diff options
author | Samuel Mimram <smimram@debian.org> | 2008-07-25 15:12:53 +0200 |
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committer | Samuel Mimram <smimram@debian.org> | 2008-07-25 15:12:53 +0200 |
commit | a0cfa4f118023d35b767a999d5a2ac4b082857b4 (patch) | |
tree | dabcac548e299fee1da464c93b3dba98484f45b1 /theories/Reals/Ranalysis3.v | |
parent | 2281410e38ef99d025ea77194585a9bc019fdaa9 (diff) |
Imported Upstream version 8.2~beta3+dfsgupstream/8.2.beta3+dfsg
Diffstat (limited to 'theories/Reals/Ranalysis3.v')
-rw-r--r-- | theories/Reals/Ranalysis3.v | 13 |
1 files changed, 7 insertions, 6 deletions
diff --git a/theories/Reals/Ranalysis3.v b/theories/Reals/Ranalysis3.v index f50aa2ad..180cf9d6 100644 --- a/theories/Reals/Ranalysis3.v +++ b/theories/Reals/Ranalysis3.v @@ -6,12 +6,13 @@ (* * GNU Lesser General Public License Version 2.1 *) (************************************************************************) -(*i $Id: Ranalysis3.v 9245 2006-10-17 12:53:34Z notin $ i*) +(*i $Id: Ranalysis3.v 10710 2008-03-23 09:24:09Z herbelin $ i*) Require Import Rbase. Require Import Rfunctions. Require Import Ranalysis1. -Require Import Ranalysis2. Open Local Scope R_scope. +Require Import Ranalysis2. +Open Local Scope R_scope. (** Division *) Theorem derivable_pt_lim_div : @@ -23,7 +24,7 @@ Theorem derivable_pt_lim_div : Proof. intros f1 f2 x l1 l2 H H0 H1. cut (derivable_pt f2 x); - [ intro X | unfold derivable_pt in |- *; apply existT with l2; exact H0 ]. + [ intro X | unfold derivable_pt in |- *; exists l2; exact H0 ]. assert (H2 := continuous_neq_0 _ _ (derivable_continuous_pt _ _ X) H1). elim H2; clear H2; intros eps_f2 H2. unfold div_fct in |- *. @@ -761,7 +762,7 @@ Proof. intros f1 f2 x X X0 H. elim X; intros. elim X0; intros. - apply existT with ((x0 * f2 x - x1 * f1 x) / Rsqr (f2 x)). + exists ((x0 * f2 x - x1 * f1 x) / Rsqr (f2 x)). apply derivable_pt_lim_div; assumption. Qed. @@ -789,9 +790,9 @@ Proof. elim H0; clear H0; intros l2 H0. elim H1; clear H1; intros l H1. rewrite H; rewrite H0; apply derive_pt_eq_0. - assert (H3 := projT2 pr1). + assert (H3 := proj2_sig pr1). unfold derive_pt in H; rewrite H in H3. - assert (H4 := projT2 pr2). + assert (H4 := proj2_sig pr2). unfold derive_pt in H0; rewrite H0 in H4. apply derivable_pt_lim_div; assumption. Qed. |