# Could not deduce (Enum a) arising from the arithmetic sequence `(x - n + 1) .. x'

when I try to compile this piece of code

``````prod [] = 1
prod (x:xs) = x * prod xs

ff :: (Num a) => a -> a -> a
ff x n = prod [(x - n + 1) .. x]
``````

I get following error:

``````a.hs:5:15:
Could not deduce (Enum a)
arising from the arithmetic sequence `(x - n + 1) .. x'
from the context (Num a)
bound by the type signature for ff :: Num a => a -> a -> a
at a.hs:5:1-32
Possible fix:
add (Enum a) to the context of
the type signature for ff :: Num a => a -> a -> a
In the first argument of `prod', namely `[(x - n + 1) .. x]'
In the expression: prod [(x - n + 1) .. x]
In an equation for `ff': ff x n = prod [(x - n + 1) .. x]
``````

what is wrong with this code? When I substitute `Double` for a everything is all right.

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`Num` is not an `Enum`, as you can have `Num` types that would be hard to enumerate, like `Complex`. – Landei Jul 31 '12 at 9:58
Remove the type signature for `ff` and see what type the compiler deduces. – augustss Jul 31 '12 at 16:31

`[i .. j]` is shorthand for `enumFromTo i j`. `enumFromTo` is part of the `Enum` typeclass, and not part of `Num` (you still need `Num` to use `+` and `-` though).

So you need to say that `a` implements `Enum` as well as implementing `Num`:

``````ff :: (Num a, Enum a) => a -> a -> a
ff x n = prod [(x - n + 1) .. x]
``````

It works with `Double` because `Double` implements both these typeclasses.

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Straight to the point! – Trismegistos Jul 31 '12 at 10:02

In order for `[x .. y]` to work, the result type doesn't need to be a `Num` instance at all (e.g., `['A'..'Z']` works just fine). It needs to be an `Enum` instance. Just add `Enum` to the type signature.

It works with `Double` since `Double` has both instances.

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``` ff :: (Enum a, Num a) => a -> a -> a ff x n = prod [(x - n + 1) .. x] ```

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