I'm new to Haskell and I'm trying to implement a calculator for a homework. I am stuck at a spot where I need to perform division on two values and I think the issue is that their type cannot be inferred or needs to be declared/converted. I'm trying to learn how to fix this myself but any insights along the way would be helpful.
Here is the code:
data Value e = OK e | Error String deriving (Eq) -- assuming we know how to type e can be shown, i.e. Show e, then -- we know how to show a Value e type instance (Show e) => Show (Value e) where show (OK x) = (show x) show (Error s) = "ERROR: " ++ s type Token = String type Result = Value Int type Intermediate = [ (Value Int) ] -- an algebra is a things that knows about plus and times class Algebra a where plus :: a -> a -> a times :: a -> a -> a subtraction :: a -> a -> a division :: a -> a-> a -- assuming that we know how to + and * things of type e, (i.e. -- we have Num e, then we have algebra's over Value e instance (Num e) => Algebra (Value e) where plus (OK x) (OK y) = (OK (x+y)) times (OK x) (OK y) = (OK (x*y)) subtraction (OK x) (OK y) = (OK (x-y)) division (OK x) (OK 0) = (Error "div by 0") division (OK x) (OK y) = (OK (x `div` y)) <-- this is line 44 that it complains about
Here is the error when I try running the program via ghci test.hs
test.hs:44:34: Could not deduce (Integral e) from the context (Algebra (Value e), Num e) arising from a use of `div' at test.hs:44:34-42 Possible fix: add (Integral e) to the context of the instance declaration In the first argument of `OK', namely `(x `div` y)' In the expression: (OK (x `div` y)) In the definition of `division': division (OK x) (OK y) = (OK (x `div` y))
There is more code to this, I thought I'd leave it out for clarity, but I can always edit it in if this is unclear otherwise.