What's the difference between these two function type definitions?

For the following trivial function definitions:

``````printLength1::(Num a)=>String->a
printLength1 s = length s

printLength2::String->Int
printLength2 s = length s
``````

Why are they not the same ? In what situations i should choose one over the other?

And i get this error for printLength1:

``````Couldn't match type `a' with `Int'
`a' is a rigid type variable bound by
the type signature for rpnc :: String -> a at test.hs:20:1
In the return type of a call of `length'
In the expression: length s
In an equation for `rpnc': rpnc s = length s
``````

I understand this error. But how can i fix this ? I've already read some posts here about rigid type variable but still couldn't understand how to fix it.

-

The first type signature is more general. It means the result can be any `Num`--it is polymorphic on its return type. So the result of your first function could be used as an `Int` or an `Integer` or any other `Num` instance.

The problem is that `length` returns an `Int` rather than any `Num` instance. You can fix this using `fromIntegral`:

``````printLength1 :: Num a => String -> a
printLength1 s = fromIntegral \$ length s
``````

Note that the signature of `fromIntegral . length` (which is the point-free version of the code above) is `Num c => [a] -> c`. This matches the signature you specified for your `printLength1` function.

-
Thanks guys. I hope there are no more such quirks hidden in the language. –  osager Nov 30 '11 at 1:12
@osager This isn't a quirk, this is a very fundamentally important part of the type system. Polymorphic types (at least rank-1 polymorphic types) are turned into concrete types by how they are used. If you write a type signature that claims that a type is polymorphic, it needs to actually be polymorphic. –  Carl Nov 30 '11 at 2:03
The `Num` class isn't a quirk, but you could reasonably argue that `length` being an `Int` rather than a `Num a` is a quirk. –  Tikhon Jelvis Nov 30 '11 at 2:05
`Data.List.genericLength` has the type `Num a => [b] -> a` –  David Powell Nov 30 '11 at 10:04
@Grazer: That's good to know. The fact that there had to be a special generic version of `length` just goes to show that it is a bit of a quirk. –  Tikhon Jelvis Nov 30 '11 at 10:08