Is it possible to prove this `forall (a b : nat), a <=? b = true -> a <=? S b = true.`

in Coq?

I tried this so far

```
Lemma leb_0_r : forall x, x <=? 0 = true -> x = 0.
intros. induction x. reflexivity. discriminate H.
Qed.
Lemma leb_S : forall a b, a <=? b = true -> a <=? S b = true.
intros a b Hab. induction b. apply leb_0_r in Hab. now rewrite Hab.
```

But here I got stuck on the induction hypothesis

```
1 subgoal
a, b : nat
Hab : (a <=? S b) = true
IHb : (a <=? b) = true -> (a <=? S b) = true
========================= (1 / 1)
(a <=? S (S b)) = true
```

I tried induction on a too

```
Lemma leb_S : forall a b, a <=? b = true -> a <=? S b = true.
intros a b Hab. induction a. reflexivity. simpl. destruct b.
discriminate Hab. simpl in Hab.
1 subgoal
a, b : nat
Hab : (a <=? b) = true
IHa : (a <=? S b) = true -> (a <=? S (S b)) = true
========================= (1 / 1)
(a <=? S b) = true
```

The problem is that I always get to `S a <= b`

or `a <= S b`

and I can't simplify that.

After posting here I realized that conclusion of IHa is equal to the goal of second try and vice versa :thinking:

`coq`

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