# Destructing on the result of applying a predicate function

I'm new to Coq and have a quick question about the destruct tactic. Suppose I have a `count` function that counts the number of occurrences of a given natural number in a list of natural numbers:

``````Fixpoint count (v : nat) (xs : natlist) : nat :=
match xs with
| nil => 0
| h :: t =>
match beq_nat h v with
| true => 1 + count v xs
| false => count v xs
end
end.
``````

I'd like to prove the following theorem:

``````Theorem count_cons : forall (n y : nat) (xs : natlist),
count n (y :: xs) = count n xs + count n [y].
``````

If I were proving the analogous theorem for n = 0, I could simply destruct y to 0 or S y'. For the general case, what I'd like to do is destruct (beq_nat n y) to true or false, but I can't seem to get that to work--I'm missing some piece of Coq syntax.

Any ideas?

-

``````Fixpoint count (v : nat) (xs : natlist) : nat :=
match xs with
| nil => 0
| h :: t =>
match beq_nat h v with
| true => 1 + count v xs (*will not compile since "count v xs" is not simply recursive*)
| false => count v xs
end
end.
``````

you probably meant

``````Fixpoint count (v : nat) (xs : natlist) : nat :=
match xs with
| nil => 0
| h :: t =>
match beq_nat h v with
| true => 1 + count v t
| false => count v t
end
end.
``````

Using `destruct` is then a perfectly good way to get your solution. But, you need to keep a few things in mind

• `destruct` is syntactic, that is it replaces terms that are expressed in your goal/assumptions. So, you normally need something like `simpl` (works here) or `unfold` first.
• the order of terms matters. `destruct (beq_nat n y)` is not the same thing as `destruct (beq_nat y n)`. In this case you want the second of those

Generally the problem is `destruct` is dumb, so you have to do the smarts yourself.

``````intros n y xs. simpl. destruct (beq_nat y n).