This is the monomorphism restriction.

The gist is that when you have a constrained type variable, Haskell won't generalize if it's bound to a single identifier

```
f = term
```

However if it's a function binding, eg

```
f a ... = term
```

Then it is generalized. I've answered this question enough that I wrote up a more complete example in a blog post

As for why we have the monomorphism restriction,

```
-- let's say comp has the type [Num a => a]
foo = (comp, comp)
where comp = super_expensive_computation
```

How many times would `comp`

be computed? If we infer general types automatically it could compute it twice. But this might surprise you if you wrote something like this intending to have the type `Num a => (a, a)`

or similar.

The extra computation occurs because in Core land something like

```
foo :: Num a => a
```

turns into something more like

```
foo :: NumDict -> a -- NumDict has the appropriate functions for + - etc
-- for our a
```

A function. Since `foo`

s general type is `(Num a, Num b) => (a, b)`

unless GHC can prove that the `NumDict`

s that `comp`

is getting in both cases are the same, it can't share the result of `comp`