# Type error with numeric type classes

``````data V2 a = V2 a a deriving (Show, Eq)

instance Num a => Num (V2 a) where
(-) (V2 x0 y0) (V2 x1 y1) = V2 (x0 - x1) (y0 - y1)
(+) (V2 x0 y0) (V2 x1 y1) = V2 (x0 + x1) (y0 + y1)
(*) (V2 x0 y0) (V2 x1 y1) = V2 (x0 * x1) (y0 * y1)
abs = undefined
signum = undefined
fromInteger = undefined

instance Fractional a => Fractional (V2 a) where
(/) (V2 x0 y0) (V2 x1 y1) = V2 (x0 / x1) (y0 / y1)
recip = undefined
fromRational = undefined

-- Multiply by scalar
(*\$) :: Num a => V2 a -> a -> V2 a
(*\$) (V2 x y) s = V2 (x * s) (y * s)

-- Length of the vector
len :: (Num a, Integral a, Floating b) => V2 a -> b
len (V2 x y) = sqrt \$ fromIntegral \$ x * x + y * y

normal :: (Num a, Integral a) => V2 a -> V2 a
normal v = v *\$ (1 / len v)

{-

Math\V2.hs:31:20:
Could not deduce (Fractional a) arising from a use of `/'
from the context (Num a, Integral a)
bound by the type signature for
normal :: (Num a, Integral a) => V2 a -> V2 a
at Math\V2.hs:31:1-27
Possible fix:
add (Fractional a) to the context of
the type signature for
normal :: (Num a, Integral a) => V2 a -> V2 a
In the second argument of `(*\$)', namely `(1 / len v)'
In the expression: v *\$ (1 / len v)
In an equation for `normal': normal v = v *\$ (1 / len v)

Math\V2.hs:31:22:
Could not deduce (Floating a) arising from a use of `len'
from the context (Num a, Integral a)
bound by the type signature for
normal :: (Num a, Integral a) => V2 a -> V2 a
at Math\V2.hs:31:1-27
Possible fix:
add (Floating a) to the context of
the type signature for
normal :: (Num a, Integral a) => V2 a -> V2 a
In the second argument of `(/)', namely `len v'
In the second argument of `(*\$)', namely `(1 / len v)'
In the expression: v *\$ (1 / len v)

-}
``````

I am having trouble implementing the normal function above. How can get it to pass the type check?

-
You should remove `recip = undefined` since it has a reasonable default method. –  augustss Nov 9 '11 at 10:44

Three options:

``````normal :: (Integral a, Floating b) => V2 a -> V2 b
``````

And then specify a function to convert a `(Integral a) => V2 a` into a `(Floating b) => V2 b` and apply that to the `v` before the `*\$`.

• Convert the `Floating` result from the `1 / len v` into an `Integral` value (`round`, etc.).

• Do as Landei suggests and force usage of `Floating` everywhere.

`len` takes in a `(Integral a) => V2 a` and returns a `(Floating b) => b`. You then do `1 /` on the result, which still has type `(Floating b) => b`. From your type of `*\$`, it takes a `V2 a` and an `a`, but in this case you have `v :: (Integral a) => V2 a` and `(1 / len v) :: (Floating b) => b` which aren't equivalent types.

So you have to do some form of coercion somewhere.

-

The minimal fix is just to change type signature for normal:

``````normal :: Floating a => V2 a -> V2 a
``````

Here are the types:

``````sqrt :: Floating a => a -> a
``````

So there's no reason for len to accept something other than `Floating`.

-

``````len :: (Floating a) => V2 a -> a
len (V2 x y) = sqrt \$ x * x + y * y

normal :: (Floating a) => V2 a -> V2 a
normal v = v *\$ (1.0 / len v)
``````

Of course that means that you need to convert a `V2 Int` before you can calculate the normal, but this is like you have to convert an Int before doing division.

-
Then I would lose the ability to work on vectors of Integers –  tm1rbrt Nov 9 '11 at 10:18
But this is the usual behavior, it's the same as being not able to write `sqrt 4`. –  Landei Nov 9 '11 at 10:31
@Landei: sure you can, that's the point of `fromInteger` in the `Num` class: integral literals are able to be transformed into any numeric type! –  ivanm Nov 9 '11 at 11:24

Found it. As `len` is returning a floating, a needs to be floating in `normal`. Otherwise you can try to define

``````(\$*) :: Num a, ?b => V2 a -> b -> V2 a
``````

Anyay

`````` normal :: (Num a, Integral a, Floating a) => V2 a -> V2 a
``````

works

You can alternatively change you len definition to be

len :: (Num a ) => V2 a -> a

-
No it isn't, 1 :: (Num a) => a. –  ivanm Nov 9 '11 at 10:13
I realized, that's the len the problem –  mb14 Nov 9 '11 at 10:25