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I'm extremely new to haskell and was trying to implement a small and a simple function that takes two strings and tells me the number of same characters at the same location.

ed :: (Integral b) => [a] -> [a] -> b
ed _ [] = 0
ed [] _ = 0
ed [] [] = 0
ed (x:xs) (y:ys)
    | x == y = 1 + ed xs ys
    | otherwise = ed xs ys

this doesn't run because my typeclass definition is wrong. I have two strings and need to return an integer and hence the typeclass definition I have written above. Is there something else I need to do?

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Just a note: Now the third case, ed [] [] is unnecessary, it's already covered by the first. – Daniel Fischer Nov 27 '12 at 21:34
up vote 11 down vote accepted

The type signature should be

ed :: (Eq a, Integral b) => [a] -> [a] -> b

This is because your definition of ed includes the expression x == y. x and y both have type a; to be able to test them for equality, this type must implement the Eq typeclass, which provides the == and /= operators.

The error message you got would have included something like this:

Could not deduce (Eq a) arising from a use of `=='
from the context (Integral b)
  bound by the type signature for ed :: Integral b => [a] -> [a] -> b
  at /home/dave/tmp/so.hs:(2,1)-(5,26)
Possible fix:
  add (Eq a) to the context of
    the type signature for ed :: Integral b => [a] -> [a] -> b

which was trying to tell you this.

(Btw, your code doesn't handle the case when when the strings have different lengths.)

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thanks a lot for that explanation. I wanted to understand exactly what does the expression in the parenthesis do. Then why even bother to include Integral b there? Wouldn't something like this suffice?ed :: (Eq a) => [a] -> [a] -> Int I looked up the net but most resources seemed to be talking about monads and stuff. Just wanted a simpler explanation. Also, yea, I corrected that different size thing as well... – shashydhar Nov 27 '12 at 21:21
sorry for bad formatting, couldn't get it formatted properly – shashydhar Nov 27 '12 at 21:25
@shashydhar ed :: (Eq a) => [a] -> [a] -> Int would be fine too, only if you need to be able to have return values of different types (Int, Integer, Word, ...) would you need to be polymorphic in the result type. – Daniel Fischer Nov 27 '12 at 21:30

Because of the x == y, you need to add an Eq type constraint:

ed :: (Integral b, Eq a) => [a] -> [a] -> b

You can comment out the type signature, load your module in ghci and let it figure out the type signature:

Main> :t ed
ed :: (Eq a1, Num a) => [a1] -> [a1] -> a
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