Note that `f`

gets called with both `x`

and `f x`

as its argument—this immediately means that the type of `x`

and the type of `f x`

must be the same[1]. Carrying this argument onward, we see that since `x`

is the input to `f`

and `f x`

is the output of `f`

, the input and output of `f`

must be the same[2].

Finally, we examine the lambda term

```
\f x -> f (f x)
```

it has two inputs, `f`

(a function) and `x`

, and it returns whatever the return type of `f`

is[3]. Putting all of this information together we have

```
(a -> b) -> c -> d
where:
b ~ c by [1]
a ~ b by [2]
d ~ b by [3]
```

thus the type which Haskell inferred is correct

```
h :: (a -> a) -> a -> a
h f x = f (f x)
```