I'm having an issue with a simple Haskell program. It's supposed to factor a number n-1 into the form (2^r)s where n is a Carmichael number. This isn't really pertinent to my question, but it's what the following set of functions aims to do.

``````divides::Int->Int->Bool
divides x y = not \$ y `mod` x == 0

carmichaeltwos::Int->Int
carmichaeltwos n
| not \$ divides 2 n =0
| otherwise = (+ 1) \$ carmichaeltwos (n/2)

carmichaelodd::Int->Int
carmichaelodd n
| not \$ divides 2 n = n
| otherwise = carmichaelodd (n/2)

factorcarmichael::Int->(Int, Int)
factorcarmichael n = (r, s)
where
nminus = n-1
r = carmichaeltwos nminus
s = carmichaelodd nminus
``````

``````No instance for (Fractional Int)
arising from a use of `/'
Possible fix: add an instance declaration for (Fractional Int)
In the first argument of `carmichaelodd', namely `(n / 2)'
In the expression: carmichaelodd (n / 2)
In an equation for `carmichaelodd':
carmichaelodd n
| not \$ divides 2 n = n
| otherwise = carmichaelodd (n / 2)
``````

I know that the function / has type (/)::(Fractional a)=>a->a->a, but I don't see how to fix my program to make this work nicely.

Also, I realize that I'm basically computing the same thing twice in the factorcarmichael function. I couldn't think of any easy way to factor the number in one pass and get the tuple I want as an answer.

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jwodder has explained the best solution in their answer, but it's worth noting that you can use `fromIntegral` to convert an instance of `Integral` into an instance of `Fractional`, and `round`/`floor`/`ceiling`/`truncate` to convert an instance of `RealFrac` (like `Float`, `Double`, `Rational`, etc.) into an instance of `Integral`. – ehird Mar 25 '12 at 19:10

To divide two `Int`s when you know, as in this case, that the dividend is divisible by the divisor, use the `div` or `quot` function, i.e., `div n 2` or `quot n 2`. (`div` and `quot` differ only in their handling of negative operands when the "true" quotient isn't an integer.)

Also, why are you defining `divides` as `not \$ mod y x == 0`? Unless you're using a nonstandard meaning of "divides," you should be using just `mod y x == 0``x` divides `y` iff `y` modulo `x` is zero.

As for combining `carmichaeltwos` and `carmichaelodd`, try using the `until` function:

``````factorcarmichael n = until (\(_, s) -> not \$ divides 2 s)
(\(r, s) -> (r+1, div s 2))
(0, n-1)
``````
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Oops. I'm a wee bit hungover. You're right about divides. – Josh Infiesto Mar 25 '12 at 19:10
@Josh Additionally, for divisibility by 2, there are `even` and `odd`. – Daniel Fischer Mar 25 '12 at 20:19