I still don't understand the division in Haskell. My first intention was to define a funcion like this:
piApprox :: (Integral a, Fractional b) => a -> b piApprox n = 4 * sum [ (-1)^k / (2*k + 1) | k <- [0..n] ]
It doesn't work. Then, using the signature:
piApprox :: (Fractional a) => Int -> a
but it raises again the "Could not deduce" error.
If I run this code in the interpreter to find out what signature is the best, the result is:
Prelude> let piApprox n = 4 * sum [ (-1)^k / (2*k + 1) | k <- [0..n] ] Prelude> :t piApprox piApprox :: (Fractional a, Integral a) => a -> a
which raises "The type variable `a0' is ambiguous" error.
Right now, the only way to make this calculation that I could think of is including the
Ratio package and then converting to
double by using
import Data.Ratio piApprox n = (fromRational) $ 4 * sum [ (-1)^k % (2*k + 1) | k <- [0..n] ]
It works, but I don't think that's the best approach.
I also thought that even the input and output types were right in the signature, the intermediate operation
(-1)^k / (2*k + 1) -- where the division is placed -- might be the problem, so I also defined:
piApprox' :: (Fractional a) => Int -> a piApprox' n = 4 * sum [ (fromIntegral) $ (-1)^k / (2*k + 1) | k <- [0..n] ]
with no luck. What am I missing here?