Is there a way to simplify one step at a time?

Say you have `f1 (f2 x)`

both of which can be simplified in turn via a single `simpl`

, is it possible to simplify `f2 x`

as a first step, examine the intermediate result and then simplify `f1`

?

Take for example the theorem:

```
Theorem pred_length : forall n : nat, forall l : list nat,
pred (length (n :: l)) = length l.
Proof.
intros.
simpl.
reflexivity.
Qed.
```

The `simpl`

tactic simplifies `Nat.pred (length (n :: l))`

to `length l`

. Is there a way to break that into a two step simplification i.e:

```
Nat.pred (length (n :: l)) --> Nat.pred (S (length l)) --> length l
```