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(***********************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * INRIA-Rocquencourt & LRI-CNRS-Orsay *)
(* \VV/ *************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(***********************************************************************)
(* $Id$ *)
(**** Tests of Field with real numbers ****)
Require Reals.
(* Example 1 *)
Goal (eps:R)``eps*1/(2+2)+eps*1/(2+2) == eps*1/2``.
Proof.
Intros.
Field.
Abort.
(* Example 2 *)
Goal (f,g:(R->R); x0,x1:R)
``((f x1)-(f x0))*1/(x1-x0)+((g x1)-(g x0))*1/(x1-x0) == ((f x1)+
(g x1)-((f x0)+(g x0)))*1/(x1-x0)``.
Proof.
Intros.
Field.
Abort.
(* Example 3 *)
Goal (a,b:R)``1/(a*b)*1/1/b == 1/a``.
Proof.
Intros.
Field.
Abort.
(* Example 4 *)
Goal (a,b:R)``a <> 0``->``b <> 0``->``1/(a*b)/1/b == 1/a``.
Proof.
Intros.
Field.
Abort.
(* Example 5 *)
Goal (a:R)``1 == 1*1/a*a``.
Proof.
Intros.
Field.
Abort.
(* Example 6 *)
Goal (a,b:R)``b == b*/a*a``.
Proof.
Intros.
Field.
Abort.
(* Example 7 *)
Goal (a,b:R)``b == b*1/a*a``.
Proof.
Intros.
Field.
Abort.
(* Example 8 *)
Goal (x,y:R)``x*((1/x)+x/(x+y)) == -(1/y)*y*(-(x*x/(x+y))-1)``.
Proof.
Intros.
Field.
Abort.
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