e6
-2135 3 29 42 -0.13107200000000000000e6
-2135 4 3 31 0.13107200000000000000e6
-2136 2 12 26 -0.65536000000000000000e5
-2136 2 18 23 0.65536000000000000000e5
-2137 1 17 48 -0.13107200000000000000e6
-2137 1 28 43 0.65536000000000000000e5
-2137 1 32 47 0.65536000000000000000e5
-2137 1 33 48 0.65536000000000000000e5
-2137 2 18 24 0.65536000000000000000e5
-2137 3 28 41 0.65536000000000000000e5
-2137 3 29 42 0.65536000000000000000e5
-2137 4 3 31 -0.65536000000000000000e5
-2138 1 4 35 -0.65536000000000000000e5
-2138 1 17 48 0.65536000000000000000e5
-2138 2 9 23 -0.65536000000000000000e5
-2138 2 18 25 0.65536000000000000000e5
-2138 3 5 34 -0.65536000000000000000e5
-2138 3 13 42 0.65536000000000000000e5
-2138 3 14 27 -0.65536000000000000000e5
-2138 3 16 29 0.13107200000000000000e6
-2139 1 2 49 0.65536000000000000000e5
-2139 1 8 39 -0.13107200000000000000e6
-2139 1 9 40 -0.13107200000000000000e6
-2139 1 10 41 0.26214400000000000000e6
-2139 1 23 38 0.65536000000000000000e5
-2139 1 24 39 0.65536000000000000000e5
-2139 1 26 41 0.13107200000000000000e6
-2139 1 32 47 -0.26214400000000000000e6
-2139 2 18 26 0.65536000000000000000e5
-2139 3 9 38 -0.13107200000000000000e6
-2139 3 28 41 -0.26214400000000000000e6
-2139 4 2 30 -0.13107200000000000000e6
-2140 2 3 33 -0.65536000000000000000e5
-2140 2 18 27 0.65536000000000000000e5
-2141 1 1 48 -0.65536000000000000000e5
-2141 1 2 49 -0.13107200000000000000e6
-2141 1 8 39 -0.13107200000000000000e6
-2141 1 9 40 -0.13107200000000000000e6
-2141 1 10 41 0.26214400000000000000e6
-2141 1 12 43 0.52428800000000000000e6
-2141 1 23 38 -0.65536000000000000000e5
-2141 1 25 40 0.65536000000000000000e5
-2141 1 28 43 -0.26214400000000000000e6
-2141 1 32 47 -0.52428800000000000000e6
-2141 2 2 32 -0.65536000000000000000e5
-2141 2 3 33 -0.65536000000000000000e5
-2141 2 16 30 -0.13107200000000000000e6
-2141 2 18 28 0.65536000000000000000e5
-2141 2 20 34 -0.26214400000000000000e6
-2141 3 9 38 -0.13107200000000000000e6
-2141 3 22 35 -0.52428800000000000000e6
-2141 3 28 41 -0.52428800000000000000e6
-2141 4 2 30 -0.13107200000000000000e6
-2141 4 6 34 -0.26214400000000000000e6
-2142 1 1 48 -0.32768000000000000000e5
-2142 1 2 49 -0.32768000000000000000e5
-2142 1 12 43 0.26214400000000000000e6
-2142 1 23 38 -0.32768000000000000000e5
-2142 1 26 41 0.65536000000000000000e5
-2142 1 28 43 -0.13107200000000000000e6
-2142 1 32 47 -0.26214400000000000000e6
-2142 2 2 32 -0.32768000000000000000e5
-2142 2 16 30 -0.65536000000000000000e5
-2142 2 18 29 0.65536000000000000000e5
-2142 2 20 34 -0.13107200000000000000e6
-2142 3 22 35 -0.26214400000000000000e6
-2142 3 28 41 -0.26214400000000000000e6
-2142 4 6 34 -0.13107200000000000000e6
-2143 2 4 34 -0.65536000000000000000e5
-2143 2 18 30 0.65536000000000000000e5
-2144 1 17 48 -0.13107200000000000000e6
-2144 1 28 43 0.65536000000000000000e5
-2144 1 32 47 0.65536000000000000000e5
-2144 1 33 48 0.65536000000000000000e5
-2144 2 18 31 0.65536000000000000000e5
-2144 3 28 41 0.65536000000000000000e5
-2144 3 29 42 0.65536000000000000000e5
-2145 2 3 33 -0.65536000000000000000e5
-2145 2 18 32 0.65536000000000000000e5
-2145 4 16 28 0.65536000000000000000e5
-2146 1 1 48 -0.65536000000000000000e5
-2146 1 2 49 -0.13107200000000000000e6
-2146 1 8 39 -0.13107200000000000000e6
-2146 1 9 40 -0.13107200000000000000e6
-2146 1 10 41 0.26214400000000000000e6
-2146 1 12 43 0.52428800000000000000e6
-2146 1 23 38 -0.65536000000000000000e5
-2146 1 25 40 0.65536000000000000000e5
-2146 1 28 43 -0.26214400000000000000e6
-2146 1 32 47 -0.52428800000000000000e6
-2146 2 2 32 -0.65536000000000000000e5
-2146 2 3 33 -0.65536000000000000000e5
-2146 2 16 30 -0.13107200000000000000e6
-2146 2 18 33 0.65536000000000000000e5
-2146 2 20 34 -0.26214400000000000000e6
-2146 3 9 38 -0.13107200000000000000e6
-2146 3 22 35 -0.52428800000000000000e6
-2146 3 28 41 -0.52428800000000000000e6
-2146 4 2 30 -0.13107200000000000000e6
-2146 4 4 32 0.65536000000000000000e5
-2146 4 6 34 -0.26214400000000000000e6
-2147 2 18 34 0.65536000000000000000e5
-2147 2 21 35 -0.65536000000000000000e5
-2147 4 7 35 -0.65536000000000000000e5
-2148 1 23 54 0.65536000000000000000e5
-2148 1 24 55 -0.13107200000000000000e6
-2148 1 25 56 0.65536000000000000000e5
-2148 1 40 47 0.65536000000000000000e5
-2148 2 18 35 0.65536000000000000000e5
-2148 3 24 53 -0.65536000000000000000e5
-2148 3 25 54 -0.65536000000000000000e5
-2148 3 38 51 0.13107200000000000000e6
-2148 4 28 32 -0.65536000000000000000e5
-2149 1 1 40 0.32768000000000000000e5
-2149 1 2 33 -0.26214400000000000000e6
-2149 1 9 40 0.13107200000000000000e6
-2149 1 10 25 -0.13107200000000000000e6
-2149 1 11 42 0.26214400000000000000e6
-2149 1 12 43 0.52428800000000000000e6
-2149 1 23 38 -0.32768000000000000000e5
-2149 1 28 43 -0.26214400000000000000e6
-2149 1 32 47 -0.26214400000000000000e6
-2149 1 33 48 -0.26214400000000000000e6
-2149 2 2 32 -0.32768000000000000000e5
-2149 2 3 17 0.32768000000000000000e5
-2149 2 5 19 -0.32768000000000000000e5
-2149 2 12 26 -0.26214400000000000000e6
-2149 2 19 19 0.65536000000000000000e5
-2149 3 1 30 0.13107200000000000000e6
-2149 3 1 38 0.32768000000000000000e5
-2149 3 2 23 0.32768000000000000000e5
-2149 3 2 39 0.32768000000000000000e5
-2149 3 3 32 -0.13107200000000000000e6
-2149 3 5 26 -0.32768000000000000000e5
-2149 3 8 37 -0.65536000000000000000e5
-2149 3 13 42 -0.52428800000000000000e6
-2149 3 14 27 0.26214400000000000000e6
-2149 3 28 41 -0.26214400000000000000e6
-2149 3 29 42 -0.26214400000000000000e6
-2149 4 3 31 0.26214400000000000000e6
-2149 4 4 16 -0.32768000000000000000e5
-2149 4 5 17 0.32768000000000000000e5
-2149 4 6 18 0.65536000000000000000e5
-2149 4 7 19 -0.65536000000000000000e5
-2149 4 8 20 -0.13107200000000000000e6
-2150 1 1 48 -0.32768000000000000000e5
-2150 1 2 49 -0.32768000000000000000e5
-2150 1 12 43 0.26214400000000000000e6
-2150 1 23 38 -0.32768000000000000000e5
-2150 1 26 41 0.65536000000000000000e5
-2150 1 28 43 -0.13107200000000000000e6
-2150 1 32 47 -0.26214400000000000000e6
-2150 2 2 32 -0.32768000000000000000e5
-2150 2 16 30 -0.65536000000000000000e5
-2150 2 19 20 0.65536000000000000000e5
-2150 2 20 34 -0.13107200000000000000e6
-2150 3 22 35 -0.26214400000000000000e6
-2150 3 28 41 -0.26214400000000000000e6
-2150 4 2 30 -0.65536000000000000000e5
-2150 4 6 34 -0.13107200000000000000e6
-2151 1 9 40 0.65536000000000000000e5
-2151 1 10 41 0.13107200000000000000e6
-2151 1 11 42 0.13107200000000000000e6
-2151 1 26 41 -0.65536000000000000000e5
-2151 1 32 47 -0.13107200000000000000e6
-2151 1 33 48 -0.13107200000000000000e6
-2151 2 4 34 -0.65536000000000000000e5
-2151 2 19 21 0.65536000000000000000e5
-2151 3 9 38 0.65536000000000000000e5
-2151 3 10 39 0.65536000000000000000e5
-2151 3 13 42 -0.26214400000000000000e6
-2151 3 28 41 -0.13107200000000000000e6
-2151 3 29 42 -0.13107200000000000000e6
-2151 4 3 31 0.13107200000000000000e6
-2152 2 19 22 0.65536000000000000000e5
-2152 2 28 34 -0.65536000000000000000e5
-2152 4 18 22 -0.65536000000000000000e5
-2152 4 18 30 -0.65536000000000000000e5
-2152 4 21 33 -0.65536000000000000000e5
-2153 1 17 48 -0.13107200000000000000e6
-2153 1 28 43 0.65536000000000000000e5
-2153 1 32 47 0.65536000000000000000e5
-2153 1 33 48 0.65536000000000000000e5
-2153 2 19 23 0.65536000000000000000e5
-2153 3 28 41 0.65536000000000000000e5
-2153 3 29 42 0.65536000000000000000e5
-2153 4 3 31 -0.65536000000000000000e5
-2154 1 10 41 -0.65536000000000000000e5
-2154 1 14 45 -0.26214400000000000000e6
-2154 1 17 48 0.13107200000000000000e6
-2154 1 18 49 0.13107200000000000000e6
-2154 1 26 33 0.65536000000000000000e5
-2154 1 28 43 0.65536000000000000000e5
-2154 1 32 47 0.65536000000000000000e5
-2154 1 33 48 0.65536000000000000000e5
-2154 2 14 28 0.13107200000000000000e6
-2154 2 19 24 0.65536000000000000000e5
-2154 3 13 42 0.26214400000000000000e6
-2154 3 14 43 0.13107200000000000000e6
-2154 3 28 41 0.65536000000000000000e5
-2154 3 29 42 0.65536000000000000000e5
-2154 4 3 31 -0.65536000000000000000e5
-2155 2 14 28 -0.65536000000000000000e5
-2155 2 19 25 0.65536000000000000000e5
-2156 2 3 33 -0.65536000000000000000e5
-2156 2 19 26 0.65536000000000000000e5
-2157 1 1 48 -0.65536000000000000000e5
-2157 1 2 49 -0.13107200000000000000e6
-2157 1 8 39 -0.13107200000000000000e6
-2157 1 9 40 -0.13107200000000000000e6
-2157 1 10 41 0.26214400000000000000e6
-2157 1 12 43 0.52428800000000000000e6
-2157 1 23 38 -0.65536000000000000000e5
-2157 1 25 40 0.65536000000000000000e5
-2157 1 28 43 -0.26214400000000000000e6
-2157 1 32 47 -0.52428800000000000000e6
-2157 2 2 32 -0.65536000000000000000e5
-2157 2 3 33 -0.65536000000000000000e5
-2157 2 16 30 -0.13107200000000000000e6
-2157 2 19 27 0.65536000000000000000e5
-2157 2 20 34 -0.26214400000000000000e6
-2157 3 9 38 -0.13107200000000000000e6
-2157 3 22 35 -0.52428800000000000000e6
-2157 3 28 41 -0.52428800000000000000e6
-2157 4 2 30 -0.13107200000000000000e6
-2157 4 6 34 -0.26214400000000000000e6
-2158 1 6 53 -0.65536000000000000000e5
-2158 1 25 40 0.65536000000000000000e5
-2158 2 5 35 -0.65536000000000000000e5
-2158 2 19 28 0.65536000000000000000e5
-2158 3 5 50 -0.13107200000000000000e6
-2158 3 25 38 0.65536000000000000000e5
-2158 3 26 39 0.65536000000000000000e5
-2159 2 4 34 -0.65536000000000000000e5
-2159 2 19 29 0.65536000000000000000e5
-2160 2 19 30 0.65536000000000000000e5
-2160 2 28 34 -0.65536000000000000000e5
-2160 4 18 30 -0.65536000000000000000e5
-2160 4 21 33 -0.65536000000000000000e5
-2161 1 28 43 0.65536000000000000000e5
-2161 1 33 40 0.65536000000000000000e5
-2161 1 33 48 0.65536000000000000000e5
-2161 1 34 49 -0.13107200000000000000e6
-2161 2 19 31 0.65536000000000000000e5
-2161 3 18 47 -0.13107200000000000000e6
-2161 3 29 42 0.65536000000000000000e5
-2162 1 1 48 -0.65536000000000000000e5
-2162 1 2 49 -0.13107200000000000000e6
-2162 1 8 39 -0.13107200000000000000e6
-2162 1 9 40 -0.13107200000000000000e6
-2162 1 10 41 0.26214400000000000000e6
-2162 1 12 43 0.52428800000000000000e6
-2162 1 23 38 -0.65536000000000000000e5
-2162 1 25 40 0.65536000000000000000e5
-2162 1 28 43 -0.26214400000000000000e6
-2162 1 32 47 -0.52428800000000000000e6
-2162 2 2 32 -0.65536000000000000000e5
-2162 2 3 33 -0.65536000000000000000e5
-2162 2 16 30 -0.13107200000000000000e6
-2162 2 19 32 0.65536000000000000000e5
-2162 2 20 34 -0.26214400000000000000e6
-2162 3 9 38 -0.13107200000000000000e6
-2162 3 22 35 -0.52428800000000000000e6
-2162 3 28 41 -0.52428800000000000000e6
-2162 4 2 30 -0.13107200000000000000e6
-2162 4 4 32 0.65536000000000000000e5
-2162 4 6 34 -0.26214400000000000000e6
-2163 2 5 35 -0.65536000000000000000e5
-2163 2 19 33 0.65536000000000000000e5
-2164 2 19 34 0.65536000000000000000e5
-2164 2 28 34 -0.65536000000000000000e5
-2164 4 21 33 -0.65536000000000000000e5
-2165 1 1 48 0.65536000000000000000e5
-2165 1 2 49 0.13107200000000000000e6
-2165 1 6 53 -0.65536000000000000000e5
-2165 1 8 39 0.13107200000000000000e6
-2165 1 9 40 0.13107200000000000000e6
-2165 1 10 41 -0.26214400000000000000e6
-2165 1 12 43 -0.52428800000000000000e6
-2165 1 23 38 0.65536000000000000000e5
-2165 1 24 39 0.65536000000000000000e5
-2165 1 24 55 0.13107200000000000000e6
-2165 1 25 56 0.65536000000000000000e5
-2165 1 26 41 -0.26214400000000000000e6
-2165 1 28 43 0.26214400000000000000e6
-2165 1 32 47 0.52428800000000000000e6
-2165 1 40 47 0.65536000000000000000e5
-2165 2 2 32 0.65536000000000000000e5
-2165 2 3 33 0.65536000000000000000e5
-2165 2 5 35 -0.65536000000000000000e5
-2165 2 16 30 0.13107200000000000000e6
-2165 2 19 35 0.65536000000000000000e5
-2165 2 20 34 0.26214400000000000000e6
-2165 3 9 38 0.13107200000000000000e6
-2165 3 22 35 0.52428800000000000000e6
-2165 3 22 51 -0.13107200000000000000e6
-2165 3 23 52 0.26214400000000000000e6
-2165 3 24 53 -0.65536000000000000000e5
-2165 3 25 38 0.65536000000000000000e5
-2165 3 25 54 -0.65536000000000000000e5
-2165 3 27 40 0.13107200000000000000e6
-2165 3 28 41 0.52428800000000000000e6
-2165 3 38 51 0.13107200000000000000e6
-2165 3 39 40 -0.65536000000000000000e5
-2165 4 2 30 0.13107200000000000000e6
-2165 4 6 34 0.26214400000000000000e6
-2165 4 7 35 -0.13107200000000000000e6
-2165 4 28 32 -0.65536000000000000000e5
-2166 2 1 31 -0.32768000000000000000e5
-2166 2 20 20 0.65536000000000000000e5
-2167 1 2 33 -0.65536000000000000000e5
-2167 1 3 34 0.13107200000000000000e6
-2167 1 11 42 0.65536000000000000000e5
-2167 1 12 43 0.13107200000000000000e6
-2167 1 16 47 -0.13107200000000000000e6
-2167 1 28 43 -0.65536000000000000000e5
-2167 1 32 47 -0.65536000000000000000e5
-2167 1 33 48 -0.65536000000000000000e5
-2167 2 7 21 -0.65536000000000000000e5
-2167 2 12 26 -0.65536000000000000000e5
-2167 2 20 21 0.65536000000000000000e5
-2167 3 2 31 -0.65536000000000000000e5
-2167 3 3 32 -0.65536000000000000000e5
-2167 3 12 41 -0.13107200000000000000e6
-2167 3 13 42 -0.13107200000000000000e6
-2167 3 28 41 -0.65536000000000000000e5
-2167 3 29 42 -0.65536000000000000000e5
-2167 4 3 31 0.65536000000000000000e5
-2168 2 12 26 -0.65536000000000000000e5
-2168 2 20 22 0.65536000000000000000e5
-2169 1 12 43 0.65536000000000000000e5
-2169 1 16 23 0.65536000000000000000e5
-2169 1 16 47 0.65536000000000000000e5
-2169 1 27 34 -0.13107200000000000000e6
-2169 2 20 23 0.65536000000000000000e5
-2169 3 1 34 -0.65536000000000000000e5
-2169 3 12 41 0.65536000000000000000e5
-2170 1 12 43 0.65536000000000000000e5
-2170 1 13 44 -0.13107200000000000000e6
-2170 1 16 47 0.65536000000000000000e5
-2170 1 17 48 0.65536000000000000000e5
-2170 2 20 24 0.65536000000000000000e5
-2170 3 12 41 0.65536000000000000000e5
-2170 3 13 42 0.65536000000000000000e5
-2171 1 4 35 0.32768000000000000000e5
-2171 1 12 43 0.32768000000000000000e5
-2171 1 13 44 0.65536000000000000000e5
-2171 1 14 45 0.65536000000000000000e5
-2171 1 17 48 -0.32768000000000000000e5
-2171 1 18 49 -0.32768000000000000000e5
-2171 1 20 27 -0.13107200000000000000e6
-2171 1 27 34 0.65536000000000000000e5
-2171 2 9 23 0.32768000000000000000e5
-2171 2 14 28 -0.32768000000000000000e5
-2171 2 20 25 0.65536000000000000000e5
-2171 3 5 34 0.32768000000000000000e5
-2171 3 7 36 0.13107200000000000000e6
-2171 3 13 42 -0.32768000000000000000e5
-2171 3 14 27 0.32768000000000000000e5
-2171 3 14 43 -0.32768000000000000000e5
-2171 3 16 29 -0.65536000000000000000e5
-2172 1 1 48 0.32768000000000000000e5
-2172 1 2 33 0.13107200000000000000e6
-2172 1 2 49 0.32768000000000000000e5
-2172 1 3 34 -0.26214400000000000000e6
-2172 1 7 38 0.65536000000000000000e5
-2172 1 8 39 0.65536000000000000000e5
-2172 1 10 41 0.13107200000000000000e6
-2172 1 23 38 0.32768000000000000000e5
-2172 2 2 32 0.32768000000000000000e5
-2172 2 7 21 0.13107200000000000000e6
-2172 2 20 26 0.65536000000000000000e5
-2172 3 2 31 0.13107200000000000000e6
-2172 3 3 32 0.13107200000000000000e6
-2172 3 8 37 0.65536000000000000000e5
-2172 4 1 29 0.65536000000000000000e5
-2173 2 16 30 -0.65536000000000000000e5
-2173 2 20 27 0.65536000000000000000e5
-2174 1 1 48 -0.32768000000000000000e5
-2174 1 2 49 -0.32768000000000000000e5
-2174 1 12 43 0.26214400000000000000e6
-2174 1 23 38 -0.32768000000000000000e5
-2174 1 26 41 0.65536000000000000000e5
-2174 1 28 43 -0.13107200000000000000e6
-2174 1 32 47 -0.26214400000000000000e6
-2174 2 2 32 -0.32768000000000000000e5
-2174 2 16 30 -0.65536000000000000000e5
-2174 2 20 28 0.65536000000000000000e5
-2174 2 20 34 -0.13107200000000000000e6
-2174 3 22 35 -0.26214400000000000000e6
-2174 3 28 41 -0.26214400000000000000e6
-2174 4 6 34 -0.13107200000000000000e6
-2175 1 2 33 -0.65536000000000000000e5
-2175 1 3 34 0.13107200000000000000e6
-2175 1 9 40 0.32768000000000000000e5
-2175 1 10 41 -0.13107200000000000000e6
-2175 1 12 43 0.13107200000000000000e6
-2175 1 16 47 -0.13107200000000000000e6
-2175 1 26 41 -0.32768000000000000000e5
-2175 1 28 43 -0.65536000000000000000e5
-2175 1 32 47 0.65536000000000000000e5
-2175 2 7 21 -0.65536000000000000000e5
-2175 2 20 29 0.65536000000000000000e5
-2175 2 20 34 -0.65536000000000000000e5
-2175 3 2 31 -0.65536000000000000000e5
-2175 3 3 32 -0.65536000000000000000e5
-2175 3 8 37 -0.32768000000000000000e5
-2175 3 9 38 0.32768000000000000000e5
-2175 3 22 27 -0.32768000000000000000e5
-2175 3 22 35 -0.13107200000000000000e6
-2175 3 28 41 0.65536000000000000000e5
-2175 4 1 29 -0.32768000000000000000e5
-2175 4 2 30 0.32768000000000000000e5
-2175 4 6 34 -0.65536000000000000000e5
-2176 2 20 30 0.65536000000000000000e5
-2176 2 20 34 -0.65536000000000000000e5
-2176 4 6 34 -0.65536000000000000000e5
-2177 1 12 43 0.65536000000000000000e5
-2177 1 16 47 0.65536000000000000000e5
-2177 1 17 48 0.65536000000000000000e5
-2177 1 34 41 -0.13107200000000000000e6
-2177 2 20 31 0.65536000000000000000e5
-2177 3 22 35 -0.65536000000000000000e5
-2178 2 16 34 -0.65536000000000000000e5
-2178 2 20 32 0.65536000000000000000e5
-2179 1 1 48 -0.32768000000000000000e5
-2179 1 2 49 -0.32768000000000000000e5
-2179 1 12 43 0.26214400000000000000e6
-2179 1 23 38 -0.32768000000000000000e5
-2179 1 26 41 0.65536000000000000000e5
-2179 1 28 43 -0.13107200000000000000e6
-2179 1 32 47 -0.26214400000000000000e6
-2179 2 2 32 -0.32768000000000000000e5
-2179 2 16 30 -0.65536000000000000000e5
-2179 2 20 33 0.65536000000000000000e5
-2179 2 20 34 -0.13107200000000000000e6
-2179 3 22 35 -0.26214400000000000000e6
-2179 3 28 41 -0.26214400000000000000e6
-2179 4 6 34 -0.13107200000000000000e6
-2179 4 17 29 0.65536000000000000000e5
-2180 1 1 48 -0.32768000000000000000e5
-2180 1 2 49 -0.32768000000000000000e5
-2180 1 12 43 0.26214400000000000000e6
-2180 1 23 38 -0.32768000000000000000e5
-2180 1 26 41 0.65536000000000000000e5
-2180 1 28 43 -0.13107200000000000000e6
-2180 1 32 47 -0.26214400000000000000e6
-2180 2 2 32 -0.32768000000000000000e5
-2180 2 16 30 -0.65536000000000000000e5
-2180 2 20 34 -0.13107200000000000000e6
-2180 2 20 35 0.65536000000000000000e5
-2180 3 22 35 -0.26214400000000000000e6
-2180 3 28 41 -0.26214400000000000000e6
-2180 4 6 34 -0.13107200000000000000e6
-2180 4 17 29 0.65536000000000000000e5
-2180 4 20 32 0.65536000000000000000e5
-2181 2 12 26 -0.32768000000000000000e5
-2181 2 21 21 0.65536000000000000000e5
-2182 1 17 48 -0.13107200000000000000e6
-2182 1 28 43 0.65536000000000000000e5
-2182 1 32 47 0.65536000000000000000e5
-2182 1 33 48 0.65536000000000000000e5
-2182 2 21 22 0.65536000000000000000e5
-2182 3 28 41 0.65536000000000000000e5
-2182 3 29 42 0.65536000000000000000e5
-2182 4 3 31 -0.65536000000000000000e5
-2183 1 12 43 0.65536000000000000000e5
-2183 1 13 44 -0.13107200000000000000e6
-2183 1 16 47 0.65536000000000000000e5
-2183 1 17 48 0.65536000000000000000e5
-2183 2 21 23 0.65536000000000000000e5
-2183 3 12 41 0.65536000000000000000e5
-2183 3 13 42 0.65536000000000000000e5
-2184 1 4 35 -0.65536000000000000000e5
-2184 1 17 48 0.65536000000000000000e5
-2184 2 9 23 -0.65536000000000000000e5
-2184 2 21 24 0.65536000000000000000e5
-2184 3 5 34 -0.65536000000000000000e5
-2184 3 13 42 0.65536000000000000000e5
-2184 3 14 27 -0.65536000000000000000e5
-2184 3 16 29 0.13107200000000000000e6
-2185 1 3 18 -0.32768000000000000000e5
-2185 1 4 19 0.65536000000000000000e5
-2185 1 4 35 0.32768000000000000000e5
-2185 1 5 36 0.65536000000000000000e5
-2185 1 12 43 0.65536000000000000000e5
-2185 1 14 45 0.65536000000000000000e5
-2185 1 17 32 -0.13107200000000000000e6
-2185 1 17 48 -0.32768000000000000000e5
-2185 1 18 49 -0.32768000000000000000e5
-2185 2 9 23 0.32768000000000000000e5
-2185 2 14 28 -0.32768000000000000000e5
-2185 2 21 25 0.65536000000000000000e5
-2185 3 3 16 -0.32768000000000000000e5
-2185 3 4 17 -0.32768000000000000000e5
-2185 3 5 34 0.32768000000000000000e5
-2185 3 13 42 -0.32768000000000000000e5
-2185 3 14 27 0.65536000000000000000e5
-2185 3 14 43 -0.32768000000000000000e5
-2185 4 2 14 -0.32768000000000000000e5
-2185 4 11 23 0.65536000000000000000e5
-2186 2 16 30 -0.65536000000000000000e5
-2186 2 21 26 0.65536000000000000000e5
-2187 1 1 48 -0.32768000000000000000e5
-2187 1 2 49 -0.32768000000000000000e5
-2187 1 12 43 0.26214400000000000000e6
-2187 1 23 38 -0.32768000000000000000e5
-2187 1 26 41 0.65536000000000000000e5
-2187 1 28 43 -0.13107200000000000000e6
-2187 1 32 47 -0.26214400000000000000e6
-2187 2 2 32 -0.32768000000000000000e5
-2187 2 16 30 -0.65536000000000000000e5
-2187 2 20 34 -0.13107200000000000000e6
-2187 2 21 27 0.65536000000000000000e5
-2187 3 22 35 -0.26214400000000000000e6
-2187 3 28 41 -0.26214400000000000000e6
-2187 4 6 34 -0.13107200000000000000e6
-2188 2 4 34 -0.65536000000000000000e5
-2188 2 21 28 0.65536000000000000000e5
-2189 2 20 34 -0.65536000000000000000e5
-2189 2 21 29 0.65536000000000000000e5
-2189 4 6 34 -0.65536000000000000000e5
-2190 1 17 48 -0.13107200000000000000e6
-2190 1 28 43 0.65536000000000000000e5
-2190 1 32 47 0.65536000000000000000e5
-2190 1 33 48 0.65536000000000000000e5
-2190 2 21 30 0.65536000000000000000e5
-2190 3 28 41 0.65536000000000000000e5
-2190 3 29 42 0.65536000000000000000e5
-2191 1 4 35 -0.65536000000000000000e5
-2191 1 17 48 0.65536000000000000000e5
-2191 2 9 23 -0.65536000000000000000e5
-2191 2 21 31 0.65536000000000000000e5
-2191 3 5 34 -0.65536000000000000000e5
-2191 3 13 42 0.65536000000000000000e5
-2191 3 14 27 -0.65536000000000000000e5
-2191 3 16 29 0.13107200000000000000e6
-2191 4 14 26 0.65536000000000000000e5
-2192 1 1 48 -0.32768000000000000000e5
-2192 1 2 49 -0.32768000000000000000e5
-2192 1 12 43 0.26214400000000000000e6
-2192 1 23 38 -0.32768000000000000000e5
-2192 1 26 41 0.65536000000000000000e5
-2192 1 28 43 -0.13107200000000000000e6
-2192 1 32 47 -0.26214400000000000000e6
-2192 2 2 32 -0.32768000000000000000e5
-2192 2 16 30 -0.65536000000000000000e5
-2192 2 20 34 -0.13107200000000000000e6
-2192 2 21 32 0.65536000000000000000e5
-2192 3 22 35 -0.26214400000000000000e6
-2192 3 28 41 -0.26214400000000000000e6
-2192 4 6 34 -0.13107200000000000000e6
-2192 4 17 29 0.65536000000000000000e5
-2193 2 21 33 0.65536000000000000000e5
-2193 2 21 35 -0.65536000000000000000e5
-2193 4 7 35 -0.65536000000000000000e5
-2194 1 17 48 -0.13107200000000000000e6
-2194 1 28 43 0.65536000000000000000e5
-2194 1 32 47 0.65536000000000000000e5
-2194 1 33 48 0.65536000000000000000e5
-2194 2 21 34 0.65536000000000000000e5
-2194 3 28 41 0.65536000000000000000e5
-2194 3 29 42 0.65536000000000000000e5
-2194 4 23 27 0.65536000000000000000e5
-2195 1 10 41 -0.32768000000000000000e5
-2195 1 14 45 -0.13107200000000000000e6
-2195 1 17 48 0.65536000000000000000e5
-2195 1 18 49 0.65536000000000000000e5
-2195 1 26 33 0.32768000000000000000e5
-2195 1 28 43 0.32768000000000000000e5
-2195 1 32 47 0.32768000000000000000e5
-2195 1 33 48 0.32768000000000000000e5
-2195 2 14 28 0.65536000000000000000e5
-2195 2 22 22 0.65536000000000000000e5
-2195 3 13 42 0.13107200000000000000e6
-2195 3 14 43 0.65536000000000000000e5
-2195 3 28 41 0.32768000000000000000e5
-2195 3 29 42 0.32768000000000000000e5
-2195 4 3 31 -0.32768000000000000000e5
-2196 1 4 35 -0.65536000000000000000e5
-2196 1 17 48 0.65536000000000000000e5
-2196 2 9 23 -0.65536000000000000000e5
-2196 2 22 23 0.65536000000000000000e5
-2196 3 5 34 -0.65536000000000000000e5
-2196 3 13 42 0.65536000000000000000e5
-2196 3 14 27 -0.65536000000000000000e5
-2196 3 16 29 0.13107200000000000000e6
-2197 2 14 28 -0.65536000000000000000e5
-2197 2 22 24 0.65536000000000000000e5
-2198 1 4 35 0.32768000000000000000e5
-2198 1 11 18 0.65536000000000000000e5
-2198 1 12 43 0.32768000000000000000e5
-2198 1 13 20 -0.26214400000000000000e6
-2198 1 14 45 0.13107200000000000000e6
-2198 1 17 32 0.13107200000000000000e6
-2198 1 17 48 -0.32768000000000000000e5
-2198 1 18 49 -0.32768000000000000000e5
-2198 1 20 27 0.13107200000000000000e6
-2198 2 9 23 0.32768000000000000000e5
-2198 2 11 25 0.13107200000000000000e6
-2198 2 14 28 -0.32768000000000000000e5
-2198 2 22 25 0.65536000000000000000e5
-2198 3 5 34 0.32768000000000000000e5
-2198 3 6 19 -0.65536000000000000000e5
-2198 3 8 21 0.26214400000000000000e6
-2198 3 13 42 -0.32768000000000000000e5
-2198 3 14 27 0.32768000000000000000e5
-2198 3 14 43 -0.32768000000000000000e5
-2198 3 16 29 -0.65536000000000000000e5
-2198 3 17 30 -0.65536000000000000000e5
-2198 3 18 31 0.13107200000000000000e6
-2199 1 1 48 -0.32768000000000000000e5
-2199 1 2 49 -0.32768000000000000000e5
-2199 1 12 43 0.26214400000000000000e6
-2199 1 23 38 -0.32768000000000000000e5
-2199 1 26 41 0.65536000000000000000e5
-2199 1 28 43 -0.13107200000000000000e6
-2199 1 32 47 -0.26214400000000000000e6
-2199 2 2 32 -0.32768000000000000000e5
-2199 2 16 30 -0.65536000000000000000e5
-2199 2 20 34 -0.13107200000000000000e6
-2199 2 22 26 0.65536000000000000000e5
-2199 3 22 35 -0.26214400000000000000e6
-2199 3 28 41 -0.26214400000000000000e6
-2199 4 6 34 -0.13107200000000000000e6
-2200 2 4 34 -0.65536000000000000000e5
-2200 2 22 27 0.65536000000000000000e5
-2201 2 22 28 0.65536000000000000000e5
-2201 2 28 34 -0.65536000000000000000e5
-2201 4 18 30 -0.65536000000000000000e5
-2201 4 21 33 -0.65536000000000000000e5
-2202 1 17 48 -0.13107200000000000000e6
-2202 1 28 43 0.65536000000000000000e5
-2202 1 32 47 0.65536000000000000000e5
-2202 1 33 48 0.65536000000000000000e5
-2202 2 22 29 0.65536000000000000000e5
-2202 3 28 41 0.65536000000000000000e5
-2202 3 29 42 0.65536000000000000000e5
-2203 1 28 43 0.65536000000000000000e5
-2203 1 33 40 0.65536000000000000000e5
-2203 1 33 48 0.65536000000000000000e5
-2203 1 34 49 -0.13107200000000000000e6
-2203 2 22 30 0.65536000000000000000e5
-2203 3 18 47 -0.13107200000000000000e6
-2203 3 29 42 0.65536000000000000000e5
-2204 1 14 45 -0.26214400000000000000e6
-2204 1 17 48 0.13107200000000000000e6
-2204 1 18 49 0.13107200000000000000e6
-2204 1 34 49 0.13107200000000000000e6
-2204 2 14 28 0.65536000000000000000e5
-2204 2 22 31 0.65536000000000000000e5
-2204 3 14 43 0.65536000000000000000e5
-2204 3 15 44 -0.13107200000000000000e6
-2204 3 16 45 0.26214400000000000000e6
-2204 3 18 47 0.13107200000000000000e6
-2204 3 22 35 -0.65536000000000000000e5
-2204 4 14 26 -0.65536000000000000000e5
-2204 4 15 27 -0.13107200000000000000e6
-2205 2 21 35 -0.65536000000000000000e5
-2205 2 22 32 0.65536000000000000000e5
-2205 4 7 35 -0.65536000000000000000e5
-2206 2 22 33 0.65536000000000000000e5
-2206 2 28 34 -0.65536000000000000000e5
-2206 4 21 33 -0.65536000000000000000e5
-2207 1 6 53 -0.16384000000000000000e5
-2207 1 25 40 0.16384000000000000000e5
-2207 1 28 43 0.65536000000000000000e5
-2207 1 33 40 0.65536000000000000000e5
-2207 1 33 48 0.65536000000000000000e5
-2207 1 34 49 -0.13107200000000000000e6
-2207 2 4 34 -0.32768000000000000000e5
-2207 2 21 35 0.32768000000000000000e5
-2207 2 22 34 0.65536000000000000000e5
-2207 3 5 50 -0.32768000000000000000e5
-2207 3 14 51 -0.13107200000000000000e6
-2207 3 24 37 -0.16384000000000000000e5
-2207 3 27 40 -0.65536000000000000000e5
-2207 3 29 42 0.65536000000000000000e5
-2207 3 30 43 0.65536000000000000000e5
-2207 4 4 32 0.16384000000000000000e5
-2207 4 7 35 0.32768000000000000000e5
-2207 4 16 28 -0.16384000000000000000e5
-2207 4 19 31 0.65536000000000000000e5
-2208 2 22 35 0.65536000000000000000e5
-2208 2 28 34 -0.65536000000000000000e5
-2209 1 4 35 0.16384000000000000000e5
-2209 1 12 43 0.16384000000000000000e5
-2209 1 13 44 0.32768000000000000000e5
-2209 1 14 45 0.32768000000000000000e5
-2209 1 17 48 -0.16384000000000000000e5
-2209 1 18 49 -0.16384000000000000000e5
-2209 1 20 27 -0.65536000000000000000e5
-2209 1 27 34 0.32768000000000000000e5
-2209 2 9 23 0.16384000000000000000e5
-2209 2 14 28 -0.16384000000000000000e5
-2209 2 23 23 0.65536000000000000000e5
-2209 3 5 34 0.16384000000000000000e5
-2209 3 7 36 0.65536000000000000000e5
-2209 3 13 42 -0.16384000000000000000e5
-2209 3 14 27 0.16384000000000000000e5
-2209 3 14 43 -0.16384000000000000000e5
-2209 3 16 29 -0.32768000000000000000e5
-2210 1 3 18 -0.32768000000000000000e5
-2210 1 4 19 0.65536000000000000000e5
-2210 1 4 35 0.32768000000000000000e5
-2210 1 5 36 0.65536000000000000000e5
-2210 1 12 43 0.65536000000000000000e5
-2210 1 14 45 0.65536000000000000000e5
-2210 1 17 32 -0.13107200000000000000e6
-2210 1 17 48 -0.32768000000000000000e5
-2210 1 18 49 -0.32768000000000000000e5
-2210 2 9 23 0.32768000000000000000e5
-2210 2 14 28 -0.32768000000000000000e5
-2210 2 23 24 0.65536000000000000000e5
-2210 3 3 16 -0.32768000000000000000e5
-2210 3 4 17 -0.32768000000000000000e5
-2210 3 5 34 0.32768000000000000000e5
-2210 3 13 42 -0.32768000000000000000e5
-2210 3 14 27 0.65536000000000000000e5
-2210 3 14 43 -0.32768000000000000000e5
-2210 4 2 14 -0.32768000000000000000e5
-2210 4 11 23 0.65536000000000000000e5
-2211 2 15 29 -0.65536000000000000000e5
-2211 2 23 25 0.65536000000000000000e5
-2212 1 2 33 -0.65536000000000000000e5
-2212 1 3 34 0.13107200000000000000e6
-2212 1 9 40 0.32768000000000000000e5
-2212 1 10 41 -0.13107200000000000000e6
-2212 1 12 43 0.13107200000000000000e6
-2212 1 16 47 -0.13107200000000000000e6
-2212 1 26 41 -0.32768000000000000000e5
-2212 1 28 43 -0.65536000000000000000e5
-2212 1 32 47 0.65536000000000000000e5
-2212 2 7 21 -0.65536000000000000000e5
-2212 2 20 34 -0.65536000000000000000e5
-2212 2 23 26 0.65536000000000000000e5
-2212 3 2 31 -0.65536000000000000000e5
-2212 3 3 32 -0.65536000000000000000e5
-2212 3 8 37 -0.32768000000000000000e5
-2212 3 9 38 0.32768000000000000000e5
-2212 3 22 27 -0.32768000000000000000e5
-2212 3 22 35 -0.13107200000000000000e6
-2212 3 28 41 0.65536000000000000000e5
-2212 4 1 29 -0.32768000000000000000e5
-2212 4 2 30 0.32768000000000000000e5
-2212 4 6 34 -0.65536000000000000000e5
-2213 2 20 34 -0.65536000000000000000e5
-2213 2 23 27 0.65536000000000000000e5
-2213 4 6 34 -0.65536000000000000000e5
-2214 1 17 48 -0.13107200000000000000e6
-2214 1 28 43 0.65536000000000000000e5
-2214 1 32 47 0.65536000000000000000e5
-2214 1 33 48 0.65536000000000000000e5
-2214 2 23 28 0.65536000000000000000e5
-2214 3 28 41 0.65536000000000000000e5
-2214 3 29 42 0.65536000000000000000e5
-2215 1 12 43 0.65536000000000000000e5
-2215 1 16 47 0.65536000000000000000e5
-2215 1 17 48 0.65536000000000000000e5
-2215 1 34 41 -0.13107200000000000000e6
-2215 2 23 29 0.65536000000000000000e5
-2215 3 22 35 -0.65536000000000000000e5
-2216 1 4 35 -0.65536000000000000000e5
-2216 1 17 48 0.65536000000000000000e5
-2216 2 9 23 -0.65536000000000000000e5
-2216 2 23 30 0.65536000000000000000e5
-2216 3 5 34 -0.65536000000000000000e5
-2216 3 13 42 0.65536000000000000000e5
-2216 3 14 27 -0.65536000000000000000e5
-2216 3 16 29 0.13107200000000000000e6
-2216 4 14 26 0.65536000000000000000e5
-2217 1 4 35 0.32768000000000000000e5
-2217 1 12 43 0.32768000000000000000e5
-2217 1 14 45 0.13107200000000000000e6
-2217 1 17 48 -0.32768000000000000000e5
-2217 1 18 49 -0.32768000000000000000e5
-2217 1 19 50 -0.13107200000000000000e6
-2217 1 34 41 0.65536000000000000000e5
-2217 2 9 23 0.32768000000000000000e5
-2217 2 14 28 -0.32768000000000000000e5
-2217 2 23 31 0.65536000000000000000e5
-2217 3 5 34 0.32768000000000000000e5
-2217 3 13 42 -0.32768000000000000000e5
-2217 3 14 27 0.32768000000000000000e5
-2217 3 14 43 -0.32768000000000000000e5
-2217 3 15 44 0.65536000000000000000e5
-2217 3 16 29 -0.65536000000000000000e5
-2217 3 16 45 -0.13107200000000000000e6
-2217 4 15 27 0.65536000000000000000e5
-2218 2 20 34 -0.65536000000000000000e5
-2218 2 23 32 0.65536000000000000000e5
-2219 1 17 48 -0.13107200000000000000e6
-2219 1 28 43 0.65536000000000000000e5
-2219 1 32 47 0.65536000000000000000e5
-2219 1 33 48 0.65536000000000000000e5
-2219 2 23 33 0.65536000000000000000e5
-2219 3 28 41 0.65536000000000000000e5
-2219 3 29 42 0.65536000000000000000e5
-2219 4 23 27 0.65536000000000000000e5
-2220 1 4 35 -0.65536000000000000000e5
-2220 1 6 53 -0.81920000000000000000e4
-2220 1 17 48 0.65536000000000000000e5
-2220 1 25 40 0.81920000000000000000e4
-2220 2 4 34 -0.16384000000000000000e5
-2220 2 9 23 -0.65536000000000000000e5
-2220 2 21 35 0.16384000000000000000e5
-2220 2 23 34 0.65536000000000000000e5
-2220 3 5 34 -0.65536000000000000000e5
-2220 3 5 50 -0.16384000000000000000e5
-2220 3 7 52 -0.65536000000000000000e5
-2220 3 13 42 0.65536000000000000000e5
-2220 3 14 27 -0.65536000000000000000e5
-2220 3 16 29 0.13107200000000000000e6
-2220 3 18 47 -0.65536000000000000000e5
-2220 3 24 37 -0.81920000000000000000e4
-2220 3 27 40 -0.32768000000000000000e5
-2220 3 28 41 -0.32768000000000000000e5
-2220 3 29 42 -0.32768000000000000000e5
-2220 3 31 44 0.13107200000000000000e6
-2220 4 4 32 0.81920000000000000000e4
-2220 4 7 35 0.16384000000000000000e5
-2220 4 14 26 0.65536000000000000000e5
-2220 4 16 28 -0.81920000000000000000e4
-2220 4 23 27 -0.32768000000000000000e5
-2221 1 17 48 -0.13107200000000000000e6
-2221 1 28 43 0.65536000000000000000e5
-2221 1 33 48 0.65536000000000000000e5
-2221 1 37 52 0.65536000000000000000e5
-2221 2 23 35 0.65536000000000000000e5
-2221 3 10 55 0.65536000000000000000e5
-2221 3 23 52 -0.65536000000000000000e5
-2221 3 28 41 0.65536000000000000000e5
-2221 3 29 42 0.65536000000000000000e5
-2221 3 34 47 0.13107200000000000000e6
-2221 3 35 48 -0.13107200000000000000e6
-2221 3 40 45 0.65536000000000000000e5
-2221 4 22 34 0.65536000000000000000e5
-2221 4 23 27 0.65536000000000000000e5
-2222 1 4 35 0.16384000000000000000e5
-2222 1 11 18 0.32768000000000000000e5
-2222 1 12 43 0.16384000000000000000e5
-2222 1 13 20 -0.13107200000000000000e6
-2222 1 14 45 0.65536000000000000000e5
-2222 1 17 32 0.65536000000000000000e5
-2222 1 17 48 -0.16384000000000000000e5
-2222 1 18 49 -0.16384000000000000000e5
-2222 1 20 27 0.65536000000000000000e5
-2222 2 9 23 0.16384000000000000000e5
-2222 2 11 25 0.65536000000000000000e5
-2222 2 14 28 -0.16384000000000000000e5
-2222 2 24 24 0.65536000000000000000e5
-2222 3 5 34 0.16384000000000000000e5
-2222 3 6 19 -0.32768000000000000000e5
-2222 3 8 21 0.13107200000000000000e6
-2222 3 13 42 -0.16384000000000000000e5
-2222 3 14 27 0.16384000000000000000e5
-2222 3 14 43 -0.16384000000000000000e5
-2222 3 16 29 -0.32768000000000000000e5
-2222 3 17 30 -0.32768000000000000000e5
-2222 3 18 31 0.65536000000000000000e5
-2223 1 3 18 0.16384000000000000000e5
-2223 1 4 19 -0.32768000000000000000e5
-2223 1 5 36 -0.32768000000000000000e5
-2223 1 6 21 -0.65536000000000000000e5
-2223 1 12 43 -0.16384000000000000000e5
-2223 1 13 44 0.32768000000000000000e5
-2223 1 14 45 0.32768000000000000000e5
-2223 1 15 46 0.65536000000000000000e5
-2223 2 9 15 -0.65536000000000000000e5
-2223 2 24 25 0.65536000000000000000e5
-2223 3 3 16 0.16384000000000000000e5
-2223 3 4 17 0.16384000000000000000e5
-2223 3 7 20 0.65536000000000000000e5
-2223 3 8 21 -0.13107200000000000000e6
-2223 3 14 19 0.13107200000000000000e6
-2223 3 14 27 -0.16384000000000000000e5
-2223 3 16 29 -0.32768000000000000000e5
-2223 3 18 31 -0.65536000000000000000e5
-2223 3 19 32 0.13107200000000000000e6
-2223 4 2 14 0.16384000000000000000e5
-2223 4 10 14 0.65536000000000000000e5
-2223 4 11 23 -0.32768000000000000000e5
-2224 2 20 34 -0.65536000000000000000e5
-2224 2 24 26 0.65536000000000000000e5
-2224 4 6 34 -0.65536000000000000000e5
-2225 1 17 48 -0.13107200000000000000e6
-2225 1 28 43 0.65536000000000000000e5
-2225 1 32 47 0.65536000000000000000e5
-2225 1 33 48 0.65536000000000000000e5
-2225 2 24 27 0.65536000000000000000e5
-2225 3 28 41 0.65536000000000000000e5
-2225 3 29 42 0.65536000000000000000e5
-2226 1 28 43 0.65536000000000000000e5
-2226 1 33 40 0.65536000000000000000e5
-2226 1 33 48 0.65536000000000000000e5
-2226 1 34 49 -0.13107200000000000000e6
-2226 2 24 28 0.65536000000000000000e5
-2226 3 18 47 -0.13107200000000000000e6
-2226 3 29 42 0.65536000000000000000e5
-2227 1 4 35 -0.65536000000000000000e5
-2227 1 17 48 0.65536000000000000000e5
-2227 2 9 23 -0.65536000000000000000e5
-2227 2 24 29 0.65536000000000000000e5
-2227 3 5 34 -0.65536000000000000000e5
-2227 3 13 42 0.65536000000000000000e5
-2227 3 14 27 -0.65536000000000000000e5
-2227 3 16 29 0.13107200000000000000e6
-2227 4 14 26 0.65536000000000000000e5
-2228 1 14 45 -0.26214400000000000000e6
-2228 1 17 48 0.13107200000000000000e6
-2228 1 18 49 0.13107200000000000000e6
-2228 1 34 49 0.13107200000000000000e6
-2228 2 14 28 0.65536000000000000000e5
-2228 2 24 30 0.65536000000000000000e5
-2228 3 14 43 0.65536000000000000000e5
-2228 3 15 44 -0.13107200000000000000e6
-2228 3 16 45 0.26214400000000000000e6
-2228 3 18 47 0.13107200000000000000e6
-2228 3 22 35 -0.65536000000000000000e5
-2228 4 14 26 -0.65536000000000000000e5
-2228 4 15 27 -0.13107200000000000000e6
-2229 1 4 35 0.32768000000000000000e5
-2229 1 11 18 0.65536000000000000000e5
-2229 1 12 43 0.32768000000000000000e5
-2229 1 13 20 -0.26214400000000000000e6
-2229 1 14 45 0.13107200000000000000e6
-2229 1 17 32 0.13107200000000000000e6
-2229 1 17 48 -0.32768000000000000000e5
-2229 1 18 49 -0.32768000000000000000e5
-2229 1 20 27 0.13107200000000000000e6
-2229 2 9 23 0.32768000000000000000e5
-2229 2 11 25 0.13107200000000000000e6
-2229 2 14 28 -0.32768000000000000000e5
-2229 2 24 31 0.65536000000000000000e5
-2229 3 5 34 0.32768000000000000000e5
-2229 3 6 19 -0.65536000000000000000e5
-2229 3 8 21 0.26214400000000000000e6
-2229 3 13 42 -0.32768000000000000000e5
-2229 3 14 27 0.32768000000000000000e5
-2229 3 14 43 -0.32768000000000000000e5
-2229 3 16 29 -0.65536000000000000000e5
-2229 3 17 30 -0.65536000000000000000e5
-2229 3 18 31 0.13107200000000000000e6
-2229 4 15 27 0.65536000000000000000e5
-2230 1 17 48 -0.13107200000000000000e6
-2230 1 28 43 0.65536000000000000000e5
-2230 1 32 47 0.65536000000000000000e5
-2230 1 33 48 0.65536000000000000000e5
-2230 2 24 32 0.65536000000000000000e5
-2230 3 28 41 0.65536000000000000000e5
-2230 3 29 42 0.65536000000000000000e5
-2230 4 23 27 0.65536000000000000000e5
-2231 1 6 53 -0.16384000000000000000e5
-2231 1 25 40 0.16384000000000000000e5
-2231 1 28 43 0.65536000000000000000e5
-2231 1 33 40 0.65536000000000000000e5
-2231 1 33 48 0.65536000000000000000e5
-2231 1 34 49 -0.13107200000000000000e6
-2231 2 4 34 -0.32768000000000000000e5
-2231 2 21 35 0.32768000000000000000e5
-2231 2 24 33 0.65536000000000000000e5
-2231 3 5 50 -0.32768000000000000000e5
-2231 3 14 51 -0.13107200000000000000e6
-2231 3 24 37 -0.16384000000000000000e5
-2231 3 27 40 -0.65536000000000000000e5
-2231 3 29 42 0.65536000000000000000e5
-2231 3 30 43 0.65536000000000000000e5
-2231 4 4 32 0.16384000000000000000e5
-2231 4 7 35 0.32768000000000000000e5
-2231 4 16 28 -0.16384000000000000000e5
-2231 4 19 31 0.65536000000000000000e5
-2232 1 6 53 -0.81920000000000000000e4
-2232 1 14 45 -0.26214400000000000000e6
-2232 1 17 48 0.13107200000000000000e6
-2232 1 18 49 0.13107200000000000000e6
-2232 1 25 40 0.81920000000000000000e4
-2232 1 34 49 0.13107200000000000000e6
-2232 2 4 34 -0.16384000000000000000e5
-2232 2 14 28 0.65536000000000000000e5
-2232 2 21 35 0.16384000000000000000e5
-2232 2 24 34 0.65536000000000000000e5
-2232 3 5 50 -0.16384000000000000000e5
-2232 3 14 43 0.65536000000000000000e5
-2232 3 14 51 -0.65536000000000000000e5
-2232 3 15 44 -0.13107200000000000000e6
-2232 3 16 45 0.26214400000000000000e6
-2232 3 18 47 0.65536000000000000000e5
-2232 3 19 48 0.13107200000000000000e6
-2232 3 22 35 -0.65536000000000000000e5
-2232 3 24 37 -0.81920000000000000000e4
-2232 3 27 40 -0.32768000000000000000e5
-2232 3 28 41 -0.32768000000000000000e5
-2232 3 29 42 -0.32768000000000000000e5
-2232 4 4 32 0.81920000000000000000e4
-2232 4 7 35 0.16384000000000000000e5
-2232 4 14 26 -0.65536000000000000000e5
-2232 4 15 27 -0.13107200000000000000e6
-2232 4 16 28 -0.81920000000000000000e4
-2232 4 23 27 -0.32768000000000000000e5
-2233 1 6 53 -0.16384000000000000000e5
-2233 1 25 40 0.16384000000000000000e5
-2233 1 28 43 0.65536000000000000000e5
-2233 1 33 40 0.65536000000000000000e5
-2233 1 33 48 0.65536000000000000000e5
-2233 1 44 51 -0.13107200000000000000e6
-2233 2 4 34 -0.32768000000000000000e5
-2233 2 21 35 0.32768000000000000000e5
-2233 2 24 35 0.65536000000000000000e5
-2233 3 5 50 -0.32768000000000000000e5
-2233 3 14 51 -0.13107200000000000000e6
-2233 3 23 52 -0.65536000000000000000e5
-2233 3 24 37 -0.16384000000000000000e5
-2233 3 27 40 -0.65536000000000000000e5
-2233 3 29 42 0.65536000000000000000e5
-2233 3 30 43 0.65536000000000000000e5
-2233 3 35 48 -0.13107200000000000000e6
-2233 3 40 45 0.65536000000000000000e5
-2233 4 4 32 0.16384000000000000000e5
-2233 4 7 35 0.32768000000000000000e5
-2233 4 16 28 -0.16384000000000000000e5
-2233 4 19 31 0.65536000000000000000e5
-2233 4 22 34 0.65536000000000000000e5
-2234 1 3 18 0.40960000000000000000e4
-2234 1 4 19 -0.81920000000000000000e4
-2234 1 5 36 -0.81920000000000000000e4
-2234 1 6 21 0.16384000000000000000e5
-2234 1 12 43 -0.40960000000000000000e4
-2234 1 13 20 0.65536000000000000000e5
-2234 1 13 44 0.81920000000000000000e4
-2234 1 14 45 0.81920000000000000000e4
-2234 1 20 27 -0.16384000000000000000e5
-2234 1 21 44 -0.65536000000000000000e5
-2234 1 33 36 0.32768000000000000000e5
-2234 2 9 15 0.16384000000000000000e5
-2234 2 11 25 -0.32768000000000000000e5
-2234 2 15 29 0.16384000000000000000e5
-2234 2 25 25 0.65536000000000000000e5
-2234 3 3 16 0.40960000000000000000e4
-2234 3 4 17 0.40960000000000000000e4
-2234 3 7 20 -0.16384000000000000000e5
-2234 3 7 36 -0.16384000000000000000e5
-2234 3 8 21 -0.32768000000000000000e5
-2234 3 14 19 -0.32768000000000000000e5
-2234 3 14 27 -0.40960000000000000000e4
-2234 3 16 29 -0.81920000000000000000e4
-2234 3 18 31 -0.16384000000000000000e5
-2234 3 19 32 -0.32768000000000000000e5
-2234 4 2 14 0.40960000000000000000e4
-2234 4 10 14 -0.16384000000000000000e5
-2234 4 11 23 -0.81920000000000000000e4
-2235 1 12 43 0.65536000000000000000e5
-2235 1 16 47 0.65536000000000000000e5
-2235 1 17 48 0.65536000000000000000e5
-2235 1 34 41 -0.13107200000000000000e6
-2235 2 25 26 0.65536000000000000000e5
-2235 3 22 35 -0.65536000000000000000e5
-2236 1 4 35 -0.65536000000000000000e5
-2236 1 17 48 0.65536000000000000000e5
-2236 2 9 23 -0.65536000000000000000e5
-2236 2 25 27 0.65536000000000000000e5
-2236 3 5 34 -0.65536000000000000000e5
-2236 3 13 42 0.65536000000000000000e5
-2236 3 14 27 -0.65536000000000000000e5
-2236 3 16 29 0.13107200000000000000e6
-2236 4 14 26 0.65536000000000000000e5
-2237 1 14 45 -0.26214400000000000000e6
-2237 1 17 48 0.13107200000000000000e6
-2237 1 18 49 0.13107200000000000000e6
-2237 1 34 49 0.13107200000000000000e6
-2237 2 14 28 0.65536000000000000000e5
-2237 2 25 28 0.65536000000000000000e5
-2237 3 14 43 0.65536000000000000000e5
-2237 3 15 44 -0.13107200000000000000e6
-2237 3 16 45 0.26214400000000000000e6
-2237 3 18 47 0.13107200000000000000e6
-2237 3 22 35 -0.65536000000000000000e5
-2237 4 14 26 -0.65536000000000000000e5
-2237 4 15 27 -0.13107200000000000000e6
-2238 1 4 35 0.32768000000000000000e5
-2238 1 12 43 0.32768000000000000000e5
-2238 1 14 45 0.13107200000000000000e6
-2238 1 17 48 -0.32768000000000000000e5
-2238 1 18 49 -0.32768000000000000000e5
-2238 1 19 50 -0.13107200000000000000e6
-2238 1 34 41 0.65536000000000000000e5
-2238 2 9 23 0.32768000000000000000e5
-2238 2 14 28 -0.32768000000000000000e5
-2238 2 25 29 0.65536000000000000000e5
-2238 3 5 34 0.32768000000000000000e5
-2238 3 13 42 -0.32768000000000000000e5
-2238 3 14 27 0.32768000000000000000e5
-2238 3 14 43 -0.32768000000000000000e5
-2238 3 15 44 0.65536000000000000000e5
-2238 3 16 29 -0.65536000000000000000e5
-2238 3 16 45 -0.13107200000000000000e6
-2238 4 15 27 0.65536000000000000000e5
-2239 1 4 35 0.32768000000000000000e5
-2239 1 11 18 0.65536000000000000000e5
-2239 1 12 43 0.32768000000000000000e5
-2239 1 13 20 -0.26214400000000000000e6
-2239 1 14 45 0.13107200000000000000e6
-2239 1 17 32 0.13107200000000000000e6
-2239 1 17 48 -0.32768000000000000000e5
-2239 1 18 49 -0.32768000000000000000e5
-2239 1 20 27 0.13107200000000000000e6
-2239 2 9 23 0.32768000000000000000e5
-2239 2 11 25 0.13107200000000000000e6
-2239 2 14 28 -0.32768000000000000000e5
-2239 2 25 30 0.65536000000000000000e5
-2239 3 5 34 0.32768000000000000000e5
-2239 3 6 19 -0.65536000000000000000e5
-2239 3 8 21 0.26214400000000000000e6
-2239 3 13 42 -0.32768000000000000000e5
-2239 3 14 27 0.32768000000000000000e5
-2239 3 14 43 -0.32768000000000000000e5
-2239 3 16 29 -0.65536000000000000000e5
-2239 3 17 30 -0.65536000000000000000e5
-2239 3 18 31 0.13107200000000000000e6
-2239 4 15 27 0.65536000000000000000e5
-2240 1 4 35 -0.65536000000000000000e5
-2240 1 6 53 -0.81920000000000000000e4
-2240 1 17 48 0.65536000000000000000e5
-2240 1 25 40 0.81920000000000000000e4
-2240 2 4 34 -0.16384000000000000000e5
-2240 2 9 23 -0.65536000000000000000e5
-2240 2 21 35 0.16384000000000000000e5
-2240 2 25 32 0.65536000000000000000e5
-2240 3 5 34 -0.65536000000000000000e5
-2240 3 5 50 -0.16384000000000000000e5
-2240 3 7 52 -0.65536000000000000000e5
-2240 3 13 42 0.65536000000000000000e5
-2240 3 14 27 -0.65536000000000000000e5
-2240 3 16 29 0.13107200000000000000e6
-2240 3 18 47 -0.65536000000000000000e5
-2240 3 24 37 -0.81920000000000000000e4
-2240 3 27 40 -0.32768000000000000000e5
-2240 3 28 41 -0.32768000000000000000e5
-2240 3 29 42 -0.32768000000000000000e5
-2240 3 31 44 0.13107200000000000000e6
-2240 4 4 32 0.81920000000000000000e4
-2240 4 7 35 0.16384000000000000000e5
-2240 4 14 26 0.65536000000000000000e5
-2240 4 16 28 -0.81920000000000000000e4
-2240 4 23 27 -0.32768000000000000000e5
-2241 1 6 53 -0.81920000000000000000e4
-2241 1 14 45 -0.26214400000000000000e6
-2241 1 17 48 0.13107200000000000000e6
-2241 1 18 49 0.13107200000000000000e6
-2241 1 25 40 0.81920000000000000000e4
-2241 1 34 49 0.13107200000000000000e6
-2241 2 4 34 -0.16384000000000000000e5
-2241 2 14 28 0.65536000000000000000e5
-2241 2 21 35 0.16384000000000000000e5
-2241 2 25 33 0.65536000000000000000e5
-2241 3 5 50 -0.16384000000000000000e5
-2241 3 14 43 0.65536000000000000000e5
-2241 3 14 51 -0.65536000000000000000e5
-2241 3 15 44 -0.13107200000000000000e6
-2241 3 16 45 0.26214400000000000000e6
-2241 3 18 47 0.65536000000000000000e5
-2241 3 19 48 0.13107200000000000000e6
-2241 3 22 35 -0.65536000000000000000e5
-2241 3 24 37 -0.81920000000000000000e4
-2241 3 27 40 -0.32768000000000000000e5
-2241 3 28 41 -0.32768000000000000000e5
-2241 3 29 42 -0.32768000000000000000e5
-2241 4 4 32 0.81920000000000000000e4
-2241 4 7 35 0.16384000000000000000e5
-2241 4 14 26 -0.65536000000000000000e5
-2241 4 15 27 -0.13107200000000000000e6
-2241 4 16 28 -0.81920000000000000000e4
-2241 4 23 27 -0.32768000000000000000e5
-2242 1 4 35 0.32768000000000000000e5
-2242 1 11 18 0.65536000000000000000e5
-2242 1 12 43 0.32768000000000000000e5
-2242 1 13 20 -0.26214400000000000000e6
-2242 1 14 45 0.13107200000000000000e6
-2242 1 17 32 0.13107200000000000000e6
-2242 1 17 48 -0.32768000000000000000e5
-2242 1 18 49 -0.32768000000000000000e5
-2242 1 20 27 0.13107200000000000000e6
-2242 2 9 23 0.32768000000000000000e5
-2242 2 11 25 0.13107200000000000000e6
-2242 2 14 28 -0.32768000000000000000e5
-2242 2 25 34 0.65536000000000000000e5
-2242 3 5 34 0.32768000000000000000e5
-2242 3 6 19 -0.65536000000000000000e5
-2242 3 8 21 0.26214400000000000000e6
-2242 3 13 42 -0.32768000000000000000e5
-2242 3 14 27 0.32768000000000000000e5
-2242 3 14 43 -0.32768000000000000000e5
-2242 3 16 29 -0.65536000000000000000e5
-2242 3 17 30 -0.65536000000000000000e5
-2242 3 18 31 0.13107200000000000000e6
-2242 3 19 48 -0.65536000000000000000e5
-2242 3 31 44 -0.65536000000000000000e5
-2242 3 32 45 -0.65536000000000000000e5
-2242 3 36 41 0.13107200000000000000e6
-2242 4 15 27 0.65536000000000000000e5
-2243 1 6 53 -0.81920000000000000000e4
-2243 1 14 45 -0.26214400000000000000e6
-2243 1 17 48 0.13107200000000000000e6
-2243 1 18 49 0.13107200000000000000e6
-2243 1 25 40 0.81920000000000000000e4
-2243 1 34 49 0.65536000000000000000e5
-2243 1 44 51 0.65536000000000000000e5
-2243 2 4 34 -0.16384000000000000000e5
-2243 2 14 28 0.65536000000000000000e5
-2243 2 21 35 0.16384000000000000000e5
-2243 2 25 35 0.65536000000000000000e5
-2243 3 5 50 -0.16384000000000000000e5
-2243 3 14 43 0.65536000000000000000e5
-2243 3 14 51 -0.65536000000000000000e5
-2243 3 15 44 -0.13107200000000000000e6
-2243 3 16 45 0.26214400000000000000e6
-2243 3 18 47 0.65536000000000000000e5
-2243 3 19 48 0.13107200000000000000e6
-2243 3 22 35 -0.65536000000000000000e5
-2243 3 24 37 -0.81920000000000000000e4
-2243 3 27 40 -0.32768000000000000000e5
-2243 3 28 41 -0.32768000000000000000e5
-2243 3 29 42 -0.32768000000000000000e5
-2243 3 34 47 -0.65536000000000000000e5
-2243 3 35 48 -0.65536000000000000000e5
-2243 3 41 46 0.13107200000000000000e6
-2243 4 4 32 0.81920000000000000000e4
-2243 4 7 35 0.16384000000000000000e5
-2243 4 14 26 -0.65536000000000000000e5
-2243 4 15 27 -0.13107200000000000000e6
-2243 4 16 28 -0.81920000000000000000e4
-2243 4 23 27 -0.32768000000000000000e5
-2244 2 1 35 -0.32768000000000000000e5
-2244 2 26 26 0.65536000000000000000e5
-2245 1 2 49 0.65536000000000000000e5
-2245 1 6 53 -0.13107200000000000000e6
-2245 1 8 39 -0.13107200000000000000e6
-2245 1 9 40 -0.13107200000000000000e6
-2245 1 10 41 0.26214400000000000000e6
-2245 1 23 38 0.65536000000000000000e5
-2245 1 24 39 0.65536000000000000000e5
-2245 1 25 40 0.13107200000000000000e6
-2245 1 26 41 0.13107200000000000000e6
-2245 1 32 47 -0.26214400000000000000e6
-2245 2 26 27 0.65536000000000000000e5
-2245 3 2 47 -0.65536000000000000000e5
-2245 3 9 38 -0.13107200000000000000e6
-2245 3 24 37 -0.13107200000000000000e6
-2245 3 25 38 0.65536000000000000000e5
-2245 3 27 40 -0.39321600000000000000e6
-2245 4 2 30 -0.13107200000000000000e6
-2245 4 4 32 0.13107200000000000000e6
-2245 4 16 28 -0.65536000000000000000e5
-2245 4 17 29 -0.13107200000000000000e6
-2246 2 3 33 -0.65536000000000000000e5
-2246 2 26 28 0.65536000000000000000e5
-2246 4 16 28 0.65536000000000000000e5
-2247 2 16 34 -0.65536000000000000000e5
-2247 2 26 29 0.65536000000000000000e5
-2248 1 1 48 -0.32768000000000000000e5
-2248 1 2 49 -0.32768000000000000000e5
-2248 1 12 43 0.26214400000000000000e6
-2248 1 23 38 -0.32768000000000000000e5
-2248 1 26 41 0.65536000000000000000e5
-2248 1 28 43 -0.13107200000000000000e6
-2248 1 32 47 -0.26214400000000000000e6
-2248 2 2 32 -0.32768000000000000000e5
-2248 2 16 30 -0.65536000000000000000e5
-2248 2 20 34 -0.13107200000000000000e6
-2248 2 26 30 0.65536000000000000000e5
-2248 3 22 35 -0.26214400000000000000e6
-2248 3 28 41 -0.26214400000000000000e6
-2248 4 6 34 -0.13107200000000000000e6
-2248 4 17 29 0.65536000000000000000e5
-2249 2 20 34 -0.65536000000000000000e5
-2249 2 26 31 0.65536000000000000000e5
-2250 1 1 48 0.65536000000000000000e5
-2250 1 2 49 0.65536000000000000000e5
-2250 1 6 53 0.13107200000000000000e6
-2250 1 8 39 0.26214400000000000000e6
-2250 1 9 40 0.26214400000000000000e6
-2250 1 10 41 -0.52428800000000000000e6
-2250 1 12 43 -0.52428800000000000000e6
-2250 1 22 53 -0.65536000000000000000e5
-2250 1 23 38 0.65536000000000000000e5
-2250 1 24 55 -0.13107200000000000000e6
-2250 1 25 40 -0.13107200000000000000e6
-2250 1 26 41 -0.13107200000000000000e6
-2250 1 28 43 0.26214400000000000000e6
-2250 1 32 47 0.52428800000000000000e6
-2250 1 37 52 0.26214400000000000000e6
-2250 1 40 47 0.65536000000000000000e5
-2250 2 2 32 0.65536000000000000000e5
-2250 2 16 30 0.13107200000000000000e6
-2250 2 20 34 0.26214400000000000000e6
-2250 2 26 32 -0.65536000000000000000e5
-2250 2 26 33 0.65536000000000000000e5
-2250 3 9 38 0.26214400000000000000e6
-2250 3 22 35 0.52428800000000000000e6
-2250 3 22 51 0.26214400000000000000e6
-2250 3 24 37 0.13107200000000000000e6
-2250 3 27 40 0.26214400000000000000e6
-2250 3 28 41 0.52428800000000000000e6
-2250 4 2 30 0.26214400000000000000e6
-2250 4 4 32 -0.13107200000000000000e6
-2250 4 6 34 0.26214400000000000000e6
-2250 4 16 28 0.13107200000000000000e6
-2250 4 17 29 0.13107200000000000000e6
-2250 4 20 32 0.13107200000000000000e6
-2251 1 1 48 -0.32768000000000000000e5
-2251 1 2 49 -0.32768000000000000000e5
-2251 1 12 43 0.26214400000000000000e6
-2251 1 23 38 -0.32768000000000000000e5
-2251 1 26 41 0.65536000000000000000e5
-2251 1 28 43 -0.13107200000000000000e6
-2251 1 32 47 -0.26214400000000000000e6
-2251 2 2 32 -0.32768000000000000000e5
-2251 2 16 30 -0.65536000000000000000e5
-2251 2 20 34 -0.13107200000000000000e6
-2251 2 26 34 0.65536000000000000000e5
-2251 3 22 35 -0.26214400000000000000e6
-2251 3 28 41 -0.26214400000000000000e6
-2251 4 6 34 -0.13107200000000000000e6
-2251 4 17 29 0.65536000000000000000e5
-2251 4 20 32 0.65536000000000000000e5
-2252 2 26 35 0.65536000000000000000e5
-2252 2 32 32 -0.13107200000000000000e6
-2253 2 3 33 -0.32768000000000000000e5
-2253 2 27 27 0.65536000000000000000e5
-2253 4 16 28 0.32768000000000000000e5
-2254 1 1 48 -0.65536000000000000000e5
-2254 1 2 49 -0.13107200000000000000e6
-2254 1 8 39 -0.13107200000000000000e6
-2254 1 9 40 -0.13107200000000000000e6
-2254 1 10 41 0.26214400000000000000e6
-2254 1 12 43 0.52428800000000000000e6
-2254 1 23 38 -0.65536000000000000000e5
-2254 1 25 40 0.65536000000000000000e5
-2254 1 28 43 -0.26214400000000000000e6
-2254 1 32 47 -0.52428800000000000000e6
-2254 2 2 32 -0.65536000000000000000e5
-2254 2 3 33 -0.65536000000000000000e5
-2254 2 16 30 -0.13107200000000000000e6
-2254 2 20 34 -0.26214400000000000000e6
-2254 2 27 28 0.65536000000000000000e5
-2254 3 9 38 -0.13107200000000000000e6
-2254 3 22 35 -0.52428800000000000000e6
-2254 3 28 41 -0.52428800000000000000e6
-2254 4 2 30 -0.13107200000000000000e6
-2254 4 4 32 0.65536000000000000000e5
-2254 4 6 34 -0.26214400000000000000e6
-2255 1 1 48 -0.32768000000000000000e5
-2255 1 2 49 -0.32768000000000000000e5
-2255 1 12 43 0.26214400000000000000e6
-2255 1 23 38 -0.32768000000000000000e5
-2255 1 26 41 0.65536000000000000000e5
-2255 1 28 43 -0.13107200000000000000e6
-2255 1 32 47 -0.26214400000000000000e6
-2255 2 2 32 -0.32768000000000000000e5
-2255 2 16 30 -0.65536000000000000000e5
-2255 2 20 34 -0.13107200000000000000e6
-2255 2 27 29 0.65536000000000000000e5
-2255 3 22 35 -0.26214400000000000000e6
-2255 3 28 41 -0.26214400000000000000e6
-2255 4 6 34 -0.13107200000000000000e6
-2255 4 17 29 0.65536000000000000000e5
-2256 2 21 35 -0.65536000000000000000e5
-2256 2 27 30 0.65536000000000000000e5
-2256 4 7 35 -0.65536000000000000000e5
-2257 1 17 48 -0.13107200000000000000e6
-2257 1 28 43 0.65536000000000000000e5
-2257 1 32 47 0.65536000000000000000e5
-2257 1 33 48 0.65536000000000000000e5
-2257 2 27 31 0.65536000000000000000e5
-2257 3 28 41 0.65536000000000000000e5
-2257 3 29 42 0.65536000000000000000e5
-2257 4 23 27 0.65536000000000000000e5
-2258 1 1 48 0.65536000000000000000e5
-2258 1 2 49 0.65536000000000000000e5
-2258 1 6 53 0.13107200000000000000e6
-2258 1 8 39 0.26214400000000000000e6
-2258 1 9 40 0.26214400000000000000e6
-2258 1 10 41 -0.52428800000000000000e6
-2258 1 12 43 -0.52428800000000000000e6
-2258 1 22 53 -0.65536000000000000000e5
-2258 1 23 38 0.65536000000000000000e5
-2258 1 24 55 -0.13107200000000000000e6
-2258 1 25 40 -0.13107200000000000000e6
-2258 1 26 41 -0.13107200000000000000e6
-2258 1 28 43 0.26214400000000000000e6
-2258 1 32 47 0.52428800000000000000e6
-2258 1 37 52 0.26214400000000000000e6
-2258 1 40 47 0.65536000000000000000e5
-2258 2 2 32 0.65536000000000000000e5
-2258 2 16 30 0.13107200000000000000e6
-2258 2 20 34 0.26214400000000000000e6
-2258 2 26 32 -0.65536000000000000000e5
-2258 2 27 32 0.65536000000000000000e5
-2258 3 9 38 0.26214400000000000000e6
-2258 3 22 35 0.52428800000000000000e6
-2258 3 22 51 0.26214400000000000000e6
-2258 3 24 37 0.13107200000000000000e6
-2258 3 27 40 0.26214400000000000000e6
-2258 3 28 41 0.52428800000000000000e6
-2258 4 2 30 0.26214400000000000000e6
-2258 4 4 32 -0.13107200000000000000e6
-2258 4 6 34 0.26214400000000000000e6
-2258 4 16 28 0.13107200000000000000e6
-2258 4 17 29 0.13107200000000000000e6
-2258 4 20 32 0.13107200000000000000e6
-2259 1 23 54 0.65536000000000000000e5
-2259 1 24 55 -0.13107200000000000000e6
-2259 1 25 56 0.65536000000000000000e5
-2259 1 40 47 0.65536000000000000000e5
-2259 2 27 33 0.65536000000000000000e5
-2259 3 24 53 -0.65536000000000000000e5
-2259 3 25 54 -0.65536000000000000000e5
-2259 3 38 51 0.13107200000000000000e6
-2259 4 28 32 -0.65536000000000000000e5
-2260 2 21 35 -0.65536000000000000000e5
-2260 2 27 34 0.65536000000000000000e5
-2261 1 25 56 0.65536000000000000000e5
-2261 1 38 53 0.65536000000000000000e5
-2261 1 40 47 0.65536000000000000000e5
-2261 1 41 56 -0.13107200000000000000e6
-2261 2 27 35 0.65536000000000000000e5
-2261 3 24 53 -0.65536000000000000000e5
-2261 3 27 56 -0.13107200000000000000e6
-2262 2 5 35 -0.32768000000000000000e5
-2262 2 28 28 0.65536000000000000000e5
-2263 2 21 35 -0.65536000000000000000e5
-2263 2 28 29 0.65536000000000000000e5
-2263 4 7 35 -0.65536000000000000000e5
-2264 2 28 30 0.65536000000000000000e5
-2264 2 28 34 -0.65536000000000000000e5
-2264 4 21 33 -0.65536000000000000000e5
-2265 1 6 53 -0.16384000000000000000e5
-2265 1 25 40 0.16384000000000000000e5
-2265 1 28 43 0.65536000000000000000e5
-2265 1 33 40 0.65536000000000000000e5
-2265 1 33 48 0.65536000000000000000e5
-2265 1 34 49 -0.13107200000000000000e6
-2265 2 4 34 -0.32768000000000000000e5
-2265 2 21 35 0.32768000000000000000e5
-2265 2 28 31 0.65536000000000000000e5
-2265 3 5 50 -0.32768000000000000000e5
-2265 3 14 51 -0.13107200000000000000e6
-2265 3 24 37 -0.16384000000000000000e5
-2265 3 27 40 -0.65536000000000000000e5
-2265 3 29 42 0.65536000000000000000e5
-2265 3 30 43 0.65536000000000000000e5
-2265 4 4 32 0.16384000000000000000e5
-2265 4 7 35 0.32768000000000000000e5
-2265 4 16 28 -0.16384000000000000000e5
-2265 4 19 31 0.65536000000000000000e5
-2266 1 23 54 0.65536000000000000000e5
-2266 1 24 55 -0.13107200000000000000e6
-2266 1 25 56 0.65536000000000000000e5
-2266 1 40 47 0.65536000000000000000e5
-2266 2 28 32 0.65536000000000000000e5
-2266 3 24 53 -0.65536000000000000000e5
-2266 3 25 54 -0.65536000000000000000e5
-2266 3 38 51 0.13107200000000000000e6
-2266 4 28 32 -0.65536000000000000000e5
-2267 1 1 48 0.65536000000000000000e5
-2267 1 2 49 0.13107200000000000000e6
-2267 1 6 53 -0.65536000000000000000e5
-2267 1 8 39 0.13107200000000000000e6
-2267 1 9 40 0.13107200000000000000e6
-2267 1 10 41 -0.26214400000000000000e6
-2267 1 12 43 -0.52428800000000000000e6
-2267 1 23 38 0.65536000000000000000e5
-2267 1 24 39 0.65536000000000000000e5
-2267 1 24 55 0.13107200000000000000e6
-2267 1 25 56 0.65536000000000000000e5
-2267 1 26 41 -0.26214400000000000000e6
-2267 1 28 43 0.26214400000000000000e6
-2267 1 32 47 0.52428800000000000000e6
-2267 1 40 47 0.65536000000000000000e5
-2267 2 2 32 0.65536000000000000000e5
-2267 2 3 33 0.65536000000000000000e5
-2267 2 5 35 -0.65536000000000000000e5
-2267 2 16 30 0.13107200000000000000e6
-2267 2 20 34 0.26214400000000000000e6
-2267 2 28 33 0.65536000000000000000e5
-2267 3 9 38 0.13107200000000000000e6
-2267 3 22 35 0.52428800000000000000e6
-2267 3 22 51 -0.13107200000000000000e6
-2267 3 23 52 0.26214400000000000000e6
-2267 3 24 53 -0.65536000000000000000e5
-2267 3 25 38 0.65536000000000000000e5
-2267 3 25 54 -0.65536000000000000000e5
-2267 3 27 40 0.13107200000000000000e6
-2267 3 28 41 0.52428800000000000000e6
-2267 3 38 51 0.13107200000000000000e6
-2267 3 39 40 -0.65536000000000000000e5
-2267 4 2 30 0.13107200000000000000e6
-2267 4 6 34 0.26214400000000000000e6
-2267 4 7 35 -0.13107200000000000000e6
-2267 4 28 32 -0.65536000000000000000e5
-2268 1 1 48 0.65536000000000000000e5
-2268 1 2 49 0.13107200000000000000e6
-2268 1 6 53 -0.65536000000000000000e5
-2268 1 8 39 0.13107200000000000000e6
-2268 1 9 40 0.13107200000000000000e6
-2268 1 10 41 -0.26214400000000000000e6
-2268 1 12 43 -0.52428800000000000000e6
-2268 1 23 38 0.65536000000000000000e5
-2268 1 24 39 0.65536000000000000000e5
-2268 1 24 55 0.13107200000000000000e6
-2268 1 25 56 0.65536000000000000000e5
-2268 1 26 41 -0.26214400000000000000e6
-2268 1 28 43 0.26214400000000000000e6
-2268 1 32 47 0.52428800000000000000e6
-2268 1 40 47 0.65536000000000000000e5
-2268 2 2 32 0.65536000000000000000e5
-2268 2 3 33 0.65536000000000000000e5
-2268 2 5 35 -0.65536000000000000000e5
-2268 2 16 30 0.13107200000000000000e6
-2268 2 20 34 0.26214400000000000000e6
-2268 2 28 35 0.65536000000000000000e5
-2268 3 9 38 0.13107200000000000000e6
-2268 3 22 35 0.52428800000000000000e6
-2268 3 22 51 -0.13107200000000000000e6
-2268 3 23 52 0.26214400000000000000e6
-2268 3 24 53 -0.65536000000000000000e5
-2268 3 25 38 0.65536000000000000000e5
-2268 3 25 54 -0.65536000000000000000e5
-2268 3 27 40 0.13107200000000000000e6
-2268 3 28 41 0.52428800000000000000e6
-2268 3 38 51 0.13107200000000000000e6
-2268 3 39 40 -0.65536000000000000000e5
-2268 4 2 30 0.13107200000000000000e6
-2268 4 6 34 0.26214400000000000000e6
-2268 4 7 35 -0.13107200000000000000e6
-2269 2 20 34 -0.32768000000000000000e5
-2269 2 29 29 0.65536000000000000000e5
-2270 1 17 48 -0.13107200000000000000e6
-2270 1 28 43 0.65536000000000000000e5
-2270 1 32 47 0.65536000000000000000e5
-2270 1 33 48 0.65536000000000000000e5
-2270 2 29 30 0.65536000000000000000e5
-2270 3 28 41 0.65536000000000000000e5
-2270 3 29 42 0.65536000000000000000e5
-2270 4 23 27 0.65536000000000000000e5
-2271 1 4 35 -0.65536000000000000000e5
-2271 1 6 53 -0.81920000000000000000e4
-2271 1 17 48 0.65536000000000000000e5
-2271 1 25 40 0.81920000000000000000e4
-2271 2 4 34 -0.16384000000000000000e5
-2271 2 9 23 -0.65536000000000000000e5
-2271 2 21 35 0.16384000000000000000e5
-2271 2 29 31 0.65536000000000000000e5
-2271 3 5 34 -0.65536000000000000000e5
-2271 3 5 50 -0.16384000000000000000e5
-2271 3 7 52 -0.65536000000000000000e5
-2271 3 13 42 0.65536000000000000000e5
-2271 3 14 27 -0.65536000000000000000e5
-2271 3 16 29 0.13107200000000000000e6
-2271 3 18 47 -0.65536000000000000000e5
-2271 3 24 37 -0.81920000000000000000e4
-2271 3 27 40 -0.32768000000000000000e5
-2271 3 28 41 -0.32768000000000000000e5
-2271 3 29 42 -0.32768000000000000000e5
-2271 3 31 44 0.13107200000000000000e6
-2271 4 4 32 0.81920000000000000000e4
-2271 4 7 35 0.16384000000000000000e5
-2271 4 14 26 0.65536000000000000000e5
-2271 4 16 28 -0.81920000000000000000e4
-2271 4 23 27 -0.32768000000000000000e5
-2272 1 1 48 -0.32768000000000000000e5
-2272 1 2 49 -0.32768000000000000000e5
-2272 1 12 43 0.26214400000000000000e6
-2272 1 23 38 -0.32768000000000000000e5
-2272 1 26 41 0.65536000000000000000e5
-2272 1 28 43 -0.13107200000000000000e6
-2272 1 32 47 -0.26214400000000000000e6
-2272 2 2 32 -0.32768000000000000000e5
-2272 2 16 30 -0.65536000000000000000e5
-2272 2 20 34 -0.13107200000000000000e6
-2272 2 29 32 0.65536000000000000000e5
-2272 3 22 35 -0.26214400000000000000e6
-2272 3 28 41 -0.26214400000000000000e6
-2272 4 6 34 -0.13107200000000000000e6
-2272 4 17 29 0.65536000000000000000e5
-2272 4 20 32 0.65536000000000000000e5
-2273 2 21 35 -0.65536000000000000000e5
-2273 2 29 33 0.65536000000000000000e5
-2274 1 17 48 -0.13107200000000000000e6
-2274 1 28 43 0.65536000000000000000e5
-2274 1 33 48 0.65536000000000000000e5
-2274 1 37 52 0.65536000000000000000e5
-2274 2 29 34 0.65536000000000000000e5
-2274 3 10 55 0.65536000000000000000e5
-2274 3 23 52 -0.65536000000000000000e5
-2274 3 28 41 0.65536000000000000000e5
-2274 3 29 42 0.65536000000000000000e5
-2274 3 34 47 0.13107200000000000000e6
-2274 3 35 48 -0.13107200000000000000e6
-2274 3 40 45 0.65536000000000000000e5
-2274 4 22 34 0.65536000000000000000e5
-2274 4 23 27 0.65536000000000000000e5
-2275 1 1 48 0.32768000000000000000e5
-2275 1 2 49 0.32768000000000000000e5
-2275 1 8 39 0.65536000000000000000e5
-2275 1 9 40 0.65536000000000000000e5
-2275 1 10 41 -0.13107200000000000000e6
-2275 1 12 43 -0.26214400000000000000e6
-2275 1 23 38 0.32768000000000000000e5
-2275 1 24 55 -0.13107200000000000000e6
-2275 1 26 41 -0.65536000000000000000e5
-2275 1 28 43 0.26214400000000000000e6
-2275 1 32 47 0.26214400000000000000e6
-2275 1 33 48 -0.13107200000000000000e6
-2275 1 40 55 0.65536000000000000000e5
-2275 1 41 56 0.13107200000000000000e6
-2275 1 44 51 0.26214400000000000000e6
-2275 1 46 53 -0.26214400000000000000e6
-2275 2 2 32 0.32768000000000000000e5
-2275 2 4 34 -0.65536000000000000000e5
-2275 2 16 30 0.65536000000000000000e5
-2275 2 20 34 0.13107200000000000000e6
-2275 2 21 35 -0.65536000000000000000e5
-2275 2 28 34 0.65536000000000000000e5
-2275 2 29 35 0.65536000000000000000e5
-2275 3 5 50 -0.65536000000000000000e5
-2275 3 9 38 0.65536000000000000000e5
-2275 3 10 55 -0.13107200000000000000e6
-2275 3 22 35 0.26214400000000000000e6
-2275 3 22 51 0.65536000000000000000e5
-2275 3 23 52 -0.13107200000000000000e6
-2275 3 27 40 -0.65536000000000000000e5
-2275 3 27 56 0.13107200000000000000e6
-2275 3 28 41 0.26214400000000000000e6
-2275 3 35 48 0.26214400000000000000e6
-2275 3 37 50 -0.65536000000000000000e5
-2275 3 38 51 -0.13107200000000000000e6
-2275 3 39 52 -0.13107200000000000000e6
-2275 3 40 45 -0.13107200000000000000e6
-2275 4 2 30 0.65536000000000000000e5
-2275 4 6 34 0.13107200000000000000e6
-2275 4 7 35 0.65536000000000000000e5
-2275 4 22 34 -0.13107200000000000000e6
-2275 4 23 35 -0.13107200000000000000e6
-2275 4 29 33 -0.65536000000000000000e5
-2276 1 6 53 -0.81920000000000000000e4
-2276 1 25 40 0.81920000000000000000e4
-2276 1 28 43 0.32768000000000000000e5
-2276 1 33 40 0.32768000000000000000e5
-2276 1 33 48 0.32768000000000000000e5
-2276 1 34 49 -0.65536000000000000000e5
-2276 2 4 34 -0.16384000000000000000e5
-2276 2 21 35 0.16384000000000000000e5
-2276 2 30 30 0.65536000000000000000e5
-2276 3 5 50 -0.16384000000000000000e5
-2276 3 14 51 -0.65536000000000000000e5
-2276 3 24 37 -0.81920000000000000000e4
-2276 3 27 40 -0.32768000000000000000e5
-2276 3 29 42 0.32768000000000000000e5
-2276 3 30 43 0.32768000000000000000e5
-2276 4 4 32 0.81920000000000000000e4
-2276 4 7 35 0.16384000000000000000e5
-2276 4 16 28 -0.81920000000000000000e4
-2276 4 19 31 0.32768000000000000000e5
-2277 1 6 53 -0.81920000000000000000e4
-2277 1 14 45 -0.26214400000000000000e6
-2277 1 17 48 0.13107200000000000000e6
-2277 1 18 49 0.13107200000000000000e6
-2277 1 25 40 0.81920000000000000000e4
-2277 1 34 49 0.13107200000000000000e6
-2277 2 4 34 -0.16384000000000000000e5
-2277 2 14 28 0.65536000000000000000e5
-2277 2 21 35 0.16384000000000000000e5
-2277 2 30 31 0.65536000000000000000e5
-2277 3 5 50 -0.16384000000000000000e5
-2277 3 14 43 0.65536000000000000000e5
-2277 3 14 51 -0.65536000000000000000e5
-2277 3 15 44 -0.13107200000000000000e6
-2277 3 16 45 0.26214400000000000000e6
-2277 3 18 47 0.65536000000000000000e5
-2277 3 19 48 0.13107200000000000000e6
-2277 3 22 35 -0.65536000000000000000e5
-2277 3 24 37 -0.81920000000000000000e4
-2277 3 27 40 -0.32768000000000000000e5
-2277 3 28 41 -0.32768000000000000000e5
-2277 3 29 42 -0.32768000000000000000e5
-2277 4 4 32 0.81920000000000000000e4
-2277 4 7 35 0.16384000000000000000e5
-2277 4 14 26 -0.65536000000000000000e5
-2277 4 15 27 -0.13107200000000000000e6
-2277 4 16 28 -0.81920000000000000000e4
-2277 4 23 27 -0.32768000000000000000e5
-2278 2 21 35 -0.65536000000000000000e5
-2278 2 30 32 0.65536000000000000000e5
-2279 2 28 34 -0.65536000000000000000e5
-2279 2 30 33 0.65536000000000000000e5
-2280 1 6 53 -0.16384000000000000000e5
-2280 1 25 40 0.16384000000000000000e5
-2280 1 28 43 0.65536000000000000000e5
-2280 1 33 40 0.65536000000000000000e5
-2280 1 33 48 0.65536000000000000000e5
-2280 1 44 51 -0.13107200000000000000e6
-2280 2 4 34 -0.32768000000000000000e5
-2280 2 21 35 0.32768000000000000000e5
-2280 2 30 34 0.65536000000000000000e5
-2280 3 5 50 -0.32768000000000000000e5
-2280 3 14 51 -0.13107200000000000000e6
-2280 3 23 52 -0.65536000000000000000e5
-2280 3 24 37 -0.16384000000000000000e5
-2280 3 27 40 -0.65536000000000000000e5
-2280 3 29 42 0.65536000000000000000e5
-2280 3 30 43 0.65536000000000000000e5
-2280 3 35 48 -0.13107200000000000000e6
-2280 3 40 45 0.65536000000000000000e5
-2280 4 4 32 0.16384000000000000000e5
-2280 4 7 35 0.32768000000000000000e5
-2280 4 16 28 -0.16384000000000000000e5
-2280 4 19 31 0.65536000000000000000e5
-2280 4 22 34 0.65536000000000000000e5
-2281 2 28 34 -0.65536000000000000000e5
-2281 2 30 35 0.65536000000000000000e5
-2281 4 29 33 0.65536000000000000000e5
-2282 1 4 35 0.16384000000000000000e5
-2282 1 11 18 0.32768000000000000000e5
-2282 1 12 43 0.16384000000000000000e5
-2282 1 13 20 -0.13107200000000000000e6
-2282 1 14 45 0.65536000000000000000e5
-2282 1 17 32 0.65536000000000000000e5
-2282 1 17 48 -0.16384000000000000000e5
-2282 1 18 49 -0.16384000000000000000e5
-2282 1 20 27 0.65536000000000000000e5
-2282 2 9 23 0.16384000000000000000e5
-2282 2 11 25 0.65536000000000000000e5
-2282 2 14 28 -0.16384000000000000000e5
-2282 2 31 31 0.65536000000000000000e5
-2282 3 5 34 0.16384000000000000000e5
-2282 3 6 19 -0.32768000000000000000e5
-2282 3 8 21 0.13107200000000000000e6
-2282 3 13 42 -0.16384000000000000000e5
-2282 3 14 27 0.16384000000000000000e5
-2282 3 14 43 -0.16384000000000000000e5
-2282 3 16 29 -0.32768000000000000000e5
-2282 3 17 30 -0.32768000000000000000e5
-2282 3 18 31 0.65536000000000000000e5
-2282 3 19 48 -0.32768000000000000000e5
-2282 3 31 44 -0.32768000000000000000e5
-2282 3 32 45 -0.32768000000000000000e5
-2282 3 36 41 0.65536000000000000000e5
-2282 4 15 27 0.32768000000000000000e5
-2283 1 17 48 -0.13107200000000000000e6
-2283 1 28 43 0.65536000000000000000e5
-2283 1 33 48 0.65536000000000000000e5
-2283 1 37 52 0.65536000000000000000e5
-2283 2 31 32 0.65536000000000000000e5
-2283 3 10 55 0.65536000000000000000e5
-2283 3 23 52 -0.65536000000000000000e5
-2283 3 28 41 0.65536000000000000000e5
-2283 3 29 42 0.65536000000000000000e5
-2283 3 34 47 0.13107200000000000000e6
-2283 3 35 48 -0.13107200000000000000e6
-2283 3 40 45 0.65536000000000000000e5
-2283 4 22 34 0.65536000000000000000e5
-2283 4 23 27 0.65536000000000000000e5
-2284 1 6 53 -0.16384000000000000000e5
-2284 1 25 40 0.16384000000000000000e5
-2284 1 28 43 0.65536000000000000000e5
-2284 1 33 40 0.65536000000000000000e5
-2284 1 33 48 0.65536000000000000000e5
-2284 1 44 51 -0.13107200000000000000e6
-2284 2 4 34 -0.32768000000000000000e5
-2284 2 21 35 0.32768000000000000000e5
-2284 2 31 33 0.65536000000000000000e5
-2284 3 5 50 -0.32768000000000000000e5
-2284 3 14 51 -0.13107200000000000000e6
-2284 3 23 52 -0.65536000000000000000e5
-2284 3 24 37 -0.16384000000000000000e5
-2284 3 27 40 -0.65536000000000000000e5
-2284 3 29 42 0.65536000000000000000e5
-2284 3 30 43 0.65536000000000000000e5
-2284 3 35 48 -0.13107200000000000000e6
-2284 3 40 45 0.65536000000000000000e5
-2284 4 4 32 0.16384000000000000000e5
-2284 4 7 35 0.32768000000000000000e5
-2284 4 16 28 -0.16384000000000000000e5
-2284 4 19 31 0.65536000000000000000e5
-2284 4 22 34 0.65536000000000000000e5
-2285 1 6 53 -0.81920000000000000000e4
-2285 1 14 45 -0.26214400000000000000e6
-2285 1 17 48 0.13107200000000000000e6
-2285 1 18 49 0.13107200000000000000e6
-2285 1 25 40 0.81920000000000000000e4
-2285 1 34 49 0.65536000000000000000e5
-2285 1 44 51 0.65536000000000000000e5
-2285 2 4 34 -0.16384000000000000000e5
-2285 2 14 28 0.65536000000000000000e5
-2285 2 21 35 0.16384000000000000000e5
-2285 2 31 34 0.65536000000000000000e5
-2285 3 5 50 -0.16384000000000000000e5
-2285 3 14 43 0.65536000000000000000e5
-2285 3 14 51 -0.65536000000000000000e5
-2285 3 15 44 -0.13107200000000000000e6
-2285 3 16 45 0.26214400000000000000e6
-2285 3 18 47 0.65536000000000000000e5
-2285 3 19 48 0.13107200000000000000e6
-2285 3 22 35 -0.65536000000000000000e5
-2285 3 24 37 -0.81920000000000000000e4
-2285 3 27 40 -0.32768000000000000000e5
-2285 3 28 41 -0.32768000000000000000e5
-2285 3 29 42 -0.32768000000000000000e5
-2285 3 34 47 -0.65536000000000000000e5
-2285 3 35 48 -0.65536000000000000000e5
-2285 3 41 46 0.13107200000000000000e6
-2285 4 4 32 0.81920000000000000000e4
-2285 4 7 35 0.16384000000000000000e5
-2285 4 14 26 -0.65536000000000000000e5
-2285 4 15 27 -0.13107200000000000000e6
-2285 4 16 28 -0.81920000000000000000e4
-2285 4 23 27 -0.32768000000000000000e5
-2286 1 6 53 -0.16384000000000000000e5
-2286 1 25 40 0.16384000000000000000e5
-2286 1 28 43 0.65536000000000000000e5
-2286 1 33 40 0.65536000000000000000e5
-2286 1 33 48 0.65536000000000000000e5
-2286 1 44 51 -0.13107200000000000000e6
-2286 2 4 34 -0.32768000000000000000e5
-2286 2 21 35 0.32768000000000000000e5
-2286 2 31 35 0.65536000000000000000e5
-2286 3 5 50 -0.32768000000000000000e5
-2286 3 14 51 -0.13107200000000000000e6
-2286 3 23 52 -0.65536000000000000000e5
-2286 3 24 37 -0.16384000000000000000e5
-2286 3 27 40 -0.65536000000000000000e5
-2286 3 29 42 0.65536000000000000000e5
-2286 3 30 43 0.65536000000000000000e5
-2286 3 35 48 -0.13107200000000000000e6
-2286 3 40 45 0.65536000000000000000e5
-2286 4 4 32 0.16384000000000000000e5
-2286 4 7 35 0.32768000000000000000e5
-2286 4 16 28 -0.16384000000000000000e5
-2286 4 19 31 0.65536000000000000000e5
-2286 4 22 34 0.65536000000000000000e5
-2286 4 23 35 0.65536000000000000000e5
-2287 1 25 56 0.65536000000000000000e5
-2287 1 38 53 0.65536000000000000000e5
-2287 1 40 47 0.65536000000000000000e5
-2287 1 41 56 -0.13107200000000000000e6
-2287 2 32 33 0.65536000000000000000e5
-2287 3 24 53 -0.65536000000000000000e5
-2287 3 27 56 -0.13107200000000000000e6
-2288 1 1 48 0.32768000000000000000e5
-2288 1 2 49 0.32768000000000000000e5
-2288 1 8 39 0.65536000000000000000e5
-2288 1 9 40 0.65536000000000000000e5
-2288 1 10 41 -0.13107200000000000000e6
-2288 1 12 43 -0.26214400000000000000e6
-2288 1 23 38 0.32768000000000000000e5
-2288 1 24 55 -0.13107200000000000000e6
-2288 1 26 41 -0.65536000000000000000e5
-2288 1 28 43 0.26214400000000000000e6
-2288 1 32 47 0.26214400000000000000e6
-2288 1 33 48 -0.13107200000000000000e6
-2288 1 40 55 0.65536000000000000000e5
-2288 1 41 56 0.13107200000000000000e6
-2288 1 44 51 0.26214400000000000000e6
-2288 1 46 53 -0.26214400000000000000e6
-2288 2 2 32 0.32768000000000000000e5
-2288 2 4 34 -0.65536000000000000000e5
-2288 2 16 30 0.65536000000000000000e5
-2288 2 20 34 0.13107200000000000000e6
-2288 2 21 35 -0.65536000000000000000e5
-2288 2 28 34 0.65536000000000000000e5
-2288 2 32 34 0.65536000000000000000e5
-2288 3 5 50 -0.65536000000000000000e5
-2288 3 9 38 0.65536000000000000000e5
-2288 3 10 55 -0.13107200000000000000e6
-2288 3 22 35 0.26214400000000000000e6
-2288 3 22 51 0.65536000000000000000e5
-2288 3 23 52 -0.13107200000000000000e6
-2288 3 27 40 -0.65536000000000000000e5
-2288 3 27 56 0.13107200000000000000e6
-2288 3 28 41 0.26214400000000000000e6
-2288 3 35 48 0.26214400000000000000e6
-2288 3 37 50 -0.65536000000000000000e5
-2288 3 38 51 -0.13107200000000000000e6
-2288 3 39 52 -0.13107200000000000000e6
-2288 3 40 45 -0.13107200000000000000e6
-2288 4 2 30 0.65536000000000000000e5
-2288 4 6 34 0.13107200000000000000e6
-2288 4 7 35 0.65536000000000000000e5
-2288 4 22 34 -0.13107200000000000000e6
-2288 4 23 35 -0.13107200000000000000e6
-2288 4 29 33 -0.65536000000000000000e5
-2289 1 25 56 0.65536000000000000000e5
-2289 1 38 53 0.65536000000000000000e5
-2289 1 40 47 0.65536000000000000000e5
-2289 1 41 56 -0.13107200000000000000e6
-2289 2 32 35 0.65536000000000000000e5
-2289 3 24 53 -0.65536000000000000000e5
-2289 3 27 56 -0.13107200000000000000e6
-2289 4 32 32 0.13107200000000000000e6
-2290 1 1 48 0.32768000000000000000e5
-2290 1 2 49 0.65536000000000000000e5
-2290 1 6 53 -0.32768000000000000000e5
-2290 1 8 39 0.65536000000000000000e5
-2290 1 9 40 0.65536000000000000000e5
-2290 1 10 41 -0.13107200000000000000e6
-2290 1 12 43 -0.26214400000000000000e6
-2290 1 23 38 0.32768000000000000000e5
-2290 1 24 39 0.32768000000000000000e5
-2290 1 24 55 0.65536000000000000000e5
-2290 1 25 56 0.32768000000000000000e5
-2290 1 26 41 -0.13107200000000000000e6
-2290 1 28 43 0.13107200000000000000e6
-2290 1 32 47 0.26214400000000000000e6
-2290 1 40 47 0.32768000000000000000e5
-2290 2 2 32 0.32768000000000000000e5
-2290 2 3 33 0.32768000000000000000e5
-2290 2 5 35 -0.32768000000000000000e5
-2290 2 16 30 0.65536000000000000000e5
-2290 2 20 34 0.13107200000000000000e6
-2290 2 33 33 0.65536000000000000000e5
-2290 3 9 38 0.65536000000000000000e5
-2290 3 22 35 0.26214400000000000000e6
-2290 3 22 51 -0.65536000000000000000e5
-2290 3 23 52 0.13107200000000000000e6
-2290 3 24 53 -0.32768000000000000000e5
-2290 3 25 38 0.32768000000000000000e5
-2290 3 25 54 -0.32768000000000000000e5
-2290 3 27 40 0.65536000000000000000e5
-2290 3 28 41 0.26214400000000000000e6
-2290 3 38 51 0.65536000000000000000e5
-2290 3 39 40 -0.32768000000000000000e5
-2290 4 2 30 0.65536000000000000000e5
-2290 4 6 34 0.13107200000000000000e6
-2290 4 7 35 -0.65536000000000000000e5
-2291 2 28 34 -0.65536000000000000000e5
-2291 2 33 34 0.65536000000000000000e5
-2291 4 29 33 0.65536000000000000000e5
-2292 1 6 53 -0.81920000000000000000e4
-2292 1 25 40 0.81920000000000000000e4
-2292 1 28 43 0.32768000000000000000e5
-2292 1 33 40 0.32768000000000000000e5
-2292 1 33 48 0.32768000000000000000e5
-2292 1 44 51 -0.65536000000000000000e5
-2292 2 4 34 -0.16384000000000000000e5
-2292 2 21 35 0.16384000000000000000e5
-2292 2 34 34 0.65536000000000000000e5
-2292 3 5 50 -0.16384000000000000000e5
-2292 3 14 51 -0.65536000000000000000e5
-2292 3 23 52 -0.32768000000000000000e5
-2292 3 24 37 -0.81920000000000000000e4
-2292 3 27 40 -0.32768000000000000000e5
-2292 3 29 42 0.32768000000000000000e5
-2292 3 30 43 0.32768000000000000000e5
-2292 3 35 48 -0.65536000000000000000e5
-2292 3 40 45 0.32768000000000000000e5
-2292 4 4 32 0.81920000000000000000e4
-2292 4 7 35 0.16384000000000000000e5
-2292 4 16 28 -0.81920000000000000000e4
-2292 4 19 31 0.32768000000000000000e5
-2292 4 22 34 0.32768000000000000000e5
-2292 4 23 35 0.32768000000000000000e5
-2293 2 28 34 -0.65536000000000000000e5
-2293 2 34 35 0.65536000000000000000e5
-2293 3 27 56 -0.65536000000000000000e5
-2293 3 41 54 -0.65536000000000000000e5
-2293 3 47 52 0.13107200000000000000e6
-2293 3 49 50 -0.65536000000000000000e5
-2293 4 29 33 0.65536000000000000000e5
-2294 1 1 8 -0.65536000000000000000e5
-2294 1 2 5 -0.32768000000000000000e5
-2294 1 2 9 0.65536000000000000000e5
-2294 1 2 25 0.32768000000000000000e5
-2294 1 7 22 0.65536000000000000000e5
-2294 1 8 23 -0.65536000000000000000e5
-2294 3 1 1 0.65536000000000000000e5
-2294 3 1 2 0.32768000000000000000e5
-2294 3 2 3 -0.32768000000000000000e5
-2294 4 1 1 0.65536000000000000000e5
-2294 4 2 2 -0.65536000000000000000e5
-2295 1 2 5 0.65536000000000000000e5
-2295 1 2 9 -0.13107200000000000000e6
-2295 1 2 25 -0.65536000000000000000e5
-2295 1 8 23 0.13107200000000000000e6
-2295 3 1 3 0.65536000000000000000e5
-2295 3 2 3 0.65536000000000000000e5
-2295 4 2 2 0.13107200000000000000e6
-2296 3 1 4 0.65536000000000000000e5
-2296 3 2 3 -0.65536000000000000000e5
-2297 1 2 5 -0.65536000000000000000e5
-2297 1 2 25 0.65536000000000000000e5
-2297 3 1 5 0.65536000000000000000e5
-2298 1 1 8 -0.65536000000000000000e5
-2298 1 7 22 0.65536000000000000000e5
-2298 3 1 7 0.65536000000000000000e5
-2299 3 1 8 0.65536000000000000000e5
-2299 3 2 7 -0.65536000000000000000e5
-2300 1 2 9 -0.65536000000000000000e5
-2300 1 8 23 0.65536000000000000000e5
-2300 3 1 9 0.65536000000000000000e5
-2301 1 1 48 0.65536000000000000000e5
-2301 1 2 9 0.65536000000000000000e5
-2301 1 2 33 0.26214400000000000000e6
-2301 1 2 49 0.65536000000000000000e5
-2301 1 3 34 -0.26214400000000000000e6
-2301 1 4 11 -0.65536000000000000000e5
-2301 1 8 39 0.65536000000000000000e5
-2301 1 9 40 0.65536000000000000000e5
-2301 1 10 41 0.13107200000000000000e6
-2301 1 11 42 -0.13107200000000000000e6
-2301 1 12 43 -0.52428800000000000000e6
-2301 1 23 38 0.65536000000000000000e5
-2301 1 26 41 -0.65536000000000000000e5
-2301 1 28 43 0.26214400000000000000e6
-2301 1 32 47 0.39321600000000000000e6
-2301 1 33 48 0.13107200000000000000e6
-2301 2 2 8 0.65536000000000000000e5
-2301 2 2 32 0.65536000000000000000e5
-2301 2 3 9 -0.65536000000000000000e5
-2301 2 7 21 0.13107200000000000000e6
-2301 2 12 26 0.13107200000000000000e6
-2301 2 16 30 0.65536000000000000000e5
-2301 2 20 34 0.13107200000000000000e6
-2301 3 1 10 0.65536000000000000000e5
-2301 3 1 14 -0.13107200000000000000e6
-2301 3 1 30 -0.65536000000000000000e5
-2301 3 2 15 0.13107200000000000000e6
-2301 3 3 32 0.26214400000000000000e6
-2301 3 4 9 -0.65536000000000000000e5
-2301 3 8 37 0.65536000000000000000e5
-2301 3 10 23 -0.13107200000000000000e6
-2301 3 13 42 0.26214400000000000000e6
-2301 3 22 35 0.26214400000000000000e6
-2301 3 28 41 0.39321600000000000000e6
-2301 3 29 42 0.13107200000000000000e6
-2301 4 2 30 0.65536000000000000000e5
-2301 4 3 31 -0.13107200000000000000e6
-2301 4 6 18 -0.65536000000000000000e5
-2301 4 6 34 0.13107200000000000000e6
-2302 1 1 48 -0.32768000000000000000e5
-2302 1 2 49 -0.32768000000000000000e5
-2302 1 4 11 0.65536000000000000000e5
-2302 1 9 40 -0.65536000000000000000e5
-2302 1 12 43 0.26214400000000000000e6
-2302 1 23 38 -0.32768000000000000000e5
-2302 1 26 41 0.65536000000000000000e5
-2302 1 28 43 -0.13107200000000000000e6
-2302 1 32 47 -0.26214400000000000000e6
-2302 2 2 32 -0.32768000000000000000e5
-2302 2 3 9 0.65536000000000000000e5
-2302 2 16 30 -0.65536000000000000000e5
-2302 2 20 34 -0.13107200000000000000e6
-2302 3 1 11 0.65536000000000000000e5
-2302 3 1 30 0.65536000000000000000e5
-2302 3 2 15 -0.13107200000000000000e6
-2302 3 3 32 -0.13107200000000000000e6
-2302 3 4 9 0.65536000000000000000e5
-2302 3 10 23 0.65536000000000000000e5
-2302 3 22 35 -0.26214400000000000000e6
-2302 3 28 41 -0.26214400000000000000e6
-2302 4 2 30 -0.65536000000000000000e5
-2302 4 6 34 -0.13107200000000000000e6
-2303 1 1 48 -0.32768000000000000000e5
-2303 1 2 33 -0.13107200000000000000e6
-2303 1 2 49 -0.32768000000000000000e5
-2303 1 3 34 0.13107200000000000000e6
-2303 1 4 11 0.32768000000000000000e5
-2303 1 8 23 -0.32768000000000000000e5
-2303 1 8 39 -0.32768000000000000000e5
-2303 1 9 40 -0.32768000000000000000e5
-2303 1 10 41 -0.65536000000000000000e5
-2303 1 11 42 0.65536000000000000000e5
-2303 1 12 43 0.26214400000000000000e6
-2303 1 23 38 -0.32768000000000000000e5
-2303 1 26 41 0.32768000000000000000e5
-2303 1 28 43 -0.13107200000000000000e6
-2303 1 32 47 -0.19660800000000000000e6
-2303 1 33 48 -0.65536000000000000000e5
-2303 2 2 8 -0.32768000000000000000e5
-2303 2 2 32 -0.32768000000000000000e5
-2303 2 3 9 0.32768000000000000000e5
-2303 2 7 21 -0.65536000000000000000e5
-2303 2 12 26 -0.65536000000000000000e5
-2303 2 16 30 -0.32768000000000000000e5
-2303 2 20 34 -0.65536000000000000000e5
-2303 3 1 12 0.65536000000000000000e5
-2303 3 1 14 0.13107200000000000000e6
-2303 3 1 30 0.32768000000000000000e5
-2303 3 2 7 0.32768000000000000000e5
-2303 3 2 15 -0.65536000000000000000e5
-2303 3 3 32 -0.13107200000000000000e6
-2303 3 4 9 0.32768000000000000000e5
-2303 3 7 12 -0.13107200000000000000e6
-2303 3 8 37 -0.32768000000000000000e5
-2303 3 10 23 0.65536000000000000000e5
-2303 3 13 42 -0.13107200000000000000e6
-2303 3 22 35 -0.13107200000000000000e6
-2303 3 28 41 -0.19660800000000000000e6
-2303 3 29 42 -0.65536000000000000000e5
-2303 4 2 6 0.32768000000000000000e5
-2303 4 2 30 -0.32768000000000000000e5
-2303 4 3 31 0.65536000000000000000e5
-2303 4 6 6 0.13107200000000000000e6
-2303 4 6 18 0.32768000000000000000e5
-2303 4 6 34 -0.65536000000000000000e5
-2304 1 1 48 0.32768000000000000000e5
-2304 1 2 33 0.13107200000000000000e6
-2304 1 2 49 0.32768000000000000000e5
-2304 1 3 34 -0.13107200000000000000e6
-2304 1 4 11 -0.32768000000000000000e5
-2304 1 8 23 0.32768000000000000000e5
-2304 1 8 39 0.32768000000000000000e5
-2304 1 9 40 0.32768000000000000000e5
-2304 1 10 41 0.65536000000000000000e5
-2304 1 11 42 -0.65536000000000000000e5
-2304 1 12 43 -0.26214400000000000000e6
-2304 1 23 38 0.32768000000000000000e5
-2304 1 26 41 -0.32768000000000000000e5
-2304 1 28 43 0.13107200000000000000e6
-2304 1 32 47 0.19660800000000000000e6
-2304 1 33 48 0.65536000000000000000e5
-2304 2 2 8 0.32768000000000000000e5
-2304 2 2 32 0.32768000000000000000e5
-2304 2 3 9 -0.32768000000000000000e5
-2304 2 7 21 0.65536000000000000000e5
-2304 2 12 26 0.65536000000000000000e5
-2304 2 16 30 0.32768000000000000000e5
-2304 2 20 34 0.65536000000000000000e5
-2304 3 1 13 0.65536000000000000000e5
-2304 3 1 14 -0.65536000000000000000e5
-2304 3 1 30 -0.32768000000000000000e5
-2304 3 2 7 -0.32768000000000000000e5
-2304 3 2 15 0.65536000000000000000e5
-2304 3 3 32 0.13107200000000000000e6
-2304 3 4 9 -0.32768000000000000000e5
-2304 3 8 37 0.32768000000000000000e5
-2304 3 10 23 -0.65536000000000000000e5
-2304 3 13 42 0.13107200000000000000e6
-2304 3 22 35 0.13107200000000000000e6
-2304 3 28 41 0.19660800000000000000e6
-2304 3 29 42 0.65536000000000000000e5
-2304 4 2 6 -0.32768000000000000000e5
-2304 4 2 30 0.32768000000000000000e5
-2304 4 3 31 -0.65536000000000000000e5
-2304 4 6 18 -0.32768000000000000000e5
-2304 4 6 34 0.65536000000000000000e5
-2305 2 4 10 0.65536000000000000000e5
-2305 2 7 21 -0.65536000000000000000e5
-2305 3 1 14 0.65536000000000000000e5
-2305 3 1 15 0.65536000000000000000e5
-2305 3 2 15 0.65536000000000000000e5
-2305 3 3 16 -0.13107200000000000000e6
-2306 3 1 16 0.65536000000000000000e5
-2306 3 7 12 -0.65536000000000000000e5
-2307 1 2 17 -0.65536000000000000000e5
-2307 1 16 23 0.65536000000000000000e5
-2307 3 1 17 0.65536000000000000000e5
-2308 3 1 18 0.65536000000000000000e5
-2308 3 3 16 -0.65536000000000000000e5
-2309 1 2 17 -0.32768000000000000000e5
-2309 1 16 23 0.32768000000000000000e5
-2309 3 1 19 0.65536000000000000000e5
-2309 3 3 16 -0.32768000000000000000e5
-2309 3 7 12 -0.32768000000000000000e5
-2309 4 1 13 -0.32768000000000000000e5
-2310 1 2 17 -0.32768000000000000000e5
-2310 1 3 34 -0.32768000000000000000e5
-2310 1 4 19 -0.65536000000000000000e5
-2310 1 4 35 -0.32768000000000000000e5
-2310 1 12 43 -0.65536000000000000000e5
-2310 1 14 45 -0.65536000000000000000e5
-2310 1 17 48 0.32768000000000000000e5
-2310 1 18 49 0.32768000000000000000e5
-2310 1 20 27 0.13107200000000000000e6
-2310 2 6 12 -0.32768000000000000000e5
-2310 2 9 23 -0.32768000000000000000e5
-2310 2 10 24 -0.65536000000000000000e5
-2310 2 14 28 0.32768000000000000000e5
-2310 3 1 20 0.65536000000000000000e5
-2310 3 4 17 0.32768000000000000000e5
-2310 3 5 34 -0.32768000000000000000e5
-2310 3 13 42 0.32768000000000000000e5
-2310 3 14 27 -0.65536000000000000000e5
-2310 3 14 43 0.32768000000000000000e5
-2310 4 2 14 0.32768000000000000000e5
-2311 1 2 17 -0.32768000000000000000e5
-2311 1 3 18 -0.16384000000000000000e5
-2311 1 3 34 -0.16384000000000000000e5
-2311 1 4 19 -0.32768000000000000000e5
-2311 1 4 35 -0.16384000000000000000e5
-2311 1 12 43 -0.16384000000000000000e5
-2311 1 14 45 -0.32768000000000000000e5
-2311 1 16 23 0.16384000000000000000e5
-2311 1 17 48 0.16384000000000000000e5
-2311 1 18 49 0.16384000000000000000e5
-2311 1 20 27 0.65536000000000000000e5
-2311 2 6 12 -0.16384000000000000000e5
-2311 2 9 23 -0.16384000000000000000e5
-2311 2 10 24 -0.32768000000000000000e5
-2311 2 14 28 0.16384000000000000000e5
-2311 3 1 21 0.65536000000000000000e5
-2311 3 3 16 -0.32768000000000000000e5
-2311 3 5 34 -0.16384000000000000000e5
-2311 3 7 12 -0.16384000000000000000e5
-2311 3 13 42 0.16384000000000000000e5
-2311 3 14 27 -0.16384000000000000000e5
-2311 3 14 43 0.16384000000000000000e5
-2311 4 1 13 -0.16384000000000000000e5
-2311 4 10 10 -0.65536000000000000000e5
-2312 1 1 24 -0.65536000000000000000e5
-2312 1 1 40 -0.65536000000000000000e5
-2312 1 22 37 0.65536000000000000000e5
-2312 1 23 38 0.65536000000000000000e5
-2312 3 1 23 0.65536000000000000000e5
-2312 3 1 38 -0.65536000000000000000e5
-2312 3 22 27 0.13107200000000000000e6
-2312 4 16 16 -0.13107200000000000000e6
-2313 3 1 24 0.65536000000000000000e5
-2313 3 2 23 -0.65536000000000000000e5
-2314 1 1 40 0.65536000000000000000e5
-2314 1 2 25 -0.65536000000000000000e5
-2314 3 1 25 0.65536000000000000000e5
-2315 1 2 25 0.65536000000000000000e5
-2315 1 2 33 -0.26214400000000000000e6
-2315 1 11 42 0.26214400000000000000e6
-2315 1 12 43 0.52428800000000000000e6
-2315 1 23 38 -0.65536000000000000000e5
-2315 1 28 43 -0.26214400000000000000e6
-2315 1 32 47 -0.26214400000000000000e6
-2315 1 33 48 -0.26214400000000000000e6
-2315 2 2 32 -0.65536000000000000000e5
-2315 2 3 17 0.65536000000000000000e5
-2315 2 12 26 -0.26214400000000000000e6
-2315 3 1 26 0.65536000000000000000e5
-2315 3 1 30 0.13107200000000000000e6
-2315 3 1 38 0.65536000000000000000e5
-2315 3 2 23 0.65536000000000000000e5
-2315 3 2 39 0.65536000000000000000e5
-2315 3 8 37 -0.13107200000000000000e6
-2315 3 10 23 0.13107200000000000000e6
-2315 3 13 42 -0.52428800000000000000e6
-2315 3 28 41 -0.26214400000000000000e6
-2315 3 29 42 -0.26214400000000000000e6
-2315 4 3 31 0.26214400000000000000e6
-2315 4 6 18 0.13107200000000000000e6
-2316 1 1 24 -0.32768000000000000000e5
-2316 1 1 40 -0.32768000000000000000e5
-2316 1 22 37 0.32768000000000000000e5
-2316 1 23 38 0.32768000000000000000e5
-2316 2 2 16 -0.32768000000000000000e5
-2316 2 16 16 0.65536000000000000000e5
-2316 3 1 22 -0.32768000000000000000e5
-2316 3 1 27 0.65536000000000000000e5
-2316 3 1 38 -0.32768000000000000000e5
-2316 3 2 23 -0.32768000000000000000e5
-2316 3 22 27 0.65536000000000000000e5
-2316 4 16 16 -0.65536000000000000000e5
-2317 1 7 38 0.65536000000000000000e5
-2317 1 8 23 -0.65536000000000000000e5
-2317 3 1 28 0.65536000000000000000e5
-2318 1 2 33 -0.13107200000000000000e6
-2318 1 11 42 0.13107200000000000000e6
-2318 1 12 43 0.26214400000000000000e6
-2318 1 28 43 -0.13107200000000000000e6
-2318 1 32 47 -0.13107200000000000000e6
-2318 1 33 48 -0.13107200000000000000e6
-2318 2 12 26 -0.13107200000000000000e6
-2318 3 1 29 0.65536000000000000000e5
-2318 3 1 30 0.65536000000000000000e5
-2318 3 10 23 0.65536000000000000000e5
-2318 3 13 42 -0.26214400000000000000e6
-2318 3 28 41 -0.13107200000000000000e6
-2318 3 29 42 -0.13107200000000000000e6
-2318 4 3 31 0.13107200000000000000e6
-2318 4 6 18 0.65536000000000000000e5
-2319 1 1 32 -0.65536000000000000000e5
-2319 1 2 33 0.65536000000000000000e5
-2319 1 3 34 -0.13107200000000000000e6
-2319 1 10 41 0.65536000000000000000e5
-2319 1 11 42 -0.65536000000000000000e5
-2319 1 12 43 -0.13107200000000000000e6
-2319 1 16 23 0.13107200000000000000e6
-2319 1 28 43 0.65536000000000000000e5
-2319 1 32 47 0.65536000000000000000e5
-2319 1 33 48 0.65536000000000000000e5
-2319 2 1 31 -0.65536000000000000000e5
-2319 2 7 21 0.65536000000000000000e5
-2319 2 12 26 0.65536000000000000000e5
-2319 3 1 31 0.65536000000000000000e5
-2319 3 1 34 -0.13107200000000000000e6
-2319 3 2 31 0.65536000000000000000e5
-2319 3 3 32 0.65536000000000000000e5
-2319 3 13 42 0.13107200000000000000e6
-2319 3 28 41 0.65536000000000000000e5
-2319 3 29 42 0.65536000000000000000e5
-2319 4 3 31 -0.65536000000000000000e5
-2320 3 1 32 0.65536000000000000000e5
-2320 3 2 31 -0.65536000000000000000e5
-2321 1 2 33 -0.65536000000000000000e5
-2321 1 11 42 0.65536000000000000000e5
-2321 1 12 43 0.13107200000000000000e6
-2321 1 28 43 -0.65536000000000000000e5
-2321 1 32 47 -0.65536000000000000000e5
-2321 1 33 48 -0.65536000000000000000e5
-2321 2 12 26 -0.65536000000000000000e5
-2321 3 1 33 0.65536000000000000000e5
-2321 3 13 42 -0.13107200000000000000e6
-2321 3 28 41 -0.65536000000000000000e5
-2321 3 29 42 -0.65536000000000000000e5
-2321 4 3 31 0.65536000000000000000e5
-2322 1 3 34 -0.65536000000000000000e5
-2322 1 16 47 0.65536000000000000000e5
-2322 3 1 35 0.65536000000000000000e5
-2322 3 12 41 0.65536000000000000000e5
-2323 1 3 18 -0.32768000000000000000e5
-2323 1 4 19 0.65536000000000000000e5
-2323 1 4 35 0.32768000000000000000e5
-2323 1 12 43 0.65536000000000000000e5
-2323 1 14 45 0.65536000000000000000e5
-2323 1 17 48 -0.32768000000000000000e5
-2323 1 18 49 -0.32768000000000000000e5
-2323 1 20 27 -0.13107200000000000000e6
-2323 1 27 34 0.65536000000000000000e5
-2323 2 9 23 0.32768000000000000000e5
-2323 2 10 24 0.65536000000000000000e5
-2323 2 14 28 -0.32768000000000000000e5
-2323 3 1 36 0.65536000000000000000e5
-2323 3 3 16 -0.32768000000000000000e5
-2323 3 4 17 -0.32768000000000000000e5
-2323 3 5 34 0.32768000000000000000e5
-2323 3 13 42 -0.32768000000000000000e5
-2323 3 14 27 0.65536000000000000000e5
-2323 3 14 43 -0.32768000000000000000e5
-2323 4 2 14 -0.32768000000000000000e5
-2324 1 1 40 0.65536000000000000000e5
-2324 1 23 38 -0.65536000000000000000e5
-2324 3 1 37 0.65536000000000000000e5
-2324 3 1 38 0.65536000000000000000e5
-2324 3 22 27 -0.13107200000000000000e6
-2324 4 16 16 0.13107200000000000000e6
-2325 1 1 40 -0.65536000000000000000e5
-2325 1 23 38 0.65536000000000000000e5
-2325 3 1 39 0.65536000000000000000e5
-2326 3 1 40 0.65536000000000000000e5
-2326 3 2 39 -0.65536000000000000000e5
-2327 3 1 41 0.65536000000000000000e5
-2327 3 22 27 -0.65536000000000000000e5
-2328 3 1 42 0.65536000000000000000e5
-2328 3 8 37 -0.65536000000000000000e5
-2329 1 9 40 0.65536000000000000000e5
-2329 1 10 41 -0.13107200000000000000e6
-2329 1 26 41 -0.65536000000000000000e5
-2329 1 32 47 0.13107200000000000000e6
-2329 3 1 43 0.65536000000000000000e5
-2329 3 9 38 0.65536000000000000000e5
-2329 3 28 41 0.13107200000000000000e6
-2329 4 2 30 0.65536000000000000000e5
-2330 1 9 40 0.32768000000000000000e5
-2330 1 10 41 -0.65536000000000000000e5
-2330 1 26 41 -0.32768000000000000000e5
-2330 1 32 47 0.65536000000000000000e5
-2330 3 1 44 0.65536000000000000000e5
-2330 3 8 37 -0.32768000000000000000e5
-2330 3 9 38 0.32768000000000000000e5
-2330 3 22 27 -0.32768000000000000000e5
-2330 3 28 41 0.65536000000000000000e5
-2330 4 1 29 -0.32768000000000000000e5
-2330 4 2 30 0.32768000000000000000e5
-2331 1 11 42 -0.65536000000000000000e5
-2331 1 33 48 0.65536000000000000000e5
-2331 2 12 26 0.65536000000000000000e5
-2331 2 20 34 -0.65536000000000000000e5
-2331 3 1 45 0.65536000000000000000e5
-2331 3 13 42 0.13107200000000000000e6
-2331 3 22 35 -0.13107200000000000000e6
-2331 3 29 42 0.65536000000000000000e5
-2331 4 3 31 -0.65536000000000000000e5
-2331 4 6 34 -0.65536000000000000000e5
-2332 3 1 46 0.65536000000000000000e5
-2332 3 12 41 -0.65536000000000000000e5
-2333 1 6 53 0.65536000000000000000e5
-2333 1 25 40 -0.65536000000000000000e5
-2333 2 1 35 -0.65536000000000000000e5
-2333 2 2 32 0.65536000000000000000e5
-2333 2 4 34 0.13107200000000000000e6
-2333 2 16 30 0.13107200000000000000e6
-2333 2 16 34 -0.13107200000000000000e6
-2333 2 21 35 -0.13107200000000000000e6
-2333 3 1 47 0.65536000000000000000e5
-2333 3 2 47 0.65536000000000000000e5
-2333 3 5 50 0.13107200000000000000e6
-2333 3 7 52 -0.52428800000000000000e6
-2333 3 24 37 0.13107200000000000000e6
-2333 3 27 40 0.13107200000000000000e6
-2333 3 28 41 0.52428800000000000000e6
-2333 4 4 32 -0.65536000000000000000e5
-2333 4 6 34 0.26214400000000000000e6
-2333 4 7 35 -0.13107200000000000000e6
-2333 4 16 28 0.65536000000000000000e5
-2333 4 17 29 -0.13107200000000000000e6
-2334 3 1 48 0.65536000000000000000e5
-2334 3 2 47 -0.65536000000000000000e5
-2335 3 1 49 0.65536000000000000000e5
-2335 3 24 37 -0.65536000000000000000e5
-2336 1 6 53 0.32768000000000000000e5
-2336 1 25 40 -0.32768000000000000000e5
-2336 2 4 34 0.65536000000000000000e5
-2336 2 16 30 0.65536000000000000000e5
-2336 2 16 34 -0.65536000000000000000e5
-2336 2 21 35 -0.65536000000000000000e5
-2336 3 1 50 0.65536000000000000000e5
-2336 3 5 50 0.65536000000000000000e5
-2336 3 7 52 -0.26214400000000000000e6
-2336 3 24 37 0.32768000000000000000e5
-2336 3 27 40 0.65536000000000000000e5
-2336 3 28 41 0.26214400000000000000e6
-2336 4 4 32 -0.32768000000000000000e5
-2336 4 6 34 0.13107200000000000000e6
-2336 4 7 35 -0.65536000000000000000e5
-2336 4 16 28 0.32768000000000000000e5
-2336 4 17 29 -0.65536000000000000000e5
-2337 1 6 53 0.32768000000000000000e5
-2337 1 25 40 -0.32768000000000000000e5
-2337 3 1 51 0.65536000000000000000e5
-2337 3 24 37 0.32768000000000000000e5
-2337 3 27 40 0.13107200000000000000e6
-2337 3 28 41 -0.13107200000000000000e6
-2337 4 4 32 -0.32768000000000000000e5
-2337 4 16 28 0.32768000000000000000e5
-2337 4 17 29 0.65536000000000000000e5
-2338 1 6 53 0.16384000000000000000e5
-2338 1 25 40 -0.16384000000000000000e5
-2338 2 4 34 0.32768000000000000000e5
-2338 2 21 35 -0.32768000000000000000e5
-2338 3 1 52 0.65536000000000000000e5
-2338 3 5 50 0.32768000000000000000e5
-2338 3 7 52 -0.13107200000000000000e6
-2338 3 24 37 0.16384000000000000000e5
-2338 3 27 40 0.65536000000000000000e5
-2338 3 28 41 0.65536000000000000000e5
-2338 4 4 32 -0.16384000000000000000e5
-2338 4 6 34 0.65536000000000000000e5
-2338 4 7 35 -0.32768000000000000000e5
-2338 4 16 28 0.16384000000000000000e5
-2339 1 22 53 0.65536000000000000000e5
-2339 1 23 38 -0.65536000000000000000e5
-2339 3 1 53 0.65536000000000000000e5
-2339 3 2 47 0.65536000000000000000e5
-2340 1 2 49 -0.65536000000000000000e5
-2340 1 6 53 0.65536000000000000000e5
-2340 1 8 39 0.13107200000000000000e6
-2340 1 9 40 0.13107200000000000000e6
-2340 1 10 41 -0.26214400000000000000e6
-2340 1 22 53 -0.65536000000000000000e5
-2340 1 23 54 -0.65536000000000000000e5
-2340 1 24 55 -0.13107200000000000000e6
-2340 1 25 40 -0.65536000000000000000e5
-2340 1 37 52 0.26214400000000000000e6
-2340 2 26 32 -0.65536000000000000000e5
-2340 3 1 54 0.65536000000000000000e5
-2340 3 9 38 0.13107200000000000000e6
-2340 3 22 51 0.13107200000000000000e6
-2340 3 24 37 0.13107200000000000000e6
-2340 3 27 40 0.13107200000000000000e6
-2340 4 2 30 0.13107200000000000000e6
-2340 4 4 32 -0.65536000000000000000e5
-2340 4 16 28 0.65536000000000000000e5
-2340 4 17 29 0.13107200000000000000e6
-2340 4 20 32 0.13107200000000000000e6
-2341 1 24 55 -0.65536000000000000000e5
-2341 1 26 41 0.65536000000000000000e5
-2341 1 32 47 -0.13107200000000000000e6
-2341 1 37 52 0.13107200000000000000e6
-2341 3 1 55 0.65536000000000000000e5
-2341 3 22 51 0.65536000000000000000e5
-2341 3 27 40 -0.65536000000000000000e5
-2341 4 20 32 0.65536000000000000000e5
-2342 1 1 48 -0.65536000000000000000e5
-2342 1 2 49 -0.65536000000000000000e5
-2342 1 6 53 -0.13107200000000000000e6
-2342 1 8 39 -0.26214400000000000000e6
-2342 1 9 40 -0.26214400000000000000e6
-2342 1 10 41 0.52428800000000000000e6
-2342 1 12 43 0.52428800000000000000e6
-2342 1 22 53 0.65536000000000000000e5
-2342 1 23 38 -0.65536000000000000000e5
-2342 1 23 54 0.65536000000000000000e5
-2342 1 24 55 0.13107200000000000000e6
-2342 1 25 40 0.13107200000000000000e6
-2342 1 26 41 0.13107200000000000000e6
-2342 1 28 43 -0.26214400000000000000e6
-2342 1 32 47 -0.52428800000000000000e6
-2342 1 37 52 -0.26214400000000000000e6
-2342 1 38 53 -0.65536000000000000000e5
-2342 1 40 47 -0.65536000000000000000e5
-2342 2 2 32 -0.65536000000000000000e5
-2342 2 16 30 -0.13107200000000000000e6
-2342 2 20 34 -0.26214400000000000000e6
-2342 2 26 32 0.65536000000000000000e5
-2342 2 32 32 -0.13107200000000000000e6
-2342 3 1 56 0.65536000000000000000e5
-2342 3 9 38 -0.26214400000000000000e6
-2342 3 22 35 -0.52428800000000000000e6
-2342 3 22 51 -0.26214400000000000000e6
-2342 3 24 37 -0.13107200000000000000e6
-2342 3 24 53 0.65536000000000000000e5
-2342 3 27 40 -0.26214400000000000000e6
-2342 3 28 41 -0.52428800000000000000e6
-2342 3 37 50 -0.13107200000000000000e6
-2342 4 2 30 -0.26214400000000000000e6
-2342 4 4 32 0.13107200000000000000e6
-2342 4 6 34 -0.26214400000000000000e6
-2342 4 16 28 -0.13107200000000000000e6
-2342 4 17 29 -0.13107200000000000000e6
-2342 4 20 32 -0.13107200000000000000e6
-2343 1 2 5 0.32768000000000000000e5
-2343 1 2 9 -0.65536000000000000000e5
-2343 1 2 25 -0.32768000000000000000e5
-2343 1 8 23 0.65536000000000000000e5
-2343 3 2 2 0.65536000000000000000e5
-2343 3 2 3 0.32768000000000000000e5
-2343 4 2 2 0.65536000000000000000e5
-2344 1 2 5 -0.65536000000000000000e5
-2344 1 2 25 0.65536000000000000000e5
-2344 3 2 4 0.65536000000000000000e5
-2345 3 1 6 -0.65536000000000000000e5
-2345 3 2 5 0.65536000000000000000e5
-2346 1 1 48 -0.65536000000000000000e5
-2346 1 2 5 0.65536000000000000000e5
-2346 1 2 25 -0.65536000000000000000e5
-2346 1 2 49 -0.65536000000000000000e5
-2346 1 4 11 0.13107200000000000000e6
-2346 1 9 40 -0.13107200000000000000e6
-2346 1 12 43 0.52428800000000000000e6
-2346 1 23 38 -0.65536000000000000000e5
-2346 1 26 41 0.13107200000000000000e6
-2346 1 28 43 -0.26214400000000000000e6
-2346 1 32 47 -0.52428800000000000000e6
-2346 2 2 32 -0.65536000000000000000e5
-2346 2 3 9 0.13107200000000000000e6
-2346 2 16 30 -0.13107200000000000000e6
-2346 2 20 34 -0.26214400000000000000e6
-2346 3 1 6 0.65536000000000000000e5
-2346 3 1 30 0.13107200000000000000e6
-2346 3 2 6 0.65536000000000000000e5
-2346 3 2 15 -0.26214400000000000000e6
-2346 3 3 32 -0.26214400000000000000e6
-2346 3 4 9 0.13107200000000000000e6
-2346 3 10 23 0.13107200000000000000e6
-2346 3 22 35 -0.52428800000000000000e6
-2346 3 28 41 -0.52428800000000000000e6
-2346 4 1 5 0.65536000000000000000e5
-2346 4 2 30 -0.13107200000000000000e6
-2346 4 6 34 -0.26214400000000000000e6
-2347 1 2 9 -0.65536000000000000000e5
-2347 1 8 23 0.65536000000000000000e5
-2347 3 2 8 0.65536000000000000000e5
-2348 1 1 48 0.65536000000000000000e5
-2348 1 2 9 0.65536000000000000000e5
-2348 1 2 33 0.26214400000000000000e6
-2348 1 2 49 0.65536000000000000000e5
-2348 1 3 34 -0.26214400000000000000e6
-2348 1 4 11 -0.65536000000000000000e5
-2348 1 8 39 0.65536000000000000000e5
-2348 1 9 40 0.65536000000000000000e5
-2348 1 10 41 0.13107200000000000000e6
-2348 1 11 42 -0.13107200000000000000e6
-2348 1 12 43 -0.52428800000000000000e6
-2348 1 23 38 0.65536000000000000000e5
-2348 1 26 41 -0.65536000000000000000e5
-2348 1 28 43 0.26214400000000000000e6
-2348 1 32 47 0.39321600000000000000e6
-2348 1 33 48 0.13107200000000000000e6
-2348 2 2 8 0.65536000000000000000e5
-2348 2 2 32 0.65536000000000000000e5
-2348 2 3 9 -0.65536000000000000000e5
-2348 2 7 21 0.13107200000000000000e6
-2348 2 12 26 0.13107200000000000000e6
-2348 2 16 30 0.65536000000000000000e5
-2348 2 20 34 0.13107200000000000000e6
-2348 3 1 14 -0.13107200000000000000e6
-2348 3 1 30 -0.65536000000000000000e5
-2348 3 2 9 0.65536000000000000000e5
-2348 3 2 15 0.13107200000000000000e6
-2348 3 3 32 0.26214400000000000000e6
-2348 3 4 9 -0.65536000000000000000e5
-2348 3 8 37 0.65536000000000000000e5
-2348 3 10 23 -0.13107200000000000000e6
-2348 3 13 42 0.26214400000000000000e6
-2348 3 22 35 0.26214400000000000000e6
-2348 3 28 41 0.39321600000000000000e6
-2348 3 29 42 0.13107200000000000000e6
-2348 4 2 30 0.65536000000000000000e5
-2348 4 3 31 -0.13107200000000000000e6
-2348 4 6 18 -0.65536000000000000000e5
-2348 4 6 34 0.13107200000000000000e6
-2349 1 1 48 -0.32768000000000000000e5
-2349 1 2 49 -0.32768000000000000000e5
-2349 1 4 11 0.65536000000000000000e5
-2349 1 9 40 -0.65536000000000000000e5
-2349 1 12 43 0.26214400000000000000e6
-2349 1 23 38 -0.32768000000000000000e5
-2349 1 26 41 0.65536000000000000000e5
-2349 1 28 43 -0.13107200000000000000e6
-2349 1 32 47 -0.26214400000000000000e6
-2349 2 2 32 -0.32768000000000000000e5
-2349 2 3 9 0.65536000000000000000e5
-2349 2 16 30 -0.65536000000000000000e5
-2349 2 20 34 -0.13107200000000000000e6
-2349 3 1 30 0.65536000000000000000e5
-2349 3 2 10 0.65536000000000000000e5
-2349 3 2 15 -0.13107200000000000000e6
-2349 3 3 32 -0.13107200000000000000e6
-2349 3 4 9 0.65536000000000000000e5
-2349 3 10 23 0.65536000000000000000e5
-2349 3 22 35 -0.26214400000000000000e6
-2349 3 28 41 -0.26214400000000000000e6
-2349 4 2 30 -0.65536000000000000000e5
-2349 4 6 34 -0.13107200000000000000e6
-2350 3 2 11 0.65536000000000000000e5
-2350 3 4 9 -0.65536000000000000000e5
-2351 1 1 48 0.32768000000000000000e5
-2351 1 2 33 0.13107200000000000000e6
-2351 1 2 49 0.32768000000000000000e5
-2351 1 3 34 -0.13107200000000000000e6
-2351 1 4 11 -0.32768000000000000000e5
-2351 1 8 23 0.32768000000000000000e5
-2351 1 8 39 0.32768000000000000000e5
-2351 1 9 40 0.32768000000000000000e5
-2351 1 10 41 0.65536000000000000000e5
-2351 1 11 42 -0.65536000000000000000e5
-2351 1 12 43 -0.26214400000000000000e6
-2351 1 23 38 0.32768000000000000000e5
-2351 1 26 41 -0.32768000000000000000e5
-2351 1 28 43 0.13107200000000000000e6
-2351 1 32 47 0.19660800000000000000e6
-2351 1 33 48 0.65536000000000000000e5
-2351 2 2 8 0.32768000000000000000e5
-2351 2 2 32 0.32768000000000000000e5
-2351 2 3 9 -0.32768000000000000000e5
-2351 2 7 21 0.65536000000000000000e5
-2351 2 12 26 0.65536000000000000000e5
-2351 2 16 30 0.32768000000000000000e5
-2351 2 20 34 0.65536000000000000000e5
-2351 3 1 14 -0.65536000000000000000e5
-2351 3 1 30 -0.32768000000000000000e5
-2351 3 2 7 -0.32768000000000000000e5
-2351 3 2 12 0.65536000000000000000e5
-2351 3 2 15 0.65536000000000000000e5
-2351 3 3 32 0.13107200000000000000e6
-2351 3 4 9 -0.32768000000000000000e5
-2351 3 8 37 0.32768000000000000000e5
-2351 3 10 23 -0.65536000000000000000e5
-2351 3 13 42 0.13107200000000000000e6
-2351 3 22 35 0.13107200000000000000e6
-2351 3 28 41 0.19660800000000000000e6
-2351 3 29 42 0.65536000000000000000e5
-2351 4 2 6 -0.32768000000000000000e5
-2351 4 2 30 0.32768000000000000000e5
-2351 4 3 31 -0.65536000000000000000e5
-2351 4 6 18 -0.32768000000000000000e5
-2351 4 6 34 0.65536000000000000000e5
-2352 3 1 14 -0.65536000000000000000e5
-2352 3 2 13 0.65536000000000000000e5
-2353 2 4 10 0.65536000000000000000e5
-2353 2 7 21 -0.65536000000000000000e5
-2353 3 1 14 0.65536000000000000000e5
-2353 3 2 14 0.65536000000000000000e5
-2353 3 2 15 0.65536000000000000000e5
-2353 3 3 16 -0.13107200000000000000e6
-2354 1 2 17 -0.65536000000000000000e5
-2354 1 16 23 0.65536000000000000000e5
-2354 3 2 16 0.65536000000000000000e5
-2355 3 2 17 0.65536000000000000000e5
-2355 3 3 16 -0.65536000000000000000e5
-2356 1 3 18 -0.65536000000000000000e5
-2356 1 12 43 0.65536000000000000000e5
-2356 3 2 18 0.65536000000000000000e5
-2356 3 14 27 0.65536000000000000000e5
-2357 1 2 17 -0.32768000000000000000e5
-2357 1 3 34 -0.32768000000000000000e5
-2357 1 4 19 -0.65536000000000000000e5
-2357 1 4 35 -0.32768000000000000000e5
-2357 1 12 43 -0.65536000000000000000e5
-2357 1 14 45 -0.65536000000000000000e5
-2357 1 17 48 0.32768000000000000000e5
-2357 1 18 49 0.32768000000000000000e5
-2357 1 20 27 0.13107200000000000000e6
-2357 2 6 12 -0.32768000000000000000e5
-2357 2 9 23 -0.32768000000000000000e5
-2357 2 10 24 -0.65536000000000000000e5
-2357 2 14 28 0.32768000000000000000e5
-2357 3 2 19 0.65536000000000000000e5
-2357 3 4 17 0.32768000000000000000e5
-2357 3 5 34 -0.32768000000000000000e5
-2357 3 13 42 0.32768000000000000000e5
-2357 3 14 27 -0.65536000000000000000e5
-2357 3 14 43 0.32768000000000000000e5
-2357 4 2 14 0.32768000000000000000e5
-2358 1 3 18 -0.32768000000000000000e5
-2358 1 12 43 0.32768000000000000000e5
-2358 3 2 20 0.65536000000000000000e5
-2358 3 3 16 -0.32768000000000000000e5
-2358 3 4 17 -0.32768000000000000000e5
-2358 3 14 27 0.32768000000000000000e5
-2358 4 2 14 -0.32768000000000000000e5
-2359 3 2 21 0.65536000000000000000e5
-2359 3 7 20 -0.65536000000000000000e5
-2360 1 1 24 -0.65536000000000000000e5
-2360 1 1 40 -0.65536000000000000000e5
-2360 1 22 37 0.65536000000000000000e5
-2360 1 23 38 0.65536000000000000000e5
-2360 3 1 38 -0.65536000000000000000e5
-2360 3 2 22 0.65536000000000000000e5
-2360 3 22 27 0.13107200000000000000e6
-2360 4 16 16 -0.13107200000000000000e6
-2361 1 1 40 0.65536000000000000000e5
-2361 1 2 25 -0.65536000000000000000e5
-2361 3 2 24 0.65536000000000000000e5
-2362 1 2 25 0.65536000000000000000e5
-2362 1 2 33 -0.26214400000000000000e6
-2362 1 11 42 0.26214400000000000000e6
-2362 1 12 43 0.52428800000000000000e6
-2362 1 23 38 -0.65536000000000000000e5
-2362 1 28 43 -0.26214400000000000000e6
-2362 1 32 47 -0.26214400000000000000e6
-2362 1 33 48 -0.26214400000000000000e6
-2362 2 2 32 -0.65536000000000000000e5
-2362 2 3 17 0.65536000000000000000e5
-2362 2 12 26 -0.26214400000000000000e6
-2362 3 1 30 0.13107200000000000000e6
-2362 3 1 38 0.65536000000000000000e5
-2362 3 2 23 0.65536000000000000000e5
-2362 3 2 25 0.65536000000000000000e5
-2362 3 2 39 0.65536000000000000000e5
-2362 3 8 37 -0.13107200000000000000e6
-2362 3 10 23 0.13107200000000000000e6
-2362 3 13 42 -0.52428800000000000000e6
-2362 3 28 41 -0.26214400000000000000e6
-2362 3 29 42 -0.26214400000000000000e6
-2362 4 3 31 0.26214400000000000000e6
-2362 4 6 18 0.13107200000000000000e6
-2363 1 1 40 -0.65536000000000000000e5
-2363 1 2 33 0.26214400000000000000e6
-2363 1 11 42 -0.26214400000000000000e6
-2363 1 12 43 -0.52428800000000000000e6
-2363 1 23 38 0.65536000000000000000e5
-2363 1 28 43 0.26214400000000000000e6
-2363 1 32 47 0.26214400000000000000e6
-2363 1 33 48 0.26214400000000000000e6
-2363 2 2 32 0.65536000000000000000e5
-2363 2 3 17 -0.65536000000000000000e5
-2363 2 12 26 0.26214400000000000000e6
-2363 3 1 30 -0.26214400000000000000e6
-2363 3 1 38 -0.65536000000000000000e5
-2363 3 2 23 -0.65536000000000000000e5
-2363 3 2 26 0.65536000000000000000e5
-2363 3 2 39 -0.65536000000000000000e5
-2363 3 8 37 0.13107200000000000000e6
-2363 3 10 23 -0.13107200000000000000e6
-2363 3 13 42 0.52428800000000000000e6
-2363 3 28 41 0.26214400000000000000e6
-2363 3 29 42 0.26214400000000000000e6
-2363 4 3 31 -0.26214400000000000000e6
-2363 4 4 16 0.65536000000000000000e5
-2363 4 6 18 -0.13107200000000000000e6
-2364 1 7 38 0.65536000000000000000e5
-2364 1 8 23 -0.65536000000000000000e5
-2364 3 2 27 0.65536000000000000000e5
-2365 1 2 33 -0.13107200000000000000e6
-2365 1 11 42 0.13107200000000000000e6
-2365 1 12 43 0.26214400000000000000e6
-2365 1 28 43 -0.13107200000000000000e6
-2365 1 32 47 -0.13107200000000000000e6
-2365 1 33 48 -0.13107200000000000000e6
-2365 2 12 26 -0.13107200000000000000e6
-2365 3 1 30 0.65536000000000000000e5
-2365 3 2 28 0.65536000000000000000e5
-2365 3 10 23 0.65536000000000000000e5
-2365 3 13 42 -0.26214400000000000000e6
-2365 3 28 41 -0.13107200000000000000e6
-2365 3 29 42 -0.13107200000000000000e6
-2365 4 3 31 0.13107200000000000000e6
-2365 4 6 18 0.65536000000000000000e5
-2366 3 1 30 -0.65536000000000000000e5
-2366 3 2 29 0.65536000000000000000e5
-2367 3 2 30 0.65536000000000000000e5
-2367 3 10 23 -0.65536000000000000000e5
-2368 1 2 33 -0.65536000000000000000e5
-2368 1 11 42 0.65536000000000000000e5
-2368 1 12 43 0.13107200000000000000e6
-2368 1 28 43 -0.65536000000000000000e5
-2368 1 32 47 -0.65536000000000000000e5
-2368 1 33 48 -0.65536000000000000000e5
-2368 2 12 26 -0.65536000000000000000e5
-2368 3 2 32 0.65536000000000000000e5
-2368 3 13 42 -0.13107200000000000000e6
-2368 3 28 41 -0.65536000000000000000e5
-2368 3 29 42 -0.65536000000000000000e5
-2368 4 3 31 0.65536000000000000000e5
-2369 3 2 33 0.65536000000000000000e5
-2369 3 3 32 -0.65536000000000000000e5
-2370 1 3 34 -0.65536000000000000000e5
-2370 1 16 47 0.65536000000000000000e5
-2370 3 2 34 0.65536000000000000000e5
-2370 3 12 41 0.65536000000000000000e5
-2371 3 2 35 0.65536000000000000000e5
-2371 3 14 27 -0.65536000000000000000e5
-2372 1 3 18 0.32768000000000000000e5
-2372 1 4 19 -0.65536000000000000000e5
-2372 1 12 43 -0.32768000000000000000e5
-2372 1 13 44 0.65536000000000000000e5
-2372 3 2 36 0.65536000000000000000e5
-2372 3 3 16 0.32768000000000000000e5
-2372 3 4 17 0.32768000000000000000e5
-2372 3 14 27 -0.32768000000000000000e5
-2372 4 2 14 0.32768000000000000000e5
-2373 3 1 38 -0.65536000000000000000e5
-2373 3 2 37 0.65536000000000000000e5
-2374 1 1 40 -0.65536000000000000000e5
-2374 1 23 38 0.65536000000000000000e5
-2374 3 2 38 0.65536000000000000000e5
-2375 1 6 37 -0.65536000000000000000e5
-2375 1 24 39 0.65536000000000000000e5
-2375 3 2 40 0.65536000000000000000e5
-2376 3 2 41 0.65536000000000000000e5
-2376 3 8 37 -0.65536000000000000000e5
-2377 1 9 40 0.65536000000000000000e5
-2377 1 10 41 -0.13107200000000000000e6
-2377 1 26 41 -0.65536000000000000000e5
-2377 1 32 47 0.13107200000000000000e6
-2377 3 2 42 0.65536000000000000000e5
-2377 3 9 38 0.65536000000000000000e5
-2377 3 28 41 0.13107200000000000000e6
-2377 4 2 30 0.65536000000000000000e5
-2378 3 2 43 0.65536000000000000000e5
-2378 3 9 38 -0.65536000000000000000e5
-2379 1 11 42 -0.65536000000000000000e5
-2379 1 33 48 0.65536000000000000000e5
-2379 2 12 26 0.65536000000000000000e5
-2379 2 20 34 -0.65536000000000000000e5
-2379 3 2 44 0.65536000000000000000e5
-2379 3 13 42 0.13107200000000000000e6
-2379 3 22 35 -0.13107200000000000000e6
-2379 3 29 42 0.65536000000000000000e5
-2379 4 3 31 -0.65536000000000000000e5
-2379 4 6 34 -0.65536000000000000000e5
-2380 1 10 41 -0.65536000000000000000e5
-2380 1 32 47 0.65536000000000000000e5
-2380 3 2 45 0.65536000000000000000e5
-2380 3 28 41 0.65536000000000000000e5
-2381 3 2 46 0.65536000000000000000e5
-2381 3 22 35 -0.65536000000000000000e5
-2382 3 2 48 0.65536000000000000000e5
-2382 3 24 37 -0.65536000000000000000e5
-2383 1 6 53 -0.65536000000000000000e5
-2383 1 25 40 0.65536000000000000000e5
-2383 3 2 49 0.65536000000000000000e5
-2383 3 25 38 0.65536000000000000000e5
-2383 3 27 40 -0.13107200000000000000e6
-2383 4 4 32 0.65536000000000000000e5
-2384 1 6 53 0.32768000000000000000e5
-2384 1 25 40 -0.32768000000000000000e5
-2384 3 2 50 0.65536000000000000000e5
-2384 3 24 37 0.32768000000000000000e5
-2384 3 27 40 0.13107200000000000000e6
-2384 3 28 41 -0.13107200000000000000e6
-2384 4 4 32 -0.32768000000000000000e5
-2384 4 16 28 0.32768000000000000000e5
-2384 4 17 29 0.65536000000000000000e5
-2385 1 6 53 -0.32768000000000000000e5
-2385 1 25 40 0.32768000000000000000e5
-2385 3 2 51 0.65536000000000000000e5
-2385 3 24 37 -0.32768000000000000000e5
-2385 3 27 40 -0.65536000000000000000e5
-2385 4 4 32 0.32768000000000000000e5
-2385 4 16 28 -0.32768000000000000000e5
-2386 3 2 52 0.65536000000000000000e5
-2386 3 28 41 -0.65536000000000000000e5
-2387 1 2 49 -0.65536000000000000000e5
-2387 1 6 53 0.65536000000000000000e5
-2387 1 8 39 0.13107200000000000000e6
-2387 1 9 40 0.13107200000000000000e6
-2387 1 10 41 -0.26214400000000000000e6
-2387 1 22 53 -0.65536000000000000000e5
-2387 1 23 54 -0.65536000000000000000e5
-2387 1 24 55 -0.13107200000000000000e6
-2387 1 25 40 -0.65536000000000000000e5
-2387 1 37 52 0.26214400000000000000e6
-2387 2 26 32 -0.65536000000000000000e5
-2387 3 2 53 0.65536000000000000000e5
-2387 3 9 38 0.13107200000000000000e6
-2387 3 22 51 0.13107200000000000000e6
-2387 3 24 37 0.13107200000000000000e6
-2387 3 27 40 0.13107200000000000000e6
-2387 4 2 30 0.13107200000000000000e6
-2387 4 4 32 -0.65536000000000000000e5
-2387 4 16 28 0.65536000000000000000e5
-2387 4 17 29 0.13107200000000000000e6
-2387 4 20 32 0.13107200000000000000e6
-2388 1 6 53 0.65536000000000000000e5
-2388 1 23 54 0.65536000000000000000e5
-2388 1 24 39 -0.65536000000000000000e5
-2388 1 25 40 -0.65536000000000000000e5
-2388 3 2 54 0.65536000000000000000e5
-2388 3 25 38 -0.65536000000000000000e5
-2388 3 27 40 0.13107200000000000000e6
-2388 4 4 32 -0.65536000000000000000e5
-2389 3 2 55 0.65536000000000000000e5
-2389 3 22 51 -0.65536000000000000000e5
-2390 1 23 54 -0.65536000000000000000e5
-2390 1 38 53 0.65536000000000000000e5
-2390 3 2 56 0.65536000000000000000e5
-2391 1 2 5 -0.32768000000000000000e5
-2391 1 2 25 0.32768000000000000000e5
-2391 3 3 3 0.65536000000000000000e5
-2392 3 1 6 -0.65536000000000000000e5
-2392 3 3 4 0.65536000000000000000e5
-2393 1 1 48 -0.65536000000000000000e5
-2393 1 2 5 0.65536000000000000000e5
-2393 1 2 25 -0.65536000000000000000e5
-2393 1 2 49 -0.65536000000000000000e5
-2393 1 4 11 0.13107200000000000000e6
-2393 1 9 40 -0.13107200000000000000e6
-2393 1 12 43 0.52428800000000000000e6
-2393 1 23 38 -0.65536000000000000000e5
-2393 1 26 41 0.13107200000000000000e6
-2393 1 28 43 -0.26214400000000000000e6
-2393 1 32 47 -0.52428800000000000000e6
-2393 2 2 32 -0.65536000000000000000e5
-2393 2 3 9 0.13107200000000000000e6
-2393 2 16 30 -0.13107200000000000000e6
-2393 2 20 34 -0.26214400000000000000e6
-2393 3 1 6 0.65536000000000000000e5
-2393 3 1 30 0.13107200000000000000e6
-2393 3 2 15 -0.26214400000000000000e6
-2393 3 3 5 0.65536000000000000000e5
-2393 3 3 32 -0.26214400000000000000e6
-2393 3 4 9 0.13107200000000000000e6
-2393 3 10 23 0.13107200000000000000e6
-2393 3 22 35 -0.52428800000000000000e6
-2393 3 28 41 -0.52428800000000000000e6
-2393 4 1 5 0.65536000000000000000e5
-2393 4 2 30 -0.13107200000000000000e6
-2393 4 6 34 -0.26214400000000000000e6
-2394 3 3 6 0.65536000000000000000e5
-2394 3 4 5 -0.65536000000000000000e5
-2395 1 2 9 -0.65536000000000000000e5
-2395 1 8 23 0.65536000000000000000e5
-2395 3 3 7 0.65536000000000000000e5
-2396 1 1 48 0.65536000000000000000e5
-2396 1 2 9 0.65536000000000000000e5
-2396 1 2 33 0.26214400000000000000e6
-2396 1 2 49 0.65536000000000000000e5
-2396 1 3 34 -0.26214400000000000000e6
-2396 1 4 11 -0.65536000000000000000e5
-2396 1 8 39 0.65536000000000000000e5
-2396 1 9 40 0.65536000000000000000e5
-2396 1 10 41 0.13107200000000000000e6
-2396 1 11 42 -0.13107200000000000000e6
-2396 1 12 43 -0.52428800000000000000e6
-2396 1 23 38 0.65536000000000000000e5
-2396 1 26 41 -0.65536000000000000000e5
-2396 1 28 43 0.26214400000000000000e6
-2396 1 32 47 0.39321600000000000000e6
-2396 1 33 48 0.13107200000000000000e6
-2396 2 2 8 0.65536000000000000000e5
-2396 2 2 32 0.65536000000000000000e5
-2396 2 3 9 -0.65536000000000000000e5
-2396 2 7 21 0.13107200000000000000e6
-2396 2 12 26 0.13107200000000000000e6
-2396 2 16 30 0.65536000000000000000e5
-2396 2 20 34 0.13107200000000000000e6
-2396 3 1 14 -0.13107200000000000000e6
-2396 3 1 30 -0.65536000000000000000e5
-2396 3 2 15 0.13107200000000000000e6
-2396 3 3 8 0.65536000000000000000e5
-2396 3 3 32 0.26214400000000000000e6
-2396 3 4 9 -0.65536000000000000000e5
-2396 3 8 37 0.65536000000000000000e5
-2396 3 10 23 -0.13107200000000000000e6
-2396 3 13 42 0.26214400000000000000e6
-2396 3 22 35 0.26214400000000000000e6
-2396 3 28 41 0.39321600000000000000e6
-2396 3 29 42 0.13107200000000000000e6
-2396 4 2 30 0.65536000000000000000e5
-2396 4 3 31 -0.13107200000000000000e6
-2396 4 6 18 -0.65536000000000000000e5
-2396 4 6 34 0.13107200000000000000e6
-2397 1 1 48 -0.32768000000000000000e5
-2397 1 2 49 -0.32768000000000000000e5
-2397 1 4 11 0.65536000000000000000e5
-2397 1 9 40 -0.65536000000000000000e5
-2397 1 12 43 0.26214400000000000000e6
-2397 1 23 38 -0.32768000000000000000e5
-2397 1 26 41 0.65536000000000000000e5
-2397 1 28 43 -0.13107200000000000000e6
-2397 1 32 47 -0.26214400000000000000e6
-2397 2 2 32 -0.32768000000000000000e5
-2397 2 3 9 0.65536000000000000000e5
-2397 2 16 30 -0.65536000000000000000e5
-2397 2 20 34 -0.13107200000000000000e6
-2397 3 1 30 0.65536000000000000000e5
-2397 3 2 15 -0.13107200000000000000e6
-2397 3 3 9 0.65536000000000000000e5
-2397 3 3 32 -0.13107200000000000000e6
-2397 3 4 9 0.65536000000000000000e5
-2397 3 10 23 0.65536000000000000000e5
-2397 3 22 35 -0.26214400000000000000e6
-2397 3 28 41 -0.26214400000000000000e6
-2397 4 2 30 -0.65536000000000000000e5
-2397 4 6 34 -0.13107200000000000000e6
-2398 3 3 10 0.65536000000000000000e5
-2398 3 4 9 -0.65536000000000000000e5
-2399 1 4 11 -0.65536000000000000000e5
-2399 1 10 25 0.65536000000000000000e5
-2399 3 3 11 0.65536000000000000000e5
-2400 3 1 14 -0.65536000000000000000e5
-2400 3 3 12 0.65536000000000000000e5
-2401 2 4 10 0.65536000000000000000e5
-2401 2 7 21 -0.65536000000000000000e5
-2401 3 1 14 0.65536000000000000000e5
-2401 3 2 15 0.65536000000000000000e5
-2401 3 3 13 0.65536000000000000000e5
-2401 3 3 16 -0.13107200000000000000e6
-2402 3 2 15 -0.65536000000000000000e5
-2402 3 3 14 0.65536000000000000000e5
-2403 1 2 33 -0.65536000000000000000e5
-2403 1 6 13 -0.65536000000000000000e5
-2403 1 10 41 -0.65536000000000000000e5
-2403 1 12 43 0.13107200000000000000e6
-2403 2 12 26 -0.65536000000000000000e5
-2403 3 3 15 0.65536000000000000000e5
-2403 3 3 32 -0.65536000000000000000e5
-2403 3 14 27 0.13107200000000000000e6
-2403 4 8 20 -0.65536000000000000000e5
-2404 1 3 18 -0.65536000000000000000e5
-2404 1 12 43 0.65536000000000000000e5
-2404 3 3 17 0.65536000000000000000e5
-2404 3 14 27 0.65536000000000000000e5
-2405 3 3 18 0.65536000000000000000e5
-2405 3 4 17 -0.65536000000000000000e5
-2406 1 3 18 -0.32768000000000000000e5
-2406 1 12 43 0.32768000000000000000e5
-2406 3 3 16 -0.32768000000000000000e5
-2406 3 3 19 0.65536000000000000000e5
-2406 3 4 17 -0.32768000000000000000e5
-2406 3 14 27 0.32768000000000000000e5
-2406 4 2 14 -0.32768000000000000000e5
-2407 1 4 35 0.32768000000000000000e5
-2407 1 10 17 -0.65536000000000000000e5
-2407 1 12 43 0.32768000000000000000e5
-2407 1 14 45 0.65536000000000000000e5
-2407 1 17 48 -0.32768000000000000000e5
-2407 1 18 49 -0.32768000000000000000e5
-2407 2 9 23 0.32768000000000000000e5
-2407 2 14 28 -0.32768000000000000000e5
-2407 3 3 20 0.65536000000000000000e5
-2407 3 5 34 0.32768000000000000000e5
-2407 3 13 42 -0.32768000000000000000e5
-2407 3 14 27 0.32768000000000000000e5
-2407 3 14 43 -0.32768000000000000000e5
-2408 1 3 18 -0.16384000000000000000e5
-2408 1 4 35 0.16384000000000000000e5
-2408 1 5 20 -0.32768000000000000000e5
-2408 1 5 36 0.32768000000000000000e5
-2408 1 10 17 -0.32768000000000000000e5
-2408 1 12 43 0.32768000000000000000e5
-2408 1 14 45 0.32768000000000000000e5
-2408 1 17 48 -0.16384000000000000000e5
-2408 1 18 49 -0.16384000000000000000e5
-2408 2 9 23 0.16384000000000000000e5
-2408 2 14 28 -0.16384000000000000000e5
-2408 3 3 16 -0.16384000000000000000e5
-2408 3 3 21 0.65536000000000000000e5
-2408 3 4 17 -0.16384000000000000000e5
-2408 3 5 34 0.16384000000000000000e5
-2408 3 13 42 -0.16384000000000000000e5
-2408 3 14 27 0.32768000000000000000e5
-2408 3 14 43 -0.16384000000000000000e5
-2408 4 2 14 -0.16384000000000000000e5
-2408 4 3 15 -0.32768000000000000000e5
-2409 3 2 23 -0.65536000000000000000e5
-2409 3 3 22 0.65536000000000000000e5
-2410 1 1 40 0.65536000000000000000e5
-2410 1 2 25 -0.65536000000000000000e5
-2410 3 3 23 0.65536000000000000000e5
-2411 1 2 25 0.65536000000000000000e5
-2411 1 2 33 -0.26214400000000000000e6
-2411 1 11 42 0.26214400000000000000e6
-2411 1 12 43 0.52428800000000000000e6
-2411 1 23 38 -0.65536000000000000000e5
-2411 1 28 43 -0.26214400000000000000e6
-2411 1 32 47 -0.26214400000000000000e6
-2411 1 33 48 -0.26214400000000000000e6
-2411 2 2 32 -0.65536000000000000000e5
-2411 2 3 17 0.65536000000000000000e5
-2411 2 12 26 -0.26214400000000000000e6
-2411 3 1 30 0.13107200000000000000e6
-2411 3 1 38 0.65536000000000000000e5
-2411 3 2 23 0.65536000000000000000e5
-2411 3 2 39 0.65536000000000000000e5
-2411 3 3 24 0.65536000000000000000e5
-2411 3 8 37 -0.13107200000000000000e6
-2411 3 10 23 0.13107200000000000000e6
-2411 3 13 42 -0.52428800000000000000e6
-2411 3 28 41 -0.26214400000000000000e6
-2411 3 29 42 -0.26214400000000000000e6
-2411 4 3 31 0.26214400000000000000e6
-2411 4 6 18 0.13107200000000000000e6
-2412 1 1 40 -0.65536000000000000000e5
-2412 1 2 33 0.26214400000000000000e6
-2412 1 11 42 -0.26214400000000000000e6
-2412 1 12 43 -0.52428800000000000000e6
-2412 1 23 38 0.65536000000000000000e5
-2412 1 28 43 0.26214400000000000000e6
-2412 1 32 47 0.26214400000000000000e6
-2412 1 33 48 0.26214400000000000000e6
-2412 2 2 32 0.65536000000000000000e5
-2412 2 3 17 -0.65536000000000000000e5
-2412 2 12 26 0.26214400000000000000e6
-2412 3 1 30 -0.26214400000000000000e6
-2412 3 1 38 -0.65536000000000000000e5
-2412 3 2 23 -0.65536000000000000000e5
-2412 3 2 39 -0.65536000000000000000e5
-2412 3 3 25 0.65536000000000000000e5
-2412 3 8 37 0.13107200000000000000e6
-2412 3 10 23 -0.13107200000000000000e6
-2412 3 13 42 0.52428800000000000000e6
-2412 3 28 41 0.26214400000000000000e6
-2412 3 29 42 0.26214400000000000000e6
-2412 4 3 31 -0.26214400000000000000e6
-2412 4 4 16 0.65536000000000000000e5
-2412 4 6 18 -0.13107200000000000000e6
-2413 1 1 40 0.65536000000000000000e5
-2413 1 2 25 -0.65536000000000000000e5
-2413 1 6 37 0.65536000000000000000e5
-2413 1 24 39 -0.65536000000000000000e5
-2413 2 3 33 -0.65536000000000000000e5
-2413 2 4 18 0.65536000000000000000e5
-2413 3 1 30 0.13107200000000000000e6
-2413 3 2 39 0.65536000000000000000e5
-2413 3 3 26 0.65536000000000000000e5
-2413 3 3 40 0.65536000000000000000e5
-2413 3 9 38 -0.13107200000000000000e6
-2413 3 10 23 -0.13107200000000000000e6
-2413 4 4 16 -0.65536000000000000000e5
-2414 1 2 33 -0.13107200000000000000e6
-2414 1 11 42 0.13107200000000000000e6
-2414 1 12 43 0.26214400000000000000e6
-2414 1 28 43 -0.13107200000000000000e6
-2414 1 32 47 -0.13107200000000000000e6
-2414 1 33 48 -0.13107200000000000000e6
-2414 2 12 26 -0.13107200000000000000e6
-2414 3 1 30 0.65536000000000000000e5
-2414 3 3 27 0.65536000000000000000e5
-2414 3 10 23 0.65536000000000000000e5
-2414 3 13 42 -0.26214400000000000000e6
-2414 3 28 41 -0.13107200000000000000e6
-2414 3 29 42 -0.13107200000000000000e6
-2414 4 3 31 0.13107200000000000000e6
-2414 4 6 18 0.65536000000000000000e5
-2415 3 1 30 -0.65536000000000000000e5
-2415 3 3 28 0.65536000000000000000e5
-2416 3 3 29 0.65536000000000000000e5
-2416 3 10 23 -0.65536000000000000000e5
-2417 1 9 40 0.65536000000000000000e5
-2417 1 10 25 -0.65536000000000000000e5
-2417 3 3 30 0.65536000000000000000e5
-2418 1 2 33 -0.65536000000000000000e5
-2418 1 11 42 0.65536000000000000000e5
-2418 1 12 43 0.13107200000000000000e6
-2418 1 28 43 -0.65536000000000000000e5
-2418 1 32 47 -0.65536000000000000000e5
-2418 1 33 48 -0.65536000000000000000e5
-2418 2 12 26 -0.65536000000000000000e5
-2418 3 3 31 0.65536000000000000000e5
-2418 3 13 42 -0.13107200000000000000e6
-2418 3 28 41 -0.65536000000000000000e5
-2418 3 29 42 -0.65536000000000000000e5
-2418 4 3 31 0.65536000000000000000e5
-2419 1 2 33 0.65536000000000000000e5
-2419 1 11 42 -0.65536000000000000000e5
-2419 1 12 43 -0.13107200000000000000e6
-2419 1 28 43 0.65536000000000000000e5
-2419 1 32 47 0.65536000000000000000e5
-2419 1 33 48 0.65536000000000000000e5
-2419 2 12 26 0.65536000000000000000e5
-2419 3 3 32 0.65536000000000000000e5
-2419 3 3 33 0.65536000000000000000e5
-2419 3 13 42 0.13107200000000000000e6
-2419 3 14 27 -0.13107200000000000000e6
-2419 3 28 41 0.65536000000000000000e5
-2419 3 29 42 0.65536000000000000000e5
-2419 4 3 31 -0.65536000000000000000e5
-2419 4 8 20 0.65536000000000000000e5
-2420 3 3 34 0.65536000000000000000e5
-2420 3 14 27 -0.65536000000000000000e5
-2421 1 4 35 -0.65536000000000000000e5
-2421 1 17 48 0.65536000000000000000e5
-2421 3 3 35 0.65536000000000000000e5
-2421 3 13 42 0.65536000000000000000e5
-2422 3 3 36 0.65536000000000000000e5
-2422 3 16 29 -0.65536000000000000000e5
-2423 1 1 40 -0.65536000000000000000e5
-2423 1 23 38 0.65536000000000000000e5
-2423 3 3 37 0.65536000000000000000e5
-2424 3 2 39 -0.65536000000000000000e5
-2424 3 3 38 0.65536000000000000000e5
-2425 1 6 37 -0.65536000000000000000e5
-2425 1 24 39 0.65536000000000000000e5
-2425 3 3 39 0.65536000000000000000e5
-2426 1 9 40 0.65536000000000000000e5
-2426 1 10 41 -0.13107200000000000000e6
-2426 1 26 41 -0.65536000000000000000e5
-2426 1 32 47 0.13107200000000000000e6
-2426 3 3 41 0.65536000000000000000e5
-2426 3 9 38 0.65536000000000000000e5
-2426 3 28 41 0.13107200000000000000e6
-2426 4 2 30 0.65536000000000000000e5
-2427 3 3 42 0.65536000000000000000e5
-2427 3 9 38 -0.65536000000000000000e5
-2428 1 9 40 -0.65536000000000000000e5
-2428 1 26 41 0.65536000000000000000e5
-2428 3 3 43 0.65536000000000000000e5
-2429 1 10 41 -0.65536000000000000000e5
-2429 1 32 47 0.65536000000000000000e5
-2429 3 3 44 0.65536000000000000000e5
-2429 3 28 41 0.65536000000000000000e5
-2430 1 10 41 0.65536000000000000000e5
-2430 1 11 42 0.65536000000000000000e5
-2430 1 32 47 -0.65536000000000000000e5
-2430 1 33 48 -0.65536000000000000000e5
-2430 3 3 45 0.65536000000000000000e5
-2430 3 13 42 -0.13107200000000000000e6
-2430 3 28 41 -0.65536000000000000000e5
-2430 3 29 42 -0.65536000000000000000e5
-2430 4 3 31 0.65536000000000000000e5
-2431 3 3 46 0.65536000000000000000e5
-2431 3 13 42 -0.65536000000000000000e5
-2432 3 3 47 0.65536000000000000000e5
-2432 3 24 37 -0.65536000000000000000e5
-2433 1 6 53 -0.65536000000000000000e5
-2433 1 25 40 0.65536000000000000000e5
-2433 3 3 48 0.65536000000000000000e5
-2433 3 25 38 0.65536000000000000000e5
-2433 3 27 40 -0.13107200000000000000e6
-2433 4 4 32 0.65536000000000000000e5
-2434 3 3 49 0.65536000000000000000e5
-2434 3 25 38 -0.65536000000000000000e5
-2435 1 6 53 -0.32768000000000000000e5
-2435 1 25 40 0.32768000000000000000e5
-2435 3 3 50 0.65536000000000000000e5
-2435 3 24 37 -0.32768000000000000000e5
-2435 3 27 40 -0.65536000000000000000e5
-2435 4 4 32 0.32768000000000000000e5
-2435 4 16 28 -0.32768000000000000000e5
-2436 3 3 51 0.65536000000000000000e5
-2436 3 27 40 -0.65536000000000000000e5
-2437 1 6 53 -0.16384000000000000000e5
-2437 1 25 40 0.16384000000000000000e5
-2437 2 4 34 -0.32768000000000000000e5
-2437 2 21 35 0.32768000000000000000e5
-2437 3 3 52 0.65536000000000000000e5
-2437 3 5 50 -0.32768000000000000000e5
-2437 3 24 37 -0.16384000000000000000e5
-2437 3 27 40 -0.65536000000000000000e5
-2437 4 4 32 0.16384000000000000000e5
-2437 4 7 35 0.32768000000000000000e5
-2437 4 16 28 -0.16384000000000000000e5
-2438 1 6 53 0.65536000000000000000e5
-2438 1 23 54 0.65536000000000000000e5
-2438 1 24 39 -0.65536000000000000000e5
-2438 1 25 40 -0.65536000000000000000e5
-2438 3 3 53 0.65536000000000000000e5
-2438 3 25 38 -0.65536000000000000000e5
-2438 3 27 40 0.13107200000000000000e6
-2438 4 4 32 -0.65536000000000000000e5
-2439 1 1 48 0.65536000000000000000e5
-2439 1 2 49 0.13107200000000000000e6
-2439 1 8 39 0.13107200000000000000e6
-2439 1 9 40 0.13107200000000000000e6
-2439 1 10 41 -0.26214400000000000000e6
-2439 1 12 43 -0.52428800000000000000e6
-2439 1 23 38 0.65536000000000000000e5
-2439 1 24 39 0.65536000000000000000e5
-2439 1 26 41 -0.13107200000000000000e6
-2439 1 28 43 0.26214400000000000000e6
-2439 1 32 47 0.52428800000000000000e6
-2439 1 40 47 0.65536000000000000000e5
-2439 2 2 32 0.65536000000000000000e5
-2439 2 3 33 0.65536000000000000000e5
-2439 2 16 30 0.13107200000000000000e6
-2439 2 20 34 0.26214400000000000000e6
-2439 3 3 54 0.65536000000000000000e5
-2439 3 9 38 0.13107200000000000000e6
-2439 3 22 35 0.52428800000000000000e6
-2439 3 25 38 0.65536000000000000000e5
-2439 3 28 41 0.52428800000000000000e6
-2439 4 2 30 0.13107200000000000000e6
-2439 4 6 34 0.26214400000000000000e6
-2440 1 24 55 0.65536000000000000000e5
-2440 1 26 41 -0.65536000000000000000e5
-2440 3 3 55 0.65536000000000000000e5
-2440 3 27 40 0.65536000000000000000e5
-2441 3 3 56 0.65536000000000000000e5
-2441 3 24 53 -0.65536000000000000000e5
-2442 1 1 48 -0.32768000000000000000e5
-2442 1 2 5 0.32768000000000000000e5
-2442 1 2 25 -0.32768000000000000000e5
-2442 1 2 49 -0.32768000000000000000e5
-2442 1 4 11 0.65536000000000000000e5
-2442 1 9 40 -0.65536000000000000000e5
-2442 1 12 43 0.26214400000000000000e6
-2442 1 23 38 -0.32768000000000000000e5
-2442 1 26 41 0.65536000000000000000e5
-2442 1 28 43 -0.13107200000000000000e6
-2442 1 32 47 -0.26214400000000000000e6
-2442 2 2 32 -0.32768000000000000000e5
-2442 2 3 9 0.65536000000000000000e5
-2442 2 16 30 -0.65536000000000000000e5
-2442 2 20 34 -0.13107200000000000000e6
-2442 3 1 6 0.32768000000000000000e5
-2442 3 1 30 0.65536000000000000000e5
-2442 3 2 15 -0.13107200000000000000e6
-2442 3 3 32 -0.13107200000000000000e6
-2442 3 4 4 0.65536000000000000000e5
-2442 3 4 9 0.65536000000000000000e5
-2442 3 10 23 0.65536000000000000000e5
-2442 3 22 35 -0.26214400000000000000e6
-2442 3 28 41 -0.26214400000000000000e6
-2442 4 1 5 0.32768000000000000000e5
-2442 4 2 30 -0.65536000000000000000e5
-2442 4 6 34 -0.13107200000000000000e6
-2443 1 1 48 0.65536000000000000000e5
-2443 1 2 5 -0.65536000000000000000e5
-2443 1 2 25 0.65536000000000000000e5
-2443 1 2 49 0.65536000000000000000e5
-2443 1 4 11 -0.26214400000000000000e6
-2443 1 9 40 0.13107200000000000000e6
-2443 1 10 25 0.13107200000000000000e6
-2443 1 12 43 -0.52428800000000000000e6
-2443 1 23 38 0.65536000000000000000e5
-2443 1 26 41 -0.13107200000000000000e6
-2443 1 28 43 0.26214400000000000000e6
-2443 1 32 47 0.52428800000000000000e6
-2443 2 2 32 0.65536000000000000000e5
-2443 2 3 9 -0.13107200000000000000e6
-2443 2 16 30 0.13107200000000000000e6
-2443 2 20 34 0.26214400000000000000e6
-2443 3 1 6 -0.65536000000000000000e5
-2443 3 1 30 -0.13107200000000000000e6
-2443 3 2 15 0.26214400000000000000e6
-2443 3 3 32 0.26214400000000000000e6
-2443 3 4 5 0.65536000000000000000e5
-2443 3 4 6 0.65536000000000000000e5
-2443 3 4 9 -0.13107200000000000000e6
-2443 3 10 23 -0.13107200000000000000e6
-2443 3 22 35 0.52428800000000000000e6
-2443 3 28 41 0.52428800000000000000e6
-2443 4 1 5 -0.65536000000000000000e5
-2443 4 2 30 0.13107200000000000000e6
-2443 4 4 4 0.13107200000000000000e6
-2443 4 6 34 0.26214400000000000000e6
-2444 1 1 48 0.65536000000000000000e5
-2444 1 2 9 0.65536000000000000000e5
-2444 1 2 33 0.26214400000000000000e6
-2444 1 2 49 0.65536000000000000000e5
-2444 1 3 34 -0.26214400000000000000e6
-2444 1 4 11 -0.65536000000000000000e5
-2444 1 8 39 0.65536000000000000000e5
-2444 1 9 40 0.65536000000000000000e5
-2444 1 10 41 0.13107200000000000000e6
-2444 1 11 42 -0.13107200000000000000e6
-2444 1 12 43 -0.52428800000000000000e6
-2444 1 23 38 0.65536000000000000000e5
-2444 1 26 41 -0.65536000000000000000e5
-2444 1 28 43 0.26214400000000000000e6
-2444 1 32 47 0.39321600000000000000e6
-2444 1 33 48 0.13107200000000000000e6
-2444 2 2 8 0.65536000000000000000e5
-2444 2 2 32 0.65536000000000000000e5
-2444 2 3 9 -0.65536000000000000000e5
-2444 2 7 21 0.13107200000000000000e6
-2444 2 12 26 0.13107200000000000000e6
-2444 2 16 30 0.65536000000000000000e5
-2444 2 20 34 0.13107200000000000000e6
-2444 3 1 14 -0.13107200000000000000e6
-2444 3 1 30 -0.65536000000000000000e5
-2444 3 2 15 0.13107200000000000000e6
-2444 3 3 32 0.26214400000000000000e6
-2444 3 4 7 0.65536000000000000000e5
-2444 3 4 9 -0.65536000000000000000e5
-2444 3 8 37 0.65536000000000000000e5
-2444 3 10 23 -0.13107200000000000000e6
-2444 3 13 42 0.26214400000000000000e6
-2444 3 22 35 0.26214400000000000000e6
-2444 3 28 41 0.39321600000000000000e6
-2444 3 29 42 0.13107200000000000000e6
-2444 4 2 30 0.65536000000000000000e5
-2444 4 3 31 -0.13107200000000000000e6
-2444 4 6 18 -0.65536000000000000000e5
-2444 4 6 34 0.13107200000000000000e6
-2445 1 1 48 -0.32768000000000000000e5
-2445 1 2 49 -0.32768000000000000000e5
-2445 1 4 11 0.65536000000000000000e5
-2445 1 9 40 -0.65536000000000000000e5
-2445 1 12 43 0.26214400000000000000e6
-2445 1 23 38 -0.32768000000000000000e5
-2445 1 26 41 0.65536000000000000000e5
-2445 1 28 43 -0.13107200000000000000e6
-2445 1 32 47 -0.26214400000000000000e6
-2445 2 2 32 -0.32768000000000000000e5
-2445 2 3 9 0.65536000000000000000e5
-2445 2 16 30 -0.65536000000000000000e5
-2445 2 20 34 -0.13107200000000000000e6
-2445 3 1 30 0.65536000000000000000e5
-2445 3 2 15 -0.13107200000000000000e6
-2445 3 3 32 -0.13107200000000000000e6
-2445 3 4 8 0.65536000000000000000e5
-2445 3 4 9 0.65536000000000000000e5
-2445 3 10 23 0.65536000000000000000e5
-2445 3 22 35 -0.26214400000000000000e6
-2445 3 28 41 -0.26214400000000000000e6
-2445 4 2 30 -0.65536000000000000000e5
-2445 4 6 34 -0.13107200000000000000e6
-2446 1 4 11 -0.65536000000000000000e5
-2446 1 10 25 0.65536000000000000000e5
-2446 3 4 10 0.65536000000000000000e5
-2447 1 2 33 -0.13107200000000000000e6
-2447 1 4 11 0.65536000000000000000e5
-2447 1 6 13 -0.13107200000000000000e6
-2447 1 10 25 -0.65536000000000000000e5
-2447 1 10 41 -0.13107200000000000000e6
-2447 1 12 43 0.26214400000000000000e6
-2447 2 12 26 -0.13107200000000000000e6
-2447 3 3 32 -0.13107200000000000000e6
-2447 3 4 9 0.65536000000000000000e5
-2447 3 4 11 0.65536000000000000000e5
-2447 3 14 27 0.26214400000000000000e6
-2447 4 4 8 0.65536000000000000000e5
-2447 4 8 20 -0.13107200000000000000e6
-2448 2 4 10 0.65536000000000000000e5
-2448 2 7 21 -0.65536000000000000000e5
-2448 3 1 14 0.65536000000000000000e5
-2448 3 2 15 0.65536000000000000000e5
-2448 3 3 16 -0.13107200000000000000e6
-2448 3 4 12 0.65536000000000000000e5
-2449 3 2 15 -0.65536000000000000000e5
-2449 3 4 13 0.65536000000000000000e5
-2450 1 2 33 -0.65536000000000000000e5
-2450 1 6 13 -0.65536000000000000000e5
-2450 1 10 41 -0.65536000000000000000e5
-2450 1 12 43 0.13107200000000000000e6
-2450 2 12 26 -0.65536000000000000000e5
-2450 3 3 32 -0.65536000000000000000e5
-2450 3 4 14 0.65536000000000000000e5
-2450 3 14 27 0.13107200000000000000e6
-2450 4 8 20 -0.65536000000000000000e5
-2451 1 4 35 -0.13107200000000000000e6
-2451 1 6 13 0.65536000000000000000e5
-2451 1 10 41 0.65536000000000000000e5
-2451 1 11 42 0.65536000000000000000e5
-2451 2 5 11 0.65536000000000000000e5
-2451 3 2 15 0.65536000000000000000e5
-2451 3 3 32 0.65536000000000000000e5
-2451 3 4 15 0.65536000000000000000e5
-2451 3 4 17 -0.13107200000000000000e6
-2451 3 4 33 0.65536000000000000000e5
-2452 1 3 18 -0.65536000000000000000e5
-2452 1 12 43 0.65536000000000000000e5
-2452 3 4 16 0.65536000000000000000e5
-2452 3 14 27 0.65536000000000000000e5
-2453 1 5 20 -0.13107200000000000000e6
-2453 1 5 36 0.13107200000000000000e6
-2453 3 4 17 0.65536000000000000000e5
-2453 3 4 18 0.65536000000000000000e5
-2453 3 5 18 0.65536000000000000000e5
-2453 4 8 12 0.65536000000000000000e5
-2454 1 4 35 0.32768000000000000000e5
-2454 1 10 17 -0.65536000000000000000e5
-2454 1 12 43 0.32768000000000000000e5
-2454 1 14 45 0.65536000000000000000e5
-2454 1 17 48 -0.32768000000000000000e5
-2454 1 18 49 -0.32768000000000000000e5
-2454 2 9 23 0.32768000000000000000e5
-2454 2 14 28 -0.32768000000000000000e5
-2454 3 4 19 0.65536000000000000000e5
-2454 3 5 34 0.32768000000000000000e5
-2454 3 13 42 -0.32768000000000000000e5
-2454 3 14 27 0.32768000000000000000e5
-2454 3 14 43 -0.32768000000000000000e5
-2455 1 5 20 -0.65536000000000000000e5
-2455 1 5 36 0.65536000000000000000e5
-2455 3 4 20 0.65536000000000000000e5
-2456 1 3 18 0.16384000000000000000e5
-2456 1 4 35 -0.16384000000000000000e5
-2456 1 5 20 0.32768000000000000000e5
-2456 1 5 36 -0.32768000000000000000e5
-2456 1 10 17 0.32768000000000000000e5
-2456 1 12 43 -0.32768000000000000000e5
-2456 1 14 45 -0.32768000000000000000e5
-2456 1 17 48 0.16384000000000000000e5
-2456 1 18 49 0.16384000000000000000e5
-2456 2 9 23 -0.16384000000000000000e5
-2456 2 14 28 0.16384000000000000000e5
-2456 3 3 16 0.16384000000000000000e5
-2456 3 4 17 0.16384000000000000000e5
-2456 3 4 21 0.65536000000000000000e5
-2456 3 5 34 -0.16384000000000000000e5
-2456 3 7 20 0.65536000000000000000e5
-2456 3 8 21 -0.13107200000000000000e6
-2456 3 13 42 0.16384000000000000000e5
-2456 3 14 27 -0.32768000000000000000e5
-2456 3 14 43 0.16384000000000000000e5
-2456 4 2 14 0.16384000000000000000e5
-2456 4 3 15 0.32768000000000000000e5
-2456 4 10 14 0.65536000000000000000e5
-2457 1 1 40 0.65536000000000000000e5
-2457 1 2 25 -0.65536000000000000000e5
-2457 3 4 22 0.65536000000000000000e5
-2458 1 2 25 0.65536000000000000000e5
-2458 1 2 33 -0.26214400000000000000e6
-2458 1 11 42 0.26214400000000000000e6
-2458 1 12 43 0.52428800000000000000e6
-2458 1 23 38 -0.65536000000000000000e5
-2458 1 28 43 -0.26214400000000000000e6
-2458 1 32 47 -0.26214400000000000000e6
-2458 1 33 48 -0.26214400000000000000e6
-2458 2 2 32 -0.65536000000000000000e5
-2458 2 3 17 0.65536000000000000000e5
-2458 2 12 26 -0.26214400000000000000e6
-2458 3 1 30 0.13107200000000000000e6
-2458 3 1 38 0.65536000000000000000e5
-2458 3 2 23 0.65536000000000000000e5
-2458 3 2 39 0.65536000000000000000e5
-2458 3 4 23 0.65536000000000000000e5
-2458 3 8 37 -0.13107200000000000000e6
-2458 3 10 23 0.13107200000000000000e6
-2458 3 13 42 -0.52428800000000000000e6
-2458 3 28 41 -0.26214400000000000000e6
-2458 3 29 42 -0.26214400000000000000e6
-2458 4 3 31 0.26214400000000000000e6
-2458 4 6 18 0.13107200000000000000e6
-2459 1 1 40 -0.65536000000000000000e5
-2459 1 2 33 0.26214400000000000000e6
-2459 1 11 42 -0.26214400000000000000e6
-2459 1 12 43 -0.52428800000000000000e6
-2459 1 23 38 0.65536000000000000000e5
-2459 1 28 43 0.26214400000000000000e6
-2459 1 32 47 0.26214400000000000000e6
-2459 1 33 48 0.26214400000000000000e6
-2459 2 2 32 0.65536000000000000000e5
-2459 2 3 17 -0.65536000000000000000e5
-2459 2 12 26 0.26214400000000000000e6
-2459 3 1 30 -0.26214400000000000000e6
-2459 3 1 38 -0.65536000000000000000e5
-2459 3 2 23 -0.65536000000000000000e5
-2459 3 2 39 -0.65536000000000000000e5
-2459 3 4 24 0.65536000000000000000e5
-2459 3 8 37 0.13107200000000000000e6
-2459 3 10 23 -0.13107200000000000000e6
-2459 3 13 42 0.52428800000000000000e6
-2459 3 28 41 0.26214400000000000000e6
-2459 3 29 42 0.26214400000000000000e6
-2459 4 3 31 -0.26214400000000000000e6
-2459 4 4 16 0.65536000000000000000e5
-2459 4 6 18 -0.13107200000000000000e6
-2460 1 1 40 0.65536000000000000000e5
-2460 1 2 25 -0.65536000000000000000e5
-2460 1 6 37 0.65536000000000000000e5
-2460 1 24 39 -0.65536000000000000000e5
-2460 2 3 33 -0.65536000000000000000e5
-2460 2 4 18 0.65536000000000000000e5
-2460 3 1 30 0.13107200000000000000e6
-2460 3 2 39 0.65536000000000000000e5
-2460 3 3 40 0.65536000000000000000e5
-2460 3 4 25 0.65536000000000000000e5
-2460 3 9 38 -0.13107200000000000000e6
-2460 3 10 23 -0.13107200000000000000e6
-2460 4 4 16 -0.65536000000000000000e5
-2461 1 2 25 0.65536000000000000000e5
-2461 1 2 33 -0.26214400000000000000e6
-2461 1 6 37 -0.65536000000000000000e5
-2461 1 9 40 0.13107200000000000000e6
-2461 1 10 25 -0.13107200000000000000e6
-2461 1 11 42 0.26214400000000000000e6
-2461 1 12 43 0.52428800000000000000e6
-2461 1 23 38 -0.65536000000000000000e5
-2461 1 24 39 0.65536000000000000000e5
-2461 1 28 43 -0.26214400000000000000e6
-2461 1 32 47 -0.26214400000000000000e6
-2461 1 33 48 -0.26214400000000000000e6
-2461 2 2 32 -0.65536000000000000000e5
-2461 2 3 17 0.65536000000000000000e5
-2461 2 3 33 0.65536000000000000000e5
-2461 2 4 18 -0.65536000000000000000e5
-2461 2 12 26 -0.26214400000000000000e6
-2461 3 1 30 0.13107200000000000000e6
-2461 3 1 38 0.65536000000000000000e5
-2461 3 2 23 0.65536000000000000000e5
-2461 3 3 40 -0.65536000000000000000e5
-2461 3 4 26 0.65536000000000000000e5
-2461 3 8 37 -0.13107200000000000000e6
-2461 3 9 38 0.13107200000000000000e6
-2461 3 10 23 0.26214400000000000000e6
-2461 3 13 42 -0.52428800000000000000e6
-2461 3 28 41 -0.26214400000000000000e6
-2461 3 29 42 -0.26214400000000000000e6
-2461 4 3 31 0.26214400000000000000e6
-2461 4 5 17 0.65536000000000000000e5
-2461 4 6 18 0.13107200000000000000e6
-2462 3 1 30 -0.65536000000000000000e5
-2462 3 4 27 0.65536000000000000000e5
-2463 3 4 28 0.65536000000000000000e5
-2463 3 10 23 -0.65536000000000000000e5
-2464 1 9 40 0.65536000000000000000e5
-2464 1 10 25 -0.65536000000000000000e5
-2464 3 4 29 0.65536000000000000000e5
-2465 1 2 33 0.13107200000000000000e6
-2465 1 9 40 -0.65536000000000000000e5
-2465 1 10 25 0.65536000000000000000e5
-2465 1 11 42 -0.13107200000000000000e6
-2465 1 12 43 -0.26214400000000000000e6
-2465 1 28 43 0.13107200000000000000e6
-2465 1 32 47 0.13107200000000000000e6
-2465 1 33 48 0.13107200000000000000e6
-2465 2 12 26 0.13107200000000000000e6
-2465 3 3 32 0.13107200000000000000e6
-2465 3 4 30 0.65536000000000000000e5
-2465 3 10 23 0.65536000000000000000e5
-2465 3 13 42 0.26214400000000000000e6
-2465 3 14 27 -0.26214400000000000000e6
-2465 3 28 41 0.13107200000000000000e6
-2465 3 29 42 0.13107200000000000000e6
-2465 4 3 31 -0.13107200000000000000e6
-2465 4 7 19 0.65536000000000000000e5
-2465 4 8 20 0.13107200000000000000e6
-2466 3 3 32 -0.65536000000000000000e5
-2466 3 4 31 0.65536000000000000000e5
-2467 1 2 33 0.65536000000000000000e5
-2467 1 11 42 -0.65536000000000000000e5
-2467 1 12 43 -0.13107200000000000000e6
-2467 1 28 43 0.65536000000000000000e5
-2467 1 32 47 0.65536000000000000000e5
-2467 1 33 48 0.65536000000000000000e5
-2467 2 12 26 0.65536000000000000000e5
-2467 3 3 32 0.65536000000000000000e5
-2467 3 4 32 0.65536000000000000000e5
-2467 3 13 42 0.13107200000000000000e6
-2467 3 14 27 -0.13107200000000000000e6
-2467 3 28 41 0.65536000000000000000e5
-2467 3 29 42 0.65536000000000000000e5
-2467 4 3 31 -0.65536000000000000000e5
-2467 4 8 20 0.65536000000000000000e5
-2468 1 4 35 -0.65536000000000000000e5
-2468 1 17 48 0.65536000000000000000e5
-2468 3 4 34 0.65536000000000000000e5
-2468 3 13 42 0.65536000000000000000e5
-2469 3 4 35 0.65536000000000000000e5
-2469 3 5 34 -0.65536000000000000000e5
-2470 1 5 36 -0.65536000000000000000e5
-2470 1 14 45 0.65536000000000000000e5
-2470 3 4 36 0.65536000000000000000e5
-2471 3 2 39 -0.65536000000000000000e5
-2471 3 4 37 0.65536000000000000000e5
-2472 1 6 37 -0.65536000000000000000e5
-2472 1 24 39 0.65536000000000000000e5
-2472 3 4 38 0.65536000000000000000e5
-2473 3 3 40 -0.65536000000000000000e5
-2473 3 4 39 0.65536000000000000000e5
-2474 1 1 48 -0.65536000000000000000e5
-2474 1 2 49 -0.13107200000000000000e6
-2474 1 6 37 0.65536000000000000000e5
-2474 1 8 39 -0.13107200000000000000e6
-2474 1 9 40 -0.26214400000000000000e6
-2474 1 10 41 0.26214400000000000000e6
-2474 1 12 43 0.52428800000000000000e6
-2474 1 23 38 -0.65536000000000000000e5
-2474 1 24 39 -0.65536000000000000000e5
-2474 1 25 40 0.65536000000000000000e5
-2474 1 26 41 0.13107200000000000000e6
-2474 1 28 43 -0.26214400000000000000e6
-2474 1 32 47 -0.52428800000000000000e6
-2474 2 2 32 -0.65536000000000000000e5
-2474 2 3 33 -0.65536000000000000000e5
-2474 2 5 27 0.65536000000000000000e5
-2474 2 16 30 -0.13107200000000000000e6
-2474 2 20 34 -0.26214400000000000000e6
-2474 3 3 40 0.65536000000000000000e5
-2474 3 4 40 0.65536000000000000000e5
-2474 3 9 38 -0.13107200000000000000e6
-2474 3 22 35 -0.52428800000000000000e6
-2474 3 28 41 -0.52428800000000000000e6
-2474 4 2 30 -0.13107200000000000000e6
-2474 4 6 34 -0.26214400000000000000e6
-2475 3 4 41 0.65536000000000000000e5
-2475 3 9 38 -0.65536000000000000000e5
-2476 1 9 40 -0.65536000000000000000e5
-2476 1 26 41 0.65536000000000000000e5
-2476 3 4 42 0.65536000000000000000e5
-2477 3 4 43 0.65536000000000000000e5
-2477 3 10 39 -0.65536000000000000000e5
-2478 1 10 41 0.65536000000000000000e5
-2478 1 11 42 0.65536000000000000000e5
-2478 1 32 47 -0.65536000000000000000e5
-2478 1 33 48 -0.65536000000000000000e5
-2478 3 4 44 0.65536000000000000000e5
-2478 3 13 42 -0.13107200000000000000e6
-2478 3 28 41 -0.65536000000000000000e5
-2478 3 29 42 -0.65536000000000000000e5
-2478 4 3 31 0.65536000000000000000e5
-2479 1 11 42 -0.65536000000000000000e5
-2479 1 33 48 0.65536000000000000000e5
-2479 3 4 45 0.65536000000000000000e5
-2479 3 29 42 0.65536000000000000000e5
-2480 1 14 45 -0.13107200000000000000e6
-2480 1 17 48 0.65536000000000000000e5
-2480 1 18 49 0.65536000000000000000e5
-2480 1 34 49 0.65536000000000000000e5
-2480 2 14 28 0.65536000000000000000e5
-2480 3 4 46 0.65536000000000000000e5
-2480 3 13 42 0.65536000000000000000e5
-2480 3 14 43 0.65536000000000000000e5
-2480 3 18 47 0.65536000000000000000e5
-2481 1 6 53 -0.65536000000000000000e5
-2481 1 25 40 0.65536000000000000000e5
-2481 3 4 47 0.65536000000000000000e5
-2481 3 25 38 0.65536000000000000000e5
-2481 3 27 40 -0.13107200000000000000e6
-2481 4 4 32 0.65536000000000000000e5
-2482 3 4 48 0.65536000000000000000e5
-2482 3 25 38 -0.65536000000000000000e5
-2483 1 6 53 0.65536000000000000000e5
-2483 1 25 40 -0.65536000000000000000e5
-2483 3 4 49 0.65536000000000000000e5
-2484 3 4 50 0.65536000000000000000e5
-2484 3 27 40 -0.65536000000000000000e5
-2485 3 4 51 0.65536000000000000000e5
-2485 3 5 50 -0.65536000000000000000e5
-2486 3 4 52 0.65536000000000000000e5
-2486 3 29 42 -0.65536000000000000000e5
-2487 1 1 48 0.65536000000000000000e5
-2487 1 2 49 0.13107200000000000000e6
-2487 1 8 39 0.13107200000000000000e6
-2487 1 9 40 0.13107200000000000000e6
-2487 1 10 41 -0.26214400000000000000e6
-2487 1 12 43 -0.52428800000000000000e6
-2487 1 23 38 0.65536000000000000000e5
-2487 1 24 39 0.65536000000000000000e5
-2487 1 26 41 -0.13107200000000000000e6
-2487 1 28 43 0.26214400000000000000e6
-2487 1 32 47 0.52428800000000000000e6
-2487 1 40 47 0.65536000000000000000e5
-2487 2 2 32 0.65536000000000000000e5
-2487 2 3 33 0.65536000000000000000e5
-2487 2 16 30 0.13107200000000000000e6
-2487 2 20 34 0.26214400000000000000e6
-2487 3 4 53 0.65536000000000000000e5
-2487 3 9 38 0.13107200000000000000e6
-2487 3 22 35 0.52428800000000000000e6
-2487 3 25 38 0.65536000000000000000e5
-2487 3 28 41 0.52428800000000000000e6
-2487 4 2 30 0.13107200000000000000e6
-2487 4 6 34 0.26214400000000000000e6
-2488 1 6 53 -0.65536000000000000000e5
-2488 1 25 56 0.65536000000000000000e5
-2488 3 4 54 0.65536000000000000000e5
-2488 3 24 53 -0.65536000000000000000e5
-2488 3 25 54 -0.65536000000000000000e5
-2488 3 38 51 0.13107200000000000000e6
-2488 4 28 32 -0.65536000000000000000e5
-2489 1 24 55 -0.65536000000000000000e5
-2489 1 26 41 0.65536000000000000000e5
-2489 3 4 55 0.65536000000000000000e5
-2489 3 22 51 0.65536000000000000000e5
-2489 3 23 52 -0.13107200000000000000e6
-2489 3 27 40 -0.65536000000000000000e5
-2489 4 7 35 0.65536000000000000000e5
-2490 3 4 56 0.65536000000000000000e5
-2490 3 24 53 0.65536000000000000000e5
-2490 3 25 54 0.65536000000000000000e5
-2490 3 38 51 -0.13107200000000000000e6
-2490 4 28 32 0.65536000000000000000e5
-2491 1 1 48 0.32768000000000000000e5
-2491 1 2 5 -0.32768000000000000000e5
-2491 1 2 25 0.32768000000000000000e5
-2491 1 2 49 0.32768000000000000000e5
-2491 1 4 11 -0.13107200000000000000e6
-2491 1 9 40 0.65536000000000000000e5
-2491 1 10 25 0.65536000000000000000e5
-2491 1 12 43 -0.26214400000000000000e6
-2491 1 23 38 0.32768000000000000000e5
-2491 1 26 41 -0.65536000000000000000e5
-2491 1 28 43 0.13107200000000000000e6
-2491 1 32 47 0.26214400000000000000e6
-2491 2 2 32 0.32768000000000000000e5
-2491 2 3 9 -0.65536000000000000000e5
-2491 2 16 30 0.65536000000000000000e5
-2491 2 20 34 0.13107200000000000000e6
-2491 3 1 6 -0.32768000000000000000e5
-2491 3 1 30 -0.65536000000000000000e5
-2491 3 2 15 0.13107200000000000000e6
-2491 3 3 32 0.13107200000000000000e6
-2491 3 4 5 0.32768000000000000000e5
-2491 3 4 9 -0.65536000000000000000e5
-2491 3 5 5 0.65536000000000000000e5
-2491 3 10 23 -0.65536000000000000000e5
-2491 3 22 35 0.26214400000000000000e6
-2491 3 28 41 0.26214400000000000000e6
-2491 4 1 5 -0.32768000000000000000e5
-2491 4 2 30 0.65536000000000000000e5
-2491 4 4 4 0.65536000000000000000e5
-2491 4 6 34 0.13107200000000000000e6
-2492 1 1 48 -0.32768000000000000000e5
-2492 1 2 49 -0.32768000000000000000e5
-2492 1 4 11 0.65536000000000000000e5
-2492 1 9 40 -0.65536000000000000000e5
-2492 1 12 43 0.26214400000000000000e6
-2492 1 23 38 -0.32768000000000000000e5
-2492 1 26 41 0.65536000000000000000e5
-2492 1 28 43 -0.13107200000000000000e6
-2492 1 32 47 -0.26214400000000000000e6
-2492 2 2 32 -0.32768000000000000000e5
-2492 2 3 9 0.65536000000000000000e5
-2492 2 16 30 -0.65536000000000000000e5
-2492 2 20 34 -0.13107200000000000000e6
-2492 3 1 30 0.65536000000000000000e5
-2492 3 2 15 -0.13107200000000000000e6
-2492 3 3 32 -0.13107200000000000000e6
-2492 3 4 9 0.65536000000000000000e5
-2492 3 5 7 0.65536000000000000000e5
-2492 3 10 23 0.65536000000000000000e5
-2492 3 22 35 -0.26214400000000000000e6
-2492 3 28 41 -0.26214400000000000000e6
-2492 4 2 30 -0.65536000000000000000e5
-2492 4 6 34 -0.13107200000000000000e6
-2493 3 4 9 -0.65536000000000000000e5
-2493 3 5 8 0.65536000000000000000e5
-2494 1 4 11 -0.65536000000000000000e5
-2494 1 10 25 0.65536000000000000000e5
-2494 3 5 9 0.65536000000000000000e5
-2495 1 2 33 -0.13107200000000000000e6
-2495 1 4 11 0.65536000000000000000e5
-2495 1 6 13 -0.13107200000000000000e6
-2495 1 10 25 -0.65536000000000000000e5
-2495 1 10 41 -0.13107200000000000000e6
-2495 1 12 43 0.26214400000000000000e6
-2495 2 12 26 -0.13107200000000000000e6
-2495 3 3 32 -0.13107200000000000000e6
-2495 3 4 9 0.65536000000000000000e5
-2495 3 5 10 0.65536000000000000000e5
-2495 3 14 27 0.26214400000000000000e6
-2495 4 4 8 0.65536000000000000000e5
-2495 4 8 20 -0.13107200000000000000e6
-2496 1 2 33 0.13107200000000000000e6
-2496 1 4 11 -0.65536000000000000000e5
-2496 1 6 13 0.13107200000000000000e6
-2496 1 10 25 0.65536000000000000000e5
-2496 1 10 41 0.13107200000000000000e6
-2496 1 12 43 -0.26214400000000000000e6
-2496 2 12 26 0.13107200000000000000e6
-2496 3 3 32 0.13107200000000000000e6
-2496 3 4 9 -0.65536000000000000000e5
-2496 3 5 11 0.65536000000000000000e5
-2496 3 6 11 0.65536000000000000000e5
-2496 3 10 11 -0.13107200000000000000e6
-2496 3 14 27 -0.26214400000000000000e6
-2496 4 4 8 -0.65536000000000000000e5
-2496 4 5 9 0.65536000000000000000e5
-2496 4 8 20 0.13107200000000000000e6
-2497 3 2 15 -0.65536000000000000000e5
-2497 3 5 12 0.65536000000000000000e5
-2498 1 2 33 -0.65536000000000000000e5
-2498 1 6 13 -0.65536000000000000000e5
-2498 1 10 41 -0.65536000000000000000e5
-2498 1 12 43 0.13107200000000000000e6
-2498 2 12 26 -0.65536000000000000000e5
-2498 3 3 32 -0.65536000000000000000e5
-2498 3 5 13 0.65536000000000000000e5
-2498 3 14 27 0.13107200000000000000e6
-2498 4 8 20 -0.65536000000000000000e5
-2499 1 4 35 -0.13107200000000000000e6
-2499 1 6 13 0.65536000000000000000e5
-2499 1 10 41 0.65536000000000000000e5
-2499 1 11 42 0.65536000000000000000e5
-2499 2 5 11 0.65536000000000000000e5
-2499 3 2 15 0.65536000000000000000e5
-2499 3 3 32 0.65536000000000000000e5
-2499 3 4 17 -0.13107200000000000000e6
-2499 3 4 33 0.65536000000000000000e5
-2499 3 5 14 0.65536000000000000000e5
-2500 3 5 15 0.65536000000000000000e5
-2500 3 10 11 -0.65536000000000000000e5
-2501 3 4 17 -0.65536000000000000000e5
-2501 3 5 16 0.65536000000000000000e5
-2502 1 5 20 -0.13107200000000000000e6
-2502 1 5 36 0.13107200000000000000e6
-2502 3 4 17 0.65536000000000000000e5
-2502 3 5 17 0.65536000000000000000e5
-2502 3 5 18 0.65536000000000000000e5
-2502 4 8 12 0.65536000000000000000e5
-2503 1 5 20 -0.65536000000000000000e5
-2503 1 5 36 0.65536000000000000000e5
-2503 3 5 19 0.65536000000000000000e5
-2504 3 5 20 0.65536000000000000000e5
-2504 3 6 19 -0.65536000000000000000e5
-2505 1 6 21 -0.65536000000000000000e5
-2505 1 18 33 0.65536000000000000000e5
-2505 3 5 21 0.65536000000000000000e5
-2506 1 2 25 0.65536000000000000000e5
-2506 1 2 33 -0.26214400000000000000e6
-2506 1 11 42 0.26214400000000000000e6
-2506 1 12 43 0.52428800000000000000e6
-2506 1 23 38 -0.65536000000000000000e5
-2506 1 28 43 -0.26214400000000000000e6
-2506 1 32 47 -0.26214400000000000000e6
-2506 1 33 48 -0.26214400000000000000e6
-2506 2 2 32 -0.65536000000000000000e5
-2506 2 3 17 0.65536000000000000000e5
-2506 2 12 26 -0.26214400000000000000e6
-2506 3 1 30 0.13107200000000000000e6
-2506 3 1 38 0.65536000000000000000e5
-2506 3 2 23 0.65536000000000000000e5
-2506 3 2 39 0.65536000000000000000e5
-2506 3 5 22 0.65536000000000000000e5
-2506 3 8 37 -0.13107200000000000000e6
-2506 3 10 23 0.13107200000000000000e6
-2506 3 13 42 -0.52428800000000000000e6
-2506 3 28 41 -0.26214400000000000000e6
-2506 3 29 42 -0.26214400000000000000e6
-2506 4 3 31 0.26214400000000000000e6
-2506 4 6 18 0.13107200000000000000e6
-2507 1 1 40 -0.65536000000000000000e5
-2507 1 2 33 0.26214400000000000000e6
-2507 1 11 42 -0.26214400000000000000e6
-2507 1 12 43 -0.52428800000000000000e6
-2507 1 23 38 0.65536000000000000000e5
-2507 1 28 43 0.26214400000000000000e6
-2507 1 32 47 0.26214400000000000000e6
-2507 1 33 48 0.26214400000000000000e6
-2507 2 2 32 0.65536000000000000000e5
-2507 2 3 17 -0.65536000000000000000e5
-2507 2 12 26 0.26214400000000000000e6
-2507 3 1 30 -0.26214400000000000000e6
-2507 3 1 38 -0.65536000000000000000e5
-2507 3 2 23 -0.65536000000000000000e5
-2507 3 2 39 -0.65536000000000000000e5
-2507 3 5 23 0.65536000000000000000e5
-2507 3 8 37 0.13107200000000000000e6
-2507 3 10 23 -0.13107200000000000000e6
-2507 3 13 42 0.52428800000000000000e6
-2507 3 28 41 0.26214400000000000000e6
-2507 3 29 42 0.26214400000000000000e6
-2507 4 3 31 -0.26214400000000000000e6
-2507 4 4 16 0.65536000000000000000e5
-2507 4 6 18 -0.13107200000000000000e6
-2508 1 1 40 0.65536000000000000000e5
-2508 1 2 25 -0.65536000000000000000e5
-2508 1 6 37 0.65536000000000000000e5
-2508 1 24 39 -0.65536000000000000000e5
-2508 2 3 33 -0.65536000000000000000e5
-2508 2 4 18 0.65536000000000000000e5
-2508 3 1 30 0.13107200000000000000e6
-2508 3 2 39 0.65536000000000000000e5
-2508 3 3 40 0.65536000000000000000e5
-2508 3 5 24 0.65536000000000000000e5
-2508 3 9 38 -0.13107200000000000000e6
-2508 3 10 23 -0.13107200000000000000e6
-2508 4 4 16 -0.65536000000000000000e5
-2509 1 2 25 0.65536000000000000000e5
-2509 1 2 33 -0.26214400000000000000e6
-2509 1 6 37 -0.65536000000000000000e5
-2509 1 9 40 0.13107200000000000000e6
-2509 1 10 25 -0.13107200000000000000e6
-2509 1 11 42 0.26214400000000000000e6
-2509 1 12 43 0.52428800000000000000e6
-2509 1 23 38 -0.65536000000000000000e5
-2509 1 24 39 0.65536000000000000000e5
-2509 1 28 43 -0.26214400000000000000e6
-2509 1 32 47 -0.26214400000000000000e6
-2509 1 33 48 -0.26214400000000000000e6
-2509 2 2 32 -0.65536000000000000000e5
-2509 2 3 17 0.65536000000000000000e5
-2509 2 3 33 0.65536000000000000000e5
-2509 2 4 18 -0.65536000000000000000e5
-2509 2 12 26 -0.26214400000000000000e6
-2509 3 1 30 0.13107200000000000000e6
-2509 3 1 38 0.65536000000000000000e5
-2509 3 2 23 0.65536000000000000000e5
-2509 3 3 40 -0.65536000000000000000e5
-2509 3 5 25 0.65536000000000000000e5
-2509 3 8 37 -0.13107200000000000000e6
-2509 3 9 38 0.13107200000000000000e6
-2509 3 10 23 0.26214400000000000000e6
-2509 3 13 42 -0.52428800000000000000e6
-2509 3 28 41 -0.26214400000000000000e6
-2509 3 29 42 -0.26214400000000000000e6
-2509 4 3 31 0.26214400000000000000e6
-2509 4 5 17 0.65536000000000000000e5
-2509 4 6 18 0.13107200000000000000e6
-2510 3 5 27 0.65536000000000000000e5
-2510 3 10 23 -0.65536000000000000000e5
-2511 1 9 40 0.65536000000000000000e5
-2511 1 10 25 -0.65536000000000000000e5
-2511 3 5 28 0.65536000000000000000e5
-2512 1 2 33 0.13107200000000000000e6
-2512 1 9 40 -0.65536000000000000000e5
-2512 1 10 25 0.65536000000000000000e5
-2512 1 11 42 -0.13107200000000000000e6
-2512 1 12 43 -0.26214400000000000000e6
-2512 1 28 43 0.13107200000000000000e6
-2512 1 32 47 0.13107200000000000000e6
-2512 1 33 48 0.13107200000000000000e6
-2512 2 12 26 0.13107200000000000000e6
-2512 3 3 32 0.13107200000000000000e6
-2512 3 5 29 0.65536000000000000000e5
-2512 3 10 23 0.65536000000000000000e5
-2512 3 13 42 0.26214400000000000000e6
-2512 3 14 27 -0.26214400000000000000e6
-2512 3 28 41 0.13107200000000000000e6
-2512 3 29 42 0.13107200000000000000e6
-2512 4 3 31 -0.13107200000000000000e6
-2512 4 7 19 0.65536000000000000000e5
-2512 4 8 20 0.13107200000000000000e6
-2513 1 1 48 -0.32768000000000000000e5
-2513 1 2 49 -0.32768000000000000000e5
-2513 1 8 39 -0.65536000000000000000e5
-2513 1 9 40 -0.13107200000000000000e6
-2513 1 10 41 0.13107200000000000000e6
-2513 1 11 26 -0.65536000000000000000e5
-2513 1 11 42 0.13107200000000000000e6
-2513 1 12 43 0.26214400000000000000e6
-2513 1 23 38 -0.32768000000000000000e5
-2513 1 26 41 0.13107200000000000000e6
-2513 1 28 43 -0.26214400000000000000e6
-2513 1 32 47 -0.26214400000000000000e6
-2513 2 2 32 -0.32768000000000000000e5
-2513 2 4 34 0.65536000000000000000e5
-2513 2 16 30 -0.65536000000000000000e5
-2513 2 20 34 -0.13107200000000000000e6
-2513 2 28 34 -0.65536000000000000000e5
-2513 3 5 30 0.65536000000000000000e5
-2513 3 9 38 -0.65536000000000000000e5
-2513 3 10 39 -0.65536000000000000000e5
-2513 3 22 35 -0.26214400000000000000e6
-2513 3 28 41 -0.26214400000000000000e6
-2513 4 2 30 -0.65536000000000000000e5
-2513 4 6 34 -0.13107200000000000000e6
-2513 4 18 22 -0.65536000000000000000e5
-2513 4 18 30 -0.65536000000000000000e5
-2513 4 21 33 -0.65536000000000000000e5
-2514 1 2 33 0.65536000000000000000e5
-2514 1 11 42 -0.65536000000000000000e5
-2514 1 12 43 -0.13107200000000000000e6
-2514 1 28 43 0.65536000000000000000e5
-2514 1 32 47 0.65536000000000000000e5
-2514 1 33 48 0.65536000000000000000e5
-2514 2 12 26 0.65536000000000000000e5
-2514 3 3 32 0.65536000000000000000e5
-2514 3 5 31 0.65536000000000000000e5
-2514 3 13 42 0.13107200000000000000e6
-2514 3 14 27 -0.13107200000000000000e6
-2514 3 28 41 0.65536000000000000000e5
-2514 3 29 42 0.65536000000000000000e5
-2514 4 3 31 -0.65536000000000000000e5
-2514 4 8 20 0.65536000000000000000e5
-2515 3 4 33 -0.65536000000000000000e5
-2515 3 5 32 0.65536000000000000000e5
-2516 1 2 33 -0.65536000000000000000e5
-2516 1 11 42 0.65536000000000000000e5
-2516 1 12 43 0.13107200000000000000e6
-2516 1 28 43 -0.65536000000000000000e5
-2516 1 32 47 -0.65536000000000000000e5
-2516 1 33 48 -0.65536000000000000000e5
-2516 2 12 26 -0.65536000000000000000e5
-2516 3 3 32 -0.65536000000000000000e5
-2516 3 4 33 0.65536000000000000000e5
-2516 3 5 33 0.65536000000000000000e5
-2516 3 5 34 -0.13107200000000000000e6
-2516 3 13 42 -0.13107200000000000000e6
-2516 3 14 27 0.13107200000000000000e6
-2516 3 28 41 -0.65536000000000000000e5
-2516 3 29 42 -0.65536000000000000000e5
-2516 4 3 31 0.65536000000000000000e5
-2516 4 8 20 -0.65536000000000000000e5
-2516 4 9 21 0.65536000000000000000e5
-2517 1 15 30 -0.65536000000000000000e5
-2517 1 18 49 0.65536000000000000000e5
-2517 3 5 35 0.65536000000000000000e5
-2517 3 14 43 0.65536000000000000000e5
-2518 3 5 36 0.65536000000000000000e5
-2518 3 17 30 -0.65536000000000000000e5
-2519 1 6 37 -0.65536000000000000000e5
-2519 1 24 39 0.65536000000000000000e5
-2519 3 5 37 0.65536000000000000000e5
-2520 3 3 40 -0.65536000000000000000e5
-2520 3 5 38 0.65536000000000000000e5
-2521 1 1 48 -0.65536000000000000000e5
-2521 1 2 49 -0.13107200000000000000e6
-2521 1 6 37 0.65536000000000000000e5
-2521 1 8 39 -0.13107200000000000000e6
-2521 1 9 40 -0.26214400000000000000e6
-2521 1 10 41 0.26214400000000000000e6
-2521 1 12 43 0.52428800000000000000e6
-2521 1 23 38 -0.65536000000000000000e5
-2521 1 24 39 -0.65536000000000000000e5
-2521 1 25 40 0.65536000000000000000e5
-2521 1 26 41 0.13107200000000000000e6
-2521 1 28 43 -0.26214400000000000000e6
-2521 1 32 47 -0.52428800000000000000e6
-2521 2 2 32 -0.65536000000000000000e5
-2521 2 3 33 -0.65536000000000000000e5
-2521 2 5 27 0.65536000000000000000e5
-2521 2 16 30 -0.13107200000000000000e6
-2521 2 20 34 -0.26214400000000000000e6
-2521 3 3 40 0.65536000000000000000e5
-2521 3 5 39 0.65536000000000000000e5
-2521 3 9 38 -0.13107200000000000000e6
-2521 3 22 35 -0.52428800000000000000e6
-2521 3 28 41 -0.52428800000000000000e6
-2521 4 2 30 -0.13107200000000000000e6
-2521 4 6 34 -0.26214400000000000000e6
-2522 1 1 40 -0.65536000000000000000e5
-2522 1 1 48 0.65536000000000000000e5
-2522 1 2 33 0.52428800000000000000e6
-2522 1 2 49 0.13107200000000000000e6
-2522 1 6 37 -0.65536000000000000000e5
-2522 1 6 53 -0.65536000000000000000e5
-2522 1 8 39 0.13107200000000000000e6
-2522 1 10 25 0.26214400000000000000e6
-2522 1 10 41 -0.26214400000000000000e6
-2522 1 11 42 -0.52428800000000000000e6
-2522 1 12 43 -0.15728640000000000000e7
-2522 1 23 38 0.13107200000000000000e6
-2522 1 24 39 0.65536000000000000000e5
-2522 1 26 41 -0.13107200000000000000e6
-2522 1 28 43 0.78643200000000000000e6
-2522 1 32 47 0.10485760000000000000e7
-2522 1 33 48 0.52428800000000000000e6
-2522 2 2 32 0.13107200000000000000e6
-2522 2 3 17 -0.65536000000000000000e5
-2522 2 3 33 0.65536000000000000000e5
-2522 2 5 19 0.65536000000000000000e5
-2522 2 5 27 -0.65536000000000000000e5
-2522 2 5 35 -0.65536000000000000000e5
-2522 2 12 26 0.52428800000000000000e6
-2522 2 16 30 0.13107200000000000000e6
-2522 2 20 34 0.26214400000000000000e6
-2522 3 1 30 -0.26214400000000000000e6
-2522 3 1 38 -0.65536000000000000000e5
-2522 3 2 23 -0.65536000000000000000e5
-2522 3 2 39 -0.65536000000000000000e5
-2522 3 3 32 0.26214400000000000000e6
-2522 3 5 26 0.65536000000000000000e5
-2522 3 5 40 0.65536000000000000000e5
-2522 3 5 50 -0.13107200000000000000e6
-2522 3 8 37 0.13107200000000000000e6
-2522 3 9 38 0.13107200000000000000e6
-2522 3 10 39 -0.13107200000000000000e6
-2522 3 13 42 0.10485760000000000000e7
-2522 3 14 27 -0.52428800000000000000e6
-2522 3 22 35 0.52428800000000000000e6
-2522 3 25 38 0.65536000000000000000e5
-2522 3 26 39 0.65536000000000000000e5
-2522 3 28 41 0.10485760000000000000e7
-2522 3 29 42 0.52428800000000000000e6
-2522 4 2 30 0.13107200000000000000e6
-2522 4 3 31 -0.52428800000000000000e6
-2522 4 4 16 0.65536000000000000000e5
-2522 4 5 17 -0.65536000000000000000e5
-2522 4 6 18 -0.13107200000000000000e6
-2522 4 6 34 0.26214400000000000000e6
-2522 4 7 19 0.13107200000000000000e6
-2522 4 8 20 0.26214400000000000000e6
-2523 1 9 40 -0.65536000000000000000e5
-2523 1 26 41 0.65536000000000000000e5
-2523 3 5 41 0.65536000000000000000e5
-2524 3 5 42 0.65536000000000000000e5
-2524 3 10 39 -0.65536000000000000000e5
-2525 1 9 40 0.65536000000000000000e5
-2525 1 11 42 -0.13107200000000000000e6
-2525 1 26 41 -0.65536000000000000000e5
-2525 1 33 48 0.13107200000000000000e6
-2525 3 5 43 0.65536000000000000000e5
-2525 3 10 39 0.65536000000000000000e5
-2525 3 29 42 0.13107200000000000000e6
-2525 4 18 22 0.65536000000000000000e5
-2526 1 11 42 -0.65536000000000000000e5
-2526 1 33 48 0.65536000000000000000e5
-2526 3 5 44 0.65536000000000000000e5
-2526 3 29 42 0.65536000000000000000e5
-2527 1 26 33 -0.65536000000000000000e5
-2527 1 33 40 0.65536000000000000000e5
-2527 3 5 45 0.65536000000000000000e5
-2528 3 5 46 0.65536000000000000000e5
-2528 3 14 43 -0.65536000000000000000e5
-2529 3 5 47 0.65536000000000000000e5
-2529 3 25 38 -0.65536000000000000000e5
-2530 1 6 53 0.65536000000000000000e5
-2530 1 25 40 -0.65536000000000000000e5
-2530 3 5 48 0.65536000000000000000e5
-2531 3 5 49 0.65536000000000000000e5
-2531 3 26 39 -0.65536000000000000000e5
-2532 3 5 50 0.65536000000000000000e5
-2532 3 5 51 0.65536000000000000000e5
-2532 3 27 40 0.65536000000000000000e5
-2532 3 29 42 -0.13107200000000000000e6
-2532 4 18 30 0.65536000000000000000e5
-2533 3 5 52 0.65536000000000000000e5
-2533 3 14 51 -0.13107200000000000000e6
-2533 3 29 42 0.65536000000000000000e5
-2533 3 30 43 0.65536000000000000000e5
-2533 4 19 31 0.65536000000000000000e5
-2534 1 6 53 -0.65536000000000000000e5
-2534 1 25 56 0.65536000000000000000e5
-2534 3 5 53 0.65536000000000000000e5
-2534 3 24 53 -0.65536000000000000000e5
-2534 3 25 54 -0.65536000000000000000e5
-2534 3 38 51 0.13107200000000000000e6
-2534 4 28 32 -0.65536000000000000000e5
-2535 3 5 54 0.65536000000000000000e5
-2535 3 39 40 -0.65536000000000000000e5
-2536 3 5 55 0.65536000000000000000e5
-2536 3 10 55 0.13107200000000000000e6
-2536 3 22 51 -0.65536000000000000000e5
-2536 3 23 52 0.13107200000000000000e6
-2536 3 35 48 -0.26214400000000000000e6
-2536 3 40 45 0.13107200000000000000e6
-2536 4 7 35 -0.65536000000000000000e5
-2536 4 21 33 0.65536000000000000000e5
-2536 4 22 34 0.13107200000000000000e6
-2537 3 5 56 0.65536000000000000000e5
-2537 3 25 54 -0.65536000000000000000e5
-2538 1 1 48 -0.32768000000000000000e5
-2538 1 2 5 0.32768000000000000000e5
-2538 1 2 25 -0.32768000000000000000e5
-2538 1 2 33 0.13107200000000000000e6
-2538 1 2 49 -0.32768000000000000000e5
-2538 1 4 11 0.65536000000000000000e5
-2538 1 6 13 0.13107200000000000000e6
-2538 1 9 40 -0.65536000000000000000e5
-2538 1 10 41 0.13107200000000000000e6
-2538 1 23 38 -0.32768000000000000000e5
-2538 1 26 41 0.65536000000000000000e5
-2538 1 28 43 -0.13107200000000000000e6
-2538 1 32 47 -0.26214400000000000000e6
-2538 2 2 32 -0.32768000000000000000e5
-2538 2 3 9 0.65536000000000000000e5
-2538 2 12 26 0.13107200000000000000e6
-2538 2 16 30 -0.65536000000000000000e5
-2538 2 20 34 -0.13107200000000000000e6
-2538 3 1 6 0.32768000000000000000e5
-2538 3 1 30 0.65536000000000000000e5
-2538 3 2 15 -0.13107200000000000000e6
-2538 3 4 5 -0.32768000000000000000e5
-2538 3 5 6 0.32768000000000000000e5
-2538 3 6 6 0.65536000000000000000e5
-2538 3 6 11 0.65536000000000000000e5
-2538 3 10 11 -0.13107200000000000000e6
-2538 3 10 23 0.65536000000000000000e5
-2538 3 14 27 -0.26214400000000000000e6
-2538 3 22 35 -0.26214400000000000000e6
-2538 3 28 41 -0.26214400000000000000e6
-2538 4 1 5 0.32768000000000000000e5
-2538 4 2 30 -0.65536000000000000000e5
-2538 4 4 4 -0.65536000000000000000e5
-2538 4 4 8 -0.65536000000000000000e5
-2538 4 5 5 0.65536000000000000000e5
-2538 4 5 9 0.65536000000000000000e5
-2538 4 6 34 -0.13107200000000000000e6
-2538 4 8 20 0.13107200000000000000e6
-2539 3 4 9 -0.65536000000000000000e5
-2539 3 6 7 0.65536000000000000000e5
-2540 1 4 11 -0.65536000000000000000e5
-2540 1 10 25 0.65536000000000000000e5
-2540 3 6 8 0.65536000000000000000e5
-2541 1 2 33 -0.13107200000000000000e6
-2541 1 4 11 0.65536000000000000000e5
-2541 1 6 13 -0.13107200000000000000e6
-2541 1 10 25 -0.65536000000000000000e5
-2541 1 10 41 -0.13107200000000000000e6
-2541 1 12 43 0.26214400000000000000e6
-2541 2 12 26 -0.13107200000000000000e6
-2541 3 3 32 -0.13107200000000000000e6
-2541 3 4 9 0.65536000000000000000e5
-2541 3 6 9 0.65536000000000000000e5
-2541 3 14 27 0.26214400000000000000e6
-2541 4 4 8 0.65536000000000000000e5
-2541 4 8 20 -0.13107200000000000000e6
-2542 1 2 33 0.13107200000000000000e6
-2542 1 4 11 -0.65536000000000000000e5
-2542 1 6 13 0.13107200000000000000e6
-2542 1 10 25 0.65536000000000000000e5
-2542 1 10 41 0.13107200000000000000e6
-2542 1 12 43 -0.26214400000000000000e6
-2542 2 12 26 0.13107200000000000000e6
-2542 3 3 32 0.13107200000000000000e6
-2542 3 4 9 -0.65536000000000000000e5
-2542 3 6 10 0.65536000000000000000e5
-2542 3 6 11 0.65536000000000000000e5
-2542 3 10 11 -0.13107200000000000000e6
-2542 3 14 27 -0.26214400000000000000e6
-2542 4 4 8 -0.65536000000000000000e5
-2542 4 5 9 0.65536000000000000000e5
-2542 4 8 20 0.13107200000000000000e6
-2543 1 2 33 -0.65536000000000000000e5
-2543 1 6 13 -0.65536000000000000000e5
-2543 1 10 41 -0.65536000000000000000e5
-2543 1 12 43 0.13107200000000000000e6
-2543 2 12 26 -0.65536000000000000000e5
-2543 3 3 32 -0.65536000000000000000e5
-2543 3 6 12 0.65536000000000000000e5
-2543 3 14 27 0.13107200000000000000e6
-2543 4 8 20 -0.65536000000000000000e5
-2544 1 4 35 -0.13107200000000000000e6
-2544 1 6 13 0.65536000000000000000e5
-2544 1 10 41 0.65536000000000000000e5
-2544 1 11 42 0.65536000000000000000e5
-2544 2 5 11 0.65536000000000000000e5
-2544 3 2 15 0.65536000000000000000e5
-2544 3 3 32 0.65536000000000000000e5
-2544 3 4 17 -0.13107200000000000000e6
-2544 3 4 33 0.65536000000000000000e5
-2544 3 6 13 0.65536000000000000000e5
-2545 3 6 14 0.65536000000000000000e5
-2545 3 10 11 -0.65536000000000000000e5
-2546 1 4 35 0.13107200000000000000e6
-2546 1 6 13 -0.65536000000000000000e5
-2546 1 10 41 -0.65536000000000000000e5
-2546 1 11 42 -0.65536000000000000000e5
-2546 2 5 11 -0.65536000000000000000e5
-2546 3 2 15 -0.65536000000000000000e5
-2546 3 3 32 -0.65536000000000000000e5
-2546 3 4 17 0.13107200000000000000e6
-2546 3 4 33 -0.65536000000000000000e5
-2546 3 5 18 -0.13107200000000000000e6
-2546 3 6 15 0.65536000000000000000e5
-2546 3 10 11 0.65536000000000000000e5
-2546 4 9 9 0.13107200000000000000e6
-2547 1 5 20 -0.13107200000000000000e6
-2547 1 5 36 0.13107200000000000000e6
-2547 3 4 17 0.65536000000000000000e5
-2547 3 5 18 0.65536000000000000000e5
-2547 3 6 16 0.65536000000000000000e5
-2547 4 8 12 0.65536000000000000000e5
-2548 3 5 18 -0.65536000000000000000e5
-2548 3 6 17 0.65536000000000000000e5
-2549 1 5 20 0.13107200000000000000e6
-2549 1 5 36 -0.13107200000000000000e6
-2549 3 4 17 -0.65536000000000000000e5
-2549 3 6 18 0.65536000000000000000e5
-2549 3 6 19 -0.13107200000000000000e6
-2549 4 5 14 0.65536000000000000000e5
-2549 4 8 12 -0.65536000000000000000e5
-2550 1 5 20 0.65536000000000000000e5
-2550 1 5 36 -0.65536000000000000000e5
-2550 1 6 21 -0.13107200000000000000e6
-2550 1 18 33 0.13107200000000000000e6
-2550 3 6 19 0.65536000000000000000e5
-2550 3 6 20 0.65536000000000000000e5
-2550 4 12 12 0.13107200000000000000e6
-2551 3 6 21 0.65536000000000000000e5
-2551 3 11 20 -0.65536000000000000000e5
-2552 1 1 40 -0.65536000000000000000e5
-2552 1 2 33 0.26214400000000000000e6
-2552 1 11 42 -0.26214400000000000000e6
-2552 1 12 43 -0.52428800000000000000e6
-2552 1 23 38 0.65536000000000000000e5
-2552 1 28 43 0.26214400000000000000e6
-2552 1 32 47 0.26214400000000000000e6
-2552 1 33 48 0.26214400000000000000e6
-2552 2 2 32 0.65536000000000000000e5
-2552 2 3 17 -0.65536000000000000000e5
-2552 2 12 26 0.26214400000000000000e6
-2552 3 1 30 -0.26214400000000000000e6
-2552 3 1 38 -0.65536000000000000000e5
-2552 3 2 23 -0.65536000000000000000e5
-2552 3 2 39 -0.65536000000000000000e5
-2552 3 6 22 0.65536000000000000000e5
-2552 3 8 37 0.13107200000000000000e6
-2552 3 10 23 -0.13107200000000000000e6
-2552 3 13 42 0.52428800000000000000e6
-2552 3 28 41 0.26214400000000000000e6
-2552 3 29 42 0.26214400000000000000e6
-2552 4 3 31 -0.26214400000000000000e6
-2552 4 4 16 0.65536000000000000000e5
-2552 4 6 18 -0.13107200000000000000e6
-2553 1 1 40 0.65536000000000000000e5
-2553 1 2 25 -0.65536000000000000000e5
-2553 1 6 37 0.65536000000000000000e5
-2553 1 24 39 -0.65536000000000000000e5
-2553 2 3 33 -0.65536000000000000000e5
-2553 2 4 18 0.65536000000000000000e5
-2553 3 1 30 0.13107200000000000000e6
-2553 3 2 39 0.65536000000000000000e5
-2553 3 3 40 0.65536000000000000000e5
-2553 3 6 23 0.65536000000000000000e5
-2553 3 9 38 -0.13107200000000000000e6
-2553 3 10 23 -0.13107200000000000000e6
-2553 4 4 16 -0.65536000000000000000e5
-2554 1 2 25 0.65536000000000000000e5
-2554 1 2 33 -0.26214400000000000000e6
-2554 1 6 37 -0.65536000000000000000e5
-2554 1 9 40 0.13107200000000000000e6
-2554 1 10 25 -0.13107200000000000000e6
-2554 1 11 42 0.26214400000000000000e6
-2554 1 12 43 0.52428800000000000000e6
-2554 1 23 38 -0.65536000000000000000e5
-2554 1 24 39 0.65536000000000000000e5
-2554 1 28 43 -0.26214400000000000000e6
-2554 1 32 47 -0.26214400000000000000e6
-2554 1 33 48 -0.26214400000000000000e6
-2554 2 2 32 -0.65536000000000000000e5
-2554 2 3 17 0.65536000000000000000e5
-2554 2 3 33 0.65536000000000000000e5
-2554 2 4 18 -0.65536000000000000000e5
-2554 2 12 26 -0.26214400000000000000e6
-2554 3 1 30 0.13107200000000000000e6
-2554 3 1 38 0.65536000000000000000e5
-2554 3 2 23 0.65536000000000000000e5
-2554 3 3 40 -0.65536000000000000000e5
-2554 3 6 24 0.65536000000000000000e5
-2554 3 8 37 -0.13107200000000000000e6
-2554 3 9 38 0.13107200000000000000e6
-2554 3 10 23 0.26214400000000000000e6
-2554 3 13 42 -0.52428800000000000000e6
-2554 3 28 41 -0.26214400000000000000e6
-2554 3 29 42 -0.26214400000000000000e6
-2554 4 3 31 0.26214400000000000000e6
-2554 4 5 17 0.65536000000000000000e5
-2554 4 6 18 0.13107200000000000000e6
-2555 3 5 26 -0.65536000000000000000e5
-2555 3 6 25 0.65536000000000000000e5
-2556 1 1 48 -0.65536000000000000000e5
-2556 1 2 25 -0.65536000000000000000e5
-2556 1 2 33 0.26214400000000000000e6
-2556 1 2 49 -0.65536000000000000000e5
-2556 1 6 37 0.65536000000000000000e5
-2556 1 8 39 -0.13107200000000000000e6
-2556 1 9 40 -0.39321600000000000000e6
-2556 1 10 25 0.13107200000000000000e6
-2556 1 10 41 0.26214400000000000000e6
-2556 1 11 26 -0.13107200000000000000e6
-2556 1 24 39 -0.65536000000000000000e5
-2556 1 26 41 0.26214400000000000000e6
-2556 1 28 43 -0.26214400000000000000e6
-2556 1 32 47 -0.26214400000000000000e6
-2556 1 33 48 0.26214400000000000000e6
-2556 2 3 17 -0.65536000000000000000e5
-2556 2 3 33 -0.65536000000000000000e5
-2556 2 4 18 0.65536000000000000000e5
-2556 2 4 34 0.13107200000000000000e6
-2556 2 12 26 0.26214400000000000000e6
-2556 2 16 30 -0.13107200000000000000e6
-2556 2 20 34 -0.26214400000000000000e6
-2556 2 28 34 -0.13107200000000000000e6
-2556 3 1 30 -0.13107200000000000000e6
-2556 3 1 38 -0.65536000000000000000e5
-2556 3 2 23 -0.65536000000000000000e5
-2556 3 3 40 0.65536000000000000000e5
-2556 3 5 26 0.65536000000000000000e5
-2556 3 6 26 0.65536000000000000000e5
-2556 3 8 37 0.13107200000000000000e6
-2556 3 9 38 -0.26214400000000000000e6
-2556 3 10 23 -0.26214400000000000000e6
-2556 3 10 39 -0.13107200000000000000e6
-2556 3 13 42 0.52428800000000000000e6
-2556 3 22 35 -0.52428800000000000000e6
-2556 3 28 41 -0.26214400000000000000e6
-2556 3 29 42 0.26214400000000000000e6
-2556 4 2 30 -0.13107200000000000000e6
-2556 4 3 31 -0.26214400000000000000e6
-2556 4 5 17 -0.65536000000000000000e5
-2556 4 5 19 0.65536000000000000000e5
-2556 4 6 18 -0.13107200000000000000e6
-2556 4 6 34 -0.26214400000000000000e6
-2556 4 18 22 -0.13107200000000000000e6
-2556 4 18 30 -0.13107200000000000000e6
-2556 4 21 33 -0.13107200000000000000e6
-2557 1 9 40 0.65536000000000000000e5
-2557 1 10 25 -0.65536000000000000000e5
-2557 3 6 27 0.65536000000000000000e5
-2558 1 2 33 0.13107200000000000000e6
-2558 1 9 40 -0.65536000000000000000e5
-2558 1 10 25 0.65536000000000000000e5
-2558 1 11 42 -0.13107200000000000000e6
-2558 1 12 43 -0.26214400000000000000e6
-2558 1 28 43 0.13107200000000000000e6
-2558 1 32 47 0.13107200000000000000e6
-2558 1 33 48 0.13107200000000000000e6
-2558 2 12 26 0.13107200000000000000e6
-2558 3 3 32 0.13107200000000000000e6
-2558 3 6 28 0.65536000000000000000e5
-2558 3 10 23 0.65536000000000000000e5
-2558 3 13 42 0.26214400000000000000e6
-2558 3 14 27 -0.26214400000000000000e6
-2558 3 28 41 0.13107200000000000000e6
-2558 3 29 42 0.13107200000000000000e6
-2558 4 3 31 -0.13107200000000000000e6
-2558 4 7 19 0.65536000000000000000e5
-2558 4 8 20 0.13107200000000000000e6
-2559 1 1 48 -0.32768000000000000000e5
-2559 1 2 49 -0.32768000000000000000e5
-2559 1 8 39 -0.65536000000000000000e5
-2559 1 9 40 -0.13107200000000000000e6
-2559 1 10 41 0.13107200000000000000e6
-2559 1 11 26 -0.65536000000000000000e5
-2559 1 11 42 0.13107200000000000000e6
-2559 1 12 43 0.26214400000000000000e6
-2559 1 23 38 -0.32768000000000000000e5
-2559 1 26 41 0.13107200000000000000e6
-2559 1 28 43 -0.26214400000000000000e6
-2559 1 32 47 -0.26214400000000000000e6
-2559 2 2 32 -0.32768000000000000000e5
-2559 2 4 34 0.65536000000000000000e5
-2559 2 16 30 -0.65536000000000000000e5
-2559 2 20 34 -0.13107200000000000000e6
-2559 2 28 34 -0.65536000000000000000e5
-2559 3 6 29 0.65536000000000000000e5
-2559 3 9 38 -0.65536000000000000000e5
-2559 3 10 39 -0.65536000000000000000e5
-2559 3 22 35 -0.26214400000000000000e6
-2559 3 28 41 -0.26214400000000000000e6
-2559 4 2 30 -0.65536000000000000000e5
-2559 4 6 34 -0.13107200000000000000e6
-2559 4 18 22 -0.65536000000000000000e5
-2559 4 18 30 -0.65536000000000000000e5
-2559 4 21 33 -0.65536000000000000000e5
-2560 3 6 30 0.65536000000000000000e5
-2560 3 11 26 -0.65536000000000000000e5
-2561 3 4 33 -0.65536000000000000000e5
-2561 3 6 31 0.65536000000000000000e5
-2562 1 2 33 -0.65536000000000000000e5
-2562 1 11 42 0.65536000000000000000e5
-2562 1 12 43 0.13107200000000000000e6
-2562 1 28 43 -0.65536000000000000000e5
-2562 1 32 47 -0.65536000000000000000e5
-2562 1 33 48 -0.65536000000000000000e5
-2562 2 12 26 -0.65536000000000000000e5
-2562 3 3 32 -0.65536000000000000000e5
-2562 3 4 33 0.65536000000000000000e5
-2562 3 5 34 -0.13107200000000000000e6
-2562 3 6 32 0.65536000000000000000e5
-2562 3 13 42 -0.13107200000000000000e6
-2562 3 14 27 0.13107200000000000000e6
-2562 3 28 41 -0.65536000000000000000e5
-2562 3 29 42 -0.65536000000000000000e5
-2562 4 3 31 0.65536000000000000000e5
-2562 4 8 20 -0.65536000000000000000e5
-2562 4 9 21 0.65536000000000000000e5
-2563 3 6 33 0.65536000000000000000e5
-2563 3 11 30 -0.65536000000000000000e5
-2564 1 15 30 -0.65536000000000000000e5
-2564 1 18 49 0.65536000000000000000e5
-2564 3 6 34 0.65536000000000000000e5
-2564 3 14 43 0.65536000000000000000e5
-2565 1 5 36 0.65536000000000000000e5
-2565 1 14 45 -0.65536000000000000000e5
-2565 1 15 46 0.13107200000000000000e6
-2565 1 18 33 -0.13107200000000000000e6
-2565 3 6 36 0.65536000000000000000e5
-2565 3 17 30 0.65536000000000000000e5
-2565 4 12 24 0.65536000000000000000e5
-2566 3 3 40 -0.65536000000000000000e5
-2566 3 6 37 0.65536000000000000000e5
-2567 1 1 48 -0.65536000000000000000e5
-2567 1 2 49 -0.13107200000000000000e6
-2567 1 6 37 0.65536000000000000000e5
-2567 1 8 39 -0.13107200000000000000e6
-2567 1 9 40 -0.26214400000000000000e6
-2567 1 10 41 0.26214400000000000000e6
-2567 1 12 43 0.52428800000000000000e6
-2567 1 23 38 -0.65536000000000000000e5
-2567 1 24 39 -0.65536000000000000000e5
-2567 1 25 40 0.65536000000000000000e5
-2567 1 26 41 0.13107200000000000000e6
-2567 1 28 43 -0.26214400000000000000e6
-2567 1 32 47 -0.52428800000000000000e6
-2567 2 2 32 -0.65536000000000000000e5
-2567 2 3 33 -0.65536000000000000000e5
-2567 2 5 27 0.65536000000000000000e5
-2567 2 16 30 -0.13107200000000000000e6
-2567 2 20 34 -0.26214400000000000000e6
-2567 3 3 40 0.65536000000000000000e5
-2567 3 6 38 0.65536000000000000000e5
-2567 3 9 38 -0.13107200000000000000e6
-2567 3 22 35 -0.52428800000000000000e6
-2567 3 28 41 -0.52428800000000000000e6
-2567 4 2 30 -0.13107200000000000000e6
-2567 4 6 34 -0.26214400000000000000e6
-2568 1 1 40 -0.65536000000000000000e5
-2568 1 1 48 0.65536000000000000000e5
-2568 1 2 33 0.52428800000000000000e6
-2568 1 2 49 0.13107200000000000000e6
-2568 1 6 37 -0.65536000000000000000e5
-2568 1 6 53 -0.65536000000000000000e5
-2568 1 8 39 0.13107200000000000000e6
-2568 1 10 25 0.26214400000000000000e6
-2568 1 10 41 -0.26214400000000000000e6
-2568 1 11 42 -0.52428800000000000000e6
-2568 1 12 43 -0.15728640000000000000e7
-2568 1 23 38 0.13107200000000000000e6
-2568 1 24 39 0.65536000000000000000e5
-2568 1 26 41 -0.13107200000000000000e6
-2568 1 28 43 0.78643200000000000000e6
-2568 1 32 47 0.10485760000000000000e7
-2568 1 33 48 0.52428800000000000000e6
-2568 2 2 32 0.13107200000000000000e6
-2568 2 3 17 -0.65536000000000000000e5
-2568 2 3 33 0.65536000000000000000e5
-2568 2 5 19 0.65536000000000000000e5
-2568 2 5 27 -0.65536000000000000000e5
-2568 2 5 35 -0.65536000000000000000e5
-2568 2 12 26 0.52428800000000000000e6
-2568 2 16 30 0.13107200000000000000e6
-2568 2 20 34 0.26214400000000000000e6
-2568 3 1 30 -0.26214400000000000000e6
-2568 3 1 38 -0.65536000000000000000e5
-2568 3 2 23 -0.65536000000000000000e5
-2568 3 2 39 -0.65536000000000000000e5
-2568 3 3 32 0.26214400000000000000e6
-2568 3 5 26 0.65536000000000000000e5
-2568 3 5 50 -0.13107200000000000000e6
-2568 3 6 39 0.65536000000000000000e5
-2568 3 8 37 0.13107200000000000000e6
-2568 3 9 38 0.13107200000000000000e6
-2568 3 10 39 -0.13107200000000000000e6
-2568 3 13 42 0.10485760000000000000e7
-2568 3 14 27 -0.52428800000000000000e6
-2568 3 22 35 0.52428800000000000000e6
-2568 3 25 38 0.65536000000000000000e5
-2568 3 26 39 0.65536000000000000000e5
-2568 3 28 41 0.10485760000000000000e7
-2568 3 29 42 0.52428800000000000000e6
-2568 4 2 30 0.13107200000000000000e6
-2568 4 3 31 -0.52428800000000000000e6
-2568 4 4 16 0.65536000000000000000e5
-2568 4 5 17 -0.65536000000000000000e5
-2568 4 6 18 -0.13107200000000000000e6
-2568 4 6 34 0.26214400000000000000e6
-2568 4 7 19 0.13107200000000000000e6
-2568 4 8 20 0.26214400000000000000e6
-2569 1 1 40 0.65536000000000000000e5
-2569 1 2 33 -0.52428800000000000000e6
-2569 1 6 53 0.65536000000000000000e5
-2569 1 9 40 0.39321600000000000000e6
-2569 1 10 25 -0.26214400000000000000e6
-2569 1 11 42 0.26214400000000000000e6
-2569 1 12 43 0.10485760000000000000e7
-2569 1 23 38 -0.65536000000000000000e5
-2569 1 25 40 -0.65536000000000000000e5
-2569 1 26 41 -0.13107200000000000000e6
-2569 1 28 43 -0.52428800000000000000e6
-2569 1 32 47 -0.52428800000000000000e6
-2569 1 33 48 -0.26214400000000000000e6
-2569 2 2 32 -0.65536000000000000000e5
-2569 2 3 17 0.65536000000000000000e5
-2569 2 5 19 -0.65536000000000000000e5
-2569 2 5 35 0.65536000000000000000e5
-2569 2 12 26 -0.52428800000000000000e6
-2569 3 1 30 0.26214400000000000000e6
-2569 3 1 38 0.65536000000000000000e5
-2569 3 2 23 0.65536000000000000000e5
-2569 3 2 39 0.65536000000000000000e5
-2569 3 3 32 -0.26214400000000000000e6
-2569 3 3 40 -0.65536000000000000000e5
-2569 3 5 26 -0.65536000000000000000e5
-2569 3 5 50 0.13107200000000000000e6
-2569 3 6 40 0.65536000000000000000e5
-2569 3 8 37 -0.13107200000000000000e6
-2569 3 10 39 0.26214400000000000000e6
-2569 3 13 42 -0.10485760000000000000e7
-2569 3 14 27 0.52428800000000000000e6
-2569 3 25 38 -0.65536000000000000000e5
-2569 3 26 39 -0.65536000000000000000e5
-2569 3 28 41 -0.52428800000000000000e6
-2569 3 29 42 -0.26214400000000000000e6
-2569 4 3 31 0.52428800000000000000e6
-2569 4 4 16 -0.65536000000000000000e5
-2569 4 5 17 0.65536000000000000000e5
-2569 4 6 18 0.13107200000000000000e6
-2569 4 7 19 -0.13107200000000000000e6
-2569 4 8 20 -0.26214400000000000000e6
-2569 4 18 22 0.13107200000000000000e6
-2569 4 19 19 0.13107200000000000000e6
-2570 3 6 41 0.65536000000000000000e5
-2570 3 10 39 -0.65536000000000000000e5
-2571 1 9 40 0.65536000000000000000e5
-2571 1 11 42 -0.13107200000000000000e6
-2571 1 26 41 -0.65536000000000000000e5
-2571 1 33 48 0.13107200000000000000e6
-2571 3 6 42 0.65536000000000000000e5
-2571 3 10 39 0.65536000000000000000e5
-2571 3 29 42 0.13107200000000000000e6
-2571 4 18 22 0.65536000000000000000e5
-2572 3 6 43 0.65536000000000000000e5
-2572 3 11 40 -0.65536000000000000000e5
-2573 1 26 33 -0.65536000000000000000e5
-2573 1 33 40 0.65536000000000000000e5
-2573 3 6 44 0.65536000000000000000e5
-2574 1 11 42 0.65536000000000000000e5
-2574 1 26 33 0.65536000000000000000e5
-2574 1 33 40 -0.65536000000000000000e5
-2574 1 33 48 -0.65536000000000000000e5
-2574 3 6 45 0.65536000000000000000e5
-2574 3 14 43 -0.13107200000000000000e6
-2574 3 29 42 -0.65536000000000000000e5
-2574 4 22 22 0.13107200000000000000e6
-2575 3 6 46 0.65536000000000000000e5
-2575 3 26 35 -0.65536000000000000000e5
-2576 1 6 53 0.65536000000000000000e5
-2576 1 25 40 -0.65536000000000000000e5
-2576 3 6 47 0.65536000000000000000e5
-2577 3 6 48 0.65536000000000000000e5
-2577 3 26 39 -0.65536000000000000000e5
-2578 1 6 53 -0.65536000000000000000e5
-2578 1 25 40 0.65536000000000000000e5
-2578 3 5 50 0.13107200000000000000e6
-2578 3 6 49 0.65536000000000000000e5
-2578 3 26 39 0.65536000000000000000e5
-2578 3 27 40 0.13107200000000000000e6
-2578 3 29 42 -0.26214400000000000000e6
-2578 4 5 33 0.65536000000000000000e5
-2578 4 18 30 0.13107200000000000000e6
-2579 3 5 50 0.65536000000000000000e5
-2579 3 6 50 0.65536000000000000000e5
-2579 3 27 40 0.65536000000000000000e5
-2579 3 29 42 -0.13107200000000000000e6
-2579 4 18 30 0.65536000000000000000e5
-2580 3 6 52 0.65536000000000000000e5
-2580 3 30 43 -0.65536000000000000000e5
-2581 3 6 53 0.65536000000000000000e5
-2581 3 39 40 -0.65536000000000000000e5
-2582 1 6 53 0.65536000000000000000e5
-2582 1 25 56 -0.65536000000000000000e5
-2582 3 6 54 0.65536000000000000000e5
-2582 3 10 55 0.26214400000000000000e6
-2582 3 22 51 -0.13107200000000000000e6
-2582 3 23 52 0.26214400000000000000e6
-2582 3 24 53 0.65536000000000000000e5
-2582 3 25 54 0.65536000000000000000e5
-2582 3 35 48 -0.52428800000000000000e6
-2582 3 38 51 -0.13107200000000000000e6
-2582 3 39 40 0.65536000000000000000e5
-2582 3 40 45 0.26214400000000000000e6
-2582 4 7 35 -0.13107200000000000000e6
-2582 4 21 33 0.13107200000000000000e6
-2582 4 22 34 0.26214400000000000000e6
-2582 4 28 28 0.13107200000000000000e6
-2582 4 28 32 0.65536000000000000000e5
-2583 1 1 48 0.65536000000000000000e5
-2583 1 2 49 0.65536000000000000000e5
-2583 1 8 39 0.13107200000000000000e6
-2583 1 9 40 0.13107200000000000000e6
-2583 1 10 41 -0.26214400000000000000e6
-2583 1 12 43 -0.52428800000000000000e6
-2583 1 23 38 0.65536000000000000000e5
-2583 1 26 41 -0.13107200000000000000e6
-2583 1 28 43 0.52428800000000000000e6
-2583 1 32 47 0.52428800000000000000e6
-2583 1 33 48 -0.26214400000000000000e6
-2583 1 40 55 0.13107200000000000000e6
-2583 2 2 32 0.65536000000000000000e5
-2583 2 4 34 -0.13107200000000000000e6
-2583 2 16 30 0.13107200000000000000e6
-2583 2 20 34 0.26214400000000000000e6
-2583 2 28 34 0.13107200000000000000e6
-2583 3 5 50 -0.13107200000000000000e6
-2583 3 6 56 0.65536000000000000000e5
-2583 3 9 38 0.13107200000000000000e6
-2583 3 10 55 -0.26214400000000000000e6
-2583 3 22 35 0.52428800000000000000e6
-2583 3 22 51 0.13107200000000000000e6
-2583 3 23 52 -0.26214400000000000000e6
-2583 3 24 53 -0.65536000000000000000e5
-2583 3 27 40 -0.13107200000000000000e6
-2583 3 28 41 0.52428800000000000000e6
-2583 3 35 48 0.52428800000000000000e6
-2583 3 38 51 0.13107200000000000000e6
-2583 3 40 45 -0.26214400000000000000e6
-2583 4 2 30 0.13107200000000000000e6
-2583 4 6 34 0.26214400000000000000e6
-2583 4 7 35 0.13107200000000000000e6
-2583 4 19 35 0.65536000000000000000e5
-2583 4 22 34 -0.26214400000000000000e6
-2583 4 28 32 -0.65536000000000000000e5
-2584 1 1 48 -0.16384000000000000000e5
-2584 1 2 33 -0.65536000000000000000e5
-2584 1 2 49 -0.16384000000000000000e5
-2584 1 3 34 0.65536000000000000000e5
-2584 1 4 11 0.16384000000000000000e5
-2584 1 8 23 -0.16384000000000000000e5
-2584 1 8 39 -0.16384000000000000000e5
-2584 1 9 40 -0.16384000000000000000e5
-2584 1 10 41 -0.32768000000000000000e5
-2584 1 11 42 0.32768000000000000000e5
-2584 1 12 43 0.13107200000000000000e6
-2584 1 23 38 -0.16384000000000000000e5
-2584 1 26 41 0.16384000000000000000e5
-2584 1 28 43 -0.65536000000000000000e5
-2584 1 32 47 -0.98304000000000000000e5
-2584 1 33 48 -0.32768000000000000000e5
-2584 2 2 8 -0.16384000000000000000e5
-2584 2 2 32 -0.16384000000000000000e5
-2584 2 3 9 0.16384000000000000000e5
-2584 2 7 21 -0.32768000000000000000e5
-2584 2 12 26 -0.32768000000000000000e5
-2584 2 16 30 -0.16384000000000000000e5
-2584 2 20 34 -0.32768000000000000000e5
-2584 3 1 14 0.65536000000000000000e5
-2584 3 1 30 0.16384000000000000000e5
-2584 3 2 7 0.16384000000000000000e5
-2584 3 2 15 -0.32768000000000000000e5
-2584 3 3 32 -0.65536000000000000000e5
-2584 3 4 9 0.16384000000000000000e5
-2584 3 7 7 0.65536000000000000000e5
-2584 3 7 12 -0.65536000000000000000e5
-2584 3 8 37 -0.16384000000000000000e5
-2584 3 10 23 0.32768000000000000000e5
-2584 3 13 42 -0.65536000000000000000e5
-2584 3 22 35 -0.65536000000000000000e5
-2584 3 28 41 -0.98304000000000000000e5
-2584 3 29 42 -0.32768000000000000000e5
-2584 4 2 6 0.16384000000000000000e5
-2584 4 2 30 -0.16384000000000000000e5
-2584 4 3 31 0.32768000000000000000e5
-2584 4 6 6 0.65536000000000000000e5
-2584 4 6 18 0.16384000000000000000e5
-2584 4 6 34 -0.32768000000000000000e5
-2585 1 1 48 0.32768000000000000000e5
-2585 1 2 33 0.13107200000000000000e6
-2585 1 2 49 0.32768000000000000000e5
-2585 1 3 34 -0.13107200000000000000e6
-2585 1 4 11 -0.32768000000000000000e5
-2585 1 8 23 0.32768000000000000000e5
-2585 1 8 39 0.32768000000000000000e5
-2585 1 9 40 0.32768000000000000000e5
-2585 1 10 41 0.65536000000000000000e5
-2585 1 11 42 -0.65536000000000000000e5
-2585 1 12 43 -0.26214400000000000000e6
-2585 1 23 38 0.32768000000000000000e5
-2585 1 26 41 -0.32768000000000000000e5
-2585 1 28 43 0.13107200000000000000e6
-2585 1 32 47 0.19660800000000000000e6
-2585 1 33 48 0.65536000000000000000e5
-2585 2 2 8 0.32768000000000000000e5
-2585 2 2 32 0.32768000000000000000e5
-2585 2 3 9 -0.32768000000000000000e5
-2585 2 7 21 0.65536000000000000000e5
-2585 2 12 26 0.65536000000000000000e5
-2585 2 16 30 0.32768000000000000000e5
-2585 2 20 34 0.65536000000000000000e5
-2585 3 1 14 -0.65536000000000000000e5
-2585 3 1 30 -0.32768000000000000000e5
-2585 3 2 7 -0.32768000000000000000e5
-2585 3 2 15 0.65536000000000000000e5
-2585 3 3 32 0.13107200000000000000e6
-2585 3 4 9 -0.32768000000000000000e5
-2585 3 7 8 0.65536000000000000000e5
-2585 3 8 37 0.32768000000000000000e5
-2585 3 10 23 -0.65536000000000000000e5
-2585 3 13 42 0.13107200000000000000e6
-2585 3 22 35 0.13107200000000000000e6
-2585 3 28 41 0.19660800000000000000e6
-2585 3 29 42 0.65536000000000000000e5
-2585 4 2 6 -0.32768000000000000000e5
-2585 4 2 30 0.32768000000000000000e5
-2585 4 3 31 -0.65536000000000000000e5
-2585 4 6 18 -0.32768000000000000000e5
-2585 4 6 34 0.65536000000000000000e5
-2586 3 1 14 -0.65536000000000000000e5
-2586 3 7 9 0.65536000000000000000e5
-2587 2 4 10 0.65536000000000000000e5
-2587 2 7 21 -0.65536000000000000000e5
-2587 3 1 14 0.65536000000000000000e5
-2587 3 2 15 0.65536000000000000000e5
-2587 3 3 16 -0.13107200000000000000e6
-2587 3 7 10 0.65536000000000000000e5
-2588 3 2 15 -0.65536000000000000000e5
-2588 3 7 11 0.65536000000000000000e5
-2589 1 2 17 -0.65536000000000000000e5
-2589 1 16 23 0.65536000000000000000e5
-2589 3 7 13 0.65536000000000000000e5
-2590 3 3 16 -0.65536000000000000000e5
-2590 3 7 14 0.65536000000000000000e5
-2591 1 3 18 -0.65536000000000000000e5
-2591 1 12 43 0.65536000000000000000e5
-2591 3 7 15 0.65536000000000000000e5
-2591 3 14 27 0.65536000000000000000e5
-2592 1 2 17 -0.32768000000000000000e5
-2592 1 16 23 0.32768000000000000000e5
-2592 3 3 16 -0.32768000000000000000e5
-2592 3 7 12 -0.32768000000000000000e5
-2592 3 7 16 0.65536000000000000000e5
-2592 4 1 13 -0.32768000000000000000e5
-2593 1 2 17 -0.32768000000000000000e5
-2593 1 3 34 -0.32768000000000000000e5
-2593 1 4 19 -0.65536000000000000000e5
-2593 1 4 35 -0.32768000000000000000e5
-2593 1 12 43 -0.65536000000000000000e5
-2593 1 14 45 -0.65536000000000000000e5
-2593 1 17 48 0.32768000000000000000e5
-2593 1 18 49 0.32768000000000000000e5
-2593 1 20 27 0.13107200000000000000e6
-2593 2 6 12 -0.32768000000000000000e5
-2593 2 9 23 -0.32768000000000000000e5
-2593 2 10 24 -0.65536000000000000000e5
-2593 2 14 28 0.32768000000000000000e5
-2593 3 4 17 0.32768000000000000000e5
-2593 3 5 34 -0.32768000000000000000e5
-2593 3 7 17 0.65536000000000000000e5
-2593 3 13 42 0.32768000000000000000e5
-2593 3 14 27 -0.65536000000000000000e5
-2593 3 14 43 0.32768000000000000000e5
-2593 4 2 14 0.32768000000000000000e5
-2594 1 3 18 -0.32768000000000000000e5
-2594 1 12 43 0.32768000000000000000e5
-2594 3 3 16 -0.32768000000000000000e5
-2594 3 4 17 -0.32768000000000000000e5
-2594 3 7 18 0.65536000000000000000e5
-2594 3 14 27 0.32768000000000000000e5
-2594 4 2 14 -0.32768000000000000000e5
-2595 1 2 17 -0.32768000000000000000e5
-2595 1 3 18 -0.16384000000000000000e5
-2595 1 3 34 -0.16384000000000000000e5
-2595 1 4 19 -0.32768000000000000000e5
-2595 1 4 35 -0.16384000000000000000e5
-2595 1 12 43 -0.16384000000000000000e5
-2595 1 14 45 -0.32768000000000000000e5
-2595 1 16 23 0.16384000000000000000e5
-2595 1 17 48 0.16384000000000000000e5
-2595 1 18 49 0.16384000000000000000e5
-2595 1 20 27 0.65536000000000000000e5
-2595 2 6 12 -0.16384000000000000000e5
-2595 2 9 23 -0.16384000000000000000e5
-2595 2 10 24 -0.32768000000000000000e5
-2595 2 14 28 0.16384000000000000000e5
-2595 3 3 16 -0.32768000000000000000e5
-2595 3 5 34 -0.16384000000000000000e5
-2595 3 7 12 -0.16384000000000000000e5
-2595 3 7 19 0.65536000000000000000e5
-2595 3 13 42 0.16384000000000000000e5
-2595 3 14 27 -0.16384000000000000000e5
-2595 3 14 43 0.16384000000000000000e5
-2595 4 1 13 -0.16384000000000000000e5
-2595 4 10 10 -0.65536000000000000000e5
-2596 3 7 21 0.65536000000000000000e5
-2596 3 8 21 0.65536000000000000000e5
-2596 3 12 21 -0.13107200000000000000e6
-2596 3 14 19 0.65536000000000000000e5
-2596 4 13 13 0.13107200000000000000e6
-2597 1 1 24 -0.32768000000000000000e5
-2597 1 1 40 -0.32768000000000000000e5
-2597 1 22 37 0.32768000000000000000e5
-2597 1 23 38 0.32768000000000000000e5
-2597 2 2 16 -0.32768000000000000000e5
-2597 2 16 16 0.65536000000000000000e5
-2597 3 1 22 -0.32768000000000000000e5
-2597 3 1 38 -0.32768000000000000000e5
-2597 3 2 23 -0.32768000000000000000e5
-2597 3 7 22 0.65536000000000000000e5
-2597 3 22 27 0.65536000000000000000e5
-2597 4 16 16 -0.65536000000000000000e5
-2598 1 7 38 0.65536000000000000000e5
-2598 1 8 23 -0.65536000000000000000e5
-2598 3 7 23 0.65536000000000000000e5
-2599 1 2 33 -0.13107200000000000000e6
-2599 1 11 42 0.13107200000000000000e6
-2599 1 12 43 0.26214400000000000000e6
-2599 1 28 43 -0.13107200000000000000e6
-2599 1 32 47 -0.13107200000000000000e6
-2599 1 33 48 -0.13107200000000000000e6
-2599 2 12 26 -0.13107200000000000000e6
-2599 3 1 30 0.65536000000000000000e5
-2599 3 7 24 0.65536000000000000000e5
-2599 3 10 23 0.65536000000000000000e5
-2599 3 13 42 -0.26214400000000000000e6
-2599 3 28 41 -0.13107200000000000000e6
-2599 3 29 42 -0.13107200000000000000e6
-2599 4 3 31 0.13107200000000000000e6
-2599 4 6 18 0.65536000000000000000e5
-2600 3 1 30 -0.65536000000000000000e5
-2600 3 7 25 0.65536000000000000000e5
-2601 3 7 26 0.65536000000000000000e5
-2601 3 10 23 -0.65536000000000000000e5
-2602 1 1 32 -0.65536000000000000000e5
-2602 1 2 33 0.65536000000000000000e5
-2602 1 3 34 -0.13107200000000000000e6
-2602 1 10 41 0.65536000000000000000e5
-2602 1 11 42 -0.65536000000000000000e5
-2602 1 12 43 -0.13107200000000000000e6
-2602 1 16 23 0.13107200000000000000e6
-2602 1 28 43 0.65536000000000000000e5
-2602 1 32 47 0.65536000000000000000e5
-2602 1 33 48 0.65536000000000000000e5
-2602 2 1 31 -0.65536000000000000000e5
-2602 2 7 21 0.65536000000000000000e5
-2602 2 12 26 0.65536000000000000000e5
-2602 3 1 34 -0.13107200000000000000e6
-2602 3 2 31 0.65536000000000000000e5
-2602 3 3 32 0.65536000000000000000e5
-2602 3 7 27 0.65536000000000000000e5
-2602 3 13 42 0.13107200000000000000e6
-2602 3 28 41 0.65536000000000000000e5
-2602 3 29 42 0.65536000000000000000e5
-2602 4 3 31 -0.65536000000000000000e5
-2603 3 2 31 -0.65536000000000000000e5
-2603 3 7 28 0.65536000000000000000e5
-2604 1 2 33 -0.65536000000000000000e5
-2604 1 11 42 0.65536000000000000000e5
-2604 1 12 43 0.13107200000000000000e6
-2604 1 28 43 -0.65536000000000000000e5
-2604 1 32 47 -0.65536000000000000000e5
-2604 1 33 48 -0.65536000000000000000e5
-2604 2 12 26 -0.65536000000000000000e5
-2604 3 7 29 0.65536000000000000000e5
-2604 3 13 42 -0.13107200000000000000e6
-2604 3 28 41 -0.65536000000000000000e5
-2604 3 29 42 -0.65536000000000000000e5
-2604 4 3 31 0.65536000000000000000e5
-2605 3 3 32 -0.65536000000000000000e5
-2605 3 7 30 0.65536000000000000000e5
-2606 3 1 34 -0.65536000000000000000e5
-2606 3 7 31 0.65536000000000000000e5
-2607 1 3 34 -0.65536000000000000000e5
-2607 1 16 47 0.65536000000000000000e5
-2607 3 7 32 0.65536000000000000000e5
-2607 3 12 41 0.65536000000000000000e5
-2608 3 7 33 0.65536000000000000000e5
-2608 3 14 27 -0.65536000000000000000e5
-2609 1 3 18 -0.32768000000000000000e5
-2609 1 4 19 0.65536000000000000000e5
-2609 1 4 35 0.32768000000000000000e5
-2609 1 12 43 0.65536000000000000000e5
-2609 1 14 45 0.65536000000000000000e5
-2609 1 17 48 -0.32768000000000000000e5
-2609 1 18 49 -0.32768000000000000000e5
-2609 1 20 27 -0.13107200000000000000e6
-2609 1 27 34 0.65536000000000000000e5
-2609 2 9 23 0.32768000000000000000e5
-2609 2 10 24 0.65536000000000000000e5
-2609 2 14 28 -0.32768000000000000000e5
-2609 3 3 16 -0.32768000000000000000e5
-2609 3 4 17 -0.32768000000000000000e5
-2609 3 5 34 0.32768000000000000000e5
-2609 3 7 34 0.65536000000000000000e5
-2609 3 13 42 -0.32768000000000000000e5
-2609 3 14 27 0.65536000000000000000e5
-2609 3 14 43 -0.32768000000000000000e5
-2609 4 2 14 -0.32768000000000000000e5
-2610 1 3 18 0.32768000000000000000e5
-2610 1 4 19 -0.65536000000000000000e5
-2610 1 12 43 -0.32768000000000000000e5
-2610 1 13 44 0.65536000000000000000e5
-2610 3 3 16 0.32768000000000000000e5
-2610 3 4 17 0.32768000000000000000e5
-2610 3 7 35 0.65536000000000000000e5
-2610 3 14 27 -0.32768000000000000000e5
-2610 4 2 14 0.32768000000000000000e5
-2611 3 7 37 0.65536000000000000000e5
-2611 3 22 27 -0.65536000000000000000e5
-2612 3 7 38 0.65536000000000000000e5
-2612 3 8 37 -0.65536000000000000000e5
-2613 1 9 40 0.65536000000000000000e5
-2613 1 10 41 -0.13107200000000000000e6
-2613 1 26 41 -0.65536000000000000000e5
-2613 1 32 47 0.13107200000000000000e6
-2613 3 7 39 0.65536000000000000000e5
-2613 3 9 38 0.65536000000000000000e5
-2613 3 28 41 0.13107200000000000000e6
-2613 4 2 30 0.65536000000000000000e5
-2614 3 7 40 0.65536000000000000000e5
-2614 3 9 38 -0.65536000000000000000e5
-2615 1 9 40 0.32768000000000000000e5
-2615 1 10 41 -0.65536000000000000000e5
-2615 1 26 41 -0.32768000000000000000e5
-2615 1 32 47 0.65536000000000000000e5
-2615 3 7 41 0.65536000000000000000e5
-2615 3 8 37 -0.32768000000000000000e5
-2615 3 9 38 0.32768000000000000000e5
-2615 3 22 27 -0.32768000000000000000e5
-2615 3 28 41 0.65536000000000000000e5
-2615 4 1 29 -0.32768000000000000000e5
-2615 4 2 30 0.32768000000000000000e5
-2616 1 11 42 -0.65536000000000000000e5
-2616 1 33 48 0.65536000000000000000e5
-2616 2 12 26 0.65536000000000000000e5
-2616 2 20 34 -0.65536000000000000000e5
-2616 3 7 42 0.65536000000000000000e5
-2616 3 13 42 0.13107200000000000000e6
-2616 3 22 35 -0.13107200000000000000e6
-2616 3 29 42 0.65536000000000000000e5
-2616 4 3 31 -0.65536000000000000000e5
-2616 4 6 34 -0.65536000000000000000e5
-2617 1 10 41 -0.65536000000000000000e5
-2617 1 32 47 0.65536000000000000000e5
-2617 3 7 43 0.65536000000000000000e5
-2617 3 28 41 0.65536000000000000000e5
-2618 3 7 44 0.65536000000000000000e5
-2618 3 12 41 -0.65536000000000000000e5
-2619 3 7 45 0.65536000000000000000e5
-2619 3 22 35 -0.65536000000000000000e5
-2620 1 13 44 -0.65536000000000000000e5
-2620 1 34 41 0.65536000000000000000e5
-2620 3 7 46 0.65536000000000000000e5
-2621 1 6 53 0.32768000000000000000e5
-2621 1 25 40 -0.32768000000000000000e5
-2621 2 4 34 0.65536000000000000000e5
-2621 2 16 30 0.65536000000000000000e5
-2621 2 16 34 -0.65536000000000000000e5
-2621 2 21 35 -0.65536000000000000000e5
-2621 3 5 50 0.65536000000000000000e5
-2621 3 7 47 0.65536000000000000000e5
-2621 3 7 52 -0.26214400000000000000e6
-2621 3 24 37 0.32768000000000000000e5
-2621 3 27 40 0.65536000000000000000e5
-2621 3 28 41 0.26214400000000000000e6
-2621 4 4 32 -0.32768000000000000000e5
-2621 4 6 34 0.13107200000000000000e6
-2621 4 7 35 -0.65536000000000000000e5
-2621 4 16 28 0.32768000000000000000e5
-2621 4 17 29 -0.65536000000000000000e5
-2622 1 6 53 0.32768000000000000000e5
-2622 1 25 40 -0.32768000000000000000e5
-2622 3 7 48 0.65536000000000000000e5
-2622 3 24 37 0.32768000000000000000e5
-2622 3 27 40 0.13107200000000000000e6
-2622 3 28 41 -0.13107200000000000000e6
-2622 4 4 32 -0.32768000000000000000e5
-2622 4 16 28 0.32768000000000000000e5
-2622 4 17 29 0.65536000000000000000e5
-2623 1 6 53 -0.32768000000000000000e5
-2623 1 25 40 0.32768000000000000000e5
-2623 3 7 49 0.65536000000000000000e5
-2623 3 24 37 -0.32768000000000000000e5
-2623 3 27 40 -0.65536000000000000000e5
-2623 4 4 32 0.32768000000000000000e5
-2623 4 16 28 -0.32768000000000000000e5
-2624 1 6 53 0.16384000000000000000e5
-2624 1 25 40 -0.16384000000000000000e5
-2624 2 4 34 0.32768000000000000000e5
-2624 2 21 35 -0.32768000000000000000e5
-2624 3 5 50 0.32768000000000000000e5
-2624 3 7 50 0.65536000000000000000e5
-2624 3 7 52 -0.13107200000000000000e6
-2624 3 24 37 0.16384000000000000000e5
-2624 3 27 40 0.65536000000000000000e5
-2624 3 28 41 0.65536000000000000000e5
-2624 4 4 32 -0.16384000000000000000e5
-2624 4 6 34 0.65536000000000000000e5
-2624 4 7 35 -0.32768000000000000000e5
-2624 4 16 28 0.16384000000000000000e5
-2625 3 7 51 0.65536000000000000000e5
-2625 3 28 41 -0.65536000000000000000e5
-2626 1 24 55 -0.65536000000000000000e5
-2626 1 26 41 0.65536000000000000000e5
-2626 1 32 47 -0.13107200000000000000e6
-2626 1 37 52 0.13107200000000000000e6
-2626 3 7 53 0.65536000000000000000e5
-2626 3 22 51 0.65536000000000000000e5
-2626 3 27 40 -0.65536000000000000000e5
-2626 4 20 32 0.65536000000000000000e5
-2627 3 7 54 0.65536000000000000000e5
-2627 3 22 51 -0.65536000000000000000e5
-2628 1 32 47 -0.65536000000000000000e5
-2628 1 37 52 0.65536000000000000000e5
-2628 3 7 55 0.65536000000000000000e5
-2629 3 7 56 0.65536000000000000000e5
-2629 3 37 50 -0.65536000000000000000e5
-2630 3 1 14 -0.32768000000000000000e5
-2630 3 8 8 0.65536000000000000000e5
-2631 2 4 10 0.65536000000000000000e5
-2631 2 7 21 -0.65536000000000000000e5
-2631 3 1 14 0.65536000000000000000e5
-2631 3 2 15 0.65536000000000000000e5
-2631 3 3 16 -0.13107200000000000000e6
-2631 3 8 9 0.65536000000000000000e5
-2632 3 2 15 -0.65536000000000000000e5
-2632 3 8 10 0.65536000000000000000e5
-2633 1 2 33 -0.65536000000000000000e5
-2633 1 6 13 -0.65536000000000000000e5
-2633 1 10 41 -0.65536000000000000000e5
-2633 1 12 43 0.13107200000000000000e6
-2633 2 12 26 -0.65536000000000000000e5
-2633 3 3 32 -0.65536000000000000000e5
-2633 3 8 11 0.65536000000000000000e5
-2633 3 14 27 0.13107200000000000000e6
-2633 4 8 20 -0.65536000000000000000e5
-2634 1 2 17 -0.65536000000000000000e5
-2634 1 16 23 0.65536000000000000000e5
-2634 3 8 12 0.65536000000000000000e5
-2635 3 3 16 -0.65536000000000000000e5
-2635 3 8 13 0.65536000000000000000e5
-2636 1 3 18 -0.65536000000000000000e5
-2636 1 12 43 0.65536000000000000000e5
-2636 3 8 14 0.65536000000000000000e5
-2636 3 14 27 0.65536000000000000000e5
-2637 3 4 17 -0.65536000000000000000e5
-2637 3 8 15 0.65536000000000000000e5
-2638 1 2 17 -0.32768000000000000000e5
-2638 1 3 34 -0.32768000000000000000e5
-2638 1 4 19 -0.65536000000000000000e5
-2638 1 4 35 -0.32768000000000000000e5
-2638 1 12 43 -0.65536000000000000000e5
-2638 1 14 45 -0.65536000000000000000e5
-2638 1 17 48 0.32768000000000000000e5
-2638 1 18 49 0.32768000000000000000e5
-2638 1 20 27 0.13107200000000000000e6
-2638 2 6 12 -0.32768000000000000000e5
-2638 2 9 23 -0.32768000000000000000e5
-2638 2 10 24 -0.65536000000000000000e5
-2638 2 14 28 0.32768000000000000000e5
-2638 3 4 17 0.32768000000000000000e5
-2638 3 5 34 -0.32768000000000000000e5
-2638 3 8 16 0.65536000000000000000e5
-2638 3 13 42 0.32768000000000000000e5
-2638 3 14 27 -0.65536000000000000000e5
-2638 3 14 43 0.32768000000000000000e5
-2638 4 2 14 0.32768000000000000000e5
-2639 1 3 18 -0.32768000000000000000e5
-2639 1 12 43 0.32768000000000000000e5
-2639 3 3 16 -0.32768000000000000000e5
-2639 3 4 17 -0.32768000000000000000e5
-2639 3 8 17 0.65536000000000000000e5
-2639 3 14 27 0.32768000000000000000e5
-2639 4 2 14 -0.32768000000000000000e5
-2640 1 4 35 0.32768000000000000000e5
-2640 1 10 17 -0.65536000000000000000e5
-2640 1 12 43 0.32768000000000000000e5
-2640 1 14 45 0.65536000000000000000e5
-2640 1 17 48 -0.32768000000000000000e5
-2640 1 18 49 -0.32768000000000000000e5
-2640 2 9 23 0.32768000000000000000e5
-2640 2 14 28 -0.32768000000000000000e5
-2640 3 5 34 0.32768000000000000000e5
-2640 3 8 18 0.65536000000000000000e5
-2640 3 13 42 -0.32768000000000000000e5
-2640 3 14 27 0.32768000000000000000e5
-2640 3 14 43 -0.32768000000000000000e5
-2641 3 7 20 -0.65536000000000000000e5
-2641 3 8 19 0.65536000000000000000e5
-2642 1 3 18 -0.16384000000000000000e5
-2642 1 4 35 0.16384000000000000000e5
-2642 1 5 20 -0.32768000000000000000e5
-2642 1 5 36 0.32768000000000000000e5
-2642 1 10 17 -0.32768000000000000000e5
-2642 1 12 43 0.32768000000000000000e5
-2642 1 14 45 0.32768000000000000000e5
-2642 1 17 48 -0.16384000000000000000e5
-2642 1 18 49 -0.16384000000000000000e5
-2642 2 9 23 0.16384000000000000000e5
-2642 2 14 28 -0.16384000000000000000e5
-2642 3 3 16 -0.16384000000000000000e5
-2642 3 4 17 -0.16384000000000000000e5
-2642 3 5 34 0.16384000000000000000e5
-2642 3 8 20 0.65536000000000000000e5
-2642 3 13 42 -0.16384000000000000000e5
-2642 3 14 27 0.32768000000000000000e5
-2642 3 14 43 -0.16384000000000000000e5
-2642 4 2 14 -0.16384000000000000000e5
-2642 4 3 15 -0.32768000000000000000e5
-2643 1 7 38 0.65536000000000000000e5
-2643 1 8 23 -0.65536000000000000000e5
-2643 3 8 22 0.65536000000000000000e5
-2644 1 2 33 -0.13107200000000000000e6
-2644 1 11 42 0.13107200000000000000e6
-2644 1 12 43 0.26214400000000000000e6
-2644 1 28 43 -0.13107200000000000000e6
-2644 1 32 47 -0.13107200000000000000e6
-2644 1 33 48 -0.13107200000000000000e6
-2644 2 12 26 -0.13107200000000000000e6
-2644 3 1 30 0.65536000000000000000e5
-2644 3 8 23 0.65536000000000000000e5
-2644 3 10 23 0.65536000000000000000e5
-2644 3 13 42 -0.26214400000000000000e6
-2644 3 28 41 -0.13107200000000000000e6
-2644 3 29 42 -0.13107200000000000000e6
-2644 4 3 31 0.13107200000000000000e6
-2644 4 6 18 0.65536000000000000000e5
-2645 3 1 30 -0.65536000000000000000e5
-2645 3 8 24 0.65536000000000000000e5
-2646 3 8 25 0.65536000000000000000e5
-2646 3 10 23 -0.65536000000000000000e5
-2647 1 9 40 0.65536000000000000000e5
-2647 1 10 25 -0.65536000000000000000e5
-2647 3 8 26 0.65536000000000000000e5
-2648 3 2 31 -0.65536000000000000000e5
-2648 3 8 27 0.65536000000000000000e5
-2649 1 2 33 -0.65536000000000000000e5
-2649 1 11 42 0.65536000000000000000e5
-2649 1 12 43 0.13107200000000000000e6
-2649 1 28 43 -0.65536000000000000000e5
-2649 1 32 47 -0.65536000000000000000e5
-2649 1 33 48 -0.65536000000000000000e5
-2649 2 12 26 -0.65536000000000000000e5
-2649 3 8 28 0.65536000000000000000e5
-2649 3 13 42 -0.13107200000000000000e6
-2649 3 28 41 -0.65536000000000000000e5
-2649 3 29 42 -0.65536000000000000000e5
-2649 4 3 31 0.65536000000000000000e5
-2650 3 3 32 -0.65536000000000000000e5
-2650 3 8 29 0.65536000000000000000e5
-2651 1 2 33 0.65536000000000000000e5
-2651 1 11 42 -0.65536000000000000000e5
-2651 1 12 43 -0.13107200000000000000e6
-2651 1 28 43 0.65536000000000000000e5
-2651 1 32 47 0.65536000000000000000e5
-2651 1 33 48 0.65536000000000000000e5
-2651 2 12 26 0.65536000000000000000e5
-2651 3 3 32 0.65536000000000000000e5
-2651 3 8 30 0.65536000000000000000e5
-2651 3 13 42 0.13107200000000000000e6
-2651 3 14 27 -0.13107200000000000000e6
-2651 3 28 41 0.65536000000000000000e5
-2651 3 29 42 0.65536000000000000000e5
-2651 4 3 31 -0.65536000000000000000e5
-2651 4 8 20 0.65536000000000000000e5
-2652 1 3 34 -0.65536000000000000000e5
-2652 1 16 47 0.65536000000000000000e5
-2652 3 8 31 0.65536000000000000000e5
-2652 3 12 41 0.65536000000000000000e5
-2653 3 8 32 0.65536000000000000000e5
-2653 3 14 27 -0.65536000000000000000e5
-2654 1 4 35 -0.65536000000000000000e5
-2654 1 17 48 0.65536000000000000000e5
-2654 3 8 33 0.65536000000000000000e5
-2654 3 13 42 0.65536000000000000000e5
-2655 1 3 18 0.32768000000000000000e5
-2655 1 4 19 -0.65536000000000000000e5
-2655 1 12 43 -0.32768000000000000000e5
-2655 1 13 44 0.65536000000000000000e5
-2655 3 3 16 0.32768000000000000000e5
-2655 3 4 17 0.32768000000000000000e5
-2655 3 8 34 0.65536000000000000000e5
-2655 3 14 27 -0.32768000000000000000e5
-2655 4 2 14 0.32768000000000000000e5
-2656 3 8 35 0.65536000000000000000e5
-2656 3 16 29 -0.65536000000000000000e5
-2657 1 3 18 0.16384000000000000000e5
-2657 1 4 19 -0.32768000000000000000e5
-2657 1 5 36 -0.32768000000000000000e5
-2657 1 12 43 -0.16384000000000000000e5
-2657 1 13 44 0.32768000000000000000e5
-2657 1 14 45 0.32768000000000000000e5
-2657 3 3 16 0.16384000000000000000e5
-2657 3 4 17 0.16384000000000000000e5
-2657 3 8 36 0.65536000000000000000e5
-2657 3 14 27 -0.16384000000000000000e5
-2657 3 16 29 -0.32768000000000000000e5
-2657 4 2 14 0.16384000000000000000e5
-2657 4 11 23 -0.32768000000000000000e5
-2658 1 9 40 0.65536000000000000000e5
-2658 1 10 41 -0.13107200000000000000e6
-2658 1 26 41 -0.65536000000000000000e5
-2658 1 32 47 0.13107200000000000000e6
-2658 3 8 38 0.65536000000000000000e5
-2658 3 9 38 0.65536000000000000000e5
-2658 3 28 41 0.13107200000000000000e6
-2658 4 2 30 0.65536000000000000000e5
-2659 3 8 39 0.65536000000000000000e5
-2659 3 9 38 -0.65536000000000000000e5
-2660 1 9 40 -0.65536000000000000000e5
-2660 1 26 41 0.65536000000000000000e5
-2660 3 8 40 0.65536000000000000000e5
-2661 1 11 42 -0.65536000000000000000e5
-2661 1 33 48 0.65536000000000000000e5
-2661 2 12 26 0.65536000000000000000e5
-2661 2 20 34 -0.65536000000000000000e5
-2661 3 8 41 0.65536000000000000000e5
-2661 3 13 42 0.13107200000000000000e6
-2661 3 22 35 -0.13107200000000000000e6
-2661 3 29 42 0.65536000000000000000e5
-2661 4 3 31 -0.65536000000000000000e5
-2661 4 6 34 -0.65536000000000000000e5
-2662 1 10 41 -0.65536000000000000000e5
-2662 1 32 47 0.65536000000000000000e5
-2662 3 8 42 0.65536000000000000000e5
-2662 3 28 41 0.65536000000000000000e5
-2663 1 10 41 0.65536000000000000000e5
-2663 1 11 42 0.65536000000000000000e5
-2663 1 32 47 -0.65536000000000000000e5
-2663 1 33 48 -0.65536000000000000000e5
-2663 3 8 43 0.65536000000000000000e5
-2663 3 13 42 -0.13107200000000000000e6
-2663 3 28 41 -0.65536000000000000000e5
-2663 3 29 42 -0.65536000000000000000e5
-2663 4 3 31 0.65536000000000000000e5
-2664 3 8 44 0.65536000000000000000e5
-2664 3 22 35 -0.65536000000000000000e5
-2665 3 8 45 0.65536000000000000000e5
-2665 3 13 42 -0.65536000000000000000e5
-2666 1 14 45 -0.65536000000000000000e5
-2666 1 17 48 0.32768000000000000000e5
-2666 1 18 49 0.32768000000000000000e5
-2666 1 34 49 0.32768000000000000000e5
-2666 2 14 28 0.32768000000000000000e5
-2666 3 8 46 0.65536000000000000000e5
-2666 3 14 43 0.32768000000000000000e5
-2666 3 18 47 0.32768000000000000000e5
-2666 3 22 35 -0.32768000000000000000e5
-2666 4 14 26 -0.32768000000000000000e5
-2667 1 6 53 0.32768000000000000000e5
-2667 1 25 40 -0.32768000000000000000e5
-2667 3 8 47 0.65536000000000000000e5
-2667 3 24 37 0.32768000000000000000e5
-2667 3 27 40 0.13107200000000000000e6
-2667 3 28 41 -0.13107200000000000000e6
-2667 4 4 32 -0.32768000000000000000e5
-2667 4 16 28 0.32768000000000000000e5
-2667 4 17 29 0.65536000000000000000e5
-2668 1 6 53 -0.32768000000000000000e5
-2668 1 25 40 0.32768000000000000000e5
-2668 3 8 48 0.65536000000000000000e5
-2668 3 24 37 -0.32768000000000000000e5
-2668 3 27 40 -0.65536000000000000000e5
-2668 4 4 32 0.32768000000000000000e5
-2668 4 16 28 -0.32768000000000000000e5
-2669 3 8 49 0.65536000000000000000e5
-2669 3 27 40 -0.65536000000000000000e5
-2670 3 8 50 0.65536000000000000000e5
-2670 3 28 41 -0.65536000000000000000e5
-2671 1 6 53 -0.16384000000000000000e5
-2671 1 25 40 0.16384000000000000000e5
-2671 2 4 34 -0.32768000000000000000e5
-2671 2 21 35 0.32768000000000000000e5
-2671 3 5 50 -0.32768000000000000000e5
-2671 3 8 51 0.65536000000000000000e5
-2671 3 24 37 -0.16384000000000000000e5
-2671 3 27 40 -0.65536000000000000000e5
-2671 4 4 32 0.16384000000000000000e5
-2671 4 7 35 0.32768000000000000000e5
-2671 4 16 28 -0.16384000000000000000e5
-2672 1 6 53 -0.81920000000000000000e4
-2672 1 25 40 0.81920000000000000000e4
-2672 2 4 34 -0.16384000000000000000e5
-2672 2 21 35 0.16384000000000000000e5
-2672 3 5 50 -0.16384000000000000000e5
-2672 3 8 52 0.65536000000000000000e5
-2672 3 24 37 -0.81920000000000000000e4
-2672 3 27 40 -0.32768000000000000000e5
-2672 3 28 41 -0.32768000000000000000e5
-2672 3 29 42 -0.32768000000000000000e5
-2672 4 4 32 0.81920000000000000000e4
-2672 4 7 35 0.16384000000000000000e5
-2672 4 16 28 -0.81920000000000000000e4
-2672 4 23 27 -0.32768000000000000000e5
-2673 3 8 53 0.65536000000000000000e5
-2673 3 22 51 -0.65536000000000000000e5
-2674 1 24 55 0.65536000000000000000e5
-2674 1 26 41 -0.65536000000000000000e5
-2674 3 8 54 0.65536000000000000000e5
-2674 3 27 40 0.65536000000000000000e5
-2675 3 8 55 0.65536000000000000000e5
-2675 3 23 52 -0.65536000000000000000e5
-2676 1 24 55 -0.65536000000000000000e5
-2676 1 41 56 0.65536000000000000000e5
-2676 3 8 56 0.65536000000000000000e5
-2676 3 27 56 0.65536000000000000000e5
-2677 3 2 15 -0.32768000000000000000e5
-2677 3 9 9 0.65536000000000000000e5
-2678 1 2 33 -0.65536000000000000000e5
-2678 1 6 13 -0.65536000000000000000e5
-2678 1 10 41 -0.65536000000000000000e5
-2678 1 12 43 0.13107200000000000000e6
-2678 2 12 26 -0.65536000000000000000e5
-2678 3 3 32 -0.65536000000000000000e5
-2678 3 9 10 0.65536000000000000000e5
-2678 3 14 27 0.13107200000000000000e6
-2678 4 8 20 -0.65536000000000000000e5
-2679 1 4 35 -0.13107200000000000000e6
-2679 1 6 13 0.65536000000000000000e5
-2679 1 10 41 0.65536000000000000000e5
-2679 1 11 42 0.65536000000000000000e5
-2679 2 5 11 0.65536000000000000000e5
-2679 3 2 15 0.65536000000000000000e5
-2679 3 3 32 0.65536000000000000000e5
-2679 3 4 17 -0.13107200000000000000e6
-2679 3 4 33 0.65536000000000000000e5
-2679 3 9 11 0.65536000000000000000e5
-2680 3 3 16 -0.65536000000000000000e5
-2680 3 9 12 0.65536000000000000000e5
-2681 1 3 18 -0.65536000000000000000e5
-2681 1 12 43 0.65536000000000000000e5
-2681 3 9 13 0.65536000000000000000e5
-2681 3 14 27 0.65536000000000000000e5
-2682 3 4 17 -0.65536000000000000000e5
-2682 3 9 14 0.65536000000000000000e5
-2683 1 5 20 -0.13107200000000000000e6
-2683 1 5 36 0.13107200000000000000e6
-2683 3 4 17 0.65536000000000000000e5
-2683 3 5 18 0.65536000000000000000e5
-2683 3 9 15 0.65536000000000000000e5
-2683 4 8 12 0.65536000000000000000e5
-2684 1 3 18 -0.32768000000000000000e5
-2684 1 12 43 0.32768000000000000000e5
-2684 3 3 16 -0.32768000000000000000e5
-2684 3 4 17 -0.32768000000000000000e5
-2684 3 9 16 0.65536000000000000000e5
-2684 3 14 27 0.32768000000000000000e5
-2684 4 2 14 -0.32768000000000000000e5
-2685 1 4 35 0.32768000000000000000e5
-2685 1 10 17 -0.65536000000000000000e5
-2685 1 12 43 0.32768000000000000000e5
-2685 1 14 45 0.65536000000000000000e5
-2685 1 17 48 -0.32768000000000000000e5
-2685 1 18 49 -0.32768000000000000000e5
-2685 2 9 23 0.32768000000000000000e5
-2685 2 14 28 -0.32768000000000000000e5
-2685 3 5 34 0.32768000000000000000e5
-2685 3 9 17 0.65536000000000000000e5
-2685 3 13 42 -0.32768000000000000000e5
-2685 3 14 27 0.32768000000000000000e5
-2685 3 14 43 -0.32768000000000000000e5
-2686 1 5 20 -0.65536000000000000000e5
-2686 1 5 36 0.65536000000000000000e5
-2686 3 9 18 0.65536000000000000000e5
-2687 1 3 18 -0.16384000000000000000e5
-2687 1 4 35 0.16384000000000000000e5
-2687 1 5 20 -0.32768000000000000000e5
-2687 1 5 36 0.32768000000000000000e5
-2687 1 10 17 -0.32768000000000000000e5
-2687 1 12 43 0.32768000000000000000e5
-2687 1 14 45 0.32768000000000000000e5
-2687 1 17 48 -0.16384000000000000000e5
-2687 1 18 49 -0.16384000000000000000e5
-2687 2 9 23 0.16384000000000000000e5
-2687 2 14 28 -0.16384000000000000000e5
-2687 3 3 16 -0.16384000000000000000e5
-2687 3 4 17 -0.16384000000000000000e5
-2687 3 5 34 0.16384000000000000000e5
-2687 3 9 19 0.65536000000000000000e5
-2687 3 13 42 -0.16384000000000000000e5
-2687 3 14 27 0.32768000000000000000e5
-2687 3 14 43 -0.16384000000000000000e5
-2687 4 2 14 -0.16384000000000000000e5
-2687 4 3 15 -0.32768000000000000000e5
-2688 1 3 18 0.16384000000000000000e5
-2688 1 4 35 -0.16384000000000000000e5
-2688 1 5 20 0.32768000000000000000e5
-2688 1 5 36 -0.32768000000000000000e5
-2688 1 10 17 0.32768000000000000000e5
-2688 1 12 43 -0.32768000000000000000e5
-2688 1 14 45 -0.32768000000000000000e5
-2688 1 17 48 0.16384000000000000000e5
-2688 1 18 49 0.16384000000000000000e5
-2688 2 9 23 -0.16384000000000000000e5
-2688 2 14 28 0.16384000000000000000e5
-2688 3 3 16 0.16384000000000000000e5
-2688 3 4 17 0.16384000000000000000e5
-2688 3 5 34 -0.16384000000000000000e5
-2688 3 7 20 0.65536000000000000000e5
-2688 3 8 21 -0.13107200000000000000e6
-2688 3 9 20 0.65536000000000000000e5
-2688 3 13 42 0.16384000000000000000e5
-2688 3 14 27 -0.32768000000000000000e5
-2688 3 14 43 0.16384000000000000000e5
-2688 4 2 14 0.16384000000000000000e5
-2688 4 3 15 0.32768000000000000000e5
-2688 4 10 14 0.65536000000000000000e5
-2689 3 9 21 0.65536000000000000000e5
-2689 3 14 19 -0.65536000000000000000e5
-2690 1 2 33 -0.13107200000000000000e6
-2690 1 11 42 0.13107200000000000000e6
-2690 1 12 43 0.26214400000000000000e6
-2690 1 28 43 -0.13107200000000000000e6
-2690 1 32 47 -0.13107200000000000000e6
-2690 1 33 48 -0.13107200000000000000e6
-2690 2 12 26 -0.13107200000000000000e6
-2690 3 1 30 0.65536000000000000000e5
-2690 3 9 22 0.65536000000000000000e5
-2690 3 10 23 0.65536000000000000000e5
-2690 3 13 42 -0.26214400000000000000e6
-2690 3 28 41 -0.13107200000000000000e6
-2690 3 29 42 -0.13107200000000000000e6
-2690 4 3 31 0.13107200000000000000e6
-2690 4 6 18 0.65536000000000000000e5
-2691 3 1 30 -0.65536000000000000000e5
-2691 3 9 23 0.65536000000000000000e5
-2692 3 9 24 0.65536000000000000000e5
-2692 3 10 23 -0.65536000000000000000e5
-2693 1 9 40 0.65536000000000000000e5
-2693 1 10 25 -0.65536000000000000000e5
-2693 3 9 25 0.65536000000000000000e5
-2694 1 2 33 0.13107200000000000000e6
-2694 1 9 40 -0.65536000000000000000e5
-2694 1 10 25 0.65536000000000000000e5
-2694 1 11 42 -0.13107200000000000000e6
-2694 1 12 43 -0.26214400000000000000e6
-2694 1 28 43 0.13107200000000000000e6
-2694 1 32 47 0.13107200000000000000e6
-2694 1 33 48 0.13107200000000000000e6
-2694 2 12 26 0.13107200000000000000e6
-2694 3 3 32 0.13107200000000000000e6
-2694 3 9 26 0.65536000000000000000e5
-2694 3 10 23 0.65536000000000000000e5
-2694 3 13 42 0.26214400000000000000e6
-2694 3 14 27 -0.26214400000000000000e6
-2694 3 28 41 0.13107200000000000000e6
-2694 3 29 42 0.13107200000000000000e6
-2694 4 3 31 -0.13107200000000000000e6
-2694 4 7 19 0.65536000000000000000e5
-2694 4 8 20 0.13107200000000000000e6
-2695 1 2 33 -0.65536000000000000000e5
-2695 1 11 42 0.65536000000000000000e5
-2695 1 12 43 0.13107200000000000000e6
-2695 1 28 43 -0.65536000000000000000e5
-2695 1 32 47 -0.65536000000000000000e5
-2695 1 33 48 -0.65536000000000000000e5
-2695 2 12 26 -0.65536000000000000000e5
-2695 3 9 27 0.65536000000000000000e5
-2695 3 13 42 -0.13107200000000000000e6
-2695 3 28 41 -0.65536000000000000000e5
-2695 3 29 42 -0.65536000000000000000e5
-2695 4 3 31 0.65536000000000000000e5
-2696 3 3 32 -0.65536000000000000000e5
-2696 3 9 28 0.65536000000000000000e5
-2697 1 2 33 0.65536000000000000000e5
-2697 1 11 42 -0.65536000000000000000e5
-2697 1 12 43 -0.13107200000000000000e6
-2697 1 28 43 0.65536000000000000000e5
-2697 1 32 47 0.65536000000000000000e5
-2697 1 33 48 0.65536000000000000000e5
-2697 2 12 26 0.65536000000000000000e5
-2697 3 3 32 0.65536000000000000000e5
-2697 3 9 29 0.65536000000000000000e5
-2697 3 13 42 0.13107200000000000000e6
-2697 3 14 27 -0.13107200000000000000e6
-2697 3 28 41 0.65536000000000000000e5
-2697 3 29 42 0.65536000000000000000e5
-2697 4 3 31 -0.65536000000000000000e5
-2697 4 8 20 0.65536000000000000000e5
-2698 3 4 33 -0.65536000000000000000e5
-2698 3 9 30 0.65536000000000000000e5
-2699 3 9 31 0.65536000000000000000e5
-2699 3 14 27 -0.65536000000000000000e5
-2700 1 4 35 -0.65536000000000000000e5
-2700 1 17 48 0.65536000000000000000e5
-2700 3 9 32 0.65536000000000000000e5
-2700 3 13 42 0.65536000000000000000e5
-2701 3 5 34 -0.65536000000000000000e5
-2701 3 9 33 0.65536000000000000000e5
-2702 3 9 34 0.65536000000000000000e5
-2702 3 16 29 -0.65536000000000000000e5
-2703 1 5 36 -0.65536000000000000000e5
-2703 1 14 45 0.65536000000000000000e5
-2703 3 9 35 0.65536000000000000000e5
-2704 3 9 36 0.65536000000000000000e5
-2704 3 18 31 -0.65536000000000000000e5
-2705 1 9 40 0.65536000000000000000e5
-2705 1 10 41 -0.13107200000000000000e6
-2705 1 26 41 -0.65536000000000000000e5
-2705 1 32 47 0.13107200000000000000e6
-2705 3 9 37 0.65536000000000000000e5
-2705 3 9 38 0.65536000000000000000e5
-2705 3 28 41 0.13107200000000000000e6
-2705 4 2 30 0.65536000000000000000e5
-2706 1 9 40 -0.65536000000000000000e5
-2706 1 26 41 0.65536000000000000000e5
-2706 3 9 39 0.65536000000000000000e5
-2707 3 9 40 0.65536000000000000000e5
-2707 3 10 39 -0.65536000000000000000e5
-2708 1 10 41 -0.65536000000000000000e5
-2708 1 32 47 0.65536000000000000000e5
-2708 3 9 41 0.65536000000000000000e5
-2708 3 28 41 0.65536000000000000000e5
-2709 1 10 41 0.65536000000000000000e5
-2709 1 11 42 0.65536000000000000000e5
-2709 1 32 47 -0.65536000000000000000e5
-2709 1 33 48 -0.65536000000000000000e5
-2709 3 9 42 0.65536000000000000000e5
-2709 3 13 42 -0.13107200000000000000e6
-2709 3 28 41 -0.65536000000000000000e5
-2709 3 29 42 -0.65536000000000000000e5
-2709 4 3 31 0.65536000000000000000e5
-2710 1 11 42 -0.65536000000000000000e5
-2710 1 33 48 0.65536000000000000000e5
-2710 3 9 43 0.65536000000000000000e5
-2710 3 29 42 0.65536000000000000000e5
-2711 3 9 44 0.65536000000000000000e5
-2711 3 13 42 -0.65536000000000000000e5
-2712 1 14 45 -0.13107200000000000000e6
-2712 1 17 48 0.65536000000000000000e5
-2712 1 18 49 0.65536000000000000000e5
-2712 1 34 49 0.65536000000000000000e5
-2712 2 14 28 0.65536000000000000000e5
-2712 3 9 45 0.65536000000000000000e5
-2712 3 13 42 0.65536000000000000000e5
-2712 3 14 43 0.65536000000000000000e5
-2712 3 18 47 0.65536000000000000000e5
-2713 1 14 45 0.65536000000000000000e5
-2713 1 17 48 -0.32768000000000000000e5
-2713 1 18 49 -0.32768000000000000000e5
-2713 1 34 49 -0.32768000000000000000e5
-2713 2 14 28 -0.32768000000000000000e5
-2713 3 9 46 0.65536000000000000000e5
-2713 3 14 43 -0.32768000000000000000e5
-2713 3 15 44 0.65536000000000000000e5
-2713 3 16 45 -0.13107200000000000000e6
-2713 3 18 47 -0.32768000000000000000e5
-2713 3 22 35 0.32768000000000000000e5
-2713 4 14 26 0.32768000000000000000e5
-2713 4 15 27 0.65536000000000000000e5
-2714 1 6 53 -0.32768000000000000000e5
-2714 1 25 40 0.32768000000000000000e5
-2714 3 9 47 0.65536000000000000000e5
-2714 3 24 37 -0.32768000000000000000e5
-2714 3 27 40 -0.65536000000000000000e5
-2714 4 4 32 0.32768000000000000000e5
-2714 4 16 28 -0.32768000000000000000e5
-2715 3 9 48 0.65536000000000000000e5
-2715 3 27 40 -0.65536000000000000000e5
-2716 3 5 50 -0.65536000000000000000e5
-2716 3 9 49 0.65536000000000000000e5
-2717 1 6 53 -0.16384000000000000000e5
-2717 1 25 40 0.16384000000000000000e5
-2717 2 4 34 -0.32768000000000000000e5
-2717 2 21 35 0.32768000000000000000e5
-2717 3 5 50 -0.32768000000000000000e5
-2717 3 9 50 0.65536000000000000000e5
-2717 3 24 37 -0.16384000000000000000e5
-2717 3 27 40 -0.65536000000000000000e5
-2717 4 4 32 0.16384000000000000000e5
-2717 4 7 35 0.32768000000000000000e5
-2717 4 16 28 -0.16384000000000000000e5
-2718 3 9 51 0.65536000000000000000e5
-2718 3 29 42 -0.65536000000000000000e5
-2719 3 9 52 0.65536000000000000000e5
-2719 3 18 47 -0.65536000000000000000e5
-2720 1 24 55 0.65536000000000000000e5
-2720 1 26 41 -0.65536000000000000000e5
-2720 3 9 53 0.65536000000000000000e5
-2720 3 27 40 0.65536000000000000000e5
-2721 1 24 55 -0.65536000000000000000e5
-2721 1 26 41 0.65536000000000000000e5
-2721 3 9 54 0.65536000000000000000e5
-2721 3 22 51 0.65536000000000000000e5
-2721 3 23 52 -0.13107200000000000000e6
-2721 3 27 40 -0.65536000000000000000e5
-2721 4 7 35 0.65536000000000000000e5
-2722 3 9 55 0.65536000000000000000e5
-2722 3 10 55 0.65536000000000000000e5
-2722 3 35 48 -0.13107200000000000000e6
-2722 3 40 45 0.65536000000000000000e5
-2722 4 22 34 0.65536000000000000000e5
-2723 3 9 56 0.65536000000000000000e5
-2723 3 38 51 -0.65536000000000000000e5
-2724 1 4 35 -0.65536000000000000000e5
-2724 1 6 13 0.32768000000000000000e5
-2724 1 10 41 0.32768000000000000000e5
-2724 1 11 42 0.32768000000000000000e5
-2724 2 5 11 0.32768000000000000000e5
-2724 3 2 15 0.32768000000000000000e5
-2724 3 3 32 0.32768000000000000000e5
-2724 3 4 17 -0.65536000000000000000e5
-2724 3 4 33 0.32768000000000000000e5
-2724 3 10 10 0.65536000000000000000e5
-2725 1 3 18 -0.65536000000000000000e5
-2725 1 12 43 0.65536000000000000000e5
-2725 3 10 12 0.65536000000000000000e5
-2725 3 14 27 0.65536000000000000000e5
-2726 3 4 17 -0.65536000000000000000e5
-2726 3 10 13 0.65536000000000000000e5
-2727 1 5 20 -0.13107200000000000000e6
-2727 1 5 36 0.13107200000000000000e6
-2727 3 4 17 0.65536000000000000000e5
-2727 3 5 18 0.65536000000000000000e5
-2727 3 10 14 0.65536000000000000000e5
-2727 4 8 12 0.65536000000000000000e5
-2728 3 5 18 -0.65536000000000000000e5
-2728 3 10 15 0.65536000000000000000e5
-2729 1 4 35 0.32768000000000000000e5
-2729 1 10 17 -0.65536000000000000000e5
-2729 1 12 43 0.32768000000000000000e5
-2729 1 14 45 0.65536000000000000000e5
-2729 1 17 48 -0.32768000000000000000e5
-2729 1 18 49 -0.32768000000000000000e5
-2729 2 9 23 0.32768000000000000000e5
-2729 2 14 28 -0.32768000000000000000e5
-2729 3 5 34 0.32768000000000000000e5
-2729 3 10 16 0.65536000000000000000e5
-2729 3 13 42 -0.32768000000000000000e5
-2729 3 14 27 0.32768000000000000000e5
-2729 3 14 43 -0.32768000000000000000e5
-2730 1 5 20 -0.65536000000000000000e5
-2730 1 5 36 0.65536000000000000000e5
-2730 3 10 17 0.65536000000000000000e5
-2731 3 6 19 -0.65536000000000000000e5
-2731 3 10 18 0.65536000000000000000e5
-2732 1 3 18 0.16384000000000000000e5
-2732 1 4 35 -0.16384000000000000000e5
-2732 1 5 20 0.32768000000000000000e5
-2732 1 5 36 -0.32768000000000000000e5
-2732 1 10 17 0.32768000000000000000e5
-2732 1 12 43 -0.32768000000000000000e5
-2732 1 14 45 -0.32768000000000000000e5
-2732 1 17 48 0.16384000000000000000e5
-2732 1 18 49 0.16384000000000000000e5
-2732 2 9 23 -0.16384000000000000000e5
-2732 2 14 28 0.16384000000000000000e5
-2732 3 3 16 0.16384000000000000000e5
-2732 3 4 17 0.16384000000000000000e5
-2732 3 5 34 -0.16384000000000000000e5
-2732 3 7 20 0.65536000000000000000e5
-2732 3 8 21 -0.13107200000000000000e6
-2732 3 10 19 0.65536000000000000000e5
-2732 3 13 42 0.16384000000000000000e5
-2732 3 14 27 -0.32768000000000000000e5
-2732 3 14 43 0.16384000000000000000e5
-2732 4 2 14 0.16384000000000000000e5
-2732 4 3 15 0.32768000000000000000e5
-2732 4 10 14 0.65536000000000000000e5
-2733 1 6 21 -0.65536000000000000000e5
-2733 1 18 33 0.65536000000000000000e5
-2733 3 10 20 0.65536000000000000000e5
-2734 3 10 21 0.65536000000000000000e5
-2734 3 14 19 0.65536000000000000000e5
-2734 3 15 20 0.65536000000000000000e5
-2734 3 18 19 -0.13107200000000000000e6
-2734 4 14 14 0.13107200000000000000e6
-2735 3 1 30 -0.65536000000000000000e5
-2735 3 10 22 0.65536000000000000000e5
-2736 1 9 40 0.65536000000000000000e5
-2736 1 10 25 -0.65536000000000000000e5
-2736 3 10 24 0.65536000000000000000e5
-2737 1 2 33 0.13107200000000000000e6
-2737 1 9 40 -0.65536000000000000000e5
-2737 1 10 25 0.65536000000000000000e5
-2737 1 11 42 -0.13107200000000000000e6
-2737 1 12 43 -0.26214400000000000000e6
-2737 1 28 43 0.13107200000000000000e6
-2737 1 32 47 0.13107200000000000000e6
-2737 1 33 48 0.13107200000000000000e6
-2737 2 12 26 0.13107200000000000000e6
-2737 3 3 32 0.13107200000000000000e6
-2737 3 10 23 0.65536000000000000000e5
-2737 3 10 25 0.65536000000000000000e5
-2737 3 13 42 0.26214400000000000000e6
-2737 3 14 27 -0.26214400000000000000e6
-2737 3 28 41 0.13107200000000000000e6
-2737 3 29 42 0.13107200000000000000e6
-2737 4 3 31 -0.13107200000000000000e6
-2737 4 7 19 0.65536000000000000000e5
-2737 4 8 20 0.13107200000000000000e6
-2738 1 1 48 -0.32768000000000000000e5
-2738 1 2 49 -0.32768000000000000000e5
-2738 1 8 39 -0.65536000000000000000e5
-2738 1 9 40 -0.13107200000000000000e6
-2738 1 10 41 0.13107200000000000000e6
-2738 1 11 26 -0.65536000000000000000e5
-2738 1 11 42 0.13107200000000000000e6
-2738 1 12 43 0.26214400000000000000e6
-2738 1 23 38 -0.32768000000000000000e5
-2738 1 26 41 0.13107200000000000000e6
-2738 1 28 43 -0.26214400000000000000e6
-2738 1 32 47 -0.26214400000000000000e6
-2738 2 2 32 -0.32768000000000000000e5
-2738 2 4 34 0.65536000000000000000e5
-2738 2 16 30 -0.65536000000000000000e5
-2738 2 20 34 -0.13107200000000000000e6
-2738 2 28 34 -0.65536000000000000000e5
-2738 3 9 38 -0.65536000000000000000e5
-2738 3 10 26 0.65536000000000000000e5
-2738 3 10 39 -0.65536000000000000000e5
-2738 3 22 35 -0.26214400000000000000e6
-2738 3 28 41 -0.26214400000000000000e6
-2738 4 2 30 -0.65536000000000000000e5
-2738 4 6 34 -0.13107200000000000000e6
-2738 4 18 22 -0.65536000000000000000e5
-2738 4 18 30 -0.65536000000000000000e5
-2738 4 21 33 -0.65536000000000000000e5
-2739 3 3 32 -0.65536000000000000000e5
-2739 3 10 27 0.65536000000000000000e5
-2740 1 2 33 0.65536000000000000000e5
-2740 1 11 42 -0.65536000000000000000e5
-2740 1 12 43 -0.13107200000000000000e6
-2740 1 28 43 0.65536000000000000000e5
-2740 1 32 47 0.65536000000000000000e5
-2740 1 33 48 0.65536000000000000000e5
-2740 2 12 26 0.65536000000000000000e5
-2740 3 3 32 0.65536000000000000000e5
-2740 3 10 28 0.65536000000000000000e5
-2740 3 13 42 0.13107200000000000000e6
-2740 3 14 27 -0.13107200000000000000e6
-2740 3 28 41 0.65536000000000000000e5
-2740 3 29 42 0.65536000000000000000e5
-2740 4 3 31 -0.65536000000000000000e5
-2740 4 8 20 0.65536000000000000000e5
-2741 3 4 33 -0.65536000000000000000e5
-2741 3 10 29 0.65536000000000000000e5
-2742 1 2 33 -0.65536000000000000000e5
-2742 1 11 42 0.65536000000000000000e5
-2742 1 12 43 0.13107200000000000000e6
-2742 1 28 43 -0.65536000000000000000e5
-2742 1 32 47 -0.65536000000000000000e5
-2742 1 33 48 -0.65536000000000000000e5
-2742 2 12 26 -0.65536000000000000000e5
-2742 3 3 32 -0.65536000000000000000e5
-2742 3 4 33 0.65536000000000000000e5
-2742 3 5 34 -0.13107200000000000000e6
-2742 3 10 30 0.65536000000000000000e5
-2742 3 13 42 -0.13107200000000000000e6
-2742 3 14 27 0.13107200000000000000e6
-2742 3 28 41 -0.65536000000000000000e5
-2742 3 29 42 -0.65536000000000000000e5
-2742 4 3 31 0.65536000000000000000e5
-2742 4 8 20 -0.65536000000000000000e5
-2742 4 9 21 0.65536000000000000000e5
-2743 1 4 35 -0.65536000000000000000e5
-2743 1 17 48 0.65536000000000000000e5
-2743 3 10 31 0.65536000000000000000e5
-2743 3 13 42 0.65536000000000000000e5
-2744 3 5 34 -0.65536000000000000000e5
-2744 3 10 32 0.65536000000000000000e5
-2745 1 15 30 -0.65536000000000000000e5
-2745 1 18 49 0.65536000000000000000e5
-2745 3 10 33 0.65536000000000000000e5
-2745 3 14 43 0.65536000000000000000e5
-2746 1 5 36 -0.65536000000000000000e5
-2746 1 14 45 0.65536000000000000000e5
-2746 3 10 34 0.65536000000000000000e5
-2747 3 10 35 0.65536000000000000000e5
-2747 3 17 30 -0.65536000000000000000e5
-2748 1 15 46 0.65536000000000000000e5
-2748 1 18 33 -0.65536000000000000000e5
-2748 3 10 36 0.65536000000000000000e5
-2749 3 9 38 -0.65536000000000000000e5
-2749 3 10 37 0.65536000000000000000e5
-2750 1 9 40 -0.65536000000000000000e5
-2750 1 26 41 0.65536000000000000000e5
-2750 3 10 38 0.65536000000000000000e5
-2751 1 9 40 0.65536000000000000000e5
-2751 1 11 42 -0.13107200000000000000e6
-2751 1 26 41 -0.65536000000000000000e5
-2751 1 33 48 0.13107200000000000000e6
-2751 3 10 39 0.65536000000000000000e5
-2751 3 10 40 0.65536000000000000000e5
-2751 3 29 42 0.13107200000000000000e6
-2751 4 18 22 0.65536000000000000000e5
-2752 1 10 41 0.65536000000000000000e5
-2752 1 11 42 0.65536000000000000000e5
-2752 1 32 47 -0.65536000000000000000e5
-2752 1 33 48 -0.65536000000000000000e5
-2752 3 10 41 0.65536000000000000000e5
-2752 3 13 42 -0.13107200000000000000e6
-2752 3 28 41 -0.65536000000000000000e5
-2752 3 29 42 -0.65536000000000000000e5
-2752 4 3 31 0.65536000000000000000e5
-2753 1 11 42 -0.65536000000000000000e5
-2753 1 33 48 0.65536000000000000000e5
-2753 3 10 42 0.65536000000000000000e5
-2753 3 29 42 0.65536000000000000000e5
-2754 1 26 33 -0.65536000000000000000e5
-2754 1 33 40 0.65536000000000000000e5
-2754 3 10 43 0.65536000000000000000e5
-2755 1 14 45 -0.13107200000000000000e6
-2755 1 17 48 0.65536000000000000000e5
-2755 1 18 49 0.65536000000000000000e5
-2755 1 34 49 0.65536000000000000000e5
-2755 2 14 28 0.65536000000000000000e5
-2755 3 10 44 0.65536000000000000000e5
-2755 3 13 42 0.65536000000000000000e5
-2755 3 14 43 0.65536000000000000000e5
-2755 3 18 47 0.65536000000000000000e5
-2756 3 10 45 0.65536000000000000000e5
-2756 3 14 43 -0.65536000000000000000e5
-2757 3 10 46 0.65536000000000000000e5
-2757 3 15 44 -0.65536000000000000000e5
-2758 3 10 47 0.65536000000000000000e5
-2758 3 27 40 -0.65536000000000000000e5
-2759 3 5 50 -0.65536000000000000000e5
-2759 3 10 48 0.65536000000000000000e5
-2760 3 5 50 0.65536000000000000000e5
-2760 3 10 49 0.65536000000000000000e5
-2760 3 27 40 0.65536000000000000000e5
-2760 3 29 42 -0.13107200000000000000e6
-2760 4 18 30 0.65536000000000000000e5
-2761 3 10 50 0.65536000000000000000e5
-2761 3 29 42 -0.65536000000000000000e5
-2762 3 10 51 0.65536000000000000000e5
-2762 3 14 51 -0.13107200000000000000e6
-2762 3 29 42 0.65536000000000000000e5
-2762 3 30 43 0.65536000000000000000e5
-2762 4 19 31 0.65536000000000000000e5
-2763 3 10 52 0.65536000000000000000e5
-2763 3 14 51 -0.65536000000000000000e5
-2764 1 24 55 -0.65536000000000000000e5
-2764 1 26 41 0.65536000000000000000e5
-2764 3 10 53 0.65536000000000000000e5
-2764 3 22 51 0.65536000000000000000e5
-2764 3 23 52 -0.13107200000000000000e6
-2764 3 27 40 -0.65536000000000000000e5
-2764 4 7 35 0.65536000000000000000e5
-2765 3 10 54 0.65536000000000000000e5
-2765 3 10 55 0.13107200000000000000e6
-2765 3 22 51 -0.65536000000000000000e5
-2765 3 23 52 0.13107200000000000000e6
-2765 3 35 48 -0.26214400000000000000e6
-2765 3 40 45 0.13107200000000000000e6
-2765 4 7 35 -0.65536000000000000000e5
-2765 4 21 33 0.65536000000000000000e5
-2765 4 22 34 0.13107200000000000000e6
-2766 1 1 48 0.32768000000000000000e5
-2766 1 2 49 0.32768000000000000000e5
-2766 1 8 39 0.65536000000000000000e5
-2766 1 9 40 0.65536000000000000000e5
-2766 1 10 41 -0.13107200000000000000e6
-2766 1 12 43 -0.26214400000000000000e6
-2766 1 23 38 0.32768000000000000000e5
-2766 1 26 41 -0.65536000000000000000e5
-2766 1 28 43 0.26214400000000000000e6
-2766 1 32 47 0.26214400000000000000e6
-2766 1 33 48 -0.13107200000000000000e6
-2766 1 40 55 0.65536000000000000000e5
-2766 2 2 32 0.32768000000000000000e5
-2766 2 4 34 -0.65536000000000000000e5
-2766 2 16 30 0.65536000000000000000e5
-2766 2 20 34 0.13107200000000000000e6
-2766 2 28 34 0.65536000000000000000e5
-2766 3 5 50 -0.65536000000000000000e5
-2766 3 9 38 0.65536000000000000000e5
-2766 3 10 55 -0.13107200000000000000e6
-2766 3 10 56 0.65536000000000000000e5
-2766 3 22 35 0.26214400000000000000e6
-2766 3 22 51 0.65536000000000000000e5
-2766 3 23 52 -0.13107200000000000000e6
-2766 3 27 40 -0.65536000000000000000e5
-2766 3 28 41 0.26214400000000000000e6
-2766 3 35 48 0.26214400000000000000e6
-2766 3 40 45 -0.13107200000000000000e6
-2766 4 2 30 0.65536000000000000000e5
-2766 4 6 34 0.13107200000000000000e6
-2766 4 7 35 0.65536000000000000000e5
-2766 4 22 34 -0.13107200000000000000e6
-2767 1 4 35 0.65536000000000000000e5
-2767 1 6 13 -0.32768000000000000000e5
-2767 1 10 41 -0.32768000000000000000e5
-2767 1 11 42 -0.32768000000000000000e5
-2767 2 5 11 -0.32768000000000000000e5
-2767 3 2 15 -0.32768000000000000000e5
-2767 3 3 32 -0.32768000000000000000e5
-2767 3 4 17 0.65536000000000000000e5
-2767 3 4 33 -0.32768000000000000000e5
-2767 3 5 18 -0.65536000000000000000e5
-2767 3 10 11 0.32768000000000000000e5
-2767 3 11 11 0.65536000000000000000e5
-2767 4 9 9 0.65536000000000000000e5
-2768 3 4 17 -0.65536000000000000000e5
-2768 3 11 12 0.65536000000000000000e5
-2769 1 5 20 -0.13107200000000000000e6
-2769 1 5 36 0.13107200000000000000e6
-2769 3 4 17 0.65536000000000000000e5
-2769 3 5 18 0.65536000000000000000e5
-2769 3 11 13 0.65536000000000000000e5
-2769 4 8 12 0.65536000000000000000e5
-2770 3 5 18 -0.65536000000000000000e5
-2770 3 11 14 0.65536000000000000000e5
-2771 1 5 20 0.13107200000000000000e6
-2771 1 5 36 -0.13107200000000000000e6
-2771 3 4 17 -0.65536000000000000000e5
-2771 3 6 19 -0.13107200000000000000e6
-2771 3 11 15 0.65536000000000000000e5
-2771 4 5 14 0.65536000000000000000e5
-2771 4 8 12 -0.65536000000000000000e5
-2772 1 5 20 -0.65536000000000000000e5
-2772 1 5 36 0.65536000000000000000e5
-2772 3 11 16 0.65536000000000000000e5
-2773 3 6 19 -0.65536000000000000000e5
-2773 3 11 17 0.65536000000000000000e5
-2774 1 5 20 0.65536000000000000000e5
-2774 1 5 36 -0.65536000000000000000e5
-2774 1 6 21 -0.13107200000000000000e6
-2774 1 18 33 0.13107200000000000000e6
-2774 3 6 19 0.65536000000000000000e5
-2774 3 11 18 0.65536000000000000000e5
-2774 4 12 12 0.13107200000000000000e6
-2775 1 6 21 -0.65536000000000000000e5
-2775 1 18 33 0.65536000000000000000e5
-2775 3 11 19 0.65536000000000000000e5
-2776 3 11 21 0.65536000000000000000e5
-2776 3 15 20 -0.65536000000000000000e5
-2777 3 10 23 -0.65536000000000000000e5
-2777 3 11 22 0.65536000000000000000e5
-2778 1 9 40 0.65536000000000000000e5
-2778 1 10 25 -0.65536000000000000000e5
-2778 3 11 23 0.65536000000000000000e5
-2779 1 2 33 0.13107200000000000000e6
-2779 1 9 40 -0.65536000000000000000e5
-2779 1 10 25 0.65536000000000000000e5
-2779 1 11 42 -0.13107200000000000000e6
-2779 1 12 43 -0.26214400000000000000e6
-2779 1 28 43 0.13107200000000000000e6
-2779 1 32 47 0.13107200000000000000e6
-2779 1 33 48 0.13107200000000000000e6
-2779 2 12 26 0.13107200000000000000e6
-2779 3 3 32 0.13107200000000000000e6
-2779 3 10 23 0.65536000000000000000e5
-2779 3 11 24 0.65536000000000000000e5
-2779 3 13 42 0.26214400000000000000e6
-2779 3 14 27 -0.26214400000000000000e6
-2779 3 28 41 0.13107200000000000000e6
-2779 3 29 42 0.13107200000000000000e6
-2779 4 3 31 -0.13107200000000000000e6
-2779 4 7 19 0.65536000000000000000e5
-2779 4 8 20 0.13107200000000000000e6
-2780 1 1 48 -0.32768000000000000000e5
-2780 1 2 49 -0.32768000000000000000e5
-2780 1 8 39 -0.65536000000000000000e5
-2780 1 9 40 -0.13107200000000000000e6
-2780 1 10 41 0.13107200000000000000e6
-2780 1 11 26 -0.65536000000000000000e5
-2780 1 11 42 0.13107200000000000000e6
-2780 1 12 43 0.26214400000000000000e6
-2780 1 23 38 -0.32768000000000000000e5
-2780 1 26 41 0.13107200000000000000e6
-2780 1 28 43 -0.26214400000000000000e6
-2780 1 32 47 -0.26214400000000000000e6
-2780 2 2 32 -0.32768000000000000000e5
-2780 2 4 34 0.65536000000000000000e5
-2780 2 16 30 -0.65536000000000000000e5
-2780 2 20 34 -0.13107200000000000000e6
-2780 2 28 34 -0.65536000000000000000e5
-2780 3 9 38 -0.65536000000000000000e5
-2780 3 10 39 -0.65536000000000000000e5
-2780 3 11 25 0.65536000000000000000e5
-2780 3 22 35 -0.26214400000000000000e6
-2780 3 28 41 -0.26214400000000000000e6
-2780 4 2 30 -0.65536000000000000000e5
-2780 4 6 34 -0.13107200000000000000e6
-2780 4 18 22 -0.65536000000000000000e5
-2780 4 18 30 -0.65536000000000000000e5
-2780 4 21 33 -0.65536000000000000000e5
-2781 1 2 33 0.65536000000000000000e5
-2781 1 11 42 -0.65536000000000000000e5
-2781 1 12 43 -0.13107200000000000000e6
-2781 1 28 43 0.65536000000000000000e5
-2781 1 32 47 0.65536000000000000000e5
-2781 1 33 48 0.65536000000000000000e5
-2781 2 12 26 0.65536000000000000000e5
-2781 3 3 32 0.65536000000000000000e5
-2781 3 11 27 0.65536000000000000000e5
-2781 3 13 42 0.13107200000000000000e6
-2781 3 14 27 -0.13107200000000000000e6
-2781 3 28 41 0.65536000000000000000e5
-2781 3 29 42 0.65536000000000000000e5
-2781 4 3 31 -0.65536000000000000000e5
-2781 4 8 20 0.65536000000000000000e5
-2782 3 4 33 -0.65536000000000000000e5
-2782 3 11 28 0.65536000000000000000e5
-2783 1 2 33 -0.65536000000000000000e5
-2783 1 11 42 0.65536000000000000000e5
-2783 1 12 43 0.13107200000000000000e6
-2783 1 28 43 -0.65536000000000000000e5
-2783 1 32 47 -0.65536000000000000000e5
-2783 1 33 48 -0.65536000000000000000e5
-2783 2 12 26 -0.65536000000000000000e5
-2783 3 3 32 -0.65536000000000000000e5
-2783 3 4 33 0.65536000000000000000e5
-2783 3 5 34 -0.13107200000000000000e6
-2783 3 11 29 0.65536000000000000000e5
-2783 3 13 42 -0.13107200000000000000e6
-2783 3 14 27 0.13107200000000000000e6
-2783 3 28 41 -0.65536000000000000000e5
-2783 3 29 42 -0.65536000000000000000e5
-2783 4 3 31 0.65536000000000000000e5
-2783 4 8 20 -0.65536000000000000000e5
-2783 4 9 21 0.65536000000000000000e5
-2784 3 5 34 -0.65536000000000000000e5
-2784 3 11 31 0.65536000000000000000e5
-2785 1 15 30 -0.65536000000000000000e5
-2785 1 18 49 0.65536000000000000000e5
-2785 3 11 32 0.65536000000000000000e5
-2785 3 14 43 0.65536000000000000000e5
-2786 3 6 35 -0.65536000000000000000e5
-2786 3 11 33 0.65536000000000000000e5
-2787 3 11 34 0.65536000000000000000e5
-2787 3 17 30 -0.65536000000000000000e5
-2788 1 5 36 0.65536000000000000000e5
-2788 1 14 45 -0.65536000000000000000e5
-2788 1 15 46 0.13107200000000000000e6
-2788 1 18 33 -0.13107200000000000000e6
-2788 3 11 35 0.65536000000000000000e5
-2788 3 17 30 0.65536000000000000000e5
-2788 4 12 24 0.65536000000000000000e5
-2789 3 11 36 0.65536000000000000000e5
-2789 3 21 26 -0.65536000000000000000e5
-2790 1 9 40 -0.65536000000000000000e5
-2790 1 26 41 0.65536000000000000000e5
-2790 3 11 37 0.65536000000000000000e5
-2791 3 10 39 -0.65536000000000000000e5
-2791 3 11 38 0.65536000000000000000e5
-2792 1 9 40 0.65536000000000000000e5
-2792 1 11 42 -0.13107200000000000000e6
-2792 1 26 41 -0.65536000000000000000e5
-2792 1 33 48 0.13107200000000000000e6
-2792 3 10 39 0.65536000000000000000e5
-2792 3 11 39 0.65536000000000000000e5
-2792 3 29 42 0.13107200000000000000e6
-2792 4 18 22 0.65536000000000000000e5
-2793 1 11 42 -0.65536000000000000000e5
-2793 1 33 48 0.65536000000000000000e5
-2793 3 11 41 0.65536000000000000000e5
-2793 3 29 42 0.65536000000000000000e5
-2794 1 26 33 -0.65536000000000000000e5
-2794 1 33 40 0.65536000000000000000e5
-2794 3 11 42 0.65536000000000000000e5
-2795 1 11 42 0.65536000000000000000e5
-2795 1 26 33 0.65536000000000000000e5
-2795 1 33 40 -0.65536000000000000000e5
-2795 1 33 48 -0.65536000000000000000e5
-2795 3 11 43 0.65536000000000000000e5
-2795 3 14 43 -0.13107200000000000000e6
-2795 3 29 42 -0.65536000000000000000e5
-2795 4 22 22 0.13107200000000000000e6
-2796 3 11 44 0.65536000000000000000e5
-2796 3 14 43 -0.65536000000000000000e5
-2797 3 11 45 0.65536000000000000000e5
-2797 3 26 35 -0.65536000000000000000e5
-2798 3 11 46 0.65536000000000000000e5
-2798 3 30 35 -0.65536000000000000000e5
-2799 3 5 50 -0.65536000000000000000e5
-2799 3 11 47 0.65536000000000000000e5
-2800 3 5 50 0.65536000000000000000e5
-2800 3 11 48 0.65536000000000000000e5
-2800 3 27 40 0.65536000000000000000e5
-2800 3 29 42 -0.13107200000000000000e6
-2800 4 18 30 0.65536000000000000000e5
-2801 3 6 51 -0.65536000000000000000e5
-2801 3 11 49 0.65536000000000000000e5
-2802 3 11 50 0.65536000000000000000e5
-2802 3 14 51 -0.13107200000000000000e6
-2802 3 29 42 0.65536000000000000000e5
-2802 3 30 43 0.65536000000000000000e5
-2802 4 19 31 0.65536000000000000000e5
-2803 3 11 51 0.65536000000000000000e5
-2803 3 30 43 -0.65536000000000000000e5
-2804 3 11 52 0.65536000000000000000e5
-2804 3 35 40 -0.65536000000000000000e5
-2805 3 10 55 0.13107200000000000000e6
-2805 3 11 53 0.65536000000000000000e5
-2805 3 22 51 -0.65536000000000000000e5
-2805 3 23 52 0.13107200000000000000e6
-2805 3 35 48 -0.26214400000000000000e6
-2805 3 40 45 0.13107200000000000000e6
-2805 4 7 35 -0.65536000000000000000e5
-2805 4 21 33 0.65536000000000000000e5
-2805 4 22 34 0.13107200000000000000e6
-2806 3 6 55 -0.65536000000000000000e5
-2806 3 11 54 0.65536000000000000000e5
-2807 3 11 55 0.65536000000000000000e5
-2807 3 40 45 -0.65536000000000000000e5
-2808 3 11 56 0.65536000000000000000e5
-2808 3 26 55 -0.65536000000000000000e5
-2809 1 2 17 -0.16384000000000000000e5
-2809 1 16 23 0.16384000000000000000e5
-2809 3 3 16 -0.16384000000000000000e5
-2809 3 7 12 -0.16384000000000000000e5
-2809 3 12 12 0.65536000000000000000e5
-2809 4 1 13 -0.16384000000000000000e5
-2810 1 2 17 -0.32768000000000000000e5
-2810 1 3 34 -0.32768000000000000000e5
-2810 1 4 19 -0.65536000000000000000e5
-2810 1 4 35 -0.32768000000000000000e5
-2810 1 12 43 -0.65536000000000000000e5
-2810 1 14 45 -0.65536000000000000000e5
-2810 1 17 48 0.32768000000000000000e5
-2810 1 18 49 0.32768000000000000000e5
-2810 1 20 27 0.13107200000000000000e6
-2810 2 6 12 -0.32768000000000000000e5
-2810 2 9 23 -0.32768000000000000000e5
-2810 2 10 24 -0.65536000000000000000e5
-2810 2 14 28 0.32768000000000000000e5
-2810 3 4 17 0.32768000000000000000e5
-2810 3 5 34 -0.32768000000000000000e5
-2810 3 12 13 0.65536000000000000000e5
-2810 3 13 42 0.32768000000000000000e5
-2810 3 14 27 -0.65536000000000000000e5
-2810 3 14 43 0.32768000000000000000e5
-2810 4 2 14 0.32768000000000000000e5
-2811 1 3 18 -0.32768000000000000000e5
-2811 1 12 43 0.32768000000000000000e5
-2811 3 3 16 -0.32768000000000000000e5
-2811 3 4 17 -0.32768000000000000000e5
-2811 3 12 14 0.65536000000000000000e5
-2811 3 14 27 0.32768000000000000000e5
-2811 4 2 14 -0.32768000000000000000e5
-2812 1 4 35 0.32768000000000000000e5
-2812 1 10 17 -0.65536000000000000000e5
-2812 1 12 43 0.32768000000000000000e5
-2812 1 14 45 0.65536000000000000000e5
-2812 1 17 48 -0.32768000000000000000e5
-2812 1 18 49 -0.32768000000000000000e5
-2812 2 9 23 0.32768000000000000000e5
-2812 2 14 28 -0.32768000000000000000e5
-2812 3 5 34 0.32768000000000000000e5
-2812 3 12 15 0.65536000000000000000e5
-2812 3 13 42 -0.32768000000000000000e5
-2812 3 14 27 0.32768000000000000000e5
-2812 3 14 43 -0.32768000000000000000e5
-2813 1 2 17 -0.32768000000000000000e5
-2813 1 3 18 -0.16384000000000000000e5
-2813 1 3 34 -0.16384000000000000000e5
-2813 1 4 19 -0.32768000000000000000e5
-2813 1 4 35 -0.16384000000000000000e5
-2813 1 12 43 -0.16384000000000000000e5
-2813 1 14 45 -0.32768000000000000000e5
-2813 1 16 23 0.16384000000000000000e5
-2813 1 17 48 0.16384000000000000000e5
-2813 1 18 49 0.16384000000000000000e5
-2813 1 20 27 0.65536000000000000000e5
-2813 2 6 12 -0.16384000000000000000e5
-2813 2 9 23 -0.16384000000000000000e5
-2813 2 10 24 -0.32768000000000000000e5
-2813 2 14 28 0.16384000000000000000e5
-2813 3 3 16 -0.32768000000000000000e5
-2813 3 5 34 -0.16384000000000000000e5
-2813 3 7 12 -0.16384000000000000000e5
-2813 3 12 16 0.65536000000000000000e5
-2813 3 13 42 0.16384000000000000000e5
-2813 3 14 27 -0.16384000000000000000e5
-2813 3 14 43 0.16384000000000000000e5
-2813 4 1 13 -0.16384000000000000000e5
-2813 4 10 10 -0.65536000000000000000e5
-2814 3 7 20 -0.65536000000000000000e5
-2814 3 12 17 0.65536000000000000000e5
-2815 1 3 18 -0.16384000000000000000e5
-2815 1 4 35 0.16384000000000000000e5
-2815 1 5 20 -0.32768000000000000000e5
-2815 1 5 36 0.32768000000000000000e5
-2815 1 10 17 -0.32768000000000000000e5
-2815 1 12 43 0.32768000000000000000e5
-2815 1 14 45 0.32768000000000000000e5
-2815 1 17 48 -0.16384000000000000000e5
-2815 1 18 49 -0.16384000000000000000e5
-2815 2 9 23 0.16384000000000000000e5
-2815 2 14 28 -0.16384000000000000000e5
-2815 3 3 16 -0.16384000000000000000e5
-2815 3 4 17 -0.16384000000000000000e5
-2815 3 5 34 0.16384000000000000000e5
-2815 3 12 18 0.65536000000000000000e5
-2815 3 13 42 -0.16384000000000000000e5
-2815 3 14 27 0.32768000000000000000e5
-2815 3 14 43 -0.16384000000000000000e5
-2815 4 2 14 -0.16384000000000000000e5
-2815 4 3 15 -0.32768000000000000000e5
-2816 3 8 21 0.65536000000000000000e5
-2816 3 12 19 0.65536000000000000000e5
-2816 3 12 21 -0.13107200000000000000e6
-2816 3 14 19 0.65536000000000000000e5
-2816 4 13 13 0.13107200000000000000e6
-2817 3 8 21 -0.65536000000000000000e5
-2817 3 12 20 0.65536000000000000000e5
-2818 1 1 32 -0.65536000000000000000e5
-2818 1 2 33 0.65536000000000000000e5
-2818 1 3 34 -0.13107200000000000000e6
-2818 1 10 41 0.65536000000000000000e5
-2818 1 11 42 -0.65536000000000000000e5
-2818 1 12 43 -0.13107200000000000000e6
-2818 1 16 23 0.13107200000000000000e6
-2818 1 28 43 0.65536000000000000000e5
-2818 1 32 47 0.65536000000000000000e5
-2818 1 33 48 0.65536000000000000000e5
-2818 2 1 31 -0.65536000000000000000e5
-2818 2 7 21 0.65536000000000000000e5
-2818 2 12 26 0.65536000000000000000e5
-2818 3 1 34 -0.13107200000000000000e6
-2818 3 2 31 0.65536000000000000000e5
-2818 3 3 32 0.65536000000000000000e5
-2818 3 12 22 0.65536000000000000000e5
-2818 3 13 42 0.13107200000000000000e6
-2818 3 28 41 0.65536000000000000000e5
-2818 3 29 42 0.65536000000000000000e5
-2818 4 3 31 -0.65536000000000000000e5
-2819 3 2 31 -0.65536000000000000000e5
-2819 3 12 23 0.65536000000000000000e5
-2820 1 2 33 -0.65536000000000000000e5
-2820 1 11 42 0.65536000000000000000e5
-2820 1 12 43 0.13107200000000000000e6
-2820 1 28 43 -0.65536000000000000000e5
-2820 1 32 47 -0.65536000000000000000e5
-2820 1 33 48 -0.65536000000000000000e5
-2820 2 12 26 -0.65536000000000000000e5
-2820 3 12 24 0.65536000000000000000e5
-2820 3 13 42 -0.13107200000000000000e6
-2820 3 28 41 -0.65536000000000000000e5
-2820 3 29 42 -0.65536000000000000000e5
-2820 4 3 31 0.65536000000000000000e5
-2821 3 3 32 -0.65536000000000000000e5
-2821 3 12 25 0.65536000000000000000e5
-2822 1 2 33 0.65536000000000000000e5
-2822 1 11 42 -0.65536000000000000000e5
-2822 1 12 43 -0.13107200000000000000e6
-2822 1 28 43 0.65536000000000000000e5
-2822 1 32 47 0.65536000000000000000e5
-2822 1 33 48 0.65536000000000000000e5
-2822 2 12 26 0.65536000000000000000e5
-2822 3 3 32 0.65536000000000000000e5
-2822 3 12 26 0.65536000000000000000e5
-2822 3 13 42 0.13107200000000000000e6
-2822 3 14 27 -0.13107200000000000000e6
-2822 3 28 41 0.65536000000000000000e5
-2822 3 29 42 0.65536000000000000000e5
-2822 4 3 31 -0.65536000000000000000e5
-2822 4 8 20 0.65536000000000000000e5
-2823 3 1 34 -0.65536000000000000000e5
-2823 3 12 27 0.65536000000000000000e5
-2824 1 3 34 -0.65536000000000000000e5
-2824 1 16 47 0.65536000000000000000e5
-2824 3 12 28 0.65536000000000000000e5
-2824 3 12 41 0.65536000000000000000e5
-2825 3 12 29 0.65536000000000000000e5
-2825 3 14 27 -0.65536000000000000000e5
-2826 1 4 35 -0.65536000000000000000e5
-2826 1 17 48 0.65536000000000000000e5
-2826 3 12 30 0.65536000000000000000e5
-2826 3 13 42 0.65536000000000000000e5
-2827 1 3 18 -0.32768000000000000000e5
-2827 1 4 19 0.65536000000000000000e5
-2827 1 4 35 0.32768000000000000000e5
-2827 1 12 43 0.65536000000000000000e5
-2827 1 14 45 0.65536000000000000000e5
-2827 1 17 48 -0.32768000000000000000e5
-2827 1 18 49 -0.32768000000000000000e5
-2827 1 20 27 -0.13107200000000000000e6
-2827 1 27 34 0.65536000000000000000e5
-2827 2 9 23 0.32768000000000000000e5
-2827 2 10 24 0.65536000000000000000e5
-2827 2 14 28 -0.32768000000000000000e5
-2827 3 3 16 -0.32768000000000000000e5
-2827 3 4 17 -0.32768000000000000000e5
-2827 3 5 34 0.32768000000000000000e5
-2827 3 12 31 0.65536000000000000000e5
-2827 3 13 42 -0.32768000000000000000e5
-2827 3 14 27 0.65536000000000000000e5
-2827 3 14 43 -0.32768000000000000000e5
-2827 4 2 14 -0.32768000000000000000e5
-2828 1 3 18 0.32768000000000000000e5
-2828 1 4 19 -0.65536000000000000000e5
-2828 1 12 43 -0.32768000000000000000e5
-2828 1 13 44 0.65536000000000000000e5
-2828 3 3 16 0.32768000000000000000e5
-2828 3 4 17 0.32768000000000000000e5
-2828 3 12 32 0.65536000000000000000e5
-2828 3 14 27 -0.32768000000000000000e5
-2828 4 2 14 0.32768000000000000000e5
-2829 3 12 33 0.65536000000000000000e5
-2829 3 16 29 -0.65536000000000000000e5
-2830 3 7 36 -0.65536000000000000000e5
-2830 3 12 34 0.65536000000000000000e5
-2831 1 3 18 0.16384000000000000000e5
-2831 1 4 19 -0.32768000000000000000e5
-2831 1 5 36 -0.32768000000000000000e5
-2831 1 12 43 -0.16384000000000000000e5
-2831 1 13 44 0.32768000000000000000e5
-2831 1 14 45 0.32768000000000000000e5
-2831 3 3 16 0.16384000000000000000e5
-2831 3 4 17 0.16384000000000000000e5
-2831 3 12 35 0.65536000000000000000e5
-2831 3 14 27 -0.16384000000000000000e5
-2831 3 16 29 -0.32768000000000000000e5
-2831 4 2 14 0.16384000000000000000e5
-2831 4 11 23 -0.32768000000000000000e5
-2832 1 3 18 0.81920000000000000000e4
-2832 1 4 19 -0.16384000000000000000e5
-2832 1 5 36 -0.16384000000000000000e5
-2832 1 12 43 -0.81920000000000000000e4
-2832 1 13 44 0.16384000000000000000e5
-2832 1 14 45 0.16384000000000000000e5
-2832 2 11 25 -0.32768000000000000000e5
-2832 2 15 29 0.32768000000000000000e5
-2832 3 3 16 0.81920000000000000000e4
-2832 3 4 17 0.81920000000000000000e4
-2832 3 7 36 -0.32768000000000000000e5
-2832 3 12 36 0.65536000000000000000e5
-2832 3 14 27 -0.81920000000000000000e4
-2832 3 16 29 -0.16384000000000000000e5
-2832 3 18 31 -0.32768000000000000000e5
-2832 4 2 14 0.81920000000000000000e4
-2832 4 11 23 -0.16384000000000000000e5
-2833 1 9 40 0.32768000000000000000e5
-2833 1 10 41 -0.65536000000000000000e5
-2833 1 26 41 -0.32768000000000000000e5
-2833 1 32 47 0.65536000000000000000e5
-2833 3 8 37 -0.32768000000000000000e5
-2833 3 9 38 0.32768000000000000000e5
-2833 3 12 37 0.65536000000000000000e5
-2833 3 22 27 -0.32768000000000000000e5
-2833 3 28 41 0.65536000000000000000e5
-2833 4 1 29 -0.32768000000000000000e5
-2833 4 2 30 0.32768000000000000000e5
-2834 1 11 42 -0.65536000000000000000e5
-2834 1 33 48 0.65536000000000000000e5
-2834 2 12 26 0.65536000000000000000e5
-2834 2 20 34 -0.65536000000000000000e5
-2834 3 12 38 0.65536000000000000000e5
-2834 3 13 42 0.13107200000000000000e6
-2834 3 22 35 -0.13107200000000000000e6
-2834 3 29 42 0.65536000000000000000e5
-2834 4 3 31 -0.65536000000000000000e5
-2834 4 6 34 -0.65536000000000000000e5
-2835 1 10 41 -0.65536000000000000000e5
-2835 1 32 47 0.65536000000000000000e5
-2835 3 12 39 0.65536000000000000000e5
-2835 3 28 41 0.65536000000000000000e5
-2836 1 10 41 0.65536000000000000000e5
-2836 1 11 42 0.65536000000000000000e5
-2836 1 32 47 -0.65536000000000000000e5
-2836 1 33 48 -0.65536000000000000000e5
-2836 3 12 40 0.65536000000000000000e5
-2836 3 13 42 -0.13107200000000000000e6
-2836 3 28 41 -0.65536000000000000000e5
-2836 3 29 42 -0.65536000000000000000e5
-2836 4 3 31 0.65536000000000000000e5
-2837 3 12 42 0.65536000000000000000e5
-2837 3 22 35 -0.65536000000000000000e5
-2838 3 12 43 0.65536000000000000000e5
-2838 3 13 42 -0.65536000000000000000e5
-2839 1 13 44 -0.65536000000000000000e5
-2839 1 34 41 0.65536000000000000000e5
-2839 3 12 44 0.65536000000000000000e5
-2840 1 14 45 -0.65536000000000000000e5
-2840 1 17 48 0.32768000000000000000e5
-2840 1 18 49 0.32768000000000000000e5
-2840 1 34 49 0.32768000000000000000e5
-2840 2 14 28 0.32768000000000000000e5
-2840 3 12 45 0.65536000000000000000e5
-2840 3 14 43 0.32768000000000000000e5
-2840 3 18 47 0.32768000000000000000e5
-2840 3 22 35 -0.32768000000000000000e5
-2840 4 14 26 -0.32768000000000000000e5
-2841 1 3 18 -0.16384000000000000000e5
-2841 1 4 19 0.32768000000000000000e5
-2841 1 5 36 0.32768000000000000000e5
-2841 1 12 43 0.16384000000000000000e5
-2841 1 13 44 -0.32768000000000000000e5
-2841 1 14 45 -0.32768000000000000000e5
-2841 1 17 32 -0.65536000000000000000e5
-2841 1 19 50 0.65536000000000000000e5
-2841 3 3 16 -0.16384000000000000000e5
-2841 3 4 17 -0.16384000000000000000e5
-2841 3 12 46 0.65536000000000000000e5
-2841 3 14 27 0.16384000000000000000e5
-2841 3 16 29 0.32768000000000000000e5
-2841 4 2 14 -0.16384000000000000000e5
-2841 4 11 23 0.32768000000000000000e5
-2842 1 6 53 0.16384000000000000000e5
-2842 1 25 40 -0.16384000000000000000e5
-2842 2 4 34 0.32768000000000000000e5
-2842 2 21 35 -0.32768000000000000000e5
-2842 3 5 50 0.32768000000000000000e5
-2842 3 7 52 -0.13107200000000000000e6
-2842 3 12 47 0.65536000000000000000e5
-2842 3 24 37 0.16384000000000000000e5
-2842 3 27 40 0.65536000000000000000e5
-2842 3 28 41 0.65536000000000000000e5
-2842 4 4 32 -0.16384000000000000000e5
-2842 4 6 34 0.65536000000000000000e5
-2842 4 7 35 -0.32768000000000000000e5
-2842 4 16 28 0.16384000000000000000e5
-2843 3 12 48 0.65536000000000000000e5
-2843 3 28 41 -0.65536000000000000000e5
-2844 1 6 53 -0.16384000000000000000e5
-2844 1 25 40 0.16384000000000000000e5
-2844 2 4 34 -0.32768000000000000000e5
-2844 2 21 35 0.32768000000000000000e5
-2844 3 5 50 -0.32768000000000000000e5
-2844 3 12 49 0.65536000000000000000e5
-2844 3 24 37 -0.16384000000000000000e5
-2844 3 27 40 -0.65536000000000000000e5
-2844 4 4 32 0.16384000000000000000e5
-2844 4 7 35 0.32768000000000000000e5
-2844 4 16 28 -0.16384000000000000000e5
-2845 3 7 52 -0.65536000000000000000e5
-2845 3 12 50 0.65536000000000000000e5
-2846 1 6 53 -0.81920000000000000000e4
-2846 1 25 40 0.81920000000000000000e4
-2846 2 4 34 -0.16384000000000000000e5
-2846 2 21 35 0.16384000000000000000e5
-2846 3 5 50 -0.16384000000000000000e5
-2846 3 12 51 0.65536000000000000000e5
-2846 3 24 37 -0.81920000000000000000e4
-2846 3 27 40 -0.32768000000000000000e5
-2846 3 28 41 -0.32768000000000000000e5
-2846 3 29 42 -0.32768000000000000000e5
-2846 4 4 32 0.81920000000000000000e4
-2846 4 7 35 0.16384000000000000000e5
-2846 4 16 28 -0.81920000000000000000e4
-2846 4 23 27 -0.32768000000000000000e5
-2847 3 12 52 0.65536000000000000000e5
-2847 3 31 44 -0.65536000000000000000e5
-2848 1 32 47 -0.65536000000000000000e5
-2848 1 37 52 0.65536000000000000000e5
-2848 3 12 53 0.65536000000000000000e5
-2849 3 12 54 0.65536000000000000000e5
-2849 3 23 52 -0.65536000000000000000e5
-2850 3 12 55 0.65536000000000000000e5
-2850 3 34 47 -0.65536000000000000000e5
-2851 1 1 48 -0.16384000000000000000e5
-2851 1 2 49 -0.16384000000000000000e5
-2851 1 8 39 -0.32768000000000000000e5
-2851 1 9 40 -0.32768000000000000000e5
-2851 1 10 41 0.65536000000000000000e5
-2851 1 12 43 0.13107200000000000000e6
-2851 1 23 38 -0.16384000000000000000e5
-2851 1 24 55 0.32768000000000000000e5
-2851 1 26 41 0.32768000000000000000e5
-2851 1 28 43 -0.13107200000000000000e6
-2851 1 32 47 -0.13107200000000000000e6
-2851 1 33 48 0.65536000000000000000e5
-2851 1 40 55 -0.32768000000000000000e5
-2851 1 41 56 -0.32768000000000000000e5
-2851 1 44 51 -0.13107200000000000000e6
-2851 1 46 53 0.13107200000000000000e6
-2851 2 2 32 -0.16384000000000000000e5
-2851 2 4 34 0.32768000000000000000e5
-2851 2 16 30 -0.32768000000000000000e5
-2851 2 20 34 -0.65536000000000000000e5
-2851 2 28 34 -0.32768000000000000000e5
-2851 3 5 50 0.32768000000000000000e5
-2851 3 9 38 -0.32768000000000000000e5
-2851 3 10 55 0.65536000000000000000e5
-2851 3 12 56 0.65536000000000000000e5
-2851 3 22 35 -0.13107200000000000000e6
-2851 3 22 51 -0.32768000000000000000e5
-2851 3 23 52 0.65536000000000000000e5
-2851 3 27 40 0.32768000000000000000e5
-2851 3 27 56 -0.32768000000000000000e5
-2851 3 28 41 -0.13107200000000000000e6
-2851 3 35 48 -0.13107200000000000000e6
-2851 3 38 51 0.32768000000000000000e5
-2851 3 39 52 0.65536000000000000000e5
-2851 3 40 45 0.65536000000000000000e5
-2851 4 2 30 -0.32768000000000000000e5
-2851 4 6 34 -0.65536000000000000000e5
-2851 4 7 35 -0.32768000000000000000e5
-2851 4 22 34 0.65536000000000000000e5
-2851 4 23 35 0.65536000000000000000e5
-2851 4 29 33 0.32768000000000000000e5
-2852 1 3 18 -0.16384000000000000000e5
-2852 1 12 43 0.16384000000000000000e5
-2852 3 3 16 -0.16384000000000000000e5
-2852 3 4 17 -0.16384000000000000000e5
-2852 3 13 13 0.65536000000000000000e5
-2852 3 14 27 0.16384000000000000000e5
-2852 4 2 14 -0.16384000000000000000e5
-2853 1 4 35 0.32768000000000000000e5
-2853 1 10 17 -0.65536000000000000000e5
-2853 1 12 43 0.32768000000000000000e5
-2853 1 14 45 0.65536000000000000000e5
-2853 1 17 48 -0.32768000000000000000e5
-2853 1 18 49 -0.32768000000000000000e5
-2853 2 9 23 0.32768000000000000000e5
-2853 2 14 28 -0.32768000000000000000e5
-2853 3 5 34 0.32768000000000000000e5
-2853 3 13 14 0.65536000000000000000e5
-2853 3 13 42 -0.32768000000000000000e5
-2853 3 14 27 0.32768000000000000000e5
-2853 3 14 43 -0.32768000000000000000e5
-2854 1 5 20 -0.65536000000000000000e5
-2854 1 5 36 0.65536000000000000000e5
-2854 3 13 15 0.65536000000000000000e5
-2855 3 7 20 -0.65536000000000000000e5
-2855 3 13 16 0.65536000000000000000e5
-2856 1 3 18 -0.16384000000000000000e5
-2856 1 4 35 0.16384000000000000000e5
-2856 1 5 20 -0.32768000000000000000e5
-2856 1 5 36 0.32768000000000000000e5
-2856 1 10 17 -0.32768000000000000000e5
-2856 1 12 43 0.32768000000000000000e5
-2856 1 14 45 0.32768000000000000000e5
-2856 1 17 48 -0.16384000000000000000e5
-2856 1 18 49 -0.16384000000000000000e5
-2856 2 9 23 0.16384000000000000000e5
-2856 2 14 28 -0.16384000000000000000e5
-2856 3 3 16 -0.16384000000000000000e5
-2856 3 4 17 -0.16384000000000000000e5
-2856 3 5 34 0.16384000000000000000e5
-2856 3 13 17 0.65536000000000000000e5
-2856 3 13 42 -0.16384000000000000000e5
-2856 3 14 27 0.32768000000000000000e5
-2856 3 14 43 -0.16384000000000000000e5
-2856 4 2 14 -0.16384000000000000000e5
-2856 4 3 15 -0.32768000000000000000e5
-2857 1 3 18 0.16384000000000000000e5
-2857 1 4 35 -0.16384000000000000000e5
-2857 1 5 20 0.32768000000000000000e5
-2857 1 5 36 -0.32768000000000000000e5
-2857 1 10 17 0.32768000000000000000e5
-2857 1 12 43 -0.32768000000000000000e5
-2857 1 14 45 -0.32768000000000000000e5
-2857 1 17 48 0.16384000000000000000e5
-2857 1 18 49 0.16384000000000000000e5
-2857 2 9 23 -0.16384000000000000000e5
-2857 2 14 28 0.16384000000000000000e5
-2857 3 3 16 0.16384000000000000000e5
-2857 3 4 17 0.16384000000000000000e5
-2857 3 5 34 -0.16384000000000000000e5
-2857 3 7 20 0.65536000000000000000e5
-2857 3 8 21 -0.13107200000000000000e6
-2857 3 13 18 0.65536000000000000000e5
-2857 3 13 42 0.16384000000000000000e5
-2857 3 14 27 -0.32768000000000000000e5
-2857 3 14 43 0.16384000000000000000e5
-2857 4 2 14 0.16384000000000000000e5
-2857 4 3 15 0.32768000000000000000e5
-2857 4 10 14 0.65536000000000000000e5
-2858 3 8 21 -0.65536000000000000000e5
-2858 3 13 19 0.65536000000000000000e5
-2859 3 13 20 0.65536000000000000000e5
-2859 3 14 19 -0.65536000000000000000e5
-2860 3 8 21 -0.32768000000000000000e5
-2860 3 13 21 0.65536000000000000000e5
-2860 3 15 20 0.32768000000000000000e5
-2860 3 18 19 -0.65536000000000000000e5
-2860 4 11 15 -0.32768000000000000000e5
-2860 4 14 14 0.65536000000000000000e5
-2861 3 2 31 -0.65536000000000000000e5
-2861 3 13 22 0.65536000000000000000e5
-2862 1 2 33 -0.65536000000000000000e5
-2862 1 11 42 0.65536000000000000000e5
-2862 1 12 43 0.13107200000000000000e6
-2862 1 28 43 -0.65536000000000000000e5
-2862 1 32 47 -0.65536000000000000000e5
-2862 1 33 48 -0.65536000000000000000e5
-2862 2 12 26 -0.65536000000000000000e5
-2862 3 13 23 0.65536000000000000000e5
-2862 3 13 42 -0.13107200000000000000e6
-2862 3 28 41 -0.65536000000000000000e5
-2862 3 29 42 -0.65536000000000000000e5
-2862 4 3 31 0.65536000000000000000e5
-2863 3 3 32 -0.65536000000000000000e5
-2863 3 13 24 0.65536000000000000000e5
-2864 1 2 33 0.65536000000000000000e5
-2864 1 11 42 -0.65536000000000000000e5
-2864 1 12 43 -0.13107200000000000000e6
-2864 1 28 43 0.65536000000000000000e5
-2864 1 32 47 0.65536000000000000000e5
-2864 1 33 48 0.65536000000000000000e5
-2864 2 12 26 0.65536000000000000000e5
-2864 3 3 32 0.65536000000000000000e5
-2864 3 13 25 0.65536000000000000000e5
-2864 3 13 42 0.13107200000000000000e6
-2864 3 14 27 -0.13107200000000000000e6
-2864 3 28 41 0.65536000000000000000e5
-2864 3 29 42 0.65536000000000000000e5
-2864 4 3 31 -0.65536000000000000000e5
-2864 4 8 20 0.65536000000000000000e5
-2865 3 4 33 -0.65536000000000000000e5
-2865 3 13 26 0.65536000000000000000e5
-2866 1 3 34 -0.65536000000000000000e5
-2866 1 16 47 0.65536000000000000000e5
-2866 3 12 41 0.65536000000000000000e5
-2866 3 13 27 0.65536000000000000000e5
-2867 3 13 28 0.65536000000000000000e5
-2867 3 14 27 -0.65536000000000000000e5
-2868 1 4 35 -0.65536000000000000000e5
-2868 1 17 48 0.65536000000000000000e5
-2868 3 13 29 0.65536000000000000000e5
-2868 3 13 42 0.65536000000000000000e5
-2869 3 5 34 -0.65536000000000000000e5
-2869 3 13 30 0.65536000000000000000e5
-2870 1 3 18 0.32768000000000000000e5
-2870 1 4 19 -0.65536000000000000000e5
-2870 1 12 43 -0.32768000000000000000e5
-2870 1 13 44 0.65536000000000000000e5
-2870 3 3 16 0.32768000000000000000e5
-2870 3 4 17 0.32768000000000000000e5
-2870 3 13 31 0.65536000000000000000e5
-2870 3 14 27 -0.32768000000000000000e5
-2870 4 2 14 0.32768000000000000000e5
-2871 3 13 32 0.65536000000000000000e5
-2871 3 16 29 -0.65536000000000000000e5
-2872 1 5 36 -0.65536000000000000000e5
-2872 1 14 45 0.65536000000000000000e5
-2872 3 13 33 0.65536000000000000000e5
-2873 1 3 18 0.16384000000000000000e5
-2873 1 4 19 -0.32768000000000000000e5
-2873 1 5 36 -0.32768000000000000000e5
-2873 1 12 43 -0.16384000000000000000e5
-2873 1 13 44 0.32768000000000000000e5
-2873 1 14 45 0.32768000000000000000e5
-2873 3 3 16 0.16384000000000000000e5
-2873 3 4 17 0.16384000000000000000e5
-2873 3 13 34 0.65536000000000000000e5
-2873 3 14 27 -0.16384000000000000000e5
-2873 3 16 29 -0.32768000000000000000e5
-2873 4 2 14 0.16384000000000000000e5
-2873 4 11 23 -0.32768000000000000000e5
-2874 3 13 35 0.65536000000000000000e5
-2874 3 18 31 -0.65536000000000000000e5
-2875 3 13 36 0.65536000000000000000e5
-2875 3 19 32 -0.65536000000000000000e5
-2876 1 11 42 -0.65536000000000000000e5
-2876 1 33 48 0.65536000000000000000e5
-2876 2 12 26 0.65536000000000000000e5
-2876 2 20 34 -0.65536000000000000000e5
-2876 3 13 37 0.65536000000000000000e5
-2876 3 13 42 0.13107200000000000000e6
-2876 3 22 35 -0.13107200000000000000e6
-2876 3 29 42 0.65536000000000000000e5
-2876 4 3 31 -0.65536000000000000000e5
-2876 4 6 34 -0.65536000000000000000e5
-2877 1 10 41 -0.65536000000000000000e5
-2877 1 32 47 0.65536000000000000000e5
-2877 3 13 38 0.65536000000000000000e5
-2877 3 28 41 0.65536000000000000000e5
-2878 1 10 41 0.65536000000000000000e5
-2878 1 11 42 0.65536000000000000000e5
-2878 1 32 47 -0.65536000000000000000e5
-2878 1 33 48 -0.65536000000000000000e5
-2878 3 13 39 0.65536000000000000000e5
-2878 3 13 42 -0.13107200000000000000e6
-2878 3 28 41 -0.65536000000000000000e5
-2878 3 29 42 -0.65536000000000000000e5
-2878 4 3 31 0.65536000000000000000e5
-2879 1 11 42 -0.65536000000000000000e5
-2879 1 33 48 0.65536000000000000000e5
-2879 3 13 40 0.65536000000000000000e5
-2879 3 29 42 0.65536000000000000000e5
-2880 3 13 41 0.65536000000000000000e5
-2880 3 22 35 -0.65536000000000000000e5
-2881 1 14 45 -0.13107200000000000000e6
-2881 1 17 48 0.65536000000000000000e5
-2881 1 18 49 0.65536000000000000000e5
-2881 1 34 49 0.65536000000000000000e5
-2881 2 14 28 0.65536000000000000000e5
-2881 3 13 42 0.65536000000000000000e5
-2881 3 13 43 0.65536000000000000000e5
-2881 3 14 43 0.65536000000000000000e5
-2881 3 18 47 0.65536000000000000000e5
-2882 1 14 45 -0.65536000000000000000e5
-2882 1 17 48 0.32768000000000000000e5
-2882 1 18 49 0.32768000000000000000e5
-2882 1 34 49 0.32768000000000000000e5
-2882 2 14 28 0.32768000000000000000e5
-2882 3 13 44 0.65536000000000000000e5
-2882 3 14 43 0.32768000000000000000e5
-2882 3 18 47 0.32768000000000000000e5
-2882 3 22 35 -0.32768000000000000000e5
-2882 4 14 26 -0.32768000000000000000e5
-2883 1 14 45 0.65536000000000000000e5
-2883 1 17 48 -0.32768000000000000000e5
-2883 1 18 49 -0.32768000000000000000e5
-2883 1 34 49 -0.32768000000000000000e5
-2883 2 14 28 -0.32768000000000000000e5
-2883 3 13 45 0.65536000000000000000e5
-2883 3 14 43 -0.32768000000000000000e5
-2883 3 15 44 0.65536000000000000000e5
-2883 3 16 45 -0.13107200000000000000e6
-2883 3 18 47 -0.32768000000000000000e5
-2883 3 22 35 0.32768000000000000000e5
-2883 4 14 26 0.32768000000000000000e5
-2883 4 15 27 0.65536000000000000000e5
-2884 3 13 46 0.65536000000000000000e5
-2884 3 16 45 -0.65536000000000000000e5
-2885 3 13 47 0.65536000000000000000e5
-2885 3 28 41 -0.65536000000000000000e5
-2886 1 6 53 -0.16384000000000000000e5
-2886 1 25 40 0.16384000000000000000e5
-2886 2 4 34 -0.32768000000000000000e5
-2886 2 21 35 0.32768000000000000000e5
-2886 3 5 50 -0.32768000000000000000e5
-2886 3 13 48 0.65536000000000000000e5
-2886 3 24 37 -0.16384000000000000000e5
-2886 3 27 40 -0.65536000000000000000e5
-2886 4 4 32 0.16384000000000000000e5
-2886 4 7 35 0.32768000000000000000e5
-2886 4 16 28 -0.16384000000000000000e5
-2887 3 13 49 0.65536000000000000000e5
-2887 3 29 42 -0.65536000000000000000e5
-2888 1 6 53 -0.81920000000000000000e4
-2888 1 25 40 0.81920000000000000000e4
-2888 2 4 34 -0.16384000000000000000e5
-2888 2 21 35 0.16384000000000000000e5
-2888 3 5 50 -0.16384000000000000000e5
-2888 3 13 50 0.65536000000000000000e5
-2888 3 24 37 -0.81920000000000000000e4
-2888 3 27 40 -0.32768000000000000000e5
-2888 3 28 41 -0.32768000000000000000e5
-2888 3 29 42 -0.32768000000000000000e5
-2888 4 4 32 0.81920000000000000000e4
-2888 4 7 35 0.16384000000000000000e5
-2888 4 16 28 -0.81920000000000000000e4
-2888 4 23 27 -0.32768000000000000000e5
-2889 3 13 51 0.65536000000000000000e5
-2889 3 18 47 -0.65536000000000000000e5
-2890 3 13 52 0.65536000000000000000e5
-2890 3 19 48 -0.65536000000000000000e5
-2891 3 13 53 0.65536000000000000000e5
-2891 3 23 52 -0.65536000000000000000e5
-2892 3 10 55 0.65536000000000000000e5
-2892 3 13 54 0.65536000000000000000e5
-2892 3 35 48 -0.13107200000000000000e6
-2892 3 40 45 0.65536000000000000000e5
-2892 4 22 34 0.65536000000000000000e5
-2893 1 34 49 -0.65536000000000000000e5
-2893 1 44 51 0.65536000000000000000e5
-2893 3 13 55 0.65536000000000000000e5
-2894 1 1 48 0.16384000000000000000e5
-2894 1 2 49 0.16384000000000000000e5
-2894 1 8 39 0.32768000000000000000e5
-2894 1 9 40 0.32768000000000000000e5
-2894 1 10 41 -0.65536000000000000000e5
-2894 1 12 43 -0.13107200000000000000e6
-2894 1 23 38 0.16384000000000000000e5
-2894 1 24 55 -0.32768000000000000000e5
-2894 1 26 41 -0.32768000000000000000e5
-2894 1 28 43 0.13107200000000000000e6
-2894 1 32 47 0.13107200000000000000e6
-2894 1 33 48 -0.65536000000000000000e5
-2894 1 40 55 0.32768000000000000000e5
-2894 1 41 56 0.32768000000000000000e5
-2894 2 2 32 0.16384000000000000000e5
-2894 2 4 34 -0.32768000000000000000e5
-2894 2 16 30 0.32768000000000000000e5
-2894 2 20 34 0.65536000000000000000e5
-2894 2 28 34 0.32768000000000000000e5
-2894 3 5 50 -0.32768000000000000000e5
-2894 3 9 38 0.32768000000000000000e5
-2894 3 10 55 -0.65536000000000000000e5
-2894 3 13 56 0.65536000000000000000e5
-2894 3 22 35 0.13107200000000000000e6
-2894 3 22 51 0.32768000000000000000e5
-2894 3 23 52 -0.65536000000000000000e5
-2894 3 27 40 -0.32768000000000000000e5
-2894 3 27 56 0.32768000000000000000e5
-2894 3 28 41 0.13107200000000000000e6
-2894 3 35 48 0.13107200000000000000e6
-2894 3 38 51 -0.32768000000000000000e5
-2894 3 40 45 -0.65536000000000000000e5
-2894 4 2 30 0.32768000000000000000e5
-2894 4 6 34 0.65536000000000000000e5
-2894 4 7 35 0.32768000000000000000e5
-2894 4 22 34 -0.65536000000000000000e5
-2894 4 29 33 -0.32768000000000000000e5
-2895 1 5 20 -0.32768000000000000000e5
-2895 1 5 36 0.32768000000000000000e5
-2895 3 14 14 0.65536000000000000000e5
-2896 3 6 19 -0.65536000000000000000e5
-2896 3 14 15 0.65536000000000000000e5
-2897 1 3 18 -0.16384000000000000000e5
-2897 1 4 35 0.16384000000000000000e5
-2897 1 5 20 -0.32768000000000000000e5
-2897 1 5 36 0.32768000000000000000e5
-2897 1 10 17 -0.32768000000000000000e5
-2897 1 12 43 0.32768000000000000000e5
-2897 1 14 45 0.32768000000000000000e5
-2897 1 17 48 -0.16384000000000000000e5
-2897 1 18 49 -0.16384000000000000000e5
-2897 2 9 23 0.16384000000000000000e5
-2897 2 14 28 -0.16384000000000000000e5
-2897 3 3 16 -0.16384000000000000000e5
-2897 3 4 17 -0.16384000000000000000e5
-2897 3 5 34 0.16384000000000000000e5
-2897 3 13 42 -0.16384000000000000000e5
-2897 3 14 16 0.65536000000000000000e5
-2897 3 14 27 0.32768000000000000000e5
-2897 3 14 43 -0.16384000000000000000e5
-2897 4 2 14 -0.16384000000000000000e5
-2897 4 3 15 -0.32768000000000000000e5
-2898 1 3 18 0.16384000000000000000e5
-2898 1 4 35 -0.16384000000000000000e5
-2898 1 5 20 0.32768000000000000000e5
-2898 1 5 36 -0.32768000000000000000e5
-2898 1 10 17 0.32768000000000000000e5
-2898 1 12 43 -0.32768000000000000000e5
-2898 1 14 45 -0.32768000000000000000e5
-2898 1 17 48 0.16384000000000000000e5
-2898 1 18 49 0.16384000000000000000e5
-2898 2 9 23 -0.16384000000000000000e5
-2898 2 14 28 0.16384000000000000000e5
-2898 3 3 16 0.16384000000000000000e5
-2898 3 4 17 0.16384000000000000000e5
-2898 3 5 34 -0.16384000000000000000e5
-2898 3 7 20 0.65536000000000000000e5
-2898 3 8 21 -0.13107200000000000000e6
-2898 3 13 42 0.16384000000000000000e5
-2898 3 14 17 0.65536000000000000000e5
-2898 3 14 27 -0.32768000000000000000e5
-2898 3 14 43 0.16384000000000000000e5
-2898 4 2 14 0.16384000000000000000e5
-2898 4 3 15 0.32768000000000000000e5
-2898 4 10 14 0.65536000000000000000e5
-2899 1 6 21 -0.65536000000000000000e5
-2899 1 18 33 0.65536000000000000000e5
-2899 3 14 18 0.65536000000000000000e5
-2900 3 14 19 0.65536000000000000000e5
-2900 3 14 20 0.65536000000000000000e5
-2900 3 15 20 0.65536000000000000000e5
-2900 3 18 19 -0.13107200000000000000e6
-2900 4 14 14 0.13107200000000000000e6
-2901 3 14 21 0.65536000000000000000e5
-2901 3 18 19 -0.65536000000000000000e5
-2902 1 2 33 -0.65536000000000000000e5
-2902 1 11 42 0.65536000000000000000e5
-2902 1 12 43 0.13107200000000000000e6
-2902 1 28 43 -0.65536000000000000000e5
-2902 1 32 47 -0.65536000000000000000e5
-2902 1 33 48 -0.65536000000000000000e5
-2902 2 12 26 -0.65536000000000000000e5
-2902 3 13 42 -0.13107200000000000000e6
-2902 3 14 22 0.65536000000000000000e5
-2902 3 28 41 -0.65536000000000000000e5
-2902 3 29 42 -0.65536000000000000000e5
-2902 4 3 31 0.65536000000000000000e5
-2903 3 3 32 -0.65536000000000000000e5
-2903 3 14 23 0.65536000000000000000e5
-2904 1 2 33 0.65536000000000000000e5
-2904 1 11 42 -0.65536000000000000000e5
-2904 1 12 43 -0.13107200000000000000e6
-2904 1 28 43 0.65536000000000000000e5
-2904 1 32 47 0.65536000000000000000e5
-2904 1 33 48 0.65536000000000000000e5
-2904 2 12 26 0.65536000000000000000e5
-2904 3 3 32 0.65536000000000000000e5
-2904 3 13 42 0.13107200000000000000e6
-2904 3 14 24 0.65536000000000000000e5
-2904 3 14 27 -0.13107200000000000000e6
-2904 3 28 41 0.65536000000000000000e5
-2904 3 29 42 0.65536000000000000000e5
-2904 4 3 31 -0.65536000000000000000e5
-2904 4 8 20 0.65536000000000000000e5
-2905 3 4 33 -0.65536000000000000000e5
-2905 3 14 25 0.65536000000000000000e5
-2906 1 2 33 -0.65536000000000000000e5
-2906 1 11 42 0.65536000000000000000e5
-2906 1 12 43 0.13107200000000000000e6
-2906 1 28 43 -0.65536000000000000000e5
-2906 1 32 47 -0.65536000000000000000e5
-2906 1 33 48 -0.65536000000000000000e5
-2906 2 12 26 -0.65536000000000000000e5
-2906 3 3 32 -0.65536000000000000000e5
-2906 3 4 33 0.65536000000000000000e5
-2906 3 5 34 -0.13107200000000000000e6
-2906 3 13 42 -0.13107200000000000000e6
-2906 3 14 26 0.65536000000000000000e5
-2906 3 14 27 0.13107200000000000000e6
-2906 3 28 41 -0.65536000000000000000e5
-2906 3 29 42 -0.65536000000000000000e5
-2906 4 3 31 0.65536000000000000000e5
-2906 4 8 20 -0.65536000000000000000e5
-2906 4 9 21 0.65536000000000000000e5
-2907 1 4 35 -0.65536000000000000000e5
-2907 1 17 48 0.65536000000000000000e5
-2907 3 13 42 0.65536000000000000000e5
-2907 3 14 28 0.65536000000000000000e5
-2908 3 5 34 -0.65536000000000000000e5
-2908 3 14 29 0.65536000000000000000e5
-2909 1 15 30 -0.65536000000000000000e5
-2909 1 18 49 0.65536000000000000000e5
-2909 3 14 30 0.65536000000000000000e5
-2909 3 14 43 0.65536000000000000000e5
-2910 3 14 31 0.65536000000000000000e5
-2910 3 16 29 -0.65536000000000000000e5
-2911 1 5 36 -0.65536000000000000000e5
-2911 1 14 45 0.65536000000000000000e5
-2911 3 14 32 0.65536000000000000000e5
-2912 3 14 33 0.65536000000000000000e5
-2912 3 17 30 -0.65536000000000000000e5
-2913 3 14 34 0.65536000000000000000e5
-2913 3 18 31 -0.65536000000000000000e5
-2914 1 15 46 0.65536000000000000000e5
-2914 1 18 33 -0.65536000000000000000e5
-2914 3 14 35 0.65536000000000000000e5
-2915 1 3 18 -0.81920000000000000000e4
-2915 1 4 19 0.16384000000000000000e5
-2915 1 5 36 0.16384000000000000000e5
-2915 1 12 43 0.81920000000000000000e4
-2915 1 13 44 -0.16384000000000000000e5
-2915 1 14 21 -0.13107200000000000000e6
-2915 1 14 45 -0.16384000000000000000e5
-2915 1 21 44 0.13107200000000000000e6
-2915 2 11 25 0.32768000000000000000e5
-2915 2 15 29 -0.32768000000000000000e5
-2915 3 3 16 -0.81920000000000000000e4
-2915 3 4 17 -0.81920000000000000000e4
-2915 3 7 36 0.32768000000000000000e5
-2915 3 8 21 0.65536000000000000000e5
-2915 3 14 27 0.81920000000000000000e4
-2915 3 14 36 0.65536000000000000000e5
-2915 3 15 20 -0.65536000000000000000e5
-2915 3 16 29 0.16384000000000000000e5
-2915 3 18 19 0.13107200000000000000e6
-2915 3 18 31 0.32768000000000000000e5
-2915 3 19 32 0.65536000000000000000e5
-2915 4 2 14 -0.81920000000000000000e4
-2915 4 11 15 0.65536000000000000000e5
-2915 4 11 23 0.16384000000000000000e5
-2915 4 13 25 0.65536000000000000000e5
-2915 4 14 14 -0.13107200000000000000e6
-2916 1 10 41 -0.65536000000000000000e5
-2916 1 32 47 0.65536000000000000000e5
-2916 3 14 37 0.65536000000000000000e5
-2916 3 28 41 0.65536000000000000000e5
-2917 1 10 41 0.65536000000000000000e5
-2917 1 11 42 0.65536000000000000000e5
-2917 1 32 47 -0.65536000000000000000e5
-2917 1 33 48 -0.65536000000000000000e5
-2917 3 13 42 -0.13107200000000000000e6
-2917 3 14 38 0.65536000000000000000e5
-2917 3 28 41 -0.65536000000000000000e5
-2917 3 29 42 -0.65536000000000000000e5
-2917 4 3 31 0.65536000000000000000e5
-2918 1 11 42 -0.65536000000000000000e5
-2918 1 33 48 0.65536000000000000000e5
-2918 3 14 39 0.65536000000000000000e5
-2918 3 29 42 0.65536000000000000000e5
-2919 1 26 33 -0.65536000000000000000e5
-2919 1 33 40 0.65536000000000000000e5
-2919 3 14 40 0.65536000000000000000e5
-2920 3 13 42 -0.65536000000000000000e5
-2920 3 14 41 0.65536000000000000000e5
-2921 1 14 45 -0.13107200000000000000e6
-2921 1 17 48 0.65536000000000000000e5
-2921 1 18 49 0.65536000000000000000e5
-2921 1 34 49 0.65536000000000000000e5
-2921 2 14 28 0.65536000000000000000e5
-2921 3 13 42 0.65536000000000000000e5
-2921 3 14 42 0.65536000000000000000e5
-2921 3 14 43 0.65536000000000000000e5
-2921 3 18 47 0.65536000000000000000e5
-2922 1 14 45 0.65536000000000000000e5
-2922 1 17 48 -0.32768000000000000000e5
-2922 1 18 49 -0.32768000000000000000e5
-2922 1 34 49 -0.32768000000000000000e5
-2922 2 14 28 -0.32768000000000000000e5
-2922 3 14 43 -0.32768000000000000000e5
-2922 3 14 44 0.65536000000000000000e5
-2922 3 15 44 0.65536000000000000000e5
-2922 3 16 45 -0.13107200000000000000e6
-2922 3 18 47 -0.32768000000000000000e5
-2922 3 22 35 0.32768000000000000000e5
-2922 4 14 26 0.32768000000000000000e5
-2922 4 15 27 0.65536000000000000000e5
-2923 3 14 45 0.65536000000000000000e5
-2923 3 15 44 -0.65536000000000000000e5
-2924 1 15 46 -0.65536000000000000000e5
-2924 1 20 51 0.65536000000000000000e5
-2924 3 14 46 0.65536000000000000000e5
-2925 1 6 53 -0.16384000000000000000e5
-2925 1 25 40 0.16384000000000000000e5
-2925 2 4 34 -0.32768000000000000000e5
-2925 2 21 35 0.32768000000000000000e5
-2925 3 5 50 -0.32768000000000000000e5
-2925 3 14 47 0.65536000000000000000e5
-2925 3 24 37 -0.16384000000000000000e5
-2925 3 27 40 -0.65536000000000000000e5
-2925 4 4 32 0.16384000000000000000e5
-2925 4 7 35 0.32768000000000000000e5
-2925 4 16 28 -0.16384000000000000000e5
-2926 3 14 48 0.65536000000000000000e5
-2926 3 29 42 -0.65536000000000000000e5
-2927 3 14 49 0.65536000000000000000e5
-2927 3 14 51 -0.13107200000000000000e6
-2927 3 29 42 0.65536000000000000000e5
-2927 3 30 43 0.65536000000000000000e5
-2927 4 19 31 0.65536000000000000000e5
-2928 3 14 50 0.65536000000000000000e5
-2928 3 18 47 -0.65536000000000000000e5
-2929 3 14 52 0.65536000000000000000e5
-2929 3 32 45 -0.65536000000000000000e5
-2930 3 10 55 0.65536000000000000000e5
-2930 3 14 53 0.65536000000000000000e5
-2930 3 35 48 -0.13107200000000000000e6
-2930 3 40 45 0.65536000000000000000e5
-2930 4 22 34 0.65536000000000000000e5
-2931 3 10 55 -0.65536000000000000000e5
-2931 3 14 54 0.65536000000000000000e5
-2932 3 14 55 0.65536000000000000000e5
-2932 3 35 48 -0.65536000000000000000e5
-2933 3 14 56 0.65536000000000000000e5
-2933 3 39 52 -0.65536000000000000000e5
-2934 1 5 20 0.32768000000000000000e5
-2934 1 5 36 -0.32768000000000000000e5
-2934 1 6 21 -0.65536000000000000000e5
-2934 1 18 33 0.65536000000000000000e5
-2934 3 6 19 0.32768000000000000000e5
-2934 3 15 15 0.65536000000000000000e5
-2934 4 12 12 0.65536000000000000000e5
-2935 1 3 18 0.16384000000000000000e5
-2935 1 4 35 -0.16384000000000000000e5
-2935 1 5 20 0.32768000000000000000e5
-2935 1 5 36 -0.32768000000000000000e5
-2935 1 10 17 0.32768000000000000000e5
-2935 1 12 43 -0.32768000000000000000e5
-2935 1 14 45 -0.32768000000000000000e5
-2935 1 17 48 0.16384000000000000000e5
-2935 1 18 49 0.16384000000000000000e5
-2935 2 9 23 -0.16384000000000000000e5
-2935 2 14 28 0.16384000000000000000e5
-2935 3 3 16 0.16384000000000000000e5
-2935 3 4 17 0.16384000000000000000e5
-2935 3 5 34 -0.16384000000000000000e5
-2935 3 7 20 0.65536000000000000000e5
-2935 3 8 21 -0.13107200000000000000e6
-2935 3 13 42 0.16384000000000000000e5
-2935 3 14 27 -0.32768000000000000000e5
-2935 3 14 43 0.16384000000000000000e5
-2935 3 15 16 0.65536000000000000000e5
-2935 4 2 14 0.16384000000000000000e5
-2935 4 3 15 0.32768000000000000000e5
-2935 4 10 14 0.65536000000000000000e5
-2936 1 6 21 -0.65536000000000000000e5
-2936 1 18 33 0.65536000000000000000e5
-2936 3 15 17 0.65536000000000000000e5
-2937 3 11 20 -0.65536000000000000000e5
-2937 3 15 18 0.65536000000000000000e5
-2938 3 14 19 0.65536000000000000000e5
-2938 3 15 19 0.65536000000000000000e5
-2938 3 15 20 0.65536000000000000000e5
-2938 3 18 19 -0.13107200000000000000e6
-2938 4 14 14 0.13107200000000000000e6
-2939 3 3 32 -0.65536000000000000000e5
-2939 3 15 22 0.65536000000000000000e5
-2940 1 2 33 0.65536000000000000000e5
-2940 1 11 42 -0.65536000000000000000e5
-2940 1 12 43 -0.13107200000000000000e6
-2940 1 28 43 0.65536000000000000000e5
-2940 1 32 47 0.65536000000000000000e5
-2940 1 33 48 0.65536000000000000000e5
-2940 2 12 26 0.65536000000000000000e5
-2940 3 3 32 0.65536000000000000000e5
-2940 3 13 42 0.13107200000000000000e6
-2940 3 14 27 -0.13107200000000000000e6
-2940 3 15 23 0.65536000000000000000e5
-2940 3 28 41 0.65536000000000000000e5
-2940 3 29 42 0.65536000000000000000e5
-2940 4 3 31 -0.65536000000000000000e5
-2940 4 8 20 0.65536000000000000000e5
-2941 3 4 33 -0.65536000000000000000e5
-2941 3 15 24 0.65536000000000000000e5
-2942 1 2 33 -0.65536000000000000000e5
-2942 1 11 42 0.65536000000000000000e5
-2942 1 12 43 0.13107200000000000000e6
-2942 1 28 43 -0.65536000000000000000e5
-2942 1 32 47 -0.65536000000000000000e5
-2942 1 33 48 -0.65536000000000000000e5
-2942 2 12 26 -0.65536000000000000000e5
-2942 3 3 32 -0.65536000000000000000e5
-2942 3 4 33 0.65536000000000000000e5
-2942 3 5 34 -0.13107200000000000000e6
-2942 3 13 42 -0.13107200000000000000e6
-2942 3 14 27 0.13107200000000000000e6
-2942 3 15 25 0.65536000000000000000e5
-2942 3 28 41 -0.65536000000000000000e5
-2942 3 29 42 -0.65536000000000000000e5
-2942 4 3 31 0.65536000000000000000e5
-2942 4 8 20 -0.65536000000000000000e5
-2942 4 9 21 0.65536000000000000000e5
-2943 3 11 30 -0.65536000000000000000e5
-2943 3 15 26 0.65536000000000000000e5
-2944 1 4 35 -0.65536000000000000000e5
-2944 1 17 48 0.65536000000000000000e5
-2944 3 13 42 0.65536000000000000000e5
-2944 3 15 27 0.65536000000000000000e5
-2945 3 5 34 -0.65536000000000000000e5
-2945 3 15 28 0.65536000000000000000e5
-2946 1 15 30 -0.65536000000000000000e5
-2946 1 18 49 0.65536000000000000000e5
-2946 3 14 43 0.65536000000000000000e5
-2946 3 15 29 0.65536000000000000000e5
-2947 3 6 35 -0.65536000000000000000e5
-2947 3 15 30 0.65536000000000000000e5
-2948 1 5 36 -0.65536000000000000000e5
-2948 1 14 45 0.65536000000000000000e5
-2948 3 15 31 0.65536000000000000000e5
-2949 3 15 32 0.65536000000000000000e5
-2949 3 17 30 -0.65536000000000000000e5
-2950 1 5 36 0.65536000000000000000e5
-2950 1 14 45 -0.65536000000000000000e5
-2950 1 15 46 0.13107200000000000000e6
-2950 1 18 33 -0.13107200000000000000e6
-2950 3 15 33 0.65536000000000000000e5
-2950 3 17 30 0.65536000000000000000e5
-2950 4 12 24 0.65536000000000000000e5
-2951 1 15 46 0.65536000000000000000e5
-2951 1 18 33 -0.65536000000000000000e5
-2951 3 15 34 0.65536000000000000000e5
-2952 3 15 35 0.65536000000000000000e5
-2952 3 21 26 -0.65536000000000000000e5
-2953 3 15 36 0.65536000000000000000e5
-2953 3 20 33 -0.65536000000000000000e5
-2954 1 10 41 0.65536000000000000000e5
-2954 1 11 42 0.65536000000000000000e5
-2954 1 32 47 -0.65536000000000000000e5
-2954 1 33 48 -0.65536000000000000000e5
-2954 3 13 42 -0.13107200000000000000e6
-2954 3 15 37 0.65536000000000000000e5
-2954 3 28 41 -0.65536000000000000000e5
-2954 3 29 42 -0.65536000000000000000e5
-2954 4 3 31 0.65536000000000000000e5
-2955 1 11 42 -0.65536000000000000000e5
-2955 1 33 48 0.65536000000000000000e5
-2955 3 15 38 0.65536000000000000000e5
-2955 3 29 42 0.65536000000000000000e5
-2956 1 26 33 -0.65536000000000000000e5
-2956 1 33 40 0.65536000000000000000e5
-2956 3 15 39 0.65536000000000000000e5
-2957 1 11 42 0.65536000000000000000e5
-2957 1 26 33 0.65536000000000000000e5
-2957 1 33 40 -0.65536000000000000000e5
-2957 1 33 48 -0.65536000000000000000e5
-2957 3 14 43 -0.13107200000000000000e6
-2957 3 15 40 0.65536000000000000000e5
-2957 3 29 42 -0.65536000000000000000e5
-2957 4 22 22 0.13107200000000000000e6
-2958 1 14 45 -0.13107200000000000000e6
-2958 1 17 48 0.65536000000000000000e5
-2958 1 18 49 0.65536000000000000000e5
-2958 1 34 49 0.65536000000000000000e5
-2958 2 14 28 0.65536000000000000000e5
-2958 3 13 42 0.65536000000000000000e5
-2958 3 14 43 0.65536000000000000000e5
-2958 3 15 41 0.65536000000000000000e5
-2958 3 18 47 0.65536000000000000000e5
-2959 3 14 43 -0.65536000000000000000e5
-2959 3 15 42 0.65536000000000000000e5
-2960 3 15 43 0.65536000000000000000e5
-2960 3 26 35 -0.65536000000000000000e5
-2961 3 15 45 0.65536000000000000000e5
-2961 3 30 35 -0.65536000000000000000e5
-2962 3 15 47 0.65536000000000000000e5
-2962 3 29 42 -0.65536000000000000000e5
-2963 3 14 51 -0.13107200000000000000e6
-2963 3 15 48 0.65536000000000000000e5
-2963 3 29 42 0.65536000000000000000e5
-2963 3 30 43 0.65536000000000000000e5
-2963 4 19 31 0.65536000000000000000e5
-2964 3 15 49 0.65536000000000000000e5
-2964 3 30 43 -0.65536000000000000000e5
-2965 3 14 51 -0.65536000000000000000e5
-2965 3 15 50 0.65536000000000000000e5
-2966 3 15 51 0.65536000000000000000e5
-2966 3 35 40 -0.65536000000000000000e5
-2967 3 15 52 0.65536000000000000000e5
-2967 3 20 49 -0.65536000000000000000e5
-2968 3 10 55 -0.65536000000000000000e5
-2968 3 15 53 0.65536000000000000000e5
-2969 3 15 54 0.65536000000000000000e5
-2969 3 40 45 -0.65536000000000000000e5
-2970 1 11 18 -0.13107200000000000000e6
-2970 1 34 49 0.65536000000000000000e5
-2970 1 44 51 -0.65536000000000000000e5
-2970 1 45 52 0.13107200000000000000e6
-2970 3 6 19 0.13107200000000000000e6
-2970 3 15 44 0.13107200000000000000e6
-2970 3 15 55 0.65536000000000000000e5
-2970 3 17 30 0.13107200000000000000e6
-2970 3 32 45 0.13107200000000000000e6
-2970 3 35 48 0.65536000000000000000e5
-2970 4 25 33 0.65536000000000000000e5
-2971 1 1 48 -0.16384000000000000000e5
-2971 1 2 49 -0.16384000000000000000e5
-2971 1 8 39 -0.32768000000000000000e5
-2971 1 9 40 -0.32768000000000000000e5
-2971 1 10 41 0.65536000000000000000e5
-2971 1 12 43 0.13107200000000000000e6
-2971 1 23 38 -0.16384000000000000000e5
-2971 1 24 55 0.32768000000000000000e5
-2971 1 26 41 0.32768000000000000000e5
-2971 1 28 43 -0.13107200000000000000e6
-2971 1 32 47 -0.13107200000000000000e6
-2971 1 33 48 0.65536000000000000000e5
-2971 1 40 55 -0.32768000000000000000e5
-2971 1 41 56 -0.32768000000000000000e5
-2971 2 2 32 -0.16384000000000000000e5
-2971 2 4 34 0.32768000000000000000e5
-2971 2 16 30 -0.32768000000000000000e5
-2971 2 20 34 -0.65536000000000000000e5
-2971 2 28 34 -0.32768000000000000000e5
-2971 3 5 50 0.32768000000000000000e5
-2971 3 9 38 -0.32768000000000000000e5
-2971 3 10 55 0.65536000000000000000e5
-2971 3 15 56 0.65536000000000000000e5
-2971 3 22 35 -0.13107200000000000000e6
-2971 3 22 51 -0.32768000000000000000e5
-2971 3 23 52 0.65536000000000000000e5
-2971 3 27 40 0.32768000000000000000e5
-2971 3 27 56 -0.32768000000000000000e5
-2971 3 28 41 -0.13107200000000000000e6
-2971 3 35 48 -0.13107200000000000000e6
-2971 3 38 51 0.32768000000000000000e5
-2971 3 39 52 0.65536000000000000000e5
-2971 3 40 45 0.65536000000000000000e5
-2971 3 45 50 -0.13107200000000000000e6
-2971 4 2 30 -0.32768000000000000000e5
-2971 4 6 34 -0.65536000000000000000e5
-2971 4 7 35 -0.32768000000000000000e5
-2971 4 22 34 0.65536000000000000000e5
-2971 4 29 33 0.32768000000000000000e5
-2971 4 30 34 0.65536000000000000000e5
-2972 3 8 21 0.32768000000000000000e5
-2972 3 12 21 -0.65536000000000000000e5
-2972 3 14 19 0.32768000000000000000e5
-2972 3 16 16 0.65536000000000000000e5
-2972 4 13 13 0.65536000000000000000e5
-2973 3 8 21 -0.65536000000000000000e5
-2973 3 16 17 0.65536000000000000000e5
-2974 3 14 19 -0.65536000000000000000e5
-2974 3 16 18 0.65536000000000000000e5
-2975 3 12 21 -0.65536000000000000000e5
-2975 3 16 19 0.65536000000000000000e5
-2976 3 8 21 -0.32768000000000000000e5
-2976 3 15 20 0.32768000000000000000e5
-2976 3 16 20 0.65536000000000000000e5
-2976 3 18 19 -0.65536000000000000000e5
-2976 4 11 15 -0.32768000000000000000e5
-2976 4 14 14 0.65536000000000000000e5
-2977 3 1 34 -0.65536000000000000000e5
-2977 3 16 22 0.65536000000000000000e5
-2978 1 3 34 -0.65536000000000000000e5
-2978 1 16 47 0.65536000000000000000e5
-2978 3 12 41 0.65536000000000000000e5
-2978 3 16 23 0.65536000000000000000e5
-2979 3 14 27 -0.65536000000000000000e5
-2979 3 16 24 0.65536000000000000000e5
-2980 1 4 35 -0.65536000000000000000e5
-2980 1 17 48 0.65536000000000000000e5
-2980 3 13 42 0.65536000000000000000e5
-2980 3 16 25 0.65536000000000000000e5
-2981 3 5 34 -0.65536000000000000000e5
-2981 3 16 26 0.65536000000000000000e5
-2982 1 3 18 -0.32768000000000000000e5
-2982 1 4 19 0.65536000000000000000e5
-2982 1 4 35 0.32768000000000000000e5
-2982 1 12 43 0.65536000000000000000e5
-2982 1 14 45 0.65536000000000000000e5
-2982 1 17 48 -0.32768000000000000000e5
-2982 1 18 49 -0.32768000000000000000e5
-2982 1 20 27 -0.13107200000000000000e6
-2982 1 27 34 0.65536000000000000000e5
-2982 2 9 23 0.32768000000000000000e5
-2982 2 10 24 0.65536000000000000000e5
-2982 2 14 28 -0.32768000000000000000e5
-2982 3 3 16 -0.32768000000000000000e5
-2982 3 4 17 -0.32768000000000000000e5
-2982 3 5 34 0.32768000000000000000e5
-2982 3 13 42 -0.32768000000000000000e5
-2982 3 14 27 0.65536000000000000000e5
-2982 3 14 43 -0.32768000000000000000e5
-2982 3 16 27 0.65536000000000000000e5
-2982 4 2 14 -0.32768000000000000000e5
-2983 1 3 18 0.32768000000000000000e5
-2983 1 4 19 -0.65536000000000000000e5
-2983 1 12 43 -0.32768000000000000000e5
-2983 1 13 44 0.65536000000000000000e5
-2983 3 3 16 0.32768000000000000000e5
-2983 3 4 17 0.32768000000000000000e5
-2983 3 14 27 -0.32768000000000000000e5
-2983 3 16 28 0.65536000000000000000e5
-2983 4 2 14 0.32768000000000000000e5
-2984 1 5 36 -0.65536000000000000000e5
-2984 1 14 45 0.65536000000000000000e5
-2984 3 16 30 0.65536000000000000000e5
-2985 3 7 36 -0.65536000000000000000e5
-2985 3 16 31 0.65536000000000000000e5
-2986 1 3 18 0.16384000000000000000e5
-2986 1 4 19 -0.32768000000000000000e5
-2986 1 5 36 -0.32768000000000000000e5
-2986 1 12 43 -0.16384000000000000000e5
-2986 1 13 44 0.32768000000000000000e5
-2986 1 14 45 0.32768000000000000000e5
-2986 3 3 16 0.16384000000000000000e5
-2986 3 4 17 0.16384000000000000000e5
-2986 3 14 27 -0.16384000000000000000e5
-2986 3 16 29 -0.32768000000000000000e5
-2986 3 16 32 0.65536000000000000000e5
-2986 4 2 14 0.16384000000000000000e5
-2986 4 11 23 -0.32768000000000000000e5
-2987 3 16 33 0.65536000000000000000e5
-2987 3 18 31 -0.65536000000000000000e5
-2988 1 3 18 0.81920000000000000000e4
-2988 1 4 19 -0.16384000000000000000e5
-2988 1 5 36 -0.16384000000000000000e5
-2988 1 12 43 -0.81920000000000000000e4
-2988 1 13 44 0.16384000000000000000e5
-2988 1 14 45 0.16384000000000000000e5
-2988 2 11 25 -0.32768000000000000000e5
-2988 2 15 29 0.32768000000000000000e5
-2988 3 3 16 0.81920000000000000000e4
-2988 3 4 17 0.81920000000000000000e4
-2988 3 7 36 -0.32768000000000000000e5
-2988 3 14 27 -0.81920000000000000000e4
-2988 3 16 29 -0.16384000000000000000e5
-2988 3 16 34 0.65536000000000000000e5
-2988 3 18 31 -0.32768000000000000000e5
-2988 4 2 14 0.81920000000000000000e4
-2988 4 11 23 -0.16384000000000000000e5
-2989 3 16 35 0.65536000000000000000e5
-2989 3 19 32 -0.65536000000000000000e5
-2990 1 14 21 -0.65536000000000000000e5
-2990 1 21 44 0.65536000000000000000e5
-2990 3 8 21 0.32768000000000000000e5
-2990 3 15 20 -0.32768000000000000000e5
-2990 3 16 36 0.65536000000000000000e5
-2990 3 18 19 0.65536000000000000000e5
-2990 4 11 15 0.32768000000000000000e5
-2990 4 14 14 -0.65536000000000000000e5
-2991 3 12 41 -0.65536000000000000000e5
-2991 3 16 37 0.65536000000000000000e5
-2992 3 16 38 0.65536000000000000000e5
-2992 3 22 35 -0.65536000000000000000e5
-2993 3 13 42 -0.65536000000000000000e5
-2993 3 16 39 0.65536000000000000000e5
-2994 1 14 45 -0.13107200000000000000e6
-2994 1 17 48 0.65536000000000000000e5
-2994 1 18 49 0.65536000000000000000e5
-2994 1 34 49 0.65536000000000000000e5
-2994 2 14 28 0.65536000000000000000e5
-2994 3 13 42 0.65536000000000000000e5
-2994 3 14 43 0.65536000000000000000e5
-2994 3 16 40 0.65536000000000000000e5
-2994 3 18 47 0.65536000000000000000e5
-2995 1 13 44 -0.65536000000000000000e5
-2995 1 34 41 0.65536000000000000000e5
-2995 3 16 41 0.65536000000000000000e5
-2996 1 14 45 -0.65536000000000000000e5
-2996 1 17 48 0.32768000000000000000e5
-2996 1 18 49 0.32768000000000000000e5
-2996 1 34 49 0.32768000000000000000e5
-2996 2 14 28 0.32768000000000000000e5
-2996 3 14 43 0.32768000000000000000e5
-2996 3 16 42 0.65536000000000000000e5
-2996 3 18 47 0.32768000000000000000e5
-2996 3 22 35 -0.32768000000000000000e5
-2996 4 14 26 -0.32768000000000000000e5
-2997 1 14 45 0.65536000000000000000e5
-2997 1 17 48 -0.32768000000000000000e5
-2997 1 18 49 -0.32768000000000000000e5
-2997 1 34 49 -0.32768000000000000000e5
-2997 2 14 28 -0.32768000000000000000e5
-2997 3 14 43 -0.32768000000000000000e5
-2997 3 15 44 0.65536000000000000000e5
-2997 3 16 43 0.65536000000000000000e5
-2997 3 16 45 -0.13107200000000000000e6
-2997 3 18 47 -0.32768000000000000000e5
-2997 3 22 35 0.32768000000000000000e5
-2997 4 14 26 0.32768000000000000000e5
-2997 4 15 27 0.65536000000000000000e5
-2998 1 3 18 -0.16384000000000000000e5
-2998 1 4 19 0.32768000000000000000e5
-2998 1 5 36 0.32768000000000000000e5
-2998 1 12 43 0.16384000000000000000e5
-2998 1 13 44 -0.32768000000000000000e5
-2998 1 14 45 -0.32768000000000000000e5
-2998 1 17 32 -0.65536000000000000000e5
-2998 1 19 50 0.65536000000000000000e5
-2998 3 3 16 -0.16384000000000000000e5
-2998 3 4 17 -0.16384000000000000000e5
-2998 3 14 27 0.16384000000000000000e5
-2998 3 16 29 0.32768000000000000000e5
-2998 3 16 44 0.65536000000000000000e5
-2998 4 2 14 -0.16384000000000000000e5
-2998 4 11 23 0.32768000000000000000e5
-2999 1 6 21 -0.32768000000000000000e5
-2999 1 17 32 -0.32768000000000000000e5
-2999 1 19 50 0.32768000000000000000e5
-2999 1 20 51 0.32768000000000000000e5
-2999 2 9 15 -0.32768000000000000000e5
-2999 2 25 31 0.32768000000000000000e5
-2999 3 7 20 0.32768000000000000000e5
-2999 3 8 21 -0.65536000000000000000e5
-2999 3 14 19 0.65536000000000000000e5
-2999 3 16 45 -0.32768000000000000000e5
-2999 3 16 46 0.65536000000000000000e5
-2999 3 18 31 -0.32768000000000000000e5
-2999 3 19 32 0.65536000000000000000e5
-2999 4 10 14 0.32768000000000000000e5
-3000 3 7 52 -0.65536000000000000000e5
-3000 3 16 47 0.65536000000000000000e5
-3001 1 6 53 -0.81920000000000000000e4
-3001 1 25 40 0.81920000000000000000e4
-3001 2 4 34 -0.16384000000000000000e5
-3001 2 21 35 0.16384000000000000000e5
-3001 3 5 50 -0.16384000000000000000e5
-3001 3 16 48 0.65536000000000000000e5
-3001 3 24 37 -0.81920000000000000000e4
-3001 3 27 40 -0.32768000000000000000e5
-3001 3 28 41 -0.32768000000000000000e5
-3001 3 29 42 -0.32768000000000000000e5
-3001 4 4 32 0.81920000000000000000e4
-3001 4 7 35 0.16384000000000000000e5
-3001 4 16 28 -0.81920000000000000000e4
-3001 4 23 27 -0.32768000000000000000e5
-3002 3 16 49 0.65536000000000000000e5
-3002 3 18 47 -0.65536000000000000000e5
-3003 3 16 50 0.65536000000000000000e5
-3003 3 31 44 -0.65536000000000000000e5
-3004 3 16 51 0.65536000000000000000e5
-3004 3 19 48 -0.65536000000000000000e5
-3005 3 16 52 0.65536000000000000000e5
-3005 3 36 41 -0.65536000000000000000e5
-3006 3 16 53 0.65536000000000000000e5
-3006 3 34 47 -0.65536000000000000000e5
-3007 1 34 49 -0.65536000000000000000e5
-3007 1 44 51 0.65536000000000000000e5
-3007 3 16 54 0.65536000000000000000e5
-3008 3 16 55 0.65536000000000000000e5
-3008 3 41 46 -0.65536000000000000000e5
-3009 1 44 51 -0.65536000000000000000e5
-3009 1 46 53 0.65536000000000000000e5
-3009 3 16 56 0.65536000000000000000e5
-3010 3 14 19 -0.32768000000000000000e5
-3010 3 17 17 0.65536000000000000000e5
-3011 3 14 19 0.65536000000000000000e5
-3011 3 15 20 0.65536000000000000000e5
-3011 3 17 18 0.65536000000000000000e5
-3011 3 18 19 -0.13107200000000000000e6
-3011 4 14 14 0.13107200000000000000e6
-3012 3 8 21 -0.32768000000000000000e5
-3012 3 15 20 0.32768000000000000000e5
-3012 3 17 19 0.65536000000000000000e5
-3012 3 18 19 -0.65536000000000000000e5
-3012 4 11 15 -0.32768000000000000000e5
-3012 4 14 14 0.65536000000000000000e5
-3013 3 17 20 0.65536000000000000000e5
-3013 3 18 19 -0.65536000000000000000e5
-3014 3 17 21 0.65536000000000000000e5
-3014 3 19 20 -0.65536000000000000000e5
-3015 1 3 34 -0.65536000000000000000e5
-3015 1 16 47 0.65536000000000000000e5
-3015 3 12 41 0.65536000000000000000e5
-3015 3 17 22 0.65536000000000000000e5
-3016 3 14 27 -0.65536000000000000000e5
-3016 3 17 23 0.65536000000000000000e5
-3017 1 4 35 -0.65536000000000000000e5
-3017 1 17 48 0.65536000000000000000e5
-3017 3 13 42 0.65536000000000000000e5
-3017 3 17 24 0.65536000000000000000e5
-3018 3 5 34 -0.65536000000000000000e5
-3018 3 17 25 0.65536000000000000000e5
-3019 1 15 30 -0.65536000000000000000e5
-3019 1 18 49 0.65536000000000000000e5
-3019 3 14 43 0.65536000000000000000e5
-3019 3 17 26 0.65536000000000000000e5
-3020 1 3 18 0.32768000000000000000e5
-3020 1 4 19 -0.65536000000000000000e5
-3020 1 12 43 -0.32768000000000000000e5
-3020 1 13 44 0.65536000000000000000e5
-3020 3 3 16 0.32768000000000000000e5
-3020 3 4 17 0.32768000000000000000e5
-3020 3 14 27 -0.32768000000000000000e5
-3020 3 17 27 0.65536000000000000000e5
-3020 4 2 14 0.32768000000000000000e5
-3021 3 16 29 -0.65536000000000000000e5
-3021 3 17 28 0.65536000000000000000e5
-3022 1 5 36 -0.65536000000000000000e5
-3022 1 14 45 0.65536000000000000000e5
-3022 3 17 29 0.65536000000000000000e5
-3023 1 3 18 0.16384000000000000000e5
-3023 1 4 19 -0.32768000000000000000e5
-3023 1 5 36 -0.32768000000000000000e5
-3023 1 12 43 -0.16384000000000000000e5
-3023 1 13 44 0.32768000000000000000e5
-3023 1 14 45 0.32768000000000000000e5
-3023 3 3 16 0.16384000000000000000e5
-3023 3 4 17 0.16384000000000000000e5
-3023 3 14 27 -0.16384000000000000000e5
-3023 3 16 29 -0.32768000000000000000e5
-3023 3 17 31 0.65536000000000000000e5
-3023 4 2 14 0.16384000000000000000e5
-3023 4 11 23 -0.32768000000000000000e5
-3024 3 17 32 0.65536000000000000000e5
-3024 3 18 31 -0.65536000000000000000e5
-3025 1 15 46 0.65536000000000000000e5
-3025 1 18 33 -0.65536000000000000000e5
-3025 3 17 33 0.65536000000000000000e5
-3026 3 17 34 0.65536000000000000000e5
-3026 3 19 32 -0.65536000000000000000e5
-3027 1 3 18 -0.81920000000000000000e4
-3027 1 4 19 0.16384000000000000000e5
-3027 1 5 36 0.16384000000000000000e5
-3027 1 12 43 0.81920000000000000000e4
-3027 1 13 44 -0.16384000000000000000e5
-3027 1 14 21 -0.13107200000000000000e6
-3027 1 14 45 -0.16384000000000000000e5
-3027 1 21 44 0.13107200000000000000e6
-3027 2 11 25 0.32768000000000000000e5
-3027 2 15 29 -0.32768000000000000000e5
-3027 3 3 16 -0.81920000000000000000e4
-3027 3 4 17 -0.81920000000000000000e4
-3027 3 7 36 0.32768000000000000000e5
-3027 3 8 21 0.65536000000000000000e5
-3027 3 14 27 0.81920000000000000000e4
-3027 3 15 20 -0.65536000000000000000e5
-3027 3 16 29 0.16384000000000000000e5
-3027 3 17 35 0.65536000000000000000e5
-3027 3 18 19 0.13107200000000000000e6
-3027 3 18 31 0.32768000000000000000e5
-3027 3 19 32 0.65536000000000000000e5
-3027 4 2 14 -0.81920000000000000000e4
-3027 4 11 15 0.65536000000000000000e5
-3027 4 11 23 0.16384000000000000000e5
-3027 4 13 25 0.65536000000000000000e5
-3027 4 14 14 -0.13107200000000000000e6
-3028 1 6 21 0.16384000000000000000e5
-3028 1 17 32 0.16384000000000000000e5
-3028 1 19 50 -0.16384000000000000000e5
-3028 1 20 35 -0.65536000000000000000e5
-3028 1 20 51 -0.16384000000000000000e5
-3028 1 21 52 0.65536000000000000000e5
-3028 2 9 15 0.16384000000000000000e5
-3028 2 25 31 -0.16384000000000000000e5
-3028 3 7 20 -0.16384000000000000000e5
-3028 3 8 21 0.32768000000000000000e5
-3028 3 14 19 -0.32768000000000000000e5
-3028 3 16 45 0.16384000000000000000e5
-3028 3 17 36 0.65536000000000000000e5
-3028 3 17 46 0.32768000000000000000e5
-3028 3 18 31 0.16384000000000000000e5
-3028 3 19 32 -0.32768000000000000000e5
-3028 3 20 45 0.32768000000000000000e5
-3028 4 10 14 -0.16384000000000000000e5
-3028 4 25 25 0.65536000000000000000e5
-3029 3 17 37 0.65536000000000000000e5
-3029 3 22 35 -0.65536000000000000000e5
-3030 3 13 42 -0.65536000000000000000e5
-3030 3 17 38 0.65536000000000000000e5
-3031 1 14 45 -0.13107200000000000000e6
-3031 1 17 48 0.65536000000000000000e5
-3031 1 18 49 0.65536000000000000000e5
-3031 1 34 49 0.65536000000000000000e5
-3031 2 14 28 0.65536000000000000000e5
-3031 3 13 42 0.65536000000000000000e5
-3031 3 14 43 0.65536000000000000000e5
-3031 3 17 39 0.65536000000000000000e5
-3031 3 18 47 0.65536000000000000000e5
-3032 3 14 43 -0.65536000000000000000e5
-3032 3 17 40 0.65536000000000000000e5
-3033 1 14 45 -0.65536000000000000000e5
-3033 1 17 48 0.32768000000000000000e5
-3033 1 18 49 0.32768000000000000000e5
-3033 1 34 49 0.32768000000000000000e5
-3033 2 14 28 0.32768000000000000000e5
-3033 3 14 43 0.32768000000000000000e5
-3033 3 17 41 0.65536000000000000000e5
-3033 3 18 47 0.32768000000000000000e5
-3033 3 22 35 -0.32768000000000000000e5
-3033 4 14 26 -0.32768000000000000000e5
-3034 1 14 45 0.65536000000000000000e5
-3034 1 17 48 -0.32768000000000000000e5
-3034 1 18 49 -0.32768000000000000000e5
-3034 1 34 49 -0.32768000000000000000e5
-3034 2 14 28 -0.32768000000000000000e5
-3034 3 14 43 -0.32768000000000000000e5
-3034 3 15 44 0.65536000000000000000e5
-3034 3 16 45 -0.13107200000000000000e6
-3034 3 17 42 0.65536000000000000000e5
-3034 3 18 47 -0.32768000000000000000e5
-3034 3 22 35 0.32768000000000000000e5
-3034 4 14 26 0.32768000000000000000e5
-3034 4 15 27 0.65536000000000000000e5
-3035 3 15 44 -0.65536000000000000000e5
-3035 3 17 43 0.65536000000000000000e5
-3036 3 16 45 -0.65536000000000000000e5
-3036 3 17 44 0.65536000000000000000e5
-3037 1 15 46 -0.65536000000000000000e5
-3037 1 20 51 0.65536000000000000000e5
-3037 3 17 45 0.65536000000000000000e5
-3038 1 6 53 -0.81920000000000000000e4
-3038 1 25 40 0.81920000000000000000e4
-3038 2 4 34 -0.16384000000000000000e5
-3038 2 21 35 0.16384000000000000000e5
-3038 3 5 50 -0.16384000000000000000e5
-3038 3 17 47 0.65536000000000000000e5
-3038 3 24 37 -0.81920000000000000000e4
-3038 3 27 40 -0.32768000000000000000e5
-3038 3 28 41 -0.32768000000000000000e5
-3038 3 29 42 -0.32768000000000000000e5
-3038 4 4 32 0.81920000000000000000e4
-3038 4 7 35 0.16384000000000000000e5
-3038 4 16 28 -0.81920000000000000000e4
-3038 4 23 27 -0.32768000000000000000e5
-3039 3 17 48 0.65536000000000000000e5
-3039 3 18 47 -0.65536000000000000000e5
-3040 3 14 51 -0.65536000000000000000e5
-3040 3 17 49 0.65536000000000000000e5
-3041 3 17 50 0.65536000000000000000e5
-3041 3 19 48 -0.65536000000000000000e5
-3042 3 17 51 0.65536000000000000000e5
-3042 3 32 45 -0.65536000000000000000e5
-3043 1 20 51 -0.65536000000000000000e5
-3043 1 36 51 0.65536000000000000000e5
-3043 3 17 52 0.65536000000000000000e5
-3044 1 34 49 -0.65536000000000000000e5
-3044 1 44 51 0.65536000000000000000e5
-3044 3 17 53 0.65536000000000000000e5
-3045 3 17 54 0.65536000000000000000e5
-3045 3 35 48 -0.65536000000000000000e5
-3046 1 11 18 -0.65536000000000000000e5
-3046 1 45 52 0.65536000000000000000e5
-3046 3 6 19 0.65536000000000000000e5
-3046 3 15 44 0.65536000000000000000e5
-3046 3 17 30 0.65536000000000000000e5
-3046 3 17 55 0.65536000000000000000e5
-3046 3 32 45 0.65536000000000000000e5
-3047 3 17 56 0.65536000000000000000e5
-3047 3 45 50 -0.65536000000000000000e5
-3048 3 15 20 -0.32768000000000000000e5
-3048 3 18 18 0.65536000000000000000e5
-3049 3 15 21 -0.65536000000000000000e5
-3049 3 18 20 0.65536000000000000000e5
-3050 1 20 21 -0.13107200000000000000e6
-3050 1 21 36 0.13107200000000000000e6
-3050 3 16 21 0.65536000000000000000e5
-3050 3 18 21 0.65536000000000000000e5
-3050 3 19 20 0.65536000000000000000e5
-3050 4 15 15 0.13107200000000000000e6
-3051 3 14 27 -0.65536000000000000000e5
-3051 3 18 22 0.65536000000000000000e5
-3052 1 4 35 -0.65536000000000000000e5
-3052 1 17 48 0.65536000000000000000e5
-3052 3 13 42 0.65536000000000000000e5
-3052 3 18 23 0.65536000000000000000e5
-3053 3 5 34 -0.65536000000000000000e5
-3053 3 18 24 0.65536000000000000000e5
-3054 1 15 30 -0.65536000000000000000e5
-3054 1 18 49 0.65536000000000000000e5
-3054 3 14 43 0.65536000000000000000e5
-3054 3 18 25 0.65536000000000000000e5
-3055 3 6 35 -0.65536000000000000000e5
-3055 3 18 26 0.65536000000000000000e5
-3056 3 16 29 -0.65536000000000000000e5
-3056 3 18 27 0.65536000000000000000e5
-3057 1 5 36 -0.65536000000000000000e5
-3057 1 14 45 0.65536000000000000000e5
-3057 3 18 28 0.65536000000000000000e5
-3058 3 17 30 -0.65536000000000000000e5
-3058 3 18 29 0.65536000000000000000e5
-3059 1 5 36 0.65536000000000000000e5
-3059 1 14 45 -0.65536000000000000000e5
-3059 1 15 46 0.13107200000000000000e6
-3059 1 18 33 -0.13107200000000000000e6
-3059 3 17 30 0.65536000000000000000e5
-3059 3 18 30 0.65536000000000000000e5
-3059 4 12 24 0.65536000000000000000e5
-3060 1 15 46 0.65536000000000000000e5
-3060 1 18 33 -0.65536000000000000000e5
-3060 3 18 32 0.65536000000000000000e5
-3061 3 18 33 0.65536000000000000000e5
-3061 3 21 26 -0.65536000000000000000e5
-3062 1 3 18 -0.81920000000000000000e4
-3062 1 4 19 0.16384000000000000000e5
-3062 1 5 36 0.16384000000000000000e5
-3062 1 12 43 0.81920000000000000000e4
-3062 1 13 44 -0.16384000000000000000e5
-3062 1 14 21 -0.13107200000000000000e6
-3062 1 14 45 -0.16384000000000000000e5
-3062 1 21 44 0.13107200000000000000e6
-3062 2 11 25 0.32768000000000000000e5
-3062 2 15 29 -0.32768000000000000000e5
-3062 3 3 16 -0.81920000000000000000e4
-3062 3 4 17 -0.81920000000000000000e4
-3062 3 7 36 0.32768000000000000000e5
-3062 3 8 21 0.65536000000000000000e5
-3062 3 14 27 0.81920000000000000000e4
-3062 3 15 20 -0.65536000000000000000e5
-3062 3 16 29 0.16384000000000000000e5
-3062 3 18 19 0.13107200000000000000e6
-3062 3 18 31 0.32768000000000000000e5
-3062 3 18 34 0.65536000000000000000e5
-3062 3 19 32 0.65536000000000000000e5
-3062 4 2 14 -0.81920000000000000000e4
-3062 4 11 15 0.65536000000000000000e5
-3062 4 11 23 0.16384000000000000000e5
-3062 4 13 25 0.65536000000000000000e5
-3062 4 14 14 -0.13107200000000000000e6
-3063 3 18 35 0.65536000000000000000e5
-3063 3 20 33 -0.65536000000000000000e5
-3064 3 18 36 0.65536000000000000000e5
-3064 3 20 35 -0.65536000000000000000e5
-3065 3 13 42 -0.65536000000000000000e5
-3065 3 18 37 0.65536000000000000000e5
-3066 1 14 45 -0.13107200000000000000e6
-3066 1 17 48 0.65536000000000000000e5
-3066 1 18 49 0.65536000000000000000e5
-3066 1 34 49 0.65536000000000000000e5
-3066 2 14 28 0.65536000000000000000e5
-3066 3 13 42 0.65536000000000000000e5
-3066 3 14 43 0.65536000000000000000e5
-3066 3 18 38 0.65536000000000000000e5
-3066 3 18 47 0.65536000000000000000e5
-3067 3 14 43 -0.65536000000000000000e5
-3067 3 18 39 0.65536000000000000000e5
-3068 3 18 40 0.65536000000000000000e5
-3068 3 26 35 -0.65536000000000000000e5
-3069 1 14 45 0.65536000000000000000e5
-3069 1 17 48 -0.32768000000000000000e5
-3069 1 18 49 -0.32768000000000000000e5
-3069 1 34 49 -0.32768000000000000000e5
-3069 2 14 28 -0.32768000000000000000e5
-3069 3 14 43 -0.32768000000000000000e5
-3069 3 15 44 0.65536000000000000000e5
-3069 3 16 45 -0.13107200000000000000e6
-3069 3 18 41 0.65536000000000000000e5
-3069 3 18 47 -0.32768000000000000000e5
-3069 3 22 35 0.32768000000000000000e5
-3069 4 14 26 0.32768000000000000000e5
-3069 4 15 27 0.65536000000000000000e5
-3070 3 15 44 -0.65536000000000000000e5
-3070 3 18 42 0.65536000000000000000e5
-3071 3 18 43 0.65536000000000000000e5
-3071 3 30 35 -0.65536000000000000000e5
-3072 1 15 46 -0.65536000000000000000e5
-3072 1 20 51 0.65536000000000000000e5
-3072 3 18 44 0.65536000000000000000e5
-3073 3 15 46 -0.65536000000000000000e5
-3073 3 18 45 0.65536000000000000000e5
-3074 3 18 46 0.65536000000000000000e5
-3074 3 20 45 -0.65536000000000000000e5
-3075 3 14 51 -0.65536000000000000000e5
-3075 3 18 48 0.65536000000000000000e5
-3076 3 18 49 0.65536000000000000000e5
-3076 3 35 40 -0.65536000000000000000e5
-3077 3 18 50 0.65536000000000000000e5
-3077 3 32 45 -0.65536000000000000000e5
-3078 3 18 51 0.65536000000000000000e5
-3078 3 20 49 -0.65536000000000000000e5
-3079 3 18 52 0.65536000000000000000e5
-3079 3 33 46 -0.65536000000000000000e5
-3080 3 18 53 0.65536000000000000000e5
-3080 3 35 48 -0.65536000000000000000e5
-3081 1 11 18 -0.13107200000000000000e6
-3081 1 34 49 0.65536000000000000000e5
-3081 1 44 51 -0.65536000000000000000e5
-3081 1 45 52 0.13107200000000000000e6
-3081 3 6 19 0.13107200000000000000e6
-3081 3 15 44 0.13107200000000000000e6
-3081 3 17 30 0.13107200000000000000e6
-3081 3 18 54 0.65536000000000000000e5
-3081 3 32 45 0.13107200000000000000e6
-3081 3 35 48 0.65536000000000000000e5
-3081 4 25 33 0.65536000000000000000e5
-3082 3 18 55 0.65536000000000000000e5
-3082 3 36 49 -0.65536000000000000000e5
-3083 3 18 56 0.65536000000000000000e5
-3083 3 43 52 -0.65536000000000000000e5
-3084 3 16 21 -0.32768000000000000000e5
-3084 3 19 19 0.65536000000000000000e5
-3085 1 20 21 -0.65536000000000000000e5
-3085 1 21 36 0.65536000000000000000e5
-3085 3 19 21 0.65536000000000000000e5
-3086 1 3 18 -0.32768000000000000000e5
-3086 1 4 19 0.65536000000000000000e5
-3086 1 4 35 0.32768000000000000000e5
-3086 1 12 43 0.65536000000000000000e5
-3086 1 14 45 0.65536000000000000000e5
-3086 1 17 48 -0.32768000000000000000e5
-3086 1 18 49 -0.32768000000000000000e5
-3086 1 20 27 -0.13107200000000000000e6
-3086 1 27 34 0.65536000000000000000e5
-3086 2 9 23 0.32768000000000000000e5
-3086 2 10 24 0.65536000000000000000e5
-3086 2 14 28 -0.32768000000000000000e5
-3086 3 3 16 -0.32768000000000000000e5
-3086 3 4 17 -0.32768000000000000000e5
-3086 3 5 34 0.32768000000000000000e5
-3086 3 13 42 -0.32768000000000000000e5
-3086 3 14 27 0.65536000000000000000e5
-3086 3 14 43 -0.32768000000000000000e5
-3086 3 19 22 0.65536000000000000000e5
-3086 4 2 14 -0.32768000000000000000e5
-3087 1 3 18 0.32768000000000000000e5
-3087 1 4 19 -0.65536000000000000000e5
-3087 1 12 43 -0.32768000000000000000e5
-3087 1 13 44 0.65536000000000000000e5
-3087 3 3 16 0.32768000000000000000e5
-3087 3 4 17 0.32768000000000000000e5
-3087 3 14 27 -0.32768000000000000000e5
-3087 3 19 23 0.65536000000000000000e5
-3087 4 2 14 0.32768000000000000000e5
-3088 3 16 29 -0.65536000000000000000e5
-3088 3 19 24 0.65536000000000000000e5
-3089 1 5 36 -0.65536000000000000000e5
-3089 1 14 45 0.65536000000000000000e5
-3089 3 19 25 0.65536000000000000000e5
-3090 3 17 30 -0.65536000000000000000e5
-3090 3 19 26 0.65536000000000000000e5
-3091 3 7 36 -0.65536000000000000000e5
-3091 3 19 27 0.65536000000000000000e5
-3092 1 3 18 0.16384000000000000000e5
-3092 1 4 19 -0.32768000000000000000e5
-3092 1 5 36 -0.32768000000000000000e5
-3092 1 12 43 -0.16384000000000000000e5
-3092 1 13 44 0.32768000000000000000e5
-3092 1 14 45 0.32768000000000000000e5
-3092 3 3 16 0.16384000000000000000e5
-3092 3 4 17 0.16384000000000000000e5
-3092 3 14 27 -0.16384000000000000000e5
-3092 3 16 29 -0.32768000000000000000e5
-3092 3 19 28 0.65536000000000000000e5
-3092 4 2 14 0.16384000000000000000e5
-3092 4 11 23 -0.32768000000000000000e5
-3093 3 18 31 -0.65536000000000000000e5
-3093 3 19 29 0.65536000000000000000e5
-3094 1 15 46 0.65536000000000000000e5
-3094 1 18 33 -0.65536000000000000000e5
-3094 3 19 30 0.65536000000000000000e5
-3095 1 3 18 0.81920000000000000000e4
-3095 1 4 19 -0.16384000000000000000e5
-3095 1 5 36 -0.16384000000000000000e5
-3095 1 12 43 -0.81920000000000000000e4
-3095 1 13 44 0.16384000000000000000e5
-3095 1 14 45 0.16384000000000000000e5
-3095 2 11 25 -0.32768000000000000000e5
-3095 2 15 29 0.32768000000000000000e5
-3095 3 3 16 0.81920000000000000000e4
-3095 3 4 17 0.81920000000000000000e4
-3095 3 7 36 -0.32768000000000000000e5
-3095 3 14 27 -0.81920000000000000000e4
-3095 3 16 29 -0.16384000000000000000e5
-3095 3 18 31 -0.32768000000000000000e5
-3095 3 19 31 0.65536000000000000000e5
-3095 4 2 14 0.81920000000000000000e4
-3095 4 11 23 -0.16384000000000000000e5
-3096 1 3 18 -0.81920000000000000000e4
-3096 1 4 19 0.16384000000000000000e5
-3096 1 5 36 0.16384000000000000000e5
-3096 1 12 43 0.81920000000000000000e4
-3096 1 13 44 -0.16384000000000000000e5
-3096 1 14 21 -0.13107200000000000000e6
-3096 1 14 45 -0.16384000000000000000e5
-3096 1 21 44 0.13107200000000000000e6
-3096 2 11 25 0.32768000000000000000e5
-3096 2 15 29 -0.32768000000000000000e5
-3096 3 3 16 -0.81920000000000000000e4
-3096 3 4 17 -0.81920000000000000000e4
-3096 3 7 36 0.32768000000000000000e5
-3096 3 8 21 0.65536000000000000000e5
-3096 3 14 27 0.81920000000000000000e4
-3096 3 15 20 -0.65536000000000000000e5
-3096 3 16 29 0.16384000000000000000e5
-3096 3 18 19 0.13107200000000000000e6
-3096 3 18 31 0.32768000000000000000e5
-3096 3 19 32 0.65536000000000000000e5
-3096 3 19 33 0.65536000000000000000e5
-3096 4 2 14 -0.81920000000000000000e4
-3096 4 11 15 0.65536000000000000000e5
-3096 4 11 23 0.16384000000000000000e5
-3096 4 13 25 0.65536000000000000000e5
-3096 4 14 14 -0.13107200000000000000e6
-3097 1 14 21 -0.65536000000000000000e5
-3097 1 21 44 0.65536000000000000000e5
-3097 3 8 21 0.32768000000000000000e5
-3097 3 15 20 -0.32768000000000000000e5
-3097 3 18 19 0.65536000000000000000e5
-3097 3 19 34 0.65536000000000000000e5
-3097 4 11 15 0.32768000000000000000e5
-3097 4 14 14 -0.65536000000000000000e5
-3098 1 6 21 0.16384000000000000000e5
-3098 1 17 32 0.16384000000000000000e5
-3098 1 19 50 -0.16384000000000000000e5
-3098 1 20 35 -0.65536000000000000000e5
-3098 1 20 51 -0.16384000000000000000e5
-3098 1 21 52 0.65536000000000000000e5
-3098 2 9 15 0.16384000000000000000e5
-3098 2 25 31 -0.16384000000000000000e5
-3098 3 7 20 -0.16384000000000000000e5
-3098 3 8 21 0.32768000000000000000e5
-3098 3 14 19 -0.32768000000000000000e5
-3098 3 16 45 0.16384000000000000000e5
-3098 3 17 46 0.32768000000000000000e5
-3098 3 18 31 0.16384000000000000000e5
-3098 3 19 32 -0.32768000000000000000e5
-3098 3 19 35 0.65536000000000000000e5
-3098 3 20 45 0.32768000000000000000e5
-3098 4 10 14 -0.16384000000000000000e5
-3098 4 25 25 0.65536000000000000000e5
-3099 3 19 36 0.65536000000000000000e5
-3099 3 21 34 -0.65536000000000000000e5
-3100 1 13 44 -0.65536000000000000000e5
-3100 1 34 41 0.65536000000000000000e5
-3100 3 19 37 0.65536000000000000000e5
-3101 1 14 45 -0.65536000000000000000e5
-3101 1 17 48 0.32768000000000000000e5
-3101 1 18 49 0.32768000000000000000e5
-3101 1 34 49 0.32768000000000000000e5
-3101 2 14 28 0.32768000000000000000e5
-3101 3 14 43 0.32768000000000000000e5
-3101 3 18 47 0.32768000000000000000e5
-3101 3 19 38 0.65536000000000000000e5
-3101 3 22 35 -0.32768000000000000000e5
-3101 4 14 26 -0.32768000000000000000e5
-3102 1 14 45 0.65536000000000000000e5
-3102 1 17 48 -0.32768000000000000000e5
-3102 1 18 49 -0.32768000000000000000e5
-3102 1 34 49 -0.32768000000000000000e5
-3102 2 14 28 -0.32768000000000000000e5
-3102 3 14 43 -0.32768000000000000000e5
-3102 3 15 44 0.65536000000000000000e5
-3102 3 16 45 -0.13107200000000000000e6
-3102 3 18 47 -0.32768000000000000000e5
-3102 3 19 39 0.65536000000000000000e5
-3102 3 22 35 0.32768000000000000000e5
-3102 4 14 26 0.32768000000000000000e5
-3102 4 15 27 0.65536000000000000000e5
-3103 3 15 44 -0.65536000000000000000e5
-3103 3 19 40 0.65536000000000000000e5
-3104 1 3 18 -0.16384000000000000000e5
-3104 1 4 19 0.32768000000000000000e5
-3104 1 5 36 0.32768000000000000000e5
-3104 1 12 43 0.16384000000000000000e5
-3104 1 13 44 -0.32768000000000000000e5
-3104 1 14 45 -0.32768000000000000000e5
-3104 1 17 32 -0.65536000000000000000e5
-3104 1 19 50 0.65536000000000000000e5
-3104 3 3 16 -0.16384000000000000000e5
-3104 3 4 17 -0.16384000000000000000e5
-3104 3 14 27 0.16384000000000000000e5
-3104 3 16 29 0.32768000000000000000e5
-3104 3 19 41 0.65536000000000000000e5
-3104 4 2 14 -0.16384000000000000000e5
-3104 4 11 23 0.32768000000000000000e5
-3105 3 16 45 -0.65536000000000000000e5
-3105 3 19 42 0.65536000000000000000e5
-3106 1 15 46 -0.65536000000000000000e5
-3106 1 20 51 0.65536000000000000000e5
-3106 3 19 43 0.65536000000000000000e5
-3107 1 6 21 -0.32768000000000000000e5
-3107 1 17 32 -0.32768000000000000000e5
-3107 1 19 50 0.32768000000000000000e5
-3107 1 20 51 0.32768000000000000000e5
-3107 2 9 15 -0.32768000000000000000e5
-3107 2 25 31 0.32768000000000000000e5
-3107 3 7 20 0.32768000000000000000e5
-3107 3 8 21 -0.65536000000000000000e5
-3107 3 14 19 0.65536000000000000000e5
-3107 3 16 45 -0.32768000000000000000e5
-3107 3 18 31 -0.32768000000000000000e5
-3107 3 19 32 0.65536000000000000000e5
-3107 3 19 44 0.65536000000000000000e5
-3107 4 10 14 0.32768000000000000000e5
-3108 3 17 46 -0.65536000000000000000e5
-3108 3 19 45 0.65536000000000000000e5
-3109 1 6 21 -0.16384000000000000000e5
-3109 1 17 32 -0.16384000000000000000e5
-3109 1 19 50 0.16384000000000000000e5
-3109 1 20 51 0.16384000000000000000e5
-3109 2 9 15 -0.16384000000000000000e5
-3109 2 25 31 0.16384000000000000000e5
-3109 3 7 20 0.16384000000000000000e5
-3109 3 8 21 -0.32768000000000000000e5
-3109 3 14 19 0.32768000000000000000e5
-3109 3 16 45 -0.16384000000000000000e5
-3109 3 17 46 -0.32768000000000000000e5
-3109 3 18 31 -0.16384000000000000000e5
-3109 3 19 32 0.32768000000000000000e5
-3109 3 19 46 0.65536000000000000000e5
-3109 3 20 45 -0.32768000000000000000e5
-3109 4 10 14 0.16384000000000000000e5
-3109 4 25 25 -0.65536000000000000000e5
-3110 3 19 47 0.65536000000000000000e5
-3110 3 31 44 -0.65536000000000000000e5
-3111 3 19 49 0.65536000000000000000e5
-3111 3 32 45 -0.65536000000000000000e5
-3112 3 19 50 0.65536000000000000000e5
-3112 3 36 41 -0.65536000000000000000e5
-3113 1 20 51 -0.65536000000000000000e5
-3113 1 36 51 0.65536000000000000000e5
-3113 3 19 51 0.65536000000000000000e5
-3114 3 19 52 0.65536000000000000000e5
-3114 3 21 50 -0.65536000000000000000e5
-3115 3 19 53 0.65536000000000000000e5
-3115 3 41 46 -0.65536000000000000000e5
-3116 1 11 18 -0.65536000000000000000e5
-3116 1 45 52 0.65536000000000000000e5
-3116 3 6 19 0.65536000000000000000e5
-3116 3 15 44 0.65536000000000000000e5
-3116 3 17 30 0.65536000000000000000e5
-3116 3 19 54 0.65536000000000000000e5
-3116 3 32 45 0.65536000000000000000e5
-3117 1 11 18 -0.32768000000000000000e5
-3117 1 45 52 0.32768000000000000000e5
-3117 3 6 19 0.32768000000000000000e5
-3117 3 15 44 0.32768000000000000000e5
-3117 3 17 30 0.32768000000000000000e5
-3117 3 19 55 0.65536000000000000000e5
-3117 3 32 45 0.32768000000000000000e5
-3117 3 36 49 -0.32768000000000000000e5
-3117 3 41 46 -0.32768000000000000000e5
-3117 4 15 35 -0.32768000000000000000e5
-3118 1 20 21 -0.65536000000000000000e5
-3118 1 21 36 0.65536000000000000000e5
-3118 3 16 21 0.32768000000000000000e5
-3118 3 19 20 0.32768000000000000000e5
-3118 3 20 20 0.65536000000000000000e5
-3118 4 15 15 0.65536000000000000000e5
-3119 1 3 18 0.32768000000000000000e5
-3119 1 4 19 -0.65536000000000000000e5
-3119 1 12 43 -0.32768000000000000000e5
-3119 1 13 44 0.65536000000000000000e5
-3119 3 3 16 0.32768000000000000000e5
-3119 3 4 17 0.32768000000000000000e5
-3119 3 14 27 -0.32768000000000000000e5
-3119 3 20 22 0.65536000000000000000e5
-3119 4 2 14 0.32768000000000000000e5
-3120 3 16 29 -0.65536000000000000000e5
-3120 3 20 23 0.65536000000000000000e5
-3121 1 5 36 -0.65536000000000000000e5
-3121 1 14 45 0.65536000000000000000e5
-3121 3 20 24 0.65536000000000000000e5
-3122 3 17 30 -0.65536000000000000000e5
-3122 3 20 25 0.65536000000000000000e5
-3123 1 5 36 0.65536000000000000000e5
-3123 1 14 45 -0.65536000000000000000e5
-3123 1 15 46 0.13107200000000000000e6
-3123 1 18 33 -0.13107200000000000000e6
-3123 3 17 30 0.65536000000000000000e5
-3123 3 20 26 0.65536000000000000000e5
-3123 4 12 24 0.65536000000000000000e5
-3124 1 3 18 0.16384000000000000000e5
-3124 1 4 19 -0.32768000000000000000e5
-3124 1 5 36 -0.32768000000000000000e5
-3124 1 12 43 -0.16384000000000000000e5
-3124 1 13 44 0.32768000000000000000e5
-3124 1 14 45 0.32768000000000000000e5
-3124 3 3 16 0.16384000000000000000e5
-3124 3 4 17 0.16384000000000000000e5
-3124 3 14 27 -0.16384000000000000000e5
-3124 3 16 29 -0.32768000000000000000e5
-3124 3 20 27 0.65536000000000000000e5
-3124 4 2 14 0.16384000000000000000e5
-3124 4 11 23 -0.32768000000000000000e5
-3125 3 18 31 -0.65536000000000000000e5
-3125 3 20 28 0.65536000000000000000e5
-3126 1 15 46 0.65536000000000000000e5
-3126 1 18 33 -0.65536000000000000000e5
-3126 3 20 29 0.65536000000000000000e5
-3127 3 20 30 0.65536000000000000000e5
-3127 3 21 26 -0.65536000000000000000e5
-3128 3 19 32 -0.65536000000000000000e5
-3128 3 20 31 0.65536000000000000000e5
-3129 1 3 18 -0.81920000000000000000e4
-3129 1 4 19 0.16384000000000000000e5
-3129 1 5 36 0.16384000000000000000e5
-3129 1 12 43 0.81920000000000000000e4
-3129 1 13 44 -0.16384000000000000000e5
-3129 1 14 21 -0.13107200000000000000e6
-3129 1 14 45 -0.16384000000000000000e5
-3129 1 21 44 0.13107200000000000000e6
-3129 2 11 25 0.32768000000000000000e5
-3129 2 15 29 -0.32768000000000000000e5
-3129 3 3 16 -0.81920000000000000000e4
-3129 3 4 17 -0.81920000000000000000e4
-3129 3 7 36 0.32768000000000000000e5
-3129 3 8 21 0.65536000000000000000e5
-3129 3 14 27 0.81920000000000000000e4
-3129 3 15 20 -0.65536000000000000000e5
-3129 3 16 29 0.16384000000000000000e5
-3129 3 18 19 0.13107200000000000000e6
-3129 3 18 31 0.32768000000000000000e5
-3129 3 19 32 0.65536000000000000000e5
-3129 3 20 32 0.65536000000000000000e5
-3129 4 2 14 -0.81920000000000000000e4
-3129 4 11 15 0.65536000000000000000e5
-3129 4 11 23 0.16384000000000000000e5
-3129 4 13 25 0.65536000000000000000e5
-3129 4 14 14 -0.13107200000000000000e6
-3130 1 6 21 0.16384000000000000000e5
-3130 1 17 32 0.16384000000000000000e5
-3130 1 19 50 -0.16384000000000000000e5
-3130 1 20 35 -0.65536000000000000000e5
-3130 1 20 51 -0.16384000000000000000e5
-3130 1 21 52 0.65536000000000000000e5
-3130 2 9 15 0.16384000000000000000e5
-3130 2 25 31 -0.16384000000000000000e5
-3130 3 7 20 -0.16384000000000000000e5
-3130 3 8 21 0.32768000000000000000e5
-3130 3 14 19 -0.32768000000000000000e5
-3130 3 16 45 0.16384000000000000000e5
-3130 3 17 46 0.32768000000000000000e5
-3130 3 18 31 0.16384000000000000000e5
-3130 3 19 32 -0.32768000000000000000e5
-3130 3 20 34 0.65536000000000000000e5
-3130 3 20 45 0.32768000000000000000e5
-3130 4 10 14 -0.16384000000000000000e5
-3130 4 25 25 0.65536000000000000000e5
-3131 3 20 36 0.65536000000000000000e5
-3131 3 21 35 -0.65536000000000000000e5
-3132 1 14 45 -0.65536000000000000000e5
-3132 1 17 48 0.32768000000000000000e5
-3132 1 18 49 0.32768000000000000000e5
-3132 1 34 49 0.32768000000000000000e5
-3132 2 14 28 0.32768000000000000000e5
-3132 3 14 43 0.32768000000000000000e5
-3132 3 18 47 0.32768000000000000000e5
-3132 3 20 37 0.65536000000000000000e5
-3132 3 22 35 -0.32768000000000000000e5
-3132 4 14 26 -0.32768000000000000000e5
-3133 1 14 45 0.65536000000000000000e5
-3133 1 17 48 -0.32768000000000000000e5
-3133 1 18 49 -0.32768000000000000000e5
-3133 1 34 49 -0.32768000000000000000e5
-3133 2 14 28 -0.32768000000000000000e5
-3133 3 14 43 -0.32768000000000000000e5
-3133 3 15 44 0.65536000000000000000e5
-3133 3 16 45 -0.13107200000000000000e6
-3133 3 18 47 -0.32768000000000000000e5
-3133 3 20 38 0.65536000000000000000e5
-3133 3 22 35 0.32768000000000000000e5
-3133 4 14 26 0.32768000000000000000e5
-3133 4 15 27 0.65536000000000000000e5
-3134 3 15 44 -0.65536000000000000000e5
-3134 3 20 39 0.65536000000000000000e5
-3135 3 20 40 0.65536000000000000000e5
-3135 3 30 35 -0.65536000000000000000e5
-3136 3 16 45 -0.65536000000000000000e5
-3136 3 20 41 0.65536000000000000000e5
-3137 1 15 46 -0.65536000000000000000e5
-3137 1 20 51 0.65536000000000000000e5
-3137 3 20 42 0.65536000000000000000e5
-3138 3 15 46 -0.65536000000000000000e5
-3138 3 20 43 0.65536000000000000000e5
-3139 3 17 46 -0.65536000000000000000e5
-3139 3 20 44 0.65536000000000000000e5
-3140 3 20 46 0.65536000000000000000e5
-3140 3 35 36 -0.65536000000000000000e5
-3141 3 19 48 -0.65536000000000000000e5
-3141 3 20 47 0.65536000000000000000e5
-3142 3 20 48 0.65536000000000000000e5
-3142 3 32 45 -0.65536000000000000000e5
-3143 1 20 51 -0.65536000000000000000e5
-3143 1 36 51 0.65536000000000000000e5
-3143 3 20 50 0.65536000000000000000e5
-3144 3 20 51 0.65536000000000000000e5
-3144 3 33 46 -0.65536000000000000000e5
-3145 3 20 52 0.65536000000000000000e5
-3145 3 36 45 -0.65536000000000000000e5
-3146 1 11 18 -0.65536000000000000000e5
-3146 1 45 52 0.65536000000000000000e5
-3146 3 6 19 0.65536000000000000000e5
-3146 3 15 44 0.65536000000000000000e5
-3146 3 17 30 0.65536000000000000000e5
-3146 3 20 53 0.65536000000000000000e5
-3146 3 32 45 0.65536000000000000000e5
-3147 3 20 54 0.65536000000000000000e5
-3147 3 36 49 -0.65536000000000000000e5
-3148 3 20 55 0.65536000000000000000e5
-3148 3 45 46 -0.65536000000000000000e5
-3149 3 20 56 0.65536000000000000000e5
-3149 3 46 51 -0.65536000000000000000e5
-3150 3 7 36 -0.65536000000000000000e5
-3150 3 21 22 0.65536000000000000000e5
-3151 1 3 18 0.16384000000000000000e5
-3151 1 4 19 -0.32768000000000000000e5
-3151 1 5 36 -0.32768000000000000000e5
-3151 1 12 43 -0.16384000000000000000e5
-3151 1 13 44 0.32768000000000000000e5
-3151 1 14 45 0.32768000000000000000e5
-3151 3 3 16 0.16384000000000000000e5
-3151 3 4 17 0.16384000000000000000e5
-3151 3 14 27 -0.16384000000000000000e5
-3151 3 16 29 -0.32768000000000000000e5
-3151 3 21 23 0.65536000000000000000e5
-3151 4 2 14 0.16384000000000000000e5
-3151 4 11 23 -0.32768000000000000000e5
-3152 3 18 31 -0.65536000000000000000e5
-3152 3 21 24 0.65536000000000000000e5
-3153 1 15 46 0.65536000000000000000e5
-3153 1 18 33 -0.65536000000000000000e5
-3153 3 21 25 0.65536000000000000000e5
-3154 1 3 18 0.81920000000000000000e4
-3154 1 4 19 -0.16384000000000000000e5
-3154 1 5 36 -0.16384000000000000000e5
-3154 1 12 43 -0.81920000000000000000e4
-3154 1 13 44 0.16384000000000000000e5
-3154 1 14 45 0.16384000000000000000e5
-3154 2 11 25 -0.32768000000000000000e5
-3154 2 15 29 0.32768000000000000000e5
-3154 3 3 16 0.81920000000000000000e4
-3154 3 4 17 0.81920000000000000000e4
-3154 3 7 36 -0.32768000000000000000e5
-3154 3 14 27 -0.81920000000000000000e4
-3154 3 16 29 -0.16384000000000000000e5
-3154 3 18 31 -0.32768000000000000000e5
-3154 3 21 27 0.65536000000000000000e5
-3154 4 2 14 0.81920000000000000000e4
-3154 4 11 23 -0.16384000000000000000e5
-3155 3 19 32 -0.65536000000000000000e5
-3155 3 21 28 0.65536000000000000000e5
-3156 1 3 18 -0.81920000000000000000e4
-3156 1 4 19 0.16384000000000000000e5
-3156 1 5 36 0.16384000000000000000e5
-3156 1 12 43 0.81920000000000000000e4
-3156 1 13 44 -0.16384000000000000000e5
-3156 1 14 21 -0.13107200000000000000e6
-3156 1 14 45 -0.16384000000000000000e5
-3156 1 21 44 0.13107200000000000000e6
-3156 2 11 25 0.32768000000000000000e5
-3156 2 15 29 -0.32768000000000000000e5
-3156 3 3 16 -0.81920000000000000000e4
-3156 3 4 17 -0.81920000000000000000e4
-3156 3 7 36 0.32768000000000000000e5
-3156 3 8 21 0.65536000000000000000e5
-3156 3 14 27 0.81920000000000000000e4
-3156 3 15 20 -0.65536000000000000000e5
-3156 3 16 29 0.16384000000000000000e5
-3156 3 18 19 0.13107200000000000000e6
-3156 3 18 31 0.32768000000000000000e5
-3156 3 19 32 0.65536000000000000000e5
-3156 3 21 29 0.65536000000000000000e5
-3156 4 2 14 -0.81920000000000000000e4
-3156 4 11 15 0.65536000000000000000e5
-3156 4 11 23 0.16384000000000000000e5
-3156 4 13 25 0.65536000000000000000e5
-3156 4 14 14 -0.13107200000000000000e6
-3157 3 20 33 -0.65536000000000000000e5
-3157 3 21 30 0.65536000000000000000e5
-3158 1 14 21 -0.65536000000000000000e5
-3158 1 21 44 0.65536000000000000000e5
-3158 3 8 21 0.32768000000000000000e5
-3158 3 15 20 -0.32768000000000000000e5
-3158 3 18 19 0.65536000000000000000e5
-3158 3 21 31 0.65536000000000000000e5
-3158 4 11 15 0.32768000000000000000e5
-3158 4 14 14 -0.65536000000000000000e5
-3159 1 6 21 0.16384000000000000000e5
-3159 1 17 32 0.16384000000000000000e5
-3159 1 19 50 -0.16384000000000000000e5
-3159 1 20 35 -0.65536000000000000000e5
-3159 1 20 51 -0.16384000000000000000e5
-3159 1 21 52 0.65536000000000000000e5
-3159 2 9 15 0.16384000000000000000e5
-3159 2 25 31 -0.16384000000000000000e5
-3159 3 7 20 -0.16384000000000000000e5
-3159 3 8 21 0.32768000000000000000e5
-3159 3 14 19 -0.32768000000000000000e5
-3159 3 16 45 0.16384000000000000000e5
-3159 3 17 46 0.32768000000000000000e5
-3159 3 18 31 0.16384000000000000000e5
-3159 3 19 32 -0.32768000000000000000e5
-3159 3 20 45 0.32768000000000000000e5
-3159 3 21 32 0.65536000000000000000e5
-3159 4 10 14 -0.16384000000000000000e5
-3159 4 25 25 0.65536000000000000000e5
-3160 3 20 35 -0.65536000000000000000e5
-3160 3 21 33 0.65536000000000000000e5
-3161 1 3 18 -0.16384000000000000000e5
-3161 1 4 19 0.32768000000000000000e5
-3161 1 5 36 0.32768000000000000000e5
-3161 1 12 43 0.16384000000000000000e5
-3161 1 13 44 -0.32768000000000000000e5
-3161 1 14 45 -0.32768000000000000000e5
-3161 1 17 32 -0.65536000000000000000e5
-3161 1 19 50 0.65536000000000000000e5
-3161 3 3 16 -0.16384000000000000000e5
-3161 3 4 17 -0.16384000000000000000e5
-3161 3 14 27 0.16384000000000000000e5
-3161 3 16 29 0.32768000000000000000e5
-3161 3 21 37 0.65536000000000000000e5
-3161 4 2 14 -0.16384000000000000000e5
-3161 4 11 23 0.32768000000000000000e5
-3162 3 16 45 -0.65536000000000000000e5
-3162 3 21 38 0.65536000000000000000e5
-3163 1 15 46 -0.65536000000000000000e5
-3163 1 20 51 0.65536000000000000000e5
-3163 3 21 39 0.65536000000000000000e5
-3164 3 15 46 -0.65536000000000000000e5
-3164 3 21 40 0.65536000000000000000e5
-3165 1 6 21 -0.32768000000000000000e5
-3165 1 17 32 -0.32768000000000000000e5
-3165 1 19 50 0.32768000000000000000e5
-3165 1 20 51 0.32768000000000000000e5
-3165 2 9 15 -0.32768000000000000000e5
-3165 2 25 31 0.32768000000000000000e5
-3165 3 7 20 0.32768000000000000000e5
-3165 3 8 21 -0.65536000000000000000e5
-3165 3 14 19 0.65536000000000000000e5
-3165 3 16 45 -0.32768000000000000000e5
-3165 3 18 31 -0.32768000000000000000e5
-3165 3 19 32 0.65536000000000000000e5
-3165 3 21 41 0.65536000000000000000e5
-3165 4 10 14 0.32768000000000000000e5
-3166 3 17 46 -0.65536000000000000000e5
-3166 3 21 42 0.65536000000000000000e5
-3167 3 20 45 -0.65536000000000000000e5
-3167 3 21 43 0.65536000000000000000e5
-3168 1 6 21 -0.16384000000000000000e5
-3168 1 17 32 -0.16384000000000000000e5
-3168 1 19 50 0.16384000000000000000e5
-3168 1 20 51 0.16384000000000000000e5
-3168 2 9 15 -0.16384000000000000000e5
-3168 2 25 31 0.16384000000000000000e5
-3168 3 7 20 0.16384000000000000000e5
-3168 3 8 21 -0.32768000000000000000e5
-3168 3 14 19 0.32768000000000000000e5
-3168 3 16 45 -0.16384000000000000000e5
-3168 3 17 46 -0.32768000000000000000e5
-3168 3 18 31 -0.16384000000000000000e5
-3168 3 19 32 0.32768000000000000000e5
-3168 3 20 45 -0.32768000000000000000e5
-3168 3 21 44 0.65536000000000000000e5
-3168 4 10 14 0.16384000000000000000e5
-3168 4 25 25 -0.65536000000000000000e5
-3169 3 21 45 0.65536000000000000000e5
-3169 3 35 36 -0.65536000000000000000e5
-3170 3 21 47 0.65536000000000000000e5
-3170 3 36 41 -0.65536000000000000000e5
-3171 1 20 51 -0.65536000000000000000e5
-3171 1 36 51 0.65536000000000000000e5
-3171 3 21 48 0.65536000000000000000e5
-3172 3 21 49 0.65536000000000000000e5
-3172 3 33 46 -0.65536000000000000000e5
-3173 3 21 51 0.65536000000000000000e5
-3173 3 36 45 -0.65536000000000000000e5
-3174 1 11 18 -0.32768000000000000000e5
-3174 1 45 52 0.32768000000000000000e5
-3174 3 6 19 0.32768000000000000000e5
-3174 3 15 44 0.32768000000000000000e5
-3174 3 17 30 0.32768000000000000000e5
-3174 3 21 53 0.65536000000000000000e5
-3174 3 32 45 0.32768000000000000000e5
-3174 3 36 49 -0.32768000000000000000e5
-3174 3 41 46 -0.32768000000000000000e5
-3174 4 15 35 -0.32768000000000000000e5
-3175 3 21 54 0.65536000000000000000e5
-3175 3 45 46 -0.65536000000000000000e5
-3176 1 1 40 0.32768000000000000000e5
-3176 1 23 38 -0.32768000000000000000e5
-3176 3 1 38 0.32768000000000000000e5
-3176 3 22 22 0.65536000000000000000e5
-3176 3 22 27 -0.65536000000000000000e5
-3176 4 16 16 0.65536000000000000000e5
-3177 3 1 38 -0.65536000000000000000e5
-3177 3 22 23 0.65536000000000000000e5
-3178 1 1 40 -0.65536000000000000000e5
-3178 1 23 38 0.65536000000000000000e5
-3178 3 22 24 0.65536000000000000000e5
-3179 3 2 39 -0.65536000000000000000e5
-3179 3 22 25 0.65536000000000000000e5
-3180 1 6 37 -0.65536000000000000000e5
-3180 1 24 39 0.65536000000000000000e5
-3180 3 22 26 0.65536000000000000000e5
-3181 3 8 37 -0.65536000000000000000e5
-3181 3 22 28 0.65536000000000000000e5
-3182 1 9 40 0.65536000000000000000e5
-3182 1 10 41 -0.13107200000000000000e6
-3182 1 26 41 -0.65536000000000000000e5
-3182 1 32 47 0.13107200000000000000e6
-3182 3 9 38 0.65536000000000000000e5
-3182 3 22 29 0.65536000000000000000e5
-3182 3 28 41 0.13107200000000000000e6
-3182 4 2 30 0.65536000000000000000e5
-3183 3 9 38 -0.65536000000000000000e5
-3183 3 22 30 0.65536000000000000000e5
-3184 1 9 40 0.32768000000000000000e5
-3184 1 10 41 -0.65536000000000000000e5
-3184 1 26 41 -0.32768000000000000000e5
-3184 1 32 47 0.65536000000000000000e5
-3184 3 8 37 -0.32768000000000000000e5
-3184 3 9 38 0.32768000000000000000e5
-3184 3 22 27 -0.32768000000000000000e5
-3184 3 22 31 0.65536000000000000000e5
-3184 3 28 41 0.65536000000000000000e5
-3184 4 1 29 -0.32768000000000000000e5
-3184 4 2 30 0.32768000000000000000e5
-3185 1 11 42 -0.65536000000000000000e5
-3185 1 33 48 0.65536000000000000000e5
-3185 2 12 26 0.65536000000000000000e5
-3185 2 20 34 -0.65536000000000000000e5
-3185 3 13 42 0.13107200000000000000e6
-3185 3 22 32 0.65536000000000000000e5
-3185 3 22 35 -0.13107200000000000000e6
-3185 3 29 42 0.65536000000000000000e5
-3185 4 3 31 -0.65536000000000000000e5
-3185 4 6 34 -0.65536000000000000000e5
-3186 1 10 41 -0.65536000000000000000e5
-3186 1 32 47 0.65536000000000000000e5
-3186 3 22 33 0.65536000000000000000e5
-3186 3 28 41 0.65536000000000000000e5
-3187 3 12 41 -0.65536000000000000000e5
-3187 3 22 34 0.65536000000000000000e5
-3188 1 13 44 -0.65536000000000000000e5
-3188 1 34 41 0.65536000000000000000e5
-3188 3 22 36 0.65536000000000000000e5
-3189 1 6 53 0.65536000000000000000e5
-3189 1 25 40 -0.65536000000000000000e5
-3189 2 1 35 -0.65536000000000000000e5
-3189 2 2 32 0.65536000000000000000e5
-3189 2 4 34 0.13107200000000000000e6
-3189 2 16 30 0.13107200000000000000e6
-3189 2 16 34 -0.13107200000000000000e6
-3189 2 21 35 -0.13107200000000000000e6
-3189 3 2 47 0.65536000000000000000e5
-3189 3 5 50 0.13107200000000000000e6
-3189 3 7 52 -0.52428800000000000000e6
-3189 3 22 37 0.65536000000000000000e5
-3189 3 24 37 0.13107200000000000000e6
-3189 3 27 40 0.13107200000000000000e6
-3189 3 28 41 0.52428800000000000000e6
-3189 4 4 32 -0.65536000000000000000e5
-3189 4 6 34 0.26214400000000000000e6
-3189 4 7 35 -0.13107200000000000000e6
-3189 4 16 28 0.65536000000000000000e5
-3189 4 17 29 -0.13107200000000000000e6
-3190 3 2 47 -0.65536000000000000000e5
-3190 3 22 38 0.65536000000000000000e5
-3191 3 22 39 0.65536000000000000000e5
-3191 3 24 37 -0.65536000000000000000e5
-3192 1 6 53 -0.65536000000000000000e5
-3192 1 25 40 0.65536000000000000000e5
-3192 3 22 40 0.65536000000000000000e5
-3192 3 25 38 0.65536000000000000000e5
-3192 3 27 40 -0.13107200000000000000e6
-3192 4 4 32 0.65536000000000000000e5
-3193 1 6 53 0.32768000000000000000e5
-3193 1 25 40 -0.32768000000000000000e5
-3193 2 4 34 0.65536000000000000000e5
-3193 2 16 30 0.65536000000000000000e5
-3193 2 16 34 -0.65536000000000000000e5
-3193 2 21 35 -0.65536000000000000000e5
-3193 3 5 50 0.65536000000000000000e5
-3193 3 7 52 -0.26214400000000000000e6
-3193 3 22 41 0.65536000000000000000e5
-3193 3 24 37 0.32768000000000000000e5
-3193 3 27 40 0.65536000000000000000e5
-3193 3 28 41 0.26214400000000000000e6
-3193 4 4 32 -0.32768000000000000000e5
-3193 4 6 34 0.13107200000000000000e6
-3193 4 7 35 -0.65536000000000000000e5
-3193 4 16 28 0.32768000000000000000e5
-3193 4 17 29 -0.65536000000000000000e5
-3194 1 6 53 0.32768000000000000000e5
-3194 1 25 40 -0.32768000000000000000e5
-3194 3 22 42 0.65536000000000000000e5
-3194 3 24 37 0.32768000000000000000e5
-3194 3 27 40 0.13107200000000000000e6
-3194 3 28 41 -0.13107200000000000000e6
-3194 4 4 32 -0.32768000000000000000e5
-3194 4 16 28 0.32768000000000000000e5
-3194 4 17 29 0.65536000000000000000e5
-3195 1 6 53 -0.32768000000000000000e5
-3195 1 25 40 0.32768000000000000000e5
-3195 3 22 43 0.65536000000000000000e5
-3195 3 24 37 -0.32768000000000000000e5
-3195 3 27 40 -0.65536000000000000000e5
-3195 4 4 32 0.32768000000000000000e5
-3195 4 16 28 -0.32768000000000000000e5
-3196 1 6 53 0.16384000000000000000e5
-3196 1 25 40 -0.16384000000000000000e5
-3196 2 4 34 0.32768000000000000000e5
-3196 2 21 35 -0.32768000000000000000e5
-3196 3 5 50 0.32768000000000000000e5
-3196 3 7 52 -0.13107200000000000000e6
-3196 3 22 44 0.65536000000000000000e5
-3196 3 24 37 0.16384000000000000000e5
-3196 3 27 40 0.65536000000000000000e5
-3196 3 28 41 0.65536000000000000000e5
-3196 4 4 32 -0.16384000000000000000e5
-3196 4 6 34 0.65536000000000000000e5
-3196 4 7 35 -0.32768000000000000000e5
-3196 4 16 28 0.16384000000000000000e5
-3197 3 22 45 0.65536000000000000000e5
-3197 3 28 41 -0.65536000000000000000e5
-3198 3 7 52 -0.65536000000000000000e5
-3198 3 22 46 0.65536000000000000000e5
-3199 1 22 53 0.65536000000000000000e5
-3199 1 23 38 -0.65536000000000000000e5
-3199 3 2 47 0.65536000000000000000e5
-3199 3 22 47 0.65536000000000000000e5
-3200 1 2 49 -0.65536000000000000000e5
-3200 1 6 53 0.65536000000000000000e5
-3200 1 8 39 0.13107200000000000000e6
-3200 1 9 40 0.13107200000000000000e6
-3200 1 10 41 -0.26214400000000000000e6
-3200 1 22 53 -0.65536000000000000000e5
-3200 1 23 54 -0.65536000000000000000e5
-3200 1 24 55 -0.13107200000000000000e6
-3200 1 25 40 -0.65536000000000000000e5
-3200 1 37 52 0.26214400000000000000e6
-3200 2 26 32 -0.65536000000000000000e5
-3200 3 9 38 0.13107200000000000000e6
-3200 3 22 48 0.65536000000000000000e5
-3200 3 22 51 0.13107200000000000000e6
-3200 3 24 37 0.13107200000000000000e6
-3200 3 27 40 0.13107200000000000000e6
-3200 4 2 30 0.13107200000000000000e6
-3200 4 4 32 -0.65536000000000000000e5
-3200 4 16 28 0.65536000000000000000e5
-3200 4 17 29 0.13107200000000000000e6
-3200 4 20 32 0.13107200000000000000e6
-3201 1 6 53 0.65536000000000000000e5
-3201 1 23 54 0.65536000000000000000e5
-3201 1 24 39 -0.65536000000000000000e5
-3201 1 25 40 -0.65536000000000000000e5
-3201 3 22 49 0.65536000000000000000e5
-3201 3 25 38 -0.65536000000000000000e5
-3201 3 27 40 0.13107200000000000000e6
-3201 4 4 32 -0.65536000000000000000e5
-3202 1 24 55 -0.65536000000000000000e5
-3202 1 26 41 0.65536000000000000000e5
-3202 1 32 47 -0.13107200000000000000e6
-3202 1 37 52 0.13107200000000000000e6
-3202 3 22 50 0.65536000000000000000e5
-3202 3 22 51 0.65536000000000000000e5
-3202 3 27 40 -0.65536000000000000000e5
-3202 4 20 32 0.65536000000000000000e5
-3203 1 32 47 -0.65536000000000000000e5
-3203 1 37 52 0.65536000000000000000e5
-3203 3 22 52 0.65536000000000000000e5
-3204 1 1 48 -0.65536000000000000000e5
-3204 1 2 49 -0.65536000000000000000e5
-3204 1 6 53 -0.13107200000000000000e6
-3204 1 8 39 -0.26214400000000000000e6
-3204 1 9 40 -0.26214400000000000000e6
-3204 1 10 41 0.52428800000000000000e6
-3204 1 12 43 0.52428800000000000000e6
-3204 1 22 53 0.65536000000000000000e5
-3204 1 23 38 -0.65536000000000000000e5
-3204 1 23 54 0.65536000000000000000e5
-3204 1 24 55 0.13107200000000000000e6
-3204 1 25 40 0.13107200000000000000e6
-3204 1 26 41 0.13107200000000000000e6
-3204 1 28 43 -0.26214400000000000000e6
-3204 1 32 47 -0.52428800000000000000e6
-3204 1 37 52 -0.26214400000000000000e6
-3204 1 38 53 -0.65536000000000000000e5
-3204 1 40 47 -0.65536000000000000000e5
-3204 2 2 32 -0.65536000000000000000e5
-3204 2 16 30 -0.13107200000000000000e6
-3204 2 20 34 -0.26214400000000000000e6
-3204 2 26 32 0.65536000000000000000e5
-3204 2 32 32 -0.13107200000000000000e6
-3204 3 9 38 -0.26214400000000000000e6
-3204 3 22 35 -0.52428800000000000000e6
-3204 3 22 51 -0.26214400000000000000e6
-3204 3 22 53 0.65536000000000000000e5
-3204 3 24 37 -0.13107200000000000000e6
-3204 3 24 53 0.65536000000000000000e5
-3204 3 27 40 -0.26214400000000000000e6
-3204 3 28 41 -0.52428800000000000000e6
-3204 3 37 50 -0.13107200000000000000e6
-3204 4 2 30 -0.26214400000000000000e6
-3204 4 4 32 0.13107200000000000000e6
-3204 4 6 34 -0.26214400000000000000e6
-3204 4 16 28 -0.13107200000000000000e6
-3204 4 17 29 -0.13107200000000000000e6
-3204 4 20 32 -0.13107200000000000000e6
-3205 1 23 54 -0.65536000000000000000e5
-3205 1 38 53 0.65536000000000000000e5
-3205 3 22 54 0.65536000000000000000e5
-3206 3 22 55 0.65536000000000000000e5
-3206 3 37 50 -0.65536000000000000000e5
-3207 1 1 48 0.65536000000000000000e5
-3207 1 2 49 0.13107200000000000000e6
-3207 1 6 53 -0.65536000000000000000e5
-3207 1 8 39 0.13107200000000000000e6
-3207 1 9 40 0.13107200000000000000e6
-3207 1 10 41 -0.26214400000000000000e6
-3207 1 12 43 -0.52428800000000000000e6
-3207 1 23 38 0.65536000000000000000e5
-3207 1 24 39 0.65536000000000000000e5
-3207 1 24 55 0.13107200000000000000e6
-3207 1 25 56 0.65536000000000000000e5
-3207 1 26 41 -0.26214400000000000000e6
-3207 1 28 43 0.26214400000000000000e6
-3207 1 32 47 0.52428800000000000000e6
-3207 1 40 47 0.65536000000000000000e5
-3207 2 2 32 0.65536000000000000000e5
-3207 2 3 33 0.65536000000000000000e5
-3207 2 5 35 -0.65536000000000000000e5
-3207 2 16 30 0.13107200000000000000e6
-3207 2 20 34 0.26214400000000000000e6
-3207 2 33 35 0.65536000000000000000e5
-3207 3 9 38 0.13107200000000000000e6
-3207 3 22 35 0.52428800000000000000e6
-3207 3 22 51 -0.13107200000000000000e6
-3207 3 22 56 0.65536000000000000000e5
-3207 3 23 52 0.26214400000000000000e6
-3207 3 24 53 -0.65536000000000000000e5
-3207 3 25 38 0.65536000000000000000e5
-3207 3 25 54 -0.65536000000000000000e5
-3207 3 27 40 0.13107200000000000000e6
-3207 3 27 56 -0.13107200000000000000e6
-3207 3 28 41 0.52428800000000000000e6
-3207 3 38 51 0.13107200000000000000e6
-3207 3 39 40 -0.65536000000000000000e5
-3207 3 40 53 -0.65536000000000000000e5
-3207 3 41 54 0.13107200000000000000e6
-3207 4 2 30 0.13107200000000000000e6
-3207 4 6 34 0.26214400000000000000e6
-3207 4 7 35 -0.13107200000000000000e6
-3207 4 32 32 0.13107200000000000000e6
-3208 1 1 40 -0.32768000000000000000e5
-3208 1 23 38 0.32768000000000000000e5
-3208 3 23 23 0.65536000000000000000e5
-3209 3 2 39 -0.65536000000000000000e5
-3209 3 23 24 0.65536000000000000000e5
-3210 1 6 37 -0.65536000000000000000e5
-3210 1 24 39 0.65536000000000000000e5
-3210 3 23 25 0.65536000000000000000e5
-3211 3 3 40 -0.65536000000000000000e5
-3211 3 23 26 0.65536000000000000000e5
-3212 3 8 37 -0.65536000000000000000e5
-3212 3 23 27 0.65536000000000000000e5
-3213 1 9 40 0.65536000000000000000e5
-3213 1 10 41 -0.13107200000000000000e6
-3213 1 26 41 -0.65536000000000000000e5
-3213 1 32 47 0.13107200000000000000e6
-3213 3 9 38 0.65536000000000000000e5
-3213 3 23 28 0.65536000000000000000e5
-3213 3 28 41 0.13107200000000000000e6
-3213 4 2 30 0.65536000000000000000e5
-3214 3 9 38 -0.65536000000000000000e5
-3214 3 23 29 0.65536000000000000000e5
-3215 1 9 40 -0.65536000000000000000e5
-3215 1 26 41 0.65536000000000000000e5
-3215 3 23 30 0.65536000000000000000e5
-3216 1 11 42 -0.65536000000000000000e5
-3216 1 33 48 0.65536000000000000000e5
-3216 2 12 26 0.65536000000000000000e5
-3216 2 20 34 -0.65536000000000000000e5
-3216 3 13 42 0.13107200000000000000e6
-3216 3 22 35 -0.13107200000000000000e6
-3216 3 23 31 0.65536000000000000000e5
-3216 3 29 42 0.65536000000000000000e5
-3216 4 3 31 -0.65536000000000000000e5
-3216 4 6 34 -0.65536000000000000000e5
-3217 1 10 41 -0.65536000000000000000e5
-3217 1 32 47 0.65536000000000000000e5
-3217 3 23 32 0.65536000000000000000e5
-3217 3 28 41 0.65536000000000000000e5
-3218 1 10 41 0.65536000000000000000e5
-3218 1 11 42 0.65536000000000000000e5
-3218 1 32 47 -0.65536000000000000000e5
-3218 1 33 48 -0.65536000000000000000e5
-3218 3 13 42 -0.13107200000000000000e6
-3218 3 23 33 0.65536000000000000000e5
-3218 3 28 41 -0.65536000000000000000e5
-3218 3 29 42 -0.65536000000000000000e5
-3218 4 3 31 0.65536000000000000000e5
-3219 3 22 35 -0.65536000000000000000e5
-3219 3 23 34 0.65536000000000000000e5
-3220 3 13 42 -0.65536000000000000000e5
-3220 3 23 35 0.65536000000000000000e5
-3221 1 14 45 -0.65536000000000000000e5
-3221 1 17 48 0.32768000000000000000e5
-3221 1 18 49 0.32768000000000000000e5
-3221 1 34 49 0.32768000000000000000e5
-3221 2 14 28 0.32768000000000000000e5
-3221 3 14 43 0.32768000000000000000e5
-3221 3 18 47 0.32768000000000000000e5
-3221 3 22 35 -0.32768000000000000000e5
-3221 3 23 36 0.65536000000000000000e5
-3221 4 14 26 -0.32768000000000000000e5
-3222 3 2 47 -0.65536000000000000000e5
-3222 3 23 37 0.65536000000000000000e5
-3223 3 23 38 0.65536000000000000000e5
-3223 3 24 37 -0.65536000000000000000e5
-3224 1 6 53 -0.65536000000000000000e5
-3224 1 25 40 0.65536000000000000000e5
-3224 3 23 39 0.65536000000000000000e5
-3224 3 25 38 0.65536000000000000000e5
-3224 3 27 40 -0.13107200000000000000e6
-3224 4 4 32 0.65536000000000000000e5
-3225 3 23 40 0.65536000000000000000e5
-3225 3 25 38 -0.65536000000000000000e5
-3226 1 6 53 0.32768000000000000000e5
-3226 1 25 40 -0.32768000000000000000e5
-3226 3 23 41 0.65536000000000000000e5
-3226 3 24 37 0.32768000000000000000e5
-3226 3 27 40 0.13107200000000000000e6
-3226 3 28 41 -0.13107200000000000000e6
-3226 4 4 32 -0.32768000000000000000e5
-3226 4 16 28 0.32768000000000000000e5
-3226 4 17 29 0.65536000000000000000e5
-3227 1 6 53 -0.32768000000000000000e5
-3227 1 25 40 0.32768000000000000000e5
-3227 3 23 42 0.65536000000000000000e5
-3227 3 24 37 -0.32768000000000000000e5
-3227 3 27 40 -0.65536000000000000000e5
-3227 4 4 32 0.32768000000000000000e5
-3227 4 16 28 -0.32768000000000000000e5
-3228 3 23 43 0.65536000000000000000e5
-3228 3 27 40 -0.65536000000000000000e5
-3229 3 23 44 0.65536000000000000000e5
-3229 3 28 41 -0.65536000000000000000e5
-3230 1 6 53 -0.16384000000000000000e5
-3230 1 25 40 0.16384000000000000000e5
-3230 2 4 34 -0.32768000000000000000e5
-3230 2 21 35 0.32768000000000000000e5
-3230 3 5 50 -0.32768000000000000000e5
-3230 3 23 45 0.65536000000000000000e5
-3230 3 24 37 -0.16384000000000000000e5
-3230 3 27 40 -0.65536000000000000000e5
-3230 4 4 32 0.16384000000000000000e5
-3230 4 7 35 0.32768000000000000000e5
-3230 4 16 28 -0.16384000000000000000e5
-3231 1 6 53 -0.81920000000000000000e4
-3231 1 25 40 0.81920000000000000000e4
-3231 2 4 34 -0.16384000000000000000e5
-3231 2 21 35 0.16384000000000000000e5
-3231 3 5 50 -0.16384000000000000000e5
-3231 3 23 46 0.65536000000000000000e5
-3231 3 24 37 -0.81920000000000000000e4
-3231 3 27 40 -0.32768000000000000000e5
-3231 3 28 41 -0.32768000000000000000e5
-3231 3 29 42 -0.32768000000000000000e5
-3231 4 4 32 0.81920000000000000000e4
-3231 4 7 35 0.16384000000000000000e5
-3231 4 16 28 -0.81920000000000000000e4
-3231 4 23 27 -0.32768000000000000000e5
-3232 1 2 49 -0.65536000000000000000e5
-3232 1 6 53 0.65536000000000000000e5
-3232 1 8 39 0.13107200000000000000e6
-3232 1 9 40 0.13107200000000000000e6
-3232 1 10 41 -0.26214400000000000000e6
-3232 1 22 53 -0.65536000000000000000e5
-3232 1 23 54 -0.65536000000000000000e5
-3232 1 24 55 -0.13107200000000000000e6
-3232 1 25 40 -0.65536000000000000000e5
-3232 1 37 52 0.26214400000000000000e6
-3232 2 26 32 -0.65536000000000000000e5
-3232 3 9 38 0.13107200000000000000e6
-3232 3 22 51 0.13107200000000000000e6
-3232 3 23 47 0.65536000000000000000e5
-3232 3 24 37 0.13107200000000000000e6
-3232 3 27 40 0.13107200000000000000e6
-3232 4 2 30 0.13107200000000000000e6
-3232 4 4 32 -0.65536000000000000000e5
-3232 4 16 28 0.65536000000000000000e5
-3232 4 17 29 0.13107200000000000000e6
-3232 4 20 32 0.13107200000000000000e6
-3233 1 6 53 0.65536000000000000000e5
-3233 1 23 54 0.65536000000000000000e5
-3233 1 24 39 -0.65536000000000000000e5
-3233 1 25 40 -0.65536000000000000000e5
-3233 3 23 48 0.65536000000000000000e5
-3233 3 25 38 -0.65536000000000000000e5
-3233 3 27 40 0.13107200000000000000e6
-3233 4 4 32 -0.65536000000000000000e5
-3234 1 1 48 0.65536000000000000000e5
-3234 1 2 49 0.13107200000000000000e6
-3234 1 8 39 0.13107200000000000000e6
-3234 1 9 40 0.13107200000000000000e6
-3234 1 10 41 -0.26214400000000000000e6
-3234 1 12 43 -0.52428800000000000000e6
-3234 1 23 38 0.65536000000000000000e5
-3234 1 24 39 0.65536000000000000000e5
-3234 1 26 41 -0.13107200000000000000e6
-3234 1 28 43 0.26214400000000000000e6
-3234 1 32 47 0.52428800000000000000e6
-3234 1 40 47 0.65536000000000000000e5
-3234 2 2 32 0.65536000000000000000e5
-3234 2 3 33 0.65536000000000000000e5
-3234 2 16 30 0.13107200000000000000e6
-3234 2 20 34 0.26214400000000000000e6
-3234 3 9 38 0.13107200000000000000e6
-3234 3 22 35 0.52428800000000000000e6
-3234 3 23 49 0.65536000000000000000e5
-3234 3 25 38 0.65536000000000000000e5
-3234 3 28 41 0.52428800000000000000e6
-3234 4 2 30 0.13107200000000000000e6
-3234 4 6 34 0.26214400000000000000e6
-3235 3 22 51 -0.65536000000000000000e5
-3235 3 23 50 0.65536000000000000000e5
-3236 1 24 55 0.65536000000000000000e5
-3236 1 26 41 -0.65536000000000000000e5
-3236 3 23 51 0.65536000000000000000e5
-3236 3 27 40 0.65536000000000000000e5
-3237 1 23 54 -0.65536000000000000000e5
-3237 1 38 53 0.65536000000000000000e5
-3237 3 23 53 0.65536000000000000000e5
-3238 3 23 54 0.65536000000000000000e5
-3238 3 24 53 -0.65536000000000000000e5
-3239 1 24 55 -0.65536000000000000000e5
-3239 1 41 56 0.65536000000000000000e5
-3239 3 23 55 0.65536000000000000000e5
-3239 3 27 56 0.65536000000000000000e5
-3240 1 40 47 -0.65536000000000000000e5
-3240 1 47 54 0.65536000000000000000e5
-3240 3 23 56 0.65536000000000000000e5
-3240 3 24 53 0.65536000000000000000e5
-3241 1 6 37 -0.32768000000000000000e5
-3241 1 24 39 0.32768000000000000000e5
-3241 3 24 24 0.65536000000000000000e5
-3242 3 3 40 -0.65536000000000000000e5
-3242 3 24 25 0.65536000000000000000e5
-3243 1 1 48 -0.65536000000000000000e5
-3243 1 2 49 -0.13107200000000000000e6
-3243 1 6 37 0.65536000000000000000e5
-3243 1 8 39 -0.13107200000000000000e6
-3243 1 9 40 -0.26214400000000000000e6
-3243 1 10 41 0.26214400000000000000e6
-3243 1 12 43 0.52428800000000000000e6
-3243 1 23 38 -0.65536000000000000000e5
-3243 1 24 39 -0.65536000000000000000e5
-3243 1 25 40 0.65536000000000000000e5
-3243 1 26 41 0.13107200000000000000e6
-3243 1 28 43 -0.26214400000000000000e6
-3243 1 32 47 -0.52428800000000000000e6
-3243 2 2 32 -0.65536000000000000000e5
-3243 2 3 33 -0.65536000000000000000e5
-3243 2 5 27 0.65536000000000000000e5
-3243 2 16 30 -0.13107200000000000000e6
-3243 2 20 34 -0.26214400000000000000e6
-3243 3 3 40 0.65536000000000000000e5
-3243 3 9 38 -0.13107200000000000000e6
-3243 3 22 35 -0.52428800000000000000e6
-3243 3 24 26 0.65536000000000000000e5
-3243 3 28 41 -0.52428800000000000000e6
-3243 4 2 30 -0.13107200000000000000e6
-3243 4 6 34 -0.26214400000000000000e6
-3244 1 9 40 0.65536000000000000000e5
-3244 1 10 41 -0.13107200000000000000e6
-3244 1 26 41 -0.65536000000000000000e5
-3244 1 32 47 0.13107200000000000000e6
-3244 3 9 38 0.65536000000000000000e5
-3244 3 24 27 0.65536000000000000000e5
-3244 3 28 41 0.13107200000000000000e6
-3244 4 2 30 0.65536000000000000000e5
-3245 3 9 38 -0.65536000000000000000e5
-3245 3 24 28 0.65536000000000000000e5
-3246 1 9 40 -0.65536000000000000000e5
-3246 1 26 41 0.65536000000000000000e5
-3246 3 24 29 0.65536000000000000000e5
-3247 3 10 39 -0.65536000000000000000e5
-3247 3 24 30 0.65536000000000000000e5
-3248 1 10 41 -0.65536000000000000000e5
-3248 1 32 47 0.65536000000000000000e5
-3248 3 24 31 0.65536000000000000000e5
-3248 3 28 41 0.65536000000000000000e5
-3249 1 10 41 0.65536000000000000000e5
-3249 1 11 42 0.65536000000000000000e5
-3249 1 32 47 -0.65536000000000000000e5
-3249 1 33 48 -0.65536000000000000000e5
-3249 3 13 42 -0.13107200000000000000e6
-3249 3 24 32 0.65536000000000000000e5
-3249 3 28 41 -0.65536000000000000000e5
-3249 3 29 42 -0.65536000000000000000e5
-3249 4 3 31 0.65536000000000000000e5
-3250 1 11 42 -0.65536000000000000000e5
-3250 1 33 48 0.65536000000000000000e5
-3250 3 24 33 0.65536000000000000000e5
-3250 3 29 42 0.65536000000000000000e5
-3251 3 13 42 -0.65536000000000000000e5
-3251 3 24 34 0.65536000000000000000e5
-3252 1 14 45 -0.13107200000000000000e6
-3252 1 17 48 0.65536000000000000000e5
-3252 1 18 49 0.65536000000000000000e5
-3252 1 34 49 0.65536000000000000000e5
-3252 2 14 28 0.65536000000000000000e5
-3252 3 13 42 0.65536000000000000000e5
-3252 3 14 43 0.65536000000000000000e5
-3252 3 18 47 0.65536000000000000000e5
-3252 3 24 35 0.65536000000000000000e5
-3253 1 14 45 0.65536000000000000000e5
-3253 1 17 48 -0.32768000000000000000e5
-3253 1 18 49 -0.32768000000000000000e5
-3253 1 34 49 -0.32768000000000000000e5
-3253 2 14 28 -0.32768000000000000000e5
-3253 3 14 43 -0.32768000000000000000e5
-3253 3 15 44 0.65536000000000000000e5
-3253 3 16 45 -0.13107200000000000000e6
-3253 3 18 47 -0.32768000000000000000e5
-3253 3 22 35 0.32768000000000000000e5
-3253 3 24 36 0.65536000000000000000e5
-3253 4 14 26 0.32768000000000000000e5
-3253 4 15 27 0.65536000000000000000e5
-3254 1 6 53 -0.65536000000000000000e5
-3254 1 25 40 0.65536000000000000000e5
-3254 3 24 38 0.65536000000000000000e5
-3254 3 25 38 0.65536000000000000000e5
-3254 3 27 40 -0.13107200000000000000e6
-3254 4 4 32 0.65536000000000000000e5
-3255 3 24 39 0.65536000000000000000e5
-3255 3 25 38 -0.65536000000000000000e5
-3256 1 6 53 0.65536000000000000000e5
-3256 1 25 40 -0.65536000000000000000e5
-3256 3 24 40 0.65536000000000000000e5
-3257 1 6 53 -0.32768000000000000000e5
-3257 1 25 40 0.32768000000000000000e5
-3257 3 24 37 -0.32768000000000000000e5
-3257 3 24 41 0.65536000000000000000e5
-3257 3 27 40 -0.65536000000000000000e5
-3257 4 4 32 0.32768000000000000000e5
-3257 4 16 28 -0.32768000000000000000e5
-3258 3 24 42 0.65536000000000000000e5
-3258 3 27 40 -0.65536000000000000000e5
-3259 3 5 50 -0.65536000000000000000e5
-3259 3 24 43 0.65536000000000000000e5
-3260 1 6 53 -0.16384000000000000000e5
-3260 1 25 40 0.16384000000000000000e5
-3260 2 4 34 -0.32768000000000000000e5
-3260 2 21 35 0.32768000000000000000e5
-3260 3 5 50 -0.32768000000000000000e5
-3260 3 24 37 -0.16384000000000000000e5
-3260 3 24 44 0.65536000000000000000e5
-3260 3 27 40 -0.65536000000000000000e5
-3260 4 4 32 0.16384000000000000000e5
-3260 4 7 35 0.32768000000000000000e5
-3260 4 16 28 -0.16384000000000000000e5
-3261 3 24 45 0.65536000000000000000e5
-3261 3 29 42 -0.65536000000000000000e5
-3262 3 18 47 -0.65536000000000000000e5
-3262 3 24 46 0.65536000000000000000e5
-3263 1 6 53 0.65536000000000000000e5
-3263 1 23 54 0.65536000000000000000e5
-3263 1 24 39 -0.65536000000000000000e5
-3263 1 25 40 -0.65536000000000000000e5
-3263 3 24 47 0.65536000000000000000e5
-3263 3 25 38 -0.65536000000000000000e5
-3263 3 27 40 0.13107200000000000000e6
-3263 4 4 32 -0.65536000000000000000e5
-3264 1 1 48 0.65536000000000000000e5
-3264 1 2 49 0.13107200000000000000e6
-3264 1 8 39 0.13107200000000000000e6
-3264 1 9 40 0.13107200000000000000e6
-3264 1 10 41 -0.26214400000000000000e6
-3264 1 12 43 -0.52428800000000000000e6
-3264 1 23 38 0.65536000000000000000e5
-3264 1 24 39 0.65536000000000000000e5
-3264 1 26 41 -0.13107200000000000000e6
-3264 1 28 43 0.26214400000000000000e6
-3264 1 32 47 0.52428800000000000000e6
-3264 1 40 47 0.65536000000000000000e5
-3264 2 2 32 0.65536000000000000000e5
-3264 2 3 33 0.65536000000000000000e5
-3264 2 16 30 0.13107200000000000000e6
-3264 2 20 34 0.26214400000000000000e6
-3264 3 9 38 0.13107200000000000000e6
-3264 3 22 35 0.52428800000000000000e6
-3264 3 24 48 0.65536000000000000000e5
-3264 3 25 38 0.65536000000000000000e5
-3264 3 28 41 0.52428800000000000000e6
-3264 4 2 30 0.13107200000000000000e6
-3264 4 6 34 0.26214400000000000000e6
-3265 1 6 53 -0.65536000000000000000e5
-3265 1 25 56 0.65536000000000000000e5
-3265 3 24 49 0.65536000000000000000e5
-3265 3 24 53 -0.65536000000000000000e5
-3265 3 25 54 -0.65536000000000000000e5
-3265 3 38 51 0.13107200000000000000e6
-3265 4 28 32 -0.65536000000000000000e5
-3266 1 24 55 0.65536000000000000000e5
-3266 1 26 41 -0.65536000000000000000e5
-3266 3 24 50 0.65536000000000000000e5
-3266 3 27 40 0.65536000000000000000e5
-3267 1 24 55 -0.65536000000000000000e5
-3267 1 26 41 0.65536000000000000000e5
-3267 3 22 51 0.65536000000000000000e5
-3267 3 23 52 -0.13107200000000000000e6
-3267 3 24 51 0.65536000000000000000e5
-3267 3 27 40 -0.65536000000000000000e5
-3267 4 7 35 0.65536000000000000000e5
-3268 3 10 55 0.65536000000000000000e5
-3268 3 24 52 0.65536000000000000000e5
-3268 3 35 48 -0.13107200000000000000e6
-3268 3 40 45 0.65536000000000000000e5
-3268 4 22 34 0.65536000000000000000e5
-3269 3 24 53 0.65536000000000000000e5
-3269 3 24 54 0.65536000000000000000e5
-3269 3 25 54 0.65536000000000000000e5
-3269 3 38 51 -0.13107200000000000000e6
-3269 4 28 32 0.65536000000000000000e5
-3270 3 24 55 0.65536000000000000000e5
-3270 3 38 51 -0.65536000000000000000e5
-3271 1 1 48 -0.65536000000000000000e5
-3271 1 2 49 -0.13107200000000000000e6
-3271 1 6 53 0.65536000000000000000e5
-3271 1 8 39 -0.13107200000000000000e6
-3271 1 9 40 -0.13107200000000000000e6
-3271 1 10 41 0.26214400000000000000e6
-3271 1 12 43 0.52428800000000000000e6
-3271 1 23 38 -0.65536000000000000000e5
-3271 1 24 39 -0.65536000000000000000e5
-3271 1 24 55 -0.13107200000000000000e6
-3271 1 25 56 -0.65536000000000000000e5
-3271 1 26 41 0.26214400000000000000e6
-3271 1 28 43 -0.26214400000000000000e6
-3271 1 32 47 -0.52428800000000000000e6
-3271 1 47 54 -0.65536000000000000000e5
-3271 2 2 32 -0.65536000000000000000e5
-3271 2 3 33 -0.65536000000000000000e5
-3271 2 5 35 0.65536000000000000000e5
-3271 2 16 30 -0.13107200000000000000e6
-3271 2 20 34 -0.26214400000000000000e6
-3271 2 33 35 -0.65536000000000000000e5
-3271 3 9 38 -0.13107200000000000000e6
-3271 3 22 35 -0.52428800000000000000e6
-3271 3 22 51 0.13107200000000000000e6
-3271 3 23 52 -0.26214400000000000000e6
-3271 3 24 56 0.65536000000000000000e5
-3271 3 25 38 -0.65536000000000000000e5
-3271 3 25 54 0.65536000000000000000e5
-3271 3 27 40 -0.13107200000000000000e6
-3271 3 28 41 -0.52428800000000000000e6
-3271 3 38 51 -0.13107200000000000000e6
-3271 3 39 40 0.65536000000000000000e5
-3271 3 40 53 0.65536000000000000000e5
-3271 3 41 54 -0.13107200000000000000e6
-3271 4 2 30 -0.13107200000000000000e6
-3271 4 6 34 -0.26214400000000000000e6
-3271 4 7 35 0.13107200000000000000e6
-3272 1 1 48 -0.32768000000000000000e5
-3272 1 2 49 -0.65536000000000000000e5
-3272 1 6 37 0.32768000000000000000e5
-3272 1 8 39 -0.65536000000000000000e5
-3272 1 9 40 -0.13107200000000000000e6
-3272 1 10 41 0.13107200000000000000e6
-3272 1 12 43 0.26214400000000000000e6
-3272 1 23 38 -0.32768000000000000000e5
-3272 1 24 39 -0.32768000000000000000e5
-3272 1 25 40 0.32768000000000000000e5
-3272 1 26 41 0.65536000000000000000e5
-3272 1 28 43 -0.13107200000000000000e6
-3272 1 32 47 -0.26214400000000000000e6
-3272 2 2 32 -0.32768000000000000000e5
-3272 2 3 33 -0.32768000000000000000e5
-3272 2 5 27 0.32768000000000000000e5
-3272 2 16 30 -0.65536000000000000000e5
-3272 2 20 34 -0.13107200000000000000e6
-3272 3 3 40 0.32768000000000000000e5
-3272 3 9 38 -0.65536000000000000000e5
-3272 3 22 35 -0.26214400000000000000e6
-3272 3 25 25 0.65536000000000000000e5
-3272 3 28 41 -0.26214400000000000000e6
-3272 4 2 30 -0.65536000000000000000e5
-3272 4 6 34 -0.13107200000000000000e6
-3273 1 1 40 -0.65536000000000000000e5
-3273 1 1 48 0.65536000000000000000e5
-3273 1 2 33 0.52428800000000000000e6
-3273 1 2 49 0.13107200000000000000e6
-3273 1 6 37 -0.65536000000000000000e5
-3273 1 6 53 -0.65536000000000000000e5
-3273 1 8 39 0.13107200000000000000e6
-3273 1 10 25 0.26214400000000000000e6
-3273 1 10 41 -0.26214400000000000000e6
-3273 1 11 42 -0.52428800000000000000e6
-3273 1 12 43 -0.15728640000000000000e7
-3273 1 23 38 0.13107200000000000000e6
-3273 1 24 39 0.65536000000000000000e5
-3273 1 26 41 -0.13107200000000000000e6
-3273 1 28 43 0.78643200000000000000e6
-3273 1 32 47 0.10485760000000000000e7
-3273 1 33 48 0.52428800000000000000e6
-3273 2 2 32 0.13107200000000000000e6
-3273 2 3 17 -0.65536000000000000000e5
-3273 2 3 33 0.65536000000000000000e5
-3273 2 5 19 0.65536000000000000000e5
-3273 2 5 27 -0.65536000000000000000e5
-3273 2 5 35 -0.65536000000000000000e5
-3273 2 12 26 0.52428800000000000000e6
-3273 2 16 30 0.13107200000000000000e6
-3273 2 20 34 0.26214400000000000000e6
-3273 3 1 30 -0.26214400000000000000e6
-3273 3 1 38 -0.65536000000000000000e5
-3273 3 2 23 -0.65536000000000000000e5
-3273 3 2 39 -0.65536000000000000000e5
-3273 3 3 32 0.26214400000000000000e6
-3273 3 5 26 0.65536000000000000000e5
-3273 3 5 50 -0.13107200000000000000e6
-3273 3 8 37 0.13107200000000000000e6
-3273 3 9 38 0.13107200000000000000e6
-3273 3 10 39 -0.13107200000000000000e6
-3273 3 13 42 0.10485760000000000000e7
-3273 3 14 27 -0.52428800000000000000e6
-3273 3 22 35 0.52428800000000000000e6
-3273 3 25 26 0.65536000000000000000e5
-3273 3 25 38 0.65536000000000000000e5
-3273 3 26 39 0.65536000000000000000e5
-3273 3 28 41 0.10485760000000000000e7
-3273 3 29 42 0.52428800000000000000e6
-3273 4 2 30 0.13107200000000000000e6
-3273 4 3 31 -0.52428800000000000000e6
-3273 4 4 16 0.65536000000000000000e5
-3273 4 5 17 -0.65536000000000000000e5
-3273 4 6 18 -0.13107200000000000000e6
-3273 4 6 34 0.26214400000000000000e6
-3273 4 7 19 0.13107200000000000000e6
-3273 4 8 20 0.26214400000000000000e6
-3274 3 9 38 -0.65536000000000000000e5
-3274 3 25 27 0.65536000000000000000e5
-3275 1 9 40 -0.65536000000000000000e5
-3275 1 26 41 0.65536000000000000000e5
-3275 3 25 28 0.65536000000000000000e5
-3276 3 10 39 -0.65536000000000000000e5
-3276 3 25 29 0.65536000000000000000e5
-3277 1 9 40 0.65536000000000000000e5
-3277 1 11 42 -0.13107200000000000000e6
-3277 1 26 41 -0.65536000000000000000e5
-3277 1 33 48 0.13107200000000000000e6
-3277 3 10 39 0.65536000000000000000e5
-3277 3 25 30 0.65536000000000000000e5
-3277 3 29 42 0.13107200000000000000e6
-3277 4 18 22 0.65536000000000000000e5
-3278 1 10 41 0.65536000000000000000e5
-3278 1 11 42 0.65536000000000000000e5
-3278 1 32 47 -0.65536000000000000000e5
-3278 1 33 48 -0.65536000000000000000e5
-3278 3 13 42 -0.13107200000000000000e6
-3278 3 25 31 0.65536000000000000000e5
-3278 3 28 41 -0.65536000000000000000e5
-3278 3 29 42 -0.65536000000000000000e5
-3278 4 3 31 0.65536000000000000000e5
-3279 1 11 42 -0.65536000000000000000e5
-3279 1 33 48 0.65536000000000000000e5
-3279 3 25 32 0.65536000000000000000e5
-3279 3 29 42 0.65536000000000000000e5
-3280 1 26 33 -0.65536000000000000000e5
-3280 1 33 40 0.65536000000000000000e5
-3280 3 25 33 0.65536000000000000000e5
-3281 1 14 45 -0.13107200000000000000e6
-3281 1 17 48 0.65536000000000000000e5
-3281 1 18 49 0.65536000000000000000e5
-3281 1 34 49 0.65536000000000000000e5
-3281 2 14 28 0.65536000000000000000e5
-3281 3 13 42 0.65536000000000000000e5
-3281 3 14 43 0.65536000000000000000e5
-3281 3 18 47 0.65536000000000000000e5
-3281 3 25 34 0.65536000000000000000e5
-3282 3 14 43 -0.65536000000000000000e5
-3282 3 25 35 0.65536000000000000000e5
-3283 3 15 44 -0.65536000000000000000e5
-3283 3 25 36 0.65536000000000000000e5
-3284 1 6 53 -0.65536000000000000000e5
-3284 1 25 40 0.65536000000000000000e5
-3284 3 25 37 0.65536000000000000000e5
-3284 3 25 38 0.65536000000000000000e5
-3284 3 27 40 -0.13107200000000000000e6
-3284 4 4 32 0.65536000000000000000e5
-3285 1 6 53 0.65536000000000000000e5
-3285 1 25 40 -0.65536000000000000000e5
-3285 3 25 39 0.65536000000000000000e5
-3286 3 25 40 0.65536000000000000000e5
-3286 3 26 39 -0.65536000000000000000e5
-3287 3 25 41 0.65536000000000000000e5
-3287 3 27 40 -0.65536000000000000000e5
-3288 3 5 50 -0.65536000000000000000e5
-3288 3 25 42 0.65536000000000000000e5
-3289 3 5 50 0.65536000000000000000e5
-3289 3 25 43 0.65536000000000000000e5
-3289 3 27 40 0.65536000000000000000e5
-3289 3 29 42 -0.13107200000000000000e6
-3289 4 18 30 0.65536000000000000000e5
-3290 3 25 44 0.65536000000000000000e5
-3290 3 29 42 -0.65536000000000000000e5
-3291 3 14 51 -0.13107200000000000000e6
-3291 3 25 45 0.65536000000000000000e5
-3291 3 29 42 0.65536000000000000000e5
-3291 3 30 43 0.65536000000000000000e5
-3291 4 19 31 0.65536000000000000000e5
-3292 3 14 51 -0.65536000000000000000e5
-3292 3 25 46 0.65536000000000000000e5
-3293 1 1 48 0.65536000000000000000e5
-3293 1 2 49 0.13107200000000000000e6
-3293 1 8 39 0.13107200000000000000e6
-3293 1 9 40 0.13107200000000000000e6
-3293 1 10 41 -0.26214400000000000000e6
-3293 1 12 43 -0.52428800000000000000e6
-3293 1 23 38 0.65536000000000000000e5
-3293 1 24 39 0.65536000000000000000e5
-3293 1 26 41 -0.13107200000000000000e6
-3293 1 28 43 0.26214400000000000000e6
-3293 1 32 47 0.52428800000000000000e6
-3293 1 40 47 0.65536000000000000000e5
-3293 2 2 32 0.65536000000000000000e5
-3293 2 3 33 0.65536000000000000000e5
-3293 2 16 30 0.13107200000000000000e6
-3293 2 20 34 0.26214400000000000000e6
-3293 3 9 38 0.13107200000000000000e6
-3293 3 22 35 0.52428800000000000000e6
-3293 3 25 38 0.65536000000000000000e5
-3293 3 25 47 0.65536000000000000000e5
-3293 3 28 41 0.52428800000000000000e6
-3293 4 2 30 0.13107200000000000000e6
-3293 4 6 34 0.26214400000000000000e6
-3294 1 6 53 -0.65536000000000000000e5
-3294 1 25 56 0.65536000000000000000e5
-3294 3 24 53 -0.65536000000000000000e5
-3294 3 25 48 0.65536000000000000000e5
-3294 3 25 54 -0.65536000000000000000e5
-3294 3 38 51 0.13107200000000000000e6
-3294 4 28 32 -0.65536000000000000000e5
-3295 3 25 49 0.65536000000000000000e5
-3295 3 39 40 -0.65536000000000000000e5
-3296 1 24 55 -0.65536000000000000000e5
-3296 1 26 41 0.65536000000000000000e5
-3296 3 22 51 0.65536000000000000000e5
-3296 3 23 52 -0.13107200000000000000e6
-3296 3 25 50 0.65536000000000000000e5
-3296 3 27 40 -0.65536000000000000000e5
-3296 4 7 35 0.65536000000000000000e5
-3297 3 10 55 0.13107200000000000000e6
-3297 3 22 51 -0.65536000000000000000e5
-3297 3 23 52 0.13107200000000000000e6
-3297 3 25 51 0.65536000000000000000e5
-3297 3 35 48 -0.26214400000000000000e6
-3297 3 40 45 0.13107200000000000000e6
-3297 4 7 35 -0.65536000000000000000e5
-3297 4 21 33 0.65536000000000000000e5
-3297 4 22 34 0.13107200000000000000e6
-3298 3 10 55 -0.65536000000000000000e5
-3298 3 25 52 0.65536000000000000000e5
-3299 3 24 53 0.65536000000000000000e5
-3299 3 25 53 0.65536000000000000000e5
-3299 3 25 54 0.65536000000000000000e5
-3299 3 38 51 -0.13107200000000000000e6
-3299 4 28 32 0.65536000000000000000e5
-3300 1 1 48 0.32768000000000000000e5
-3300 1 2 49 0.32768000000000000000e5
-3300 1 8 39 0.65536000000000000000e5
-3300 1 9 40 0.65536000000000000000e5
-3300 1 10 41 -0.13107200000000000000e6
-3300 1 12 43 -0.26214400000000000000e6
-3300 1 23 38 0.32768000000000000000e5
-3300 1 26 41 -0.65536000000000000000e5
-3300 1 28 43 0.26214400000000000000e6
-3300 1 32 47 0.26214400000000000000e6
-3300 1 33 48 -0.13107200000000000000e6
-3300 1 40 55 0.65536000000000000000e5
-3300 2 2 32 0.32768000000000000000e5
-3300 2 4 34 -0.65536000000000000000e5
-3300 2 16 30 0.65536000000000000000e5
-3300 2 20 34 0.13107200000000000000e6
-3300 2 28 34 0.65536000000000000000e5
-3300 3 5 50 -0.65536000000000000000e5
-3300 3 9 38 0.65536000000000000000e5
-3300 3 10 55 -0.13107200000000000000e6
-3300 3 22 35 0.26214400000000000000e6
-3300 3 22 51 0.65536000000000000000e5
-3300 3 23 52 -0.13107200000000000000e6
-3300 3 25 55 0.65536000000000000000e5
-3300 3 27 40 -0.65536000000000000000e5
-3300 3 28 41 0.26214400000000000000e6
-3300 3 35 48 0.26214400000000000000e6
-3300 3 40 45 -0.13107200000000000000e6
-3300 4 2 30 0.65536000000000000000e5
-3300 4 6 34 0.13107200000000000000e6
-3300 4 7 35 0.65536000000000000000e5
-3300 4 22 34 -0.13107200000000000000e6
-3301 3 25 56 0.65536000000000000000e5
-3301 3 40 53 -0.65536000000000000000e5
-3302 1 1 40 0.32768000000000000000e5
-3302 1 2 33 -0.26214400000000000000e6
-3302 1 6 53 0.32768000000000000000e5
-3302 1 9 40 0.19660800000000000000e6
-3302 1 10 25 -0.13107200000000000000e6
-3302 1 11 42 0.13107200000000000000e6
-3302 1 12 43 0.52428800000000000000e6
-3302 1 23 38 -0.32768000000000000000e5
-3302 1 25 40 -0.32768000000000000000e5
-3302 1 26 41 -0.65536000000000000000e5
-3302 1 28 43 -0.26214400000000000000e6
-3302 1 32 47 -0.26214400000000000000e6
-3302 1 33 48 -0.13107200000000000000e6
-3302 2 2 32 -0.32768000000000000000e5
-3302 2 3 17 0.32768000000000000000e5
-3302 2 5 19 -0.32768000000000000000e5
-3302 2 5 35 0.32768000000000000000e5
-3302 2 12 26 -0.26214400000000000000e6
-3302 3 1 30 0.13107200000000000000e6
-3302 3 1 38 0.32768000000000000000e5
-3302 3 2 23 0.32768000000000000000e5
-3302 3 2 39 0.32768000000000000000e5
-3302 3 3 32 -0.13107200000000000000e6
-3302 3 3 40 -0.32768000000000000000e5
-3302 3 5 26 -0.32768000000000000000e5
-3302 3 5 50 0.65536000000000000000e5
-3302 3 8 37 -0.65536000000000000000e5
-3302 3 10 39 0.13107200000000000000e6
-3302 3 13 42 -0.52428800000000000000e6
-3302 3 14 27 0.26214400000000000000e6
-3302 3 25 38 -0.32768000000000000000e5
-3302 3 26 26 0.65536000000000000000e5
-3302 3 26 39 -0.32768000000000000000e5
-3302 3 28 41 -0.26214400000000000000e6
-3302 3 29 42 -0.13107200000000000000e6
-3302 4 3 31 0.26214400000000000000e6
-3302 4 4 16 -0.32768000000000000000e5
-3302 4 5 17 0.32768000000000000000e5
-3302 4 6 18 0.65536000000000000000e5
-3302 4 7 19 -0.65536000000000000000e5
-3302 4 8 20 -0.13107200000000000000e6
-3302 4 18 22 0.65536000000000000000e5
-3302 4 19 19 0.65536000000000000000e5
-3303 1 9 40 -0.65536000000000000000e5
-3303 1 26 41 0.65536000000000000000e5
-3303 3 26 27 0.65536000000000000000e5
-3304 3 10 39 -0.65536000000000000000e5
-3304 3 26 28 0.65536000000000000000e5
-3305 1 9 40 0.65536000000000000000e5
-3305 1 11 42 -0.13107200000000000000e6
-3305 1 26 41 -0.65536000000000000000e5
-3305 1 33 48 0.13107200000000000000e6
-3305 3 10 39 0.65536000000000000000e5
-3305 3 26 29 0.65536000000000000000e5
-3305 3 29 42 0.13107200000000000000e6
-3305 4 18 22 0.65536000000000000000e5
-3306 3 11 40 -0.65536000000000000000e5
-3306 3 26 30 0.65536000000000000000e5
-3307 1 11 42 -0.65536000000000000000e5
-3307 1 33 48 0.65536000000000000000e5
-3307 3 26 31 0.65536000000000000000e5
-3307 3 29 42 0.65536000000000000000e5
-3308 1 26 33 -0.65536000000000000000e5
-3308 1 33 40 0.65536000000000000000e5
-3308 3 26 32 0.65536000000000000000e5
-3309 1 11 42 0.65536000000000000000e5
-3309 1 26 33 0.65536000000000000000e5
-3309 1 33 40 -0.65536000000000000000e5
-3309 1 33 48 -0.65536000000000000000e5
-3309 3 14 43 -0.13107200000000000000e6
-3309 3 26 33 0.65536000000000000000e5
-3309 3 29 42 -0.65536000000000000000e5
-3309 4 22 22 0.13107200000000000000e6
-3310 3 14 43 -0.65536000000000000000e5
-3310 3 26 34 0.65536000000000000000e5
-3311 3 26 36 0.65536000000000000000e5
-3311 3 30 35 -0.65536000000000000000e5
-3312 3 25 38 -0.65536000000000000000e5
-3312 3 26 37 0.65536000000000000000e5
-3313 1 6 53 0.65536000000000000000e5
-3313 1 25 40 -0.65536000000000000000e5
-3313 3 26 38 0.65536000000000000000e5
-3314 1 6 53 -0.65536000000000000000e5
-3314 1 25 40 0.65536000000000000000e5
-3314 3 5 50 0.13107200000000000000e6
-3314 3 26 39 0.65536000000000000000e5
-3314 3 26 40 0.65536000000000000000e5
-3314 3 27 40 0.13107200000000000000e6
-3314 3 29 42 -0.26214400000000000000e6
-3314 4 5 33 0.65536000000000000000e5
-3314 4 18 30 0.13107200000000000000e6
-3315 3 5 50 -0.65536000000000000000e5
-3315 3 26 41 0.65536000000000000000e5
-3316 3 5 50 0.65536000000000000000e5
-3316 3 26 42 0.65536000000000000000e5
-3316 3 27 40 0.65536000000000000000e5
-3316 3 29 42 -0.13107200000000000000e6
-3316 4 18 30 0.65536000000000000000e5
-3317 3 6 51 -0.65536000000000000000e5
-3317 3 26 43 0.65536000000000000000e5
-3318 3 14 51 -0.13107200000000000000e6
-3318 3 26 44 0.65536000000000000000e5
-3318 3 29 42 0.65536000000000000000e5
-3318 3 30 43 0.65536000000000000000e5
-3318 4 19 31 0.65536000000000000000e5
-3319 3 26 45 0.65536000000000000000e5
-3319 3 30 43 -0.65536000000000000000e5
-3320 3 26 46 0.65536000000000000000e5
-3320 3 35 40 -0.65536000000000000000e5
-3321 1 6 53 -0.65536000000000000000e5
-3321 1 25 56 0.65536000000000000000e5
-3321 3 24 53 -0.65536000000000000000e5
-3321 3 25 54 -0.65536000000000000000e5
-3321 3 26 47 0.65536000000000000000e5
-3321 3 38 51 0.13107200000000000000e6
-3321 4 28 32 -0.65536000000000000000e5
-3322 3 26 48 0.65536000000000000000e5
-3322 3 39 40 -0.65536000000000000000e5
-3323 1 6 53 0.65536000000000000000e5
-3323 1 25 56 -0.65536000000000000000e5
-3323 3 10 55 0.26214400000000000000e6
-3323 3 22 51 -0.13107200000000000000e6
-3323 3 23 52 0.26214400000000000000e6
-3323 3 24 53 0.65536000000000000000e5
-3323 3 25 54 0.65536000000000000000e5
-3323 3 26 49 0.65536000000000000000e5
-3323 3 35 48 -0.52428800000000000000e6
-3323 3 38 51 -0.13107200000000000000e6
-3323 3 39 40 0.65536000000000000000e5
-3323 3 40 45 0.26214400000000000000e6
-3323 4 7 35 -0.13107200000000000000e6
-3323 4 21 33 0.13107200000000000000e6
-3323 4 22 34 0.26214400000000000000e6
-3323 4 28 28 0.13107200000000000000e6
-3323 4 28 32 0.65536000000000000000e5
-3324 3 10 55 0.13107200000000000000e6
-3324 3 22 51 -0.65536000000000000000e5
-3324 3 23 52 0.13107200000000000000e6
-3324 3 26 50 0.65536000000000000000e5
-3324 3 35 48 -0.26214400000000000000e6
-3324 3 40 45 0.13107200000000000000e6
-3324 4 7 35 -0.65536000000000000000e5
-3324 4 21 33 0.65536000000000000000e5
-3324 4 22 34 0.13107200000000000000e6
-3325 3 6 55 -0.65536000000000000000e5
-3325 3 26 51 0.65536000000000000000e5
-3326 3 26 52 0.65536000000000000000e5
-3326 3 40 45 -0.65536000000000000000e5
-3327 3 25 54 -0.65536000000000000000e5
-3327 3 26 53 0.65536000000000000000e5
-3328 1 1 48 0.65536000000000000000e5
-3328 1 2 49 0.65536000000000000000e5
-3328 1 8 39 0.13107200000000000000e6
-3328 1 9 40 0.13107200000000000000e6
-3328 1 10 41 -0.26214400000000000000e6
-3328 1 12 43 -0.52428800000000000000e6
-3328 1 23 38 0.65536000000000000000e5
-3328 1 26 41 -0.13107200000000000000e6
-3328 1 28 43 0.52428800000000000000e6
-3328 1 32 47 0.52428800000000000000e6
-3328 1 33 48 -0.26214400000000000000e6
-3328 1 40 55 0.13107200000000000000e6
-3328 2 2 32 0.65536000000000000000e5
-3328 2 4 34 -0.13107200000000000000e6
-3328 2 16 30 0.13107200000000000000e6
-3328 2 20 34 0.26214400000000000000e6
-3328 2 28 34 0.13107200000000000000e6
-3328 3 5 50 -0.13107200000000000000e6
-3328 3 9 38 0.13107200000000000000e6
-3328 3 10 55 -0.26214400000000000000e6
-3328 3 22 35 0.52428800000000000000e6
-3328 3 22 51 0.13107200000000000000e6
-3328 3 23 52 -0.26214400000000000000e6
-3328 3 24 53 -0.65536000000000000000e5
-3328 3 26 54 0.65536000000000000000e5
-3328 3 27 40 -0.13107200000000000000e6
-3328 3 28 41 0.52428800000000000000e6
-3328 3 35 48 0.52428800000000000000e6
-3328 3 38 51 0.13107200000000000000e6
-3328 3 40 45 -0.26214400000000000000e6
-3328 4 2 30 0.13107200000000000000e6
-3328 4 6 34 0.26214400000000000000e6
-3328 4 7 35 0.13107200000000000000e6
-3328 4 19 35 0.65536000000000000000e5
-3328 4 22 34 -0.26214400000000000000e6
-3328 4 28 32 -0.65536000000000000000e5
-3329 1 1 48 0.65536000000000000000e5
-3329 1 2 49 0.13107200000000000000e6
-3329 1 6 53 -0.65536000000000000000e5
-3329 1 8 39 0.13107200000000000000e6
-3329 1 9 40 0.13107200000000000000e6
-3329 1 10 41 -0.26214400000000000000e6
-3329 1 12 43 -0.52428800000000000000e6
-3329 1 23 38 0.65536000000000000000e5
-3329 1 24 39 0.65536000000000000000e5
-3329 1 24 55 0.13107200000000000000e6
-3329 1 25 56 0.65536000000000000000e5
-3329 1 26 41 -0.26214400000000000000e6
-3329 1 28 43 0.26214400000000000000e6
-3329 1 32 47 0.52428800000000000000e6
-3329 1 47 54 0.65536000000000000000e5
-3329 2 2 32 0.65536000000000000000e5
-3329 2 3 33 0.65536000000000000000e5
-3329 2 5 35 -0.65536000000000000000e5
-3329 2 16 30 0.13107200000000000000e6
-3329 2 20 34 0.26214400000000000000e6
-3329 2 33 35 0.65536000000000000000e5
-3329 3 9 38 0.13107200000000000000e6
-3329 3 22 35 0.52428800000000000000e6
-3329 3 22 51 -0.13107200000000000000e6
-3329 3 23 52 0.26214400000000000000e6
-3329 3 25 38 0.65536000000000000000e5
-3329 3 25 54 -0.65536000000000000000e5
-3329 3 26 56 0.65536000000000000000e5
-3329 3 27 40 0.13107200000000000000e6
-3329 3 28 41 0.52428800000000000000e6
-3329 3 38 51 0.13107200000000000000e6
-3329 3 39 40 -0.65536000000000000000e5
-3329 3 41 54 0.13107200000000000000e6
-3329 3 49 50 -0.13107200000000000000e6
-3329 4 2 30 0.13107200000000000000e6
-3329 4 6 34 0.26214400000000000000e6
-3329 4 7 35 -0.13107200000000000000e6
-3329 4 33 33 0.13107200000000000000e6
-3330 1 9 40 0.16384000000000000000e5
-3330 1 10 41 -0.32768000000000000000e5
-3330 1 26 41 -0.16384000000000000000e5
-3330 1 32 47 0.32768000000000000000e5
-3330 3 8 37 -0.16384000000000000000e5
-3330 3 9 38 0.16384000000000000000e5
-3330 3 22 27 -0.16384000000000000000e5
-3330 3 27 27 0.65536000000000000000e5
-3330 3 28 41 0.32768000000000000000e5
-3330 4 1 29 -0.16384000000000000000e5
-3330 4 2 30 0.16384000000000000000e5
-3331 1 11 42 -0.65536000000000000000e5
-3331 1 33 48 0.65536000000000000000e5
-3331 2 12 26 0.65536000000000000000e5
-3331 2 20 34 -0.65536000000000000000e5
-3331 3 13 42 0.13107200000000000000e6
-3331 3 22 35 -0.13107200000000000000e6
-3331 3 27 28 0.65536000000000000000e5
-3331 3 29 42 0.65536000000000000000e5
-3331 4 3 31 -0.65536000000000000000e5
-3331 4 6 34 -0.65536000000000000000e5
-3332 1 10 41 -0.65536000000000000000e5
-3332 1 32 47 0.65536000000000000000e5
-3332 3 27 29 0.65536000000000000000e5
-3332 3 28 41 0.65536000000000000000e5
-3333 1 10 41 0.65536000000000000000e5
-3333 1 11 42 0.65536000000000000000e5
-3333 1 32 47 -0.65536000000000000000e5
-3333 1 33 48 -0.65536000000000000000e5
-3333 3 13 42 -0.13107200000000000000e6
-3333 3 27 30 0.65536000000000000000e5
-3333 3 28 41 -0.65536000000000000000e5
-3333 3 29 42 -0.65536000000000000000e5
-3333 4 3 31 0.65536000000000000000e5
-3334 3 12 41 -0.65536000000000000000e5
-3334 3 27 31 0.65536000000000000000e5
-3335 3 22 35 -0.65536000000000000000e5
-3335 3 27 32 0.65536000000000000000e5
-3336 3 13 42 -0.65536000000000000000e5
-3336 3 27 33 0.65536000000000000000e5
-3337 1 13 44 -0.65536000000000000000e5
-3337 1 34 41 0.65536000000000000000e5
-3337 3 27 34 0.65536000000000000000e5
-3338 1 14 45 -0.65536000000000000000e5
-3338 1 17 48 0.32768000000000000000e5
-3338 1 18 49 0.32768000000000000000e5
-3338 1 34 49 0.32768000000000000000e5
-3338 2 14 28 0.32768000000000000000e5
-3338 3 14 43 0.32768000000000000000e5
-3338 3 18 47 0.32768000000000000000e5
-3338 3 22 35 -0.32768000000000000000e5
-3338 3 27 35 0.65536000000000000000e5
-3338 4 14 26 -0.32768000000000000000e5
-3339 1 3 18 -0.16384000000000000000e5
-3339 1 4 19 0.32768000000000000000e5
-3339 1 5 36 0.32768000000000000000e5
-3339 1 12 43 0.16384000000000000000e5
-3339 1 13 44 -0.32768000000000000000e5
-3339 1 14 45 -0.32768000000000000000e5
-3339 1 17 32 -0.65536000000000000000e5
-3339 1 19 50 0.65536000000000000000e5
-3339 3 3 16 -0.16384000000000000000e5
-3339 3 4 17 -0.16384000000000000000e5
-3339 3 14 27 0.16384000000000000000e5
-3339 3 16 29 0.32768000000000000000e5
-3339 3 27 36 0.65536000000000000000e5
-3339 4 2 14 -0.16384000000000000000e5
-3339 4 11 23 0.32768000000000000000e5
-3340 1 6 53 0.32768000000000000000e5
-3340 1 25 40 -0.32768000000000000000e5
-3340 2 4 34 0.65536000000000000000e5
-3340 2 16 30 0.65536000000000000000e5
-3340 2 16 34 -0.65536000000000000000e5
-3340 2 21 35 -0.65536000000000000000e5
-3340 3 5 50 0.65536000000000000000e5
-3340 3 7 52 -0.26214400000000000000e6
-3340 3 24 37 0.32768000000000000000e5
-3340 3 27 37 0.65536000000000000000e5
-3340 3 27 40 0.65536000000000000000e5
-3340 3 28 41 0.26214400000000000000e6
-3340 4 4 32 -0.32768000000000000000e5
-3340 4 6 34 0.13107200000000000000e6
-3340 4 7 35 -0.65536000000000000000e5
-3340 4 16 28 0.32768000000000000000e5
-3340 4 17 29 -0.65536000000000000000e5
-3341 1 6 53 0.32768000000000000000e5
-3341 1 25 40 -0.32768000000000000000e5
-3341 3 24 37 0.32768000000000000000e5
-3341 3 27 38 0.65536000000000000000e5
-3341 3 27 40 0.13107200000000000000e6
-3341 3 28 41 -0.13107200000000000000e6
-3341 4 4 32 -0.32768000000000000000e5
-3341 4 16 28 0.32768000000000000000e5
-3341 4 17 29 0.65536000000000000000e5
-3342 1 6 53 -0.32768000000000000000e5
-3342 1 25 40 0.32768000000000000000e5
-3342 3 24 37 -0.32768000000000000000e5
-3342 3 27 39 0.65536000000000000000e5
-3342 3 27 40 -0.65536000000000000000e5
-3342 4 4 32 0.32768000000000000000e5
-3342 4 16 28 -0.32768000000000000000e5
-3343 1 6 53 0.16384000000000000000e5
-3343 1 25 40 -0.16384000000000000000e5
-3343 2 4 34 0.32768000000000000000e5
-3343 2 21 35 -0.32768000000000000000e5
-3343 3 5 50 0.32768000000000000000e5
-3343 3 7 52 -0.13107200000000000000e6
-3343 3 24 37 0.16384000000000000000e5
-3343 3 27 40 0.65536000000000000000e5
-3343 3 27 41 0.65536000000000000000e5
-3343 3 28 41 0.65536000000000000000e5
-3343 4 4 32 -0.16384000000000000000e5
-3343 4 6 34 0.65536000000000000000e5
-3343 4 7 35 -0.32768000000000000000e5
-3343 4 16 28 0.16384000000000000000e5
-3344 3 27 42 0.65536000000000000000e5
-3344 3 28 41 -0.65536000000000000000e5
-3345 1 6 53 -0.16384000000000000000e5
-3345 1 25 40 0.16384000000000000000e5
-3345 2 4 34 -0.32768000000000000000e5
-3345 2 21 35 0.32768000000000000000e5
-3345 3 5 50 -0.32768000000000000000e5
-3345 3 24 37 -0.16384000000000000000e5
-3345 3 27 40 -0.65536000000000000000e5
-3345 3 27 43 0.65536000000000000000e5
-3345 4 4 32 0.16384000000000000000e5
-3345 4 7 35 0.32768000000000000000e5
-3345 4 16 28 -0.16384000000000000000e5
-3346 3 7 52 -0.65536000000000000000e5
-3346 3 27 44 0.65536000000000000000e5
-3347 1 6 53 -0.81920000000000000000e4
-3347 1 25 40 0.81920000000000000000e4
-3347 2 4 34 -0.16384000000000000000e5
-3347 2 21 35 0.16384000000000000000e5
-3347 3 5 50 -0.16384000000000000000e5
-3347 3 24 37 -0.81920000000000000000e4
-3347 3 27 40 -0.32768000000000000000e5
-3347 3 27 45 0.65536000000000000000e5
-3347 3 28 41 -0.32768000000000000000e5
-3347 3 29 42 -0.32768000000000000000e5
-3347 4 4 32 0.81920000000000000000e4
-3347 4 7 35 0.16384000000000000000e5
-3347 4 16 28 -0.81920000000000000000e4
-3347 4 23 27 -0.32768000000000000000e5
-3348 3 27 46 0.65536000000000000000e5
-3348 3 31 44 -0.65536000000000000000e5
-3349 1 24 55 -0.65536000000000000000e5
-3349 1 26 41 0.65536000000000000000e5
-3349 1 32 47 -0.13107200000000000000e6
-3349 1 37 52 0.13107200000000000000e6
-3349 3 22 51 0.65536000000000000000e5
-3349 3 27 40 -0.65536000000000000000e5
-3349 3 27 47 0.65536000000000000000e5
-3349 4 20 32 0.65536000000000000000e5
-3350 3 22 51 -0.65536000000000000000e5
-3350 3 27 48 0.65536000000000000000e5
-3351 1 24 55 0.65536000000000000000e5
-3351 1 26 41 -0.65536000000000000000e5
-3351 3 27 40 0.65536000000000000000e5
-3351 3 27 49 0.65536000000000000000e5
-3352 1 32 47 -0.65536000000000000000e5
-3352 1 37 52 0.65536000000000000000e5
-3352 3 27 50 0.65536000000000000000e5
-3353 3 23 52 -0.65536000000000000000e5
-3353 3 27 51 0.65536000000000000000e5
-3354 3 27 52 0.65536000000000000000e5
-3354 3 34 47 -0.65536000000000000000e5
-3355 3 27 53 0.65536000000000000000e5
-3355 3 37 50 -0.65536000000000000000e5
-3356 1 24 55 -0.65536000000000000000e5
-3356 1 41 56 0.65536000000000000000e5
-3356 3 27 54 0.65536000000000000000e5
-3356 3 27 56 0.65536000000000000000e5
-3357 1 1 48 -0.16384000000000000000e5
-3357 1 2 49 -0.16384000000000000000e5
-3357 1 8 39 -0.32768000000000000000e5
-3357 1 9 40 -0.32768000000000000000e5
-3357 1 10 41 0.65536000000000000000e5
-3357 1 12 43 0.13107200000000000000e6
-3357 1 23 38 -0.16384000000000000000e5
-3357 1 24 55 0.32768000000000000000e5
-3357 1 26 41 0.32768000000000000000e5
-3357 1 28 43 -0.13107200000000000000e6
-3357 1 32 47 -0.13107200000000000000e6
-3357 1 33 48 0.65536000000000000000e5
-3357 1 40 55 -0.32768000000000000000e5
-3357 1 41 56 -0.32768000000000000000e5
-3357 1 44 51 -0.13107200000000000000e6
-3357 1 46 53 0.13107200000000000000e6
-3357 2 2 32 -0.16384000000000000000e5
-3357 2 4 34 0.32768000000000000000e5
-3357 2 16 30 -0.32768000000000000000e5
-3357 2 20 34 -0.65536000000000000000e5
-3357 2 28 34 -0.32768000000000000000e5
-3357 3 5 50 0.32768000000000000000e5
-3357 3 9 38 -0.32768000000000000000e5
-3357 3 10 55 0.65536000000000000000e5
-3357 3 22 35 -0.13107200000000000000e6
-3357 3 22 51 -0.32768000000000000000e5
-3357 3 23 52 0.65536000000000000000e5
-3357 3 27 40 0.32768000000000000000e5
-3357 3 27 55 0.65536000000000000000e5
-3357 3 27 56 -0.32768000000000000000e5
-3357 3 28 41 -0.13107200000000000000e6
-3357 3 35 48 -0.13107200000000000000e6
-3357 3 38 51 0.32768000000000000000e5
-3357 3 39 52 0.65536000000000000000e5
-3357 3 40 45 0.65536000000000000000e5
-3357 4 2 30 -0.32768000000000000000e5
-3357 4 6 34 -0.65536000000000000000e5
-3357 4 7 35 -0.32768000000000000000e5
-3357 4 22 34 0.65536000000000000000e5
-3357 4 23 35 0.65536000000000000000e5
-3357 4 29 33 0.32768000000000000000e5
-3358 1 10 41 -0.32768000000000000000e5
-3358 1 32 47 0.32768000000000000000e5
-3358 3 28 28 0.65536000000000000000e5
-3358 3 28 41 0.32768000000000000000e5
-3359 1 10 41 0.65536000000000000000e5
-3359 1 11 42 0.65536000000000000000e5
-3359 1 32 47 -0.65536000000000000000e5
-3359 1 33 48 -0.65536000000000000000e5
-3359 3 13 42 -0.13107200000000000000e6
-3359 3 28 29 0.65536000000000000000e5
-3359 3 28 41 -0.65536000000000000000e5
-3359 3 29 42 -0.65536000000000000000e5
-3359 4 3 31 0.65536000000000000000e5
-3360 1 11 42 -0.65536000000000000000e5
-3360 1 33 48 0.65536000000000000000e5
-3360 3 28 30 0.65536000000000000000e5
-3360 3 29 42 0.65536000000000000000e5
-3361 3 22 35 -0.65536000000000000000e5
-3361 3 28 31 0.65536000000000000000e5
-3362 3 13 42 -0.65536000000000000000e5
-3362 3 28 32 0.65536000000000000000e5
-3363 1 14 45 -0.13107200000000000000e6
-3363 1 17 48 0.65536000000000000000e5
-3363 1 18 49 0.65536000000000000000e5
-3363 1 34 49 0.65536000000000000000e5
-3363 2 14 28 0.65536000000000000000e5
-3363 3 13 42 0.65536000000000000000e5
-3363 3 14 43 0.65536000000000000000e5
-3363 3 18 47 0.65536000000000000000e5
-3363 3 28 33 0.65536000000000000000e5
-3364 1 14 45 -0.65536000000000000000e5
-3364 1 17 48 0.32768000000000000000e5
-3364 1 18 49 0.32768000000000000000e5
-3364 1 34 49 0.32768000000000000000e5
-3364 2 14 28 0.32768000000000000000e5
-3364 3 14 43 0.32768000000000000000e5
-3364 3 18 47 0.32768000000000000000e5
-3364 3 22 35 -0.32768000000000000000e5
-3364 3 28 34 0.65536000000000000000e5
-3364 4 14 26 -0.32768000000000000000e5
-3365 1 14 45 0.65536000000000000000e5
-3365 1 17 48 -0.32768000000000000000e5
-3365 1 18 49 -0.32768000000000000000e5
-3365 1 34 49 -0.32768000000000000000e5
-3365 2 14 28 -0.32768000000000000000e5
-3365 3 14 43 -0.32768000000000000000e5
-3365 3 15 44 0.65536000000000000000e5
-3365 3 16 45 -0.13107200000000000000e6
-3365 3 18 47 -0.32768000000000000000e5
-3365 3 22 35 0.32768000000000000000e5
-3365 3 28 35 0.65536000000000000000e5
-3365 4 14 26 0.32768000000000000000e5
-3365 4 15 27 0.65536000000000000000e5
-3366 3 16 45 -0.65536000000000000000e5
-3366 3 28 36 0.65536000000000000000e5
-3367 1 6 53 0.32768000000000000000e5
-3367 1 25 40 -0.32768000000000000000e5
-3367 3 24 37 0.32768000000000000000e5
-3367 3 27 40 0.13107200000000000000e6
-3367 3 28 37 0.65536000000000000000e5
-3367 3 28 41 -0.13107200000000000000e6
-3367 4 4 32 -0.32768000000000000000e5
-3367 4 16 28 0.32768000000000000000e5
-3367 4 17 29 0.65536000000000000000e5
-3368 1 6 53 -0.32768000000000000000e5
-3368 1 25 40 0.32768000000000000000e5
-3368 3 24 37 -0.32768000000000000000e5
-3368 3 27 40 -0.65536000000000000000e5
-3368 3 28 38 0.65536000000000000000e5
-3368 4 4 32 0.32768000000000000000e5
-3368 4 16 28 -0.32768000000000000000e5
-3369 3 27 40 -0.65536000000000000000e5
-3369 3 28 39 0.65536000000000000000e5
-3370 3 5 50 -0.65536000000000000000e5
-3370 3 28 40 0.65536000000000000000e5
-3371 1 6 53 -0.16384000000000000000e5
-3371 1 25 40 0.16384000000000000000e5
-3371 2 4 34 -0.32768000000000000000e5
-3371 2 21 35 0.32768000000000000000e5
-3371 3 5 50 -0.32768000000000000000e5
-3371 3 24 37 -0.16384000000000000000e5
-3371 3 27 40 -0.65536000000000000000e5
-3371 3 28 42 0.65536000000000000000e5
-3371 4 4 32 0.16384000000000000000e5
-3371 4 7 35 0.32768000000000000000e5
-3371 4 16 28 -0.16384000000000000000e5
-3372 3 28 43 0.65536000000000000000e5
-3372 3 29 42 -0.65536000000000000000e5
-3373 1 6 53 -0.81920000000000000000e4
-3373 1 25 40 0.81920000000000000000e4
-3373 2 4 34 -0.16384000000000000000e5
-3373 2 21 35 0.16384000000000000000e5
-3373 3 5 50 -0.16384000000000000000e5
-3373 3 24 37 -0.81920000000000000000e4
-3373 3 27 40 -0.32768000000000000000e5
-3373 3 28 41 -0.32768000000000000000e5
-3373 3 28 44 0.65536000000000000000e5
-3373 3 29 42 -0.32768000000000000000e5
-3373 4 4 32 0.81920000000000000000e4
-3373 4 7 35 0.16384000000000000000e5
-3373 4 16 28 -0.81920000000000000000e4
-3373 4 23 27 -0.32768000000000000000e5
-3374 3 18 47 -0.65536000000000000000e5
-3374 3 28 45 0.65536000000000000000e5
-3375 3 19 48 -0.65536000000000000000e5
-3375 3 28 46 0.65536000000000000000e5
-3376 3 22 51 -0.65536000000000000000e5
-3376 3 28 47 0.65536000000000000000e5
-3377 1 24 55 0.65536000000000000000e5
-3377 1 26 41 -0.65536000000000000000e5
-3377 3 27 40 0.65536000000000000000e5
-3377 3 28 48 0.65536000000000000000e5
-3378 1 24 55 -0.65536000000000000000e5
-3378 1 26 41 0.65536000000000000000e5
-3378 3 22 51 0.65536000000000000000e5
-3378 3 23 52 -0.13107200000000000000e6
-3378 3 27 40 -0.65536000000000000000e5
-3378 3 28 49 0.65536000000000000000e5
-3378 4 7 35 0.65536000000000000000e5
-3379 3 23 52 -0.65536000000000000000e5
-3379 3 28 50 0.65536000000000000000e5
-3380 3 10 55 0.65536000000000000000e5
-3380 3 28 51 0.65536000000000000000e5
-3380 3 35 48 -0.13107200000000000000e6
-3380 3 40 45 0.65536000000000000000e5
-3380 4 22 34 0.65536000000000000000e5
-3381 1 34 49 -0.65536000000000000000e5
-3381 1 44 51 0.65536000000000000000e5
-3381 3 28 52 0.65536000000000000000e5
-3382 1 24 55 -0.65536000000000000000e5
-3382 1 41 56 0.65536000000000000000e5
-3382 3 27 56 0.65536000000000000000e5
-3382 3 28 53 0.65536000000000000000e5
-3383 3 28 54 0.65536000000000000000e5
-3383 3 38 51 -0.65536000000000000000e5
-3384 1 1 48 0.16384000000000000000e5
-3384 1 2 49 0.16384000000000000000e5
-3384 1 8 39 0.32768000000000000000e5
-3384 1 9 40 0.32768000000000000000e5
-3384 1 10 41 -0.65536000000000000000e5
-3384 1 12 43 -0.13107200000000000000e6
-3384 1 23 38 0.16384000000000000000e5
-3384 1 24 55 -0.32768000000000000000e5
-3384 1 26 41 -0.32768000000000000000e5
-3384 1 28 43 0.13107200000000000000e6
-3384 1 32 47 0.13107200000000000000e6
-3384 1 33 48 -0.65536000000000000000e5
-3384 1 40 55 0.32768000000000000000e5
-3384 1 41 56 0.32768000000000000000e5
-3384 2 2 32 0.16384000000000000000e5
-3384 2 4 34 -0.32768000000000000000e5
-3384 2 16 30 0.32768000000000000000e5
-3384 2 20 34 0.65536000000000000000e5
-3384 2 28 34 0.32768000000000000000e5
-3384 3 5 50 -0.32768000000000000000e5
-3384 3 9 38 0.32768000000000000000e5
-3384 3 10 55 -0.65536000000000000000e5
-3384 3 22 35 0.13107200000000000000e6
-3384 3 22 51 0.32768000000000000000e5
-3384 3 23 52 -0.65536000000000000000e5
-3384 3 27 40 -0.32768000000000000000e5
-3384 3 27 56 0.32768000000000000000e5
-3384 3 28 41 0.13107200000000000000e6
-3384 3 28 55 0.65536000000000000000e5
-3384 3 35 48 0.13107200000000000000e6
-3384 3 38 51 -0.32768000000000000000e5
-3384 3 40 45 -0.65536000000000000000e5
-3384 4 2 30 0.32768000000000000000e5
-3384 4 6 34 0.65536000000000000000e5
-3384 4 7 35 0.32768000000000000000e5
-3384 4 22 34 -0.65536000000000000000e5
-3384 4 29 33 -0.32768000000000000000e5
-3385 3 28 56 0.65536000000000000000e5
-3385 3 41 54 -0.65536000000000000000e5
-3386 1 11 42 -0.32768000000000000000e5
-3386 1 33 48 0.32768000000000000000e5
-3386 3 29 29 0.65536000000000000000e5
-3386 3 29 42 0.32768000000000000000e5
-3387 1 26 33 -0.65536000000000000000e5
-3387 1 33 40 0.65536000000000000000e5
-3387 3 29 30 0.65536000000000000000e5
-3388 3 13 42 -0.65536000000000000000e5
-3388 3 29 31 0.65536000000000000000e5
-3389 1 14 45 -0.13107200000000000000e6
-3389 1 17 48 0.65536000000000000000e5
-3389 1 18 49 0.65536000000000000000e5
-3389 1 34 49 0.65536000000000000000e5
-3389 2 14 28 0.65536000000000000000e5
-3389 3 13 42 0.65536000000000000000e5
-3389 3 14 43 0.65536000000000000000e5
-3389 3 18 47 0.65536000000000000000e5
-3389 3 29 32 0.65536000000000000000e5
-3390 3 14 43 -0.65536000000000000000e5
-3390 3 29 33 0.65536000000000000000e5
-3391 1 14 45 0.65536000000000000000e5
-3391 1 17 48 -0.32768000000000000000e5
-3391 1 18 49 -0.32768000000000000000e5
-3391 1 34 49 -0.32768000000000000000e5
-3391 2 14 28 -0.32768000000000000000e5
-3391 3 14 43 -0.32768000000000000000e5
-3391 3 15 44 0.65536000000000000000e5
-3391 3 16 45 -0.13107200000000000000e6
-3391 3 18 47 -0.32768000000000000000e5
-3391 3 22 35 0.32768000000000000000e5
-3391 3 29 34 0.65536000000000000000e5
-3391 4 14 26 0.32768000000000000000e5
-3391 4 15 27 0.65536000000000000000e5
-3392 3 15 44 -0.65536000000000000000e5
-3392 3 29 35 0.65536000000000000000e5
-3393 1 15 46 -0.65536000000000000000e5
-3393 1 20 51 0.65536000000000000000e5
-3393 3 29 36 0.65536000000000000000e5
-3394 1 6 53 -0.32768000000000000000e5
-3394 1 25 40 0.32768000000000000000e5
-3394 3 24 37 -0.32768000000000000000e5
-3394 3 27 40 -0.65536000000000000000e5
-3394 3 29 37 0.65536000000000000000e5
-3394 4 4 32 0.32768000000000000000e5
-3394 4 16 28 -0.32768000000000000000e5
-3395 3 27 40 -0.65536000000000000000e5
-3395 3 29 38 0.65536000000000000000e5
-3396 3 5 50 -0.65536000000000000000e5
-3396 3 29 39 0.65536000000000000000e5
-3397 3 5 50 0.65536000000000000000e5
-3397 3 27 40 0.65536000000000000000e5
-3397 3 29 40 0.65536000000000000000e5
-3397 3 29 42 -0.13107200000000000000e6
-3397 4 18 30 0.65536000000000000000e5
-3398 1 6 53 -0.16384000000000000000e5
-3398 1 25 40 0.16384000000000000000e5
-3398 2 4 34 -0.32768000000000000000e5
-3398 2 21 35 0.32768000000000000000e5
-3398 3 5 50 -0.32768000000000000000e5
-3398 3 24 37 -0.16384000000000000000e5
-3398 3 27 40 -0.65536000000000000000e5
-3398 3 29 41 0.65536000000000000000e5
-3398 4 4 32 0.16384000000000000000e5
-3398 4 7 35 0.32768000000000000000e5
-3398 4 16 28 -0.16384000000000000000e5
-3399 3 14 51 -0.13107200000000000000e6
-3399 3 29 42 0.65536000000000000000e5
-3399 3 29 43 0.65536000000000000000e5
-3399 3 30 43 0.65536000000000000000e5
-3399 4 19 31 0.65536000000000000000e5
-3400 3 18 47 -0.65536000000000000000e5
-3400 3 29 44 0.65536000000000000000e5
-3401 3 14 51 -0.65536000000000000000e5
-3401 3 29 45 0.65536000000000000000e5
-3402 3 29 46 0.65536000000000000000e5
-3402 3 32 45 -0.65536000000000000000e5
-3403 1 24 55 0.65536000000000000000e5
-3403 1 26 41 -0.65536000000000000000e5
-3403 3 27 40 0.65536000000000000000e5
-3403 3 29 47 0.65536000000000000000e5
-3404 1 24 55 -0.65536000000000000000e5
-3404 1 26 41 0.65536000000000000000e5
-3404 3 22 51 0.65536000000000000000e5
-3404 3 23 52 -0.13107200000000000000e6
-3404 3 27 40 -0.65536000000000000000e5
-3404 3 29 48 0.65536000000000000000e5
-3404 4 7 35 0.65536000000000000000e5
-3405 3 10 55 0.13107200000000000000e6
-3405 3 22 51 -0.65536000000000000000e5
-3405 3 23 52 0.13107200000000000000e6
-3405 3 29 49 0.65536000000000000000e5
-3405 3 35 48 -0.26214400000000000000e6
-3405 3 40 45 0.13107200000000000000e6
-3405 4 7 35 -0.65536000000000000000e5
-3405 4 21 33 0.65536000000000000000e5
-3405 4 22 34 0.13107200000000000000e6
-3406 3 10 55 0.65536000000000000000e5
-3406 3 29 50 0.65536000000000000000e5
-3406 3 35 48 -0.13107200000000000000e6
-3406 3 40 45 0.65536000000000000000e5
-3406 4 22 34 0.65536000000000000000e5
-3407 3 10 55 -0.65536000000000000000e5
-3407 3 29 51 0.65536000000000000000e5
-3408 3 29 52 0.65536000000000000000e5
-3408 3 35 48 -0.65536000000000000000e5
-3409 3 29 53 0.65536000000000000000e5
-3409 3 38 51 -0.65536000000000000000e5
-3410 1 1 48 0.32768000000000000000e5
-3410 1 2 49 0.32768000000000000000e5
-3410 1 8 39 0.65536000000000000000e5
-3410 1 9 40 0.65536000000000000000e5
-3410 1 10 41 -0.13107200000000000000e6
-3410 1 12 43 -0.26214400000000000000e6
-3410 1 23 38 0.32768000000000000000e5
-3410 1 26 41 -0.65536000000000000000e5
-3410 1 28 43 0.26214400000000000000e6
-3410 1 32 47 0.26214400000000000000e6
-3410 1 33 48 -0.13107200000000000000e6
-3410 1 40 55 0.65536000000000000000e5
-3410 2 2 32 0.32768000000000000000e5
-3410 2 4 34 -0.65536000000000000000e5
-3410 2 16 30 0.65536000000000000000e5
-3410 2 20 34 0.13107200000000000000e6
-3410 2 28 34 0.65536000000000000000e5
-3410 3 5 50 -0.65536000000000000000e5
-3410 3 9 38 0.65536000000000000000e5
-3410 3 10 55 -0.13107200000000000000e6
-3410 3 22 35 0.26214400000000000000e6
-3410 3 22 51 0.65536000000000000000e5
-3410 3 23 52 -0.13107200000000000000e6
-3410 3 27 40 -0.65536000000000000000e5
-3410 3 28 41 0.26214400000000000000e6
-3410 3 29 54 0.65536000000000000000e5
-3410 3 35 48 0.26214400000000000000e6
-3410 3 40 45 -0.13107200000000000000e6
-3410 4 2 30 0.65536000000000000000e5
-3410 4 6 34 0.13107200000000000000e6
-3410 4 7 35 0.65536000000000000000e5
-3410 4 22 34 -0.13107200000000000000e6
-3411 3 29 55 0.65536000000000000000e5
-3411 3 39 52 -0.65536000000000000000e5
-3412 3 29 56 0.65536000000000000000e5
-3412 3 49 50 -0.65536000000000000000e5
-3413 1 11 42 0.32768000000000000000e5
-3413 1 26 33 0.32768000000000000000e5
-3413 1 33 40 -0.32768000000000000000e5
-3413 1 33 48 -0.32768000000000000000e5
-3413 3 14 43 -0.65536000000000000000e5
-3413 3 29 42 -0.32768000000000000000e5
-3413 3 30 30 0.65536000000000000000e5
-3413 4 22 22 0.65536000000000000000e5
-3414 1 14 45 -0.13107200000000000000e6
-3414 1 17 48 0.65536000000000000000e5
-3414 1 18 49 0.65536000000000000000e5
-3414 1 34 49 0.65536000000000000000e5
-3414 2 14 28 0.65536000000000000000e5
-3414 3 13 42 0.65536000000000000000e5
-3414 3 14 43 0.65536000000000000000e5
-3414 3 18 47 0.65536000000000000000e5
-3414 3 30 31 0.65536000000000000000e5
-3415 3 14 43 -0.65536000000000000000e5
-3415 3 30 32 0.65536000000000000000e5
-3416 3 26 35 -0.65536000000000000000e5
-3416 3 30 33 0.65536000000000000000e5
-3417 3 15 44 -0.65536000000000000000e5
-3417 3 30 34 0.65536000000000000000e5
-3418 3 15 46 -0.65536000000000000000e5
-3418 3 30 36 0.65536000000000000000e5
-3419 3 27 40 -0.65536000000000000000e5
-3419 3 30 37 0.65536000000000000000e5
-3420 3 5 50 -0.65536000000000000000e5
-3420 3 30 38 0.65536000000000000000e5
-3421 3 5 50 0.65536000000000000000e5
-3421 3 27 40 0.65536000000000000000e5
-3421 3 29 42 -0.13107200000000000000e6
-3421 3 30 39 0.65536000000000000000e5
-3421 4 18 30 0.65536000000000000000e5
-3422 3 6 51 -0.65536000000000000000e5
-3422 3 30 40 0.65536000000000000000e5
-3423 3 29 42 -0.65536000000000000000e5
-3423 3 30 41 0.65536000000000000000e5
-3424 3 14 51 -0.13107200000000000000e6
-3424 3 29 42 0.65536000000000000000e5
-3424 3 30 42 0.65536000000000000000e5
-3424 3 30 43 0.65536000000000000000e5
-3424 4 19 31 0.65536000000000000000e5
-3425 3 14 51 -0.65536000000000000000e5
-3425 3 30 44 0.65536000000000000000e5
-3426 3 30 45 0.65536000000000000000e5
-3426 3 35 40 -0.65536000000000000000e5
-3427 3 20 49 -0.65536000000000000000e5
-3427 3 30 46 0.65536000000000000000e5
-3428 1 24 55 -0.65536000000000000000e5
-3428 1 26 41 0.65536000000000000000e5
-3428 3 22 51 0.65536000000000000000e5
-3428 3 23 52 -0.13107200000000000000e6
-3428 3 27 40 -0.65536000000000000000e5
-3428 3 30 47 0.65536000000000000000e5
-3428 4 7 35 0.65536000000000000000e5
-3429 3 10 55 0.13107200000000000000e6
-3429 3 22 51 -0.65536000000000000000e5
-3429 3 23 52 0.13107200000000000000e6
-3429 3 30 48 0.65536000000000000000e5
-3429 3 35 48 -0.26214400000000000000e6
-3429 3 40 45 0.13107200000000000000e6
-3429 4 7 35 -0.65536000000000000000e5
-3429 4 21 33 0.65536000000000000000e5
-3429 4 22 34 0.13107200000000000000e6
-3430 3 6 55 -0.65536000000000000000e5
-3430 3 30 49 0.65536000000000000000e5
-3431 3 10 55 -0.65536000000000000000e5
-3431 3 30 50 0.65536000000000000000e5
-3432 3 30 51 0.65536000000000000000e5
-3432 3 40 45 -0.65536000000000000000e5
-3433 1 11 18 -0.13107200000000000000e6
-3433 1 34 49 0.65536000000000000000e5
-3433 1 44 51 -0.65536000000000000000e5
-3433 1 45 52 0.13107200000000000000e6
-3433 3 6 19 0.13107200000000000000e6
-3433 3 15 44 0.13107200000000000000e6
-3433 3 17 30 0.13107200000000000000e6
-3433 3 30 52 0.65536000000000000000e5
-3433 3 32 45 0.13107200000000000000e6
-3433 3 35 48 0.65536000000000000000e5
-3433 4 25 33 0.65536000000000000000e5
-3434 1 1 48 0.32768000000000000000e5
-3434 1 2 49 0.32768000000000000000e5
-3434 1 8 39 0.65536000000000000000e5
-3434 1 9 40 0.65536000000000000000e5
-3434 1 10 41 -0.13107200000000000000e6
-3434 1 12 43 -0.26214400000000000000e6
-3434 1 23 38 0.32768000000000000000e5
-3434 1 26 41 -0.65536000000000000000e5
-3434 1 28 43 0.26214400000000000000e6
-3434 1 32 47 0.26214400000000000000e6
-3434 1 33 48 -0.13107200000000000000e6
-3434 1 40 55 0.65536000000000000000e5
-3434 2 2 32 0.32768000000000000000e5
-3434 2 4 34 -0.65536000000000000000e5
-3434 2 16 30 0.65536000000000000000e5
-3434 2 20 34 0.13107200000000000000e6
-3434 2 28 34 0.65536000000000000000e5
-3434 3 5 50 -0.65536000000000000000e5
-3434 3 9 38 0.65536000000000000000e5
-3434 3 10 55 -0.13107200000000000000e6
-3434 3 22 35 0.26214400000000000000e6
-3434 3 22 51 0.65536000000000000000e5
-3434 3 23 52 -0.13107200000000000000e6
-3434 3 27 40 -0.65536000000000000000e5
-3434 3 28 41 0.26214400000000000000e6
-3434 3 30 53 0.65536000000000000000e5
-3434 3 35 48 0.26214400000000000000e6
-3434 3 40 45 -0.13107200000000000000e6
-3434 4 2 30 0.65536000000000000000e5
-3434 4 6 34 0.13107200000000000000e6
-3434 4 7 35 0.65536000000000000000e5
-3434 4 22 34 -0.13107200000000000000e6
-3435 3 26 55 -0.65536000000000000000e5
-3435 3 30 54 0.65536000000000000000e5
-3436 1 1 48 -0.16384000000000000000e5
-3436 1 2 49 -0.16384000000000000000e5
-3436 1 8 39 -0.32768000000000000000e5
-3436 1 9 40 -0.32768000000000000000e5
-3436 1 10 41 0.65536000000000000000e5
-3436 1 12 43 0.13107200000000000000e6
-3436 1 23 38 -0.16384000000000000000e5
-3436 1 24 55 0.32768000000000000000e5
-3436 1 26 41 0.32768000000000000000e5
-3436 1 28 43 -0.13107200000000000000e6
-3436 1 32 47 -0.13107200000000000000e6
-3436 1 33 48 0.65536000000000000000e5
-3436 1 40 55 -0.32768000000000000000e5
-3436 1 41 56 -0.32768000000000000000e5
-3436 2 2 32 -0.16384000000000000000e5
-3436 2 4 34 0.32768000000000000000e5
-3436 2 16 30 -0.32768000000000000000e5
-3436 2 20 34 -0.65536000000000000000e5
-3436 2 28 34 -0.32768000000000000000e5
-3436 3 5 50 0.32768000000000000000e5
-3436 3 9 38 -0.32768000000000000000e5
-3436 3 10 55 0.65536000000000000000e5
-3436 3 22 35 -0.13107200000000000000e6
-3436 3 22 51 -0.32768000000000000000e5
-3436 3 23 52 0.65536000000000000000e5
-3436 3 27 40 0.32768000000000000000e5
-3436 3 27 56 -0.32768000000000000000e5
-3436 3 28 41 -0.13107200000000000000e6
-3436 3 30 55 0.65536000000000000000e5
-3436 3 35 48 -0.13107200000000000000e6
-3436 3 38 51 0.32768000000000000000e5
-3436 3 39 52 0.65536000000000000000e5
-3436 3 40 45 0.65536000000000000000e5
-3436 3 45 50 -0.13107200000000000000e6
-3436 4 2 30 -0.32768000000000000000e5
-3436 4 6 34 -0.65536000000000000000e5
-3436 4 7 35 -0.32768000000000000000e5
-3436 4 22 34 0.65536000000000000000e5
-3436 4 29 33 0.32768000000000000000e5
-3436 4 30 34 0.65536000000000000000e5
-3437 3 30 56 0.65536000000000000000e5
-3437 3 40 55 -0.65536000000000000000e5
-3438 1 13 44 -0.32768000000000000000e5
-3438 1 34 41 0.32768000000000000000e5
-3438 3 31 31 0.65536000000000000000e5
-3439 1 14 45 -0.65536000000000000000e5
-3439 1 17 48 0.32768000000000000000e5
-3439 1 18 49 0.32768000000000000000e5
-3439 1 34 49 0.32768000000000000000e5
-3439 2 14 28 0.32768000000000000000e5
-3439 3 14 43 0.32768000000000000000e5
-3439 3 18 47 0.32768000000000000000e5
-3439 3 22 35 -0.32768000000000000000e5
-3439 3 31 32 0.65536000000000000000e5
-3439 4 14 26 -0.32768000000000000000e5
-3440 1 14 45 0.65536000000000000000e5
-3440 1 17 48 -0.32768000000000000000e5
-3440 1 18 49 -0.32768000000000000000e5
-3440 1 34 49 -0.32768000000000000000e5
-3440 2 14 28 -0.32768000000000000000e5
-3440 3 14 43 -0.32768000000000000000e5
-3440 3 15 44 0.65536000000000000000e5
-3440 3 16 45 -0.13107200000000000000e6
-3440 3 18 47 -0.32768000000000000000e5
-3440 3 22 35 0.32768000000000000000e5
-3440 3 31 33 0.65536000000000000000e5
-3440 4 14 26 0.32768000000000000000e5
-3440 4 15 27 0.65536000000000000000e5
-3441 1 3 18 -0.16384000000000000000e5
-3441 1 4 19 0.32768000000000000000e5
-3441 1 5 36 0.32768000000000000000e5
-3441 1 12 43 0.16384000000000000000e5
-3441 1 13 44 -0.32768000000000000000e5
-3441 1 14 45 -0.32768000000000000000e5
-3441 1 17 32 -0.65536000000000000000e5
-3441 1 19 50 0.65536000000000000000e5
-3441 3 3 16 -0.16384000000000000000e5
-3441 3 4 17 -0.16384000000000000000e5
-3441 3 14 27 0.16384000000000000000e5
-3441 3 16 29 0.32768000000000000000e5
-3441 3 31 34 0.65536000000000000000e5
-3441 4 2 14 -0.16384000000000000000e5
-3441 4 11 23 0.32768000000000000000e5
-3442 3 16 45 -0.65536000000000000000e5
-3442 3 31 35 0.65536000000000000000e5
-3443 1 6 21 -0.32768000000000000000e5
-3443 1 17 32 -0.32768000000000000000e5
-3443 1 19 50 0.32768000000000000000e5
-3443 1 20 51 0.32768000000000000000e5
-3443 2 9 15 -0.32768000000000000000e5
-3443 2 25 31 0.32768000000000000000e5
-3443 3 7 20 0.32768000000000000000e5
-3443 3 8 21 -0.65536000000000000000e5
-3443 3 14 19 0.65536000000000000000e5
-3443 3 16 45 -0.32768000000000000000e5
-3443 3 18 31 -0.32768000000000000000e5
-3443 3 19 32 0.65536000000000000000e5
-3443 3 31 36 0.65536000000000000000e5
-3443 4 10 14 0.32768000000000000000e5
-3444 1 6 53 0.16384000000000000000e5
-3444 1 25 40 -0.16384000000000000000e5
-3444 2 4 34 0.32768000000000000000e5
-3444 2 21 35 -0.32768000000000000000e5
-3444 3 5 50 0.32768000000000000000e5
-3444 3 7 52 -0.13107200000000000000e6
-3444 3 24 37 0.16384000000000000000e5
-3444 3 27 40 0.65536000000000000000e5
-3444 3 28 41 0.65536000000000000000e5
-3444 3 31 37 0.65536000000000000000e5
-3444 4 4 32 -0.16384000000000000000e5
-3444 4 6 34 0.65536000000000000000e5
-3444 4 7 35 -0.32768000000000000000e5
-3444 4 16 28 0.16384000000000000000e5
-3445 3 28 41 -0.65536000000000000000e5
-3445 3 31 38 0.65536000000000000000e5
-3446 1 6 53 -0.16384000000000000000e5
-3446 1 25 40 0.16384000000000000000e5
-3446 2 4 34 -0.32768000000000000000e5
-3446 2 21 35 0.32768000000000000000e5
-3446 3 5 50 -0.32768000000000000000e5
-3446 3 24 37 -0.16384000000000000000e5
-3446 3 27 40 -0.65536000000000000000e5
-3446 3 31 39 0.65536000000000000000e5
-3446 4 4 32 0.16384000000000000000e5
-3446 4 7 35 0.32768000000000000000e5
-3446 4 16 28 -0.16384000000000000000e5
-3447 3 29 42 -0.65536000000000000000e5
-3447 3 31 40 0.65536000000000000000e5
-3448 3 7 52 -0.65536000000000000000e5
-3448 3 31 41 0.65536000000000000000e5
-3449 1 6 53 -0.81920000000000000000e4
-3449 1 25 40 0.81920000000000000000e4
-3449 2 4 34 -0.16384000000000000000e5
-3449 2 21 35 0.16384000000000000000e5
-3449 3 5 50 -0.16384000000000000000e5
-3449 3 24 37 -0.81920000000000000000e4
-3449 3 27 40 -0.32768000000000000000e5
-3449 3 28 41 -0.32768000000000000000e5
-3449 3 29 42 -0.32768000000000000000e5
-3449 3 31 42 0.65536000000000000000e5
-3449 4 4 32 0.81920000000000000000e4
-3449 4 7 35 0.16384000000000000000e5
-3449 4 16 28 -0.81920000000000000000e4
-3449 4 23 27 -0.32768000000000000000e5
-3450 3 18 47 -0.65536000000000000000e5
-3450 3 31 43 0.65536000000000000000e5
-3451 3 19 48 -0.65536000000000000000e5
-3451 3 31 45 0.65536000000000000000e5
-3452 3 31 46 0.65536000000000000000e5
-3452 3 36 41 -0.65536000000000000000e5
-3453 1 32 47 -0.65536000000000000000e5
-3453 1 37 52 0.65536000000000000000e5
-3453 3 31 47 0.65536000000000000000e5
-3454 3 23 52 -0.65536000000000000000e5
-3454 3 31 48 0.65536000000000000000e5
-3455 3 10 55 0.65536000000000000000e5
-3455 3 31 49 0.65536000000000000000e5
-3455 3 35 48 -0.13107200000000000000e6
-3455 3 40 45 0.65536000000000000000e5
-3455 4 22 34 0.65536000000000000000e5
-3456 3 31 50 0.65536000000000000000e5
-3456 3 34 47 -0.65536000000000000000e5
-3457 1 34 49 -0.65536000000000000000e5
-3457 1 44 51 0.65536000000000000000e5
-3457 3 31 51 0.65536000000000000000e5
-3458 3 31 52 0.65536000000000000000e5
-3458 3 41 46 -0.65536000000000000000e5
-3459 1 1 48 -0.16384000000000000000e5
-3459 1 2 49 -0.16384000000000000000e5
-3459 1 8 39 -0.32768000000000000000e5
-3459 1 9 40 -0.32768000000000000000e5
-3459 1 10 41 0.65536000000000000000e5
-3459 1 12 43 0.13107200000000000000e6
-3459 1 23 38 -0.16384000000000000000e5
-3459 1 24 55 0.32768000000000000000e5
-3459 1 26 41 0.32768000000000000000e5
-3459 1 28 43 -0.13107200000000000000e6
-3459 1 32 47 -0.13107200000000000000e6
-3459 1 33 48 0.65536000000000000000e5
-3459 1 40 55 -0.32768000000000000000e5
-3459 1 41 56 -0.32768000000000000000e5
-3459 1 44 51 -0.13107200000000000000e6
-3459 1 46 53 0.13107200000000000000e6
-3459 2 2 32 -0.16384000000000000000e5
-3459 2 4 34 0.32768000000000000000e5
-3459 2 16 30 -0.32768000000000000000e5
-3459 2 20 34 -0.65536000000000000000e5
-3459 2 28 34 -0.32768000000000000000e5
-3459 3 5 50 0.32768000000000000000e5
-3459 3 9 38 -0.32768000000000000000e5
-3459 3 10 55 0.65536000000000000000e5
-3459 3 22 35 -0.13107200000000000000e6
-3459 3 22 51 -0.32768000000000000000e5
-3459 3 23 52 0.65536000000000000000e5
-3459 3 27 40 0.32768000000000000000e5
-3459 3 27 56 -0.32768000000000000000e5
-3459 3 28 41 -0.13107200000000000000e6
-3459 3 31 53 0.65536000000000000000e5
-3459 3 35 48 -0.13107200000000000000e6
-3459 3 38 51 0.32768000000000000000e5
-3459 3 39 52 0.65536000000000000000e5
-3459 3 40 45 0.65536000000000000000e5
-3459 4 2 30 -0.32768000000000000000e5
-3459 4 6 34 -0.65536000000000000000e5
-3459 4 7 35 -0.32768000000000000000e5
-3459 4 22 34 0.65536000000000000000e5
-3459 4 23 35 0.65536000000000000000e5
-3459 4 29 33 0.32768000000000000000e5
-3460 1 1 48 0.16384000000000000000e5
-3460 1 2 49 0.16384000000000000000e5
-3460 1 8 39 0.32768000000000000000e5
-3460 1 9 40 0.32768000000000000000e5
-3460 1 10 41 -0.65536000000000000000e5
-3460 1 12 43 -0.13107200000000000000e6
-3460 1 23 38 0.16384000000000000000e5
-3460 1 24 55 -0.32768000000000000000e5
-3460 1 26 41 -0.32768000000000000000e5
-3460 1 28 43 0.13107200000000000000e6
-3460 1 32 47 0.13107200000000000000e6
-3460 1 33 48 -0.65536000000000000000e5
-3460 1 40 55 0.32768000000000000000e5
-3460 1 41 56 0.32768000000000000000e5
-3460 2 2 32 0.16384000000000000000e5
-3460 2 4 34 -0.32768000000000000000e5
-3460 2 16 30 0.32768000000000000000e5
-3460 2 20 34 0.65536000000000000000e5
-3460 2 28 34 0.32768000000000000000e5
-3460 3 5 50 -0.32768000000000000000e5
-3460 3 9 38 0.32768000000000000000e5
-3460 3 10 55 -0.65536000000000000000e5
-3460 3 22 35 0.13107200000000000000e6
-3460 3 22 51 0.32768000000000000000e5
-3460 3 23 52 -0.65536000000000000000e5
-3460 3 27 40 -0.32768000000000000000e5
-3460 3 27 56 0.32768000000000000000e5
-3460 3 28 41 0.13107200000000000000e6
-3460 3 31 54 0.65536000000000000000e5
-3460 3 35 48 0.13107200000000000000e6
-3460 3 38 51 -0.32768000000000000000e5
-3460 3 40 45 -0.65536000000000000000e5
-3460 4 2 30 0.32768000000000000000e5
-3460 4 6 34 0.65536000000000000000e5
-3460 4 7 35 0.32768000000000000000e5
-3460 4 22 34 -0.65536000000000000000e5
-3460 4 29 33 -0.32768000000000000000e5
-3461 1 44 51 -0.65536000000000000000e5
-3461 1 46 53 0.65536000000000000000e5
-3461 3 31 55 0.65536000000000000000e5
-3462 3 31 56 0.65536000000000000000e5
-3462 3 47 52 -0.65536000000000000000e5
-3463 1 14 45 0.32768000000000000000e5
-3463 1 17 48 -0.16384000000000000000e5
-3463 1 18 49 -0.16384000000000000000e5
-3463 1 34 49 -0.16384000000000000000e5
-3463 2 14 28 -0.16384000000000000000e5
-3463 3 14 43 -0.16384000000000000000e5
-3463 3 15 44 0.32768000000000000000e5
-3463 3 16 45 -0.65536000000000000000e5
-3463 3 18 47 -0.16384000000000000000e5
-3463 3 22 35 0.16384000000000000000e5
-3463 3 32 32 0.65536000000000000000e5
-3463 4 14 26 0.16384000000000000000e5
-3463 4 15 27 0.32768000000000000000e5
-3464 3 15 44 -0.65536000000000000000e5
-3464 3 32 33 0.65536000000000000000e5
-3465 3 16 45 -0.65536000000000000000e5
-3465 3 32 34 0.65536000000000000000e5
-3466 1 15 46 -0.65536000000000000000e5
-3466 1 20 51 0.65536000000000000000e5
-3466 3 32 35 0.65536000000000000000e5
-3467 3 17 46 -0.65536000000000000000e5
-3467 3 32 36 0.65536000000000000000e5
-3468 3 28 41 -0.65536000000000000000e5
-3468 3 32 37 0.65536000000000000000e5
-3469 1 6 53 -0.16384000000000000000e5
-3469 1 25 40 0.16384000000000000000e5
-3469 2 4 34 -0.32768000000000000000e5
-3469 2 21 35 0.32768000000000000000e5
-3469 3 5 50 -0.32768000000000000000e5
-3469 3 24 37 -0.16384000000000000000e5
-3469 3 27 40 -0.65536000000000000000e5
-3469 3 32 38 0.65536000000000000000e5
-3469 4 4 32 0.16384000000000000000e5
-3469 4 7 35 0.32768000000000000000e5
-3469 4 16 28 -0.16384000000000000000e5
-3470 3 29 42 -0.65536000000000000000e5
-3470 3 32 39 0.65536000000000000000e5
-3471 3 14 51 -0.13107200000000000000e6
-3471 3 29 42 0.65536000000000000000e5
-3471 3 30 43 0.65536000000000000000e5
-3471 3 32 40 0.65536000000000000000e5
-3471 4 19 31 0.65536000000000000000e5
-3472 1 6 53 -0.81920000000000000000e4
-3472 1 25 40 0.81920000000000000000e4
-3472 2 4 34 -0.16384000000000000000e5
-3472 2 21 35 0.16384000000000000000e5
-3472 3 5 50 -0.16384000000000000000e5
-3472 3 24 37 -0.81920000000000000000e4
-3472 3 27 40 -0.32768000000000000000e5
-3472 3 28 41 -0.32768000000000000000e5
-3472 3 29 42 -0.32768000000000000000e5
-3472 3 32 41 0.65536000000000000000e5
-3472 4 4 32 0.81920000000000000000e4
-3472 4 7 35 0.16384000000000000000e5
-3472 4 16 28 -0.81920000000000000000e4
-3472 4 23 27 -0.32768000000000000000e5
-3473 3 18 47 -0.65536000000000000000e5
-3473 3 32 42 0.65536000000000000000e5
-3474 3 14 51 -0.65536000000000000000e5
-3474 3 32 43 0.65536000000000000000e5
-3475 3 19 48 -0.65536000000000000000e5
-3475 3 32 44 0.65536000000000000000e5
-3476 1 20 51 -0.65536000000000000000e5
-3476 1 36 51 0.65536000000000000000e5
-3476 3 32 46 0.65536000000000000000e5
-3477 3 23 52 -0.65536000000000000000e5
-3477 3 32 47 0.65536000000000000000e5
-3478 3 10 55 0.65536000000000000000e5
-3478 3 32 48 0.65536000000000000000e5
-3478 3 35 48 -0.13107200000000000000e6
-3478 3 40 45 0.65536000000000000000e5
-3478 4 22 34 0.65536000000000000000e5
-3479 3 10 55 -0.65536000000000000000e5
-3479 3 32 49 0.65536000000000000000e5
-3480 1 34 49 -0.65536000000000000000e5
-3480 1 44 51 0.65536000000000000000e5
-3480 3 32 50 0.65536000000000000000e5
-3481 3 32 51 0.65536000000000000000e5
-3481 3 35 48 -0.65536000000000000000e5
-3482 1 11 18 -0.65536000000000000000e5
-3482 1 45 52 0.65536000000000000000e5
-3482 3 6 19 0.65536000000000000000e5
-3482 3 15 44 0.65536000000000000000e5
-3482 3 17 30 0.65536000000000000000e5
-3482 3 32 45 0.65536000000000000000e5
-3482 3 32 52 0.65536000000000000000e5
-3483 1 1 48 0.16384000000000000000e5
-3483 1 2 49 0.16384000000000000000e5
-3483 1 8 39 0.32768000000000000000e5
-3483 1 9 40 0.32768000000000000000e5
-3483 1 10 41 -0.65536000000000000000e5
-3483 1 12 43 -0.13107200000000000000e6
-3483 1 23 38 0.16384000000000000000e5
-3483 1 24 55 -0.32768000000000000000e5
-3483 1 26 41 -0.32768000000000000000e5
-3483 1 28 43 0.13107200000000000000e6
-3483 1 32 47 0.13107200000000000000e6
-3483 1 33 48 -0.65536000000000000000e5
-3483 1 40 55 0.32768000000000000000e5
-3483 1 41 56 0.32768000000000000000e5
-3483 2 2 32 0.16384000000000000000e5
-3483 2 4 34 -0.32768000000000000000e5
-3483 2 16 30 0.32768000000000000000e5
-3483 2 20 34 0.65536000000000000000e5
-3483 2 28 34 0.32768000000000000000e5
-3483 3 5 50 -0.32768000000000000000e5
-3483 3 9 38 0.32768000000000000000e5
-3483 3 10 55 -0.65536000000000000000e5
-3483 3 22 35 0.13107200000000000000e6
-3483 3 22 51 0.32768000000000000000e5
-3483 3 23 52 -0.65536000000000000000e5
-3483 3 27 40 -0.32768000000000000000e5
-3483 3 27 56 0.32768000000000000000e5
-3483 3 28 41 0.13107200000000000000e6
-3483 3 32 53 0.65536000000000000000e5
-3483 3 35 48 0.13107200000000000000e6
-3483 3 38 51 -0.32768000000000000000e5
-3483 3 40 45 -0.65536000000000000000e5
-3483 4 2 30 0.32768000000000000000e5
-3483 4 6 34 0.65536000000000000000e5
-3483 4 7 35 0.32768000000000000000e5
-3483 4 22 34 -0.65536000000000000000e5
-3483 4 29 33 -0.32768000000000000000e5
-3484 3 32 54 0.65536000000000000000e5
-3484 3 39 52 -0.65536000000000000000e5
-3485 3 32 55 0.65536000000000000000e5
-3485 3 45 50 -0.65536000000000000000e5
-3486 3 32 56 0.65536000000000000000e5
-3486 3 42 55 -0.65536000000000000000e5
-3487 3 30 35 -0.32768000000000000000e5
-3487 3 33 33 0.65536000000000000000e5
-3488 1 15 46 -0.65536000000000000000e5
-3488 1 20 51 0.65536000000000000000e5
-3488 3 33 34 0.65536000000000000000e5
-3489 3 15 46 -0.65536000000000000000e5
-3489 3 33 35 0.65536000000000000000e5
-3490 3 20 45 -0.65536000000000000000e5
-3490 3 33 36 0.65536000000000000000e5
-3491 1 6 53 -0.16384000000000000000e5
-3491 1 25 40 0.16384000000000000000e5
-3491 2 4 34 -0.32768000000000000000e5
-3491 2 21 35 0.32768000000000000000e5
-3491 3 5 50 -0.32768000000000000000e5
-3491 3 24 37 -0.16384000000000000000e5
-3491 3 27 40 -0.65536000000000000000e5
-3491 3 33 37 0.65536000000000000000e5
-3491 4 4 32 0.16384000000000000000e5
-3491 4 7 35 0.32768000000000000000e5
-3491 4 16 28 -0.16384000000000000000e5
-3492 3 29 42 -0.65536000000000000000e5
-3492 3 33 38 0.65536000000000000000e5
-3493 3 14 51 -0.13107200000000000000e6
-3493 3 29 42 0.65536000000000000000e5
-3493 3 30 43 0.65536000000000000000e5
-3493 3 33 39 0.65536000000000000000e5
-3493 4 19 31 0.65536000000000000000e5
-3494 3 30 43 -0.65536000000000000000e5
-3494 3 33 40 0.65536000000000000000e5
-3495 3 18 47 -0.65536000000000000000e5
-3495 3 33 41 0.65536000000000000000e5
-3496 3 14 51 -0.65536000000000000000e5
-3496 3 33 42 0.65536000000000000000e5
-3497 3 33 43 0.65536000000000000000e5
-3497 3 35 40 -0.65536000000000000000e5
-3498 3 32 45 -0.65536000000000000000e5
-3498 3 33 44 0.65536000000000000000e5
-3499 3 20 49 -0.65536000000000000000e5
-3499 3 33 45 0.65536000000000000000e5
-3500 3 10 55 0.65536000000000000000e5
-3500 3 33 47 0.65536000000000000000e5
-3500 3 35 48 -0.13107200000000000000e6
-3500 3 40 45 0.65536000000000000000e5
-3500 4 22 34 0.65536000000000000000e5
-3501 3 10 55 -0.65536000000000000000e5
-3501 3 33 48 0.65536000000000000000e5
-3502 3 33 49 0.65536000000000000000e5
-3502 3 40 45 -0.65536000000000000000e5
-3503 3 33 50 0.65536000000000000000e5
-3503 3 35 48 -0.65536000000000000000e5
-3504 1 11 18 -0.13107200000000000000e6
-3504 1 34 49 0.65536000000000000000e5
-3504 1 44 51 -0.65536000000000000000e5
-3504 1 45 52 0.13107200000000000000e6
-3504 3 6 19 0.13107200000000000000e6
-3504 3 15 44 0.13107200000000000000e6
-3504 3 17 30 0.13107200000000000000e6
-3504 3 32 45 0.13107200000000000000e6
-3504 3 33 51 0.65536000000000000000e5
-3504 3 35 48 0.65536000000000000000e5
-3504 4 25 33 0.65536000000000000000e5
-3505 3 33 52 0.65536000000000000000e5
-3505 3 36 49 -0.65536000000000000000e5
-3506 3 33 53 0.65536000000000000000e5
-3506 3 39 52 -0.65536000000000000000e5
-3507 1 1 48 -0.16384000000000000000e5
-3507 1 2 49 -0.16384000000000000000e5
-3507 1 8 39 -0.32768000000000000000e5
-3507 1 9 40 -0.32768000000000000000e5
-3507 1 10 41 0.65536000000000000000e5
-3507 1 12 43 0.13107200000000000000e6
-3507 1 23 38 -0.16384000000000000000e5
-3507 1 24 55 0.32768000000000000000e5
-3507 1 26 41 0.32768000000000000000e5
-3507 1 28 43 -0.13107200000000000000e6
-3507 1 32 47 -0.13107200000000000000e6
-3507 1 33 48 0.65536000000000000000e5
-3507 1 40 55 -0.32768000000000000000e5
-3507 1 41 56 -0.32768000000000000000e5
-3507 2 2 32 -0.16384000000000000000e5
-3507 2 4 34 0.32768000000000000000e5
-3507 2 16 30 -0.32768000000000000000e5
-3507 2 20 34 -0.65536000000000000000e5
-3507 2 28 34 -0.32768000000000000000e5
-3507 3 5 50 0.32768000000000000000e5
-3507 3 9 38 -0.32768000000000000000e5
-3507 3 10 55 0.65536000000000000000e5
-3507 3 22 35 -0.13107200000000000000e6
-3507 3 22 51 -0.32768000000000000000e5
-3507 3 23 52 0.65536000000000000000e5
-3507 3 27 40 0.32768000000000000000e5
-3507 3 27 56 -0.32768000000000000000e5
-3507 3 28 41 -0.13107200000000000000e6
-3507 3 33 54 0.65536000000000000000e5
-3507 3 35 48 -0.13107200000000000000e6
-3507 3 38 51 0.32768000000000000000e5
-3507 3 39 52 0.65536000000000000000e5
-3507 3 40 45 0.65536000000000000000e5
-3507 3 45 50 -0.13107200000000000000e6
-3507 4 2 30 -0.32768000000000000000e5
-3507 4 6 34 -0.65536000000000000000e5
-3507 4 7 35 -0.32768000000000000000e5
-3507 4 22 34 0.65536000000000000000e5
-3507 4 29 33 0.32768000000000000000e5
-3507 4 30 34 0.65536000000000000000e5
-3508 3 33 55 0.65536000000000000000e5
-3508 3 43 52 -0.65536000000000000000e5
-3509 1 18 49 -0.13107200000000000000e6
-3509 1 52 55 0.13107200000000000000e6
-3509 3 14 51 0.13107200000000000000e6
-3509 3 33 56 0.65536000000000000000e5
-3509 3 35 48 0.13107200000000000000e6
-3509 3 42 55 0.65536000000000000000e5
-3509 3 45 50 0.13107200000000000000e6
-3509 3 47 52 0.65536000000000000000e5
-3509 4 31 35 0.65536000000000000000e5
-3510 1 6 21 -0.16384000000000000000e5
-3510 1 17 32 -0.16384000000000000000e5
-3510 1 19 50 0.16384000000000000000e5
-3510 1 20 51 0.16384000000000000000e5
-3510 2 9 15 -0.16384000000000000000e5
-3510 2 25 31 0.16384000000000000000e5
-3510 3 7 20 0.16384000000000000000e5
-3510 3 8 21 -0.32768000000000000000e5
-3510 3 14 19 0.32768000000000000000e5
-3510 3 16 45 -0.16384000000000000000e5
-3510 3 18 31 -0.16384000000000000000e5
-3510 3 19 32 0.32768000000000000000e5
-3510 3 34 34 0.65536000000000000000e5
-3510 4 10 14 0.16384000000000000000e5
-3511 3 17 46 -0.65536000000000000000e5
-3511 3 34 35 0.65536000000000000000e5
-3512 1 6 21 -0.16384000000000000000e5
-3512 1 17 32 -0.16384000000000000000e5
-3512 1 19 50 0.16384000000000000000e5
-3512 1 20 51 0.16384000000000000000e5
-3512 2 9 15 -0.16384000000000000000e5
-3512 2 25 31 0.16384000000000000000e5
-3512 3 7 20 0.16384000000000000000e5
-3512 3 8 21 -0.32768000000000000000e5
-3512 3 14 19 0.32768000000000000000e5
-3512 3 16 45 -0.16384000000000000000e5
-3512 3 17 46 -0.32768000000000000000e5
-3512 3 18 31 -0.16384000000000000000e5
-3512 3 19 32 0.32768000000000000000e5
-3512 3 20 45 -0.32768000000000000000e5
-3512 3 34 36 0.65536000000000000000e5
-3512 4 10 14 0.16384000000000000000e5
-3512 4 25 25 -0.65536000000000000000e5
-3513 3 7 52 -0.65536000000000000000e5
-3513 3 34 37 0.65536000000000000000e5
-3514 1 6 53 -0.81920000000000000000e4
-3514 1 25 40 0.81920000000000000000e4
-3514 2 4 34 -0.16384000000000000000e5
-3514 2 21 35 0.16384000000000000000e5
-3514 3 5 50 -0.16384000000000000000e5
-3514 3 24 37 -0.81920000000000000000e4
-3514 3 27 40 -0.32768000000000000000e5
-3514 3 28 41 -0.32768000000000000000e5
-3514 3 29 42 -0.32768000000000000000e5
-3514 3 34 38 0.65536000000000000000e5
-3514 4 4 32 0.81920000000000000000e4
-3514 4 7 35 0.16384000000000000000e5
-3514 4 16 28 -0.81920000000000000000e4
-3514 4 23 27 -0.32768000000000000000e5
-3515 3 18 47 -0.65536000000000000000e5
-3515 3 34 39 0.65536000000000000000e5
-3516 3 14 51 -0.65536000000000000000e5
-3516 3 34 40 0.65536000000000000000e5
-3517 3 31 44 -0.65536000000000000000e5
-3517 3 34 41 0.65536000000000000000e5
-3518 3 19 48 -0.65536000000000000000e5
-3518 3 34 42 0.65536000000000000000e5
-3519 3 32 45 -0.65536000000000000000e5
-3519 3 34 43 0.65536000000000000000e5
-3520 3 34 44 0.65536000000000000000e5
-3520 3 36 41 -0.65536000000000000000e5
-3521 1 20 51 -0.65536000000000000000e5
-3521 1 36 51 0.65536000000000000000e5
-3521 3 34 45 0.65536000000000000000e5
-3522 3 21 50 -0.65536000000000000000e5
-3522 3 34 46 0.65536000000000000000e5
-3523 1 34 49 -0.65536000000000000000e5
-3523 1 44 51 0.65536000000000000000e5
-3523 3 34 48 0.65536000000000000000e5
-3524 3 34 49 0.65536000000000000000e5
-3524 3 35 48 -0.65536000000000000000e5
-3525 3 34 50 0.65536000000000000000e5
-3525 3 41 46 -0.65536000000000000000e5
-3526 1 11 18 -0.65536000000000000000e5
-3526 1 45 52 0.65536000000000000000e5
-3526 3 6 19 0.65536000000000000000e5
-3526 3 15 44 0.65536000000000000000e5
-3526 3 17 30 0.65536000000000000000e5
-3526 3 32 45 0.65536000000000000000e5
-3526 3 34 51 0.65536000000000000000e5
-3527 1 11 18 -0.32768000000000000000e5
-3527 1 45 52 0.32768000000000000000e5
-3527 3 6 19 0.32768000000000000000e5
-3527 3 15 44 0.32768000000000000000e5
-3527 3 17 30 0.32768000000000000000e5
-3527 3 32 45 0.32768000000000000000e5
-3527 3 34 52 0.65536000000000000000e5
-3527 3 36 49 -0.32768000000000000000e5
-3527 3 41 46 -0.32768000000000000000e5
-3527 4 15 35 -0.32768000000000000000e5
-3528 1 44 51 -0.65536000000000000000e5
-3528 1 46 53 0.65536000000000000000e5
-3528 3 34 53 0.65536000000000000000e5
-3529 3 34 54 0.65536000000000000000e5
-3529 3 45 50 -0.65536000000000000000e5
-3530 3 19 56 -0.65536000000000000000e5
-3530 3 34 55 0.65536000000000000000e5
-3531 1 18 49 -0.65536000000000000000e5
-3531 1 52 55 0.65536000000000000000e5
-3531 3 14 51 0.65536000000000000000e5
-3531 3 34 56 0.65536000000000000000e5
-3531 3 35 48 0.65536000000000000000e5
-3531 3 45 50 0.65536000000000000000e5
-3532 3 20 45 -0.32768000000000000000e5
-3532 3 35 35 0.65536000000000000000e5
-3533 1 6 53 -0.81920000000000000000e4
-3533 1 25 40 0.81920000000000000000e4
-3533 2 4 34 -0.16384000000000000000e5
-3533 2 21 35 0.16384000000000000000e5
-3533 3 5 50 -0.16384000000000000000e5
-3533 3 24 37 -0.81920000000000000000e4
-3533 3 27 40 -0.32768000000000000000e5
-3533 3 28 41 -0.32768000000000000000e5
-3533 3 29 42 -0.32768000000000000000e5
-3533 3 35 37 0.65536000000000000000e5
-3533 4 4 32 0.81920000000000000000e4
-3533 4 7 35 0.16384000000000000000e5
-3533 4 16 28 -0.81920000000000000000e4
-3533 4 23 27 -0.32768000000000000000e5
-3534 3 18 47 -0.65536000000000000000e5
-3534 3 35 38 0.65536000000000000000e5
-3535 3 14 51 -0.65536000000000000000e5
-3535 3 35 39 0.65536000000000000000e5
-3536 3 19 48 -0.65536000000000000000e5
-3536 3 35 41 0.65536000000000000000e5
-3537 3 32 45 -0.65536000000000000000e5
-3537 3 35 42 0.65536000000000000000e5
-3538 3 20 49 -0.65536000000000000000e5
-3538 3 35 43 0.65536000000000000000e5
-3539 1 20 51 -0.65536000000000000000e5
-3539 1 36 51 0.65536000000000000000e5
-3539 3 35 44 0.65536000000000000000e5
-3540 3 33 46 -0.65536000000000000000e5
-3540 3 35 45 0.65536000000000000000e5
-3541 3 35 46 0.65536000000000000000e5
-3541 3 36 45 -0.65536000000000000000e5
-3542 1 34 49 -0.65536000000000000000e5
-3542 1 44 51 0.65536000000000000000e5
-3542 3 35 47 0.65536000000000000000e5
-3543 1 11 18 -0.13107200000000000000e6
-3543 1 34 49 0.65536000000000000000e5
-3543 1 44 51 -0.65536000000000000000e5
-3543 1 45 52 0.13107200000000000000e6
-3543 3 6 19 0.13107200000000000000e6
-3543 3 15 44 0.13107200000000000000e6
-3543 3 17 30 0.13107200000000000000e6
-3543 3 32 45 0.13107200000000000000e6
-3543 3 35 48 0.65536000000000000000e5
-3543 3 35 49 0.65536000000000000000e5
-3543 4 25 33 0.65536000000000000000e5
-3544 1 11 18 -0.65536000000000000000e5
-3544 1 45 52 0.65536000000000000000e5
-3544 3 6 19 0.65536000000000000000e5
-3544 3 15 44 0.65536000000000000000e5
-3544 3 17 30 0.65536000000000000000e5
-3544 3 32 45 0.65536000000000000000e5
-3544 3 35 50 0.65536000000000000000e5
-3545 3 35 51 0.65536000000000000000e5
-3545 3 36 49 -0.65536000000000000000e5
-3546 3 35 52 0.65536000000000000000e5
-3546 3 45 46 -0.65536000000000000000e5
-3547 3 35 53 0.65536000000000000000e5
-3547 3 45 50 -0.65536000000000000000e5
-3548 3 35 54 0.65536000000000000000e5
-3548 3 43 52 -0.65536000000000000000e5
-3549 3 35 55 0.65536000000000000000e5
-3549 3 46 51 -0.65536000000000000000e5
-3550 3 21 46 -0.32768000000000000000e5
-3550 3 36 36 0.65536000000000000000e5
-3551 3 31 44 -0.65536000000000000000e5
-3551 3 36 37 0.65536000000000000000e5
-3552 3 19 48 -0.65536000000000000000e5
-3552 3 36 38 0.65536000000000000000e5
-3553 3 32 45 -0.65536000000000000000e5
-3553 3 36 39 0.65536000000000000000e5
-3554 3 20 49 -0.65536000000000000000e5
-3554 3 36 40 0.65536000000000000000e5
-3555 1 20 51 -0.65536000000000000000e5
-3555 1 36 51 0.65536000000000000000e5
-3555 3 36 42 0.65536000000000000000e5
-3556 3 33 46 -0.65536000000000000000e5
-3556 3 36 43 0.65536000000000000000e5
-3557 3 21 50 -0.65536000000000000000e5
-3557 3 36 44 0.65536000000000000000e5
-3558 3 21 52 -0.65536000000000000000e5
-3558 3 36 46 0.65536000000000000000e5
-3559 3 36 47 0.65536000000000000000e5
-3559 3 41 46 -0.65536000000000000000e5
-3560 1 11 18 -0.65536000000000000000e5
-3560 1 45 52 0.65536000000000000000e5
-3560 3 6 19 0.65536000000000000000e5
-3560 3 15 44 0.65536000000000000000e5
-3560 3 17 30 0.65536000000000000000e5
-3560 3 32 45 0.65536000000000000000e5
-3560 3 36 48 0.65536000000000000000e5
-3561 1 11 18 -0.32768000000000000000e5
-3561 1 45 52 0.32768000000000000000e5
-3561 3 6 19 0.32768000000000000000e5
-3561 3 15 44 0.32768000000000000000e5
-3561 3 17 30 0.32768000000000000000e5
-3561 3 32 45 0.32768000000000000000e5
-3561 3 36 49 -0.32768000000000000000e5
-3561 3 36 50 0.65536000000000000000e5
-3561 3 41 46 -0.32768000000000000000e5
-3561 4 15 35 -0.32768000000000000000e5
-3562 3 36 51 0.65536000000000000000e5
-3562 3 45 46 -0.65536000000000000000e5
-3563 3 21 55 -0.65536000000000000000e5
-3563 3 36 52 0.65536000000000000000e5
-3564 3 19 56 -0.65536000000000000000e5
-3564 3 36 53 0.65536000000000000000e5
-3565 3 36 54 0.65536000000000000000e5
-3565 3 46 51 -0.65536000000000000000e5
-3566 3 21 56 -0.65536000000000000000e5
-3566 3 36 55 0.65536000000000000000e5
-3567 3 36 56 0.65536000000000000000e5
-3567 3 46 55 -0.65536000000000000000e5
-3568 1 22 53 0.32768000000000000000e5
-3568 1 23 38 -0.32768000000000000000e5
-3568 3 2 47 0.32768000000000000000e5
-3568 3 37 37 0.65536000000000000000e5
-3569 1 2 49 -0.65536000000000000000e5
-3569 1 6 53 0.65536000000000000000e5
-3569 1 8 39 0.13107200000000000000e6
-3569 1 9 40 0.13107200000000000000e6
-3569 1 10 41 -0.26214400000000000000e6
-3569 1 22 53 -0.65536000000000000000e5
-3569 1 23 54 -0.65536000000000000000e5
-3569 1 24 55 -0.13107200000000000000e6
-3569 1 25 40 -0.65536000000000000000e5
-3569 1 37 52 0.26214400000000000000e6
-3569 2 26 32 -0.65536000000000000000e5
-3569 3 9 38 0.13107200000000000000e6
-3569 3 22 51 0.13107200000000000000e6
-3569 3 24 37 0.13107200000000000000e6
-3569 3 27 40 0.13107200000000000000e6
-3569 3 37 38 0.65536000000000000000e5
-3569 4 2 30 0.13107200000000000000e6
-3569 4 4 32 -0.65536000000000000000e5
-3569 4 16 28 0.65536000000000000000e5
-3569 4 17 29 0.13107200000000000000e6
-3569 4 20 32 0.13107200000000000000e6
-3570 1 6 53 0.65536000000000000000e5
-3570 1 23 54 0.65536000000000000000e5
-3570 1 24 39 -0.65536000000000000000e5
-3570 1 25 40 -0.65536000000000000000e5
-3570 3 25 38 -0.65536000000000000000e5
-3570 3 27 40 0.13107200000000000000e6
-3570 3 37 39 0.65536000000000000000e5
-3570 4 4 32 -0.65536000000000000000e5
-3571 1 1 48 0.65536000000000000000e5
-3571 1 2 49 0.13107200000000000000e6
-3571 1 8 39 0.13107200000000000000e6
-3571 1 9 40 0.13107200000000000000e6
-3571 1 10 41 -0.26214400000000000000e6
-3571 1 12 43 -0.52428800000000000000e6
-3571 1 23 38 0.65536000000000000000e5
-3571 1 24 39 0.65536000000000000000e5
-3571 1 26 41 -0.13107200000000000000e6
-3571 1 28 43 0.26214400000000000000e6
-3571 1 32 47 0.52428800000000000000e6
-3571 1 40 47 0.65536000000000000000e5
-3571 2 2 32 0.65536000000000000000e5
-3571 2 3 33 0.65536000000000000000e5
-3571 2 16 30 0.13107200000000000000e6
-3571 2 20 34 0.26214400000000000000e6
-3571 3 9 38 0.13107200000000000000e6
-3571 3 22 35 0.52428800000000000000e6
-3571 3 25 38 0.65536000000000000000e5
-3571 3 28 41 0.52428800000000000000e6
-3571 3 37 40 0.65536000000000000000e5
-3571 4 2 30 0.13107200000000000000e6
-3571 4 6 34 0.26214400000000000000e6
-3572 1 24 55 -0.65536000000000000000e5
-3572 1 26 41 0.65536000000000000000e5
-3572 1 32 47 -0.13107200000000000000e6
-3572 1 37 52 0.13107200000000000000e6
-3572 3 22 51 0.65536000000000000000e5
-3572 3 27 40 -0.65536000000000000000e5
-3572 3 37 41 0.65536000000000000000e5
-3572 4 20 32 0.65536000000000000000e5
-3573 3 22 51 -0.65536000000000000000e5
-3573 3 37 42 0.65536000000000000000e5
-3574 1 24 55 0.65536000000000000000e5
-3574 1 26 41 -0.65536000000000000000e5
-3574 3 27 40 0.65536000000000000000e5
-3574 3 37 43 0.65536000000000000000e5
-3575 1 32 47 -0.65536000000000000000e5
-3575 1 37 52 0.65536000000000000000e5
-3575 3 37 44 0.65536000000000000000e5
-3576 3 23 52 -0.65536000000000000000e5
-3576 3 37 45 0.65536000000000000000e5
-3577 3 34 47 -0.65536000000000000000e5
-3577 3 37 46 0.65536000000000000000e5
-3578 1 1 48 -0.65536000000000000000e5
-3578 1 2 49 -0.65536000000000000000e5
-3578 1 6 53 -0.13107200000000000000e6
-3578 1 8 39 -0.26214400000000000000e6
-3578 1 9 40 -0.26214400000000000000e6
-3578 1 10 41 0.52428800000000000000e6
-3578 1 12 43 0.52428800000000000000e6
-3578 1 22 53 0.65536000000000000000e5
-3578 1 23 38 -0.65536000000000000000e5
-3578 1 23 54 0.65536000000000000000e5
-3578 1 24 55 0.13107200000000000000e6
-3578 1 25 40 0.13107200000000000000e6
-3578 1 26 41 0.13107200000000000000e6
-3578 1 28 43 -0.26214400000000000000e6
-3578 1 32 47 -0.52428800000000000000e6
-3578 1 37 52 -0.26214400000000000000e6
-3578 1 38 53 -0.65536000000000000000e5
-3578 1 40 47 -0.65536000000000000000e5
-3578 2 2 32 -0.65536000000000000000e5
-3578 2 16 30 -0.13107200000000000000e6
-3578 2 20 34 -0.26214400000000000000e6
-3578 2 26 32 0.65536000000000000000e5
-3578 2 32 32 -0.13107200000000000000e6
-3578 3 9 38 -0.26214400000000000000e6
-3578 3 22 35 -0.52428800000000000000e6
-3578 3 22 51 -0.26214400000000000000e6
-3578 3 24 37 -0.13107200000000000000e6
-3578 3 24 53 0.65536000000000000000e5
-3578 3 27 40 -0.26214400000000000000e6
-3578 3 28 41 -0.52428800000000000000e6
-3578 3 37 47 0.65536000000000000000e5
-3578 3 37 50 -0.13107200000000000000e6
-3578 4 2 30 -0.26214400000000000000e6
-3578 4 4 32 0.13107200000000000000e6
-3578 4 6 34 -0.26214400000000000000e6
-3578 4 16 28 -0.13107200000000000000e6
-3578 4 17 29 -0.13107200000000000000e6
-3578 4 20 32 -0.13107200000000000000e6
-3579 1 23 54 -0.65536000000000000000e5
-3579 1 38 53 0.65536000000000000000e5
-3579 3 37 48 0.65536000000000000000e5
-3580 3 24 53 -0.65536000000000000000e5
-3580 3 37 49 0.65536000000000000000e5
-3581 1 24 55 -0.65536000000000000000e5
-3581 1 41 56 0.65536000000000000000e5
-3581 3 27 56 0.65536000000000000000e5
-3581 3 37 51 0.65536000000000000000e5
-3582 1 1 48 -0.16384000000000000000e5
-3582 1 2 49 -0.16384000000000000000e5
-3582 1 8 39 -0.32768000000000000000e5
-3582 1 9 40 -0.32768000000000000000e5
-3582 1 10 41 0.65536000000000000000e5
-3582 1 12 43 0.13107200000000000000e6
-3582 1 23 38 -0.16384000000000000000e5
-3582 1 24 55 0.32768000000000000000e5
-3582 1 26 41 0.32768000000000000000e5
-3582 1 28 43 -0.13107200000000000000e6
-3582 1 32 47 -0.13107200000000000000e6
-3582 1 33 48 0.65536000000000000000e5
-3582 1 40 55 -0.32768000000000000000e5
-3582 1 41 56 -0.32768000000000000000e5
-3582 1 44 51 -0.13107200000000000000e6
-3582 1 46 53 0.13107200000000000000e6
-3582 2 2 32 -0.16384000000000000000e5
-3582 2 4 34 0.32768000000000000000e5
-3582 2 16 30 -0.32768000000000000000e5
-3582 2 20 34 -0.65536000000000000000e5
-3582 2 28 34 -0.32768000000000000000e5
-3582 3 5 50 0.32768000000000000000e5
-3582 3 9 38 -0.32768000000000000000e5
-3582 3 10 55 0.65536000000000000000e5
-3582 3 22 35 -0.13107200000000000000e6
-3582 3 22 51 -0.32768000000000000000e5
-3582 3 23 52 0.65536000000000000000e5
-3582 3 27 40 0.32768000000000000000e5
-3582 3 27 56 -0.32768000000000000000e5
-3582 3 28 41 -0.13107200000000000000e6
-3582 3 35 48 -0.13107200000000000000e6
-3582 3 37 52 0.65536000000000000000e5
-3582 3 38 51 0.32768000000000000000e5
-3582 3 39 52 0.65536000000000000000e5
-3582 3 40 45 0.65536000000000000000e5
-3582 4 2 30 -0.32768000000000000000e5
-3582 4 6 34 -0.65536000000000000000e5
-3582 4 7 35 -0.32768000000000000000e5
-3582 4 22 34 0.65536000000000000000e5
-3582 4 23 35 0.65536000000000000000e5
-3582 4 29 33 0.32768000000000000000e5
-3583 1 1 48 0.65536000000000000000e5
-3583 1 2 49 0.13107200000000000000e6
-3583 1 6 53 -0.65536000000000000000e5
-3583 1 8 39 0.13107200000000000000e6
-3583 1 9 40 0.13107200000000000000e6
-3583 1 10 41 -0.26214400000000000000e6
-3583 1 12 43 -0.52428800000000000000e6
-3583 1 23 38 0.65536000000000000000e5
-3583 1 24 39 0.65536000000000000000e5
-3583 1 24 55 0.13107200000000000000e6
-3583 1 25 56 0.65536000000000000000e5
-3583 1 26 41 -0.26214400000000000000e6
-3583 1 28 43 0.26214400000000000000e6
-3583 1 32 47 0.52428800000000000000e6
-3583 1 40 47 0.65536000000000000000e5
-3583 2 2 32 0.65536000000000000000e5
-3583 2 3 33 0.65536000000000000000e5
-3583 2 5 35 -0.65536000000000000000e5
-3583 2 16 30 0.13107200000000000000e6
-3583 2 20 34 0.26214400000000000000e6
-3583 2 33 35 0.65536000000000000000e5
-3583 3 9 38 0.13107200000000000000e6
-3583 3 22 35 0.52428800000000000000e6
-3583 3 22 51 -0.13107200000000000000e6
-3583 3 23 52 0.26214400000000000000e6
-3583 3 24 53 -0.65536000000000000000e5
-3583 3 25 38 0.65536000000000000000e5
-3583 3 25 54 -0.65536000000000000000e5
-3583 3 27 40 0.13107200000000000000e6
-3583 3 27 56 -0.13107200000000000000e6
-3583 3 28 41 0.52428800000000000000e6
-3583 3 37 53 0.65536000000000000000e5
-3583 3 38 51 0.13107200000000000000e6
-3583 3 39 40 -0.65536000000000000000e5
-3583 3 40 53 -0.65536000000000000000e5
-3583 3 41 54 0.13107200000000000000e6
-3583 4 2 30 0.13107200000000000000e6
-3583 4 6 34 0.26214400000000000000e6
-3583 4 7 35 -0.13107200000000000000e6
-3583 4 32 32 0.13107200000000000000e6
-3584 1 40 47 -0.65536000000000000000e5
-3584 1 47 54 0.65536000000000000000e5
-3584 3 24 53 0.65536000000000000000e5
-3584 3 37 54 0.65536000000000000000e5
-3585 3 27 56 -0.65536000000000000000e5
-3585 3 37 55 0.65536000000000000000e5
-3586 1 1 48 0.13107200000000000000e6
-3586 1 2 49 0.19660800000000000000e6
-3586 1 6 53 -0.65536000000000000000e5
-3586 1 8 39 0.26214400000000000000e6
-3586 1 9 40 0.26214400000000000000e6
-3586 1 10 41 -0.52428800000000000000e6
-3586 1 12 43 -0.10485760000000000000e7
-3586 1 23 38 0.13107200000000000000e6
-3586 1 24 39 0.65536000000000000000e5
-3586 1 26 41 -0.39321600000000000000e6
-3586 1 28 43 0.78643200000000000000e6
-3586 1 32 47 0.10485760000000000000e7
-3586 1 49 56 -0.65536000000000000000e5
-3586 2 2 32 0.13107200000000000000e6
-3586 2 3 33 0.65536000000000000000e5
-3586 2 4 34 -0.13107200000000000000e6
-3586 2 5 35 -0.65536000000000000000e5
-3586 2 16 30 0.26214400000000000000e6
-3586 2 20 34 0.52428800000000000000e6
-3586 2 33 35 0.65536000000000000000e5
-3586 2 35 35 -0.13107200000000000000e6
-3586 3 5 50 -0.13107200000000000000e6
-3586 3 9 38 0.26214400000000000000e6
-3586 3 22 35 0.10485760000000000000e7
-3586 3 25 38 0.65536000000000000000e5
-3586 3 25 54 -0.65536000000000000000e5
-3586 3 28 41 0.10485760000000000000e7
-3586 3 37 56 0.65536000000000000000e5
-3586 3 39 40 -0.65536000000000000000e5
-3586 3 40 53 -0.65536000000000000000e5
-3586 3 41 56 -0.13107200000000000000e6
-3586 3 48 53 0.65536000000000000000e5
-3586 4 2 30 0.26214400000000000000e6
-3586 4 6 34 0.52428800000000000000e6
-3587 1 6 53 0.32768000000000000000e5
-3587 1 23 54 0.32768000000000000000e5
-3587 1 24 39 -0.32768000000000000000e5
-3587 1 25 40 -0.32768000000000000000e5
-3587 3 25 38 -0.32768000000000000000e5
-3587 3 27 40 0.65536000000000000000e5
-3587 3 38 38 0.65536000000000000000e5
-3587 4 4 32 -0.32768000000000000000e5
-3588 1 1 48 0.65536000000000000000e5
-3588 1 2 49 0.13107200000000000000e6
-3588 1 8 39 0.13107200000000000000e6
-3588 1 9 40 0.13107200000000000000e6
-3588 1 10 41 -0.26214400000000000000e6
-3588 1 12 43 -0.52428800000000000000e6
-3588 1 23 38 0.65536000000000000000e5
-3588 1 24 39 0.65536000000000000000e5
-3588 1 26 41 -0.13107200000000000000e6
-3588 1 28 43 0.26214400000000000000e6
-3588 1 32 47 0.52428800000000000000e6
-3588 1 40 47 0.65536000000000000000e5
-3588 2 2 32 0.65536000000000000000e5
-3588 2 3 33 0.65536000000000000000e5
-3588 2 16 30 0.13107200000000000000e6
-3588 2 20 34 0.26214400000000000000e6
-3588 3 9 38 0.13107200000000000000e6
-3588 3 22 35 0.52428800000000000000e6
-3588 3 25 38 0.65536000000000000000e5
-3588 3 28 41 0.52428800000000000000e6
-3588 3 38 39 0.65536000000000000000e5
-3588 4 2 30 0.13107200000000000000e6
-3588 4 6 34 0.26214400000000000000e6
-3589 1 6 53 -0.65536000000000000000e5
-3589 1 25 56 0.65536000000000000000e5
-3589 3 24 53 -0.65536000000000000000e5
-3589 3 25 54 -0.65536000000000000000e5
-3589 3 38 40 0.65536000000000000000e5
-3589 3 38 51 0.13107200000000000000e6
-3589 4 28 32 -0.65536000000000000000e5
-3590 3 22 51 -0.65536000000000000000e5
-3590 3 38 41 0.65536000000000000000e5
-3591 1 24 55 0.65536000000000000000e5
-3591 1 26 41 -0.65536000000000000000e5
-3591 3 27 40 0.65536000000000000000e5
-3591 3 38 42 0.65536000000000000000e5
-3592 1 24 55 -0.65536000000000000000e5
-3592 1 26 41 0.65536000000000000000e5
-3592 3 22 51 0.65536000000000000000e5
-3592 3 23 52 -0.13107200000000000000e6
-3592 3 27 40 -0.65536000000000000000e5
-3592 3 38 43 0.65536000000000000000e5
-3592 4 7 35 0.65536000000000000000e5
-3593 3 23 52 -0.65536000000000000000e5
-3593 3 38 44 0.65536000000000000000e5
-3594 3 10 55 0.65536000000000000000e5
-3594 3 35 48 -0.13107200000000000000e6
-3594 3 38 45 0.65536000000000000000e5
-3594 3 40 45 0.65536000000000000000e5
-3594 4 22 34 0.65536000000000000000e5
-3595 1 34 49 -0.65536000000000000000e5
-3595 1 44 51 0.65536000000000000000e5
-3595 3 38 46 0.65536000000000000000e5
-3596 1 23 54 -0.65536000000000000000e5
-3596 1 38 53 0.65536000000000000000e5
-3596 3 38 47 0.65536000000000000000e5
-3597 3 24 53 -0.65536000000000000000e5
-3597 3 38 48 0.65536000000000000000e5
-3598 3 24 53 0.65536000000000000000e5
-3598 3 25 54 0.65536000000000000000e5
-3598 3 38 49 0.65536000000000000000e5
-3598 3 38 51 -0.13107200000000000000e6
-3598 4 28 32 0.65536000000000000000e5
-3599 1 24 55 -0.65536000000000000000e5
-3599 1 41 56 0.65536000000000000000e5
-3599 3 27 56 0.65536000000000000000e5
-3599 3 38 50 0.65536000000000000000e5
-3600 1 1 48 0.16384000000000000000e5
-3600 1 2 49 0.16384000000000000000e5
-3600 1 8 39 0.32768000000000000000e5
-3600 1 9 40 0.32768000000000000000e5
-3600 1 10 41 -0.65536000000000000000e5
-3600 1 12 43 -0.13107200000000000000e6
-3600 1 23 38 0.16384000000000000000e5
-3600 1 24 55 -0.32768000000000000000e5
-3600 1 26 41 -0.32768000000000000000e5
-3600 1 28 43 0.13107200000000000000e6
-3600 1 32 47 0.13107200000000000000e6
-3600 1 33 48 -0.65536000000000000000e5
-3600 1 40 55 0.32768000000000000000e5
-3600 1 41 56 0.32768000000000000000e5
-3600 2 2 32 0.16384000000000000000e5
-3600 2 4 34 -0.32768000000000000000e5
-3600 2 16 30 0.32768000000000000000e5
-3600 2 20 34 0.65536000000000000000e5
-3600 2 28 34 0.32768000000000000000e5
-3600 3 5 50 -0.32768000000000000000e5
-3600 3 9 38 0.32768000000000000000e5
-3600 3 10 55 -0.65536000000000000000e5
-3600 3 22 35 0.13107200000000000000e6
-3600 3 22 51 0.32768000000000000000e5
-3600 3 23 52 -0.65536000000000000000e5
-3600 3 27 40 -0.32768000000000000000e5
-3600 3 27 56 0.32768000000000000000e5
-3600 3 28 41 0.13107200000000000000e6
-3600 3 35 48 0.13107200000000000000e6
-3600 3 38 51 -0.32768000000000000000e5
-3600 3 38 52 0.65536000000000000000e5
-3600 3 40 45 -0.65536000000000000000e5
-3600 4 2 30 0.32768000000000000000e5
-3600 4 6 34 0.65536000000000000000e5
-3600 4 7 35 0.32768000000000000000e5
-3600 4 22 34 -0.65536000000000000000e5
-3600 4 29 33 -0.32768000000000000000e5
-3601 1 40 47 -0.65536000000000000000e5
-3601 1 47 54 0.65536000000000000000e5
-3601 3 24 53 0.65536000000000000000e5
-3601 3 38 53 0.65536000000000000000e5
-3602 1 1 48 -0.65536000000000000000e5
-3602 1 2 49 -0.13107200000000000000e6
-3602 1 6 53 0.65536000000000000000e5
-3602 1 8 39 -0.13107200000000000000e6
-3602 1 9 40 -0.13107200000000000000e6
-3602 1 10 41 0.26214400000000000000e6
-3602 1 12 43 0.52428800000000000000e6
-3602 1 23 38 -0.65536000000000000000e5
-3602 1 24 39 -0.65536000000000000000e5
-3602 1 24 55 -0.13107200000000000000e6
-3602 1 25 56 -0.65536000000000000000e5
-3602 1 26 41 0.26214400000000000000e6
-3602 1 28 43 -0.26214400000000000000e6
-3602 1 32 47 -0.52428800000000000000e6
-3602 1 47 54 -0.65536000000000000000e5
-3602 2 2 32 -0.65536000000000000000e5
-3602 2 3 33 -0.65536000000000000000e5
-3602 2 5 35 0.65536000000000000000e5
-3602 2 16 30 -0.13107200000000000000e6
-3602 2 20 34 -0.26214400000000000000e6
-3602 2 33 35 -0.65536000000000000000e5
-3602 3 9 38 -0.13107200000000000000e6
-3602 3 22 35 -0.52428800000000000000e6
-3602 3 22 51 0.13107200000000000000e6
-3602 3 23 52 -0.26214400000000000000e6
-3602 3 25 38 -0.65536000000000000000e5
-3602 3 25 54 0.65536000000000000000e5
-3602 3 27 40 -0.13107200000000000000e6
-3602 3 28 41 -0.52428800000000000000e6
-3602 3 38 51 -0.13107200000000000000e6
-3602 3 38 54 0.65536000000000000000e5
-3602 3 39 40 0.65536000000000000000e5
-3602 3 40 53 0.65536000000000000000e5
-3602 3 41 54 -0.13107200000000000000e6
-3602 4 2 30 -0.13107200000000000000e6
-3602 4 6 34 -0.26214400000000000000e6
-3602 4 7 35 0.13107200000000000000e6
-3603 3 38 55 0.65536000000000000000e5
-3603 3 41 54 -0.65536000000000000000e5
-3604 3 38 56 0.65536000000000000000e5
-3604 3 48 53 -0.65536000000000000000e5
-3605 1 6 53 -0.32768000000000000000e5
-3605 1 25 56 0.32768000000000000000e5
-3605 3 24 53 -0.32768000000000000000e5
-3605 3 25 54 -0.32768000000000000000e5
-3605 3 38 51 0.65536000000000000000e5
-3605 3 39 39 0.65536000000000000000e5
-3605 4 28 32 -0.32768000000000000000e5
-3606 1 24 55 0.65536000000000000000e5
-3606 1 26 41 -0.65536000000000000000e5
-3606 3 27 40 0.65536000000000000000e5
-3606 3 39 41 0.65536000000000000000e5
-3607 1 24 55 -0.65536000000000000000e5
-3607 1 26 41 0.65536000000000000000e5
-3607 3 22 51 0.65536000000000000000e5
-3607 3 23 52 -0.13107200000000000000e6
-3607 3 27 40 -0.65536000000000000000e5
-3607 3 39 42 0.65536000000000000000e5
-3607 4 7 35 0.65536000000000000000e5
-3608 3 10 55 0.13107200000000000000e6
-3608 3 22 51 -0.65536000000000000000e5
-3608 3 23 52 0.13107200000000000000e6
-3608 3 35 48 -0.26214400000000000000e6
-3608 3 39 43 0.65536000000000000000e5
-3608 3 40 45 0.13107200000000000000e6
-3608 4 7 35 -0.65536000000000000000e5
-3608 4 21 33 0.65536000000000000000e5
-3608 4 22 34 0.13107200000000000000e6
-3609 3 10 55 0.65536000000000000000e5
-3609 3 35 48 -0.13107200000000000000e6
-3609 3 39 44 0.65536000000000000000e5
-3609 3 40 45 0.65536000000000000000e5
-3609 4 22 34 0.65536000000000000000e5
-3610 3 10 55 -0.65536000000000000000e5
-3610 3 39 45 0.65536000000000000000e5
-3611 3 35 48 -0.65536000000000000000e5
-3611 3 39 46 0.65536000000000000000e5
-3612 3 24 53 -0.65536000000000000000e5
-3612 3 39 47 0.65536000000000000000e5
-3613 3 24 53 0.65536000000000000000e5
-3613 3 25 54 0.65536000000000000000e5
-3613 3 38 51 -0.13107200000000000000e6
-3613 3 39 48 0.65536000000000000000e5
-3613 4 28 32 0.65536000000000000000e5
-3614 3 25 54 -0.65536000000000000000e5
-3614 3 39 49 0.65536000000000000000e5
-3615 3 38 51 -0.65536000000000000000e5
-3615 3 39 50 0.65536000000000000000e5
-3616 1 1 48 0.32768000000000000000e5
-3616 1 2 49 0.32768000000000000000e5
-3616 1 8 39 0.65536000000000000000e5
-3616 1 9 40 0.65536000000000000000e5
-3616 1 10 41 -0.13107200000000000000e6
-3616 1 12 43 -0.26214400000000000000e6
-3616 1 23 38 0.32768000000000000000e5
-3616 1 26 41 -0.65536000000000000000e5
-3616 1 28 43 0.26214400000000000000e6
-3616 1 32 47 0.26214400000000000000e6
-3616 1 33 48 -0.13107200000000000000e6
-3616 1 40 55 0.65536000000000000000e5
-3616 2 2 32 0.32768000000000000000e5
-3616 2 4 34 -0.65536000000000000000e5
-3616 2 16 30 0.65536000000000000000e5
-3616 2 20 34 0.13107200000000000000e6
-3616 2 28 34 0.65536000000000000000e5
-3616 3 5 50 -0.65536000000000000000e5
-3616 3 9 38 0.65536000000000000000e5
-3616 3 10 55 -0.13107200000000000000e6
-3616 3 22 35 0.26214400000000000000e6
-3616 3 22 51 0.65536000000000000000e5
-3616 3 23 52 -0.13107200000000000000e6
-3616 3 27 40 -0.65536000000000000000e5
-3616 3 28 41 0.26214400000000000000e6
-3616 3 35 48 0.26214400000000000000e6
-3616 3 39 51 0.65536000000000000000e5
-3616 3 40 45 -0.13107200000000000000e6
-3616 4 2 30 0.65536000000000000000e5
-3616 4 6 34 0.13107200000000000000e6
-3616 4 7 35 0.65536000000000000000e5
-3616 4 22 34 -0.13107200000000000000e6
-3617 1 1 48 -0.65536000000000000000e5
-3617 1 2 49 -0.13107200000000000000e6
-3617 1 6 53 0.65536000000000000000e5
-3617 1 8 39 -0.13107200000000000000e6
-3617 1 9 40 -0.13107200000000000000e6
-3617 1 10 41 0.26214400000000000000e6
-3617 1 12 43 0.52428800000000000000e6
-3617 1 23 38 -0.65536000000000000000e5
-3617 1 24 39 -0.65536000000000000000e5
-3617 1 24 55 -0.13107200000000000000e6
-3617 1 25 56 -0.65536000000000000000e5
-3617 1 26 41 0.26214400000000000000e6
-3617 1 28 43 -0.26214400000000000000e6
-3617 1 32 47 -0.52428800000000000000e6
-3617 1 47 54 -0.65536000000000000000e5
-3617 2 2 32 -0.65536000000000000000e5
-3617 2 3 33 -0.65536000000000000000e5
-3617 2 5 35 0.65536000000000000000e5
-3617 2 16 30 -0.13107200000000000000e6
-3617 2 20 34 -0.26214400000000000000e6
-3617 2 33 35 -0.65536000000000000000e5
-3617 3 9 38 -0.13107200000000000000e6
-3617 3 22 35 -0.52428800000000000000e6
-3617 3 22 51 0.13107200000000000000e6
-3617 3 23 52 -0.26214400000000000000e6
-3617 3 25 38 -0.65536000000000000000e5
-3617 3 25 54 0.65536000000000000000e5
-3617 3 27 40 -0.13107200000000000000e6
-3617 3 28 41 -0.52428800000000000000e6
-3617 3 38 51 -0.13107200000000000000e6
-3617 3 39 40 0.65536000000000000000e5
-3617 3 39 53 0.65536000000000000000e5
-3617 3 40 53 0.65536000000000000000e5
-3617 3 41 54 -0.13107200000000000000e6
-3617 4 2 30 -0.13107200000000000000e6
-3617 4 6 34 -0.26214400000000000000e6
-3617 4 7 35 0.13107200000000000000e6
-3618 3 39 54 0.65536000000000000000e5
-3618 3 40 53 -0.65536000000000000000e5
-3619 3 39 55 0.65536000000000000000e5
-3619 3 49 50 -0.65536000000000000000e5
-3620 1 1 48 -0.13107200000000000000e6
-3620 1 2 49 -0.19660800000000000000e6
-3620 1 6 53 0.65536000000000000000e5
-3620 1 8 39 -0.26214400000000000000e6
-3620 1 9 40 -0.26214400000000000000e6
-3620 1 10 41 0.52428800000000000000e6
-3620 1 12 43 0.10485760000000000000e7
-3620 1 23 38 -0.13107200000000000000e6
-3620 1 24 39 -0.65536000000000000000e5
-3620 1 26 41 0.39321600000000000000e6
-3620 1 28 43 -0.78643200000000000000e6
-3620 1 32 47 -0.10485760000000000000e7
-3620 1 49 56 0.65536000000000000000e5
-3620 2 2 32 -0.13107200000000000000e6
-3620 2 3 33 -0.65536000000000000000e5
-3620 2 4 34 0.13107200000000000000e6
-3620 2 5 35 0.65536000000000000000e5
-3620 2 16 30 -0.26214400000000000000e6
-3620 2 20 34 -0.52428800000000000000e6
-3620 3 5 50 0.13107200000000000000e6
-3620 3 9 38 -0.26214400000000000000e6
-3620 3 22 35 -0.10485760000000000000e7
-3620 3 25 38 -0.65536000000000000000e5
-3620 3 25 54 0.65536000000000000000e5
-3620 3 28 41 -0.10485760000000000000e7
-3620 3 39 40 0.65536000000000000000e5
-3620 3 39 56 0.65536000000000000000e5
-3620 3 40 53 0.65536000000000000000e5
-3620 4 2 30 -0.26214400000000000000e6
-3620 4 6 34 -0.52428800000000000000e6
-3621 1 6 53 0.32768000000000000000e5
-3621 1 25 56 -0.32768000000000000000e5
-3621 3 10 55 0.13107200000000000000e6
-3621 3 22 51 -0.65536000000000000000e5
-3621 3 23 52 0.13107200000000000000e6
-3621 3 24 53 0.32768000000000000000e5
-3621 3 25 54 0.32768000000000000000e5
-3621 3 35 48 -0.26214400000000000000e6
-3621 3 38 51 -0.65536000000000000000e5
-3621 3 39 40 0.32768000000000000000e5
-3621 3 40 40 0.65536000000000000000e5
-3621 3 40 45 0.13107200000000000000e6
-3621 4 7 35 -0.65536000000000000000e5
-3621 4 21 33 0.65536000000000000000e5
-3621 4 22 34 0.13107200000000000000e6
-3621 4 28 28 0.65536000000000000000e5
-3621 4 28 32 0.32768000000000000000e5
-3622 1 24 55 -0.65536000000000000000e5
-3622 1 26 41 0.65536000000000000000e5
-3622 3 22 51 0.65536000000000000000e5
-3622 3 23 52 -0.13107200000000000000e6
-3622 3 27 40 -0.65536000000000000000e5
-3622 3 40 41 0.65536000000000000000e5
-3622 4 7 35 0.65536000000000000000e5
-3623 3 10 55 0.13107200000000000000e6
-3623 3 22 51 -0.65536000000000000000e5
-3623 3 23 52 0.13107200000000000000e6
-3623 3 35 48 -0.26214400000000000000e6
-3623 3 40 42 0.65536000000000000000e5
-3623 3 40 45 0.13107200000000000000e6
-3623 4 7 35 -0.65536000000000000000e5
-3623 4 21 33 0.65536000000000000000e5
-3623 4 22 34 0.13107200000000000000e6
-3624 3 6 55 -0.65536000000000000000e5
-3624 3 40 43 0.65536000000000000000e5
-3625 3 10 55 -0.65536000000000000000e5
-3625 3 40 44 0.65536000000000000000e5
-3626 1 11 18 -0.13107200000000000000e6
-3626 1 34 49 0.65536000000000000000e5
-3626 1 44 51 -0.65536000000000000000e5
-3626 1 45 52 0.13107200000000000000e6
-3626 3 6 19 0.13107200000000000000e6
-3626 3 15 44 0.13107200000000000000e6
-3626 3 17 30 0.13107200000000000000e6
-3626 3 32 45 0.13107200000000000000e6
-3626 3 35 48 0.65536000000000000000e5
-3626 3 40 46 0.65536000000000000000e5
-3626 4 25 33 0.65536000000000000000e5
-3627 3 24 53 0.65536000000000000000e5
-3627 3 25 54 0.65536000000000000000e5
-3627 3 38 51 -0.13107200000000000000e6
-3627 3 40 47 0.65536000000000000000e5
-3627 4 28 32 0.65536000000000000000e5
-3628 3 25 54 -0.65536000000000000000e5
-3628 3 40 48 0.65536000000000000000e5
-3629 1 1 48 0.65536000000000000000e5
-3629 1 2 49 0.65536000000000000000e5
-3629 1 8 39 0.13107200000000000000e6
-3629 1 9 40 0.13107200000000000000e6
-3629 1 10 41 -0.26214400000000000000e6
-3629 1 12 43 -0.52428800000000000000e6
-3629 1 23 38 0.65536000000000000000e5
-3629 1 26 41 -0.13107200000000000000e6
-3629 1 28 43 0.52428800000000000000e6
-3629 1 32 47 0.52428800000000000000e6
-3629 1 33 48 -0.26214400000000000000e6
-3629 1 40 55 0.13107200000000000000e6
-3629 2 2 32 0.65536000000000000000e5
-3629 2 4 34 -0.13107200000000000000e6
-3629 2 16 30 0.13107200000000000000e6
-3629 2 20 34 0.26214400000000000000e6
-3629 2 28 34 0.13107200000000000000e6
-3629 3 5 50 -0.13107200000000000000e6
-3629 3 9 38 0.13107200000000000000e6
-3629 3 10 55 -0.26214400000000000000e6
-3629 3 22 35 0.52428800000000000000e6
-3629 3 22 51 0.13107200000000000000e6
-3629 3 23 52 -0.26214400000000000000e6
-3629 3 24 53 -0.65536000000000000000e5
-3629 3 27 40 -0.13107200000000000000e6
-3629 3 28 41 0.52428800000000000000e6
-3629 3 35 48 0.52428800000000000000e6
-3629 3 38 51 0.13107200000000000000e6
-3629 3 40 45 -0.26214400000000000000e6
-3629 3 40 49 0.65536000000000000000e5
-3629 4 2 30 0.13107200000000000000e6
-3629 4 6 34 0.26214400000000000000e6
-3629 4 7 35 0.13107200000000000000e6
-3629 4 19 35 0.65536000000000000000e5
-3629 4 22 34 -0.26214400000000000000e6
-3629 4 28 32 -0.65536000000000000000e5
-3630 1 1 48 0.32768000000000000000e5
-3630 1 2 49 0.32768000000000000000e5
-3630 1 8 39 0.65536000000000000000e5
-3630 1 9 40 0.65536000000000000000e5
-3630 1 10 41 -0.13107200000000000000e6
-3630 1 12 43 -0.26214400000000000000e6
-3630 1 23 38 0.32768000000000000000e5
-3630 1 26 41 -0.65536000000000000000e5
-3630 1 28 43 0.26214400000000000000e6
-3630 1 32 47 0.26214400000000000000e6
-3630 1 33 48 -0.13107200000000000000e6
-3630 1 40 55 0.65536000000000000000e5
-3630 2 2 32 0.32768000000000000000e5
-3630 2 4 34 -0.65536000000000000000e5
-3630 2 16 30 0.65536000000000000000e5
-3630 2 20 34 0.13107200000000000000e6
-3630 2 28 34 0.65536000000000000000e5
-3630 3 5 50 -0.65536000000000000000e5
-3630 3 9 38 0.65536000000000000000e5
-3630 3 10 55 -0.13107200000000000000e6
-3630 3 22 35 0.26214400000000000000e6
-3630 3 22 51 0.65536000000000000000e5
-3630 3 23 52 -0.13107200000000000000e6
-3630 3 27 40 -0.65536000000000000000e5
-3630 3 28 41 0.26214400000000000000e6
-3630 3 35 48 0.26214400000000000000e6
-3630 3 40 45 -0.13107200000000000000e6
-3630 3 40 50 0.65536000000000000000e5
-3630 4 2 30 0.65536000000000000000e5
-3630 4 6 34 0.13107200000000000000e6
-3630 4 7 35 0.65536000000000000000e5
-3630 4 22 34 -0.13107200000000000000e6
-3631 3 26 55 -0.65536000000000000000e5
-3631 3 40 51 0.65536000000000000000e5
-3632 1 1 48 -0.16384000000000000000e5
-3632 1 2 49 -0.16384000000000000000e5
-3632 1 8 39 -0.32768000000000000000e5
-3632 1 9 40 -0.32768000000000000000e5
-3632 1 10 41 0.65536000000000000000e5
-3632 1 12 43 0.13107200000000000000e6
-3632 1 23 38 -0.16384000000000000000e5
-3632 1 24 55 0.32768000000000000000e5
-3632 1 26 41 0.32768000000000000000e5
-3632 1 28 43 -0.13107200000000000000e6
-3632 1 32 47 -0.13107200000000000000e6
-3632 1 33 48 0.65536000000000000000e5
-3632 1 40 55 -0.32768000000000000000e5
-3632 1 41 56 -0.32768000000000000000e5
-3632 2 2 32 -0.16384000000000000000e5
-3632 2 4 34 0.32768000000000000000e5
-3632 2 16 30 -0.32768000000000000000e5
-3632 2 20 34 -0.65536000000000000000e5
-3632 2 28 34 -0.32768000000000000000e5
-3632 3 5 50 0.32768000000000000000e5
-3632 3 9 38 -0.32768000000000000000e5
-3632 3 10 55 0.65536000000000000000e5
-3632 3 22 35 -0.13107200000000000000e6
-3632 3 22 51 -0.32768000000000000000e5
-3632 3 23 52 0.65536000000000000000e5
-3632 3 27 40 0.32768000000000000000e5
-3632 3 27 56 -0.32768000000000000000e5
-3632 3 28 41 -0.13107200000000000000e6
-3632 3 35 48 -0.13107200000000000000e6
-3632 3 38 51 0.32768000000000000000e5
-3632 3 39 52 0.65536000000000000000e5
-3632 3 40 45 0.65536000000000000000e5
-3632 3 40 52 0.65536000000000000000e5
-3632 3 45 50 -0.13107200000000000000e6
-3632 4 2 30 -0.32768000000000000000e5
-3632 4 6 34 -0.65536000000000000000e5
-3632 4 7 35 -0.32768000000000000000e5
-3632 4 22 34 0.65536000000000000000e5
-3632 4 29 33 0.32768000000000000000e5
-3632 4 30 34 0.65536000000000000000e5
-3633 1 1 48 0.65536000000000000000e5
-3633 1 2 49 0.13107200000000000000e6
-3633 1 6 53 -0.65536000000000000000e5
-3633 1 8 39 0.13107200000000000000e6
-3633 1 9 40 0.13107200000000000000e6
-3633 1 10 41 -0.26214400000000000000e6
-3633 1 12 43 -0.52428800000000000000e6
-3633 1 23 38 0.65536000000000000000e5
-3633 1 24 39 0.65536000000000000000e5
-3633 1 24 55 0.13107200000000000000e6
-3633 1 25 56 0.65536000000000000000e5
-3633 1 26 41 -0.26214400000000000000e6
-3633 1 28 43 0.26214400000000000000e6
-3633 1 32 47 0.52428800000000000000e6
-3633 1 47 54 0.65536000000000000000e5
-3633 2 2 32 0.65536000000000000000e5
-3633 2 3 33 0.65536000000000000000e5
-3633 2 5 35 -0.65536000000000000000e5
-3633 2 16 30 0.13107200000000000000e6
-3633 2 20 34 0.26214400000000000000e6
-3633 2 33 35 0.65536000000000000000e5
-3633 3 9 38 0.13107200000000000000e6
-3633 3 22 35 0.52428800000000000000e6
-3633 3 22 51 -0.13107200000000000000e6
-3633 3 23 52 0.26214400000000000000e6
-3633 3 25 38 0.65536000000000000000e5
-3633 3 25 54 -0.65536000000000000000e5
-3633 3 27 40 0.13107200000000000000e6
-3633 3 28 41 0.52428800000000000000e6
-3633 3 38 51 0.13107200000000000000e6
-3633 3 39 40 -0.65536000000000000000e5
-3633 3 40 54 0.65536000000000000000e5
-3633 3 41 54 0.13107200000000000000e6
-3633 3 49 50 -0.13107200000000000000e6
-3633 4 2 30 0.13107200000000000000e6
-3633 4 6 34 0.26214400000000000000e6
-3633 4 7 35 -0.13107200000000000000e6
-3633 4 33 33 0.13107200000000000000e6
-3634 3 40 56 0.65536000000000000000e5
-3634 3 49 54 -0.65536000000000000000e5
-3635 1 32 47 -0.32768000000000000000e5
-3635 1 37 52 0.32768000000000000000e5
-3635 3 41 41 0.65536000000000000000e5
-3636 3 23 52 -0.65536000000000000000e5
-3636 3 41 42 0.65536000000000000000e5
-3637 3 10 55 0.65536000000000000000e5
-3637 3 35 48 -0.13107200000000000000e6
-3637 3 40 45 0.65536000000000000000e5
-3637 3 41 43 0.65536000000000000000e5
-3637 4 22 34 0.65536000000000000000e5
-3638 3 34 47 -0.65536000000000000000e5
-3638 3 41 44 0.65536000000000000000e5
-3639 1 34 49 -0.65536000000000000000e5
-3639 1 44 51 0.65536000000000000000e5
-3639 3 41 45 0.65536000000000000000e5
-3640 3 37 50 -0.65536000000000000000e5
-3640 3 41 47 0.65536000000000000000e5
-3641 1 24 55 -0.65536000000000000000e5
-3641 1 41 56 0.65536000000000000000e5
-3641 3 27 56 0.65536000000000000000e5
-3641 3 41 48 0.65536000000000000000e5
-3642 3 38 51 -0.65536000000000000000e5
-3642 3 41 49 0.65536000000000000000e5
-3643 1 1 48 -0.16384000000000000000e5
-3643 1 2 49 -0.16384000000000000000e5
-3643 1 8 39 -0.32768000000000000000e5
-3643 1 9 40 -0.32768000000000000000e5
-3643 1 10 41 0.65536000000000000000e5
-3643 1 12 43 0.13107200000000000000e6
-3643 1 23 38 -0.16384000000000000000e5
-3643 1 24 55 0.32768000000000000000e5
-3643 1 26 41 0.32768000000000000000e5
-3643 1 28 43 -0.13107200000000000000e6
-3643 1 32 47 -0.13107200000000000000e6
-3643 1 33 48 0.65536000000000000000e5
-3643 1 40 55 -0.32768000000000000000e5
-3643 1 41 56 -0.32768000000000000000e5
-3643 1 44 51 -0.13107200000000000000e6
-3643 1 46 53 0.13107200000000000000e6
-3643 2 2 32 -0.16384000000000000000e5
-3643 2 4 34 0.32768000000000000000e5
-3643 2 16 30 -0.32768000000000000000e5
-3643 2 20 34 -0.65536000000000000000e5
-3643 2 28 34 -0.32768000000000000000e5
-3643 3 5 50 0.32768000000000000000e5
-3643 3 9 38 -0.32768000000000000000e5
-3643 3 10 55 0.65536000000000000000e5
-3643 3 22 35 -0.13107200000000000000e6
-3643 3 22 51 -0.32768000000000000000e5
-3643 3 23 52 0.65536000000000000000e5
-3643 3 27 40 0.32768000000000000000e5
-3643 3 27 56 -0.32768000000000000000e5
-3643 3 28 41 -0.13107200000000000000e6
-3643 3 35 48 -0.13107200000000000000e6
-3643 3 38 51 0.32768000000000000000e5
-3643 3 39 52 0.65536000000000000000e5
-3643 3 40 45 0.65536000000000000000e5
-3643 3 41 50 0.65536000000000000000e5
-3643 4 2 30 -0.32768000000000000000e5
-3643 4 6 34 -0.65536000000000000000e5
-3643 4 7 35 -0.32768000000000000000e5
-3643 4 22 34 0.65536000000000000000e5
-3643 4 23 35 0.65536000000000000000e5
-3643 4 29 33 0.32768000000000000000e5
-3644 1 1 48 0.16384000000000000000e5
-3644 1 2 49 0.16384000000000000000e5
-3644 1 8 39 0.32768000000000000000e5
-3644 1 9 40 0.32768000000000000000e5
-3644 1 10 41 -0.65536000000000000000e5
-3644 1 12 43 -0.13107200000000000000e6
-3644 1 23 38 0.16384000000000000000e5
-3644 1 24 55 -0.32768000000000000000e5
-3644 1 26 41 -0.32768000000000000000e5
-3644 1 28 43 0.13107200000000000000e6
-3644 1 32 47 0.13107200000000000000e6
-3644 1 33 48 -0.65536000000000000000e5
-3644 1 40 55 0.32768000000000000000e5
-3644 1 41 56 0.32768000000000000000e5
-3644 2 2 32 0.16384000000000000000e5
-3644 2 4 34 -0.32768000000000000000e5
-3644 2 16 30 0.32768000000000000000e5
-3644 2 20 34 0.65536000000000000000e5
-3644 2 28 34 0.32768000000000000000e5
-3644 3 5 50 -0.32768000000000000000e5
-3644 3 9 38 0.32768000000000000000e5
-3644 3 10 55 -0.65536000000000000000e5
-3644 3 22 35 0.13107200000000000000e6
-3644 3 22 51 0.32768000000000000000e5
-3644 3 23 52 -0.65536000000000000000e5
-3644 3 27 40 -0.32768000000000000000e5
-3644 3 27 56 0.32768000000000000000e5
-3644 3 28 41 0.13107200000000000000e6
-3644 3 35 48 0.13107200000000000000e6
-3644 3 38 51 -0.32768000000000000000e5
-3644 3 40 45 -0.65536000000000000000e5
-3644 3 41 51 0.65536000000000000000e5
-3644 4 2 30 0.32768000000000000000e5
-3644 4 6 34 0.65536000000000000000e5
-3644 4 7 35 0.32768000000000000000e5
-3644 4 22 34 -0.65536000000000000000e5
-3644 4 29 33 -0.32768000000000000000e5
-3645 1 44 51 -0.65536000000000000000e5
-3645 1 46 53 0.65536000000000000000e5
-3645 3 41 52 0.65536000000000000000e5
-3646 3 27 56 -0.65536000000000000000e5
-3646 3 41 53 0.65536000000000000000e5
-3647 3 41 55 0.65536000000000000000e5
-3647 3 47 52 -0.65536000000000000000e5
-3648 3 10 55 0.32768000000000000000e5
-3648 3 35 48 -0.65536000000000000000e5
-3648 3 40 45 0.32768000000000000000e5
-3648 3 42 42 0.65536000000000000000e5
-3648 4 22 34 0.32768000000000000000e5
-3649 3 10 55 -0.65536000000000000000e5
-3649 3 42 43 0.65536000000000000000e5
-3650 1 34 49 -0.65536000000000000000e5
-3650 1 44 51 0.65536000000000000000e5
-3650 3 42 44 0.65536000000000000000e5
-3651 3 35 48 -0.65536000000000000000e5
-3651 3 42 45 0.65536000000000000000e5
-3652 1 11 18 -0.65536000000000000000e5
-3652 1 45 52 0.65536000000000000000e5
-3652 3 6 19 0.65536000000000000000e5
-3652 3 15 44 0.65536000000000000000e5
-3652 3 17 30 0.65536000000000000000e5
-3652 3 32 45 0.65536000000000000000e5
-3652 3 42 46 0.65536000000000000000e5
-3653 1 24 55 -0.65536000000000000000e5
-3653 1 41 56 0.65536000000000000000e5
-3653 3 27 56 0.65536000000000000000e5
-3653 3 42 47 0.65536000000000000000e5
-3654 3 38 51 -0.65536000000000000000e5
-3654 3 42 48 0.65536000000000000000e5
-3655 1 1 48 0.32768000000000000000e5
-3655 1 2 49 0.32768000000000000000e5
-3655 1 8 39 0.65536000000000000000e5
-3655 1 9 40 0.65536000000000000000e5
-3655 1 10 41 -0.13107200000000000000e6
-3655 1 12 43 -0.26214400000000000000e6
-3655 1 23 38 0.32768000000000000000e5
-3655 1 26 41 -0.65536000000000000000e5
-3655 1 28 43 0.26214400000000000000e6
-3655 1 32 47 0.26214400000000000000e6
-3655 1 33 48 -0.13107200000000000000e6
-3655 1 40 55 0.65536000000000000000e5
-3655 2 2 32 0.32768000000000000000e5
-3655 2 4 34 -0.65536000000000000000e5
-3655 2 16 30 0.65536000000000000000e5
-3655 2 20 34 0.13107200000000000000e6
-3655 2 28 34 0.65536000000000000000e5
-3655 3 5 50 -0.65536000000000000000e5
-3655 3 9 38 0.65536000000000000000e5
-3655 3 10 55 -0.13107200000000000000e6
-3655 3 22 35 0.26214400000000000000e6
-3655 3 22 51 0.65536000000000000000e5
-3655 3 23 52 -0.13107200000000000000e6
-3655 3 27 40 -0.65536000000000000000e5
-3655 3 28 41 0.26214400000000000000e6
-3655 3 35 48 0.26214400000000000000e6
-3655 3 40 45 -0.13107200000000000000e6
-3655 3 42 49 0.65536000000000000000e5
-3655 4 2 30 0.65536000000000000000e5
-3655 4 6 34 0.13107200000000000000e6
-3655 4 7 35 0.65536000000000000000e5
-3655 4 22 34 -0.13107200000000000000e6
-3656 1 1 48 0.16384000000000000000e5
-3656 1 2 49 0.16384000000000000000e5
-3656 1 8 39 0.32768000000000000000e5
-3656 1 9 40 0.32768000000000000000e5
-3656 1 10 41 -0.65536000000000000000e5
-3656 1 12 43 -0.13107200000000000000e6
-3656 1 23 38 0.16384000000000000000e5
-3656 1 24 55 -0.32768000000000000000e5
-3656 1 26 41 -0.32768000000000000000e5
-3656 1 28 43 0.13107200000000000000e6
-3656 1 32 47 0.13107200000000000000e6
-3656 1 33 48 -0.65536000000000000000e5
-3656 1 40 55 0.32768000000000000000e5
-3656 1 41 56 0.32768000000000000000e5
-3656 2 2 32 0.16384000000000000000e5
-3656 2 4 34 -0.32768000000000000000e5
-3656 2 16 30 0.32768000000000000000e5
-3656 2 20 34 0.65536000000000000000e5
-3656 2 28 34 0.32768000000000000000e5
-3656 3 5 50 -0.32768000000000000000e5
-3656 3 9 38 0.32768000000000000000e5
-3656 3 10 55 -0.65536000000000000000e5
-3656 3 22 35 0.13107200000000000000e6
-3656 3 22 51 0.32768000000000000000e5
-3656 3 23 52 -0.65536000000000000000e5
-3656 3 27 40 -0.32768000000000000000e5
-3656 3 27 56 0.32768000000000000000e5
-3656 3 28 41 0.13107200000000000000e6
-3656 3 35 48 0.13107200000000000000e6
-3656 3 38 51 -0.32768000000000000000e5
-3656 3 40 45 -0.65536000000000000000e5
-3656 3 42 50 0.65536000000000000000e5
-3656 4 2 30 0.32768000000000000000e5
-3656 4 6 34 0.65536000000000000000e5
-3656 4 7 35 0.32768000000000000000e5
-3656 4 22 34 -0.65536000000000000000e5
-3656 4 29 33 -0.32768000000000000000e5
-3657 3 39 52 -0.65536000000000000000e5
-3657 3 42 51 0.65536000000000000000e5
-3658 3 42 52 0.65536000000000000000e5
-3658 3 45 50 -0.65536000000000000000e5
-3659 3 41 54 -0.65536000000000000000e5
-3659 3 42 53 0.65536000000000000000e5
-3660 3 42 54 0.65536000000000000000e5
-3660 3 49 50 -0.65536000000000000000e5
-3661 1 40 55 -0.65536000000000000000e5
-3661 1 54 55 0.65536000000000000000e5
-3661 3 42 56 0.65536000000000000000e5
-3661 3 49 50 0.65536000000000000000e5
-3662 3 40 45 -0.32768000000000000000e5
-3662 3 43 43 0.65536000000000000000e5
-3663 3 35 48 -0.65536000000000000000e5
-3663 3 43 44 0.65536000000000000000e5
-3664 1 11 18 -0.13107200000000000000e6
-3664 1 34 49 0.65536000000000000000e5
-3664 1 44 51 -0.65536000000000000000e5
-3664 1 45 52 0.13107200000000000000e6
-3664 3 6 19 0.13107200000000000000e6
-3664 3 15 44 0.13107200000000000000e6
-3664 3 17 30 0.13107200000000000000e6
-3664 3 32 45 0.13107200000000000000e6
-3664 3 35 48 0.65536000000000000000e5
-3664 3 43 45 0.65536000000000000000e5
-3664 4 25 33 0.65536000000000000000e5
-3665 3 36 49 -0.65536000000000000000e5
-3665 3 43 46 0.65536000000000000000e5
-3666 3 38 51 -0.65536000000000000000e5
-3666 3 43 47 0.65536000000000000000e5
-3667 1 1 48 0.32768000000000000000e5
-3667 1 2 49 0.32768000000000000000e5
-3667 1 8 39 0.65536000000000000000e5
-3667 1 9 40 0.65536000000000000000e5
-3667 1 10 41 -0.13107200000000000000e6
-3667 1 12 43 -0.26214400000000000000e6
-3667 1 23 38 0.32768000000000000000e5
-3667 1 26 41 -0.65536000000000000000e5
-3667 1 28 43 0.26214400000000000000e6
-3667 1 32 47 0.26214400000000000000e6
-3667 1 33 48 -0.13107200000000000000e6
-3667 1 40 55 0.65536000000000000000e5
-3667 2 2 32 0.32768000000000000000e5
-3667 2 4 34 -0.65536000000000000000e5
-3667 2 16 30 0.65536000000000000000e5
-3667 2 20 34 0.13107200000000000000e6
-3667 2 28 34 0.65536000000000000000e5
-3667 3 5 50 -0.65536000000000000000e5
-3667 3 9 38 0.65536000000000000000e5
-3667 3 10 55 -0.13107200000000000000e6
-3667 3 22 35 0.26214400000000000000e6
-3667 3 22 51 0.65536000000000000000e5
-3667 3 23 52 -0.13107200000000000000e6
-3667 3 27 40 -0.65536000000000000000e5
-3667 3 28 41 0.26214400000000000000e6
-3667 3 35 48 0.26214400000000000000e6
-3667 3 40 45 -0.13107200000000000000e6
-3667 3 43 48 0.65536000000000000000e5
-3667 4 2 30 0.65536000000000000000e5
-3667 4 6 34 0.13107200000000000000e6
-3667 4 7 35 0.65536000000000000000e5
-3667 4 22 34 -0.13107200000000000000e6
-3668 3 26 55 -0.65536000000000000000e5
-3668 3 43 49 0.65536000000000000000e5
-3669 3 39 52 -0.65536000000000000000e5
-3669 3 43 50 0.65536000000000000000e5
-3670 1 1 48 -0.16384000000000000000e5
-3670 1 2 49 -0.16384000000000000000e5
-3670 1 8 39 -0.32768000000000000000e5
-3670 1 9 40 -0.32768000000000000000e5
-3670 1 10 41 0.65536000000000000000e5
-3670 1 12 43 0.13107200000000000000e6
-3670 1 23 38 -0.16384000000000000000e5
-3670 1 24 55 0.32768000000000000000e5
-3670 1 26 41 0.32768000000000000000e5
-3670 1 28 43 -0.13107200000000000000e6
-3670 1 32 47 -0.13107200000000000000e6
-3670 1 33 48 0.65536000000000000000e5
-3670 1 40 55 -0.32768000000000000000e5
-3670 1 41 56 -0.32768000000000000000e5
-3670 2 2 32 -0.16384000000000000000e5
-3670 2 4 34 0.32768000000000000000e5
-3670 2 16 30 -0.32768000000000000000e5
-3670 2 20 34 -0.65536000000000000000e5
-3670 2 28 34 -0.32768000000000000000e5
-3670 3 5 50 0.32768000000000000000e5
-3670 3 9 38 -0.32768000000000000000e5
-3670 3 10 55 0.65536000000000000000e5
-3670 3 22 35 -0.13107200000000000000e6
-3670 3 22 51 -0.32768000000000000000e5
-3670 3 23 52 0.65536000000000000000e5
-3670 3 27 40 0.32768000000000000000e5
-3670 3 27 56 -0.32768000000000000000e5
-3670 3 28 41 -0.13107200000000000000e6
-3670 3 35 48 -0.13107200000000000000e6
-3670 3 38 51 0.32768000000000000000e5
-3670 3 39 52 0.65536000000000000000e5
-3670 3 40 45 0.65536000000000000000e5
-3670 3 43 51 0.65536000000000000000e5
-3670 3 45 50 -0.13107200000000000000e6
-3670 4 2 30 -0.32768000000000000000e5
-3670 4 6 34 -0.65536000000000000000e5
-3670 4 7 35 -0.32768000000000000000e5
-3670 4 22 34 0.65536000000000000000e5
-3670 4 29 33 0.32768000000000000000e5
-3670 4 30 34 0.65536000000000000000e5
-3671 3 43 53 0.65536000000000000000e5
-3671 3 49 50 -0.65536000000000000000e5
-3672 3 40 55 -0.65536000000000000000e5
-3672 3 43 54 0.65536000000000000000e5
-3673 1 18 49 -0.13107200000000000000e6
-3673 1 52 55 0.13107200000000000000e6
-3673 3 14 51 0.13107200000000000000e6
-3673 3 35 48 0.13107200000000000000e6
-3673 3 42 55 0.65536000000000000000e5
-3673 3 43 55 0.65536000000000000000e5
-3673 3 45 50 0.13107200000000000000e6
-3673 3 47 52 0.65536000000000000000e5
-3673 4 31 35 0.65536000000000000000e5
-3674 3 41 46 -0.32768000000000000000e5
-3674 3 44 44 0.65536000000000000000e5
-3675 1 11 18 -0.65536000000000000000e5
-3675 1 45 52 0.65536000000000000000e5
-3675 3 6 19 0.65536000000000000000e5
-3675 3 15 44 0.65536000000000000000e5
-3675 3 17 30 0.65536000000000000000e5
-3675 3 32 45 0.65536000000000000000e5
-3675 3 44 45 0.65536000000000000000e5
-3676 1 11 18 -0.32768000000000000000e5
-3676 1 45 52 0.32768000000000000000e5
-3676 3 6 19 0.32768000000000000000e5
-3676 3 15 44 0.32768000000000000000e5
-3676 3 17 30 0.32768000000000000000e5
-3676 3 32 45 0.32768000000000000000e5
-3676 3 36 49 -0.32768000000000000000e5
-3676 3 41 46 -0.32768000000000000000e5
-3676 3 44 46 0.65536000000000000000e5
-3676 4 15 35 -0.32768000000000000000e5
-3677 1 1 48 -0.16384000000000000000e5
-3677 1 2 49 -0.16384000000000000000e5
-3677 1 8 39 -0.32768000000000000000e5
-3677 1 9 40 -0.32768000000000000000e5
-3677 1 10 41 0.65536000000000000000e5
-3677 1 12 43 0.13107200000000000000e6
-3677 1 23 38 -0.16384000000000000000e5
-3677 1 24 55 0.32768000000000000000e5
-3677 1 26 41 0.32768000000000000000e5
-3677 1 28 43 -0.13107200000000000000e6
-3677 1 32 47 -0.13107200000000000000e6
-3677 1 33 48 0.65536000000000000000e5
-3677 1 40 55 -0.32768000000000000000e5
-3677 1 41 56 -0.32768000000000000000e5
-3677 1 44 51 -0.13107200000000000000e6
-3677 1 46 53 0.13107200000000000000e6
-3677 2 2 32 -0.16384000000000000000e5
-3677 2 4 34 0.32768000000000000000e5
-3677 2 16 30 -0.32768000000000000000e5
-3677 2 20 34 -0.65536000000000000000e5
-3677 2 28 34 -0.32768000000000000000e5
-3677 3 5 50 0.32768000000000000000e5
-3677 3 9 38 -0.32768000000000000000e5
-3677 3 10 55 0.65536000000000000000e5
-3677 3 22 35 -0.13107200000000000000e6
-3677 3 22 51 -0.32768000000000000000e5
-3677 3 23 52 0.65536000000000000000e5
-3677 3 27 40 0.32768000000000000000e5
-3677 3 27 56 -0.32768000000000000000e5
-3677 3 28 41 -0.13107200000000000000e6
-3677 3 35 48 -0.13107200000000000000e6
-3677 3 38 51 0.32768000000000000000e5
-3677 3 39 52 0.65536000000000000000e5
-3677 3 40 45 0.65536000000000000000e5
-3677 3 44 47 0.65536000000000000000e5
-3677 4 2 30 -0.32768000000000000000e5
-3677 4 6 34 -0.65536000000000000000e5
-3677 4 7 35 -0.32768000000000000000e5
-3677 4 22 34 0.65536000000000000000e5
-3677 4 23 35 0.65536000000000000000e5
-3677 4 29 33 0.32768000000000000000e5
-3678 1 1 48 0.16384000000000000000e5
-3678 1 2 49 0.16384000000000000000e5
-3678 1 8 39 0.32768000000000000000e5
-3678 1 9 40 0.32768000000000000000e5
-3678 1 10 41 -0.65536000000000000000e5
-3678 1 12 43 -0.13107200000000000000e6
-3678 1 23 38 0.16384000000000000000e5
-3678 1 24 55 -0.32768000000000000000e5
-3678 1 26 41 -0.32768000000000000000e5
-3678 1 28 43 0.13107200000000000000e6
-3678 1 32 47 0.13107200000000000000e6
-3678 1 33 48 -0.65536000000000000000e5
-3678 1 40 55 0.32768000000000000000e5
-3678 1 41 56 0.32768000000000000000e5
-3678 2 2 32 0.16384000000000000000e5
-3678 2 4 34 -0.32768000000000000000e5
-3678 2 16 30 0.32768000000000000000e5
-3678 2 20 34 0.65536000000000000000e5
-3678 2 28 34 0.32768000000000000000e5
-3678 3 5 50 -0.32768000000000000000e5
-3678 3 9 38 0.32768000000000000000e5
-3678 3 10 55 -0.65536000000000000000e5
-3678 3 22 35 0.13107200000000000000e6
-3678 3 22 51 0.32768000000000000000e5
-3678 3 23 52 -0.65536000000000000000e5
-3678 3 27 40 -0.32768000000000000000e5
-3678 3 27 56 0.32768000000000000000e5
-3678 3 28 41 0.13107200000000000000e6
-3678 3 35 48 0.13107200000000000000e6
-3678 3 38 51 -0.32768000000000000000e5
-3678 3 40 45 -0.65536000000000000000e5
-3678 3 44 48 0.65536000000000000000e5
-3678 4 2 30 0.32768000000000000000e5
-3678 4 6 34 0.65536000000000000000e5
-3678 4 7 35 0.32768000000000000000e5
-3678 4 22 34 -0.65536000000000000000e5
-3678 4 29 33 -0.32768000000000000000e5
-3679 3 39 52 -0.65536000000000000000e5
-3679 3 44 49 0.65536000000000000000e5
-3680 1 44 51 -0.65536000000000000000e5
-3680 1 46 53 0.65536000000000000000e5
-3680 3 44 50 0.65536000000000000000e5
-3681 3 44 51 0.65536000000000000000e5
-3681 3 45 50 -0.65536000000000000000e5
-3682 3 19 56 -0.65536000000000000000e5
-3682 3 44 52 0.65536000000000000000e5
-3683 3 44 53 0.65536000000000000000e5
-3683 3 47 52 -0.65536000000000000000e5
-3684 3 42 55 -0.65536000000000000000e5
-3684 3 44 54 0.65536000000000000000e5
-3685 1 18 49 -0.65536000000000000000e5
-3685 1 52 55 0.65536000000000000000e5
-3685 3 14 51 0.65536000000000000000e5
-3685 3 35 48 0.65536000000000000000e5
-3685 3 44 55 0.65536000000000000000e5
-3685 3 45 50 0.65536000000000000000e5
-3686 3 44 56 0.65536000000000000000e5
-3686 3 50 55 -0.65536000000000000000e5
-3687 3 36 49 -0.32768000000000000000e5
-3687 3 45 45 0.65536000000000000000e5
-3688 1 1 48 0.16384000000000000000e5
-3688 1 2 49 0.16384000000000000000e5
-3688 1 8 39 0.32768000000000000000e5
-3688 1 9 40 0.32768000000000000000e5
-3688 1 10 41 -0.65536000000000000000e5
-3688 1 12 43 -0.13107200000000000000e6
-3688 1 23 38 0.16384000000000000000e5
-3688 1 24 55 -0.32768000000000000000e5
-3688 1 26 41 -0.32768000000000000000e5
-3688 1 28 43 0.13107200000000000000e6
-3688 1 32 47 0.13107200000000000000e6
-3688 1 33 48 -0.65536000000000000000e5
-3688 1 40 55 0.32768000000000000000e5
-3688 1 41 56 0.32768000000000000000e5
-3688 2 2 32 0.16384000000000000000e5
-3688 2 4 34 -0.32768000000000000000e5
-3688 2 16 30 0.32768000000000000000e5
-3688 2 20 34 0.65536000000000000000e5
-3688 2 28 34 0.32768000000000000000e5
-3688 3 5 50 -0.32768000000000000000e5
-3688 3 9 38 0.32768000000000000000e5
-3688 3 10 55 -0.65536000000000000000e5
-3688 3 22 35 0.13107200000000000000e6
-3688 3 22 51 0.32768000000000000000e5
-3688 3 23 52 -0.65536000000000000000e5
-3688 3 27 40 -0.32768000000000000000e5
-3688 3 27 56 0.32768000000000000000e5
-3688 3 28 41 0.13107200000000000000e6
-3688 3 35 48 0.13107200000000000000e6
-3688 3 38 51 -0.32768000000000000000e5
-3688 3 40 45 -0.65536000000000000000e5
-3688 3 45 47 0.65536000000000000000e5
-3688 4 2 30 0.32768000000000000000e5
-3688 4 6 34 0.65536000000000000000e5
-3688 4 7 35 0.32768000000000000000e5
-3688 4 22 34 -0.65536000000000000000e5
-3688 4 29 33 -0.32768000000000000000e5
-3689 3 39 52 -0.65536000000000000000e5
-3689 3 45 48 0.65536000000000000000e5
-3690 1 1 48 -0.16384000000000000000e5
-3690 1 2 49 -0.16384000000000000000e5
-3690 1 8 39 -0.32768000000000000000e5
-3690 1 9 40 -0.32768000000000000000e5
-3690 1 10 41 0.65536000000000000000e5
-3690 1 12 43 0.13107200000000000000e6
-3690 1 23 38 -0.16384000000000000000e5
-3690 1 24 55 0.32768000000000000000e5
-3690 1 26 41 0.32768000000000000000e5
-3690 1 28 43 -0.13107200000000000000e6
-3690 1 32 47 -0.13107200000000000000e6
-3690 1 33 48 0.65536000000000000000e5
-3690 1 40 55 -0.32768000000000000000e5
-3690 1 41 56 -0.32768000000000000000e5
-3690 2 2 32 -0.16384000000000000000e5
-3690 2 4 34 0.32768000000000000000e5
-3690 2 16 30 -0.32768000000000000000e5
-3690 2 20 34 -0.65536000000000000000e5
-3690 2 28 34 -0.32768000000000000000e5
-3690 3 5 50 0.32768000000000000000e5
-3690 3 9 38 -0.32768000000000000000e5
-3690 3 10 55 0.65536000000000000000e5
-3690 3 22 35 -0.13107200000000000000e6
-3690 3 22 51 -0.32768000000000000000e5
-3690 3 23 52 0.65536000000000000000e5
-3690 3 27 40 0.32768000000000000000e5
-3690 3 27 56 -0.32768000000000000000e5
-3690 3 28 41 -0.13107200000000000000e6
-3690 3 35 48 -0.13107200000000000000e6
-3690 3 38 51 0.32768000000000000000e5
-3690 3 39 52 0.65536000000000000000e5
-3690 3 40 45 0.65536000000000000000e5
-3690 3 45 49 0.65536000000000000000e5
-3690 3 45 50 -0.13107200000000000000e6
-3690 4 2 30 -0.32768000000000000000e5
-3690 4 6 34 -0.65536000000000000000e5
-3690 4 7 35 -0.32768000000000000000e5
-3690 4 22 34 0.65536000000000000000e5
-3690 4 29 33 0.32768000000000000000e5
-3690 4 30 34 0.65536000000000000000e5
-3691 3 43 52 -0.65536000000000000000e5
-3691 3 45 51 0.65536000000000000000e5
-3692 3 45 52 0.65536000000000000000e5
-3692 3 46 51 -0.65536000000000000000e5
-3693 3 42 55 -0.65536000000000000000e5
-3693 3 45 53 0.65536000000000000000e5
-3694 1 18 49 -0.13107200000000000000e6
-3694 1 52 55 0.13107200000000000000e6
-3694 3 14 51 0.13107200000000000000e6
-3694 3 35 48 0.13107200000000000000e6
-3694 3 42 55 0.65536000000000000000e5
-3694 3 45 50 0.13107200000000000000e6
-3694 3 45 54 0.65536000000000000000e5
-3694 3 47 52 0.65536000000000000000e5
-3694 4 31 35 0.65536000000000000000e5
-3695 3 35 56 -0.65536000000000000000e5
-3695 3 45 55 0.65536000000000000000e5
-3696 3 21 55 -0.32768000000000000000e5
-3696 3 46 46 0.65536000000000000000e5
-3697 1 44 51 -0.65536000000000000000e5
-3697 1 46 53 0.65536000000000000000e5
-3697 3 46 47 0.65536000000000000000e5
-3698 3 45 50 -0.65536000000000000000e5
-3698 3 46 48 0.65536000000000000000e5
-3699 3 43 52 -0.65536000000000000000e5
-3699 3 46 49 0.65536000000000000000e5
-3700 3 19 56 -0.65536000000000000000e5
-3700 3 46 50 0.65536000000000000000e5
-3701 3 21 56 -0.65536000000000000000e5
-3701 3 46 52 0.65536000000000000000e5
-3702 1 18 49 -0.65536000000000000000e5
-3702 1 52 55 0.65536000000000000000e5
-3702 3 14 51 0.65536000000000000000e5
-3702 3 35 48 0.65536000000000000000e5
-3702 3 45 50 0.65536000000000000000e5
-3702 3 46 53 0.65536000000000000000e5
-3703 3 35 56 -0.65536000000000000000e5
-3703 3 46 54 0.65536000000000000000e5
-3704 3 46 56 0.65536000000000000000e5
-3704 3 52 55 -0.65536000000000000000e5
-3705 1 1 48 0.32768000000000000000e5
-3705 1 2 49 0.65536000000000000000e5
-3705 1 6 53 -0.32768000000000000000e5
-3705 1 8 39 0.65536000000000000000e5
-3705 1 9 40 0.65536000000000000000e5
-3705 1 10 41 -0.13107200000000000000e6
-3705 1 12 43 -0.26214400000000000000e6
-3705 1 23 38 0.32768000000000000000e5
-3705 1 24 39 0.32768000000000000000e5
-3705 1 24 55 0.65536000000000000000e5
-3705 1 25 56 0.32768000000000000000e5
-3705 1 26 41 -0.13107200000000000000e6
-3705 1 28 43 0.13107200000000000000e6
-3705 1 32 47 0.26214400000000000000e6
-3705 1 40 47 0.32768000000000000000e5
-3705 2 2 32 0.32768000000000000000e5
-3705 2 3 33 0.32768000000000000000e5
-3705 2 5 35 -0.32768000000000000000e5
-3705 2 16 30 0.65536000000000000000e5
-3705 2 20 34 0.13107200000000000000e6
-3705 2 33 35 0.32768000000000000000e5
-3705 3 9 38 0.65536000000000000000e5
-3705 3 22 35 0.26214400000000000000e6
-3705 3 22 51 -0.65536000000000000000e5
-3705 3 23 52 0.13107200000000000000e6
-3705 3 24 53 -0.32768000000000000000e5
-3705 3 25 38 0.32768000000000000000e5
-3705 3 25 54 -0.32768000000000000000e5
-3705 3 27 40 0.65536000000000000000e5
-3705 3 27 56 -0.65536000000000000000e5
-3705 3 28 41 0.26214400000000000000e6
-3705 3 38 51 0.65536000000000000000e5
-3705 3 39 40 -0.32768000000000000000e5
-3705 3 40 53 -0.32768000000000000000e5
-3705 3 41 54 0.65536000000000000000e5
-3705 3 47 47 0.65536000000000000000e5
-3705 4 2 30 0.65536000000000000000e5
-3705 4 6 34 0.13107200000000000000e6
-3705 4 7 35 -0.65536000000000000000e5
-3705 4 32 32 0.65536000000000000000e5
-3706 1 40 47 -0.65536000000000000000e5
-3706 1 47 54 0.65536000000000000000e5
-3706 3 24 53 0.65536000000000000000e5
-3706 3 47 48 0.65536000000000000000e5
-3707 1 1 48 -0.65536000000000000000e5
-3707 1 2 49 -0.13107200000000000000e6
-3707 1 6 53 0.65536000000000000000e5
-3707 1 8 39 -0.13107200000000000000e6
-3707 1 9 40 -0.13107200000000000000e6
-3707 1 10 41 0.26214400000000000000e6
-3707 1 12 43 0.52428800000000000000e6
-3707 1 23 38 -0.65536000000000000000e5
-3707 1 24 39 -0.65536000000000000000e5
-3707 1 24 55 -0.13107200000000000000e6
-3707 1 25 56 -0.65536000000000000000e5
-3707 1 26 41 0.26214400000000000000e6
-3707 1 28 43 -0.26214400000000000000e6
-3707 1 32 47 -0.52428800000000000000e6
-3707 1 47 54 -0.65536000000000000000e5
-3707 2 2 32 -0.65536000000000000000e5
-3707 2 3 33 -0.65536000000000000000e5
-3707 2 5 35 0.65536000000000000000e5
-3707 2 16 30 -0.13107200000000000000e6
-3707 2 20 34 -0.26214400000000000000e6
-3707 2 33 35 -0.65536000000000000000e5
-3707 3 9 38 -0.13107200000000000000e6
-3707 3 22 35 -0.52428800000000000000e6
-3707 3 22 51 0.13107200000000000000e6
-3707 3 23 52 -0.26214400000000000000e6
-3707 3 25 38 -0.65536000000000000000e5
-3707 3 25 54 0.65536000000000000000e5
-3707 3 27 40 -0.13107200000000000000e6
-3707 3 28 41 -0.52428800000000000000e6
-3707 3 38 51 -0.13107200000000000000e6
-3707 3 39 40 0.65536000000000000000e5
-3707 3 40 53 0.65536000000000000000e5
-3707 3 41 54 -0.13107200000000000000e6
-3707 3 47 49 0.65536000000000000000e5
-3707 4 2 30 -0.13107200000000000000e6
-3707 4 6 34 -0.26214400000000000000e6
-3707 4 7 35 0.13107200000000000000e6
-3708 3 27 56 -0.65536000000000000000e5
-3708 3 47 50 0.65536000000000000000e5
-3709 3 41 54 -0.65536000000000000000e5
-3709 3 47 51 0.65536000000000000000e5
-3710 1 1 48 0.13107200000000000000e6
-3710 1 2 49 0.19660800000000000000e6
-3710 1 6 53 -0.65536000000000000000e5
-3710 1 8 39 0.26214400000000000000e6
-3710 1 9 40 0.26214400000000000000e6
-3710 1 10 41 -0.52428800000000000000e6
-3710 1 12 43 -0.10485760000000000000e7
-3710 1 23 38 0.13107200000000000000e6
-3710 1 24 39 0.65536000000000000000e5
-3710 1 26 41 -0.39321600000000000000e6
-3710 1 28 43 0.78643200000000000000e6
-3710 1 32 47 0.10485760000000000000e7
-3710 1 49 56 -0.65536000000000000000e5
-3710 2 2 32 0.13107200000000000000e6
-3710 2 3 33 0.65536000000000000000e5
-3710 2 4 34 -0.13107200000000000000e6
-3710 2 5 35 -0.65536000000000000000e5
-3710 2 16 30 0.26214400000000000000e6
-3710 2 20 34 0.52428800000000000000e6
-3710 2 33 35 0.65536000000000000000e5
-3710 2 35 35 -0.13107200000000000000e6
-3710 3 5 50 -0.13107200000000000000e6
-3710 3 9 38 0.26214400000000000000e6
-3710 3 22 35 0.10485760000000000000e7
-3710 3 25 38 0.65536000000000000000e5
-3710 3 25 54 -0.65536000000000000000e5
-3710 3 28 41 0.10485760000000000000e7
-3710 3 39 40 -0.65536000000000000000e5
-3710 3 40 53 -0.65536000000000000000e5
-3710 3 41 56 -0.13107200000000000000e6
-3710 3 47 53 0.65536000000000000000e5
-3710 3 48 53 0.65536000000000000000e5
-3710 4 2 30 0.26214400000000000000e6
-3710 4 6 34 0.52428800000000000000e6
-3711 3 47 54 0.65536000000000000000e5
-3711 3 48 53 -0.65536000000000000000e5
-3712 3 41 56 -0.65536000000000000000e5
-3712 3 47 55 0.65536000000000000000e5
-3713 1 1 48 0.65536000000000000000e5
-3713 1 2 49 0.13107200000000000000e6
-3713 1 6 53 -0.65536000000000000000e5
-3713 1 8 39 0.13107200000000000000e6
-3713 1 9 40 0.13107200000000000000e6
-3713 1 10 41 -0.26214400000000000000e6
-3713 1 12 43 -0.52428800000000000000e6
-3713 1 23 38 0.65536000000000000000e5
-3713 1 24 39 0.65536000000000000000e5
-3713 1 24 55 0.13107200000000000000e6
-3713 1 26 41 -0.26214400000000000000e6
-3713 1 28 43 0.26214400000000000000e6
-3713 1 32 47 0.52428800000000000000e6
-3713 1 47 54 0.65536000000000000000e5
-3713 1 53 56 0.65536000000000000000e5
-3713 2 2 32 0.65536000000000000000e5
-3713 2 3 33 0.65536000000000000000e5
-3713 2 5 35 -0.65536000000000000000e5
-3713 2 16 30 0.13107200000000000000e6
-3713 2 20 34 0.26214400000000000000e6
-3713 2 33 35 0.65536000000000000000e5
-3713 3 9 38 0.13107200000000000000e6
-3713 3 22 35 0.52428800000000000000e6
-3713 3 22 51 -0.13107200000000000000e6
-3713 3 23 52 0.26214400000000000000e6
-3713 3 25 38 0.65536000000000000000e5
-3713 3 25 54 -0.65536000000000000000e5
-3713 3 27 40 0.13107200000000000000e6
-3713 3 28 41 0.52428800000000000000e6
-3713 3 38 51 0.13107200000000000000e6
-3713 3 39 40 -0.65536000000000000000e5
-3713 3 40 53 -0.65536000000000000000e5
-3713 3 41 54 0.13107200000000000000e6
-3713 3 47 56 0.65536000000000000000e5
-3713 3 48 53 0.65536000000000000000e5
-3713 4 2 30 0.13107200000000000000e6
-3713 4 6 34 0.26214400000000000000e6
-3713 4 7 35 -0.13107200000000000000e6
-3714 1 1 48 -0.32768000000000000000e5
-3714 1 2 49 -0.65536000000000000000e5
-3714 1 6 53 0.32768000000000000000e5
-3714 1 8 39 -0.65536000000000000000e5
-3714 1 9 40 -0.65536000000000000000e5
-3714 1 10 41 0.13107200000000000000e6
-3714 1 12 43 0.26214400000000000000e6
-3714 1 23 38 -0.32768000000000000000e5
-3714 1 24 39 -0.32768000000000000000e5
-3714 1 24 55 -0.65536000000000000000e5
-3714 1 25 56 -0.32768000000000000000e5
-3714 1 26 41 0.13107200000000000000e6
-3714 1 28 43 -0.13107200000000000000e6
-3714 1 32 47 -0.26214400000000000000e6
-3714 1 47 54 -0.32768000000000000000e5
-3714 2 2 32 -0.32768000000000000000e5
-3714 2 3 33 -0.32768000000000000000e5
-3714 2 5 35 0.32768000000000000000e5
-3714 2 16 30 -0.65536000000000000000e5
-3714 2 20 34 -0.13107200000000000000e6
-3714 2 33 35 -0.32768000000000000000e5
-3714 3 9 38 -0.65536000000000000000e5
-3714 3 22 35 -0.26214400000000000000e6
-3714 3 22 51 0.65536000000000000000e5
-3714 3 23 52 -0.13107200000000000000e6
-3714 3 25 38 -0.32768000000000000000e5
-3714 3 25 54 0.32768000000000000000e5
-3714 3 27 40 -0.65536000000000000000e5
-3714 3 28 41 -0.26214400000000000000e6
-3714 3 38 51 -0.65536000000000000000e5
-3714 3 39 40 0.32768000000000000000e5
-3714 3 40 53 0.32768000000000000000e5
-3714 3 41 54 -0.65536000000000000000e5
-3714 3 48 48 0.65536000000000000000e5
-3714 4 2 30 -0.65536000000000000000e5
-3714 4 6 34 -0.13107200000000000000e6
-3714 4 7 35 0.65536000000000000000e5
-3715 3 40 53 -0.65536000000000000000e5
-3715 3 48 49 0.65536000000000000000e5
-3716 3 41 54 -0.65536000000000000000e5
-3716 3 48 50 0.65536000000000000000e5
-3717 3 48 51 0.65536000000000000000e5
-3717 3 49 50 -0.65536000000000000000e5
-3718 3 42 55 -0.65536000000000000000e5
-3718 3 48 52 0.65536000000000000000e5
-3719 1 1 48 -0.13107200000000000000e6
-3719 1 2 49 -0.19660800000000000000e6
-3719 1 6 53 0.65536000000000000000e5
-3719 1 8 39 -0.26214400000000000000e6
-3719 1 9 40 -0.26214400000000000000e6
-3719 1 10 41 0.52428800000000000000e6
-3719 1 12 43 0.10485760000000000000e7
-3719 1 23 38 -0.13107200000000000000e6
-3719 1 24 39 -0.65536000000000000000e5
-3719 1 26 41 0.39321600000000000000e6
-3719 1 28 43 -0.78643200000000000000e6
-3719 1 32 47 -0.10485760000000000000e7
-3719 1 49 56 0.65536000000000000000e5
-3719 2 2 32 -0.13107200000000000000e6
-3719 2 3 33 -0.65536000000000000000e5
-3719 2 4 34 0.13107200000000000000e6
-3719 2 5 35 0.65536000000000000000e5
-3719 2 16 30 -0.26214400000000000000e6
-3719 2 20 34 -0.52428800000000000000e6
-3719 3 5 50 0.13107200000000000000e6
-3719 3 9 38 -0.26214400000000000000e6
-3719 3 22 35 -0.10485760000000000000e7
-3719 3 25 38 -0.65536000000000000000e5
-3719 3 25 54 0.65536000000000000000e5
-3719 3 28 41 -0.10485760000000000000e7
-3719 3 39 40 0.65536000000000000000e5
-3719 3 40 53 0.65536000000000000000e5
-3719 3 48 54 0.65536000000000000000e5
-3719 4 2 30 -0.26214400000000000000e6
-3719 4 6 34 -0.52428800000000000000e6
-3720 1 40 55 -0.65536000000000000000e5
-3720 1 54 55 0.65536000000000000000e5
-3720 3 48 55 0.65536000000000000000e5
-3720 3 49 50 0.65536000000000000000e5
-3721 3 48 56 0.65536000000000000000e5
-3721 3 53 54 -0.65536000000000000000e5
-3722 1 1 48 0.32768000000000000000e5
-3722 1 2 49 0.65536000000000000000e5
-3722 1 6 53 -0.32768000000000000000e5
-3722 1 8 39 0.65536000000000000000e5
-3722 1 9 40 0.65536000000000000000e5
-3722 1 10 41 -0.13107200000000000000e6
-3722 1 12 43 -0.26214400000000000000e6
-3722 1 23 38 0.32768000000000000000e5
-3722 1 24 39 0.32768000000000000000e5
-3722 1 24 55 0.65536000000000000000e5
-3722 1 25 56 0.32768000000000000000e5
-3722 1 26 41 -0.13107200000000000000e6
-3722 1 28 43 0.13107200000000000000e6
-3722 1 32 47 0.26214400000000000000e6
-3722 1 47 54 0.32768000000000000000e5
-3722 2 2 32 0.32768000000000000000e5
-3722 2 3 33 0.32768000000000000000e5
-3722 2 5 35 -0.32768000000000000000e5
-3722 2 16 30 0.65536000000000000000e5
-3722 2 20 34 0.13107200000000000000e6
-3722 2 33 35 0.32768000000000000000e5
-3722 3 9 38 0.65536000000000000000e5
-3722 3 22 35 0.26214400000000000000e6
-3722 3 22 51 -0.65536000000000000000e5
-3722 3 23 52 0.13107200000000000000e6
-3722 3 25 38 0.32768000000000000000e5
-3722 3 25 54 -0.32768000000000000000e5
-3722 3 27 40 0.65536000000000000000e5
-3722 3 28 41 0.26214400000000000000e6
-3722 3 38 51 0.65536000000000000000e5
-3722 3 39 40 -0.32768000000000000000e5
-3722 3 41 54 0.65536000000000000000e5
-3722 3 49 49 0.65536000000000000000e5
-3722 3 49 50 -0.65536000000000000000e5
-3722 4 2 30 0.65536000000000000000e5
-3722 4 6 34 0.13107200000000000000e6
-3722 4 7 35 -0.65536000000000000000e5
-3722 4 33 33 0.65536000000000000000e5
-3723 3 40 55 -0.65536000000000000000e5
-3723 3 49 51 0.65536000000000000000e5
-3724 1 18 49 -0.13107200000000000000e6
-3724 1 52 55 0.13107200000000000000e6
-3724 3 14 51 0.13107200000000000000e6
-3724 3 35 48 0.13107200000000000000e6
-3724 3 42 55 0.65536000000000000000e5
-3724 3 45 50 0.13107200000000000000e6
-3724 3 47 52 0.65536000000000000000e5
-3724 3 49 52 0.65536000000000000000e5
-3724 4 31 35 0.65536000000000000000e5
-3725 1 1 48 -0.13107200000000000000e6
-3725 1 2 49 -0.19660800000000000000e6
-3725 1 6 53 0.65536000000000000000e5
-3725 1 8 39 -0.26214400000000000000e6
-3725 1 9 40 -0.26214400000000000000e6
-3725 1 10 41 0.52428800000000000000e6
-3725 1 12 43 0.10485760000000000000e7
-3725 1 23 38 -0.13107200000000000000e6
-3725 1 24 39 -0.65536000000000000000e5
-3725 1 26 41 0.39321600000000000000e6
-3725 1 28 43 -0.78643200000000000000e6
-3725 1 32 47 -0.10485760000000000000e7
-3725 1 49 56 0.65536000000000000000e5
-3725 2 2 32 -0.13107200000000000000e6
-3725 2 3 33 -0.65536000000000000000e5
-3725 2 4 34 0.13107200000000000000e6
-3725 2 5 35 0.65536000000000000000e5
-3725 2 16 30 -0.26214400000000000000e6
-3725 2 20 34 -0.52428800000000000000e6
-3725 3 5 50 0.13107200000000000000e6
-3725 3 9 38 -0.26214400000000000000e6
-3725 3 22 35 -0.10485760000000000000e7
-3725 3 25 38 -0.65536000000000000000e5
-3725 3 25 54 0.65536000000000000000e5
-3725 3 28 41 -0.10485760000000000000e7
-3725 3 39 40 0.65536000000000000000e5
-3725 3 40 53 0.65536000000000000000e5
-3725 3 49 53 0.65536000000000000000e5
-3725 4 2 30 -0.26214400000000000000e6
-3725 4 6 34 -0.52428800000000000000e6
-3726 3 43 56 -0.65536000000000000000e5
-3726 3 49 55 0.65536000000000000000e5
-3727 1 1 48 -0.65536000000000000000e5
-3727 1 2 49 -0.13107200000000000000e6
-3727 1 6 53 0.65536000000000000000e5
-3727 1 8 39 -0.13107200000000000000e6
-3727 1 9 40 -0.13107200000000000000e6
-3727 1 10 41 0.26214400000000000000e6
-3727 1 12 43 0.52428800000000000000e6
-3727 1 23 38 -0.65536000000000000000e5
-3727 1 24 39 -0.65536000000000000000e5
-3727 1 24 55 -0.13107200000000000000e6
-3727 1 26 41 0.26214400000000000000e6
-3727 1 28 43 -0.26214400000000000000e6
-3727 1 32 47 -0.52428800000000000000e6
-3727 1 47 54 -0.65536000000000000000e5
-3727 1 53 56 -0.65536000000000000000e5
-3727 1 54 55 -0.13107200000000000000e6
-3727 1 55 56 0.13107200000000000000e6
-3727 2 2 32 -0.65536000000000000000e5
-3727 2 3 33 -0.65536000000000000000e5
-3727 2 5 35 0.65536000000000000000e5
-3727 2 16 30 -0.13107200000000000000e6
-3727 2 20 34 -0.26214400000000000000e6
-3727 2 33 35 -0.65536000000000000000e5
-3727 3 9 38 -0.13107200000000000000e6
-3727 3 22 35 -0.52428800000000000000e6
-3727 3 22 51 0.13107200000000000000e6
-3727 3 23 52 -0.26214400000000000000e6
-3727 3 25 38 -0.65536000000000000000e5
-3727 3 25 54 0.65536000000000000000e5
-3727 3 27 40 -0.13107200000000000000e6
-3727 3 28 41 -0.52428800000000000000e6
-3727 3 38 51 -0.13107200000000000000e6
-3727 3 39 40 0.65536000000000000000e5
-3727 3 40 53 0.65536000000000000000e5
-3727 3 41 54 -0.13107200000000000000e6
-3727 3 48 53 -0.65536000000000000000e5
-3727 3 49 56 0.65536000000000000000e5
-3727 3 53 54 0.65536000000000000000e5
-3727 4 2 30 -0.13107200000000000000e6
-3727 4 6 34 -0.26214400000000000000e6
-3727 4 7 35 0.13107200000000000000e6
-3727 4 35 35 0.13107200000000000000e6
-3728 3 47 52 -0.32768000000000000000e5
-3728 3 50 50 0.65536000000000000000e5
-3729 3 42 55 -0.65536000000000000000e5
-3729 3 50 51 0.65536000000000000000e5
-3730 1 18 49 -0.65536000000000000000e5
-3730 1 52 55 0.65536000000000000000e5
-3730 3 14 51 0.65536000000000000000e5
-3730 3 35 48 0.65536000000000000000e5
-3730 3 45 50 0.65536000000000000000e5
-3730 3 50 52 0.65536000000000000000e5
-3731 3 41 56 -0.65536000000000000000e5
-3731 3 50 53 0.65536000000000000000e5
-3732 1 40 55 -0.65536000000000000000e5
-3732 1 54 55 0.65536000000000000000e5
-3732 3 49 50 0.65536000000000000000e5
-3732 3 50 54 0.65536000000000000000e5
-3733 1 54 55 -0.65536000000000000000e5
-3733 1 55 56 0.65536000000000000000e5
-3733 3 50 56 0.65536000000000000000e5
-3734 1 18 49 -0.65536000000000000000e5
-3734 1 52 55 0.65536000000000000000e5
-3734 3 14 51 0.65536000000000000000e5
-3734 3 35 48 0.65536000000000000000e5
-3734 3 42 55 0.32768000000000000000e5
-3734 3 45 50 0.65536000000000000000e5
-3734 3 47 52 0.32768000000000000000e5
-3734 3 51 51 0.65536000000000000000e5
-3734 4 31 35 0.32768000000000000000e5
-3735 3 35 56 -0.65536000000000000000e5
-3735 3 51 52 0.65536000000000000000e5
-3736 1 40 55 -0.65536000000000000000e5
-3736 1 54 55 0.65536000000000000000e5
-3736 3 49 50 0.65536000000000000000e5
-3736 3 51 53 0.65536000000000000000e5
-3737 3 43 56 -0.65536000000000000000e5
-3737 3 51 54 0.65536000000000000000e5
-3738 3 45 56 -0.65536000000000000000e5
-3738 3 51 55 0.65536000000000000000e5
-3739 3 46 55 -0.32768000000000000000e5
-3739 3 52 52 0.65536000000000000000e5
-3740 3 50 55 -0.65536000000000000000e5
-3740 3 52 53 0.65536000000000000000e5
-3741 3 45 56 -0.65536000000000000000e5
-3741 3 52 54 0.65536000000000000000e5
-3742 3 52 56 0.65536000000000000000e5
-3742 3 55 55 -0.13107200000000000000e6
-3743 1 1 48 0.32768000000000000000e5
-3743 1 2 49 0.65536000000000000000e5
-3743 1 6 53 -0.32768000000000000000e5
-3743 1 8 39 0.65536000000000000000e5
-3743 1 9 40 0.65536000000000000000e5
-3743 1 10 41 -0.13107200000000000000e6
-3743 1 12 43 -0.26214400000000000000e6
-3743 1 23 38 0.32768000000000000000e5
-3743 1 24 39 0.32768000000000000000e5
-3743 1 24 55 0.65536000000000000000e5
-3743 1 26 41 -0.13107200000000000000e6
-3743 1 28 43 0.13107200000000000000e6
-3743 1 32 47 0.26214400000000000000e6
-3743 1 47 54 0.32768000000000000000e5
-3743 1 53 56 0.32768000000000000000e5
-3743 2 2 32 0.32768000000000000000e5
-3743 2 3 33 0.32768000000000000000e5
-3743 2 5 35 -0.32768000000000000000e5
-3743 2 16 30 0.65536000000000000000e5
-3743 2 20 34 0.13107200000000000000e6
-3743 2 33 35 0.32768000000000000000e5
-3743 3 9 38 0.65536000000000000000e5
-3743 3 22 35 0.26214400000000000000e6
-3743 3 22 51 -0.65536000000000000000e5
-3743 3 23 52 0.13107200000000000000e6
-3743 3 25 38 0.32768000000000000000e5
-3743 3 25 54 -0.32768000000000000000e5
-3743 3 27 40 0.65536000000000000000e5
-3743 3 28 41 0.26214400000000000000e6
-3743 3 38 51 0.65536000000000000000e5
-3743 3 39 40 -0.32768000000000000000e5
-3743 3 40 53 -0.32768000000000000000e5
-3743 3 41 54 0.65536000000000000000e5
-3743 3 48 53 0.32768000000000000000e5
-3743 3 53 53 0.65536000000000000000e5
-3743 4 2 30 0.65536000000000000000e5
-3743 4 6 34 0.13107200000000000000e6
-3743 4 7 35 -0.65536000000000000000e5
-3744 1 54 55 -0.65536000000000000000e5
-3744 1 55 56 0.65536000000000000000e5
-3744 3 53 55 0.65536000000000000000e5
-3745 1 1 48 -0.32768000000000000000e5
-3745 1 2 49 -0.65536000000000000000e5
-3745 1 6 53 0.32768000000000000000e5
-3745 1 8 39 -0.65536000000000000000e5
-3745 1 9 40 -0.65536000000000000000e5
-3745 1 10 41 0.13107200000000000000e6
-3745 1 12 43 0.26214400000000000000e6
-3745 1 23 38 -0.32768000000000000000e5
-3745 1 24 39 -0.32768000000000000000e5
-3745 1 24 55 -0.65536000000000000000e5
-3745 1 26 41 0.13107200000000000000e6
-3745 1 28 43 -0.13107200000000000000e6
-3745 1 32 47 -0.26214400000000000000e6
-3745 1 47 54 -0.32768000000000000000e5
-3745 1 53 56 -0.32768000000000000000e5
-3745 1 54 55 -0.65536000000000000000e5
-3745 1 55 56 0.65536000000000000000e5
-3745 2 2 32 -0.32768000000000000000e5
-3745 2 3 33 -0.32768000000000000000e5
-3745 2 5 35 0.32768000000000000000e5
-3745 2 16 30 -0.65536000000000000000e5
-3745 2 20 34 -0.13107200000000000000e6
-3745 2 33 35 -0.32768000000000000000e5
-3745 3 9 38 -0.65536000000000000000e5
-3745 3 22 35 -0.26214400000000000000e6
-3745 3 22 51 0.65536000000000000000e5
-3745 3 23 52 -0.13107200000000000000e6
-3745 3 25 38 -0.32768000000000000000e5
-3745 3 25 54 0.32768000000000000000e5
-3745 3 27 40 -0.65536000000000000000e5
-3745 3 28 41 -0.26214400000000000000e6
-3745 3 38 51 -0.65536000000000000000e5
-3745 3 39 40 0.32768000000000000000e5
-3745 3 40 53 0.32768000000000000000e5
-3745 3 41 54 -0.65536000000000000000e5
-3745 3 48 53 -0.32768000000000000000e5
-3745 3 53 54 0.32768000000000000000e5
-3745 3 54 54 0.65536000000000000000e5
-3745 4 2 30 -0.65536000000000000000e5
-3745 4 6 34 -0.13107200000000000000e6
-3745 4 7 35 0.65536000000000000000e5
-3745 4 35 35 0.65536000000000000000e5
-3746 3 51 56 -0.65536000000000000000e5
-3746 3 54 55 0.65536000000000000000e5
-3747 1 2 5 -0.65536000000000000000e5
-3747 1 2 9 0.13107200000000000000e6
-3747 1 2 25 0.65536000000000000000e5
-3747 1 8 23 -0.13107200000000000000e6
-3747 3 1 2 0.65536000000000000000e5
-3747 3 2 7 -0.13107200000000000000e6
-3747 4 1 2 0.65536000000000000000e5
-3747 4 2 2 -0.13107200000000000000e6
-3748 4 1 3 0.65536000000000000000e5
-3748 4 2 2 -0.13107200000000000000e6
-3749 1 1 48 0.13107200000000000000e6
-3749 1 2 5 0.65536000000000000000e5
-3749 1 2 9 0.13107200000000000000e6
-3749 1 2 25 -0.65536000000000000000e5
-3749 1 2 33 0.52428800000000000000e6
-3749 1 2 49 0.13107200000000000000e6
-3749 1 3 34 -0.52428800000000000000e6
-3749 1 4 11 -0.13107200000000000000e6
-3749 1 8 39 0.13107200000000000000e6
-3749 1 9 40 0.13107200000000000000e6
-3749 1 10 41 0.26214400000000000000e6
-3749 1 11 42 -0.26214400000000000000e6
-3749 1 12 43 -0.10485760000000000000e7
-3749 1 23 38 0.13107200000000000000e6
-3749 1 26 41 -0.13107200000000000000e6
-3749 1 28 43 0.52428800000000000000e6
-3749 1 32 47 0.78643200000000000000e6
-3749 1 33 48 0.26214400000000000000e6
-3749 2 2 8 0.13107200000000000000e6
-3749 2 2 32 0.13107200000000000000e6
-3749 2 3 9 -0.13107200000000000000e6
-3749 2 7 21 0.26214400000000000000e6
-3749 2 12 26 0.26214400000000000000e6
-3749 2 16 30 0.13107200000000000000e6
-3749 2 20 34 0.26214400000000000000e6
-3749 3 1 6 0.65536000000000000000e5
-3749 3 1 14 -0.26214400000000000000e6
-3749 3 1 30 -0.13107200000000000000e6
-3749 3 2 3 0.65536000000000000000e5
-3749 3 2 15 0.26214400000000000000e6
-3749 3 3 32 0.52428800000000000000e6
-3749 3 4 9 -0.13107200000000000000e6
-3749 3 8 37 0.13107200000000000000e6
-3749 3 10 23 -0.26214400000000000000e6
-3749 3 13 42 0.52428800000000000000e6
-3749 3 22 35 0.52428800000000000000e6
-3749 3 28 41 0.78643200000000000000e6
-3749 3 29 42 0.26214400000000000000e6
-3749 4 1 4 0.65536000000000000000e5
-3749 4 2 30 0.13107200000000000000e6
-3749 4 3 31 -0.26214400000000000000e6
-3749 4 6 18 -0.13107200000000000000e6
-3749 4 6 34 0.26214400000000000000e6
-3750 1 1 8 0.65536000000000000000e5
-3750 1 1 48 -0.65536000000000000000e5
-3750 1 2 9 0.65536000000000000000e5
-3750 1 2 33 -0.26214400000000000000e6
-3750 1 2 49 -0.65536000000000000000e5
-3750 1 3 34 0.26214400000000000000e6
-3750 1 4 11 0.65536000000000000000e5
-3750 1 7 22 -0.65536000000000000000e5
-3750 1 8 23 -0.13107200000000000000e6
-3750 1 8 39 -0.65536000000000000000e5
-3750 1 9 40 -0.65536000000000000000e5
-3750 1 10 41 -0.13107200000000000000e6
-3750 1 11 42 0.13107200000000000000e6
-3750 1 12 43 0.52428800000000000000e6
-3750 1 23 38 -0.65536000000000000000e5
-3750 1 26 41 0.65536000000000000000e5
-3750 1 28 43 -0.26214400000000000000e6
-3750 1 32 47 -0.39321600000000000000e6
-3750 1 33 48 -0.13107200000000000000e6
-3750 2 2 8 -0.65536000000000000000e5
-3750 2 2 32 -0.65536000000000000000e5
-3750 2 3 9 0.65536000000000000000e5
-3750 2 7 21 -0.13107200000000000000e6
-3750 2 12 26 -0.13107200000000000000e6
-3750 2 16 30 -0.65536000000000000000e5
-3750 2 20 34 -0.13107200000000000000e6
-3750 3 1 14 0.26214400000000000000e6
-3750 3 1 30 0.65536000000000000000e5
-3750 3 2 7 0.13107200000000000000e6
-3750 3 2 15 -0.13107200000000000000e6
-3750 3 3 32 -0.26214400000000000000e6
-3750 3 4 9 0.65536000000000000000e5
-3750 3 7 12 -0.26214400000000000000e6
-3750 3 8 37 -0.65536000000000000000e5
-3750 3 10 23 0.13107200000000000000e6
-3750 3 13 42 -0.26214400000000000000e6
-3750 3 22 35 -0.26214400000000000000e6
-3750 3 28 41 -0.39321600000000000000e6
-3750 3 29 42 -0.13107200000000000000e6
-3750 4 1 6 0.65536000000000000000e5
-3750 4 2 6 0.65536000000000000000e5
-3750 4 2 30 -0.65536000000000000000e5
-3750 4 3 31 0.13107200000000000000e6
-3750 4 6 6 0.26214400000000000000e6
-3750 4 6 18 0.65536000000000000000e5
-3750 4 6 34 -0.13107200000000000000e6
-3751 4 1 7 0.65536000000000000000e5
-3751 4 2 6 -0.65536000000000000000e5
-3752 1 1 48 -0.32768000000000000000e5
-3752 1 2 33 -0.26214400000000000000e6
-3752 1 2 49 -0.32768000000000000000e5
-3752 1 3 34 0.26214400000000000000e6
-3752 1 8 23 -0.65536000000000000000e5
-3752 1 8 39 -0.65536000000000000000e5
-3752 1 10 41 -0.13107200000000000000e6
-3752 1 11 42 0.13107200000000000000e6
-3752 1 12 43 0.26214400000000000000e6
-3752 1 23 38 -0.32768000000000000000e5
-3752 1 28 43 -0.13107200000000000000e6
-3752 1 32 47 -0.13107200000000000000e6
-3752 1 33 48 -0.13107200000000000000e6
-3752 2 2 8 -0.65536000000000000000e5
-3752 2 2 32 -0.32768000000000000000e5
-3752 2 7 21 -0.13107200000000000000e6
-3752 2 12 26 -0.13107200000000000000e6
-3752 3 3 32 -0.13107200000000000000e6
-3752 3 8 37 -0.65536000000000000000e5
-3752 3 10 23 0.65536000000000000000e5
-3752 3 13 42 -0.26214400000000000000e6
-3752 3 28 41 -0.13107200000000000000e6
-3752 3 29 42 -0.13107200000000000000e6
-3752 4 1 8 0.65536000000000000000e5
-3752 4 3 31 0.13107200000000000000e6
-3752 4 6 18 0.65536000000000000000e5
-3753 1 1 48 -0.32768000000000000000e5
-3753 1 2 9 -0.65536000000000000000e5
-3753 1 2 33 -0.26214400000000000000e6
-3753 1 2 49 -0.32768000000000000000e5
-3753 1 3 34 0.26214400000000000000e6
-3753 1 8 39 -0.65536000000000000000e5
-3753 1 10 41 -0.13107200000000000000e6
-3753 1 11 42 0.13107200000000000000e6
-3753 1 12 43 0.26214400000000000000e6
-3753 1 23 38 -0.32768000000000000000e5
-3753 1 28 43 -0.13107200000000000000e6
-3753 1 32 47 -0.13107200000000000000e6
-3753 1 33 48 -0.13107200000000000000e6
-3753 2 2 8 -0.65536000000000000000e5
-3753 2 2 32 -0.32768000000000000000e5
-3753 2 4 10 0.13107200000000000000e6
-3753 2 7 21 -0.26214400000000000000e6
-3753 2 12 26 -0.13107200000000000000e6
-3753 3 1 14 0.26214400000000000000e6
-3753 3 2 15 0.13107200000000000000e6
-3753 3 3 16 -0.26214400000000000000e6
-3753 3 3 32 -0.13107200000000000000e6
-3753 3 4 9 0.65536000000000000000e5
-3753 3 8 37 -0.65536000000000000000e5
-3753 3 10 23 0.65536000000000000000e5
-3753 3 13 42 -0.26214400000000000000e6
-3753 3 28 41 -0.13107200000000000000e6
-3753 3 29 42 -0.13107200000000000000e6
-3753 4 1 9 0.65536000000000000000e5
-3753 4 3 31 0.13107200000000000000e6
-3753 4 6 18 0.65536000000000000000e5
-3754 4 1 10 0.65536000000000000000e5
-3754 4 6 6 -0.13107200000000000000e6
-3755 1 1 48 -0.32768000000000000000e5
-3755 1 2 17 -0.13107200000000000000e6
-3755 1 2 33 -0.13107200000000000000e6
-3755 1 2 49 -0.32768000000000000000e5
-3755 1 3 34 0.13107200000000000000e6
-3755 1 4 11 0.32768000000000000000e5
-3755 1 8 23 -0.32768000000000000000e5
-3755 1 8 39 -0.32768000000000000000e5
-3755 1 9 40 -0.32768000000000000000e5
-3755 1 10 41 -0.65536000000000000000e5
-3755 1 11 42 0.65536000000000000000e5
-3755 1 12 43 0.26214400000000000000e6
-3755 1 16 23 0.13107200000000000000e6
-3755 1 23 38 -0.32768000000000000000e5
-3755 1 26 41 0.32768000000000000000e5
-3755 1 28 43 -0.13107200000000000000e6
-3755 1 32 47 -0.19660800000000000000e6
-3755 1 33 48 -0.65536000000000000000e5
-3755 2 2 8 -0.32768000000000000000e5
-3755 2 2 32 -0.32768000000000000000e5
-3755 2 3 9 0.32768000000000000000e5
-3755 2 4 10 -0.65536000000000000000e5
-3755 2 12 26 -0.65536000000000000000e5
-3755 2 16 30 -0.32768000000000000000e5
-3755 2 20 34 -0.65536000000000000000e5
-3755 3 1 14 0.65536000000000000000e5
-3755 3 1 30 0.32768000000000000000e5
-3755 3 2 7 0.32768000000000000000e5
-3755 3 2 15 -0.13107200000000000000e6
-3755 3 3 16 0.13107200000000000000e6
-3755 3 3 32 -0.13107200000000000000e6
-3755 3 4 9 0.32768000000000000000e5
-3755 3 8 37 -0.32768000000000000000e5
-3755 3 10 23 0.65536000000000000000e5
-3755 3 13 42 -0.13107200000000000000e6
-3755 3 22 35 -0.13107200000000000000e6
-3755 3 28 41 -0.19660800000000000000e6
-3755 3 29 42 -0.65536000000000000000e5
-3755 4 1 11 0.65536000000000000000e5
-3755 4 2 6 0.32768000000000000000e5
-3755 4 2 30 -0.32768000000000000000e5
-3755 4 3 31 0.65536000000000000000e5
-3755 4 6 18 0.32768000000000000000e5
-3755 4 6 34 -0.65536000000000000000e5
-3756 2 4 10 -0.65536000000000000000e5
-3756 2 7 21 0.65536000000000000000e5
-3756 4 1 12 0.65536000000000000000e5
-3757 1 3 18 0.65536000000000000000e5
-3757 1 3 34 -0.65536000000000000000e5
-3757 1 4 19 -0.13107200000000000000e6
-3757 1 4 35 -0.65536000000000000000e5
-3757 1 12 43 -0.19660800000000000000e6
-3757 1 14 45 -0.13107200000000000000e6
-3757 1 16 23 -0.65536000000000000000e5
-3757 1 17 48 0.65536000000000000000e5
-3757 1 18 49 0.65536000000000000000e5
-3757 1 20 27 0.26214400000000000000e6
-3757 2 6 12 -0.65536000000000000000e5
-3757 2 9 23 -0.65536000000000000000e5
-3757 2 10 24 -0.13107200000000000000e6
-3757 2 14 28 0.65536000000000000000e5
-3757 3 3 16 0.65536000000000000000e5
-3757 3 4 17 0.65536000000000000000e5
-3757 3 5 34 -0.65536000000000000000e5
-3757 3 13 42 0.65536000000000000000e5
-3757 3 14 27 -0.19660800000000000000e6
-3757 3 14 43 0.65536000000000000000e5
-3757 4 1 14 0.65536000000000000000e5
-3757 4 2 14 0.65536000000000000000e5
-3758 4 1 15 0.65536000000000000000e5
-3758 4 10 10 -0.13107200000000000000e6
-3759 2 2 16 -0.65536000000000000000e5
-3759 2 16 16 0.13107200000000000000e6
-3759 4 1 16 0.65536000000000000000e5
-3760 1 1 24 0.65536000000000000000e5
-3760 1 2 25 0.65536000000000000000e5
-3760 1 7 38 0.13107200000000000000e6
-3760 1 8 23 -0.13107200000000000000e6
-3760 1 22 37 -0.65536000000000000000e5
-3760 1 23 38 -0.65536000000000000000e5
-3760 3 1 38 0.65536000000000000000e5
-3760 3 2 23 0.65536000000000000000e5
-3760 3 22 27 -0.13107200000000000000e6
-3760 4 1 17 0.65536000000000000000e5
-3760 4 16 16 0.13107200000000000000e6
-3761 1 1 40 -0.65536000000000000000e5
-3761 1 23 38 0.65536000000000000000e5
-3761 2 2 32 0.65536000000000000000e5
-3761 2 3 17 -0.65536000000000000000e5
-3761 3 1 38 -0.65536000000000000000e5
-3761 3 2 39 -0.65536000000000000000e5
-3761 3 8 37 0.13107200000000000000e6
-3761 4 1 18 0.65536000000000000000e5
-3762 4 1 19 0.65536000000000000000e5
-3762 4 4 16 -0.65536000000000000000e5
-3763 1 1 24 0.32768000000000000000e5
-3763 1 1 32 -0.13107200000000000000e6
-3763 1 1 40 0.32768000000000000000e5
-3763 1 2 33 0.26214400000000000000e6
-3763 1 3 34 -0.26214400000000000000e6
-3763 1 7 38 -0.65536000000000000000e5
-3763 1 8 23 0.65536000000000000000e5
-3763 1 10 41 0.13107200000000000000e6
-3763 1 11 42 -0.26214400000000000000e6
-3763 1 12 43 -0.52428800000000000000e6
-3763 1 16 23 0.26214400000000000000e6
-3763 1 22 37 -0.32768000000000000000e5
-3763 1 23 38 -0.32768000000000000000e5
-3763 1 28 43 0.26214400000000000000e6
-3763 1 32 47 0.26214400000000000000e6
-3763 1 33 48 0.26214400000000000000e6
-3763 2 1 31 -0.13107200000000000000e6
-3763 2 2 16 0.32768000000000000000e5
-3763 2 7 21 0.13107200000000000000e6
-3763 2 12 26 0.26214400000000000000e6
-3763 2 16 16 -0.65536000000000000000e5
-3763 3 1 22 0.32768000000000000000e5
-3763 3 1 30 -0.65536000000000000000e5
-3763 3 1 34 -0.26214400000000000000e6
-3763 3 1 38 0.32768000000000000000e5
-3763 3 2 23 0.32768000000000000000e5
-3763 3 2 31 0.13107200000000000000e6
-3763 3 3 32 0.13107200000000000000e6
-3763 3 10 23 -0.65536000000000000000e5
-3763 3 13 42 0.52428800000000000000e6
-3763 3 22 27 -0.65536000000000000000e5
-3763 3 28 41 0.26214400000000000000e6
-3763 3 29 42 0.26214400000000000000e6
-3763 4 1 20 0.65536000000000000000e5
-3763 4 3 31 -0.26214400000000000000e6
-3763 4 6 18 -0.65536000000000000000e5
-3763 4 16 16 0.65536000000000000000e5
-3764 1 2 33 0.13107200000000000000e6
-3764 1 7 38 -0.65536000000000000000e5
-3764 1 8 23 0.65536000000000000000e5
-3764 1 11 42 -0.13107200000000000000e6
-3764 1 12 43 -0.26214400000000000000e6
-3764 1 28 43 0.13107200000000000000e6
-3764 1 32 47 0.13107200000000000000e6
-3764 1 33 48 0.13107200000000000000e6
-3764 2 12 26 0.13107200000000000000e6
-3764 3 2 31 -0.13107200000000000000e6
-3764 3 10 23 -0.65536000000000000000e5
-3764 3 13 42 0.26214400000000000000e6
-3764 3 28 41 0.13107200000000000000e6
-3764 3 29 42 0.13107200000000000000e6
-3764 4 1 21 0.65536000000000000000e5
-3764 4 3 31 -0.13107200000000000000e6
-3764 4 6 18 -0.65536000000000000000e5
-3765 4 1 22 0.65536000000000000000e5
-3765 4 6 18 -0.65536000000000000000e5
-3766 1 1 32 0.65536000000000000000e5
-3766 1 3 34 0.13107200000000000000e6
-3766 1 10 41 -0.65536000000000000000e5
-3766 1 16 23 -0.13107200000000000000e6
-3766 2 1 31 0.65536000000000000000e5
-3766 2 7 21 -0.65536000000000000000e5
-3766 3 3 32 -0.65536000000000000000e5
-3766 4 1 23 0.65536000000000000000e5
-3767 1 2 33 0.65536000000000000000e5
-3767 1 3 34 -0.13107200000000000000e6
-3767 1 11 42 -0.65536000000000000000e5
-3767 1 12 43 -0.13107200000000000000e6
-3767 1 16 47 0.13107200000000000000e6
-3767 1 28 43 0.65536000000000000000e5
-3767 1 32 47 0.65536000000000000000e5
-3767 1 33 48 0.65536000000000000000e5
-3767 2 12 26 0.65536000000000000000e5
-3767 3 2 31 0.65536000000000000000e5
-3767 3 3 32 0.65536000000000000000e5
-3767 3 12 41 0.13107200000000000000e6
-3767 3 13 42 0.13107200000000000000e6
-3767 3 28 41 0.65536000000000000000e5
-3767 3 29 42 0.65536000000000000000e5
-3767 4 1 24 0.65536000000000000000e5
-3767 4 3 31 -0.65536000000000000000e5
-3768 1 3 18 -0.65536000000000000000e5
-3768 1 3 34 0.65536000000000000000e5
-3768 1 4 19 0.13107200000000000000e6
-3768 1 4 35 0.65536000000000000000e5
-3768 1 12 43 0.13107200000000000000e6
-3768 1 14 45 0.13107200000000000000e6
-3768 1 16 47 -0.65536000000000000000e5
-3768 1 17 48 -0.65536000000000000000e5
-3768 1 18 49 -0.65536000000000000000e5
-3768 1 20 27 -0.26214400000000000000e6
-3768 1 27 34 0.13107200000000000000e6
-3768 2 9 23 0.65536000000000000000e5
-3768 2 10 24 0.13107200000000000000e6
-3768 2 14 28 -0.65536000000000000000e5
-3768 3 1 34 0.65536000000000000000e5
-3768 3 3 16 -0.65536000000000000000e5
-3768 3 4 17 -0.65536000000000000000e5
-3768 3 5 34 0.65536000000000000000e5
-3768 3 12 41 -0.65536000000000000000e5
-3768 3 13 42 -0.65536000000000000000e5
-3768 3 14 27 0.19660800000000000000e6
-3768 3 14 43 -0.65536000000000000000e5
-3768 4 1 25 0.65536000000000000000e5
-3768 4 2 14 -0.65536000000000000000e5
-3769 4 1 26 0.65536000000000000000e5
-3769 4 16 16 -0.13107200000000000000e6
-3770 1 1 40 0.65536000000000000000e5
-3770 1 23 38 -0.65536000000000000000e5
-3770 3 1 38 0.65536000000000000000e5
-3770 3 2 39 0.65536000000000000000e5
-3770 3 8 37 -0.13107200000000000000e6
-3770 4 1 27 0.65536000000000000000e5
-3771 1 1 40 0.65536000000000000000e5
-3771 1 6 37 0.65536000000000000000e5
-3771 1 9 40 0.13107200000000000000e6
-3771 1 10 41 -0.26214400000000000000e6
-3771 1 23 38 -0.65536000000000000000e5
-3771 1 24 39 -0.65536000000000000000e5
-3771 1 26 41 -0.13107200000000000000e6
-3771 1 32 47 0.26214400000000000000e6
-3771 3 2 39 0.65536000000000000000e5
-3771 3 9 38 0.13107200000000000000e6
-3771 3 28 41 0.26214400000000000000e6
-3771 4 1 28 0.65536000000000000000e5
-3771 4 2 30 0.13107200000000000000e6
-3772 1 9 40 -0.65536000000000000000e5
-3772 1 10 41 0.13107200000000000000e6
-3772 1 11 42 -0.13107200000000000000e6
-3772 1 26 41 0.65536000000000000000e5
-3772 1 32 47 -0.13107200000000000000e6
-3772 1 33 48 0.13107200000000000000e6
-3772 2 12 26 0.13107200000000000000e6
-3772 2 20 34 -0.13107200000000000000e6
-3772 3 8 37 0.65536000000000000000e5
-3772 3 13 42 0.26214400000000000000e6
-3772 3 22 35 -0.26214400000000000000e6
-3772 3 28 41 -0.13107200000000000000e6
-3772 3 29 42 0.13107200000000000000e6
-3772 4 1 30 0.65536000000000000000e5
-3772 4 2 30 -0.65536000000000000000e5
-3772 4 3 31 -0.13107200000000000000e6
-3772 4 6 34 -0.13107200000000000000e6
-3773 1 9 40 -0.32768000000000000000e5
-3773 1 10 41 0.13107200000000000000e6
-3773 1 11 42 0.65536000000000000000e5
-3773 1 26 41 0.32768000000000000000e5
-3773 1 32 47 -0.13107200000000000000e6
-3773 1 33 48 -0.65536000000000000000e5
-3773 2 12 26 -0.65536000000000000000e5
-3773 2 20 34 0.65536000000000000000e5
-3773 3 8 37 0.32768000000000000000e5
-3773 3 9 38 -0.32768000000000000000e5
-3773 3 12 41 -0.13107200000000000000e6
-3773 3 13 42 -0.13107200000000000000e6
-3773 3 22 27 0.32768000000000000000e5
-3773 3 22 35 0.13107200000000000000e6
-3773 3 28 41 -0.13107200000000000000e6
-3773 3 29 42 -0.65536000000000000000e5
-3773 4 1 29 0.32768000000000000000e5
-3773 4 1 31 0.65536000000000000000e5
-3773 4 2 30 -0.32768000000000000000e5
-3773 4 3 31 0.65536000000000000000e5
-3773 4 6 34 0.65536000000000000000e5
-3774 2 1 35 0.65536000000000000000e5
-3774 2 2 32 -0.65536000000000000000e5
-3774 4 1 32 0.65536000000000000000e5
-3775 1 6 53 0.13107200000000000000e6
-3775 1 25 40 -0.13107200000000000000e6
-3775 3 2 47 0.65536000000000000000e5
-3775 3 24 37 0.13107200000000000000e6
-3775 3 25 38 -0.65536000000000000000e5
-3775 3 27 40 0.39321600000000000000e6
-3775 3 28 41 -0.26214400000000000000e6
-3775 4 1 33 0.65536000000000000000e5
-3775 4 4 32 -0.13107200000000000000e6
-3775 4 16 28 0.65536000000000000000e5
-3775 4 17 29 0.13107200000000000000e6
-3776 2 16 30 -0.65536000000000000000e5
-3776 2 16 34 0.65536000000000000000e5
-3776 4 1 34 0.65536000000000000000e5
-3777 1 2 49 0.65536000000000000000e5
-3777 1 6 53 -0.13107200000000000000e6
-3777 1 8 39 -0.13107200000000000000e6
-3777 1 9 40 -0.13107200000000000000e6
-3777 1 10 41 0.26214400000000000000e6
-3777 1 23 38 0.65536000000000000000e5
-3777 1 24 39 0.65536000000000000000e5
-3777 1 25 40 0.13107200000000000000e6
-3777 1 26 41 0.13107200000000000000e6
-3777 1 32 47 -0.26214400000000000000e6
-3777 2 26 32 0.65536000000000000000e5
-3777 3 2 47 -0.65536000000000000000e5
-3777 3 9 38 -0.13107200000000000000e6
-3777 3 24 37 -0.13107200000000000000e6
-3777 3 25 38 0.65536000000000000000e5
-3777 3 27 40 -0.39321600000000000000e6
-3777 4 1 35 0.65536000000000000000e5
-3777 4 2 30 -0.13107200000000000000e6
-3777 4 4 32 0.13107200000000000000e6
-3777 4 16 28 -0.65536000000000000000e5
-3777 4 17 29 -0.13107200000000000000e6
-3778 1 1 48 0.13107200000000000000e6
-3778 1 2 5 0.65536000000000000000e5
-3778 1 2 9 0.13107200000000000000e6
-3778 1 2 25 -0.65536000000000000000e5
-3778 1 2 33 0.52428800000000000000e6
-3778 1 2 49 0.13107200000000000000e6
-3778 1 3 34 -0.52428800000000000000e6
-3778 1 4 11 -0.13107200000000000000e6
-3778 1 8 39 0.13107200000000000000e6
-3778 1 9 40 0.13107200000000000000e6
-3778 1 10 41 0.26214400000000000000e6
-3778 1 11 42 -0.26214400000000000000e6
-3778 1 12 43 -0.10485760000000000000e7
-3778 1 23 38 0.13107200000000000000e6
-3778 1 26 41 -0.13107200000000000000e6
-3778 1 28 43 0.52428800000000000000e6
-3778 1 32 47 0.78643200000000000000e6
-3778 1 33 48 0.26214400000000000000e6
-3778 2 2 8 0.13107200000000000000e6
-3778 2 2 32 0.13107200000000000000e6
-3778 2 3 9 -0.13107200000000000000e6
-3778 2 7 21 0.26214400000000000000e6
-3778 2 12 26 0.26214400000000000000e6
-3778 2 16 30 0.13107200000000000000e6
-3778 2 20 34 0.26214400000000000000e6
-3778 3 1 6 0.65536000000000000000e5
-3778 3 1 14 -0.26214400000000000000e6
-3778 3 1 30 -0.13107200000000000000e6
-3778 3 2 3 0.65536000000000000000e5
-3778 3 2 15 0.26214400000000000000e6
-3778 3 3 32 0.52428800000000000000e6
-3778 3 4 9 -0.13107200000000000000e6
-3778 3 8 37 0.13107200000000000000e6
-3778 3 10 23 -0.26214400000000000000e6
-3778 3 13 42 0.52428800000000000000e6
-3778 3 22 35 0.52428800000000000000e6
-3778 3 28 41 0.78643200000000000000e6
-3778 3 29 42 0.26214400000000000000e6
-3778 4 2 3 0.65536000000000000000e5
-3778 4 2 30 0.13107200000000000000e6
-3778 4 3 31 -0.26214400000000000000e6
-3778 4 6 18 -0.13107200000000000000e6
-3778 4 6 34 0.26214400000000000000e6
-3779 4 1 5 -0.65536000000000000000e5
-3779 4 2 4 0.65536000000000000000e5
-3780 1 1 48 0.65536000000000000000e5
-3780 1 2 5 -0.65536000000000000000e5
-3780 1 2 25 0.65536000000000000000e5
-3780 1 2 49 0.65536000000000000000e5
-3780 1 4 11 -0.13107200000000000000e6
-3780 1 9 40 0.13107200000000000000e6
-3780 1 12 43 -0.52428800000000000000e6
-3780 1 23 38 0.65536000000000000000e5
-3780 1 26 41 -0.13107200000000000000e6
-3780 1 28 43 0.26214400000000000000e6
-3780 1 32 47 0.52428800000000000000e6
-3780 2 2 32 0.65536000000000000000e5
-3780 2 3 9 -0.13107200000000000000e6
-3780 2 16 30 0.13107200000000000000e6
-3780 2 20 34 0.26214400000000000000e6
-3780 3 1 30 -0.13107200000000000000e6
-3780 3 2 15 0.26214400000000000000e6
-3780 3 3 32 0.26214400000000000000e6
-3780 3 4 5 0.65536000000000000000e5
-3780 3 4 9 -0.26214400000000000000e6
-3780 3 10 23 -0.13107200000000000000e6
-3780 3 22 35 0.52428800000000000000e6
-3780 3 28 41 0.52428800000000000000e6
-3780 4 1 5 -0.65536000000000000000e5
-3780 4 2 5 0.65536000000000000000e5
-3780 4 2 30 0.13107200000000000000e6
-3780 4 6 34 0.26214400000000000000e6
-3781 1 1 48 -0.32768000000000000000e5
-3781 1 2 33 -0.26214400000000000000e6
-3781 1 2 49 -0.32768000000000000000e5
-3781 1 3 34 0.26214400000000000000e6
-3781 1 8 23 -0.65536000000000000000e5
-3781 1 8 39 -0.65536000000000000000e5
-3781 1 10 41 -0.13107200000000000000e6
-3781 1 11 42 0.13107200000000000000e6
-3781 1 12 43 0.26214400000000000000e6
-3781 1 23 38 -0.32768000000000000000e5
-3781 1 28 43 -0.13107200000000000000e6
-3781 1 32 47 -0.13107200000000000000e6
-3781 1 33 48 -0.13107200000000000000e6
-3781 2 2 8 -0.65536000000000000000e5
-3781 2 2 32 -0.32768000000000000000e5
-3781 2 7 21 -0.13107200000000000000e6
-3781 2 12 26 -0.13107200000000000000e6
-3781 3 3 32 -0.13107200000000000000e6
-3781 3 8 37 -0.65536000000000000000e5
-3781 3 10 23 0.65536000000000000000e5
-3781 3 13 42 -0.26214400000000000000e6
-3781 3 28 41 -0.13107200000000000000e6
-3781 3 29 42 -0.13107200000000000000e6
-3781 4 2 7 0.65536000000000000000e5
-3781 4 3 31 0.13107200000000000000e6
-3781 4 6 18 0.65536000000000000000e5
-3782 1 1 48 -0.32768000000000000000e5
-3782 1 2 9 -0.65536000000000000000e5
-3782 1 2 33 -0.26214400000000000000e6
-3782 1 2 49 -0.32768000000000000000e5
-3782 1 3 34 0.26214400000000000000e6
-3782 1 8 39 -0.65536000000000000000e5
-3782 1 10 41 -0.13107200000000000000e6
-3782 1 11 42 0.13107200000000000000e6
-3782 1 12 43 0.26214400000000000000e6
-3782 1 23 38 -0.32768000000000000000e5
-3782 1 28 43 -0.13107200000000000000e6
-3782 1 32 47 -0.13107200000000000000e6
-3782 1 33 48 -0.13107200000000000000e6
-3782 2 2 8 -0.65536000000000000000e5
-3782 2 2 32 -0.32768000000000000000e5
-3782 2 4 10 0.13107200000000000000e6
-3782 2 7 21 -0.26214400000000000000e6
-3782 2 12 26 -0.13107200000000000000e6
-3782 3 1 14 0.26214400000000000000e6
-3782 3 2 15 0.13107200000000000000e6
-3782 3 3 16 -0.26214400000000000000e6
-3782 3 3 32 -0.13107200000000000000e6
-3782 3 4 9 0.65536000000000000000e5
-3782 3 8 37 -0.65536000000000000000e5
-3782 3 10 23 0.65536000000000000000e5
-3782 3 13 42 -0.26214400000000000000e6
-3782 3 28 41 -0.13107200000000000000e6
-3782 3 29 42 -0.13107200000000000000e6
-3782 4 2 8 0.65536000000000000000e5
-3782 4 3 31 0.13107200000000000000e6
-3782 4 6 18 0.65536000000000000000e5
-3783 1 1 48 0.32768000000000000000e5
-3783 1 2 49 0.32768000000000000000e5
-3783 1 9 40 0.65536000000000000000e5
-3783 1 10 25 -0.65536000000000000000e5
-3783 1 12 43 -0.26214400000000000000e6
-3783 1 23 38 0.32768000000000000000e5
-3783 1 26 41 -0.65536000000000000000e5
-3783 1 28 43 0.13107200000000000000e6
-3783 1 32 47 0.26214400000000000000e6
-3783 2 2 32 0.32768000000000000000e5
-3783 2 3 9 -0.65536000000000000000e5
-3783 2 16 30 0.65536000000000000000e5
-3783 2 20 34 0.13107200000000000000e6
-3783 3 1 30 -0.65536000000000000000e5
-3783 3 3 32 0.13107200000000000000e6
-3783 3 10 23 -0.65536000000000000000e5
-3783 3 22 35 0.26214400000000000000e6
-3783 3 28 41 0.26214400000000000000e6
-3783 4 2 9 0.65536000000000000000e5
-3783 4 2 30 0.65536000000000000000e5
-3783 4 6 34 0.13107200000000000000e6
-3784 1 1 48 -0.32768000000000000000e5
-3784 1 2 17 -0.13107200000000000000e6
-3784 1 2 33 -0.13107200000000000000e6
-3784 1 2 49 -0.32768000000000000000e5
-3784 1 3 34 0.13107200000000000000e6
-3784 1 4 11 0.32768000000000000000e5
-3784 1 8 23 -0.32768000000000000000e5
-3784 1 8 39 -0.32768000000000000000e5
-3784 1 9 40 -0.32768000000000000000e5
-3784 1 10 41 -0.65536000000000000000e5
-3784 1 11 42 0.65536000000000000000e5
-3784 1 12 43 0.26214400000000000000e6
-3784 1 16 23 0.13107200000000000000e6
-3784 1 23 38 -0.32768000000000000000e5
-3784 1 26 41 0.32768000000000000000e5
-3784 1 28 43 -0.13107200000000000000e6
-3784 1 32 47 -0.19660800000000000000e6
-3784 1 33 48 -0.65536000000000000000e5
-3784 2 2 8 -0.32768000000000000000e5
-3784 2 2 32 -0.32768000000000000000e5
-3784 2 3 9 0.32768000000000000000e5
-3784 2 4 10 -0.65536000000000000000e5
-3784 2 12 26 -0.65536000000000000000e5
-3784 2 16 30 -0.32768000000000000000e5
-3784 2 20 34 -0.65536000000000000000e5
-3784 3 1 14 0.65536000000000000000e5
-3784 3 1 30 0.32768000000000000000e5
-3784 3 2 7 0.32768000000000000000e5
-3784 3 2 15 -0.13107200000000000000e6
-3784 3 3 16 0.13107200000000000000e6
-3784 3 3 32 -0.13107200000000000000e6
-3784 3 4 9 0.32768000000000000000e5
-3784 3 8 37 -0.32768000000000000000e5
-3784 3 10 23 0.65536000000000000000e5
-3784 3 13 42 -0.13107200000000000000e6
-3784 3 22 35 -0.13107200000000000000e6
-3784 3 28 41 -0.19660800000000000000e6
-3784 3 29 42 -0.65536000000000000000e5
-3784 4 2 6 0.32768000000000000000e5
-3784 4 2 10 0.65536000000000000000e5
-3784 4 2 30 -0.32768000000000000000e5
-3784 4 3 31 0.65536000000000000000e5
-3784 4 6 18 0.32768000000000000000e5
-3784 4 6 34 -0.65536000000000000000e5
-3785 2 4 10 -0.65536000000000000000e5
-3785 2 7 21 0.65536000000000000000e5
-3785 4 2 11 0.65536000000000000000e5
-3786 1 2 33 0.65536000000000000000e5
-3786 1 3 18 -0.13107200000000000000e6
-3786 1 6 13 0.65536000000000000000e5
-3786 1 10 41 0.65536000000000000000e5
-3786 2 4 10 -0.65536000000000000000e5
-3786 2 7 21 0.65536000000000000000e5
-3786 2 12 26 0.65536000000000000000e5
-3786 3 1 14 -0.65536000000000000000e5
-3786 3 3 16 0.13107200000000000000e6
-3786 3 3 32 0.65536000000000000000e5
-3786 4 2 12 0.65536000000000000000e5
-3786 4 8 20 0.65536000000000000000e5
-3787 1 3 18 0.65536000000000000000e5
-3787 1 3 34 -0.65536000000000000000e5
-3787 1 4 19 -0.13107200000000000000e6
-3787 1 4 35 -0.65536000000000000000e5
-3787 1 12 43 -0.19660800000000000000e6
-3787 1 14 45 -0.13107200000000000000e6
-3787 1 16 23 -0.65536000000000000000e5
-3787 1 17 48 0.65536000000000000000e5
-3787 1 18 49 0.65536000000000000000e5
-3787 1 20 27 0.26214400000000000000e6
-3787 2 6 12 -0.65536000000000000000e5
-3787 2 9 23 -0.65536000000000000000e5
-3787 2 10 24 -0.13107200000000000000e6
-3787 2 14 28 0.65536000000000000000e5
-3787 3 3 16 0.65536000000000000000e5
-3787 3 4 17 0.65536000000000000000e5
-3787 3 5 34 -0.65536000000000000000e5
-3787 3 13 42 0.65536000000000000000e5
-3787 3 14 27 -0.19660800000000000000e6
-3787 3 14 43 0.65536000000000000000e5
-3787 4 2 13 0.65536000000000000000e5
-3787 4 2 14 0.65536000000000000000e5
-3788 1 2 17 0.32768000000000000000e5
-3788 1 3 18 0.32768000000000000000e5
-3788 1 3 34 0.32768000000000000000e5
-3788 1 4 19 0.65536000000000000000e5
-3788 1 10 17 0.65536000000000000000e5
-3788 1 20 27 -0.13107200000000000000e6
-3788 2 6 12 0.32768000000000000000e5
-3788 2 10 24 0.65536000000000000000e5
-3788 3 3 16 0.32768000000000000000e5
-3788 3 7 20 -0.13107200000000000000e6
-3788 4 2 15 0.65536000000000000000e5
-3789 1 1 24 0.65536000000000000000e5
-3789 1 2 25 0.65536000000000000000e5
-3789 1 7 38 0.13107200000000000000e6
-3789 1 8 23 -0.13107200000000000000e6
-3789 1 22 37 -0.65536000000000000000e5
-3789 1 23 38 -0.65536000000000000000e5
-3789 3 1 38 0.65536000000000000000e5
-3789 3 2 23 0.65536000000000000000e5
-3789 3 22 27 -0.13107200000000000000e6
-3789 4 2 16 0.65536000000000000000e5
-3789 4 16 16 0.13107200000000000000e6
-3790 1 1 40 -0.65536000000000000000e5
-3790 1 23 38 0.65536000000000000000e5
-3790 2 2 32 0.65536000000000000000e5
-3790 2 3 17 -0.65536000000000000000e5
-3790 3 1 38 -0.65536000000000000000e5
-3790 3 2 39 -0.65536000000000000000e5
-3790 3 8 37 0.13107200000000000000e6
-3790 4 2 17 0.65536000000000000000e5
-3791 4 2 18 0.65536000000000000000e5
-3791 4 4 16 -0.65536000000000000000e5
-3792 1 6 37 -0.65536000000000000000e5
-3792 1 24 39 0.65536000000000000000e5
-3792 2 3 33 0.65536000000000000000e5
-3792 2 4 18 -0.65536000000000000000e5
-3792 3 2 39 -0.65536000000000000000e5
-3792 3 3 40 -0.65536000000000000000e5
-3792 3 9 38 0.13107200000000000000e6
-3792 4 2 19 0.65536000000000000000e5
-3793 1 2 33 0.13107200000000000000e6
-3793 1 7 38 -0.65536000000000000000e5
-3793 1 8 23 0.65536000000000000000e5
-3793 1 11 42 -0.13107200000000000000e6
-3793 1 12 43 -0.26214400000000000000e6
-3793 1 28 43 0.13107200000000000000e6
-3793 1 32 47 0.13107200000000000000e6
-3793 1 33 48 0.13107200000000000000e6
-3793 2 12 26 0.13107200000000000000e6
-3793 3 2 31 -0.13107200000000000000e6
-3793 3 10 23 -0.65536000000000000000e5
-3793 3 13 42 0.26214400000000000000e6
-3793 3 28 41 0.13107200000000000000e6
-3793 3 29 42 0.13107200000000000000e6
-3793 4 2 20 0.65536000000000000000e5
-3793 4 3 31 -0.13107200000000000000e6
-3793 4 6 18 -0.65536000000000000000e5
-3794 4 2 21 0.65536000000000000000e5
-3794 4 6 18 -0.65536000000000000000e5
-3795 1 9 40 -0.65536000000000000000e5
-3795 1 10 25 0.65536000000000000000e5
-3795 3 1 30 0.65536000000000000000e5
-3795 3 3 32 -0.13107200000000000000e6
-3795 3 10 23 0.65536000000000000000e5
-3795 4 2 22 0.65536000000000000000e5
-3796 1 2 33 0.65536000000000000000e5
-3796 1 3 34 -0.13107200000000000000e6
-3796 1 11 42 -0.65536000000000000000e5
-3796 1 12 43 -0.13107200000000000000e6
-3796 1 16 47 0.13107200000000000000e6
-3796 1 28 43 0.65536000000000000000e5
-3796 1 32 47 0.65536000000000000000e5
-3796 1 33 48 0.65536000000000000000e5
-3796 2 12 26 0.65536000000000000000e5
-3796 3 2 31 0.65536000000000000000e5
-3796 3 3 32 0.65536000000000000000e5
-3796 3 12 41 0.13107200000000000000e6
-3796 3 13 42 0.13107200000000000000e6
-3796 3 28 41 0.65536000000000000000e5
-3796 3 29 42 0.65536000000000000000e5
-3796 4 2 23 0.65536000000000000000e5
-3796 4 3 31 -0.65536000000000000000e5
-3797 4 2 24 0.65536000000000000000e5
-3797 4 8 20 -0.65536000000000000000e5
-3798 1 3 18 0.65536000000000000000e5
-3798 1 3 34 0.65536000000000000000e5
-3798 1 4 19 -0.13107200000000000000e6
-3798 1 4 35 0.65536000000000000000e5
-3798 1 12 43 -0.65536000000000000000e5
-3798 1 13 44 0.13107200000000000000e6
-3798 1 16 47 -0.65536000000000000000e5
-3798 1 17 48 -0.65536000000000000000e5
-3798 3 3 16 0.65536000000000000000e5
-3798 3 4 17 0.65536000000000000000e5
-3798 3 12 41 -0.65536000000000000000e5
-3798 3 13 42 -0.65536000000000000000e5
-3798 4 2 14 0.65536000000000000000e5
-3798 4 2 25 0.65536000000000000000e5
-3799 1 1 40 0.65536000000000000000e5
-3799 1 23 38 -0.65536000000000000000e5
-3799 3 1 38 0.65536000000000000000e5
-3799 3 2 39 0.65536000000000000000e5
-3799 3 8 37 -0.13107200000000000000e6
-3799 4 2 26 0.65536000000000000000e5
-3800 1 1 40 0.65536000000000000000e5
-3800 1 6 37 0.65536000000000000000e5
-3800 1 9 40 0.13107200000000000000e6
-3800 1 10 41 -0.26214400000000000000e6
-3800 1 23 38 -0.65536000000000000000e5
-3800 1 24 39 -0.65536000000000000000e5
-3800 1 26 41 -0.13107200000000000000e6
-3800 1 32 47 0.26214400000000000000e6
-3800 3 2 39 0.65536000000000000000e5
-3800 3 9 38 0.13107200000000000000e6
-3800 3 28 41 0.26214400000000000000e6
-3800 4 2 27 0.65536000000000000000e5
-3800 4 2 30 0.13107200000000000000e6
-3801 1 6 37 0.65536000000000000000e5
-3801 1 24 39 -0.65536000000000000000e5
-3801 3 2 39 0.65536000000000000000e5
-3801 3 3 40 0.65536000000000000000e5
-3801 3 9 38 -0.13107200000000000000e6
-3801 4 2 28 0.65536000000000000000e5
-3802 1 9 40 -0.65536000000000000000e5
-3802 1 10 41 0.13107200000000000000e6
-3802 1 11 42 -0.13107200000000000000e6
-3802 1 26 41 0.65536000000000000000e5
-3802 1 32 47 -0.13107200000000000000e6
-3802 1 33 48 0.13107200000000000000e6
-3802 2 12 26 0.13107200000000000000e6
-3802 2 20 34 -0.13107200000000000000e6
-3802 3 8 37 0.65536000000000000000e5
-3802 3 13 42 0.26214400000000000000e6
-3802 3 22 35 -0.26214400000000000000e6
-3802 3 28 41 -0.13107200000000000000e6
-3802 3 29 42 0.13107200000000000000e6
-3802 4 2 29 0.65536000000000000000e5
-3802 4 2 30 -0.65536000000000000000e5
-3802 4 3 31 -0.13107200000000000000e6
-3802 4 6 34 -0.13107200000000000000e6
-3803 2 12 26 -0.65536000000000000000e5
-3803 2 20 34 0.65536000000000000000e5
-3803 4 2 31 0.65536000000000000000e5
-3803 4 6 34 0.65536000000000000000e5
-3804 1 6 53 0.13107200000000000000e6
-3804 1 25 40 -0.13107200000000000000e6
-3804 3 2 47 0.65536000000000000000e5
-3804 3 24 37 0.13107200000000000000e6
-3804 3 25 38 -0.65536000000000000000e5
-3804 3 27 40 0.39321600000000000000e6
-3804 3 28 41 -0.26214400000000000000e6
-3804 4 2 32 0.65536000000000000000e5
-3804 4 4 32 -0.13107200000000000000e6
-3804 4 16 28 0.65536000000000000000e5
-3804 4 17 29 0.13107200000000000000e6
-3805 4 2 33 0.65536000000000000000e5
-3805 4 16 28 -0.65536000000000000000e5
-3806 4 2 34 0.65536000000000000000e5
-3806 4 17 29 -0.65536000000000000000e5
-3807 1 1 48 -0.65536000000000000000e5
-3807 1 2 49 -0.65536000000000000000e5
-3807 1 6 53 -0.13107200000000000000e6
-3807 1 8 39 -0.26214400000000000000e6
-3807 1 9 40 -0.26214400000000000000e6
-3807 1 10 41 0.52428800000000000000e6
-3807 1 12 43 0.52428800000000000000e6
-3807 1 22 53 0.65536000000000000000e5
-3807 1 23 38 -0.65536000000000000000e5
-3807 1 24 55 0.13107200000000000000e6
-3807 1 25 40 0.13107200000000000000e6
-3807 1 26 41 0.13107200000000000000e6
-3807 1 28 43 -0.26214400000000000000e6
-3807 1 32 47 -0.52428800000000000000e6
-3807 1 37 52 -0.26214400000000000000e6
-3807 1 40 47 -0.65536000000000000000e5
-3807 2 2 32 -0.65536000000000000000e5
-3807 2 3 33 -0.65536000000000000000e5
-3807 2 16 30 -0.13107200000000000000e6
-3807 2 20 34 -0.26214400000000000000e6
-3807 2 26 32 0.65536000000000000000e5
-3807 3 9 38 -0.26214400000000000000e6
-3807 3 22 35 -0.52428800000000000000e6
-3807 3 22 51 -0.26214400000000000000e6
-3807 3 24 37 -0.13107200000000000000e6
-3807 3 27 40 -0.26214400000000000000e6
-3807 3 28 41 -0.52428800000000000000e6
-3807 4 2 30 -0.26214400000000000000e6
-3807 4 2 35 0.65536000000000000000e5
-3807 4 4 32 0.13107200000000000000e6
-3807 4 6 34 -0.26214400000000000000e6
-3807 4 16 28 -0.65536000000000000000e5
-3807 4 17 29 -0.13107200000000000000e6
-3807 4 20 32 -0.13107200000000000000e6
-3808 4 1 5 -0.32768000000000000000e5
-3808 4 3 3 0.65536000000000000000e5
-3809 1 1 48 0.65536000000000000000e5
-3809 1 2 5 -0.65536000000000000000e5
-3809 1 2 25 0.65536000000000000000e5
-3809 1 2 49 0.65536000000000000000e5
-3809 1 4 11 -0.13107200000000000000e6
-3809 1 9 40 0.13107200000000000000e6
-3809 1 12 43 -0.52428800000000000000e6
-3809 1 23 38 0.65536000000000000000e5
-3809 1 26 41 -0.13107200000000000000e6
-3809 1 28 43 0.26214400000000000000e6
-3809 1 32 47 0.52428800000000000000e6
-3809 2 2 32 0.65536000000000000000e5
-3809 2 3 9 -0.13107200000000000000e6
-3809 2 16 30 0.13107200000000000000e6
-3809 2 20 34 0.26214400000000000000e6
-3809 3 1 30 -0.13107200000000000000e6
-3809 3 2 15 0.26214400000000000000e6
-3809 3 3 32 0.26214400000000000000e6
-3809 3 4 5 0.65536000000000000000e5
-3809 3 4 9 -0.26214400000000000000e6
-3809 3 10 23 -0.13107200000000000000e6
-3809 3 22 35 0.52428800000000000000e6
-3809 3 28 41 0.52428800000000000000e6
-3809 4 1 5 -0.65536000000000000000e5
-3809 4 2 30 0.13107200000000000000e6
-3809 4 3 4 0.65536000000000000000e5
-3809 4 6 34 0.26214400000000000000e6
-3810 4 3 5 0.65536000000000000000e5
-3810 4 4 4 -0.13107200000000000000e6
-3811 1 1 48 -0.32768000000000000000e5
-3811 1 2 33 -0.26214400000000000000e6
-3811 1 2 49 -0.32768000000000000000e5
-3811 1 3 34 0.26214400000000000000e6
-3811 1 8 23 -0.65536000000000000000e5
-3811 1 8 39 -0.65536000000000000000e5
-3811 1 10 41 -0.13107200000000000000e6
-3811 1 11 42 0.13107200000000000000e6
-3811 1 12 43 0.26214400000000000000e6
-3811 1 23 38 -0.32768000000000000000e5
-3811 1 28 43 -0.13107200000000000000e6
-3811 1 32 47 -0.13107200000000000000e6
-3811 1 33 48 -0.13107200000000000000e6
-3811 2 2 8 -0.65536000000000000000e5
-3811 2 2 32 -0.32768000000000000000e5
-3811 2 7 21 -0.13107200000000000000e6
-3811 2 12 26 -0.13107200000000000000e6
-3811 3 3 32 -0.13107200000000000000e6
-3811 3 8 37 -0.65536000000000000000e5
-3811 3 10 23 0.65536000000000000000e5
-3811 3 13 42 -0.26214400000000000000e6
-3811 3 28 41 -0.13107200000000000000e6
-3811 3 29 42 -0.13107200000000000000e6
-3811 4 3 6 0.65536000000000000000e5
-3811 4 3 31 0.13107200000000000000e6
-3811 4 6 18 0.65536000000000000000e5
-3812 1 1 48 -0.32768000000000000000e5
-3812 1 2 9 -0.65536000000000000000e5
-3812 1 2 33 -0.26214400000000000000e6
-3812 1 2 49 -0.32768000000000000000e5
-3812 1 3 34 0.26214400000000000000e6
-3812 1 8 39 -0.65536000000000000000e5
-3812 1 10 41 -0.13107200000000000000e6
-3812 1 11 42 0.13107200000000000000e6
-3812 1 12 43 0.26214400000000000000e6
-3812 1 23 38 -0.32768000000000000000e5
-3812 1 28 43 -0.13107200000000000000e6
-3812 1 32 47 -0.13107200000000000000e6
-3812 1 33 48 -0.13107200000000000000e6
-3812 2 2 8 -0.65536000000000000000e5
-3812 2 2 32 -0.32768000000000000000e5
-3812 2 4 10 0.13107200000000000000e6
-3812 2 7 21 -0.26214400000000000000e6
-3812 2 12 26 -0.13107200000000000000e6
-3812 3 1 14 0.26214400000000000000e6
-3812 3 2 15 0.13107200000000000000e6
-3812 3 3 16 -0.26214400000000000000e6
-3812 3 3 32 -0.13107200000000000000e6
-3812 3 4 9 0.65536000000000000000e5
-3812 3 8 37 -0.65536000000000000000e5
-3812 3 10 23 0.65536000000000000000e5
-3812 3 13 42 -0.26214400000000000000e6
-3812 3 28 41 -0.13107200000000000000e6
-3812 3 29 42 -0.13107200000000000000e6
-3812 4 3 7 0.65536000000000000000e5
-3812 4 3 31 0.13107200000000000000e6
-3812 4 6 18 0.65536000000000000000e5
-3813 1 1 48 0.32768000000000000000e5
-3813 1 2 49 0.32768000000000000000e5
-3813 1 9 40 0.65536000000000000000e5
-3813 1 10 25 -0.65536000000000000000e5
-3813 1 12 43 -0.26214400000000000000e6
-3813 1 23 38 0.32768000000000000000e5
-3813 1 26 41 -0.65536000000000000000e5
-3813 1 28 43 0.13107200000000000000e6
-3813 1 32 47 0.26214400000000000000e6
-3813 2 2 32 0.32768000000000000000e5
-3813 2 3 9 -0.65536000000000000000e5
-3813 2 16 30 0.65536000000000000000e5
-3813 2 20 34 0.13107200000000000000e6
-3813 3 1 30 -0.65536000000000000000e5
-3813 3 3 32 0.13107200000000000000e6
-3813 3 10 23 -0.65536000000000000000e5
-3813 3 22 35 0.26214400000000000000e6
-3813 3 28 41 0.26214400000000000000e6
-3813 4 2 30 0.65536000000000000000e5
-3813 4 3 8 0.65536000000000000000e5
-3813 4 6 34 0.13107200000000000000e6
-3814 4 3 9 0.65536000000000000000e5
-3814 4 4 8 -0.65536000000000000000e5
-3815 2 4 10 -0.65536000000000000000e5
-3815 2 7 21 0.65536000000000000000e5
-3815 4 3 10 0.65536000000000000000e5
-3816 1 2 33 0.65536000000000000000e5
-3816 1 3 18 -0.13107200000000000000e6
-3816 1 6 13 0.65536000000000000000e5
-3816 1 10 41 0.65536000000000000000e5
-3816 2 4 10 -0.65536000000000000000e5
-3816 2 7 21 0.65536000000000000000e5
-3816 2 12 26 0.65536000000000000000e5
-3816 3 1 14 -0.65536000000000000000e5
-3816 3 3 16 0.13107200000000000000e6
-3816 3 3 32 0.65536000000000000000e5
-3816 4 3 11 0.65536000000000000000e5
-3816 4 8 20 0.65536000000000000000e5
-3817 1 2 33 0.65536000000000000000e5
-3817 1 4 35 0.13107200000000000000e6
-3817 1 11 42 -0.65536000000000000000e5
-3817 1 12 43 -0.13107200000000000000e6
-3817 2 5 11 -0.65536000000000000000e5
-3817 2 12 26 0.65536000000000000000e5
-3817 3 4 33 -0.65536000000000000000e5
-3817 3 14 27 -0.13107200000000000000e6
-3817 4 3 12 0.65536000000000000000e5
-3817 4 8 20 0.65536000000000000000e5
-3818 4 2 14 -0.65536000000000000000e5
-3818 4 3 13 0.65536000000000000000e5
-3819 1 3 18 0.65536000000000000000e5
-3819 1 4 35 0.65536000000000000000e5
-3819 1 5 20 0.13107200000000000000e6
-3819 1 5 36 -0.13107200000000000000e6
-3819 1 10 17 -0.13107200000000000000e6
-3819 1 14 45 0.13107200000000000000e6
-3819 1 17 48 -0.65536000000000000000e5
-3819 1 18 49 -0.65536000000000000000e5
-3819 2 9 23 0.65536000000000000000e5
-3819 2 14 28 -0.65536000000000000000e5
-3819 3 5 18 -0.65536000000000000000e5
-3819 3 5 34 0.65536000000000000000e5
-3819 3 13 42 -0.65536000000000000000e5
-3819 3 14 43 -0.65536000000000000000e5
-3819 4 3 14 0.65536000000000000000e5
-3819 4 8 12 -0.65536000000000000000e5
-3820 1 1 40 -0.65536000000000000000e5
-3820 1 23 38 0.65536000000000000000e5
-3820 2 2 32 0.65536000000000000000e5
-3820 2 3 17 -0.65536000000000000000e5
-3820 3 1 38 -0.65536000000000000000e5
-3820 3 2 39 -0.65536000000000000000e5
-3820 3 8 37 0.13107200000000000000e6
-3820 4 3 16 0.65536000000000000000e5
-3821 4 3 17 0.65536000000000000000e5
-3821 4 4 16 -0.65536000000000000000e5
-3822 1 6 37 -0.65536000000000000000e5
-3822 1 24 39 0.65536000000000000000e5
-3822 2 3 33 0.65536000000000000000e5
-3822 2 4 18 -0.65536000000000000000e5
-3822 3 2 39 -0.65536000000000000000e5
-3822 3 3 40 -0.65536000000000000000e5
-3822 3 9 38 0.13107200000000000000e6
-3822 4 3 18 0.65536000000000000000e5
-3823 4 3 19 0.65536000000000000000e5
-3823 4 5 17 -0.65536000000000000000e5
-3824 4 3 20 0.65536000000000000000e5
-3824 4 6 18 -0.65536000000000000000e5
-3825 1 9 40 -0.65536000000000000000e5
-3825 1 10 25 0.65536000000000000000e5
-3825 3 1 30 0.65536000000000000000e5
-3825 3 3 32 -0.13107200000000000000e6
-3825 3 10 23 0.65536000000000000000e5
-3825 4 3 21 0.65536000000000000000e5
-3826 4 3 22 0.65536000000000000000e5
-3826 4 7 19 -0.65536000000000000000e5
-3827 4 3 23 0.65536000000000000000e5
-3827 4 8 20 -0.65536000000000000000e5
-3828 1 2 33 -0.65536000000000000000e5
-3828 1 4 35 -0.13107200000000000000e6
-3828 1 11 42 0.65536000000000000000e5
-3828 1 12 43 0.13107200000000000000e6
-3828 1 17 48 0.13107200000000000000e6
-3828 1 28 43 -0.65536000000000000000e5
-3828 1 32 47 -0.65536000000000000000e5
-3828 1 33 48 -0.65536000000000000000e5
-3828 2 12 26 -0.65536000000000000000e5
-3828 3 4 33 0.65536000000000000000e5
-3828 3 14 27 0.13107200000000000000e6
-3828 3 28 41 -0.65536000000000000000e5
-3828 3 29 42 -0.65536000000000000000e5
-3828 4 3 24 0.65536000000000000000e5
-3828 4 3 31 0.65536000000000000000e5
-3828 4 8 20 -0.65536000000000000000e5
-3829 1 4 35 0.65536000000000000000e5
-3829 1 17 48 -0.65536000000000000000e5
-3829 3 5 34 0.65536000000000000000e5
-3829 3 13 42 -0.65536000000000000000e5
-3829 3 14 27 0.65536000000000000000e5
-3829 3 16 29 -0.13107200000000000000e6
-3829 4 3 25 0.65536000000000000000e5
-3830 1 1 40 0.65536000000000000000e5
-3830 1 6 37 0.65536000000000000000e5
-3830 1 9 40 0.13107200000000000000e6
-3830 1 10 41 -0.26214400000000000000e6
-3830 1 23 38 -0.65536000000000000000e5
-3830 1 24 39 -0.65536000000000000000e5
-3830 1 26 41 -0.13107200000000000000e6
-3830 1 32 47 0.26214400000000000000e6
-3830 3 2 39 0.65536000000000000000e5
-3830 3 9 38 0.13107200000000000000e6
-3830 3 28 41 0.26214400000000000000e6
-3830 4 2 30 0.13107200000000000000e6
-3830 4 3 26 0.65536000000000000000e5
-3831 1 6 37 0.65536000000000000000e5
-3831 1 24 39 -0.65536000000000000000e5
-3831 3 2 39 0.65536000000000000000e5
-3831 3 3 40 0.65536000000000000000e5
-3831 3 9 38 -0.13107200000000000000e6
-3831 4 3 27 0.65536000000000000000e5
-3832 1 1 48 0.65536000000000000000e5
-3832 1 2 49 0.13107200000000000000e6
-3832 1 8 39 0.13107200000000000000e6
-3832 1 9 40 0.13107200000000000000e6
-3832 1 10 41 -0.26214400000000000000e6
-3832 1 12 43 -0.52428800000000000000e6
-3832 1 23 38 0.65536000000000000000e5
-3832 1 25 40 -0.65536000000000000000e5
-3832 1 28 43 0.26214400000000000000e6
-3832 1 32 47 0.52428800000000000000e6
-3832 2 2 32 0.65536000000000000000e5
-3832 2 3 33 0.65536000000000000000e5
-3832 2 5 27 -0.65536000000000000000e5
-3832 2 16 30 0.13107200000000000000e6
-3832 2 20 34 0.26214400000000000000e6
-3832 3 9 38 0.13107200000000000000e6
-3832 3 22 35 0.52428800000000000000e6
-3832 3 28 41 0.52428800000000000000e6
-3832 4 2 30 0.13107200000000000000e6
-3832 4 3 28 0.65536000000000000000e5
-3832 4 6 34 0.26214400000000000000e6
-3833 4 2 30 -0.65536000000000000000e5
-3833 4 3 29 0.65536000000000000000e5
-3834 1 9 40 0.65536000000000000000e5
-3834 1 10 41 0.13107200000000000000e6
-3834 1 11 42 0.13107200000000000000e6
-3834 1 26 41 -0.65536000000000000000e5
-3834 1 32 47 -0.13107200000000000000e6
-3834 1 33 48 -0.13107200000000000000e6
-3834 3 9 38 0.65536000000000000000e5
-3834 3 10 39 0.65536000000000000000e5
-3834 3 13 42 -0.26214400000000000000e6
-3834 3 28 41 -0.13107200000000000000e6
-3834 3 29 42 -0.13107200000000000000e6
-3834 4 3 30 0.65536000000000000000e5
-3834 4 3 31 0.13107200000000000000e6
-3835 4 3 32 0.65536000000000000000e5
-3835 4 16 28 -0.65536000000000000000e5
-3836 4 3 33 0.65536000000000000000e5
-3836 4 4 32 -0.65536000000000000000e5
-3837 2 4 34 -0.65536000000000000000e5
-3837 2 21 35 0.65536000000000000000e5
-3837 4 3 34 0.65536000000000000000e5
-3837 4 7 35 0.65536000000000000000e5
-3838 1 1 48 -0.65536000000000000000e5
-3838 1 2 49 -0.13107200000000000000e6
-3838 1 8 39 -0.13107200000000000000e6
-3838 1 9 40 -0.13107200000000000000e6
-3838 1 10 41 0.26214400000000000000e6
-3838 1 12 43 0.52428800000000000000e6
-3838 1 23 38 -0.65536000000000000000e5
-3838 1 23 54 -0.65536000000000000000e5
-3838 1 24 55 0.13107200000000000000e6
-3838 1 25 40 0.65536000000000000000e5
-3838 1 25 56 -0.65536000000000000000e5
-3838 1 28 43 -0.26214400000000000000e6
-3838 1 32 47 -0.52428800000000000000e6
-3838 1 40 47 -0.65536000000000000000e5
-3838 2 2 32 -0.65536000000000000000e5
-3838 2 3 33 -0.65536000000000000000e5
-3838 2 16 30 -0.13107200000000000000e6
-3838 2 20 34 -0.26214400000000000000e6
-3838 3 9 38 -0.13107200000000000000e6
-3838 3 22 35 -0.52428800000000000000e6
-3838 3 24 53 0.65536000000000000000e5
-3838 3 25 54 0.65536000000000000000e5
-3838 3 28 41 -0.52428800000000000000e6
-3838 3 38 51 -0.13107200000000000000e6
-3838 4 2 30 -0.13107200000000000000e6
-3838 4 3 35 0.65536000000000000000e5
-3838 4 4 32 0.65536000000000000000e5
-3838 4 6 34 -0.26214400000000000000e6
-3838 4 28 32 0.65536000000000000000e5
-3839 1 1 48 -0.65536000000000000000e5
-3839 1 2 5 0.65536000000000000000e5
-3839 1 2 25 -0.65536000000000000000e5
-3839 1 2 33 -0.26214400000000000000e6
-3839 1 2 49 -0.65536000000000000000e5
-3839 1 4 11 0.39321600000000000000e6
-3839 1 6 13 -0.26214400000000000000e6
-3839 1 9 40 -0.13107200000000000000e6
-3839 1 10 25 -0.26214400000000000000e6
-3839 1 10 41 -0.26214400000000000000e6
-3839 1 12 43 0.10485760000000000000e7
-3839 1 23 38 -0.65536000000000000000e5
-3839 1 26 41 0.13107200000000000000e6
-3839 1 28 43 -0.26214400000000000000e6
-3839 1 32 47 -0.52428800000000000000e6
-3839 2 2 32 -0.65536000000000000000e5
-3839 2 3 9 0.13107200000000000000e6
-3839 2 12 26 -0.26214400000000000000e6
-3839 2 16 30 -0.13107200000000000000e6
-3839 2 20 34 -0.26214400000000000000e6
-3839 3 1 6 0.65536000000000000000e5
-3839 3 1 30 0.13107200000000000000e6
-3839 3 2 15 -0.26214400000000000000e6
-3839 3 3 32 -0.52428800000000000000e6
-3839 3 4 9 0.26214400000000000000e6
-3839 3 5 6 0.65536000000000000000e5
-3839 3 10 23 0.13107200000000000000e6
-3839 3 14 27 0.52428800000000000000e6
-3839 3 22 35 -0.52428800000000000000e6
-3839 3 28 41 -0.52428800000000000000e6
-3839 4 1 5 0.65536000000000000000e5
-3839 4 2 30 -0.13107200000000000000e6
-3839 4 4 4 -0.13107200000000000000e6
-3839 4 4 5 0.65536000000000000000e5
-3839 4 4 8 0.13107200000000000000e6
-3839 4 6 34 -0.26214400000000000000e6
-3839 4 8 20 -0.26214400000000000000e6
-3840 1 1 48 -0.32768000000000000000e5
-3840 1 2 9 -0.65536000000000000000e5
-3840 1 2 33 -0.26214400000000000000e6
-3840 1 2 49 -0.32768000000000000000e5
-3840 1 3 34 0.26214400000000000000e6
-3840 1 8 39 -0.65536000000000000000e5
-3840 1 10 41 -0.13107200000000000000e6
-3840 1 11 42 0.13107200000000000000e6
-3840 1 12 43 0.26214400000000000000e6
-3840 1 23 38 -0.32768000000000000000e5
-3840 1 28 43 -0.13107200000000000000e6
-3840 1 32 47 -0.13107200000000000000e6
-3840 1 33 48 -0.13107200000000000000e6
-3840 2 2 8 -0.65536000000000000000e5
-3840 2 2 32 -0.32768000000000000000e5
-3840 2 4 10 0.13107200000000000000e6
-3840 2 7 21 -0.26214400000000000000e6
-3840 2 12 26 -0.13107200000000000000e6
-3840 3 1 14 0.26214400000000000000e6
-3840 3 2 15 0.13107200000000000000e6
-3840 3 3 16 -0.26214400000000000000e6
-3840 3 3 32 -0.13107200000000000000e6
-3840 3 4 9 0.65536000000000000000e5
-3840 3 8 37 -0.65536000000000000000e5
-3840 3 10 23 0.65536000000000000000e5
-3840 3 13 42 -0.26214400000000000000e6
-3840 3 28 41 -0.13107200000000000000e6
-3840 3 29 42 -0.13107200000000000000e6
-3840 4 3 31 0.13107200000000000000e6
-3840 4 4 6 0.65536000000000000000e5
-3840 4 6 18 0.65536000000000000000e5
-3841 1 1 48 0.32768000000000000000e5
-3841 1 2 49 0.32768000000000000000e5
-3841 1 9 40 0.65536000000000000000e5
-3841 1 10 25 -0.65536000000000000000e5
-3841 1 12 43 -0.26214400000000000000e6
-3841 1 23 38 0.32768000000000000000e5
-3841 1 26 41 -0.65536000000000000000e5
-3841 1 28 43 0.13107200000000000000e6
-3841 1 32 47 0.26214400000000000000e6
-3841 2 2 32 0.32768000000000000000e5
-3841 2 3 9 -0.65536000000000000000e5
-3841 2 16 30 0.65536000000000000000e5
-3841 2 20 34 0.13107200000000000000e6
-3841 3 1 30 -0.65536000000000000000e5
-3841 3 3 32 0.13107200000000000000e6
-3841 3 10 23 -0.65536000000000000000e5
-3841 3 22 35 0.26214400000000000000e6
-3841 3 28 41 0.26214400000000000000e6
-3841 4 2 30 0.65536000000000000000e5
-3841 4 4 7 0.65536000000000000000e5
-3841 4 6 34 0.13107200000000000000e6
-3842 1 4 11 0.65536000000000000000e5
-3842 1 4 35 -0.26214400000000000000e6
-3842 1 6 13 0.13107200000000000000e6
-3842 1 10 25 -0.65536000000000000000e5
-3842 1 10 41 0.13107200000000000000e6
-3842 1 11 42 0.13107200000000000000e6
-3842 2 5 11 0.13107200000000000000e6
-3842 3 2 15 0.13107200000000000000e6
-3842 3 3 32 0.13107200000000000000e6
-3842 3 4 17 -0.26214400000000000000e6
-3842 3 4 33 0.13107200000000000000e6
-3842 3 6 11 -0.65536000000000000000e5
-3842 3 10 11 0.13107200000000000000e6
-3842 4 4 9 0.65536000000000000000e5
-3842 4 5 9 -0.65536000000000000000e5
-3843 1 2 33 0.65536000000000000000e5
-3843 1 3 18 -0.13107200000000000000e6
-3843 1 6 13 0.65536000000000000000e5
-3843 1 10 41 0.65536000000000000000e5
-3843 2 4 10 -0.65536000000000000000e5
-3843 2 7 21 0.65536000000000000000e5
-3843 2 12 26 0.65536000000000000000e5
-3843 3 1 14 -0.65536000000000000000e5
-3843 3 3 16 0.13107200000000000000e6
-3843 3 3 32 0.65536000000000000000e5
-3843 4 4 10 0.65536000000000000000e5
-3843 4 8 20 0.65536000000000000000e5
-3844 1 2 33 0.65536000000000000000e5
-3844 1 4 35 0.13107200000000000000e6
-3844 1 11 42 -0.65536000000000000000e5
-3844 1 12 43 -0.13107200000000000000e6
-3844 2 5 11 -0.65536000000000000000e5
-3844 2 12 26 0.65536000000000000000e5
-3844 3 4 33 -0.65536000000000000000e5
-3844 3 14 27 -0.13107200000000000000e6
-3844 4 4 11 0.65536000000000000000e5
-3844 4 8 20 0.65536000000000000000e5
-3845 1 2 33 0.65536000000000000000e5
-3845 1 4 35 0.13107200000000000000e6
-3845 1 5 20 -0.26214400000000000000e6
-3845 1 5 36 0.26214400000000000000e6
-3845 1 11 42 -0.65536000000000000000e5
-3845 1 12 43 -0.13107200000000000000e6
-3845 2 5 11 -0.65536000000000000000e5
-3845 2 12 26 0.65536000000000000000e5
-3845 3 2 15 -0.65536000000000000000e5
-3845 3 4 17 0.26214400000000000000e6
-3845 3 4 33 -0.65536000000000000000e5
-3845 3 5 18 0.13107200000000000000e6
-3845 3 10 11 0.65536000000000000000e5
-3845 3 14 27 -0.13107200000000000000e6
-3845 4 4 12 0.65536000000000000000e5
-3845 4 8 12 0.13107200000000000000e6
-3845 4 8 20 0.65536000000000000000e5
-3846 1 3 18 0.65536000000000000000e5
-3846 1 4 35 0.65536000000000000000e5
-3846 1 5 20 0.13107200000000000000e6
-3846 1 5 36 -0.13107200000000000000e6
-3846 1 10 17 -0.13107200000000000000e6
-3846 1 14 45 0.13107200000000000000e6
-3846 1 17 48 -0.65536000000000000000e5
-3846 1 18 49 -0.65536000000000000000e5
-3846 2 9 23 0.65536000000000000000e5
-3846 2 14 28 -0.65536000000000000000e5
-3846 3 5 18 -0.65536000000000000000e5
-3846 3 5 34 0.65536000000000000000e5
-3846 3 13 42 -0.65536000000000000000e5
-3846 3 14 43 -0.65536000000000000000e5
-3846 4 4 13 0.65536000000000000000e5
-3846 4 8 12 -0.65536000000000000000e5
-3847 4 4 14 0.65536000000000000000e5
-3847 4 8 12 -0.65536000000000000000e5
-3848 1 3 18 0.32768000000000000000e5
-3848 1 4 35 -0.65536000000000000000e5
-3848 1 5 20 0.13107200000000000000e6
-3848 1 5 36 -0.13107200000000000000e6
-3848 1 10 17 0.13107200000000000000e6
-3848 1 12 43 -0.98304000000000000000e5
-3848 1 14 45 -0.13107200000000000000e6
-3848 1 17 48 0.65536000000000000000e5
-3848 1 18 49 0.65536000000000000000e5
-3848 2 9 23 -0.65536000000000000000e5
-3848 2 14 28 0.65536000000000000000e5
-3848 3 3 16 0.32768000000000000000e5
-3848 3 4 17 0.32768000000000000000e5
-3848 3 5 34 -0.65536000000000000000e5
-3848 3 6 19 0.65536000000000000000e5
-3848 3 7 20 0.13107200000000000000e6
-3848 3 8 21 -0.26214400000000000000e6
-3848 3 13 42 0.65536000000000000000e5
-3848 3 14 27 -0.98304000000000000000e5
-3848 3 14 43 0.65536000000000000000e5
-3848 4 2 14 0.32768000000000000000e5
-3848 4 3 15 0.65536000000000000000e5
-3848 4 4 15 0.65536000000000000000e5
-3848 4 10 14 0.13107200000000000000e6
-3849 1 6 37 -0.65536000000000000000e5
-3849 1 24 39 0.65536000000000000000e5
-3849 2 3 33 0.65536000000000000000e5
-3849 2 4 18 -0.65536000000000000000e5
-3849 3 2 39 -0.65536000000000000000e5
-3849 3 3 40 -0.65536000000000000000e5
-3849 3 9 38 0.13107200000000000000e6
-3849 4 4 17 0.65536000000000000000e5
-3850 4 4 18 0.65536000000000000000e5
-3850 4 5 17 -0.65536000000000000000e5
-3851 1 1 40 -0.65536000000000000000e5
-3851 1 2 33 0.52428800000000000000e6
-3851 1 9 40 -0.26214400000000000000e6
-3851 1 10 25 0.26214400000000000000e6
-3851 1 11 42 -0.52428800000000000000e6
-3851 1 12 43 -0.10485760000000000000e7
-3851 1 23 38 0.65536000000000000000e5
-3851 1 28 43 0.52428800000000000000e6
-3851 1 32 47 0.52428800000000000000e6
-3851 1 33 48 0.52428800000000000000e6
-3851 2 2 32 0.65536000000000000000e5
-3851 2 3 17 -0.65536000000000000000e5
-3851 2 12 26 0.52428800000000000000e6
-3851 3 1 30 -0.26214400000000000000e6
-3851 3 1 38 -0.65536000000000000000e5
-3851 3 2 23 -0.65536000000000000000e5
-3851 3 2 39 -0.65536000000000000000e5
-3851 3 3 32 0.26214400000000000000e6
-3851 3 5 26 0.65536000000000000000e5
-3851 3 8 37 0.13107200000000000000e6
-3851 3 13 42 0.10485760000000000000e7
-3851 3 14 27 -0.52428800000000000000e6
-3851 3 28 41 0.52428800000000000000e6
-3851 3 29 42 0.52428800000000000000e6
-3851 4 3 31 -0.52428800000000000000e6
-3851 4 4 16 0.65536000000000000000e5
-3851 4 4 19 0.65536000000000000000e5
-3851 4 5 17 -0.65536000000000000000e5
-3851 4 6 18 -0.13107200000000000000e6
-3851 4 7 19 0.13107200000000000000e6
-3851 4 8 20 0.26214400000000000000e6
-3852 1 9 40 -0.65536000000000000000e5
-3852 1 10 25 0.65536000000000000000e5
-3852 3 1 30 0.65536000000000000000e5
-3852 3 3 32 -0.13107200000000000000e6
-3852 3 10 23 0.65536000000000000000e5
-3852 4 4 20 0.65536000000000000000e5
-3853 4 4 21 0.65536000000000000000e5
-3853 4 7 19 -0.65536000000000000000e5
-3854 1 1 48 0.32768000000000000000e5
-3854 1 2 33 -0.13107200000000000000e6
-3854 1 2 49 0.32768000000000000000e5
-3854 1 8 39 0.65536000000000000000e5
-3854 1 9 40 0.13107200000000000000e6
-3854 1 10 41 -0.13107200000000000000e6
-3854 1 11 26 0.65536000000000000000e5
-3854 1 23 38 0.32768000000000000000e5
-3854 1 26 41 -0.13107200000000000000e6
-3854 1 28 43 0.13107200000000000000e6
-3854 1 32 47 0.13107200000000000000e6
-3854 1 33 48 -0.13107200000000000000e6
-3854 2 2 32 0.32768000000000000000e5
-3854 2 4 34 -0.65536000000000000000e5
-3854 2 12 26 -0.13107200000000000000e6
-3854 2 16 30 0.65536000000000000000e5
-3854 2 20 34 0.13107200000000000000e6
-3854 2 28 34 0.65536000000000000000e5
-3854 3 3 32 -0.13107200000000000000e6
-3854 3 4 33 -0.13107200000000000000e6
-3854 3 9 38 0.65536000000000000000e5
-3854 3 10 23 -0.65536000000000000000e5
-3854 3 10 39 0.65536000000000000000e5
-3854 3 13 42 -0.26214400000000000000e6
-3854 3 14 27 0.26214400000000000000e6
-3854 3 22 35 0.26214400000000000000e6
-3854 3 28 41 0.13107200000000000000e6
-3854 3 29 42 -0.13107200000000000000e6
-3854 4 2 30 0.65536000000000000000e5
-3854 4 3 31 0.13107200000000000000e6
-3854 4 4 22 0.65536000000000000000e5
-3854 4 6 34 0.13107200000000000000e6
-3854 4 7 19 -0.65536000000000000000e5
-3854 4 8 20 -0.13107200000000000000e6
-3854 4 18 22 0.65536000000000000000e5
-3854 4 18 30 0.65536000000000000000e5
-3854 4 21 33 0.65536000000000000000e5
-3855 1 2 33 -0.65536000000000000000e5
-3855 1 4 35 -0.13107200000000000000e6
-3855 1 11 42 0.65536000000000000000e5
-3855 1 12 43 0.13107200000000000000e6
-3855 1 17 48 0.13107200000000000000e6
-3855 1 28 43 -0.65536000000000000000e5
-3855 1 32 47 -0.65536000000000000000e5
-3855 1 33 48 -0.65536000000000000000e5
-3855 2 12 26 -0.65536000000000000000e5
-3855 3 4 33 0.65536000000000000000e5
-3855 3 14 27 0.13107200000000000000e6
-3855 3 28 41 -0.65536000000000000000e5
-3855 3 29 42 -0.65536000000000000000e5
-3855 4 3 31 0.65536000000000000000e5
-3855 4 4 23 0.65536000000000000000e5
-3855 4 8 20 -0.65536000000000000000e5
-3856 4 4 24 0.65536000000000000000e5
-3856 4 9 21 -0.65536000000000000000e5
-3857 1 4 35 0.65536000000000000000e5
-3857 1 5 36 -0.13107200000000000000e6
-3857 1 14 45 0.13107200000000000000e6
-3857 1 15 30 0.65536000000000000000e5
-3857 1 17 48 -0.65536000000000000000e5
-3857 1 18 49 -0.65536000000000000000e5
-3857 3 5 34 0.65536000000000000000e5
-3857 3 13 42 -0.65536000000000000000e5
-3857 3 14 43 -0.65536000000000000000e5
-3857 4 4 25 0.65536000000000000000e5
-3858 1 6 37 0.65536000000000000000e5
-3858 1 24 39 -0.65536000000000000000e5
-3858 3 2 39 0.65536000000000000000e5
-3858 3 3 40 0.65536000000000000000e5
-3858 3 9 38 -0.13107200000000000000e6
-3858 4 4 26 0.65536000000000000000e5
-3859 1 1 48 0.65536000000000000000e5
-3859 1 2 49 0.13107200000000000000e6
-3859 1 8 39 0.13107200000000000000e6
-3859 1 9 40 0.13107200000000000000e6
-3859 1 10 41 -0.26214400000000000000e6
-3859 1 12 43 -0.52428800000000000000e6
-3859 1 23 38 0.65536000000000000000e5
-3859 1 25 40 -0.65536000000000000000e5
-3859 1 28 43 0.26214400000000000000e6
-3859 1 32 47 0.52428800000000000000e6
-3859 2 2 32 0.65536000000000000000e5
-3859 2 3 33 0.65536000000000000000e5
-3859 2 5 27 -0.65536000000000000000e5
-3859 2 16 30 0.13107200000000000000e6
-3859 2 20 34 0.26214400000000000000e6
-3859 3 9 38 0.13107200000000000000e6
-3859 3 22 35 0.52428800000000000000e6
-3859 3 28 41 0.52428800000000000000e6
-3859 4 2 30 0.13107200000000000000e6
-3859 4 4 27 0.65536000000000000000e5
-3859 4 6 34 0.26214400000000000000e6
-3860 1 1 40 0.65536000000000000000e5
-3860 1 2 33 -0.52428800000000000000e6
-3860 1 6 53 0.65536000000000000000e5
-3860 1 9 40 0.26214400000000000000e6
-3860 1 10 25 -0.26214400000000000000e6
-3860 1 11 42 0.52428800000000000000e6
-3860 1 12 43 0.10485760000000000000e7
-3860 1 23 38 -0.65536000000000000000e5
-3860 1 25 40 -0.65536000000000000000e5
-3860 1 28 43 -0.52428800000000000000e6
-3860 1 32 47 -0.52428800000000000000e6
-3860 1 33 48 -0.52428800000000000000e6
-3860 2 2 32 -0.65536000000000000000e5
-3860 2 3 17 0.65536000000000000000e5
-3860 2 5 19 -0.65536000000000000000e5
-3860 2 5 35 0.65536000000000000000e5
-3860 2 12 26 -0.52428800000000000000e6
-3860 3 1 30 0.26214400000000000000e6
-3860 3 1 38 0.65536000000000000000e5
-3860 3 2 23 0.65536000000000000000e5
-3860 3 2 39 0.65536000000000000000e5
-3860 3 3 32 -0.26214400000000000000e6
-3860 3 5 26 -0.65536000000000000000e5
-3860 3 5 50 0.13107200000000000000e6
-3860 3 8 37 -0.13107200000000000000e6
-3860 3 13 42 -0.10485760000000000000e7
-3860 3 14 27 0.52428800000000000000e6
-3860 3 25 38 -0.65536000000000000000e5
-3860 3 26 39 -0.65536000000000000000e5
-3860 3 28 41 -0.52428800000000000000e6
-3860 3 29 42 -0.52428800000000000000e6
-3860 4 3 31 0.52428800000000000000e6
-3860 4 4 16 -0.65536000000000000000e5
-3860 4 4 28 0.65536000000000000000e5
-3860 4 5 17 0.65536000000000000000e5
-3860 4 6 18 0.13107200000000000000e6
-3860 4 7 19 -0.13107200000000000000e6
-3860 4 8 20 -0.26214400000000000000e6
-3861 1 9 40 0.65536000000000000000e5
-3861 1 10 41 0.13107200000000000000e6
-3861 1 11 42 0.13107200000000000000e6
-3861 1 26 41 -0.65536000000000000000e5
-3861 1 32 47 -0.13107200000000000000e6
-3861 1 33 48 -0.13107200000000000000e6
-3861 3 9 38 0.65536000000000000000e5
-3861 3 10 39 0.65536000000000000000e5
-3861 3 13 42 -0.26214400000000000000e6
-3861 3 28 41 -0.13107200000000000000e6
-3861 3 29 42 -0.13107200000000000000e6
-3861 4 3 31 0.13107200000000000000e6
-3861 4 4 29 0.65536000000000000000e5
-3862 4 4 30 0.65536000000000000000e5
-3862 4 18 22 -0.65536000000000000000e5
-3863 1 10 41 -0.65536000000000000000e5
-3863 1 14 45 -0.26214400000000000000e6
-3863 1 17 48 0.13107200000000000000e6
-3863 1 18 49 0.13107200000000000000e6
-3863 1 26 33 0.65536000000000000000e5
-3863 1 32 47 0.65536000000000000000e5
-3863 1 33 40 -0.65536000000000000000e5
-3863 1 34 49 0.13107200000000000000e6
-3863 2 14 28 0.13107200000000000000e6
-3863 3 13 42 0.26214400000000000000e6
-3863 3 14 43 0.13107200000000000000e6
-3863 3 18 47 0.13107200000000000000e6
-3863 3 28 41 0.65536000000000000000e5
-3863 4 3 31 -0.65536000000000000000e5
-3863 4 4 31 0.65536000000000000000e5
-3864 1 6 53 -0.65536000000000000000e5
-3864 1 25 40 0.65536000000000000000e5
-3864 3 5 50 -0.13107200000000000000e6
-3864 3 25 38 0.65536000000000000000e5
-3864 3 26 39 0.65536000000000000000e5
-3864 4 4 33 0.65536000000000000000e5
-3865 4 4 34 0.65536000000000000000e5
-3865 4 18 30 -0.65536000000000000000e5
-3866 1 1 48 -0.65536000000000000000e5
-3866 1 2 49 -0.13107200000000000000e6
-3866 1 6 53 0.65536000000000000000e5
-3866 1 8 39 -0.13107200000000000000e6
-3866 1 9 40 -0.13107200000000000000e6
-3866 1 10 41 0.26214400000000000000e6
-3866 1 12 43 0.52428800000000000000e6
-3866 1 23 38 -0.65536000000000000000e5
-3866 1 24 39 -0.65536000000000000000e5
-3866 1 24 55 -0.13107200000000000000e6
-3866 1 25 56 -0.65536000000000000000e5
-3866 1 26 41 0.26214400000000000000e6
-3866 1 28 43 -0.26214400000000000000e6
-3866 1 32 47 -0.52428800000000000000e6
-3866 1 40 47 -0.65536000000000000000e5
-3866 2 2 32 -0.65536000000000000000e5
-3866 2 3 33 -0.65536000000000000000e5
-3866 2 16 30 -0.13107200000000000000e6
-3866 2 20 34 -0.26214400000000000000e6
-3866 3 9 38 -0.13107200000000000000e6
-3866 3 22 35 -0.52428800000000000000e6
-3866 3 22 51 0.13107200000000000000e6
-3866 3 23 52 -0.26214400000000000000e6
-3866 3 24 53 0.65536000000000000000e5
-3866 3 25 38 -0.65536000000000000000e5
-3866 3 25 54 0.65536000000000000000e5
-3866 3 27 40 -0.13107200000000000000e6
-3866 3 28 41 -0.52428800000000000000e6
-3866 3 38 51 -0.13107200000000000000e6
-3866 3 39 40 0.65536000000000000000e5
-3866 4 2 30 -0.13107200000000000000e6
-3866 4 4 35 0.65536000000000000000e5
-3866 4 6 34 -0.26214400000000000000e6
-3866 4 7 35 0.13107200000000000000e6
-3866 4 28 32 0.65536000000000000000e5
-3867 1 1 48 0.32768000000000000000e5
-3867 1 2 49 0.32768000000000000000e5
-3867 1 9 40 0.65536000000000000000e5
-3867 1 10 25 -0.65536000000000000000e5
-3867 1 12 43 -0.26214400000000000000e6
-3867 1 23 38 0.32768000000000000000e5
-3867 1 26 41 -0.65536000000000000000e5
-3867 1 28 43 0.13107200000000000000e6
-3867 1 32 47 0.26214400000000000000e6
-3867 2 2 32 0.32768000000000000000e5
-3867 2 3 9 -0.65536000000000000000e5
-3867 2 16 30 0.65536000000000000000e5
-3867 2 20 34 0.13107200000000000000e6
-3867 3 1 30 -0.65536000000000000000e5
-3867 3 3 32 0.13107200000000000000e6
-3867 3 10 23 -0.65536000000000000000e5
-3867 3 22 35 0.26214400000000000000e6
-3867 3 28 41 0.26214400000000000000e6
-3867 4 2 30 0.65536000000000000000e5
-3867 4 5 6 0.65536000000000000000e5
-3867 4 6 34 0.13107200000000000000e6
-3868 4 4 8 -0.65536000000000000000e5
-3868 4 5 7 0.65536000000000000000e5
-3869 1 4 11 0.65536000000000000000e5
-3869 1 4 35 -0.26214400000000000000e6
-3869 1 6 13 0.13107200000000000000e6
-3869 1 10 25 -0.65536000000000000000e5
-3869 1 10 41 0.13107200000000000000e6
-3869 1 11 42 0.13107200000000000000e6
-3869 2 5 11 0.13107200000000000000e6
-3869 3 2 15 0.13107200000000000000e6
-3869 3 3 32 0.13107200000000000000e6
-3869 3 4 17 -0.26214400000000000000e6
-3869 3 4 33 0.13107200000000000000e6
-3869 3 6 11 -0.65536000000000000000e5
-3869 3 10 11 0.13107200000000000000e6
-3869 4 5 8 0.65536000000000000000e5
-3869 4 5 9 -0.65536000000000000000e5
-3870 1 2 33 0.65536000000000000000e5
-3870 1 4 35 0.13107200000000000000e6
-3870 1 11 42 -0.65536000000000000000e5
-3870 1 12 43 -0.13107200000000000000e6
-3870 2 5 11 -0.65536000000000000000e5
-3870 2 12 26 0.65536000000000000000e5
-3870 3 4 33 -0.65536000000000000000e5
-3870 3 14 27 -0.13107200000000000000e6
-3870 4 5 10 0.65536000000000000000e5
-3870 4 8 20 0.65536000000000000000e5
-3871 1 2 33 0.65536000000000000000e5
-3871 1 4 35 0.13107200000000000000e6
-3871 1 5 20 -0.26214400000000000000e6
-3871 1 5 36 0.26214400000000000000e6
-3871 1 11 42 -0.65536000000000000000e5
-3871 1 12 43 -0.13107200000000000000e6
-3871 2 5 11 -0.65536000000000000000e5
-3871 2 12 26 0.65536000000000000000e5
-3871 3 2 15 -0.65536000000000000000e5
-3871 3 4 17 0.26214400000000000000e6
-3871 3 4 33 -0.65536000000000000000e5
-3871 3 5 18 0.13107200000000000000e6
-3871 3 10 11 0.65536000000000000000e5
-3871 3 14 27 -0.13107200000000000000e6
-3871 4 5 11 0.65536000000000000000e5
-3871 4 8 12 0.13107200000000000000e6
-3871 4 8 20 0.65536000000000000000e5
-3872 4 5 12 0.65536000000000000000e5
-3872 4 9 9 -0.13107200000000000000e6
-3873 4 5 13 0.65536000000000000000e5
-3873 4 8 12 -0.65536000000000000000e5
-3874 4 5 15 0.65536000000000000000e5
-3874 4 12 12 -0.13107200000000000000e6
-3875 1 6 37 -0.65536000000000000000e5
-3875 1 24 39 0.65536000000000000000e5
-3875 2 3 33 0.65536000000000000000e5
-3875 2 4 18 -0.65536000000000000000e5
-3875 3 2 39 -0.65536000000000000000e5
-3875 3 3 40 -0.65536000000000000000e5
-3875 3 9 38 0.13107200000000000000e6
-3875 4 5 16 0.65536000000000000000e5
-3876 1 1 40 -0.65536000000000000000e5
-3876 1 2 33 0.52428800000000000000e6
-3876 1 9 40 -0.26214400000000000000e6
-3876 1 10 25 0.26214400000000000000e6
-3876 1 11 42 -0.52428800000000000000e6
-3876 1 12 43 -0.10485760000000000000e7
-3876 1 23 38 0.65536000000000000000e5
-3876 1 28 43 0.52428800000000000000e6
-3876 1 32 47 0.52428800000000000000e6
-3876 1 33 48 0.52428800000000000000e6
-3876 2 2 32 0.65536000000000000000e5
-3876 2 3 17 -0.65536000000000000000e5
-3876 2 12 26 0.52428800000000000000e6
-3876 3 1 30 -0.26214400000000000000e6
-3876 3 1 38 -0.65536000000000000000e5
-3876 3 2 23 -0.65536000000000000000e5
-3876 3 2 39 -0.65536000000000000000e5
-3876 3 3 32 0.26214400000000000000e6
-3876 3 5 26 0.65536000000000000000e5
-3876 3 8 37 0.13107200000000000000e6
-3876 3 13 42 0.10485760000000000000e7
-3876 3 14 27 -0.52428800000000000000e6
-3876 3 28 41 0.52428800000000000000e6
-3876 3 29 42 0.52428800000000000000e6
-3876 4 3 31 -0.52428800000000000000e6
-3876 4 4 16 0.65536000000000000000e5
-3876 4 5 17 -0.65536000000000000000e5
-3876 4 5 18 0.65536000000000000000e5
-3876 4 6 18 -0.13107200000000000000e6
-3876 4 7 19 0.13107200000000000000e6
-3876 4 8 20 0.26214400000000000000e6
-3877 4 5 20 0.65536000000000000000e5
-3877 4 7 19 -0.65536000000000000000e5
-3878 1 1 48 0.32768000000000000000e5
-3878 1 2 33 -0.13107200000000000000e6
-3878 1 2 49 0.32768000000000000000e5
-3878 1 8 39 0.65536000000000000000e5
-3878 1 9 40 0.13107200000000000000e6
-3878 1 10 41 -0.13107200000000000000e6
-3878 1 11 26 0.65536000000000000000e5
-3878 1 23 38 0.32768000000000000000e5
-3878 1 26 41 -0.13107200000000000000e6
-3878 1 28 43 0.13107200000000000000e6
-3878 1 32 47 0.13107200000000000000e6
-3878 1 33 48 -0.13107200000000000000e6
-3878 2 2 32 0.32768000000000000000e5
-3878 2 4 34 -0.65536000000000000000e5
-3878 2 12 26 -0.13107200000000000000e6
-3878 2 16 30 0.65536000000000000000e5
-3878 2 20 34 0.13107200000000000000e6
-3878 2 28 34 0.65536000000000000000e5
-3878 3 3 32 -0.13107200000000000000e6
-3878 3 4 33 -0.13107200000000000000e6
-3878 3 9 38 0.65536000000000000000e5
-3878 3 10 23 -0.65536000000000000000e5
-3878 3 10 39 0.65536000000000000000e5
-3878 3 13 42 -0.26214400000000000000e6
-3878 3 14 27 0.26214400000000000000e6
-3878 3 22 35 0.26214400000000000000e6
-3878 3 28 41 0.13107200000000000000e6
-3878 3 29 42 -0.13107200000000000000e6
-3878 4 2 30 0.65536000000000000000e5
-3878 4 3 31 0.13107200000000000000e6
-3878 4 5 21 0.65536000000000000000e5
-3878 4 6 34 0.13107200000000000000e6
-3878 4 7 19 -0.65536000000000000000e5
-3878 4 8 20 -0.13107200000000000000e6
-3878 4 18 22 0.65536000000000000000e5
-3878 4 18 30 0.65536000000000000000e5
-3878 4 21 33 0.65536000000000000000e5
-3879 1 1 48 0.32768000000000000000e5
-3879 1 2 33 -0.26214400000000000000e6
-3879 1 2 49 0.32768000000000000000e5
-3879 1 8 39 0.65536000000000000000e5
-3879 1 9 40 0.19660800000000000000e6
-3879 1 10 25 -0.65536000000000000000e5
-3879 1 10 41 -0.13107200000000000000e6
-3879 1 11 26 0.65536000000000000000e5
-3879 1 11 42 0.13107200000000000000e6
-3879 1 12 43 0.26214400000000000000e6
-3879 1 23 38 0.32768000000000000000e5
-3879 1 26 41 -0.13107200000000000000e6
-3879 1 33 48 -0.26214400000000000000e6
-3879 2 2 32 0.32768000000000000000e5
-3879 2 4 34 -0.65536000000000000000e5
-3879 2 12 26 -0.26214400000000000000e6
-3879 2 16 30 0.65536000000000000000e5
-3879 2 20 34 0.13107200000000000000e6
-3879 2 28 34 0.65536000000000000000e5
-3879 3 3 32 -0.26214400000000000000e6
-3879 3 4 33 0.13107200000000000000e6
-3879 3 5 34 -0.26214400000000000000e6
-3879 3 9 38 0.65536000000000000000e5
-3879 3 10 23 -0.65536000000000000000e5
-3879 3 10 39 0.65536000000000000000e5
-3879 3 11 26 0.65536000000000000000e5
-3879 3 13 42 -0.52428800000000000000e6
-3879 3 14 27 0.52428800000000000000e6
-3879 3 22 35 0.26214400000000000000e6
-3879 3 29 42 -0.26214400000000000000e6
-3879 4 2 30 0.65536000000000000000e5
-3879 4 3 31 0.26214400000000000000e6
-3879 4 5 22 0.65536000000000000000e5
-3879 4 6 34 0.13107200000000000000e6
-3879 4 7 19 -0.65536000000000000000e5
-3879 4 8 20 -0.26214400000000000000e6
-3879 4 9 21 0.13107200000000000000e6
-3879 4 18 22 0.65536000000000000000e5
-3879 4 18 30 0.65536000000000000000e5
-3879 4 21 33 0.65536000000000000000e5
-3880 4 5 23 0.65536000000000000000e5
-3880 4 9 21 -0.65536000000000000000e5
-3881 1 2 33 0.65536000000000000000e5
-3881 1 11 42 -0.65536000000000000000e5
-3881 1 12 43 -0.13107200000000000000e6
-3881 1 15 30 -0.13107200000000000000e6
-3881 1 18 49 0.13107200000000000000e6
-3881 1 28 43 0.65536000000000000000e5
-3881 1 32 47 0.65536000000000000000e5
-3881 1 33 48 0.65536000000000000000e5
-3881 2 12 26 0.65536000000000000000e5
-3881 3 3 32 0.65536000000000000000e5
-3881 3 5 34 0.13107200000000000000e6
-3881 3 11 30 0.65536000000000000000e5
-3881 3 13 42 0.13107200000000000000e6
-3881 3 14 27 -0.13107200000000000000e6
-3881 3 14 43 0.13107200000000000000e6
-3881 3 28 41 0.65536000000000000000e5
-3881 3 29 42 0.65536000000000000000e5
-3881 4 3 31 -0.65536000000000000000e5
-3881 4 5 24 0.65536000000000000000e5
-3881 4 8 20 0.65536000000000000000e5
-3881 4 9 21 -0.65536000000000000000e5
-3882 1 15 30 0.65536000000000000000e5
-3882 1 18 49 -0.65536000000000000000e5
-3882 3 5 34 0.65536000000000000000e5
-3882 3 6 35 0.65536000000000000000e5
-3882 3 14 43 -0.65536000000000000000e5
-3882 3 17 30 -0.13107200000000000000e6
-3882 4 5 25 0.65536000000000000000e5
-3883 1 1 48 0.65536000000000000000e5
-3883 1 2 49 0.13107200000000000000e6
-3883 1 8 39 0.13107200000000000000e6
-3883 1 9 40 0.13107200000000000000e6
-3883 1 10 41 -0.26214400000000000000e6
-3883 1 12 43 -0.52428800000000000000e6
-3883 1 23 38 0.65536000000000000000e5
-3883 1 25 40 -0.65536000000000000000e5
-3883 1 28 43 0.26214400000000000000e6
-3883 1 32 47 0.52428800000000000000e6
-3883 2 2 32 0.65536000000000000000e5
-3883 2 3 33 0.65536000000000000000e5
-3883 2 5 27 -0.65536000000000000000e5
-3883 2 16 30 0.13107200000000000000e6
-3883 2 20 34 0.26214400000000000000e6
-3883 3 9 38 0.13107200000000000000e6
-3883 3 22 35 0.52428800000000000000e6
-3883 3 28 41 0.52428800000000000000e6
-3883 4 2 30 0.13107200000000000000e6
-3883 4 5 26 0.65536000000000000000e5
-3883 4 6 34 0.26214400000000000000e6
-3884 1 1 40 0.65536000000000000000e5
-3884 1 2 33 -0.52428800000000000000e6
-3884 1 6 53 0.65536000000000000000e5
-3884 1 9 40 0.26214400000000000000e6
-3884 1 10 25 -0.26214400000000000000e6
-3884 1 11 42 0.52428800000000000000e6
-3884 1 12 43 0.10485760000000000000e7
-3884 1 23 38 -0.65536000000000000000e5
-3884 1 25 40 -0.65536000000000000000e5
-3884 1 28 43 -0.52428800000000000000e6
-3884 1 32 47 -0.52428800000000000000e6
-3884 1 33 48 -0.52428800000000000000e6
-3884 2 2 32 -0.65536000000000000000e5
-3884 2 3 17 0.65536000000000000000e5
-3884 2 5 19 -0.65536000000000000000e5
-3884 2 5 35 0.65536000000000000000e5
-3884 2 12 26 -0.52428800000000000000e6
-3884 3 1 30 0.26214400000000000000e6
-3884 3 1 38 0.65536000000000000000e5
-3884 3 2 23 0.65536000000000000000e5
-3884 3 2 39 0.65536000000000000000e5
-3884 3 3 32 -0.26214400000000000000e6
-3884 3 5 26 -0.65536000000000000000e5
-3884 3 5 50 0.13107200000000000000e6
-3884 3 8 37 -0.13107200000000000000e6
-3884 3 13 42 -0.10485760000000000000e7
-3884 3 14 27 0.52428800000000000000e6
-3884 3 25 38 -0.65536000000000000000e5
-3884 3 26 39 -0.65536000000000000000e5
-3884 3 28 41 -0.52428800000000000000e6
-3884 3 29 42 -0.52428800000000000000e6
-3884 4 3 31 0.52428800000000000000e6
-3884 4 4 16 -0.65536000000000000000e5
-3884 4 5 17 0.65536000000000000000e5
-3884 4 5 27 0.65536000000000000000e5
-3884 4 6 18 0.13107200000000000000e6
-3884 4 7 19 -0.13107200000000000000e6
-3884 4 8 20 -0.26214400000000000000e6
-3885 4 5 28 0.65536000000000000000e5
-3885 4 19 19 -0.13107200000000000000e6
-3886 4 5 29 0.65536000000000000000e5
-3886 4 18 22 -0.65536000000000000000e5
-3887 1 9 40 -0.65536000000000000000e5
-3887 1 11 42 0.13107200000000000000e6
-3887 1 26 33 -0.13107200000000000000e6
-3887 1 26 41 0.65536000000000000000e5
-3887 1 33 40 0.13107200000000000000e6
-3887 1 33 48 -0.13107200000000000000e6
-3887 3 11 40 0.65536000000000000000e5
-3887 3 29 42 -0.13107200000000000000e6
-3887 4 5 30 0.65536000000000000000e5
-3887 4 18 22 -0.65536000000000000000e5
-3888 4 5 31 0.65536000000000000000e5
-3888 4 22 22 -0.13107200000000000000e6
-3889 1 6 53 -0.65536000000000000000e5
-3889 1 25 40 0.65536000000000000000e5
-3889 3 5 50 -0.13107200000000000000e6
-3889 3 25 38 0.65536000000000000000e5
-3889 3 26 39 0.65536000000000000000e5
-3889 4 5 32 0.65536000000000000000e5
-3890 3 6 51 0.65536000000000000000e5
-3890 3 14 51 -0.26214400000000000000e6
-3890 3 27 40 -0.65536000000000000000e5
-3890 3 29 42 0.26214400000000000000e6
-3890 3 30 43 0.13107200000000000000e6
-3890 4 5 34 0.65536000000000000000e5
-3890 4 18 30 -0.65536000000000000000e5
-3890 4 19 31 0.13107200000000000000e6
-3891 4 5 35 0.65536000000000000000e5
-3891 4 28 28 -0.13107200000000000000e6
-3892 1 1 48 -0.32768000000000000000e5
-3892 1 2 17 -0.13107200000000000000e6
-3892 1 2 33 -0.13107200000000000000e6
-3892 1 2 49 -0.32768000000000000000e5
-3892 1 3 34 0.13107200000000000000e6
-3892 1 4 11 0.32768000000000000000e5
-3892 1 8 23 -0.32768000000000000000e5
-3892 1 8 39 -0.32768000000000000000e5
-3892 1 9 40 -0.32768000000000000000e5
-3892 1 10 41 -0.65536000000000000000e5
-3892 1 11 42 0.65536000000000000000e5
-3892 1 12 43 0.26214400000000000000e6
-3892 1 16 23 0.13107200000000000000e6
-3892 1 23 38 -0.32768000000000000000e5
-3892 1 26 41 0.32768000000000000000e5
-3892 1 28 43 -0.13107200000000000000e6
-3892 1 32 47 -0.19660800000000000000e6
-3892 1 33 48 -0.65536000000000000000e5
-3892 2 2 8 -0.32768000000000000000e5
-3892 2 2 32 -0.32768000000000000000e5
-3892 2 3 9 0.32768000000000000000e5
-3892 2 4 10 -0.65536000000000000000e5
-3892 2 12 26 -0.65536000000000000000e5
-3892 2 16 30 -0.32768000000000000000e5
-3892 2 20 34 -0.65536000000000000000e5
-3892 3 1 14 0.65536000000000000000e5
-3892 3 1 30 0.32768000000000000000e5
-3892 3 2 7 0.32768000000000000000e5
-3892 3 2 15 -0.13107200000000000000e6
-3892 3 3 16 0.13107200000000000000e6
-3892 3 3 32 -0.13107200000000000000e6
-3892 3 4 9 0.32768000000000000000e5
-3892 3 8 37 -0.32768000000000000000e5
-3892 3 10 23 0.65536000000000000000e5
-3892 3 13 42 -0.13107200000000000000e6
-3892 3 22 35 -0.13107200000000000000e6
-3892 3 28 41 -0.19660800000000000000e6
-3892 3 29 42 -0.65536000000000000000e5
-3892 4 2 6 0.32768000000000000000e5
-3892 4 2 30 -0.32768000000000000000e5
-3892 4 3 31 0.65536000000000000000e5
-3892 4 6 7 0.65536000000000000000e5
-3892 4 6 18 0.32768000000000000000e5
-3892 4 6 34 -0.65536000000000000000e5
-3893 2 4 10 -0.65536000000000000000e5
-3893 2 7 21 0.65536000000000000000e5
-3893 4 6 8 0.65536000000000000000e5
-3894 1 2 33 0.65536000000000000000e5
-3894 1 3 18 -0.13107200000000000000e6
-3894 1 6 13 0.65536000000000000000e5
-3894 1 10 41 0.65536000000000000000e5
-3894 2 4 10 -0.65536000000000000000e5
-3894 2 7 21 0.65536000000000000000e5
-3894 2 12 26 0.65536000000000000000e5
-3894 3 1 14 -0.65536000000000000000e5
-3894 3 3 16 0.13107200000000000000e6
-3894 3 3 32 0.65536000000000000000e5
-3894 4 6 9 0.65536000000000000000e5
-3894 4 8 20 0.65536000000000000000e5
-3895 4 1 13 -0.65536000000000000000e5
-3895 4 6 10 0.65536000000000000000e5
-3896 1 3 18 0.65536000000000000000e5
-3896 1 3 34 -0.65536000000000000000e5
-3896 1 4 19 -0.13107200000000000000e6
-3896 1 4 35 -0.65536000000000000000e5
-3896 1 12 43 -0.19660800000000000000e6
-3896 1 14 45 -0.13107200000000000000e6
-3896 1 16 23 -0.65536000000000000000e5
-3896 1 17 48 0.65536000000000000000e5
-3896 1 18 49 0.65536000000000000000e5
-3896 1 20 27 0.26214400000000000000e6
-3896 2 6 12 -0.65536000000000000000e5
-3896 2 9 23 -0.65536000000000000000e5
-3896 2 10 24 -0.13107200000000000000e6
-3896 2 14 28 0.65536000000000000000e5
-3896 3 3 16 0.65536000000000000000e5
-3896 3 4 17 0.65536000000000000000e5
-3896 3 5 34 -0.65536000000000000000e5
-3896 3 13 42 0.65536000000000000000e5
-3896 3 14 27 -0.19660800000000000000e6
-3896 3 14 43 0.65536000000000000000e5
-3896 4 2 14 0.65536000000000000000e5
-3896 4 6 11 0.65536000000000000000e5
-3897 4 2 14 -0.65536000000000000000e5
-3897 4 6 12 0.65536000000000000000e5
-3898 4 6 13 0.65536000000000000000e5
-3898 4 10 10 -0.13107200000000000000e6
-3899 1 2 17 0.32768000000000000000e5
-3899 1 3 18 0.32768000000000000000e5
-3899 1 3 34 0.32768000000000000000e5
-3899 1 4 19 0.65536000000000000000e5
-3899 1 10 17 0.65536000000000000000e5
-3899 1 20 27 -0.13107200000000000000e6
-3899 2 6 12 0.32768000000000000000e5
-3899 2 10 24 0.65536000000000000000e5
-3899 3 3 16 0.32768000000000000000e5
-3899 3 7 20 -0.13107200000000000000e6
-3899 4 6 14 0.65536000000000000000e5
-3900 1 2 17 0.32768000000000000000e5
-3900 1 3 18 0.32768000000000000000e5
-3900 1 3 34 0.16384000000000000000e5
-3900 1 4 19 0.32768000000000000000e5
-3900 1 5 20 0.32768000000000000000e5
-3900 1 5 36 -0.32768000000000000000e5
-3900 1 10 17 0.32768000000000000000e5
-3900 1 12 43 -0.16384000000000000000e5
-3900 1 16 23 -0.16384000000000000000e5
-3900 1 20 27 -0.65536000000000000000e5
-3900 2 6 12 0.16384000000000000000e5
-3900 2 10 24 0.32768000000000000000e5
-3900 3 3 16 0.49152000000000000000e5
-3900 3 4 17 0.16384000000000000000e5
-3900 3 7 12 0.16384000000000000000e5
-3900 3 7 20 0.65536000000000000000e5
-3900 3 8 21 0.13107200000000000000e6
-3900 3 12 21 -0.26214400000000000000e6
-3900 3 14 19 0.13107200000000000000e6
-3900 3 14 27 -0.16384000000000000000e5
-3900 4 1 13 0.16384000000000000000e5
-3900 4 2 14 0.16384000000000000000e5
-3900 4 3 15 0.32768000000000000000e5
-3900 4 6 15 0.65536000000000000000e5
-3900 4 10 10 0.65536000000000000000e5
-3900 4 13 13 0.26214400000000000000e6
-3901 1 1 24 0.32768000000000000000e5
-3901 1 1 32 -0.13107200000000000000e6
-3901 1 1 40 0.32768000000000000000e5
-3901 1 2 33 0.26214400000000000000e6
-3901 1 3 34 -0.26214400000000000000e6
-3901 1 7 38 -0.65536000000000000000e5
-3901 1 8 23 0.65536000000000000000e5
-3901 1 10 41 0.13107200000000000000e6
-3901 1 11 42 -0.26214400000000000000e6
-3901 1 12 43 -0.52428800000000000000e6
-3901 1 16 23 0.26214400000000000000e6
-3901 1 22 37 -0.32768000000000000000e5
-3901 1 23 38 -0.32768000000000000000e5
-3901 1 28 43 0.26214400000000000000e6
-3901 1 32 47 0.26214400000000000000e6
-3901 1 33 48 0.26214400000000000000e6
-3901 2 1 31 -0.13107200000000000000e6
-3901 2 2 16 0.32768000000000000000e5
-3901 2 7 21 0.13107200000000000000e6
-3901 2 12 26 0.26214400000000000000e6
-3901 2 16 16 -0.65536000000000000000e5
-3901 3 1 22 0.32768000000000000000e5
-3901 3 1 30 -0.65536000000000000000e5
-3901 3 1 34 -0.26214400000000000000e6
-3901 3 1 38 0.32768000000000000000e5
-3901 3 2 23 0.32768000000000000000e5
-3901 3 2 31 0.13107200000000000000e6
-3901 3 3 32 0.13107200000000000000e6
-3901 3 10 23 -0.65536000000000000000e5
-3901 3 13 42 0.52428800000000000000e6
-3901 3 22 27 -0.65536000000000000000e5
-3901 3 28 41 0.26214400000000000000e6
-3901 3 29 42 0.26214400000000000000e6
-3901 4 3 31 -0.26214400000000000000e6
-3901 4 6 16 0.65536000000000000000e5
-3901 4 6 18 -0.65536000000000000000e5
-3901 4 16 16 0.65536000000000000000e5
-3902 1 2 33 0.13107200000000000000e6
-3902 1 7 38 -0.65536000000000000000e5
-3902 1 8 23 0.65536000000000000000e5
-3902 1 11 42 -0.13107200000000000000e6
-3902 1 12 43 -0.26214400000000000000e6
-3902 1 28 43 0.13107200000000000000e6
-3902 1 32 47 0.13107200000000000000e6
-3902 1 33 48 0.13107200000000000000e6
-3902 2 12 26 0.13107200000000000000e6
-3902 3 2 31 -0.13107200000000000000e6
-3902 3 10 23 -0.65536000000000000000e5
-3902 3 13 42 0.26214400000000000000e6
-3902 3 28 41 0.13107200000000000000e6
-3902 3 29 42 0.13107200000000000000e6
-3902 4 3 31 -0.13107200000000000000e6
-3902 4 6 17 0.65536000000000000000e5
-3902 4 6 18 -0.65536000000000000000e5
-3903 1 9 40 -0.65536000000000000000e5
-3903 1 10 25 0.65536000000000000000e5
-3903 3 1 30 0.65536000000000000000e5
-3903 3 3 32 -0.13107200000000000000e6
-3903 3 10 23 0.65536000000000000000e5
-3903 4 6 19 0.65536000000000000000e5
-3904 1 1 32 0.65536000000000000000e5
-3904 1 3 34 0.13107200000000000000e6
-3904 1 10 41 -0.65536000000000000000e5
-3904 1 16 23 -0.13107200000000000000e6
-3904 2 1 31 0.65536000000000000000e5
-3904 2 7 21 -0.65536000000000000000e5
-3904 3 3 32 -0.65536000000000000000e5
-3904 4 6 20 0.65536000000000000000e5
-3905 1 2 33 0.65536000000000000000e5
-3905 1 3 34 -0.13107200000000000000e6
-3905 1 11 42 -0.65536000000000000000e5
-3905 1 12 43 -0.13107200000000000000e6
-3905 1 16 47 0.13107200000000000000e6
-3905 1 28 43 0.65536000000000000000e5
-3905 1 32 47 0.65536000000000000000e5
-3905 1 33 48 0.65536000000000000000e5
-3905 2 12 26 0.65536000000000000000e5
-3905 3 2 31 0.65536000000000000000e5
-3905 3 3 32 0.65536000000000000000e5
-3905 3 12 41 0.13107200000000000000e6
-3905 3 13 42 0.13107200000000000000e6
-3905 3 28 41 0.65536000000000000000e5
-3905 3 29 42 0.65536000000000000000e5
-3905 4 3 31 -0.65536000000000000000e5
-3905 4 6 21 0.65536000000000000000e5
-3906 4 6 22 0.65536000000000000000e5
-3906 4 8 20 -0.65536000000000000000e5
-3907 1 3 18 -0.65536000000000000000e5
-3907 1 3 34 0.65536000000000000000e5
-3907 1 4 19 0.13107200000000000000e6
-3907 1 4 35 0.65536000000000000000e5
-3907 1 12 43 0.13107200000000000000e6
-3907 1 14 45 0.13107200000000000000e6
-3907 1 16 47 -0.65536000000000000000e5
-3907 1 17 48 -0.65536000000000000000e5
-3907 1 18 49 -0.65536000000000000000e5
-3907 1 20 27 -0.26214400000000000000e6
-3907 1 27 34 0.13107200000000000000e6
-3907 2 9 23 0.65536000000000000000e5
-3907 2 10 24 0.13107200000000000000e6
-3907 2 14 28 -0.65536000000000000000e5
-3907 3 1 34 0.65536000000000000000e5
-3907 3 3 16 -0.65536000000000000000e5
-3907 3 4 17 -0.65536000000000000000e5
-3907 3 5 34 0.65536000000000000000e5
-3907 3 12 41 -0.65536000000000000000e5
-3907 3 13 42 -0.65536000000000000000e5
-3907 3 14 27 0.19660800000000000000e6
-3907 3 14 43 -0.65536000000000000000e5
-3907 4 2 14 -0.65536000000000000000e5
-3907 4 6 23 0.65536000000000000000e5
-3908 1 3 18 0.65536000000000000000e5
-3908 1 3 34 0.65536000000000000000e5
-3908 1 4 19 -0.13107200000000000000e6
-3908 1 4 35 0.65536000000000000000e5
-3908 1 12 43 -0.65536000000000000000e5
-3908 1 13 44 0.13107200000000000000e6
-3908 1 16 47 -0.65536000000000000000e5
-3908 1 17 48 -0.65536000000000000000e5
-3908 3 3 16 0.65536000000000000000e5
-3908 3 4 17 0.65536000000000000000e5
-3908 3 12 41 -0.65536000000000000000e5
-3908 3 13 42 -0.65536000000000000000e5
-3908 4 2 14 0.65536000000000000000e5
-3908 4 6 24 0.65536000000000000000e5
-3909 1 4 35 -0.32768000000000000000e5
-3909 1 12 43 -0.32768000000000000000e5
-3909 1 13 44 -0.65536000000000000000e5
-3909 1 14 45 -0.65536000000000000000e5
-3909 1 17 48 0.32768000000000000000e5
-3909 1 18 49 0.32768000000000000000e5
-3909 1 20 27 0.13107200000000000000e6
-3909 1 27 34 -0.65536000000000000000e5
-3909 2 9 23 -0.32768000000000000000e5
-3909 2 10 24 -0.65536000000000000000e5
-3909 2 14 28 0.32768000000000000000e5
-3909 3 5 34 -0.32768000000000000000e5
-3909 3 7 36 -0.13107200000000000000e6
-3909 3 13 42 0.32768000000000000000e5
-3909 3 14 27 -0.32768000000000000000e5
-3909 3 14 43 0.32768000000000000000e5
-3909 3 16 29 0.65536000000000000000e5
-3909 4 6 25 0.65536000000000000000e5
-3910 4 1 29 -0.65536000000000000000e5
-3910 4 6 26 0.65536000000000000000e5
-3911 1 9 40 -0.65536000000000000000e5
-3911 1 10 41 0.13107200000000000000e6
-3911 1 11 42 -0.13107200000000000000e6
-3911 1 26 41 0.65536000000000000000e5
-3911 1 32 47 -0.13107200000000000000e6
-3911 1 33 48 0.13107200000000000000e6
-3911 2 12 26 0.13107200000000000000e6
-3911 2 20 34 -0.13107200000000000000e6
-3911 3 8 37 0.65536000000000000000e5
-3911 3 13 42 0.26214400000000000000e6
-3911 3 22 35 -0.26214400000000000000e6
-3911 3 28 41 -0.13107200000000000000e6
-3911 3 29 42 0.13107200000000000000e6
-3911 4 2 30 -0.65536000000000000000e5
-3911 4 3 31 -0.13107200000000000000e6
-3911 4 6 27 0.65536000000000000000e5
-3911 4 6 34 -0.13107200000000000000e6
-3912 4 2 30 -0.65536000000000000000e5
-3912 4 6 28 0.65536000000000000000e5
-3913 1 9 40 -0.32768000000000000000e5
-3913 1 10 41 0.13107200000000000000e6
-3913 1 11 42 0.65536000000000000000e5
-3913 1 26 41 0.32768000000000000000e5
-3913 1 32 47 -0.13107200000000000000e6
-3913 1 33 48 -0.65536000000000000000e5
-3913 2 12 26 -0.65536000000000000000e5
-3913 2 20 34 0.65536000000000000000e5
-3913 3 8 37 0.32768000000000000000e5
-3913 3 9 38 -0.32768000000000000000e5
-3913 3 12 41 -0.13107200000000000000e6
-3913 3 13 42 -0.13107200000000000000e6
-3913 3 22 27 0.32768000000000000000e5
-3913 3 22 35 0.13107200000000000000e6
-3913 3 28 41 -0.13107200000000000000e6
-3913 3 29 42 -0.65536000000000000000e5
-3913 4 1 29 0.32768000000000000000e5
-3913 4 2 30 -0.32768000000000000000e5
-3913 4 3 31 0.65536000000000000000e5
-3913 4 6 29 0.65536000000000000000e5
-3913 4 6 34 0.65536000000000000000e5
-3914 2 12 26 -0.65536000000000000000e5
-3914 2 20 34 0.65536000000000000000e5
-3914 4 6 30 0.65536000000000000000e5
-3914 4 6 34 0.65536000000000000000e5
-3915 1 13 44 -0.13107200000000000000e6
-3915 1 34 41 0.13107200000000000000e6
-3915 3 12 41 0.65536000000000000000e5
-3915 3 13 42 0.65536000000000000000e5
-3915 3 22 35 0.65536000000000000000e5
-3915 4 6 31 0.65536000000000000000e5
-3916 2 16 30 -0.65536000000000000000e5
-3916 2 16 34 0.65536000000000000000e5
-3916 4 6 32 0.65536000000000000000e5
-3917 4 6 33 0.65536000000000000000e5
-3917 4 17 29 -0.65536000000000000000e5
-3918 4 6 35 0.65536000000000000000e5
-3918 4 20 32 -0.65536000000000000000e5
-3919 2 4 10 -0.32768000000000000000e5
-3919 2 7 21 0.32768000000000000000e5
-3919 4 7 7 0.65536000000000000000e5
-3920 1 2 33 0.65536000000000000000e5
-3920 1 3 18 -0.13107200000000000000e6
-3920 1 6 13 0.65536000000000000000e5
-3920 1 10 41 0.65536000000000000000e5
-3920 2 4 10 -0.65536000000000000000e5
-3920 2 7 21 0.65536000000000000000e5
-3920 2 12 26 0.65536000000000000000e5
-3920 3 1 14 -0.65536000000000000000e5
-3920 3 3 16 0.13107200000000000000e6
-3920 3 3 32 0.65536000000000000000e5
-3920 4 7 8 0.65536000000000000000e5
-3920 4 8 20 0.65536000000000000000e5
-3921 1 2 33 0.65536000000000000000e5
-3921 1 4 35 0.13107200000000000000e6
-3921 1 11 42 -0.65536000000000000000e5
-3921 1 12 43 -0.13107200000000000000e6
-3921 2 5 11 -0.65536000000000000000e5
-3921 2 12 26 0.65536000000000000000e5
-3921 3 4 33 -0.65536000000000000000e5
-3921 3 14 27 -0.13107200000000000000e6
-3921 4 7 9 0.65536000000000000000e5
-3921 4 8 20 0.65536000000000000000e5
-3922 1 3 18 0.65536000000000000000e5
-3922 1 3 34 -0.65536000000000000000e5
-3922 1 4 19 -0.13107200000000000000e6
-3922 1 4 35 -0.65536000000000000000e5
-3922 1 12 43 -0.19660800000000000000e6
-3922 1 14 45 -0.13107200000000000000e6
-3922 1 16 23 -0.65536000000000000000e5
-3922 1 17 48 0.65536000000000000000e5
-3922 1 18 49 0.65536000000000000000e5
-3922 1 20 27 0.26214400000000000000e6
-3922 2 6 12 -0.65536000000000000000e5
-3922 2 9 23 -0.65536000000000000000e5
-3922 2 10 24 -0.13107200000000000000e6
-3922 2 14 28 0.65536000000000000000e5
-3922 3 3 16 0.65536000000000000000e5
-3922 3 4 17 0.65536000000000000000e5
-3922 3 5 34 -0.65536000000000000000e5
-3922 3 13 42 0.65536000000000000000e5
-3922 3 14 27 -0.19660800000000000000e6
-3922 3 14 43 0.65536000000000000000e5
-3922 4 2 14 0.65536000000000000000e5
-3922 4 7 10 0.65536000000000000000e5
-3923 4 2 14 -0.65536000000000000000e5
-3923 4 7 11 0.65536000000000000000e5
-3924 1 3 18 0.65536000000000000000e5
-3924 1 4 35 0.65536000000000000000e5
-3924 1 5 20 0.13107200000000000000e6
-3924 1 5 36 -0.13107200000000000000e6
-3924 1 10 17 -0.13107200000000000000e6
-3924 1 14 45 0.13107200000000000000e6
-3924 1 17 48 -0.65536000000000000000e5
-3924 1 18 49 -0.65536000000000000000e5
-3924 2 9 23 0.65536000000000000000e5
-3924 2 14 28 -0.65536000000000000000e5
-3924 3 5 18 -0.65536000000000000000e5
-3924 3 5 34 0.65536000000000000000e5
-3924 3 13 42 -0.65536000000000000000e5
-3924 3 14 43 -0.65536000000000000000e5
-3924 4 7 12 0.65536000000000000000e5
-3924 4 8 12 -0.65536000000000000000e5
-3925 1 2 17 0.32768000000000000000e5
-3925 1 3 18 0.32768000000000000000e5
-3925 1 3 34 0.32768000000000000000e5
-3925 1 4 19 0.65536000000000000000e5
-3925 1 10 17 0.65536000000000000000e5
-3925 1 20 27 -0.13107200000000000000e6
-3925 2 6 12 0.32768000000000000000e5
-3925 2 10 24 0.65536000000000000000e5
-3925 3 3 16 0.32768000000000000000e5
-3925 3 7 20 -0.13107200000000000000e6
-3925 4 7 13 0.65536000000000000000e5
-3926 4 3 15 -0.65536000000000000000e5
-3926 4 7 14 0.65536000000000000000e5
-3927 4 7 15 0.65536000000000000000e5
-3927 4 10 14 -0.65536000000000000000e5
-3928 1 2 33 0.13107200000000000000e6
-3928 1 7 38 -0.65536000000000000000e5
-3928 1 8 23 0.65536000000000000000e5
-3928 1 11 42 -0.13107200000000000000e6
-3928 1 12 43 -0.26214400000000000000e6
-3928 1 28 43 0.13107200000000000000e6
-3928 1 32 47 0.13107200000000000000e6
-3928 1 33 48 0.13107200000000000000e6
-3928 2 12 26 0.13107200000000000000e6
-3928 3 2 31 -0.13107200000000000000e6
-3928 3 10 23 -0.65536000000000000000e5
-3928 3 13 42 0.26214400000000000000e6
-3928 3 28 41 0.13107200000000000000e6
-3928 3 29 42 0.13107200000000000000e6
-3928 4 3 31 -0.13107200000000000000e6
-3928 4 6 18 -0.65536000000000000000e5
-3928 4 7 16 0.65536000000000000000e5
-3929 4 6 18 -0.65536000000000000000e5
-3929 4 7 17 0.65536000000000000000e5
-3930 1 9 40 -0.65536000000000000000e5
-3930 1 10 25 0.65536000000000000000e5
-3930 3 1 30 0.65536000000000000000e5
-3930 3 3 32 -0.13107200000000000000e6
-3930 3 10 23 0.65536000000000000000e5
-3930 4 7 18 0.65536000000000000000e5
-3931 1 2 33 0.65536000000000000000e5
-3931 1 3 34 -0.13107200000000000000e6
-3931 1 11 42 -0.65536000000000000000e5
-3931 1 12 43 -0.13107200000000000000e6
-3931 1 16 47 0.13107200000000000000e6
-3931 1 28 43 0.65536000000000000000e5
-3931 1 32 47 0.65536000000000000000e5
-3931 1 33 48 0.65536000000000000000e5
-3931 2 12 26 0.65536000000000000000e5
-3931 3 2 31 0.65536000000000000000e5
-3931 3 3 32 0.65536000000000000000e5
-3931 3 12 41 0.13107200000000000000e6
-3931 3 13 42 0.13107200000000000000e6
-3931 3 28 41 0.65536000000000000000e5
-3931 3 29 42 0.65536000000000000000e5
-3931 4 3 31 -0.65536000000000000000e5
-3931 4 7 20 0.65536000000000000000e5
-3932 4 7 21 0.65536000000000000000e5
-3932 4 8 20 -0.65536000000000000000e5
-3933 1 2 33 -0.65536000000000000000e5
-3933 1 4 35 -0.13107200000000000000e6
-3933 1 11 42 0.65536000000000000000e5
-3933 1 12 43 0.13107200000000000000e6
-3933 1 17 48 0.13107200000000000000e6
-3933 1 28 43 -0.65536000000000000000e5
-3933 1 32 47 -0.65536000000000000000e5
-3933 1 33 48 -0.65536000000000000000e5
-3933 2 12 26 -0.65536000000000000000e5
-3933 3 4 33 0.65536000000000000000e5
-3933 3 14 27 0.13107200000000000000e6
-3933 3 28 41 -0.65536000000000000000e5
-3933 3 29 42 -0.65536000000000000000e5
-3933 4 3 31 0.65536000000000000000e5
-3933 4 7 22 0.65536000000000000000e5
-3933 4 8 20 -0.65536000000000000000e5
-3934 1 3 18 0.65536000000000000000e5
-3934 1 3 34 0.65536000000000000000e5
-3934 1 4 19 -0.13107200000000000000e6
-3934 1 4 35 0.65536000000000000000e5
-3934 1 12 43 -0.65536000000000000000e5
-3934 1 13 44 0.13107200000000000000e6
-3934 1 16 47 -0.65536000000000000000e5
-3934 1 17 48 -0.65536000000000000000e5
-3934 3 3 16 0.65536000000000000000e5
-3934 3 4 17 0.65536000000000000000e5
-3934 3 12 41 -0.65536000000000000000e5
-3934 3 13 42 -0.65536000000000000000e5
-3934 4 2 14 0.65536000000000000000e5
-3934 4 7 23 0.65536000000000000000e5
-3935 1 4 35 0.65536000000000000000e5
-3935 1 17 48 -0.65536000000000000000e5
-3935 3 5 34 0.65536000000000000000e5
-3935 3 13 42 -0.65536000000000000000e5
-3935 3 14 27 0.65536000000000000000e5
-3935 3 16 29 -0.13107200000000000000e6
-3935 4 7 24 0.65536000000000000000e5
-3936 4 7 25 0.65536000000000000000e5
-3936 4 11 23 -0.65536000000000000000e5
-3937 1 9 40 -0.65536000000000000000e5
-3937 1 10 41 0.13107200000000000000e6
-3937 1 11 42 -0.13107200000000000000e6
-3937 1 26 41 0.65536000000000000000e5
-3937 1 32 47 -0.13107200000000000000e6
-3937 1 33 48 0.13107200000000000000e6
-3937 2 12 26 0.13107200000000000000e6
-3937 2 20 34 -0.13107200000000000000e6
-3937 3 8 37 0.65536000000000000000e5
-3937 3 13 42 0.26214400000000000000e6
-3937 3 22 35 -0.26214400000000000000e6
-3937 3 28 41 -0.13107200000000000000e6
-3937 3 29 42 0.13107200000000000000e6
-3937 4 2 30 -0.65536000000000000000e5
-3937 4 3 31 -0.13107200000000000000e6
-3937 4 6 34 -0.13107200000000000000e6
-3937 4 7 26 0.65536000000000000000e5
-3938 4 2 30 -0.65536000000000000000e5
-3938 4 7 27 0.65536000000000000000e5
-3939 1 9 40 0.65536000000000000000e5
-3939 1 10 41 0.13107200000000000000e6
-3939 1 11 42 0.13107200000000000000e6
-3939 1 26 41 -0.65536000000000000000e5
-3939 1 32 47 -0.13107200000000000000e6
-3939 1 33 48 -0.13107200000000000000e6
-3939 3 9 38 0.65536000000000000000e5
-3939 3 10 39 0.65536000000000000000e5
-3939 3 13 42 -0.26214400000000000000e6
-3939 3 28 41 -0.13107200000000000000e6
-3939 3 29 42 -0.13107200000000000000e6
-3939 4 3 31 0.13107200000000000000e6
-3939 4 7 28 0.65536000000000000000e5
-3940 2 12 26 -0.65536000000000000000e5
-3940 2 20 34 0.65536000000000000000e5
-3940 4 6 34 0.65536000000000000000e5
-3940 4 7 29 0.65536000000000000000e5
-3941 4 3 31 -0.65536000000000000000e5
-3941 4 7 30 0.65536000000000000000e5
-3942 4 7 31 0.65536000000000000000e5
-3942 4 14 26 -0.65536000000000000000e5
-3943 4 7 32 0.65536000000000000000e5
-3943 4 17 29 -0.65536000000000000000e5
-3944 2 4 34 -0.65536000000000000000e5
-3944 2 21 35 0.65536000000000000000e5
-3944 4 7 33 0.65536000000000000000e5
-3944 4 7 35 0.65536000000000000000e5
-3945 4 7 34 0.65536000000000000000e5
-3945 4 23 27 -0.65536000000000000000e5
-3946 1 2 33 0.32768000000000000000e5
-3946 1 4 35 0.65536000000000000000e5
-3946 1 11 42 -0.32768000000000000000e5
-3946 1 12 43 -0.65536000000000000000e5
-3946 2 5 11 -0.32768000000000000000e5
-3946 2 12 26 0.32768000000000000000e5
-3946 3 4 33 -0.32768000000000000000e5
-3946 3 14 27 -0.65536000000000000000e5
-3946 4 8 8 0.65536000000000000000e5
-3946 4 8 20 0.32768000000000000000e5
-3947 1 2 33 0.65536000000000000000e5
-3947 1 4 35 0.13107200000000000000e6
-3947 1 5 20 -0.26214400000000000000e6
-3947 1 5 36 0.26214400000000000000e6
-3947 1 11 42 -0.65536000000000000000e5
-3947 1 12 43 -0.13107200000000000000e6
-3947 2 5 11 -0.65536000000000000000e5
-3947 2 12 26 0.65536000000000000000e5
-3947 3 2 15 -0.65536000000000000000e5
-3947 3 4 17 0.26214400000000000000e6
-3947 3 4 33 -0.65536000000000000000e5
-3947 3 5 18 0.13107200000000000000e6
-3947 3 10 11 0.65536000000000000000e5
-3947 3 14 27 -0.13107200000000000000e6
-3947 4 8 9 0.65536000000000000000e5
-3947 4 8 12 0.13107200000000000000e6
-3947 4 8 20 0.65536000000000000000e5
-3948 4 2 14 -0.65536000000000000000e5
-3948 4 8 10 0.65536000000000000000e5
-3949 1 3 18 0.65536000000000000000e5
-3949 1 4 35 0.65536000000000000000e5
-3949 1 5 20 0.13107200000000000000e6
-3949 1 5 36 -0.13107200000000000000e6
-3949 1 10 17 -0.13107200000000000000e6
-3949 1 14 45 0.13107200000000000000e6
-3949 1 17 48 -0.65536000000000000000e5
-3949 1 18 49 -0.65536000000000000000e5
-3949 2 9 23 0.65536000000000000000e5
-3949 2 14 28 -0.65536000000000000000e5
-3949 3 5 18 -0.65536000000000000000e5
-3949 3 5 34 0.65536000000000000000e5
-3949 3 13 42 -0.65536000000000000000e5
-3949 3 14 43 -0.65536000000000000000e5
-3949 4 8 11 0.65536000000000000000e5
-3949 4 8 12 -0.65536000000000000000e5
-3950 4 3 15 -0.65536000000000000000e5
-3950 4 8 13 0.65536000000000000000e5
-3951 1 3 18 0.32768000000000000000e5
-3951 1 4 35 -0.65536000000000000000e5
-3951 1 5 20 0.13107200000000000000e6
-3951 1 5 36 -0.13107200000000000000e6
-3951 1 10 17 0.13107200000000000000e6
-3951 1 12 43 -0.98304000000000000000e5
-3951 1 14 45 -0.13107200000000000000e6
-3951 1 17 48 0.65536000000000000000e5
-3951 1 18 49 0.65536000000000000000e5
-3951 2 9 23 -0.65536000000000000000e5
-3951 2 14 28 0.65536000000000000000e5
-3951 3 3 16 0.32768000000000000000e5
-3951 3 4 17 0.32768000000000000000e5
-3951 3 5 34 -0.65536000000000000000e5
-3951 3 6 19 0.65536000000000000000e5
-3951 3 7 20 0.13107200000000000000e6
-3951 3 8 21 -0.26214400000000000000e6
-3951 3 13 42 0.65536000000000000000e5
-3951 3 14 27 -0.98304000000000000000e5
-3951 3 14 43 0.65536000000000000000e5
-3951 4 2 14 0.32768000000000000000e5
-3951 4 3 15 0.65536000000000000000e5
-3951 4 8 14 0.65536000000000000000e5
-3951 4 10 14 0.13107200000000000000e6
-3952 1 6 21 0.65536000000000000000e5
-3952 1 18 33 -0.65536000000000000000e5
-3952 3 7 20 -0.65536000000000000000e5
-3952 3 8 21 0.13107200000000000000e6
-3952 3 14 19 -0.13107200000000000000e6
-3952 4 8 15 0.65536000000000000000e5
-3952 4 10 14 -0.65536000000000000000e5
-3953 4 6 18 -0.65536000000000000000e5
-3953 4 8 16 0.65536000000000000000e5
-3954 1 9 40 -0.65536000000000000000e5
-3954 1 10 25 0.65536000000000000000e5
-3954 3 1 30 0.65536000000000000000e5
-3954 3 3 32 -0.13107200000000000000e6
-3954 3 10 23 0.65536000000000000000e5
-3954 4 8 17 0.65536000000000000000e5
-3955 4 7 19 -0.65536000000000000000e5
-3955 4 8 18 0.65536000000000000000e5
-3956 1 1 48 0.32768000000000000000e5
-3956 1 2 33 -0.13107200000000000000e6
-3956 1 2 49 0.32768000000000000000e5
-3956 1 8 39 0.65536000000000000000e5
-3956 1 9 40 0.13107200000000000000e6
-3956 1 10 41 -0.13107200000000000000e6
-3956 1 11 26 0.65536000000000000000e5
-3956 1 23 38 0.32768000000000000000e5
-3956 1 26 41 -0.13107200000000000000e6
-3956 1 28 43 0.13107200000000000000e6
-3956 1 32 47 0.13107200000000000000e6
-3956 1 33 48 -0.13107200000000000000e6
-3956 2 2 32 0.32768000000000000000e5
-3956 2 4 34 -0.65536000000000000000e5
-3956 2 12 26 -0.13107200000000000000e6
-3956 2 16 30 0.65536000000000000000e5
-3956 2 20 34 0.13107200000000000000e6
-3956 2 28 34 0.65536000000000000000e5
-3956 3 3 32 -0.13107200000000000000e6
-3956 3 4 33 -0.13107200000000000000e6
-3956 3 9 38 0.65536000000000000000e5
-3956 3 10 23 -0.65536000000000000000e5
-3956 3 10 39 0.65536000000000000000e5
-3956 3 13 42 -0.26214400000000000000e6
-3956 3 14 27 0.26214400000000000000e6
-3956 3 22 35 0.26214400000000000000e6
-3956 3 28 41 0.13107200000000000000e6
-3956 3 29 42 -0.13107200000000000000e6
-3956 4 2 30 0.65536000000000000000e5
-3956 4 3 31 0.13107200000000000000e6
-3956 4 6 34 0.13107200000000000000e6
-3956 4 7 19 -0.65536000000000000000e5
-3956 4 8 19 0.65536000000000000000e5
-3956 4 8 20 -0.13107200000000000000e6
-3956 4 18 22 0.65536000000000000000e5
-3956 4 18 30 0.65536000000000000000e5
-3956 4 21 33 0.65536000000000000000e5
-3957 1 2 33 -0.65536000000000000000e5
-3957 1 4 35 -0.13107200000000000000e6
-3957 1 11 42 0.65536000000000000000e5
-3957 1 12 43 0.13107200000000000000e6
-3957 1 17 48 0.13107200000000000000e6
-3957 1 28 43 -0.65536000000000000000e5
-3957 1 32 47 -0.65536000000000000000e5
-3957 1 33 48 -0.65536000000000000000e5
-3957 2 12 26 -0.65536000000000000000e5
-3957 3 4 33 0.65536000000000000000e5
-3957 3 14 27 0.13107200000000000000e6
-3957 3 28 41 -0.65536000000000000000e5
-3957 3 29 42 -0.65536000000000000000e5
-3957 4 3 31 0.65536000000000000000e5
-3957 4 8 20 -0.65536000000000000000e5
-3957 4 8 21 0.65536000000000000000e5
-3958 4 8 22 0.65536000000000000000e5
-3958 4 9 21 -0.65536000000000000000e5
-3959 1 4 35 0.65536000000000000000e5
-3959 1 17 48 -0.65536000000000000000e5
-3959 3 5 34 0.65536000000000000000e5
-3959 3 13 42 -0.65536000000000000000e5
-3959 3 14 27 0.65536000000000000000e5
-3959 3 16 29 -0.13107200000000000000e6
-3959 4 8 23 0.65536000000000000000e5
-3960 1 4 35 0.65536000000000000000e5
-3960 1 5 36 -0.13107200000000000000e6
-3960 1 14 45 0.13107200000000000000e6
-3960 1 15 30 0.65536000000000000000e5
-3960 1 17 48 -0.65536000000000000000e5
-3960 1 18 49 -0.65536000000000000000e5
-3960 3 5 34 0.65536000000000000000e5
-3960 3 13 42 -0.65536000000000000000e5
-3960 3 14 43 -0.65536000000000000000e5
-3960 4 8 24 0.65536000000000000000e5
-3961 1 5 36 0.65536000000000000000e5
-3961 1 14 45 -0.65536000000000000000e5
-3961 3 16 29 0.65536000000000000000e5
-3961 3 17 30 0.65536000000000000000e5
-3961 3 18 31 -0.13107200000000000000e6
-3961 4 8 25 0.65536000000000000000e5
-3962 4 2 30 -0.65536000000000000000e5
-3962 4 8 26 0.65536000000000000000e5
-3963 1 9 40 0.65536000000000000000e5
-3963 1 10 41 0.13107200000000000000e6
-3963 1 11 42 0.13107200000000000000e6
-3963 1 26 41 -0.65536000000000000000e5
-3963 1 32 47 -0.13107200000000000000e6
-3963 1 33 48 -0.13107200000000000000e6
-3963 3 9 38 0.65536000000000000000e5
-3963 3 10 39 0.65536000000000000000e5
-3963 3 13 42 -0.26214400000000000000e6
-3963 3 28 41 -0.13107200000000000000e6
-3963 3 29 42 -0.13107200000000000000e6
-3963 4 3 31 0.13107200000000000000e6
-3963 4 8 27 0.65536000000000000000e5
-3964 4 8 28 0.65536000000000000000e5
-3964 4 18 22 -0.65536000000000000000e5
-3965 4 3 31 -0.65536000000000000000e5
-3965 4 8 29 0.65536000000000000000e5
-3966 1 10 41 -0.65536000000000000000e5
-3966 1 14 45 -0.26214400000000000000e6
-3966 1 17 48 0.13107200000000000000e6
-3966 1 18 49 0.13107200000000000000e6
-3966 1 26 33 0.65536000000000000000e5
-3966 1 32 47 0.65536000000000000000e5
-3966 1 33 40 -0.65536000000000000000e5
-3966 1 34 49 0.13107200000000000000e6
-3966 2 14 28 0.13107200000000000000e6
-3966 3 13 42 0.26214400000000000000e6
-3966 3 14 43 0.13107200000000000000e6
-3966 3 18 47 0.13107200000000000000e6
-3966 3 28 41 0.65536000000000000000e5
-3966 4 3 31 -0.65536000000000000000e5
-3966 4 8 30 0.65536000000000000000e5
-3967 1 14 45 0.26214400000000000000e6
-3967 1 17 48 -0.13107200000000000000e6
-3967 1 18 49 -0.13107200000000000000e6
-3967 1 34 49 -0.13107200000000000000e6
-3967 2 14 28 -0.13107200000000000000e6
-3967 3 14 43 -0.65536000000000000000e5
-3967 3 15 44 0.13107200000000000000e6
-3967 3 16 45 -0.26214400000000000000e6
-3967 3 18 47 -0.13107200000000000000e6
-3967 3 22 35 0.65536000000000000000e5
-3967 4 8 31 0.65536000000000000000e5
-3967 4 14 26 0.65536000000000000000e5
-3967 4 15 27 0.13107200000000000000e6
-3968 2 4 34 -0.65536000000000000000e5
-3968 2 21 35 0.65536000000000000000e5
-3968 4 7 35 0.65536000000000000000e5
-3968 4 8 32 0.65536000000000000000e5
-3969 4 8 33 0.65536000000000000000e5
-3969 4 18 30 -0.65536000000000000000e5
-3970 1 6 53 0.16384000000000000000e5
-3970 1 25 40 -0.16384000000000000000e5
-3970 2 4 34 0.32768000000000000000e5
-3970 2 21 35 -0.32768000000000000000e5
-3970 3 5 50 0.32768000000000000000e5
-3970 3 14 51 0.13107200000000000000e6
-3970 3 18 47 -0.13107200000000000000e6
-3970 3 24 37 0.16384000000000000000e5
-3970 3 27 40 0.65536000000000000000e5
-3970 3 30 43 -0.65536000000000000000e5
-3970 4 4 32 -0.16384000000000000000e5
-3970 4 7 35 -0.32768000000000000000e5
-3970 4 8 34 0.65536000000000000000e5
-3970 4 16 28 0.16384000000000000000e5
-3970 4 19 31 -0.65536000000000000000e5
-3971 4 8 35 0.65536000000000000000e5
-3971 4 21 33 -0.65536000000000000000e5
-3972 1 3 18 0.65536000000000000000e5
-3972 1 4 35 0.65536000000000000000e5
-3972 1 5 20 0.13107200000000000000e6
-3972 1 5 36 -0.13107200000000000000e6
-3972 1 10 17 -0.13107200000000000000e6
-3972 1 14 45 0.13107200000000000000e6
-3972 1 17 48 -0.65536000000000000000e5
-3972 1 18 49 -0.65536000000000000000e5
-3972 2 9 23 0.65536000000000000000e5
-3972 2 14 28 -0.65536000000000000000e5
-3972 3 5 18 -0.65536000000000000000e5
-3972 3 5 34 0.65536000000000000000e5
-3972 3 13 42 -0.65536000000000000000e5
-3972 3 14 43 -0.65536000000000000000e5
-3972 4 8 12 -0.65536000000000000000e5
-3972 4 9 10 0.65536000000000000000e5
-3973 4 8 12 -0.65536000000000000000e5
-3973 4 9 11 0.65536000000000000000e5
-3974 4 5 14 -0.65536000000000000000e5
-3974 4 9 12 0.65536000000000000000e5
-3975 1 3 18 0.32768000000000000000e5
-3975 1 4 35 -0.65536000000000000000e5
-3975 1 5 20 0.13107200000000000000e6
-3975 1 5 36 -0.13107200000000000000e6
-3975 1 10 17 0.13107200000000000000e6
-3975 1 12 43 -0.98304000000000000000e5
-3975 1 14 45 -0.13107200000000000000e6
-3975 1 17 48 0.65536000000000000000e5
-3975 1 18 49 0.65536000000000000000e5
-3975 2 9 23 -0.65536000000000000000e5
-3975 2 14 28 0.65536000000000000000e5
-3975 3 3 16 0.32768000000000000000e5
-3975 3 4 17 0.32768000000000000000e5
-3975 3 5 34 -0.65536000000000000000e5
-3975 3 6 19 0.65536000000000000000e5
-3975 3 7 20 0.13107200000000000000e6
-3975 3 8 21 -0.26214400000000000000e6
-3975 3 13 42 0.65536000000000000000e5
-3975 3 14 27 -0.98304000000000000000e5
-3975 3 14 43 0.65536000000000000000e5
-3975 4 2 14 0.32768000000000000000e5
-3975 4 3 15 0.65536000000000000000e5
-3975 4 9 13 0.65536000000000000000e5
-3975 4 10 14 0.13107200000000000000e6
-3976 4 9 14 0.65536000000000000000e5
-3976 4 12 12 -0.13107200000000000000e6
-3977 1 3 18 -0.16384000000000000000e5
-3977 1 4 35 0.16384000000000000000e5
-3977 1 5 20 -0.32768000000000000000e5
-3977 1 5 36 0.32768000000000000000e5
-3977 1 6 21 0.65536000000000000000e5
-3977 1 10 17 -0.32768000000000000000e5
-3977 1 12 43 0.32768000000000000000e5
-3977 1 14 45 0.32768000000000000000e5
-3977 1 17 48 -0.16384000000000000000e5
-3977 1 18 33 -0.65536000000000000000e5
-3977 1 18 49 -0.16384000000000000000e5
-3977 2 9 23 0.16384000000000000000e5
-3977 2 14 28 -0.16384000000000000000e5
-3977 3 3 16 -0.16384000000000000000e5
-3977 3 4 17 -0.16384000000000000000e5
-3977 3 5 34 0.16384000000000000000e5
-3977 3 7 20 -0.65536000000000000000e5
-3977 3 8 21 0.13107200000000000000e6
-3977 3 11 20 0.65536000000000000000e5
-3977 3 13 42 -0.16384000000000000000e5
-3977 3 14 19 0.13107200000000000000e6
-3977 3 14 27 0.32768000000000000000e5
-3977 3 14 43 -0.16384000000000000000e5
-3977 3 15 20 0.13107200000000000000e6
-3977 3 18 19 -0.26214400000000000000e6
-3977 4 2 14 -0.16384000000000000000e5
-3977 4 3 15 -0.32768000000000000000e5
-3977 4 9 15 0.65536000000000000000e5
-3977 4 10 14 -0.65536000000000000000e5
-3977 4 14 14 0.26214400000000000000e6
-3978 1 9 40 -0.65536000000000000000e5
-3978 1 10 25 0.65536000000000000000e5
-3978 3 1 30 0.65536000000000000000e5
-3978 3 3 32 -0.13107200000000000000e6
-3978 3 10 23 0.65536000000000000000e5
-3978 4 9 16 0.65536000000000000000e5
-3979 4 7 19 -0.65536000000000000000e5
-3979 4 9 17 0.65536000000000000000e5
-3980 1 1 48 0.32768000000000000000e5
-3980 1 2 33 -0.13107200000000000000e6
-3980 1 2 49 0.32768000000000000000e5
-3980 1 8 39 0.65536000000000000000e5
-3980 1 9 40 0.13107200000000000000e6
-3980 1 10 41 -0.13107200000000000000e6
-3980 1 11 26 0.65536000000000000000e5
-3980 1 23 38 0.32768000000000000000e5
-3980 1 26 41 -0.13107200000000000000e6
-3980 1 28 43 0.13107200000000000000e6
-3980 1 32 47 0.13107200000000000000e6
-3980 1 33 48 -0.13107200000000000000e6
-3980 2 2 32 0.32768000000000000000e5
-3980 2 4 34 -0.65536000000000000000e5
-3980 2 12 26 -0.13107200000000000000e6
-3980 2 16 30 0.65536000000000000000e5
-3980 2 20 34 0.13107200000000000000e6
-3980 2 28 34 0.65536000000000000000e5
-3980 3 3 32 -0.13107200000000000000e6
-3980 3 4 33 -0.13107200000000000000e6
-3980 3 9 38 0.65536000000000000000e5
-3980 3 10 23 -0.65536000000000000000e5
-3980 3 10 39 0.65536000000000000000e5
-3980 3 13 42 -0.26214400000000000000e6
-3980 3 14 27 0.26214400000000000000e6
-3980 3 22 35 0.26214400000000000000e6
-3980 3 28 41 0.13107200000000000000e6
-3980 3 29 42 -0.13107200000000000000e6
-3980 4 2 30 0.65536000000000000000e5
-3980 4 3 31 0.13107200000000000000e6
-3980 4 6 34 0.13107200000000000000e6
-3980 4 7 19 -0.65536000000000000000e5
-3980 4 8 20 -0.13107200000000000000e6
-3980 4 9 18 0.65536000000000000000e5
-3980 4 18 22 0.65536000000000000000e5
-3980 4 18 30 0.65536000000000000000e5
-3980 4 21 33 0.65536000000000000000e5
-3981 1 1 48 0.32768000000000000000e5
-3981 1 2 33 -0.26214400000000000000e6
-3981 1 2 49 0.32768000000000000000e5
-3981 1 8 39 0.65536000000000000000e5
-3981 1 9 40 0.19660800000000000000e6
-3981 1 10 25 -0.65536000000000000000e5
-3981 1 10 41 -0.13107200000000000000e6
-3981 1 11 26 0.65536000000000000000e5
-3981 1 11 42 0.13107200000000000000e6
-3981 1 12 43 0.26214400000000000000e6
-3981 1 23 38 0.32768000000000000000e5
-3981 1 26 41 -0.13107200000000000000e6
-3981 1 33 48 -0.26214400000000000000e6
-3981 2 2 32 0.32768000000000000000e5
-3981 2 4 34 -0.65536000000000000000e5
-3981 2 12 26 -0.26214400000000000000e6
-3981 2 16 30 0.65536000000000000000e5
-3981 2 20 34 0.13107200000000000000e6
-3981 2 28 34 0.65536000000000000000e5
-3981 3 3 32 -0.26214400000000000000e6
-3981 3 4 33 0.13107200000000000000e6
-3981 3 5 34 -0.26214400000000000000e6
-3981 3 9 38 0.65536000000000000000e5
-3981 3 10 23 -0.65536000000000000000e5
-3981 3 10 39 0.65536000000000000000e5
-3981 3 11 26 0.65536000000000000000e5
-3981 3 13 42 -0.52428800000000000000e6
-3981 3 14 27 0.52428800000000000000e6
-3981 3 22 35 0.26214400000000000000e6
-3981 3 29 42 -0.26214400000000000000e6
-3981 4 2 30 0.65536000000000000000e5
-3981 4 3 31 0.26214400000000000000e6
-3981 4 6 34 0.13107200000000000000e6
-3981 4 7 19 -0.65536000000000000000e5
-3981 4 8 20 -0.26214400000000000000e6
-3981 4 9 19 0.65536000000000000000e5
-3981 4 9 21 0.13107200000000000000e6
-3981 4 18 22 0.65536000000000000000e5
-3981 4 18 30 0.65536000000000000000e5
-3981 4 21 33 0.65536000000000000000e5
-3982 1 2 33 -0.65536000000000000000e5
-3982 1 4 35 -0.13107200000000000000e6
-3982 1 11 42 0.65536000000000000000e5
-3982 1 12 43 0.13107200000000000000e6
-3982 1 17 48 0.13107200000000000000e6
-3982 1 28 43 -0.65536000000000000000e5
-3982 1 32 47 -0.65536000000000000000e5
-3982 1 33 48 -0.65536000000000000000e5
-3982 2 12 26 -0.65536000000000000000e5
-3982 3 4 33 0.65536000000000000000e5
-3982 3 14 27 0.13107200000000000000e6
-3982 3 28 41 -0.65536000000000000000e5
-3982 3 29 42 -0.65536000000000000000e5
-3982 4 3 31 0.65536000000000000000e5
-3982 4 8 20 -0.65536000000000000000e5
-3982 4 9 20 0.65536000000000000000e5
-3983 1 2 33 0.65536000000000000000e5
-3983 1 11 42 -0.65536000000000000000e5
-3983 1 12 43 -0.13107200000000000000e6
-3983 1 15 30 -0.13107200000000000000e6
-3983 1 18 49 0.13107200000000000000e6
-3983 1 28 43 0.65536000000000000000e5
-3983 1 32 47 0.65536000000000000000e5
-3983 1 33 48 0.65536000000000000000e5
-3983 2 12 26 0.65536000000000000000e5
-3983 3 3 32 0.65536000000000000000e5
-3983 3 5 34 0.13107200000000000000e6
-3983 3 11 30 0.65536000000000000000e5
-3983 3 13 42 0.13107200000000000000e6
-3983 3 14 27 -0.13107200000000000000e6
-3983 3 14 43 0.13107200000000000000e6
-3983 3 28 41 0.65536000000000000000e5
-3983 3 29 42 0.65536000000000000000e5
-3983 4 3 31 -0.65536000000000000000e5
-3983 4 8 20 0.65536000000000000000e5
-3983 4 9 21 -0.65536000000000000000e5
-3983 4 9 22 0.65536000000000000000e5
-3984 1 4 35 0.65536000000000000000e5
-3984 1 5 36 -0.13107200000000000000e6
-3984 1 14 45 0.13107200000000000000e6
-3984 1 15 30 0.65536000000000000000e5
-3984 1 17 48 -0.65536000000000000000e5
-3984 1 18 49 -0.65536000000000000000e5
-3984 3 5 34 0.65536000000000000000e5
-3984 3 13 42 -0.65536000000000000000e5
-3984 3 14 43 -0.65536000000000000000e5
-3984 4 9 23 0.65536000000000000000e5
-3985 1 15 30 0.65536000000000000000e5
-3985 1 18 49 -0.65536000000000000000e5
-3985 3 5 34 0.65536000000000000000e5
-3985 3 6 35 0.65536000000000000000e5
-3985 3 14 43 -0.65536000000000000000e5
-3985 3 17 30 -0.13107200000000000000e6
-3985 4 9 24 0.65536000000000000000e5
-3986 4 9 25 0.65536000000000000000e5
-3986 4 12 24 -0.65536000000000000000e5
-3987 1 9 40 0.65536000000000000000e5
-3987 1 10 41 0.13107200000000000000e6
-3987 1 11 42 0.13107200000000000000e6
-3987 1 26 41 -0.65536000000000000000e5
-3987 1 32 47 -0.13107200000000000000e6
-3987 1 33 48 -0.13107200000000000000e6
-3987 3 9 38 0.65536000000000000000e5
-3987 3 10 39 0.65536000000000000000e5
-3987 3 13 42 -0.26214400000000000000e6
-3987 3 28 41 -0.13107200000000000000e6
-3987 3 29 42 -0.13107200000000000000e6
-3987 4 3 31 0.13107200000000000000e6
-3987 4 9 26 0.65536000000000000000e5
-3988 4 9 27 0.65536000000000000000e5
-3988 4 18 22 -0.65536000000000000000e5
-3989 1 9 40 -0.65536000000000000000e5
-3989 1 11 42 0.13107200000000000000e6
-3989 1 26 33 -0.13107200000000000000e6
-3989 1 26 41 0.65536000000000000000e5
-3989 1 33 40 0.13107200000000000000e6
-3989 1 33 48 -0.13107200000000000000e6
-3989 3 11 40 0.65536000000000000000e5
-3989 3 29 42 -0.13107200000000000000e6
-3989 4 9 28 0.65536000000000000000e5
-3989 4 18 22 -0.65536000000000000000e5
-3990 1 10 41 -0.65536000000000000000e5
-3990 1 14 45 -0.26214400000000000000e6
-3990 1 17 48 0.13107200000000000000e6
-3990 1 18 49 0.13107200000000000000e6
-3990 1 26 33 0.65536000000000000000e5
-3990 1 32 47 0.65536000000000000000e5
-3990 1 33 40 -0.65536000000000000000e5
-3990 1 34 49 0.13107200000000000000e6
-3990 2 14 28 0.13107200000000000000e6
-3990 3 13 42 0.26214400000000000000e6
-3990 3 14 43 0.13107200000000000000e6
-3990 3 18 47 0.13107200000000000000e6
-3990 3 28 41 0.65536000000000000000e5
-3990 4 3 31 -0.65536000000000000000e5
-3990 4 9 29 0.65536000000000000000e5
-3991 4 9 30 0.65536000000000000000e5
-3991 4 22 22 -0.13107200000000000000e6
-3992 1 14 45 0.13107200000000000000e6
-3992 1 17 48 -0.65536000000000000000e5
-3992 1 18 49 -0.65536000000000000000e5
-3992 1 34 49 -0.65536000000000000000e5
-3992 2 14 28 -0.65536000000000000000e5
-3992 3 13 42 -0.65536000000000000000e5
-3992 3 15 44 -0.13107200000000000000e6
-3992 3 18 47 -0.65536000000000000000e5
-3992 3 26 35 0.65536000000000000000e5
-3992 4 9 31 0.65536000000000000000e5
-3993 4 9 32 0.65536000000000000000e5
-3993 4 18 30 -0.65536000000000000000e5
-3994 3 6 51 0.65536000000000000000e5
-3994 3 14 51 -0.26214400000000000000e6
-3994 3 27 40 -0.65536000000000000000e5
-3994 3 29 42 0.26214400000000000000e6
-3994 3 30 43 0.13107200000000000000e6
-3994 4 9 33 0.65536000000000000000e5
-3994 4 18 30 -0.65536000000000000000e5
-3994 4 19 31 0.13107200000000000000e6
-3995 4 9 34 0.65536000000000000000e5
-3995 4 19 31 -0.65536000000000000000e5
-3996 1 24 55 0.65536000000000000000e5
-3996 1 26 41 -0.65536000000000000000e5
-3996 3 6 55 0.65536000000000000000e5
-3996 3 10 55 -0.26214400000000000000e6
-3996 3 27 40 0.65536000000000000000e5
-3996 3 35 48 0.26214400000000000000e6
-3996 3 40 45 -0.13107200000000000000e6
-3996 4 9 35 0.65536000000000000000e5
-3996 4 21 33 -0.65536000000000000000e5
-3996 4 22 34 -0.13107200000000000000e6
-3997 1 2 17 0.32768000000000000000e5
-3997 1 3 18 0.32768000000000000000e5
-3997 1 3 34 0.32768000000000000000e5
-3997 1 4 19 0.65536000000000000000e5
-3997 1 10 17 0.65536000000000000000e5
-3997 1 20 27 -0.13107200000000000000e6
-3997 2 6 12 0.32768000000000000000e5
-3997 2 10 24 0.65536000000000000000e5
-3997 3 3 16 0.32768000000000000000e5
-3997 3 7 20 -0.13107200000000000000e6
-3997 4 10 11 0.65536000000000000000e5
-3998 4 3 15 -0.65536000000000000000e5
-3998 4 10 12 0.65536000000000000000e5
-3999 1 2 17 0.32768000000000000000e5
-3999 1 3 18 0.32768000000000000000e5
-3999 1 3 34 0.16384000000000000000e5
-3999 1 4 19 0.32768000000000000000e5
-3999 1 5 20 0.32768000000000000000e5
-3999 1 5 36 -0.32768000000000000000e5
-3999 1 10 17 0.32768000000000000000e5
-3999 1 12 43 -0.16384000000000000000e5
-3999 1 16 23 -0.16384000000000000000e5
-3999 1 20 27 -0.65536000000000000000e5
-3999 2 6 12 0.16384000000000000000e5
-3999 2 10 24 0.32768000000000000000e5
-3999 3 3 16 0.49152000000000000000e5
-3999 3 4 17 0.16384000000000000000e5
-3999 3 7 12 0.16384000000000000000e5
-3999 3 7 20 0.65536000000000000000e5
-3999 3 8 21 0.13107200000000000000e6
-3999 3 12 21 -0.26214400000000000000e6
-3999 3 14 19 0.13107200000000000000e6
-3999 3 14 27 -0.16384000000000000000e5
-3999 4 1 13 0.16384000000000000000e5
-3999 4 2 14 0.16384000000000000000e5
-3999 4 3 15 0.32768000000000000000e5
-3999 4 10 10 0.65536000000000000000e5
-3999 4 10 13 0.65536000000000000000e5
-3999 4 13 13 0.26214400000000000000e6
-4000 4 10 15 0.65536000000000000000e5
-4000 4 13 13 -0.13107200000000000000e6
-4001 1 1 32 0.65536000000000000000e5
-4001 1 3 34 0.13107200000000000000e6
-4001 1 10 41 -0.65536000000000000000e5
-4001 1 16 23 -0.13107200000000000000e6
-4001 2 1 31 0.65536000000000000000e5
-4001 2 7 21 -0.65536000000000000000e5
-4001 3 3 32 -0.65536000000000000000e5
-4001 4 10 16 0.65536000000000000000e5
-4002 1 2 33 0.65536000000000000000e5
-4002 1 3 34 -0.13107200000000000000e6
-4002 1 11 42 -0.65536000000000000000e5
-4002 1 12 43 -0.13107200000000000000e6
-4002 1 16 47 0.13107200000000000000e6
-4002 1 28 43 0.65536000000000000000e5
-4002 1 32 47 0.65536000000000000000e5
-4002 1 33 48 0.65536000000000000000e5
-4002 2 12 26 0.65536000000000000000e5
-4002 3 2 31 0.65536000000000000000e5
-4002 3 3 32 0.65536000000000000000e5
-4002 3 12 41 0.13107200000000000000e6
-4002 3 13 42 0.13107200000000000000e6
-4002 3 28 41 0.65536000000000000000e5
-4002 3 29 42 0.65536000000000000000e5
-4002 4 3 31 -0.65536000000000000000e5
-4002 4 10 17 0.65536000000000000000e5
-4003 4 8 20 -0.65536000000000000000e5
-4003 4 10 18 0.65536000000000000000e5
-4004 1 2 33 -0.65536000000000000000e5
-4004 1 4 35 -0.13107200000000000000e6
-4004 1 11 42 0.65536000000000000000e5
-4004 1 12 43 0.13107200000000000000e6
-4004 1 17 48 0.13107200000000000000e6
-4004 1 28 43 -0.65536000000000000000e5
-4004 1 32 47 -0.65536000000000000000e5
-4004 1 33 48 -0.65536000000000000000e5
-4004 2 12 26 -0.65536000000000000000e5
-4004 3 4 33 0.65536000000000000000e5
-4004 3 14 27 0.13107200000000000000e6
-4004 3 28 41 -0.65536000000000000000e5
-4004 3 29 42 -0.65536000000000000000e5
-4004 4 3 31 0.65536000000000000000e5
-4004 4 8 20 -0.65536000000000000000e5
-4004 4 10 19 0.65536000000000000000e5
-4005 1 3 18 -0.65536000000000000000e5
-4005 1 3 34 0.65536000000000000000e5
-4005 1 4 19 0.13107200000000000000e6
-4005 1 4 35 0.65536000000000000000e5
-4005 1 12 43 0.13107200000000000000e6
-4005 1 14 45 0.13107200000000000000e6
-4005 1 16 47 -0.65536000000000000000e5
-4005 1 17 48 -0.65536000000000000000e5
-4005 1 18 49 -0.65536000000000000000e5
-4005 1 20 27 -0.26214400000000000000e6
-4005 1 27 34 0.13107200000000000000e6
-4005 2 9 23 0.65536000000000000000e5
-4005 2 10 24 0.13107200000000000000e6
-4005 2 14 28 -0.65536000000000000000e5
-4005 3 1 34 0.65536000000000000000e5
-4005 3 3 16 -0.65536000000000000000e5
-4005 3 4 17 -0.65536000000000000000e5
-4005 3 5 34 0.65536000000000000000e5
-4005 3 12 41 -0.65536000000000000000e5
-4005 3 13 42 -0.65536000000000000000e5
-4005 3 14 27 0.19660800000000000000e6
-4005 3 14 43 -0.65536000000000000000e5
-4005 4 2 14 -0.65536000000000000000e5
-4005 4 10 20 0.65536000000000000000e5
-4006 1 3 18 0.65536000000000000000e5
-4006 1 3 34 0.65536000000000000000e5
-4006 1 4 19 -0.13107200000000000000e6
-4006 1 4 35 0.65536000000000000000e5
-4006 1 12 43 -0.65536000000000000000e5
-4006 1 13 44 0.13107200000000000000e6
-4006 1 16 47 -0.65536000000000000000e5
-4006 1 17 48 -0.65536000000000000000e5
-4006 3 3 16 0.65536000000000000000e5
-4006 3 4 17 0.65536000000000000000e5
-4006 3 12 41 -0.65536000000000000000e5
-4006 3 13 42 -0.65536000000000000000e5
-4006 4 2 14 0.65536000000000000000e5
-4006 4 10 21 0.65536000000000000000e5
-4007 1 4 35 0.65536000000000000000e5
-4007 1 17 48 -0.65536000000000000000e5
-4007 3 5 34 0.65536000000000000000e5
-4007 3 13 42 -0.65536000000000000000e5
-4007 3 14 27 0.65536000000000000000e5
-4007 3 16 29 -0.13107200000000000000e6
-4007 4 10 22 0.65536000000000000000e5
-4008 1 4 35 -0.32768000000000000000e5
-4008 1 12 43 -0.32768000000000000000e5
-4008 1 13 44 -0.65536000000000000000e5
-4008 1 14 45 -0.65536000000000000000e5
-4008 1 17 48 0.32768000000000000000e5
-4008 1 18 49 0.32768000000000000000e5
-4008 1 20 27 0.13107200000000000000e6
-4008 1 27 34 -0.65536000000000000000e5
-4008 2 9 23 -0.32768000000000000000e5
-4008 2 10 24 -0.65536000000000000000e5
-4008 2 14 28 0.32768000000000000000e5
-4008 3 5 34 -0.32768000000000000000e5
-4008 3 7 36 -0.13107200000000000000e6
-4008 3 13 42 0.32768000000000000000e5
-4008 3 14 27 -0.32768000000000000000e5
-4008 3 14 43 0.32768000000000000000e5
-4008 3 16 29 0.65536000000000000000e5
-4008 4 10 23 0.65536000000000000000e5
-4009 4 10 24 0.65536000000000000000e5
-4009 4 11 23 -0.65536000000000000000e5
-4010 2 11 25 -0.65536000000000000000e5
-4010 2 15 29 0.65536000000000000000e5
-4010 4 10 25 0.65536000000000000000e5
-4011 1 9 40 -0.32768000000000000000e5
-4011 1 10 41 0.13107200000000000000e6
-4011 1 11 42 0.65536000000000000000e5
-4011 1 26 41 0.32768000000000000000e5
-4011 1 32 47 -0.13107200000000000000e6
-4011 1 33 48 -0.65536000000000000000e5
-4011 2 12 26 -0.65536000000000000000e5
-4011 2 20 34 0.65536000000000000000e5
-4011 3 8 37 0.32768000000000000000e5
-4011 3 9 38 -0.32768000000000000000e5
-4011 3 12 41 -0.13107200000000000000e6
-4011 3 13 42 -0.13107200000000000000e6
-4011 3 22 27 0.32768000000000000000e5
-4011 3 22 35 0.13107200000000000000e6
-4011 3 28 41 -0.13107200000000000000e6
-4011 3 29 42 -0.65536000000000000000e5
-4011 4 1 29 0.32768000000000000000e5
-4011 4 2 30 -0.32768000000000000000e5
-4011 4 3 31 0.65536000000000000000e5
-4011 4 6 34 0.65536000000000000000e5
-4011 4 10 26 0.65536000000000000000e5
-4012 2 12 26 -0.65536000000000000000e5
-4012 2 20 34 0.65536000000000000000e5
-4012 4 6 34 0.65536000000000000000e5
-4012 4 10 27 0.65536000000000000000e5
-4013 4 3 31 -0.65536000000000000000e5
-4013 4 10 28 0.65536000000000000000e5
-4014 1 13 44 -0.13107200000000000000e6
-4014 1 34 41 0.13107200000000000000e6
-4014 3 12 41 0.65536000000000000000e5
-4014 3 13 42 0.65536000000000000000e5
-4014 3 22 35 0.65536000000000000000e5
-4014 4 10 29 0.65536000000000000000e5
-4015 4 10 30 0.65536000000000000000e5
-4015 4 14 26 -0.65536000000000000000e5
-4016 1 3 18 -0.32768000000000000000e5
-4016 1 4 19 0.65536000000000000000e5
-4016 1 5 36 0.65536000000000000000e5
-4016 1 12 43 0.32768000000000000000e5
-4016 1 14 45 -0.65536000000000000000e5
-4016 1 17 32 -0.13107200000000000000e6
-4016 1 19 50 0.13107200000000000000e6
-4016 1 34 41 -0.65536000000000000000e5
-4016 3 3 16 -0.32768000000000000000e5
-4016 3 4 17 -0.32768000000000000000e5
-4016 3 14 27 0.32768000000000000000e5
-4016 3 15 44 -0.65536000000000000000e5
-4016 3 16 29 0.65536000000000000000e5
-4016 3 16 45 0.13107200000000000000e6
-4016 4 2 14 -0.32768000000000000000e5
-4016 4 10 31 0.65536000000000000000e5
-4016 4 11 23 0.65536000000000000000e5
-4016 4 15 27 -0.65536000000000000000e5
-4017 4 6 34 -0.65536000000000000000e5
-4017 4 10 32 0.65536000000000000000e5
-4018 4 10 33 0.65536000000000000000e5
-4018 4 23 27 -0.65536000000000000000e5
-4019 1 6 53 0.81920000000000000000e4
-4019 1 25 40 -0.81920000000000000000e4
-4019 2 4 34 0.16384000000000000000e5
-4019 2 21 35 -0.16384000000000000000e5
-4019 3 5 50 0.16384000000000000000e5
-4019 3 7 52 0.65536000000000000000e5
-4019 3 18 47 0.65536000000000000000e5
-4019 3 24 37 0.81920000000000000000e4
-4019 3 27 40 0.32768000000000000000e5
-4019 3 28 41 0.32768000000000000000e5
-4019 3 29 42 0.32768000000000000000e5
-4019 3 31 44 -0.13107200000000000000e6
-4019 4 4 32 -0.81920000000000000000e4
-4019 4 7 35 -0.16384000000000000000e5
-4019 4 10 34 0.65536000000000000000e5
-4019 4 16 28 0.81920000000000000000e4
-4019 4 23 27 0.32768000000000000000e5
-4020 1 32 47 0.65536000000000000000e5
-4020 1 37 52 -0.65536000000000000000e5
-4020 3 10 55 -0.65536000000000000000e5
-4020 3 23 52 0.65536000000000000000e5
-4020 3 34 47 -0.13107200000000000000e6
-4020 3 35 48 0.13107200000000000000e6
-4020 3 40 45 -0.65536000000000000000e5
-4020 4 10 35 0.65536000000000000000e5
-4020 4 22 34 -0.65536000000000000000e5
-4021 4 3 15 -0.32768000000000000000e5
-4021 4 11 11 0.65536000000000000000e5
-4022 1 3 18 0.32768000000000000000e5
-4022 1 4 35 -0.65536000000000000000e5
-4022 1 5 20 0.13107200000000000000e6
-4022 1 5 36 -0.13107200000000000000e6
-4022 1 10 17 0.13107200000000000000e6
-4022 1 12 43 -0.98304000000000000000e5
-4022 1 14 45 -0.13107200000000000000e6
-4022 1 17 48 0.65536000000000000000e5
-4022 1 18 49 0.65536000000000000000e5
-4022 2 9 23 -0.65536000000000000000e5
-4022 2 14 28 0.65536000000000000000e5
-4022 3 3 16 0.32768000000000000000e5
-4022 3 4 17 0.32768000000000000000e5
-4022 3 5 34 -0.65536000000000000000e5
-4022 3 6 19 0.65536000000000000000e5
-4022 3 7 20 0.13107200000000000000e6
-4022 3 8 21 -0.26214400000000000000e6
-4022 3 13 42 0.65536000000000000000e5
-4022 3 14 27 -0.98304000000000000000e5
-4022 3 14 43 0.65536000000000000000e5
-4022 4 2 14 0.32768000000000000000e5
-4022 4 3 15 0.65536000000000000000e5
-4022 4 10 14 0.13107200000000000000e6
-4022 4 11 12 0.65536000000000000000e5
-4023 4 10 14 -0.65536000000000000000e5
-4023 4 11 13 0.65536000000000000000e5
-4024 1 6 21 0.65536000000000000000e5
-4024 1 18 33 -0.65536000000000000000e5
-4024 3 7 20 -0.65536000000000000000e5
-4024 3 8 21 0.13107200000000000000e6
-4024 3 14 19 -0.13107200000000000000e6
-4024 4 10 14 -0.65536000000000000000e5
-4024 4 11 14 0.65536000000000000000e5
-4025 1 2 33 0.65536000000000000000e5
-4025 1 3 34 -0.13107200000000000000e6
-4025 1 11 42 -0.65536000000000000000e5
-4025 1 12 43 -0.13107200000000000000e6
-4025 1 16 47 0.13107200000000000000e6
-4025 1 28 43 0.65536000000000000000e5
-4025 1 32 47 0.65536000000000000000e5
-4025 1 33 48 0.65536000000000000000e5
-4025 2 12 26 0.65536000000000000000e5
-4025 3 2 31 0.65536000000000000000e5
-4025 3 3 32 0.65536000000000000000e5
-4025 3 12 41 0.13107200000000000000e6
-4025 3 13 42 0.13107200000000000000e6
-4025 3 28 41 0.65536000000000000000e5
-4025 3 29 42 0.65536000000000000000e5
-4025 4 3 31 -0.65536000000000000000e5
-4025 4 11 16 0.65536000000000000000e5
-4026 4 8 20 -0.65536000000000000000e5
-4026 4 11 17 0.65536000000000000000e5
-4027 1 2 33 -0.65536000000000000000e5
-4027 1 4 35 -0.13107200000000000000e6
-4027 1 11 42 0.65536000000000000000e5
-4027 1 12 43 0.13107200000000000000e6
-4027 1 17 48 0.13107200000000000000e6
-4027 1 28 43 -0.65536000000000000000e5
-4027 1 32 47 -0.65536000000000000000e5
-4027 1 33 48 -0.65536000000000000000e5
-4027 2 12 26 -0.65536000000000000000e5
-4027 3 4 33 0.65536000000000000000e5
-4027 3 14 27 0.13107200000000000000e6
-4027 3 28 41 -0.65536000000000000000e5
-4027 3 29 42 -0.65536000000000000000e5
-4027 4 3 31 0.65536000000000000000e5
-4027 4 8 20 -0.65536000000000000000e5
-4027 4 11 18 0.65536000000000000000e5
-4028 4 9 21 -0.65536000000000000000e5
-4028 4 11 19 0.65536000000000000000e5
-4029 1 3 18 0.65536000000000000000e5
-4029 1 3 34 0.65536000000000000000e5
-4029 1 4 19 -0.13107200000000000000e6
-4029 1 4 35 0.65536000000000000000e5
-4029 1 12 43 -0.65536000000000000000e5
-4029 1 13 44 0.13107200000000000000e6
-4029 1 16 47 -0.65536000000000000000e5
-4029 1 17 48 -0.65536000000000000000e5
-4029 3 3 16 0.65536000000000000000e5
-4029 3 4 17 0.65536000000000000000e5
-4029 3 12 41 -0.65536000000000000000e5
-4029 3 13 42 -0.65536000000000000000e5
-4029 4 2 14 0.65536000000000000000e5
-4029 4 11 20 0.65536000000000000000e5
-4030 1 4 35 0.65536000000000000000e5
-4030 1 17 48 -0.65536000000000000000e5
-4030 3 5 34 0.65536000000000000000e5
-4030 3 13 42 -0.65536000000000000000e5
-4030 3 14 27 0.65536000000000000000e5
-4030 3 16 29 -0.13107200000000000000e6
-4030 4 11 21 0.65536000000000000000e5
-4031 1 4 35 0.65536000000000000000e5
-4031 1 5 36 -0.13107200000000000000e6
-4031 1 14 45 0.13107200000000000000e6
-4031 1 15 30 0.65536000000000000000e5
-4031 1 17 48 -0.65536000000000000000e5
-4031 1 18 49 -0.65536000000000000000e5
-4031 3 5 34 0.65536000000000000000e5
-4031 3 13 42 -0.65536000000000000000e5
-4031 3 14 43 -0.65536000000000000000e5
-4031 4 11 22 0.65536000000000000000e5
-4032 1 5 36 0.65536000000000000000e5
-4032 1 14 45 -0.65536000000000000000e5
-4032 3 16 29 0.65536000000000000000e5
-4032 3 17 30 0.65536000000000000000e5
-4032 3 18 31 -0.13107200000000000000e6
-4032 4 11 24 0.65536000000000000000e5
-4033 1 3 18 -0.16384000000000000000e5
-4033 1 4 19 0.32768000000000000000e5
-4033 1 5 36 0.32768000000000000000e5
-4033 1 12 43 0.16384000000000000000e5
-4033 1 13 44 -0.32768000000000000000e5
-4033 1 14 45 -0.32768000000000000000e5
-4033 1 15 46 -0.65536000000000000000e5
-4033 1 18 33 0.65536000000000000000e5
-4033 3 3 16 -0.16384000000000000000e5
-4033 3 4 17 -0.16384000000000000000e5
-4033 3 14 27 0.16384000000000000000e5
-4033 3 16 29 0.32768000000000000000e5
-4033 3 18 31 0.65536000000000000000e5
-4033 3 19 32 -0.13107200000000000000e6
-4033 4 2 14 -0.16384000000000000000e5
-4033 4 11 23 0.32768000000000000000e5
-4033 4 11 25 0.65536000000000000000e5
-4034 2 12 26 -0.65536000000000000000e5
-4034 2 20 34 0.65536000000000000000e5
-4034 4 6 34 0.65536000000000000000e5
-4034 4 11 26 0.65536000000000000000e5
-4035 4 3 31 -0.65536000000000000000e5
-4035 4 11 27 0.65536000000000000000e5
-4036 1 10 41 -0.65536000000000000000e5
-4036 1 14 45 -0.26214400000000000000e6
-4036 1 17 48 0.13107200000000000000e6
-4036 1 18 49 0.13107200000000000000e6
-4036 1 26 33 0.65536000000000000000e5
-4036 1 32 47 0.65536000000000000000e5
-4036 1 33 40 -0.65536000000000000000e5
-4036 1 34 49 0.13107200000000000000e6
-4036 2 14 28 0.13107200000000000000e6
-4036 3 13 42 0.26214400000000000000e6
-4036 3 14 43 0.13107200000000000000e6
-4036 3 18 47 0.13107200000000000000e6
-4036 3 28 41 0.65536000000000000000e5
-4036 4 3 31 -0.65536000000000000000e5
-4036 4 11 28 0.65536000000000000000e5
-4037 4 11 29 0.65536000000000000000e5
-4037 4 14 26 -0.65536000000000000000e5
-4038 1 14 45 0.26214400000000000000e6
-4038 1 17 48 -0.13107200000000000000e6
-4038 1 18 49 -0.13107200000000000000e6
-4038 1 34 49 -0.13107200000000000000e6
-4038 2 14 28 -0.13107200000000000000e6
-4038 3 14 43 -0.65536000000000000000e5
-4038 3 15 44 0.13107200000000000000e6
-4038 3 16 45 -0.26214400000000000000e6
-4038 3 18 47 -0.13107200000000000000e6
-4038 3 22 35 0.65536000000000000000e5
-4038 4 11 30 0.65536000000000000000e5
-4038 4 14 26 0.65536000000000000000e5
-4038 4 15 27 0.13107200000000000000e6
-4039 4 11 31 0.65536000000000000000e5
-4039 4 15 27 -0.65536000000000000000e5
-4040 4 11 32 0.65536000000000000000e5
-4040 4 23 27 -0.65536000000000000000e5
-4041 1 6 53 0.16384000000000000000e5
-4041 1 25 40 -0.16384000000000000000e5
-4041 2 4 34 0.32768000000000000000e5
-4041 2 21 35 -0.32768000000000000000e5
-4041 3 5 50 0.32768000000000000000e5
-4041 3 14 51 0.13107200000000000000e6
-4041 3 18 47 -0.13107200000000000000e6
-4041 3 24 37 0.16384000000000000000e5
-4041 3 27 40 0.65536000000000000000e5
-4041 3 30 43 -0.65536000000000000000e5
-4041 4 4 32 -0.16384000000000000000e5
-4041 4 7 35 -0.32768000000000000000e5
-4041 4 11 33 0.65536000000000000000e5
-4041 4 16 28 0.16384000000000000000e5
-4041 4 19 31 -0.65536000000000000000e5
-4042 1 6 53 0.81920000000000000000e4
-4042 1 25 40 -0.81920000000000000000e4
-4042 2 4 34 0.16384000000000000000e5
-4042 2 21 35 -0.16384000000000000000e5
-4042 3 5 50 0.16384000000000000000e5
-4042 3 14 51 0.65536000000000000000e5
-4042 3 18 47 0.65536000000000000000e5
-4042 3 19 48 -0.13107200000000000000e6
-4042 3 24 37 0.81920000000000000000e4
-4042 3 27 40 0.32768000000000000000e5
-4042 3 28 41 0.32768000000000000000e5
-4042 3 29 42 0.32768000000000000000e5
-4042 4 4 32 -0.81920000000000000000e4
-4042 4 7 35 -0.16384000000000000000e5
-4042 4 11 34 0.65536000000000000000e5
-4042 4 16 28 0.81920000000000000000e4
-4042 4 23 27 0.32768000000000000000e5
-4043 1 34 49 -0.13107200000000000000e6
-4043 1 44 51 0.13107200000000000000e6
-4043 3 23 52 0.65536000000000000000e5
-4043 3 35 48 0.13107200000000000000e6
-4043 3 40 45 -0.65536000000000000000e5
-4043 4 11 35 0.65536000000000000000e5
-4043 4 22 34 -0.65536000000000000000e5
-4044 1 6 21 0.65536000000000000000e5
-4044 1 18 33 -0.65536000000000000000e5
-4044 3 7 20 -0.65536000000000000000e5
-4044 3 8 21 0.13107200000000000000e6
-4044 3 14 19 -0.13107200000000000000e6
-4044 4 10 14 -0.65536000000000000000e5
-4044 4 12 13 0.65536000000000000000e5
-4045 1 3 18 -0.16384000000000000000e5
-4045 1 4 35 0.16384000000000000000e5
-4045 1 5 20 -0.32768000000000000000e5
-4045 1 5 36 0.32768000000000000000e5
-4045 1 6 21 0.65536000000000000000e5
-4045 1 10 17 -0.32768000000000000000e5
-4045 1 12 43 0.32768000000000000000e5
-4045 1 14 45 0.32768000000000000000e5
-4045 1 17 48 -0.16384000000000000000e5
-4045 1 18 33 -0.65536000000000000000e5
-4045 1 18 49 -0.16384000000000000000e5
-4045 2 9 23 0.16384000000000000000e5
-4045 2 14 28 -0.16384000000000000000e5
-4045 3 3 16 -0.16384000000000000000e5
-4045 3 4 17 -0.16384000000000000000e5
-4045 3 5 34 0.16384000000000000000e5
-4045 3 7 20 -0.65536000000000000000e5
-4045 3 8 21 0.13107200000000000000e6
-4045 3 11 20 0.65536000000000000000e5
-4045 3 13 42 -0.16384000000000000000e5
-4045 3 14 19 0.13107200000000000000e6
-4045 3 14 27 0.32768000000000000000e5
-4045 3 14 43 -0.16384000000000000000e5
-4045 3 15 20 0.13107200000000000000e6
-4045 3 18 19 -0.26214400000000000000e6
-4045 4 2 14 -0.16384000000000000000e5
-4045 4 3 15 -0.32768000000000000000e5
-4045 4 10 14 -0.65536000000000000000e5
-4045 4 12 14 0.65536000000000000000e5
-4045 4 14 14 0.26214400000000000000e6
-4046 4 12 15 0.65536000000000000000e5
-4046 4 14 14 -0.13107200000000000000e6
-4047 4 8 20 -0.65536000000000000000e5
-4047 4 12 16 0.65536000000000000000e5
-4048 1 2 33 -0.65536000000000000000e5
-4048 1 4 35 -0.13107200000000000000e6
-4048 1 11 42 0.65536000000000000000e5
-4048 1 12 43 0.13107200000000000000e6
-4048 1 17 48 0.13107200000000000000e6
-4048 1 28 43 -0.65536000000000000000e5
-4048 1 32 47 -0.65536000000000000000e5
-4048 1 33 48 -0.65536000000000000000e5
-4048 2 12 26 -0.65536000000000000000e5
-4048 3 4 33 0.65536000000000000000e5
-4048 3 14 27 0.13107200000000000000e6
-4048 3 28 41 -0.65536000000000000000e5
-4048 3 29 42 -0.65536000000000000000e5
-4048 4 3 31 0.65536000000000000000e5
-4048 4 8 20 -0.65536000000000000000e5
-4048 4 12 17 0.65536000000000000000e5
-4049 4 9 21 -0.65536000000000000000e5
-4049 4 12 18 0.65536000000000000000e5
-4050 1 2 33 0.65536000000000000000e5
-4050 1 11 42 -0.65536000000000000000e5
-4050 1 12 43 -0.13107200000000000000e6
-4050 1 15 30 -0.13107200000000000000e6
-4050 1 18 49 0.13107200000000000000e6
-4050 1 28 43 0.65536000000000000000e5
-4050 1 32 47 0.65536000000000000000e5
-4050 1 33 48 0.65536000000000000000e5
-4050 2 12 26 0.65536000000000000000e5
-4050 3 3 32 0.65536000000000000000e5
-4050 3 5 34 0.13107200000000000000e6
-4050 3 11 30 0.65536000000000000000e5
-4050 3 13 42 0.13107200000000000000e6
-4050 3 14 27 -0.13107200000000000000e6
-4050 3 14 43 0.13107200000000000000e6
-4050 3 28 41 0.65536000000000000000e5
-4050 3 29 42 0.65536000000000000000e5
-4050 4 3 31 -0.65536000000000000000e5
-4050 4 8 20 0.65536000000000000000e5
-4050 4 9 21 -0.65536000000000000000e5
-4050 4 12 19 0.65536000000000000000e5
-4051 1 4 35 0.65536000000000000000e5
-4051 1 17 48 -0.65536000000000000000e5
-4051 3 5 34 0.65536000000000000000e5
-4051 3 13 42 -0.65536000000000000000e5
-4051 3 14 27 0.65536000000000000000e5
-4051 3 16 29 -0.13107200000000000000e6
-4051 4 12 20 0.65536000000000000000e5
-4052 1 4 35 0.65536000000000000000e5
-4052 1 5 36 -0.13107200000000000000e6
-4052 1 14 45 0.13107200000000000000e6
-4052 1 15 30 0.65536000000000000000e5
-4052 1 17 48 -0.65536000000000000000e5
-4052 1 18 49 -0.65536000000000000000e5
-4052 3 5 34 0.65536000000000000000e5
-4052 3 13 42 -0.65536000000000000000e5
-4052 3 14 43 -0.65536000000000000000e5
-4052 4 12 21 0.65536000000000000000e5
-4053 1 15 30 0.65536000000000000000e5
-4053 1 18 49 -0.65536000000000000000e5
-4053 3 5 34 0.65536000000000000000e5
-4053 3 6 35 0.65536000000000000000e5
-4053 3 14 43 -0.65536000000000000000e5
-4053 3 17 30 -0.13107200000000000000e6
-4053 4 12 22 0.65536000000000000000e5
-4054 1 5 36 0.65536000000000000000e5
-4054 1 14 45 -0.65536000000000000000e5
-4054 3 16 29 0.65536000000000000000e5
-4054 3 17 30 0.65536000000000000000e5
-4054 3 18 31 -0.13107200000000000000e6
-4054 4 12 23 0.65536000000000000000e5
-4055 1 3 18 -0.16384000000000000000e5
-4055 1 4 19 0.32768000000000000000e5
-4055 1 5 36 0.32768000000000000000e5
-4055 1 12 43 0.16384000000000000000e5
-4055 1 13 44 -0.32768000000000000000e5
-4055 1 14 21 -0.26214400000000000000e6
-4055 1 14 45 -0.32768000000000000000e5
-4055 1 15 46 -0.65536000000000000000e5
-4055 1 18 33 0.65536000000000000000e5
-4055 1 21 44 0.26214400000000000000e6
-4055 2 11 25 0.65536000000000000000e5
-4055 2 15 29 -0.65536000000000000000e5
-4055 3 3 16 -0.16384000000000000000e5
-4055 3 4 17 -0.16384000000000000000e5
-4055 3 7 36 0.65536000000000000000e5
-4055 3 8 21 0.13107200000000000000e6
-4055 3 14 27 0.16384000000000000000e5
-4055 3 15 20 -0.13107200000000000000e6
-4055 3 16 29 0.32768000000000000000e5
-4055 3 18 19 0.26214400000000000000e6
-4055 3 18 31 0.13107200000000000000e6
-4055 3 19 32 0.13107200000000000000e6
-4055 3 21 26 0.65536000000000000000e5
-4055 4 2 14 -0.16384000000000000000e5
-4055 4 11 15 0.13107200000000000000e6
-4055 4 11 23 0.32768000000000000000e5
-4055 4 12 25 0.65536000000000000000e5
-4055 4 13 25 0.13107200000000000000e6
-4055 4 14 14 -0.26214400000000000000e6
-4056 4 3 31 -0.65536000000000000000e5
-4056 4 12 26 0.65536000000000000000e5
-4057 1 10 41 -0.65536000000000000000e5
-4057 1 14 45 -0.26214400000000000000e6
-4057 1 17 48 0.13107200000000000000e6
-4057 1 18 49 0.13107200000000000000e6
-4057 1 26 33 0.65536000000000000000e5
-4057 1 32 47 0.65536000000000000000e5
-4057 1 33 40 -0.65536000000000000000e5
-4057 1 34 49 0.13107200000000000000e6
-4057 2 14 28 0.13107200000000000000e6
-4057 3 13 42 0.26214400000000000000e6
-4057 3 14 43 0.13107200000000000000e6
-4057 3 18 47 0.13107200000000000000e6
-4057 3 28 41 0.65536000000000000000e5
-4057 4 3 31 -0.65536000000000000000e5
-4057 4 12 27 0.65536000000000000000e5
-4058 4 12 28 0.65536000000000000000e5
-4058 4 22 22 -0.13107200000000000000e6
-4059 1 14 45 0.26214400000000000000e6
-4059 1 17 48 -0.13107200000000000000e6
-4059 1 18 49 -0.13107200000000000000e6
-4059 1 34 49 -0.13107200000000000000e6
-4059 2 14 28 -0.13107200000000000000e6
-4059 3 14 43 -0.65536000000000000000e5
-4059 3 15 44 0.13107200000000000000e6
-4059 3 16 45 -0.26214400000000000000e6
-4059 3 18 47 -0.13107200000000000000e6
-4059 3 22 35 0.65536000000000000000e5
-4059 4 12 29 0.65536000000000000000e5
-4059 4 14 26 0.65536000000000000000e5
-4059 4 15 27 0.13107200000000000000e6
-4060 1 14 45 0.13107200000000000000e6
-4060 1 17 48 -0.65536000000000000000e5
-4060 1 18 49 -0.65536000000000000000e5
-4060 1 34 49 -0.65536000000000000000e5
-4060 2 14 28 -0.65536000000000000000e5
-4060 3 13 42 -0.65536000000000000000e5
-4060 3 15 44 -0.13107200000000000000e6
-4060 3 18 47 -0.65536000000000000000e5
-4060 3 26 35 0.65536000000000000000e5
-4060 4 12 30 0.65536000000000000000e5
-4061 1 14 45 -0.65536000000000000000e5
-4061 1 15 46 -0.13107200000000000000e6
-4061 1 17 48 0.32768000000000000000e5
-4061 1 18 49 0.32768000000000000000e5
-4061 1 20 51 0.13107200000000000000e6
-4061 1 34 49 0.32768000000000000000e5
-4061 2 14 28 0.32768000000000000000e5
-4061 3 14 43 0.32768000000000000000e5
-4061 3 16 45 0.13107200000000000000e6
-4061 3 18 47 0.32768000000000000000e5
-4061 3 22 35 -0.32768000000000000000e5
-4061 3 30 35 0.65536000000000000000e5
-4061 4 12 31 0.65536000000000000000e5
-4061 4 14 26 -0.32768000000000000000e5
-4061 4 15 27 -0.65536000000000000000e5
-4062 1 6 53 0.16384000000000000000e5
-4062 1 25 40 -0.16384000000000000000e5
-4062 2 4 34 0.32768000000000000000e5
-4062 2 21 35 -0.32768000000000000000e5
-4062 3 5 50 0.32768000000000000000e5
-4062 3 14 51 0.13107200000000000000e6
-4062 3 18 47 -0.13107200000000000000e6
-4062 3 24 37 0.16384000000000000000e5
-4062 3 27 40 0.65536000000000000000e5
-4062 3 30 43 -0.65536000000000000000e5
-4062 4 4 32 -0.16384000000000000000e5
-4062 4 7 35 -0.32768000000000000000e5
-4062 4 12 32 0.65536000000000000000e5
-4062 4 16 28 0.16384000000000000000e5
-4062 4 19 31 -0.65536000000000000000e5
-4063 4 12 33 0.65536000000000000000e5
-4063 4 19 31 -0.65536000000000000000e5
-4064 3 14 51 0.65536000000000000000e5
-4064 3 18 47 0.65536000000000000000e5
-4064 3 32 45 -0.13107200000000000000e6
-4064 3 35 40 0.65536000000000000000e5
-4064 4 12 34 0.65536000000000000000e5
-4065 4 12 35 0.65536000000000000000e5
-4065 4 22 34 -0.65536000000000000000e5
-4066 4 11 15 -0.65536000000000000000e5
-4066 4 13 14 0.65536000000000000000e5
-4067 3 8 21 0.32768000000000000000e5
-4067 3 12 21 0.65536000000000000000e5
-4067 3 15 20 -0.32768000000000000000e5
-4067 3 16 21 -0.13107200000000000000e6
-4067 3 18 19 0.13107200000000000000e6
-4067 4 11 15 0.32768000000000000000e5
-4067 4 13 15 0.65536000000000000000e5
-4067 4 14 14 -0.65536000000000000000e5
-4068 1 3 18 -0.65536000000000000000e5
-4068 1 3 34 0.65536000000000000000e5
-4068 1 4 19 0.13107200000000000000e6
-4068 1 4 35 0.65536000000000000000e5
-4068 1 12 43 0.13107200000000000000e6
-4068 1 14 45 0.13107200000000000000e6
-4068 1 16 47 -0.65536000000000000000e5
-4068 1 17 48 -0.65536000000000000000e5
-4068 1 18 49 -0.65536000000000000000e5
-4068 1 20 27 -0.26214400000000000000e6
-4068 1 27 34 0.13107200000000000000e6
-4068 2 9 23 0.65536000000000000000e5
-4068 2 10 24 0.13107200000000000000e6
-4068 2 14 28 -0.65536000000000000000e5
-4068 3 1 34 0.65536000000000000000e5
-4068 3 3 16 -0.65536000000000000000e5
-4068 3 4 17 -0.65536000000000000000e5
-4068 3 5 34 0.65536000000000000000e5
-4068 3 12 41 -0.65536000000000000000e5
-4068 3 13 42 -0.65536000000000000000e5
-4068 3 14 27 0.19660800000000000000e6
-4068 3 14 43 -0.65536000000000000000e5
-4068 4 2 14 -0.65536000000000000000e5
-4068 4 13 16 0.65536000000000000000e5
-4069 1 3 18 0.65536000000000000000e5
-4069 1 3 34 0.65536000000000000000e5
-4069 1 4 19 -0.13107200000000000000e6
-4069 1 4 35 0.65536000000000000000e5
-4069 1 12 43 -0.65536000000000000000e5
-4069 1 13 44 0.13107200000000000000e6
-4069 1 16 47 -0.65536000000000000000e5
-4069 1 17 48 -0.65536000000000000000e5
-4069 3 3 16 0.65536000000000000000e5
-4069 3 4 17 0.65536000000000000000e5
-4069 3 12 41 -0.65536000000000000000e5
-4069 3 13 42 -0.65536000000000000000e5
-4069 4 2 14 0.65536000000000000000e5
-4069 4 13 17 0.65536000000000000000e5
-4070 1 4 35 0.65536000000000000000e5
-4070 1 17 48 -0.65536000000000000000e5
-4070 3 5 34 0.65536000000000000000e5
-4070 3 13 42 -0.65536000000000000000e5
-4070 3 14 27 0.65536000000000000000e5
-4070 3 16 29 -0.13107200000000000000e6
-4070 4 13 18 0.65536000000000000000e5
-4071 1 4 35 0.65536000000000000000e5
-4071 1 5 36 -0.13107200000000000000e6
-4071 1 14 45 0.13107200000000000000e6
-4071 1 15 30 0.65536000000000000000e5
-4071 1 17 48 -0.65536000000000000000e5
-4071 1 18 49 -0.65536000000000000000e5
-4071 3 5 34 0.65536000000000000000e5
-4071 3 13 42 -0.65536000000000000000e5
-4071 3 14 43 -0.65536000000000000000e5
-4071 4 13 19 0.65536000000000000000e5
-4072 1 4 35 -0.32768000000000000000e5
-4072 1 12 43 -0.32768000000000000000e5
-4072 1 13 44 -0.65536000000000000000e5
-4072 1 14 45 -0.65536000000000000000e5
-4072 1 17 48 0.32768000000000000000e5
-4072 1 18 49 0.32768000000000000000e5
-4072 1 20 27 0.13107200000000000000e6
-4072 1 27 34 -0.65536000000000000000e5
-4072 2 9 23 -0.32768000000000000000e5
-4072 2 10 24 -0.65536000000000000000e5
-4072 2 14 28 0.32768000000000000000e5
-4072 3 5 34 -0.32768000000000000000e5
-4072 3 7 36 -0.13107200000000000000e6
-4072 3 13 42 0.32768000000000000000e5
-4072 3 14 27 -0.32768000000000000000e5
-4072 3 14 43 0.32768000000000000000e5
-4072 3 16 29 0.65536000000000000000e5
-4072 4 13 20 0.65536000000000000000e5
-4073 4 11 23 -0.65536000000000000000e5
-4073 4 13 21 0.65536000000000000000e5
-4074 1 5 36 0.65536000000000000000e5
-4074 1 14 45 -0.65536000000000000000e5
-4074 3 16 29 0.65536000000000000000e5
-4074 3 17 30 0.65536000000000000000e5
-4074 3 18 31 -0.13107200000000000000e6
-4074 4 13 22 0.65536000000000000000e5
-4075 2 11 25 -0.65536000000000000000e5
-4075 2 15 29 0.65536000000000000000e5
-4075 4 13 23 0.65536000000000000000e5
-4076 1 3 18 -0.16384000000000000000e5
-4076 1 4 19 0.32768000000000000000e5
-4076 1 5 36 0.32768000000000000000e5
-4076 1 12 43 0.16384000000000000000e5
-4076 1 13 44 -0.32768000000000000000e5
-4076 1 14 45 -0.32768000000000000000e5
-4076 1 15 46 -0.65536000000000000000e5
-4076 1 18 33 0.65536000000000000000e5
-4076 3 3 16 -0.16384000000000000000e5
-4076 3 4 17 -0.16384000000000000000e5
-4076 3 14 27 0.16384000000000000000e5
-4076 3 16 29 0.32768000000000000000e5
-4076 3 18 31 0.65536000000000000000e5
-4076 3 19 32 -0.13107200000000000000e6
-4076 4 2 14 -0.16384000000000000000e5
-4076 4 11 23 0.32768000000000000000e5
-4076 4 13 24 0.65536000000000000000e5
-4077 1 13 44 -0.13107200000000000000e6
-4077 1 34 41 0.13107200000000000000e6
-4077 3 12 41 0.65536000000000000000e5
-4077 3 13 42 0.65536000000000000000e5
-4077 3 22 35 0.65536000000000000000e5
-4077 4 13 26 0.65536000000000000000e5
-4078 4 13 27 0.65536000000000000000e5
-4078 4 14 26 -0.65536000000000000000e5
-4079 1 14 45 0.26214400000000000000e6
-4079 1 17 48 -0.13107200000000000000e6
-4079 1 18 49 -0.13107200000000000000e6
-4079 1 34 49 -0.13107200000000000000e6
-4079 2 14 28 -0.13107200000000000000e6
-4079 3 14 43 -0.65536000000000000000e5
-4079 3 15 44 0.13107200000000000000e6
-4079 3 16 45 -0.26214400000000000000e6
-4079 3 18 47 -0.13107200000000000000e6
-4079 3 22 35 0.65536000000000000000e5
-4079 4 13 28 0.65536000000000000000e5
-4079 4 14 26 0.65536000000000000000e5
-4079 4 15 27 0.13107200000000000000e6
-4080 1 3 18 -0.32768000000000000000e5
-4080 1 4 19 0.65536000000000000000e5
-4080 1 5 36 0.65536000000000000000e5
-4080 1 12 43 0.32768000000000000000e5
-4080 1 14 45 -0.65536000000000000000e5
-4080 1 17 32 -0.13107200000000000000e6
-4080 1 19 50 0.13107200000000000000e6
-4080 1 34 41 -0.65536000000000000000e5
-4080 3 3 16 -0.32768000000000000000e5
-4080 3 4 17 -0.32768000000000000000e5
-4080 3 14 27 0.32768000000000000000e5
-4080 3 15 44 -0.65536000000000000000e5
-4080 3 16 29 0.65536000000000000000e5
-4080 3 16 45 0.13107200000000000000e6
-4080 4 2 14 -0.32768000000000000000e5
-4080 4 11 23 0.65536000000000000000e5
-4080 4 13 29 0.65536000000000000000e5
-4080 4 15 27 -0.65536000000000000000e5
-4081 4 13 30 0.65536000000000000000e5
-4081 4 15 27 -0.65536000000000000000e5
-4082 1 3 18 0.16384000000000000000e5
-4082 1 4 19 -0.32768000000000000000e5
-4082 1 5 36 -0.32768000000000000000e5
-4082 1 6 21 -0.65536000000000000000e5
-4082 1 12 43 -0.16384000000000000000e5
-4082 1 13 44 0.32768000000000000000e5
-4082 1 14 45 0.32768000000000000000e5
-4082 1 15 46 0.65536000000000000000e5
-4082 2 9 15 -0.65536000000000000000e5
-4082 2 25 31 0.65536000000000000000e5
-4082 3 3 16 0.16384000000000000000e5
-4082 3 4 17 0.16384000000000000000e5
-4082 3 7 20 0.65536000000000000000e5
-4082 3 8 21 -0.13107200000000000000e6
-4082 3 14 19 0.13107200000000000000e6
-4082 3 14 27 -0.16384000000000000000e5
-4082 3 16 29 -0.32768000000000000000e5
-4082 3 18 31 -0.65536000000000000000e5
-4082 3 19 32 0.13107200000000000000e6
-4082 4 2 14 0.16384000000000000000e5
-4082 4 10 14 0.65536000000000000000e5
-4082 4 11 23 -0.32768000000000000000e5
-4082 4 13 31 0.65536000000000000000e5
-4083 1 6 53 0.81920000000000000000e4
-4083 1 25 40 -0.81920000000000000000e4
-4083 2 4 34 0.16384000000000000000e5
-4083 2 21 35 -0.16384000000000000000e5
-4083 3 5 50 0.16384000000000000000e5
-4083 3 7 52 0.65536000000000000000e5
-4083 3 18 47 0.65536000000000000000e5
-4083 3 24 37 0.81920000000000000000e4
-4083 3 27 40 0.32768000000000000000e5
-4083 3 28 41 0.32768000000000000000e5
-4083 3 29 42 0.32768000000000000000e5
-4083 3 31 44 -0.13107200000000000000e6
-4083 4 4 32 -0.81920000000000000000e4
-4083 4 7 35 -0.16384000000000000000e5
-4083 4 13 32 0.65536000000000000000e5
-4083 4 16 28 0.81920000000000000000e4
-4083 4 23 27 0.32768000000000000000e5
-4084 1 6 53 0.81920000000000000000e4
-4084 1 25 40 -0.81920000000000000000e4
-4084 2 4 34 0.16384000000000000000e5
-4084 2 21 35 -0.16384000000000000000e5
-4084 3 5 50 0.16384000000000000000e5
-4084 3 14 51 0.65536000000000000000e5
-4084 3 18 47 0.65536000000000000000e5
-4084 3 19 48 -0.13107200000000000000e6
-4084 3 24 37 0.81920000000000000000e4
-4084 3 27 40 0.32768000000000000000e5
-4084 3 28 41 0.32768000000000000000e5
-4084 3 29 42 0.32768000000000000000e5
-4084 4 4 32 -0.81920000000000000000e4
-4084 4 7 35 -0.16384000000000000000e5
-4084 4 13 33 0.65536000000000000000e5
-4084 4 16 28 0.81920000000000000000e4
-4084 4 23 27 0.32768000000000000000e5
-4085 3 19 48 0.65536000000000000000e5
-4085 3 31 44 0.65536000000000000000e5
-4085 3 32 45 0.65536000000000000000e5
-4085 3 36 41 -0.13107200000000000000e6
-4085 4 13 34 0.65536000000000000000e5
-4086 1 34 49 0.65536000000000000000e5
-4086 1 44 51 -0.65536000000000000000e5
-4086 3 34 47 0.65536000000000000000e5
-4086 3 35 48 0.65536000000000000000e5
-4086 3 41 46 -0.13107200000000000000e6
-4086 4 13 35 0.65536000000000000000e5
-4087 3 8 21 0.32768000000000000000e5
-4087 3 15 20 -0.32768000000000000000e5
-4087 3 15 21 0.65536000000000000000e5
-4087 3 18 19 0.13107200000000000000e6
-4087 3 19 20 -0.13107200000000000000e6
-4087 4 11 15 0.32768000000000000000e5
-4087 4 14 14 -0.65536000000000000000e5
-4087 4 14 15 0.65536000000000000000e5
-4088 1 3 18 0.65536000000000000000e5
-4088 1 3 34 0.65536000000000000000e5
-4088 1 4 19 -0.13107200000000000000e6
-4088 1 4 35 0.65536000000000000000e5
-4088 1 12 43 -0.65536000000000000000e5
-4088 1 13 44 0.13107200000000000000e6
-4088 1 16 47 -0.65536000000000000000e5
-4088 1 17 48 -0.65536000000000000000e5
-4088 3 3 16 0.65536000000000000000e5
-4088 3 4 17 0.65536000000000000000e5
-4088 3 12 41 -0.65536000000000000000e5
-4088 3 13 42 -0.65536000000000000000e5
-4088 4 2 14 0.65536000000000000000e5
-4088 4 14 16 0.65536000000000000000e5
-4089 1 4 35 0.65536000000000000000e5
-4089 1 17 48 -0.65536000000000000000e5
-4089 3 5 34 0.65536000000000000000e5
-4089 3 13 42 -0.65536000000000000000e5
-4089 3 14 27 0.65536000000000000000e5
-4089 3 16 29 -0.13107200000000000000e6
-4089 4 14 17 0.65536000000000000000e5
-4090 1 4 35 0.65536000000000000000e5
-4090 1 5 36 -0.13107200000000000000e6
-4090 1 14 45 0.13107200000000000000e6
-4090 1 15 30 0.65536000000000000000e5
-4090 1 17 48 -0.65536000000000000000e5
-4090 1 18 49 -0.65536000000000000000e5
-4090 3 5 34 0.65536000000000000000e5
-4090 3 13 42 -0.65536000000000000000e5
-4090 3 14 43 -0.65536000000000000000e5
-4090 4 14 18 0.65536000000000000000e5
-4091 1 15 30 0.65536000000000000000e5
-4091 1 18 49 -0.65536000000000000000e5
-4091 3 5 34 0.65536000000000000000e5
-4091 3 6 35 0.65536000000000000000e5
-4091 3 14 43 -0.65536000000000000000e5
-4091 3 17 30 -0.13107200000000000000e6
-4091 4 14 19 0.65536000000000000000e5
-4092 4 11 23 -0.65536000000000000000e5
-4092 4 14 20 0.65536000000000000000e5
-4093 1 5 36 0.65536000000000000000e5
-4093 1 14 45 -0.65536000000000000000e5
-4093 3 16 29 0.65536000000000000000e5
-4093 3 17 30 0.65536000000000000000e5
-4093 3 18 31 -0.13107200000000000000e6
-4093 4 14 21 0.65536000000000000000e5
-4094 4 12 24 -0.65536000000000000000e5
-4094 4 14 22 0.65536000000000000000e5
-4095 1 3 18 -0.16384000000000000000e5
-4095 1 4 19 0.32768000000000000000e5
-4095 1 5 36 0.32768000000000000000e5
-4095 1 12 43 0.16384000000000000000e5
-4095 1 13 44 -0.32768000000000000000e5
-4095 1 14 45 -0.32768000000000000000e5
-4095 1 15 46 -0.65536000000000000000e5
-4095 1 18 33 0.65536000000000000000e5
-4095 3 3 16 -0.16384000000000000000e5
-4095 3 4 17 -0.16384000000000000000e5
-4095 3 14 27 0.16384000000000000000e5
-4095 3 16 29 0.32768000000000000000e5
-4095 3 18 31 0.65536000000000000000e5
-4095 3 19 32 -0.13107200000000000000e6
-4095 4 2 14 -0.16384000000000000000e5
-4095 4 11 23 0.32768000000000000000e5
-4095 4 14 23 0.65536000000000000000e5
-4096 1 3 18 -0.16384000000000000000e5
-4096 1 4 19 0.32768000000000000000e5
-4096 1 5 36 0.32768000000000000000e5
-4096 1 12 43 0.16384000000000000000e5
-4096 1 13 44 -0.32768000000000000000e5
-4096 1 14 21 -0.26214400000000000000e6
-4096 1 14 45 -0.32768000000000000000e5
-4096 1 15 46 -0.65536000000000000000e5
-4096 1 18 33 0.65536000000000000000e5
-4096 1 21 44 0.26214400000000000000e6
-4096 2 11 25 0.65536000000000000000e5
-4096 2 15 29 -0.65536000000000000000e5
-4096 3 3 16 -0.16384000000000000000e5
-4096 3 4 17 -0.16384000000000000000e5
-4096 3 7 36 0.65536000000000000000e5
-4096 3 8 21 0.13107200000000000000e6
-4096 3 14 27 0.16384000000000000000e5
-4096 3 15 20 -0.13107200000000000000e6
-4096 3 16 29 0.32768000000000000000e5
-4096 3 18 19 0.26214400000000000000e6
-4096 3 18 31 0.13107200000000000000e6
-4096 3 19 32 0.13107200000000000000e6
-4096 3 21 26 0.65536000000000000000e5
-4096 4 2 14 -0.16384000000000000000e5
-4096 4 11 15 0.13107200000000000000e6
-4096 4 11 23 0.32768000000000000000e5
-4096 4 13 25 0.13107200000000000000e6
-4096 4 14 14 -0.26214400000000000000e6
-4096 4 14 24 0.65536000000000000000e5
-4097 1 3 18 0.81920000000000000000e4
-4097 1 4 19 -0.16384000000000000000e5
-4097 1 5 36 -0.16384000000000000000e5
-4097 1 6 21 0.32768000000000000000e5
-4097 1 12 43 -0.81920000000000000000e4
-4097 1 13 44 0.16384000000000000000e5
-4097 1 14 21 0.13107200000000000000e6
-4097 1 14 45 0.16384000000000000000e5
-4097 1 17 32 0.32768000000000000000e5
-4097 1 19 50 -0.32768000000000000000e5
-4097 1 20 35 -0.13107200000000000000e6
-4097 1 20 51 -0.32768000000000000000e5
-4097 1 21 44 -0.13107200000000000000e6
-4097 1 21 52 0.13107200000000000000e6
-4097 2 9 15 0.32768000000000000000e5
-4097 2 11 25 -0.32768000000000000000e5
-4097 2 15 29 0.32768000000000000000e5
-4097 2 25 31 -0.32768000000000000000e5
-4097 3 3 16 0.81920000000000000000e4
-4097 3 4 17 0.81920000000000000000e4
-4097 3 7 20 -0.32768000000000000000e5
-4097 3 7 36 -0.32768000000000000000e5
-4097 3 14 19 -0.65536000000000000000e5
-4097 3 14 27 -0.81920000000000000000e4
-4097 3 15 20 0.65536000000000000000e5
-4097 3 16 29 -0.16384000000000000000e5
-4097 3 16 45 0.32768000000000000000e5
-4097 3 17 46 0.65536000000000000000e5
-4097 3 18 19 -0.13107200000000000000e6
-4097 3 19 32 -0.65536000000000000000e5
-4097 3 20 33 0.65536000000000000000e5
-4097 3 20 45 0.65536000000000000000e5
-4097 4 2 14 0.81920000000000000000e4
-4097 4 10 14 -0.32768000000000000000e5
-4097 4 11 15 -0.65536000000000000000e5
-4097 4 11 23 -0.16384000000000000000e5
-4097 4 13 25 -0.65536000000000000000e5
-4097 4 14 14 0.13107200000000000000e6
-4097 4 14 25 0.65536000000000000000e5
-4097 4 25 25 0.13107200000000000000e6
-4098 1 14 45 0.26214400000000000000e6
-4098 1 17 48 -0.13107200000000000000e6
-4098 1 18 49 -0.13107200000000000000e6
-4098 1 34 49 -0.13107200000000000000e6
-4098 2 14 28 -0.13107200000000000000e6
-4098 3 14 43 -0.65536000000000000000e5
-4098 3 15 44 0.13107200000000000000e6
-4098 3 16 45 -0.26214400000000000000e6
-4098 3 18 47 -0.13107200000000000000e6
-4098 3 22 35 0.65536000000000000000e5
-4098 4 14 26 0.65536000000000000000e5
-4098 4 14 27 0.65536000000000000000e5
-4098 4 15 27 0.13107200000000000000e6
-4099 1 14 45 0.13107200000000000000e6
-4099 1 17 48 -0.65536000000000000000e5
-4099 1 18 49 -0.65536000000000000000e5
-4099 1 34 49 -0.65536000000000000000e5
-4099 2 14 28 -0.65536000000000000000e5
-4099 3 13 42 -0.65536000000000000000e5
-4099 3 15 44 -0.13107200000000000000e6
-4099 3 18 47 -0.65536000000000000000e5
-4099 3 26 35 0.65536000000000000000e5
-4099 4 14 28 0.65536000000000000000e5
-4100 4 14 29 0.65536000000000000000e5
-4100 4 15 27 -0.65536000000000000000e5
-4101 1 14 45 -0.65536000000000000000e5
-4101 1 15 46 -0.13107200000000000000e6
-4101 1 17 48 0.32768000000000000000e5
-4101 1 18 49 0.32768000000000000000e5
-4101 1 20 51 0.13107200000000000000e6
-4101 1 34 49 0.32768000000000000000e5
-4101 2 14 28 0.32768000000000000000e5
-4101 3 14 43 0.32768000000000000000e5
-4101 3 16 45 0.13107200000000000000e6
-4101 3 18 47 0.32768000000000000000e5
-4101 3 22 35 -0.32768000000000000000e5
-4101 3 30 35 0.65536000000000000000e5
-4101 4 14 26 -0.32768000000000000000e5
-4101 4 14 30 0.65536000000000000000e5
-4101 4 15 27 -0.65536000000000000000e5
-4102 1 15 46 0.65536000000000000000e5
-4102 1 20 51 -0.65536000000000000000e5
-4102 3 15 46 0.65536000000000000000e5
-4102 3 16 45 0.65536000000000000000e5
-4102 3 17 46 -0.13107200000000000000e6
-4102 4 14 31 0.65536000000000000000e5
-4103 1 6 53 0.81920000000000000000e4
-4103 1 25 40 -0.81920000000000000000e4
-4103 2 4 34 0.16384000000000000000e5
-4103 2 21 35 -0.16384000000000000000e5
-4103 3 5 50 0.16384000000000000000e5
-4103 3 14 51 0.65536000000000000000e5
-4103 3 18 47 0.65536000000000000000e5
-4103 3 19 48 -0.13107200000000000000e6
-4103 3 24 37 0.81920000000000000000e4
-4103 3 27 40 0.32768000000000000000e5
-4103 3 28 41 0.32768000000000000000e5
-4103 3 29 42 0.32768000000000000000e5
-4103 4 4 32 -0.81920000000000000000e4
-4103 4 7 35 -0.16384000000000000000e5
-4103 4 14 32 0.65536000000000000000e5
-4103 4 16 28 0.81920000000000000000e4
-4103 4 23 27 0.32768000000000000000e5
-4104 3 14 51 0.65536000000000000000e5
-4104 3 18 47 0.65536000000000000000e5
-4104 3 32 45 -0.13107200000000000000e6
-4104 3 35 40 0.65536000000000000000e5
-4104 4 14 33 0.65536000000000000000e5
-4105 1 20 51 -0.13107200000000000000e6
-4105 1 36 51 0.13107200000000000000e6
-4105 3 19 48 0.65536000000000000000e5
-4105 3 20 49 0.65536000000000000000e5
-4105 3 32 45 0.65536000000000000000e5
-4105 4 14 34 0.65536000000000000000e5
-4106 4 14 35 0.65536000000000000000e5
-4106 4 25 33 -0.65536000000000000000e5
-4107 1 4 35 -0.32768000000000000000e5
-4107 1 12 43 -0.32768000000000000000e5
-4107 1 13 44 -0.65536000000000000000e5
-4107 1 14 45 -0.65536000000000000000e5
-4107 1 17 48 0.32768000000000000000e5
-4107 1 18 49 0.32768000000000000000e5
-4107 1 20 27 0.13107200000000000000e6
-4107 1 27 34 -0.65536000000000000000e5
-4107 2 9 23 -0.32768000000000000000e5
-4107 2 10 24 -0.65536000000000000000e5
-4107 2 14 28 0.32768000000000000000e5
-4107 3 5 34 -0.32768000000000000000e5
-4107 3 7 36 -0.13107200000000000000e6
-4107 3 13 42 0.32768000000000000000e5
-4107 3 14 27 -0.32768000000000000000e5
-4107 3 14 43 0.32768000000000000000e5
-4107 3 16 29 0.65536000000000000000e5
-4107 4 15 16 0.65536000000000000000e5
-4108 4 11 23 -0.65536000000000000000e5
-4108 4 15 17 0.65536000000000000000e5
-4109 1 5 36 0.65536000000000000000e5
-4109 1 14 45 -0.65536000000000000000e5
-4109 3 16 29 0.65536000000000000000e5
-4109 3 17 30 0.65536000000000000000e5
-4109 3 18 31 -0.13107200000000000000e6
-4109 4 15 18 0.65536000000000000000e5
-4110 4 12 24 -0.65536000000000000000e5
-4110 4 15 19 0.65536000000000000000e5
-4111 2 11 25 -0.65536000000000000000e5
-4111 2 15 29 0.65536000000000000000e5
-4111 4 15 20 0.65536000000000000000e5
-4112 1 3 18 -0.16384000000000000000e5
-4112 1 4 19 0.32768000000000000000e5
-4112 1 5 36 0.32768000000000000000e5
-4112 1 12 43 0.16384000000000000000e5
-4112 1 13 44 -0.32768000000000000000e5
-4112 1 14 45 -0.32768000000000000000e5
-4112 1 15 46 -0.65536000000000000000e5
-4112 1 18 33 0.65536000000000000000e5
-4112 3 3 16 -0.16384000000000000000e5
-4112 3 4 17 -0.16384000000000000000e5
-4112 3 14 27 0.16384000000000000000e5
-4112 3 16 29 0.32768000000000000000e5
-4112 3 18 31 0.65536000000000000000e5
-4112 3 19 32 -0.13107200000000000000e6
-4112 4 2 14 -0.16384000000000000000e5
-4112 4 11 23 0.32768000000000000000e5
-4112 4 15 21 0.65536000000000000000e5
-4113 1 3 18 -0.16384000000000000000e5
-4113 1 4 19 0.32768000000000000000e5
-4113 1 5 36 0.32768000000000000000e5
-4113 1 12 43 0.16384000000000000000e5
-4113 1 13 44 -0.32768000000000000000e5
-4113 1 14 21 -0.26214400000000000000e6
-4113 1 14 45 -0.32768000000000000000e5
-4113 1 15 46 -0.65536000000000000000e5
-4113 1 18 33 0.65536000000000000000e5
-4113 1 21 44 0.26214400000000000000e6
-4113 2 11 25 0.65536000000000000000e5
-4113 2 15 29 -0.65536000000000000000e5
-4113 3 3 16 -0.16384000000000000000e5
-4113 3 4 17 -0.16384000000000000000e5
-4113 3 7 36 0.65536000000000000000e5
-4113 3 8 21 0.13107200000000000000e6
-4113 3 14 27 0.16384000000000000000e5
-4113 3 15 20 -0.13107200000000000000e6
-4113 3 16 29 0.32768000000000000000e5
-4113 3 18 19 0.26214400000000000000e6
-4113 3 18 31 0.13107200000000000000e6
-4113 3 19 32 0.13107200000000000000e6
-4113 3 21 26 0.65536000000000000000e5
-4113 4 2 14 -0.16384000000000000000e5
-4113 4 11 15 0.13107200000000000000e6
-4113 4 11 23 0.32768000000000000000e5
-4113 4 13 25 0.13107200000000000000e6
-4113 4 14 14 -0.26214400000000000000e6
-4113 4 15 22 0.65536000000000000000e5
-4114 4 13 25 -0.65536000000000000000e5
-4114 4 15 23 0.65536000000000000000e5
-4115 1 3 18 0.81920000000000000000e4
-4115 1 4 19 -0.16384000000000000000e5
-4115 1 5 36 -0.16384000000000000000e5
-4115 1 6 21 0.32768000000000000000e5
-4115 1 12 43 -0.81920000000000000000e4
-4115 1 13 44 0.16384000000000000000e5
-4115 1 14 21 0.13107200000000000000e6
-4115 1 14 45 0.16384000000000000000e5
-4115 1 17 32 0.32768000000000000000e5
-4115 1 19 50 -0.32768000000000000000e5
-4115 1 20 35 -0.13107200000000000000e6
-4115 1 20 51 -0.32768000000000000000e5
-4115 1 21 44 -0.13107200000000000000e6
-4115 1 21 52 0.13107200000000000000e6
-4115 2 9 15 0.32768000000000000000e5
-4115 2 11 25 -0.32768000000000000000e5
-4115 2 15 29 0.32768000000000000000e5
-4115 2 25 31 -0.32768000000000000000e5
-4115 3 3 16 0.81920000000000000000e4
-4115 3 4 17 0.81920000000000000000e4
-4115 3 7 20 -0.32768000000000000000e5
-4115 3 7 36 -0.32768000000000000000e5
-4115 3 14 19 -0.65536000000000000000e5
-4115 3 14 27 -0.81920000000000000000e4
-4115 3 15 20 0.65536000000000000000e5
-4115 3 16 29 -0.16384000000000000000e5
-4115 3 16 45 0.32768000000000000000e5
-4115 3 17 46 0.65536000000000000000e5
-4115 3 18 19 -0.13107200000000000000e6
-4115 3 19 32 -0.65536000000000000000e5
-4115 3 20 33 0.65536000000000000000e5
-4115 3 20 45 0.65536000000000000000e5
-4115 4 2 14 0.81920000000000000000e4
-4115 4 10 14 -0.32768000000000000000e5
-4115 4 11 15 -0.65536000000000000000e5
-4115 4 11 23 -0.16384000000000000000e5
-4115 4 13 25 -0.65536000000000000000e5
-4115 4 14 14 0.13107200000000000000e6
-4115 4 15 24 0.65536000000000000000e5
-4115 4 25 25 0.13107200000000000000e6
-4116 1 6 21 -0.16384000000000000000e5
-4116 1 14 21 0.65536000000000000000e5
-4116 1 17 32 -0.16384000000000000000e5
-4116 1 19 50 0.16384000000000000000e5
-4116 1 20 35 0.65536000000000000000e5
-4116 1 20 51 0.16384000000000000000e5
-4116 1 21 44 -0.65536000000000000000e5
-4116 1 21 52 -0.65536000000000000000e5
-4116 2 9 15 -0.16384000000000000000e5
-4116 2 25 31 0.16384000000000000000e5
-4116 3 7 20 0.16384000000000000000e5
-4116 3 8 21 -0.65536000000000000000e5
-4116 3 14 19 0.32768000000000000000e5
-4116 3 15 20 0.32768000000000000000e5
-4116 3 16 45 -0.16384000000000000000e5
-4116 3 17 46 -0.32768000000000000000e5
-4116 3 18 19 -0.65536000000000000000e5
-4116 3 18 31 -0.16384000000000000000e5
-4116 3 19 32 0.32768000000000000000e5
-4116 3 20 35 0.65536000000000000000e5
-4116 3 20 45 -0.32768000000000000000e5
-4116 3 21 34 -0.13107200000000000000e6
-4116 4 10 14 0.16384000000000000000e5
-4116 4 11 15 -0.32768000000000000000e5
-4116 4 14 14 0.65536000000000000000e5
-4116 4 15 25 0.65536000000000000000e5
-4116 4 25 25 -0.65536000000000000000e5
-4117 1 3 18 -0.32768000000000000000e5
-4117 1 4 19 0.65536000000000000000e5
-4117 1 5 36 0.65536000000000000000e5
-4117 1 12 43 0.32768000000000000000e5
-4117 1 14 45 -0.65536000000000000000e5
-4117 1 17 32 -0.13107200000000000000e6
-4117 1 19 50 0.13107200000000000000e6
-4117 1 34 41 -0.65536000000000000000e5
-4117 3 3 16 -0.32768000000000000000e5
-4117 3 4 17 -0.32768000000000000000e5
-4117 3 14 27 0.32768000000000000000e5
-4117 3 15 44 -0.65536000000000000000e5
-4117 3 16 29 0.65536000000000000000e5
-4117 3 16 45 0.13107200000000000000e6
-4117 4 2 14 -0.32768000000000000000e5
-4117 4 11 23 0.65536000000000000000e5
-4117 4 15 26 0.65536000000000000000e5
-4117 4 15 27 -0.65536000000000000000e5
-4118 1 14 45 -0.65536000000000000000e5
-4118 1 15 46 -0.13107200000000000000e6
-4118 1 17 48 0.32768000000000000000e5
-4118 1 18 49 0.32768000000000000000e5
-4118 1 20 51 0.13107200000000000000e6
-4118 1 34 49 0.32768000000000000000e5
-4118 2 14 28 0.32768000000000000000e5
-4118 3 14 43 0.32768000000000000000e5
-4118 3 16 45 0.13107200000000000000e6
-4118 3 18 47 0.32768000000000000000e5
-4118 3 22 35 -0.32768000000000000000e5
-4118 3 30 35 0.65536000000000000000e5
-4118 4 14 26 -0.32768000000000000000e5
-4118 4 15 27 -0.65536000000000000000e5
-4118 4 15 28 0.65536000000000000000e5
-4119 1 3 18 0.16384000000000000000e5
-4119 1 4 19 -0.32768000000000000000e5
-4119 1 5 36 -0.32768000000000000000e5
-4119 1 6 21 -0.65536000000000000000e5
-4119 1 12 43 -0.16384000000000000000e5
-4119 1 13 44 0.32768000000000000000e5
-4119 1 14 45 0.32768000000000000000e5
-4119 1 15 46 0.65536000000000000000e5
-4119 2 9 15 -0.65536000000000000000e5
-4119 2 25 31 0.65536000000000000000e5
-4119 3 3 16 0.16384000000000000000e5
-4119 3 4 17 0.16384000000000000000e5
-4119 3 7 20 0.65536000000000000000e5
-4119 3 8 21 -0.13107200000000000000e6
-4119 3 14 19 0.13107200000000000000e6
-4119 3 14 27 -0.16384000000000000000e5
-4119 3 16 29 -0.32768000000000000000e5
-4119 3 18 31 -0.65536000000000000000e5
-4119 3 19 32 0.13107200000000000000e6
-4119 4 2 14 0.16384000000000000000e5
-4119 4 10 14 0.65536000000000000000e5
-4119 4 11 23 -0.32768000000000000000e5
-4119 4 15 29 0.65536000000000000000e5
-4120 1 15 46 0.65536000000000000000e5
-4120 1 20 51 -0.65536000000000000000e5
-4120 3 15 46 0.65536000000000000000e5
-4120 3 16 45 0.65536000000000000000e5
-4120 3 17 46 -0.13107200000000000000e6
-4120 4 15 30 0.65536000000000000000e5
-4121 4 15 31 0.65536000000000000000e5
-4121 4 25 25 -0.13107200000000000000e6
-4122 3 19 48 0.65536000000000000000e5
-4122 3 31 44 0.65536000000000000000e5
-4122 3 32 45 0.65536000000000000000e5
-4122 3 36 41 -0.13107200000000000000e6
-4122 4 15 32 0.65536000000000000000e5
-4123 1 20 51 -0.13107200000000000000e6
-4123 1 36 51 0.13107200000000000000e6
-4123 3 19 48 0.65536000000000000000e5
-4123 3 20 49 0.65536000000000000000e5
-4123 3 32 45 0.65536000000000000000e5
-4123 4 15 33 0.65536000000000000000e5
-4124 1 20 51 0.65536000000000000000e5
-4124 1 36 51 -0.65536000000000000000e5
-4124 3 21 50 -0.13107200000000000000e6
-4124 3 33 46 0.65536000000000000000e5
-4124 3 36 41 0.65536000000000000000e5
-4124 4 15 34 0.65536000000000000000e5
-4125 1 1 40 0.65536000000000000000e5
-4125 1 23 38 -0.65536000000000000000e5
-4125 3 1 38 0.65536000000000000000e5
-4125 3 2 39 0.65536000000000000000e5
-4125 3 8 37 -0.13107200000000000000e6
-4125 4 16 17 0.65536000000000000000e5
-4126 1 1 40 0.65536000000000000000e5
-4126 1 6 37 0.65536000000000000000e5
-4126 1 9 40 0.13107200000000000000e6
-4126 1 10 41 -0.26214400000000000000e6
-4126 1 23 38 -0.65536000000000000000e5
-4126 1 24 39 -0.65536000000000000000e5
-4126 1 26 41 -0.13107200000000000000e6
-4126 1 32 47 0.26214400000000000000e6
-4126 3 2 39 0.65536000000000000000e5
-4126 3 9 38 0.13107200000000000000e6
-4126 3 28 41 0.26214400000000000000e6
-4126 4 2 30 0.13107200000000000000e6
-4126 4 16 18 0.65536000000000000000e5
-4127 1 6 37 0.65536000000000000000e5
-4127 1 24 39 -0.65536000000000000000e5
-4127 3 2 39 0.65536000000000000000e5
-4127 3 3 40 0.65536000000000000000e5
-4127 3 9 38 -0.13107200000000000000e6
-4127 4 16 19 0.65536000000000000000e5
-4128 4 1 29 -0.65536000000000000000e5
-4128 4 16 20 0.65536000000000000000e5
-4129 1 9 40 -0.65536000000000000000e5
-4129 1 10 41 0.13107200000000000000e6
-4129 1 11 42 -0.13107200000000000000e6
-4129 1 26 41 0.65536000000000000000e5
-4129 1 32 47 -0.13107200000000000000e6
-4129 1 33 48 0.13107200000000000000e6
-4129 2 12 26 0.13107200000000000000e6
-4129 2 20 34 -0.13107200000000000000e6
-4129 3 8 37 0.65536000000000000000e5
-4129 3 13 42 0.26214400000000000000e6
-4129 3 22 35 -0.26214400000000000000e6
-4129 3 28 41 -0.13107200000000000000e6
-4129 3 29 42 0.13107200000000000000e6
-4129 4 2 30 -0.65536000000000000000e5
-4129 4 3 31 -0.13107200000000000000e6
-4129 4 6 34 -0.13107200000000000000e6
-4129 4 16 21 0.65536000000000000000e5
-4130 4 2 30 -0.65536000000000000000e5
-4130 4 16 22 0.65536000000000000000e5
-4131 1 9 40 -0.32768000000000000000e5
-4131 1 10 41 0.13107200000000000000e6
-4131 1 11 42 0.65536000000000000000e5
-4131 1 26 41 0.32768000000000000000e5
-4131 1 32 47 -0.13107200000000000000e6
-4131 1 33 48 -0.65536000000000000000e5
-4131 2 12 26 -0.65536000000000000000e5
-4131 2 20 34 0.65536000000000000000e5
-4131 3 8 37 0.32768000000000000000e5
-4131 3 9 38 -0.32768000000000000000e5
-4131 3 12 41 -0.13107200000000000000e6
-4131 3 13 42 -0.13107200000000000000e6
-4131 3 22 27 0.32768000000000000000e5
-4131 3 22 35 0.13107200000000000000e6
-4131 3 28 41 -0.13107200000000000000e6
-4131 3 29 42 -0.65536000000000000000e5
-4131 4 1 29 0.32768000000000000000e5
-4131 4 2 30 -0.32768000000000000000e5
-4131 4 3 31 0.65536000000000000000e5
-4131 4 6 34 0.65536000000000000000e5
-4131 4 16 23 0.65536000000000000000e5
-4132 2 12 26 -0.65536000000000000000e5
-4132 2 20 34 0.65536000000000000000e5
-4132 4 6 34 0.65536000000000000000e5
-4132 4 16 24 0.65536000000000000000e5
-4133 1 13 44 -0.13107200000000000000e6
-4133 1 34 41 0.13107200000000000000e6
-4133 3 12 41 0.65536000000000000000e5
-4133 3 13 42 0.65536000000000000000e5
-4133 3 22 35 0.65536000000000000000e5
-4133 4 16 25 0.65536000000000000000e5
-4134 2 1 35 0.65536000000000000000e5
-4134 2 2 32 -0.65536000000000000000e5
-4134 4 16 26 0.65536000000000000000e5
-4135 1 6 53 0.13107200000000000000e6
-4135 1 25 40 -0.13107200000000000000e6
-4135 3 2 47 0.65536000000000000000e5
-4135 3 24 37 0.13107200000000000000e6
-4135 3 25 38 -0.65536000000000000000e5
-4135 3 27 40 0.39321600000000000000e6
-4135 3 28 41 -0.26214400000000000000e6
-4135 4 4 32 -0.13107200000000000000e6
-4135 4 16 27 0.65536000000000000000e5
-4135 4 16 28 0.65536000000000000000e5
-4135 4 17 29 0.13107200000000000000e6
-4136 2 16 30 -0.65536000000000000000e5
-4136 2 16 34 0.65536000000000000000e5
-4136 4 16 29 0.65536000000000000000e5
-4137 4 16 30 0.65536000000000000000e5
-4137 4 17 29 -0.65536000000000000000e5
-4138 4 6 34 -0.65536000000000000000e5
-4138 4 16 31 0.65536000000000000000e5
-4139 1 2 49 0.65536000000000000000e5
-4139 1 6 53 -0.13107200000000000000e6
-4139 1 8 39 -0.13107200000000000000e6
-4139 1 9 40 -0.13107200000000000000e6
-4139 1 10 41 0.26214400000000000000e6
-4139 1 23 38 0.65536000000000000000e5
-4139 1 24 39 0.65536000000000000000e5
-4139 1 25 40 0.13107200000000000000e6
-4139 1 26 41 0.13107200000000000000e6
-4139 1 32 47 -0.26214400000000000000e6
-4139 2 26 32 0.65536000000000000000e5
-4139 3 2 47 -0.65536000000000000000e5
-4139 3 9 38 -0.13107200000000000000e6
-4139 3 24 37 -0.13107200000000000000e6
-4139 3 25 38 0.65536000000000000000e5
-4139 3 27 40 -0.39321600000000000000e6
-4139 4 2 30 -0.13107200000000000000e6
-4139 4 4 32 0.13107200000000000000e6
-4139 4 16 28 -0.65536000000000000000e5
-4139 4 16 32 0.65536000000000000000e5
-4139 4 17 29 -0.13107200000000000000e6
-4140 1 1 48 -0.65536000000000000000e5
-4140 1 2 49 -0.65536000000000000000e5
-4140 1 6 53 -0.13107200000000000000e6
-4140 1 8 39 -0.26214400000000000000e6
-4140 1 9 40 -0.26214400000000000000e6
-4140 1 10 41 0.52428800000000000000e6
-4140 1 12 43 0.52428800000000000000e6
-4140 1 22 53 0.65536000000000000000e5
-4140 1 23 38 -0.65536000000000000000e5
-4140 1 24 55 0.13107200000000000000e6
-4140 1 25 40 0.13107200000000000000e6
-4140 1 26 41 0.13107200000000000000e6
-4140 1 28 43 -0.26214400000000000000e6
-4140 1 32 47 -0.52428800000000000000e6
-4140 1 37 52 -0.26214400000000000000e6
-4140 1 40 47 -0.65536000000000000000e5
-4140 2 2 32 -0.65536000000000000000e5
-4140 2 3 33 -0.65536000000000000000e5
-4140 2 16 30 -0.13107200000000000000e6
-4140 2 20 34 -0.26214400000000000000e6
-4140 2 26 32 0.65536000000000000000e5
-4140 3 9 38 -0.26214400000000000000e6
-4140 3 22 35 -0.52428800000000000000e6
-4140 3 22 51 -0.26214400000000000000e6
-4140 3 24 37 -0.13107200000000000000e6
-4140 3 27 40 -0.26214400000000000000e6
-4140 3 28 41 -0.52428800000000000000e6
-4140 4 2 30 -0.26214400000000000000e6
-4140 4 4 32 0.13107200000000000000e6
-4140 4 6 34 -0.26214400000000000000e6
-4140 4 16 28 -0.65536000000000000000e5
-4140 4 16 33 0.65536000000000000000e5
-4140 4 17 29 -0.13107200000000000000e6
-4140 4 20 32 -0.13107200000000000000e6
-4141 4 16 34 0.65536000000000000000e5
-4141 4 20 32 -0.65536000000000000000e5
-4142 1 1 48 0.65536000000000000000e5
-4142 1 2 49 0.65536000000000000000e5
-4142 1 6 53 0.13107200000000000000e6
-4142 1 8 39 0.26214400000000000000e6
-4142 1 9 40 0.26214400000000000000e6
-4142 1 10 41 -0.52428800000000000000e6
-4142 1 12 43 -0.52428800000000000000e6
-4142 1 22 53 -0.65536000000000000000e5
-4142 1 23 38 0.65536000000000000000e5
-4142 1 24 55 -0.13107200000000000000e6
-4142 1 25 40 -0.13107200000000000000e6
-4142 1 26 41 -0.13107200000000000000e6
-4142 1 28 43 0.26214400000000000000e6
-4142 1 32 47 0.52428800000000000000e6
-4142 1 37 52 0.26214400000000000000e6
-4142 1 40 47 0.65536000000000000000e5
-4142 2 2 32 0.65536000000000000000e5
-4142 2 16 30 0.13107200000000000000e6
-4142 2 20 34 0.26214400000000000000e6
-4142 2 26 32 -0.65536000000000000000e5
-4142 2 32 32 0.13107200000000000000e6
-4142 3 9 38 0.26214400000000000000e6
-4142 3 22 35 0.52428800000000000000e6
-4142 3 22 51 0.26214400000000000000e6
-4142 3 24 37 0.13107200000000000000e6
-4142 3 27 40 0.26214400000000000000e6
-4142 3 28 41 0.52428800000000000000e6
-4142 4 2 30 0.26214400000000000000e6
-4142 4 4 32 -0.13107200000000000000e6
-4142 4 6 34 0.26214400000000000000e6
-4142 4 16 28 0.13107200000000000000e6
-4142 4 16 35 0.65536000000000000000e5
-4142 4 17 29 0.13107200000000000000e6
-4142 4 20 32 0.13107200000000000000e6
-4143 1 1 40 0.32768000000000000000e5
-4143 1 6 37 0.32768000000000000000e5
-4143 1 9 40 0.65536000000000000000e5
-4143 1 10 41 -0.13107200000000000000e6
-4143 1 23 38 -0.32768000000000000000e5
-4143 1 24 39 -0.32768000000000000000e5
-4143 1 26 41 -0.65536000000000000000e5
-4143 1 32 47 0.13107200000000000000e6
-4143 3 2 39 0.32768000000000000000e5
-4143 3 9 38 0.65536000000000000000e5
-4143 3 28 41 0.13107200000000000000e6
-4143 4 2 30 0.65536000000000000000e5
-4143 4 17 17 0.65536000000000000000e5
-4144 1 6 37 0.65536000000000000000e5
-4144 1 24 39 -0.65536000000000000000e5
-4144 3 2 39 0.65536000000000000000e5
-4144 3 3 40 0.65536000000000000000e5
-4144 3 9 38 -0.13107200000000000000e6
-4144 4 17 18 0.65536000000000000000e5
-4145 1 1 48 0.65536000000000000000e5
-4145 1 2 49 0.13107200000000000000e6
-4145 1 8 39 0.13107200000000000000e6
-4145 1 9 40 0.13107200000000000000e6
-4145 1 10 41 -0.26214400000000000000e6
-4145 1 12 43 -0.52428800000000000000e6
-4145 1 23 38 0.65536000000000000000e5
-4145 1 25 40 -0.65536000000000000000e5
-4145 1 28 43 0.26214400000000000000e6
-4145 1 32 47 0.52428800000000000000e6
-4145 2 2 32 0.65536000000000000000e5
-4145 2 3 33 0.65536000000000000000e5
-4145 2 5 27 -0.65536000000000000000e5
-4145 2 16 30 0.13107200000000000000e6
-4145 2 20 34 0.26214400000000000000e6
-4145 3 9 38 0.13107200000000000000e6
-4145 3 22 35 0.52428800000000000000e6
-4145 3 28 41 0.52428800000000000000e6
-4145 4 2 30 0.13107200000000000000e6
-4145 4 6 34 0.26214400000000000000e6
-4145 4 17 19 0.65536000000000000000e5
-4146 1 9 40 -0.65536000000000000000e5
-4146 1 10 41 0.13107200000000000000e6
-4146 1 11 42 -0.13107200000000000000e6
-4146 1 26 41 0.65536000000000000000e5
-4146 1 32 47 -0.13107200000000000000e6
-4146 1 33 48 0.13107200000000000000e6
-4146 2 12 26 0.13107200000000000000e6
-4146 2 20 34 -0.13107200000000000000e6
-4146 3 8 37 0.65536000000000000000e5
-4146 3 13 42 0.26214400000000000000e6
-4146 3 22 35 -0.26214400000000000000e6
-4146 3 28 41 -0.13107200000000000000e6
-4146 3 29 42 0.13107200000000000000e6
-4146 4 2 30 -0.65536000000000000000e5
-4146 4 3 31 -0.13107200000000000000e6
-4146 4 6 34 -0.13107200000000000000e6
-4146 4 17 20 0.65536000000000000000e5
-4147 4 2 30 -0.65536000000000000000e5
-4147 4 17 21 0.65536000000000000000e5
-4148 1 9 40 0.65536000000000000000e5
-4148 1 10 41 0.13107200000000000000e6
-4148 1 11 42 0.13107200000000000000e6
-4148 1 26 41 -0.65536000000000000000e5
-4148 1 32 47 -0.13107200000000000000e6
-4148 1 33 48 -0.13107200000000000000e6
-4148 3 9 38 0.65536000000000000000e5
-4148 3 10 39 0.65536000000000000000e5
-4148 3 13 42 -0.26214400000000000000e6
-4148 3 28 41 -0.13107200000000000000e6
-4148 3 29 42 -0.13107200000000000000e6
-4148 4 3 31 0.13107200000000000000e6
-4148 4 17 22 0.65536000000000000000e5
-4149 2 12 26 -0.65536000000000000000e5
-4149 2 20 34 0.65536000000000000000e5
-4149 4 6 34 0.65536000000000000000e5
-4149 4 17 23 0.65536000000000000000e5
-4150 4 3 31 -0.65536000000000000000e5
-4150 4 17 24 0.65536000000000000000e5
-4151 4 14 26 -0.65536000000000000000e5
-4151 4 17 25 0.65536000000000000000e5
-4152 1 6 53 0.13107200000000000000e6
-4152 1 25 40 -0.13107200000000000000e6
-4152 3 2 47 0.65536000000000000000e5
-4152 3 24 37 0.13107200000000000000e6
-4152 3 25 38 -0.65536000000000000000e5
-4152 3 27 40 0.39321600000000000000e6
-4152 3 28 41 -0.26214400000000000000e6
-4152 4 4 32 -0.13107200000000000000e6
-4152 4 16 28 0.65536000000000000000e5
-4152 4 17 26 0.65536000000000000000e5
-4152 4 17 29 0.13107200000000000000e6
-4153 4 16 28 -0.65536000000000000000e5
-4153 4 17 27 0.65536000000000000000e5
-4154 4 4 32 -0.65536000000000000000e5
-4154 4 17 28 0.65536000000000000000e5
-4155 2 4 34 -0.65536000000000000000e5
-4155 2 21 35 0.65536000000000000000e5
-4155 4 7 35 0.65536000000000000000e5
-4155 4 17 30 0.65536000000000000000e5
-4156 4 17 31 0.65536000000000000000e5
-4156 4 23 27 -0.65536000000000000000e5
-4157 1 1 48 -0.65536000000000000000e5
-4157 1 2 49 -0.65536000000000000000e5
-4157 1 6 53 -0.13107200000000000000e6
-4157 1 8 39 -0.26214400000000000000e6
-4157 1 9 40 -0.26214400000000000000e6
-4157 1 10 41 0.52428800000000000000e6
-4157 1 12 43 0.52428800000000000000e6
-4157 1 22 53 0.65536000000000000000e5
-4157 1 23 38 -0.65536000000000000000e5
-4157 1 24 55 0.13107200000000000000e6
-4157 1 25 40 0.13107200000000000000e6
-4157 1 26 41 0.13107200000000000000e6
-4157 1 28 43 -0.26214400000000000000e6
-4157 1 32 47 -0.52428800000000000000e6
-4157 1 37 52 -0.26214400000000000000e6
-4157 1 40 47 -0.65536000000000000000e5
-4157 2 2 32 -0.65536000000000000000e5
-4157 2 3 33 -0.65536000000000000000e5
-4157 2 16 30 -0.13107200000000000000e6
-4157 2 20 34 -0.26214400000000000000e6
-4157 2 26 32 0.65536000000000000000e5
-4157 3 9 38 -0.26214400000000000000e6
-4157 3 22 35 -0.52428800000000000000e6
-4157 3 22 51 -0.26214400000000000000e6
-4157 3 24 37 -0.13107200000000000000e6
-4157 3 27 40 -0.26214400000000000000e6
-4157 3 28 41 -0.52428800000000000000e6
-4157 4 2 30 -0.26214400000000000000e6
-4157 4 4 32 0.13107200000000000000e6
-4157 4 6 34 -0.26214400000000000000e6
-4157 4 16 28 -0.65536000000000000000e5
-4157 4 17 29 -0.13107200000000000000e6
-4157 4 17 32 0.65536000000000000000e5
-4157 4 20 32 -0.13107200000000000000e6
-4158 1 1 48 -0.65536000000000000000e5
-4158 1 2 49 -0.13107200000000000000e6
-4158 1 8 39 -0.13107200000000000000e6
-4158 1 9 40 -0.13107200000000000000e6
-4158 1 10 41 0.26214400000000000000e6
-4158 1 12 43 0.52428800000000000000e6
-4158 1 23 38 -0.65536000000000000000e5
-4158 1 23 54 -0.65536000000000000000e5
-4158 1 24 55 0.13107200000000000000e6
-4158 1 25 40 0.65536000000000000000e5
-4158 1 25 56 -0.65536000000000000000e5
-4158 1 28 43 -0.26214400000000000000e6
-4158 1 32 47 -0.52428800000000000000e6
-4158 1 40 47 -0.65536000000000000000e5
-4158 2 2 32 -0.65536000000000000000e5
-4158 2 3 33 -0.65536000000000000000e5
-4158 2 16 30 -0.13107200000000000000e6
-4158 2 20 34 -0.26214400000000000000e6
-4158 3 9 38 -0.13107200000000000000e6
-4158 3 22 35 -0.52428800000000000000e6
-4158 3 24 53 0.65536000000000000000e5
-4158 3 25 54 0.65536000000000000000e5
-4158 3 28 41 -0.52428800000000000000e6
-4158 3 38 51 -0.13107200000000000000e6
-4158 4 2 30 -0.13107200000000000000e6
-4158 4 4 32 0.65536000000000000000e5
-4158 4 6 34 -0.26214400000000000000e6
-4158 4 17 33 0.65536000000000000000e5
-4158 4 28 32 0.65536000000000000000e5
-4159 4 7 35 -0.65536000000000000000e5
-4159 4 17 34 0.65536000000000000000e5
-4160 1 23 54 0.65536000000000000000e5
-4160 1 24 55 -0.13107200000000000000e6
-4160 1 38 53 -0.65536000000000000000e5
-4160 1 41 56 0.13107200000000000000e6
-4160 3 25 54 -0.65536000000000000000e5
-4160 3 27 56 0.13107200000000000000e6
-4160 3 38 51 0.13107200000000000000e6
-4160 4 17 35 0.65536000000000000000e5
-4160 4 28 32 -0.65536000000000000000e5
-4161 1 1 48 0.32768000000000000000e5
-4161 1 2 49 0.65536000000000000000e5
-4161 1 8 39 0.65536000000000000000e5
-4161 1 9 40 0.65536000000000000000e5
-4161 1 10 41 -0.13107200000000000000e6
-4161 1 12 43 -0.26214400000000000000e6
-4161 1 23 38 0.32768000000000000000e5
-4161 1 25 40 -0.32768000000000000000e5
-4161 1 28 43 0.13107200000000000000e6
-4161 1 32 47 0.26214400000000000000e6
-4161 2 2 32 0.32768000000000000000e5
-4161 2 3 33 0.32768000000000000000e5
-4161 2 5 27 -0.32768000000000000000e5
-4161 2 16 30 0.65536000000000000000e5
-4161 2 20 34 0.13107200000000000000e6
-4161 3 9 38 0.65536000000000000000e5
-4161 3 22 35 0.26214400000000000000e6
-4161 3 28 41 0.26214400000000000000e6
-4161 4 2 30 0.65536000000000000000e5
-4161 4 6 34 0.13107200000000000000e6
-4161 4 18 18 0.65536000000000000000e5
-4162 1 1 40 0.65536000000000000000e5
-4162 1 2 33 -0.52428800000000000000e6
-4162 1 6 53 0.65536000000000000000e5
-4162 1 9 40 0.26214400000000000000e6
-4162 1 10 25 -0.26214400000000000000e6
-4162 1 11 42 0.52428800000000000000e6
-4162 1 12 43 0.10485760000000000000e7
-4162 1 23 38 -0.65536000000000000000e5
-4162 1 25 40 -0.65536000000000000000e5
-4162 1 28 43 -0.52428800000000000000e6
-4162 1 32 47 -0.52428800000000000000e6
-4162 1 33 48 -0.52428800000000000000e6
-4162 2 2 32 -0.65536000000000000000e5
-4162 2 3 17 0.65536000000000000000e5
-4162 2 5 19 -0.65536000000000000000e5
-4162 2 5 35 0.65536000000000000000e5
-4162 2 12 26 -0.52428800000000000000e6
-4162 3 1 30 0.26214400000000000000e6
-4162 3 1 38 0.65536000000000000000e5
-4162 3 2 23 0.65536000000000000000e5
-4162 3 2 39 0.65536000000000000000e5
-4162 3 3 32 -0.26214400000000000000e6
-4162 3 5 26 -0.65536000000000000000e5
-4162 3 5 50 0.13107200000000000000e6
-4162 3 8 37 -0.13107200000000000000e6
-4162 3 13 42 -0.10485760000000000000e7
-4162 3 14 27 0.52428800000000000000e6
-4162 3 25 38 -0.65536000000000000000e5
-4162 3 26 39 -0.65536000000000000000e5
-4162 3 28 41 -0.52428800000000000000e6
-4162 3 29 42 -0.52428800000000000000e6
-4162 4 3 31 0.52428800000000000000e6
-4162 4 4 16 -0.65536000000000000000e5
-4162 4 5 17 0.65536000000000000000e5
-4162 4 6 18 0.13107200000000000000e6
-4162 4 7 19 -0.13107200000000000000e6
-4162 4 8 20 -0.26214400000000000000e6
-4162 4 18 19 0.65536000000000000000e5
-4163 4 2 30 -0.65536000000000000000e5
-4163 4 18 20 0.65536000000000000000e5
-4164 1 9 40 0.65536000000000000000e5
-4164 1 10 41 0.13107200000000000000e6
-4164 1 11 42 0.13107200000000000000e6
-4164 1 26 41 -0.65536000000000000000e5
-4164 1 32 47 -0.13107200000000000000e6
-4164 1 33 48 -0.13107200000000000000e6
-4164 3 9 38 0.65536000000000000000e5
-4164 3 10 39 0.65536000000000000000e5
-4164 3 13 42 -0.26214400000000000000e6
-4164 3 28 41 -0.13107200000000000000e6
-4164 3 29 42 -0.13107200000000000000e6
-4164 4 3 31 0.13107200000000000000e6
-4164 4 18 21 0.65536000000000000000e5
-4165 4 3 31 -0.65536000000000000000e5
-4165 4 18 23 0.65536000000000000000e5
-4166 1 10 41 -0.65536000000000000000e5
-4166 1 14 45 -0.26214400000000000000e6
-4166 1 17 48 0.13107200000000000000e6
-4166 1 18 49 0.13107200000000000000e6
-4166 1 26 33 0.65536000000000000000e5
-4166 1 32 47 0.65536000000000000000e5
-4166 1 33 40 -0.65536000000000000000e5
-4166 1 34 49 0.13107200000000000000e6
-4166 2 14 28 0.13107200000000000000e6
-4166 3 13 42 0.26214400000000000000e6
-4166 3 14 43 0.13107200000000000000e6
-4166 3 18 47 0.13107200000000000000e6
-4166 3 28 41 0.65536000000000000000e5
-4166 4 3 31 -0.65536000000000000000e5
-4166 4 18 24 0.65536000000000000000e5
-4167 1 14 45 0.26214400000000000000e6
-4167 1 17 48 -0.13107200000000000000e6
-4167 1 18 49 -0.13107200000000000000e6
-4167 1 34 49 -0.13107200000000000000e6
-4167 2 14 28 -0.13107200000000000000e6
-4167 3 14 43 -0.65536000000000000000e5
-4167 3 15 44 0.13107200000000000000e6
-4167 3 16 45 -0.26214400000000000000e6
-4167 3 18 47 -0.13107200000000000000e6
-4167 3 22 35 0.65536000000000000000e5
-4167 4 14 26 0.65536000000000000000e5
-4167 4 15 27 0.13107200000000000000e6
-4167 4 18 25 0.65536000000000000000e5
-4168 4 16 28 -0.65536000000000000000e5
-4168 4 18 26 0.65536000000000000000e5
-4169 4 4 32 -0.65536000000000000000e5
-4169 4 18 27 0.65536000000000000000e5
-4170 1 6 53 -0.65536000000000000000e5
-4170 1 25 40 0.65536000000000000000e5
-4170 3 5 50 -0.13107200000000000000e6
-4170 3 25 38 0.65536000000000000000e5
-4170 3 26 39 0.65536000000000000000e5
-4170 4 18 28 0.65536000000000000000e5
-4171 2 4 34 -0.65536000000000000000e5
-4171 2 21 35 0.65536000000000000000e5
-4171 4 7 35 0.65536000000000000000e5
-4171 4 18 29 0.65536000000000000000e5
-4172 1 6 53 0.16384000000000000000e5
-4172 1 25 40 -0.16384000000000000000e5
-4172 2 4 34 0.32768000000000000000e5
-4172 2 21 35 -0.32768000000000000000e5
-4172 3 5 50 0.32768000000000000000e5
-4172 3 14 51 0.13107200000000000000e6
-4172 3 18 47 -0.13107200000000000000e6
-4172 3 24 37 0.16384000000000000000e5
-4172 3 27 40 0.65536000000000000000e5
-4172 3 30 43 -0.65536000000000000000e5
-4172 4 4 32 -0.16384000000000000000e5
-4172 4 7 35 -0.32768000000000000000e5
-4172 4 16 28 0.16384000000000000000e5
-4172 4 18 31 0.65536000000000000000e5
-4172 4 19 31 -0.65536000000000000000e5
-4173 1 1 48 -0.65536000000000000000e5
-4173 1 2 49 -0.13107200000000000000e6
-4173 1 8 39 -0.13107200000000000000e6
-4173 1 9 40 -0.13107200000000000000e6
-4173 1 10 41 0.26214400000000000000e6
-4173 1 12 43 0.52428800000000000000e6
-4173 1 23 38 -0.65536000000000000000e5
-4173 1 23 54 -0.65536000000000000000e5
-4173 1 24 55 0.13107200000000000000e6
-4173 1 25 40 0.65536000000000000000e5
-4173 1 25 56 -0.65536000000000000000e5
-4173 1 28 43 -0.26214400000000000000e6
-4173 1 32 47 -0.52428800000000000000e6
-4173 1 40 47 -0.65536000000000000000e5
-4173 2 2 32 -0.65536000000000000000e5
-4173 2 3 33 -0.65536000000000000000e5
-4173 2 16 30 -0.13107200000000000000e6
-4173 2 20 34 -0.26214400000000000000e6
-4173 3 9 38 -0.13107200000000000000e6
-4173 3 22 35 -0.52428800000000000000e6
-4173 3 24 53 0.65536000000000000000e5
-4173 3 25 54 0.65536000000000000000e5
-4173 3 28 41 -0.52428800000000000000e6
-4173 3 38 51 -0.13107200000000000000e6
-4173 4 2 30 -0.13107200000000000000e6
-4173 4 4 32 0.65536000000000000000e5
-4173 4 6 34 -0.26214400000000000000e6
-4173 4 18 32 0.65536000000000000000e5
-4173 4 28 32 0.65536000000000000000e5
-4174 1 1 48 -0.65536000000000000000e5
-4174 1 2 49 -0.13107200000000000000e6
-4174 1 6 53 0.65536000000000000000e5
-4174 1 8 39 -0.13107200000000000000e6
-4174 1 9 40 -0.13107200000000000000e6
-4174 1 10 41 0.26214400000000000000e6
-4174 1 12 43 0.52428800000000000000e6
-4174 1 23 38 -0.65536000000000000000e5
-4174 1 24 39 -0.65536000000000000000e5
-4174 1 24 55 -0.13107200000000000000e6
-4174 1 25 56 -0.65536000000000000000e5
-4174 1 26 41 0.26214400000000000000e6
-4174 1 28 43 -0.26214400000000000000e6
-4174 1 32 47 -0.52428800000000000000e6
-4174 1 40 47 -0.65536000000000000000e5
-4174 2 2 32 -0.65536000000000000000e5
-4174 2 3 33 -0.65536000000000000000e5
-4174 2 16 30 -0.13107200000000000000e6
-4174 2 20 34 -0.26214400000000000000e6
-4174 3 9 38 -0.13107200000000000000e6
-4174 3 22 35 -0.52428800000000000000e6
-4174 3 22 51 0.13107200000000000000e6
-4174 3 23 52 -0.26214400000000000000e6
-4174 3 24 53 0.65536000000000000000e5
-4174 3 25 38 -0.65536000000000000000e5
-4174 3 25 54 0.65536000000000000000e5
-4174 3 27 40 -0.13107200000000000000e6
-4174 3 28 41 -0.52428800000000000000e6
-4174 3 38 51 -0.13107200000000000000e6
-4174 3 39 40 0.65536000000000000000e5
-4174 4 2 30 -0.13107200000000000000e6
-4174 4 6 34 -0.26214400000000000000e6
-4174 4 7 35 0.13107200000000000000e6
-4174 4 18 33 0.65536000000000000000e5
-4174 4 28 32 0.65536000000000000000e5
-4175 4 18 34 0.65536000000000000000e5
-4175 4 21 33 -0.65536000000000000000e5
-4176 4 18 35 0.65536000000000000000e5
-4176 4 28 32 -0.65536000000000000000e5
-4177 1 9 40 0.65536000000000000000e5
-4177 1 10 41 0.13107200000000000000e6
-4177 1 11 42 0.13107200000000000000e6
-4177 1 26 41 -0.65536000000000000000e5
-4177 1 32 47 -0.13107200000000000000e6
-4177 1 33 48 -0.13107200000000000000e6
-4177 3 9 38 0.65536000000000000000e5
-4177 3 10 39 0.65536000000000000000e5
-4177 3 13 42 -0.26214400000000000000e6
-4177 3 28 41 -0.13107200000000000000e6
-4177 3 29 42 -0.13107200000000000000e6
-4177 4 3 31 0.13107200000000000000e6
-4177 4 19 20 0.65536000000000000000e5
-4178 4 18 22 -0.65536000000000000000e5
-4178 4 19 21 0.65536000000000000000e5
-4179 1 9 40 -0.65536000000000000000e5
-4179 1 11 42 0.13107200000000000000e6
-4179 1 26 33 -0.13107200000000000000e6
-4179 1 26 41 0.65536000000000000000e5
-4179 1 33 40 0.13107200000000000000e6
-4179 1 33 48 -0.13107200000000000000e6
-4179 3 11 40 0.65536000000000000000e5
-4179 3 29 42 -0.13107200000000000000e6
-4179 4 18 22 -0.65536000000000000000e5
-4179 4 19 22 0.65536000000000000000e5
-4180 1 10 41 -0.65536000000000000000e5
-4180 1 14 45 -0.26214400000000000000e6
-4180 1 17 48 0.13107200000000000000e6
-4180 1 18 49 0.13107200000000000000e6
-4180 1 26 33 0.65536000000000000000e5
-4180 1 32 47 0.65536000000000000000e5
-4180 1 33 40 -0.65536000000000000000e5
-4180 1 34 49 0.13107200000000000000e6
-4180 2 14 28 0.13107200000000000000e6
-4180 3 13 42 0.26214400000000000000e6
-4180 3 14 43 0.13107200000000000000e6
-4180 3 18 47 0.13107200000000000000e6
-4180 3 28 41 0.65536000000000000000e5
-4180 4 3 31 -0.65536000000000000000e5
-4180 4 19 23 0.65536000000000000000e5
-4181 4 19 24 0.65536000000000000000e5
-4181 4 22 22 -0.13107200000000000000e6
-4182 1 14 45 0.13107200000000000000e6
-4182 1 17 48 -0.65536000000000000000e5
-4182 1 18 49 -0.65536000000000000000e5
-4182 1 34 49 -0.65536000000000000000e5
-4182 2 14 28 -0.65536000000000000000e5
-4182 3 13 42 -0.65536000000000000000e5
-4182 3 15 44 -0.13107200000000000000e6
-4182 3 18 47 -0.65536000000000000000e5
-4182 3 26 35 0.65536000000000000000e5
-4182 4 19 25 0.65536000000000000000e5
-4183 4 4 32 -0.65536000000000000000e5
-4183 4 19 26 0.65536000000000000000e5
-4184 1 6 53 -0.65536000000000000000e5
-4184 1 25 40 0.65536000000000000000e5
-4184 3 5 50 -0.13107200000000000000e6
-4184 3 25 38 0.65536000000000000000e5
-4184 3 26 39 0.65536000000000000000e5
-4184 4 19 27 0.65536000000000000000e5
-4185 4 5 33 -0.65536000000000000000e5
-4185 4 19 28 0.65536000000000000000e5
-4186 4 18 30 -0.65536000000000000000e5
-4186 4 19 29 0.65536000000000000000e5
-4187 3 6 51 0.65536000000000000000e5
-4187 3 14 51 -0.26214400000000000000e6
-4187 3 27 40 -0.65536000000000000000e5
-4187 3 29 42 0.26214400000000000000e6
-4187 3 30 43 0.13107200000000000000e6
-4187 4 18 30 -0.65536000000000000000e5
-4187 4 19 30 0.65536000000000000000e5
-4187 4 19 31 0.13107200000000000000e6
-4188 1 1 48 -0.65536000000000000000e5
-4188 1 2 49 -0.13107200000000000000e6
-4188 1 6 53 0.65536000000000000000e5
-4188 1 8 39 -0.13107200000000000000e6
-4188 1 9 40 -0.13107200000000000000e6
-4188 1 10 41 0.26214400000000000000e6
-4188 1 12 43 0.52428800000000000000e6
-4188 1 23 38 -0.65536000000000000000e5
-4188 1 24 39 -0.65536000000000000000e5
-4188 1 24 55 -0.13107200000000000000e6
-4188 1 25 56 -0.65536000000000000000e5
-4188 1 26 41 0.26214400000000000000e6
-4188 1 28 43 -0.26214400000000000000e6
-4188 1 32 47 -0.52428800000000000000e6
-4188 1 40 47 -0.65536000000000000000e5
-4188 2 2 32 -0.65536000000000000000e5
-4188 2 3 33 -0.65536000000000000000e5
-4188 2 16 30 -0.13107200000000000000e6
-4188 2 20 34 -0.26214400000000000000e6
-4188 3 9 38 -0.13107200000000000000e6
-4188 3 22 35 -0.52428800000000000000e6
-4188 3 22 51 0.13107200000000000000e6
-4188 3 23 52 -0.26214400000000000000e6
-4188 3 24 53 0.65536000000000000000e5
-4188 3 25 38 -0.65536000000000000000e5
-4188 3 25 54 0.65536000000000000000e5
-4188 3 27 40 -0.13107200000000000000e6
-4188 3 28 41 -0.52428800000000000000e6
-4188 3 38 51 -0.13107200000000000000e6
-4188 3 39 40 0.65536000000000000000e5
-4188 4 2 30 -0.13107200000000000000e6
-4188 4 6 34 -0.26214400000000000000e6
-4188 4 7 35 0.13107200000000000000e6
-4188 4 19 32 0.65536000000000000000e5
-4188 4 28 32 0.65536000000000000000e5
-4189 4 19 33 0.65536000000000000000e5
-4189 4 28 28 -0.13107200000000000000e6
-4190 1 24 55 0.65536000000000000000e5
-4190 1 26 41 -0.65536000000000000000e5
-4190 3 6 55 0.65536000000000000000e5
-4190 3 10 55 -0.26214400000000000000e6
-4190 3 27 40 0.65536000000000000000e5
-4190 3 35 48 0.26214400000000000000e6
-4190 3 40 45 -0.13107200000000000000e6
-4190 4 19 34 0.65536000000000000000e5
-4190 4 21 33 -0.65536000000000000000e5
-4190 4 22 34 -0.13107200000000000000e6
-4191 1 9 40 -0.16384000000000000000e5
-4191 1 10 41 0.65536000000000000000e5
-4191 1 11 42 0.32768000000000000000e5
-4191 1 26 41 0.16384000000000000000e5
-4191 1 32 47 -0.65536000000000000000e5
-4191 1 33 48 -0.32768000000000000000e5
-4191 2 12 26 -0.32768000000000000000e5
-4191 2 20 34 0.32768000000000000000e5
-4191 3 8 37 0.16384000000000000000e5
-4191 3 9 38 -0.16384000000000000000e5
-4191 3 12 41 -0.65536000000000000000e5
-4191 3 13 42 -0.65536000000000000000e5
-4191 3 22 27 0.16384000000000000000e5
-4191 3 22 35 0.65536000000000000000e5
-4191 3 28 41 -0.65536000000000000000e5
-4191 3 29 42 -0.32768000000000000000e5
-4191 4 1 29 0.16384000000000000000e5
-4191 4 2 30 -0.16384000000000000000e5
-4191 4 3 31 0.32768000000000000000e5
-4191 4 6 34 0.32768000000000000000e5
-4191 4 20 20 0.65536000000000000000e5
-4192 2 12 26 -0.65536000000000000000e5
-4192 2 20 34 0.65536000000000000000e5
-4192 4 6 34 0.65536000000000000000e5
-4192 4 20 21 0.65536000000000000000e5
-4193 4 3 31 -0.65536000000000000000e5
-4193 4 20 22 0.65536000000000000000e5
-4194 1 13 44 -0.13107200000000000000e6
-4194 1 34 41 0.13107200000000000000e6
-4194 3 12 41 0.65536000000000000000e5
-4194 3 13 42 0.65536000000000000000e5
-4194 3 22 35 0.65536000000000000000e5
-4194 4 20 23 0.65536000000000000000e5
-4195 4 14 26 -0.65536000000000000000e5
-4195 4 20 24 0.65536000000000000000e5
-4196 1 3 18 -0.32768000000000000000e5
-4196 1 4 19 0.65536000000000000000e5
-4196 1 5 36 0.65536000000000000000e5
-4196 1 12 43 0.32768000000000000000e5
-4196 1 14 45 -0.65536000000000000000e5
-4196 1 17 32 -0.13107200000000000000e6
-4196 1 19 50 0.13107200000000000000e6
-4196 1 34 41 -0.65536000000000000000e5
-4196 3 3 16 -0.32768000000000000000e5
-4196 3 4 17 -0.32768000000000000000e5
-4196 3 14 27 0.32768000000000000000e5
-4196 3 15 44 -0.65536000000000000000e5
-4196 3 16 29 0.65536000000000000000e5
-4196 3 16 45 0.13107200000000000000e6
-4196 4 2 14 -0.32768000000000000000e5
-4196 4 11 23 0.65536000000000000000e5
-4196 4 15 27 -0.65536000000000000000e5
-4196 4 20 25 0.65536000000000000000e5
-4197 2 16 30 -0.65536000000000000000e5
-4197 2 16 34 0.65536000000000000000e5
-4197 4 20 26 0.65536000000000000000e5
-4198 4 17 29 -0.65536000000000000000e5
-4198 4 20 27 0.65536000000000000000e5
-4199 2 4 34 -0.65536000000000000000e5
-4199 2 21 35 0.65536000000000000000e5
-4199 4 7 35 0.65536000000000000000e5
-4199 4 20 28 0.65536000000000000000e5
-4200 4 6 34 -0.65536000000000000000e5
-4200 4 20 29 0.65536000000000000000e5
-4201 4 20 30 0.65536000000000000000e5
-4201 4 23 27 -0.65536000000000000000e5
-4202 1 6 53 0.81920000000000000000e4
-4202 1 25 40 -0.81920000000000000000e4
-4202 2 4 34 0.16384000000000000000e5
-4202 2 21 35 -0.16384000000000000000e5
-4202 3 5 50 0.16384000000000000000e5
-4202 3 7 52 0.65536000000000000000e5
-4202 3 18 47 0.65536000000000000000e5
-4202 3 24 37 0.81920000000000000000e4
-4202 3 27 40 0.32768000000000000000e5
-4202 3 28 41 0.32768000000000000000e5
-4202 3 29 42 0.32768000000000000000e5
-4202 3 31 44 -0.13107200000000000000e6
-4202 4 4 32 -0.81920000000000000000e4
-4202 4 7 35 -0.16384000000000000000e5
-4202 4 16 28 0.81920000000000000000e4
-4202 4 20 31 0.65536000000000000000e5
-4202 4 23 27 0.32768000000000000000e5
-4203 4 7 35 -0.65536000000000000000e5
-4203 4 20 33 0.65536000000000000000e5
-4204 1 32 47 0.65536000000000000000e5
-4204 1 37 52 -0.65536000000000000000e5
-4204 3 10 55 -0.65536000000000000000e5
-4204 3 23 52 0.65536000000000000000e5
-4204 3 34 47 -0.13107200000000000000e6
-4204 3 35 48 0.13107200000000000000e6
-4204 3 40 45 -0.65536000000000000000e5
-4204 4 20 34 0.65536000000000000000e5
-4204 4 22 34 -0.65536000000000000000e5
-4205 1 1 48 -0.32768000000000000000e5
-4205 1 2 49 -0.32768000000000000000e5
-4205 1 8 39 -0.65536000000000000000e5
-4205 1 9 40 -0.65536000000000000000e5
-4205 1 10 41 0.13107200000000000000e6
-4205 1 12 43 0.26214400000000000000e6
-4205 1 23 38 -0.32768000000000000000e5
-4205 1 24 55 0.13107200000000000000e6
-4205 1 26 41 0.65536000000000000000e5
-4205 1 28 43 -0.26214400000000000000e6
-4205 1 32 47 -0.26214400000000000000e6
-4205 1 33 48 0.13107200000000000000e6
-4205 1 40 55 -0.65536000000000000000e5
-4205 1 41 56 -0.13107200000000000000e6
-4205 1 44 51 -0.26214400000000000000e6
-4205 1 46 53 0.26214400000000000000e6
-4205 2 2 32 -0.32768000000000000000e5
-4205 2 4 34 0.65536000000000000000e5
-4205 2 16 30 -0.65536000000000000000e5
-4205 2 20 34 -0.13107200000000000000e6
-4205 2 28 34 -0.65536000000000000000e5
-4205 3 5 50 0.65536000000000000000e5
-4205 3 9 38 -0.65536000000000000000e5
-4205 3 10 55 0.13107200000000000000e6
-4205 3 22 35 -0.26214400000000000000e6
-4205 3 22 51 -0.65536000000000000000e5
-4205 3 23 52 0.13107200000000000000e6
-4205 3 27 40 0.65536000000000000000e5
-4205 3 27 56 -0.13107200000000000000e6
-4205 3 28 41 -0.26214400000000000000e6
-4205 3 35 48 -0.26214400000000000000e6
-4205 3 37 50 0.65536000000000000000e5
-4205 3 38 51 0.13107200000000000000e6
-4205 3 39 52 0.13107200000000000000e6
-4205 3 40 45 0.13107200000000000000e6
-4205 4 2 30 -0.65536000000000000000e5
-4205 4 6 34 -0.13107200000000000000e6
-4205 4 7 35 -0.65536000000000000000e5
-4205 4 20 35 0.65536000000000000000e5
-4205 4 22 34 0.13107200000000000000e6
-4205 4 23 35 0.13107200000000000000e6
-4205 4 29 33 0.65536000000000000000e5
-4206 4 3 31 -0.32768000000000000000e5
-4206 4 21 21 0.65536000000000000000e5
-4207 1 10 41 -0.65536000000000000000e5
-4207 1 14 45 -0.26214400000000000000e6
-4207 1 17 48 0.13107200000000000000e6
-4207 1 18 49 0.13107200000000000000e6
-4207 1 26 33 0.65536000000000000000e5
-4207 1 32 47 0.65536000000000000000e5
-4207 1 33 40 -0.65536000000000000000e5
-4207 1 34 49 0.13107200000000000000e6
-4207 2 14 28 0.13107200000000000000e6
-4207 3 13 42 0.26214400000000000000e6
-4207 3 14 43 0.13107200000000000000e6
-4207 3 18 47 0.13107200000000000000e6
-4207 3 28 41 0.65536000000000000000e5
-4207 4 3 31 -0.65536000000000000000e5
-4207 4 21 22 0.65536000000000000000e5
-4208 4 14 26 -0.65536000000000000000e5
-4208 4 21 23 0.65536000000000000000e5
-4209 1 14 45 0.26214400000000000000e6
-4209 1 17 48 -0.13107200000000000000e6
-4209 1 18 49 -0.13107200000000000000e6
-4209 1 34 49 -0.13107200000000000000e6
-4209 2 14 28 -0.13107200000000000000e6
-4209 3 14 43 -0.65536000000000000000e5
-4209 3 15 44 0.13107200000000000000e6
-4209 3 16 45 -0.26214400000000000000e6
-4209 3 18 47 -0.13107200000000000000e6
-4209 3 22 35 0.65536000000000000000e5
-4209 4 14 26 0.65536000000000000000e5
-4209 4 15 27 0.13107200000000000000e6
-4209 4 21 24 0.65536000000000000000e5
-4210 4 15 27 -0.65536000000000000000e5
-4210 4 21 25 0.65536000000000000000e5
-4211 4 17 29 -0.65536000000000000000e5
-4211 4 21 26 0.65536000000000000000e5
-4212 2 4 34 -0.65536000000000000000e5
-4212 2 21 35 0.65536000000000000000e5
-4212 4 7 35 0.65536000000000000000e5
-4212 4 21 27 0.65536000000000000000e5
-4213 4 18 30 -0.65536000000000000000e5
-4213 4 21 28 0.65536000000000000000e5
-4214 4 21 29 0.65536000000000000000e5
-4214 4 23 27 -0.65536000000000000000e5
-4215 1 6 53 0.16384000000000000000e5
-4215 1 25 40 -0.16384000000000000000e5
-4215 2 4 34 0.32768000000000000000e5
-4215 2 21 35 -0.32768000000000000000e5
-4215 3 5 50 0.32768000000000000000e5
-4215 3 14 51 0.13107200000000000000e6
-4215 3 18 47 -0.13107200000000000000e6
-4215 3 24 37 0.16384000000000000000e5
-4215 3 27 40 0.65536000000000000000e5
-4215 3 30 43 -0.65536000000000000000e5
-4215 4 4 32 -0.16384000000000000000e5
-4215 4 7 35 -0.32768000000000000000e5
-4215 4 16 28 0.16384000000000000000e5
-4215 4 19 31 -0.65536000000000000000e5
-4215 4 21 30 0.65536000000000000000e5
-4216 1 6 53 0.81920000000000000000e4
-4216 1 25 40 -0.81920000000000000000e4
-4216 2 4 34 0.16384000000000000000e5
-4216 2 21 35 -0.16384000000000000000e5
-4216 3 5 50 0.16384000000000000000e5
-4216 3 14 51 0.65536000000000000000e5
-4216 3 18 47 0.65536000000000000000e5
-4216 3 19 48 -0.13107200000000000000e6
-4216 3 24 37 0.81920000000000000000e4
-4216 3 27 40 0.32768000000000000000e5
-4216 3 28 41 0.32768000000000000000e5
-4216 3 29 42 0.32768000000000000000e5
-4216 4 4 32 -0.81920000000000000000e4
-4216 4 7 35 -0.16384000000000000000e5
-4216 4 16 28 0.81920000000000000000e4
-4216 4 21 31 0.65536000000000000000e5
-4216 4 23 27 0.32768000000000000000e5
-4217 4 7 35 -0.65536000000000000000e5
-4217 4 21 32 0.65536000000000000000e5
-4218 1 34 49 -0.13107200000000000000e6
-4218 1 44 51 0.13107200000000000000e6
-4218 3 23 52 0.65536000000000000000e5
-4218 3 35 48 0.13107200000000000000e6
-4218 3 40 45 -0.65536000000000000000e5
-4218 4 21 34 0.65536000000000000000e5
-4218 4 22 34 -0.65536000000000000000e5
-4219 4 21 35 0.65536000000000000000e5
-4219 4 29 33 -0.65536000000000000000e5
-4220 1 14 45 0.26214400000000000000e6
-4220 1 17 48 -0.13107200000000000000e6
-4220 1 18 49 -0.13107200000000000000e6
-4220 1 34 49 -0.13107200000000000000e6
-4220 2 14 28 -0.13107200000000000000e6
-4220 3 14 43 -0.65536000000000000000e5
-4220 3 15 44 0.13107200000000000000e6
-4220 3 16 45 -0.26214400000000000000e6
-4220 3 18 47 -0.13107200000000000000e6
-4220 3 22 35 0.65536000000000000000e5
-4220 4 14 26 0.65536000000000000000e5
-4220 4 15 27 0.13107200000000000000e6
-4220 4 22 23 0.65536000000000000000e5
-4221 1 14 45 0.13107200000000000000e6
-4221 1 17 48 -0.65536000000000000000e5
-4221 1 18 49 -0.65536000000000000000e5
-4221 1 34 49 -0.65536000000000000000e5
-4221 2 14 28 -0.65536000000000000000e5
-4221 3 13 42 -0.65536000000000000000e5
-4221 3 15 44 -0.13107200000000000000e6
-4221 3 18 47 -0.65536000000000000000e5
-4221 3 26 35 0.65536000000000000000e5
-4221 4 22 24 0.65536000000000000000e5
-4222 1 14 45 -0.65536000000000000000e5
-4222 1 15 46 -0.13107200000000000000e6
-4222 1 17 48 0.32768000000000000000e5
-4222 1 18 49 0.32768000000000000000e5
-4222 1 20 51 0.13107200000000000000e6
-4222 1 34 49 0.32768000000000000000e5
-4222 2 14 28 0.32768000000000000000e5
-4222 3 14 43 0.32768000000000000000e5
-4222 3 16 45 0.13107200000000000000e6
-4222 3 18 47 0.32768000000000000000e5
-4222 3 22 35 -0.32768000000000000000e5
-4222 3 30 35 0.65536000000000000000e5
-4222 4 14 26 -0.32768000000000000000e5
-4222 4 15 27 -0.65536000000000000000e5
-4222 4 22 25 0.65536000000000000000e5
-4223 2 4 34 -0.65536000000000000000e5
-4223 2 21 35 0.65536000000000000000e5
-4223 4 7 35 0.65536000000000000000e5
-4223 4 22 26 0.65536000000000000000e5
-4224 4 18 30 -0.65536000000000000000e5
-4224 4 22 27 0.65536000000000000000e5
-4225 3 6 51 0.65536000000000000000e5
-4225 3 14 51 -0.26214400000000000000e6
-4225 3 27 40 -0.65536000000000000000e5
-4225 3 29 42 0.26214400000000000000e6
-4225 3 30 43 0.13107200000000000000e6
-4225 4 18 30 -0.65536000000000000000e5
-4225 4 19 31 0.13107200000000000000e6
-4225 4 22 28 0.65536000000000000000e5
-4226 1 6 53 0.16384000000000000000e5
-4226 1 25 40 -0.16384000000000000000e5
-4226 2 4 34 0.32768000000000000000e5
-4226 2 21 35 -0.32768000000000000000e5
-4226 3 5 50 0.32768000000000000000e5
-4226 3 14 51 0.13107200000000000000e6
-4226 3 18 47 -0.13107200000000000000e6
-4226 3 24 37 0.16384000000000000000e5
-4226 3 27 40 0.65536000000000000000e5
-4226 3 30 43 -0.65536000000000000000e5
-4226 4 4 32 -0.16384000000000000000e5
-4226 4 7 35 -0.32768000000000000000e5
-4226 4 16 28 0.16384000000000000000e5
-4226 4 19 31 -0.65536000000000000000e5
-4226 4 22 29 0.65536000000000000000e5
-4227 4 19 31 -0.65536000000000000000e5
-4227 4 22 30 0.65536000000000000000e5
-4228 3 14 51 0.65536000000000000000e5
-4228 3 18 47 0.65536000000000000000e5
-4228 3 32 45 -0.13107200000000000000e6
-4228 3 35 40 0.65536000000000000000e5
-4228 4 22 31 0.65536000000000000000e5
-4229 4 21 33 -0.65536000000000000000e5
-4229 4 22 32 0.65536000000000000000e5
-4230 1 24 55 0.65536000000000000000e5
-4230 1 26 41 -0.65536000000000000000e5
-4230 3 6 55 0.65536000000000000000e5
-4230 3 10 55 -0.26214400000000000000e6
-4230 3 27 40 0.65536000000000000000e5
-4230 3 35 48 0.26214400000000000000e6
-4230 3 40 45 -0.13107200000000000000e6
-4230 4 21 33 -0.65536000000000000000e5
-4230 4 22 33 0.65536000000000000000e5
-4230 4 22 34 -0.13107200000000000000e6
-4231 1 1 48 -0.32768000000000000000e5
-4231 1 2 49 -0.32768000000000000000e5
-4231 1 8 39 -0.65536000000000000000e5
-4231 1 9 40 -0.65536000000000000000e5
-4231 1 10 41 0.13107200000000000000e6
-4231 1 12 43 0.26214400000000000000e6
-4231 1 23 38 -0.32768000000000000000e5
-4231 1 26 41 0.65536000000000000000e5
-4231 1 28 43 -0.26214400000000000000e6
-4231 1 32 47 -0.26214400000000000000e6
-4231 1 33 48 0.13107200000000000000e6
-4231 1 40 55 -0.65536000000000000000e5
-4231 2 2 32 -0.32768000000000000000e5
-4231 2 4 34 0.65536000000000000000e5
-4231 2 16 30 -0.65536000000000000000e5
-4231 2 20 34 -0.13107200000000000000e6
-4231 2 28 34 -0.65536000000000000000e5
-4231 3 5 50 0.65536000000000000000e5
-4231 3 9 38 -0.65536000000000000000e5
-4231 3 10 55 0.13107200000000000000e6
-4231 3 22 35 -0.26214400000000000000e6
-4231 3 22 51 -0.65536000000000000000e5
-4231 3 23 52 0.13107200000000000000e6
-4231 3 26 55 0.65536000000000000000e5
-4231 3 27 40 0.65536000000000000000e5
-4231 3 28 41 -0.26214400000000000000e6
-4231 3 35 48 -0.26214400000000000000e6
-4231 3 38 51 0.65536000000000000000e5
-4231 3 39 52 -0.13107200000000000000e6
-4231 3 40 45 0.13107200000000000000e6
-4231 4 2 30 -0.65536000000000000000e5
-4231 4 6 34 -0.13107200000000000000e6
-4231 4 7 35 -0.65536000000000000000e5
-4231 4 22 34 0.13107200000000000000e6
-4231 4 22 35 0.65536000000000000000e5
-4232 1 3 18 -0.16384000000000000000e5
-4232 1 4 19 0.32768000000000000000e5
-4232 1 5 36 0.32768000000000000000e5
-4232 1 12 43 0.16384000000000000000e5
-4232 1 14 45 -0.32768000000000000000e5
-4232 1 17 32 -0.65536000000000000000e5
-4232 1 19 50 0.65536000000000000000e5
-4232 1 34 41 -0.32768000000000000000e5
-4232 3 3 16 -0.16384000000000000000e5
-4232 3 4 17 -0.16384000000000000000e5
-4232 3 14 27 0.16384000000000000000e5
-4232 3 15 44 -0.32768000000000000000e5
-4232 3 16 29 0.32768000000000000000e5
-4232 3 16 45 0.65536000000000000000e5
-4232 4 2 14 -0.16384000000000000000e5
-4232 4 11 23 0.32768000000000000000e5
-4232 4 15 27 -0.32768000000000000000e5
-4232 4 23 23 0.65536000000000000000e5
-4233 4 15 27 -0.65536000000000000000e5
-4233 4 23 24 0.65536000000000000000e5
-4234 1 3 18 0.16384000000000000000e5
-4234 1 4 19 -0.32768000000000000000e5
-4234 1 5 36 -0.32768000000000000000e5
-4234 1 6 21 -0.65536000000000000000e5
-4234 1 12 43 -0.16384000000000000000e5
-4234 1 13 44 0.32768000000000000000e5
-4234 1 14 45 0.32768000000000000000e5
-4234 1 15 46 0.65536000000000000000e5
-4234 2 9 15 -0.65536000000000000000e5
-4234 2 25 31 0.65536000000000000000e5
-4234 3 3 16 0.16384000000000000000e5
-4234 3 4 17 0.16384000000000000000e5
-4234 3 7 20 0.65536000000000000000e5
-4234 3 8 21 -0.13107200000000000000e6
-4234 3 14 19 0.13107200000000000000e6
-4234 3 14 27 -0.16384000000000000000e5
-4234 3 16 29 -0.32768000000000000000e5
-4234 3 18 31 -0.65536000000000000000e5
-4234 3 19 32 0.13107200000000000000e6
-4234 4 2 14 0.16384000000000000000e5
-4234 4 10 14 0.65536000000000000000e5
-4234 4 11 23 -0.32768000000000000000e5
-4234 4 23 25 0.65536000000000000000e5
-4235 4 6 34 -0.65536000000000000000e5
-4235 4 23 26 0.65536000000000000000e5
-4236 1 6 53 0.16384000000000000000e5
-4236 1 25 40 -0.16384000000000000000e5
-4236 2 4 34 0.32768000000000000000e5
-4236 2 21 35 -0.32768000000000000000e5
-4236 3 5 50 0.32768000000000000000e5
-4236 3 14 51 0.13107200000000000000e6
-4236 3 18 47 -0.13107200000000000000e6
-4236 3 24 37 0.16384000000000000000e5
-4236 3 27 40 0.65536000000000000000e5
-4236 3 30 43 -0.65536000000000000000e5
-4236 4 4 32 -0.16384000000000000000e5
-4236 4 7 35 -0.32768000000000000000e5
-4236 4 16 28 0.16384000000000000000e5
-4236 4 19 31 -0.65536000000000000000e5
-4236 4 23 28 0.65536000000000000000e5
-4237 1 6 53 0.81920000000000000000e4
-4237 1 25 40 -0.81920000000000000000e4
-4237 2 4 34 0.16384000000000000000e5
-4237 2 21 35 -0.16384000000000000000e5
-4237 3 5 50 0.16384000000000000000e5
-4237 3 7 52 0.65536000000000000000e5
-4237 3 18 47 0.65536000000000000000e5
-4237 3 24 37 0.81920000000000000000e4
-4237 3 27 40 0.32768000000000000000e5
-4237 3 28 41 0.32768000000000000000e5
-4237 3 29 42 0.32768000000000000000e5
-4237 3 31 44 -0.13107200000000000000e6
-4237 4 4 32 -0.81920000000000000000e4
-4237 4 7 35 -0.16384000000000000000e5
-4237 4 16 28 0.81920000000000000000e4
-4237 4 23 27 0.32768000000000000000e5
-4237 4 23 29 0.65536000000000000000e5
-4238 1 6 53 0.81920000000000000000e4
-4238 1 25 40 -0.81920000000000000000e4
-4238 2 4 34 0.16384000000000000000e5
-4238 2 21 35 -0.16384000000000000000e5
-4238 3 5 50 0.16384000000000000000e5
-4238 3 14 51 0.65536000000000000000e5
-4238 3 18 47 0.65536000000000000000e5
-4238 3 19 48 -0.13107200000000000000e6
-4238 3 24 37 0.81920000000000000000e4
-4238 3 27 40 0.32768000000000000000e5
-4238 3 28 41 0.32768000000000000000e5
-4238 3 29 42 0.32768000000000000000e5
-4238 4 4 32 -0.81920000000000000000e4
-4238 4 7 35 -0.16384000000000000000e5
-4238 4 16 28 0.81920000000000000000e4
-4238 4 23 27 0.32768000000000000000e5
-4238 4 23 30 0.65536000000000000000e5
-4239 3 19 48 0.65536000000000000000e5
-4239 3 31 44 0.65536000000000000000e5
-4239 3 32 45 0.65536000000000000000e5
-4239 3 36 41 -0.13107200000000000000e6
-4239 4 23 31 0.65536000000000000000e5
-4240 1 32 47 0.65536000000000000000e5
-4240 1 37 52 -0.65536000000000000000e5
-4240 3 10 55 -0.65536000000000000000e5
-4240 3 23 52 0.65536000000000000000e5
-4240 3 34 47 -0.13107200000000000000e6
-4240 3 35 48 0.13107200000000000000e6
-4240 3 40 45 -0.65536000000000000000e5
-4240 4 22 34 -0.65536000000000000000e5
-4240 4 23 32 0.65536000000000000000e5
-4241 1 34 49 -0.13107200000000000000e6
-4241 1 44 51 0.13107200000000000000e6
-4241 3 23 52 0.65536000000000000000e5
-4241 3 35 48 0.13107200000000000000e6
-4241 3 40 45 -0.65536000000000000000e5
-4241 4 22 34 -0.65536000000000000000e5
-4241 4 23 33 0.65536000000000000000e5
-4242 1 34 49 0.65536000000000000000e5
-4242 1 44 51 -0.65536000000000000000e5
-4242 3 34 47 0.65536000000000000000e5
-4242 3 35 48 0.65536000000000000000e5
-4242 3 41 46 -0.13107200000000000000e6
-4242 4 23 34 0.65536000000000000000e5
-4243 1 14 45 -0.32768000000000000000e5
-4243 1 15 46 -0.65536000000000000000e5
-4243 1 17 48 0.16384000000000000000e5
-4243 1 18 49 0.16384000000000000000e5
-4243 1 20 51 0.65536000000000000000e5
-4243 1 34 49 0.16384000000000000000e5
-4243 2 14 28 0.16384000000000000000e5
-4243 3 14 43 0.16384000000000000000e5
-4243 3 16 45 0.65536000000000000000e5
-4243 3 18 47 0.16384000000000000000e5
-4243 3 22 35 -0.16384000000000000000e5
-4243 3 30 35 0.32768000000000000000e5
-4243 4 14 26 -0.16384000000000000000e5
-4243 4 15 27 -0.32768000000000000000e5
-4243 4 24 24 0.65536000000000000000e5
-4244 1 15 46 0.65536000000000000000e5
-4244 1 20 51 -0.65536000000000000000e5
-4244 3 15 46 0.65536000000000000000e5
-4244 3 16 45 0.65536000000000000000e5
-4244 3 17 46 -0.13107200000000000000e6
-4244 4 24 25 0.65536000000000000000e5
-4245 4 23 27 -0.65536000000000000000e5
-4245 4 24 26 0.65536000000000000000e5
-4246 1 6 53 0.16384000000000000000e5
-4246 1 25 40 -0.16384000000000000000e5
-4246 2 4 34 0.32768000000000000000e5
-4246 2 21 35 -0.32768000000000000000e5
-4246 3 5 50 0.32768000000000000000e5
-4246 3 14 51 0.13107200000000000000e6
-4246 3 18 47 -0.13107200000000000000e6
-4246 3 24 37 0.16384000000000000000e5
-4246 3 27 40 0.65536000000000000000e5
-4246 3 30 43 -0.65536000000000000000e5
-4246 4 4 32 -0.16384000000000000000e5
-4246 4 7 35 -0.32768000000000000000e5
-4246 4 16 28 0.16384000000000000000e5
-4246 4 19 31 -0.65536000000000000000e5
-4246 4 24 27 0.65536000000000000000e5
-4247 4 19 31 -0.65536000000000000000e5
-4247 4 24 28 0.65536000000000000000e5
-4248 1 6 53 0.81920000000000000000e4
-4248 1 25 40 -0.81920000000000000000e4
-4248 2 4 34 0.16384000000000000000e5
-4248 2 21 35 -0.16384000000000000000e5
-4248 3 5 50 0.16384000000000000000e5
-4248 3 14 51 0.65536000000000000000e5
-4248 3 18 47 0.65536000000000000000e5
-4248 3 19 48 -0.13107200000000000000e6
-4248 3 24 37 0.81920000000000000000e4
-4248 3 27 40 0.32768000000000000000e5
-4248 3 28 41 0.32768000000000000000e5
-4248 3 29 42 0.32768000000000000000e5
-4248 4 4 32 -0.81920000000000000000e4
-4248 4 7 35 -0.16384000000000000000e5
-4248 4 16 28 0.81920000000000000000e4
-4248 4 23 27 0.32768000000000000000e5
-4248 4 24 29 0.65536000000000000000e5
-4249 3 14 51 0.65536000000000000000e5
-4249 3 18 47 0.65536000000000000000e5
-4249 3 32 45 -0.13107200000000000000e6
-4249 3 35 40 0.65536000000000000000e5
-4249 4 24 30 0.65536000000000000000e5
-4250 1 20 51 -0.13107200000000000000e6
-4250 1 36 51 0.13107200000000000000e6
-4250 3 19 48 0.65536000000000000000e5
-4250 3 20 49 0.65536000000000000000e5
-4250 3 32 45 0.65536000000000000000e5
-4250 4 24 31 0.65536000000000000000e5
-4251 1 34 49 -0.13107200000000000000e6
-4251 1 44 51 0.13107200000000000000e6
-4251 3 23 52 0.65536000000000000000e5
-4251 3 35 48 0.13107200000000000000e6
-4251 3 40 45 -0.65536000000000000000e5
-4251 4 22 34 -0.65536000000000000000e5
-4251 4 24 32 0.65536000000000000000e5
-4252 4 22 34 -0.65536000000000000000e5
-4252 4 24 33 0.65536000000000000000e5
-4253 4 24 34 0.65536000000000000000e5
-4253 4 25 33 -0.65536000000000000000e5
-4254 4 24 35 0.65536000000000000000e5
-4254 4 30 34 -0.65536000000000000000e5
-4255 1 6 53 0.81920000000000000000e4
-4255 1 25 40 -0.81920000000000000000e4
-4255 2 4 34 0.16384000000000000000e5
-4255 2 21 35 -0.16384000000000000000e5
-4255 3 5 50 0.16384000000000000000e5
-4255 3 7 52 0.65536000000000000000e5
-4255 3 18 47 0.65536000000000000000e5
-4255 3 24 37 0.81920000000000000000e4
-4255 3 27 40 0.32768000000000000000e5
-4255 3 28 41 0.32768000000000000000e5
-4255 3 29 42 0.32768000000000000000e5
-4255 3 31 44 -0.13107200000000000000e6
-4255 4 4 32 -0.81920000000000000000e4
-4255 4 7 35 -0.16384000000000000000e5
-4255 4 16 28 0.81920000000000000000e4
-4255 4 23 27 0.32768000000000000000e5
-4255 4 25 26 0.65536000000000000000e5
-4256 1 6 53 0.81920000000000000000e4
-4256 1 25 40 -0.81920000000000000000e4
-4256 2 4 34 0.16384000000000000000e5
-4256 2 21 35 -0.16384000000000000000e5
-4256 3 5 50 0.16384000000000000000e5
-4256 3 14 51 0.65536000000000000000e5
-4256 3 18 47 0.65536000000000000000e5
-4256 3 19 48 -0.13107200000000000000e6
-4256 3 24 37 0.81920000000000000000e4
-4256 3 27 40 0.32768000000000000000e5
-4256 3 28 41 0.32768000000000000000e5
-4256 3 29 42 0.32768000000000000000e5
-4256 4 4 32 -0.81920000000000000000e4
-4256 4 7 35 -0.16384000000000000000e5
-4256 4 16 28 0.81920000000000000000e4
-4256 4 23 27 0.32768000000000000000e5
-4256 4 25 27 0.65536000000000000000e5
-4257 3 14 51 0.65536000000000000000e5
-4257 3 18 47 0.65536000000000000000e5
-4257 3 32 45 -0.13107200000000000000e6
-4257 3 35 40 0.65536000000000000000e5
-4257 4 25 28 0.65536000000000000000e5
-4258 3 19 48 0.65536000000000000000e5
-4258 3 31 44 0.65536000000000000000e5
-4258 3 32 45 0.65536000000000000000e5
-4258 3 36 41 -0.13107200000000000000e6
-4258 4 25 29 0.65536000000000000000e5
-4259 1 20 51 -0.13107200000000000000e6
-4259 1 36 51 0.13107200000000000000e6
-4259 3 19 48 0.65536000000000000000e5
-4259 3 20 49 0.65536000000000000000e5
-4259 3 32 45 0.65536000000000000000e5
-4259 4 25 30 0.65536000000000000000e5
-4260 1 20 51 0.65536000000000000000e5
-4260 1 36 51 -0.65536000000000000000e5
-4260 3 21 50 -0.13107200000000000000e6
-4260 3 33 46 0.65536000000000000000e5
-4260 3 36 41 0.65536000000000000000e5
-4260 4 25 31 0.65536000000000000000e5
-4261 1 34 49 0.65536000000000000000e5
-4261 1 44 51 -0.65536000000000000000e5
-4261 3 34 47 0.65536000000000000000e5
-4261 3 35 48 0.65536000000000000000e5
-4261 3 41 46 -0.13107200000000000000e6
-4261 4 25 32 0.65536000000000000000e5
-4262 4 15 35 -0.65536000000000000000e5
-4262 4 25 34 0.65536000000000000000e5
-4263 1 44 51 0.65536000000000000000e5
-4263 1 46 53 -0.65536000000000000000e5
-4263 3 19 56 -0.13107200000000000000e6
-4263 3 43 52 0.65536000000000000000e5
-4263 3 45 50 0.65536000000000000000e5
-4263 4 25 35 0.65536000000000000000e5
-4264 1 2 49 0.32768000000000000000e5
-4264 1 6 53 -0.65536000000000000000e5
-4264 1 8 39 -0.65536000000000000000e5
-4264 1 9 40 -0.65536000000000000000e5
-4264 1 10 41 0.13107200000000000000e6
-4264 1 23 38 0.32768000000000000000e5
-4264 1 24 39 0.32768000000000000000e5
-4264 1 25 40 0.65536000000000000000e5
-4264 1 26 41 0.65536000000000000000e5
-4264 1 32 47 -0.13107200000000000000e6
-4264 2 26 32 0.32768000000000000000e5
-4264 3 2 47 -0.32768000000000000000e5
-4264 3 9 38 -0.65536000000000000000e5
-4264 3 24 37 -0.65536000000000000000e5
-4264 3 25 38 0.32768000000000000000e5
-4264 3 27 40 -0.19660800000000000000e6
-4264 4 2 30 -0.65536000000000000000e5
-4264 4 4 32 0.65536000000000000000e5
-4264 4 16 28 -0.32768000000000000000e5
-4264 4 17 29 -0.65536000000000000000e5
-4264 4 26 26 0.65536000000000000000e5
-4265 1 1 48 -0.65536000000000000000e5
-4265 1 2 49 -0.65536000000000000000e5
-4265 1 6 53 -0.13107200000000000000e6
-4265 1 8 39 -0.26214400000000000000e6
-4265 1 9 40 -0.26214400000000000000e6
-4265 1 10 41 0.52428800000000000000e6
-4265 1 12 43 0.52428800000000000000e6
-4265 1 22 53 0.65536000000000000000e5
-4265 1 23 38 -0.65536000000000000000e5
-4265 1 24 55 0.13107200000000000000e6
-4265 1 25 40 0.13107200000000000000e6
-4265 1 26 41 0.13107200000000000000e6
-4265 1 28 43 -0.26214400000000000000e6
-4265 1 32 47 -0.52428800000000000000e6
-4265 1 37 52 -0.26214400000000000000e6
-4265 1 40 47 -0.65536000000000000000e5
-4265 2 2 32 -0.65536000000000000000e5
-4265 2 3 33 -0.65536000000000000000e5
-4265 2 16 30 -0.13107200000000000000e6
-4265 2 20 34 -0.26214400000000000000e6
-4265 2 26 32 0.65536000000000000000e5
-4265 3 9 38 -0.26214400000000000000e6
-4265 3 22 35 -0.52428800000000000000e6
-4265 3 22 51 -0.26214400000000000000e6
-4265 3 24 37 -0.13107200000000000000e6
-4265 3 27 40 -0.26214400000000000000e6
-4265 3 28 41 -0.52428800000000000000e6
-4265 4 2 30 -0.26214400000000000000e6
-4265 4 4 32 0.13107200000000000000e6
-4265 4 6 34 -0.26214400000000000000e6
-4265 4 16 28 -0.65536000000000000000e5
-4265 4 17 29 -0.13107200000000000000e6
-4265 4 20 32 -0.13107200000000000000e6
-4265 4 26 27 0.65536000000000000000e5
-4266 1 1 48 -0.65536000000000000000e5
-4266 1 2 49 -0.13107200000000000000e6
-4266 1 8 39 -0.13107200000000000000e6
-4266 1 9 40 -0.13107200000000000000e6
-4266 1 10 41 0.26214400000000000000e6
-4266 1 12 43 0.52428800000000000000e6
-4266 1 23 38 -0.65536000000000000000e5
-4266 1 23 54 -0.65536000000000000000e5
-4266 1 24 55 0.13107200000000000000e6
-4266 1 25 40 0.65536000000000000000e5
-4266 1 25 56 -0.65536000000000000000e5
-4266 1 28 43 -0.26214400000000000000e6
-4266 1 32 47 -0.52428800000000000000e6
-4266 1 40 47 -0.65536000000000000000e5
-4266 2 2 32 -0.65536000000000000000e5
-4266 2 3 33 -0.65536000000000000000e5
-4266 2 16 30 -0.13107200000000000000e6
-4266 2 20 34 -0.26214400000000000000e6
-4266 3 9 38 -0.13107200000000000000e6
-4266 3 22 35 -0.52428800000000000000e6
-4266 3 24 53 0.65536000000000000000e5
-4266 3 25 54 0.65536000000000000000e5
-4266 3 28 41 -0.52428800000000000000e6
-4266 3 38 51 -0.13107200000000000000e6
-4266 4 2 30 -0.13107200000000000000e6
-4266 4 4 32 0.65536000000000000000e5
-4266 4 6 34 -0.26214400000000000000e6
-4266 4 26 28 0.65536000000000000000e5
-4266 4 28 32 0.65536000000000000000e5
-4267 4 20 32 -0.65536000000000000000e5
-4267 4 26 29 0.65536000000000000000e5
-4268 4 7 35 -0.65536000000000000000e5
-4268 4 26 30 0.65536000000000000000e5
-4269 1 32 47 0.65536000000000000000e5
-4269 1 37 52 -0.65536000000000000000e5
-4269 3 10 55 -0.65536000000000000000e5
-4269 3 23 52 0.65536000000000000000e5
-4269 3 34 47 -0.13107200000000000000e6
-4269 3 35 48 0.13107200000000000000e6
-4269 3 40 45 -0.65536000000000000000e5
-4269 4 22 34 -0.65536000000000000000e5
-4269 4 26 31 0.65536000000000000000e5
-4270 1 1 48 0.65536000000000000000e5
-4270 1 2 49 0.65536000000000000000e5
-4270 1 6 53 0.13107200000000000000e6
-4270 1 8 39 0.26214400000000000000e6
-4270 1 9 40 0.26214400000000000000e6
-4270 1 10 41 -0.52428800000000000000e6
-4270 1 12 43 -0.52428800000000000000e6
-4270 1 22 53 -0.65536000000000000000e5
-4270 1 23 38 0.65536000000000000000e5
-4270 1 24 55 -0.13107200000000000000e6
-4270 1 25 40 -0.13107200000000000000e6
-4270 1 26 41 -0.13107200000000000000e6
-4270 1 28 43 0.26214400000000000000e6
-4270 1 32 47 0.52428800000000000000e6
-4270 1 37 52 0.26214400000000000000e6
-4270 1 40 47 0.65536000000000000000e5
-4270 2 2 32 0.65536000000000000000e5
-4270 2 16 30 0.13107200000000000000e6
-4270 2 20 34 0.26214400000000000000e6
-4270 2 26 32 -0.65536000000000000000e5
-4270 2 32 32 0.13107200000000000000e6
-4270 3 9 38 0.26214400000000000000e6
-4270 3 22 35 0.52428800000000000000e6
-4270 3 22 51 0.26214400000000000000e6
-4270 3 24 37 0.13107200000000000000e6
-4270 3 27 40 0.26214400000000000000e6
-4270 3 28 41 0.52428800000000000000e6
-4270 4 2 30 0.26214400000000000000e6
-4270 4 4 32 -0.13107200000000000000e6
-4270 4 6 34 0.26214400000000000000e6
-4270 4 16 28 0.13107200000000000000e6
-4270 4 17 29 0.13107200000000000000e6
-4270 4 20 32 0.13107200000000000000e6
-4270 4 26 32 0.65536000000000000000e5
-4271 1 23 54 0.65536000000000000000e5
-4271 1 24 55 -0.13107200000000000000e6
-4271 1 38 53 -0.65536000000000000000e5
-4271 1 41 56 0.13107200000000000000e6
-4271 3 25 54 -0.65536000000000000000e5
-4271 3 27 56 0.13107200000000000000e6
-4271 3 38 51 0.13107200000000000000e6
-4271 4 26 33 0.65536000000000000000e5
-4271 4 28 32 -0.65536000000000000000e5
-4272 1 1 48 -0.32768000000000000000e5
-4272 1 2 49 -0.32768000000000000000e5
-4272 1 8 39 -0.65536000000000000000e5
-4272 1 9 40 -0.65536000000000000000e5
-4272 1 10 41 0.13107200000000000000e6
-4272 1 12 43 0.26214400000000000000e6
-4272 1 23 38 -0.32768000000000000000e5
-4272 1 24 55 0.13107200000000000000e6
-4272 1 26 41 0.65536000000000000000e5
-4272 1 28 43 -0.26214400000000000000e6
-4272 1 32 47 -0.26214400000000000000e6
-4272 1 33 48 0.13107200000000000000e6
-4272 1 40 55 -0.65536000000000000000e5
-4272 1 41 56 -0.13107200000000000000e6
-4272 1 44 51 -0.26214400000000000000e6
-4272 1 46 53 0.26214400000000000000e6
-4272 2 2 32 -0.32768000000000000000e5
-4272 2 4 34 0.65536000000000000000e5
-4272 2 16 30 -0.65536000000000000000e5
-4272 2 20 34 -0.13107200000000000000e6
-4272 2 28 34 -0.65536000000000000000e5
-4272 3 5 50 0.65536000000000000000e5
-4272 3 9 38 -0.65536000000000000000e5
-4272 3 10 55 0.13107200000000000000e6
-4272 3 22 35 -0.26214400000000000000e6
-4272 3 22 51 -0.65536000000000000000e5
-4272 3 23 52 0.13107200000000000000e6
-4272 3 27 40 0.65536000000000000000e5
-4272 3 27 56 -0.13107200000000000000e6
-4272 3 28 41 -0.26214400000000000000e6
-4272 3 35 48 -0.26214400000000000000e6
-4272 3 37 50 0.65536000000000000000e5
-4272 3 38 51 0.13107200000000000000e6
-4272 3 39 52 0.13107200000000000000e6
-4272 3 40 45 0.13107200000000000000e6
-4272 4 2 30 -0.65536000000000000000e5
-4272 4 6 34 -0.13107200000000000000e6
-4272 4 7 35 -0.65536000000000000000e5
-4272 4 22 34 0.13107200000000000000e6
-4272 4 23 35 0.13107200000000000000e6
-4272 4 26 34 0.65536000000000000000e5
-4272 4 29 33 0.65536000000000000000e5
-4273 4 26 35 0.65536000000000000000e5
-4273 4 32 32 -0.13107200000000000000e6
-4274 1 1 48 -0.32768000000000000000e5
-4274 1 2 49 -0.65536000000000000000e5
-4274 1 8 39 -0.65536000000000000000e5
-4274 1 9 40 -0.65536000000000000000e5
-4274 1 10 41 0.13107200000000000000e6
-4274 1 12 43 0.26214400000000000000e6
-4274 1 23 38 -0.32768000000000000000e5
-4274 1 23 54 -0.32768000000000000000e5
-4274 1 24 55 0.65536000000000000000e5
-4274 1 25 40 0.32768000000000000000e5
-4274 1 25 56 -0.32768000000000000000e5
-4274 1 28 43 -0.13107200000000000000e6
-4274 1 32 47 -0.26214400000000000000e6
-4274 1 40 47 -0.32768000000000000000e5
-4274 2 2 32 -0.32768000000000000000e5
-4274 2 3 33 -0.32768000000000000000e5
-4274 2 16 30 -0.65536000000000000000e5
-4274 2 20 34 -0.13107200000000000000e6
-4274 3 9 38 -0.65536000000000000000e5
-4274 3 22 35 -0.26214400000000000000e6
-4274 3 24 53 0.32768000000000000000e5
-4274 3 25 54 0.32768000000000000000e5
-4274 3 28 41 -0.26214400000000000000e6
-4274 3 38 51 -0.65536000000000000000e5
-4274 4 2 30 -0.65536000000000000000e5
-4274 4 4 32 0.32768000000000000000e5
-4274 4 6 34 -0.13107200000000000000e6
-4274 4 27 27 0.65536000000000000000e5
-4274 4 28 32 0.32768000000000000000e5
-4275 1 1 48 -0.65536000000000000000e5
-4275 1 2 49 -0.13107200000000000000e6
-4275 1 6 53 0.65536000000000000000e5
-4275 1 8 39 -0.13107200000000000000e6
-4275 1 9 40 -0.13107200000000000000e6
-4275 1 10 41 0.26214400000000000000e6
-4275 1 12 43 0.52428800000000000000e6
-4275 1 23 38 -0.65536000000000000000e5
-4275 1 24 39 -0.65536000000000000000e5
-4275 1 24 55 -0.13107200000000000000e6
-4275 1 25 56 -0.65536000000000000000e5
-4275 1 26 41 0.26214400000000000000e6
-4275 1 28 43 -0.26214400000000000000e6
-4275 1 32 47 -0.52428800000000000000e6
-4275 1 40 47 -0.65536000000000000000e5
-4275 2 2 32 -0.65536000000000000000e5
-4275 2 3 33 -0.65536000000000000000e5
-4275 2 16 30 -0.13107200000000000000e6
-4275 2 20 34 -0.26214400000000000000e6
-4275 3 9 38 -0.13107200000000000000e6
-4275 3 22 35 -0.52428800000000000000e6
-4275 3 22 51 0.13107200000000000000e6
-4275 3 23 52 -0.26214400000000000000e6
-4275 3 24 53 0.65536000000000000000e5
-4275 3 25 38 -0.65536000000000000000e5
-4275 3 25 54 0.65536000000000000000e5
-4275 3 27 40 -0.13107200000000000000e6
-4275 3 28 41 -0.52428800000000000000e6
-4275 3 38 51 -0.13107200000000000000e6
-4275 3 39 40 0.65536000000000000000e5
-4275 4 2 30 -0.13107200000000000000e6
-4275 4 6 34 -0.26214400000000000000e6
-4275 4 7 35 0.13107200000000000000e6
-4275 4 27 28 0.65536000000000000000e5
-4275 4 28 32 0.65536000000000000000e5
-4276 4 7 35 -0.65536000000000000000e5
-4276 4 27 29 0.65536000000000000000e5
-4277 4 21 33 -0.65536000000000000000e5
-4277 4 27 30 0.65536000000000000000e5
-4278 1 34 49 -0.13107200000000000000e6
-4278 1 44 51 0.13107200000000000000e6
-4278 3 23 52 0.65536000000000000000e5
-4278 3 35 48 0.13107200000000000000e6
-4278 3 40 45 -0.65536000000000000000e5
-4278 4 22 34 -0.65536000000000000000e5
-4278 4 27 31 0.65536000000000000000e5
-4279 1 23 54 0.65536000000000000000e5
-4279 1 24 55 -0.13107200000000000000e6
-4279 1 38 53 -0.65536000000000000000e5
-4279 1 41 56 0.13107200000000000000e6
-4279 3 25 54 -0.65536000000000000000e5
-4279 3 27 56 0.13107200000000000000e6
-4279 3 38 51 0.13107200000000000000e6
-4279 4 27 32 0.65536000000000000000e5
-4279 4 28 32 -0.65536000000000000000e5
-4280 4 27 33 0.65536000000000000000e5
-4280 4 28 32 -0.65536000000000000000e5
-4281 4 27 34 0.65536000000000000000e5
-4281 4 29 33 -0.65536000000000000000e5
-4282 1 1 48 0.65536000000000000000e5
-4282 1 2 49 0.13107200000000000000e6
-4282 1 6 53 -0.65536000000000000000e5
-4282 1 8 39 0.13107200000000000000e6
-4282 1 9 40 0.13107200000000000000e6
-4282 1 10 41 -0.26214400000000000000e6
-4282 1 12 43 -0.52428800000000000000e6
-4282 1 23 38 0.65536000000000000000e5
-4282 1 24 39 0.65536000000000000000e5
-4282 1 24 55 0.13107200000000000000e6
-4282 1 25 56 0.65536000000000000000e5
-4282 1 26 41 -0.26214400000000000000e6
-4282 1 28 43 0.26214400000000000000e6
-4282 1 32 47 0.52428800000000000000e6
-4282 1 40 47 0.65536000000000000000e5
-4282 2 2 32 0.65536000000000000000e5
-4282 2 3 33 0.65536000000000000000e5
-4282 2 5 35 -0.65536000000000000000e5
-4282 2 16 30 0.13107200000000000000e6
-4282 2 20 34 0.26214400000000000000e6
-4282 2 33 35 0.65536000000000000000e5
-4282 3 9 38 0.13107200000000000000e6
-4282 3 22 35 0.52428800000000000000e6
-4282 3 22 51 -0.13107200000000000000e6
-4282 3 23 52 0.26214400000000000000e6
-4282 3 24 53 -0.65536000000000000000e5
-4282 3 25 38 0.65536000000000000000e5
-4282 3 25 54 -0.65536000000000000000e5
-4282 3 27 40 0.13107200000000000000e6
-4282 3 28 41 0.52428800000000000000e6
-4282 3 38 51 0.13107200000000000000e6
-4282 3 39 40 -0.65536000000000000000e5
-4282 4 2 30 0.13107200000000000000e6
-4282 4 6 34 0.26214400000000000000e6
-4282 4 7 35 -0.13107200000000000000e6
-4282 4 27 35 0.65536000000000000000e5
-4283 4 21 33 -0.65536000000000000000e5
-4283 4 28 29 0.65536000000000000000e5
-4284 1 24 55 0.65536000000000000000e5
-4284 1 26 41 -0.65536000000000000000e5
-4284 3 6 55 0.65536000000000000000e5
-4284 3 10 55 -0.26214400000000000000e6
-4284 3 27 40 0.65536000000000000000e5
-4284 3 35 48 0.26214400000000000000e6
-4284 3 40 45 -0.13107200000000000000e6
-4284 4 21 33 -0.65536000000000000000e5
-4284 4 22 34 -0.13107200000000000000e6
-4284 4 28 30 0.65536000000000000000e5
-4285 4 22 34 -0.65536000000000000000e5
-4285 4 28 31 0.65536000000000000000e5
-4286 4 19 35 -0.65536000000000000000e5
-4286 4 28 33 0.65536000000000000000e5
-4287 1 1 48 -0.32768000000000000000e5
-4287 1 2 49 -0.32768000000000000000e5
-4287 1 8 39 -0.65536000000000000000e5
-4287 1 9 40 -0.65536000000000000000e5
-4287 1 10 41 0.13107200000000000000e6
-4287 1 12 43 0.26214400000000000000e6
-4287 1 23 38 -0.32768000000000000000e5
-4287 1 26 41 0.65536000000000000000e5
-4287 1 28 43 -0.26214400000000000000e6
-4287 1 32 47 -0.26214400000000000000e6
-4287 1 33 48 0.13107200000000000000e6
-4287 1 40 55 -0.65536000000000000000e5
-4287 2 2 32 -0.32768000000000000000e5
-4287 2 4 34 0.65536000000000000000e5
-4287 2 16 30 -0.65536000000000000000e5
-4287 2 20 34 -0.13107200000000000000e6
-4287 2 28 34 -0.65536000000000000000e5
-4287 3 5 50 0.65536000000000000000e5
-4287 3 9 38 -0.65536000000000000000e5
-4287 3 10 55 0.13107200000000000000e6
-4287 3 22 35 -0.26214400000000000000e6
-4287 3 22 51 -0.65536000000000000000e5
-4287 3 23 52 0.13107200000000000000e6
-4287 3 26 55 0.65536000000000000000e5
-4287 3 27 40 0.65536000000000000000e5
-4287 3 28 41 -0.26214400000000000000e6
-4287 3 35 48 -0.26214400000000000000e6
-4287 3 38 51 0.65536000000000000000e5
-4287 3 39 52 -0.13107200000000000000e6
-4287 3 40 45 0.13107200000000000000e6
-4287 4 2 30 -0.65536000000000000000e5
-4287 4 6 34 -0.13107200000000000000e6
-4287 4 7 35 -0.65536000000000000000e5
-4287 4 22 34 0.13107200000000000000e6
-4287 4 28 34 0.65536000000000000000e5
-4288 4 28 35 0.65536000000000000000e5
-4288 4 33 33 -0.13107200000000000000e6
-4289 1 32 47 0.32768000000000000000e5
-4289 1 37 52 -0.32768000000000000000e5
-4289 3 10 55 -0.32768000000000000000e5
-4289 3 23 52 0.32768000000000000000e5
-4289 3 34 47 -0.65536000000000000000e5
-4289 3 35 48 0.65536000000000000000e5
-4289 3 40 45 -0.32768000000000000000e5
-4289 4 22 34 -0.32768000000000000000e5
-4289 4 29 29 0.65536000000000000000e5
-4290 1 34 49 -0.13107200000000000000e6
-4290 1 44 51 0.13107200000000000000e6
-4290 3 23 52 0.65536000000000000000e5
-4290 3 35 48 0.13107200000000000000e6
-4290 3 40 45 -0.65536000000000000000e5
-4290 4 22 34 -0.65536000000000000000e5
-4290 4 29 30 0.65536000000000000000e5
-4291 1 34 49 0.65536000000000000000e5
-4291 1 44 51 -0.65536000000000000000e5
-4291 3 34 47 0.65536000000000000000e5
-4291 3 35 48 0.65536000000000000000e5
-4291 3 41 46 -0.13107200000000000000e6
-4291 4 29 31 0.65536000000000000000e5
-4292 1 1 48 -0.32768000000000000000e5
-4292 1 2 49 -0.32768000000000000000e5
-4292 1 8 39 -0.65536000000000000000e5
-4292 1 9 40 -0.65536000000000000000e5
-4292 1 10 41 0.13107200000000000000e6
-4292 1 12 43 0.26214400000000000000e6
-4292 1 23 38 -0.32768000000000000000e5
-4292 1 24 55 0.13107200000000000000e6
-4292 1 26 41 0.65536000000000000000e5
-4292 1 28 43 -0.26214400000000000000e6
-4292 1 32 47 -0.26214400000000000000e6
-4292 1 33 48 0.13107200000000000000e6
-4292 1 40 55 -0.65536000000000000000e5
-4292 1 41 56 -0.13107200000000000000e6
-4292 1 44 51 -0.26214400000000000000e6
-4292 1 46 53 0.26214400000000000000e6
-4292 2 2 32 -0.32768000000000000000e5
-4292 2 4 34 0.65536000000000000000e5
-4292 2 16 30 -0.65536000000000000000e5
-4292 2 20 34 -0.13107200000000000000e6
-4292 2 28 34 -0.65536000000000000000e5
-4292 3 5 50 0.65536000000000000000e5
-4292 3 9 38 -0.65536000000000000000e5
-4292 3 10 55 0.13107200000000000000e6
-4292 3 22 35 -0.26214400000000000000e6
-4292 3 22 51 -0.65536000000000000000e5
-4292 3 23 52 0.13107200000000000000e6
-4292 3 27 40 0.65536000000000000000e5
-4292 3 27 56 -0.13107200000000000000e6
-4292 3 28 41 -0.26214400000000000000e6
-4292 3 35 48 -0.26214400000000000000e6
-4292 3 37 50 0.65536000000000000000e5
-4292 3 38 51 0.13107200000000000000e6
-4292 3 39 52 0.13107200000000000000e6
-4292 3 40 45 0.13107200000000000000e6
-4292 4 2 30 -0.65536000000000000000e5
-4292 4 6 34 -0.13107200000000000000e6
-4292 4 7 35 -0.65536000000000000000e5
-4292 4 22 34 0.13107200000000000000e6
-4292 4 23 35 0.13107200000000000000e6
-4292 4 29 32 0.65536000000000000000e5
-4292 4 29 33 0.65536000000000000000e5
-4293 4 23 35 -0.65536000000000000000e5
-4293 4 29 34 0.65536000000000000000e5
-4294 3 27 56 0.65536000000000000000e5
-4294 3 41 54 0.65536000000000000000e5
-4294 3 47 52 -0.13107200000000000000e6
-4294 3 49 50 0.65536000000000000000e5
-4294 4 29 35 0.65536000000000000000e5
-4295 4 22 34 -0.32768000000000000000e5
-4295 4 30 30 0.65536000000000000000e5
-4296 4 25 33 -0.65536000000000000000e5
-4296 4 30 31 0.65536000000000000000e5
-4297 4 29 33 -0.65536000000000000000e5
-4297 4 30 32 0.65536000000000000000e5
-4298 1 1 48 -0.32768000000000000000e5
-4298 1 2 49 -0.32768000000000000000e5
-4298 1 8 39 -0.65536000000000000000e5
-4298 1 9 40 -0.65536000000000000000e5
-4298 1 10 41 0.13107200000000000000e6
-4298 1 12 43 0.26214400000000000000e6
-4298 1 23 38 -0.32768000000000000000e5
-4298 1 26 41 0.65536000000000000000e5
-4298 1 28 43 -0.26214400000000000000e6
-4298 1 32 47 -0.26214400000000000000e6
-4298 1 33 48 0.13107200000000000000e6
-4298 1 40 55 -0.65536000000000000000e5
-4298 2 2 32 -0.32768000000000000000e5
-4298 2 4 34 0.65536000000000000000e5
-4298 2 16 30 -0.65536000000000000000e5
-4298 2 20 34 -0.13107200000000000000e6
-4298 2 28 34 -0.65536000000000000000e5
-4298 3 5 50 0.65536000000000000000e5
-4298 3 9 38 -0.65536000000000000000e5
-4298 3 10 55 0.13107200000000000000e6
-4298 3 22 35 -0.26214400000000000000e6
-4298 3 22 51 -0.65536000000000000000e5
-4298 3 23 52 0.13107200000000000000e6
-4298 3 26 55 0.65536000000000000000e5
-4298 3 27 40 0.65536000000000000000e5
-4298 3 28 41 -0.26214400000000000000e6
-4298 3 35 48 -0.26214400000000000000e6
-4298 3 38 51 0.65536000000000000000e5
-4298 3 39 52 -0.13107200000000000000e6
-4298 3 40 45 0.13107200000000000000e6
-4298 4 2 30 -0.65536000000000000000e5
-4298 4 6 34 -0.13107200000000000000e6
-4298 4 7 35 -0.65536000000000000000e5
-4298 4 22 34 0.13107200000000000000e6
-4298 4 30 33 0.65536000000000000000e5
-4299 3 40 55 0.65536000000000000000e5
-4299 3 41 54 0.65536000000000000000e5
-4299 3 42 55 -0.13107200000000000000e6
-4299 3 49 50 0.65536000000000000000e5
-4299 4 30 35 0.65536000000000000000e5
-4300 4 15 35 -0.32768000000000000000e5
-4300 4 31 31 0.65536000000000000000e5
-4301 4 23 35 -0.65536000000000000000e5
-4301 4 31 32 0.65536000000000000000e5
-4302 4 30 34 -0.65536000000000000000e5
-4302 4 31 33 0.65536000000000000000e5
-4303 1 44 51 0.65536000000000000000e5
-4303 1 46 53 -0.65536000000000000000e5
-4303 3 19 56 -0.13107200000000000000e6
-4303 3 43 52 0.65536000000000000000e5
-4303 3 45 50 0.65536000000000000000e5
-4303 4 31 34 0.65536000000000000000e5
-4304 1 1 48 0.65536000000000000000e5
-4304 1 2 49 0.13107200000000000000e6
-4304 1 6 53 -0.65536000000000000000e5
-4304 1 8 39 0.13107200000000000000e6
-4304 1 9 40 0.13107200000000000000e6
-4304 1 10 41 -0.26214400000000000000e6
-4304 1 12 43 -0.52428800000000000000e6
-4304 1 23 38 0.65536000000000000000e5
-4304 1 24 39 0.65536000000000000000e5
-4304 1 24 55 0.13107200000000000000e6
-4304 1 25 56 0.65536000000000000000e5
-4304 1 26 41 -0.26214400000000000000e6
-4304 1 28 43 0.26214400000000000000e6
-4304 1 32 47 0.52428800000000000000e6
-4304 1 40 47 0.65536000000000000000e5
-4304 2 2 32 0.65536000000000000000e5
-4304 2 3 33 0.65536000000000000000e5
-4304 2 5 35 -0.65536000000000000000e5
-4304 2 16 30 0.13107200000000000000e6
-4304 2 20 34 0.26214400000000000000e6
-4304 2 33 35 0.65536000000000000000e5
-4304 3 9 38 0.13107200000000000000e6
-4304 3 22 35 0.52428800000000000000e6
-4304 3 22 51 -0.13107200000000000000e6
-4304 3 23 52 0.26214400000000000000e6
-4304 3 24 53 -0.65536000000000000000e5
-4304 3 25 38 0.65536000000000000000e5
-4304 3 25 54 -0.65536000000000000000e5
-4304 3 27 40 0.13107200000000000000e6
-4304 3 28 41 0.52428800000000000000e6
-4304 3 38 51 0.13107200000000000000e6
-4304 3 39 40 -0.65536000000000000000e5
-4304 4 2 30 0.13107200000000000000e6
-4304 4 6 34 0.26214400000000000000e6
-4304 4 7 35 -0.13107200000000000000e6
-4304 4 32 33 0.65536000000000000000e5
-4305 3 27 56 0.65536000000000000000e5
-4305 3 41 54 0.65536000000000000000e5
-4305 3 47 52 -0.13107200000000000000e6
-4305 3 49 50 0.65536000000000000000e5
-4305 4 32 34 0.65536000000000000000e5
-4306 2 33 35 -0.65536000000000000000e5
-4306 2 35 35 0.13107200000000000000e6
-4306 4 32 35 0.65536000000000000000e5
-4307 3 40 55 0.65536000000000000000e5
-4307 3 41 54 0.65536000000000000000e5
-4307 3 42 55 -0.13107200000000000000e6
-4307 3 49 50 0.65536000000000000000e5
-4307 4 33 34 0.65536000000000000000e5
-4308 1 1 48 0.13107200000000000000e6
-4308 1 2 49 0.19660800000000000000e6
-4308 1 6 53 -0.65536000000000000000e5
-4308 1 8 39 0.26214400000000000000e6
-4308 1 9 40 0.26214400000000000000e6
-4308 1 10 41 -0.52428800000000000000e6
-4308 1 12 43 -0.10485760000000000000e7
-4308 1 23 38 0.13107200000000000000e6
-4308 1 24 39 0.65536000000000000000e5
-4308 1 26 41 -0.39321600000000000000e6
-4308 1 28 43 0.78643200000000000000e6
-4308 1 32 47 0.10485760000000000000e7
-4308 1 40 55 -0.13107200000000000000e6
-4308 1 49 56 -0.65536000000000000000e5
-4308 1 54 55 0.13107200000000000000e6
-4308 2 2 32 0.13107200000000000000e6
-4308 2 3 33 0.65536000000000000000e5
-4308 2 4 34 -0.13107200000000000000e6
-4308 2 5 35 -0.65536000000000000000e5
-4308 2 16 30 0.26214400000000000000e6
-4308 2 20 34 0.52428800000000000000e6
-4308 3 5 50 -0.13107200000000000000e6
-4308 3 9 38 0.26214400000000000000e6
-4308 3 22 35 0.10485760000000000000e7
-4308 3 25 38 0.65536000000000000000e5
-4308 3 25 54 -0.65536000000000000000e5
-4308 3 28 41 0.10485760000000000000e7
-4308 3 39 40 -0.65536000000000000000e5
-4308 3 40 53 -0.65536000000000000000e5
-4308 3 48 53 0.65536000000000000000e5
-4308 3 49 50 0.13107200000000000000e6
-4308 3 49 54 0.65536000000000000000e5
-4308 4 2 30 0.26214400000000000000e6
-4308 4 6 34 0.52428800000000000000e6
-4308 4 33 35 0.65536000000000000000e5
-4309 4 31 35 -0.32768000000000000000e5
-4309 4 34 34 0.65536000000000000000e5
-4310 1 40 55 0.65536000000000000000e5
-4310 1 54 55 -0.65536000000000000000e5
-4310 3 41 56 0.65536000000000000000e5
-4310 3 43 56 0.65536000000000000000e5
-4310 3 49 50 -0.65536000000000000000e5
-4310 3 50 55 -0.13107200000000000000e6
-4310 4 34 35 0.65536000000000000000e5
-*** ANSWER ***
-Failure
-*** END ***
-*** REQUEST ***
-""
 1
 3
 1 1 1
@@ -94559,6 +366,98 @@ Failure
 *** END ***
 *** REQUEST ***
 ""
+2
+4
+1 1 1 1
+0.15728640000000000000e7 0.10485760000000000000e7
+0 2 1 1 -0.10485760000000000000e7
+0 4 1 1 -0.10485760000000000000e7
+1 1 1 1 0.10485760000000000000e7
+1 2 1 1 0.10485760000000000000e7
+1 4 1 1 0.10485760000000000000e7
+2 2 1 1 0.10485760000000000000e7
+2 3 1 1 0.10485760000000000000e7
+*** ANSWER ***
+-8.033537119682993312e-10 -8.033532523347130644e-10 
+1 1 1 1 9.639215222160258208e-10 
+1 2 1 1 1.048575999157623970e+06 
+1 3 1 1 1.445882272036933453e-09 
+1 4 1 1 1.048576000000000931e+06 
+2 1 1 1 1.499999999685651009e+00 
+2 2 1 1 1.378900983392931975e-15 
+2 3 1 1 9.999999999999862332e-01 
+2 4 1 1 1.378900796134651217e-15 
+*** END ***
+*** REQUEST ***
+""
+1
+3
+1 1 1
+0.10485760000000000000e7
+0 1 1 1 0.10485760000000000000e7
+1 1 1 1 0.10485760000000000000e7
+1 2 1 1 -0.10485760000000000000e7
+1 3 1 1 0.10485760000000000000e7
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+5
+4 1 1 1 1
+0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0
+0 2 1 1 -0.52428800000000000000e6
+1 1 1 1 0.52428800000000000000e6
+1 2 1 1 0.52428800000000000000e6
+2 1 1 3 0.52428800000000000000e6
+2 1 1 4 -0.52428800000000000000e6
+2 2 1 1 -0.10485760000000000000e7
+2 4 1 1 0.10485760000000000000e7
+3 1 1 2 -0.52428800000000000000e6
+3 1 1 4 0.26214400000000000000e6
+3 1 3 3 0.52428800000000000000e6
+3 2 1 1 0.52428800000000000000e6
+3 4 1 1 -0.52428800000000000000e6
+4 2 1 1 0.52428800000000000000e6
+4 3 1 1 0.52428800000000000000e6
+4 4 1 1 -0.52428800000000000000e6
+5 1 1 2 -0.52428800000000000000e6
+5 1 1 4 0.26214400000000000000e6
+5 1 3 4 0.52428800000000000000e6
+5 1 4 4 -0.52428800000000000000e6
+5 5 1 1 0.52428800000000000000e6
+*** ANSWER ***
+-1.338594917701584393e-10 -4.876570677399720908e-12 -8.432248596379257249e-11 -1.376003305176662146e-10 6.303077531793304895e-11 
+1 1 1 1 1.961387163584582007e-06 
+1 1 1 2 1.116298839109634367e-05 
+1 1 1 3 -2.556727487312544875e-06 
+1 1 1 4 -3.024766708235593078e-06 
+1 1 2 2 7.214231238477719979e-05 
+1 1 3 3 2.793304486379264481e-05 
+1 1 3 4 3.304627912988848237e-05 
+1 1 4 4 3.909603325488893426e-05 
+1 2 1 1 5.242879998907233821e+05 
+1 3 1 1 1.102983309069068926e-10 
+1 4 1 1 1.833803270175834998e-04 
+1 5 1 1 1.051885915146662243e-04 
+2 1 1 1 1.999999999825280872e+00 
+2 1 1 2 -3.095056099254819282e-01 
+2 1 1 3 8.388821521212311283e-02 
+2 1 1 4 8.388917358587567874e-02 
+2 1 2 2 4.789927494245199008e-02 
+2 1 2 3 -1.307058076260208049e-02 
+2 1 2 4 -1.290714134044862460e-02 
+2 1 3 3 2.971005649372479018e-01 
+2 1 3 4 -2.447309307272341194e-01 
+2 1 4 4 2.134402019028047992e-01 
+2 2 1 1 2.103712716147778344e-16 
+2 3 1 1 1.000000958427416542e+00 
+2 4 1 1 9.583793370118670507e-07 
+2 5 1 1 1.669900717227676154e-06 
+*** END ***
+*** REQUEST ***
+""
 1
 2
 2 1
@@ -105175,449 +11074,111 @@ Infeasible
 *** END ***
 *** REQUEST ***
 ""
-5
-5
-4 1 1 1 1
-0.15728640000000000000e7 -0.10485760000000000000e7 -0.52428800000000000000e6 -0.15728640000000000000e7 0.10485760000000000000e7
-0 1 2 2 -0.52428800000000000000e6
-0 1 4 4 0.52428800000000000000e6
-0 2 1 1 -0.52428800000000000000e6
-0 4 1 1 -0.52428800000000000000e6
-1 1 1 1 0.52428800000000000000e6
-1 1 2 2 0.52428800000000000000e6
-1 1 4 4 -0.52428800000000000000e6
-1 2 1 1 0.52428800000000000000e6
-1 4 1 1 0.52428800000000000000e6
-2 1 1 2 0.52428800000000000000e6
-2 1 1 4 -0.52428800000000000000e6
-2 4 1 1 -0.10485760000000000000e7
-3 1 1 3 0.52428800000000000000e6
-3 1 1 4 -0.26214400000000000000e6
-3 1 4 4 -0.52428800000000000000e6
-4 1 2 2 -0.52428800000000000000e6
-4 1 2 4 0.52428800000000000000e6
-4 1 4 4 -0.52428800000000000000e6
-4 5 1 1 -0.52428800000000000000e6
-5 3 1 1 0.52428800000000000000e6
-5 4 1 1 0.52428800000000000000e6
-*** ANSWER ***
-Failure
-*** END ***
-*** REQUEST ***
-""
-20
-7
-4 1 4 1 4 1 1
--0.52428800000000000000e6 0.10485760000000000000e7 -0.52428800000000000000e6 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.10485760000000000000e7 0.10485760000000000000e7 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6
-0 1 1 2 -0.26214400000000000000e6
-0 1 1 4 0.26214400000000000000e6
-0 2 1 1 -0.52428800000000000000e6
-0 3 1 2 0.26214400000000000000e6
-0 5 1 4 -0.26214400000000000000e6
-1 1 2 3 0.52428800000000000000e6
-1 1 3 4 -0.52428800000000000000e6
-1 5 1 4 -0.26214400000000000000e6
-1 5 4 4 -0.52428800000000000000e6
-2 1 1 1 0.52428800000000000000e6
-2 1 1 2 0.26214400000000000000e6
-2 1 1 4 -0.26214400000000000000e6
-2 2 1 1 0.52428800000000000000e6
-2 3 1 2 -0.26214400000000000000e6
-2 5 1 4 0.26214400000000000000e6
-3 1 1 3 0.52428800000000000000e6
-3 1 1 4 -0.26214400000000000000e6
-3 1 4 4 -0.52428800000000000000e6
-4 1 2 2 0.52428800000000000000e6
-4 1 4 4 -0.52428800000000000000e6
-4 3 1 2 0.26214400000000000000e6
-4 5 1 4 -0.26214400000000000000e6
-5 1 2 4 0.52428800000000000000e6
-5 1 4 4 -0.10485760000000000000e7
-5 5 1 4 -0.52428800000000000000e6
-6 1 1 2 0.26214400000000000000e6
-6 1 1 4 -0.26214400000000000000e6
-6 3 1 1 0.52428800000000000000e6
-7 1 2 3 0.52428800000000000000e6
-7 1 3 4 -0.52428800000000000000e6
-7 3 1 3 0.52428800000000000000e6
-8 3 1 4 0.52428800000000000000e6
-8 5 1 4 0.52428800000000000000e6
-9 1 1 2 -0.26214400000000000000e6
-9 1 1 4 0.26214400000000000000e6
-9 1 2 3 0.52428800000000000000e6
-9 1 3 4 -0.52428800000000000000e6
-9 3 1 2 0.26214400000000000000e6
-9 3 2 2 0.52428800000000000000e6
-9 4 1 1 0.52428800000000000000e6
-10 3 3 3 0.52428800000000000000e6
-10 5 3 3 0.52428800000000000000e6
-11 3 4 4 0.52428800000000000000e6
-11 5 4 4 0.52428800000000000000e6
-12 1 1 2 -0.26214400000000000000e6
-12 1 1 4 0.26214400000000000000e6
-12 5 1 1 0.52428800000000000000e6
-13 3 1 2 0.52428800000000000000e6
-13 5 1 2 0.52428800000000000000e6
-14 1 2 3 -0.52428800000000000000e6
-14 1 3 4 0.52428800000000000000e6
-14 5 1 3 0.52428800000000000000e6
-15 1 1 2 0.26214400000000000000e6
-15 1 1 4 -0.26214400000000000000e6
-15 1 2 3 -0.52428800000000000000e6
-15 1 3 4 0.52428800000000000000e6
-15 3 1 2 -0.26214400000000000000e6
-15 4 1 1 -0.52428800000000000000e6
-15 5 2 2 0.52428800000000000000e6
-16 3 2 3 0.52428800000000000000e6
-16 5 2 3 0.52428800000000000000e6
-17 3 2 4 0.52428800000000000000e6
-17 5 2 4 0.52428800000000000000e6
-18 3 3 4 0.52428800000000000000e6
-18 5 3 4 0.52428800000000000000e6
-19 4 1 1 0.52428800000000000000e6
-19 6 1 1 0.52428800000000000000e6
-20 3 1 2 -0.26214400000000000000e6
-20 5 1 4 -0.26214400000000000000e6
-20 7 1 1 0.52428800000000000000e6
-*** ANSWER ***
-1.408782135629833379e-09 -1.602915007691423680e-09 -2.114475652645426357e-10 1.060506410792219022e-09 2.087517963511041579e-10 7.735026962533785022e-02 -6.083346056031729135e-10 -1.056624336133169251e-01 1.443375650931139342e-01 -1.043524718501323747e-09 1.443375655752403564e-01 1.077350266300642900e+00 3.943375640054703757e-01 2.270314905788526486e-09 1.443375636846789267e-01 8.310024292703551422e-10 1.443375652667335807e-01 8.309943070227691571e-10 -1.341153069964939011e-09 -1.043513950273019921e-09 
-1 1 1 1 1.330530909011591600e-04 
-1 1 1 2 8.214146408166717733e-05 
-1 1 1 3 -1.108594210974165294e-04 
-1 1 1 4 -2.671176437533311163e-05 
-1 1 2 2 1.529452979555114694e-03 
-1 1 2 3 -3.220826912303867418e-05 
-1 1 2 4 1.094460618053276968e-04 
-1 1 3 3 9.734421944536802984e-04 
-1 1 3 4 3.220826912303867418e-05 
-1 1 4 4 3.093987068390115919e-04 
-1 2 1 1 5.242880001330530504e+05 
-1 3 1 1 4.055381913477132912e+04 
-1 3 1 2 -5.539754590173628094e+04 
-1 3 1 3 -3.189425337024763205e-04 
-1 3 1 4 -5.539754599425870401e+04 
-1 3 2 2 7.567445430098070938e+04 
-1 3 2 3 4.356846016372959568e-04 
-1 3 2 4 7.567445341856521554e+04 
-1 3 3 3 4.263347068400591411e-04 
-1 3 3 4 4.356803432403535958e-04 
-1 3 4 4 7.567445455375382153e+04 
-1 4 1 1 1.008717294824084537e-03 
-1 5 1 1 5.648418173916736851e+05 
-1 5 1 2 2.067464527573000523e+05 
-1 5 1 3 1.190298861326054974e-03 
-1 5 1 4 2.067464531023424352e+05 
-1 5 2 2 7.567445356255515071e+04 
-1 5 2 3 4.356846016372959568e-04 
-1 5 2 4 7.567445341856521554e+04 
-1 5 3 3 4.263347068400591411e-04 
-1 5 3 4 4.356803432403535958e-04 
-1 5 4 4 7.567445381514624751e+04 
-1 6 1 1 2.702917337079049562e-04 
-1 7 1 1 4.263403524929400973e-04 
-2 1 1 1 3.732050805139194516e+00 
-2 1 1 2 -2.205738821003602190e-01 
-2 1 1 3 5.137913895681569532e-01 
-2 1 1 4 3.567764144417457928e-01 
-2 1 2 2 5.161058552875832373e-01 
-2 1 2 3 1.025309974541342359e-02 
-2 1 2 4 9.345607328673936898e-02 
-2 1 3 3 8.811272737592539261e-01 
-2 1 3 4 1.025319705650454272e-02 
-2 1 4 4 1.670806364694566115e+00 
-2 2 1 1 8.098913424095950693e-10 
-2 3 1 1 1.577350296542103125e+00 
-2 3 1 2 5.773502179991568672e-01 
-2 3 1 3 9.731109131778280951e-08 
-2 3 1 4 5.773502914078277870e-01 
-2 3 2 2 4.226500930909230513e-01 
-2 3 2 3 -1.505172222580337775e-03 
-2 3 2 4 -2.930749631858512249e-07 
-2 3 3 3 1.009116009161232563e+00 
-2 3 3 4 1.505025171725787349e-03 
-2 3 4 4 4.226499032143540280e-01 
-2 4 1 1 4.226495869899917768e-01 
-2 5 1 1 4.226497034578927114e-01 
-2 5 1 2 -5.773502179991555350e-01 
-2 5 1 3 -9.731109217953321892e-08 
-2 5 1 4 -5.773502914078278980e-01 
-2 5 2 2 1.577349906909068178e+00 
-2 5 2 3 1.505172222581506979e-03 
-2 5 2 4 2.930749610850833078e-07 
-2 5 3 3 9.908839908387667705e-01 
-2 5 3 4 -1.505025171724929745e-03 
-2 5 4 4 1.577350096785647304e+00 
-2 6 1 1 1.577350413010008445e+00 
-2 7 1 1 9.999999265913281921e-01 
-*** END ***
-*** REQUEST ***
-""
-5
-5
-4 1 1 1 1
-0.52428800000000000000e6 -0.10485760000000000000e7 -0.52428800000000000000e6 -0.15728640000000000000e7 0.10485760000000000000e7
-0 1 2 2 0.52428800000000000000e6
-0 1 4 4 -0.52428800000000000000e6
-0 2 1 1 -0.52428800000000000000e6
-0 4 1 1 0.52428800000000000000e6
-1 1 1 1 0.52428800000000000000e6
-1 1 2 2 -0.52428800000000000000e6
-1 1 4 4 0.52428800000000000000e6
-1 2 1 1 0.52428800000000000000e6
-1 4 1 1 -0.52428800000000000000e6
-2 1 1 2 0.52428800000000000000e6
-2 1 1 4 -0.52428800000000000000e6
-2 4 1 1 -0.10485760000000000000e7
-3 1 1 3 0.52428800000000000000e6
-3 1 1 4 -0.26214400000000000000e6
-3 1 4 4 -0.52428800000000000000e6
-4 1 2 2 -0.52428800000000000000e6
-4 1 2 4 0.52428800000000000000e6
-4 1 4 4 -0.52428800000000000000e6
-4 5 1 1 -0.52428800000000000000e6
-5 3 1 1 0.52428800000000000000e6
-5 4 1 1 0.52428800000000000000e6
-*** ANSWER ***
-Failure
-*** END ***
-*** REQUEST ***
-""
-20
-7
-4 1 4 1 4 1 1
--0.52428800000000000000e6 0.10485760000000000000e7 -0.52428800000000000000e6 0.0 -0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.0 0.10485760000000000000e7 0.10485760000000000000e7 0.52428800000000000000e6 0.0 0.0 0.10485760000000000000e7 0.0 0.0 0.0 0.10485760000000000000e7 0.52428800000000000000e6
-0 1 1 2 0.26214400000000000000e6
-0 1 1 4 -0.26214400000000000000e6
-0 2 1 1 -0.52428800000000000000e6
-0 3 1 2 -0.26214400000000000000e6
-0 5 1 4 0.26214400000000000000e6
-1 1 2 3 0.52428800000000000000e6
-1 1 3 4 -0.52428800000000000000e6
-1 5 1 4 -0.26214400000000000000e6
-1 5 4 4 -0.52428800000000000000e6
-2 1 1 1 0.52428800000000000000e6
-2 1 1 2 -0.26214400000000000000e6
-2 1 1 4 0.26214400000000000000e6
-2 2 1 1 0.52428800000000000000e6
-2 3 1 2 0.26214400000000000000e6
-2 5 1 4 -0.26214400000000000000e6
-3 1 1 3 0.52428800000000000000e6
-3 1 1 4 -0.26214400000000000000e6
-3 1 4 4 -0.52428800000000000000e6
-4 1 2 2 0.52428800000000000000e6
-4 1 4 4 -0.52428800000000000000e6
-4 3 1 2 0.26214400000000000000e6
-4 5 1 4 -0.26214400000000000000e6
-5 1 2 4 0.52428800000000000000e6
-5 1 4 4 -0.10485760000000000000e7
-5 5 1 4 -0.52428800000000000000e6
-6 1 1 2 0.26214400000000000000e6
-6 1 1 4 -0.26214400000000000000e6
-6 3 1 1 0.52428800000000000000e6
-7 1 2 3 0.52428800000000000000e6
-7 1 3 4 -0.52428800000000000000e6
-7 3 1 3 0.52428800000000000000e6
-8 3 1 4 0.52428800000000000000e6
-8 5 1 4 0.52428800000000000000e6
-9 1 1 2 0.26214400000000000000e6
-9 1 1 4 -0.26214400000000000000e6
-9 1 2 3 0.52428800000000000000e6
-9 1 3 4 -0.52428800000000000000e6
-9 3 1 2 0.26214400000000000000e6
-9 3 2 2 0.52428800000000000000e6
-9 4 1 1 -0.52428800000000000000e6
-10 3 3 3 0.52428800000000000000e6
-10 5 3 3 0.52428800000000000000e6
-11 3 4 4 0.52428800000000000000e6
-11 5 4 4 0.52428800000000000000e6
-12 1 1 2 -0.26214400000000000000e6
-12 1 1 4 0.26214400000000000000e6
-12 5 1 1 0.52428800000000000000e6
-13 3 1 2 0.52428800000000000000e6
-13 5 1 2 0.52428800000000000000e6
-14 1 2 3 -0.52428800000000000000e6
-14 1 3 4 0.52428800000000000000e6
-14 5 1 3 0.52428800000000000000e6
-15 1 1 2 -0.26214400000000000000e6
-15 1 1 4 0.26214400000000000000e6
-15 1 2 3 -0.52428800000000000000e6
-15 1 3 4 0.52428800000000000000e6
-15 3 1 2 -0.26214400000000000000e6
-15 4 1 1 0.52428800000000000000e6
-15 5 2 2 0.52428800000000000000e6
-16 3 2 3 0.52428800000000000000e6
-16 5 2 3 0.52428800000000000000e6
-17 3 2 4 0.52428800000000000000e6
-17 5 2 4 0.52428800000000000000e6
-18 3 3 4 0.52428800000000000000e6
-18 5 3 4 0.52428800000000000000e6
-19 4 1 1 0.52428800000000000000e6
-19 6 1 1 0.52428800000000000000e6
-20 3 1 2 -0.26214400000000000000e6
-20 5 1 4 -0.26214400000000000000e6
-20 7 1 1 0.52428800000000000000e6
-*** ANSWER ***
--1.342746526345061715e-09 -2.443492977315052222e-10 2.208950819456293398e-11 -1.532357985106601546e-10 -3.139233416116088887e-11 1.077350268749094120e+00 7.009852277455727232e-10 3.943375659685520174e-01 1.443375671349989564e-01 -5.878340507562113329e-11 1.443375661877718541e-01 7.735026948774698097e-02 -1.056624327919023082e-01 -1.878285492550673151e-10 1.443375666874154029e-01 2.565781949174762027e-10 1.443375668147542368e-01 2.565786864113415496e-10 2.942145218318752536e-10 -5.878238521589696054e-11 
-1 1 1 1 3.819403205883547918e-05 
-1 1 1 2 -1.224733049205359824e-05 
-1 1 1 3 1.158126407231101153e-05 
-1 1 1 4 6.456704127512840957e-06 
-1 1 2 2 8.596374633833324744e-05 
-1 1 2 3 -3.328802848049413742e-06 
-1 1 2 4 -1.645862409268672010e-05 
-1 1 3 3 1.663034366678906723e-04 
-1 1 3 4 3.328802848049413742e-06 
-1 1 4 4 2.679791111105120707e-04 
-1 2 1 1 5.242880000381940044e+05 
-1 3 1 1 5.648418178682285361e+05 
-1 3 1 2 2.067464544649153540e+05 
-1 3 1 3 3.675181430842708319e-04 
-1 3 1 4 2.067464537865202001e+05 
-1 3 2 2 7.567445456437776738e+04 
-1 3 2 3 1.345208686568937634e-04 
-1 3 2 4 7.567445423017386929e+04 
-1 3 3 3 1.354840027876034331e-04 
-1 3 3 4 1.345211263412294384e-04 
-1 3 4 4 7.567445406775796437e+04 
-1 4 1 1 8.589389131903515245e-05 
-1 5 1 1 4.055381825549533096e+04 
-1 5 1 2 -5.539754556360087736e+04 
-1 5 1 3 -9.847625443184073249e-05 
-1 5 1 4 -5.539754572539421497e+04 
-1 5 2 2 7.567445432971508126e+04 
-1 5 2 3 1.345208686568937634e-04 
-1 5 2 4 7.567445423017386929e+04 
-1 5 3 3 1.354840027876034331e-04 
-1 5 3 4 1.345211263412294384e-04 
-1 5 4 4 7.567445477174385451e+04 
-1 6 1 1 3.205565798900817526e-04 
-1 7 1 1 1.354845374878180936e-04 
-2 1 1 1 3.732050806982203373e+00 
-2 1 1 2 4.978949133196186594e-01 
-2 1 1 3 -1.308568436669261814e-01 
-2 1 1 4 -7.945535675086745631e-02 
-2 1 2 2 1.972442206524292363e+00 
-2 1 2 3 6.164317095563820459e-02 
-2 1 2 4 3.950919296356215638e-01 
-2 1 3 3 1.074614358661167834e+00 
-2 1 3 4 6.164314293620330037e-02 
-2 1 4 4 8.177416694170173139e-01 
-2 2 1 1 1.955575535633660102e-10 
-2 3 1 1 4.226497299295132737e-01 
-2 3 1 2 -5.773502768886704661e-01 
-2 3 1 3 -2.801943794662026982e-08 
-2 3 1 4 -5.773502602186049160e-01 
-2 3 2 2 1.577350183915906534e+00 
-2 3 2 3 -5.093597884469405757e-03 
-2 3 2 4 7.563155554311366017e-08 
-2 3 3 3 1.000664225665719220e+00 
-2 3 3 4 5.093637134632639923e-03 
-2 3 4 4 1.577350204179726045e+00 
-2 4 1 1 1.577350233136592728e+00 
-2 5 1 1 1.577350270070483784e+00 
-2 5 1 2 5.773502768886699110e-01 
-2 5 1 3 2.801943516876615048e-08 
-2 5 1 4 5.773502602186050270e-01 
-2 5 2 2 4.226498160840916896e-01 
-2 5 2 3 5.093597884469902755e-03 
-2 5 2 4 -7.563155467628118543e-08 
-2 5 3 3 9.993357743342811128e-01 
-2 5 3 4 -5.093637134632782171e-03 
-2 5 4 4 4.226497958202757865e-01 
-2 6 1 1 4.226497668634069393e-01 
-2 7 1 1 9.999999833299334506e-01 
-*** END ***
-*** REQUEST ***
-""
 2
-4
-1 1 1 1
-0.15728640000000000000e7 0.10485760000000000000e7
-0 2 1 1 -0.10485760000000000000e7
-0 4 1 1 -0.10485760000000000000e7
-1 1 1 1 0.10485760000000000000e7
+3
+2 1 1
+0.10485760000000000000e7 0.10485760000000000000e7
+0 1 1 1 0.10485760000000000000e7
+1 1 2 2 0.10485760000000000000e7
 1 2 1 1 0.10485760000000000000e7
-1 4 1 1 0.10485760000000000000e7
-2 2 1 1 0.10485760000000000000e7
+2 1 1 1 0.10485760000000000000e7
+2 1 1 2 -0.52428800000000000000e6
 2 3 1 1 0.10485760000000000000e7
 *** ANSWER ***
--8.033537119682993312e-10 -8.033532523347130644e-10 
-1 1 1 1 9.639215222160258208e-10 
-1 2 1 1 1.048575999157623970e+06 
-1 3 1 1 1.445882272036933453e-09 
-1 4 1 1 1.048576000000000931e+06 
-2 1 1 1 1.499999999685651009e+00 
-2 2 1 1 1.378900983392931975e-15 
-2 3 1 1 9.999999999999862332e-01 
-2 4 1 1 1.378900796134651217e-15 
+1.170818692744000744e+00 1.447215295915970978e+00 
+1 1 1 1 4.689392261611652211e+05 
+1 1 1 2 -7.587576130651925923e+05 
+1 1 2 2 1.227692381593513535e+06 
+1 2 1 1 1.227692381593513535e+06 
+1 3 1 1 1.517515226161165396e+06 
+2 1 1 1 2.618033982848464447e+00 
+2 1 1 2 1.618033984214826360e+00 
+2 1 2 2 9.999999983112128898e-01 
+2 2 1 1 1.688748897052140516e-09 
+2 3 1 1 1.366359508118386529e-09 
 *** END ***
 *** REQUEST ***
 ""
+11
 1
-3
-1 1 1
-0.10485760000000000000e7
-0 1 1 1 0.10485760000000000000e7
-1 1 1 1 0.10485760000000000000e7
-1 2 1 1 -0.10485760000000000000e7
-1 3 1 1 0.10485760000000000000e7
-*** ANSWER ***
-Infeasible
-*** END ***
-*** REQUEST ***
-""
-5
-5
-4 1 1 1 1
-0.10485760000000000000e7 0.0 0.52428800000000000000e6 0.52428800000000000000e6 0.0
-0 2 1 1 -0.52428800000000000000e6
-1 1 1 1 0.52428800000000000000e6
-1 2 1 1 0.52428800000000000000e6
-2 1 1 3 0.52428800000000000000e6
-2 1 1 4 -0.52428800000000000000e6
-2 2 1 1 -0.10485760000000000000e7
-2 4 1 1 0.10485760000000000000e7
-3 1 1 2 -0.52428800000000000000e6
-3 1 1 4 0.26214400000000000000e6
-3 1 3 3 0.52428800000000000000e6
-3 2 1 1 0.52428800000000000000e6
-3 4 1 1 -0.52428800000000000000e6
-4 2 1 1 0.52428800000000000000e6
-4 3 1 1 0.52428800000000000000e6
-4 4 1 1 -0.52428800000000000000e6
-5 1 1 2 -0.52428800000000000000e6
-5 1 1 4 0.26214400000000000000e6
-5 1 3 4 0.52428800000000000000e6
-5 1 4 4 -0.52428800000000000000e6
-5 5 1 1 0.52428800000000000000e6
+9
+-0.20000000000000000000e1 -0.40000000000000000000e1 0.0 -0.20000000000000000000e1 0.0 0.0 -0.40000000000000000000e1 0.0 0.0 0.0 0.0
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.20000000000000000000e1
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.30000000000000000000e1
+0 1 7 7 -0.10000000000000000000e1
+0 1 8 8 -0.10000000000000000000e1
+0 1 9 9 -0.10000000000000000000e1
+1 1 1 4 0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+2 1 1 6 0.10000000000000000000e1
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 6 0.10000000000000000000e1
+2 1 5 5 -0.20000000000000000000e1
+3 1 1 8 -0.10000000000000000000e1
+3 1 2 7 0.10000000000000000000e1
+3 1 2 8 0.10000000000000000000e1
+3 1 4 7 -0.10000000000000000000e1
+4 1 2 9 0.10000000000000000000e1
+4 1 6 6 -0.20000000000000000000e1
+5 1 1 5 0.10000000000000000000e1
+5 1 2 3 -0.10000000000000000000e1
+5 1 2 5 -0.10000000000000000000e1
+5 1 3 4 0.10000000000000000000e1
+6 1 2 6 -0.10000000000000000000e1
+6 1 3 5 0.10000000000000000000e1
+7 1 3 8 0.10000000000000000000e1
+7 1 5 7 0.10000000000000000000e1
+7 1 6 6 -0.40000000000000000000e1
+8 1 1 9 0.10000000000000000000e1
+8 1 3 7 -0.10000000000000000000e1
+8 1 4 9 0.10000000000000000000e1
+8 1 5 8 -0.10000000000000000000e1
+9 1 1 8 -0.10000000000000000000e1
+9 1 3 6 0.10000000000000000000e1
+9 1 4 7 -0.10000000000000000000e1
+9 1 5 6 0.10000000000000000000e1
+10 1 3 9 -0.10000000000000000000e1
+10 1 5 9 -0.10000000000000000000e1
+10 1 6 7 0.10000000000000000000e1
+10 1 6 8 0.10000000000000000000e1
+11 1 6 9 -0.10000000000000000000e1
+11 1 7 8 0.10000000000000000000e1
 *** ANSWER ***
--1.338594917701584393e-10 -4.876570677399720908e-12 -8.432248596379257249e-11 -1.376003305176662146e-10 6.303077531793304895e-11 
-1 1 1 1 1.961387163584582007e-06 
-1 1 1 2 1.116298839109634367e-05 
-1 1 1 3 -2.556727487312544875e-06 
-1 1 1 4 -3.024766708235593078e-06 
-1 1 2 2 7.214231238477719979e-05 
-1 1 3 3 2.793304486379264481e-05 
-1 1 3 4 3.304627912988848237e-05 
-1 1 4 4 3.909603325488893426e-05 
-1 2 1 1 5.242879998907233821e+05 
-1 3 1 1 1.102983309069068926e-10 
-1 4 1 1 1.833803270175834998e-04 
-1 5 1 1 1.051885915146662243e-04 
-2 1 1 1 1.999999999825280872e+00 
-2 1 1 2 -3.095056099254819282e-01 
-2 1 1 3 8.388821521212311283e-02 
-2 1 1 4 8.388917358587567874e-02 
-2 1 2 2 4.789927494245199008e-02 
-2 1 2 3 -1.307058076260208049e-02 
-2 1 2 4 -1.290714134044862460e-02 
-2 1 3 3 2.971005649372479018e-01 
-2 1 3 4 -2.447309307272341194e-01 
-2 1 4 4 2.134402019028047992e-01 
-2 2 1 1 2.103712716147778344e-16 
-2 3 1 1 1.000000958427416542e+00 
-2 4 1 1 9.583793370118670507e-07 
-2 5 1 1 1.669900717227676154e-06 
+5.000179462710149236e-01 -1.499910088781482242e+00 0.000000000000000000e+00 -9.999820571239961264e-01 0.000000000000000000e+00 0.000000000000000000e+00 -9.999100882951448277e-01 0.000000000000000000e+00 0.000000000000000000e+00 0.000000000000000000e+00 0.000000000000000000e+00 
+1 1 1 1 1.000000003557179440e+00 
+1 1 1 4 5.000179462710149236e-01 
+1 1 1 6 -1.499910088781482242e+00 
+1 1 2 2 9.999641110151495926e-01 
+1 1 2 9 -9.999820571239961264e-01 
+1 1 3 3 9.998201811201439249e-01 
+1 1 3 8 -9.999100882951448277e-01 
+1 1 4 4 1.000000003557179440e+00 
+1 1 4 6 -1.499910088781482242e+00 
+1 1 5 5 9.998201811201439249e-01 
+1 1 5 7 -9.999100882951448277e-01 
+1 1 6 6 2.999604470985750559e+00 
+1 1 7 7 1.000000003557179440e+00 
+1 1 8 8 1.000000003557179440e+00 
+1 1 9 9 1.000000003557179440e+00 
+2 1 1 1 1.184220387763170584e+04 
+2 1 1 4 1.184220399462378919e+04 
+2 1 1 6 1.184309073001916113e+04 
+2 1 2 2 1.184320399458401334e+04 
+2 1 2 9 1.184297764883485434e+04 
+2 1 3 3 1.184409078860287264e+04 
+2 1 3 8 1.184297764886539881e+04 
+2 1 4 4 1.184220411189475271e+04 
+2 1 4 6 1.184309084718016129e+04 
+2 1 5 5 1.184409078860287264e+04 
+2 1 5 7 1.184297764886539881e+04 
+2 1 6 6 1.184397764896266563e+04 
+2 1 7 7 1.184186461389191209e+04 
+2 1 8 8 1.184186461389191209e+04 
+2 1 9 9 1.184275130749586242e+04 
 *** END ***
 *** REQUEST ***
 ""
@@ -106546,3 +12107,9137 @@ Infeasible
 2 4 1 1 1.000167935332526570e+00 
 2 5 1 1 8.111425888609598012e-01 
 *** END ***
+*** REQUEST ***
+""
+1
+1
+7
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+7
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+5
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+5
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.20000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+6
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.10000000000000000000e1
+2 1 4 4 0.20000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+*** ANSWER ***
+4.999999992068303034e-01 4.999999999999717448e-01 
+1 1 1 1 2.234855962115750234e-09 
+1 1 2 2 1.441714466032480548e-09 
+1 1 3 3 6.484598716445790825e-10 
+1 1 4 4 1.441601382173089094e-09 
+1 1 5 5 5.000000006484882631e-01 
+1 1 6 6 5.000000014416297045e-01 
+2 1 1 1 2.430636066597300915e-01 
+2 1 2 2 6.491689746068749489e-01 
+2 1 3 3 1.243063605282559214e+00 
+2 1 4 4 6.491689746068740607e-01 
+2 1 5 5 1.377170993508608760e-09 
+2 1 6 6 1.377172611291298374e-09 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+6
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.10000000000000000000e1
+2 1 4 4 0.20000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+*** ANSWER ***
+9.999999994936811243e-01 9.682230762383211618e-11 
+1 1 1 1 1.309904697678035410e-09 
+1 1 2 2 7.067635777442771991e-10 
+1 1 3 3 4.909117361428470945e-10 
+1 1 4 4 1.094052808239612281e-09 
+1 1 5 5 1.000000000394089428e+00 
+1 1 6 6 9.972305006157776836e-10 
+2 1 1 1 4.222498665480665103e-01 
+2 1 2 2 1.100973461369222361e+00 
+2 1 3 3 1.422249865900061749e+00 
+2 1 4 4 7.109544607945516015e-01 
+2 1 5 5 6.480049172985338255e-10 
+2 1 6 6 7.800380017973469471e-01 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+6
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.10000000000000000000e1
+2 1 4 4 0.20000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+*** ANSWER ***
+-5.898413553387937813e-10 9.999999995996913249e-01 
+1 1 1 1 3.921936466561582656e-09 
+1 1 2 2 3.732403641816520613e-09 
+1 1 3 3 1.941636431076409662e-09 
+1 1 4 4 2.131169575795896706e-09 
+1 1 5 5 2.341945076465655525e-09 
+1 1 6 6 1.000000002531477694e+00 
+2 1 1 1 7.663600750946447659e-01 
+2 1 2 2 7.368814363860991534e-01 
+2 1 3 3 9.276967302793648340e-01 
+2 1 4 4 1.156213107928222072e+00 
+2 1 5 5 8.386633448152800430e-01 
+2 1 6 6 1.731033794508974853e-09 
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.10000000000000000000e1
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.10000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.20000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.10000000000000000000e1
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+5
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+5
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+6
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+*** ANSWER ***
+9.999999998705981774e-01 4.060378510709243862e-11 
+1 1 1 1 2.042956722851974423e-10 
+1 1 2 2 7.489396064814460446e-11 
+1 1 3 3 2.669979330869889220e-11 
+1 1 4 4 1.561015308623294817e-10 
+1 1 5 5 9.999999999860960109e-01 
+1 1 6 6 1.561015308623294817e-10 
+2 1 1 1 5.855573749392285476e-01 
+2 1 2 2 1.455587500401115175e+00 
+2 1 3 3 1.585557374939227326e+00 
+2 1 4 4 7.277937502005578096e-01 
+2 1 5 5 6.575109134929267400e-17 
+2 1 6 6 7.277937502005578096e-01 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+6
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+0
+1
+4
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.10000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+*** ANSWER ***
+Failure
+*** END ***
+*** REQUEST ***
+""
+1
+1
+7
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+7
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.20000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+9
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.10000000000000000000e1
+3 1 4 4 0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 9 9 0.10000000000000000000e1
+*** ANSWER ***
+2.234155997690766949e-11 9.999999998320631134e-01 6.917512973704836318e-11 
+1 1 1 1 2.840620192745186093e-10 
+1 1 2 2 1.629586716528608164e-10 
+1 1 3 3 1.384666618696282058e-10 
+1 1 4 4 1.312215676676241093e-10 
+1 1 5 5 2.523249115604914944e-10 
+1 1 6 6 2.768169213437241050e-10 
+1 1 7 7 2.299833515835842384e-10 
+1 1 8 8 1.000000000039704906e+00 
+1 1 9 9 2.768169213437241050e-10 
+2 1 1 1 1.371923221710165119e+00 
+2 1 2 2 2.298749391246399210e+00 
+2 1 3 3 2.705915209548278799e+00 
+2 1 4 4 2.371923221400263682e+00 
+2 1 5 5 1.484417751842687538e+00 
+2 1 6 6 1.352957604929090119e+00 
+2 1 7 7 1.628663279117326113e+00 
+2 1 8 8 3.099017317714043746e-10 
+2 1 9 9 1.352957604929090119e+00 
+*** END ***
+*** REQUEST ***
+""
+3
+1
+9
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.10000000000000000000e1
+3 1 4 4 0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 9 9 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+9
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.10000000000000000000e1
+3 1 4 4 0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 9 9 0.10000000000000000000e1
+*** ANSWER ***
+9.999999994414392468e-01 -1.296401890272380373e-09 -4.875469758002913532e-10 
+1 1 1 1 5.782970043674438137e-09 
+1 1 2 2 4.557581878364294585e-09 
+1 1 3 3 3.928007367994356710e-09 
+1 1 4 4 1.097950736420666556e-09 
+1 1 5 5 2.323339045491816103e-09 
+1 1 6 6 2.952913416393788893e-09 
+1 1 7 7 1.000000002881899830e+00 
+1 1 8 8 2.144058501921675884e-09 
+1 1 9 9 2.952913416393788893e-09 
+2 1 1 1 1.819287160927221814e-01 
+2 1 2 2 3.855046481660661661e-01 
+2 1 3 3 4.630295060564071363e-01 
+2 1 4 4 6.294172701528573111e-01 
+2 1 5 5 6.617603706164947308e-01 
+2 1 6 6 5.077704759981358507e-01 
+2 1 7 7 1.039007549793057772e-09 
+2 1 8 8 5.525114459398647870e-01 
+2 1 9 9 5.077704759981358507e-01 
+*** END ***
+*** REQUEST ***
+""
+3
+1
+9
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.10000000000000000000e1
+3 1 4 4 0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 9 9 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.10000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+9
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+9
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+10
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 10 10 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+10
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.20000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 10 10 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+10
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 10 10 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.20000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.0
+3 1 7 7 0.20000000000000000000e1
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.0
+3 1 7 7 0.0
+3 1 8 8 0.20000000000000000000e1
+3 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.20000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.0
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+1.128792988258798944e-10 1.128792988258811352e-10 1.128792988258811352e-10 9.999999991045613879e-01 
+1 1 1 1 1.605753394551088760e-09 
+1 1 2 2 8.231941398192049575e-10 
+1 1 3 3 8.231941398192049575e-10 
+1 1 4 4 8.231941398192049575e-10 
+1 1 5 5 4.921518843697332710e-10 
+1 1 6 6 1.274711335122729498e-09 
+1 1 7 7 1.274711335122722881e-09 
+1 1 8 8 1.274711335122729498e-09 
+1 1 9 9 1.161832036296847536e-09 
+1 1 10 10 1.161832036296847536e-09 
+1 1 11 11 1.161832036296847536e-09 
+1 1 12 12 1.000000000153514090e+00 
+2 1 1 1 8.025980163842326709e-01 
+2 1 2 2 1.524312099679625554e+00 
+2 1 3 3 1.524312099679625110e+00 
+2 1 4 4 1.524312099679625554e+00 
+2 1 5 5 1.802598015461922554e+00 
+2 1 6 6 9.844628524691878546e-01 
+2 1 7 7 9.844628524691871885e-01 
+2 1 8 8 9.844628524691878546e-01 
+2 1 9 9 1.079698495343185849e+00 
+2 1 10 10 1.079698495343185405e+00 
+2 1 11 11 1.079698495343185405e+00 
+2 1 12 12 9.223095237450112384e-10 
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+-2.428616878909433906e-10 9.999999992347369249e-01 -2.428616878909413227e-10 -1.779330352805840483e-09 
+1 1 1 1 7.618394095351434234e-09 
+1 1 2 2 5.073800714463713554e-09 
+1 1 3 3 5.073800714463713554e-09 
+1 1 4 4 6.118603504419627072e-09 
+1 1 5 5 1.557760683527268464e-09 
+1 1 6 6 4.102353962899936683e-09 
+1 1 7 7 4.102353962899936683e-09 
+1 1 8 8 3.057551040343424022e-09 
+1 1 9 9 4.345215650790887518e-09 
+1 1 10 10 1.000000003822814287e+00 
+1 1 11 11 4.345215650790887518e-09 
+1 1 12 12 2.808746985875981327e-09 
+2 1 1 1 1.955795033361595603e-01 
+2 1 2 2 4.556246577290272159e-01 
+2 1 3 3 4.556246577290264943e-01 
+2 1 4 4 3.717112994376555735e-01 
+2 1 5 5 6.410707656566014823e-01 
+2 1 6 6 4.911498035212520930e-01 
+2 1 7 7 4.911498035212515934e-01 
+2 1 8 8 6.489656675108010919e-01 
+2 1 9 9 4.834584460951079632e-01 
+2 1 10 10 1.533267097621334952e-09 
+2 1 11 11 4.834584460951083518e-01 
+2 1 12 12 5.545087376795581058e-01 
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+9.999999992347439193e-01 -2.428606236137262739e-10 -2.428606236137333050e-10 -1.779324404745448910e-09 
+1 1 1 1 7.618327006771317835e-09 
+1 1 2 2 5.073746699024476086e-09 
+1 1 3 3 6.118537623311949689e-09 
+1 1 4 4 5.073746699024462851e-09 
+1 1 5 5 1.557723844980547544e-09 
+1 1 6 6 4.102304204569544521e-09 
+1 1 7 7 3.057513308654994586e-09 
+1 1 8 8 4.102304204569544521e-09 
+1 1 9 9 1.000000003822769212e+00 
+1 1 10 10 4.345164828183277412e-09 
+1 1 11 11 4.345164828183264177e-09 
+1 1 12 12 2.808701047051577938e-09 
+2 1 1 1 1.955795693706836313e-01 
+2 1 2 2 4.556247489154121588e-01 
+2 1 3 3 3.717113737956587172e-01 
+2 1 4 4 4.556247489154122698e-01 
+2 1 5 5 6.410708159401797834e-01 
+2 1 6 6 4.911498672160703460e-01 
+2 1 7 7 6.489657497442780087e-01 
+2 1 8 8 4.911498672160701240e-01 
+2 1 9 9 1.533264824656265122e-09 
+2 1 10 10 4.834585168291880564e-01 
+2 1 11 11 4.834585168291874457e-01 
+2 1 12 12 5.545087534305035426e-01 
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.0
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+-2.428605862266610242e-10 -2.428605862266589563e-10 9.999999992347440303e-01 -1.779323969831035246e-09 
+1 1 1 1 7.618325894038891929e-09 
+1 1 2 2 6.118536864620594836e-09 
+1 1 3 3 5.073745966367764128e-09 
+1 1 4 4 5.073745966367750893e-09 
+1 1 5 5 1.557723750186211828e-09 
+1 1 6 6 3.057512927594624689e-09 
+1 1 7 7 4.102303621461131612e-09 
+1 1 8 8 4.102303621461131612e-09 
+1 1 9 9 4.345164207687783124e-09 
+1 1 10 10 4.345164207687783124e-09 
+1 1 11 11 1.000000003822768990e+00 
+1 1 12 12 2.808700824083429167e-09 
+2 1 1 1 1.955795461943821978e-01 
+2 1 2 2 3.717113417587327162e-01 
+2 1 3 3 4.556247134278948452e-01 
+2 1 4 4 4.556247134278944566e-01 
+2 1 5 5 6.410708042139924290e-01 
+2 1 6 6 6.489657119822952458e-01 
+2 1 7 7 4.911498405143807089e-01 
+2 1 8 8 4.911498405143802093e-01 
+2 1 9 9 4.834584878074181247e-01 
+2 1 10 10 4.834584878074180692e-01 
+2 1 11 11 1.533264659242191938e-09 
+2 1 12 12 5.545087419803894635e-01 
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.10000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.10000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.10000000000000000000e1
+2 1 6 6 0.0
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 10 10 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.10000000000000000000e1
+3 1 6 6 0.20000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 11 11 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.10000000000000000000e1
+4 1 6 6 0.0
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.20000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.20000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.20000000000000000000e1
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.20000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.20000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 -0.20000000000000000000e1
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.20000000000000000000e1
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.20000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.20000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.20000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.20000000000000000000e1
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 -0.20000000000000000000e1
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.20000000000000000000e1
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.20000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.20000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.20000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 -0.20000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.20000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+1.140006347091767952e-10 9.999999989769592368e-01 1.140006347091726593e-10 1.140006347091734865e-10 1.140006347091734865e-10 
+1 1 1 1 1.626240365781564325e-09 
+1 1 2 2 8.312009925024784502e-10 
+1 1 3 3 8.312009925024817589e-10 
+1 1 4 4 8.312009925024751415e-10 
+1 1 5 5 8.312009925024850677e-10 
+1 1 6 6 4.921640668097002615e-10 
+1 1 7 7 1.287203531339177359e-09 
+1 1 8 8 1.287203531339174051e-09 
+1 1 9 9 1.287203531339180668e-09 
+1 1 10 10 1.287203531339174051e-09 
+1 1 11 11 1.173202896630006768e-09 
+1 1 12 12 1.000000000036161296e+00 
+1 1 13 13 1.173202896630003459e-09 
+1 1 14 14 1.173202896630006768e-09 
+1 1 15 15 1.173202896630003459e-09 
+2 1 1 1 2.748980194517817166e-01 
+2 1 2 2 8.517318902940799186e-01 
+2 1 3 3 8.517318902940796965e-01 
+2 1 4 4 8.517318902940803627e-01 
+2 1 5 5 8.517318902940801406e-01 
+2 1 6 6 1.274898018809142997e+00 
+2 1 7 7 5.500069852182746244e-01 
+2 1 8 8 5.500069852182747354e-01 
+2 1 9 9 5.500069852182747354e-01 
+2 1 10 10 5.500069852182747354e-01 
+2 1 11 11 6.034498107942499745e-01 
+2 1 12 12 6.426388087290469552e-10 
+2 1 13 13 6.034498107942499745e-01 
+2 1 14 14 6.034498107942489753e-01 
+2 1 15 15 6.034498107942490863e-01 
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+-1.700771201411503459e-13 -1.489754672916564258e-11 9.999999999714919152e-01 -1.700771201401034454e-13 -1.700771201410275613e-13 
+1 1 1 1 2.820147471688711685e-10 
+1 1 2 2 2.384391339849524314e-10 
+1 1 3 3 2.384391339849507771e-10 
+1 1 4 4 2.384391339849524314e-10 
+1 1 5 5 2.951151546359145267e-10 
+1 1 6 6 1.941834293149265589e-10 
+1 1 7 7 2.377588255043881144e-10 
+1 1 8 8 2.377588255043897688e-10 
+1 1 9 9 2.377588255043881144e-10 
+1 1 10 10 1.810826608154485231e-10 
+1 1 11 11 2.379289026245298141e-10 
+1 1 12 12 2.232014330155048888e-10 
+1 1 13 13 1.000000000209591011e+00 
+1 1 14 14 2.379289026245306412e-10 
+1 1 15 15 2.379289026245298141e-10 
+2 1 1 1 2.159970317737134049e-01 
+2 1 2 2 4.746298011869106714e-01 
+2 1 3 3 4.746298011869105049e-01 
+2 1 4 4 4.746298011869102829e-01 
+2 1 5 5 3.868029514914341771e-01 
+2 1 6 6 6.519278356981845768e-01 
+2 1 7 7 5.067635820733448204e-01 
+2 1 8 8 5.067635820733444874e-01 
+2 1 9 9 5.067635820733445984e-01 
+2 1 10 10 6.688375494771376939e-01 
+2 1 11 11 4.998016343026600583e-01 
+2 1 12 12 5.640691960755287448e-01 
+2 1 13 13 1.041215704542160540e-10 
+2 1 14 14 4.998016343026608910e-01 
+2 1 15 15 4.998016343026605024e-01 
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+9.999999999714921373e-01 -1.489685212043442134e-11 -1.699701974303440866e-13 -1.699701974294522825e-13 -1.699701974304410218e-13 
+1 1 1 1 2.820121541545470975e-10 
+1 1 2 2 2.384373546041226914e-10 
+1 1 3 3 2.384373546041210371e-10 
+1 1 4 4 2.951131317262096289e-10 
+1 1 5 5 2.384373546041235186e-10 
+1 1 6 6 1.941827080998868487e-10 
+1 1 7 7 2.377574738144014443e-10 
+1 1 8 8 2.377574738144039259e-10 
+1 1 9 9 1.810816979331396060e-10 
+1 1 10 10 2.377574738144014443e-10 
+1 1 11 11 1.000000000209589457e+00 
+1 1 12 12 2.232005620888277370e-10 
+1 1 13 13 2.379274440118329969e-10 
+1 1 14 14 2.379274440118329969e-10 
+1 1 15 15 2.379274440118321697e-10 
+2 1 1 1 2.159977829433336050e-01 
+2 1 2 2 4.746307461361169988e-01 
+2 1 3 3 4.746307461361173319e-01 
+2 1 4 4 3.868036964841574665e-01 
+2 1 5 5 4.746307461361171098e-01 
+2 1 6 6 6.519280948015019339e-01 
+2 1 7 7 5.067643614946997221e-01 
+2 1 8 8 5.067643614947001662e-01 
+2 1 9 9 6.688385405030115027e-01 
+2 1 10 10 5.067643614947000552e-01 
+2 1 11 11 1.041233349902387688e-10 
+2 1 12 12 5.640696881418317821e-01 
+2 1 13 13 4.998024574246660023e-01 
+2 1 14 14 4.998024574246661689e-01 
+2 1 15 15 4.998024574246662799e-01 
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+-1.700835335796465942e-13 -1.489740526787777836e-11 -1.700835335796142825e-13 9.999999999714921373e-01 -1.700835335794721108e-13 
+1 1 1 1 2.820116486791315796e-10 
+1 1 2 2 2.384361712519543541e-10 
+1 1 3 3 2.951118700725115664e-10 
+1 1 4 4 2.384361712519543541e-10 
+1 1 5 5 2.384361712519543541e-10 
+1 1 6 6 1.941804055878626723e-10 
+1 1 7 7 2.377558371176356901e-10 
+1 1 8 8 1.810805265432461786e-10 
+1 1 9 9 2.377558371176356901e-10 
+1 1 10 10 2.377558371176365173e-10 
+1 1 11 11 2.379259206512155629e-10 
+1 1 12 12 2.231985989169171920e-10 
+1 1 13 13 2.379259206512155629e-10 
+1 1 14 14 1.000000000209588347e+00 
+1 1 15 15 2.379259206512163901e-10 
+2 1 1 1 2.159975131221077704e-01 
+2 1 2 2 4.746304007556285676e-01 
+2 1 3 3 3.868034029513773842e-01 
+2 1 4 4 4.746304007556284565e-01 
+2 1 5 5 4.746304007556286786e-01 
+2 1 6 6 6.519280585506914694e-01 
+2 1 7 7 5.067640576838258193e-01 
+2 1 8 8 6.688381301850243599e-01 
+2 1 9 9 5.067640576838258193e-01 
+2 1 10 10 5.067640576838261524e-01 
+2 1 11 11 4.998021407150215478e-01 
+2 1 12 12 5.640694545714161068e-01 
+2 1 13 13 4.998021407150214368e-01 
+2 1 14 14 1.041220408834866285e-10 
+2 1 15 15 4.998021407150216588e-01 
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+-1.700596684760854763e-13 -1.489740944300603012e-11 -1.700596684762211856e-13 -1.700596684764861419e-13 9.999999999714916932e-01 
+1 1 1 1 2.820152671333601397e-10 
+1 1 2 2 2.951159640401410920e-10 
+1 1 3 3 2.384395419792453792e-10 
+1 1 4 4 2.384395419792453792e-10 
+1 1 5 5 2.384395419792453792e-10 
+1 1 6 6 1.941836301951890694e-10 
+1 1 7 7 1.810831412532674334e-10 
+1 1 8 8 2.377593033053405203e-10 
+1 1 9 9 2.377593033053405203e-10 
+1 1 10 10 2.377593033053405203e-10 
+1 1 11 11 2.379293629738175622e-10 
+1 1 12 12 2.232020131992867387e-10 
+1 1 13 13 2.379293629738167351e-10 
+1 1 14 14 2.379293629738175622e-10 
+1 1 15 15 1.000000000209591233e+00 
+2 1 1 1 2.159975144250702028e-01 
+2 1 2 2 3.868034078649766339e-01 
+2 1 3 3 4.746303992712999631e-01 
+2 1 4 4 4.746303992712995745e-01 
+2 1 5 5 4.746303992713001296e-01 
+2 1 6 6 6.519280532721553056e-01 
+2 1 7 7 6.688381383893732268e-01 
+2 1 8 8 5.067640591389587224e-01 
+2 1 9 9 5.067640591389582783e-01 
+2 1 10 10 5.067640591389588334e-01 
+2 1 11 11 4.998021414175976562e-01 
+2 1 12 12 5.640694611529150082e-01 
+2 1 13 13 4.998021414175974897e-01 
+2 1 14 14 4.998021414175973787e-01 
+2 1 15 15 1.041220408493290323e-10 
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.10000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+11
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.10000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.10000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+12
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.10000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.10000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 -0.10000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.10000000000000000000e1
+3 1 9 9 0.0
+3 1 10 10 0.10000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.10000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.10000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.20000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.20000000000000000000e1
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.10000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.10000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 -0.10000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.10000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.10000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.10000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.10000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 -0.20000000000000000000e1
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.20000000000000000000e1
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+4.999999999430526643e-01 -3.152598173044785626e-12 -1.063705677744346535e-11 4.999999999430526643e-01 
+1 1 1 1 5.760614482621152684e-10 
+1 1 2 2 4.515296915946822692e-10 
+1 1 3 3 5.622717585459421585e-10 
+1 1 4 4 4.621667483721239251e-10 
+1 1 5 5 5.622717573858842151e-10 
+1 1 6 6 3.206926219625878951e-10 
+1 1 7 7 4.452244952485922843e-10 
+1 1 8 8 3.344822993429371206e-10 
+1 1 9 9 4.345874384711489741e-10 
+1 1 10 10 3.344822988529633022e-10 
+1 1 11 11 5.000000003914297775e-01 
+1 1 12 12 4.452244952485922843e-10 
+1 1 13 13 4.377400366441939665e-10 
+1 1 14 14 5.000000003914297775e-01 
+2 1 1 1 7.030415980493230910e-01 
+2 1 2 2 8.664273395777900566e-01 
+2 1 3 3 7.022642372906718888e-01 
+2 1 4 4 8.826222968057834128e-01 
+2 1 5 5 7.022642373660188397e-01 
+2 1 6 6 9.701469565948714902e-01 
+2 1 7 7 8.406924966092669260e-01 
+2 1 8 8 1.068711557704655979e+00 
+2 1 9 9 8.005592846194916623e-01 
+2 1 10 10 1.068711557780002375e+00 
+2 1 11 11 6.264839582533233015e-10 
+2 1 12 12 8.406924966092669260e-01 
+2 1 13 13 8.149576536407434624e-01 
+2 1 14 14 6.264839582533233015e-10 
+*** END ***
+*** REQUEST ***
+""
+3
+1
+13
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.20000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.20000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.20000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.20000000000000000000e1
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 -0.10000000000000000000e1
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.10000000000000000000e1
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+4
+1
+14
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.20000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.20000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.10000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.10000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 -0.10000000000000000000e1
+4 1 3 3 0.0
+4 1 4 4 -0.10000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.10000000000000000000e1
+4 1 8 8 0.0
+4 1 9 9 0.10000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.20000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.20000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.10000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.10000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 -0.10000000000000000000e1
+4 1 3 3 0.0
+4 1 4 4 -0.10000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.10000000000000000000e1
+4 1 8 8 0.0
+4 1 9 9 0.10000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.10000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.10000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.10000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.10000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 -0.10000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.10000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.10000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 -0.20000000000000000000e1
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.20000000000000000000e1
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 -0.20000000000000000000e1
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.20000000000000000000e1
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.10000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.10000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 -0.20000000000000000000e1
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.20000000000000000000e1
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 -0.20000000000000000000e1
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.20000000000000000000e1
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 -0.20000000000000000000e1
+6 1 4 4 0.0
+6 1 5 5 0.0
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.20000000000000000000e1
+6 1 9 9 0.0
+6 1 10 10 0.0
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.10000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.20000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 -0.20000000000000000000e1
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.20000000000000000000e1
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 -0.20000000000000000000e1
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.20000000000000000000e1
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 -0.20000000000000000000e1
+6 1 5 5 0.0
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.20000000000000000000e1
+6 1 10 10 0.0
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.10000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+4.568257747946911464e-10 4.999999993780210317e-01 1.414114236171344136e-10 -2.294230329214615861e-10 4.999999991496432150e-01 -8.344791351182588796e-10 
+1 1 1 1 5.446743607824519853e-09 
+1 1 2 2 4.752700774491880916e-09 
+1 1 3 3 3.967588930705469605e-09 
+1 1 4 4 4.752630630965639553e-09 
+1 1 5 5 4.060399152746526145e-09 
+1 1 6 6 1.570742070310456408e-09 
+1 1 7 7 2.264784955945096820e-09 
+1 1 8 8 3.049896799019629878e-09 
+1 1 9 9 2.264855115809551561e-09 
+1 1 10 10 2.957086576978566720e-09 
+1 1 11 11 3.965568639657224344e-09 
+1 1 12 12 5.000000028867638280e-01 
+1 1 13 13 3.650154288479681053e-09 
+1 1 14 14 3.279319831941088155e-09 
+1 1 15 15 5.000000026583860668e-01 
+1 1 16 16 2.674263729744290862e-09 
+2 1 1 1 3.221557914718115034e-01 
+2 1 2 2 4.402062235239494470e-01 
+2 1 3 3 5.366478795098653665e-01 
+2 1 4 4 4.402007217632724068e-01 
+2 1 5 5 5.293723846567419677e-01 
+2 1 6 6 6.071841459524551787e-01 
+2 1 7 7 7.976920450626668879e-01 
+2 1 8 8 6.015439347239212031e-01 
+2 1 9 9 7.976865433019899587e-01 
+2 1 10 10 6.089534229382423947e-01 
+2 1 11 11 3.574858239806389948e-01 
+2 1 12 12 2.441921534513253524e-09 
+2 1 13 13 5.558095689563555819e-01 
+2 1 14 14 5.851795350912446514e-01 
+2 1 15 15 2.441922006947937880e-09 
+2 1 16 16 6.353906072378558978e-01 
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.10000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.20000000000000000000e1
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.20000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.20000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 -0.20000000000000000000e1
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.20000000000000000000e1
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 -0.20000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.20000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 -0.10000000000000000000e1
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.10000000000000000000e1
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.20000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.20000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.20000000000000000000e1
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.20000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.20000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 -0.10000000000000000000e1
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.10000000000000000000e1
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.10000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.10000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.0
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.20000000000000000000e1
+1 1 9 9 0.0
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.20000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.20000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.10000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.10000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 -0.10000000000000000000e1
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.10000000000000000000e1
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 -0.20000000000000000000e1
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.20000000000000000000e1
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.20000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.20000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 -0.10000000000000000000e1
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.10000000000000000000e1
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 -0.10000000000000000000e1
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.10000000000000000000e1
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 -0.20000000000000000000e1
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.20000000000000000000e1
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 0.0
+5 1 5 5 -0.20000000000000000000e1
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.0
+5 1 10 10 0.20000000000000000000e1
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 0.0
+1 1 5 5 -0.10000000000000000000e1
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.0
+1 1 10 10 0.10000000000000000000e1
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 0.0
+2 1 4 4 -0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.0
+2 1 8 8 0.0
+2 1 9 9 0.10000000000000000000e1
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 -0.20000000000000000000e1
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 0.0
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.20000000000000000000e1
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.0
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 0.0
+4 1 4 4 0.0
+4 1 5 5 -0.20000000000000000000e1
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.0
+4 1 9 9 0.0
+4 1 10 10 0.20000000000000000000e1
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 -0.20000000000000000000e1
+5 1 4 4 0.0
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.20000000000000000000e1
+5 1 9 9 0.0
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+1
+15
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.10000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.10000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+-3.897040643191546913e-11 -1.003510531701456252e-11 9.999999998759184772e-01 -1.003510531701483394e-11 7.278112893597343402e-12 1.561441904119943567e-10 
+1 1 1 1 3.303028737554005514e-10 
+1 1 2 2 3.306733310133833145e-10 
+1 1 3 3 3.306733310133849689e-10 
+1 1 4 4 3.350173010240751528e-10 
+1 1 5 5 4.026220818578850470e-10 
+1 1 6 6 2.909034262452337179e-10 
+1 1 7 7 2.905329097453249094e-10 
+1 1 8 8 2.905329097453249094e-10 
+1 1 9 9 2.861889397346347255e-10 
+1 1 10 10 2.185844448948059261e-10 
+1 1 11 11 2.716327139474391598e-10 
+1 1 12 12 3.005680150623395106e-10 
+1 1 13 13 1.000000000186521687e+00 
+1 1 14 14 3.005680150623395106e-10 
+1 1 15 15 3.178812332729514812e-10 
+1 1 16 16 4.667473107913476415e-10 
+2 1 1 1 3.085720952458895772e-01 
+2 1 2 2 4.905335086154526403e-01 
+2 1 3 3 4.905335086154523072e-01 
+2 1 4 4 4.819195249099123557e-01 
+2 1 5 5 4.049907625198815309e-01 
+2 1 6 6 5.799834879569591983e-01 
+2 1 7 7 5.775677111214314596e-01 
+2 1 8 8 5.775677111214317927e-01 
+2 1 9 9 5.877345122279882261e-01 
+2 1 10 10 7.692850660886183523e-01 
+2 1 11 11 6.227736199708546749e-01 
+2 1 12 12 5.545202022769724071e-01 
+2 1 13 13 1.514565026878761820e-10 
+2 1 14 14 5.545202022769712968e-01 
+2 1 15 15 5.169586326527789710e-01 
+2 1 16 16 3.642943037201932244e-01 
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+1.561436804720584254e-10 -1.003471654480777468e-11 7.277889324200324975e-12 -1.003471654480698627e-11 9.999999998759198094e-01 -3.896902886301123655e-11 
+1 1 1 1 3.302949967520381486e-10 
+1 1 2 2 3.306671684213788068e-10 
+1 1 3 3 3.306671684213771525e-10 
+1 1 4 4 4.026144892469943921e-10 
+1 1 5 5 3.350109855463749298e-10 
+1 1 6 6 2.909004543732646459e-10 
+1 1 7 7 2.905283022421476047e-10 
+1 1 8 8 2.905283022421484319e-10 
+1 1 9 9 2.185809546673415602e-10 
+1 1 10 10 2.861844851171523090e-10 
+1 1 11 11 4.667414158038203904e-10 
+1 1 12 12 3.005630187869551985e-10 
+1 1 13 13 3.178756246559627553e-10 
+1 1 14 14 3.005630187869560256e-10 
+1 1 15 15 1.000000000186517690e+00 
+1 1 16 16 2.716287064687523828e-10 
+2 1 1 1 3.085719342317698732e-01 
+2 1 2 2 4.905334289267460623e-01 
+2 1 3 3 4.905334289267462844e-01 
+2 1 4 4 4.049907076165012443e-01 
+2 1 5 5 4.819194444383021469e-01 
+2 1 6 6 5.799834147745930313e-01 
+2 1 7 7 5.775676280573411869e-01 
+2 1 8 8 5.775676280573415200e-01 
+2 1 9 9 7.692849672693621299e-01 
+2 1 10 10 5.877344286191705791e-01 
+2 1 11 11 3.642942598043165114e-01 
+2 1 12 12 5.545201211959869259e-01 
+2 1 13 13 5.169585510954400887e-01 
+2 1 14 14 5.545201211959867038e-01 
+2 1 15 15 1.514561541115767410e-10 
+2 1 16 16 6.227735352763087429e-01 
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+-6.849415201783658479e-10 -1.930143031844140208e-10 1.100739337062153513e-10 9.999999994701329609e-01 1.100739337062205212e-10 -6.849415201783683294e-10 
+1 1 1 1 4.896772153401161641e-09 
+1 1 2 2 3.410184245151618581e-09 
+1 1 3 3 4.083889644060248397e-09 
+1 1 4 4 3.488949291548719894e-09 
+1 1 5 5 3.488949291548733129e-09 
+1 1 6 6 1.151539070681502660e-09 
+1 1 7 7 2.638127032413976560e-09 
+1 1 8 8 1.964421313380110173e-09 
+1 1 9 9 2.559361986016868629e-09 
+1 1 10 10 2.559361986016855394e-09 
+1 1 11 11 2.339214118604432549e-09 
+1 1 12 12 2.831141335598380447e-09 
+1 1 13 13 3.134229572489018918e-09 
+1 1 14 14 1.000000002494288553e+00 
+1 1 15 15 3.134229572489012301e-09 
+1 1 16 16 2.339214118604432549e-09 
+2 1 1 1 2.402125948547901291e-01 
+2 1 2 2 4.293990944355126071e-01 
+2 1 3 3 3.526586237363739107e-01 
+2 1 4 4 4.190468782498448230e-01 
+2 1 5 5 4.190468782498449341e-01 
+2 1 6 6 6.391045303916250697e-01 
+2 1 7 7 4.909907186453401073e-01 
+2 1 8 8 6.532126554796919837e-01 
+2 1 9 9 4.975288653752938384e-01 
+2 1 10 10 4.975288653752942825e-01 
+2 1 11 11 5.226260773377160440e-01 
+2 1 12 12 4.779248160435100590e-01 
+2 1 13 13 4.441440902122668621e-01 
+2 1 14 14 9.765294464102801268e-10 
+2 1 15 15 4.441440902122675283e-01 
+2 1 16 16 5.226260773377159330e-01 
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.0
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+-6.849400706441458255e-10 9.999999994701341821e-01 1.100735747628501262e-10 -1.930140114645311479e-10 1.100735747628577776e-10 -6.849400706441317634e-10 
+1 1 1 1 4.896760498130980968e-09 
+1 1 2 2 4.083879403322953245e-09 
+1 1 3 3 3.410175670796990847e-09 
+1 1 4 4 3.488940568986361716e-09 
+1 1 5 5 3.488940568986361716e-09 
+1 1 6 6 1.151534955493484270e-09 
+1 1 7 7 1.964415890107431548e-09 
+1 1 8 8 2.638119624938865428e-09 
+1 1 9 9 2.559354726749494558e-09 
+1 1 10 10 2.559354726749494558e-09 
+1 1 11 11 2.339207577223779003e-09 
+1 1 12 12 1.000000002494281892e+00 
+1 1 13 13 3.134221222630779297e-09 
+1 1 14 14 2.831133636403395128e-09 
+1 1 15 15 3.134221222630785915e-09 
+1 1 16 16 2.339207577223805473e-09 
+2 1 1 1 2.402111842980755307e-01 
+2 1 2 2 3.526577452644326649e-01 
+2 1 3 3 4.293979895366418220e-01 
+2 1 4 4 4.190457434964942607e-01 
+2 1 5 5 4.190457434964942607e-01 
+2 1 6 6 6.391037240891001003e-01 
+2 1 7 7 6.532114748806566729e-01 
+2 1 8 8 4.909897934203765746e-01 
+2 1 9 9 4.975279592951371010e-01 
+2 1 10 10 4.975279592951371566e-01 
+2 1 11 11 5.226252444103325345e-01 
+2 1 12 12 9.765278284421895590e-10 
+2 1 13 13 4.441430286116896387e-01 
+2 1 14 14 4.779238524415060918e-01 
+2 1 15 15 4.441430286116897497e-01 
+2 1 16 16 5.226252444103324235e-01 
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.0
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.0
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.0
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+6
+1
+16
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 -0.20000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 0.10000000000000000000e1
+0 1 7 7 0.20000000000000000000e1
+0 1 8 8 0.20000000000000000000e1
+0 1 9 9 0.20000000000000000000e1
+0 1 10 10 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 0.0
+1 1 4 4 -0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.10000000000000000000e1
+1 1 7 7 0.0
+1 1 8 8 0.0
+1 1 9 9 0.10000000000000000000e1
+1 1 10 10 0.0
+1 1 11 11 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.0
+2 1 5 5 0.0
+2 1 6 6 0.10000000000000000000e1
+2 1 7 7 0.20000000000000000000e1
+2 1 8 8 0.0
+2 1 9 9 0.0
+2 1 10 10 0.0
+2 1 12 12 0.10000000000000000000e1
+3 1 1 1 -0.10000000000000000000e1
+3 1 2 2 0.0
+3 1 3 3 0.0
+3 1 4 4 0.0
+3 1 5 5 -0.20000000000000000000e1
+3 1 6 6 0.10000000000000000000e1
+3 1 7 7 0.0
+3 1 8 8 0.0
+3 1 9 9 0.0
+3 1 10 10 0.20000000000000000000e1
+3 1 13 13 0.10000000000000000000e1
+4 1 1 1 -0.10000000000000000000e1
+4 1 2 2 0.0
+4 1 3 3 -0.20000000000000000000e1
+4 1 4 4 0.0
+4 1 5 5 0.0
+4 1 6 6 0.10000000000000000000e1
+4 1 7 7 0.0
+4 1 8 8 0.20000000000000000000e1
+4 1 9 9 0.0
+4 1 10 10 0.0
+4 1 14 14 0.10000000000000000000e1
+5 1 1 1 -0.10000000000000000000e1
+5 1 2 2 0.0
+5 1 3 3 0.0
+5 1 4 4 -0.20000000000000000000e1
+5 1 5 5 0.0
+5 1 6 6 0.10000000000000000000e1
+5 1 7 7 0.0
+5 1 8 8 0.0
+5 1 9 9 0.20000000000000000000e1
+5 1 10 10 0.0
+5 1 15 15 0.10000000000000000000e1
+6 1 1 1 -0.10000000000000000000e1
+6 1 2 2 0.0
+6 1 3 3 0.0
+6 1 4 4 0.0
+6 1 5 5 -0.10000000000000000000e1
+6 1 6 6 0.10000000000000000000e1
+6 1 7 7 0.0
+6 1 8 8 0.0
+6 1 9 9 0.0
+6 1 10 10 0.10000000000000000000e1
+6 1 16 16 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+11
+1
+9
+-0.20000000000000000000e1 -0.40000000000000000000e1 0.0 -0.20000000000000000000e1 0.0 0.0 -0.40000000000000000000e1 0.0 0.0 0.0 0.0
+0 1 1 1 0.10000000000000000000e1
+0 1 2 2 0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 -0.20000000000000000000e1
+0 1 6 6 -0.30000000000000000000e1
+0 1 7 7 0.10000000000000000000e1
+0 1 8 8 0.10000000000000000000e1
+0 1 9 9 0.10000000000000000000e1
+1 1 1 4 0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+2 1 1 6 0.10000000000000000000e1
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 6 0.10000000000000000000e1
+2 1 5 5 -0.20000000000000000000e1
+3 1 1 8 -0.10000000000000000000e1
+3 1 2 7 0.10000000000000000000e1
+3 1 2 8 0.10000000000000000000e1
+3 1 4 7 -0.10000000000000000000e1
+4 1 2 9 0.10000000000000000000e1
+4 1 6 6 -0.20000000000000000000e1
+5 1 1 5 0.10000000000000000000e1
+5 1 2 3 -0.10000000000000000000e1
+5 1 2 5 -0.10000000000000000000e1
+5 1 3 4 0.10000000000000000000e1
+6 1 2 6 -0.10000000000000000000e1
+6 1 3 5 0.10000000000000000000e1
+7 1 3 8 0.10000000000000000000e1
+7 1 5 7 0.10000000000000000000e1
+7 1 6 6 -0.40000000000000000000e1
+8 1 1 9 0.10000000000000000000e1
+8 1 3 7 -0.10000000000000000000e1
+8 1 4 9 0.10000000000000000000e1
+8 1 5 8 -0.10000000000000000000e1
+9 1 1 8 -0.10000000000000000000e1
+9 1 3 6 0.10000000000000000000e1
+9 1 4 7 -0.10000000000000000000e1
+9 1 5 6 0.10000000000000000000e1
+10 1 3 9 -0.10000000000000000000e1
+10 1 5 9 -0.10000000000000000000e1
+10 1 6 7 0.10000000000000000000e1
+10 1 6 8 0.10000000000000000000e1
+11 1 6 9 -0.10000000000000000000e1
+11 1 7 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+7
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+1
+1
+7
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.20000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.20000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+-5.556890788244735801e-11 9.999999998126090084e-01 
+1 1 1 1 1.371766850022979014e-09 
+1 1 2 2 1.239944655225034812e-09 
+1 1 3 3 1.503588755145111583e-09 
+1 1 4 4 8.858467696241275587e-10 
+1 1 5 5 1.017669023695250343e-09 
+1 1 6 6 7.540251913734023071e-10 
+1 1 7 7 1.073237931577693152e-09 
+1 1 8 8 1.000000000941415834e+00 
+2 1 1 1 8.264668190892117128e-01 
+2 1 2 2 9.284018581911474000e-01 
+2 1 3 3 7.440682020827841248e-01 
+2 1 4 4 1.003750952565872101e+00 
+2 1 5 5 8.879183343799141870e-01 
+2 1 6 6 1.155426134928457360e+00 
+2 1 7 7 9.036829141458061487e-01 
+2 1 8 8 8.319933258656564673e-10 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.20000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+9.999999998126082312e-01 -5.556927173712509185e-11 
+1 1 1 1 1.371772828573506046e-09 
+1 1 2 2 1.503595446115085720e-09 
+1 1 3 3 1.239950336479537417e-09 
+1 1 4 4 8.858507360359174306e-10 
+1 1 5 5 7.540282028624092675e-10 
+1 1 6 6 1.017673249531043667e-09 
+1 1 7 7 1.000000000941420053e+00 
+1 1 8 8 1.073242521268168758e-09 
+2 1 1 1 8.264669124386264665e-01 
+2 1 2 2 7.440682835202859779e-01 
+2 1 3 3 9.284019561791024833e-01 
+2 1 4 4 1.003751022824112438e+00 
+2 1 5 5 1.155426227911544590e+00 
+2 1 6 6 8.879184076024234651e-01 
+2 1 7 7 8.319966659598644703e-10 
+2 1 8 8 9.036829867678720651e-01 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 -0.20000000000000000000e1
+1 1 3 3 0.0
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.20000000000000000000e1
+1 1 6 6 0.0
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 0.0
+2 1 3 3 -0.20000000000000000000e1
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.0
+2 1 6 6 0.20000000000000000000e1
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.20000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 0.0
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.0
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.20000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+9.999999998126088974e-01 -5.556900459200294288e-11 
+1 1 1 1 1.371768075283454030e-09 
+1 1 2 2 1.239945918359582213e-09 
+1 1 3 3 1.503590213300041686e-09 
+1 1 4 4 8.858478070408223231e-10 
+1 1 5 5 1.017669899991571269e-09 
+1 1 6 6 7.540257960484817367e-10 
+1 1 7 7 1.000000000941416722e+00 
+1 1 8 8 1.073238904583577314e-09 
+2 1 1 1 8.264668397480413597e-01 
+2 1 2 2 9.284018756793208649e-01 
+2 1 3 3 7.440682187553763205e-01 
+2 1 4 4 1.003750962326673601e+00 
+2 1 5 5 8.879183499986768036e-01 
+2 1 6 6 1.155426157050063019e+00 
+2 1 7 7 8.319939589806611944e-10 
+2 1 8 8 9.036829287826558810e-01 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 0.0
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.0
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.20000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+-5.556891800422891315e-11 9.999999998126090084e-01 
+1 1 1 1 1.371766834908556190e-09 
+1 1 2 2 1.503588811560894002e-09 
+1 1 3 3 1.239944722019174444e-09 
+1 1 4 4 8.858468417542438861e-10 
+1 1 5 5 7.540251988850989329e-10 
+1 1 6 6 1.017669050002260653e-09 
+1 1 7 7 1.073237968006482483e-09 
+1 1 8 8 1.000000000941415834e+00 
+2 1 1 1 8.264668205471025209e-01 
+2 1 2 2 7.440682022098322745e-01 
+2 1 3 3 9.284018576700705516e-01 
+2 1 4 4 1.003750951780127076e+00 
+2 1 5 5 1.155426136177322816e+00 
+2 1 6 6 8.879183348606732862e-01 
+2 1 7 7 9.036829143857701974e-01 
+2 1 8 8 8.319933256754810271e-10 
+*** END ***
+*** REQUEST ***
+""
+2
+1
+8
+0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1 0.10000000000000000000e1
+0 1 1 1 -0.10000000000000000000e1
+0 1 2 2 -0.20000000000000000000e1
+0 1 3 3 -0.20000000000000000000e1
+0 1 4 4 0.10000000000000000000e1
+0 1 5 5 0.20000000000000000000e1
+0 1 6 6 0.20000000000000000000e1
+1 1 1 1 -0.10000000000000000000e1
+1 1 2 2 0.0
+1 1 3 3 -0.20000000000000000000e1
+1 1 4 4 0.10000000000000000000e1
+1 1 5 5 0.0
+1 1 6 6 0.20000000000000000000e1
+1 1 7 7 0.10000000000000000000e1
+2 1 1 1 -0.10000000000000000000e1
+2 1 2 2 -0.20000000000000000000e1
+2 1 3 3 0.0
+2 1 4 4 0.10000000000000000000e1
+2 1 5 5 0.20000000000000000000e1
+2 1 6 6 0.0
+2 1 8 8 0.10000000000000000000e1
+*** ANSWER ***
+Infeasible
+*** END ***
+*** REQUEST ***
+""
+5
+5
+4 1 1 1 1
+0.16384000000000000000e6 0.98304000000000000000e6 -0.19660800000000000000e6 -0.14745600000000000000e7 0.98304000000000000000e6
+0 1 2 2 -0.32768000000000000000e6
+0 1 4 4 0.32768000000000000000e6
+0 2 1 1 -0.32768000000000000000e6
+0 4 1 1 0.98304000000000000000e6
+1 1 1 1 0.98304000000000000000e6
+1 1 2 2 0.32768000000000000000e6
+1 1 4 4 -0.32768000000000000000e6
+1 2 1 1 0.32768000000000000000e6
+1 4 1 1 -0.98304000000000000000e6
+2 1 1 2 0.98304000000000000000e6
+2 1 1 4 -0.98304000000000000000e6
+2 4 1 1 0.19660800000000000000e7
+3 1 1 3 0.98304000000000000000e6
+3 1 1 4 -0.58982400000000000000e6
+3 1 4 4 -0.39321600000000000000e6
+4 1 2 2 -0.98304000000000000000e6
+4 1 2 4 0.98304000000000000000e6
+4 1 4 4 -0.98304000000000000000e6
+4 5 1 1 -0.98304000000000000000e6
+5 3 1 1 0.98304000000000000000e6
+5 4 1 1 0.98304000000000000000e6
+*** ANSWER ***
+Failure
+*** END ***
+*** REQUEST ***
+""
+20
+7
+4 1 4 1 4 1 1
+0.98304000000000000000e6 0.13107200000000000000e7 -0.39321600000000000000e6 0.0 -0.19660800000000000000e7 0.98304000000000000000e6 0.0 0.0 0.19660800000000000000e7 0.19660800000000000000e7 0.19660800000000000000e7 0.98304000000000000000e6 0.0 0.0 0.0 0.0 0.0 0.0 0.19660800000000000000e7 0.98304000000000000000e6
+0 1 1 2 -0.24576000000000000000e6
+0 1 1 4 0.24576000000000000000e6
+0 2 1 1 -0.16384000000000000000e6
+0 3 1 2 -0.81920000000000000000e5
+0 5 1 4 0.81920000000000000000e5
+1 1 2 3 0.12288000000000000000e7
+1 1 3 4 -0.12288000000000000000e7
+1 5 1 4 0.73728000000000000000e6
+1 5 4 4 0.49152000000000000000e6
+2 1 1 1 0.49152000000000000000e6
+2 1 1 2 0.24576000000000000000e6
+2 1 1 4 -0.24576000000000000000e6
+2 2 1 1 0.16384000000000000000e6
+2 3 1 2 0.81920000000000000000e5
+2 5 1 4 -0.81920000000000000000e5
+3 1 1 3 0.49152000000000000000e6
+3 1 1 4 -0.29491200000000000000e6
+3 1 4 4 -0.19660800000000000000e6
+4 1 2 2 0.49152000000000000000e6
+4 1 4 4 -0.49152000000000000000e6
+4 3 1 2 -0.24576000000000000000e6
+4 5 1 4 0.24576000000000000000e6
+5 1 2 4 0.49152000000000000000e6
+5 1 4 4 -0.98304000000000000000e6
+5 5 1 4 0.49152000000000000000e6
+6 1 1 2 -0.24576000000000000000e6
+6 1 1 4 0.24576000000000000000e6
+6 3 1 1 0.49152000000000000000e6
+7 1 2 3 -0.49152000000000000000e6
+7 1 3 4 0.49152000000000000000e6
+7 3 1 3 0.49152000000000000000e6
+8 3 1 4 0.49152000000000000000e6
+8 5 1 4 0.49152000000000000000e6
+9 1 1 2 0.73728000000000000000e6
+9 1 1 4 -0.73728000000000000000e6
+9 1 2 3 -0.12288000000000000000e7
+9 1 3 4 0.12288000000000000000e7
+9 3 1 2 0.73728000000000000000e6
+9 3 2 2 0.49152000000000000000e6
+9 4 1 1 0.49152000000000000000e6
+10 3 3 3 0.49152000000000000000e6
+10 5 3 3 0.49152000000000000000e6
+11 3 4 4 0.49152000000000000000e6
+11 5 4 4 0.49152000000000000000e6
+12 1 1 2 0.24576000000000000000e6
+12 1 1 4 -0.24576000000000000000e6
+12 5 1 1 0.49152000000000000000e6
+13 3 1 2 0.49152000000000000000e6
+13 5 1 2 0.49152000000000000000e6
+14 1 2 3 0.49152000000000000000e6
+14 1 3 4 -0.49152000000000000000e6
+14 5 1 3 0.49152000000000000000e6
+15 1 1 2 -0.73728000000000000000e6
+15 1 1 4 0.73728000000000000000e6
+15 1 2 3 0.12288000000000000000e7
+15 1 3 4 -0.12288000000000000000e7
+15 3 1 2 -0.73728000000000000000e6
+15 4 1 1 -0.49152000000000000000e6
+15 5 2 2 0.49152000000000000000e6
+16 3 2 3 0.49152000000000000000e6
+16 5 2 3 0.49152000000000000000e6
+17 3 2 4 0.49152000000000000000e6
+17 5 2 4 0.49152000000000000000e6
+18 3 3 4 0.49152000000000000000e6
+18 5 3 4 0.49152000000000000000e6
+19 4 1 1 0.49152000000000000000e6
+19 6 1 1 0.49152000000000000000e6
+20 3 1 2 0.24576000000000000000e6
+20 5 1 4 0.24576000000000000000e6
+20 7 1 1 0.49152000000000000000e6
+*** ANSWER ***
+Failure
+*** END ***
+*** REQUEST ***
+""
+2
+3
+2 1 1
+0.78643200000000000000e6 -0.18350080000000000000e7
+0 1 2 2 -0.26214400000000000000e6
+0 2 1 1 -0.26214400000000000000e6
+1 1 1 1 0.26214400000000000000e6
+1 1 2 2 0.26214400000000000000e6
+1 2 1 1 0.26214400000000000000e6
+2 1 1 2 -0.13107200000000000000e6
+2 1 2 2 -0.10485760000000000000e7
+2 2 1 1 -0.10485760000000000000e7
+2 3 1 1 0.26214400000000000000e6
+*** ANSWER ***
+1.127570111857972568e-01 2.449355441053016891e-01 
+1 1 1 1 2.955857394028963608e+04 
+1 1 1 2 -3.210419163697010299e+04 
+1 1 2 2 3.486904084452883399e+04 
+1 2 1 1 3.486904084452883399e+04 
+1 3 1 1 6.420838327394020598e+04 
+2 1 1 1 1.623722218783865356e+00 
+2 1 1 2 1.494888884982461086e+00 
+2 1 2 2 1.376277763118065600e+00 
+2 2 1 1 1.809839237968250559e-08 
+2 3 1 1 9.854620231493015123e-09 
+*** END ***
+*** REQUEST ***
+""
+4
+2
+3 1
+-0.78643200000000000000e6 0.78643200000000000000e6 0.10485760000000000000e7 0.0
+0 1 2 2 0.52428800000000000000e6
+0 1 3 3 -0.52428800000000000000e6
+0 2 1 1 -0.52428800000000000000e6
+1 1 2 3 0.78643200000000000000e6
+1 1 3 3 -0.15728640000000000000e7
+2 1 2 2 0.15728640000000000000e7
+2 1 2 3 -0.78643200000000000000e6
+3 1 1 1 0.15728640000000000000e7
+3 1 2 2 -0.52428800000000000000e6
+3 1 3 3 0.52428800000000000000e6
+3 2 1 1 0.52428800000000000000e6
+4 1 1 2 -0.15728640000000000000e7
+4 1 1 3 0.15728640000000000000e7
+*** ANSWER ***
+Failure
+*** END ***
diff --git a/test-suite/failure/evarclear1.v b/test-suite/failure/evarclear1.v
new file mode 100644
index 00000000..2e9fa0f3
--- /dev/null
+++ b/test-suite/failure/evarclear1.v
@@ -0,0 +1,10 @@
+Set Printing Existential Instances.
+Set Printing All.
+Goal forall y, let z := S y in exists x, x = 0.
+intros.
+eexists.
+unfold z.
+clear y z.
+(* should fail because the evar should no longer be allowed to depend on z *)
+instantiate (1:=z).
+
diff --git a/test-suite/failure/evarclear2.v b/test-suite/failure/evarclear2.v
new file mode 100644
index 00000000..e606a06f
--- /dev/null
+++ b/test-suite/failure/evarclear2.v
@@ -0,0 +1,9 @@
+Set Printing Existential Instances.
+Set Printing All.
+Goal let y:=0 in exists x:y=y, x = x.
+intros.
+eexists.
+rename y into z.
+unfold z at 1 2.
+(* should fail because the evar type depends on z *)
+clear z.
diff --git a/test-suite/micromega/bertot.v b/test-suite/micromega/bertot.v
index 6951fcd3..bcf222f9 100644
--- a/test-suite/micromega/bertot.v
+++ b/test-suite/micromega/bertot.v
@@ -7,7 +7,7 @@
 (************************************************************************)
 
 Require Import ZArith.
-Require Import Micromegatac.
+Require Import Psatz.
 
 Open Scope Z_scope.
 
@@ -17,6 +17,6 @@ Goal (forall x y n,
   (x < n /\ x <= n /\ 2 * y = x * (x+1) -> x + 1 <= n /\ 2 *(x+1+y) = (x+1)*(x+2))).
 Proof.
   intros.
-  micromega Z.
+  psatz Z 3.
 Qed.
 
diff --git a/test-suite/micromega/example.v b/test-suite/micromega/example.v
index dc78ace5..751fe91e 100644
--- a/test-suite/micromega/example.v
+++ b/test-suite/micromega/example.v
@@ -7,7 +7,7 @@
 (************************************************************************)
 
 Require Import ZArith.
-Require Import Micromegatac.
+Require Import Psatz.
 Require Import Ring_normalize.
 Open Scope Z_scope.
 Require Import ZMicromega.
@@ -19,7 +19,7 @@ Lemma not_so_easy : forall x n : Z,
   2*x + 1 <= 2 *n -> x <= n-1.
 Proof.
   intros.
-  zfarkas. 
+  lia. 
 Qed.
 
 
@@ -28,14 +28,14 @@ Qed.
 Lemma some_pol : forall x, 4 * x ^ 2 + 3 * x + 2 >= 0.
 Proof.
   intros. 
-  micromega Z. 
+  psatz Z 2. 
 Qed.
 
 
 Lemma Zdiscr: forall a b c x, 
   a * x ^ 2 + b * x + c = 0 -> b ^ 2 - 4 * a * c >= 0.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 4.
 Qed.
 
 
@@ -43,7 +43,7 @@ Lemma plus_minus : forall x y,
   0 = x + y -> 0 =  x -y -> 0 = x /\ 0 = y.
 Proof.
   intros.
-  zfarkas.
+  lia.
 Qed.
 
 
@@ -51,13 +51,13 @@ Qed.
 Lemma mplus_minus : forall x y, 
   x + y >= 0 -> x -y >= 0 -> x^2 - y^2 >= 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma pol3: forall x y, 0 <= x + y ->  
   x^3 + 3*x^2*y + 3*x* y^2 + y^3 >= 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 4.
 Qed.
 
 
@@ -96,7 +96,7 @@ Proof.
   generalize (H8 _ _ _ (conj H5 H4)).
   generalize (H10 _ _ _ (conj H5 H4)).
   generalize rho_ge.
-  micromega Z.
+  psatz Z 2.
 Qed.
 
 (* Rule of signs *)
@@ -104,55 +104,55 @@ Qed.
 Lemma sign_pos_pos: forall x y,
   x > 0 -> y > 0 -> x*y > 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_pos_zero: forall x y,
   x > 0 -> y = 0 -> x*y = 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_pos_neg: forall x y,
   x > 0 -> y < 0 -> x*y < 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_zer_pos: forall x y,
   x = 0 -> y > 0 -> x*y = 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_zero_zero: forall x y,
   x = 0 -> y = 0 -> x*y = 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_zero_neg: forall x y,
   x = 0 -> y < 0 -> x*y = 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_neg_pos: forall x y,
   x < 0 -> y > 0 -> x*y < 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_neg_zero: forall x y,
   x < 0 -> y = 0 -> x*y = 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma sign_neg_neg: forall x y,
   x < 0 -> y < 0 -> x*y > 0.
 Proof.
-  intros; micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 
@@ -161,26 +161,26 @@ Qed.
 Lemma binomial : forall x y, (x+y)^2 = x^2 + 2*x*y + y^2.
 Proof.
   intros.
-  zfarkas.
+  lia.
 Qed.
 
 Lemma product : forall x y, x >= 0 -> y >= 0 -> x * y >= 0.
 Proof.
   intros.
-  micromega Z.
+  psatz Z 2.
 Qed.
 
 
 Lemma product_strict : forall x y, x > 0 -> y > 0 -> x * y > 0.
 Proof.
   intros.
-  micromega Z.
+  psatz Z 2.
 Qed.
 
 
 Lemma pow_2_pos : forall x, x ^ 2 + 1 = 0 ->  False.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 2.
 Qed.
 
 (* Found in Parrilo's talk *)
@@ -188,10 +188,9 @@ Qed.
 Lemma parrilo_ex : forall x y, x - y^2 + 3 >= 0 -> y + x^2 + 2 = 0 -> False.
 Proof.
   intros.
-  micromega Z.
+  psatz Z 2.
 Qed.
 
-
 (* from hol_light/Examples/sos.ml *)
 
 Lemma hol_light1 : forall a1 a2 b1 b2,
@@ -199,26 +198,26 @@ Lemma hol_light1 : forall a1 a2 b1 b2,
    (a1 * a1 + a2 * a2 = b1 * b1 + b2 * b2 + 2) -> 
    (a1 * b1 + a2 * b2 = 0) -> a1 * a2 - b1 * b2 >= 0.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 4.
 Qed.
 
 
 Lemma hol_light2 : forall x a,
         3 * x + 7 * a < 4 -> 3 < 2 * x -> a < 0.
 Proof.
- intros ; micromega Z.
+ intros ; psatz Z 2.
 Qed.
 
 Lemma hol_light3 : forall b a c x,
   b ^ 2 < 4 * a * c -> (a * x ^2  + b * x + c = 0) -> False.
 Proof.
-intros ; micromega Z.
+intros ; psatz Z 4.
 Qed.
 
 Lemma hol_light4 : forall a c b x,
   a * x ^ 2 + b * x + c = 0 -> b ^ 2 >= 4 * a * c.
 Proof.
-intros ; micromega Z.
+intros ; psatz Z 4.
 Qed.
 
 Lemma hol_light5 : forall x y,
@@ -228,7 +227,7 @@ Lemma hol_light5 : forall x y,
       x ^ 2 + (y - 1) ^ 2 < 1 \/
       (x - 1) ^ 2 + (y - 1) ^ 2 < 1.
 Proof.
-intros; micromega Z.
+intros; psatz Z 3.
 Qed.
 
 
@@ -237,32 +236,32 @@ Lemma hol_light7 : forall x y z,
  0<= x /\ 0 <= y /\ 0 <= z /\ x + y + z <= 3
   -> x * y + x * z + y * z >= 3 * x * y * z.
 Proof.
-intros ; micromega Z.
+intros ; psatz Z 3.
 Qed.
 
 Lemma hol_light8 : forall x y z,
  x ^ 2 + y ^ 2 + z ^ 2 = 1 -> (x + y + z) ^ 2 <= 3.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 2.
 Qed.
 
 Lemma hol_light9 : forall w x y z,
  w ^ 2 + x ^ 2 + y ^ 2 + z ^ 2 = 1
   -> (w + x + y + z) ^ 2 <= 4.
 Proof.
-  intros;micromega Z.
+  intros; psatz Z 2.
 Qed.
 
 Lemma hol_light10 : forall x y,
  x >= 1 /\ y >= 1 -> x * y >= x + y - 1.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 2.
 Qed.
 
 Lemma hol_light11 : forall x y,
  x > 1 /\ y > 1 -> x * y > x + y - 1.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 2.
 Qed.
 
 
@@ -274,14 +273,14 @@ Lemma hol_light12: forall x y z,
 Proof.
   intros x y z ; set (e:= (125841 / 50000)).
   compute in e.
-  unfold e ; intros ; micromega Z.
+  unfold e ; intros ; psatz Z 2.
 Qed.
 
 Lemma hol_light14 : forall x y z,
  2 <= x /\ x <= 4 /\ 2 <= y /\ y <= 4 /\ 2 <= z /\ z <= 4
   -> 12 <= 2 * (x * z + x * y + y * z) - (x * x + y * y + z * z).
 Proof.
-  intros ;micromega Z.
+  intros ;psatz Z 2.
 Qed.
 
 (* ------------------------------------------------------------------------- *)
@@ -292,20 +291,20 @@ Lemma hol_light16 : forall x y,
   0 <= x /\ 0 <= y /\ (x * y = 1)
    -> x + y <= x ^ 2 + y ^ 2.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 2.
 Qed.
 
 Lemma hol_light17 : forall x y,
   0 <= x /\ 0 <= y /\ (x * y = 1)
    -> x * y * (x + y) <= x ^ 2 + y ^ 2.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 3.
 Qed.
 
 Lemma hol_light18 : forall x y,
   0 <= x /\ 0 <= y -> x * y * (x + y) ^ 2 <= (x ^ 2 + y ^ 2) ^ 2.
 Proof.
-  intros ; micromega Z.
+  intros ; psatz Z 4.
 Qed.
 
 (* ------------------------------------------------------------------------- *)
@@ -314,13 +313,13 @@ Qed.
 
 Lemma hol_light19 : forall m n, 2 * m + n = (n + m) + m.
 Proof.
-  intros ; zfarkas.
+  intros ; lia.
 Qed.
 
 Lemma hol_light22 : forall n, n >= 0 -> n <= n * n.
 Proof.
   intros.
-  micromega Z.
+  psatz Z 2.
 Qed.
 
 
@@ -329,12 +328,12 @@ Lemma hol_light24 : forall x1 y1 x2 y2, x1 >= 0 -> x2 >= 0 -> y1 >= 0 -> y2 >= 0
                 -> (x1 + y1 = x2 + y2).
 Proof.
   intros.
-  micromega Z.
+  psatz Z 2.
 Qed.
 
 Lemma motzkin' : forall x y, (x^2+y^2+1)*(x^2*y^4 + x^4*y^2 + 1 - 3*x^2*y^2) >= 0.
 Proof.
-  intros ; sos Z.
+  intros ; psatz Z.
 Qed.
 
 
@@ -343,5 +342,5 @@ Lemma motzkin : forall x y, (x^2*y^4 + x^4*y^2 + 1 - 3*x^2*y^2)  >= 0.
 Proof.
   intros.
   generalize (motzkin' x y).
-  micromega Z.
+  psatz Z 8.
 Qed.
diff --git a/test-suite/micromega/heap3_vcgen_25.v b/test-suite/micromega/heap3_vcgen_25.v
index ec88b68d..0298303f 100644
--- a/test-suite/micromega/heap3_vcgen_25.v
+++ b/test-suite/micromega/heap3_vcgen_25.v
@@ -7,7 +7,7 @@
 (************************************************************************)
 
 Require Import ZArith.
-Require Import Micromegatac.
+Require Import Psatz.
 
 Open Scope Z_scope.
 
@@ -34,5 +34,5 @@ Lemma vcgen_25 : forall
   (H13 : 0 <= 121 * i + 810 * j + -7465 * m + 64350),
   (1 = -2 * i + it).
 Proof.
-  intros ; zfarkas.
+  intros ; lia.
 Qed.
diff --git a/test-suite/micromega/qexample.v b/test-suite/micromega/qexample.v
index 42aff5a4..1fa250e0 100644
--- a/test-suite/micromega/qexample.v
+++ b/test-suite/micromega/qexample.v
@@ -6,7 +6,7 @@
 (*                                                                      *)
 (************************************************************************)
 
-Require Import Micromegatac.
+Require Import Psatz.
 Require Import QArith.
 Require Import Ring_normalize.
 
@@ -14,22 +14,25 @@ Lemma plus_minus : forall x y,
   0 == x + y -> 0 ==  x -y -> 0 == x /\ 0 == y.
 Proof.
   intros.
-  omicron Q.
+  psatzl Q.
 Qed.
 
+
+
+
 (* Other (simple) examples *)
 Open Scope Q_scope.
 
 Lemma binomial : forall x y:Q, ((x+y)^2 == x^2 + (2 # 1) *x*y + y^2).
 Proof.
   intros.
-  omicron Q.
+  psatzl Q.
 Qed.
 
 
 Lemma hol_light19 : forall m n, (2 # 1) * m + n == (n + m) + m.
 Proof.
-  intros ; omicron Q.
+  intros ; psatzl Q.
 Qed.
 Open Scope Z_scope.
 Open Scope Q_scope.
@@ -58,5 +61,19 @@ Lemma vcgen_25 : forall
   (( 1# 1) == (-2 # 1) * i + it).
 Proof.
   intros.
-  omicron Q.
+  psatzl Q.
+Qed.
+
+Goal forall x, -x^2 >= 0 -> x - 1 >= 0 -> False.
+Proof.
+  intros.
+  psatz Q 2.
 Qed.
+
+Lemma motzkin' : forall x y, (x^2+y^2+1)*(x^2*y^4 + x^4*y^2 + 1 - (3 # 1) *x^2*y^2) >= 0.
+Proof.
+  intros ; psatz Q.
+Qed.
+
+
+
diff --git a/test-suite/micromega/rexample.v b/test-suite/micromega/rexample.v
index 5132dc4e..d7386a4e 100644
--- a/test-suite/micromega/rexample.v
+++ b/test-suite/micromega/rexample.v
@@ -6,17 +6,17 @@
 (*                                                                      *)
 (************************************************************************)
 
-Require Import Micromegatac.
+Require Import Psatz.
 Require Import Reals.
 Require Import Ring_normalize.
 
 Open Scope R_scope.
 
-Lemma plus_minus : forall x y, 
+Lemma yplus_minus : forall x y, 
   0 = x + y -> 0 =  x -y -> 0 = x /\ 0 = y.
 Proof.
   intros.
-  omicron R.
+  psatzl R.
 Qed.
 
 (* Other (simple) examples *)
@@ -24,13 +24,13 @@ Qed.
 Lemma binomial : forall x y, ((x+y)^2 = x^2 + 2 *x*y + y^2).
 Proof.
   intros.
-  omicron R.
+  psatzl R.
 Qed.
 
 
 Lemma hol_light19 : forall m n, 2 * m + n = (n + m) + m.
 Proof.
-  intros ; omicron R.
+  intros ; psatzl R.
 Qed.
 
 
@@ -58,5 +58,20 @@ Lemma vcgen_25 : forall
   (( 1 ) = (-2  ) * i + it).
 Proof.
   intros.
-  omicron R.
+  psatzl R.
 Qed.
+
+Goal forall x, -x^2 >= 0 -> x - 1 >= 0 -> False.
+Proof.
+  intros.
+  psatz R 2.
+Qed.
+
+Lemma motzkin' : forall x y, (x^2+y^2+1)*(x^2*y^4 + x^4*y^2 + 1 - (3 ) *x^2*y^2) >= 0.
+Proof.
+  intros ; psatz R.
+Qed.
+
+Lemma l1 : forall x y z : R, Rabs (x - z) <= Rabs (x - y) + Rabs (y - z).
+intros; split_Rabs; psatzl R.
+Qed.
\ No newline at end of file
diff --git a/test-suite/micromega/square.v b/test-suite/micromega/square.v
index 30c72e8c..b78bba25 100644
--- a/test-suite/micromega/square.v
+++ b/test-suite/micromega/square.v
@@ -6,12 +6,12 @@
 (*                                                                      *)
 (************************************************************************)
 
-Require Import ZArith Zwf Micromegatac QArith.
+Require Import ZArith Zwf Psatz QArith.
 Open Scope Z_scope.
 
 Lemma Zabs_square : forall x,  (Zabs  x)^2 = x^2.
 Proof.
- intros ; case (Zabs_dec x) ; intros ; micromega Z.
+ intros ; case (Zabs_dec x) ; intros ; psatz Z 2.
 Qed.
 Hint Resolve Zabs_pos Zabs_square.
 
@@ -21,11 +21,11 @@ intros [n [p [Heq Hnz]]]; pose (n' := Zabs n); pose (p':=Zabs p).
 assert (facts : 0 <= Zabs n /\ 0 <= Zabs p /\ Zabs n^2=n^2
          /\ Zabs p^2 = p^2) by auto.
 assert (H : (0 < n' /\ 0 <= p' /\ n' ^2 = 2* p' ^2)) by 
-  (destruct facts as [Hf1 [Hf2 [Hf3 Hf4]]]; unfold n', p' ; micromega Z).
+  (destruct facts as [Hf1 [Hf2 [Hf3 Hf4]]]; unfold n', p' ; psatz Z 2).
 generalize p' H; elim n' using (well_founded_ind (Zwf_well_founded 0)); clear.
 intros n IHn p [Hn [Hp Heq]].
-assert (Hzwf : Zwf 0 (2*p-n) n) by (unfold Zwf; micromega Z).
-assert (Hdecr : 0 < 2*p-n /\ 0 <= n-p /\ (2*p-n)^2=2*(n-p)^2) by micromega Z.
+assert (Hzwf : Zwf 0 (2*p-n) n) by (unfold Zwf; psatz Z 2).
+assert (Hdecr : 0 < 2*p-n /\ 0 <= n-p /\ (2*p-n)^2=2*(n-p)^2) by psatz Z 2.
 apply (IHn (2*p-n) Hzwf (n-p) Hdecr).
 Qed.
 
@@ -44,7 +44,9 @@ Lemma QdenZpower : forall x : Q, ' Qden (x ^ 2)%Q = ('(Qden x) ^ 2) %Z.
 Proof.
   intros.
   destruct x.
-  cbv beta  iota zeta delta - [Pmult].
+  simpl.
+  unfold Zpower_pos.
+  simpl.
   rewrite Pmult_1_r.
   reflexivity.
 Qed.
diff --git a/test-suite/micromega/zomicron.v b/test-suite/micromega/zomicron.v
index b13654d6..2b40f6c9 100644
--- a/test-suite/micromega/zomicron.v
+++ b/test-suite/micromega/zomicron.v
@@ -1,27 +1,27 @@
 Require Import ZArith.
-Require Import Micromegatac.
+Require Import Psatz.
 Open Scope Z_scope.
 
 Lemma two_x_eq_1 : forall x, 2 * x = 1 -> False.
 Proof.
   intros.
-  omicron Z.
+  lia.
 Qed.
 
 Lemma two_x_y_eq_1 : forall x y, 2 * x + 2 * y = 1 -> False.
 Proof.
   intros.
-  omicron Z.
+  lia.
 Qed.
 
 Lemma two_x_y_z_eq_1 : forall x y z, 2 * x + 2 * y + 2 * z= 1 -> False.
 Proof.
   intros.
-  omicron Z.
+  lia.
 Qed.
 
 Lemma omega_nightmare : forall x y, 27 <= 11 * x + 13 * y <= 45 -> 7 * x - 9 * y = 4 -> -10 <= 7 * x - 9 * y <= 4 -> False.
 Proof.
   intros ; intuition auto.
-  omicron Z.
+  lia.
 Qed.  
diff --git a/test-suite/output/ArgumentsScope.out b/test-suite/output/ArgumentsScope.out
new file mode 100644
index 00000000..6643c142
--- /dev/null
+++ b/test-suite/output/ArgumentsScope.out
@@ -0,0 +1,56 @@
+a : bool -> bool
+
+Argument scope is [bool_scope]
+Expands to: Variable a
+b : bool -> bool
+
+Argument scope is [bool_scope]
+Expands to: Variable b
+negb'' : bool -> bool
+
+Argument scope is [bool_scope]
+negb'' is transparent
+Expands to: Constant Top.A.B.negb''
+negb' : bool -> bool
+
+Argument scope is [bool_scope]
+negb' is transparent
+Expands to: Constant Top.A.negb'
+negb : bool -> bool
+
+Argument scope is [bool_scope]
+negb is transparent
+Expands to: Constant Coq.Init.Datatypes.negb
+a : bool -> bool
+
+Expands to: Variable a
+b : bool -> bool
+
+Expands to: Variable b
+negb : bool -> bool
+
+negb is transparent
+Expands to: Constant Coq.Init.Datatypes.negb
+negb' : bool -> bool
+
+negb' is transparent
+Expands to: Constant Top.A.negb'
+negb'' : bool -> bool
+
+negb'' is transparent
+Expands to: Constant Top.A.B.negb''
+a : bool -> bool
+
+Expands to: Variable a
+negb : bool -> bool
+
+negb is transparent
+Expands to: Constant Coq.Init.Datatypes.negb
+negb' : bool -> bool
+
+negb' is transparent
+Expands to: Constant Top.negb'
+negb'' : bool -> bool
+
+negb'' is transparent
+Expands to: Constant Top.negb''
diff --git a/test-suite/output/ArgumentsScope.v b/test-suite/output/ArgumentsScope.v
new file mode 100644
index 00000000..13b5e13d
--- /dev/null
+++ b/test-suite/output/ArgumentsScope.v
@@ -0,0 +1,29 @@
+(* A few tests to check Argument Scope Global command *)
+
+Section A.
+Variable a : bool -> bool.
+Definition negb' := negb.
+Section B.
+Variable b : bool -> bool.
+Definition negb'' := negb.
+About a.
+About b.
+About negb''.
+About negb'.
+About negb.
+Arguments Scope Global negb'' [ _ ].
+Arguments Scope Global negb' [ _ ].
+Arguments Scope Global negb [ _ ].
+Arguments Scope Global a [ _ ].
+Arguments Scope Global b [ _ ].
+About a.
+About b.
+About negb.
+About negb'.
+About negb''.
+End B.
+About a.
+End A.
+About negb.
+About negb'.
+About negb''.
diff --git a/test-suite/output/Cases.out b/test-suite/output/Cases.out
index 9d0d0658..995754a6 100644
--- a/test-suite/output/Cases.out
+++ b/test-suite/output/Cases.out
@@ -21,7 +21,7 @@ Argument scopes are [nat_scope nat_scope _ _ _]
 foo = 
 fix foo (A : Type) (l : list A) {struct l} : option A :=
   match l with
-  | nil => None (A:=A)
+  | nil => None
   | x0 :: nil => Some x0
   | x0 :: (_ :: _) as l0 => foo A l0
   end
diff --git a/test-suite/output/Fixpoint.out b/test-suite/output/Fixpoint.out
index f4270d3d..c69d31f4 100644
--- a/test-suite/output/Fixpoint.out
+++ b/test-suite/output/Fixpoint.out
@@ -1,6 +1,6 @@
 fix F (A B : Set) (f : A -> B) (l : list A) {struct l} : 
 list B := match l with
-          | nil => nil (A:=B)
+          | nil => nil
           | a :: l0 => f a :: F A B f l0
           end
      : forall A B : Set, (A -> B) -> list A -> list B
@@ -13,13 +13,13 @@ fix even_pos_odd_pos 2
  with (odd_pos_even_pos (n:_) (H:odd n) {struct H} : n >= 1).
  intros.
  destruct H.
-   omega.
+  omega.
   
-   apply odd_pos_even_pos in H.
-   omega.
+  apply odd_pos_even_pos in H.
+  omega.
   
  intros.
  destruct H.
-  apply even_pos_odd_pos in H.
-  omega.
+ apply even_pos_odd_pos in H.
+ omega.
  
diff --git a/test-suite/output/Match_subterm.out b/test-suite/output/Match_subterm.out
new file mode 100644
index 00000000..951a98db
--- /dev/null
+++ b/test-suite/output/Match_subterm.out
@@ -0,0 +1,8 @@
+(0 = 1)
+eq
+nat
+0
+1
+S
+0
+2
diff --git a/test-suite/output/Match_subterm.v b/test-suite/output/Match_subterm.v
new file mode 100644
index 00000000..2c44b187
--- /dev/null
+++ b/test-suite/output/Match_subterm.v
@@ -0,0 +1,6 @@
+Goal 0 = 1.
+match goal with
+| |- context [?v] =>
+  idtac v ; fail
+| _ => idtac 2
+end.
diff --git a/test-suite/output/Tactics.out b/test-suite/output/Tactics.out
index 287e8488..ac5eedc1 100644
--- a/test-suite/output/Tactics.out
+++ b/test-suite/output/Tactics.out
@@ -1,4 +1,4 @@
-intro H; split; [  a H |  e H ].
+intro H; split; [ a H | e H ].
 
 intros; match goal with
         | |- context [if ?X then _ else _] => case X
diff --git a/test-suite/success/CanonicalStructure.v b/test-suite/success/CanonicalStructure.v
index 44d21b83..b8cae471 100644
--- a/test-suite/success/CanonicalStructure.v
+++ b/test-suite/success/CanonicalStructure.v
@@ -12,3 +12,20 @@ Record Silly (X : Set) : Set := mkSilly { x : X }.
 Definition anotherMk := mkSilly.
 Definition struct := anotherMk nat 3.
 Canonical Structure struct.
+
+(* Intertwinning canonical structures and delta-expansion *)
+(* Assia's short example *)
+
+Open Scope bool_scope.
+
+Set Implicit Arguments.
+
+Structure test_struct : Type := mk_test {dom :> Type; f : dom -> dom -> bool}.
+
+Notation " x != y":= (f _ x y)(at level 10).
+
+Canonical Structure bool_test := mk_test (fun x y => x || y).
+
+Definition b := bool.
+
+Check (fun x : b => x != x).
diff --git a/test-suite/success/ImplicitArguments.v b/test-suite/success/ImplicitArguments.v
index e7795733..84ec298d 100644
--- a/test-suite/success/ImplicitArguments.v
+++ b/test-suite/success/ImplicitArguments.v
@@ -2,6 +2,8 @@ Inductive vector {A : Type} : nat -> Type :=
 | vnil : vector 0
 | vcons : A -> forall {n'}, vector n' -> vector (S n').
 
+Implicit Arguments vector [].
+
 Require Import Coq.Program.Program.
 
 Program Definition head {A : Type} {n : nat} (v : vector A (S n)) : vector A n :=
diff --git a/test-suite/success/Notations.v b/test-suite/success/Notations.v
index facd5509..6dce0401 100644
--- a/test-suite/success/Notations.v
+++ b/test-suite/success/Notations.v
@@ -21,3 +21,8 @@ Definition marker := O.
 Notation "x +1" := (S x) (at level 8, left associativity).
 Reset marker.
 Notation "x +1" := (S x) (at level 8, right associativity).
+
+(* Check that empty levels (here 8 and 2 in pattern) are added in the
+   right order *)
+
+Notation "' 'C_' G ( A )" := (A,G) (at level 8, G at level 2).
diff --git a/test-suite/success/setoid_test2.v b/test-suite/success/setoid_test2.v
index 34fff9d1..b89787bb 100644
--- a/test-suite/success/setoid_test2.v
+++ b/test-suite/success/setoid_test2.v
@@ -120,7 +120,7 @@ Axiom eqS1: S1 -> S1 -> Prop.
 Axiom SetoidS1 : Setoid_Theory S1 eqS1.
 Add Setoid S1 eqS1 SetoidS1 as S1setoid.
 
-Instance eqS1_default : DefaultRelation S1 eqS1.
+Instance eqS1_default : DefaultRelation eqS1.
 
 Axiom eqS1': S1 -> S1 -> Prop.
 Axiom SetoidS1' : Setoid_Theory S1 eqS1'.
@@ -220,7 +220,7 @@ Axiom eqS1_test8: S1_test8 -> S1_test8 -> Prop.
 Axiom SetoidS1_test8 : Setoid_Theory S1_test8 eqS1_test8.
 Add Setoid S1_test8 eqS1_test8 SetoidS1_test8 as S1_test8setoid.
 
-Instance eqS1_test8_default : DefaultRelation S1_test8 eqS1_test8.
+Instance eqS1_test8_default : DefaultRelation eqS1_test8.
 
 Axiom f_test8 : S2 -> S1_test8.
 Add Morphism f_test8 : f_compat_test8. Admitted.
diff --git a/theories/Classes/EquivDec.v b/theories/Classes/EquivDec.v
index debe953a..1e58d05d 100644
--- a/theories/Classes/EquivDec.v
+++ b/theories/Classes/EquivDec.v
@@ -13,7 +13,7 @@
  * Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
  *              91405 Orsay, France *)
 
-(* $Id: EquivDec.v 10919 2008-05-11 22:04:26Z msozeau $ *)
+(* $Id: EquivDec.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Set Implicit Arguments.
 Unset Strict Implicit.
@@ -40,7 +40,7 @@ Class [ equiv : Equivalence A ] => EqDec :=
 (** We define the [==] overloaded notation for deciding equality. It does not take precedence
    of [==] defined in the type scope, hence we can have both at the same time. *)
 
-Notation " x == y " := (equiv_dec (x :>) (y :>)) (no associativity, at level 70).
+Notation " x == y " := (equiv_dec (x :>) (y :>)) (no associativity, at level 70) : equiv_scope.
 
 Definition swap_sumbool {A B} (x : { A } + { B }) : { B } + { A } :=
   match x with
@@ -58,7 +58,7 @@ Program Definition nequiv_dec [ EqDec A ] (x y : A) : { x =/= y } + { x === y }
 
 (** Overloaded notation for inequality. *)
 
-Infix "=/=" := nequiv_dec (no associativity, at level 70).
+Infix "<>" := nequiv_dec (no associativity, at level 70) : equiv_scope.
 
 (** Define boolean versions, losing the logical information. *)
 
@@ -155,4 +155,4 @@ Program Instance list_eqdec [ eqa : EqDec A eq ] : ! EqDec (list A) eq :=
   Next Obligation.
   Proof. clear aux. red in H0. subst. 
     destruct y; intuition (discriminate || eauto).
-  Defined.
\ No newline at end of file
+  Defined.
diff --git a/theories/Classes/Equivalence.v b/theories/Classes/Equivalence.v
index 70bf3483..d52eed47 100644
--- a/theories/Classes/Equivalence.v
+++ b/theories/Classes/Equivalence.v
@@ -13,7 +13,7 @@
    Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
    91405 Orsay, France *) 
 
-(* $Id: Equivalence.v 10919 2008-05-11 22:04:26Z msozeau $ *)
+(* $Id: Equivalence.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Require Export Coq.Program.Basics.
 Require Import Coq.Program.Tactics.
@@ -116,7 +116,7 @@ Section Respecting.
   Definition respecting [ Equivalence A (R : relation A), Equivalence B (R' : relation B) ] : Type := 
     { morph : A -> B | respectful R R' morph morph }.
   
-  Program Instance respecting_equiv [ Equivalence A R, Equivalence B R' ] :
+  Program Instance respecting_equiv [ eqa : Equivalence A R, eqb : Equivalence B R' ] :
     Equivalence respecting
     (fun (f g : respecting) => forall (x y : A), R x y -> R' (proj1_sig f x) (proj1_sig g y)).
 
@@ -124,18 +124,17 @@ Section Respecting.
 
   Next Obligation.
   Proof. 
-    unfold respecting in *. program_simpl. red in H2,H3,H4. 
-    transitivity (y x0) ; auto.
-    transitivity (y y0) ; auto.
-    symmetry. auto.
+    unfold respecting in *. program_simpl. transitivity (y y0); auto. apply H0. reflexivity.
   Qed.
 
 End Respecting.
 
 (** The default equivalence on function spaces, with higher-priority than [eq]. *)
 
-Program Instance pointwise_equivalence [ Equivalence A eqA ] :
-  Equivalence (B -> A) (pointwise_relation eqA) | 9.
+Program Instance pointwise_equivalence [ eqb : Equivalence B eqB ] :
+  Equivalence (A -> B) (pointwise_relation eqB) | 9.
+
+  Solve Obligations using simpl_relation ; first [ reflexivity | (symmetry ; auto) ].
 
   Next Obligation.
   Proof.
diff --git a/theories/Classes/Functions.v b/theories/Classes/Functions.v
index 49fc4f89..4c844911 100644
--- a/theories/Classes/Functions.v
+++ b/theories/Classes/Functions.v
@@ -13,7 +13,7 @@
    Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
    91405 Orsay, France *)
 
-(* $Id: Functions.v 10739 2008-04-01 14:45:20Z herbelin $ *)
+(* $Id: Functions.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Require Import Coq.Classes.RelationClasses.
 Require Import Coq.Classes.Morphisms.
@@ -21,22 +21,22 @@ Require Import Coq.Classes.Morphisms.
 Set Implicit Arguments.
 Unset Strict Implicit.
 
-Class [ m : Morphism (A -> B) (RA ++> RB) f ] => Injective : Prop :=
+Class Injective ((m : Morphism (A -> B) (RA ++> RB) f)) : Prop :=
   injective : forall x y : A, RB (f x) (f y) -> RA x y.
 
-Class [ m : Morphism (A -> B) (RA ++> RB) f ] => Surjective : Prop :=
+Class ((m : Morphism (A -> B) (RA ++> RB) f)) => Surjective : Prop :=
   surjective : forall y, exists x : A, RB y (f x).
 
-Definition Bijective [ m : Morphism (A -> B) (RA ++> RB) (f : A -> B) ] :=
+Definition Bijective ((m : Morphism (A -> B) (RA ++> RB) (f : A -> B))) :=
   Injective m /\ Surjective m.
 
-Class [ m : Morphism (A -> B) (eqA ++> eqB) ] => MonoMorphism :=
+Class MonoMorphism (( m : Morphism (A -> B) (eqA ++> eqB) )) :=
   monic :> Injective m.
 
-Class [ m : Morphism (A -> B) (eqA ++> eqB) ] => EpiMorphism :=
+Class EpiMorphism ((m : Morphism (A -> B) (eqA ++> eqB))) :=
   epic :> Surjective m.
 
-Class [ m : Morphism (A -> B) (eqA ++> eqB) ] => IsoMorphism :=
+Class IsoMorphism ((m : Morphism (A -> B) (eqA ++> eqB))) :=
   monomorphism :> MonoMorphism m ; epimorphism :> EpiMorphism m.
 
-Class [ m : Morphism (A -> A) (eqA ++> eqA), ! IsoMorphism m ] => AutoMorphism.
+Class ((m : Morphism (A -> A) (eqA ++> eqA))) [ ! IsoMorphism m ] => AutoMorphism.
diff --git a/theories/Classes/Init.v b/theories/Classes/Init.v
index 6ba0c61e..e5f951d0 100644
--- a/theories/Classes/Init.v
+++ b/theories/Classes/Init.v
@@ -13,9 +13,22 @@
    Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
    91405 Orsay, France *)
 
-(* $Id: Init.v 10739 2008-04-01 14:45:20Z herbelin $ *)
+(* $Id: Init.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 (* Ltac typeclass_instantiation := typeclasses eauto || eauto. *)
 
 Tactic Notation "clapply" ident(c) :=
   eapply @c ; eauto with typeclass_instances.
+
+(** The unconvertible typeclass, to test that two objects of the same type are 
+   actually different. *)
+
+Class Unconvertible (A : Type) (a b : A).
+
+Ltac unconvertible :=
+  match goal with
+    | |- @Unconvertible _ ?x ?y => conv x y ; fail 1 "Convertible"
+    | |- _ => apply Build_Unconvertible 
+  end.
+
+Hint Extern 0 (@Unconvertible _ _ _) => unconvertible : typeclass_instances.
\ No newline at end of file
diff --git a/theories/Classes/Morphisms.v b/theories/Classes/Morphisms.v
index f21c68a6..c2ae026d 100644
--- a/theories/Classes/Morphisms.v
+++ b/theories/Classes/Morphisms.v
@@ -1,4 +1,4 @@
-(* -*- coq-prog-args: ("-emacs-U" "-top" "Coq.Classes.Morphisms"); compile-command: "make -C ../.. TIME='time'" -*- *)
+(* -*- coq-prog-name: "~/research/coq/trunk/bin/coqtop.byte"; coq-prog-args: ("-emacs-U" "-top" "Coq.Classes.Morphisms"); compile-command: "make -C ../.. TIME='time'" -*- *)
 (************************************************************************)
 (*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
 (* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
@@ -13,7 +13,7 @@
    Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
    91405 Orsay, France *)
 
-(* $Id: Morphisms.v 11092 2008-06-10 18:28:26Z msozeau $ *)
+(* $Id: Morphisms.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Require Import Coq.Program.Basics.
 Require Import Coq.Program.Tactics.
@@ -39,10 +39,6 @@ Class Morphism A (R : relation A) (m : A) : Prop :=
 
 Implicit Arguments Morphism [A].
 
-(** We allow to unfold the [relation] definition while doing morphism search. *)
-
-Typeclasses unfold relation.
-
 (** Respectful morphisms. *)
 
 (** The fully dependent version, not used yet. *)
@@ -79,9 +75,22 @@ Arguments Scope respectful [type_scope type_scope signature_scope signature_scop
 
 Open Local Scope signature_scope.
 
+(** Pointwise lifting is just respect with leibniz equality on the left. *)
+
+Definition pointwise_relation {A B : Type} (R : relation B) : relation (A -> B) := 
+  fun f g => forall x : A, R (f x) (g x).
+
+Lemma pointwise_pointwise A B (R : relation B) : 
+  relation_equivalence (pointwise_relation R) (@eq A ==> R).
+Proof. intros. split. simpl_relation. firstorder. Qed.
+
 (** We can build a PER on the Coq function space if we have PERs on the domain and
    codomain. *)
 
+Hint Unfold Reflexive : core.
+Hint Unfold Symmetric : core.
+Hint Unfold Transitive : core.
+
 Program Instance respectful_per [ PER A (R : relation A), PER B (R' : relation B) ] : 
   PER (A -> B) (R ==> R').
 
@@ -92,24 +101,26 @@ Program Instance respectful_per [ PER A (R : relation A), PER B (R' : relation B
     transitivity (y x0)...
   Qed.
 
-(** Subrelations induce a morphism on the identity, not used for morphism search yet. *)
+(** Subrelations induce a morphism on the identity. *)
 
-Lemma subrelation_id_morphism [ subrelation A R� R₂ ] : Morphism (R� ==> R₂) id.
+Instance subrelation_id_morphism [ subrelation A R� R₂ ] : Morphism (R� ==> R₂) id.
 Proof. firstorder. Qed.
 
 (** The subrelation property goes through products as usual. *)
 
-Instance morphisms_subrelation [ sub : subrelation A R� R₂ ] :
-  ! subrelation (B -> A) (R ==> R�) (R ==> R₂).
-Proof. firstorder. Qed.
+Instance morphisms_subrelation_respectful [ subl : subrelation A R₂ R�, subr : subrelation B S� S₂ ] :
+  subrelation (R� ==> S�) (R₂ ==> S₂).
+Proof. simpl_relation. apply subr. apply H. apply subl. apply H0. Qed.
 
-Instance morphisms_subrelation_left [ sub : subrelation A R₂ R� ] :
-  ! subrelation (A -> B) (R� ==> R) (R₂ ==> R) | 3.
-Proof. firstorder. Qed.
+(** And of course it is reflexive. *)
+
+Instance morphisms_subrelation_refl : ! subrelation A R R | 10.
+Proof. simpl_relation. Qed.
 
 (** [Morphism] is itself a covariant morphism for [subrelation]. *)
 
-Lemma subrelation_morphism [ sub : subrelation A R� R₂, mor : Morphism A R� m ] : Morphism R₂ m.
+Lemma subrelation_morphism [ mor : Morphism A R� m, unc : Unconvertible (relation A) R� R₂,
+  sub : subrelation A R� R₂ ] : Morphism R₂ m.
 Proof.
   intros. apply sub. apply mor.
 Qed.
@@ -121,8 +132,9 @@ Proof. reduce. subst. firstorder. Qed.
 (** We use an external tactic to manage the application of subrelation, which is otherwise
    always applicable. We allow its use only once per branch. *)
 
-Inductive subrelation_done : Prop :=
-  did_subrelation : subrelation_done.
+Inductive subrelation_done : Prop := did_subrelation : subrelation_done.
+
+Inductive normalization_done : Prop := did_normalization.
 
 Ltac subrelation_tac := 
   match goal with
@@ -131,7 +143,7 @@ Ltac subrelation_tac :=
       set(H:=did_subrelation) ; eapply @subrelation_morphism
   end.
 
-Hint Extern 4 (@Morphism _ _ _) => subrelation_tac : typeclass_instances.
+Hint Extern 5 (@Morphism _ _ _) => subrelation_tac : typeclass_instances.
 
 (** Essential subrelation instances for [iff], [impl] and [pointwise_relation]. *)
 
@@ -181,20 +193,10 @@ Program Instance trans_contra_co_morphism
     transitivity x0...
   Qed.
 
-(* (** Dually... *) *)
-
-(* Program Instance [ Transitive A R ] => *)
-(*   trans_co_contra_inv_impl_morphism : Morphism (R ++> R --> inverse impl) R. *)
-  
-(*   Next Obligation. *)
-(*   Proof with auto. *)
-(*     apply* trans_contra_co_morphism ; eauto. eauto. *)
-(*   Qed. *)
-
 (** Morphism declarations for partial applications. *)
 
 Program Instance trans_contra_inv_impl_morphism
-  [ Transitive A R ] : Morphism (R --> inverse impl) (R x).
+  [ Transitive A R ] : Morphism (R --> inverse impl) (R x) | 3.
 
   Next Obligation.
   Proof with auto.
@@ -202,7 +204,7 @@ Program Instance trans_contra_inv_impl_morphism
   Qed.
 
 Program Instance trans_co_impl_morphism
-  [ Transitive A R ] : Morphism (R ==> impl) (R x).
+  [ Transitive A R ] : Morphism (R ==> impl) (R x) | 3.
 
   Next Obligation.
   Proof with auto.
@@ -210,23 +212,23 @@ Program Instance trans_co_impl_morphism
   Qed.
 
 Program Instance trans_sym_co_inv_impl_morphism
-  [ Transitive A R, Symmetric A R ] : Morphism (R ==> inverse impl) (R x).
+  [ PER A R ] : Morphism (R ==> inverse impl) (R x) | 2.
 
   Next Obligation.
   Proof with auto.
-    transitivity y...
+    transitivity y... symmetry...
   Qed.
 
 Program Instance trans_sym_contra_impl_morphism
-  [ Transitive A R, Symmetric _ R ] : Morphism (R --> impl) (R x).
+  [ PER A R ] : Morphism (R --> impl) (R x) | 2.
 
   Next Obligation.
   Proof with auto.
-    transitivity x0...
+    transitivity x0... symmetry...
   Qed.
 
-Program Instance equivalence_partial_app_morphism
-  [ Equivalence A R ] : Morphism (R ==> iff) (R x).
+Program Instance per_partial_app_morphism
+  [ PER A R ] : Morphism (R ==> iff) (R x) | 1.
 
   Next Obligation.
   Proof with auto.
@@ -240,36 +242,16 @@ Program Instance equivalence_partial_app_morphism
    to get an [R y z] goal. *)
 
 Program Instance trans_co_eq_inv_impl_morphism
-  [ Transitive A R ] : Morphism (R ==> (@eq A) ==> inverse impl) R.
+  [ Transitive A R ] : Morphism (R ==> (@eq A) ==> inverse impl) R | 2.
 
   Next Obligation.
   Proof with auto.
     transitivity y...
   Qed.
 
-(* Program Instance [ Transitive A R ] =>  *)
-(*   trans_contra_eq_impl_morphism : Morphism (R --> (@eq A) ==> impl) R. *)
-
-(*   Next Obligation. *)
-(*   Proof with auto. *)
-(*     transitivity x... *)
-(*   Qed. *)
-
 (** Every Symmetric and Transitive relation gives rise to an equivariant morphism. *)
 
-Program Instance trans_sym_morphism
-  [ Transitive A R, Symmetric _ R ] : Morphism (R ==> R ==> iff) R.
-
-  Next Obligation.
-  Proof with auto.
-    split ; intros.
-    transitivity x0... transitivity x...
-  
-    transitivity y... transitivity y0... 
-  Qed.
-
-Program Instance equiv_morphism [ Equivalence A R ] :
-  Morphism (R ==> R ==> iff) R.
+Program Instance PER_morphism [ PER A R ] : Morphism (R ==> R ==> iff) R | 1.
 
   Next Obligation.
   Proof with auto.
@@ -279,27 +261,21 @@ Program Instance equiv_morphism [ Equivalence A R ] :
     transitivity y... transitivity y0... symmetry...
   Qed.
 
-(** In case the rewrite happens at top level. *)
-
-Program Instance iff_inverse_impl_id :
-  Morphism (iff ==> inverse impl) id.
-
-Program Instance inverse_iff_inverse_impl_id :
-  Morphism (iff --> inverse impl) id.
+Lemma symmetric_equiv_inverse [ Symmetric A R ] : relation_equivalence R (flip R).
+Proof. firstorder. Qed.
   
-Program Instance iff_impl_id :
-  Morphism (iff ==> impl) id.
+Program Instance compose_morphism A B C R₀ R� R₂ :
+  Morphism ((R� ==> R₂) ==> (R₀ ==> R�) ==> (R₀ ==> R₂)) (@compose A B C).
+
+  Next Obligation.
+  Proof.
+    simpl_relation.
+    unfold compose. apply H. apply H0. apply H1.
+  Qed.
 
-Program Instance inverse_iff_impl_id :
-  Morphism (iff --> impl) id.
-  
 (** Coq functions are morphisms for leibniz equality, 
    applied only if really needed. *)
 
-(* Instance (A : Type) [ Reflexive B R ] => *)
-(*   eq_reflexive_morphism : Morphism (@Logic.eq A ==> R) m | 3. *)
-(* Proof. simpl_relation. Qed. *)
-
 Instance reflexive_eq_dom_reflexive (A : Type) [ Reflexive B R' ] :
   Reflexive (@Logic.eq A ==> R').
 Proof. simpl_relation. Qed.
@@ -335,49 +311,81 @@ Class MorphismProxy A (R : relation A) (m : A) : Prop :=
   respect_proxy : R m m.
 
 Instance reflexive_morphism_proxy
-  [ Reflexive A R ] (x : A) : MorphismProxy A R x | 1.
+  [ Reflexive A R ] (x : A) : MorphismProxy R x | 1.
 Proof. firstorder. Qed.
 
 Instance morphism_morphism_proxy
-  [ Morphism A R x ] : MorphismProxy A R x | 2.
+  [ Morphism A R x ] : MorphismProxy R x | 2.
 Proof. firstorder. Qed.
 
-(* Instance (A : Type) [ Reflexive B R ] => *)
-(*   eq_reflexive_morphism : Morphism (@Logic.eq A ==> R) m | 3. *)
-(* Proof. simpl_relation. Qed. *)
-
 (** [R] is Reflexive, hence we can build the needed proof. *)
 
 Lemma Reflexive_partial_app_morphism [ Morphism (A -> B) (R ==> R') m, MorphismProxy A R x ] :
    Morphism R' (m x).
 Proof. simpl_relation. Qed.
 
+Class Params {A : Type} (of : A) (arity : nat).
+
+Class PartialApplication.
+
 Ltac partial_application_tactic := 
-  let tac x :=
-    match type of x with
-      | Type => fail 1
-      | _ => eapply @Reflexive_partial_app_morphism
+  let rec do_partial_apps H m :=
+    match m with
+      | ?m' ?x => eapply @Reflexive_partial_app_morphism ; [do_partial_apps H m'|clear H]
+      | _ => idtac
     end
   in
-  let on_morphism m :=
-    match m with
-      | ?m' ?x => tac x
-      | ?m' _ ?x => tac x
-      | ?m' _ _ ?x => tac x
-      | ?m' _ _ _ ?x => tac x
-      | ?m' _ _ _ _ ?x => tac x
-      | ?m' _ _ _ _ _ ?x => tac x
-      | ?m' _ _ _ _ _ _ ?x => tac x
-      | ?m' _ _ _ _ _ _ _ ?x => tac x
-      | ?m' _ _ _ _ _ _ _ _ ?x => tac x
+  let rec do_partial H ar m :=
+    match ar with
+      | 0 => do_partial_apps H m
+      | S ?n' => 
+        match m with
+          ?m' ?x => do_partial H n' m'
+        end
     end
   in
+  let on_morphism m :=
+    let m' := fresh in head_of_constr m' m ;
+    let n := fresh in evar (n:nat) ;
+    let v := eval compute in n in clear n ;
+    let H := fresh in
+      assert(H:Params m' v) by typeclasses eauto ;
+      let v' := eval compute in v in 
+      do_partial H v' m
+ in
   match goal with
-    | [ |- @Morphism _ _ ?m ] => on_morphism m
+    | [ _ : subrelation_done |- _ ] => fail 1
+    | [ _ : normalization_done |- _ ] => fail 1
+    | [ _ : @Params _ _ _ |- _ ] => fail 1
+    | [ |- @Morphism ?T _ (?m ?x) ] => 
+      match goal with 
+        | [ _ : PartialApplication |- _ ] => 
+          eapply @Reflexive_partial_app_morphism
+        | _ => 
+          on_morphism (m x) || 
+            (eapply @Reflexive_partial_app_morphism ;
+              [ pose Build_PartialApplication | idtac ])
+      end
   end.
 
-(* Program Instance [ Morphism (A -> B) (R ==> R') m, Reflexive A R ] (x : A) => *)
-(*   reflexive_partial_app_morphism : Morphism R' (m x). *)
+Section PartialAppTest.
+  Instance and_ar : Params and 0.
+
+  Goal Morphism (iff) (and True True).
+    partial_application_tactic.
+  Admitted.
+
+  Goal Morphism (iff) (or True True).
+    partial_application_tactic.
+    partial_application_tactic. 
+  Admitted.
+
+  Goal Morphism (iff ==> iff) (iff True).
+    partial_application_tactic.
+    (*partial_application_tactic. *)
+   Admitted.
+
+End PartialAppTest.
 
 Hint Extern 4 (@Morphism _ _ _) => partial_application_tactic : typeclass_instances.
 
@@ -395,19 +403,19 @@ Class (A : Type) => Normalizes (m : relation A) (m' : relation A) : Prop :=
   normalizes : relation_equivalence m m'.
 
 Instance inverse_respectful_norm : 
-  Normalizes (A -> B) (inverse R ==> inverse R') (inverse (R ==> R')) .
+  ! Normalizes (A -> B) (inverse R ==> inverse R') (inverse (R ==> R')) .
 Proof. firstorder. Qed.
 
 (* If not an inverse on the left, do a double inverse. *)
 
 Instance not_inverse_respectful_norm : 
-  Normalizes (A -> B) (R ==> inverse R') (inverse (inverse R ==> R')) | 4.
+  ! Normalizes (A -> B) (R ==> inverse R') (inverse (inverse R ==> R')) | 4.
 Proof. firstorder. Qed.
 
 Instance inverse_respectful_rec_norm [ Normalizes B R' (inverse R'') ] :
-  Normalizes (A -> B) (inverse R ==> R') (inverse (R ==> R'')).
-Proof. red ; intros.  
-  pose normalizes as r.
+  ! Normalizes (A -> B) (inverse R ==> R') (inverse (R ==> R'')).
+Proof. red ; intros. 
+  assert(r:=normalizes).
   setoid_rewrite r.
   setoid_rewrite inverse_respectful.
   reflexivity.
@@ -415,8 +423,14 @@ Qed.
 
 (** Once we have normalized, we will apply this instance to simplify the problem. *)
 
-Program Instance morphism_inverse_morphism
-  [ Morphism A R m ] : Morphism (inverse R) m | 2.
+Definition morphism_inverse_morphism [ mor : Morphism A R m ] : Morphism (inverse R) m := mor.
+
+Ltac morphism_inverse :=
+  match goal with
+    [ |- @Morphism _ (flip _) _ ] => eapply @morphism_inverse_morphism
+  end.
+
+Hint Extern 2 (@Morphism _ _ _) => morphism_inverse : typeclass_instances.
 
 (** Bootstrap !!! *)
 
@@ -434,16 +448,16 @@ Qed.
 Lemma morphism_releq_morphism [ Normalizes A R R', Morphism _ R' m ] : Morphism R m.
 Proof.
   intros.
+
   pose respect as r.
   pose normalizes as norm.
   setoid_rewrite norm.
   assumption.
 Qed.
 
-Inductive normalization_done : Prop := did_normalization.
-
 Ltac morphism_normalization := 
   match goal with
+    | [ _ : subrelation_done |- _ ] => fail 1
     | [ _ : normalization_done |- _ ] => fail 1
     | [ |- @Morphism _ _ _ ] => let H := fresh "H" in
       set(H:=did_normalization) ; eapply @morphism_releq_morphism
@@ -464,4 +478,4 @@ Ltac morphism_reflexive :=
     | [ |- @Morphism _ _ _ ] => eapply @reflexive_morphism
   end.
 
-Hint Extern 4 (@Morphism _ _ _) => morphism_reflexive : typeclass_instances.
\ No newline at end of file
+Hint Extern 7 (@Morphism _ _ _) => morphism_reflexive : typeclass_instances.
diff --git a/theories/Classes/Morphisms_Prop.v b/theories/Classes/Morphisms_Prop.v
index 7dc1f95e..ec62e12e 100644
--- a/theories/Classes/Morphisms_Prop.v
+++ b/theories/Classes/Morphisms_Prop.v
@@ -29,7 +29,7 @@ Program Instance not_iff_morphism :
 
 (** Logical conjunction. *)
 
-Program Instance and_impl_iff_morphism :
+Program Instance and_impl_morphism :
   Morphism (impl ==> impl ==> impl) and.
 
 (* Program Instance and_impl_iff_morphism :  *)
@@ -49,7 +49,7 @@ Program Instance and_iff_morphism :
 
 (** Logical disjunction. *)
 
-Program Instance or_impl_iff_morphism : 
+Program Instance or_impl_morphism : 
   Morphism (impl ==> impl ==> impl) or.
 
 (* Program Instance or_impl_iff_morphism :  *)
diff --git a/theories/Classes/Morphisms_Relations.v b/theories/Classes/Morphisms_Relations.v
index 5018fa01..1b389667 100644
--- a/theories/Classes/Morphisms_Relations.v
+++ b/theories/Classes/Morphisms_Relations.v
@@ -48,3 +48,11 @@ Proof. intro. apply (predicate_equivalence_pointwise (cons A (cons A nil))). Qed
 Instance subrelation_pointwise :
   Morphism (subrelation ==> pointwise_relation (A:=A) (pointwise_relation (A:=A) impl)) id.
 Proof. intro. apply (predicate_implication_pointwise (cons A (cons A nil))). Qed.
+
+
+Lemma inverse_pointwise_relation A (R : relation A) : 
+  relation_equivalence (pointwise_relation (inverse R)) (inverse (pointwise_relation (A:=A) R)).
+Proof. intros. split; firstorder. Qed.
+
+
+
diff --git a/theories/Classes/RelationClasses.v b/theories/Classes/RelationClasses.v
index a9a53068..9a43a1ba 100644
--- a/theories/Classes/RelationClasses.v
+++ b/theories/Classes/RelationClasses.v
@@ -1,4 +1,4 @@
-(* -*- coq-prog-args: ("-emacs-U" "-top" "Coq.Classes.RelationClasses") -*- *)
+(* -*- coq-prog-name: "coqtop.byte"; coq-prog-args: ("-emacs-U" "-top" "Coq.Classes.RelationClasses") -*- *)
 (************************************************************************)
 (*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
 (* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
@@ -14,20 +14,21 @@
    Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
    91405 Orsay, France *)
 
-(* $Id: RelationClasses.v 11092 2008-06-10 18:28:26Z msozeau $ *)
+(* $Id: RelationClasses.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Require Export Coq.Classes.Init.
 Require Import Coq.Program.Basics.
 Require Import Coq.Program.Tactics.
 Require Export Coq.Relations.Relation_Definitions.
 
+(** We allow to unfold the [relation] definition while doing morphism search. *)
+
+Typeclasses unfold relation.
+
 Notation inverse R := (flip (R:relation _) : relation _).
 
 Definition complement {A} (R : relation A) : relation A := fun x y => R x y -> False.
 
-Definition pointwise_relation {A B : Type} (R : relation B) : relation (A -> B) := 
-  fun f g => forall x : A, R (f x) (g x).
-
 (** These are convertible. *)
 
 Lemma complement_inverse : forall A (R : relation A), complement (inverse R) = inverse (complement R).
@@ -42,7 +43,7 @@ Class Reflexive A (R : relation A) :=
   reflexivity : forall x, R x x.
 
 Class Irreflexive A (R : relation A) := 
-  irreflexivity :> Reflexive A (complement R).
+  irreflexivity :> Reflexive (complement R).
 
 Class Symmetric A (R : relation A) := 
   symmetry : forall x y, R x y -> R y x.
@@ -53,12 +54,6 @@ Class Asymmetric A (R : relation A) :=
 Class Transitive A (R : relation A) := 
   transitivity : forall x y z, R x y -> R y z -> R x z.
 
-Implicit Arguments Reflexive [A].
-Implicit Arguments Irreflexive [A].
-Implicit Arguments Symmetric [A].
-Implicit Arguments Asymmetric [A].
-Implicit Arguments Transitive [A].
-
 Hint Resolve @irreflexivity : ord.
 
 Unset Implicit Arguments.
@@ -91,7 +86,7 @@ Program Instance Reflexive_complement_Irreflexive [ Reflexive A (R : relation A)
     unfold complement.
     red. intros H.
     intros H' ; apply H'.
-    apply (reflexivity H).
+    apply reflexivity.
   Qed.
 
 
@@ -129,7 +124,7 @@ Ltac simpl_relation :=
   unfold flip, impl, arrow ; try reduce ; program_simpl ;
     try ( solve [ intuition ]).
 
-Ltac obligations_tactic ::= simpl_relation.
+Ltac obligation_tactic ::= simpl_relation.
 
 (** Logical implication. *)
 
@@ -171,17 +166,17 @@ Class Equivalence (carrier : Type) (equiv : relation carrier) : Prop :=
 
 (** An Equivalence is a PER plus reflexivity. *)
 
-Instance Equivalence_PER [ Equivalence A R ] : PER A R :=
+Instance Equivalence_PER [ Equivalence A R ] : PER A R | 10 :=
   PER_Symmetric := Equivalence_Symmetric ;
   PER_Transitive := Equivalence_Transitive.
 
 (** We can now define antisymmetry w.r.t. an equivalence relation on the carrier. *)
 
-Class [ Equivalence A eqA ] => Antisymmetric (R : relation A) := 
+Class Antisymmetric ((equ : Equivalence A eqA)) (R : relation A) := 
   antisymmetry : forall x y, R x y -> R y x -> eqA x y.
 
-Program Instance flip_antiSymmetric [ eq : Equivalence A eqA, ! Antisymmetric eq R ] :
-  Antisymmetric eq (flip R).
+Program Instance flip_antiSymmetric {{Antisymmetric A eqA R}} :
+  ! Antisymmetric A eqA (flip R).
 
 (** Leibinz equality [eq] is an equivalence relation.
    The instance has low priority as it is always applicable 
@@ -372,7 +367,7 @@ Proof. intro A. exact (@predicate_implication_preorder (cons A (cons A nil))). Q
    We give an equivalent definition, up-to an equivalence relation 
    on the carrier. *)
 
-Class [ equ : Equivalence A eqA, PreOrder A R ] => PartialOrder :=
+Class [ equ : Equivalence A eqA, preo : PreOrder A R ] => PartialOrder :=
   partial_order_equivalence : relation_equivalence eqA (relation_conjunction R (inverse R)).
 
 (** The equivalence proof is sufficient for proving that [R] must be a morphism 
@@ -394,7 +389,3 @@ Program Instance subrelation_partial_order :
   Proof.
     unfold relation_equivalence in *. firstorder.
   Qed.
-
-Lemma inverse_pointwise_relation A (R : relation A) : 
-  relation_equivalence (pointwise_relation (inverse R)) (inverse (pointwise_relation (A:=A) R)).
-Proof. reflexivity. Qed.
diff --git a/theories/Classes/SetoidClass.v b/theories/Classes/SetoidClass.v
index a9bdaa8f..178d5333 100644
--- a/theories/Classes/SetoidClass.v
+++ b/theories/Classes/SetoidClass.v
@@ -13,7 +13,7 @@
    Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
    91405 Orsay, France *)
 
-(* $Id: SetoidClass.v 11065 2008-06-06 22:39:43Z msozeau $ *)
+(* $Id: SetoidClass.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Set Implicit Arguments.
 Unset Strict Implicit.
@@ -41,13 +41,13 @@ Typeclasses unfold equiv.
 (** Shortcuts to make proof search easier. *)
 
 Definition setoid_refl [ sa : Setoid A ] : Reflexive equiv.
-Proof. eauto with typeclass_instances. Qed.
+Proof. typeclasses eauto. Qed.
 
 Definition setoid_sym [ sa : Setoid A ] : Symmetric equiv.
-Proof. eauto with typeclass_instances. Qed.
+Proof. typeclasses eauto. Qed.
 
 Definition setoid_trans [ sa : Setoid A ] : Transitive equiv.
-Proof. eauto with typeclass_instances. Qed.
+Proof. typeclasses eauto. Qed.
 
 Existing Instance setoid_refl.
 Existing Instance setoid_sym.
@@ -123,7 +123,7 @@ Ltac setoidify := repeat setoidify_tac.
 (** Every setoid relation gives rise to a morphism, in fact every partial setoid does. *)
 
 Program Definition setoid_morphism [ sa : Setoid A ] : Morphism (equiv ++> equiv ++> iff) equiv :=
-  trans_sym_morphism.
+  PER_morphism.
 
 (** Add this very useful instance in the database. *)
 
@@ -142,7 +142,7 @@ Program Instance type_equivalence : Equivalence Type type_eq.
 
 Ltac morphism_tac := try red ; unfold arrow ; intros ; program_simpl ; try tauto.
 
-Ltac obligations_tactic ::= morphism_tac.
+Ltac obligation_tactic ::= morphism_tac.
 
 (** These are morphisms used to rewrite at the top level of a proof, 
    using [iff_impl_id_morphism] if the proof is in [Prop] and
@@ -178,4 +178,4 @@ Infix "=~=" := pequiv (at level 70, no associativity) : type_scope.
 
 (** Reset the default Program tactic. *)
 
-Ltac obligations_tactic ::= program_simpl.
+Ltac obligation_tactic ::= program_simpl.
diff --git a/theories/Classes/SetoidDec.v b/theories/Classes/SetoidDec.v
index cf3d202d..8a069343 100644
--- a/theories/Classes/SetoidDec.v
+++ b/theories/Classes/SetoidDec.v
@@ -13,7 +13,7 @@
  * Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
  *              91405 Orsay, France *)
 
-(* $Id: SetoidDec.v 10919 2008-05-11 22:04:26Z msozeau $ *)
+(* $Id: SetoidDec.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Set Implicit Arguments.
 Unset Strict Implicit.
@@ -27,12 +27,12 @@ Require Export Coq.Classes.SetoidClass.
 
 Require Import Coq.Logic.Decidable.
 
-Class [ Setoid A ] => DecidableSetoid :=
+Class DecidableSetoid A [ Setoid A ] :=
   setoid_decidable : forall x y : A, decidable (x == y).
 
 (** The [EqDec] class gives a decision procedure for a particular setoid equality. *)
 
-Class [ Setoid A ] => EqDec :=
+Class (( s : Setoid A )) => EqDec :=
   equiv_dec : forall x y : A, { x == y } + { x =/= y }.
 
 (** We define the [==] overloaded notation for deciding equality. It does not take precedence
@@ -75,18 +75,18 @@ Require Import Coq.Arith.Arith.
 
 (** The equiv is burried inside the setoid, but we can recover it by specifying which setoid we're talking about. *)
 
-Program Instance eq_setoid : Setoid A :=
+Program Instance eq_setoid A : Setoid A :=
   equiv := eq ; setoid_equiv := eq_equivalence.
 
-Program Instance nat_eq_eqdec : EqDec (@eq_setoid nat) :=
+Program Instance nat_eq_eqdec : EqDec (eq_setoid nat) :=
   equiv_dec := eq_nat_dec.
 
 Require Import Coq.Bool.Bool.
 
-Program Instance bool_eqdec : EqDec (@eq_setoid bool) :=
+Program Instance bool_eqdec : EqDec (eq_setoid bool) :=
   equiv_dec := bool_dec.
 
-Program Instance unit_eqdec : EqDec (@eq_setoid unit) :=
+Program Instance unit_eqdec : EqDec (eq_setoid unit) :=
   equiv_dec x y := in_left.
 
   Next Obligation.
@@ -95,7 +95,7 @@ Program Instance unit_eqdec : EqDec (@eq_setoid unit) :=
     reflexivity.
   Qed.
 
-Program Instance prod_eqdec [ ! EqDec (@eq_setoid A), ! EqDec (@eq_setoid B) ] : EqDec (@eq_setoid (prod A B)) :=
+Program Instance prod_eqdec [ ! EqDec (eq_setoid A), ! EqDec (eq_setoid B) ] : EqDec (eq_setoid (prod A B)) :=
   equiv_dec x y := 
     let '(x1, x2) := x in 
     let '(y1, y2) := y in 
@@ -110,7 +110,7 @@ Program Instance prod_eqdec [ ! EqDec (@eq_setoid A), ! EqDec (@eq_setoid B) ] :
 
 Require Import Coq.Program.FunctionalExtensionality.
 
-Program Instance bool_function_eqdec [ ! EqDec (@eq_setoid A) ] : EqDec (@eq_setoid (bool -> A)) :=
+Program Instance bool_function_eqdec [ ! EqDec (eq_setoid A) ] : EqDec (eq_setoid (bool -> A)) :=
   equiv_dec f g := 
     if f true == g true then
       if f false == g false then in_left
diff --git a/theories/Classes/SetoidTactics.v b/theories/Classes/SetoidTactics.v
index b29a52cc..6398b125 100644
--- a/theories/Classes/SetoidTactics.v
+++ b/theories/Classes/SetoidTactics.v
@@ -13,7 +13,7 @@
  * Institution: LRI, CNRS UMR 8623 - UniversitÃcopyright Paris Sud
  *              91405 Orsay, France *)
 
-(* $Id: SetoidTactics.v 10921 2008-05-12 12:27:25Z msozeau $ *)
+(* $Id: SetoidTactics.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 Require Export Coq.Classes.RelationClasses.
 Require Export Coq.Classes.Morphisms.
@@ -24,11 +24,22 @@ Require Export Coq.Relations.Relation_Definitions.
 Set Implicit Arguments.
 Unset Strict Implicit.
 
+(** Setoid relation on a given support: declares a relation as a setoid
+   for use with rewrite. It helps choosing if a rewrite should be handled
+   by setoid_rewrite or the regular rewrite using leibniz equality.
+   Users can declare an [SetoidRelation A RA] anywhere to declare default 
+   relations. This is also done automatically by the [Declare Relation A RA]
+   commands. *)
+
+Class SetoidRelation A (R : relation A).
+
+Instance impl_setoid_relation : SetoidRelation impl.
+Instance iff_setoid_relation : SetoidRelation iff.
+
 (** Default relation on a given support. Can be used by tactics
    to find a sensible default relation on any carrier. Users can 
-   declare an [Instance A RA] anywhere to declare default relations.
-   This is also done by the [Declare Relation A RA] command with no
-   parameters for backward compatibility. *)
+   declare an [Instance def : DefaultRelation A RA] anywhere to 
+   declare default relations. *)
 
 Class DefaultRelation A (R : relation A).
 
@@ -38,7 +49,7 @@ Definition default_relation [ DefaultRelation A R ] := R.
 
 (** Every [Equivalence] gives a default relation, if no other is given (lowest priority). *)
 
-Instance equivalence_default [ Equivalence A R ] : DefaultRelation A R | 4.
+Instance equivalence_default [ Equivalence A R ] : DefaultRelation R | 4.
 
 (** The setoid_replace tactics in Ltac, defined in terms of default relations and
    the setoid_rewrite tactic. *)
@@ -174,3 +185,5 @@ Ltac default_add_morphism_tactic :=
   end.
 
 Ltac add_morphism_tactic := default_add_morphism_tactic.
+
+Ltac obligation_tactic ::= program_simpl.
diff --git a/theories/FSets/FMapFacts.v b/theories/FSets/FMapFacts.v
index b307efe3..94444f5b 100644
--- a/theories/FSets/FMapFacts.v
+++ b/theories/FSets/FMapFacts.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1       *)
 (***********************************************************************)
 
-(* $Id: FMapFacts.v 10782 2008-04-12 16:08:04Z msozeau $ *)
+(* $Id: FMapFacts.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 (** * Finite maps library *)
 
@@ -660,6 +660,8 @@ Add Relation key E.eq
  transitivity proved by E.eq_trans 
  as KeySetoid.
 
+Typeclasses unfold key.
+
 Implicit Arguments Equal [[elt]].
 
 Add Parametric Relation (elt : Type) : (t elt) Equal  
diff --git a/theories/FSets/FSetFacts.v b/theories/FSets/FSetFacts.v
index b4b834b1..d77d9c60 100644
--- a/theories/FSets/FSetFacts.v
+++ b/theories/FSets/FSetFacts.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1       *)
 (***********************************************************************)
 
-(* $Id: FSetFacts.v 10765 2008-04-08 16:15:23Z msozeau $ *)
+(* $Id: FSetFacts.v 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 (** * Finite sets library *)
 
@@ -309,6 +309,8 @@ Add Relation elt E.eq
  transitivity proved by E.eq_trans 
  as EltSetoid.
 
+Typeclasses unfold elt.
+
 Add Relation t Equal 
  reflexivity proved by eq_refl 
  symmetry proved by eq_sym
diff --git a/theories/Init/Tactics.v b/theories/Init/Tactics.v
index afe8297e..10555fc0 100644
--- a/theories/Init/Tactics.v
+++ b/theories/Init/Tactics.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Tactics.v 11072 2008-06-08 16:13:37Z herbelin $ i*)
+(*i $Id: Tactics.v 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 Require Import Notations.
 Require Import Logic.
@@ -115,7 +115,7 @@ lazymatch T with
     evar (a : t); pose proof (H a) as H1; unfold a in H1;
     clear a; clear H; rename H1 into H; find_equiv H
 | ?A <-> ?B => idtac
-| _ => fail "The given statement does not seem to end with an equivalence"
+| _ => fail "The given statement does not seem to end with an equivalence."
 end.
 
 Ltac bapply lemma todo :=
@@ -141,7 +141,7 @@ t;
 match goal with
 | H : _ |- _ => solve [inversion H]
 | _ => solve [trivial | reflexivity | symmetry; trivial | discriminate | split]
-| _ => fail 1 "Cannot solve this goal"
+| _ => fail 1 "Cannot solve this goal."
 end.
 
 (** A tactic to document or check what is proved at some point of a script *)
diff --git a/theories/Init/Wf.v b/theories/Init/Wf.v
index f46b2b11..d3f8f1ab 100644
--- a/theories/Init/Wf.v
+++ b/theories/Init/Wf.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Wf.v 10712 2008-03-23 11:38:38Z herbelin $ i*)
+(*i $Id: Wf.v 11251 2008-07-24 08:28:40Z herbelin $ i*)
 
 (** * This module proves the validity of
     - well-founded recursion (also known as course of values)
@@ -27,6 +27,7 @@ Section Well_founded.
  Variable R : A -> A -> Prop.
 
  (** The accessibility predicate is defined to be non-informative *)
+ (** (Acc_rect is automatically defined because Acc is a singleton type) *)
 
  Inductive Acc (x: A) : Prop :=
      Acc_intro : (forall y:A, R y x -> Acc y) -> Acc x.
@@ -35,22 +36,6 @@ Section Well_founded.
   destruct 1; trivial.
  Defined.
 
-  (** Informative elimination :
-     [let Acc_rec F = let rec wf x = F x wf in wf] *)
-
- Section AccRecType.
-
-  Variable P : A -> Type.
-  Variable F : forall x:A,
-    (forall y:A, R y x -> Acc y) -> (forall y:A, R y x -> P y) -> P x.
-
-  Fixpoint Acc_rect (x:A) (a:Acc x) {struct a} : P x :=
-    F (Acc_inv a) (fun (y:A) (h:R y x) => Acc_rect (Acc_inv a h)).
-
- End AccRecType.
-
- Definition Acc_rec (P:A -> Set) := Acc_rect P.
-
  (** A relation is well-founded if every element is accessible *)
 
  Definition well_founded := forall a:A, Acc a.
diff --git a/theories/Logic/ClassicalDescription.v b/theories/Logic/ClassicalDescription.v
index 3737abf6..d15e2c96 100644
--- a/theories/Logic/ClassicalDescription.v
+++ b/theories/Logic/ClassicalDescription.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: ClassicalDescription.v 10170 2007-10-03 14:41:25Z herbelin $ i*)
+(*i $Id: ClassicalDescription.v 11238 2008-07-19 09:34:03Z herbelin $ i*)
 
 (** This file provides classical logic and definite description, which is
     equivalent to providing classical logic and Church's iota operator *)
@@ -21,7 +21,7 @@ Set Implicit Arguments.
 Require Export Classical.
 Require Import ChoiceFacts.
 
-Notation Local "'inhabited' A" := A (at level 200, only parsing).
+Notation Local inhabited A := A.
 
 Axiom constructive_definite_description :
   forall (A : Type) (P : A->Prop), (exists! x : A, P x) -> { x : A | P x }.
diff --git a/theories/Logic/ClassicalFacts.v b/theories/Logic/ClassicalFacts.v
index 734de52d..8a045ec8 100644
--- a/theories/Logic/ClassicalFacts.v
+++ b/theories/Logic/ClassicalFacts.v
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: ClassicalFacts.v 10156 2007-09-30 19:02:14Z herbelin $ i*)
+(*i $Id: ClassicalFacts.v 11238 2008-07-19 09:34:03Z herbelin $ i*)
 
 (** Some facts and definitions about classical logic
 
@@ -119,7 +119,7 @@ Qed.
 
 *)
 
-Definition inhabited (A:Prop) := A.
+Notation Local inhabited A := A.
 
 Lemma prop_ext_A_eq_A_imp_A :
   prop_extensionality -> forall A:Prop, inhabited A -> (A -> A) = A.
@@ -514,8 +514,6 @@ Qed.
     344 of Lecture Notes in Mathematics, Springer-Verlag, 1973.
 *)
 
-Notation Local "'inhabited' A" := A (at level 10, only parsing).
-
 Definition IndependenceOfGeneralPremises :=
   forall (A:Type) (P:A -> Prop) (Q:Prop),
     inhabited A -> (Q -> exists x, P x) -> exists x, Q -> P x.
diff --git a/theories/Logic/ConstructiveEpsilon.v b/theories/Logic/ConstructiveEpsilon.v
index f1503d24..3753b97b 100644
--- a/theories/Logic/ConstructiveEpsilon.v
+++ b/theories/Logic/ConstructiveEpsilon.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: ConstructiveEpsilon.v 10739 2008-04-01 14:45:20Z herbelin $ i*)
+(*i $Id: ConstructiveEpsilon.v 11238 2008-07-19 09:34:03Z herbelin $ i*)
 
 (** This module proves the constructive description schema, which
 infers the sigma-existence (i.e., [Set]-existence) of a witness to a
@@ -53,7 +53,7 @@ of our searching algorithm. *)
 
 Let R (x y : nat) : Prop := x = S y /\ ~ P y.
 
-Notation Local "'acc' x" := (Acc R x) (at level 10).
+Notation Local acc x := (Acc R x).
 
 Lemma P_implies_acc : forall x : nat, P x -> acc x.
 Proof.
diff --git a/theories/Logic/Diaconescu.v b/theories/Logic/Diaconescu.v
index 5f139f35..880ef7e2 100644
--- a/theories/Logic/Diaconescu.v
+++ b/theories/Logic/Diaconescu.v
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Diaconescu.v 9245 2006-10-17 12:53:34Z notin $ i*)
+(*i $Id: Diaconescu.v 11238 2008-07-19 09:34:03Z herbelin $ i*)
 
 (** Diaconescu showed that the Axiom of Choice entails Excluded-Middle
    in topoi [Diaconescu75]. Lacas and Werner adapted the proof to show
@@ -267,7 +267,7 @@ End ProofIrrel_RelChoice_imp_EqEM.
 
 (** Proof sketch from Bell [Bell93] (with thanks to P. Castéran) *)
 
-Notation Local "'inhabited' A" := A (at level 10, only parsing).
+Notation Local inhabited A := A.
 
 Section ExtensionalEpsilon_imp_EM.
 
diff --git a/theories/Numbers/BigNumPrelude.v b/theories/Numbers/BigNumPrelude.v
index 9669eacd..83ecd10d 100644
--- a/theories/Numbers/BigNumPrelude.v
+++ b/theories/Numbers/BigNumPrelude.v
@@ -8,7 +8,7 @@
 (*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
 (************************************************************************)
 
-(*i $Id: BigNumPrelude.v 11013 2008-05-28 18:17:30Z letouzey $ i*)
+(*i $Id: BigNumPrelude.v 11207 2008-07-04 16:50:32Z letouzey $ i*)
 
 (** * BigNumPrelude *)
 
@@ -277,7 +277,7 @@ Theorem Zmod_le_first: forall a b, 0 <= a -> 0 < b -> 0 <= a mod b <= a.
  Qed.
 
 
- Lemma shift_unshift_mod_2 : forall n p a, (0<=p<=n)%Z -> 
+ Lemma shift_unshift_mod_2 : forall n p a, 0 <= p <= n -> 
    ((a * 2 ^ (n - p)) mod (2^n) / 2 ^ (n - p)) mod (2^n) = 
    a mod 2 ^ p.
  Proof.
@@ -329,7 +329,7 @@ Theorem Zmod_le_first: forall a b, 0 <= a -> 0 < b -> 0 <= a mod b <= a.
  Qed.
 
  Theorem Zgcd_div_pos a b:
-   (0 < b)%Z -> (0 < Zgcd a b)%Z -> (0 < b / Zgcd a b)%Z.
+   0 < b -> 0 < Zgcd a b -> 0 < b / Zgcd a b.
  Proof.
  intros a b Ha Hg.
  case (Zle_lt_or_eq 0 (b/Zgcd a b)); auto.
@@ -340,6 +340,72 @@ Theorem Zmod_le_first: forall a b, 0 <= a -> 0 < b -> 0 <= a mod b <= a.
  assert (F := (Zgcd_is_gcd a b)); inversion F; auto.
  Qed.
 
+ Theorem Zdiv_neg a b:
+   a < 0 -> 0 < b -> a / b < 0.
+ Proof.
+ intros a b Ha Hb.
+ assert (b > 0) by omega.
+ generalize (Z_mult_div_ge a _ H); intros.
+ assert (b * (a / b) < 0)%Z.
+  apply Zle_lt_trans with a; auto with zarith.
+ destruct b; try (compute in Hb; discriminate).
+ destruct (a/Zpos p)%Z.
+ compute in H1; discriminate.
+ compute in H1; discriminate.
+ compute; auto.
+ Qed.
+ 
+ Lemma Zgcd_Zabs : forall z z', Zgcd (Zabs z) z' = Zgcd z z'.
+ Proof.
+ destruct z; simpl; auto.
+ Qed.
+
+ Lemma Zgcd_sym : forall p q, Zgcd p q = Zgcd q p.
+ Proof.
+ intros.
+ apply Zis_gcd_gcd.
+ apply Zgcd_is_pos.
+ apply Zis_gcd_sym.
+ apply Zgcd_is_gcd.
+ Qed.
+
+ Lemma Zdiv_gcd_zero : forall a b, b / Zgcd a b = 0 -> b <> 0 -> 
+  Zgcd a b = 0.
+ Proof.
+ intros.
+ generalize (Zgcd_is_gcd a b); destruct 1.
+ destruct H2 as (k,Hk).
+ generalize H; rewrite Hk at 1.
+ destruct (Z_eq_dec (Zgcd a b) 0) as [H'|H']; auto.
+ rewrite Z_div_mult_full; auto.
+ intros; subst k; simpl in *; subst b; elim H0; auto.
+ Qed.
+
+ Lemma Zgcd_1 : forall z, Zgcd z 1 = 1.
+ Proof.
+ intros; apply Zis_gcd_gcd; auto with zarith; apply Zis_gcd_1.
+ Qed.
+ Hint Resolve Zgcd_1.
+
+ Lemma Zgcd_mult_rel_prime : forall a b c, 
+  Zgcd a c = 1 -> Zgcd b c = 1 -> Zgcd (a*b) c = 1.
+ Proof.
+ intros.
+ rewrite Zgcd_1_rel_prime in *.
+ apply rel_prime_sym; apply rel_prime_mult; apply rel_prime_sym; auto.
+ Qed.
+
+ Lemma Zcompare_gt : forall (A:Type)(a a':A)(p q:Z),
+  match (p?=q)%Z with Gt => a | _ => a' end = 
+  if Z_le_gt_dec p q then a' else a.
+ Proof.
+ intros.
+ destruct Z_le_gt_dec as [H|H].
+ red in H.
+ destruct (p?=q)%Z; auto; elim H; auto.
+ rewrite H; auto.
+ Qed.
+
 Theorem Zbounded_induction :
   (forall Q : Z -> Prop, forall b : Z,
     Q 0 ->
diff --git a/theories/Numbers/Cyclic/Abstract/NZCyclic.v b/theories/Numbers/Cyclic/Abstract/NZCyclic.v
index 22f6d95b..fb3f0cef 100644
--- a/theories/Numbers/Cyclic/Abstract/NZCyclic.v
+++ b/theories/Numbers/Cyclic/Abstract/NZCyclic.v
@@ -8,7 +8,7 @@
 (*                      Evgeny Makarov, INRIA, 2007                     *)
 (************************************************************************)
 
-(*i $Id: NZCyclic.v 11040 2008-06-03 00:04:16Z letouzey $ i*)
+(*i $Id: NZCyclic.v 11238 2008-07-19 09:34:03Z herbelin $ i*)
 
 Require Export NZAxioms.
 Require Import BigNumPrelude.
@@ -89,8 +89,8 @@ Open Local Scope IntScope.
 Notation "x == y"  := (NZeq x y) (at level 70) : IntScope.
 Notation "x ~= y" := (~ NZeq x y) (at level 70) : IntScope.
 Notation "0" := NZ0 : IntScope.
-Notation "'S'" := NZsucc : IntScope.
-Notation "'P'" := NZpred : IntScope.
+Notation S x := (NZsucc x).
+Notation P x := (NZpred x).
 (*Notation "1" := (S 0) : IntScope.*)
 Notation "x + y" := (NZadd x y) : IntScope.
 Notation "x - y" := (NZsub x y) : IntScope.
diff --git a/theories/Numbers/Integer/BigZ/BigZ.v b/theories/Numbers/Integer/BigZ/BigZ.v
index 09abf424..cb920124 100644
--- a/theories/Numbers/Integer/BigZ/BigZ.v
+++ b/theories/Numbers/Integer/BigZ/BigZ.v
@@ -8,7 +8,7 @@
 (*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
 (************************************************************************)
 
-(*i $Id: BigZ.v 11040 2008-06-03 00:04:16Z letouzey $ i*)
+(*i $Id: BigZ.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 Require Export BigN.
 Require Import ZMulOrder.
@@ -42,25 +42,27 @@ Infix "?=" := BigZ.compare : bigZ_scope.
 Infix "==" := BigZ.eq (at level 70, no associativity) : bigZ_scope.
 Infix "<" := BigZ.lt : bigZ_scope.
 Infix "<=" := BigZ.le : bigZ_scope.
+Notation "x > y" := (BigZ.lt y x)(only parsing) : bigZ_scope.
+Notation "x >= y" := (BigZ.le y x)(only parsing) : bigZ_scope.
 Notation "[ i ]" := (BigZ.to_Z i) : bigZ_scope.
 
 Open Scope bigZ_scope.
 
 (** Some additional results about [BigZ] *)
 
-Theorem spec_to_Z: forall n:bigZ, 
+Theorem spec_to_Z: forall n:bigZ,
   BigN.to_Z (BigZ.to_N n) = ((Zsgn [n]) * [n])%Z.
 Proof.
-intros n; case n; simpl; intros p; 
+intros n; case n; simpl; intros p;
   generalize (BigN.spec_pos p); case (BigN.to_Z p); auto.
 intros p1 H1; case H1; auto.
 intros p1 H1; case H1; auto.
 Qed.
 
-Theorem spec_to_N n: 
+Theorem spec_to_N n:
  ([n] = Zsgn [n] * (BigN.to_Z (BigZ.to_N n)))%Z.
 Proof.
-intros n; case n; simpl; intros p; 
+intros n; case n; simpl; intros p;
   generalize (BigN.spec_pos p); case (BigN.to_Z p); auto.
 intros p1 H1; case H1; auto.
 intros p1 H1; case H1; auto.
@@ -69,7 +71,7 @@ Qed.
 Theorem spec_to_Z_pos: forall n, (0 <= [n])%Z ->
   BigN.to_Z (BigZ.to_N n) = [n].
 Proof.
-intros n; case n; simpl; intros p; 
+intros n; case n; simpl; intros p;
   generalize (BigN.spec_pos p); case (BigN.to_Z p); auto.
 intros p1 _ H1; case H1; auto.
 intros p1 H1; case H1; auto.
@@ -87,7 +89,7 @@ Qed.
 
 (** [BigZ] is a ring *)
 
-Lemma BigZring : 
+Lemma BigZring :
  ring_theory BigZ.zero BigZ.one BigZ.add BigZ.mul BigZ.sub BigZ.opp BigZ.eq.
 Proof.
 constructor.
@@ -102,6 +104,8 @@ exact sub_opp.
 exact add_opp.
 Qed.
 
+Typeclasses unfold NZadd NZmul NZsub NZeq.
+
 Add Ring BigZr : BigZring.
 
 (** Todo: tactic translating from [BigZ] to [Z] + omega *)
diff --git a/theories/Numbers/Integer/BigZ/ZMake.v b/theories/Numbers/Integer/BigZ/ZMake.v
index 1f2b12bb..6305156b 100644
--- a/theories/Numbers/Integer/BigZ/ZMake.v
+++ b/theories/Numbers/Integer/BigZ/ZMake.v
@@ -8,7 +8,7 @@
 (*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
 (************************************************************************)
 
-(*i $Id: ZMake.v 11027 2008-06-01 13:28:59Z letouzey $ i*)
+(*i $Id: ZMake.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 Require Import ZArith.
 Require Import BigNumPrelude.
@@ -30,6 +30,7 @@ Module Make (N:NType) <: ZType.
   | Neg : N.t -> t_.
  
  Definition t := t_.
+ Typeclasses unfold t.
 
  Definition zero := Pos N.zero.
  Definition one  := Pos N.one.
diff --git a/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v b/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v
index d7c56267..aceb8984 100644
--- a/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v
+++ b/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: ZSigZAxioms.v 11040 2008-06-03 00:04:16Z letouzey $ i*)
+(*i $Id: ZSigZAxioms.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 Require Import ZArith.
 Require Import ZAxioms.
@@ -216,7 +216,7 @@ Qed.
 Add Morphism Z.compare with signature Z.eq ==> Z.eq ==> (@eq comparison) as compare_wd.
 Proof. 
 intros x x' Hx y y' Hy.
-rewrite 2 spec_compare_alt; rewrite Hx, Hy; intuition.
+rewrite 2 spec_compare_alt; unfold Z.eq in *; rewrite Hx, Hy; intuition.
 Qed.
 
 Add Morphism Z.lt with signature Z.eq ==> Z.eq ==> iff as NZlt_wd.
diff --git a/theories/Numbers/Natural/Abstract/NOrder.v b/theories/Numbers/Natural/Abstract/NOrder.v
index 826ffa2c..15aed7ab 100644
--- a/theories/Numbers/Natural/Abstract/NOrder.v
+++ b/theories/Numbers/Natural/Abstract/NOrder.v
@@ -8,7 +8,7 @@
 (*                      Evgeny Makarov, INRIA, 2007                     *)
 (************************************************************************)
 
-(*i $Id: NOrder.v 11040 2008-06-03 00:04:16Z letouzey $ i*)
+(*i $Id: NOrder.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 Require Export NMul.
 
@@ -309,13 +309,12 @@ Proof NZgt_wf.
 
 Theorem lt_wf_0 : well_founded lt.
 Proof.
-assert (H : relations_eq lt (fun n m : N => 0 <= n /\ n < m)).
+setoid_replace lt with (fun n m : N => 0 <= n /\ n < m) 
+  using relation (@relations_eq N N).
+apply lt_wf.
 intros x y; split.
 intro H; split; [apply le_0_l | assumption]. now intros [_ H].
-rewrite H; apply lt_wf.
-(* does not work:
-setoid_replace lt with (fun n m : N => 0 <= n /\ n < m) using relation relations_eq.*)
-Qed.
+Defined.
 
 (* Theorems that are true for natural numbers but not for integers *)
 
diff --git a/theories/Numbers/Natural/BigN/BigN.v b/theories/Numbers/Natural/BigN/BigN.v
index 0574c09f..41c255b1 100644
--- a/theories/Numbers/Natural/BigN/BigN.v
+++ b/theories/Numbers/Natural/BigN/BigN.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: BigN.v 11040 2008-06-03 00:04:16Z letouzey $ i*)
+(*i $Id: BigN.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (** * Natural numbers in base 2^31 *)
 
@@ -47,6 +47,8 @@ Infix "?=" := BigN.compare : bigN_scope.
 Infix "==" := BigN.eq (at level 70, no associativity) : bigN_scope.
 Infix "<" := BigN.lt : bigN_scope.
 Infix "<=" := BigN.le : bigN_scope.
+Notation "x > y" := (BigN.lt y x)(only parsing) : bigN_scope.
+Notation "x >= y" := (BigN.le y x)(only parsing) : bigN_scope.
 Notation "[ i ]" := (BigN.to_Z i) : bigN_scope.
 
 Open Scope bigN_scope.
@@ -62,7 +64,7 @@ Qed.
 
 (** [BigN] is a semi-ring *)
 
-Lemma BigNring : 
+Lemma BigNring :
  semi_ring_theory BigN.zero BigN.one BigN.add BigN.mul BigN.eq.
 Proof.
 constructor.
@@ -76,6 +78,8 @@ exact mul_assoc.
 exact mul_add_distr_r.
 Qed.
 
+Typeclasses unfold NZadd NZsub NZmul.
+
 Add Ring BigNr : BigNring.
 
 (** Todo: tactic translating from [BigN] to [Z] + omega *)
diff --git a/theories/Numbers/Natural/BigN/NMake_gen.ml b/theories/Numbers/Natural/BigN/NMake_gen.ml
index bd0fb5b1..4d6b45c5 100644
--- a/theories/Numbers/Natural/BigN/NMake_gen.ml
+++ b/theories/Numbers/Natural/BigN/NMake_gen.ml
@@ -8,7 +8,7 @@
 (*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
 (************************************************************************)
 
-(*i $Id: NMake_gen.ml 11136 2008-06-18 10:41:34Z herbelin $ i*)
+(*i $Id: NMake_gen.ml 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*S NMake_gen.ml : this file generates NMake.v *)
 
@@ -139,7 +139,7 @@ let _ =
   pr "";
   pr " Definition %s := %s_." t t;
   pr "";
-
+  pr " Typeclasses unfold %s." t;
   pr " Definition w_0 := w0_op.(znz_0).";
   pr "";
 
diff --git a/theories/Numbers/Natural/SpecViaZ/NSigNAxioms.v b/theories/Numbers/Natural/SpecViaZ/NSigNAxioms.v
index fe068437..84836268 100644
--- a/theories/Numbers/Natural/SpecViaZ/NSigNAxioms.v
+++ b/theories/Numbers/Natural/SpecViaZ/NSigNAxioms.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: NSigNAxioms.v 11040 2008-06-03 00:04:16Z letouzey $ i*)
+(*i $Id: NSigNAxioms.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 Require Import ZArith.
 Require Import Nnat.
@@ -223,7 +223,7 @@ Qed.
 Add Morphism N.compare with signature N.eq ==> N.eq ==> (@eq comparison) as compare_wd.
 Proof. 
 intros x x' Hx y y' Hy.
-rewrite 2 spec_compare_alt; rewrite Hx, Hy; intuition.
+rewrite 2 spec_compare_alt. unfold N.eq in *. rewrite Hx, Hy; intuition.
 Qed.
 
 Add Morphism N.lt with signature N.eq ==> N.eq ==> iff as NZlt_wd.
diff --git a/theories/Numbers/Rational/BigQ/BigQ.v b/theories/Numbers/Rational/BigQ/BigQ.v
index 39e120f7..21f2513f 100644
--- a/theories/Numbers/Rational/BigQ/BigQ.v
+++ b/theories/Numbers/Rational/BigQ/BigQ.v
@@ -8,19 +8,35 @@
 (*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
 (************************************************************************)
 
-(*i $Id: BigQ.v 11028 2008-06-01 17:34:19Z letouzey $ i*)
+(*i $Id: BigQ.v 11208 2008-07-04 16:57:46Z letouzey $ i*)
 
-Require Export QMake_base.
-Require Import QpMake.
-Require Import QvMake.
-Require Import Q0Make.
-Require Import QifMake.
-Require Import QbiMake.
+Require Import Field Qfield BigN BigZ QSig QMake.
 
-(* We choose for Q the implemention with
-   multiple representation of 0: 0, 1/0, 2/0 etc *)
+(** We choose for BigQ an implemention with
+    multiple representation of 0: 0, 1/0, 2/0 etc.
+    See [QMake.v] *)
 
-Module BigQ <: QSig.QType := Q0.
+(** First, we provide translations functions between [BigN] and [BigZ] *)
+
+Module BigN_BigZ <: NType_ZType BigN.BigN BigZ.
+ Definition Z_of_N := BigZ.Pos.
+ Lemma spec_Z_of_N : forall n, BigZ.to_Z (Z_of_N n) = BigN.to_Z n.
+ Proof.
+ reflexivity.
+ Qed.
+ Definition Zabs_N := BigZ.to_N.
+ Lemma spec_Zabs_N : forall z, BigN.to_Z (Zabs_N z) = Zabs (BigZ.to_Z z).
+ Proof.
+ unfold Zabs_N; intros.
+ rewrite BigZ.spec_to_Z, Zmult_comm; apply Zsgn_Zabs.
+ Qed.
+End BigN_BigZ.
+
+(** This allows to build [BigQ] out of [BigN] and [BigQ] via [QMake] *)
+
+Module BigQ <: QSig.QType := QMake.Make BigN BigZ BigN_BigZ.
+
+(** Notations about [BigQ] *)
 
 Notation bigQ := BigQ.t.
 
@@ -28,8 +44,150 @@ Delimit Scope bigQ_scope with bigQ.
 Bind Scope bigQ_scope with bigQ.
 Bind Scope bigQ_scope with BigQ.t.
 
-Notation " i + j " := (BigQ.add i j) : bigQ_scope.
-Notation " i - j " := (BigQ.sub i j) : bigQ_scope.
-Notation " i * j " := (BigQ.mul i j) : bigQ_scope.
-Notation " i / j " := (BigQ.div i j) : bigQ_scope.
-Notation " i ?= j " := (BigQ.compare i j) : bigQ_scope.
+Infix "+" := BigQ.add : bigQ_scope.
+Infix "-" := BigQ.sub : bigQ_scope.
+Notation "- x" := (BigQ.opp x) : bigQ_scope.
+Infix "*" := BigQ.mul : bigQ_scope.
+Infix "/" := BigQ.div : bigQ_scope.
+Infix "^" := BigQ.power : bigQ_scope.
+Infix "?=" := BigQ.compare : bigQ_scope.
+Infix "==" := BigQ.eq : bigQ_scope.
+Infix "<" := BigQ.lt : bigQ_scope.
+Infix "<=" := BigQ.le : bigQ_scope.
+Notation "x > y" := (BigQ.lt y x)(only parsing) : bigQ_scope.
+Notation "x >= y" := (BigQ.le y x)(only parsing) : bigQ_scope.
+Notation "[ q ]" := (BigQ.to_Q q) : bigQ_scope.
+
+Open Scope bigQ_scope.
+
+(** [BigQ] is a setoid *)
+
+Add Relation BigQ.t BigQ.eq
+ reflexivity proved by (fun x => Qeq_refl [x])
+ symmetry proved by (fun x y => Qeq_sym [x] [y])
+ transitivity proved by (fun x y z => Qeq_trans [x] [y] [z])
+as BigQeq_rel.
+
+Add Morphism BigQ.add with signature BigQ.eq ==> BigQ.eq ==> BigQ.eq as BigQadd_wd.
+Proof.
+ unfold BigQ.eq; intros; rewrite !BigQ.spec_add; rewrite H, H0; apply Qeq_refl.
+Qed.
+
+Add Morphism BigQ.opp with signature BigQ.eq ==> BigQ.eq as BigQopp_wd.
+Proof.
+ unfold BigQ.eq; intros; rewrite !BigQ.spec_opp; rewrite H; apply Qeq_refl.
+Qed.
+
+Add Morphism BigQ.sub with signature BigQ.eq ==> BigQ.eq ==> BigQ.eq as BigQsub_wd.
+Proof.
+ unfold BigQ.eq; intros; rewrite !BigQ.spec_sub; rewrite H, H0; apply Qeq_refl.
+Qed.
+
+Add Morphism BigQ.mul with signature BigQ.eq ==> BigQ.eq ==> BigQ.eq as BigQmul_wd.
+Proof.
+ unfold BigQ.eq; intros; rewrite !BigQ.spec_mul; rewrite H, H0; apply Qeq_refl.
+Qed.
+
+Add Morphism BigQ.inv with signature BigQ.eq ==> BigQ.eq as BigQinv_wd.
+Proof.
+ unfold BigQ.eq; intros; rewrite !BigQ.spec_inv; rewrite H; apply Qeq_refl.
+Qed.
+
+Add Morphism BigQ.div with signature BigQ.eq ==> BigQ.eq ==> BigQ.eq as BigQdiv_wd.
+Proof.
+ unfold BigQ.eq; intros; rewrite !BigQ.spec_div; rewrite H, H0; apply Qeq_refl.
+Qed.
+
+(* TODO : fix this. For the moment it's useless (horribly slow)
+Hint Rewrite
+ BigQ.spec_0 BigQ.spec_1 BigQ.spec_m1 BigQ.spec_compare
+ BigQ.spec_red BigQ.spec_add BigQ.spec_sub BigQ.spec_opp
+ BigQ.spec_mul BigQ.spec_inv BigQ.spec_div BigQ.spec_power_pos
+ BigQ.spec_square : bigq. *)
+
+
+(** [BigQ] is a field *)
+
+Lemma BigQfieldth :
+ field_theory BigQ.zero BigQ.one BigQ.add BigQ.mul BigQ.sub BigQ.opp BigQ.div BigQ.inv BigQ.eq.
+Proof.
+constructor.
+constructor; intros; red.
+rewrite BigQ.spec_add, BigQ.spec_0; ring.
+rewrite ! BigQ.spec_add; ring.
+rewrite ! BigQ.spec_add; ring.
+rewrite BigQ.spec_mul, BigQ.spec_1; ring.
+rewrite ! BigQ.spec_mul; ring.
+rewrite ! BigQ.spec_mul; ring.
+rewrite BigQ.spec_add, ! BigQ.spec_mul, BigQ.spec_add; ring.
+unfold BigQ.sub; apply Qeq_refl.
+rewrite BigQ.spec_add, BigQ.spec_0, BigQ.spec_opp; ring.
+compute; discriminate.
+intros; red.
+unfold BigQ.div; apply Qeq_refl.
+intros; red.
+rewrite BigQ.spec_mul, BigQ.spec_inv, BigQ.spec_1; field.
+rewrite <- BigQ.spec_0; auto.
+Qed.
+
+Lemma BigQpowerth :
+ power_theory BigQ.one BigQ.mul BigQ.eq Z_of_N BigQ.power.
+Proof.
+constructor.
+intros; red.
+rewrite BigQ.spec_power.
+replace ([r] ^ Z_of_N n)%Q with (pow_N 1 Qmult [r] n)%Q.
+destruct n.
+simpl; compute; auto.
+induction p; simpl; auto; try rewrite !BigQ.spec_mul, !IHp; apply Qeq_refl.
+destruct n; reflexivity.
+Qed.
+
+Lemma BigQ_eq_bool_correct :
+ forall x y, BigQ.eq_bool x y = true -> x==y.
+Proof.
+intros; generalize (BigQ.spec_eq_bool x y); rewrite H; auto.
+Qed.
+
+Lemma BigQ_eq_bool_complete :
+ forall x y, x==y -> BigQ.eq_bool x y = true.
+Proof.
+intros; generalize (BigQ.spec_eq_bool x y).
+destruct BigQ.eq_bool; auto.
+Qed.
+
+(* TODO : improve later the detection of constants ... *)
+
+Ltac BigQcst t :=
+ match t with
+   | BigQ.zero => BigQ.zero
+   | BigQ.one => BigQ.one
+   | BigQ.minus_one => BigQ.minus_one
+   | _ => NotConstant
+ end.
+
+Add Field BigQfield : BigQfieldth
+ (decidable BigQ_eq_bool_correct,
+  completeness BigQ_eq_bool_complete,
+  constants [BigQcst],
+  power_tac BigQpowerth [Qpow_tac]).
+
+Section Examples.
+
+Let ex1 : forall x y z, (x+y)*z ==  (x*z)+(y*z).
+  intros.
+  ring.
+Qed.
+
+Let ex8 : forall x, x ^ 1 == x.
+  intro.
+  ring.
+Qed.
+
+Let ex10 : forall x y, ~(y==BigQ.zero) -> (x/y)*y == x.
+intros.
+field.
+auto.
+Qed.
+
+End Examples.
\ No newline at end of file
diff --git a/theories/Numbers/Rational/BigQ/Q0Make.v b/theories/Numbers/Rational/BigQ/Q0Make.v
deleted file mode 100644
index 93f52c03..00000000
--- a/theories/Numbers/Rational/BigQ/Q0Make.v
+++ /dev/null
@@ -1,1412 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
-(************************************************************************)
-
-(*i $Id: Q0Make.v 11028 2008-06-01 17:34:19Z letouzey $ i*)
-
-Require Import Bool.
-Require Import ZArith.
-Require Import Znumtheory.
-Require Import BigNumPrelude.
-Require Import Arith.
-Require Export BigN.
-Require Export BigZ.
-Require Import QArith.
-Require Import Qcanon.
-Require Import Qpower.
-Require Import QSig.
-Require Import QMake_base.
-
-Module Q0 <: QType.
-
- Import BinInt Zorder.
-
- (** The notation of a rational number is either an integer x,
-     interpreted as itself or a pair (x,y) of an integer x and a natural
-     number y interpreted as x/y. The pairs (x,0) and (0,y) are all
-     interpreted as 0. *)
-
- Definition t := q_type.
-
- (** Specification with respect to [QArith] *) 
-
- Open Local Scope Q_scope.
-
- Definition of_Z x: t := Qz (BigZ.of_Z x).
-
- Definition of_Q q: t := 
- match q with x # y =>
-  Qq (BigZ.of_Z x) (BigN.of_N (Npos y))
- end.
-
- Definition to_Q (q: t) := 
- match q with 
-  Qz x => BigZ.to_Z x # 1
- |Qq x y => if BigN.eq_bool y BigN.zero then 0
-            else BigZ.to_Z x # Z2P (BigN.to_Z y)
- end.
-
- Notation "[ x ]" := (to_Q x).
-
- Theorem strong_spec_of_Q: forall q: Q, [of_Q q] = q.
- Proof.
- intros (x,y); simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-  generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
-   rewrite BigN.spec_of_pos; intros HH; discriminate HH.
- rewrite BigZ.spec_of_Z; simpl.
- rewrite (BigN.spec_of_pos); auto.
- Qed.
-
- Theorem spec_of_Q: forall q: Q, [of_Q q] == q.
- Proof.
- intros; rewrite strong_spec_of_Q; red; auto.
- Qed.
-
- Definition eq x y := [x] == [y].
-
- Definition zero: t := Qz BigZ.zero.
- Definition one: t := Qz BigZ.one.
- Definition minus_one: t := Qz BigZ.minus_one.
-
- Lemma spec_0: [zero] == 0.
- Proof.
- reflexivity.
- Qed.
-
- Lemma spec_1: [one] == 1.
- Proof.
- reflexivity.
- Qed.
-
- Lemma spec_m1: [minus_one] == -(1).
- Proof.
- reflexivity.
- Qed.
-
- Definition opp (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.opp zx)
-  | Qq nx dx => Qq (BigZ.opp nx) dx
-  end.
-
- Theorem strong_spec_opp: forall q, [opp q] = -[q].
- Proof.
- intros [z | x y]; simpl.
- rewrite BigZ.spec_opp; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-  generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- rewrite BigZ.spec_opp; auto.
- Qed.
-
- Theorem spec_opp : forall q, [opp q] == -[q].
- Proof.
- intros; rewrite strong_spec_opp; red; auto.
- Qed.
-
- Definition compare (x y: t) :=
-  match x, y with
-  | Qz zx, Qz zy => BigZ.compare zx zy
-  | Qz zx, Qq ny dy => 
-    if BigN.eq_bool dy BigN.zero then BigZ.compare zx BigZ.zero
-    else BigZ.compare (BigZ.mul zx (BigZ.Pos dy)) ny
-  | Qq nx dx, Qz zy => 
-    if BigN.eq_bool dx BigN.zero then BigZ.compare BigZ.zero zy 
-    else BigZ.compare nx (BigZ.mul zy (BigZ.Pos dx))
-  | Qq nx dx, Qq ny dy =>
-    match BigN.eq_bool dx BigN.zero, BigN.eq_bool dy BigN.zero with
-    | true, true => Eq
-    | true, false => BigZ.compare BigZ.zero ny
-    | false, true => BigZ.compare nx BigZ.zero
-    | false, false => BigZ.compare (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx))
-    end
-  end.
-
- Theorem spec_compare: forall q1 q2, (compare q1 q2) = ([q1] ?= [q2]).
- Proof.
- intros [z1 | x1 y1] [z2 | x2 y2]; 
-   unfold Qcompare, compare, to_Q, Qnum, Qden.
- repeat rewrite Zmult_1_r.
- generalize (BigZ.spec_compare z1 z2); case BigZ.compare; intros H; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- rewrite Zmult_1_r.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- rewrite Zmult_1_r; generalize (BigZ.spec_compare z1 BigZ.zero);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH1; rewrite HH1; rewrite Zcompare_refl; auto.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (z1 * BigZ.Pos y2) x2)%bigZ; case BigZ.compare;
-   rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare BigZ.zero z2);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH1; rewrite <- HH1; rewrite Zcompare_refl; auto.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
- rewrite Zmult_1_r.
- generalize (BigZ.spec_compare x1 (z2 * BigZ.Pos y1))%bigZ; case BigZ.compare;
-   rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- rewrite Zcompare_refl; auto.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare BigZ.zero x2);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH2; rewrite <- HH2; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare x1 BigZ.zero)%bigZ; case BigZ.compare;
-   auto; rewrite BigZ.spec_0.
- intros HH2; rewrite <- HH2; rewrite Zcompare_refl; auto.
- repeat rewrite Z2P_correct.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (x1 * BigZ.Pos y2) 
-                               (x2 * BigZ.Pos y1))%bigZ; case BigZ.compare;
-   repeat rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- Qed.
-
- Definition lt n m := compare n m = Lt.
- Definition le n m := compare n m <> Gt.
- Definition min n m := match compare n m with Gt => m | _ => n end.
- Definition max n m := match compare n m with Lt => m | _ => n end.
-
-(* Je pense que cette fonction normalise bien ... *)
- Definition norm n d: t :=
-  let gcd := BigN.gcd (BigZ.to_N n) d in 
-  match BigN.compare BigN.one gcd with
-  | Lt => 
-    let n := BigZ.div n (BigZ.Pos gcd) in
-    let d := BigN.div d gcd in
-    match BigN.compare d BigN.one with
-    | Gt => Qq n d
-    | Eq => Qz n
-    | Lt => zero
-    end
-  | Eq => Qq n d
-  | Gt => zero (* gcd = 0 => both numbers are 0 *)
-  end.
-
- Theorem spec_norm: forall n q, [norm n q] == [Qq n q].
- Proof.
- intros p q; unfold norm.
- assert (Hp := BigN.spec_pos (BigZ.to_N p)).
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; auto; rewrite BigN.spec_1; rewrite BigN.spec_gcd; intros H1.
-   apply Qeq_refl.
- generalize (BigN.spec_pos (q / BigN.gcd (BigZ.to_N p) q)%bigN).
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; auto; rewrite BigN.spec_1; rewrite BigN.spec_div; 
-   rewrite BigN.spec_gcd; auto with zarith; intros H2 HH.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H3; simpl;
-  rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd;
-  auto with zarith.
- generalize H2; rewrite H3; 
-   rewrite Zdiv_0_l; auto with zarith.
- generalize H1 H2 H3 (BigN.spec_pos q); clear H1 H2 H3.
- rewrite spec_to_N.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 H4; rewrite Z2P_correct; auto with zarith.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H3; simpl.
- case H3.
- generalize H1 H2 H3 HH; clear H1 H2 H3 HH.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 HH.
-  rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto with zarith.
- case (Zle_lt_or_eq _ _ HH); auto with zarith.
- intros HH1; rewrite <- HH1; ring.
- generalize (Zgcd_is_gcd a b); intros HH1; inversion HH1; auto.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_div;
-   rewrite BigN.spec_gcd; auto with zarith; intros H3.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H4.
- case H3; rewrite H4;  rewrite Zdiv_0_l; auto with zarith.
- simpl.
- assert (FF := BigN.spec_pos q).
- rewrite Z2P_correct; auto with zarith.
- rewrite <- BigN.spec_gcd; rewrite <- BigN.spec_div; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; auto with zarith.
- simpl; rewrite BigZ.spec_div; simpl.
- rewrite BigN.spec_gcd; auto with zarith.
- generalize H1 H2 H3 H4 HH FF; clear H1 H2 H3 H4 HH FF.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 H4 HH FF.
- rewrite spec_to_N; fold a.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_div; 
-   rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_gcd; auto with zarith.
- case (Zle_lt_or_eq _ _ 
-   (BigN.spec_pos (BigN.gcd (BigZ.to_N p) q)));
-  rewrite BigN.spec_gcd; auto with zarith.
- intros; apply False_ind; auto with zarith.
- intros HH2; assert (FF1 := Zgcd_inv_0_l _ _ (sym_equal HH2)).
- assert (FF2 := Zgcd_inv_0_l _ _ (sym_equal HH2)).
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2; simpl.
- rewrite spec_to_N.
- rewrite FF2; ring.
- Qed.
-
-   
- Definition add (x y: t): t :=
-  match x with
-  | Qz zx =>
-    match y with
-    | Qz zy => Qz (BigZ.add zx zy)
-    | Qq ny dy => 
-      if BigN.eq_bool dy BigN.zero then x 
-      else Qq (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-    end
-  | Qq nx dx =>
-    if BigN.eq_bool dx BigN.zero then y 
-    else match y with
-    | Qz zy => Qq (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-    | Qq ny dy =>
-      if BigN.eq_bool dy BigN.zero then x
-      else
-       let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-       let d := BigN.mul dx dy in
-       Qq n d
-    end
-  end.
-
- Theorem spec_add : forall x y, [add x y] == [x] + [y].
- Proof.
- intros [x | nx dx] [y | ny dy]; unfold Qplus; simpl.
- rewrite BigZ.spec_add; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- assert (F1:= BigN.spec_pos dy).
- rewrite Zmult_1_r; red; simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH; simpl; try ring.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH1; simpl; try ring.
- case HH; auto.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl; auto.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH; simpl; try ring.
- rewrite Zmult_1_r; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH1; simpl; try ring.
- case HH; auto.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl; auto.
- rewrite Zmult_1_r; rewrite Pmult_1_r.
- apply Qeq_refl.
- assert (F1:= BigN.spec_pos dx); auto with zarith.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- apply Qeq_refl.
- case HH2; auto.
- simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- case HH2; auto.
- case HH1; auto.
- rewrite Zmult_1_r; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- simpl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- case HH; auto.
- rewrite Zmult_1_r; rewrite Zplus_0_r; rewrite Pmult_1_r.
- apply Qeq_refl.
- simpl.
- generalize (BigN.spec_eq_bool (dx * dy)%bigN BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_mul;
-   rewrite BigN.spec_0; intros HH2.
- (case (Zmult_integral _ _ HH2); intros HH3);
-  [case HH| case HH1]; auto.
- rewrite BigZ.spec_add; repeat rewrite BigZ.spec_mul; simpl.
- assert (Fx: (0 < BigN.to_Z dx)%Z).
-   generalize (BigN.spec_pos dx); auto with zarith.
- assert (Fy: (0 < BigN.to_Z dy)%Z).
-   generalize (BigN.spec_pos dy); auto with zarith.
- red; simpl; rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto with zarith.
- apply Zmult_lt_0_compat; auto.
- Qed.
-
- Definition add_norm (x y: t): t :=
-  match x with
-  | Qz zx =>
-    match y with
-    | Qz zy => Qz (BigZ.add zx zy)
-    | Qq ny dy =>  
-      if BigN.eq_bool dy BigN.zero then x 
-      else norm (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-    end
-  | Qq nx dx =>
-    if BigN.eq_bool dx BigN.zero then y 
-    else match y with
-    | Qz zy => norm (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-    | Qq ny dy =>
-      if BigN.eq_bool dy BigN.zero then x
-      else
-       let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-       let d := BigN.mul dx dy in
-       norm n d
-    end
-  end.
-
- Theorem spec_add_norm : forall x y, [add_norm x y] == [x] + [y].
- Proof.
- intros x y; rewrite <- spec_add; auto.
- case x; case y; clear x y; unfold add_norm, add.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- simpl.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- apply Qeq_refl.
- apply Qeq_refl.
- intros p1 p2 n.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- apply Qeq_refl.
- intros p1 q1 p2 q2.
- generalize (BigN.spec_eq_bool q2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- apply Qeq_refl.
- generalize (BigN.spec_eq_bool q1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- apply Qeq_refl.
- Qed.
-
- Definition sub x y := add x (opp y).
-
- Theorem spec_sub : forall x y, [sub x y] == [x] - [y].
- Proof.
- intros x y; unfold sub; rewrite spec_add; auto.
- rewrite spec_opp; ring.
- Qed.
-
- Definition sub_norm x y := add_norm x (opp y).
-
- Theorem spec_sub_norm : forall x y, [sub_norm x y] == [x] - [y].
- Proof.
- intros x y; unfold sub_norm; rewrite spec_add_norm; auto.
- rewrite spec_opp; ring.
- Qed.
-
- Definition mul (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.mul zx ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.mul nx zy) dx
-  | Qq nx dx, Qq ny dy => Qq (BigZ.mul nx ny) (BigN.mul dx dy)
-  end.
-
- Theorem spec_mul : forall x y, [mul x y] == [x] * [y].
- Proof.
- intros [x | nx dx] [y | ny dy]; unfold Qmult; simpl.
- rewrite BigZ.spec_mul; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end;  rewrite BigN.spec_0; intros HH1.
- red; simpl; ring.
- rewrite BigZ.spec_mul; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH1.
- red; simpl; ring.
- rewrite BigZ.spec_mul; rewrite Pmult_1_r.
- apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0;  rewrite BigN.spec_mul;
-      intros HH1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH2.
- red; simpl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH3.
- red; simpl; ring.
- case (Zmult_integral _ _ HH1); intros HH.
-   case HH2; auto.
-   case HH3; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH2.
- case HH1; rewrite HH2; ring.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH3.
- case HH1; rewrite HH3; ring.
- rewrite BigZ.spec_mul.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- apply Qeq_refl.
-  generalize (BigN.spec_pos dx); auto with zarith.
-  generalize (BigN.spec_pos dy); auto with zarith.
- Qed.
-
-Definition mul_norm (x y: t): t := 
- match x, y with
- | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
- | Qz zx, Qq ny dy =>
-   if BigZ.eq_bool zx BigZ.zero then zero
-   else	
-     let gcd := BigN.gcd (BigZ.to_N zx) dy in
-     match BigN.compare gcd BigN.one with
-       Gt => 
-       let zx := BigZ.div zx (BigZ.Pos gcd) in
-       let d := BigN.div dy gcd in
-       if BigN.eq_bool d BigN.one then Qz (BigZ.mul zx ny)
-       else Qq (BigZ.mul zx ny) d
-      | _  => Qq (BigZ.mul zx ny) dy
-     end
- | Qq nx dx, Qz zy =>   
-   if BigZ.eq_bool zy BigZ.zero then zero
-   else	
-     let gcd := BigN.gcd (BigZ.to_N zy) dx in
-     match BigN.compare gcd BigN.one with
-       Gt => 
-       let zy := BigZ.div zy (BigZ.Pos gcd) in
-       let d := BigN.div dx gcd in
-       if BigN.eq_bool d BigN.one then Qz (BigZ.mul zy nx)
-       else Qq (BigZ.mul zy nx) d
-     | _ =>  Qq (BigZ.mul zy nx) dx
-     end
- | Qq nx dx, Qq ny dy => 
-     let (nx, dy) := 
-       let gcd := BigN.gcd (BigZ.to_N nx) dy in
-       match BigN.compare gcd BigN.one with 
-        Gt => (BigZ.div nx (BigZ.Pos gcd), BigN.div dy gcd)
-       | _ => (nx, dy)
-       end in
-     let (ny, dx) := 
-       let gcd := BigN.gcd (BigZ.to_N ny) dx in
-       match BigN.compare gcd BigN.one with 
-        Gt =>  (BigZ.div ny (BigZ.Pos gcd), BigN.div dx gcd) 
-       | _ =>  (ny, dx)
-       end in 
-     let d := (BigN.mul dx dy) in
-     if BigN.eq_bool d BigN.one then Qz (BigZ.mul ny nx) 
-     else Qq (BigZ.mul ny nx) d
- end.
-
- Theorem spec_mul_norm : forall x y, [mul_norm x y] == [x] * [y].
- Proof.
- intros x y; rewrite <- spec_mul; auto.
- unfold mul_norm, mul; case x; case y; clear x y.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- set (a := BigN.to_Z (BigZ.to_N p2)).
- set (b := BigN.to_Z n).
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; unfold zero, to_Q; repeat rewrite BigZ.spec_0; intros H.
- case BigN.eq_bool; try apply Qeq_refl.
- rewrite BigZ.spec_mul; rewrite H.
- red; simpl; ring.
- assert (F: (0 < a)%Z).
-  case (Zle_lt_or_eq _ _ (BigN.spec_pos (BigZ.to_N p2))); auto.
-  intros H1; case H; rewrite spec_to_N; rewrite <- H1; ring.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; rewrite BigN.spec_gcd;
-      fold a b; intros H1.
- apply Qeq_refl.
- apply Qeq_refl.
- assert (F0 : (0 < (Zgcd a b))%Z).
-   apply Zlt_trans with 1%Z.
-   red; auto.
-   apply Zgt_lt; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; rewrite BigN.spec_div;
- rewrite BigN.spec_gcd; auto with zarith; 
- fold a b; intros H2.
- assert (F1: b = Zgcd a b).
-   pattern b at 1; rewrite (Zdivide_Zdiv_eq (Zgcd a b) b);
-   auto with zarith.
-   rewrite H2; ring.
-   assert (FF := Zgcd_is_gcd a b); inversion FF; auto.
- assert (F2: (0 < b)%Z).
-   rewrite F1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; fold b; intros H3.
- rewrite H3 in F2; discriminate F2.
- rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; 
-  fold a b; auto with zarith.
- rewrite BigZ.spec_mul.
- red; simpl; rewrite Z2P_correct; auto.
- rewrite Zmult_1_r; rewrite spec_to_N; fold a b.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p1)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; rewrite BigN.spec_div;
- rewrite BigN.spec_gcd; fold a b; auto; intros H3.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H4.
- apply Qeq_refl.
- case H4; fold b.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite H3; ring.
- assert (FF := Zgcd_is_gcd a b); inversion FF; auto.
- simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; fold b; intros H4.
- case H3; rewrite H4; rewrite Zdiv_0_l; auto.
- rewrite BigZ.spec_mul; rewrite BigZ.spec_div; simpl;
-  rewrite BigN.spec_gcd; fold a b; auto with zarith.
- assert (F1: (0 < b)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos n)); fold b; auto with zarith.
- red; simpl.
- rewrite BigZ.spec_mul.
- repeat rewrite Z2P_correct; auto.
- rewrite spec_to_N; fold a.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p1)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- ring.
- apply Zgcd_div_pos; auto.
- intros p1 p2 n.
- set (a := BigN.to_Z (BigZ.to_N p1)).
- set (b := BigN.to_Z n).
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; unfold zero, to_Q; repeat rewrite BigZ.spec_0; intros H.
- case BigN.eq_bool; try apply Qeq_refl.
- rewrite BigZ.spec_mul; rewrite H.
- red; simpl; ring.
- assert (F: (0 < a)%Z).
-  case (Zle_lt_or_eq _ _ (BigN.spec_pos (BigZ.to_N p1))); auto.
-  intros H1; case H; rewrite spec_to_N; rewrite <- H1; ring.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; rewrite BigN.spec_gcd;
-      fold a b; intros H1.
- repeat rewrite BigZ.spec_mul; rewrite Zmult_comm.
- apply Qeq_refl.
- repeat rewrite BigZ.spec_mul; rewrite Zmult_comm.
- apply Qeq_refl.
- assert (F0 : (0 < (Zgcd a b))%Z).
-   apply Zlt_trans with 1%Z.
-   red; auto.
-   apply Zgt_lt; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; rewrite BigN.spec_div;
- rewrite BigN.spec_gcd; auto with zarith; 
- fold a b; intros H2.
- assert (F1: b = Zgcd a b).
-   pattern b at 1; rewrite (Zdivide_Zdiv_eq (Zgcd a b) b);
-   auto with zarith.
-   rewrite H2; ring.
-   assert (FF := Zgcd_is_gcd a b); inversion FF; auto.
- assert (F2: (0 < b)%Z).
-   rewrite F1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; fold b; intros H3.
- rewrite H3 in F2; discriminate F2.
- rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; 
-  fold a b; auto with zarith.
- rewrite BigZ.spec_mul.
- red; simpl; rewrite Z2P_correct; auto.
- rewrite Zmult_1_r; rewrite spec_to_N; fold a b.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p2)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; rewrite BigN.spec_div;
- rewrite BigN.spec_gcd; fold a b; auto; intros H3.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H4.
- apply Qeq_refl.
- case H4; fold b.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite H3; ring.
- assert (FF := Zgcd_is_gcd a b); inversion FF; auto.
- simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; fold b; intros H4.
- case H3; rewrite H4; rewrite Zdiv_0_l; auto.
- rewrite BigZ.spec_mul; rewrite BigZ.spec_div; simpl;
-  rewrite BigN.spec_gcd; fold a b; auto with zarith.
- assert (F1: (0 < b)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos n)); fold b; auto with zarith.
- red; simpl.
- rewrite BigZ.spec_mul.
- repeat rewrite Z2P_correct; auto.
- rewrite spec_to_N; fold a.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p2)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- ring.
- apply Zgcd_div_pos; auto.
- set (f := fun p t =>
-        match (BigN.gcd (BigZ.to_N p) t ?= BigN.one)%bigN with
-       | Eq => (p, t)
-       | Lt => (p, t)
-       | Gt =>
-         ((p / BigZ.Pos (BigN.gcd (BigZ.to_N p) t))%bigZ,
-           (t / BigN.gcd (BigZ.to_N p) t)%bigN)
-       end).
- assert (F: forall p t,
-   let (n, d) := f p t in [Qq p t] == [Qq n d]).
- intros p t1; unfold f.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; rewrite BigN.spec_gcd; intros H1.
- apply Qeq_refl.
- apply Qeq_refl.
- set (a := BigN.to_Z (BigZ.to_N p)).
- set (b := BigN.to_Z t1).
- fold a b in H1.
- assert (F0 : (0 < (Zgcd a b))%Z).
-   apply Zlt_trans with 1%Z.
-   red; auto.
-   apply Zgt_lt; auto.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; fold b; intros HH1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; fold b; intros HH2.
- simpl; ring.
- case HH2.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; fold a b; auto.
- rewrite HH1; rewrite Zdiv_0_l; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0;
-   rewrite BigN.spec_div; rewrite BigN.spec_gcd; fold a b; auto;
-   intros HH2.
- case HH1.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite HH2; ring.
- assert (FF := Zgcd_is_gcd a b); inversion FF; auto.
- simpl.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; fold a b; auto with zarith.
- assert (F1: (0 < b)%Z).
-    case (Zle_lt_or_eq _ _ (BigN.spec_pos t1)); fold b; auto with zarith.
-    intros HH; case HH1; auto.
- repeat rewrite Z2P_correct; auto.
- rewrite spec_to_N; fold a.
- rewrite Zgcd_div_swap; auto.
- apply Zgcd_div_pos; auto.
- intros HH; rewrite HH in F0; discriminate F0.
- intros p1 n1 p2 n2.
- change ([let (nx , dy) := f p2 n1 in
-         let (ny, dx) := f p1 n2 in
-  if BigN.eq_bool (dx * dy)%bigN BigN.one
-   then Qz (ny * nx)
-  else Qq (ny * nx) (dx * dy)] == [Qq (p2 * p1) (n2 * n1)]).
-  generalize (F p2 n1) (F p1 n2).
- case f; case f.
- intros u1 u2 v1 v2 Hu1 Hv1.
- apply Qeq_trans with [mul (Qq p2 n1) (Qq p1 n2)].
- rewrite spec_mul; rewrite Hu1; rewrite Hv1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; rewrite BigN.spec_mul; intros HH1.
- assert (F1: BigN.to_Z u2 = 1%Z).
-  case (Zmult_1_inversion_l _ _ HH1); auto.
-  generalize (BigN.spec_pos u2); auto with zarith.
- assert (F2: BigN.to_Z v2 = 1%Z).
-  rewrite Zmult_comm in HH1.
-  case (Zmult_1_inversion_l _ _ HH1); auto.
-  generalize (BigN.spec_pos v2); auto with zarith.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- rewrite H1 in F2; discriminate F2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2.
- rewrite H2 in F1; discriminate F1.
- simpl; rewrite BigZ.spec_mul.
- rewrite F1; rewrite F2; simpl; ring.
- rewrite Qmult_comm; rewrite <- spec_mul.
- apply Qeq_refl.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; rewrite BigN.spec_mul;
- rewrite Zmult_comm; intros H1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; rewrite BigN.spec_mul; intros H2; auto.
- case H2; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; rewrite BigN.spec_mul; intros H2; auto.
- case H1; auto.
- Qed.
-
-
-Definition inv (x: t): t := 
- match x with
- | Qz (BigZ.Pos n) => Qq BigZ.one n
- | Qz (BigZ.Neg n) => Qq BigZ.minus_one n
- | Qq (BigZ.Pos n) d => Qq (BigZ.Pos d) n
- | Qq (BigZ.Neg n) d => Qq (BigZ.Neg d) n
- end.
-
- Theorem spec_inv : forall x, [inv x] == /[x].
- Proof.
- intros [ [x | x] | [nx | nx] dx]; unfold inv, Qinv; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- rewrite H1; apply Qeq_refl.
- generalize H1 (BigN.spec_pos x); case (BigN.to_Z x); auto.
- intros HH; case HH; auto.
- intros; red; simpl; auto.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- rewrite H1; apply Qeq_refl.
- generalize H1 (BigN.spec_pos x); case (BigN.to_Z x); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl; auto.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- apply Qeq_refl.
- rewrite H1; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- rewrite H2; red; simpl; auto.
- generalize H1 (BigN.spec_pos nx); case (BigN.to_Z nx); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- apply Qeq_refl.
- rewrite H1; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- rewrite H2; red; simpl; auto.
- generalize H1 (BigN.spec_pos nx); case (BigN.to_Z nx); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p _ HH; case HH; auto.
- Qed.
-
-Definition inv_norm (x: t): t := 
- match x with
- | Qz (BigZ.Pos n) => 
-   match BigN.compare n BigN.one with
-     Gt => Qq BigZ.one n
-   | _ =>  x
-   end
- | Qz (BigZ.Neg n) => 
-   match BigN.compare n BigN.one with
-     Gt => Qq BigZ.minus_one n
-   | _ =>  x
-   end
- | Qq (BigZ.Pos n) d =>
-   match BigN.compare n BigN.one with
-     Gt => Qq (BigZ.Pos d) n
-   | Eq =>  Qz (BigZ.Pos d) 
-   | Lt => Qz (BigZ.zero)
-   end
- | Qq (BigZ.Neg n) d => 
-   match BigN.compare n BigN.one with
-     Gt => Qq (BigZ.Neg d) n
-   | Eq =>  Qz (BigZ.Neg d) 
-   | Lt => Qz (BigZ.zero)
-   end
- end.
-
- Theorem spec_inv_norm : forall x, [inv_norm x] == /[x].
- Proof.
- intros [ [x | x] | [nx | nx] dx]; unfold inv_norm, Qinv.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H.
- simpl; rewrite H; apply Qeq_refl.
- case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); simpl.
- generalize H; case BigN.to_Z.
- intros _ HH; discriminate HH.
- intros p; case p; auto.
-   intros p1 HH; discriminate HH.
-   intros p1 HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; discriminate HH.
- intros HH; rewrite <- HH.
-   apply Qeq_refl.
- generalize H; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- rewrite H1; intros HH; discriminate.
- generalize H; case BigN.to_Z.
- intros HH; discriminate HH.
- intros; red; simpl; auto.
- intros p HH; discriminate HH.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H.
- simpl; rewrite H; apply Qeq_refl.
- case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); simpl.
- generalize H; case BigN.to_Z.
- intros _ HH; discriminate HH.
- intros p; case p; auto.
-   intros p1 HH; discriminate HH.
-   intros p1 HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; discriminate HH.
- intros HH; rewrite <- HH.
-   apply Qeq_refl.
- generalize H; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- rewrite H1; intros HH; discriminate.
- generalize H; case BigN.to_Z.
- intros HH; discriminate HH.
- intros; red; simpl; auto.
- intros p HH; discriminate HH.
- simpl Qnum.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; simpl.
- case BigN.compare; red; simpl; auto.
- rewrite H1; auto.
- case BigN.eq_bool; auto.
- simpl; rewrite H1; auto.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H2.
- rewrite H2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- red; simpl.
- rewrite Zmult_1_r; rewrite Pmult_1_r; rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- generalize H2 (BigN.spec_pos nx); case (BigN.to_Z nx).
- intros; apply Qeq_refl.
- intros p; case p; clear p.
- intros p HH; discriminate HH.
- intros p HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- simpl; generalize H2; case (BigN.to_Z nx).
- intros HH; discriminate HH.
- intros p Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H4.
- rewrite H4 in H2; discriminate H2.
- red; simpl.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p HH; discriminate HH.
- simpl Qnum.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; simpl.
- case BigN.compare; red; simpl; auto.
- rewrite H1; auto.
- case BigN.eq_bool; auto.
- simpl; rewrite H1; auto.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H2.
- rewrite H2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zmult_1_r; rewrite Pmult_1_r; rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- generalize H2 (BigN.spec_pos nx); case (BigN.to_Z nx).
- intros; apply Qeq_refl.
- intros p; case p; clear p.
- intros p HH; discriminate HH.
- intros p HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- simpl; generalize H2; case (BigN.to_Z nx).
- intros HH; discriminate HH.
- intros p Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H4.
- rewrite H4 in H2; discriminate H2.
- red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p HH; discriminate HH.
- Qed.
-
- Definition div x y := mul x (inv y).
-
- Theorem spec_div x y: [div x y] == [x] / [y].
- Proof.
- intros x y; unfold div; rewrite spec_mul; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Definition div_norm x y := mul_norm x (inv y).
-
- Theorem spec_div_norm x y: [div_norm x y] == [x] / [y].
- Proof.
- intros x y; unfold div_norm; rewrite spec_mul_norm; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Definition square (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.square zx)
-  | Qq nx dx => Qq (BigZ.square nx) (BigN.square dx)
-  end.
-
- Theorem spec_square : forall x, [square x] == [x] ^ 2.
- Proof.
- intros [ x | nx dx]; unfold square.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- simpl Qpower.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H.
- red; simpl.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_square;
-   intros H1.
- case H1; rewrite H; auto.
- red; simpl.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_square;
-   intros H1.
- case H; case (Zmult_integral _ _ H1); auto.
- simpl.
- rewrite BigZ.spec_square.
- rewrite Zpos_mult_morphism.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- generalize (BigN.spec_pos dx); auto with zarith.
- Qed.
-
- Definition power_pos (x: t) p: t :=
-  match x with
-  | Qz zx => Qz (BigZ.power_pos zx p)
-  | Qq nx dx => Qq (BigZ.power_pos nx p) (BigN.power_pos dx p)
-  end.
-
- Theorem spec_power_pos : forall x p, [power_pos x p] == [x] ^ Zpos p.
- Proof.
- intros [x | nx dx] p; unfold power_pos.
-   unfold power_pos; red; simpl.
-   generalize (Qpower_decomp p (BigZ.to_Z x) 1).
-   unfold Qeq; simpl.
-   rewrite Zpower_pos_1_l; simpl Z2P.
-   rewrite Zmult_1_r.
-   intros H; rewrite H.
-   rewrite BigZ.spec_power_pos; simpl; ring.
- simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_power_pos; intros H1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2.
- elim p; simpl.
- intros; red; simpl; auto.
- intros p1 Hp1; rewrite <- Hp1; red; simpl; auto.
- apply Qeq_refl.
- case H2; generalize H1.
- elim p; simpl.
- intros p1 Hrec.
- change (xI p1) with (1 + (xO p1))%positive.
- rewrite Zpower_pos_is_exp; rewrite Zpower_pos_1_r.
- intros HH; case (Zmult_integral _ _ HH); auto.
- rewrite <- Pplus_diag.
- rewrite Zpower_pos_is_exp.
- intros HH1; case (Zmult_integral _ _ HH1); auto.
- intros p1 Hrec.
- rewrite <- Pplus_diag.
- rewrite Zpower_pos_is_exp.
- intros HH1; case (Zmult_integral _ _ HH1); auto.
- rewrite Zpower_pos_1_r; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2.
- case H1; rewrite H2; auto.
- simpl; rewrite Zpower_pos_0_l; auto.
- assert (F1: (0 < BigN.to_Z dx)%Z).
-     generalize (BigN.spec_pos dx); auto with zarith.
- assert (F2: (0 < BigN.to_Z dx  ^ ' p)%Z).
-  unfold Zpower; apply Zpower_pos_pos; auto.
- unfold power_pos; red; simpl.
- generalize (Qpower_decomp p (BigZ.to_Z nx) 
-               (Z2P (BigN.to_Z dx))).
- unfold Qeq; simpl.
- repeat rewrite Z2P_correct; auto.
- unfold Qeq; simpl; intros HH.
- rewrite HH.
- rewrite BigZ.spec_power_pos; simpl; ring.
- Qed.
-
- (** Interaction with [Qcanon.Qc] *)
- 
- Open Scope Qc_scope.
-
- Definition of_Qc q := of_Q (this q).
-
- Definition to_Qc q := !!(to_Q q).
-
- Notation "[[ x ]]" := (to_Qc x).
-
- Theorem spec_of_Qc: forall q, [[of_Qc q]] = q.
- Proof.
- intros (x, Hx); unfold of_Qc, to_Qc; simpl.
- apply Qc_decomp; simpl.
- intros.
- rewrite <- H0 at 2; apply Qred_complete.
- apply spec_of_Q.
- Qed.
-
- Theorem spec_oppc: forall q, [[opp q]] = -[[q]].
- Proof.
- intros q; unfold Qcopp, to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- rewrite spec_opp.
- rewrite <- Qred_opp.
- rewrite Qred_correct; red; auto.
- Qed.
-
- Theorem spec_comparec: forall q1 q2,
-  compare q1 q2 = ([[q1]] ?= [[q2]]).
- Proof.
- unfold Qccompare, to_Qc. 
- intros q1 q2; rewrite spec_compare; simpl; auto.
- apply Qcompare_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_addc x y:
-  [[add x y]] = [[x]] + [[y]].
- Proof.
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_add_normc x y:
-  [[add_norm x y]] = [[x]] + [[y]].
- Proof.
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add_norm; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_subc x y:  [[sub x y]] = [[x]] - [[y]].
- Proof.
- intros x y; unfold sub; rewrite spec_addc; auto.
- rewrite spec_oppc; ring.
- Qed.
-
- Theorem spec_sub_normc x y:
-   [[sub_norm x y]] = [[x]] - [[y]].
- intros x y; unfold sub_norm; rewrite spec_add_normc; auto.
- rewrite spec_oppc; ring.
- Qed.
-
- Theorem spec_mulc x y:
-  [[mul x y]] = [[x]] * [[y]].
- Proof.
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_mul_normc x y:
-   [[mul_norm x y]] = [[x]] * [[y]].
- Proof.
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul_norm; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_invc x:
-   [[inv x]] =  /[[x]].
- Proof.
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_inv_normc x:
-   [[inv_norm x]] =  /[[x]].
- Proof.
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv_norm; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_divc x y: [[div x y]] = [[x]] / [[y]].
- Proof.
- intros x y; unfold div; rewrite spec_mulc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto. 
- Qed.
-
- Theorem spec_div_normc x y: [[div_norm x y]] = [[x]] / [[y]].
- Proof.
- intros x y; unfold div_norm; rewrite spec_mul_normc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto.
- Qed.
-
- Theorem spec_squarec x: [[square x]] =  [[x]]^2.
- Proof.
- intros x; unfold to_Qc.
- apply trans_equal with (!! ([x]^2)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_square; auto.
- simpl Qcpower.
- replace (!! [x] * 1) with (!![x]); try ring.
- simpl.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Theorem spec_power_posc x p:
-   [[power_pos x p]] = [[x]] ^ nat_of_P p.
- Proof.
- intros x p; unfold to_Qc.
- apply trans_equal with (!! ([x]^Zpos p)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_power_pos; auto.
- pattern p; apply Pind; clear p.
- simpl; ring.
- intros p Hrec.
- rewrite nat_of_P_succ_morphism; simpl Qcpower.
- rewrite <- Hrec.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _;
- unfold this.
- apply Qred_complete.
- assert (F: [x] ^ ' Psucc p == [x] *   [x] ^ ' p).
-  simpl; case x; simpl; clear x Hrec.
-  intros x; simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  intros nx dx.
-  match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-  end; auto; rewrite BigN.spec_0.
-  unfold Qpower_positive.
-  assert (tmp: forall p, pow_pos Qmult 0%Q p = 0%Q).
-    intros p1; elim p1; simpl; auto; clear p1.
-    intros p1 Hp1; rewrite Hp1; auto.
-    intros p1 Hp1; rewrite Hp1; auto.
-  repeat rewrite tmp; intros; red; simpl; auto.
-  intros H1.
-  assert (F1: (0 < BigN.to_Z dx)%Z).
-     generalize (BigN.spec_pos dx); auto with zarith.
-  simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  repeat rewrite Zpos_mult_morphism.
-  repeat rewrite Z2P_correct; auto.
-  2: apply Zpower_pos_pos; auto.
-  2: apply Zpower_pos_pos; auto.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
- rewrite F.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
-End Q0.
diff --git a/theories/Numbers/Rational/BigQ/QMake.v b/theories/Numbers/Rational/BigQ/QMake.v
new file mode 100644
index 00000000..494420bd
--- /dev/null
+++ b/theories/Numbers/Rational/BigQ/QMake.v
@@ -0,0 +1,1345 @@
+(************************************************************************)
+(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
+(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
+(*   \VV/  **************************************************************)
+(*    //   *      This file is distributed under the terms of the       *)
+(*         *       GNU Lesser General Public License Version 2.1        *)
+(************************************************************************)
+(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
+(************************************************************************)
+
+(*i $Id: QMake.v 11208 2008-07-04 16:57:46Z letouzey $ i*)
+
+Require Import BigNumPrelude ROmega.
+Require Import QArith Qcanon Qpower.
+Require Import NSig ZSig QSig.
+
+Module Type NType_ZType (N:NType)(Z:ZType).
+ Parameter Z_of_N : N.t -> Z.t.
+ Parameter spec_Z_of_N : forall n, Z.to_Z (Z_of_N n) = N.to_Z n.
+ Parameter Zabs_N : Z.t -> N.t.
+ Parameter spec_Zabs_N : forall z, N.to_Z (Zabs_N z) = Zabs (Z.to_Z z).
+End NType_ZType.
+
+Module Make (N:NType)(Z:ZType)(Import NZ:NType_ZType N Z) <: QType.
+
+ (** The notation of a rational number is either an integer x,
+     interpreted as itself or a pair (x,y) of an integer x and a natural
+     number y interpreted as x/y. The pairs (x,0) and (0,y) are all
+     interpreted as 0. *)
+
+ Inductive t_ := 
+  | Qz : Z.t -> t_
+  | Qq : Z.t -> N.t -> t_.
+
+ Definition t := t_.
+
+ (** Specification with respect to [QArith] *) 
+
+ Open Local Scope Q_scope.
+
+ Definition of_Z x: t := Qz (Z.of_Z x).
+
+ Definition of_Q (q:Q) : t := 
+  let (x,y) := q in 
+  match y with 
+    | 1%positive => Qz (Z.of_Z x)
+    | _ => Qq (Z.of_Z x) (N.of_N (Npos y))
+  end.
+
+ Definition to_Q (q: t) := 
+ match q with 
+   | Qz x => Z.to_Z x # 1
+   | Qq x y => if N.eq_bool y N.zero then 0
+               else Z.to_Z x # Z2P (N.to_Z y)
+ end.
+
+ Notation "[ x ]" := (to_Q x).
+
+ Theorem strong_spec_of_Q: forall q: Q, [of_Q q] = q.
+ Proof.
+ intros(x,y); destruct y; simpl; rewrite Z.spec_of_Z; auto.
+ generalize (N.spec_eq_bool (N.of_N (Npos y~1)) N.zero); 
+  case N.eq_bool; auto; rewrite N.spec_0.
+ rewrite N.spec_of_N; intros; discriminate.
+ rewrite N.spec_of_N; auto.
+ generalize (N.spec_eq_bool (N.of_N (Npos y~0)) N.zero); 
+  case N.eq_bool; auto; rewrite N.spec_0.
+ rewrite N.spec_of_N; intros; discriminate.
+ rewrite N.spec_of_N; auto.
+ Qed.
+
+ Theorem spec_of_Q: forall q: Q, [of_Q q] == q.
+ Proof.
+ intros; rewrite strong_spec_of_Q; red; auto.
+ Qed.
+
+ Definition eq x y := [x] == [y].
+
+ Definition zero: t := Qz Z.zero.
+ Definition one: t := Qz Z.one.
+ Definition minus_one: t := Qz Z.minus_one.
+
+ Lemma spec_0: [zero] == 0.
+ Proof.
+ simpl; rewrite Z.spec_0; reflexivity.
+ Qed.
+
+ Lemma spec_1: [one] == 1.
+ Proof.
+ simpl; rewrite Z.spec_1; reflexivity.
+ Qed.
+
+ Lemma spec_m1: [minus_one] == -(1).
+ Proof.
+ simpl; rewrite Z.spec_m1; reflexivity.
+ Qed.
+
+ Definition compare (x y: t) :=
+  match x, y with
+  | Qz zx, Qz zy => Z.compare zx zy
+  | Qz zx, Qq ny dy => 
+    if N.eq_bool dy N.zero then Z.compare zx Z.zero
+    else Z.compare (Z.mul zx (Z_of_N dy)) ny
+  | Qq nx dx, Qz zy => 
+    if N.eq_bool dx N.zero then Z.compare Z.zero zy 
+    else Z.compare nx (Z.mul zy (Z_of_N dx))
+  | Qq nx dx, Qq ny dy =>
+    match N.eq_bool dx N.zero, N.eq_bool dy N.zero with
+    | true, true => Eq
+    | true, false => Z.compare Z.zero ny
+    | false, true => Z.compare nx Z.zero
+    | false, false => Z.compare (Z.mul nx (Z_of_N dy)) 
+                                (Z.mul ny (Z_of_N dx))
+    end
+  end.
+
+ Lemma Zcompare_spec_alt : 
+  forall z z', Z.compare z z' = (Z.to_Z z ?= Z.to_Z z')%Z.
+ Proof.
+ intros; generalize (Z.spec_compare z z'); destruct Z.compare; auto.
+ intro H; rewrite H; symmetry; apply Zcompare_refl.
+ Qed.
+ 
+ Lemma Ncompare_spec_alt : 
+  forall n n', N.compare n n' = (N.to_Z n ?= N.to_Z n')%Z.
+ Proof.
+ intros; generalize (N.spec_compare n n'); destruct N.compare; auto.
+ intro H; rewrite H; symmetry; apply Zcompare_refl.
+ Qed.
+
+ Lemma N_to_Z2P : forall n, N.to_Z n <> 0%Z -> 
+  Zpos (Z2P (N.to_Z n)) = N.to_Z n.
+ Proof.
+ intros; apply Z2P_correct.
+ generalize (N.spec_pos n); romega.
+ Qed.
+
+ Hint Rewrite 
+  Zplus_0_r Zplus_0_l Zmult_0_r Zmult_0_l Zmult_1_r Zmult_1_l 
+  Z.spec_0 N.spec_0 Z.spec_1 N.spec_1 Z.spec_m1 Z.spec_opp
+  Zcompare_spec_alt Ncompare_spec_alt
+  Z.spec_add N.spec_add Z.spec_mul N.spec_mul 
+  Z.spec_gcd N.spec_gcd Zgcd_Zabs
+  spec_Z_of_N spec_Zabs_N
+ : nz.
+ Ltac nzsimpl := autorewrite with nz in *.
+
+ Ltac destr_neq_bool := repeat
+ (match goal with |- context [N.eq_bool ?x ?y] => 
+   generalize (N.spec_eq_bool x y); case N.eq_bool
+  end).
+ 
+ Ltac destr_zeq_bool := repeat
+ (match goal with |- context [Z.eq_bool ?x ?y] => 
+   generalize (Z.spec_eq_bool x y); case Z.eq_bool
+  end).
+
+ Ltac simpl_ndiv := rewrite N.spec_div by (nzsimpl; romega).
+ Tactic Notation "simpl_ndiv" "in" "*" := 
+   rewrite N.spec_div in * by (nzsimpl; romega).
+
+ Ltac simpl_zdiv := rewrite Z.spec_div by (nzsimpl; romega).
+ Tactic Notation "simpl_zdiv" "in" "*" := 
+   rewrite Z.spec_div in * by (nzsimpl; romega).
+
+ Ltac qsimpl := try red; unfold to_Q; simpl; intros; 
+  destr_neq_bool; destr_zeq_bool; simpl; nzsimpl; auto; intros.
+
+ Theorem spec_compare: forall q1 q2, (compare q1 q2) = ([q1] ?= [q2]).
+ Proof.
+ intros [z1 | x1 y1] [z2 | x2 y2]; 
+   unfold Qcompare, compare; qsimpl; rewrite ! N_to_Z2P; auto.
+ Qed.
+
+ Definition lt n m := compare n m = Lt.
+ Definition le n m := compare n m <> Gt.
+ Definition min n m := match compare n m with Gt => m | _ => n end.
+ Definition max n m := match compare n m with Lt => m | _ => n end.
+
+ Definition eq_bool n m := 
+  match compare n m with Eq => true | _ => false end.
+
+ Theorem spec_eq_bool: forall x y,
+  if eq_bool x y then [x] == [y] else ~([x] == [y]).
+ Proof.
+ intros.
+ unfold eq_bool.
+ rewrite spec_compare.
+ generalize (Qeq_alt [x] [y]).
+ destruct Qcompare.
+ intros H; rewrite H; auto.
+ intros H H'; rewrite H in H'; discriminate.
+ intros H H'; rewrite H in H'; discriminate.
+ Qed.
+
+ (** Normalisation function *)
+
+ Definition norm n d : t :=
+  let gcd := N.gcd (Zabs_N n) d in 
+  match N.compare N.one gcd with
+  | Lt => 
+    let n := Z.div n (Z_of_N gcd) in
+    let d := N.div d gcd in
+    match N.compare d N.one with
+    | Gt => Qq n d
+    | Eq => Qz n
+    | Lt => zero
+    end
+  | Eq => Qq n d
+  | Gt => zero (* gcd = 0 => both numbers are 0 *)
+  end.
+
+ Theorem spec_norm: forall n q, [norm n q] == [Qq n q].
+ Proof.
+ intros p q; unfold norm.
+ assert (Hp := N.spec_pos (Zabs_N p)).
+ assert (Hq := N.spec_pos q).
+ nzsimpl.
+ destr_zcompare.
+ qsimpl.
+
+ simpl_ndiv.
+ destr_zcompare.
+ qsimpl.
+ rewrite H1 in *; rewrite Zdiv_0_l in H0; discriminate.
+ rewrite N_to_Z2P; auto.
+ simpl_zdiv; nzsimpl.
+ rewrite Zgcd_div_swap0, H0; romega.
+
+ qsimpl.
+ assert (0 < N.to_Z q / Zgcd (Z.to_Z p) (N.to_Z q))%Z.
+  apply Zgcd_div_pos; romega.
+ romega.
+
+ qsimpl.
+ simpl_ndiv in *; nzsimpl; romega.
+ simpl_ndiv in *.
+ rewrite H1, Zdiv_0_l in H2; elim H2; auto.
+ rewrite 2 N_to_Z2P; auto.
+ simpl_ndiv; simpl_zdiv; nzsimpl.
+ apply Zgcd_div_swap0; romega.
+
+ qsimpl.
+ assert (H' : Zgcd (Z.to_Z p) (N.to_Z q) = 0%Z).
+  generalize (Zgcd_is_pos (Z.to_Z p) (N.to_Z q)); romega.
+ symmetry; apply (Zgcd_inv_0_l _ _ H'); auto.
+ Qed.
+
+ Theorem strong_spec_norm : forall p q, [norm p q] = Qred [Qq p q].
+ Proof.
+ intros.
+ replace (Qred [Qq p q]) with (Qred [norm p q]) by 
+  (apply Qred_complete; apply spec_norm).
+ symmetry; apply Qred_identity.
+ unfold norm.
+ assert (Hp := N.spec_pos (Zabs_N p)).
+ assert (Hq := N.spec_pos q).
+ nzsimpl.
+ destr_zcompare.
+ (* Eq *)
+ simpl.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ intros.
+ rewrite N_to_Z2P; auto.
+ (* Lt *)
+ simpl_ndiv.
+ destr_zcompare.
+ qsimpl; auto.
+ qsimpl.
+ qsimpl.
+ simpl_zdiv; nzsimpl.
+ rewrite N_to_Z2P; auto.
+ clear H1.
+ simpl_ndiv; nzsimpl.
+ rewrite Zgcd_1_rel_prime.
+ destruct (Z_lt_le_dec 0 (N.to_Z q)).
+ apply Zis_gcd_rel_prime; auto with zarith.
+ apply Zgcd_is_gcd.
+ replace (N.to_Z q) with 0%Z in * by romega.
+ rewrite Zdiv_0_l in H0; discriminate.
+ (* Gt *)
+ simpl; auto.
+ Qed.
+
+ (** Reduction function : producing irreducible fractions *) 
+
+ Definition red (x : t) : t := 
+  match x with 
+   | Qz z => x
+   | Qq n d => norm n d
+  end.
+
+ Definition Reduced x := [red x] = [x].
+
+ Theorem spec_red : forall x, [red x] == [x].
+ Proof.
+ intros [ z | n d ].
+ auto with qarith.
+ unfold red.
+ apply spec_norm.
+ Qed.
+
+ Theorem strong_spec_red : forall x, [red x] = Qred [x].
+ Proof.
+ intros [ z | n d ].
+ unfold red.
+ symmetry; apply Qred_identity; simpl; auto.
+ unfold red; apply strong_spec_norm.
+ Qed.
+   
+ Definition add (x y: t): t :=
+  match x with
+  | Qz zx =>
+    match y with
+    | Qz zy => Qz (Z.add zx zy)
+    | Qq ny dy => 
+      if N.eq_bool dy N.zero then x 
+      else Qq (Z.add (Z.mul zx (Z_of_N dy)) ny) dy
+    end
+  | Qq nx dx =>
+    if N.eq_bool dx N.zero then y 
+    else match y with
+    | Qz zy => Qq (Z.add nx (Z.mul zy (Z_of_N dx))) dx
+    | Qq ny dy =>
+      if N.eq_bool dy N.zero then x
+      else
+       let n := Z.add (Z.mul nx (Z_of_N dy)) (Z.mul ny (Z_of_N dx)) in
+       let d := N.mul dx dy in
+       Qq n d
+    end
+  end.
+
+ Theorem spec_add : forall x y, [add x y] == [x] + [y].
+ Proof.
+ intros [x | nx dx] [y | ny dy]; unfold Qplus; qsimpl.
+ intuition.
+ rewrite N_to_Z2P; auto.
+ intuition.
+ rewrite Pmult_1_r, N_to_Z2P; auto.
+ intuition.
+ rewrite Pmult_1_r, N_to_Z2P; auto.
+ destruct (Zmult_integral _ _ H); intuition.
+ rewrite Zpos_mult_morphism, 2 N_to_Z2P; auto.
+ rewrite (Z2P_correct (N.to_Z dx * N.to_Z dy)); auto.
+ apply Zmult_lt_0_compat.
+  generalize (N.spec_pos dx); romega.
+  generalize (N.spec_pos dy); romega.
+ Qed.
+
+ Definition add_norm (x y: t): t :=
+  match x with
+  | Qz zx =>
+    match y with
+    | Qz zy => Qz (Z.add zx zy)
+    | Qq ny dy =>  
+      if N.eq_bool dy N.zero then x 
+      else norm (Z.add (Z.mul zx (Z_of_N dy)) ny) dy
+    end
+  | Qq nx dx =>
+    if N.eq_bool dx N.zero then y 
+    else match y with
+    | Qz zy => norm (Z.add nx (Z.mul zy (Z_of_N dx))) dx
+    | Qq ny dy =>
+      if N.eq_bool dy N.zero then x
+      else
+       let n := Z.add (Z.mul nx (Z_of_N dy)) (Z.mul ny (Z_of_N dx)) in
+       let d := N.mul dx dy in
+       norm n d
+    end
+  end.
+
+ Theorem spec_add_norm : forall x y, [add_norm x y] == [x] + [y].
+ Proof.
+ intros x y; rewrite <- spec_add.
+ destruct x; destruct y; unfold add_norm, add; 
+ destr_neq_bool; auto using Qeq_refl, spec_norm.
+ Qed.
+
+ Theorem strong_spec_add_norm : forall x y : t, 
+   Reduced x -> Reduced y -> Reduced (add_norm x y).
+ Proof.
+ unfold Reduced; intros.
+ rewrite strong_spec_red.
+ rewrite <- (Qred_complete [add x y]); 
+  [ | rewrite spec_add, spec_add_norm; apply Qeq_refl ].
+ rewrite <- strong_spec_red.
+ destruct x as [zx|nx dx]; destruct y as [zy|ny dy].
+ simpl in *; auto.
+ simpl; intros.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ simpl; intros.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ simpl; intros.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ Qed.
+
+ Definition opp (x: t): t :=
+  match x with
+  | Qz zx => Qz (Z.opp zx)
+  | Qq nx dx => Qq (Z.opp nx) dx
+  end.
+
+ Theorem strong_spec_opp: forall q, [opp q] = -[q].
+ Proof.
+ intros [z | x y]; simpl.
+ rewrite Z.spec_opp; auto.
+ match goal with  |- context[N.eq_bool ?X ?Y] => 
+  generalize (N.spec_eq_bool X Y); case N.eq_bool
+ end; auto; rewrite N.spec_0.
+ rewrite Z.spec_opp; auto.
+ Qed.
+
+ Theorem spec_opp : forall q, [opp q] == -[q].
+ Proof.
+ intros; rewrite strong_spec_opp; red; auto.
+ Qed.
+
+ Theorem strong_spec_opp_norm : forall q, Reduced q -> Reduced (opp q).
+ Proof.
+ unfold Reduced; intros.
+ rewrite strong_spec_opp, <- H, !strong_spec_red, <- Qred_opp.
+ apply Qred_complete; apply spec_opp.
+ Qed.
+
+ Definition sub x y := add x (opp y).
+
+ Theorem spec_sub : forall x y, [sub x y] == [x] - [y].
+ Proof.
+ intros x y; unfold sub; rewrite spec_add; auto.
+ rewrite spec_opp; ring.
+ Qed.
+
+ Definition sub_norm x y := add_norm x (opp y).
+
+ Theorem spec_sub_norm : forall x y, [sub_norm x y] == [x] - [y].
+ Proof.
+ intros x y; unfold sub_norm; rewrite spec_add_norm; auto.
+ rewrite spec_opp; ring.
+ Qed.
+
+ Theorem strong_spec_sub_norm : forall x y, 
+  Reduced x -> Reduced y -> Reduced (sub_norm x y).
+ Proof.
+ intros.
+ unfold sub_norm.
+ apply strong_spec_add_norm; auto.
+ apply strong_spec_opp_norm; auto.
+ Qed.
+
+ Definition mul (x y: t): t :=
+  match x, y with
+  | Qz zx, Qz zy => Qz (Z.mul zx zy)
+  | Qz zx, Qq ny dy => Qq (Z.mul zx ny) dy
+  | Qq nx dx, Qz zy => Qq (Z.mul nx zy) dx
+  | Qq nx dx, Qq ny dy => Qq (Z.mul nx ny) (N.mul dx dy)
+  end.
+
+ Theorem spec_mul : forall x y, [mul x y] == [x] * [y].
+ Proof.
+ intros [x | nx dx] [y | ny dy]; unfold Qmult; simpl; qsimpl.
+ rewrite Pmult_1_r, N_to_Z2P; auto.
+ destruct (Zmult_integral _ _ H1); intuition.
+ rewrite H0 in H1; elim H1; auto.
+ rewrite H0 in H1; elim H1; auto.
+ rewrite H in H1; nzsimpl; elim H1; auto.
+ rewrite Zpos_mult_morphism, 2 N_to_Z2P; auto.
+ rewrite (Z2P_correct (N.to_Z dx * N.to_Z dy)); auto.
+ apply Zmult_lt_0_compat.
+  generalize (N.spec_pos dx); omega.
+  generalize (N.spec_pos dy); omega.
+ Qed.
+
+ Lemma norm_denum : forall n d, 
+  [if N.eq_bool d N.one then Qz n else Qq n d] == [Qq n d].
+ Proof.
+ intros; simpl; qsimpl.
+ rewrite H0 in H; discriminate.
+ rewrite N_to_Z2P, H0; auto with zarith.
+ Qed.
+
+ Definition irred n d :=        
+   let gcd := N.gcd (Zabs_N n) d in
+   match N.compare gcd N.one with 
+     | Gt => (Z.div n (Z_of_N gcd), N.div d gcd)
+     | _ => (n, d)
+   end.
+
+ Lemma spec_irred : forall n d, exists g, 
+  let (n',d') := irred n d in 
+  (Z.to_Z n' * g = Z.to_Z n)%Z /\ (N.to_Z d' * g = N.to_Z d)%Z.
+ Proof.
+ intros.
+ unfold irred; nzsimpl; simpl.
+ destr_zcompare.
+ exists 1%Z; nzsimpl; auto.
+ exists 0%Z; nzsimpl.
+ assert (Zgcd (Z.to_Z n) (N.to_Z d) = 0%Z).
+  generalize (Zgcd_is_pos (Z.to_Z n) (N.to_Z d)); romega.
+ clear H.
+ split.
+ symmetry; apply (Zgcd_inv_0_l _ _ H0).
+ symmetry; apply (Zgcd_inv_0_r _ _ H0).
+ exists (Zgcd (Z.to_Z n) (N.to_Z d)).
+ simpl.
+ split.
+ simpl_zdiv; nzsimpl.
+ destruct (Zgcd_is_gcd (Z.to_Z n) (N.to_Z d)).
+ rewrite Zmult_comm; symmetry; apply Zdivide_Zdiv_eq; auto with zarith.
+ simpl_ndiv; nzsimpl.
+ destruct (Zgcd_is_gcd (Z.to_Z n) (N.to_Z d)).
+ rewrite Zmult_comm; symmetry; apply Zdivide_Zdiv_eq; auto with zarith.
+ Qed.
+
+ Lemma spec_irred_zero : forall n d, 
+   (N.to_Z d = 0)%Z <-> (N.to_Z (snd (irred n d)) = 0)%Z.
+ Proof.
+ intros.
+ unfold irred.
+ split.
+ nzsimpl; intros.
+ destr_zcompare; auto.
+ simpl.
+ simpl_ndiv; nzsimpl.
+ rewrite H, Zdiv_0_l; auto.
+ nzsimpl; destr_zcompare; simpl; auto.
+ simpl_ndiv; nzsimpl.
+ intros.
+ generalize (N.spec_pos d); intros.
+ destruct (N.to_Z d); auto.
+ assert (0 < 0)%Z.
+  rewrite <- H0 at 2.
+  apply Zgcd_div_pos; auto with zarith.
+  compute; auto.
+ discriminate.
+ compute in H1; elim H1; auto.
+ Qed.
+
+ Lemma strong_spec_irred : forall n d, 
+  (N.to_Z d <> 0%Z) -> 
+  let (n',d') := irred n d in Zgcd (Z.to_Z n') (N.to_Z d') = 1%Z.
+ Proof.
+ unfold irred; intros.
+ nzsimpl.
+ destr_zcompare; simpl; auto.
+ elim H.
+ apply (Zgcd_inv_0_r (Z.to_Z n)).
+ generalize (Zgcd_is_pos (Z.to_Z n) (N.to_Z d)); romega.
+
+ simpl_ndiv; simpl_zdiv; nzsimpl.
+ rewrite Zgcd_1_rel_prime.
+ apply Zis_gcd_rel_prime.
+ generalize (N.spec_pos d); romega.
+ generalize (Zgcd_is_pos (Z.to_Z n) (N.to_Z d)); romega.
+ apply Zgcd_is_gcd; auto.
+ Qed.
+
+ Definition mul_norm_Qz_Qq z n d := 
+   if Z.eq_bool z Z.zero then zero 
+   else
+    let gcd := N.gcd (Zabs_N z) d in
+    match N.compare gcd N.one with
+      | Gt => 
+        let z := Z.div z (Z_of_N gcd) in
+        let d := N.div d gcd in
+        if N.eq_bool d N.one then Qz (Z.mul z n) else Qq (Z.mul z n) d
+      | _  => Qq (Z.mul z n) d
+    end.
+
+ Definition mul_norm (x y: t): t := 
+ match x, y with
+ | Qz zx, Qz zy => Qz (Z.mul zx zy)
+ | Qz zx, Qq ny dy => mul_norm_Qz_Qq zx ny dy
+ | Qq nx dx, Qz zy => mul_norm_Qz_Qq zy nx dx
+ | Qq nx dx, Qq ny dy => 
+    let (nx, dy) := irred nx dy in 
+    let (ny, dx) := irred ny dx in 
+    let d := N.mul dx dy in
+    if N.eq_bool d N.one then Qz (Z.mul ny nx) else Qq (Z.mul ny nx) d
+ end.
+
+ Lemma spec_mul_norm_Qz_Qq : forall z n d, 
+   [mul_norm_Qz_Qq z n d] == [Qq (Z.mul z n) d].
+ Proof.
+ intros z n d; unfold mul_norm_Qz_Qq; nzsimpl; rewrite Zcompare_gt.
+ destr_zeq_bool; intros Hz; nzsimpl.
+ qsimpl; rewrite Hz; auto.
+ assert (Hd := N.spec_pos d).
+ destruct Z_le_gt_dec.
+ qsimpl.
+ rewrite norm_denum.
+ qsimpl.
+ simpl_ndiv in *; nzsimpl.
+ rewrite (Zdiv_gcd_zero _ _ H0 H) in z0; discriminate.
+ simpl_ndiv in *; nzsimpl.
+ rewrite H, Zdiv_0_l in H0; elim H0; auto.
+ rewrite 2 N_to_Z2P; auto.
+ simpl_ndiv; simpl_zdiv; nzsimpl.
+ rewrite (Zmult_comm (Z.to_Z z)), <- 2 Zmult_assoc.
+ rewrite <- Zgcd_div_swap0; auto with zarith; ring.
+ Qed.
+
+ Lemma strong_spec_mul_norm_Qz_Qq : forall z n d, 
+   Reduced (Qq n d) -> Reduced (mul_norm_Qz_Qq z n d).
+ Proof.
+ unfold Reduced; intros z n d.
+ rewrite 2 strong_spec_red, 2 Qred_iff.
+ simpl; nzsimpl.
+ destr_neq_bool; intros Hd H; simpl in *; nzsimpl.
+ 
+ unfold mul_norm_Qz_Qq; nzsimpl; rewrite Zcompare_gt.
+ destr_zeq_bool; intros Hz; simpl; nzsimpl; simpl; auto.
+ destruct Z_le_gt_dec.
+ simpl; nzsimpl.
+ destr_neq_bool; simpl; nzsimpl; auto.
+ intros H'; elim H'; auto.
+ destr_neq_bool; simpl; nzsimpl.
+ simpl_ndiv; nzsimpl; rewrite Hd, Zdiv_0_l; intros; discriminate.
+ intros _.
+ destr_neq_bool; simpl; nzsimpl; auto.
+ simpl_ndiv; nzsimpl; rewrite Hd, Zdiv_0_l; intro H'; elim H'; auto.
+
+ rewrite N_to_Z2P in H; auto.
+ unfold mul_norm_Qz_Qq; nzsimpl; rewrite Zcompare_gt.
+ destr_zeq_bool; intros Hz; simpl; nzsimpl; simpl; auto.
+ destruct Z_le_gt_dec as [H'|H'].
+ simpl; nzsimpl.
+ destr_neq_bool; simpl; nzsimpl; auto.
+ intros.
+ rewrite N_to_Z2P; auto.
+ apply Zgcd_mult_rel_prime; auto.
+  generalize (Zgcd_inv_0_l (Z.to_Z z) (N.to_Z d))
+    (Zgcd_is_pos (Z.to_Z z) (N.to_Z d)); romega.
+ destr_neq_bool; simpl; nzsimpl; auto.
+ simpl_ndiv; simpl_zdiv; nzsimpl.
+ intros.
+ destr_neq_bool; simpl; nzsimpl; auto.
+ simpl_ndiv in *; nzsimpl.
+ intros.
+ rewrite Z2P_correct.
+ apply Zgcd_mult_rel_prime.
+ rewrite Zgcd_1_rel_prime.
+ apply Zis_gcd_rel_prime.
+ generalize (N.spec_pos d); romega.
+ generalize (Zgcd_is_pos (Z.to_Z z) (N.to_Z d)); romega.
+ apply Zgcd_is_gcd.
+ destruct (Zgcd_is_gcd (Z.to_Z z) (N.to_Z d)) as [ (z0,Hz0) (d0,Hd0) Hzd].
+ replace (N.to_Z d / Zgcd (Z.to_Z z) (N.to_Z d))%Z with d0.
+ rewrite Zgcd_1_rel_prime in *.
+ apply bezout_rel_prime.
+ destruct (rel_prime_bezout _ _ H) as [u v Huv].
+ apply Bezout_intro with u (v*(Zgcd (Z.to_Z z) (N.to_Z d)))%Z.
+ rewrite <- Huv; rewrite Hd0 at 2; ring.
+ rewrite Hd0 at 1.
+ symmetry; apply Z_div_mult_full; auto with zarith.
+ apply Zgcd_div_pos.
+ generalize (N.spec_pos d); romega.
+ generalize (Zgcd_is_pos (Z.to_Z z) (N.to_Z d)); romega.
+ Qed.
+
+ Theorem spec_mul_norm : forall x y, [mul_norm x y] == [x] * [y].
+ Proof.
+ intros x y; rewrite <- spec_mul; auto.
+ unfold mul_norm, mul; destruct x; destruct y.
+ apply Qeq_refl.
+ apply spec_mul_norm_Qz_Qq.
+ rewrite spec_mul_norm_Qz_Qq; qsimpl; ring.
+
+ rename t0 into nx, t3 into dy, t2 into ny, t1 into dx.
+ destruct (spec_irred nx dy) as (g & Hg).
+ destruct (spec_irred ny dx) as (g' & Hg').
+ assert (Hz := spec_irred_zero nx dy).
+ assert (Hz':= spec_irred_zero ny dx).
+ destruct irred as (n1,d1); destruct irred as (n2,d2). 
+ simpl snd in *; destruct Hg as [Hg1 Hg2]; destruct Hg' as [Hg1' Hg2'].
+ rewrite norm_denum.
+ qsimpl.
+
+ elim H; destruct (Zmult_integral _ _ H0) as [Eq|Eq].
+ rewrite <- Hz' in Eq; rewrite Eq; simpl; auto.
+ rewrite <- Hz in Eq; rewrite Eq; nzsimpl; auto.
+
+ elim H0; destruct (Zmult_integral _ _ H) as [Eq|Eq].
+ rewrite Hz' in Eq; rewrite Eq; simpl; auto.
+ rewrite Hz in Eq; rewrite Eq; nzsimpl; auto.
+
+ rewrite 2 Z2P_correct.
+ rewrite <- Hg1, <- Hg2, <- Hg1', <- Hg2'; ring.
+
+ assert (0 <= N.to_Z d2 * N.to_Z d1)%Z 
+  by (apply Zmult_le_0_compat; apply N.spec_pos).
+ romega.
+ assert (0 <= N.to_Z dx * N.to_Z dy)%Z 
+  by (apply Zmult_le_0_compat; apply N.spec_pos).
+ romega.
+ Qed.
+
+ Theorem strong_spec_mul_norm : forall x y,
+  Reduced x -> Reduced y -> Reduced (mul_norm x y).
+ Proof.
+ unfold Reduced; intros.
+ rewrite strong_spec_red, Qred_iff.
+ destruct x as [zx|nx dx]; destruct y as [zy|ny dy].
+ simpl in *; auto.
+ simpl.
+ rewrite <- Qred_iff, <- strong_spec_red, strong_spec_mul_norm_Qz_Qq; auto.
+ simpl.
+ rewrite <- Qred_iff, <- strong_spec_red, strong_spec_mul_norm_Qz_Qq; auto.
+ simpl.
+ destruct (spec_irred nx dy) as [g Hg].
+ destruct (spec_irred ny dx) as [g' Hg'].
+ assert (Hz := spec_irred_zero nx dy).
+ assert (Hz':= spec_irred_zero ny dx).
+ assert (Hgc := strong_spec_irred nx dy).
+ assert (Hgc' := strong_spec_irred ny dx).
+ destruct irred as (n1,d1); destruct irred as (n2,d2). 
+ simpl snd in *; destruct Hg as [Hg1 Hg2]; destruct Hg' as [Hg1' Hg2'].
+ destr_neq_bool; simpl; nzsimpl; intros.
+ apply Zis_gcd_gcd; auto with zarith; apply Zis_gcd_1.
+ destr_neq_bool; simpl; nzsimpl; intros.
+ auto.
+
+ revert H H0.
+ rewrite 2 strong_spec_red, 2 Qred_iff; simpl.
+ destr_neq_bool; simpl; nzsimpl; intros.
+ rewrite Hz in H; rewrite H in H2; nzsimpl; elim H2; auto.
+ rewrite Hz' in H0; rewrite H0 in H2; nzsimpl; elim H2; auto.
+ rewrite Hz in H; rewrite H in H2; nzsimpl; elim H2; auto.
+
+ rewrite N_to_Z2P in *; auto.
+ rewrite Z2P_correct.
+
+ apply Zgcd_mult_rel_prime; rewrite Zgcd_sym; 
+  apply Zgcd_mult_rel_prime; rewrite Zgcd_sym; auto.
+ 
+ rewrite Zgcd_1_rel_prime in *.
+ apply bezout_rel_prime.
+ destruct (rel_prime_bezout _ _ H4) as [u v Huv].
+ apply Bezout_intro with (u*g')%Z (v*g)%Z.
+ rewrite <- Huv, <- Hg1', <- Hg2. ring.
+
+ rewrite Zgcd_1_rel_prime in *.
+ apply bezout_rel_prime.
+ destruct (rel_prime_bezout _ _ H3) as [u v Huv].
+ apply Bezout_intro with (u*g)%Z (v*g')%Z.
+ rewrite <- Huv, <- Hg2', <- Hg1. ring.
+
+ assert (0 <= N.to_Z d2 * N.to_Z d1)%Z.
+  apply Zmult_le_0_compat; apply N.spec_pos.
+ romega.
+ Qed.
+
+ Definition inv (x: t): t := 
+ match x with
+ | Qz z => 
+   match Z.compare Z.zero z with 
+     | Eq => zero
+     | Lt => Qq Z.one (Zabs_N z)
+     | Gt => Qq Z.minus_one (Zabs_N z)
+   end
+ | Qq n d => 
+   match Z.compare Z.zero n with
+     | Eq => zero
+     | Lt => Qq (Z_of_N d) (Zabs_N n)
+     | Gt => Qq (Z.opp (Z_of_N d)) (Zabs_N n)
+   end
+ end.
+
+ Theorem spec_inv : forall x, [inv x] == /[x].
+ Proof.
+ destruct x as [ z | n d ].
+ (* Qz z *)
+ simpl.
+ rewrite Zcompare_spec_alt; destr_zcompare.
+ (* 0 = z *)
+ rewrite <- H.
+ simpl; nzsimpl; compute; auto.
+ (* 0 < z *)
+ simpl.
+ destr_neq_bool; nzsimpl; [ intros; rewrite Zabs_eq in *; romega | intros _ ].
+ set (z':=Z.to_Z z) in *; clearbody z'.
+ red; simpl.
+ rewrite Zabs_eq by romega.
+ rewrite Z2P_correct by auto.
+ unfold Qinv; simpl; destruct z'; simpl; auto; discriminate.
+ (* 0 > z *)
+ simpl.
+ destr_neq_bool; nzsimpl; [ intros; rewrite Zabs_non_eq in *; romega | intros _ ].
+ set (z':=Z.to_Z z) in *; clearbody z'.
+ red; simpl.
+ rewrite Zabs_non_eq by romega.
+ rewrite Z2P_correct by romega.
+ unfold Qinv; simpl; destruct z'; simpl; auto; discriminate.
+ (* Qq n d *)
+ simpl.
+ rewrite Zcompare_spec_alt; destr_zcompare.
+ (* 0 = n *)
+ rewrite <- H.
+ simpl; nzsimpl.
+ destr_neq_bool; intros; compute; auto.
+ (* 0 < n *)
+ simpl.
+ destr_neq_bool; nzsimpl; intros.
+ intros; rewrite Zabs_eq in *; romega.
+ intros; rewrite Zabs_eq in *; romega.
+ clear H1.
+ rewrite H0.
+ compute; auto.
+ clear H1.
+ set (n':=Z.to_Z n) in *; clearbody n'.
+ rewrite Zabs_eq by romega.
+ red; simpl.
+ rewrite Z2P_correct by auto.
+ unfold Qinv; simpl; destruct n'; simpl; auto; try discriminate.
+ rewrite Zpos_mult_morphism, N_to_Z2P; auto.
+ (* 0 > n *)
+ simpl.
+ destr_neq_bool; nzsimpl; intros.
+ intros; rewrite Zabs_non_eq in *; romega.
+ intros; rewrite Zabs_non_eq in *; romega.
+ clear H1.
+ red; nzsimpl; rewrite H0; compute; auto.
+ clear H1.
+ set (n':=Z.to_Z n) in *; clearbody n'.
+ red; simpl; nzsimpl.
+ rewrite Zabs_non_eq by romega.
+ rewrite Z2P_correct by romega.
+ unfold Qinv; simpl; destruct n'; simpl; auto; try discriminate.
+ assert (T : forall x, Zneg x = Zopp (Zpos x)) by auto.
+ rewrite T, Zpos_mult_morphism, N_to_Z2P; auto; ring.
+ Qed.
+
+ Definition inv_norm (x: t): t := 
+   match x with
+     | Qz z => 
+       match Z.compare Z.zero z with 
+         | Eq => zero
+         | Lt => Qq Z.one (Zabs_N z)
+         | Gt => Qq Z.minus_one (Zabs_N z)
+       end
+     | Qq n d => 
+       if N.eq_bool d N.zero then zero else 
+       match Z.compare Z.zero n with 
+         | Eq => zero
+         | Lt => 
+           match Z.compare n Z.one with 
+             | Gt => Qq (Z_of_N d) (Zabs_N n)
+             | _ => Qz (Z_of_N d)
+           end
+         | Gt => 
+           match Z.compare n Z.minus_one with 
+             | Lt => Qq (Z.opp (Z_of_N d)) (Zabs_N n)
+             | _ => Qz (Z.opp (Z_of_N d))
+           end
+       end
+   end.
+
+ Theorem spec_inv_norm : forall x, [inv_norm x] == /[x].
+ Proof.
+ intros.
+ rewrite <- spec_inv.
+ destruct x as [ z | n d ].
+ (* Qz z *)
+ simpl.
+ rewrite Zcompare_spec_alt; destr_zcompare; auto with qarith.
+ (* Qq n d *)
+ simpl; nzsimpl; destr_neq_bool.
+ destr_zcompare; simpl; auto with qarith.
+ destr_neq_bool; nzsimpl; auto with qarith.
+ intros _ Hd; rewrite Hd; auto with qarith.
+ destr_neq_bool; nzsimpl; auto with qarith.
+ intros _ Hd; rewrite Hd; auto with qarith.
+ (* 0 < n *)
+ destr_zcompare; auto with qarith.
+ destr_zcompare; nzsimpl; simpl; auto with qarith; intros.
+ destr_neq_bool; nzsimpl; [ intros; rewrite Zabs_eq in *; romega | intros _ ].
+ rewrite H0; auto with qarith.
+ romega.
+ (* 0 > n *)
+ destr_zcompare; nzsimpl; simpl; auto with qarith.
+ destr_neq_bool; nzsimpl; [ intros; rewrite Zabs_non_eq in *; romega | intros _ ].
+ rewrite H0; auto with qarith.
+ romega.
+ Qed.
+
+ Theorem strong_spec_inv_norm : forall x, Reduced x -> Reduced (inv_norm x).
+ Proof.
+ unfold Reduced. 
+ intros.
+ destruct x as [ z | n d ].
+ (* Qz *)
+ simpl; nzsimpl.
+ rewrite strong_spec_red, Qred_iff.
+ destr_zcompare; simpl; nzsimpl; auto.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ (* Qq n d *)
+ rewrite strong_spec_red, Qred_iff in H; revert H.
+ simpl; nzsimpl.
+ destr_neq_bool; nzsimpl; auto with qarith.
+ destr_zcompare; simpl; nzsimpl; auto; intros.
+ (* 0 < n *)
+ destr_zcompare; simpl; nzsimpl; auto.
+ destr_neq_bool; nzsimpl; simpl; auto.
+ rewrite Zabs_eq; romega.
+ intros _.
+ rewrite strong_spec_norm; simpl; nzsimpl.
+ destr_neq_bool; nzsimpl.
+ rewrite Zabs_eq; romega.
+ intros _.
+ rewrite Qred_iff.
+ simpl.
+ rewrite Zabs_eq; auto with zarith.
+ rewrite N_to_Z2P in *; auto.
+ rewrite Z2P_correct; auto with zarith.
+ rewrite Zgcd_sym; auto.
+ (* 0 > n *)
+ destr_neq_bool; nzsimpl; simpl; auto; intros.
+ destr_zcompare; simpl; nzsimpl; auto.
+ destr_neq_bool; nzsimpl.
+ rewrite Zabs_non_eq; romega.
+ intros _.
+ rewrite strong_spec_norm; simpl; nzsimpl.
+ destr_neq_bool; nzsimpl.
+ rewrite Zabs_non_eq; romega.
+ intros _.
+ rewrite Qred_iff.
+ simpl.
+ rewrite N_to_Z2P in *; auto.
+ rewrite Z2P_correct; auto with zarith.
+ intros.
+ rewrite Zgcd_sym, Zgcd_Zabs, Zgcd_sym.
+ apply Zis_gcd_gcd; auto with zarith.
+ apply Zis_gcd_minus.
+ rewrite Zopp_involutive, <- H1; apply Zgcd_is_gcd.
+ rewrite Zabs_non_eq; romega.
+ Qed.
+
+ Definition div x y := mul x (inv y).
+
+ Theorem spec_div x y: [div x y] == [x] / [y].
+ Proof.
+ intros x y; unfold div; rewrite spec_mul; auto.
+ unfold Qdiv; apply Qmult_comp.
+ apply Qeq_refl.
+ apply spec_inv; auto.
+ Qed.
+
+ Definition div_norm x y := mul_norm x (inv_norm y).
+
+ Theorem spec_div_norm x y: [div_norm x y] == [x] / [y].
+ Proof.
+ intros x y; unfold div_norm; rewrite spec_mul_norm; auto.
+ unfold Qdiv; apply Qmult_comp.
+ apply Qeq_refl.
+ apply spec_inv_norm; auto.
+ Qed.
+ 
+ Theorem strong_spec_div_norm : forall x y, 
+   Reduced x -> Reduced y -> Reduced (div_norm x y).
+ Proof.
+ intros; unfold div_norm.
+ apply strong_spec_mul_norm; auto.
+ apply strong_spec_inv_norm; auto.
+ Qed.
+
+ Definition square (x: t): t :=
+  match x with
+  | Qz zx => Qz (Z.square zx)
+  | Qq nx dx => Qq (Z.square nx) (N.square dx)
+  end.
+
+ Theorem spec_square : forall x, [square x] == [x] ^ 2.
+ Proof.
+ destruct x as [ z | n d ].
+ simpl; rewrite Z.spec_square; red; auto.
+ simpl.
+ destr_neq_bool; nzsimpl; intros.
+ apply Qeq_refl.
+ rewrite N.spec_square in *; nzsimpl.
+ contradict H; elim (Zmult_integral _ _ H0); auto.
+ rewrite N.spec_square in *; nzsimpl.
+ rewrite H in H0; simpl in H0; elim H0; auto.
+ assert (0 < N.to_Z d)%Z by (generalize (N.spec_pos d); romega).
+ clear H H0.
+ rewrite Z.spec_square, N.spec_square.  
+ red; simpl.
+ rewrite Zpos_mult_morphism; rewrite !Z2P_correct; auto.
+ apply Zmult_lt_0_compat; auto.
+ Qed.
+
+ Definition power_pos (x : t) p : t :=
+  match x with
+  | Qz zx => Qz (Z.power_pos zx p)
+  | Qq nx dx => Qq (Z.power_pos nx p) (N.power_pos dx p)
+  end.
+ 
+ Theorem spec_power_pos : forall x p, [power_pos x p] == [x] ^ Zpos p.
+ Proof.
+ intros [ z | n d ] p; unfold power_pos.
+ (* Qz *)
+ simpl.
+ rewrite Z.spec_power_pos.
+ rewrite Qpower_decomp.
+ red; simpl; f_equal.
+ rewrite Zpower_pos_1_l; auto.
+ (* Qq *)
+ simpl.
+ rewrite Z.spec_power_pos.
+ destr_neq_bool; nzsimpl; intros.
+ apply Qeq_sym; apply Qpower_positive_0.
+ rewrite N.spec_power_pos in *.
+ assert (0 < N.to_Z d ^ ' p)%Z.
+  apply Zpower_gt_0; auto with zarith.
+  generalize (N.spec_pos d); romega.
+ romega.
+ rewrite N.spec_power_pos, H in *.
+ rewrite Zpower_0_l in H0; [ elim H0; auto | discriminate ].
+ rewrite Qpower_decomp.
+ red; simpl; do 3 f_equal.
+ rewrite Z2P_correct by (generalize (N.spec_pos d); romega).
+ rewrite N.spec_power_pos. auto.
+ Qed.
+
+ Theorem strong_spec_power_pos : forall x p, 
+  Reduced x -> Reduced (power_pos x p).
+ Proof.
+ destruct x as [z | n d]; simpl; intros.
+ red; simpl; auto.
+ red; simpl; intros.
+ rewrite strong_spec_norm; simpl.
+ destr_neq_bool; nzsimpl; intros.
+ simpl; auto.
+ rewrite Qred_iff.
+ revert H.
+ unfold Reduced; rewrite strong_spec_red, Qred_iff; simpl.
+ destr_neq_bool; nzsimpl; simpl; intros.
+ rewrite N.spec_power_pos in H0.
+ elim H0; rewrite H; rewrite Zpower_0_l; auto; discriminate.
+ rewrite N_to_Z2P in *; auto.
+ rewrite N.spec_power_pos, Z.spec_power_pos; auto.
+ rewrite Zgcd_1_rel_prime in *.
+ apply rel_prime_Zpower; auto with zarith.
+ Qed.
+
+ Definition power (x : t) (z : Z) : t := 
+   match z with 
+     | Z0 => one
+     | Zpos p => power_pos x p
+     | Zneg p => inv (power_pos x p)
+   end.
+
+ Theorem spec_power : forall x z, [power x z] == [x]^z.
+ Proof.
+ destruct z.
+ simpl; nzsimpl; red; auto.
+ apply spec_power_pos.
+ simpl.
+ rewrite spec_inv, spec_power_pos; apply Qeq_refl.
+ Qed.
+
+ Definition power_norm (x : t) (z : Z) : t := 
+   match z with 
+     | Z0 => one
+     | Zpos p => power_pos x p
+     | Zneg p => inv_norm (power_pos x p)
+   end.
+
+ Theorem spec_power_norm : forall x z, [power_norm x z] == [x]^z.
+ Proof.
+ destruct z.
+ simpl; nzsimpl; red; auto.
+ apply spec_power_pos.
+ simpl.
+ rewrite spec_inv_norm, spec_power_pos; apply Qeq_refl.
+ Qed.
+
+ Theorem strong_spec_power_norm : forall x z, 
+   Reduced x -> Reduced (power_norm x z).
+ Proof.
+ destruct z; simpl.
+ intros _; unfold Reduced; rewrite strong_spec_red.
+ unfold one.
+ simpl to_Q; nzsimpl; auto.
+ intros; apply strong_spec_power_pos; auto.
+ intros; apply strong_spec_inv_norm; apply strong_spec_power_pos; auto.
+ Qed.
+
+
+ (** Interaction with [Qcanon.Qc] *)
+ 
+ Open Scope Qc_scope.
+
+ Definition of_Qc q := of_Q (this q).
+
+ Definition to_Qc q := !! [q].
+
+ Notation "[[ x ]]" := (to_Qc x).
+
+ Theorem strong_spec_of_Qc : forall q, [of_Qc q] = q.
+ Proof.
+ intros (q,Hq); intros.
+ unfold of_Qc; rewrite strong_spec_of_Q; auto.
+ Qed.
+
+ Lemma strong_spec_of_Qc_bis : forall q, Reduced (of_Qc q).
+ Proof.
+ intros; red; rewrite strong_spec_red, strong_spec_of_Qc.
+ destruct q; simpl; auto.
+ Qed.
+
+ Theorem spec_of_Qc: forall q, [[of_Qc q]] = q.
+ Proof.
+ intros; apply Qc_decomp; simpl; intros.
+ rewrite strong_spec_of_Qc; auto.
+ Qed.
+
+ Theorem spec_oppc: forall q, [[opp q]] = -[[q]].
+ Proof.
+ intros q; unfold Qcopp, to_Qc, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ rewrite spec_opp, <- Qred_opp, Qred_correct.
+ apply Qeq_refl.
+ Qed.
+
+ Theorem spec_oppc_bis : forall q : Qc, [opp (of_Qc q)] = - q.
+ Proof.
+ intros.
+ rewrite <- strong_spec_opp_norm by apply strong_spec_of_Qc_bis.
+ rewrite strong_spec_red.
+ symmetry; apply (Qred_complete (-q)%Q).
+ rewrite spec_opp, strong_spec_of_Qc; auto with qarith.
+ Qed.
+
+ Theorem spec_comparec: forall q1 q2,
+  compare q1 q2 = ([[q1]] ?= [[q2]]).
+ Proof.
+ unfold Qccompare, to_Qc.
+ intros q1 q2; rewrite spec_compare; simpl; auto.
+ apply Qcompare_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_addc x y:
+  [[add x y]] = [[x]] + [[y]].
+ Proof.
+ intros x y; unfold to_Qc.
+ apply trans_equal with (!! ([x] + [y])).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_add; auto.
+ unfold Qcplus, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_add_normc x y:
+  [[add_norm x y]] = [[x]] + [[y]].
+ Proof.
+ intros x y; unfold to_Qc.
+ apply trans_equal with (!! ([x] + [y])).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_add_norm; auto.
+ unfold Qcplus, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_add_normc_bis : forall x y : Qc, 
+   [add_norm (of_Qc x) (of_Qc y)] = x+y.
+ Proof.
+ intros.
+ rewrite <- strong_spec_add_norm by apply strong_spec_of_Qc_bis.
+ rewrite strong_spec_red.
+ symmetry; apply (Qred_complete (x+y)%Q).
+ rewrite spec_add_norm, ! strong_spec_of_Qc; auto with qarith.
+ Qed.
+
+ Theorem spec_subc x y:  [[sub x y]] = [[x]] - [[y]].
+ Proof.
+ intros x y; unfold sub; rewrite spec_addc; auto.
+ rewrite spec_oppc; ring.
+ Qed.
+
+ Theorem spec_sub_normc x y:
+   [[sub_norm x y]] = [[x]] - [[y]].
+ Proof.
+ intros x y; unfold sub_norm; rewrite spec_add_normc; auto.
+ rewrite spec_oppc; ring.
+ Qed.
+
+ Theorem spec_sub_normc_bis : forall x y : Qc, 
+   [sub_norm (of_Qc x) (of_Qc y)] = x-y.
+ Proof.
+ intros.
+ rewrite <- strong_spec_sub_norm by apply strong_spec_of_Qc_bis.
+ rewrite strong_spec_red.
+ symmetry; apply (Qred_complete (x+(-y)%Qc)%Q).
+ rewrite spec_sub_norm, ! strong_spec_of_Qc.
+ unfold Qcopp, Q2Qc; rewrite Qred_correct; auto with qarith.
+ Qed.
+
+ Theorem spec_mulc x y:
+  [[mul x y]] = [[x]] * [[y]].
+ Proof.
+ intros x y; unfold to_Qc.
+ apply trans_equal with (!! ([x] * [y])).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_mul; auto.
+ unfold Qcmult, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_mul_normc x y:
+   [[mul_norm x y]] = [[x]] * [[y]].
+ Proof.
+ intros x y; unfold to_Qc.
+ apply trans_equal with (!! ([x] * [y])).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_mul_norm; auto.
+ unfold Qcmult, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_mul_normc_bis : forall x y : Qc, 
+   [mul_norm (of_Qc x) (of_Qc y)] = x*y.
+ Proof.
+ intros.
+ rewrite <- strong_spec_mul_norm by apply strong_spec_of_Qc_bis.
+ rewrite strong_spec_red.
+ symmetry; apply (Qred_complete (x*y)%Q).
+ rewrite spec_mul_norm, ! strong_spec_of_Qc; auto with qarith.
+ Qed.
+
+ Theorem spec_invc x:
+   [[inv x]] =  /[[x]].
+ Proof.
+ intros x; unfold to_Qc.
+ apply trans_equal with (!! (/[x])).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_inv; auto.
+ unfold Qcinv, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_inv_normc x:
+   [[inv_norm x]] =  /[[x]].
+ Proof.
+ intros x; unfold to_Qc.
+ apply trans_equal with (!! (/[x])).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_inv_norm; auto.
+ unfold Qcinv, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_inv_normc_bis : forall x : Qc, 
+   [inv_norm (of_Qc x)] = /x.
+ Proof.
+ intros.
+ rewrite <- strong_spec_inv_norm by apply strong_spec_of_Qc_bis.
+ rewrite strong_spec_red.
+ symmetry; apply (Qred_complete (/x)%Q).
+ rewrite spec_inv_norm, ! strong_spec_of_Qc; auto with qarith.
+ Qed.
+
+ Theorem spec_divc x y: [[div x y]] = [[x]] / [[y]].
+ Proof.
+ intros x y; unfold div; rewrite spec_mulc; auto.
+ unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
+ apply spec_invc; auto. 
+ Qed.
+
+ Theorem spec_div_normc x y: [[div_norm x y]] = [[x]] / [[y]].
+ Proof.
+ intros x y; unfold div_norm; rewrite spec_mul_normc; auto.
+ unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
+ apply spec_inv_normc; auto.
+ Qed.
+
+ Theorem spec_div_normc_bis : forall x y : Qc, 
+   [div_norm (of_Qc x) (of_Qc y)] = x/y.
+ Proof.
+ intros.
+ rewrite <- strong_spec_div_norm by apply strong_spec_of_Qc_bis.
+ rewrite strong_spec_red.
+ symmetry; apply (Qred_complete (x*(/y)%Qc)%Q).
+ rewrite spec_div_norm, ! strong_spec_of_Qc.
+ unfold Qcinv, Q2Qc; rewrite Qred_correct; auto with qarith.
+ Qed.
+
+ Theorem spec_squarec x: [[square x]] =  [[x]]^2.
+ Proof.
+ intros x; unfold to_Qc.
+ apply trans_equal with (!! ([x]^2)).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_square; auto.
+ simpl Qcpower.
+ replace (!! [x] * 1) with (!![x]); try ring.
+ simpl.
+ unfold Qcmult, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
+ Qed.
+
+ Theorem spec_power_posc x p:
+   [[power_pos x p]] = [[x]] ^ nat_of_P p.
+ Proof.
+ intros x p; unfold to_Qc.
+ apply trans_equal with (!! ([x]^Zpos p)).
+ unfold Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete; apply spec_power_pos; auto.
+ induction p using Pind.
+ simpl; ring.
+ rewrite nat_of_P_succ_morphism; simpl Qcpower.
+ rewrite <- IHp; clear IHp.
+ unfold Qcmult, Q2Qc.
+ apply Qc_decomp; intros _ _; unfold this.
+ apply Qred_complete.
+ setoid_replace ([x] ^ ' Psucc p)%Q with ([x] * [x] ^ ' p)%Q.
+ apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
+ simpl.
+ rewrite Pplus_one_succ_l.
+ rewrite Qpower_plus_positive; simpl; apply Qeq_refl.
+ Qed.
+
+End Make.
+
diff --git a/theories/Numbers/Rational/BigQ/QMake_base.v b/theories/Numbers/Rational/BigQ/QMake_base.v
deleted file mode 100644
index 547e74b7..00000000
--- a/theories/Numbers/Rational/BigQ/QMake_base.v
+++ /dev/null
@@ -1,34 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
-(************************************************************************)
-
-(* $Id: QMake_base.v 10964 2008-05-22 11:08:13Z letouzey $ *)
-
-(** * An implementation of rational numbers based on big integers *)
-
-Require Export BigN.
-Require Export BigZ.
-
-(* Basic type for Q: a Z or a pair of a Z and an N *)
-
-Inductive q_type := 
- | Qz : BigZ.t -> q_type
- | Qq : BigZ.t -> BigN.t -> q_type.
-
-Definition print_type x := 
- match x with
- | Qz _ => Z
- | _ => (Z*Z)%type
- end.
-
-Definition print x :=
- match x return print_type x with
- | Qz zx => BigZ.to_Z zx
- | Qq nx dx => (BigZ.to_Z nx, BigN.to_Z dx)
- end.
diff --git a/theories/Numbers/Rational/BigQ/QbiMake.v b/theories/Numbers/Rational/BigQ/QbiMake.v
deleted file mode 100644
index 699f383e..00000000
--- a/theories/Numbers/Rational/BigQ/QbiMake.v
+++ /dev/null
@@ -1,1066 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
-(************************************************************************)
-
-(*i $Id: QbiMake.v 11027 2008-06-01 13:28:59Z letouzey $ i*)
-
-Require Import Bool.
-Require Import ZArith.
-Require Import Znumtheory.
-Require Import BigNumPrelude.
-Require Import Arith.
-Require Export BigN.
-Require Export BigZ.
-Require Import QArith.
-Require Import Qcanon.
-Require Import Qpower.
-Require Import QMake_base.	
-
-Module Qbi.
-
- Import BinInt Zorder.
- Open Local Scope Q_scope.
- Open Local Scope Qc_scope.
-
- (** The notation of a rational number is either an integer x,
-     interpreted as itself or a pair (x,y) of an integer x and a naturel
-     number y interpreted as x/y. The pairs (x,0) and (0,y) are all
-     interpreted as 0. *)
-
- Definition t := q_type.
-
- Definition zero: t := Qz BigZ.zero.
- Definition one: t  := Qz BigZ.one.
- Definition minus_one: t := Qz BigZ.minus_one.
-
- Definition of_Z x: t := Qz (BigZ.of_Z x).
-
-
- Definition of_Q q: t := 
- match q with x # y =>
-  Qq (BigZ.of_Z x) (BigN.of_N (Npos y))
- end.
-
- Definition of_Qc q := of_Q (this q).
-
- Definition to_Q (q: t) := 
- match q with 
-  Qz x => BigZ.to_Z x # 1
- |Qq x y => if BigN.eq_bool y BigN.zero then 0%Q
-            else BigZ.to_Z x # Z2P (BigN.to_Z y)
- end.
-
- Definition to_Qc q := !!(to_Q q).
-
- Notation "[[ x ]]" := (to_Qc x).
-
- Notation "[ x ]" := (to_Q x).
-
- Theorem spec_to_Q: forall q: Q, [of_Q q] = q.
- intros (x,y); simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-  generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
-   rewrite BigN.spec_of_pos; intros HH; discriminate HH.
- rewrite BigZ.spec_of_Z; simpl.
- rewrite (BigN.spec_of_pos); auto.
- Qed.
-
- Theorem spec_to_Qc: forall q, [[of_Qc q]] = q.
- intros (x, Hx); unfold of_Qc, to_Qc; simpl.
- apply Qc_decomp; simpl.
- intros; rewrite spec_to_Q; auto.
- Qed.
-
- Definition opp (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.opp zx)
-  | Qq nx dx => Qq (BigZ.opp nx) dx
-  end.
-
- Theorem spec_opp: forall q, ([opp q] = -[q])%Q.
- intros [z | x y]; simpl.
- rewrite BigZ.spec_opp; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-  generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- rewrite BigZ.spec_opp; auto.
- Qed.
-
- Theorem spec_oppc: forall q, [[opp q]] = -[[q]].
- intros q; unfold Qcopp, to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- rewrite spec_opp.
- rewrite <- Qred_opp.
- rewrite Qred_involutive; auto.
- Qed.
-
-
- Definition compare (x y: t) :=
-  match x, y with
-  | Qz zx, Qz zy => BigZ.compare zx zy
-  | Qz zx, Qq ny dy => 
-    if BigN.eq_bool dy BigN.zero then BigZ.compare zx BigZ.zero
-    else
-      match BigZ.cmp_sign zx ny with
-      | Lt => Lt 
-      | Gt => Gt
-      | Eq => BigZ.compare (BigZ.mul zx (BigZ.Pos dy)) ny
-      end
-  | Qq nx dx, Qz zy =>
-    if BigN.eq_bool dx BigN.zero then BigZ.compare BigZ.zero zy     
-    else
-      match BigZ.cmp_sign nx zy with
-      | Lt => Lt
-      | Gt => Gt
-      | Eq => BigZ.compare nx (BigZ.mul zy (BigZ.Pos dx))
-      end
-  | Qq nx dx, Qq ny dy =>
-    match BigN.eq_bool dx BigN.zero, BigN.eq_bool dy BigN.zero with
-    | true, true => Eq
-    | true, false => BigZ.compare BigZ.zero ny
-    | false, true => BigZ.compare nx BigZ.zero
-    | false, false =>
-      match BigZ.cmp_sign nx ny with
-      | Lt => Lt
-      | Gt => Gt
-      | Eq => BigZ.compare (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx))
-      end
-    end
-  end.
-
- Theorem spec_compare: forall q1 q2, 
-  compare q1 q2 = ([q1] ?= [q2])%Q.
- intros [z1 | x1 y1] [z2 | x2 y2]; 
-   unfold Qcompare, compare, to_Q, Qnum, Qden.
- repeat rewrite Zmult_1_r.
- generalize (BigZ.spec_compare z1 z2); case BigZ.compare; intros H; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- rewrite Zmult_1_r.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- rewrite Zmult_1_r; generalize (BigZ.spec_compare z1 BigZ.zero);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH1; rewrite HH1; rewrite Zcompare_refl; auto.
- set (a := BigZ.to_Z z1); set (b := BigZ.to_Z x2);
-   set (c := BigN.to_Z y2); fold c in HH.
- assert (F: (0 < c)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos  y2)); fold c; auto.
-   intros H1; case HH; rewrite <- H1; auto.
- rewrite Z2P_correct; auto with zarith.
- generalize (BigZ.spec_cmp_sign z1 x2); case BigZ.cmp_sign; fold a b c.
- intros _; generalize (BigZ.spec_compare (z1 * BigZ.Pos y2)%bigZ x2); 
-   case BigZ.compare; rewrite BigZ.spec_mul; simpl; fold a b c; auto.
- intros H1; rewrite H1; rewrite Zcompare_refl; auto.
- intros (H1, H2); apply sym_equal; change (a * c < b)%Z.
- apply Zlt_le_trans with (2 := H2).
- change 0%Z with (0 * c)%Z.
- apply Zmult_lt_compat_r; auto with zarith.
- intros (H1, H2); apply sym_equal; change (a * c > b)%Z.
- apply Zlt_gt.
- apply Zlt_le_trans with (1 := H2).
- change 0%Z with (0 * c)%Z.
- apply Zmult_le_compat_r; auto with zarith.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare BigZ.zero z2);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH1; rewrite <- HH1; rewrite Zcompare_refl; auto.
- set (a := BigZ.to_Z z2); set (b := BigZ.to_Z x1);
-   set (c := BigN.to_Z y1); fold c in HH.
- assert (F: (0 < c)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos  y1)); fold c; auto.
-   intros H1; case HH; rewrite <- H1; auto.
- rewrite Zmult_1_r; rewrite Z2P_correct; auto with zarith.
- generalize (BigZ.spec_cmp_sign x1 z2); case BigZ.cmp_sign; fold a b c.
- intros _; generalize (BigZ.spec_compare x1 (z2 * BigZ.Pos y1)%bigZ); 
-   case BigZ.compare; rewrite BigZ.spec_mul; simpl; fold a b c; auto.
- intros H1; rewrite H1; rewrite Zcompare_refl; auto.
- intros (H1, H2); apply sym_equal; change (b < a * c)%Z.
- apply Zlt_le_trans with (1 := H1).
- change 0%Z with (0 * c)%Z.
- apply Zmult_le_compat_r; auto with zarith.
- intros (H1, H2); apply sym_equal; change (b > a * c)%Z.
- apply Zlt_gt.
- apply Zlt_le_trans with (2 := H1).
- change 0%Z with (0 * c)%Z.
- apply Zmult_lt_compat_r; auto with zarith.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- rewrite Zcompare_refl; auto.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare BigZ.zero x2);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH2; rewrite <- HH2; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare x1 BigZ.zero)%bigZ; case BigZ.compare;
-   auto; rewrite BigZ.spec_0.
- intros HH2; rewrite <- HH2; rewrite Zcompare_refl; auto.
- set (a := BigZ.to_Z x1); set (b := BigZ.to_Z x2);
-   set (c1 := BigN.to_Z y1); set (c2 := BigN.to_Z y2).
- fold c1 in HH; fold c2 in HH1.
- assert (F1: (0 < c1)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos  y1)); fold c1; auto.
-   intros H1; case HH; rewrite <- H1; auto.
- assert (F2: (0 < c2)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos  y2)); fold c2; auto.
-   intros H1; case HH1; rewrite <- H1; auto.
- repeat rewrite Z2P_correct; auto.
- generalize (BigZ.spec_cmp_sign x1 x2); case BigZ.cmp_sign.
- intros _; generalize (BigZ.spec_compare (x1 * BigZ.Pos y2)%bigZ
-                          (x2 * BigZ.Pos y1)%bigZ); 
-   case BigZ.compare; rewrite BigZ.spec_mul; simpl; fold a b c1 c2; auto.
- rewrite BigZ.spec_mul; simpl; fold a b c1; intros HH2; rewrite HH2;
-  rewrite Zcompare_refl; auto.
- rewrite BigZ.spec_mul; simpl; auto.
- rewrite BigZ.spec_mul; simpl; auto.
- fold a b; intros (H1, H2); apply sym_equal; change (a * c2 < b * c1)%Z.
- apply Zlt_le_trans with 0%Z.
-   change 0%Z with (0 * c2)%Z.
- apply Zmult_lt_compat_r; auto with zarith.
- apply Zmult_le_0_compat; auto with zarith.
- fold a b; intros (H1, H2); apply sym_equal; change (a * c2 > b * c1)%Z.
- apply Zlt_gt; apply Zlt_le_trans with 0%Z.
- change 0%Z with (0 * c1)%Z.
- apply Zmult_lt_compat_r; auto with zarith.
- apply Zmult_le_0_compat; auto with zarith.
- Qed.
-
-
- Definition do_norm_n n := 
-  match n with
-  | BigN.N0 _ => false
-  | BigN.N1 _ => false
-  | BigN.N2 _ => false
-  | BigN.N3 _ => false
-  | BigN.N4 _ => false
-  | BigN.N5 _ => false
-  | BigN.N6 _ => false
-  | _         => true 
-  end.
- 
- Definition do_norm_z z :=
-  match z with
-  | BigZ.Pos n => do_norm_n n
-  | BigZ.Neg n => do_norm_n n
-  end.
-
-(* Je pense que cette fonction normalise bien ... *)
- Definition norm n d: t :=
-  if andb (do_norm_z n) (do_norm_n d) then
-  let gcd := BigN.gcd (BigZ.to_N n) d in 
-  match BigN.compare BigN.one gcd with
-  | Lt => 
-    let n := BigZ.div n (BigZ.Pos gcd) in
-    let d := BigN.div d gcd in
-    match BigN.compare d BigN.one with
-    | Gt => Qq n d
-    | Eq => Qz n
-    | Lt => zero
-    end
-  | Eq => Qq n d
-  | Gt => zero (* gcd = 0 => both numbers are 0 *)
-  end
- else Qq n d.
-
- Theorem spec_norm: forall n q, 
-     ([norm n q] == [Qq n q])%Q.
- intros p q; unfold norm.
- case do_norm_z; simpl andb.
- 2: apply Qeq_refl.
- case do_norm_n.
- 2: apply Qeq_refl.
- assert (Hp := BigN.spec_pos (BigZ.to_N p)).
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; auto; rewrite BigN.spec_1; rewrite BigN.spec_gcd; intros H1.
-   apply Qeq_refl.
- generalize (BigN.spec_pos (q / BigN.gcd (BigZ.to_N p) q)%bigN).
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; auto; rewrite BigN.spec_1; rewrite BigN.spec_div; 
-   rewrite BigN.spec_gcd; auto with zarith; intros H2 HH.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H3; simpl;
-  rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd;
-  auto with zarith.
- generalize H2; rewrite H3; 
-   rewrite Zdiv_0_l; auto with zarith.
- generalize H1 H2 H3 (BigN.spec_pos q); clear H1 H2 H3.
- rewrite spec_to_N.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 H4; rewrite Z2P_correct; auto with zarith.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H3; simpl.
- case H3.
- generalize H1 H2 H3 HH; clear H1 H2 H3 HH.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 HH.
-  rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto with zarith.
- case (Zle_lt_or_eq _ _ HH); auto with zarith.
- intros HH1; rewrite <- HH1; ring.
- generalize (Zgcd_is_gcd a b); intros HH1; inversion HH1; auto.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_div;
-   rewrite BigN.spec_gcd; auto with zarith; intros H3.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H4.
- case H3; rewrite H4;  rewrite Zdiv_0_l; auto with zarith.
- simpl.
- assert (FF := BigN.spec_pos q).
- rewrite Z2P_correct; auto with zarith.
- rewrite <- BigN.spec_gcd; rewrite <- BigN.spec_div; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; auto with zarith.
- simpl; rewrite BigZ.spec_div; simpl.
- rewrite BigN.spec_gcd; auto with zarith.
- generalize H1 H2 H3 H4 HH FF; clear H1 H2 H3 H4 HH FF.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 H4 HH FF.
- rewrite spec_to_N; fold a.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_div; 
-   rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_gcd; auto with zarith.
- case (Zle_lt_or_eq _ _ 
-   (BigN.spec_pos (BigN.gcd (BigZ.to_N p) q)));
-  rewrite BigN.spec_gcd; auto with zarith.
- intros; apply False_ind; auto with zarith.
- intros HH2; assert (FF1 := Zgcd_inv_0_l _ _ (sym_equal HH2)).
- assert (FF2 := Zgcd_inv_0_l _ _ (sym_equal HH2)).
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2; simpl.
- rewrite spec_to_N.
- rewrite FF2; ring.
- Qed.
-   
- Definition add (x y: t): t :=
-  match x with
-  | Qz zx =>
-    match y with
-    | Qz zy => Qz (BigZ.add zx zy)
-    | Qq ny dy => 
-      if BigN.eq_bool dy BigN.zero then x 
-      else Qq (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-    end
-  | Qq nx dx =>
-    if BigN.eq_bool dx BigN.zero then y 
-    else match y with
-    | Qz zy => Qq (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-    | Qq ny dy =>
-      if BigN.eq_bool dy BigN.zero then x
-      else
-       if BigN.eq_bool dx dy then
-         let n := BigZ.add nx ny in
-         Qq n dx
-       else
-         let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-         let d := BigN.mul dx dy in
-         Qq n d
-    end
-  end.
-
-
-
- Theorem spec_add x y: 
-  ([add x y] == [x] + [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qplus; simpl.
- rewrite BigZ.spec_add; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- assert (F1:= BigN.spec_pos dy).
- rewrite Zmult_1_r; red; simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH; simpl; try ring.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH1; simpl; try ring.
- case HH; auto.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl; auto.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH; simpl; try ring.
- rewrite Zmult_1_r; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH1; simpl; try ring.
- case HH; auto.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl; auto.
- rewrite Zmult_1_r; rewrite Pmult_1_r.
- apply Qeq_refl.
- assert (F1:= BigN.spec_pos dx); auto with zarith.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- apply Qeq_refl.
- case HH2; auto.
- simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- case HH2; auto.
- case HH1; auto.
- rewrite Zmult_1_r; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- simpl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- case HH; auto.
- rewrite Zmult_1_r; rewrite Zplus_0_r; rewrite Pmult_1_r.
- apply Qeq_refl.
- simpl.
- generalize (BigN.spec_eq_bool (dx * dy)%bigN BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_mul;
-   rewrite BigN.spec_0; intros HH2.
- (case (Zmult_integral _ _ HH2); intros HH3);
-  [case HH| case HH1]; auto.
- generalize (BigN.spec_eq_bool dx dy);
-   case BigN.eq_bool; intros HH3.
- rewrite <- HH3.
- assert (Fx: (0 < BigN.to_Z dx)%Z).
-   generalize (BigN.spec_pos dx); auto with zarith.
- red; simpl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH4.
- case HH; auto.
- simpl; rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; repeat rewrite BigZ.spec_mul; simpl.
- ring.
- assert (Fx: (0 < BigN.to_Z dx)%Z).
-   generalize (BigN.spec_pos dx); auto with zarith.
- assert (Fy: (0 < BigN.to_Z dy)%Z).
-   generalize (BigN.spec_pos dy); auto with zarith.
- red; simpl; rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_mul;
-    rewrite BigN.spec_0; intros H3; simpl.
- absurd (0 < 0)%Z; auto with zarith.
- rewrite BigZ.spec_add; repeat rewrite BigZ.spec_mul; simpl.
- repeat rewrite Z2P_correct; auto with zarith.
- apply Zmult_lt_0_compat; auto.
- Qed.
-
- Theorem spec_addc x y:
-  [[add x y]] = [[x]] + [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition add_norm (x y: t): t :=
-  match x with
-  | Qz zx =>
-    match y with
-    | Qz zy => Qz (BigZ.add zx zy)
-    | Qq ny dy =>  
-      if BigN.eq_bool dy BigN.zero then x 
-      else 
-        norm (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-    end
-  | Qq nx dx =>
-    if BigN.eq_bool dx BigN.zero then y 
-    else match y with
-    | Qz zy => norm (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-    | Qq ny dy =>
-      if BigN.eq_bool dy BigN.zero then x
-      else
-       if BigN.eq_bool dx dy then
-         let n := BigZ.add nx ny in
-         norm n dx
-       else
-         let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-         let d := BigN.mul dx dy in
-         norm n d
-    end
-  end.
-
- Theorem spec_add_norm x y:
-  ([add_norm x y] == [x] + [y])%Q.
- intros x y; rewrite <- spec_add; auto.
- case x; case y; clear x y; unfold add_norm, add.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- simpl.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- apply Qeq_refl.
- apply Qeq_refl.
- intros p1 p2 n.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- apply Qeq_refl.
- intros p1 q1 p2 q2.
- generalize (BigN.spec_eq_bool q2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- apply Qeq_refl.
- generalize (BigN.spec_eq_bool q1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; intros HH3;
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end; apply Qeq_refl.
- Qed.
-
- Theorem spec_add_normc x y:
-  [[add_norm x y]] = [[x]] + [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add_norm; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
- 
- Definition sub x y := add x (opp y).
-
- Theorem spec_sub x y:
-  ([sub x y] == [x] - [y])%Q.
- intros x y; unfold sub; rewrite spec_add; auto.
- rewrite spec_opp; ring.
- Qed.
-
- Theorem spec_subc x y:  [[sub x y]] = [[x]] - [[y]].
- intros x y; unfold sub; rewrite spec_addc; auto.
- rewrite spec_oppc; ring.
- Qed.
-
- Definition sub_norm x y := add_norm x (opp y).
-
- Theorem spec_sub_norm x y: 
-  ([sub_norm x y] == [x] - [y])%Q.
- intros x y; unfold sub_norm; rewrite spec_add_norm; auto.
- rewrite spec_opp; ring.
- Qed.
-
- Theorem spec_sub_normc x y:
-   [[sub_norm x y]] = [[x]] - [[y]].
- intros x y; unfold sub_norm; rewrite spec_add_normc; auto.
- rewrite spec_oppc; ring.
- Qed.
-
- Definition mul (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.mul zx ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.mul nx zy) dx
-  | Qq nx dx, Qq ny dy => Qq (BigZ.mul nx ny) (BigN.mul dx dy)
-  end.
-
- Theorem spec_mul x y: ([mul x y] == [x] * [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qmult; simpl.
- rewrite BigZ.spec_mul; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end;  rewrite BigN.spec_0; intros HH1.
- red; simpl; ring.
- rewrite BigZ.spec_mul; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH1.
- red; simpl; ring.
- rewrite BigZ.spec_mul; rewrite Pmult_1_r.
- apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0;  rewrite BigN.spec_mul;
-      intros HH1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH2.
- red; simpl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH3.
- red; simpl; ring.
- case (Zmult_integral _ _ HH1); intros HH.
-   case HH2; auto.
-   case HH3; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH2.
- case HH1; rewrite HH2; ring.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH3.
- case HH1; rewrite HH3; ring.
- rewrite BigZ.spec_mul.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- apply Qeq_refl.
-  generalize (BigN.spec_pos dx); auto with zarith.
-  generalize (BigN.spec_pos dy); auto with zarith.
- Qed.
-
- Theorem spec_mulc x y:
-  [[mul x y]] = [[x]] * [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition mul_norm (x y: t): t := 
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => mul (Qz ny) (norm zx dy)
-  | Qq nx dx, Qz zy => mul (Qz nx) (norm zy dx)
-  | Qq nx dx, Qq ny dy => mul (norm nx dy) (norm ny dx)
-  end.
-
- Theorem spec_mul_norm x y:
-  ([mul_norm x y] == [x] * [y])%Q.
- intros x y; rewrite <- spec_mul; auto.
- unfold mul_norm; case x; case y; clear x y.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- repeat rewrite spec_mul.
- match goal with |- ?Z == _ =>
-   match Z with context id [norm ?X ?Y] =>
-   let y := context id [Qq X Y] in
-   apply Qeq_trans with y; [repeat apply Qmult_comp;
-   repeat apply Qplus_comp; repeat apply Qeq_refl;
-   apply spec_norm | idtac]
-   end
- end.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH; simpl; ring.
- intros p1 p2 n.
- repeat rewrite spec_mul.
- match goal with |- ?Z == _ =>
-   match Z with context id [norm ?X ?Y] =>
-   let y := context id [Qq X Y] in
-   apply Qeq_trans with y; [repeat apply Qmult_comp;
-   repeat apply Qplus_comp; repeat apply Qeq_refl;
-   apply spec_norm | idtac]
-   end
- end.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH; simpl; try ring.
- rewrite Pmult_1_r; auto.
- intros p1 n1 p2 n2.
- repeat rewrite spec_mul.
- repeat match goal with |- ?Z == _ =>
-   match Z with context id [norm ?X ?Y] =>
-   let y := context id [Qq X Y] in
-   apply Qeq_trans with y; [repeat apply Qmult_comp;
-   repeat apply Qplus_comp; repeat apply Qeq_refl;
-   apply spec_norm | idtac]
-   end
- end.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1;
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; try ring.
- repeat rewrite Zpos_mult_morphism; ring.
- Qed.
-
- Theorem spec_mul_normc x y:
-   [[mul_norm x y]] = [[x]] * [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul_norm; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition inv (x: t): t := 
-  match x with
-  | Qz (BigZ.Pos n) => Qq BigZ.one n
-  | Qz (BigZ.Neg n) => Qq BigZ.minus_one n
-  | Qq (BigZ.Pos n) d => Qq (BigZ.Pos d) n
-  | Qq (BigZ.Neg n) d => Qq (BigZ.Neg d) n
-  end.
-
-
- Theorem spec_inv x:
-   ([inv x] == /[x])%Q.
- intros [ [x | x] | [nx | nx] dx]; unfold inv, Qinv; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- rewrite H1; apply Qeq_refl.
- generalize H1 (BigN.spec_pos x); case (BigN.to_Z x); auto.
- intros HH; case HH; auto.
- intros; red; simpl; auto.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- rewrite H1; apply Qeq_refl.
- generalize H1 (BigN.spec_pos x); case (BigN.to_Z x); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl; auto.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- apply Qeq_refl.
- rewrite H1; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- rewrite H2; red; simpl; auto.
- generalize H1 (BigN.spec_pos nx); case (BigN.to_Z nx); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- apply Qeq_refl.
- rewrite H1; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- rewrite H2; red; simpl; auto.
- generalize H1 (BigN.spec_pos nx); case (BigN.to_Z nx); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p _ HH; case HH; auto.
- Qed.
-
- Theorem spec_invc x:
-   [[inv x]] =  /[[x]].
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition inv_norm (x: t): t := 
-  match x with
-  | Qz (BigZ.Pos n) => 
-    if BigN.eq_bool n BigN.zero then zero else Qq BigZ.one n
-  | Qz (BigZ.Neg n) => 
-    if BigN.eq_bool n BigN.zero then zero else Qq BigZ.minus_one n
-  | Qq (BigZ.Pos n) d => 
-    if BigN.eq_bool n BigN.zero then zero else Qq (BigZ.Pos d) n
-  | Qq (BigZ.Neg n) d => 
-    if BigN.eq_bool n BigN.zero then zero else Qq (BigZ.Neg d) n
-  end.
-
- Theorem spec_inv_norm x: ([inv_norm x] == /[x])%Q.
- intros x; rewrite <- spec_inv; generalize x; clear x.
- intros [ [x | x] | [nx | nx] dx]; unfold inv_norm, inv;
-   match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-     generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-   end; rewrite BigN.spec_0; intros H1; try apply Qeq_refl;
-   red; simpl;
-   match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-     generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-   end; rewrite BigN.spec_0; intros H2; auto;
-   case H2; auto.
- Qed.
-
- Theorem spec_inv_normc x:
-   [[inv_norm x]] =  /[[x]].
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv_norm; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
- Definition div x y := mul x (inv y).
-
- Theorem spec_div x y: ([div x y] == [x] / [y])%Q.
- intros x y; unfold div; rewrite spec_mul; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Theorem spec_divc x y: [[div x y]] = [[x]] / [[y]].
- intros x y; unfold div; rewrite spec_mulc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto. 
- Qed.
-
- Definition div_norm x y := mul_norm x (inv y).
-
- Theorem spec_div_norm x y: ([div_norm x y] == [x] / [y])%Q.
- intros x y; unfold div_norm; rewrite spec_mul_norm; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Theorem spec_div_normc x y: [[div_norm x y]] = [[x]] / [[y]].
- intros x y; unfold div_norm; rewrite spec_mul_normc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto.
- Qed.
-
-
- Definition square (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.square zx)
-  | Qq nx dx => Qq (BigZ.square nx) (BigN.square dx)
-  end.
-
-
- Theorem spec_square x: ([square x] == [x] ^ 2)%Q.
- intros [ x | nx dx]; unfold square.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- simpl Qpower.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H.
- red; simpl.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_square;
-   intros H1.
- case H1; rewrite H; auto.
- red; simpl.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_square;
-   intros H1.
- case H; case (Zmult_integral _ _ H1); auto.
- simpl.
- rewrite BigZ.spec_square.
- rewrite Zpos_mult_morphism.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- generalize (BigN.spec_pos dx); auto with zarith.
- Qed.
-
- Theorem spec_squarec x: [[square x]] =  [[x]]^2.
- intros x; unfold to_Qc.
- apply trans_equal with (!! ([x]^2)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_square; auto.
- simpl Qcpower.
- replace (!! [x] * 1) with (!![x]); try ring.
- simpl.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition power_pos (x: t) p: t :=
-  match x with
-  | Qz zx => Qz (BigZ.power_pos zx p)
-  | Qq nx dx => Qq (BigZ.power_pos nx p) (BigN.power_pos dx p)
-  end.
-
- Theorem spec_power_pos x p: ([power_pos x p] == [x] ^ Zpos p)%Q.
- Proof.
- intros [x | nx dx] p; unfold power_pos.
-   unfold power_pos; red; simpl.
-   generalize (Qpower_decomp p (BigZ.to_Z x) 1).
-   unfold Qeq; simpl.
-   rewrite Zpower_pos_1_l; simpl Z2P.
-   rewrite Zmult_1_r.
-   intros H; rewrite H.
-   rewrite BigZ.spec_power_pos; simpl; ring.
- simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_power_pos; intros H1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2.
- elim p; simpl.
- intros; red; simpl; auto.
- intros p1 Hp1; rewrite <- Hp1; red; simpl; auto.
- apply Qeq_refl.
- case H2; generalize H1.
- elim p; simpl.
- intros p1 Hrec.
- change (xI p1) with (1 + (xO p1))%positive.
- rewrite Zpower_pos_is_exp; rewrite Zpower_pos_1_r.
- intros HH; case (Zmult_integral _ _ HH); auto.
- rewrite <- Pplus_diag.
- rewrite Zpower_pos_is_exp.
- intros HH1; case (Zmult_integral _ _ HH1); auto.
- intros p1 Hrec.
- rewrite <- Pplus_diag.
- rewrite Zpower_pos_is_exp.
- intros HH1; case (Zmult_integral _ _ HH1); auto.
- rewrite Zpower_pos_1_r; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2.
- case H1; rewrite H2; auto.
- simpl; rewrite Zpower_pos_0_l; auto.
- assert (F1: (0 < BigN.to_Z dx)%Z).
-     generalize (BigN.spec_pos dx); auto with zarith.
- assert (F2: (0 < BigN.to_Z dx  ^ ' p)%Z).
-  unfold Zpower; apply Zpower_pos_pos; auto.
- unfold power_pos; red; simpl.
- generalize (Qpower_decomp p (BigZ.to_Z nx) 
-               (Z2P (BigN.to_Z dx))).
- unfold Qeq; simpl.
- repeat rewrite Z2P_correct; auto.
- unfold Qeq; simpl; intros HH.
- rewrite HH.
- rewrite BigZ.spec_power_pos; simpl; ring.
- Qed.
-
- Theorem spec_power_posc x p:
-   [[power_pos x p]] = [[x]] ^ nat_of_P p.
- intros x p; unfold to_Qc.
- apply trans_equal with (!! ([x]^Zpos p)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_power_pos; auto.
- pattern p; apply Pind; clear p.
- simpl; ring.
- intros p Hrec.
- rewrite nat_of_P_succ_morphism; simpl Qcpower.
- rewrite <- Hrec.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _;
- unfold this.
- apply Qred_complete.
- assert (F: [x] ^ ' Psucc p == [x] *   [x] ^ ' p).
-  simpl; case x; simpl; clear x Hrec.
-  intros x; simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  intros nx dx.
-  match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-  end; auto; rewrite BigN.spec_0.
-  unfold Qpower_positive.
-  assert (tmp: forall p, pow_pos Qmult 0%Q p = 0%Q).
-    intros p1; elim p1; simpl; auto; clear p1.
-    intros p1 Hp1; rewrite Hp1; auto.
-    intros p1 Hp1; rewrite Hp1; auto.
-  repeat rewrite tmp; intros; red; simpl; auto.
-  intros H1.
-  assert (F1: (0 < BigN.to_Z dx)%Z).
-     generalize (BigN.spec_pos dx); auto with zarith.
-  simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  repeat rewrite Zpos_mult_morphism.
-  repeat rewrite Z2P_correct; auto.
-  2: apply Zpower_pos_pos; auto.
-  2: apply Zpower_pos_pos; auto.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
- rewrite F.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
-End Qbi.
diff --git a/theories/Numbers/Rational/BigQ/QifMake.v b/theories/Numbers/Rational/BigQ/QifMake.v
deleted file mode 100644
index 1d8ecc94..00000000
--- a/theories/Numbers/Rational/BigQ/QifMake.v
+++ /dev/null
@@ -1,979 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
-(************************************************************************)
-
-(*i $Id: QifMake.v 11027 2008-06-01 13:28:59Z letouzey $ i*)
-
-Require Import Bool.
-Require Import ZArith.
-Require Import Znumtheory.
-Require Import BigNumPrelude.
-Require Import Arith.
-Require Export BigN.
-Require Export BigZ.
-Require Import QArith.
-Require Import Qcanon.
-Require Import Qpower.
-Require Import QMake_base.
-
-Module Qif.
-
- Import BinInt.
- Open Local Scope Q_scope.
- Open Local Scope Qc_scope.
-
- (** The notation of a rational number is either an integer x,
-     interpreted as itself or a pair (x,y) of an integer x and a naturel
-     number y interpreted as x/y. The pairs (x,0) and (0,y) are all
-     interpreted as 0. *)
-
- Definition t := q_type.
-
- Definition zero: t := Qz BigZ.zero.
- Definition one: t := Qz BigZ.one.
- Definition minus_one: t := Qz BigZ.minus_one.
-
- Definition of_Z x: t := Qz (BigZ.of_Z x).
-
- Definition of_Q q: t := 
- match q with x # y =>
-  Qq (BigZ.of_Z x) (BigN.of_N (Npos y))
- end.
-
- Definition of_Qc q := of_Q (this q).
-
- Definition to_Q (q: t) := 
- match q with 
-  Qz x => BigZ.to_Z x # 1
- |Qq x y => if BigN.eq_bool y BigN.zero then 0%Q
-            else BigZ.to_Z x # Z2P (BigN.to_Z y)
- end.
-
- Definition to_Qc q := !!(to_Q q).
-
- Notation "[[ x ]]" := (to_Qc x).
-
- Notation "[ x ]" := (to_Q x).
-
- Theorem spec_to_Q: forall q: Q, [of_Q q] = q.
- intros (x,y); simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-  generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
-   rewrite BigN.spec_of_pos; intros HH; discriminate HH.
- rewrite BigZ.spec_of_Z; simpl.
- rewrite (BigN.spec_of_pos); auto.
- Qed.
-
- Theorem spec_to_Qc: forall q, [[of_Qc q]] = q.
- intros (x, Hx); unfold of_Qc, to_Qc; simpl.
- apply Qc_decomp; simpl.
- intros; rewrite spec_to_Q; auto.
- Qed.
-
- Definition opp (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.opp zx)
-  | Qq nx dx => Qq (BigZ.opp nx) dx
-  end.
-
- Theorem spec_opp: forall q, ([opp q] = -[q])%Q.
- intros [z | x y]; simpl.
- rewrite BigZ.spec_opp; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-  generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- rewrite BigZ.spec_opp; auto.
- Qed.
-
- Theorem spec_oppc: forall q, [[opp q]] = -[[q]].
- intros q; unfold Qcopp, to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- rewrite spec_opp.
- rewrite <- Qred_opp.
- rewrite Qred_involutive; auto.
- Qed.
-
- Definition compare (x y: t) :=
-  match x, y with
-  | Qz zx, Qz zy => BigZ.compare zx zy
-  | Qz zx, Qq ny dy => 
-    if BigN.eq_bool dy BigN.zero then BigZ.compare zx BigZ.zero
-    else BigZ.compare (BigZ.mul zx (BigZ.Pos dy)) ny
-  | Qq nx dx, Qz zy => 
-    if BigN.eq_bool dx BigN.zero then BigZ.compare BigZ.zero zy 
-    else BigZ.compare nx (BigZ.mul zy (BigZ.Pos dx))
-  | Qq nx dx, Qq ny dy =>
-    match BigN.eq_bool dx BigN.zero, BigN.eq_bool dy BigN.zero with
-    | true, true => Eq
-    | true, false => BigZ.compare BigZ.zero ny
-    | false, true => BigZ.compare nx BigZ.zero
-    | false, false => BigZ.compare (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx))
-    end
-  end.
-
- Theorem spec_compare: forall q1 q2, 
-  compare q1 q2 = ([q1] ?= [q2])%Q.
- intros [z1 | x1 y1] [z2 | x2 y2]; 
-   unfold Qcompare, compare, to_Q, Qnum, Qden.
- repeat rewrite Zmult_1_r.
- generalize (BigZ.spec_compare z1 z2); case BigZ.compare; intros H; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- rewrite Zmult_1_r.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- rewrite Zmult_1_r; generalize (BigZ.spec_compare z1 BigZ.zero);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH1; rewrite HH1; rewrite Zcompare_refl; auto.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (z1 * BigZ.Pos y2) x2)%bigZ; case BigZ.compare;
-   rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare BigZ.zero z2);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH1; rewrite <- HH1; rewrite Zcompare_refl; auto.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
- rewrite Zmult_1_r.
- generalize (BigZ.spec_compare x1 (z2 * BigZ.Pos y1))%bigZ; case BigZ.compare;
-   rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- rewrite Zcompare_refl; auto.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare BigZ.zero x2);
-  case BigZ.compare; auto.
- rewrite BigZ.spec_0; intros HH2; rewrite <- HH2; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- rewrite Zmult_0_l; rewrite Zmult_1_r.
- generalize (BigZ.spec_compare x1 BigZ.zero)%bigZ; case BigZ.compare;
-   auto; rewrite BigZ.spec_0.
- intros HH2; rewrite <- HH2; rewrite Zcompare_refl; auto.
- repeat rewrite Z2P_correct.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (x1 * BigZ.Pos y2) 
-                               (x2 * BigZ.Pos y1))%bigZ; case BigZ.compare;
-   repeat rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- Qed.
-
- Definition do_norm_n n := 
-  match n with
-  | BigN.N0 _ => false
-  | BigN.N1 _ => false
-  | BigN.N2 _ => false
-  | BigN.N3 _ => false
-  | BigN.N4 _ => false
-  | BigN.N5 _ => false
-  | BigN.N6 _ => false
-  | _         => true 
-  end.
-
- Definition do_norm_z z :=
-  match z with
-  | BigZ.Pos n => do_norm_n n
-  | BigZ.Neg n => do_norm_n n
-  end.
-
-(* Je pense que cette fonction normalise bien ... *)
- Definition norm n d: t :=
-  if andb (do_norm_z n) (do_norm_n d) then
-  let gcd := BigN.gcd (BigZ.to_N n) d in 
-  match BigN.compare BigN.one gcd with
-  | Lt => 
-    let n := BigZ.div n (BigZ.Pos gcd) in
-    let d := BigN.div d gcd in
-    match BigN.compare d BigN.one with
-    | Gt => Qq n d
-    | Eq => Qz n
-    | Lt => zero
-    end
-  | Eq => Qq n d
-  | Gt => zero (* gcd = 0 => both numbers are 0 *)
-  end
- else Qq n d.
-
- Theorem spec_norm: forall n q, 
-     ([norm n q] == [Qq n q])%Q.
- intros p q; unfold norm.
- case do_norm_z; simpl andb.
- 2: apply Qeq_refl.
- case do_norm_n.
- 2: apply Qeq_refl.
- assert (Hp := BigN.spec_pos (BigZ.to_N p)).
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; auto; rewrite BigN.spec_1; rewrite BigN.spec_gcd; intros H1.
-   apply Qeq_refl.
- generalize (BigN.spec_pos (q / BigN.gcd (BigZ.to_N p) q)%bigN).
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; auto; rewrite BigN.spec_1; rewrite BigN.spec_div; 
-   rewrite BigN.spec_gcd; auto with zarith; intros H2 HH.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H3; simpl;
-  rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd;
-  auto with zarith.
- generalize H2; rewrite H3; 
-   rewrite Zdiv_0_l; auto with zarith.
- generalize H1 H2 H3 (BigN.spec_pos q); clear H1 H2 H3.
- rewrite spec_to_N.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 H4; rewrite Z2P_correct; auto with zarith.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H3; simpl.
- case H3.
- generalize H1 H2 H3 HH; clear H1 H2 H3 HH.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 HH.
-  rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto with zarith.
- case (Zle_lt_or_eq _ _ HH); auto with zarith.
- intros HH1; rewrite <- HH1; ring.
- generalize (Zgcd_is_gcd a b); intros HH1; inversion HH1; auto.
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_div;
-   rewrite BigN.spec_gcd; auto with zarith; intros H3.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H4.
- case H3; rewrite H4;  rewrite Zdiv_0_l; auto with zarith.
- simpl.
- assert (FF := BigN.spec_pos q).
- rewrite Z2P_correct; auto with zarith.
- rewrite <- BigN.spec_gcd; rewrite <- BigN.spec_div; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; auto with zarith.
- simpl; rewrite BigZ.spec_div; simpl.
- rewrite BigN.spec_gcd; auto with zarith.
- generalize H1 H2 H3 H4 HH FF; clear H1 H2 H3 H4 HH FF.
- set (a := (BigN.to_Z (BigZ.to_N p))).
- set (b := (BigN.to_Z q)).
- intros H1 H2 H3 H4 HH FF.
- rewrite spec_to_N; fold a.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_div; 
-   rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_gcd; auto with zarith.
- case (Zle_lt_or_eq _ _ 
-   (BigN.spec_pos (BigN.gcd (BigZ.to_N p) q)));
-  rewrite BigN.spec_gcd; auto with zarith.
- intros; apply False_ind; auto with zarith.
- intros HH2; assert (FF1 := Zgcd_inv_0_l _ _ (sym_equal HH2)).
- assert (FF2 := Zgcd_inv_0_l _ _ (sym_equal HH2)).
- red; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H2; simpl.
- rewrite spec_to_N.
- rewrite FF2; ring.
- Qed.
-
-   
- Definition add (x y: t): t :=
-  match x with
-  | Qz zx =>
-    match y with
-    | Qz zy => Qz (BigZ.add zx zy)
-    | Qq ny dy => 
-      if BigN.eq_bool dy BigN.zero then x 
-      else Qq (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-    end
-  | Qq nx dx =>
-    if BigN.eq_bool dx BigN.zero then y 
-    else match y with
-    | Qz zy => Qq (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-    | Qq ny dy =>
-      if BigN.eq_bool dy BigN.zero then x
-      else
-       let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-       let d := BigN.mul dx dy in
-       Qq n d
-    end
-  end.
-
-
- Theorem spec_add x y: 
-  ([add x y] == [x] + [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qplus; simpl.
- rewrite BigZ.spec_add; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- assert (F1:= BigN.spec_pos dy).
- rewrite Zmult_1_r; red; simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH; simpl; try ring.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH1; simpl; try ring.
- case HH; auto.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl; auto.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH; simpl; try ring.
- rewrite Zmult_1_r; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool;
-   rewrite BigN.spec_0; intros HH1; simpl; try ring.
- case HH; auto.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl; auto.
- rewrite Zmult_1_r; rewrite Pmult_1_r.
- apply Qeq_refl.
- assert (F1:= BigN.spec_pos dx); auto with zarith.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- apply Qeq_refl.
- case HH2; auto.
- simpl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- case HH2; auto.
- case HH1; auto.
- rewrite Zmult_1_r; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- simpl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- case HH; auto.
- rewrite Zmult_1_r; rewrite Zplus_0_r; rewrite Pmult_1_r.
- apply Qeq_refl.
- simpl.
- generalize (BigN.spec_eq_bool (dx * dy)%bigN BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_mul;
-   rewrite BigN.spec_0; intros HH2.
- (case (Zmult_integral _ _ HH2); intros HH3);
-  [case HH| case HH1]; auto.
- rewrite BigZ.spec_add; repeat rewrite BigZ.spec_mul; simpl.
- assert (Fx: (0 < BigN.to_Z dx)%Z).
-   generalize (BigN.spec_pos dx); auto with zarith.
- assert (Fy: (0 < BigN.to_Z dy)%Z).
-   generalize (BigN.spec_pos dy); auto with zarith.
- red; simpl; rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto with zarith.
- apply Zmult_lt_0_compat; auto.
- Qed.
-
- Theorem spec_addc x y:
-  [[add x y]] = [[x]] + [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition add_norm (x y: t): t :=
-  match x with
-  | Qz zx =>
-    match y with
-    | Qz zy => Qz (BigZ.add zx zy)
-    | Qq ny dy =>  
-      if BigN.eq_bool dy BigN.zero then x 
-      else norm (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-    end
-  | Qq nx dx =>
-    if BigN.eq_bool dx BigN.zero then y 
-    else match y with
-    | Qz zy => norm (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-    | Qq ny dy =>
-      if BigN.eq_bool dy BigN.zero then x
-      else
-       let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-       let d := BigN.mul dx dy in
-       norm n d
-    end
-  end.
-
- Theorem spec_add_norm x y:
-  ([add_norm x y] == [x] + [y])%Q.
- intros x y; rewrite <- spec_add; auto.
- case x; case y; clear x y; unfold add_norm, add.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- simpl.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- apply Qeq_refl.
- apply Qeq_refl.
- intros p1 p2 n.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- apply Qeq_refl.
- intros p1 q1 p2 q2.
- generalize (BigN.spec_eq_bool q2 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH1.
- apply Qeq_refl.
- generalize (BigN.spec_eq_bool q1 BigN.zero);
-   case BigN.eq_bool; rewrite BigN.spec_0; intros HH2.
- apply Qeq_refl.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- apply Qeq_refl.
- Qed.
-
- Theorem spec_add_normc x y:
-  [[add_norm x y]] = [[x]] + [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add_norm; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition sub x y := add x (opp y).
-
-
- Theorem spec_sub x y:
-  ([sub x y] == [x] - [y])%Q.
- intros x y; unfold sub; rewrite spec_add; auto.
- rewrite spec_opp; ring.
- Qed.
-
- Theorem spec_subc x y:  [[sub x y]] = [[x]] - [[y]].
- intros x y; unfold sub; rewrite spec_addc; auto.
- rewrite spec_oppc; ring.
- Qed.
-
- Definition sub_norm x y := add_norm x (opp y).
-
- Theorem spec_sub_norm x y: 
-  ([sub_norm x y] == [x] - [y])%Q.
- intros x y; unfold sub_norm; rewrite spec_add_norm; auto.
- rewrite spec_opp; ring.
- Qed.
-
- Theorem spec_sub_normc x y:
-   [[sub_norm x y]] = [[x]] - [[y]].
- intros x y; unfold sub_norm; rewrite spec_add_normc; auto.
- rewrite spec_oppc; ring.
- Qed.
-
- Definition mul (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.mul zx ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.mul nx zy) dx
-  | Qq nx dx, Qq ny dy => Qq (BigZ.mul nx ny) (BigN.mul dx dy)
-  end.
-
-
- Theorem spec_mul x y: ([mul x y] == [x] * [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qmult; simpl.
- rewrite BigZ.spec_mul; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end;  rewrite BigN.spec_0; intros HH1.
- red; simpl; ring.
- rewrite BigZ.spec_mul; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH1.
- red; simpl; ring.
- rewrite BigZ.spec_mul; rewrite Pmult_1_r.
- apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0;  rewrite BigN.spec_mul;
-      intros HH1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH2.
- red; simpl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH3.
- red; simpl; ring.
- case (Zmult_integral _ _ HH1); intros HH.
-   case HH2; auto.
-   case HH3; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH2.
- case HH1; rewrite HH2; ring.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros HH3.
- case HH1; rewrite HH3; ring.
- rewrite BigZ.spec_mul.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- apply Qeq_refl.
-  generalize (BigN.spec_pos dx); auto with zarith.
-  generalize (BigN.spec_pos dy); auto with zarith.
- Qed.
-
- Theorem spec_mulc x y:
-  [[mul x y]] = [[x]] * [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
- Definition mul_norm (x y: t): t := 
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => norm (BigZ.mul zx ny) dy
-  | Qq nx dx, Qz zy => norm (BigZ.mul nx zy) dx
-  | Qq nx dx, Qq ny dy => norm (BigZ.mul nx ny) (BigN.mul dx dy)
-  end.
-
- Theorem spec_mul_norm x y:
-  ([mul_norm x y] == [x] * [y])%Q.
- intros x y; rewrite <- spec_mul; auto.
- unfold mul_norm, mul; case x; case y; clear x y.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end; apply Qeq_refl.
- intros p1 p2 n.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end; apply Qeq_refl.
- intros p1 n1 p2 n2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end; apply Qeq_refl.
- Qed.
-
- Theorem spec_mul_normc x y:
-   [[mul_norm x y]] = [[x]] * [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul_norm; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
-
- Definition inv (x: t): t := 
-  match x with
-  | Qz (BigZ.Pos n) => Qq BigZ.one n
-  | Qz (BigZ.Neg n) => Qq BigZ.minus_one n
-  | Qq (BigZ.Pos n) d => Qq (BigZ.Pos d) n
-  | Qq (BigZ.Neg n) d => Qq (BigZ.Neg d) n
-  end.
-
- Theorem spec_inv x:
-   ([inv x] == /[x])%Q.
- intros [ [x | x] | [nx | nx] dx]; unfold inv, Qinv; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- rewrite H1; apply Qeq_refl.
- generalize H1 (BigN.spec_pos x); case (BigN.to_Z x); auto.
- intros HH; case HH; auto.
- intros; red; simpl; auto.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- rewrite H1; apply Qeq_refl.
- generalize H1 (BigN.spec_pos x); case (BigN.to_Z x); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl; auto.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- apply Qeq_refl.
- rewrite H1; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- rewrite H2; red; simpl; auto.
- generalize H1 (BigN.spec_pos nx); case (BigN.to_Z nx); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- apply Qeq_refl.
- rewrite H1; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H2; simpl; auto.
- rewrite H2; red; simpl; auto.
- generalize H1 (BigN.spec_pos nx); case (BigN.to_Z nx); simpl;
-   auto.
- intros HH; case HH; auto.
- intros; red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p _ HH; case HH; auto.
- Qed.
-
- Theorem spec_invc x:
-   [[inv x]] =  /[[x]].
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
-Definition inv_norm (x: t): t := 
- match x with
- | Qz (BigZ.Pos n) => 
-   match BigN.compare n BigN.one with
-     Gt => Qq BigZ.one n
-   | _ =>  x
-   end
- | Qz (BigZ.Neg n) => 
-   match BigN.compare n BigN.one with
-     Gt => Qq BigZ.minus_one n
-   | _ =>  x
-   end
- | Qq (BigZ.Pos n) d =>
-   match BigN.compare n BigN.one with
-     Gt => Qq (BigZ.Pos d) n
-   | Eq =>  Qz (BigZ.Pos d) 
-   | Lt => Qz (BigZ.zero)
-   end
- | Qq (BigZ.Neg n) d => 
-   match BigN.compare n BigN.one with
-     Gt => Qq (BigZ.Neg d) n
-   | Eq =>  Qz (BigZ.Neg d) 
-   | Lt => Qz (BigZ.zero)
-   end
- end.
-
- Theorem spec_inv_norm x: ([inv_norm x] == /[x])%Q.
- intros [ [x | x] | [nx | nx] dx]; unfold inv_norm, Qinv.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H.
- simpl; rewrite H; apply Qeq_refl.
- case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); simpl.
- generalize H; case BigN.to_Z.
- intros _ HH; discriminate HH.
- intros p; case p; auto.
-   intros p1 HH; discriminate HH.
-   intros p1 HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; discriminate HH.
- intros HH; rewrite <- HH.
-   apply Qeq_refl.
- generalize H; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- rewrite H1; intros HH; discriminate.
- generalize H; case BigN.to_Z.
- intros HH; discriminate HH.
- intros; red; simpl; auto.
- intros p HH; discriminate HH.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H.
- simpl; rewrite H; apply Qeq_refl.
- case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); simpl.
- generalize H; case BigN.to_Z.
- intros _ HH; discriminate HH.
- intros p; case p; auto.
-   intros p1 HH; discriminate HH.
-   intros p1 HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; discriminate HH.
- intros HH; rewrite <- HH.
-   apply Qeq_refl.
- generalize H; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- rewrite H1; intros HH; discriminate.
- generalize H; case BigN.to_Z.
- intros HH; discriminate HH.
- intros; red; simpl; auto.
- intros p HH; discriminate HH.
- simpl Qnum.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; simpl.
- case BigN.compare; red; simpl; auto.
- rewrite H1; auto.
- case BigN.eq_bool; auto.
- simpl; rewrite H1; auto.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H2.
- rewrite H2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- red; simpl.
- rewrite Zmult_1_r; rewrite Pmult_1_r; rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- generalize H2 (BigN.spec_pos nx); case (BigN.to_Z nx).
- intros; apply Qeq_refl.
- intros p; case p; clear p.
- intros p HH; discriminate HH.
- intros p HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- simpl; generalize H2; case (BigN.to_Z nx).
- intros HH; discriminate HH.
- intros p Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H4.
- rewrite H4 in H2; discriminate H2.
- red; simpl.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p HH; discriminate HH.
- simpl Qnum.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1; simpl.
- case BigN.compare; red; simpl; auto.
- rewrite H1; auto.
- case BigN.eq_bool; auto.
- simpl; rewrite H1; auto.
- match goal with  |- context[BigN.compare ?X ?Y] => 
-   generalize (BigN.spec_compare X Y); case BigN.compare
- end; rewrite BigN.spec_1; intros H2.
- rewrite H2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zmult_1_r; rewrite Pmult_1_r; rewrite Z2P_correct; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- generalize H2 (BigN.spec_pos nx); case (BigN.to_Z nx).
- intros; apply Qeq_refl.
- intros p; case p; clear p.
- intros p HH; discriminate HH.
- intros p HH; discriminate HH.
- intros HH; discriminate HH.
- intros p _ HH; case HH; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H3.
- case H1; auto.
- simpl; generalize H2; case (BigN.to_Z nx).
- intros HH; discriminate HH.
- intros p Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H4.
- rewrite H4 in H2; discriminate H2.
- red; simpl.
- assert (tmp: forall x, Zneg x = Zopp (Zpos x)); auto.
- rewrite tmp.
- rewrite Zpos_mult_morphism.
- rewrite Z2P_correct; auto.
- ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p HH; discriminate HH.
- Qed.
-
- Theorem spec_inv_normc x:
-   [[inv_norm x]] =  /[[x]].
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv_norm; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
- Definition div x y := mul x (inv y).
-
- Theorem spec_div x y: ([div x y] == [x] / [y])%Q.
- intros x y; unfold div; rewrite spec_mul; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Theorem spec_divc x y: [[div x y]] = [[x]] / [[y]].
- intros x y; unfold div; rewrite spec_mulc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto. 
- Qed.
-
- Definition div_norm x y := mul_norm x (inv y).
-
- Theorem spec_div_norm x y: ([div_norm x y] == [x] / [y])%Q.
- intros x y; unfold div_norm; rewrite spec_mul_norm; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Theorem spec_div_normc x y: [[div_norm x y]] = [[x]] / [[y]].
- intros x y; unfold div_norm; rewrite spec_mul_normc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto.
- Qed.
-
-
- Definition square (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.square zx)
-  | Qq nx dx => Qq (BigZ.square nx) (BigN.square dx)
-  end.
-
- Theorem spec_square x: ([square x] == [x] ^ 2)%Q.
- intros [ x | nx dx]; unfold square.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- simpl Qpower.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; intros H.
- red; simpl.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_square;
-   intros H1.
- case H1; rewrite H; auto.
- red; simpl.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_square;
-   intros H1.
- case H; case (Zmult_integral _ _ H1); auto.
- simpl.
- rewrite BigZ.spec_square.
- rewrite Zpos_mult_morphism.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- generalize (BigN.spec_pos dx); auto with zarith.
- generalize (BigN.spec_pos dx); auto with zarith.
- Qed.
-
- Theorem spec_squarec x: [[square x]] =  [[x]]^2.
- intros x; unfold to_Qc.
- apply trans_equal with (!! ([x]^2)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_square; auto.
- simpl Qcpower.
- replace (!! [x] * 1) with (!![x]); try ring.
- simpl.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
-End Qif.
diff --git a/theories/Numbers/Rational/BigQ/QpMake.v b/theories/Numbers/Rational/BigQ/QpMake.v
deleted file mode 100644
index ac3ca47a..00000000
--- a/theories/Numbers/Rational/BigQ/QpMake.v
+++ /dev/null
@@ -1,901 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
-(************************************************************************)
-
-(*i $Id: QpMake.v 11027 2008-06-01 13:28:59Z letouzey $ i*)
-
-Require Import Bool.
-Require Import ZArith.
-Require Import Znumtheory.
-Require Import BigNumPrelude.
-Require Import Arith.
-Require Export BigN.
-Require Export BigZ.
-Require Import QArith.
-Require Import Qcanon.
-Require Import Qpower.
-Require Import QMake_base.
-
-Notation Nspec_lt := BigNAxiomsMod.NZOrdAxiomsMod.spec_lt.
-Notation Nspec_le := BigNAxiomsMod.NZOrdAxiomsMod.spec_le.
-
-Module Qp.
-
- (** The notation of a rational number is either an integer x,
-     interpreted as itself or a pair (x,y) of an integer x and a naturel
-     number y interpreted as x/(y+1). *)
-
- Definition t := q_type.
-
- Definition zero: t := Qz BigZ.zero.
- Definition one: t := Qz BigZ.one.
- Definition minus_one: t := Qz BigZ.minus_one.
-
- Definition of_Z x: t := Qz (BigZ.of_Z x).
-
- Definition d_to_Z d := BigZ.Pos (BigN.succ d).
-
- Definition of_Q q: t := 
- match q with x # y =>
-  Qq (BigZ.of_Z x) (BigN.pred (BigN.of_N (Npos y)))
- end.
-
- Definition of_Qc q := of_Q (this q).
-
- Definition to_Q (q: t) := 
- match q with 
-  Qz x => BigZ.to_Z x # 1
- |Qq x y => BigZ.to_Z x # Z2P (BigN.to_Z (BigN.succ y))
- end.
-
- Definition to_Qc q := !!(to_Q q).
-
- Notation "[[ x ]]" := (to_Qc x).
-
- Notation "[ x ]" := (to_Q x).
-
- Theorem spec_to_Q: forall q: Q, [of_Q q] = q.
- intros (x,y); simpl.
- rewrite BigZ.spec_of_Z; auto.
- rewrite BigN.spec_succ; simpl. simpl.
- rewrite BigN.spec_pred; rewrite (BigN.spec_of_pos).
- replace (Zpos y - 1 + 1)%Z with (Zpos y); auto; ring.
- red; auto.
- Qed.
-
- Theorem spec_to_Qc: forall q, [[of_Qc q]] = q.
- intros (x, Hx); unfold of_Qc, to_Qc; simpl.
- apply Qc_decomp; simpl.
- intros; rewrite spec_to_Q; auto.
- Qed.
-
- Definition opp (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.opp zx)
-  | Qq nx dx => Qq (BigZ.opp nx) dx
-  end.
-
-
- Theorem spec_opp: forall q, ([opp q] = -[q])%Q.
- intros [z | x y]; simpl.
- rewrite BigZ.spec_opp; auto.
- rewrite BigZ.spec_opp; auto.
- Qed.
-
-
- Theorem spec_oppc: forall q, [[opp q]] = -[[q]].
- intros q; unfold Qcopp, to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- rewrite spec_opp.
- rewrite <- Qred_opp.
- rewrite Qred_involutive; auto.
- Qed.
-
- Definition compare (x y: t) :=
-  match x, y with
-  | Qz zx, Qz zy => BigZ.compare zx zy
-  | Qz zx, Qq ny dy => BigZ.compare (BigZ.mul zx (d_to_Z dy)) ny
-  | Qq nx dy, Qz zy => BigZ.compare nx (BigZ.mul zy (d_to_Z dy))
-  | Qq nx dx, Qq ny dy =>
-    BigZ.compare (BigZ.mul nx (d_to_Z dy)) (BigZ.mul ny (d_to_Z dx))
-  end.
-
- Theorem spec_compare: forall q1 q2,
-  compare q1 q2 = ([q1] ?= [q2])%Q.
- intros [z1 | x1 y1] [z2 | x2 y2]; unfold Qcompare; simpl.
- repeat rewrite Zmult_1_r.
- generalize (BigZ.spec_compare z1 z2); case BigZ.compare; intros H; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- rewrite Zmult_1_r.
- rewrite BigN.spec_succ.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (z1 * d_to_Z y2) x2)%bigZ; case BigZ.compare; 
-   intros H; rewrite <- H.
- rewrite BigZ.spec_mul; unfold d_to_Z; simpl.
- rewrite BigN.spec_succ.
- rewrite Zcompare_refl; auto.
- rewrite BigZ.spec_mul; unfold d_to_Z; simpl.
- rewrite BigN.spec_succ; auto.
- rewrite BigZ.spec_mul; unfold d_to_Z; simpl.
- rewrite BigN.spec_succ; auto.
- rewrite Zmult_1_r.
- rewrite BigN.spec_succ.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
- generalize (BigZ.spec_compare x1 (z2 * d_to_Z y1))%bigZ; case BigZ.compare;
-    rewrite BigZ.spec_mul; unfold d_to_Z; simpl;  
-    rewrite BigN.spec_succ; intros H; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- repeat rewrite BigN.spec_succ; auto.
- repeat rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (x1 * d_to_Z  y2)
-                  (x2 * d_to_Z y1))%bigZ; case BigZ.compare;
-    repeat rewrite BigZ.spec_mul; unfold d_to_Z; simpl;  
-    repeat rewrite BigN.spec_succ; intros H; auto.
- rewrite H; auto.
- rewrite Zcompare_refl; auto.
- Qed.
-
-
- Theorem spec_comparec: forall q1 q2,
-  compare q1 q2 = ([[q1]] ?= [[q2]]).
- unfold Qccompare, to_Qc. 
- intros q1 q2; rewrite spec_compare; simpl.
- apply Qcompare_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-(* Inv d > 0, Pour la forme normal unique on veut d > 1 *)
- Definition norm n d: t :=
-  if BigZ.eq_bool n BigZ.zero then zero
-  else
-    let gcd := BigN.gcd (BigZ.to_N n) d in
-    if BigN.eq_bool gcd BigN.one then Qq n (BigN.pred d)
-    else	
-      let n := BigZ.div n (BigZ.Pos gcd) in
-      let d := BigN.div d gcd in
-      if BigN.eq_bool d BigN.one then Qz n
-      else Qq n (BigN.pred d).
-
- Theorem spec_norm: forall n q, 
-    ((0 < BigN.to_Z q)%Z -> [norm n q] == [Qq n (BigN.pred q)])%Q.
- intros p q; unfold norm; intros Hq.
- assert (Hp := BigN.spec_pos (BigZ.to_N p)).
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; auto; rewrite BigZ.spec_0; intros H1.
-   red; simpl; rewrite H1; ring.
- case (Zle_lt_or_eq _ _ Hp); clear Hp; intros Hp.
- case (Zle_lt_or_eq _ _ 
-      (Zgcd_is_pos (BigN.to_Z (BigZ.to_N p)) (BigN.to_Z q))); intros H4.
- 2: generalize Hq; rewrite (Zgcd_inv_0_r _ _ (sym_equal H4)); auto with zarith.
- 2: red; simpl; auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_1; intros H2.
-   apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_1.
- red; simpl.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite Zmult_1_r.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite Z2P_correct; auto with zarith.
- rewrite spec_to_N; intros; rewrite Zgcd_div_swap; auto.
- rewrite H; ring.
- intros H3.
- red; simpl.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- assert (F: (0 < BigN.to_Z (q / BigN.gcd (BigZ.to_N p) q)%bigN)%Z).
-   rewrite BigN.spec_div; auto with zarith.
-   rewrite BigN.spec_gcd.
-   apply Zgcd_div_pos; auto.
-   rewrite BigN.spec_gcd; auto.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite Z2P_correct; auto.
- rewrite Z2P_correct; auto.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite spec_to_N; apply Zgcd_div_swap; auto.
- case H1; rewrite spec_to_N; rewrite <- Hp; ring.
- Qed.
-
- Theorem spec_normc: forall n q, 
-    (0 < BigN.to_Z q)%Z -> [[norm n q]] = [[Qq n (BigN.pred q)]].
- intros n q H; unfold to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_norm; auto.
- Qed.
-   
- Definition add (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.add zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.add (BigZ.mul zx (d_to_Z dy)) ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.add nx (BigZ.mul zy (d_to_Z dx))) dx
-  | Qq nx dx, Qq ny dy => 
-    let dx' := BigN.succ dx in
-    let dy' := BigN.succ dy in
-    let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy')) (BigZ.mul ny (BigZ.Pos dx')) in
-    let d := BigN.pred (BigN.mul dx' dy') in
-    Qq n d
-  end. 
-
- Theorem spec_d_to_Z: forall dy,
-     (BigZ.to_Z (d_to_Z dy) = BigN.to_Z dy + 1)%Z.
- intros dy; unfold d_to_Z; simpl.
- rewrite BigN.spec_succ; auto.
- Qed.
-
- Theorem spec_succ_pos: forall p,
-  (0 < BigN.to_Z (BigN.succ p))%Z.
- intros p; rewrite BigN.spec_succ;
-   generalize (BigN.spec_pos p); auto with zarith.
- Qed.
-
- Theorem spec_add x y: ([add x y] == [x] + [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qplus; simpl.
- rewrite BigZ.spec_add; repeat rewrite Zmult_1_r; auto.
-  apply Qeq_refl; auto.
- assert (F1:= BigN.spec_pos dy).
- rewrite Zmult_1_r.
- simpl; rewrite Z2P_correct; rewrite BigN.spec_succ; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul.
- rewrite spec_d_to_Z; apply Qeq_refl.
- assert (F1:= BigN.spec_pos dx).
- rewrite Zmult_1_r; rewrite Pmult_1_r.
- simpl; rewrite Z2P_correct; rewrite BigN.spec_succ; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul.
- rewrite spec_d_to_Z; apply Qeq_refl.
- repeat rewrite BigN.spec_succ.
- assert (Fx: (0 < BigN.to_Z dx + 1)%Z).
-   generalize (BigN.spec_pos dx); auto with zarith.
- assert (Fy: (0 < BigN.to_Z dy + 1)%Z).
-   generalize (BigN.spec_pos dy); auto with zarith.
- repeat rewrite BigN.spec_pred.
- rewrite BigZ.spec_add; repeat rewrite BigN.spec_mul;
-   repeat rewrite BigN.spec_succ.
- assert (tmp: forall x, (x-1+1 = x)%Z); [intros; ring | rewrite tmp; clear tmp].
- repeat rewrite Z2P_correct; auto.
- repeat rewrite BigZ.spec_mul; simpl.
- repeat rewrite BigN.spec_succ.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto; apply Qeq_refl.
- rewrite BigN.spec_mul; repeat rewrite BigN.spec_succ; auto with zarith.
- apply Zmult_lt_0_compat; auto.
- Qed.
-
- Theorem spec_addc x y: [[add x y]] = [[x]] + [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition add_norm (x y: t): t := 
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.add zx zy)
-  | Qz zx, Qq ny dy => 
-    let d := BigN.succ dy in
-    norm (BigZ.add (BigZ.mul zx (BigZ.Pos d)) ny) d 
-  | Qq nx dx, Qz zy =>
-    let d := BigN.succ dx in
-    norm (BigZ.add (BigZ.mul zy (BigZ.Pos d)) nx) d
-  | Qq nx dx, Qq ny dy =>
-    let dx' := BigN.succ dx in
-    let dy' := BigN.succ dy in
-    let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy')) (BigZ.mul ny (BigZ.Pos dx')) in
-    let d := BigN.mul dx' dy' in
-    norm n d 
-  end.
-
- Theorem spec_add_norm x y: ([add_norm x y] == [x] + [y])%Q.
- intros x y; rewrite <- spec_add.
- unfold add_norm, add; case x; case y.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X (BigN.pred Y)]);
-  [apply spec_norm | idtac]
- end.
- rewrite BigN.spec_succ; generalize (BigN.spec_pos n); auto with zarith.
- simpl.
- repeat rewrite BigZ.spec_add.
- repeat rewrite BigZ.spec_mul; simpl.
- rewrite BigN.succ_pred; try apply Qeq_refl; apply lt_0_succ.
- intros p1 n p2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X (BigN.pred Y)]);
-  [apply spec_norm | idtac]
- end.
- rewrite BigN.spec_succ; generalize (BigN.spec_pos p2); auto with zarith.
- simpl.
- repeat rewrite BigZ.spec_add.
- repeat rewrite BigZ.spec_mul; simpl.
- rewrite BinInt.Zplus_comm.
- rewrite BigN.succ_pred; try apply Qeq_refl; apply lt_0_succ.
- intros p1 q1 p2 q2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X (BigN.pred Y)]);
-  [apply spec_norm | idtac]
- end; try apply Qeq_refl.
- rewrite BigN.spec_mul.
- apply Zmult_lt_0_compat; apply spec_succ_pos.
- Qed.
-
- Theorem spec_add_normc x y: [[add_norm x y]] = [[x]] + [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add_norm.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
- 
- Definition sub (x y: t): t := add x (opp y).
-
- Theorem spec_sub x y: ([sub x y] == [x] - [y])%Q.
- intros x y; unfold sub; rewrite spec_add.
- rewrite spec_opp; ring.
- Qed.
-
- Theorem spec_subc x y: [[sub x y]] = [[x]] - [[y]].
- intros x y; unfold sub; rewrite spec_addc.
- rewrite spec_oppc; ring.
- Qed.
-
- Definition sub_norm x y := add_norm x (opp y).
-
- Theorem spec_sub_norm x y: ([sub_norm x y] == [x] - [y])%Q.
- intros x y; unfold sub_norm; rewrite spec_add_norm.
- rewrite spec_opp; ring.
- Qed.
-
- Theorem spec_sub_normc x y: [[sub_norm x y]] = [[x]] - [[y]].
- intros x y; unfold sub_norm; rewrite spec_add_normc.
- rewrite spec_oppc; ring.
- Qed.
-
-
- Definition mul (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.mul zx ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.mul nx zy) dx
-  | Qq nx dx, Qq ny dy => 
-    Qq (BigZ.mul nx ny) (BigN.pred (BigN.mul (BigN.succ dx) (BigN.succ dy)))
-  end.
-
- Theorem spec_mul x y: ([mul x y] == [x] * [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qmult; simpl.
- rewrite BigZ.spec_mul; repeat rewrite Zmult_1_r; auto.
-  apply Qeq_refl; auto.
- rewrite BigZ.spec_mul; apply Qeq_refl.
- rewrite BigZ.spec_mul; rewrite Pmult_1_r; auto.
-  apply Qeq_refl; auto.
- assert (F1:= spec_succ_pos dx).
- assert (F2:= spec_succ_pos dy).
- rewrite BigN.succ_pred.
- rewrite BigN.spec_mul; rewrite BigZ.spec_mul.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto; apply Qeq_refl.
- rewrite Nspec_lt, BigN.spec_0, BigN.spec_mul; auto.
- apply Zmult_lt_0_compat; apply spec_succ_pos.
- Qed.
-
- Theorem spec_mulc x y: [[mul x y]] = [[x]] * [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition mul_norm (x y: t): t := 
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy =>
-    if BigZ.eq_bool zx BigZ.zero then zero
-    else	
-      let d := BigN.succ dy in
-      let gcd := BigN.gcd (BigZ.to_N zx) d in
-      if BigN.eq_bool gcd BigN.one then Qq (BigZ.mul zx ny) dy
-      else 
-        let zx := BigZ.div zx (BigZ.Pos gcd) in
-        let d := BigN.div d gcd in
-        if BigN.eq_bool d BigN.one then Qz (BigZ.mul zx ny)
-        else Qq (BigZ.mul zx ny) (BigN.pred d)
-  | Qq nx dx, Qz zy =>   
-    if BigZ.eq_bool zy BigZ.zero then zero
-    else	
-      let d := BigN.succ dx in
-      let gcd := BigN.gcd (BigZ.to_N zy) d in
-      if BigN.eq_bool gcd BigN.one then Qq (BigZ.mul zy nx) dx
-      else 
-        let zy := BigZ.div zy (BigZ.Pos gcd) in
-        let d := BigN.div d gcd in
-        if BigN.eq_bool d BigN.one then Qz (BigZ.mul zy nx)
-        else Qq (BigZ.mul zy nx) (BigN.pred d)
-  | Qq nx dx, Qq ny dy => 
-    norm (BigZ.mul nx ny) (BigN.mul (BigN.succ dx) (BigN.succ dy))
-  end.
-
- Theorem spec_mul_norm x y: ([mul_norm x y] == [x] * [y])%Q.
- intros x y; rewrite <- spec_mul.
- unfold mul_norm, mul; case x; case y.
-  intros; apply Qeq_refl.
- intros p1 n p2.
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; unfold zero, to_Q; repeat rewrite BigZ.spec_0; intros H.
- rewrite BigZ.spec_mul; rewrite H; red; auto.
- assert (F: (0 < BigN.to_Z (BigZ.to_N p2))%Z).
-  case (Zle_lt_or_eq _ _ (BigN.spec_pos (BigZ.to_N p2))); auto.
-  intros H1; case H; rewrite spec_to_N; rewrite <- H1; ring.
- assert (F1: (0 < BigN.to_Z (BigN.succ n))%Z).
-  rewrite BigN.spec_succ; generalize (BigN.spec_pos n); auto with zarith.
- assert (F2: (0 < Zgcd (BigN.to_Z (BigZ.to_N p2)) (BigN.to_Z (BigN.succ n)))%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos (BigN.to_Z (BigZ.to_N p2))
-                                       (BigN.to_Z (BigN.succ n)))); intros H3; auto.
-   generalize F; rewrite (Zgcd_inv_0_l _ _ (sym_equal H3)); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; intros H1.
-  intros; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd;
-   auto with zarith.
- intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite spec_to_N.
- rewrite Zmult_1_r; repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p1)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite (spec_to_N p2).
- case (Zle_lt_or_eq _ _
-       (BigN.spec_pos  (BigN.succ n / 
-                         BigN.gcd (BigZ.to_N p2) 
-                                  (BigN.succ n)))%bigN); intros F3.
- rewrite BigN.succ_pred; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p1)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto; try ring.
- rewrite Nspec_lt, BigN.spec_0; auto.
- apply False_ind; generalize F1.
- rewrite (Zdivide_Zdiv_eq
-          (Zgcd (BigN.to_Z (BigZ.to_N p2)) (BigN.to_Z (BigN.succ n)))
-           (BigN.to_Z (BigN.succ n))); auto.
- generalize F3; rewrite BigN.spec_div; rewrite BigN.spec_gcd;
-   auto with zarith.
- intros HH; rewrite <- HH; auto with zarith.
- assert (FF:= Zgcd_is_gcd (BigN.to_Z (BigZ.to_N p2))
-           (BigN.to_Z (BigN.succ n))); inversion FF; auto.
- intros p1 p2 n.
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; unfold zero, to_Q; repeat rewrite BigZ.spec_0; intros H.
- rewrite BigZ.spec_mul; rewrite H; red; simpl; ring.
- assert (F: (0 < BigN.to_Z (BigZ.to_N p1))%Z).
-  case (Zle_lt_or_eq _ _ (BigN.spec_pos (BigZ.to_N p1))); auto.
-  intros H1; case H; rewrite spec_to_N; rewrite <- H1; ring.
- assert (F1: (0 < BigN.to_Z (BigN.succ n))%Z).
-  rewrite BigN.spec_succ; generalize (BigN.spec_pos n); auto with zarith.
- assert (F2: (0 < Zgcd (BigN.to_Z (BigZ.to_N p1)) (BigN.to_Z (BigN.succ n)))%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos (BigN.to_Z (BigZ.to_N p1))
-                                       (BigN.to_Z (BigN.succ n)))); intros H3; auto.
-   generalize F; rewrite (Zgcd_inv_0_l _ _ (sym_equal H3)); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; intros H1.
-  intros; repeat rewrite BigZ.spec_mul; rewrite Zmult_comm; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd;
-   auto with zarith.
- intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite spec_to_N.
- rewrite Zmult_1_r; repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p2)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite (spec_to_N p1).
- case (Zle_lt_or_eq _ _
-       (BigN.spec_pos  (BigN.succ n / 
-                         BigN.gcd (BigZ.to_N p1) 
-                                  (BigN.succ n)))%bigN); intros F3.
- rewrite BigN.succ_pred; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p2)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto; try ring.
- rewrite Nspec_lt, BigN.spec_0; auto.
- apply False_ind; generalize F1.
- rewrite (Zdivide_Zdiv_eq
-          (Zgcd (BigN.to_Z (BigZ.to_N p1)) (BigN.to_Z (BigN.succ n)))
-           (BigN.to_Z (BigN.succ n))); auto.
- generalize F3; rewrite BigN.spec_div; rewrite BigN.spec_gcd;
-   auto with zarith.
- intros HH; rewrite <- HH; auto with zarith.
- assert (FF:= Zgcd_is_gcd (BigN.to_Z (BigZ.to_N p1))
-           (BigN.to_Z (BigN.succ n))); inversion FF; auto.
- intros p1 n1 p2 n2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X (BigN.pred Y)]);
-  [apply spec_norm | idtac]
- end; try  apply Qeq_refl.
- rewrite BigN.spec_mul.
- apply Zmult_lt_0_compat; rewrite BigN.spec_succ;
-    generalize (BigN.spec_pos n1) (BigN.spec_pos n2); auto with zarith.
- Qed.
-
- Theorem spec_mul_normc x y: [[mul_norm x y]] = [[x]] * [[y]].
- intros x y; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul_norm.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition inv (x: t): t := 
-  match x with
-  | Qz (BigZ.Pos n) => 
-    if BigN.eq_bool n BigN.zero then zero else Qq BigZ.one (BigN.pred n)
-  | Qz (BigZ.Neg n) => 
-    if BigN.eq_bool n BigN.zero then zero else Qq BigZ.minus_one (BigN.pred n)
-  | Qq (BigZ.Pos n) d => 
-    if BigN.eq_bool n BigN.zero then zero else Qq (BigZ.Pos (BigN.succ d)) (BigN.pred n)
-  | Qq (BigZ.Neg n) d => 
-    if BigN.eq_bool n BigN.zero then zero else Qq (BigZ.Neg (BigN.succ d)) (BigN.pred n)
-  end.
-
- Theorem spec_inv x: ([inv x] == /[x])%Q.
- intros [ [x | x] | [nx | nx] dx]; unfold inv.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z x)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); auto with zarith.
- unfold to_Q; rewrite BigZ.spec_1.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- red; unfold Qinv; simpl.
- generalize F; case BigN.to_Z; auto with zarith.
- intros p Hp; discriminate Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z x)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); auto with zarith.
- red; unfold Qinv; simpl.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- generalize F; case BigN.to_Z; simpl; auto with zarith.
- intros p Hp; discriminate Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z nx)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos nx)); auto with zarith.
- red; unfold Qinv; simpl.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite BigN.spec_succ; rewrite Z2P_correct; auto with zarith.
- generalize F; case BigN.to_Z; auto with zarith.
- intros p Hp; discriminate Hp.
- generalize (BigN.spec_pos dx); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z nx)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos nx)); auto with zarith.
- red; unfold Qinv; simpl.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite BigN.spec_succ; rewrite Z2P_correct; auto with zarith.
- generalize F; case BigN.to_Z; auto with zarith.
- simpl; intros.
- match goal with  |- (?X = Zneg ?Y)%Z => 
-   replace (Zneg Y) with (-(Zpos Y))%Z;
-   try rewrite Z2P_correct; auto with zarith
- end.
- rewrite Zpos_mult_morphism; 
-   rewrite Z2P_correct; auto with zarith; try ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p Hp; discriminate Hp.
- generalize (BigN.spec_pos dx); auto with zarith.
- Qed.
-
- Theorem spec_invc x: [[inv x]] =  /[[x]].
- intros x; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-Definition inv_norm x := 
- match x with
- | Qz (BigZ.Pos n) => 
-      if BigN.eq_bool n BigN.zero then zero else
-      if BigN.eq_bool n BigN.one then x else Qq BigZ.one (BigN.pred n)
- | Qz (BigZ.Neg n) => 
-      if BigN.eq_bool n BigN.zero then zero  else
-      if BigN.eq_bool n BigN.one then x else Qq BigZ.minus_one (BigN.pred n)
- | Qq (BigZ.Pos n) d => let d := BigN.succ d in 
-                  if BigN.eq_bool n BigN.zero then zero else
-                  if BigN.eq_bool n BigN.one then Qz (BigZ.Pos d) 
-                     else Qq (BigZ.Pos d) (BigN.pred n)
- | Qq (BigZ.Neg n) d => let d := BigN.succ d in 
-                  if BigN.eq_bool n BigN.zero then zero else
-                  if BigN.eq_bool n BigN.one then Qz (BigZ.Neg d) 
-                     else Qq (BigZ.Neg d) (BigN.pred n)
- end.
-
- Theorem spec_inv_norm x: ([inv_norm x] == /[x])%Q.
- intros x; rewrite <- spec_inv.
- (case x; clear x); [intros [x | x] | intros nx dx];
-  unfold inv_norm, inv.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  apply Qeq_refl.
- assert (F: (0 < BigN.to_Z x)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; intros H1.
- red; simpl.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite Z2P_correct; try rewrite H1; auto with zarith.
-  apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  apply Qeq_refl.
- assert (F: (0 < BigN.to_Z x)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; intros H1.
- red; simpl.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite Z2P_correct; try rewrite H1; auto with zarith.
-  apply Qeq_refl.
- case nx; clear nx; intros nx.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; intros H1.
- red; simpl.
- rewrite BigN.succ_pred; try rewrite H1; auto with zarith.
- rewrite Nspec_lt, BigN.spec_0, H1; auto with zarith.
- apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; intros H1.
- red; simpl.
- rewrite BigN.succ_pred; try rewrite H1; auto with zarith.
- rewrite Nspec_lt, BigN.spec_0, H1; auto with zarith.
- apply Qeq_refl.
- Qed.
-
-
- Definition div x y := mul x (inv y).
-
- Theorem spec_div x y: ([div x y] == [x] / [y])%Q.
- intros x y; unfold div; rewrite spec_mul; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Theorem spec_divc x y: [[div x y]] = [[x]] / [[y]].
- intros x y; unfold div; rewrite spec_mulc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto. 
- Qed.
-
- Definition div_norm x y := mul_norm x (inv y).
-
- Theorem spec_div_norm x y: ([div_norm x y] == [x] / [y])%Q.
- intros x y; unfold div_norm; rewrite spec_mul_norm; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- Qed.
-
- Theorem spec_div_normc x y: [[div_norm x y]] = [[x]] / [[y]].
- intros x y; unfold div_norm; rewrite spec_mul_normc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto.
- Qed.
-
-
- Definition square (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.square zx)
-  | Qq nx dx => Qq (BigZ.square nx) (BigN.pred (BigN.square (BigN.succ dx)))
-  end.
-
- Theorem spec_square x: ([square x] == [x] ^ 2)%Q.
- intros [ x | nx dx]; unfold square.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- assert (F: (0 < BigN.to_Z (BigN.succ dx))%Z).
-   rewrite BigN.spec_succ;
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos dx)); auto with zarith.
- assert (F1 : (0 < BigN.to_Z (BigN.square (BigN.succ dx)))%Z).
-   rewrite BigN.spec_square; apply Zmult_lt_0_compat;
-     auto with zarith.
- rewrite BigN.succ_pred by (rewrite Nspec_lt, BigN.spec_0; auto).
- rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto with zarith.
- repeat rewrite BigN.spec_succ; auto with zarith.
- rewrite BigN.spec_square; auto with zarith.
- repeat rewrite BigN.spec_succ; auto with zarith.
- Qed.
-
- Theorem spec_squarec x: [[square x]] =  [[x]]^2.
- intros x; unfold to_Qc.
- apply trans_equal with (!! ([x]^2)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_square.
- simpl Qcpower.
- replace (!! [x] * 1) with (!![x]); try ring.
- simpl.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition power_pos (x: t) p: t :=
-  match x with
-  | Qz zx => Qz (BigZ.power_pos zx p)
-  | Qq nx dx => Qq (BigZ.power_pos nx p) (BigN.pred (BigN.power_pos (BigN.succ dx) p))
-  end.
-
-
- Theorem spec_power_pos x p: ([power_pos x p] == [x] ^ Zpos p)%Q.
- Proof.
- intros [x | nx dx] p; unfold power_pos.
-   unfold power_pos; red; simpl.
-   generalize (Qpower_decomp p (BigZ.to_Z x) 1).
-   unfold Qeq; simpl.
-   rewrite Zpower_pos_1_l; simpl Z2P.
-   rewrite Zmult_1_r.
-   intros H; rewrite H.
-   rewrite BigZ.spec_power_pos; simpl; ring.
- assert (F1: (0 < BigN.to_Z (BigN.succ dx))%Z).
-     rewrite BigN.spec_succ;
-     generalize (BigN.spec_pos dx); auto with zarith.
- assert (F2: (0 < BigN.to_Z (BigN.succ dx) ^ ' p)%Z).
-  unfold Zpower; apply Zpower_pos_pos; auto.
- unfold power_pos; red; simpl.
- rewrite BigN.succ_pred, BigN.spec_power_pos.
- rewrite Z2P_correct; auto.
- generalize (Qpower_decomp p (BigZ.to_Z nx) 
-               (Z2P (BigN.to_Z (BigN.succ dx)))).
- unfold Qeq; simpl.
- repeat rewrite Z2P_correct; auto.
- unfold Qeq; simpl; intros HH.
- rewrite HH.
- rewrite BigZ.spec_power_pos; simpl; ring.
- rewrite Nspec_lt, BigN.spec_0, BigN.spec_power_pos; auto.
- Qed.
-
- Theorem spec_power_posc x p: [[power_pos x p]] = [[x]] ^ nat_of_P p.
- intros x p; unfold to_Qc.
- apply trans_equal with (!! ([x]^Zpos p)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_power_pos.
- pattern p; apply Pind; clear p.
- simpl; ring.
- intros p Hrec.
- rewrite nat_of_P_succ_morphism; simpl Qcpower.
- rewrite <- Hrec.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _;
- unfold this.
- apply Qred_complete.
- assert (F: [x] ^ ' Psucc p == [x] *   [x] ^ ' p).
-  simpl; case x; simpl; clear x Hrec.
-  intros x; simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  intros nx dx; simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  assert (F1: (0 < BigN.to_Z (BigN.succ dx))%Z).
-    rewrite BigN.spec_succ; generalize (BigN.spec_pos dx); 
-      auto with zarith.
-  repeat rewrite Zpos_mult_morphism.
-  repeat rewrite Z2P_correct; auto.
-  2: apply Zpower_pos_pos; auto.
-  2: apply Zpower_pos_pos; auto.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
- rewrite F.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
-End Qp.
diff --git a/theories/Numbers/Rational/BigQ/QvMake.v b/theories/Numbers/Rational/BigQ/QvMake.v
deleted file mode 100644
index 4523e241..00000000
--- a/theories/Numbers/Rational/BigQ/QvMake.v
+++ /dev/null
@@ -1,1151 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-(*            Benjamin Gregoire, Laurent Thery, INRIA, 2007             *)
-(************************************************************************)
-
-(*i $Id: QvMake.v 11027 2008-06-01 13:28:59Z letouzey $ i*)
-
-Require Import Bool.
-Require Import ZArith.
-Require Import Znumtheory.
-Require Import BigNumPrelude.
-Require Import Arith.
-Require Export BigN.
-Require Export BigZ.
-Require Import QArith.
-Require Import Qcanon.
-Require Import Qpower.
-Require Import QMake_base.
-
-Module Qv.
-
- Import BinInt Zorder.
- Open Local Scope Q_scope.
- Open Local Scope Qc_scope.
-
- (** The notation of a rational number is either an integer x,
-     interpreted as itself or a pair (x,y) of an integer x and a naturel
-     number y interpreted as x/y. All functions maintain the invariant
-     that y is never zero. *)
-
- Definition t := q_type.
-
- Definition zero: t := Qz BigZ.zero.
- Definition one: t := Qz BigZ.one.
- Definition minus_one: t := Qz BigZ.minus_one.
-
- Definition of_Z x: t := Qz (BigZ.of_Z x).
-
- Definition wf x := 
-  match x with
-  | Qz _ => True
-  | Qq n d => if BigN.eq_bool d BigN.zero then False else True
-  end.
-
- Definition of_Q q: t := 
- match q with x # y =>
-  Qq (BigZ.of_Z x) (BigN.of_N (Npos y))
- end.
-
- Definition of_Qc q := of_Q (this q).
-
- Definition to_Q (q: t) := 
- match q with 
-  Qz x => BigZ.to_Z x # 1
- |Qq x y => BigZ.to_Z x # Z2P (BigN.to_Z y)
- end.
-
- Definition to_Qc q := !!(to_Q q).
-
- Notation "[[ x ]]" := (to_Qc x).
-
- Notation "[ x ]" := (to_Q x).
-
- Theorem spec_to_Q: forall q: Q, [of_Q q] = q.
- intros (x,y); simpl.
- rewrite BigZ.spec_of_Z; simpl.
- rewrite (BigN.spec_of_pos); auto.
- Qed.
-
- Theorem spec_to_Qc: forall q, [[of_Qc q]] = q.
- intros (x, Hx); unfold of_Qc, to_Qc; simpl.
- apply Qc_decomp; simpl.
- intros; rewrite spec_to_Q; auto.
- Qed.
-
- Definition opp (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.opp zx)
-  | Qq nx dx => Qq (BigZ.opp nx) dx
-  end.
-
- Theorem wf_opp: forall x, wf x -> wf (opp x).
- intros [zx | nx dx]; unfold opp, wf; auto.
- Qed.
-
- Theorem spec_opp: forall q, ([opp q] = -[q])%Q.
- intros [z | x y]; simpl.
- rewrite BigZ.spec_opp; auto.
- rewrite BigZ.spec_opp; auto.
- Qed.
-
- Theorem spec_oppc: forall q, [[opp q]] = -[[q]].
- intros q; unfold Qcopp, to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- rewrite spec_opp.
- rewrite <- Qred_opp.
- rewrite Qred_involutive; auto.
- Qed.
-
- (* Les fonctions doivent assurer que si leur arguments sont valides alors
-    le resultat est correct et valide (si c'est un Q) 
- *)
-
- Definition compare (x y: t) :=
-  match x, y with
-  | Qz zx, Qz zy => BigZ.compare zx zy
-  | Qz zx, Qq ny dy => BigZ.compare (BigZ.mul zx (BigZ.Pos dy)) ny
-  | Qq nx dx, Qz zy => BigZ.compare nx (BigZ.mul zy (BigZ.Pos dx))  
-  | Qq nx dx, Qq ny dy => BigZ.compare (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx))
-  end.
-
- Theorem spec_compare: forall q1 q2, wf q1 -> wf q2 ->
-  compare q1 q2 = ([q1] ?= [q2])%Q.
- intros [z1 | x1 y1] [z2 | x2 y2]; 
-   unfold Qcompare, compare, to_Q, Qnum, Qden, wf.
- repeat rewrite Zmult_1_r.
- generalize (BigZ.spec_compare z1 z2); case BigZ.compare; intros H; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- rewrite Zmult_1_r.
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool.
-   intros _ _ HH; case HH.
- rewrite BigN.spec_0; intros HH _ _.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (z1 * BigZ.Pos y2) x2)%bigZ; case BigZ.compare;
-   rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH _ _.
- rewrite Z2P_correct; auto with zarith.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
- rewrite Zmult_1_r.
- generalize (BigZ.spec_compare x1 (z2 * BigZ.Pos y1))%bigZ; case BigZ.compare;
-   rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- generalize (BigN.spec_eq_bool y1 BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH1. 
- generalize (BigN.spec_eq_bool y2 BigN.zero);
-   case BigN.eq_bool.
-   intros _ _ HH; case HH.
- rewrite BigN.spec_0; intros HH2 _ _.
- repeat rewrite Z2P_correct.
-  2: generalize (BigN.spec_pos y1); auto with zarith.
-  2: generalize (BigN.spec_pos y2); auto with zarith.
- generalize (BigZ.spec_compare (x1 * BigZ.Pos y2) 
-                               (x2 * BigZ.Pos y1))%bigZ; case BigZ.compare;
-   repeat rewrite BigZ.spec_mul; simpl; intros H; apply sym_equal; auto.
- rewrite H; rewrite Zcompare_refl; auto.
- Qed.
-
- Theorem spec_comparec: forall q1 q2, wf q1 -> wf q2 ->
-  compare q1 q2 = ([[q1]] ?= [[q2]]).
- unfold Qccompare, to_Qc. 
- intros q1 q2 Hq1 Hq2; rewrite spec_compare; simpl; auto.
- apply Qcompare_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition norm n d: t :=
-  if BigZ.eq_bool n BigZ.zero then zero
-  else
-    let gcd := BigN.gcd (BigZ.to_N n) d in
-    if BigN.eq_bool gcd BigN.one then Qq n d
-    else	
-      let n := BigZ.div n (BigZ.Pos gcd) in
-      let d := BigN.div d gcd in
-      if BigN.eq_bool d BigN.one then Qz n
-      else Qq n d.
-
- Theorem wf_norm: forall n q,
-   (BigN.to_Z q <> 0)%Z -> wf (norm n q).
- intros p q; unfold norm, wf; intros Hq.
- assert (Hp := BigN.spec_pos (BigZ.to_N p)).
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; auto; rewrite BigZ.spec_0; intros H1.
- simpl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_1.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- set (a := BigN.to_Z (BigZ.to_N p)).
- set (b := (BigN.to_Z q)).
- assert (F: (0 < Zgcd a b)%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos a b)); auto.
-   intros HH1; case Hq; apply (Zgcd_inv_0_r _ _ (sym_equal HH1)).
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; auto; fold a; fold b.
- intros H; case Hq; fold b.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite H; auto with zarith.
- assert (F1:= Zgcd_is_gcd a b); inversion F1; auto.
- Qed.
- 
- Theorem spec_norm: forall n q, 
-    ((0 < BigN.to_Z q)%Z -> [norm n q] == [Qq n q])%Q.
- intros p q; unfold norm; intros Hq.
- assert (Hp := BigN.spec_pos (BigZ.to_N p)).
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; auto; rewrite BigZ.spec_0; intros H1.
-   red; simpl; rewrite H1; ring.
- case (Zle_lt_or_eq _ _ Hp); clear Hp; intros Hp.
- case (Zle_lt_or_eq _ _ 
-      (Zgcd_is_pos (BigN.to_Z (BigZ.to_N p)) (BigN.to_Z q))); intros H4.
- 2: generalize Hq; rewrite (Zgcd_inv_0_r _ _ (sym_equal H4)); auto with zarith.
- 2: red; simpl; auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_1; intros H2.
-   apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_1.
- red; simpl.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite Zmult_1_r.
- rewrite Z2P_correct; auto with zarith.
- rewrite spec_to_N; intros; rewrite Zgcd_div_swap; auto.
- rewrite H; ring.
- intros H3.
- red; simpl.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- assert (F: (0 < BigN.to_Z (q / BigN.gcd (BigZ.to_N p) q)%bigN)%Z).
-   rewrite BigN.spec_div; auto with zarith.
-   rewrite BigN.spec_gcd.
-   apply Zgcd_div_pos; auto.
-   rewrite BigN.spec_gcd; auto.
- rewrite Z2P_correct; auto.
- rewrite Z2P_correct; auto.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; auto with zarith.
- rewrite spec_to_N; apply Zgcd_div_swap; auto.
- case H1; rewrite spec_to_N; rewrite <- Hp; ring.
- Qed.
-
- Theorem spec_normc: forall n q, 
-    (0 < BigN.to_Z q)%Z -> [[norm n q]] = [[Qq n q]].
- intros n q H; unfold to_Qc, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_norm; auto.
- Qed.
-      
- Definition add (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.add zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.add nx (BigZ.mul zy (BigZ.Pos dx))) dx
-  | Qq nx dx, Qq ny dy => 
-    let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-    let d := BigN.mul dx dy in
-    Qq n d
-  end.
-
- Theorem wf_add: forall x y, wf x -> wf y -> wf (add x y).
- intros [zx | nx dx] [zy | ny dy]; unfold add, wf; auto.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_mul.
- intros H1 H2 H3.
- case (Zmult_integral _ _ H1); auto with zarith.
- Qed.
-
- Theorem spec_add x y: wf x -> wf y ->
-  ([add x y] == [x] + [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qplus; simpl.
- rewrite BigZ.spec_add; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- assert (F1:= BigN.spec_pos dy).
- rewrite Zmult_1_r.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool.
-   intros _ _ HH; case HH.
- rewrite BigN.spec_0; intros HH _ _.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul.
- simpl; apply Qeq_refl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH _ _.
- assert (F1:= BigN.spec_pos dx).
- rewrite Zmult_1_r; rewrite Pmult_1_r.
- simpl; rewrite Z2P_correct; auto with zarith.
- rewrite BigZ.spec_add; rewrite BigZ.spec_mul; simpl.
- apply Qeq_refl.
- generalize (BigN.spec_eq_bool dx BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH1.
- generalize (BigN.spec_eq_bool dy BigN.zero);
-   case BigN.eq_bool.
-   intros _ _ HH; case HH.
- rewrite BigN.spec_0; intros HH2 _ _.
- assert (Fx: (0 < BigN.to_Z dx)%Z).
-   generalize (BigN.spec_pos dx); auto with zarith.
- assert (Fy: (0 < BigN.to_Z dy)%Z).
-   generalize (BigN.spec_pos dy); auto with zarith.
- rewrite BigZ.spec_add; repeat rewrite BigN.spec_mul.
- red; simpl.
- rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto.
- repeat rewrite BigZ.spec_mul; simpl; auto.
- apply Zmult_lt_0_compat; auto.
- Qed.
-
- Theorem spec_addc x y: wf x -> wf y ->
-  [[add x y]] = [[x]] + [[y]].
- intros x y H1 H2; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition add_norm (x y: t): t := 
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.add zx zy)
-  | Qz zx, Qq ny dy => 
-    norm (BigZ.add (BigZ.mul zx (BigZ.Pos dy)) ny) dy 
-  | Qq nx dx, Qz zy =>
-    norm (BigZ.add (BigZ.mul zy (BigZ.Pos dx)) nx) dx
-  | Qq nx dx, Qq ny dy =>
-    let n := BigZ.add (BigZ.mul nx (BigZ.Pos dy)) (BigZ.mul ny (BigZ.Pos dx)) in
-    let d := BigN.mul dx dy in
-    norm n d 
-  end.
-
- Theorem wf_add_norm: forall x y, wf x -> wf y -> wf (add_norm x y).
- intros [zx | nx dx] [zy | ny dy]; unfold add_norm; auto.
- intros HH1 HH2; apply wf_norm.
- generalize HH2; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- intros HH1 HH2; apply wf_norm.
- generalize HH1; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- intros HH1 HH2; apply wf_norm.
- rewrite BigN.spec_mul; intros HH3.
- case (Zmult_integral _ _ HH3).
- generalize HH1; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- generalize HH2; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- Qed.
-
- Theorem spec_add_norm x y: wf x -> wf y ->
-  ([add_norm x y] == [x] + [y])%Q.
- intros x y H1 H2; rewrite <- spec_add; auto.
- generalize H1 H2; unfold add_norm, add, wf; case x; case y; clear H1 H2.
-  intros; apply Qeq_refl.
- intros p1 n p2 _.
- generalize (BigN.spec_eq_bool n BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH _.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- generalize (BigN.spec_pos n); auto with zarith.
- simpl.
- repeat rewrite BigZ.spec_add.
- repeat rewrite BigZ.spec_mul; simpl.
- apply Qeq_refl.
- intros p1 n p2.
- generalize (BigN.spec_eq_bool p2 BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH _ _.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end.
- generalize (BigN.spec_pos p2); auto with zarith.
- simpl.
- repeat rewrite BigZ.spec_add.
- repeat rewrite BigZ.spec_mul; simpl.
- rewrite Zplus_comm.
- apply Qeq_refl.
- intros p1 q1 p2 q2.
- generalize (BigN.spec_eq_bool q2 BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH1 _.
- generalize (BigN.spec_eq_bool q1 BigN.zero);
-   case BigN.eq_bool.
-   intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH2 _.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end; try apply Qeq_refl.
- rewrite BigN.spec_mul.
- apply Zmult_lt_0_compat.
-  generalize (BigN.spec_pos q2); auto with zarith.
-  generalize (BigN.spec_pos q1); auto with zarith.
- Qed.
-
- Theorem spec_add_normc x y: wf x -> wf y ->
-  [[add_norm x y]] = [[x]] + [[y]].
- intros x y Hx Hy; unfold to_Qc.
- apply trans_equal with (!! ([x] + [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_add_norm; auto.
- unfold Qcplus, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qplus_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition sub x y := add x (opp y).
-
- Theorem wf_sub x y: wf x -> wf y -> wf (sub x y).
- intros x y Hx Hy; unfold sub; apply wf_add; auto.
- apply wf_opp; auto.
- Qed.
-
- Theorem spec_sub x y: wf x -> wf y ->
-  ([sub x y] == [x] - [y])%Q.
- intros x y Hx Hy; unfold sub; rewrite spec_add; auto.
- rewrite spec_opp; ring.
- apply wf_opp; auto.
- Qed.
-
- Theorem spec_subc x y: wf x -> wf y ->
-   [[sub x y]] = [[x]] - [[y]].
- intros x y Hx Hy; unfold sub; rewrite spec_addc; auto.
- rewrite spec_oppc; ring.
- apply wf_opp; auto.
- Qed.
-
- Definition sub_norm x y := add_norm x (opp y).
-
- Theorem wf_sub_norm x y: wf x -> wf y -> wf (sub_norm x y).
- intros x y Hx Hy; unfold sub_norm; apply wf_add_norm; auto.
- apply wf_opp; auto.
- Qed.
-
- Theorem spec_sub_norm x y: wf x -> wf y ->
-  ([sub_norm x y] == [x] - [y])%Q.
- intros x y Hx Hy; unfold sub_norm; rewrite spec_add_norm; auto.
- rewrite spec_opp; ring.
- apply wf_opp; auto.
- Qed.
-
- Theorem spec_sub_normc x y: wf x -> wf y ->
-   [[sub_norm x y]] = [[x]] - [[y]].
- intros x y Hx Hy; unfold sub_norm; rewrite spec_add_normc; auto.
- rewrite spec_oppc; ring.
- apply wf_opp; auto.
- Qed.
-
- Definition mul (x y: t): t :=
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy => Qq (BigZ.mul zx ny) dy
-  | Qq nx dx, Qz zy => Qq (BigZ.mul nx zy) dx
-  | Qq nx dx, Qq ny dy => 
-    Qq (BigZ.mul nx ny) (BigN.mul dx dy)
-  end.
-
- Theorem wf_mul: forall x y, wf x -> wf y -> wf (mul x y).
- intros [zx | nx dx] [zy | ny dy]; unfold mul, wf; auto.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_mul.
- intros H1 H2 H3.
- case (Zmult_integral _ _ H1); auto with zarith.
- Qed.
-
- Theorem spec_mul x y: wf x -> wf y -> ([mul x y] == [x] * [y])%Q.
- intros [x | nx dx] [y | ny dy]; unfold Qmult; simpl.
- rewrite BigZ.spec_mul; repeat rewrite Zmult_1_r; auto.
-  intros; apply Qeq_refl; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- intros _ _ HH; case HH.
- rewrite BigN.spec_0; intros HH1 _ _.
- rewrite BigZ.spec_mul; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- intros _ HH; case HH.
- rewrite BigN.spec_0; intros HH1 _ _.
- rewrite BigZ.spec_mul; rewrite Pmult_1_r.
- apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- intros _ HH; case HH.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- intros _ _ _ HH; case HH.
- rewrite BigN.spec_0; intros H1 H2 _ _.
- rewrite BigZ.spec_mul; rewrite BigN.spec_mul.
- assert (tmp: 
-  (forall a b, 0 < a -> 0 < b -> Z2P (a * b) = (Z2P a * Z2P b)%positive)%Z).
-  intros [|a|a] [|b|b]; simpl; auto; intros; apply False_ind; auto with zarith.
- rewrite tmp; auto.
- apply Qeq_refl.
-  generalize (BigN.spec_pos dx); auto with zarith.
-  generalize (BigN.spec_pos dy); auto with zarith.
- Qed.
-
- Theorem spec_mulc x y: wf x -> wf y ->
-  [[mul x y]] = [[x]] * [[y]].
- intros x y Hx Hy; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition mul_norm (x y: t): t := 
-  match x, y with
-  | Qz zx, Qz zy => Qz (BigZ.mul zx zy)
-  | Qz zx, Qq ny dy =>
-    if BigZ.eq_bool zx BigZ.zero then zero
-    else	
-      let gcd := BigN.gcd (BigZ.to_N zx) dy in
-      if BigN.eq_bool gcd BigN.one then Qq (BigZ.mul zx ny) dy
-      else 
-        let zx := BigZ.div zx (BigZ.Pos gcd) in
-        let d := BigN.div dy gcd in
-        if BigN.eq_bool d BigN.one then Qz (BigZ.mul zx ny)
-        else Qq (BigZ.mul zx ny) d
-  | Qq nx dx, Qz zy =>   
-    if BigZ.eq_bool zy BigZ.zero then zero
-    else	
-      let gcd := BigN.gcd (BigZ.to_N zy) dx in
-      if BigN.eq_bool gcd BigN.one then Qq (BigZ.mul zy nx) dx
-      else 
-        let zy := BigZ.div zy (BigZ.Pos gcd) in
-        let d := BigN.div dx gcd in
-        if BigN.eq_bool d BigN.one then Qz (BigZ.mul zy nx)
-        else Qq (BigZ.mul zy nx) d
-  | Qq nx dx, Qq ny dy => norm (BigZ.mul nx ny) (BigN.mul dx dy)
-  end.
-
- Theorem wf_mul_norm: forall x y, wf x -> wf y -> wf (mul_norm x y).
- intros [zx | nx dx] [zy | ny dy]; unfold mul_norm; auto.
- intros HH1 HH2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto;
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- rewrite BigN.spec_1; rewrite BigZ.spec_0.
- intros H1 H2; unfold wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- rewrite BigN.spec_0.
- set (a := BigN.to_Z (BigZ.to_N zx)).
- set (b := (BigN.to_Z dy)).
- assert (F: (0 < Zgcd a b)%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos a b)); auto.
-   intros HH3; case H2; rewrite spec_to_N; fold a.
-   rewrite (Zgcd_inv_0_l _ _ (sym_equal HH3)); try ring.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; fold a; fold b; auto.
- intros H.
- generalize HH2; simpl wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- rewrite BigN.spec_0; intros HH; case HH; fold b.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite H; auto with zarith.
- assert (F1:= Zgcd_is_gcd a b); inversion F1; auto.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- rewrite BigN.spec_1; rewrite BigN.spec_gcd.
- intros HH1 H1 H2.
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; auto.
- rewrite BigN.spec_1; rewrite BigN.spec_gcd.
- intros HH1 H1 H2.
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; auto.
- rewrite BigZ.spec_0.
- intros HH2.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- set (a := BigN.to_Z (BigZ.to_N zy)).
- set (b := (BigN.to_Z dx)).
- assert (F: (0 < Zgcd a b)%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos a b)); auto.
-   intros HH3; case HH2; rewrite spec_to_N; fold a.
-   rewrite (Zgcd_inv_0_l _ _ (sym_equal HH3)); try ring.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; fold a; fold b; auto.
- intros H; unfold wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- rewrite BigN.spec_0.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd; fold a; fold b; auto.
- intros HH; generalize H1; simpl wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- rewrite BigN.spec_0.
- intros HH3; case HH3; fold b.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite HH; auto with zarith.
- assert (F1:= Zgcd_is_gcd a b); inversion F1; auto.
- intros HH1 HH2; apply wf_norm.
- rewrite BigN.spec_mul; intros HH3.
- case (Zmult_integral _ _ HH3).
- generalize HH1; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- generalize HH2; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto.
- Qed.
-
- Theorem spec_mul_norm x y: wf x -> wf y ->
-  ([mul_norm x y] == [x] * [y])%Q.
- intros x y Hx Hy; rewrite <- spec_mul; auto.
- unfold mul_norm, mul; generalize Hx Hy; case x; case y; clear Hx Hy.
-  intros; apply Qeq_refl.
- intros p1 n p2 Hx Hy.
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; unfold zero, to_Q; repeat rewrite BigZ.spec_0; intros H.
- rewrite BigZ.spec_mul; rewrite H; red; auto.
- assert (F: (0 < BigN.to_Z (BigZ.to_N p2))%Z).
-  case (Zle_lt_or_eq _ _ (BigN.spec_pos (BigZ.to_N p2))); auto.
-  intros H1; case H; rewrite spec_to_N; rewrite <- H1; ring.
- assert (F1: (0 < BigN.to_Z n)%Z).
-  generalize Hy; simpl.
-  match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-    generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-  end; auto.
-  intros _ HH; case HH.
-  rewrite BigN.spec_0; generalize (BigN.spec_pos n); auto with zarith.
- set (a := BigN.to_Z (BigZ.to_N p2)).
- set (b := BigN.to_Z n).
- assert (F2: (0 < Zgcd a b )%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos a b)); intros H3; auto.
-   generalize F; fold a; rewrite (Zgcd_inv_0_l _ _ (sym_equal H3)); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; try rewrite BigN.spec_gcd; 
-  fold a b; intros H1.
-  intros; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd;
-   auto with zarith; fold a b; intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; 
-   fold a b; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite spec_to_N; fold a; fold b.
- rewrite Zmult_1_r; repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p1)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; 
-   fold a b; auto with zarith.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; 
-   fold a b; auto with zarith.
- intros H2; red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite Z2P_correct; auto with zarith.
- rewrite (spec_to_N p2); fold a b.
- rewrite Z2P_correct; auto with zarith.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p1)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto; try ring.
- case (Zle_lt_or_eq _ _
-       (BigN.spec_pos  (n / 
-                         BigN.gcd (BigZ.to_N p2) 
-                                  n))%bigN);
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; 
-   fold a b; auto with zarith.
- intros H3.
- apply False_ind; generalize F1.
- generalize Hy; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; auto with zarith.
- intros HH; case HH; fold b.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- rewrite <- H3; ring.
- assert (FF:= Zgcd_is_gcd a b); inversion FF; auto.
- intros p1 p2 n Hx Hy.
- match goal with  |- context[BigZ.eq_bool ?X ?Y] => 
-   generalize (BigZ.spec_eq_bool X Y); case BigZ.eq_bool
- end; unfold zero, to_Q; repeat rewrite BigZ.spec_0; intros H.
- rewrite BigZ.spec_mul; rewrite H; red; simpl; ring.
- set (a := BigN.to_Z (BigZ.to_N p1)).
- set (b := BigN.to_Z n).
- assert (F: (0 < a)%Z).
-  case (Zle_lt_or_eq _ _ (BigN.spec_pos (BigZ.to_N p1))); auto.
-  intros H1; case H; rewrite spec_to_N; rewrite <- H1; ring.
- assert (F1: (0 < b)%Z).
-  generalize Hx; unfold wf.
-  match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-    generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-  end; rewrite BigN.spec_0; auto with zarith.
-  generalize (BigN.spec_pos n); fold b; auto with zarith.
- assert (F2: (0 < Zgcd a b)%Z).
-   case (Zle_lt_or_eq _ _ (Zgcd_is_pos a b)); intros H3; auto.
-   generalize F; rewrite (Zgcd_inv_0_l _ _ (sym_equal H3)); auto with zarith.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1; rewrite BigN.spec_gcd; fold a b; intros H1.
-  intros; repeat rewrite BigZ.spec_mul; rewrite Zmult_comm; apply Qeq_refl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_1.
- rewrite BigN.spec_div; rewrite BigN.spec_gcd;
-   auto with zarith.
- fold a b; intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd;
-   fold a b; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite spec_to_N; fold a b.
- rewrite Zmult_1_r; repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p2)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto with zarith.
- rewrite H2; ring.
- intros H2.
- red; simpl.
- repeat rewrite BigZ.spec_mul.
- rewrite BigZ.spec_div; simpl; rewrite BigN.spec_gcd; 
-   fold a b; auto with zarith.
- rewrite Z2P_correct; auto with zarith.
- rewrite (spec_to_N p1); fold a b.
- case (Zle_lt_or_eq _ _
-       (BigN.spec_pos  (n / BigN.gcd (BigZ.to_N p1) n))%bigN); intros F3.
- rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_div; simpl; rewrite BigN.spec_gcd; 
-   fold a b; auto with zarith.
- repeat rewrite <- Zmult_assoc.
- rewrite (Zmult_comm (BigZ.to_Z p2)).
- repeat rewrite Zmult_assoc.
- rewrite Zgcd_div_swap; auto; try ring.
- apply False_ind; generalize F1.
- rewrite (Zdivide_Zdiv_eq (Zgcd a b) b); auto.
- generalize F3; rewrite BigN.spec_div; rewrite BigN.spec_gcd; fold a b;
-   auto with zarith.
- intros HH; rewrite <- HH; auto with zarith.
- assert (FF:= Zgcd_is_gcd a b); inversion FF; auto.
- intros p1 n1 p2 n2 Hn1 Hn2.
- match goal with |- [norm ?X ?Y] == _ =>
-  apply Qeq_trans with ([Qq X Y]);
-  [apply spec_norm | idtac]
- end; try  apply Qeq_refl.
- rewrite BigN.spec_mul.
- apply Zmult_lt_0_compat.
- generalize Hn1; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; auto with zarith.
- generalize (BigN.spec_pos n1) (BigN.spec_pos n2); auto with zarith.
- generalize Hn2; simpl.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; auto with zarith.
- generalize (BigN.spec_pos n1) (BigN.spec_pos n2); auto with zarith.
- Qed.
-
- Theorem spec_mul_normc x y: wf x -> wf y ->
-   [[mul_norm x y]] = [[x]] * [[y]].
- intros x y Hx Hy; unfold to_Qc.
- apply trans_equal with (!! ([x] * [y])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_mul_norm; auto.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
- Definition inv (x: t): t := 
-  match x with
-  | Qz (BigZ.Pos n) => 
-    if BigN.eq_bool n BigN.zero then zero else Qq BigZ.one n
-  | Qz (BigZ.Neg n) => 
-    if BigN.eq_bool n BigN.zero then zero else Qq BigZ.minus_one n
-  | Qq (BigZ.Pos n) d => 
-    if BigN.eq_bool n BigN.zero then zero else Qq (BigZ.Pos d) n
-  | Qq (BigZ.Neg n) d => 
-    if BigN.eq_bool n BigN.zero then zero else Qq (BigZ.Neg d) n
-  end.
-
-
- Theorem wf_inv: forall x, wf x -> wf (inv x).
- intros [ zx | nx dx]; unfold inv, wf; auto.
- case zx; clear zx.
- intros nx.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_mul.
- intros nx.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0; rewrite BigN.spec_mul.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- intros _ HH; case HH.
- intros H1 _.
- case nx; clear nx.
- intros nx.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; simpl; auto.
- intros nx.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; simpl; auto.
- Qed.
-
- Theorem spec_inv x: wf x ->
-   ([inv x] == /[x])%Q.
- intros [ [x | x] _ | [nx | nx] dx]; unfold inv.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z x)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); auto with zarith.
- unfold to_Q; rewrite BigZ.spec_1.
- red; unfold Qinv; simpl.
- generalize F; case BigN.to_Z; auto with zarith.
- intros p Hp; discriminate Hp.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z x)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos x)); auto with zarith.
- red; unfold Qinv; simpl.
- generalize F; case BigN.to_Z; simpl; auto with zarith.
- intros p Hp; discriminate Hp.
- simpl wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- intros HH; case HH.
- intros _.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z nx)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos nx)); auto with zarith.
- red; unfold Qinv; simpl.
- rewrite Z2P_correct; auto with zarith.
- generalize F; case BigN.to_Z; auto with zarith.
- intros p Hp; discriminate Hp.
- generalize (BigN.spec_pos dx); auto with zarith.
- simpl wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H1.
- intros HH; case HH.
- intros _.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; rewrite BigN.spec_0; intros H.
-  unfold zero, to_Q; rewrite BigZ.spec_0.
- unfold BigZ.to_Z; rewrite H; apply Qeq_refl.
- assert (F: (0 < BigN.to_Z nx)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos nx)); auto with zarith.
- red; unfold Qinv; simpl.
- rewrite Z2P_correct; auto with zarith.
- generalize F; case BigN.to_Z; auto with zarith.
- simpl; intros. 
- match goal with  |- (?X = Zneg ?Y)%Z => 
-   replace (Zneg Y) with (Zopp (Zpos Y));
-   try rewrite Z2P_correct; auto with zarith
- end.
- rewrite Zpos_mult_morphism; 
-   rewrite Z2P_correct; auto with zarith; try ring.
- generalize (BigN.spec_pos dx); auto with zarith.
- intros p Hp; discriminate Hp.
- generalize (BigN.spec_pos dx); auto with zarith.
- Qed.
-
- Theorem spec_invc x: wf x ->
-   [[inv x]] =  /[[x]].
- intros x Hx; unfold to_Qc.
- apply trans_equal with (!! (/[x])).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_inv; auto.
- unfold Qcinv, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qinv_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
- Definition div x y := mul x (inv y).
-
- Theorem wf_div x y: wf x -> wf y -> wf (div x y).
- intros x y Hx Hy; unfold div; apply wf_mul; auto.
- apply wf_inv; auto.
- Qed.
-
- Theorem spec_div x y: wf x -> wf y ->
-  ([div x y] == [x] / [y])%Q.
- intros x y Hx Hy; unfold div; rewrite spec_mul; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- apply wf_inv; auto.
- Qed.
-
- Theorem spec_divc x y: wf x -> wf y ->
-   [[div x y]] = [[x]] / [[y]].
- intros x y Hx Hy; unfold div; rewrite spec_mulc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto. 
- apply wf_inv; auto.
- Qed.
-
- Definition div_norm x y := mul_norm x (inv y).
-
- Theorem wf_div_norm x y: wf x -> wf y -> wf (div_norm x y).
- intros x y Hx Hy; unfold div_norm; apply wf_mul_norm; auto.
- apply wf_inv; auto.
- Qed.
-
- Theorem spec_div_norm x y: wf x -> wf y ->
-  ([div_norm x y] == [x] / [y])%Q.
- intros x y Hx Hy; unfold div_norm; rewrite spec_mul_norm; auto.
- unfold Qdiv; apply Qmult_comp.
- apply Qeq_refl.
- apply spec_inv; auto.
- apply wf_inv; auto.
- Qed.
-
- Theorem spec_div_normc x y: wf x -> wf y ->
-   [[div_norm x y]] = [[x]] / [[y]].
- intros x y Hx Hy; unfold div_norm; rewrite spec_mul_normc; auto.
- unfold Qcdiv; apply f_equal2 with (f := Qcmult); auto.
- apply spec_invc; auto.
- apply wf_inv; auto.
- Qed.
-
- Definition square (x: t): t :=
-  match x with
-  | Qz zx => Qz (BigZ.square zx)
-  | Qq nx dx => Qq (BigZ.square nx) (BigN.square dx)
-  end.
-
- Theorem wf_square: forall x, wf x -> wf (square x).
- intros [ zx | nx dx]; unfold square, wf; auto.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- rewrite BigN.spec_square; intros H1 H2; case H2.
- case (Zmult_integral _ _ H1); auto.
- Qed.
-
- Theorem spec_square x: wf x -> ([square x] == [x] ^ 2)%Q.
- intros [ x | nx dx]; unfold square.
- intros _.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- unfold wf.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- intros _ HH; case HH.
- intros H1 _.
- red; simpl; rewrite BigZ.spec_square; auto with zarith.
- assert (F: (0 < BigN.to_Z dx)%Z).
-   case (Zle_lt_or_eq _ _ (BigN.spec_pos dx)); auto with zarith.
- assert (F1 : (0 < BigN.to_Z (BigN.square dx))%Z).
-   rewrite BigN.spec_square; apply Zmult_lt_0_compat;
-     auto with zarith.
- rewrite Zpos_mult_morphism.
- repeat rewrite Z2P_correct; auto with zarith.
- rewrite BigN.spec_square; auto with zarith.
- Qed.
-
- Theorem spec_squarec x: wf x -> [[square x]] =  [[x]]^2.
- intros x Hx; unfold to_Qc.
- apply trans_equal with (!! ([x]^2)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_square; auto.
- simpl Qcpower.
- replace (!! [x] * 1) with (!![x]); try ring.
- simpl.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-
- Definition power_pos (x: t) p: t :=
-  match x with
-  | Qz zx => Qz (BigZ.power_pos zx p)
-  | Qq nx dx => Qq (BigZ.power_pos nx p) (BigN.power_pos dx p)
-  end.
-
- Theorem wf_power_pos: forall x p, wf x -> wf (power_pos x p).
- intros [ zx | nx dx] p; unfold power_pos, wf; auto.
- repeat match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- rewrite BigN.spec_power_pos; simpl.
- intros H1 H2 _.
- case (Zle_lt_or_eq _ _ (BigN.spec_pos dx)); auto with zarith.
- intros H3; generalize (Zpower_pos_pos _ p H3); auto with zarith.
- Qed.
-
- Theorem spec_power_pos x p: wf x -> ([power_pos x p] == [x] ^ Zpos p)%Q.
- Proof.
- intros [x | nx dx] p; unfold power_pos.
-   intros _; unfold power_pos; red; simpl.
-   generalize (Qpower_decomp p (BigZ.to_Z x) 1).
-   unfold Qeq; simpl.
-   rewrite Zpower_pos_1_l; simpl Z2P.
-   rewrite Zmult_1_r.
-   intros H; rewrite H.
-   rewrite BigZ.spec_power_pos; simpl; ring.
- unfold wf.
- match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
- end; auto; rewrite BigN.spec_0.
- intros _ HH; case HH.
- intros H1 _.
- assert (F1: (0 < BigN.to_Z dx)%Z).
-     generalize (BigN.spec_pos dx); auto with zarith.
- assert (F2: (0 < BigN.to_Z dx  ^ ' p)%Z).
-  unfold Zpower; apply Zpower_pos_pos; auto.
- unfold power_pos; red; simpl.
- rewrite Z2P_correct; rewrite BigN.spec_power_pos; auto.
- generalize (Qpower_decomp p (BigZ.to_Z nx) 
-               (Z2P (BigN.to_Z dx))).
- unfold Qeq; simpl.
- repeat rewrite Z2P_correct; auto.
- unfold Qeq; simpl; intros HH.
- rewrite HH.
- rewrite BigZ.spec_power_pos; simpl; ring.
- Qed.
-
- Theorem spec_power_posc x p: wf x ->
-   [[power_pos x p]] = [[x]] ^ nat_of_P p.
- intros x p Hx; unfold to_Qc.
- apply trans_equal with (!! ([x]^Zpos p)).
- unfold Q2Qc.
- apply Qc_decomp; intros _ _; unfold this.
- apply Qred_complete; apply spec_power_pos; auto.
- pattern p; apply Pind; clear p.
- simpl; ring.
- intros p Hrec.
- rewrite nat_of_P_succ_morphism; simpl Qcpower.
- rewrite <- Hrec.
- unfold Qcmult, Q2Qc.
- apply Qc_decomp; intros _ _;
- unfold this.
- apply Qred_complete.
- assert (F: [x] ^ ' Psucc p == [x] *   [x] ^ ' p).
-  simpl; generalize Hx; case x; simpl; clear x Hx Hrec.
-  intros x _; simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  intros nx dx.
-  match goal with  |- context[BigN.eq_bool ?X ?Y] => 
-   generalize (BigN.spec_eq_bool X Y); case BigN.eq_bool
-  end; auto; rewrite BigN.spec_0.
-  intros _ HH; case HH.
-  intros H1 _.
-  assert (F1: (0 < BigN.to_Z dx)%Z).
-     generalize (BigN.spec_pos dx); auto with zarith.
-  simpl; repeat rewrite Qpower_decomp; simpl.
-  red; simpl; repeat rewrite Zpower_pos_1_l; simpl Z2P.
-  rewrite Pplus_one_succ_l.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
-  repeat rewrite Zpos_mult_morphism.
-  repeat rewrite Z2P_correct; auto.
-  2: apply Zpower_pos_pos; auto.
-  2: apply Zpower_pos_pos; auto.
-  rewrite Zpower_pos_is_exp.
-  rewrite Zpower_pos_1_r; auto.
- rewrite F.
- apply Qmult_comp; apply Qeq_sym; apply Qred_correct.
- Qed.
-
-End Qv.
-
diff --git a/theories/Numbers/Rational/SpecViaQ/QSig.v b/theories/Numbers/Rational/SpecViaQ/QSig.v
index a488c7c6..be9b2d4e 100644
--- a/theories/Numbers/Rational/SpecViaQ/QSig.v
+++ b/theories/Numbers/Rational/SpecViaQ/QSig.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: QSig.v 11028 2008-06-01 17:34:19Z letouzey $ i*)
+(*i $Id: QSig.v 11207 2008-07-04 16:50:32Z letouzey $ i*)
 
 Require Import QArith Qpower.
 
@@ -40,14 +40,24 @@ Module Type QType.
 
  Parameter compare : t -> t -> comparison.
 
- Parameter spec_compare: forall x y, compare x y = ([x] ?= [y]).
+ Parameter spec_compare : forall x y, compare x y = ([x] ?= [y]).
 
  Definition lt n m := compare n m = Lt.
  Definition le n m := compare n m <> Gt.
  Definition min n m := match compare n m with Gt => m | _ => n end.
  Definition max n m := match compare n m with Lt => m | _ => n end.
 
- Parameter add  : t -> t -> t.
+ Parameter eq_bool : t -> t -> bool.
+ 
+ Parameter spec_eq_bool : forall x y, 
+  if eq_bool x y then [x]==[y] else ~([x]==[y]).
+
+ Parameter red : t -> t.
+ 
+ Parameter spec_red : forall x, [red x] == [x].
+ Parameter strong_spec_red : forall x, [red x] = Qred [x].
+
+ Parameter add : t -> t -> t.
 
  Parameter spec_add: forall x y, [add x y] == [x] + [y].
 
@@ -75,10 +85,13 @@ Module Type QType.
 
  Parameter spec_div: forall x y, [div x y] == [x] / [y].
 
- Parameter power_pos : t -> positive -> t.
+ Parameter power : t -> Z -> t.
 
- Parameter spec_power_pos: forall x n, [power_pos x n] == [x] ^ Zpos n.
+ Parameter spec_power: forall x z, [power x z] == [x] ^ z.
 
 End QType.
 
-(* TODO: add norm function and variants, add eq_bool, what about Qc ? *)
\ No newline at end of file
+(** NB: several of the above functions come with [..._norm] variants
+     that expect reduced arguments and return reduced results. *)
+
+(** TODO : also speak of specifications via Qcanon ... *)
diff --git a/theories/Program/Equality.v b/theories/Program/Equality.v
index d19f29c3..c776070a 100644
--- a/theories/Program/Equality.v
+++ b/theories/Program/Equality.v
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Equality.v 11023 2008-05-30 11:08:39Z msozeau $ i*)
+(*i $Id: Equality.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (** Tactics related to (dependent) equality and proof irrelevance. *)
 
@@ -82,7 +82,7 @@ Ltac simpl_uip :=
 
 (** Simplify equalities appearing in the context and goal. *)
 
-Ltac simpl_eq := simpl ; repeat (elim_eq_rect ; simpl) ; repeat (simpl_uip ; simpl).
+Ltac simpl_eq := simpl ; unfold eq_rec_r, eq_rec ; repeat (elim_eq_rect ; simpl) ; repeat (simpl_uip ; simpl).
 
 (** Try to abstract a proof of equality, if no proof of the same equality is present in the context. *)
 
@@ -235,30 +235,43 @@ Ltac simpl_depind := subst* ; autoinjections ; try discriminates ;
    and starts a dependent induction using this tactic. *)
 
 Ltac do_depind tac H :=
+  generalize_eqs_vars H ; tac H ; repeat progress simpl_depind.
+
+(** A variant where generalized variables should be given by the user. *)
+
+Ltac do_depind' tac H :=
   generalize_eqs H ; tac H ; repeat progress simpl_depind.
 
 (** Calls [destruct] on the generalized hypothesis, results should be similar to inversion. *)
 
 Tactic Notation "dependent" "destruction" ident(H) := 
-  do_depind ltac:(fun H => destruct H ; intros) H ; subst*.
+  do_depind ltac:(fun hyp => destruct hyp ; intros) H ; subst*.
 
 Tactic Notation "dependent" "destruction" ident(H) "using" constr(c) := 
-  do_depind ltac:(fun H => destruct H using c ; intros) H.
+  do_depind ltac:(fun hyp => destruct hyp using c ; intros) H.
+
+(** This tactic also generalizes the goal by the given variables before the induction. *)
+
+Tactic Notation "dependent" "destruction" ident(H) "generalizing" ne_hyp_list(l) := 
+  do_depind' ltac:(fun hyp => revert l ; destruct hyp ; intros) H.
+
+Tactic Notation "dependent" "destruction" ident(H) "generalizing" ne_hyp_list(l) "using" constr(c) := 
+  do_depind' ltac:(fun hyp => revert l ; destruct hyp using c ; intros) H.
 
 (** Then we have wrappers for usual calls to induction. One can customize the induction tactic by 
    writting another wrapper calling do_depind. *)
 
 Tactic Notation "dependent" "induction" ident(H) := 
-  do_depind ltac:(fun H => induction H ; intros) H.
+  do_depind ltac:(fun hyp => induction hyp ; intros) H.
 
 Tactic Notation "dependent" "induction" ident(H) "using" constr(c) := 
-  do_depind ltac:(fun H => induction H using c ; intros) H.
+  do_depind ltac:(fun hyp => induction hyp using c ; intros) H.
 
 (** This tactic also generalizes the goal by the given variables before the induction. *)
 
 Tactic Notation "dependent" "induction" ident(H) "generalizing" ne_hyp_list(l) := 
-  do_depind ltac:(fun H => generalize l ; clear l ; induction H ; intros) H.
+  do_depind' ltac:(fun hyp => generalize l ; clear l ; induction hyp ; intros) H.
 
 Tactic Notation "dependent" "induction" ident(H) "generalizing" ne_hyp_list(l) "using" constr(c) := 
-  do_depind ltac:(fun H => generalize l ; clear l ; induction H using c ; intros) H.
+  do_depind' ltac:(fun hyp => generalize l ; clear l ; induction hyp using c ; intros) H.
 
diff --git a/theories/Program/Tactics.v b/theories/Program/Tactics.v
index 41b170c9..bb5054b4 100644
--- a/theories/Program/Tactics.v
+++ b/theories/Program/Tactics.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Tactics.v 11122 2008-06-13 14:18:44Z msozeau $ i*)
+(*i $Id: Tactics.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (** This module implements various tactics used to simplify the goals produced by Program,
    which are also generally useful. *)
@@ -77,10 +77,10 @@ Ltac clear_dup :=
   match goal with 
     | [ H : ?X |- _ ] => 
       match goal with
-        | [ H' : X |- _ ] =>
-          match H' with
-            | H => fail 2 
-            | _ => clear H' || clear H
+        | [ H' : ?Y |- _ ] =>
+          match H with
+            | H' => fail 2
+            | _ => conv X Y ; (clear H' || clear H)
           end
       end
   end.
@@ -158,14 +158,6 @@ Ltac autoinjection :=
   let tac H := progress (inversion H ; subst ; clear_dups) ; clear H in
     match goal with
       | [ H : ?f ?a = ?f' ?a' |- _ ] => tac H
-      | [ H : ?f ?a ?b = ?f' ?a' ?b'  |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c = ?f' ?a' ?b' ?c' |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c ?d= ?f' ?a' ?b' ?c' ?d' |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c ?d ?e= ?f' ?a' ?b' ?c' ?d' ?e' |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c ?d ?e ?g= ?f' ?a' ?b' ?c' ?d' ?e' ?g'  |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c ?d ?e ?g ?h= ?f' ?a' ?b' ?c' ?d' ?e'?g' ?h' |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c ?d ?e ?g ?h ?i = ?f' ?a' ?b' ?c' ?d' ?e'?g' ?h' ?i' |- _ ] => tac H
-      | [ H : ?f ?a ?b ?c ?d ?e ?g ?h ?i ?j = ?f' ?a' ?b' ?c' ?d' ?e'?g' ?h' ?i' ?j' |- _ ] => tac H
     end.
 
 Ltac autoinjections := repeat autoinjection.
@@ -222,7 +214,7 @@ Ltac refine_hyp c :=
     end.
 
 (** The default simplification tactic used by Program is defined by [program_simpl], sometimes [auto]
-   is not enough, better rebind using [Obligations Tactic := tac] in this case, 
+   is not enough, better rebind using [Obligation Tactic := tac] in this case, 
    possibly using [program_simplify] to use standard goal-cleaning tactics. *)
 
 Ltac program_simplify :=
@@ -231,4 +223,4 @@ Ltac program_simplify :=
 
 Ltac program_simpl := program_simplify ; auto.
 
-Ltac obligations_tactic := program_simpl.
+Ltac obligation_tactic := program_simpl.
diff --git a/theories/Program/Utils.v b/theories/Program/Utils.v
index 21eee0ca..fcd85f41 100644
--- a/theories/Program/Utils.v
+++ b/theories/Program/Utils.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Utils.v 10919 2008-05-11 22:04:26Z msozeau $ i*)
+(*i $Id: Utils.v 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 Require Export Coq.Program.Tactics.
 
@@ -42,8 +42,8 @@ Notation dec := sumbool_of_bool.
 
 (** Hide proofs and generates obligations when put in a term. *)
 
-Notation "'in_left'" := (@left _ _ _) : program_scope.
-Notation "'in_right'" := (@right _ _ _) : program_scope.
+Notation in_left := (@left _ _ _).
+Notation in_right := (@right _ _ _).
 
 (** Extraction directives *)
 (*
diff --git a/theories/QArith/QArith_base.v b/theories/QArith/QArith_base.v
index 304fbf77..78cf2892 100644
--- a/theories/QArith/QArith_base.v
+++ b/theories/QArith/QArith_base.v
@@ -6,11 +6,11 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: QArith_base.v 10765 2008-04-08 16:15:23Z msozeau $ i*)
+(*i $Id: QArith_base.v 11301 2008-08-04 19:41:18Z herbelin $ i*)
 
 Require Export ZArith.
 Require Export ZArithRing.
-Require Export Setoid.
+Require Export Setoid Bool.
 
 (** * Definition of [Q] and basic properties *)
 
@@ -28,24 +28,24 @@ Ltac simpl_mult := repeat rewrite Zpos_mult_morphism.
 
 Notation "a # b" := (Qmake a b) (at level 55, no associativity) : Q_scope.
 
-Definition inject_Z (x : Z) := Qmake x 1. 
+Definition inject_Z (x : Z) := Qmake x 1.
 Arguments Scope inject_Z [Z_scope].
 
-Notation " 'QDen'  p " := (Zpos (Qden p)) (at level 20, no associativity) : Q_scope.
+Notation QDen p := (Zpos (Qden p)).
 Notation " 0 " := (0#1) : Q_scope.
 Notation " 1 " := (1#1) : Q_scope.
 
 Definition Qeq (p q : Q) := (Qnum p * QDen q)%Z = (Qnum q * QDen p)%Z.
 Definition Qle (x y : Q) := (Qnum x * QDen y <= Qnum y * QDen x)%Z.
 Definition Qlt (x y : Q) := (Qnum x * QDen y < Qnum y * QDen x)%Z.
-Notation Qgt := (fun a b : Q => Qlt b a).
-Notation Qge := (fun a b : Q => Qle b a).
+Notation Qgt a b := (Qlt b a) (only parsing).
+Notation Qge a b := (Qle b a) (only parsing).
 
-Infix "==" := Qeq (at level 70, no associativity) : Q_scope. 
+Infix "==" := Qeq (at level 70, no associativity) : Q_scope.
 Infix "<" := Qlt : Q_scope.
-Infix ">" := Qgt : Q_scope.
 Infix "<=" := Qle : Q_scope.
-Infix ">=" := Qge : Q_scope.
+Notation "x > y" := (Qlt y x)(only parsing) : Q_scope.
+Notation "x >= y" := (Qle y x)(only parsing) : Q_scope.
 Notation "x <= y <= z" := (x<=y/\y<=z) : Q_scope.
 
 (** Another approach : using Qcompare for defining order relations. *)
@@ -84,7 +84,7 @@ rewrite Zcompare_Gt_Lt_antisym; auto.
 rewrite Zcompare_Gt_Lt_antisym in H; auto.
 Qed.
 
-Hint Unfold Qeq Qlt Qle: qarith.
+Hint Unfold Qeq Qlt Qle : qarith.
 Hint Extern 5 (?X1 <> ?X2) => intro; discriminate: qarith.
 
 (** * Properties of equality. *)
@@ -94,7 +94,7 @@ Proof.
  auto with qarith.
 Qed.
 
-Theorem Qeq_sym : forall x y, x == y -> y == x. 
+Theorem Qeq_sym : forall x y, x == y -> y == x.
 Proof.
  auto with qarith.
 Qed.
@@ -102,7 +102,7 @@ Qed.
 Theorem Qeq_trans : forall x y z, x == y -> y == z -> x == z.
 Proof.
 unfold Qeq in |- *; intros.
-apply Zmult_reg_l with (QDen y). 
+apply Zmult_reg_l with (QDen y).
 auto with qarith.
 transitivity (Qnum x * QDen y * QDen z)%Z; try ring.
 rewrite H.
@@ -117,6 +117,44 @@ Proof.
  intros; case (Z_eq_dec (Qnum x * QDen y) (Qnum y * QDen x)); auto.
 Defined.
 
+Definition Qeq_bool x y :=
+  (Zeq_bool (Qnum x * QDen y) (Qnum y * QDen x))%Z.
+
+Definition Qle_bool x y := 
+  (Zle_bool (Qnum x * QDen y) (Qnum y * QDen x))%Z.
+
+Lemma Qeq_bool_iff : forall x y, Qeq_bool x y = true <-> x == y.
+Proof.
+  unfold Qeq_bool, Qeq; intros. 
+  symmetry; apply Zeq_is_eq_bool.
+Qed.
+
+Lemma Qeq_bool_eq : forall x y, Qeq_bool x y = true -> x == y.
+Proof.
+  intros; rewrite <- Qeq_bool_iff; auto.
+Qed.
+
+Lemma Qeq_eq_bool : forall x y, x == y -> Qeq_bool x y = true.
+Proof.
+  intros; rewrite Qeq_bool_iff; auto.
+Qed.
+
+Lemma Qeq_bool_neq : forall x y, Qeq_bool x y = false -> ~ x == y.
+Proof.
+  intros x y H; rewrite <- Qeq_bool_iff, H; discriminate.
+Qed.
+
+Lemma Qle_bool_iff : forall x y, Qle_bool x y = true <-> x <= y.
+Proof.
+  unfold Qle_bool, Qle; intros.
+  symmetry; apply Zle_is_le_bool.
+Qed.
+
+Lemma Qle_bool_imp_le : forall x y, Qle_bool x y = true -> x <= y.
+Proof.
+  intros; rewrite <- Qle_bool_iff; auto.
+Qed.
+
 (** We now consider [Q] seen as a setoid. *)
 
 Definition Q_Setoid : Setoid_Theory Q Qeq.
@@ -130,7 +168,7 @@ Hint Resolve (Seq_refl Q Qeq Q_Setoid): qarith.
 Hint Resolve (Seq_sym Q Qeq Q_Setoid): qarith.
 Hint Resolve (Seq_trans Q Qeq Q_Setoid): qarith.
 
-Theorem Qnot_eq_sym : forall x y, ~x == y -> ~y == x. 
+Theorem Qnot_eq_sym : forall x y, ~x == y -> ~y == x.
 Proof.
  auto with qarith.
 Qed.
@@ -139,13 +177,13 @@ Hint Resolve Qnot_eq_sym : qarith.
 
 (** * Addition, multiplication and opposite *)
 
-(** The addition, multiplication and opposite are defined 
+(** The addition, multiplication and opposite are defined
    in the straightforward way: *)
 
 Definition Qplus (x y : Q) :=
   (Qnum x * QDen y + Qnum y * QDen x) # (Qden x * Qden y).
 
-Definition Qmult (x y : Q) := (Qnum x * Qnum y) # (Qden x * Qden y). 
+Definition Qmult (x y : Q) := (Qnum x * Qnum y) # (Qden x * Qden y).
 
 Definition Qopp (x : Q) := (- Qnum x) # (Qden x).
 
@@ -164,8 +202,8 @@ Infix "+" := Qplus : Q_scope.
 Notation "- x" := (Qopp x) : Q_scope.
 Infix "-" := Qminus : Q_scope.
 Infix "*" := Qmult : Q_scope.
-Notation "/ x" := (Qinv x) : Q_scope. 
-Infix "/" := Qdiv : Q_scope. 
+Notation "/ x" := (Qinv x) : Q_scope.
+Infix "/" := Qdiv : Q_scope.
 
 (** A light notation for [Zpos] *)
 
@@ -181,7 +219,7 @@ Qed.
 
 (** * Setoid compatibility results *)
 
-Add Morphism Qplus : Qplus_comp. 
+Add Morphism Qplus : Qplus_comp.
 Proof.
   unfold Qeq, Qplus; simpl.
   Open Scope Z_scope.
@@ -208,7 +246,7 @@ Qed.
 Add Morphism Qminus : Qminus_comp.
 Proof.
   intros.
-  unfold Qminus. 
+  unfold Qminus.
   rewrite H; rewrite H0; auto with qarith.
 Qed.
 
@@ -232,11 +270,11 @@ Proof.
   Open Scope Z_scope.
   intros (p1, p2) (q1, q2); simpl.
   case p1; simpl.
-  intros. 
+  intros.
   assert (q1 = 0).
   elim (Zmult_integral q1 ('p2)); auto with zarith.
   intros; discriminate.
-  subst; auto. 
+  subst; auto.
   case q1; simpl; intros; try discriminate.
   rewrite (Pmult_comm p2 p); rewrite (Pmult_comm q2 p0); auto.
   case q1; simpl; intros; try discriminate.
@@ -254,7 +292,7 @@ Add Morphism Qle with signature Qeq ==> Qeq ==> iff as Qle_comp.
 Proof.
   cut (forall x1 x2, x1==x2 -> forall x3 x4, x3==x4 -> x1<=x3 -> x2<=x4).
   split; apply H; assumption || (apply Qeq_sym ; assumption).
-  
+
   unfold Qeq, Qle; simpl.
   Open Scope Z_scope.
   intros (p1, p2) (q1, q2) H (r1, r2) (s1, s2) H0 H1; simpl in *.
@@ -289,14 +327,26 @@ Proof.
   replace (s1 * 'q2 * 'p2 * 'r2) with (s1 * 'r2 * 'q2 * 'p2) by ring.
   rewrite <- H0.
   replace (p1 * 'q2 * 's2 * 'r2) with ('q2 * 's2 * (p1 * 'r2)) by ring.
-  replace (r1 * 's2 * 'q2 * 'p2) with ('q2 * 's2 * (r1 * 'p2)) by ring. 
+  replace (r1 * 's2 * 'q2 * 'p2) with ('q2 * 's2 * (r1 * 'p2)) by ring.
   apply Zlt_gt.
   apply Zmult_gt_0_lt_compat_l; auto with zarith.
   Close Scope Z_scope.
 Qed.
 
+Add Morphism Qeq_bool with signature Qeq ==> Qeq ==> (@eq bool) as Qeqb_comp.
+Proof.
+ intros; apply eq_true_iff_eq.
+ rewrite 2 Qeq_bool_iff, H, H0; split; auto with qarith.
+Qed.
+
+Add Morphism Qle_bool with signature Qeq ==> Qeq ==> (@eq bool) as Qleb_comp.
+Proof.
+ intros; apply eq_true_iff_eq.
+ rewrite 2 Qle_bool_iff, H, H0.
+ split; auto with qarith.
+Qed.
 
-Lemma Qcompare_egal_dec: forall n m p q : Q, 
+Lemma Qcompare_egal_dec: forall n m p q : Q,
   (n<m -> p<q) -> (n==m -> p==q) -> (n>m -> p>q) -> ((n?=m) = (p?=q)).
 Proof.
   intros.
@@ -306,7 +356,6 @@ Proof.
   omega.
 Qed.
 
-
 Add Morphism Qcompare : Qcompare_comp.
 Proof.
   intros; apply Qcompare_egal_dec; rewrite H; rewrite H0; auto.
@@ -341,7 +390,7 @@ Lemma Qplus_0_r : forall x, x+0 == x.
 Proof.
   intros (x1, x2); unfold Qeq, Qplus; simpl.
   rewrite Pmult_comm; simpl; ring.
-Qed. 
+Qed.
 
 (** Commutativity of addition: *)
 
@@ -374,6 +423,18 @@ Proof.
   intros; red; simpl; rewrite Pmult_assoc; ring.
 Qed.
 
+(** multiplication and zero *)
+
+Lemma Qmult_0_l : forall x , 0*x == 0.
+Proof.
+  intros; compute; reflexivity.
+Qed.
+
+Lemma Qmult_0_r : forall x , x*0 == 0.
+Proof.
+  intros; red; simpl; ring.
+Qed.
+
 (** [1] is a neutral element for multiplication: *)
 
 Lemma Qmult_1_l : forall n, 1*n == n.
@@ -385,7 +446,7 @@ Theorem Qmult_1_r : forall n, n*1==n.
 Proof.
   intro; red; simpl.
   rewrite Zmult_1_r with (n := Qnum n).
-  rewrite Pmult_comm; simpl; trivial. 
+  rewrite Pmult_comm; simpl; trivial.
 Qed.
 
 (** Commutativity of multiplication *)
@@ -427,7 +488,7 @@ Proof.
   rewrite <- H0; ring.
 Qed.
 
-(** * Inverse and division. *) 
+(** * Inverse and division. *)
 
 Lemma Qinv_involutive : forall q, (/ / q) == q.
 Proof.
@@ -438,13 +499,13 @@ Theorem Qmult_inv_r : forall x, ~ x == 0 -> x*(/x) == 1.
 Proof.
   intros (x1, x2); unfold Qeq, Qdiv, Qmult; case x1; simpl;
     intros; simpl_mult; try ring.
-  elim H; auto. 
+  elim H; auto.
 Qed.
 
 Lemma Qinv_mult_distr : forall p q, / (p * q) == /p * /q.
 Proof.
   intros (x1,x2) (y1,y2); unfold Qeq, Qinv, Qmult; simpl.
-  destruct x1; simpl; auto; 
+  destruct x1; simpl; auto;
     destruct y1; simpl; auto.
 Qed.
 
@@ -485,10 +546,10 @@ Proof.
   red; trivial.
   apply Zle_trans with (y1 * 'x2 * 'z2).
   replace (x1 * 'z2 * 'y2) with (x1 * 'y2 * 'z2) by ring.
-  apply Zmult_le_compat_r; auto with zarith. 
+  apply Zmult_le_compat_r; auto with zarith.
   replace (y1 * 'x2 * 'z2) with (y1 * 'z2 * 'x2) by ring.
   replace (z1 * 'x2 * 'y2) with (z1 * 'y2 * 'x2) by ring.
-  apply Zmult_le_compat_r; auto with zarith. 
+  apply Zmult_le_compat_r; auto with zarith.
   Close Scope Z_scope.
 Qed.
 
@@ -516,9 +577,9 @@ Proof.
   apply Zgt_le_trans with (y1 * 'x2 * 'z2).
   replace (y1 * 'x2 * 'z2) with (y1 * 'z2 * 'x2) by ring.
   replace (z1 * 'x2 * 'y2) with (z1 * 'y2 * 'x2) by ring.
-  apply Zmult_gt_compat_r; auto with zarith. 
+  apply Zmult_gt_compat_r; auto with zarith.
   replace (x1 * 'z2 * 'y2) with (x1 * 'y2 * 'z2) by ring.
-  apply Zmult_le_compat_r; auto with zarith. 
+  apply Zmult_le_compat_r; auto with zarith.
   Close Scope Z_scope.
 Qed.
 
@@ -532,9 +593,9 @@ Proof.
   apply Zle_gt_trans with (y1 * 'x2 * 'z2).
   replace (y1 * 'x2 * 'z2) with (y1 * 'z2 * 'x2) by ring.
   replace (z1 * 'x2 * 'y2) with (z1 * 'y2 * 'x2) by ring.
-  apply Zmult_le_compat_r; auto with zarith. 
+  apply Zmult_le_compat_r; auto with zarith.
   replace (x1 * 'z2 * 'y2) with (x1 * 'y2 * 'z2) by ring.
-  apply Zmult_gt_compat_r; auto with zarith. 
+  apply Zmult_gt_compat_r; auto with zarith.
   Close Scope Z_scope.
 Qed.
 
@@ -572,7 +633,7 @@ Proof.
   unfold Qle, Qlt, Qeq; intros; apply Zle_lt_or_eq; auto.
 Qed.
 
-Hint Resolve Qle_not_lt Qlt_not_le Qnot_le_lt Qnot_lt_le 
+Hint Resolve Qle_not_lt Qlt_not_le Qnot_le_lt Qnot_lt_le
  Qlt_le_weak Qlt_not_eq Qle_antisym Qle_refl: qartih.
 
 (** Some decidability results about orders. *)
@@ -679,7 +740,7 @@ Proof.
 intros [[|n|n] d] Ha; assumption.
 Qed.
 
-Lemma Qle_shift_div_l : forall a b c, 
+Lemma Qle_shift_div_l : forall a b c,
  0 < c -> a*c <= b -> a <= b/c.
 Proof.
 intros a b c Hc H.
@@ -690,7 +751,7 @@ rewrite Qmult_div_r; try assumption.
 auto with *.
 Qed.
 
-Lemma Qle_shift_inv_l : forall a c, 
+Lemma Qle_shift_inv_l : forall a c,
  0 < c -> a*c <= 1 -> a <= /c.
 Proof.
 intros a c Hc H.
@@ -699,7 +760,7 @@ change (a <= 1/c).
 apply Qle_shift_div_l; assumption.
 Qed.
 
-Lemma Qle_shift_div_r : forall a b c, 
+Lemma Qle_shift_div_r : forall a b c,
  0 < b -> a <= c*b -> a/b <= c.
 Proof.
 intros a b c Hc H.
@@ -710,7 +771,7 @@ rewrite Qmult_div_r; try assumption.
 auto with *.
 Qed.
 
-Lemma Qle_shift_inv_r : forall b c, 
+Lemma Qle_shift_inv_r : forall b c,
  0 < b -> 1 <= c*b -> /b <= c.
 Proof.
 intros b c Hc H.
@@ -772,7 +833,7 @@ Qed.
 
 (** * Rational to the n-th power *)
 
-Definition Qpower_positive (q:Q)(p:positive) : Q := 
+Definition Qpower_positive (q:Q)(p:positive) : Q :=
  pow_pos Qmult q p.
 
 Add Morphism Qpower_positive with signature Qeq ==> @eq _ ==> Qeq as Qpower_positive_comp.
diff --git a/theories/QArith/Qfield.v b/theories/QArith/Qfield.v
index 5d548aea..9841ef89 100644
--- a/theories/QArith/Qfield.v
+++ b/theories/QArith/Qfield.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Qfield.v 10739 2008-04-01 14:45:20Z herbelin $ i*)
+(*i $Id: Qfield.v 11208 2008-07-04 16:57:46Z letouzey $ i*)
 
 Require Export Field.
 Require Export QArith_base.
@@ -14,24 +14,9 @@ Require Import NArithRing.
 
 (** * field and ring tactics for rational numbers *)
 
-Definition Qeq_bool (x y : Q) :=
-  if Qeq_dec x y then true else false.
-
-Lemma Qeq_bool_correct : forall x y : Q, Qeq_bool x y = true -> x==y.
-Proof.
-  intros x y; unfold Qeq_bool in |- *; case (Qeq_dec x y); simpl in |- *; auto.
-  intros _ H; inversion H.
-Qed.
-
-Lemma Qeq_bool_complete : forall x y : Q, x==y -> Qeq_bool x y = true.
-Proof.
-  intros x y; unfold Qeq_bool in |- *; case (Qeq_dec x y); simpl in |- *; auto.
-Qed.
-
-Definition Qsft : field_theory 0 1 Qplus Qmult Qminus Qopp Qdiv Qinv Qeq.
+Definition Qsrt : ring_theory 0 1 Qplus Qmult Qminus Qopp Qeq.
 Proof.
   constructor.
-  constructor.
   exact Qplus_0_l.
   exact Qplus_comm.
   exact Qplus_assoc.
@@ -41,6 +26,12 @@ Proof.
   exact Qmult_plus_distr_l.
   reflexivity.
   exact Qplus_opp_r.
+Qed.
+
+Definition Qsft : field_theory 0 1 Qplus Qmult Qminus Qopp Qdiv Qinv Qeq.
+Proof.
+  constructor.
+  exact Qsrt.
   discriminate.
   reflexivity.
   intros p Hp.
@@ -83,8 +74,8 @@ Ltac Qpow_tac t :=
   end.
 
 Add Field Qfield : Qsft 
- (decidable Qeq_bool_correct, 
-  completeness Qeq_bool_complete,
+ (decidable Qeq_bool_eq, 
+  completeness Qeq_eq_bool,
   constants [Qcst], 
   power_tac Qpower_theory [Qpow_tac]).
 
diff --git a/theories/Strings/String.v b/theories/Strings/String.v
index 53260480..00f28a9c 100644
--- a/theories/Strings/String.v
+++ b/theories/Strings/String.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: String.v 10855 2008-04-27 11:16:15Z msozeau $ *)
+(* $Id: String.v 11206 2008-07-04 16:21:28Z letouzey $ *)
 
 (** Contributed by Laurent Théry (INRIA);
     Adapted to Coq V8 by the Coq Development Team *)
@@ -225,7 +225,7 @@ Fixpoint index (n : nat) (s1 s2 : string) {struct s2} : option nat :=
       end
   end.
 
-(* Dirty trick to evaluate locally that prefix reduces itself *)
+(* Dirty trick to avoid locally that prefix reduces itself *)
 Opaque prefix.
 
 (** If the result of [index] is [Some m], [s1] in [s2] at position [m] *)
diff --git a/theories/ZArith/Zbool.v b/theories/ZArith/Zbool.v
index 34114d46..71befa4a 100644
--- a/theories/ZArith/Zbool.v
+++ b/theories/ZArith/Zbool.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: Zbool.v 10063 2007-08-08 14:21:03Z emakarov $ *)
+(* $Id: Zbool.v 11208 2008-07-04 16:57:46Z letouzey $ *)
 
 Require Import BinInt.
 Require Import Zeven.
@@ -16,7 +16,7 @@ Require Import ZArith_dec.
 Require Import Sumbool.
 
 Unset Boxed Definitions.
-
+Open Local Scope Z_scope.
 
 (** * Boolean operations from decidabilty of order *)
 (** The decidability of equality and order relations over
@@ -37,80 +37,82 @@ Definition Zeven_odd_bool (x:Z) := bool_of_sumbool (Zeven_odd_dec x).
 (** * Boolean comparisons of binary integers *)
 
 Definition Zle_bool (x y:Z) :=
-  match (x ?= y)%Z with
+  match x ?= y with
     | Gt => false
     | _ => true
   end.
 
 Definition Zge_bool (x y:Z) :=
-  match (x ?= y)%Z with
+  match x ?= y with
     | Lt => false
     | _ => true
   end.
 
 Definition Zlt_bool (x y:Z) :=
-  match (x ?= y)%Z with
+  match x ?= y with
     | Lt => true
     | _ => false
   end.
 
 Definition Zgt_bool (x y:Z) :=
-  match (x ?= y)%Z with
+  match x ?= y with
     | Gt => true
     | _ => false
   end.
 
 Definition Zeq_bool (x y:Z) :=
-  match (x ?= y)%Z with
+  match x ?= y with
     | Eq => true
     | _ => false
   end.
 
 Definition Zneq_bool (x y:Z) :=
-  match (x ?= y)%Z with
+  match x ?= y with
     | Eq => false
     | _ => true
   end.
 
+(** Properties in term of [if ... then ... else ...] *)
+
 Lemma Zle_cases :
-  forall n m:Z, if Zle_bool n m then (n <= m)%Z else (n > m)%Z.
+  forall n m:Z, if Zle_bool n m then (n <= m) else (n > m).
 Proof.
   intros x y; unfold Zle_bool, Zle, Zgt in |- *.
-  case (x ?= y)%Z; auto; discriminate.
+  case (x ?= y); auto; discriminate.
 Qed.
 
 Lemma Zlt_cases :
-  forall n m:Z, if Zlt_bool n m then (n < m)%Z else (n >= m)%Z.
+  forall n m:Z, if Zlt_bool n m then (n < m) else (n >= m).
 Proof.
   intros x y; unfold Zlt_bool, Zlt, Zge in |- *.
-  case (x ?= y)%Z; auto; discriminate.
+  case (x ?= y); auto; discriminate.
 Qed.
 
 Lemma Zge_cases :
-  forall n m:Z, if Zge_bool n m then (n >= m)%Z else (n < m)%Z.
+  forall n m:Z, if Zge_bool n m then (n >= m) else (n < m).
 Proof.
   intros x y; unfold Zge_bool, Zge, Zlt in |- *.
-  case (x ?= y)%Z; auto; discriminate.
+  case (x ?= y); auto; discriminate.
 Qed.
 
 Lemma Zgt_cases :
-  forall n m:Z, if Zgt_bool n m then (n > m)%Z else (n <= m)%Z.
+  forall n m:Z, if Zgt_bool n m then (n > m) else (n <= m).
 Proof.
   intros x y; unfold Zgt_bool, Zgt, Zle in |- *.
-  case (x ?= y)%Z; auto; discriminate.
+  case (x ?= y); auto; discriminate.
 Qed.
 
 (** Lemmas on [Zle_bool] used in contrib/graphs *)
 
-Lemma Zle_bool_imp_le : forall n m:Z, Zle_bool n m = true -> (n <= m)%Z.
+Lemma Zle_bool_imp_le : forall n m:Z, Zle_bool n m = true -> (n <= m).
 Proof.
   unfold Zle_bool, Zle in |- *. intros x y. unfold not in |- *.
-  case (x ?= y)%Z; intros; discriminate.
+  case (x ?= y); intros; discriminate.
 Qed.
 
-Lemma Zle_imp_le_bool : forall n m:Z, (n <= m)%Z -> Zle_bool n m = true.
+Lemma Zle_imp_le_bool : forall n m:Z, (n <= m) -> Zle_bool n m = true.
 Proof.
-  unfold Zle, Zle_bool in |- *. intros x y. case (x ?= y)%Z; trivial. intro. elim (H (refl_equal _)).
+  unfold Zle, Zle_bool in |- *. intros x y. case (x ?= y); trivial. intro. elim (H (refl_equal _)).
 Qed.
 
 Lemma Zle_bool_refl : forall n:Z, Zle_bool n n = true.
@@ -136,8 +138,8 @@ Qed.
 Definition Zle_bool_total :
   forall x y:Z, {Zle_bool x y = true} + {Zle_bool y x = true}.
 Proof.
-  intros x y; intros. unfold Zle_bool in |- *. cut ((x ?= y)%Z = Gt <-> (y ?= x)%Z = Lt).
-  case (x ?= y)%Z. left. reflexivity.
+  intros x y; intros. unfold Zle_bool in |- *. cut ((x ?= y) = Gt <-> (y ?= x) = Lt).
+  case (x ?= y). left. reflexivity.
   left. reflexivity.
   right. rewrite (proj1 H (refl_equal _)). reflexivity.
   apply Zcompare_Gt_Lt_antisym.
@@ -159,39 +161,40 @@ Qed.
 
 Lemma Zone_min_pos : forall n:Z, Zle_bool n 0 = false -> Zle_bool 1 n = true.
 Proof.
-  intros x; intros. apply Zle_imp_le_bool. change (Zsucc 0 <= x)%Z in |- *. apply Zgt_le_succ. generalize H.
-  unfold Zle_bool, Zgt in |- *. case (x ?= 0)%Z. intro H0. discriminate H0.
+  intros x; intros. apply Zle_imp_le_bool. change (Zsucc 0 <= x) in |- *. apply Zgt_le_succ. generalize H.
+  unfold Zle_bool, Zgt in |- *. case (x ?= 0). intro H0. discriminate H0.
   intro H0. discriminate H0.
   reflexivity.
 Qed.
 
+(** Properties in term of [iff] *)
 
-Lemma Zle_is_le_bool : forall n m:Z, (n <= m)%Z <-> Zle_bool n m = true.
+Lemma Zle_is_le_bool : forall n m:Z, (n <= m) <-> Zle_bool n m = true.
 Proof.
   intros. split. intro. apply Zle_imp_le_bool. assumption.
   intro. apply Zle_bool_imp_le. assumption.
 Qed.
 
-Lemma Zge_is_le_bool : forall n m:Z, (n >= m)%Z <-> Zle_bool m n = true.
+Lemma Zge_is_le_bool : forall n m:Z, (n >= m) <-> Zle_bool m n = true.
 Proof.
   intros. split. intro. apply Zle_imp_le_bool. apply Zge_le. assumption.
   intro. apply Zle_ge. apply Zle_bool_imp_le. assumption.
 Qed.
 
-Lemma Zlt_is_lt_bool : forall n m:Z, (n < m)%Z <-> Zlt_bool n m = true.
+Lemma Zlt_is_lt_bool : forall n m:Z, (n < m) <-> Zlt_bool n m = true.
 Proof.
 intros n m; unfold Zlt_bool, Zlt.
-destruct (n ?= m)%Z; simpl; split; now intro.
+destruct (n ?= m); simpl; split; now intro.
 Qed.
 
-Lemma Zgt_is_gt_bool : forall n m:Z, (n > m)%Z <-> Zgt_bool n m = true.
+Lemma Zgt_is_gt_bool : forall n m:Z, (n > m) <-> Zgt_bool n m = true.
 Proof.
 intros n m; unfold Zgt_bool, Zgt.
-destruct (n ?= m)%Z; simpl; split; now intro.
+destruct (n ?= m); simpl; split; now intro.
 Qed.
 
 Lemma Zlt_is_le_bool :
-  forall n m:Z, (n < m)%Z <-> Zle_bool n (m - 1) = true.
+  forall n m:Z, (n < m) <-> Zle_bool n (m - 1) = true.
 Proof.
   intros x y. split. intro. apply Zle_imp_le_bool. apply Zlt_succ_le. rewrite (Zsucc_pred y) in H.
   assumption.
@@ -199,9 +202,29 @@ Proof.
 Qed.
 
 Lemma Zgt_is_le_bool :
-  forall n m:Z, (n > m)%Z <-> Zle_bool m (n - 1) = true.
+  forall n m:Z, (n > m) <-> Zle_bool m (n - 1) = true.
 Proof.
-  intros x y. apply iff_trans with (y < x)%Z. split. exact (Zgt_lt x y).
+  intros x y. apply iff_trans with (y < x). split. exact (Zgt_lt x y).
   exact (Zlt_gt y x).
   exact (Zlt_is_le_bool y x).
 Qed.
+
+Lemma Zeq_is_eq_bool : forall x y, x = y <-> Zeq_bool x y = true.
+Proof.
+  intros; unfold Zeq_bool.
+  generalize (Zcompare_Eq_iff_eq x y); destruct Zcompare; intuition;
+   try discriminate.
+Qed.
+
+Lemma Zeq_bool_eq : forall x y, Zeq_bool x y = true -> x = y.
+Proof.
+  intros x y H; apply <- Zeq_is_eq_bool; auto.
+Qed.
+
+Lemma Zeq_bool_neq : forall x y, Zeq_bool x y = false -> x <> y.
+Proof.
+  unfold Zeq_bool; red ; intros; subst.
+  rewrite Zcompare_refl in H.
+  discriminate.
+Qed.
+
diff --git a/theories/ZArith/Zcompare.v b/theories/ZArith/Zcompare.v
index 6c5b07d2..8244d4ce 100644
--- a/theories/ZArith/Zcompare.v
+++ b/theories/ZArith/Zcompare.v
@@ -40,6 +40,15 @@ Proof.
 	    | destruct ((x' ?= y')%positive Eq); reflexivity || discriminate ] ].
 Qed.
 
+Ltac destr_zcompare := 
+ match goal with |- context [Zcompare ?x ?y] => 
+  let H := fresh "H" in 
+  case_eq (Zcompare x y); intro H;
+   [generalize (Zcompare_Eq_eq _ _ H); clear H; intro H |
+    change (x<y)%Z in H | 
+    change (x>y)%Z in H ]
+ end.
+
 Lemma Zcompare_Eq_iff_eq : forall n m:Z, (n ?= m) = Eq <-> n = m.
 Proof.
   intros x y; split; intro E;
diff --git a/theories/ZArith/Znumtheory.v b/theories/ZArith/Znumtheory.v
index e77475e0..9be372a3 100644
--- a/theories/ZArith/Znumtheory.v
+++ b/theories/ZArith/Znumtheory.v
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: Znumtheory.v 10295 2007-11-06 22:46:21Z letouzey $ i*)
+(*i $Id: Znumtheory.v 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 Require Import ZArith_base.
 Require Import ZArithRing.
@@ -522,7 +522,7 @@ Lemma Zis_gcd_mult :
   forall a b c d:Z, Zis_gcd a b d -> Zis_gcd (c * a) (c * b) (c * d).
 Proof.
   intros a b c d; simple induction 1; constructor; intuition.
-  elim (Zis_gcd_bezout a b d H); intros.
+  elim (Zis_gcd_bezout a b d H). intros.
   elim H3; intros.
   elim H4; intros.
   apply Zdivide_intro with (u * q + v * q0).
diff --git a/tools/coq_makefile.ml4 b/tools/coq_makefile.ml4
index 77dbcc47..d1d0d854 100644
--- a/tools/coq_makefile.ml4
+++ b/tools/coq_makefile.ml4
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coq_makefile.ml4 11136 2008-06-18 10:41:34Z herbelin $ *)
+(* $Id: coq_makefile.ml4 11255 2008-07-24 16:57:13Z notin $ *)
 
 (* créer un Makefile pour un développement Coq automatiquement *)
 
@@ -156,7 +156,6 @@ let variables l =
     | _ :: r -> var_aux r
   in
     section "Variables definitions.";
-    print "CAMLP4LIB:=$(shell $(CAMLBIN)camlp5 -where 2> /dev/null || $(CAMLBIN)camlp4 -where)\n";
     print "CAMLP4:=$(notdir $(CAMLP4LIB))\n"; 
     if Coq_config.local then
       (print "COQSRC:=$(COQTOP)\n";
@@ -175,7 +174,7 @@ let variables l =
   -I $(COQTOP)/contrib/subtac -I $(COQTOP)/contrib/xml \\
   -I $(CAMLP4LIB)\n")
     else
-      (print "COQSRC:=$(shell $(COQTOP)coqc -where)\n"; 
+      (print "COQSRC:=$(shell $(COQBIN)coqc -where)\n"; 
        print "COQSRCLIBS:=-I $(COQSRC)\n");
     print "ZFLAGS:=$(OCAMLLIBS) $(COQSRCLIBS)\n";
     if !opt = "-byte" then 
@@ -255,7 +254,8 @@ let include_dirs l =
   let str_i' = parse_includes inc_i' in
   let str_r = parse_includes inc_r in
     section "Libraries definition.";
-    print "OCAMLLIBS:="; print_list "\\\n  " str_i; print "\n";
+    print "CAMLP4LIB:=$(shell $(CAMLBIN)camlp5 -where 2> /dev/null || $(CAMLBIN)camlp4 -where)\n";
+    print "OCAMLLIBS:=-I $(CAMLP4LIB) "; print_list "\\\n  " str_i; print "\n";
     print "COQLIBS:="; print_list "\\\n  " str_i'; print " "; print_list "\\\n  " str_r; print "\n";
     print "COQDOCLIBS:=";   print_list "\\\n  " str_r; print "\n\n"
 
diff --git a/tools/coqdep.ml b/tools/coqdep.ml
index dc80476b..b4b161f5 100644
--- a/tools/coqdep.ml
+++ b/tools/coqdep.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coqdep.ml 10746 2008-04-03 15:45:25Z notin $ *)
+(* $Id: coqdep.ml 11282 2008-07-28 11:51:53Z msozeau $ *)
 
 open Printf
 open Coqdep_lexer
@@ -442,8 +442,8 @@ let rec add_directory recur add_file phys_dir log_dir =
   try
     while true do
       let f = readdir dirh in
-      (* we avoid . .. and all hidden files and subdirs (e.g. .svn) *)
-      if f.[0] <> '.' then
+      (* we avoid . .. and all hidden files and subdirs (e.g. .svn, _darcs) *)
+      if f.[0] <> '.' && f.[0] <> '_' then
         let phys_f = phys_dir//f in
 	match try (stat phys_f).st_kind with _ -> S_BLK with
 	  | S_DIR when recur -> add_directory recur add_file phys_f (log_dir@[f])
diff --git a/tools/coqdoc/cdglobals.ml b/tools/coqdoc/cdglobals.ml
index 44b9bd3c..3339b1db 100644
--- a/tools/coqdoc/cdglobals.ml
+++ b/tools/coqdoc/cdglobals.ml
@@ -32,6 +32,13 @@ let open_out_file f =
 let close_out_file () = close_out !out_channel
 
 
+type glob_source_t =
+    | NoGlob
+    | DotGlob
+    | GlobFile of string
+
+let glob_source = ref DotGlob 
+
 let header_trailer = ref true
 let header_file = ref ""
 let header_file_spec = ref false
diff --git a/tools/coqdoc/main.ml b/tools/coqdoc/main.ml
index 7111187f..81560259 100644
--- a/tools/coqdoc/main.ml
+++ b/tools/coqdoc/main.ml
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: main.ml 11024 2008-05-30 12:41:39Z msozeau $ i*)
+(*i $Id: main.ml 11236 2008-07-18 15:58:12Z notin $ i*)
 
 (* Modified by Lionel Elie Mamane <lionel@mamane.lu> on 9 & 10 Mar 2004:
  *  - handling of absolute filenames (function coq_module)
@@ -50,6 +50,7 @@ let usage () =
   prerr_endline "  --tex <file>         consider <file> as a .tex file";
   prerr_endline "  -p <string>          insert <string> in LaTeX preamble";
   prerr_endline "  --files-from <file>  read file names to process in <file>";
+  prerr_endline "  --glob-from <file>   read globalization information from <file>";
   prerr_endline "  --quiet              quiet mode (default)";
   prerr_endline "  --verbose            verbose mode";  
   prerr_endline "  --no-externals       no links to Coq standard library";
@@ -300,7 +301,7 @@ let parse () =
     | "-R" :: ([] | [_]) ->
 	usage ()
     | ("-glob-from" | "--glob-from") :: f :: rem ->
-	obsolete "glob-from"; parse_rec rem
+	glob_source := GlobFile f; parse_rec rem
     | ("-glob-from" | "--glob-from") :: [] ->
 	usage ()
     | ("--no-externals" | "-no-externals" | "-noexternals") :: rem ->
@@ -436,7 +437,10 @@ let produce_document l =
 	  Filename.concat !output_dir "coqdoc.sty" 
 	else "coqdoc.sty" in
 	copy src dst);
-  let l = List.map read_glob l in
+  (match !Cdglobals.glob_source with
+    | NoGlob -> ()
+    | DotGlob -> ignore (List.map read_glob l)
+    | GlobFile f -> ignore (Index.read_glob f));
   List.iter index_module l;
   match !out_to with
     | StdOut -> 
diff --git a/tools/coqdoc/pretty.mll b/tools/coqdoc/pretty.mll
index 8be3e0b0..baace5ba 100644
--- a/tools/coqdoc/pretty.mll
+++ b/tools/coqdoc/pretty.mll
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: pretty.mll 11154 2008-06-19 18:42:19Z msozeau $ i*)
+(*i $Id: pretty.mll 11255 2008-07-24 16:57:13Z notin $ i*)
 
 (*s Utility functions for the scanners *)
 
@@ -56,6 +56,7 @@
 
   let formatted = ref false
   let brackets = ref 0
+  let comment_level = ref 0
 
   let backtrack lexbuf = lexbuf.lex_curr_pos <- lexbuf.lex_start_pos
 
@@ -93,7 +94,8 @@
 
   let reset () =
     formatted := false;
-    brackets := 0
+    brackets := 0;
+    comment_level := 0
 
   (* erasing of Section/End *)
 
@@ -385,6 +387,7 @@ rule coq_bol = parse
   | space* "(**" space+ "printing" space+
       { eprintf "warning: bad 'printing' command at character %d\n" 
 	  (lexeme_start lexbuf); flush stderr;
+	comment_level := 1;
 	ignore (comment lexbuf);
 	coq_bol lexbuf }
   | space* "(**" space+ "remove" space+ "printing" space+ 
@@ -394,10 +397,12 @@ rule coq_bol = parse
   | space* "(**" space+ "remove" space+ "printing" space+
       { eprintf "warning: bad 'remove printing' command at character %d\n" 
 	  (lexeme_start lexbuf); flush stderr;
+	comment_level := 1;
 	ignore (comment lexbuf);
 	coq_bol lexbuf }
   | space* "(*"
-      { let eol = comment lexbuf in
+      { comment_level := 1; 
+	let eol = comment lexbuf in
 	  if eol then coq_bol lexbuf else coq lexbuf }
   | eof 
       { () }
@@ -421,7 +426,8 @@ and coq = parse
 	  Output.end_doc (); Output.start_coq (); 
 	  if eol then coq_bol lexbuf else coq lexbuf }
   | "(*"
-      { let eol = comment lexbuf in
+      { comment_level := 1;
+	let eol = comment lexbuf in
 	  if eol then begin Output.line_break(); coq_bol lexbuf end 
           else coq lexbuf
       }
@@ -556,7 +562,7 @@ and escaped_coq = parse
   | "["
       { incr brackets; Output.char '['; escaped_coq lexbuf }
   | "(*"
-      { ignore (comment lexbuf); escaped_coq lexbuf }
+      { comment_level := 1; ignore (comment lexbuf); escaped_coq lexbuf }
   | "*)"
       { (* likely to be a syntax error: we escape *) backtrack lexbuf }
   | eof
@@ -591,16 +597,16 @@ and comments = parse
 (*s Skip comments *)
 
 and comment = parse
-  | "(*" { comment lexbuf }
-  | "*)" space* nl { true }
-  | "*)" { false }
-  | eof  { false }
-  | _    { comment lexbuf }
+  | "(*" { incr comment_level; comment lexbuf }
+  | "*)" space* nl { decr comment_level; if !comment_level > 0 then comment lexbuf else true }
+  | "*)" { decr comment_level; if !comment_level > 0 then comment lexbuf else false }
+  | eof  {  false }
+  | _    {  comment lexbuf }
 
 and skip_to_dot = parse
   | '.' space* nl { true }
   | eof | '.' space+ { false}
-  | "(*" { ignore (comment lexbuf); skip_to_dot lexbuf }
+  | "(*" { comment_level := 1; ignore (comment lexbuf); skip_to_dot lexbuf }
   | _ { skip_to_dot lexbuf }
 
 and body_bol = parse
@@ -616,7 +622,8 @@ and body = parse
   | '.' space* nl | '.' space* eof { Output.char '.'; Output.line_break(); true }      
   | '.' space+ { Output.char '.'; Output.char ' '; false }
   | '"' { Output.char '"'; ignore(notation lexbuf); body lexbuf }
-  | "(*" { let eol = comment lexbuf in 
+  | "(*" { comment_level := 1; 
+	   let eol = comment lexbuf in 
 	     if eol 
 	     then begin Output.line_break(); body_bol lexbuf end
 	     else body lexbuf }
diff --git a/tools/gallina_lexer.mll b/tools/gallina_lexer.mll
index 0b769dbd..7eaec2a8 100644
--- a/tools/gallina_lexer.mll
+++ b/tools/gallina_lexer.mll
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: gallina_lexer.mll 5920 2004-07-16 20:01:26Z herbelin $ *)
+(* $Id: gallina_lexer.mll 11301 2008-08-04 19:41:18Z herbelin $ *)
 
 {
  open Lexing
@@ -51,7 +51,7 @@ rule action = parse
 		cRcpt := 0; action lexbuf }
   | [' ' '\t']* '\n'      { if !cRcpt < 2 then print "\n";
       	       	       	    cRcpt := !cRcpt+1; action lexbuf}
-  | eof       { raise Fin_fichier}
+  | eof       { (raise Fin_fichier : unit)}
   | _         { print (Lexing.lexeme lexbuf); cRcpt := 0; action lexbuf }
 
 and comment = parse
diff --git a/toplevel/auto_ind_decl.ml b/toplevel/auto_ind_decl.ml
index 094a77ff..49b9ce7a 100644
--- a/toplevel/auto_ind_decl.ml
+++ b/toplevel/auto_ind_decl.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: auto_ind_decl.ml 11166 2008-06-22 13:23:35Z herbelin $ i*)
+(*i $Id: auto_ind_decl.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 open Tacmach
 open Util
@@ -55,6 +55,8 @@ let subst_in_constr (_,subst,(ind,const)) =
 exception EqNotFound of string 
 exception EqUnknown of string
 
+let dl = dummy_loc
+
 (* Some pre declaration of constant we are going to use *)
 let bb = constr_of_global Coqlib.glob_bool
 
@@ -514,13 +516,13 @@ let compute_bl_tact ind lnamesparrec nparrec  =
                      new_induct false [ (Tacexpr.ElimOnConstr ((mkVar freshn),
                                         Rawterm.NoBindings))]
                                 None
-                                Genarg.IntroAnonymous
+                                (None,None)
 		                None;
                      intro_using freshm;
                      new_destruct false [ (Tacexpr.ElimOnConstr ((mkVar freshm),
                                     Rawterm.NoBindings))]
                                 None
-                                Genarg.IntroAnonymous
+                                (None,None)
 		                None;
                      intro_using freshz;
                      intros;
@@ -542,9 +544,9 @@ repeat ( apply andb_prop in z;let z1:= fresh "Z" in destruct z as [z1 z]).
                             (new_destruct false [Tacexpr.ElimOnConstr
                                       ((mkVar freshz,Rawterm.NoBindings))]
                                   None
-                                  ( Genarg.IntroOrAndPattern [[
-                                    Genarg.IntroIdentifier fresht;
-                                    Genarg.IntroIdentifier freshz]]) None) gl
+                                  (None, Some (dl,Genarg.IntroOrAndPattern [[
+                                    dl,Genarg.IntroIdentifier fresht;
+                                    dl,Genarg.IntroIdentifier freshz]])) None) gl
                         ]);
 (*
   Ci a1 ... an = Ci b1 ... bn 
@@ -632,13 +634,13 @@ let compute_lb_tact ind lnamesparrec nparrec =
                      new_induct false [Tacexpr.ElimOnConstr 
                                     ((mkVar freshn),Rawterm.NoBindings)] 
                                 None
-                                Genarg.IntroAnonymous
+                                (None,None)
 		                None;
                      intro_using freshm;
                      new_destruct false [Tacexpr.ElimOnConstr 
                                     ((mkVar freshm),Rawterm.NoBindings)]
                                 None
-                                Genarg.IntroAnonymous
+                                (None,None)
 		                None;
                      intro_using freshz;
                      intros;
@@ -746,7 +748,7 @@ let compute_dec_tact ind lnamesparrec nparrec =
       Pfedit.by ( tclTHENSEQ [
                         intros_using fresh_first_intros;
                         intros_using [freshn;freshm];
-                        assert_as true (Genarg.IntroIdentifier freshH) (
+                        assert_as true (dl,Genarg.IntroIdentifier freshH) (
                     mkApp(sumbool(),[|eqtrue eqbnm; eqfalse eqbnm|])
                   ) ]); 
 (*we do this so we don't have to prove the same goal twice *)
@@ -754,7 +756,7 @@ let compute_dec_tact ind lnamesparrec nparrec =
                    (new_destruct false [Tacexpr.ElimOnConstr
                                   (eqbnm,Rawterm.NoBindings)]
                                 None
-                                Genarg.IntroAnonymous
+                                (None,None)
 		                None)
                   Auto.default_auto
                 );
@@ -764,9 +766,9 @@ let compute_dec_tact ind lnamesparrec nparrec =
                     new_destruct false [Tacexpr.ElimOnConstr 
                                     ((mkVar freshH),Rawterm.NoBindings)] 
                                 None
-                                (Genarg.IntroOrAndPattern [
-                                    [Genarg.IntroAnonymous];
-                                    [Genarg.IntroIdentifier freshH2]]) None
+                                (None,Some (dl,Genarg.IntroOrAndPattern [
+                                    [dl,Genarg.IntroAnonymous];
+                                    [dl,Genarg.IntroIdentifier freshH2]])) None
       );
       let arfresh = Array.of_list fresh_first_intros in
         let xargs = Array.sub arfresh 0 (2*nparrec) in
@@ -793,7 +795,7 @@ let compute_dec_tact ind lnamesparrec nparrec =
                       unfold_constr (Lazy.force Coqlib.coq_not_ref);
                       intro;
                       Equality.subst_all;
-                assert_as true (Genarg.IntroIdentifier freshH3) 
+                assert_as true (dl,Genarg.IntroIdentifier freshH3) 
                 (mkApp(eq,[|bb;mkApp(eqI,[|mkVar freshm;mkVar freshm|]);tt|]))
           ]);
           Pfedit.by 
diff --git a/toplevel/cerrors.ml b/toplevel/cerrors.ml
index 40d74256..0983463a 100644
--- a/toplevel/cerrors.ml
+++ b/toplevel/cerrors.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: cerrors.ml 10410 2007-12-31 13:11:55Z msozeau $ *)
+(* $Id: cerrors.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -34,21 +34,21 @@ let rec explain_exn_default_aux anomaly_string report_fn = function
   | Stream.Failure -> 
       hov 0 (anomaly_string () ++ str "uncaught Stream.Failure.")
   | Stream.Error txt -> 
-      hov 0 (str "Syntax error: " ++ str txt)
+      hov 0 (str "Syntax error: " ++ str txt ++ str ".")
   | Token.Error txt -> 
-      hov 0 (str "Syntax error: " ++ str txt)
+      hov 0 (str "Syntax error: " ++ str txt ++ str ".")
   | Sys_error msg -> 
       hov 0 (anomaly_string () ++ str "uncaught exception Sys_error " ++ str (guill msg) ++ report_fn ())
   | UserError(s,pps) -> 
-      hov 1 (str "User error: " ++ where s ++ pps)
+      hov 0 (str "Error: " ++ where s ++ pps)
   | Out_of_memory -> 
-      hov 0 (str "Out of memory")
+      hov 0 (str "Out of memory.")
   | Stack_overflow -> 
-      hov 0 (str "Stack overflow")
+      hov 0 (str "Stack overflow.")
   | Anomaly (s,pps) -> 
-      hov 1 (anomaly_string () ++ where s ++ pps ++ report_fn ())
+      hov 0 (anomaly_string () ++ where s ++ pps ++ report_fn ())
   | Match_failure(filename,pos1,pos2) ->
-      hov 1 (anomaly_string () ++ str "Match failure in file " ++ str (guill filename) ++ 
+      hov 0 (anomaly_string () ++ str "Match failure in file " ++ str (guill filename) ++ 
       if Sys.ocaml_version = "3.06" then
 		   (str " from character " ++ int pos1 ++ 
                     str " to " ++ int pos2)
@@ -83,6 +83,11 @@ let rec explain_exn_default_aux anomaly_string report_fn = function
       hov 0 (str "Error:" ++ spc () ++ Himsg.explain_inductive_error e)
   | RecursionSchemeError e -> 
       hov 0 (str "Error:" ++ spc () ++ Himsg.explain_recursion_scheme_error e)
+  | Proof_type.LtacLocated (_,(Refiner.FailError (i,s) as exc)) when s <> mt () ->
+      explain_exn_default_aux anomaly_string report_fn exc
+  | Proof_type.LtacLocated (s,exc) ->
+      hov 0 (Himsg.explain_ltac_call_trace s ++ fnl ()
+             ++ explain_exn_default_aux anomaly_string report_fn exc)
   | Cases.PatternMatchingError (env,e) -> 
       hov 0
 	(str "Error:" ++ spc () ++ Himsg.explain_pattern_matching_error env e)
@@ -94,13 +99,15 @@ let rec explain_exn_default_aux anomaly_string report_fn = function
       hov 0 (str "Error:" ++ spc () ++
 	       str "The reference" ++ spc () ++ Libnames.pr_qualid q ++
 	       spc () ++ str "was not found" ++ 
-	       spc () ++ str "in the current" ++ spc () ++ str "environment")
+	       spc () ++ str "in the current" ++ spc () ++ str "environment.")
   | Nametab.GlobalizationConstantError q ->
       hov 0 (str "Error:" ++ spc () ++
-	       str "No constant of this name:" ++ spc () ++ Libnames.pr_qualid q)
+	       str "No constant of this name:" ++ spc () ++ 
+               Libnames.pr_qualid q ++ str ".")
   | Refiner.FailError (i,s) ->
-      hov 0 (str "Error: Tactic failure" ++ s ++
-             if i=0 then mt () else str " (level " ++ int i ++ str").")
+      hov 0 (str "Error: Tactic failure" ++ 
+                (if s <> mt() then str ":" ++ s else mt ()) ++
+                if i=0 then str "." else str " (level " ++ int i ++ str").")
   | Stdpp.Exc_located (loc,exc) ->
       hov 0 ((if loc = dummy_loc then (mt ())
                else (str"At location " ++ print_loc loc ++ str":" ++ fnl ()))
@@ -145,7 +152,7 @@ let raise_if_debug e =
 let _ = Tactic_debug.explain_logic_error := explain_exn_default
 
 let _ = Tactic_debug.explain_logic_error_no_anomaly :=
-          explain_exn_default_aux (fun () -> mt()) (fun () -> mt())
+          explain_exn_default_aux (fun () -> mt()) (fun () -> str ".")
 
 let explain_exn_function = ref explain_exn_default
 
diff --git a/toplevel/class.ml b/toplevel/class.ml
index 92fd2d4c..2c6a63b0 100644
--- a/toplevel/class.ml
+++ b/toplevel/class.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: class.ml 11085 2008-06-10 08:54:43Z herbelin $ *)
+(* $Id: class.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -119,7 +119,7 @@ let class_of_global = function
   | ConstructRef _ as c -> 
       errorlabstrm "class_of_global"
 	(str "Constructors, such as " ++ Printer.pr_global c ++ 
-	   str " cannot be used as class")
+	   str ", cannot be used as a class.")
 
 (* 
 lp est la liste (inverse'e) des arguments de la coercion
@@ -189,7 +189,7 @@ let ident_key_of_class = function
 
 let error_not_transparent source =
   errorlabstrm "build_id_coercion"
-    (pr_class source ++ str " must be a transparent constant")
+    (pr_class source ++ str " must be a transparent constant.")
 
 let build_id_coercion idf_opt source =
   let env = Global.env () in
@@ -218,8 +218,8 @@ let build_id_coercion idf_opt source =
       (Reductionops.is_conv_leq env Evd.empty
 	(Typing.type_of env Evd.empty val_f) typ_f)
     then
-      error ("cannot be defined as coercion - "^
-             "maybe a bad number of arguments") 
+      errorlabstrm "" (strbrk
+	"Cannot be defined as coercion (maybe a bad number of arguments).")
   in
   let idf =
     match idf_opt with
@@ -283,7 +283,8 @@ let add_new_coercion_core coef stre source target isid =
 let try_add_new_coercion_core ref b c d e =
   try add_new_coercion_core ref b c d e
   with CoercionError e ->
-      errorlabstrm "try_add_new_coercion_core" (explain_coercion_error ref e)
+      errorlabstrm "try_add_new_coercion_core"
+        (explain_coercion_error ref e ++ str ".")
 
 let try_add_new_coercion ref stre =
   try_add_new_coercion_core ref stre None None false
diff --git a/toplevel/classes.ml b/toplevel/classes.ml
index 8ed99cbd..511befd8 100644
--- a/toplevel/classes.ml
+++ b/toplevel/classes.ml
@@ -7,7 +7,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: classes.ml 11161 2008-06-21 14:32:47Z msozeau $ i*)
+(*i $Id: classes.ml 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Names
@@ -50,22 +50,23 @@ let declare_instance_cst glob con =
   let _, r = decompose_prod_assum instance in
     match class_of_constr r with
       | Some tc -> add_instance (new_instance tc None glob con)
-      | None -> error "Constant does not build instances of a declared type class"
+      | None -> errorlabstrm "" (Pp.strbrk "Constant does not build instances of a declared type class.")
 
 let declare_instance glob idl =
   let con = 
     try (match global (Ident idl) with
       | ConstRef x -> x
       | _ -> raise Not_found)
-    with _ -> error "Instance definition not found"
+    with _ -> error "Instance definition not found."
   in declare_instance_cst glob con
 	  
 let mismatched_params env n m = mismatched_ctx_inst env Parameters n m
-(* let mismatched_defs env n m = mismatched_ctx_inst env Definitions n m *)
 let mismatched_props env n m = mismatched_ctx_inst env Properties n m
 
 type binder_list = (identifier located * bool * constr_expr) list
 
+(* Calls to interpretation functions. *)
+
 let interp_binders_evars isevars env avoid l =
   List.fold_left
     (fun (env, ids, params) ((loc, i), t) -> 
@@ -87,111 +88,6 @@ let interp_typeclass_context_evars isevars env avoid l =
 	(push_named d env, i :: ids, d::params))
     (env, avoid, []) l
 
-let interp_constrs_evars isevars env avoid l =
-  List.fold_left
-    (fun (env, ids, params) t -> 
-      let t' = interp_binder_evars isevars env Anonymous t in
-      let id = Nameops.next_name_away (Termops.named_hd env t' Anonymous) ids in
-      let d = (id,None,t') in
-	(push_named d env, id :: ids, d::params))
-    (env, avoid, []) l
-
-let raw_assum_of_binders k = 
-  List.map (fun ((loc,i),t) -> LocalRawAssum ([(loc, Name i)], k, t))
-
-let raw_assum_of_constrs k = 
-  List.map2 (fun t (n,_,_) -> LocalRawAssum ([(dummy_loc, Name n)], k, t))
-
-let raw_assum_of_anonymous_constrs k = 
-  List.map (fun t -> LocalRawAssum ([(dummy_loc, Anonymous)], k, t))
-
-let decl_expr_of_binders = 
-  List.map (fun ((loc,i),t) -> false, Vernacexpr.AssumExpr ((loc, Name i), t))
-      
-let rec unfold n f acc = 
-  match n with 
-    | 0 -> f 0 acc
-    | n -> unfold (n - 1) f (f n acc)
-
-(* Declare everything in the parameters as implicit, and the class instance as well *)
-open Topconstr
-
-let declare_implicit_proj c proj imps sub =
-  let len = List.length c.cl_context in
-  let (ctx, _) = decompose_prod_n (len + 1) (Typeops.type_of_constant (Global.env()) (snd proj)) in
-  let expls =
-    let rec aux i expls = function
-	[] -> expls
-      | (Name n, _) :: tl -> 
-	  let impl = ExplByPos (i, Some n), (true, true) in
-	    aux (succ i) (impl :: List.remove_assoc (ExplByName n) expls) tl
-      | (Anonymous,_) :: _ -> assert(false)
-    in
-      aux 1 [] (List.rev ctx)
-  in 
-  let expls = expls @ List.map (function (ExplByPos (i, n), f) -> (ExplByPos (succ len + i, n)), f | _ -> assert(false)) imps in
-    if sub then 
-      declare_instance_cst true (snd proj);
-    Impargs.declare_manual_implicits false (ConstRef (snd proj)) true expls
-      
-let declare_implicits impls subs cl =
-  Util.list_iter3 (fun p imps sub -> declare_implicit_proj cl p imps sub)
-    cl.cl_projs impls subs;
-  let len = List.length cl.cl_context in
-  let indimps = 
-    list_fold_left_i 
-      (fun i acc (is, (na, b, t)) -> 
-	if len - i <= cl.cl_params then acc
-	else 
-	  match is with
-	      None | Some (_, false) -> (ExplByPos (i, Some na), (false, true)) :: acc
-	    | _ -> acc)
-      1 [] (List.rev cl.cl_context)
-  in
-    Impargs.declare_manual_implicits false cl.cl_impl false indimps
-      
-let rel_of_named_context subst l = 
-  List.fold_right
-    (fun (id, _, t) (ctx, acc) -> (Name id, None, subst_vars acc t) :: ctx, id :: acc)
-    l ([], subst)
-
-let ids_of_rel_context subst l = 
-  List.fold_right
-    (fun (id, _, t) acc -> Nameops.out_name id :: acc)
-    l subst
-
-let degenerate_decl (na,b,t) =
-  let id = match na with
-    | Name id -> id
-    | Anonymous -> anomaly "Unnamed record variable" in 
-  match b with
-    | None -> (id, Entries.LocalAssum t)
-    | Some b -> (id, Entries.LocalDef b)
-
-
-let declare_structure env id idbuild params arity fields =
-  let nparams = List.length params and nfields = List.length fields in
-  let args = extended_rel_list nfields params in
-  let ind = applist (mkRel (1+nparams+nfields), args) in
-  let type_constructor = it_mkProd_or_LetIn ind fields in
-  let mie_ind =
-    { mind_entry_typename = id;
-      mind_entry_arity = arity;
-      mind_entry_consnames = [idbuild];
-      mind_entry_lc = [type_constructor] } in
-  let mie =
-    { mind_entry_params = List.map degenerate_decl params;
-      mind_entry_record = true;
-      mind_entry_finite = true;
-      mind_entry_inds = [mie_ind] } in
-  let kn = Command.declare_mutual_with_eliminations true mie [] in
-  let rsp = (kn,0) in (* This is ind path of idstruc *)
-  let id = Nameops.next_ident_away id (ids_of_context (Global.env())) in
-  let kinds,sp_projs = Record.declare_projections rsp ~kind:Method ~name:id (List.map (fun _ -> false) fields) fields in
-  let _build = ConstructRef (rsp,1) in
-    Recordops.declare_structure(rsp,idbuild,List.rev kinds,List.rev sp_projs);
-    rsp
-
 let interp_type_evars evdref env ?(impls=([],[])) typ =
   let typ' = intern_gen true ~impls (Evd.evars_of !evdref) env typ in
   let imps = Implicit_quantifiers.implicits_of_rawterm typ' in
@@ -206,19 +102,31 @@ let interp_fields_evars isevars env avoid l =
     (fun (env, uimpls, ids, params, impls) ((loc, i), _, t) -> 
       let impl, t' = interp_type_evars isevars env ~impls t in
       let data = mk_interning_data env i impl t' in
-      let d = (i,None,t') in
-	(push_named d env, impl :: uimpls, Idset.add i ids, d::params, ([], data :: snd impls)))
-    (env, [], avoid, [], ([], [])) l    
-
-let interp_fields_rel_evars isevars env avoid l =
-  List.fold_left
-    (fun (env, uimpls, ids, params, impls) ((loc, i), _, t) -> 
-      let impl, t' = interp_type_evars isevars env ~impls t in
-      let data = mk_interning_data env i impl t' in
       let d = (Name i,None,t') in
 	(push_rel d env, impl :: uimpls, Idset.add i ids, d::params, ([], data :: snd impls)))
     (env, [], avoid, [], ([], [])) l    
 
+(* Declare everything in the parameters as implicit, and the class instance as well *)
+
+open Topconstr
+
+let implicits_of_context ctx =
+  list_map_i (fun i name ->
+    let explname = 
+      match name with 
+      | Name n -> Some n
+      | Anonymous -> None
+    in ExplByPos (i, explname), (true, true))
+    1 (List.rev (Anonymous :: (List.map pi1 ctx)))
+
+let degenerate_decl (na,b,t) =
+  let id = match na with
+    | Name id -> id
+    | Anonymous -> anomaly "Unnamed record variable" in 
+  match b with
+    | None -> (id, Entries.LocalAssum t)
+    | Some b -> (id, Entries.LocalDef b)
+
 let name_typeclass_binder avoid = function
   | LocalRawAssum ([loc, Anonymous], bk, c) ->
       let name = 
@@ -237,33 +145,7 @@ let name_typeclass_binders avoid l =
 				   b' :: binders, avoid)
       ([], avoid) l
   in List.rev l', avoid
-
-let decompose_named_assum = 
-  let rec prodec_rec subst l c =
-    match kind_of_term c with
-      | Prod (Name na,t,c) -> 
-	let decl = (na,None,substl subst t) in
-	let subst' = mkVar na :: subst in
-	  prodec_rec subst' (add_named_decl decl l) (substl subst' c)
-      | LetIn (Name na, b, t, c) ->
-	let decl = (na,Some (substl subst b),substl subst t) in
-	let subst' = mkVar na :: subst in
-	  prodec_rec subst' (add_named_decl decl l) (substl subst' c)
-      | Cast (c,_,_)      -> prodec_rec subst l c
-      | _               -> l,c
-  in prodec_rec [] []
       
-let push_named_context = 
-  List.fold_right push_named
-
-let named_of_rel_context (subst, ids, env as init) ctx =
-  Sign.fold_rel_context
-    (fun (na,c,t) (subst, avoid, env) ->
-      let id = Nameops.next_name_away na avoid in
-      let d = (id,Option.map (substl subst) c,substl subst t) in
-	(mkVar id :: subst, id::avoid, d::env))
-    ctx ~init
-    
 let new_class id par ar sup props =
   let env0 = Global.env() in
   let isevars = ref (Evd.create_evar_defs Evd.empty) in
@@ -294,7 +176,7 @@ let new_class id par ar sup props =
     
   (* Interpret the definitions and propositions *)
   let env_props, prop_impls, bound, ctx_props, _ = 
-    interp_fields_rel_evars isevars env_params bound props 
+    interp_fields_evars isevars env_params bound props 
   in
   let subs = List.map (fun ((loc, id), b, _) -> b) props in
   (* Instantiate evars and check all are resolved *)
@@ -305,6 +187,12 @@ let new_class id par ar sup props =
   let ctx_props = Evarutil.nf_rel_context_evar sigma ctx_props in
   let arity = Reductionops.nf_evar sigma arity in
   let ce t = Evarutil.check_evars env0 Evd.empty isevars t in
+  let fieldimpls = 
+    (* Make the class and all params implicits in the projections *)
+    let ctx_impls = implicits_of_context ctx_params in
+    let len = succ (List.length ctx_params) in
+      List.map (fun x -> ctx_impls @ Impargs.lift_implicits len x) prop_impls
+  in
   let impl, projs = 
     let params = ctx_params and fields = ctx_props in
       List.iter (fun (_,c,t) -> ce t; match c with Some c -> ce c | None -> ()) (params @ fields);
@@ -337,31 +225,34 @@ let new_class id par ar sup props =
 	    let proj_cst = Declare.declare_constant proj_name
 	      (DefinitionEntry proj_entry, IsDefinition Definition) 
 	    in
-	      ConstRef cst, [proj_name, proj_cst]
+	    let cref = ConstRef cst in
+	      Impargs.declare_manual_implicits false cref (Impargs.is_implicit_args()) arity_imps;
+	      Impargs.declare_manual_implicits false (ConstRef proj_cst) (Impargs.is_implicit_args()) (List.hd fieldimpls);
+	      cref, [proj_name, proj_cst]
 	| _ ->
 	    let idb = id_of_string ("Build_" ^ (string_of_id (snd id))) in
-	    let kn = declare_structure env0 (snd id) idb params arity fields in
-	      IndRef kn, (List.map2 (fun (id, _, _) y -> Nameops.out_name id, Option.get y)
-			     fields (Recordops.lookup_projections kn))
+	    let idarg = Nameops.next_ident_away (snd id) (ids_of_context (Global.env())) in
+	    let kn = Record.declare_structure (snd id) idb arity_imps
+	      params arity fieldimpls fields ~kind:Method ~name:idarg false (List.map (fun _ -> false) fields)
+	    in
+	      IndRef (kn,0), (List.map2 (fun (id, _, _) y -> Nameops.out_name id, Option.get y)
+			     fields (Recordops.lookup_projections (kn,0)))
   in
-  let ids = List.map pi1 (named_context env0) in
-  let (subst, ids, named_ctx_params) = named_of_rel_context ([], ids, []) ctx_params in
-  let (_, _, named_ctx_props) = named_of_rel_context (subst, ids, []) ctx_props in
   let ctx_context =
     List.map (fun ((na, b, t) as d) -> 
       match Typeclasses.class_of_constr t with
-      | Some cl -> (Some (cl.cl_impl, List.exists (fun (_, n) -> n = Name na) supnames), d)
+      | Some cl -> (Some (cl.cl_impl, List.exists (fun (_, n) -> n = na) supnames), d)
       | None -> (None, d))
-      named_ctx_params
+      ctx_params
   in
   let k =
     { cl_impl = impl;
-      cl_params = List.length par;
       cl_context = ctx_context;
-      cl_props = named_ctx_props;
+      cl_props = ctx_props;
       cl_projs = projs }
   in
-    declare_implicits (List.rev prop_impls) subs k;
+    List.iter2 (fun p sub -> if sub then declare_instance_cst true (snd p))
+      k.cl_projs subs;
     add_class k
     
 type binder_def_list = (identifier located * identifier located list * constr_expr) list
@@ -369,63 +260,16 @@ type binder_def_list = (identifier located * identifier located list * constr_ex
 let binders_of_lidents l =
   List.map (fun (loc, id) -> LocalRawAssum ([loc, Name id], Default Rawterm.Implicit, CHole (loc, None))) l
 
-let subst_ids_in_named_context subst l =
-  let x, _ = 
-    List.fold_right
-      (fun (id, _, t) (ctx, k) -> (id, None, substn_vars k subst t) :: ctx, succ k)
-      l ([], 1)
-  in x
-    
-let subst_one_named inst ids t =
-  substnl inst 0 (substn_vars 1 ids t)
-      
-let subst_named inst subst ctx =
-  let ids = List.map (fun (id, _, _) -> id) subst in
-  let ctx' = subst_ids_in_named_context ids ctx in
-  let ctx', _ =
-    List.fold_right
-      (fun (id, _, t) (ctx, k) -> (id, None, substnl inst k t) :: ctx, succ k)
-      ctx' ([], 0)
-  in ctx'
-(*
-let infer_super_instances env params params_ctx super =
-  let super = subst_named params params_ctx super in
-    List.fold_right 
-      (fun (na, _, t) (sups, ids, supctx) -> 
-	let t = subst_one_named sups ids t in
-	let inst = 
-	  try resolve_one_typeclass env t 
-	  with Not_found -> 
-	    let cl, args = destClass t in
-	      no_instance (push_named_context supctx env) (dummy_loc, cl.cl_name) (Array.to_list args)
-	in
-	let d = (na, Some inst, t) in
-	  inst :: sups, na :: ids, d :: supctx)
-      super ([], [], [])*)
-      
-(* let evars_of_context ctx id n env = *)
-(*   List.fold_right (fun (na, _, t) (n, env, nc) ->  *)
-(*     let b = Evarutil.e_new_evar isevars env ~src:(dummy_loc, ImplicitArg (Ident id, (n * Some na))) t in *)
-(*     let d = (na, Some b, t) in *)
-(*       (succ n, push_named d env, d :: nc)) *)
-(*     ctx (n, env, []) *)
-
 let type_ctx_instance isevars env ctx inst subst =
-  List.fold_left2
-    (fun (subst, instctx) (na, _, t) ce ->
-      let t' = replace_vars subst t in
-      let c = interp_casted_constr_evars isevars env ce t' in
-      let d = na, Some c, t' in
-	(na, c) :: subst, d :: instctx)
-    (subst, []) (List.rev ctx) inst
-
-let substitution_of_constrs ctx cstrs =
-  List.fold_right2 (fun c (na, _, _) acc -> (na, c) :: acc) cstrs ctx []
-
-let destClassApp cl =
-  match cl with
-    | CApp (loc, (None,CRef (Ident f)), l) -> f, List.map fst l
-    | _ -> raise Not_found
+  let (s, _) = 
+    List.fold_left2
+      (fun (subst, instctx) (na, _, t) ce ->
+	let t' = substl subst t in
+	let c = interp_casted_constr_evars isevars env ce t' in
+	let d = na, Some c, t' in
+	  c :: subst, d :: instctx)
+      (subst, []) (List.rev ctx) inst
+  in s
 
 let refine_ref = ref (fun _ -> assert(false))
 
@@ -521,31 +365,31 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=defau
   let k, ctx', imps, subst = 
     let c = Command.generalize_constr_expr tclass ctx in
     let imps, c' = interp_type_evars isevars env c in
-    let ctx, c = decompose_named_assum c' in
+    let ctx, c = decompose_prod_assum c' in
     let cl, args = Typeclasses.dest_class_app c in
-      cl, ctx, imps, substitution_of_constrs (List.map snd cl.cl_context) (List.rev (Array.to_list args))
+      cl, ctx, imps, List.rev (Array.to_list args)
   in
   let id = 
     match snd instid with
 	Name id -> 
 	  let sp = Lib.make_path id in
 	    if Nametab.exists_cci sp then
-	      errorlabstrm "new_instance" (Nameops.pr_id id ++ Pp.str " already exists");
+	      errorlabstrm "new_instance" (Nameops.pr_id id ++ Pp.str " already exists.");
 	    id
       | Anonymous -> 
 	  let i = Nameops.add_suffix (id_of_class k) "_instance_0" in
 	    Termops.next_global_ident_away false i (Termops.ids_of_context env)
   in
-  let env' = push_named_context ctx' env in
+  let env' = push_rel_context ctx' env in
   isevars := Evarutil.nf_evar_defs !isevars;
   isevars := resolve_typeclasses env !isevars;
   let sigma = Evd.evars_of !isevars in
-  let substctx = Typeclasses.nf_substitution sigma subst in
+  let substctx = List.map (Evarutil.nf_evar sigma) subst in
     if Lib.is_modtype () then
       begin
-	let _, ty_constr = instance_constructor k (List.rev_map snd substctx) in
+	let _, ty_constr = instance_constructor k (List.rev subst) in
 	let termtype = 
-	  let t = it_mkNamedProd_or_LetIn ty_constr ctx' in
+	  let t = it_mkProd_or_LetIn ty_constr ctx' in
 	    Evarutil.nf_isevar !isevars t
 	in
 	Evarutil.check_evars env Evd.empty !isevars termtype;
@@ -555,7 +399,7 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=defau
       end
     else
       begin
-	let subst, _propsctx = 
+	let subst = 
 	  let props = 
 	    List.map (fun (x, l, d) -> 
 	      x, Topconstr.abstract_constr_expr d (binders_of_lidents l))
@@ -567,8 +411,8 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=defau
 	      List.fold_left
 		(fun (props, rest) (id,_,_) -> 
 		  try 
-		    let ((loc, mid), c) = List.find (fun ((_,id'), c) -> id' = id) rest in
-		    let rest' = List.filter (fun ((_,id'), c) -> id' <> id) rest in
+		    let ((loc, mid), c) = List.find (fun ((_,id'), c) -> Name id' = id) rest in
+		    let rest' = List.filter (fun ((_,id'), c) -> Name id' <> id) rest in
 		      Constrintern.add_glob loc (ConstRef (List.assoc mid k.cl_projs));
 		      c :: props, rest'
 		  with Not_found -> (CHole (Util.dummy_loc, None) :: props), rest)
@@ -579,12 +423,12 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=defau
 	      else
 		type_ctx_instance isevars env' k.cl_props props substctx
 	in
-	let app, ty_constr = instance_constructor k (List.rev_map snd subst) in
+	let app, ty_constr = instance_constructor k (List.rev subst) in
 	let termtype = 
-	  let t = it_mkNamedProd_or_LetIn ty_constr ctx' in
+	  let t = it_mkProd_or_LetIn ty_constr ctx' in
 	    Evarutil.nf_isevar !isevars t
 	in
-	let term = Termops.it_mkNamedLambda_or_LetIn app ctx' in
+	let term = Termops.it_mkLambda_or_LetIn app ctx' in
 	isevars := Evarutil.nf_evar_defs !isevars;
 	let term = Evarutil.nf_isevar !isevars term in
 	let evm = Evd.evars_of (undefined_evars !isevars) in
@@ -607,31 +451,26 @@ let new_instance ?(global=false) ctx (instid, bk, cl) props ?(on_free_vars=defau
 	  end
       end
 
-let goal_kind = Decl_kinds.Global, Decl_kinds.DefinitionBody Decl_kinds.Definition
-
-let solve_by_tac env evd evar evi t =
-  let goal = {it = evi; sigma = (Evd.evars_of evd) } in
-  let (res, valid) = t goal in 
-    if res.it = [] then 
-      let prooftree = valid [] in
-      let proofterm, obls = Refiner.extract_open_proof res.sigma prooftree in
-	if obls = [] then 
-	  let evd' = evars_reset_evd res.sigma evd in
-	  let evd' = evar_define evar proofterm evd' in
-	    evd', true
-	else evd, false
-    else evd, false
+let named_of_rel_context l =
+  let acc, ctx = 
+    List.fold_right 
+      (fun (na, b, t) (subst, ctx) ->
+	let id = match na with Anonymous -> raise (Invalid_argument "named_of_rel_context") | Name id -> id in
+	let d = (id, Option.map (substl subst) b, substl subst t) in
+	  (mkVar id :: subst, d :: ctx))
+      l ([], [])
+  in ctx
 
 let context ?(hook=fun _ -> ()) l =
   let env = Global.env() in
-  let isevars = ref (Evd.create_evar_defs Evd.empty) in
-  let avoid = Termops.ids_of_context env in
-  let ctx, l = Implicit_quantifiers.resolve_class_binders (vars_of_env env) l in
-  let env', avoid, ctx = interp_binders_evars isevars env avoid ctx in
-  let env', avoid, l = interp_typeclass_context_evars isevars env' avoid l in
-  isevars := Evarutil.nf_evar_defs !isevars;
-  let sigma = Evd.evars_of !isevars in
-  let fullctx = Evarutil.nf_named_context_evar sigma (l @ ctx) in
+  let evars = ref (Evd.create_evar_defs Evd.empty) in
+  let (env', fullctx), impls = interp_context_evars evars env l in
+  let fullctx = Evarutil.nf_rel_context_evar (Evd.evars_of !evars) fullctx in
+  let ce t = Evarutil.check_evars env Evd.empty !evars t in
+  List.iter (fun (n, b, t) -> Option.iter ce b; ce t) fullctx;
+  let ctx = try named_of_rel_context fullctx with _ -> 
+    error "Anonymous variables not allowed in contexts."
+  in
     List.iter (function (id,_,t) -> 
       if Lib.is_modtype () then 
 	let cst = Declare.declare_internal_constant id
@@ -642,96 +481,12 @@ let context ?(hook=fun _ -> ()) l =
 		add_instance (Typeclasses.new_instance tc None false cst);
 		hook (ConstRef cst)
 	    | None -> ()
-      else
-	(Command.declare_one_assumption false (Local (* global *), Definitional) t
-	    [] true (* implicit *) true (* always kept *) false (* inline *) (dummy_loc, id);
-	 match class_of_constr t with
-	     None -> ()
-	   | Some tc -> hook (VarRef id)))
-      (List.rev fullctx)
-
-open Libobject
-
-let module_qualid = qualid_of_dirpath (dirpath_of_string "Coq.Classes.Init")
-let tactic_qualid = make_qualid (dirpath_of_string "Coq.Classes.Init") (id_of_string "typeclass_instantiation")
-  
-let tactic_expr = Tacexpr.TacArg (Tacexpr.Reference (Qualid (dummy_loc, tactic_qualid)))
-let tactic = lazy (Tacinterp.interp tactic_expr)
-
-let _ =
-  Typeclasses.solve_instanciation_problem :=
-    (fun env evd ev evi -> 
-      Library.require_library [(dummy_loc, module_qualid)] None; (* may be inefficient *)
-      solve_by_tac env evd ev evi (Lazy.force tactic))
-
-(* let prod = lazy_fun Coqlib.build_prod *)
-
-(* let build_conjunction evm = *)
-(*   List.fold_left *)
-(*     (fun (acc, evs) (ev, evi)  -> *)
-(*       if class_of_constr evi.evar_concl <> None then *)
-(* 	mkApp ((Lazy.force prod).Coqlib.typ, [|evi.evar_concl; acc |]), evs *)
-(*       else acc, Evd.add evs ev evi) *)
-(*     (Coqlib.build_coq_True (), Evd.empty) evm *)
-
-(* let destruct_conjunction evm_list evm evm' term = *)
-(*   let _, evm = *)
-(*     List.fold_right *)
-(*       (fun (ev, evi) (term, evs) -> *)
-(* 	if class_of_constr evi.evar_concl <> None then *)
-(* 	  match kind_of_term term with *)
-(* 	    | App (x, [| _ ; _ ; proof ; term |]) -> *)
-(* 		let evs' = Evd.define evs ev proof in *)
-(* 		  (term, evs') *)
-(* 	    | _ -> assert(false) *)
-(* 	else *)
-(* 	  match (Evd.find evm' ev).evar_body with *)
-(* 	      Evar_empty -> raise Not_found *)
-(* 	    | Evar_defined c -> *)
-(* 		let evs' = Evd.define evs ev c in *)
-(* 		  (term, evs')) *)
-(*       evm_list (term, evm) *)
-(*   in evm *)
- 
-(* let solve_by_tac env evd evar evi t = *)
-(*   let goal = {it = evi; sigma = (Evd.evars_of evd) } in *)
-(*   let (res, valid) = t goal in *)
-(*     if res.it = [] then *)
-(*       let prooftree = valid [] in *)
-(*       let proofterm, obls = Refiner.extract_open_proof res.sigma prooftree in *)
-(* 	if obls = [] then *)
-(* 	  let evd' = evars_reset_evd res.sigma evd in *)
-(* 	  let evd' = evar_define evar proofterm evd' in *)
-(* 	    evd', true *)
-(* 	else evd, false *)
-(*     else evd, false *)
-
-(* let resolve_all_typeclasses env evd = *)
-(*   let evm = Evd.evars_of evd in *)
-(*   let evm_list = Evd.to_list evm in *)
-(*   let goal, typesevm = build_conjunction evm_list in *)
-(*   let evars = ref (Evd.create_evar_defs typesevm) in *)
-(*   let term = resolve_one_typeclass_evd env evars goal in *)
-(*   let evm' = destruct_conjunction evm_list evm (Evd.evars_of !evars) term in *)
-(*     Evd.create_evar_defs evm' *)
-
-(* let _ = *)
-(*   Typeclasses.solve_instanciations_problem := *)
-(*     (fun env evd ->  *)
-(*       Library.require_library [(dummy_loc, module_qualid)] None; (\* may be inefficient *\) *)
-(*       resolve_all_typeclasses env evd) *)
-
-let solve_evars_by_tac env evd t =
-  let ev = make_evar empty_named_context_val mkProp in
-  let goal = {it = ev; sigma = (Evd.evars_of evd) } in
-  let (res, valid) = t goal in 
-  let evd' = evars_reset_evd res.sigma evd in
-    evd'
-(*       Library.require_library [(dummy_loc, module_qualid)] None (a\* may be inefficient *\); *)
-
-(* let _ = *)
-(*   Typeclasses.solve_instanciations_problem := *)
-(*     (fun env evd ->  *)
-(*       Eauto.resolve_all_evars false (true, 15) env  *)
-(* 	(fun ev evi -> is_implicit_arg (snd (evar_source ev evd)) *)
-(* 	  && class_of_constr evi.evar_concl <> None) evd) *)
+      else (
+	let impl = List.exists (fun (x,_) -> match x with ExplByPos (_, Some id') -> id = id' | _ -> false) impls
+	in
+	  Command.declare_one_assumption false (Local (* global *), Definitional) t
+	    [] impl (* implicit *) true (* always kept *) false (* inline *) (dummy_loc, id);
+	  match class_of_constr t with
+	  | None -> ()
+	  | Some tc -> hook (VarRef id)))
+      (List.rev ctx)
diff --git a/toplevel/classes.mli b/toplevel/classes.mli
index f3cb0c58..f149ac72 100644
--- a/toplevel/classes.mli
+++ b/toplevel/classes.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: classes.mli 11024 2008-05-30 12:41:39Z msozeau $ i*)
+(*i $Id: classes.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -23,17 +23,21 @@ open Typeclasses
 open Implicit_quantifiers
 (*i*)
 
+(* Errors *)
+
+val mismatched_params : env -> constr_expr list -> rel_context -> 'a
+
+val mismatched_props : env -> constr_expr list -> rel_context -> 'a
+
 type binder_list = (identifier located * bool * constr_expr) list
 type binder_def_list = (identifier located * identifier located list * constr_expr) list
  
 val binders_of_lidents : identifier located list -> local_binder list
 
-val declare_implicit_proj : typeclass -> (identifier * constant) -> 
-  Impargs.manual_explicitation list -> bool -> unit
-(*
-val infer_super_instances : env -> constr list ->
-  named_context -> named_context -> types list * identifier list * named_context
-*)
+val name_typeclass_binders : Idset.t ->
+    Topconstr.local_binder list ->
+    Topconstr.local_binder list * Idset.t
+
 val new_class : identifier located ->
   local_binder list ->
   Vernacexpr.sort_expr located option ->
@@ -46,6 +50,10 @@ val default_on_free_vars : identifier list -> unit
 
 val fail_on_free_vars : identifier list -> unit
 
+(* Instance declaration *)
+
+val declare_instance : bool -> identifier located -> unit
+
 val declare_instance_constant :
   typeclass ->
   int option -> (* priority *)
@@ -69,35 +77,15 @@ val new_instance :
   identifier
 
 (* For generation on names based on classes only *)
-val id_of_class : typeclass -> identifier
-    
-val context : ?hook:(Libnames.global_reference -> unit) -> typeclass_context -> unit
-
-val declare_instance : bool -> identifier located -> unit
 
-val mismatched_params : env -> constr_expr list -> named_context -> 'a
+val id_of_class : typeclass -> identifier
 
-val mismatched_props : env -> constr_expr list -> named_context -> 'a
+(* Context command *)    
 
-val solve_by_tac :     env ->
-    Evd.evar_defs ->
-    Evd.evar ->
-  evar_info ->
-  Proof_type.tactic ->
-    Evd.evar_defs * bool
+val context : ?hook:(Libnames.global_reference -> unit) -> 
+  local_binder list -> unit
 
-val solve_evars_by_tac :     env ->
-    Evd.evar_defs ->
-  Proof_type.tactic ->
-  Evd.evar_defs
+(* Forward ref for refine *)
 
 val refine_ref : (open_constr -> Proof_type.tactic) ref
 
-val decompose_named_assum : types -> named_context * types
-
-val push_named_context : named_context -> env -> env
-
-val name_typeclass_binders : Idset.t ->
-    Topconstr.local_binder list ->
-    Topconstr.local_binder list * Idset.t
-
diff --git a/toplevel/command.ml b/toplevel/command.ml
index 531eadb3..3688c347 100644
--- a/toplevel/command.ml
+++ b/toplevel/command.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: command.ml 11169 2008-06-24 14:37:18Z notin $ *)
+(* $Id: command.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -88,8 +88,8 @@ let rec complete_conclusion a cs = function
       let (has_no_args,name,params) = a in
       if not has_no_args then
 	user_err_loc (loc,"",
-	  str "Cannot infer the non constant arguments of the conclusion of "
-	  ++ pr_id cs);
+	  strbrk"Cannot infer the non constant arguments of the conclusion of "
+	  ++ pr_id cs ++ str ".");
       let args = List.map (fun id -> CRef(Ident(loc,id))) params in
       CAppExpl (loc,(None,Ident(loc,name)),List.rev args)
   | c -> c
@@ -310,7 +310,7 @@ let declare_eq_scheme sp =
           definition_message nam
     done
   with Not_found -> 
-    error "Your type contains Parameters without a boolean equality"
+    error "Your type contains Parameters without a boolean equality."
 
 (* decidability of eq *)
 
@@ -473,7 +473,7 @@ type inductive_expr = {
 }
 
 let minductive_message = function
-  | []  -> error "no inductive definition"
+  | []  -> error "No inductive definition."
   | [x] -> (pr_id x ++ str " is defined")
   | l   -> hov 0  (prlist_with_sep pr_coma pr_id l ++
 		     spc () ++ str "are defined")
@@ -556,12 +556,18 @@ let interp_mutual paramsl indl notations finite =
     mind_entry_consnames = cnames;
     mind_entry_lc = ctypes
   }) indl arities constructors in
-
+  let impls = 
+    let len = List.length ctx_params in
+      List.map (fun (_,_,impls) ->
+	userimpls, List.map (fun impls -> 
+	  userimpls @ (lift_implicits len impls)) impls) constructors
+  in
   (* Build the mutual inductive entry *)
   { mind_entry_params = List.map prepare_param ctx_params;
     mind_entry_record = false; 
     mind_entry_finite = finite; 
-    mind_entry_inds = entries }, (List.map (fun (_,_,impls) -> userimpls, impls) constructors)
+    mind_entry_inds = entries }, 
+    impls
 
 let eq_constr_expr c1 c2 =
   try let _ = Constrextern.check_same_type c1 c2 in true with _ -> false
@@ -591,7 +597,7 @@ let extract_params indl =
   | [] -> anomaly "empty list of inductive types"
   | params::paramsl ->
       if not (List.for_all (eq_local_binders params) paramsl) then error 
-	"Parameters should be syntactically the same for each inductive type";
+	"Parameters should be syntactically the same for each inductive type.";
       params
 
 let prepare_inductive ntnl indl =
@@ -613,23 +619,17 @@ let _ =
       optread  = (fun () -> !elim_flag) ;
       optwrite = (fun b -> elim_flag := b) }
 
-
-let lift_implicits n = 
-  List.map (fun x -> 
-    match fst x with 
-	ExplByPos (k, id) -> ExplByPos (k + n, id), snd x
-      | _ -> x)
-
 let declare_mutual_with_eliminations isrecord mie impls =
   let names = List.map (fun e -> e.mind_entry_typename) mie.mind_entry_inds in
-  let params = List.length mie.mind_entry_params in
   let (_,kn) = declare_mind isrecord mie in    
     list_iter_i (fun i (indimpls, constrimpls) -> 
       let ind = (kn,i) in
+	maybe_declare_manual_implicits false (IndRef ind)
+	  (is_implicit_args()) indimpls;
 	list_iter_i
 	  (fun j impls -> 
 	    maybe_declare_manual_implicits false (ConstructRef (ind, succ j))
-	      (is_implicit_args()) (indimpls @ (lift_implicits params impls)))
+	      (is_implicit_args()) impls)
 	  constrimpls)
       impls;
     if_verbose ppnl (minductive_message names);
@@ -672,7 +672,7 @@ let recursive_message indexes = function
 		    | None -> mt ())
 
 let corecursive_message _ = function
-  | [] -> error "no corecursive definition"
+  | [] -> error "No corecursive definition."
   | [id] -> pr_id id ++ str " is corecursively defined"
   | l -> hov 0 (prlist_with_sep pr_coma pr_id l ++
                     spc () ++ str "are corecursively defined")
@@ -827,6 +827,7 @@ let interp_recursive fixkind l boxed =
     List.split (List.map (interp_fix_context evdref env) fixl) in
   let fixccls = List.map2 (interp_fix_ccl evdref) fixctxs fixl in
   let fixtypes = List.map2 build_fix_type fixctxs fixccls in
+  let fixtypes = List.map (nf_evar (evars_of !evdref)) fixtypes in
   let env_rec = push_named_types env fixnames fixtypes in
 
   (* Get interpretation metadatas *)
@@ -1005,7 +1006,7 @@ let build_combined_scheme name schemes =
 		let qualid = qualid_of_reference refe in
 		let cst = try 
                     Nametab.locate_constant (snd qualid) 
-                with Not_found -> error ((string_of_qualid (snd qualid))^" is not declared")
+                with Not_found -> error ((string_of_qualid (snd qualid))^" is not declared.")
                 in
 		let ty = Typeops.type_of_constant env cst in
 		  qualid, cst, ty)
@@ -1051,15 +1052,21 @@ let retrieve_first_recthm = function
               (Option.map Declarations.force body,opaq)
           | _ -> assert false
 
+let default_thm_id = id_of_string "Unnamed_thm"
+
 let compute_proof_name = function
   | Some (loc,id) ->
       (* We check existence here: it's a bit late at Qed time *)
       if Nametab.exists_cci (Lib.make_path id) or is_section_variable id then
-        user_err_loc (loc,"",pr_id id ++ str " already exists");
+        user_err_loc (loc,"",pr_id id ++ str " already exists.");
       id
   | None ->
-      next_global_ident_away false (id_of_string "Unnamed_thm")
- 	(Pfedit.get_all_proof_names ())
+      let rec next avoid id =
+        let id = next_global_ident_away false id avoid in
+        if Nametab.exists_cci (Lib.make_path id) then next (id::avoid) id 
+        else id
+      in
+      next (Pfedit.get_all_proof_names ()) default_thm_id
 
 let save_remaining_recthms (local,kind) body opaq i (id,(t_i,imps)) =
   match body with
@@ -1207,7 +1214,7 @@ let start_proof_com kind thms hook =
 
 let check_anonymity id save_ident =
   if atompart_of_id id <> "Unnamed_thm" then
-    error "This command can only be used for unnamed theorem"
+    error "This command can only be used for unnamed theorem."
 (*
     message("Overriding name "^(string_of_id id)^" and using "^save_ident)
 *)
diff --git a/toplevel/command.mli b/toplevel/command.mli
index 26526a5f..8ac8c234 100644
--- a/toplevel/command.mli
+++ b/toplevel/command.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: command.mli 11024 2008-05-30 12:41:39Z msozeau $ i*)
+(*i $Id: command.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Util
@@ -56,18 +56,16 @@ val declare_assumption : identifier located list ->
 val declare_interning_data : 'a * Constrintern.implicits_env ->
     string * Topconstr.constr_expr * Topconstr.scope_name option -> unit
 
-
-val compute_interning_datas :  Environ.env ->
-    'a list ->
-    'b list ->
-    Term.types list ->
-    Impargs.manual_explicitation list list ->
+val compute_interning_datas :  Environ.env -> 'a list -> 'b list ->
+  Term.types list ->Impargs.manual_explicitation list list ->
   'a list *
-    ('b *
-	(Names.identifier list * Impargs.implicits_list *
-	    Topconstr.scope_name option list))
+    ('b * (Names.identifier list * Impargs.implicits_list *
+	      Topconstr.scope_name option list))
     list
 
+val check_mutuality : Environ.env -> definition_object_kind ->
+  (identifier * types) list -> unit
+
 val build_mutual : (inductive_expr * decl_notation) list -> bool -> unit
 
 val declare_mutual_with_eliminations :
@@ -87,10 +85,10 @@ type fixpoint_expr = {
   fix_type : constr_expr
 }
 
-val recursive_message : Decl_kinds.definition_object_kind ->
-  int array option -> Names.identifier list -> Pp.std_ppcmds
+val recursive_message : definition_object_kind ->
+  int array option -> identifier list -> Pp.std_ppcmds
   
-val declare_fix : bool -> Decl_kinds.definition_object_kind -> identifier ->
+val declare_fix : bool -> definition_object_kind -> identifier ->
   constr -> types -> Impargs.manual_explicitation list -> global_reference
 
 val build_recursive : (Topconstr.fixpoint_expr * decl_notation) list -> bool -> unit
diff --git a/toplevel/coqtop.ml b/toplevel/coqtop.ml
index e6d2deec..f8c57ad2 100644
--- a/toplevel/coqtop.ml
+++ b/toplevel/coqtop.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: coqtop.ml 11062 2008-06-06 14:19:50Z notin $ *)
+(* $Id: coqtop.ml 11209 2008-07-05 10:17:49Z herbelin $ *)
 
 open Pp
 open Util
@@ -72,10 +72,12 @@ let check_coq_overwriting p =
   if string_of_id (list_last (repr_dirpath p)) = "Coq" then
     error "The \"Coq\" logical root directory is reserved for the Coq library"
 
-let set_include d p = push_include (d,p)
-let set_rec_include d p = check_coq_overwriting p; push_rec_include (d,p)
-let set_default_include d = set_include d Nameops.default_root_prefix
-let set_default_rec_include d = set_rec_include d Nameops.default_root_prefix
+let set_default_include d = push_include (d,Nameops.default_root_prefix)
+let set_default_rec_include d = push_rec_include(d,Nameops.default_root_prefix)
+let set_include d p =
+  let p = dirpath_of_string p in check_coq_overwriting p; push_include (d,p)
+let set_rec_include d p =
+  let p = dirpath_of_string p in check_coq_overwriting p; push_rec_include(d,p)
  
 let load_vernacular_list = ref ([] : (string * bool) list)
 let add_load_vernacular verb s =
@@ -187,15 +189,22 @@ let parse_args is_ide =
     | "-impredicative-set" :: rem -> 
         set_engagement Declarations.ImpredicativeSet; parse rem
 
+    | ("-I"|"-include") :: d :: "-as" :: p :: rem -> set_include d p; parse rem
+    | ("-I"|"-include") :: d :: "-as" :: [] -> usage ()
     | ("-I"|"-include") :: d :: rem -> set_default_include d; parse rem
     | ("-I"|"-include") :: []       -> usage ()
 
-    | "-R" :: d :: p :: rem ->set_rec_include d (dirpath_of_string p);parse rem
+    | "-R" :: d :: "-as" :: p :: rem -> set_rec_include d p;parse rem
+    | "-R" :: d :: "-as" :: [] -> usage ()
+    | "-R" :: d :: p :: rem -> set_rec_include d p;parse rem
     | "-R" :: ([] | [_]) -> usage ()
 
     | "-top" :: d :: rem -> set_toplevel_name (dirpath_of_string d); parse rem
     | "-top" :: [] -> usage ()
 
+    | "-exclude-dir" :: f :: rem -> exclude_search_in_dirname f; parse rem
+    | "-exclude-dir" :: [] -> usage ()
+
     | "-notop" :: rem -> unset_toplevel_name (); parse rem
     | "-q" :: rem -> no_load_rc (); parse rem
 
diff --git a/toplevel/fhimsg.ml b/toplevel/fhimsg.ml
deleted file mode 100644
index 4ef5d5fd..00000000
--- a/toplevel/fhimsg.ml
+++ /dev/null
@@ -1,355 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-
-(* $Id: fhimsg.ml 7837 2006-01-11 09:47:32Z herbelin $ *)
-
-open Pp
-open Util
-open Names
-open Term
-open Sign
-open Environ
-open Type_errors
-open Reduction
-open G_minicoq
-
-module type Printer = sig
-  val pr_term : path_kind -> env -> constr -> std_ppcmds
-end
-
-module Make = functor (P : Printer) -> struct
-
-  let print_decl k env (s,typ) =
-    let ptyp = P.pr_term k env typ in 
-    (spc () ++ pr_id s ++ str" : " ++ ptyp)
-  
-  let print_binding k env = function
-    | Anonymous,ty -> 
-	(spc () ++ str"_" ++ str" : " ++ P.pr_term k env ty)
-    | Name id,ty -> 
-	(spc () ++ pr_id id ++ str" : " ++ P.pr_term k env ty)
-
-(****
-  let sign_it_with f sign e =
-    snd (fold_named_context
-	   (fun (id,v,t) (sign,e) -> (add_named_decl (id,v,t) sign, f id t sign e))
-           sign (empty_named_context,e))
-
-  let dbenv_it_with f env e =
-    snd (dbenv_it 
-	   (fun na t (env,e) -> (add_rel_decl (na,t) env, f na t env e))
-           env (gLOB(get_globals env),e))
-****)
-      
-  let pr_env k env =
-    let sign_env =
-      fold_named_context
-	(fun env (id,_,t) pps ->
-           let pidt =  print_decl k env (id,t) in (pps ++ fnl () ++ pidt))
-	env (mt ()) 
-    in
-    let db_env =
-      fold_rel_context
-	(fun env (na,_,t) pps ->
-           let pnat = print_binding k env (na,t) in (pps ++ fnl () ++ pnat))
-	env (mt ())
-    in 
-    (sign_env ++ db_env)
-    
-  let pr_ne_ctx header k env =
-    if rel_context env = [] && named_context env = [] then
-      (mt ())
-    else
-      (header ++ pr_env k env)
-
-
-let explain_unbound_rel k ctx n =
-  let pe = pr_ne_ctx (str"in environment") k ctx in
-  (str"Unbound reference: " ++ pe ++ fnl () ++
-     str"The reference " ++ int n ++ str" is free")
-
-let explain_not_type k ctx c =
-  let pe = pr_ne_ctx (str"In environment") k ctx in
-  let pc = P.pr_term k ctx c in
-  (pe ++ cut () ++ str "the term" ++ brk(1,1) ++ pc ++ spc () ++
-     str"should be typed by Set, Prop or Type.");;
-
-let explain_bad_assumption k ctx c =
-  let pc = P.pr_term k ctx c in
-  (str "Cannot declare a variable or hypothesis over the term" ++
-     brk(1,1) ++ pc ++ spc () ++ str "because this term is not a type.");;
-
-let explain_reference_variables id =
-  (str "the constant" ++ spc () ++ pr_id id ++ spc () ++ 
-     str "refers to variables which are not in the context")
-
-let msg_bad_elimination ctx k = function
-  | Some(ki,kp,explanation) ->
-      let pki = P.pr_term k ctx ki in
-      let pkp = P.pr_term k ctx kp in
-      (hov 0 
-         (fnl () ++ str "Elimination of an inductive object of sort : " ++
-            pki ++ brk(1,0) ++
-            str "is not allowed on a predicate in sort : " ++ pkp ++fnl () ++
-            str "because" ++ spc () ++ str explanation))
-  | None -> 
-      (mt ())
-
-let explain_elim_arity k ctx ind aritylst c pj okinds = 
-  let pi = P.pr_term k ctx ind in
-  let ppar = prlist_with_sep pr_coma (P.pr_term k ctx) aritylst in
-  let pc = P.pr_term k ctx c in
-  let pp = P.pr_term k ctx pj.uj_val in
-  let ppt = P.pr_term k ctx pj.uj_type in
-  (str "Incorrect elimination of" ++ brk(1,1) ++ pc ++ spc () ++
-     str "in the inductive type" ++ brk(1,1) ++ pi ++ fnl () ++
-     str "The elimination predicate" ++ brk(1,1) ++ pp ++ spc () ++
-     str "has type" ++ brk(1,1) ++ ppt ++ fnl () ++
-     str "It should be one of :" ++ brk(1,1) ++ hov 0 ppar ++ fnl () ++
-     msg_bad_elimination ctx k okinds)
-
-let explain_case_not_inductive k ctx cj =
-  let pc = P.pr_term k ctx cj.uj_val in
-  let pct = P.pr_term k ctx cj.uj_type in
-  (str "In Cases expression" ++ brk(1,1) ++ pc ++ spc () ++ 
-     str "has type" ++ brk(1,1) ++ pct ++ spc () ++ 
-     str "which is not an inductive definition")
-  
-let explain_number_branches k ctx cj expn =
-  let pc = P.pr_term k ctx cj.uj_val in
-  let pct = P.pr_term k ctx cj.uj_val in
-  (str "Cases on term" ++ brk(1,1) ++ pc ++ spc () ++
-     str "of type" ++ brk(1,1) ++ pct ++ spc () ++
-     str "expects " ++  int expn ++ str " branches")
-
-let explain_ill_formed_branch k ctx c i actty expty =
-  let pc = P.pr_term k ctx c in
-  let pa = P.pr_term k ctx actty in
-  let pe = P.pr_term k ctx expty in
-  (str "In Cases expression on term" ++ brk(1,1) ++ pc ++
-     spc () ++ str "the branch " ++ int (i+1) ++
-     str " has type" ++ brk(1,1) ++ pa ++ spc () ++ 
-     str "which should be:" ++ brk(1,1) ++ pe)
-
-let explain_generalization k ctx (name,var) c =
-  let pe = pr_ne_ctx (str"in environment") k ctx in
-  let pv = P.pr_term k ctx var in
-  let pc = P.pr_term k (push_rel (name,None,var) ctx) c in
-  (str"Illegal generalization: " ++ pe ++ fnl () ++
-     str"Cannot generalize" ++ brk(1,1) ++ pv ++ spc () ++
-     str"over" ++ brk(1,1) ++ pc ++ spc () ++
-     str"which should be typed by Set, Prop or Type.")
-
-let explain_actual_type k ctx c ct pt =
-  let pe = pr_ne_ctx (str"In environment") k ctx in
-  let pc = P.pr_term k ctx c in
-  let pct = P.pr_term k ctx ct in
-  let pt = P.pr_term k ctx pt in
-  (pe ++ fnl () ++
-     str"The term" ++ brk(1,1) ++ pc ++ spc () ++
-     str"does not have type" ++ brk(1,1) ++ pt ++ fnl () ++
-     str"Actually, it has type" ++ brk(1,1) ++ pct)
-
-let explain_cant_apply_bad_type k ctx (n,exptyp,actualtyp) rator randl =
-  let ctx = make_all_name_different ctx in
-  let pe = pr_ne_ctx (str"in environment") k ctx in
-  let pr = pr_term k ctx rator.uj_val in
-  let prt = pr_term k ctx rator.uj_type in
-  let term_string = if List.length randl > 1 then "terms" else "term" in
-  let many = match n mod 10 with 1 -> "st" | 2 -> "nd" | _ -> "th" in
-  let appl = prlist_with_sep pr_fnl 
-	       (fun c ->
-		  let pc = pr_term k ctx c.uj_val in
-		  let pct = pr_term k ctx c.uj_type in
-		  hov 2 (pc ++ spc () ++ str": " ++ pct)) randl
-  in
-  (str"Illegal application (Type Error): " ++ pe ++ fnl () ++
-     str"The term" ++ brk(1,1) ++ pr ++ spc () ++
-     str"of type" ++ brk(1,1) ++ prt ++ spc () ++
-     str("cannot be applied to the "^term_string) ++ fnl () ++ 
-     str" " ++ v 0 appl ++ fnl () ++
-     str"The " ++int n ++ str (many^" term of type ") ++
-     pr_term k ctx actualtyp ++
-     str" should be of type " ++ pr_term k ctx exptyp)
-
-let explain_cant_apply_not_functional k ctx rator randl =
-  let ctx = make_all_name_different ctx in
-  let pe = pr_ne_ctx (str"in environment") k ctx in
-  let pr = pr_term k ctx rator.uj_val in
-  let prt = pr_term k ctx rator.uj_type in
-  let term_string = if List.length randl > 1 then "terms" else "term" in
-  let appl = prlist_with_sep pr_fnl 
-	       (fun c ->
-		  let pc = pr_term k ctx c.uj_val in
-		  let pct = pr_term k ctx c.uj_type in
-		  hov 2 (pc ++ spc () ++ str": " ++ pct)) randl
-  in
-  (str"Illegal application (Non-functional construction): " ++ pe ++ fnl () ++
-     str"The term" ++ brk(1,1) ++ pr ++ spc () ++
-     str"of type" ++ brk(1,1) ++ prt ++ spc () ++
-     str("cannot be applied to the "^term_string) ++ fnl () ++ 
-     str" " ++ v 0 appl ++ fnl ())
-
-(* (co)fixpoints *)
-let explain_ill_formed_rec_body k ctx err names i vdefs =
-  let str = match err with
-
-  (* Fixpoint guard errors *)
-  | NotEnoughAbstractionInFixBody ->
-      (str "Not enough abstractions in the definition")
-  | RecursionNotOnInductiveType ->
-      (str "Recursive definition on a non inductive type")
-  | RecursionOnIllegalTerm ->
-      (str "Recursive call applied to an illegal term")
-  | NotEnoughArgumentsForFixCall ->
-      (str "Not enough arguments for the recursive call")
-
-  (* CoFixpoint guard errors *)
-  (* TODO : récupérer le contexte des termes pour pouvoir les afficher *)
-  | CodomainNotInductiveType c ->
-      (str "The codomain is" ++ spc () ++ P.pr_term k ctx c ++ spc () ++
-	 str "which should be a coinductive type")
-  | NestedRecursiveOccurrences ->
-      (str "Nested recursive occurrences")
-  | UnguardedRecursiveCall c ->
-      (str "Unguarded recursive call")
-  | RecCallInTypeOfAbstraction c ->
-      (str "Not allowed recursive call in the domain of an abstraction")
-  | RecCallInNonRecArgOfConstructor c ->
-      (str "Not allowed recursive call in a non-recursive argument of constructor")
-  | RecCallInTypeOfDef c ->
-      (str "Not allowed recursive call in the type of a recursive definition")
-  | RecCallInCaseFun c ->
-      (str "Not allowed recursive call in a branch of cases")
-  | RecCallInCaseArg c -> 
-      (str "Not allowed recursive call in the argument of cases")
-  | RecCallInCasePred c ->
-      (str "Not allowed recursive call in the type of cases in")
-  | NotGuardedForm c ->
-      str "Sub-expression " ++ pr_lconstr_env ctx c ++ spc() ++
-      str "not in guarded form (should be a constructor, Cases or CoFix)"
-in
-  let pvd = P.pr_term k ctx vdefs.(i) in
-  let s =
-    match names.(i) with Name id -> string_of_id id | Anonymous -> "_" in
-  (str ++ fnl () ++ str"The " ++
-     if Array.length vdefs = 1 then (mt ()) else (int (i+1) ++ str "-th ") ++
-     str"recursive definition" ++ spc () ++ str s ++
-	 spc () ++ str":=" ++ spc () ++ pvd ++ spc () ++
-     str "is not well-formed")
-    
-let explain_ill_typed_rec_body k ctx i lna vdefj vargs =
-  let pvd = P.pr_term k ctx (vdefj.(i)).uj_val in
-  let pvdt = P.pr_term k ctx (vdefj.(i)).uj_type in
-  let pv = P.pr_term k ctx vargs.(i) in
-  (str"The " ++
-     if Array.length vdefj = 1 then (mt ()) else (int (i+1) ++ str "-th") ++
-     str"recursive definition" ++ spc () ++ pvd ++ spc () ++
-     str "has type" ++ spc () ++ pvdt ++spc () ++ str "it should be" ++ spc () ++ pv)
-
-let explain_not_inductive k ctx c =
-  let pc = P.pr_term k ctx c in
-  (str"The term" ++ brk(1,1) ++ pc ++ spc () ++
-     str "is not an inductive definition")
-
-let explain_ml_case k ctx mes c ct br brt =
-  let pc = P.pr_term k ctx c in
-  let pct = P.pr_term k ctx ct in
-  let expln =
-    match mes with
-      | "Inductive" -> (pct ++ str "is not an inductive definition")
-      | "Predicate" -> (str "ML case not allowed on a predicate")
-      | "Absurd" -> (str "Ill-formed case expression on an empty type")
-      | "Decomp" ->
-          let plf = P.pr_term k ctx br in
-          let pft = P.pr_term k ctx brt in
-          (str "The branch " ++ plf ++ ws 1 ++ cut () ++ str "has type " ++ pft ++
-             ws 1 ++ cut () ++
-             str "does not correspond to the inductive definition")
-      | "Dependent" ->
-          (str "ML case not allowed for a dependent case elimination")
-      | _ -> (mt ())
-  in
-  hov 0 (str "In ML case expression on " ++ pc ++ ws 1 ++ cut () ++
-           str "of type" ++  ws 1 ++ pct ++ ws 1 ++ cut () ++ 
-           str "which is an inductive predicate." ++ fnl () ++ expln)
-
-let explain_type_error k ctx = function
-  | UnboundRel n -> 
-      explain_unbound_rel k ctx n
-  | NotAType c -> 
-      explain_not_type k ctx c.uj_val
-  | BadAssumption c -> 
-      explain_bad_assumption k ctx c
-  | ReferenceVariables id -> 
-      explain_reference_variables id
-  | ElimArity (ind, aritylst, c, pj, okinds) ->
-      explain_elim_arity k ctx (mkMutInd ind) aritylst c pj okinds 
-  | CaseNotInductive cj -> 
-      explain_case_not_inductive k ctx cj
-  | NumberBranches (cj, n) -> 
-      explain_number_branches k ctx cj n
-  | IllFormedBranch (c, i, actty, expty) -> 
-      explain_ill_formed_branch k ctx c i actty expty 
-  | Generalization (nvar, c) ->
-      explain_generalization k ctx nvar c.uj_val
-  | ActualType (c, ct, pt) -> 
-      explain_actual_type k ctx c ct pt
-  | CantApplyBadType (s, rator, randl) ->
-      explain_cant_apply_bad_type k ctx s rator randl
-  | CantApplyNonFunctional (rator, randl) ->
-      explain_cant_apply_not_functional k ctx rator randl
-  | IllFormedRecBody (i, lna, vdefj, vargs) ->
-      explain_ill_formed_rec_body k ctx i lna vdefj vargs
-  | IllTypedRecBody (i, lna, vdefj, vargs) ->
-      explain_ill_typed_rec_body k ctx i lna vdefj vargs
-(*
-  | NotInductive c ->
-      explain_not_inductive k ctx c
-  | MLCase (mes,c,ct,br,brt) ->
-      explain_ml_case k ctx mes c ct br brt
-*)
-  | _ -> 
-      (str "Unknown type error (TODO)")
-
-let explain_refiner_bad_type k ctx arg ty conclty =
-  errorlabstrm "Logic.conv_leq_goal"
-    (str"refiner was given an argument" ++ brk(1,1) ++ 
-       P.pr_term k ctx arg ++ spc () ++
-       str"of type" ++ brk(1,1) ++ P.pr_term k ctx ty ++ spc () ++
-       str"instead of" ++ brk(1,1) ++ P.pr_term k ctx conclty)
-
-let explain_refiner_occur_meta k ctx t =
-  errorlabstrm "Logic.mk_refgoals"
-    (str"cannot refine with term" ++ brk(1,1) ++ P.pr_term k ctx t ++
-       spc () ++ str"because there are metavariables, and it is" ++
-       spc () ++ str"neither an application nor a Case")
-
-let explain_refiner_cannot_applt k ctx t harg =
-  errorlabstrm "Logic.mkARGGOALS"
-    (str"in refiner, a term of type " ++ brk(1,1) ++
-       P.pr_term k ctx t ++ spc () ++ str"could not be applied to" ++ brk(1,1) ++
-       P.pr_term k ctx harg)
-
-let explain_occur_check k ctx ev rhs =
-  let id = "?" ^ string_of_int ev in
-  let pt = P.pr_term k ctx rhs in
-  errorlabstrm "Trad.occur_check"
-    (str"Occur check failed: tried to define " ++ str id ++
-      str" with term" ++ brk(1,1) ++ pt)
-
-let explain_not_clean k ctx sp t =
-  let c = mkRel (Intset.choose (free_rels t)) in
-  let id = string_of_id (Names.basename sp) in
-  let var = P.pr_term k ctx c in
-  errorlabstrm "Trad.not_clean"
-    (str"Tried to define " ++ str id ++
-       str" with a term using variable " ++ var ++ spc () ++
-       str"which is not in its scope.")
-
-end
diff --git a/toplevel/himsg.ml b/toplevel/himsg.ml
index 579acffa..41783faa 100644
--- a/toplevel/himsg.ml
+++ b/toplevel/himsg.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: himsg.ml 11150 2008-06-19 11:38:27Z msozeau $ *)
+(* $Id: himsg.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -392,7 +392,7 @@ let explain_cannot_unify env m n =
   let pm = pr_lconstr_env env m in
   let pn = pr_lconstr_env env n in
   str "Impossible to unify" ++ brk(1,1) ++ pm ++ spc () ++
-  str "with" ++ brk(1,1) ++ pn
+  str "with" ++ brk(1,1) ++ pn ++ str "."
 
 let explain_cannot_unify_local env m n subn =
   let pm = pr_lconstr_env env m in
@@ -400,34 +400,31 @@ let explain_cannot_unify_local env m n subn =
   let psubn = pr_lconstr_env env subn in
     str "Impossible to unify" ++ brk(1,1) ++ pm ++ spc () ++
       str "with" ++ brk(1,1) ++ pn ++ spc () ++ str "as" ++ brk(1,1) ++
-      psubn ++ str " contains local variables"
+      psubn ++ str " contains local variables."
 
 let explain_refiner_cannot_generalize env ty =
   str "Cannot find a well-typed generalisation of the goal with type: " ++
-  pr_lconstr_env env ty
+  pr_lconstr_env env ty ++ str "."
 
 let explain_no_occurrence_found env c id =
   str "Found no subterm matching " ++ pr_lconstr_env env c ++
   str " in " ++ 
     (match id with
       | Some id -> pr_id id
-      | None -> str"the current goal")
+      | None -> str"the current goal") ++ str "."
 
 let explain_cannot_unify_binding_type env m n =
   let pm = pr_lconstr_env env m in
   let pn = pr_lconstr_env env n in
   str "This binding has type" ++ brk(1,1) ++ pm ++ spc () ++
-  str "which should be unifiable with" ++ brk(1,1) ++ pn
+  str "which should be unifiable with" ++ brk(1,1) ++ pn ++ str "."
 
 let explain_cannot_find_well_typed_abstraction env p l =
-  let la,lc = list_chop (List.length l - 1) l in
   str "Abstracting over the " ++
   str (plural (List.length l) "term") ++ spc () ++ 
-  hov 0 (prlist_with_sep pr_coma (pr_lconstr_env env) la ++
-         (if la<>[] then str " and" ++ spc () else mt()) ++ 
-         pr_lconstr_env env (List.hd lc)) ++ spc () ++
+  hov 0 (pr_enum (pr_lconstr_env env) l) ++ spc () ++
   str "leads to a term" ++ spc () ++ pr_lconstr_env env p ++ spc () ++ 
-  str "which is ill-typed"
+  str "which is ill-typed."
 
 let explain_type_error env err =
   let env = make_all_name_different env in
@@ -487,11 +484,11 @@ let explain_pretype_error env err =
 (* Typeclass errors *)
 
 let explain_not_a_class env c =
-  pr_constr_env env c ++ str" is not a declared type class"
+  pr_constr_env env c ++ str" is not a declared type class."
 
 let explain_unbound_method env cid id =
   str "Unbound method name " ++ Nameops.pr_id (snd id) ++ spc () ++ str"of class" ++ spc () ++ 
-    pr_global cid
+    pr_global cid ++ str "."
 
 let pr_constr_exprs exprs = 
   hv 0 (List.fold_right 
@@ -532,7 +529,7 @@ let explain_unsatisfiable_constraints env evd constr =
 	
 let explain_mismatched_contexts env c i j = 
   str"Mismatched contexts while declaring instance: " ++ brk (1,1) ++
-    hov 1 (str"Expected:" ++ brk (1, 1) ++ pr_named_context env j) ++ fnl () ++ brk (1,1) ++ 
+    hov 1 (str"Expected:" ++ brk (1, 1) ++ pr_rel_context env j) ++ fnl () ++ brk (1,1) ++ 
     hov 1 (str"Found:" ++ brk (1, 1) ++ pr_constr_exprs i)
 
 let explain_typeclass_error env err = 
@@ -549,21 +546,20 @@ let explain_refiner_bad_type arg ty conclty =
   str "Refiner was given an argument" ++ brk(1,1) ++
   pr_lconstr arg ++ spc () ++
   str "of type" ++ brk(1,1) ++ pr_lconstr ty ++ spc () ++
-  str "instead of" ++ brk(1,1) ++ pr_lconstr conclty
+  str "instead of" ++ brk(1,1) ++ pr_lconstr conclty ++ str "."
 
 let explain_refiner_unresolved_bindings l =
-  let l = map_succeed (function Name id -> id | _ -> failwith "") l in
   str "Unable to find an instance for the " ++ 
   str (plural (List.length l) "variable") ++ spc () ++
-  prlist_with_sep pr_coma pr_id l
+  prlist_with_sep pr_coma pr_name l ++ str"."
 
 let explain_refiner_cannot_apply t harg =
-  str "In refiner, a term of type " ++ brk(1,1) ++
+  str "In refiner, a term of type" ++ brk(1,1) ++
   pr_lconstr t ++ spc () ++ str "could not be applied to" ++ brk(1,1) ++
-  pr_lconstr harg
+  pr_lconstr harg ++ str "."
 
 let explain_refiner_not_well_typed c =
-  str "The term " ++ pr_lconstr c ++ str " is not well-typed"
+  str "The term " ++ pr_lconstr c ++ str " is not well-typed."
 
 let explain_intro_needs_product () =
   str "Introduction tactics needs products."
@@ -706,7 +702,7 @@ let explain_bad_constructor env cstr ind =
   str "is expected."
 
 let decline_string n s =
-  if n = 0 then "no "^s
+  if n = 0 then "no "^s^"s"
   else if n = 1 then "1 "^s
   else (string_of_int n^" "^s^"s")
 
@@ -781,3 +777,40 @@ let explain_reduction_tactic_error = function
       str "The abstracted term" ++ spc () ++ pr_lconstr_env_at_top env c ++
       spc () ++ str "is not well typed." ++ fnl () ++
       explain_type_error env' e
+
+let explain_ltac_call_trace (last,trace,loc) =
+  let calls = last :: List.rev (List.map snd trace) in
+  let pr_call = function
+  | Proof_type.LtacNotationCall s -> quote (str s)
+  | Proof_type.LtacNameCall cst -> quote (Pptactic.pr_ltac_constant cst)
+  | Proof_type.LtacVarCall (id,t) ->
+      quote (Nameops.pr_id id) ++ strbrk " (bound to " ++ 
+      Pptactic.pr_glob_tactic (Global.env()) t ++ str ")"
+  | Proof_type.LtacAtomCall (te,otac) -> quote
+      (Pptactic.pr_glob_tactic (Global.env())
+	(Tacexpr.TacAtom (dummy_loc,te)))
+      ++ (match !otac with
+      | Some te' when (Obj.magic te' <> te) ->
+	  strbrk " (expanded to " ++ quote
+	  (Pptactic.pr_tactic (Global.env())
+	    (Tacexpr.TacAtom (dummy_loc,te')))
+	++ str ")"
+      | _ -> mt ())
+  | Proof_type.LtacConstrInterp (c,(vars,unboundvars)) ->
+      let filter =
+	function (id,None) -> None | (id,Some id') -> Some(id,mkVar id') in
+      let unboundvars = list_map_filter filter unboundvars in
+      quote (pr_rawconstr_env (Global.env()) c) ++
+      (if unboundvars <> [] or vars <> [] then
+	strbrk " (with " ++ prlist_with_sep pr_coma (fun (id,c) -> 
+	pr_id id ++ str ":=" ++ Printer.pr_lconstr c)
+	  (List.rev vars @ unboundvars)
+       else mt()) ++ str ")" in
+  if calls <> [] then
+    let kind_of_last_call = match list_last calls with
+    | Proof_type.LtacConstrInterp _ -> ", last term evaluation failed."
+    | _ -> ", last call failed." in
+    hov 0 (str "In nested Ltac calls to " ++ 
+           pr_enum pr_call calls ++ strbrk kind_of_last_call)
+  else
+    mt ()
diff --git a/toplevel/himsg.mli b/toplevel/himsg.mli
index 1b9e38ce..ff5991de 100644
--- a/toplevel/himsg.mli
+++ b/toplevel/himsg.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: himsg.mli 10410 2007-12-31 13:11:55Z msozeau $ i*)
+(*i $Id: himsg.mli 11309 2008-08-06 10:30:35Z herbelin $ i*)
 
 (*i*)
 open Pp
@@ -40,3 +40,6 @@ val explain_pattern_matching_error :
 
 val explain_reduction_tactic_error :
   Tacred.reduction_tactic_error -> std_ppcmds
+
+val explain_ltac_call_trace : 
+  Proof_type.ltac_call_kind * Proof_type.ltac_trace * Util.loc -> std_ppcmds
diff --git a/toplevel/metasyntax.ml b/toplevel/metasyntax.ml
index fbeaea34..89ba6aac 100644
--- a/toplevel/metasyntax.ml
+++ b/toplevel/metasyntax.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: metasyntax.ml 11121 2008-06-12 21:15:49Z herbelin $ *)
+(* $Id: metasyntax.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -127,7 +127,7 @@ let print_grammar = function
       Gram.Entry.print Pcoq.Vernac_.gallina;
       msgnl (str "Entry gallina_ext is");
       Gram.Entry.print Pcoq.Vernac_.gallina_ext;
-  | _ -> error "Unknown or unprintable grammar entry"
+  | _ -> error "Unknown or unprintable grammar entry."
 
 (**********************************************************************)
 (* Parse a format (every terminal starting with a letter or a single
@@ -143,11 +143,11 @@ let parse_format (loc,str) =
     if n = 0 then l else push_token (UnpTerminal (String.make n ' ')) l in
   let close_box i b = function
     | a::(_::_ as l) -> push_token (UnpBox (b,a)) l
-    | _ -> error "Non terminated box in format" in
+    | _ -> error "Non terminated box in format." in
   let close_quotation i =
     if i < String.length str & str.[i] = '\'' & (i+1 = l or str.[i+1] = ' ')
     then i+1
-    else error "Incorrectly terminated quoted expression" in
+    else error "Incorrectly terminated quoted expression." in
   let rec spaces n i =
     if i < String.length str & str.[i] = ' ' then spaces (n+1) (i+1)
     else n in
@@ -155,10 +155,10 @@ let parse_format (loc,str) =
     if i < String.length str & str.[i] <> ' ' then
       if str.[i] = '\'' & quoted &
         (i+1 >= String.length str or str.[i+1] = ' ')
-      then if n=0 then error "Empty quoted token" else n
+      then if n=0 then error "Empty quoted token." else n
       else nonspaces quoted (n+1) (i+1)
     else
-      if quoted then error "Spaces are not allowed in (quoted) symbols"
+      if quoted then error "Spaces are not allowed in (quoted) symbols."
       else n in
   let rec parse_non_format i =
     let n = nonspaces false 0 i in
@@ -189,8 +189,8 @@ let parse_format (loc,str) =
 		(* Parse " [ .. ",  *)
 	    | ' ' | '\'' ->
 		parse_box (fun n -> PpHOVB n) (i+1)
-	    | _ -> error "\"v\", \"hv\", \" \" expected after \"[\" in format"
-	  else error "\"v\", \"hv\" or \" \" expected after \"[\" in format"
+	    | _ -> error "\"v\", \"hv\", \" \" expected after \"[\" in format."
+	  else error "\"v\", \"hv\" or \" \" expected after \"[\" in format."
       (* Parse "]"  *)
       | ']' ->
 	  ([] :: parse_token (close_quotation (i+1)))
@@ -201,7 +201,7 @@ let parse_format (loc,str) =
 	    (parse_token (close_quotation (i+n))))
     else
       if n = 0 then []
-      else error "Ending spaces non part of a format annotation"
+      else error "Ending spaces non part of a format annotation."
   and parse_box box i =
     let n = spaces 0 i in
     close_box i (box n) (parse_token (close_quotation (i+n)))
@@ -223,9 +223,9 @@ let parse_format (loc,str) =
   try
     if str <> "" then match parse_token 0 with
       | [l] -> l
-      | _ -> error "Box closed without being opened in format"
+      | _ -> error "Box closed without being opened in format."
     else
-      error "Empty format"
+      error "Empty format."
   with e ->
     Stdpp.raise_with_loc loc e
 
@@ -274,11 +274,11 @@ let rec find_pattern xl = function
   | [NonTerminal x], NonTerminal x' :: l' ->
       (x,x',xl),l'
   | [NonTerminal _], Terminal s :: _ | Terminal s :: _, _ ->
-      error ("The token "^s^" occurs on one side of \"..\" but not on the other side")
+      error ("The token "^s^" occurs on one side of \"..\" but not on the other side.")
   | [NonTerminal _], Break s :: _ | Break s :: _, _ ->
-      error ("A break occurs on one side of \"..\" but not on the other side")
+      error ("A break occurs on one side of \"..\" but not on the other side.")
   | ((SProdList _ | NonTerminal _) :: _ | []), _ -> 
-      error ("The special symbol \"..\" must occur in a configuration of the form\n\"x symbs .. symbs y\"")
+      error ("The special symbol \"..\" must occur in a configuration of the form\n\"x symbs .. symbs y\".")
 
 let rec interp_list_parser hd = function
   | [] -> [], List.rev hd
@@ -320,12 +320,13 @@ let rec raw_analyse_notation_tokens = function
   | String ".." :: sl ->
       let (vars,l) = raw_analyse_notation_tokens sl in
       (list_add_set ldots_var vars, NonTerminal ldots_var :: l)
+  | String "_" :: _ -> error "_ must be quoted."
   | String x :: sl when is_normal_token x ->
       Lexer.check_ident x;
       let id = Names.id_of_string x in
       let (vars,l) = raw_analyse_notation_tokens sl in
       if List.mem id vars then
-	error ("Variable "^x^" occurs more than once");
+	error ("Variable "^x^" occurs more than once.");
       (id::vars, NonTerminal id :: l)
   | String s :: sl ->
       Lexer.check_keyword s;
@@ -481,10 +482,10 @@ let make_hunks etyps symbols from =
 
 (* Build default printing rules from explicit format *)
 
-let error_format () = error "The format does not match the notation"
+let error_format () = error "The format does not match the notation."
 
 let rec split_format_at_ldots hd = function
-  | UnpTerminal s :: fmt when id_of_string s = ldots_var -> List.rev hd, fmt
+  | UnpTerminal s :: fmt when s = string_of_id ldots_var -> List.rev hd, fmt
   | u :: fmt -> 
       check_no_ldots_in_box u;
       split_format_at_ldots (u::hd) fmt
@@ -494,7 +495,7 @@ and check_no_ldots_in_box = function
   | UnpBox (_,fmt) ->
       (try 
         let _ = split_format_at_ldots [] fmt in
-        error ("The special symbol \"..\" must occur at the same formatting depth than the variables of which it is the ellipse")
+        error ("The special symbol \"..\" must occur at the same formatting depth than the variables of which it is the ellipse.")
       with Exit -> ())
   | _ -> ()
 
@@ -512,7 +513,7 @@ let read_recursive_format sl fmt =
   let rec get_tail = function
     | a :: sepfmt, b :: fmt when a = b -> get_tail (sepfmt, fmt)
     | [], tail -> skip_var_in_recursive_format tail
-    | _ -> error "The format is not the same on the right and left hand side of the special token \"..\"" in
+    | _ -> error "The format is not the same on the right and left hand side of the special token \"..\"." in
   let slfmt, fmt = get_head fmt in
   slfmt, get_tail (slfmt, fmt)
 
@@ -594,7 +595,7 @@ let make_production etyps symbols =
 	    let y = match List.assoc x etyps with
               | ETConstr x -> x
               | _ ->
-                  error "Component of recursive patterns in notation must be constr" in
+                  error "Component of recursive patterns in notation must be constr." in
             let typ = ETConstrList (y,sl) in
             NonTerm (typ, Some (x,typ)) :: l)
       symbols [] in
@@ -640,7 +641,7 @@ let error_incompatible_level ntn oldprec prec =
     (str ("Notation "^ntn^" is already defined") ++ spc() ++ 
     pr_level ntn oldprec ++ 
     spc() ++ str "while it is now required to be" ++ spc() ++ 
-    pr_level ntn prec)
+    pr_level ntn prec ++ str ".")
 
 let cache_one_syntax_extension (prec,ntn,gr,pp) =
   try 
@@ -692,34 +693,34 @@ let interp_modifiers modl =
     | SetEntryType (s,typ) :: l ->
 	let id = id_of_string s in
 	if List.mem_assoc id etyps then
-	  error (s^" is already assigned to an entry or constr level");
+	  error (s^" is already assigned to an entry or constr level.");
 	interp assoc level ((id,typ)::etyps) format l
     | SetItemLevel ([],n) :: l ->
 	interp assoc level etyps format l
     | SetItemLevel (s::idl,n) :: l ->
 	let id = id_of_string s in
 	if List.mem_assoc id etyps then
-	  error (s^" is already assigned to an entry or constr level");
+	  error (s^" is already assigned to an entry or constr level.");
 	let typ = ETConstr (n,()) in
 	interp assoc level ((id,typ)::etyps) format (SetItemLevel (idl,n)::l)
     | SetLevel n :: l ->
-	if level <> None then error "A level is given more than once";
+	if level <> None then error "A level is given more than once.";
 	interp assoc (Some n) etyps format l
     | SetAssoc a :: l ->
-	if assoc <> None then error "An associativity is given more than once";
+	if assoc <> None then error"An associativity is given more than once.";
 	interp (Some a) level etyps format l
     | SetOnlyParsing :: l ->
 	onlyparsing := true;
 	interp assoc level etyps format l
     | SetFormat s :: l ->
-	if format <> None then error "A format is given more than once";
+	if format <> None then error "A format is given more than once.";
 	interp assoc level etyps (Some s) l
   in interp None None [] None modl
 
 let check_infix_modifiers modifiers =
   let (assoc,level,t,b,fmt) = interp_modifiers modifiers in
   if t <> [] then
-    error "explicit entry level or type unexpected in infix notation"
+    error "explicit entry level or type unexpected in infix notation."
 
 let no_syntax_modifiers modifiers = 
   modifiers = [] or modifiers = [SetOnlyParsing]
@@ -739,9 +740,9 @@ let set_entry_type etyps (x,typ) =
 
 let check_rule_productivity l = 
   if List.for_all (function NonTerminal _ -> true | _ -> false) l then
-    error "A notation must include at least one symbol";
+    error "A notation must include at least one symbol.";
   if (match l with SProdList _ :: _ -> true | _ -> false) then
-    error "A recursive notation must start with at least one symbol"
+    error "A recursive notation must start with at least one symbol."
 
 let is_not_printable = function
   | AVar _ -> warning "This notation won't be used for printing as it is bound to a \nsingle variable"; true
@@ -752,38 +753,38 @@ let find_precedence lev etyps symbols =
   | NonTerminal x :: _ ->
       (try match List.assoc x etyps with
 	| ETConstr _ ->
-	    error "The level of the leftmost non-terminal cannot be changed"
+	    error "The level of the leftmost non-terminal cannot be changed."
 	| ETIdent | ETBigint | ETReference -> 
 	    if lev = None then 
-	      Flags.if_verbose msgnl (str "Setting notation at level 0")
+	      Flags.if_verbose msgnl (str "Setting notation at level 0.")
 	    else
 	    if lev <> Some 0 then
-	      error "A notation starting with an atomic expression must be at level 0";
+	      error "A notation starting with an atomic expression must be at level 0.";
 	    0
 	| ETPattern | ETOther _ -> (* Give a default ? *)
 	    if lev = None then
-	      error "Need an explicit level"
+	      error "Need an explicit level."
 	    else Option.get lev
         | ETConstrList _ -> assert false (* internally used in grammar only *)
       with Not_found -> 
 	if lev = None then
-	  error "A left-recursive notation must have an explicit level"
+	  error "A left-recursive notation must have an explicit level."
 	else Option.get lev)
   | Terminal _ ::l when
       (match list_last symbols with Terminal _ -> true |_ -> false)
       -> 
       if lev = None then
-	(Flags.if_verbose msgnl (str "Setting notation at level 0"); 0)
+	(Flags.if_verbose msgnl (str "Setting notation at level 0."); 0)
       else Option.get lev
   | _ ->
-      if lev = None then error "Cannot determine the level";
+      if lev = None then error "Cannot determine the level.";
       Option.get lev
 
 let check_curly_brackets_notation_exists () =
   try let _ = Notation.level_of_notation "{ _ }" in ()
   with Not_found -> 
     error "Notations involving patterns of the form \"{ _ }\" are treated \n\
-specially and require that the notation \"{ _ }\" is already reserved"
+specially and require that the notation \"{ _ }\" is already reserved."
 
 (* Remove patterns of the form "{ _ }", unless it is the "{ _ }" notation *)
 let remove_curly_brackets l = 
@@ -970,7 +971,7 @@ let add_syntax_extension local mv =
 let add_notation_interpretation df names c sc =
   try add_notation_interpretation_core false df names c sc false
   with NoSyntaxRule ->
-    error "Parsing rule for this notation has to be previously declared"
+    error "Parsing rule for this notation has to be previously declared."
 
 (* Main entry point *)
 
diff --git a/toplevel/minicoq.ml b/toplevel/minicoq.ml
deleted file mode 100644
index e688d50e..00000000
--- a/toplevel/minicoq.ml
+++ /dev/null
@@ -1,149 +0,0 @@
-(************************************************************************)
-(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
-(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
-(*   \VV/  **************************************************************)
-(*    //   *      This file is distributed under the terms of the       *)
-(*         *       GNU Lesser General Public License Version 2.1        *)
-(************************************************************************)
-
-(* $Id: minicoq.ml 10346 2007-12-05 21:11:19Z aspiwack $ *)
-
-open Pp
-open Util
-open Names
-open Term
-open Sign
-open Declarations
-open Inductive
-open Type_errors
-open Safe_typing
-open G_minicoq
-
-let (env : safe_environment ref) = ref empty_environment
-
-let locals () =
-  List.map (fun (id,b,t) -> (id, make_path [] id CCI))
-    (named_context !env)
-
-let lookup_named id =
-  let rec look n = function
-    | [] -> mkVar id
-    | (Name id')::_ when id = id' -> mkRel n
-    | _::r -> look (succ n) r
-  in
-  look 1
-
-let args sign = Array.of_list (instance_from_section_context sign)
-
-let rec globalize bv c = match kind_of_term c with
-  | Var id -> lookup_named id bv
-  | Const (sp, _) ->
-      let cb = lookup_constant sp !env in mkConst (sp, args cb.const_hyps)
-  | Ind (sp,_ as spi, _) ->
-      let mib = lookup_mind sp !env in mkMutInd (spi, args mib.mind_hyps)
-  | Construct ((sp,_),_ as spc, _) ->
-      let mib = lookup_mind sp !env in mkMutConstruct (spc, args mib.mind_hyps)
-  | _ -> map_constr_with_named_binders (fun na l -> na::l) globalize bv c
-
-let check c = 
-  let c = globalize [] c in
-  let (j,u) = safe_infer !env c in
-  let ty = j_type j in
-  let pty = pr_term CCI (env_of_safe_env !env) ty in
-  mSGNL (hov 0 (str"  :" ++ spc () ++ hov 0 pty ++ fnl ()))
-
-let definition id ty c =
-  let c = globalize [] c in
-  let ty = Option.map (globalize []) ty in
-  let ce = { const_entry_body = c; const_entry_type = ty } in
-  let sp = make_path [] id CCI in
-  env := add_constant sp ce (locals()) !env;
-  mSGNL (hov 0 (pr_id id ++ spc () ++ str"is defined" ++ fnl ()))
-
-let parameter id t =
-  let t = globalize [] t in
-  let sp = make_path [] id CCI in
-  env := add_parameter sp t (locals()) !env;
-  mSGNL (hov 0 (str"parameter" ++ spc () ++ pr_id id ++ 
-		  spc () ++ str"is declared" ++ fnl ()))
-
-let variable id t =
-  let t = globalize [] t in
-  env := push_named_assum (id,t) !env;
-  mSGNL (hov 0 (str"variable" ++ spc () ++ pr_id id ++ 
-		  spc () ++ str"is declared" ++ fnl ()))
-
-let inductive par inds =
-  let nparams = List.length par in
-  let bvpar = List.rev (List.map (fun (id,_) -> Name id) par) in
-  let name_inds = List.map (fun (id,_,_) -> Name id) inds in
-  let bv = bvpar @  List.rev name_inds in
-  let npar = List.map (fun (id,c) -> (Name id, globalize [] c)) par in
-  let one_inductive (id,ar,cl) =
-    let cv = List.map (fun (_,c) -> prod_it (globalize bv c) npar) cl in
-    { mind_entry_nparams = nparams;
-      mind_entry_params = List.map (fun (id,c) -> (id, LocalAssum c)) par;
-      mind_entry_typename = id;
-      mind_entry_arity = prod_it (globalize bvpar ar) npar;
-      mind_entry_consnames = List.map fst cl;
-      mind_entry_lc = cv }
-  in
-  let inds = List.map one_inductive inds in
-  let mie = { 
-    mind_entry_finite = true;
-    mind_entry_inds = inds }
-  in
-  let sp =
-    let mi1 = List.hd inds in
-    make_path [] mi1.mind_entry_typename CCI in
-  env := add_mind sp mie (locals()) !env;
-  mSGNL (hov 0 (str"inductive type(s) are declared" ++ fnl ()))
-
-
-let execute = function
-  | Check c -> check c
-  | Definition (id, ty, c) -> definition id ty c
-  | Parameter (id, t) -> parameter id t
-  | Variable (id, t) -> variable id t
-  | Inductive (par,inds) -> inductive par inds
-
-let parse_file f =
-  let c = open_in f in
-  let cs = Stream.of_channel c in
-  try
-    while true do
-      let c = Grammar.Entry.parse command cs in execute c
-    done
-  with 
-    | End_of_file | Stdpp.Exc_located (_, End_of_file) -> close_in c; exit 0
-    | exn -> close_in c; raise exn
-
-module Explain = Fhimsg.Make(struct let pr_term = pr_term end)
-
-let rec explain_exn = function
-  | TypeError (k,ctx,te) -> 
-      mSGNL (hov 0 (str "type error:" ++ spc () ++ 
-		      Explain.explain_type_error k ctx te ++ fnl ()))
-  | Stdpp.Exc_located (_,exn) -> 
-      explain_exn exn
-  | exn -> 
-      mSGNL (hov 0 (str"error: " ++ str (Printexc.to_string exn) ++ fnl ()))
-
-let top () =
-  let cs = Stream.of_channel stdin in
-  while true do
-    try
-      let c = Grammar.Entry.parse command cs in execute c
-    with 
-      | End_of_file | Stdpp.Exc_located (_, End_of_file) -> exit 0
-      | exn -> explain_exn exn
-  done
-
-let main () =
-  if Array.length Sys.argv = 1 then
-    parse_file "test"
-  else
-    if Sys.argv.(1) = "-top" then top () else parse_file (Sys.argv.(1))
-
-let _ = Printexc.print main ()
-
diff --git a/toplevel/mltop.ml4 b/toplevel/mltop.ml4
index 30cffa34..ac30f890 100644
--- a/toplevel/mltop.ml4
+++ b/toplevel/mltop.ml4
@@ -11,7 +11,7 @@
  * camlp4deps will not work for this file unless Makefile system enhanced.
  *)
 
-(* $Id: mltop.ml4 10348 2007-12-06 17:36:14Z aspiwack $ *)
+(* $Id: mltop.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Util
 open Pp
@@ -99,8 +99,8 @@ let dir_ml_load s =
       (try t.load_obj s
        with
        | (UserError _ | Failure _ | Anomaly _ | Not_found as u) -> raise u
-       | _ -> errorlabstrm "Mltop.load_object" [< str"Cannot link ml-object ";
-                str s; str" to Coq code." >])
+       | _ -> errorlabstrm "Mltop.load_object" (str"Cannot link ml-object " ++
+                str s ++ str" to Coq code."))
 (* TO DO: .cma loading without toplevel *)
     | WithoutTop ->
       IFDEF Byte THEN
@@ -108,7 +108,7 @@ let dir_ml_load s =
 	 * if this code section starts to use a module not used elsewhere
 	 * in this file, the Makefile dependency logic needs to be updated.
 	 *)
-        let _,gname = where_in_path !coq_mlpath_copy s in
+        let _,gname = where_in_path true !coq_mlpath_copy s in
         try
           Dynlink.loadfile gname;
 	  Dynlink.add_interfaces 
@@ -116,11 +116,11 @@ let dir_ml_load s =
 				(Filename.basename gname) ".cmo"))] 
 	    [Filename.dirname gname]
 	with | Dynlink.Error a ->
-          errorlabstrm "Mltop.load_object" [< str (Dynlink.error_message a) >]
+          errorlabstrm "Mltop.load_object" (str (Dynlink.error_message a))
       ELSE () END
     | Native ->
 	errorlabstrm "Mltop.no_load_object"
-          [< str"Loading of ML object file forbidden in a native Coq" >]
+          (str"Loading of ML object file forbidden in a native Coq.")
 
 (* Dynamic interpretation of .ml *)
 let dir_ml_use s =
@@ -145,10 +145,10 @@ let add_path ~unix_path:dir ~coq_root:coq_dirpath =
   if exists_dir dir then
     begin
       add_ml_dir dir;
-      Library.add_load_path (dir,coq_dirpath)
+      Library.add_load_path true (dir,coq_dirpath)
     end
   else
-    msg_warning [< str ("Cannot open " ^ dir) >]
+    msg_warning (str ("Cannot open " ^ dir))
 
 let convert_string d =
   try Names.id_of_string d
@@ -159,19 +159,18 @@ let convert_string d =
     failwith "caught"
 
 let add_rec_path ~unix_path:dir ~coq_root:coq_dirpath =
-  let dirs = all_subdirs dir in
-  let prefix = Names.repr_dirpath coq_dirpath in
-  if dirs <> [] then
+  if exists_dir dir then
+    let dirs = all_subdirs dir in
+    let prefix = Names.repr_dirpath coq_dirpath in
     let convert_dirs (lp,cp) =
-      (lp,Names.make_dirpath
-            ((List.map convert_string (List.rev cp))@prefix)) in
+      (lp,Names.make_dirpath (List.map convert_string (List.rev cp)@prefix)) in
     let dirs = map_succeed convert_dirs dirs in
-    begin
-      List.iter (fun lpe -> add_ml_dir (fst lpe)) dirs;
-      List.iter Library.add_load_path dirs
-    end
+    List.iter (fun lpe -> add_ml_dir (fst lpe)) dirs;
+    add_ml_dir dir;
+    List.iter (Library.add_load_path false) dirs;
+    Library.add_load_path true (dir,Names.make_dirpath prefix)
   else
-    msg_warning [< str ("Cannot open " ^ dir) >]
+    msg_warning (str ("Cannot open " ^ dir))
 
 (* convertit un nom quelconque en nom de fichier ou de module *) 
 let mod_of_name name =
@@ -191,7 +190,7 @@ let file_of_name name =
   if (is_in_path !coq_mlpath_copy fname) then fname
   else
     errorlabstrm "Mltop.load_object"
-      [< str"File not found on loadpath : "; str (bname^".cm[oa]") >]
+      (str"File not found on loadpath : " ++ str (bname^".cm[oa]"))
 
 (* TODO: supprimer ce hack, si possible *)
 (* Initialisation of ML modules that need the state (ex: tactics like
@@ -248,7 +247,7 @@ let unfreeze_ml_modules x =
            load_object mname fname
          else 
 	   errorlabstrm "Mltop.unfreeze_ml_modules"
-             [< str"Loading of ML object file forbidden in a native Coq" >];
+             (str"Loading of ML object file forbidden in a native Coq.");
        add_loaded_module mname)
     x
 
@@ -271,11 +270,11 @@ let cache_ml_module_object (_,{mnames=mnames}) =
          begin 
 	   try 
 	     if_verbose 
-	       msg [< str"[Loading ML file "; str fname; str" ..." >];
+	       msg (str"[Loading ML file " ++ str fname ++ str" ...");
              load_object mname fname;
-             if_verbose msgnl [< str"done]" >]
+             if_verbose msgnl (str"done]")
            with e -> 
-	     if_verbose msgnl [< str"failed]" >]; 
+	     if_verbose msgnl (str"failed]"); 
 	     raise e
 	 end;
          add_loaded_module mname)
@@ -294,11 +293,11 @@ let declare_ml_modules l =
     
 let print_ml_path () =
   let l = !coq_mlpath_copy in
-  ppnl [< str"ML Load Path:"; fnl (); str"  ";
-          hv 0 (prlist_with_sep pr_fnl pr_str l) >]
+  ppnl (str"ML Load Path:" ++ fnl () ++ str"  " ++
+          hv 0 (prlist_with_sep pr_fnl pr_str l))
 
 	  (* Printing of loaded ML modules *)
 	  
 let print_ml_modules () =
   let l = get_loaded_modules () in
-  pp [< str"Loaded ML Modules: " ; pr_vertical_list pr_str l >]
+  pp (str"Loaded ML Modules: " ++ pr_vertical_list pr_str l)
diff --git a/toplevel/record.ml b/toplevel/record.ml
index 5629bb71..306ab047 100644
--- a/toplevel/record.ml
+++ b/toplevel/record.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: record.ml 11024 2008-05-30 12:41:39Z msozeau $ *)
+(* $Id: record.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -31,29 +31,46 @@ open Topconstr
 
 (********** definition d'un record (structure) **************)
 
-let interp_decl sigma env = function
-  | Vernacexpr.AssumExpr((_,id),t) -> (id,None,interp_type Evd.empty env t)
-  | Vernacexpr.DefExpr((_,id),c,t) ->
-      let c = match t with
-	| None -> c
-	| Some t -> mkCastC (c, Rawterm.CastConv (DEFAULTcast,t))
-      in
-      let j = interp_constr_judgment Evd.empty env c in
-      (id,Some j.uj_val, refresh_universes j.uj_type)
+let interp_evars evdref env ?(impls=([],[])) k typ =
+  let typ' = intern_gen true ~impls (Evd.evars_of !evdref) env typ in
+  let imps = Implicit_quantifiers.implicits_of_rawterm typ' in
+    imps, Pretyping.Default.understand_tcc_evars evdref env k typ'
+
+let mk_interning_data env na impls typ =
+  let impl = Impargs.compute_implicits_with_manual env typ (Impargs.is_implicit_args()) impls
+  in (out_name na, ([], impl, Notation.compute_arguments_scope typ))
+    
+let interp_fields_evars isevars env l =
+  List.fold_left
+    (fun (env, uimpls, params, impls) ((loc, i), b, t) ->
+      let impl, t' = interp_evars isevars env ~impls Pretyping.IsType t in
+      let b' = Option.map (fun x -> snd (interp_evars isevars env ~impls (Pretyping.OfType (Some t')) x)) b in
+      let data = mk_interning_data env i impl t' in
+      let d = (i,b',t') in
+	(push_rel d env, impl :: uimpls, d::params, ([], data :: snd impls)))
+    (env, [], [], ([], [])) l    
+
+let binder_of_decl = function
+  | Vernacexpr.AssumExpr(n,t) -> (n,None,t)
+  | Vernacexpr.DefExpr(n,c,t) -> (n,Some c, match t with Some c -> c | None -> CHole (fst n, None))
+
+let binders_of_decls = List.map binder_of_decl
 
 let typecheck_params_and_fields id t ps fs =
   let env0 = Global.env () in
-  let (env1,newps), _ = interp_context Evd.empty env0 ps in
+  let (env1,newps), imps = interp_context Evd.empty env0 ps in
   let fullarity = it_mkProd_or_LetIn t newps in
   let env_ar = push_rel_context newps (push_rel (Name id,None,fullarity) env0) in
-  let env2,newfs =
-    List.fold_left
-      (fun (env,newfs) d ->
-         let decl = interp_decl Evd.empty env d in
-         (push_rel decl env, decl::newfs))
-      (env_ar,[]) fs
+  let evars = ref (Evd.create_evar_defs Evd.empty) in
+  let env2,impls,newfs,data =
+    interp_fields_evars evars env_ar (binders_of_decls fs)
   in
-  newps, newfs
+  let newps = Evarutil.nf_rel_context_evar (Evd.evars_of !evars) newps in
+  let newfs = Evarutil.nf_rel_context_evar (Evd.evars_of !evars) newfs in
+  let ce t = Evarutil.check_evars env0 Evd.empty !evars t in
+    List.iter (fun (n, b, t) -> Option.iter ce b; ce t) newps;
+    List.iter (fun (n, b, t) -> Option.iter ce b; ce t) newfs;
+    imps, newps, impls, newfs
 
 let degenerate_decl (na,b,t) =
   let id = match na with
@@ -70,24 +87,25 @@ type record_error =
 let warning_or_error coe indsp err =
   let st = match err with
     | MissingProj (fi,projs) ->
-	let s,have = if List.length projs > 1 then "s","have" else "","has" in
+	let s,have = if List.length projs > 1 then "s","were" else "","was" in
         (str(string_of_id fi) ++
-	   str" cannot be defined because the projection" ++ str s ++ spc () ++
-           prlist_with_sep pr_coma pr_id projs ++ spc () ++ str have ++ str "n't.")
+	   strbrk" cannot be defined because the projection" ++ str s ++ spc () ++
+           prlist_with_sep pr_coma pr_id projs ++ spc () ++ str have ++ 
+	   strbrk " not defined.")
     | BadTypedProj (fi,ctx,te) ->
 	match te with
 	  | ElimArity (_,_,_,_,Some (_,_,NonInformativeToInformative)) ->
               (pr_id fi ++ 
-		str" cannot be defined because it is informative and " ++
+		strbrk" cannot be defined because it is informative and " ++
 		Printer.pr_inductive (Global.env()) indsp ++
-		str " is not.")   
+		strbrk " is not.")   
 	  | ElimArity (_,_,_,_,Some (_,_,StrongEliminationOnNonSmallType)) ->
 	      (pr_id fi ++ 
-		str" cannot be defined because it is large and " ++
+		strbrk" cannot be defined because it is large and " ++
 		Printer.pr_inductive (Global.env()) indsp ++
-		str " is not.")
+		strbrk " is not.")
 	  | _ -> 
-              (pr_id fi ++ str " cannot be defined because it is not typable")
+              (pr_id fi ++ strbrk " cannot be defined because it is not typable.")
   in
   if coe then errorlabstrm "structure" st;
   Flags.if_verbose ppnl (hov 0 (str"Warning: " ++ st))
@@ -131,7 +149,7 @@ let instantiate_possibly_recursive_type indsp paramdecls fields =
   substl_rel_context (subst@[mkInd indsp]) fields
 
 (* We build projections *)
-let declare_projections indsp ?(kind=StructureComponent) ?name coers fields =
+let declare_projections indsp ?(kind=StructureComponent) ?name coers fieldimpls fields =
   let env = Global.env() in
   let (mib,mip) = Global.lookup_inductive indsp in
   let paramdecls = mib.mind_params_ctxt in
@@ -142,8 +160,8 @@ let declare_projections indsp ?(kind=StructureComponent) ?name coers fields =
   let fields = instantiate_possibly_recursive_type indsp paramdecls fields in
   let lifted_fields = lift_rel_context 1 fields in
   let (_,kinds,sp_projs,_) =
-    List.fold_left2
-      (fun (nfi,kinds,sp_projs,subst) coe (fi,optci,ti) ->
+    list_fold_left3
+      (fun (nfi,kinds,sp_projs,subst) coe (fi,optci,ti) impls ->
 	let (sp_projs,subst) =
 	  match fi with
 	  | Anonymous ->
@@ -180,6 +198,8 @@ let declare_projections indsp ?(kind=StructureComponent) ?name coers fields =
                   raise (NotDefinable (BadTypedProj (fid,ctx,te))) in
 	      let refi = ConstRef kn in
 	      let constr_fi = mkConst kn in
+	      Impargs.maybe_declare_manual_implicits 
+		false refi (Impargs.is_implicit_args()) impls;
 	      if coe then begin
 	        let cl = Class.class_of_global (IndRef indsp) in
 	        Class.try_add_new_coercion_with_source refi Global cl
@@ -191,28 +211,18 @@ let declare_projections indsp ?(kind=StructureComponent) ?name coers fields =
 	      warning_or_error coe indsp why;
 	      (None::sp_projs,NoProjection fi::subst) in
       (nfi-1,(optci=None)::kinds,sp_projs,subst))
-      (List.length fields,[],[],[]) coers (List.rev fields)
+      (List.length fields,[],[],[]) coers (List.rev fields) (List.rev fieldimpls)
   in (kinds,sp_projs)
 
-(* [fs] corresponds to fields and [ps] to parameters; [coers] is a boolean 
-   list telling if the corresponding fields must me declared as coercion *)
-let definition_structure ((is_coe,(_,idstruc)),ps,cfs,idbuild,s) =
-  let coers,fs = List.split cfs in
-  let extract_name acc = function
-      Vernacexpr.AssumExpr((_,Name id),_) -> id::acc
-    | Vernacexpr.DefExpr ((_,Name id),_,_) -> id::acc
-    | _ -> acc in
-  let allnames =  idstruc::(List.fold_left extract_name [] fs) in
-  if not (list_distinct allnames) then error "Two objects have the same name";
-  (* Now, younger decl in params and fields is on top *)
-  let params,fields = typecheck_params_and_fields idstruc (mkSort s) ps fs in
+let declare_structure id idbuild paramimpls params arity fieldimpls fields
+    ?(kind=StructureComponent) ?name is_coe coers =
   let nparams = List.length params and nfields = List.length fields in
   let args = extended_rel_list nfields params in
   let ind = applist (mkRel (1+nparams+nfields), args) in
   let type_constructor = it_mkProd_or_LetIn ind fields in
   let mie_ind =
-    { mind_entry_typename = idstruc;
-      mind_entry_arity = mkSort s;
+    { mind_entry_typename = id;
+      mind_entry_arity = arity;
       mind_entry_consnames = [idbuild];
       mind_entry_lc = [type_constructor] } in
   let declare_as_coind =
@@ -223,10 +233,27 @@ let definition_structure ((is_coe,(_,idstruc)),ps,cfs,idbuild,s) =
       mind_entry_record = true;
       mind_entry_finite = not declare_as_coind;
       mind_entry_inds = [mie_ind] } in
-  let kn = declare_mutual_with_eliminations true mie [] in
+  let kn = Command.declare_mutual_with_eliminations true mie [(paramimpls,[])] in
   let rsp = (kn,0) in (* This is ind path of idstruc *)
-  let kinds,sp_projs = declare_projections rsp coers fields in
-  let build = ConstructRef (rsp,1) in (* This is construct path of idbuild *)
-  if is_coe then Class.try_add_new_coercion build Global;
-  Recordops.declare_structure(rsp,idbuild,List.rev kinds,List.rev sp_projs);
-  kn
+  let kinds,sp_projs = declare_projections rsp ~kind ?name coers fieldimpls fields in
+  let build = ConstructRef (rsp,1) in
+    if is_coe then Class.try_add_new_coercion build Global;
+    Recordops.declare_structure(rsp,idbuild,List.rev kinds,List.rev sp_projs);
+    kn
+
+(* [fs] corresponds to fields and [ps] to parameters; [coers] is a boolean 
+   list telling if the corresponding fields must me declared as coercion *)
+let definition_structure ((is_coe,(_,idstruc)),ps,cfs,idbuild,s) =
+  let coers,fs = List.split cfs in
+  let extract_name acc = function
+      Vernacexpr.AssumExpr((_,Name id),_) -> id::acc
+    | Vernacexpr.DefExpr ((_,Name id),_,_) -> id::acc
+    | _ -> acc in
+  let allnames =  idstruc::(List.fold_left extract_name [] fs) in
+  if not (list_distinct allnames) then error "Two objects have the same name";
+  (* Now, younger decl in params and fields is on top *)
+  let implpars, params, implfs, fields = typecheck_params_and_fields idstruc (mkSort s) ps fs in
+  let implfs = List.map 
+    (fun impls -> implpars @ Impargs.lift_implicits (succ (List.length params)) impls) implfs in
+    declare_structure idstruc idbuild implpars params (mkSort s) implfs fields is_coe coers
+  
diff --git a/toplevel/record.mli b/toplevel/record.mli
index 9642b351..48181437 100644
--- a/toplevel/record.mli
+++ b/toplevel/record.mli
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: record.mli 11024 2008-05-30 12:41:39Z msozeau $ i*)
+(*i $Id: record.mli 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 (*i*)
 open Names
@@ -14,6 +14,7 @@ open Term
 open Sign
 open Vernacexpr
 open Topconstr
+open Impargs
 (*i*)
 
 (* [declare_projections ref name coers params fields] declare projections of
@@ -21,7 +22,18 @@ open Topconstr
    as coercions accordingly to [coers]; it returns the absolute names of projections *)
 
 val declare_projections :
-  inductive -> ?kind:Decl_kinds.definition_object_kind -> ?name:identifier -> bool list -> rel_context -> bool list * constant option list
+  inductive -> ?kind:Decl_kinds.definition_object_kind -> ?name:identifier ->
+  bool list -> manual_explicitation list list -> rel_context -> 
+  bool list * constant option list
+
+val declare_structure : identifier -> identifier -> 
+  manual_explicitation list -> rel_context -> (* params *)
+  Term.constr -> (* arity *)
+  Impargs.manual_explicitation list list -> Sign.rel_context -> (* fields *)
+  ?kind:Decl_kinds.definition_object_kind -> ?name:identifier ->
+  bool -> (* coercion? *)
+  bool list -> (* field coercions *)
+  mutual_inductive
 
 val definition_structure :
   lident with_coercion * local_binder list *
diff --git a/toplevel/toplevel.ml b/toplevel/toplevel.ml
index 42f2883a..8a9ef501 100644
--- a/toplevel/toplevel.ml
+++ b/toplevel/toplevel.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: toplevel.ml 10916 2008-05-10 15:38:36Z herbelin $ *)
+(* $Id: toplevel.ml 11317 2008-08-07 15:52:38Z barras $ *)
 
 open Pp
 open Util
@@ -140,13 +140,15 @@ let print_highlight_location ib loc =
 (* Functions to report located errors in a file. *)
 
 let print_location_in_file s inlibrary fname loc =
-  let errstrm = (str"Error while reading " ++ str s ++ str":") in
-  if loc = dummy_loc then 
-    (errstrm ++ str", unknown location." ++ fnl ())
+  let errstrm = str"Error while reading " ++ str s in
+  if loc = dummy_loc then
+    hov 1 (errstrm ++ spc() ++ str" (unknown location):") ++ fnl ()
   else
+    let errstrm =
+      if s = fname then mt() else errstrm ++ str":" ++ fnl() in
     if inlibrary then
-      (errstrm ++ fnl () ++ str"Module " ++ str ("\""^fname^"\"") ++
-       str" characters " ++ Cerrors.print_loc loc ++ fnl ())
+      hov 0 (errstrm ++ str"Module " ++ str ("\""^fname^"\"") ++ spc() ++
+             str"characters " ++ Cerrors.print_loc loc) ++ fnl ()
     else
     let (bp,ep) = unloc loc in
     let ic = open_in fname in
@@ -160,10 +162,15 @@ let print_location_in_file s inlibrary fname loc =
     try
       let (line, bol) = line_of_pos 1 0 0 in
       close_in ic;
-      (errstrm  ++ str"File " ++ str ("\""^fname^"\"") ++
-         str", line " ++ int line ++
-         str", characters " ++ Cerrors.print_loc (make_loc (bp-bol,ep-bol)) ++ str":" ++ fnl ())
-    with e -> (close_in ic; (errstrm ++ str", invalid location." ++ fnl ()))
+      hov 0
+        (errstrm ++ str"File " ++ str ("\""^fname^"\"") ++ str"," ++ spc() ++
+         hov 0 (str"line " ++ int line ++ str"," ++ spc() ++
+                str"characters " ++
+                Cerrors.print_loc (make_loc (bp-bol,ep-bol))) ++ str":") ++
+      fnl ()
+    with e ->
+      (close_in ic;
+       hov 1 (errstrm ++ spc() ++ str"(invalid location):") ++ fnl ())
 	
 let print_command_location ib dloc =
   match dloc with
diff --git a/toplevel/usage.ml b/toplevel/usage.ml
index 782fdc80..b0b0f826 100644
--- a/toplevel/usage.ml
+++ b/toplevel/usage.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: usage.ml 8932 2006-06-09 09:29:03Z notin $ *)
+(* $Id: usage.ml 11209 2008-07-05 10:17:49Z herbelin $ *)
 
 let version () =
   Printf.printf "The Coq Proof Assistant, version %s (%s)\n"
@@ -20,10 +20,14 @@ let print_usage_channel co command =
   output_string co command;
   output_string co "Coq options are:\n";
   output_string co
-"  -I dir                 add directory dir in the include path
+"  -I dir -as coqdir      map physical dir to logical coqdir
+  -I dir                 map directory dir to the empty logical path
   -include dir           (idem)
-  -R dir coqdir          recursively map physical dir to logical coqdir 
+  -R dir -as coqdir      recursively map physical dir to logical coqdir 
+  -R dir coqdir          (idem)
   -top coqdir            set the toplevel name to be coqdir instead of Top
+  -notop    r            set the toplevel name to be the empty logical path
+  -exclude-dir f         exclude subdirectories named f for option -R
 
   -inputstate f          read state from file f.coq
   -is f                  (idem)
diff --git a/toplevel/vernacentries.ml b/toplevel/vernacentries.ml
index 402f3b34..3f474239 100644
--- a/toplevel/vernacentries.ml
+++ b/toplevel/vernacentries.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: vernacentries.ml 11065 2008-06-06 22:39:43Z msozeau $ i*)
+(*i $Id: vernacentries.ml 11313 2008-08-07 11:15:03Z barras $ i*)
 
 (* Concrete syntax of the mathematical vernacular MV V2.6 *)
 
@@ -95,7 +95,7 @@ let show_script () =
   let pts = get_pftreestate () in
   let pf = proof_of_pftreestate pts
   and evc = evc_of_pftreestate pts in
-  msgnl_with !Pp_control.deep_ft (print_treescript true evc pf)
+  msgnl_with !Pp_control.deep_ft (print_treescript evc pf)
 
 let show_thesis () =
      msgnl (anomaly "TODO" )
@@ -175,17 +175,17 @@ let show_match id =
 		^ " => \n" ^ acc)
 	"end" patterns in
     msg (str ("match # with\n" ^ cases))
-  with Not_found -> error "Unknown inductive type"
+  with Not_found -> error "Unknown inductive type."
 
 (* "Print" commands *)
 
 let print_path_entry (s,l) =
-  (str s ++ str " " ++ tbrk (0,2) ++ str (string_of_dirpath l))
+  (str (string_of_dirpath l) ++ str " " ++ tbrk (0,0) ++ str s)
 
 let print_loadpath () =
   let l = Library.get_full_load_paths () in
-  msgnl (Pp.t (str "Physical path:                                 " ++
-		 tab () ++ str "Logical Path:" ++ fnl () ++ 
+  msgnl (Pp.t (str "Logical Path:                 " ++
+		 tab () ++ str "Physical path:" ++ fnl () ++
 		 prlist_with_sep pr_fnl print_path_entry l))
 
 let print_modules () =
@@ -232,7 +232,7 @@ let dump_universes s =
 
 let locate_file f =
   try
-    let _,file = System.where_in_path (Library.get_load_paths ()) f in
+    let _,file = System.where_in_path false (Library.get_load_paths ()) f in
     msgnl (str file)
   with Not_found -> 
     msgnl (hov 0 (str"Can't find file" ++ spc () ++ str f ++ spc () ++
@@ -240,24 +240,26 @@ let locate_file f =
 
 let msg_found_library = function
   | Library.LibLoaded, fulldir, file ->
-      msgnl(pr_dirpath fulldir ++ str " has been loaded from file" ++ fnl () ++
-      str file)
+      msgnl (hov 0
+	(pr_dirpath fulldir ++ strbrk " has been loaded from file " ++
+	 str file))
   | Library.LibInPath, fulldir, file ->
-      msgnl(pr_dirpath fulldir ++ str " is bound to file " ++ str file)
+      msgnl (hov 0
+	(pr_dirpath fulldir ++ strbrk " is bound to file " ++ str file))
 let msg_notfound_library loc qid = function
   | Library.LibUnmappedDir ->
       let dir = fst (repr_qualid qid) in
       user_err_loc (loc,"locate_library",
-        str "Cannot find a physical path bound to logical path " ++
-           pr_dirpath dir ++ fnl ())
+        strbrk "Cannot find a physical path bound to logical path " ++
+           pr_dirpath dir ++ str".")
   | Library.LibNotFound ->
       msgnl (hov 0 
-	(str"Unable to locate library" ++ spc () ++ pr_qualid qid))
+	(strbrk "Unable to locate library " ++ pr_qualid qid ++ str"."))
   | e -> assert false
 
 let print_located_library r =
   let (loc,qid) = qualid_of_reference r in
-  try msg_found_library (Library.locate_qualified_library qid)
+  try msg_found_library (Library.locate_qualified_library false qid)
   with e -> msg_notfound_library loc qid e
 
 let print_located_module r = 
@@ -329,7 +331,7 @@ let vernac_definition (local,_,_ as k) (_,id as lid) def hook =
   | ProveBody (bl,t) ->   (* local binders, typ *)
       if Lib.is_modtype () then
 	errorlabstrm "Vernacentries.VernacDefinition"
-	  (str "Proof editing mode not supported in module types")
+	  (str "Proof editing mode not supported in module types.")
       else
 	let hook _ _ = () in
 	start_proof_and_print (local,DefinitionBody Definition)
@@ -351,10 +353,10 @@ let vernac_start_proof kind l lettop hook =
   if not(refining ()) then
     if lettop then
       errorlabstrm "Vernacentries.StartProof"
-	(str "Let declarations can only be used in proof editing mode");
+	(str "Let declarations can only be used in proof editing mode.");
   if Lib.is_modtype () then
     errorlabstrm "Vernacentries.StartProof"
-      (str "Proof editing mode not supported in module types");
+      (str "Proof editing mode not supported in module types.");
   start_proof_and_print (Global, Proof kind) l hook
 
 let vernac_end_proof = function
@@ -377,7 +379,7 @@ let vernac_exact_proof c =
       save_named true end
     else
       errorlabstrm "Vernacentries.ExactProof"
-	(str "Command 'Proof ...' can only be used at the beginning of the proof")
+	(strbrk "Command 'Proof ...' can only be used at the beginning of the proof.")
   	
 let vernac_assumption kind l nl=
   let global = fst kind = Global in
@@ -421,7 +423,7 @@ let vernac_declare_module export (loc, id) binders_ast mty_ast_o =
   (* We check the state of the system (in section, in module type)
      and what module information is supplied *)
   if Lib.sections_are_opened () then
-    error "Modules and Module Types are not allowed inside sections";
+    error "Modules and Module Types are not allowed inside sections.";
   let binders_ast = List.map
    (fun (export,idl,ty) ->
      if export <> None then
@@ -441,7 +443,7 @@ let vernac_define_module export (loc, id) binders_ast mty_ast_o mexpr_ast_o =
   (* We check the state of the system (in section, in module type)
      and what module information is supplied *)
   if Lib.sections_are_opened () then
-    error "Modules and Module Types are not allowed inside sections";
+    error "Modules and Module Types are not allowed inside sections.";
   match mexpr_ast_o with
     | None ->
        check_no_pending_proofs ();
@@ -488,7 +490,7 @@ let vernac_end_module export (loc,id) =
 
 let vernac_declare_module_type (loc,id) binders_ast mty_ast_o =
   if Lib.sections_are_opened () then
-    error "Modules and Module Types are not allowed inside sections";
+    error "Modules and Module Types are not allowed inside sections.";
   
   match mty_ast_o with
     | None ->
@@ -552,7 +554,7 @@ let vernac_record struc binders sort nameopt cfs =
   let s = match kind_of_term s with
     | Sort s -> s
     | _ -> user_err_loc
-        (constr_loc sort,"definition_structure", str "Sort expected") in
+        (constr_loc sort,"definition_structure", str "Sort expected.") in
     if !dump then (
       dump_definition (snd struc) false "rec";
       List.iter (fun (_, x) ->
@@ -615,7 +617,6 @@ let vernac_instance glob sup inst props pri =
   ignore(Classes.new_instance ~global:glob sup inst props pri)
 
 let vernac_context l =
-  if !dump then List.iter (fun x -> dump_constraint x true "var") l;
   Classes.context l
 
 let vernac_declare_instance id =
@@ -626,7 +627,7 @@ let vernac_declare_instance id =
 (* Solving *)
 let vernac_solve n tcom b =
   if not (refining ()) then
-    error "Unknown command of the non proof-editing mode";
+    error "Unknown command of the non proof-editing mode.";
   Decl_mode.check_not_proof_mode "Unknown proof instruction";
   begin
     if b then 
@@ -653,7 +654,7 @@ let vernac_solve_existential = instantiate_nth_evar_com
 
 let vernac_set_end_tac tac =
   if not (refining ()) then
-    error "Unknown command of the non proof-editing mode";
+    error "Unknown command of the non proof-editing mode.";
   if tac <> (Tacexpr.TacId []) then set_end_tac (Tacinterp.interp tac) else ()
     (* TO DO verifier s'il faut pas mettre exist s | TacId s ici*)
 
@@ -771,7 +772,7 @@ let vernac_reserve idl c =
 
 let make_silent_if_not_pcoq b =
   if !pcoq <> None then 
-    error "Turning on/off silent flag is not supported in Centaur mode"
+    error "Turning on/off silent flag is not supported in Pcoq mode."
   else make_silent b
 
 let _ =
@@ -793,6 +794,14 @@ let _ =
 let _ =
   declare_bool_option 
     { optsync  = true;
+      optname  = "manual implicit arguments";
+      optkey   = (TertiaryTable ("Manual","Implicit","Arguments"));
+      optread  = Impargs.is_manual_implicit_args;
+      optwrite = Impargs.make_manual_implicit_args }
+
+let _ =
+  declare_bool_option 
+    { optsync  = true;
       optname  = "strict implicit arguments";
       optkey   = (SecondaryTable ("Strict","Implicit"));
       optread  = Impargs.is_strict_implicit_args;
@@ -825,7 +834,7 @@ let _ =
 let _ =
   declare_bool_option 
     { optsync  = true;
-      optname  = "implicit arguments defensive printing";
+      optname  = "implicit status of reversible patterns";
       optkey   = (TertiaryTable ("Reversible","Pattern","Implicit"));
       optread  = Impargs.is_reversible_pattern_implicit_args;
       optwrite = Impargs.make_reversible_pattern_implicit_args }
@@ -1096,7 +1105,7 @@ let global_module r =
   try Nametab.full_name_module qid
   with Not_found -> 
     user_err_loc (loc, "global_module",
-      str "Module/section " ++ pr_qualid qid ++ str " not found")
+      str "Module/section " ++ pr_qualid qid ++ str " not found.")
 
 let interp_search_restriction = function
   | SearchOutside l -> (List.map global_module l, true)
@@ -1143,7 +1152,7 @@ let vernac_goal = function
         start_proof_com (Global, Proof unnamed_kind) [None,c] (fun _ _ ->());
 	print_subgoals ()
       end else 
-	error "repeated Goal not permitted in refining mode"
+	error "repeated Goal not permitted in refining mode."
 
 let vernac_abort = function
   | None ->
@@ -1161,7 +1170,7 @@ let vernac_abort_all () =
     delete_all_proofs ();
     message "Current goals aborted"
   end else
-    error "No proof-editing in progress"
+    error "No proof-editing in progress."
 
 let vernac_restart () = restart_proof(); print_subgoals ()
 
@@ -1217,7 +1226,7 @@ let apply_subproof f occ =
   f evc (Global.named_context()) pf
 
 let explain_proof occ =
-  msg (apply_subproof (fun evd _ -> print_treescript true evd) occ)
+  msg (apply_subproof (fun evd _ -> print_treescript evd) occ)
 
 let explain_tree occ =
   msg (apply_subproof print_proof occ)
@@ -1256,7 +1265,7 @@ let vernac_check_guard () =
 	pfterm; 
       (str "The condition holds up to here")
     with UserError(_,s) -> 
-      (str ("Condition violated : ") ++s)
+      (str ("Condition violated: ") ++s)
   in 
   msgnl message
 
diff --git a/toplevel/vernacexpr.ml b/toplevel/vernacexpr.ml
index 744c3a6f..663e2e3c 100644
--- a/toplevel/vernacexpr.ml
+++ b/toplevel/vernacexpr.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(*i $Id: vernacexpr.ml 11024 2008-05-30 12:41:39Z msozeau $ i*)
+(*i $Id: vernacexpr.ml 11282 2008-07-28 11:51:53Z msozeau $ i*)
 
 open Util
 open Names
@@ -239,7 +239,7 @@ type vernac_expr =
 	(lident * lident list * constr_expr) list * (* props *)
 	int option (* Priority *)
 
-  | VernacContext of typeclass_context
+  | VernacContext of local_binder list
 	
   | VernacDeclareInstance of
       lident (* instance name *)
diff --git a/toplevel/vernacinterp.ml b/toplevel/vernacinterp.ml
index f43c0c5e..41669c47 100644
--- a/toplevel/vernacinterp.ml
+++ b/toplevel/vernacinterp.ml
@@ -6,7 +6,7 @@
 (*         *       GNU Lesser General Public License Version 2.1        *)
 (************************************************************************)
 
-(* $Id: vernacinterp.ml 10348 2007-12-06 17:36:14Z aspiwack $ *)
+(* $Id: vernacinterp.ml 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Pp
 open Util
@@ -31,7 +31,7 @@ let vinterp_add s f =
     Hashtbl.add vernac_tab s f
   with Failure _ ->
     errorlabstrm "vinterp_add"
-      (str"Cannot add the vernac command " ++ str s ++ str" twice")
+      (str"Cannot add the vernac command " ++ str s ++ str" twice.")
 
 let overwriting_vinterp_add s f =
   begin 
@@ -46,7 +46,7 @@ let vinterp_map s =
     Hashtbl.find vernac_tab s
   with Not_found -> 
     errorlabstrm "Vernac Interpreter"
-      (str"Cannot find vernac command " ++ str s)
+      (str"Cannot find vernac command " ++ str s ++ str".")
 
 let vinterp_init () = Hashtbl.clear vernac_tab
 
diff --git a/toplevel/whelp.ml4 b/toplevel/whelp.ml4
index 58703c8e..62aaa303 100644
--- a/toplevel/whelp.ml4
+++ b/toplevel/whelp.ml4
@@ -8,7 +8,7 @@
 
 (*i camlp4deps: "parsing/grammar.cma" i*)
 
-(* $Id: whelp.ml4 10904 2008-05-08 16:31:26Z herbelin $ *)
+(* $Id: whelp.ml4 11309 2008-08-06 10:30:35Z herbelin $ *)
 
 open Flags
 open Pp
@@ -80,7 +80,9 @@ let uri_of_dirpath dir =
 
 let error_whelp_unknown_reference ref =
   let qid = Nametab.shortest_qualid_of_global Idset.empty ref in
-  error ("Definitions of the current session not supported in Whelp: " ^ string_of_qualid qid)
+  errorlabstrm ""
+    (strbrk "Definitions of the current session, like " ++ pr_qualid qid ++ 
+     strbrk ", are not supported in Whelp.")
 
 let uri_of_repr_kn ref (mp,dir,l) = 
   match mp with
@@ -104,7 +106,7 @@ let uri_of_ind_pointer l =
 
 let uri_of_global ref =
   match ref with
-  | VarRef id -> error ("Unknown Whelp reference: "^(string_of_id id))
+  | VarRef id -> error ("Unknown Whelp reference: "^(string_of_id id)^".")
   | ConstRef cst ->
       uri_of_repr_kn ref (repr_con cst); url_string ".con"
   | IndRef (kn,i) -> 
@@ -165,7 +167,7 @@ let rec uri_of_constr c =
   | RCast (_,c, CastConv (_,t)) ->
       uri_of_constr c; url_string ":"; uri_of_constr t
   | RRec _ | RIf _ | RLetTuple _ | RCases _ ->
-      error "Whelp does not support pattern-matching and (co-)fixpoint"
+      error "Whelp does not support pattern-matching and (co-)fixpoint."
   | RVar _ | RRef _ | RHole _ | REvar _ | RSort _ | RCast (_,_, CastCoerce) ->
       anomaly "Written w/o parenthesis"
   | RPatVar _ | RDynamic _ ->