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I have a simple class that includes an "add" operation

class (Eq a, Show a, Read a) => Group a where 
  add :: a -> a -> a

I created a new datatype called "Z5" with one constructor parameter, namly an int value:

data Z5 = Z5 Int deriving (Eq, Read, Show)   

The instantiation of the datatype looks like this:

instance Group (Z5) where
  add x y = x+y

The thing is that I get the error message:

 No instance for (Num Z5) arising from a use of `+'
 Possible fix: add an instance declaration for (Num Z5)

I tried it with

instance (Num Z5) => Group (Z5) where
 add x y = x+y

but then the error message is:

 Non type-variable argument in the constraint: Num Z5
 (Use -XFlexibleContexts to permit this)
 In the context: (Num Z5)
 While checking an instance declaration
 In the instance declaration for `Group (Z5)'
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Check out the modular-arithmetic package. –  leftaroundabout Jan 4 at 12:06

2 Answers 2

up vote 5 down vote accepted

This error is pretty straight forward: No instance for (Num Z5) arising from a use of `+'. You need a 'Num' instance for Z5. You have several options:

{-# LANGUAGE GeneralizedNewtypeDeriving #-}
newtype Z5 = Z5 Int deriving (Eq, Read, Show, Num)   

This creates a Num instance for your type identical to that of Int. Or, you can write the instance manually, if you don't want it the be the same as the one for Num.

instance Num Z5 where
     (Z5 a) + (Z5 b) = Z5 (a + b + 5) -- you can do whatever you like here

Writing the constraint C T where C is a typeclass and T is a monomorphic type is always pointless; this will either be true in which case you don't need to write the constraint, or it will be false in which case it will not compile.

More generally, any instance of Num is a mathematical group, so you can write:

-- This newtype is defined in Data.Monoid
newtype Sum a = Sum a
instance Num a => Group (Sum a) where 
  add (Sum a) (Sum b) = Sum (a + b) 
  identity = Sum 0
  invert (Sum x) = Sum (-x)

Then you can do things like:

>add ((Sum 4) :: Sum Z5) ((Sum 5) :: Sum Z5)
Sum {getSum = Z5 9}
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'invert' is not necessarily defined on a monoid. Maybe and List, for example, don't have inverse operations. –  misterbee Jan 4 at 3:34
2  
I meant the type Sum; I changed the comment to reflect that. –  user2407038 Jan 4 at 3:36
    
Great dude, thanks so much! –  enne87 Jan 4 at 12:10

Did you mean to use + for your Z5 type directly in your original code or did you perhaps mean to write

instance Group Z5 where
  add (Z5 x) (Z5 y) = Z5 (x+y)

The + operation only works for numbers (i.e. instances of the Num type-class) so you can't automatically use it for custom data types such as your Z5.

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Which means I have to create an instance of Num with Z5, thanks for your reply! –  enne87 Jan 4 at 12:11

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