# Implementing Wiener's Algorithm in Haskell - No instance for (RealFrac a0) arising from a use of `wiener'

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)

| 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)
``````

Trying `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?

-
It typechecks fine for me. GHCi gives me these types: `wiener :: (Floating a, Integral a, RealFrac a) => a -> a -> Maybe (a, a)`, `euclidean :: Integral a => a -> a -> [a]`, `quad :: (Floating t, Ord t) => t -> t -> t -> (t, t)` and `isInt :: RealFrac a => a -> Bool`. –  Lubomír Sedlář Jan 4 at 18:39
This also typechecks for me.. –  jozefg Jan 4 at 18:44
Yes, it typechecks. My bad. However, trying `wiener 238123333 293719721` gives me: `No instance for (RealFrac a0) arising from a use of 'wiener'` and `No instance for (Num a0) arising from the literal '238123333'` –  Stavros Jan 4 at 18:47
`(238123333::Int)` or whatever concrete type you want. The problem is that GHCi can't guess which concrete type you want to work with. –  misterbee Jan 4 at 18:49
Aha, it didn't typecheck! That's generally a good thing. Without signatures, GHC may infer some completely ridiculous type for a function, which then causes far more obscure problems elsewhere. OTOH if you get compilation errors because the given signature doesn't work out, it's usually quite easy to get to the bug (though admittedly it requires some practise, since many of GHC's error messages are quite misleading). –  leftaroundabout Jan 4 at 19:43

I tracked down the error. The return type of `euclidean` is `Integral a => [a]` while `quad` returns an instance of `RealFrac`. Since you use the value `n` and `e` as arguments to both functions, `n` and `e` must be instances of both typeclasses.

``````wiener :: (Floating b, Integral a, RealFrac b) => a -> a -> Maybe (b,b)
wiener e' n' = factors
where euclid = map fromIntegral \$ euclidean e' n'  -- convert result from `Integral` to `Num`
e = fromIntegral e'                          -- convert Integral to Num
n = fromIntegral 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))
``````
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Awesome! Thank you :-) –  Stavros Jan 4 at 19:31