The first thing that is confusing things is the `Num a =>`

, so we'll ignore that altogether for now. Instead, lets consider `Int -> Int -> Int`

, which is one possible specialization of the type signature you gave.

Functions are almost always curried in Haskell. This means that a multi-argument function is actually function of one argument that returns a function that takes the next argument, and so on.

The `->`

is right associative, so `Int -> Int -> Int`

is the same thing as `Int -> (Int -> Int)`

.

This also means that this definition

```
f :: Int -> Int -> Int
f x y = x + y
```

is the same as

```
f :: Int -> Int -> Int
f x = \y -> x + y
```

In fact, all functions in Haskell take exactly one argument. Tuples exist as well, but they are first-class citizens so they are more than just an argument list.

The `Num a =>`

is a bit of a different aspect of the type system. It says that the type variable `a`

must be an instance of the `Num`

type class. Common examples of types that are instances of `Num`

include `Int`

and `Double`

. So `Num`

isn't a type itself, it is a type class. `Num a =>`

represents a constraint on the type variable `a`

, it isn't another argument for the function.

The `(+)`

method is a member of the `Num`

type class, so you must constrain `a`

in this way in order to use `(+)`

. If you try to give `f`

the signature `a -> a -> a`

(with no constraint), it won't work because `a`

is completely unconstrained and we know nothing about what types it can be. As a result, we couldn't use `(+)`

on it.

`(Ord a, Num a) => a -> a -> a`

?