false = true problem when solving Lemma in Coq

I have definition:

``````Definition f (b1 b2 : bool) :bool :=
match b1 with
| true => true
| false => b2
end.
``````

And Lemma...

``````Lemma l1: forall p : bool, f p false = true.
``````

What I have tried is this:

``````Lemma l1: forall p : bool, f p false = true.
Proof.
intros p.
destruct p.
simpl.
reflexivity.
simpl.
``````

And then I get false=true. What to do?

You cannot prove `l1`, since `f false false = false`.

Perhaps you would like to prove:

``````Lemma l1: forall p : bool, f p false = p.
``````

Actually the definition was n ot good. Here it is.

``````Definition f (b1 b2 : bool) : bool :=
match b1, b2 with
| false, true => false
| _, _ => true
end.
``````

And then I did proof in this way. Am I right?

``````Lemma l1: forall p : bool, f p false = true.
Proof.
intros p.
destruct p.
simpl.
reflexivity.
simpl.
reflexivity.
Qed.
``````
• Your proof is correct. Using tacticals, you can make the proof script shorter and more readable: `Proof. destruct p; reflexivity. Qed.`. Please note that it's important not to build proofs about erroneous definitions ... Aug 30 at 17:53