I'm making a function in Haskell that halves only the evens in a list and I am experiencing a problem. When I run the complier it complains that you can't perform division of an int and that I need a fractional int type declaration. I have tried changing the type declaration to float, but that just generated another error. I have included the function's code below and was hoping for any form of help.

``````halfEvens :: [Int] -> [Int]
halfEvens [] = []
halfEvens (x:xs) | odd x = halfEvens xs
| otherwise = x/2:halfEvens xs
``````

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I think you want x `div` 2 in this case. I'll let someone else confirm that I'm right (not 100% sure I am) and give a more complete explanation. – MatrixFrog Sep 10 '11 at 0:57

Use `div`, which performs integer division:

``````halfEvens :: [Int] -> [Int]
halfEvens [] = []
halfEvens (x:xs) | odd x = halfEvens xs
| otherwise = x `div` 2 : halfEvens xs
``````

The `(/)` function requires arguments whose type is in the class Fractional, and performs standard division. The `div` function requires arguments whose type is in the class Integral, and performs integer division.

More precisely, `div` and `mod` round toward negative infinity. Their cousins, `quot` and `rem`, behave like integer division in C and round toward zero. `div` and `mod` are usually correct when doing modular arithmetic (e.g. when calculating the day of the week given a date), while `quot` and `rem` are slightly faster (I think).

Playing around a bit in GHCi:

``````> :t div
div :: Integral a => a -> a -> a
> :t (/)
(/) :: Fractional a => a -> a -> a
> 3 / 5
0.6
> 3 `div` 5
0
> (-3) `div` 5
-1
> (-3) `quot` 5
0
> [x `mod` 3 | x <- [-10..10]]
[2,0,1,2,0,1,2,0,1,2,0,1,2,0,1,2,0,1,2,0,1]
> [x `rem` 3 | x <- [-10..10]]
[-1,0,-2,-1,0,-2,-1,0,-2,-1,0,1,2,0,1,2,0,1,2,0,1]
``````
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Thank you so much for your help. – D347th Sep 10 '11 at 1:23
Yes, quot is faster because that's what the machine instruction tends to do. Except for the NS32k processor that had both kinds of division instructions. – augustss Sep 10 '11 at 9:06
Does ghc optimize division by a power of 2 into a right-shift? An arithmetic right shift of n bits will divide by 2n, but it will round towards negative infinity (if you right shift -1, you still get -1). To round towards 0, you have to add (2n)-1 if the input is negative before shifting. In this case, `div` should be faster than `quot` – pat Sep 10 '11 at 15:53
@pat, I doubt it. ghc does not do very many arithmetic tricks. – luqui Sep 11 '11 at 1:05
@luqui: I wonder if the underlying compiler (GCC, LLVM, etc.) can do it, even after the operation is obfuscated by the code that implements `div` using `quot`. – Joey Adams Sep 11 '11 at 1:24

I should add that using `map` would simplify the code.

``````HalfIfEven n
| even n = n `div` 2
| otherwise = n

halfEvens = map halfIfEven
``````
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