In the skeleton you have given, `pipe`

takes only one argument. From the type of pipe (`('a -> 'a) list -> 'a list`

) you know that this argument has type `('a -> 'a) list`

, and that you are supposed to return some value of type `('a -> 'a)`

.

Now the type of `List.fold_left`

is of the form `('b -> 'c -> 'b) -> 'b -> 'c list -> 'b`

. But you know that:

It should return a value of type `'a -> 'a`

, so `'b`

will be instantiated with `('a -> 'a)`

here

The third argument is of type `('a -> 'a) list`

, so `'c list`

will be `('a -> 'a) list`

here: again `'c`

will be instantiated with `('a -> 'a)`

.

You can conclude that you will use `List.fold_left`

at the specialized type (yes, it's a mouthful)

```
(('a -> 'a) -> ('a -> 'a) -> ('a -> 'a)) -> ('a -> 'a) -> ('a -> 'a) list -> ('a -> 'a)
```

Said shortly: if pipe must return a function and takes a list of functions, then `base`

must itself be a function, and `f`

must take two functions and return a function.

Which function should `base`

be? `base`

will be returned if `fs`

is the empty list, so `base`

should have the behavior expected of `pipe []`

.

How should `f a x`

combines the two functions `a`

and `x`

, both of type `'a -> 'a`

, and return a single function `'a -> 'a`

? I'll let you come up with an answer here. But the intuition you want to have the following equality to hold:

f (pipe [f1; f2]) f3 = pipe [f1; f2; f3]

(It holds for any list rather than just `[f1; f2]`

, but this example suffices). Working out the relation between the meaning of `pipe [f1; f2]`

and `pipe [f1; f2; f3]`

, you will be able to define the combining function `f`

.

Note that you could have written the `pipe`

function in a *very* different way starting from the following different skeleton:

```
let pipe fs x =
let f a x = failwith "to be implemented" in
let base = failwith "to be implemented" in
List.fold_left f base fs
```

In this case, `pipe`

takes two argument, one of type `('a -> 'a) list`

and the other of type `'a`

, and the whole returned value should be of type `'a`

(a value, rather than a function). `f`

takes a function (`'a -> 'a`

) and a value (`'a`

) and returns a value, and `base`

is just a value (which one can you choose?).

I believe this second approach is slightly easier as a bit less abstract, but if you teacher asked you to use the first skeleton it is probably because it will teach you things about manipulating functions, and building functions that build functions.