Uniformisation (Qed/Save et Implicits Arguments)

git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@2650 85f007b7-540e-0410-9357-904b9bb8a0f7

1 files changed, 4 insertions, 4 deletions

diff --git a/theories/Bool/Zerob.v b/theories/Bool/Zerob.v
index 4422a03f4..07b4c68c8 100755
--- a/theories/Bool/Zerob.v
+++ b/theories/Bool/Zerob.v
@@ -16,18 +16,18 @@ Definition zerob : nat->bool
 
 Lemma zerob_true_intro : (n:nat)(n=O)->(zerob n)=true.
 NewDestruct n; [Trivial with bool | Inversion 1].
-Save.
+Qed.
 Hints Resolve zerob_true_intro : bool.
 
 Lemma zerob_true_elim : (n:nat)(zerob n)=true->(n=O).
 NewDestruct n; [Trivial with bool | Inversion 1].
-Save.
+Qed.
 
 Lemma zerob_false_intro : (n:nat)~(n=O)->(zerob n)=false.
 NewDestruct n; [NewDestruct 1; Auto with bool | Trivial with bool].
-Save.
+Qed.
 Hints Resolve zerob_false_intro : bool.
 
 Lemma zerob_false_elim : (n:nat)(zerob n)=false -> ~(n=O).
 NewDestruct n; [Intro H; Inversion H | Auto with bool].
-Save.
+Qed.