I'm trying to implement in Haskell the Wiener's Algorithm from the book Cryptography: Theory and Practice, Third Edition. Here's what I've written so far:
import Data.List wiener e n = factors where euclid = euclidean e n cs = 1 : head euclid : rest cs euclid ds = 0 : 1 : rest ds euclid ns = filter isInt $ drop 2 $ zipWith (\x y -> (x * e - 1) / y) ds cs qs = map (\x -> quad 1 (x - n - 1) n) ns factors = find (\(p, q) -> isInt p && 0 < p && p < n && isInt q && 0 < q && q < n) qs rest xs ys = zipWith (+) xs (zipWith (*) (tail ys) (tail xs)) euclidean _ 0 =  euclidean a b = a `div` b : euclidean b (a `mod` b) quad a b c | d > 0 = ((-b + sqrt d) / (2 * a), (-b - sqrt d) / (2 * a)) | otherwise = (0.0, 0.0) where d = b * b - 4 * a * c isInt x = x == fromInteger (round x)
wiener 238123333 293719721 gives me:
No instance for (RealFrac a0) arising from a use of `wiener' The type variable `a0' is ambiguous Possible fix: add a type signature that fixes these type variable(s) No instance for (Num a0) arising from the literal `238123333' The type variable `a0' is ambiguous Possible fix: add a type signature that fixes these type variable(s
How should I proceed? Is there any general number type such that it can be used everywhere?