Using Greatest Common Divisor fun

euclid :: Int -> Int euclid n = length (filter (gcd n == 1) [1 .. n-1])

gcd :: Int -> Int -> Int

..

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The Haskell prelude already defines a `gcd` function for you, no need to define it yourself. – Frerich Raabe Mar 5 '12 at 13:51
“the length of all the common divisors that is == 1” --- I don't understand. What do you mean by this? – dave4420 Mar 5 '12 at 14:10
What is the problem you are trying to solve? (If it's Project Euler problem 73, the optimal solution is not computing any `gcd`s, by the way.) – Daniel Fischer Mar 5 '12 at 14:12
If you cannot explain your problem in english, then you will not be able to explain it to a computer, in any language, either. – Ingo Mar 5 '12 at 15:17
Your error comes from "gcd x 0 = x". The "x :: Int" is the inferred result but the type declaration of "gcd :: Int->Int->Bool" expects Bool. I expect that "gcd x 0 = (x==1)" is what you ought to have typed. – Chris Kuklewicz Mar 5 '12 at 17:18

Assuming you're looking for Euler's totient function, simply call

``````euler_fi1 n = length \$ filter ((==1).(gcd n)) [1..n-1]
``````

The linked WP article gives a formula for calculating this directly:

``````euler_fi n = let
fs = Data.List.nub \$ factorize n
pr = n * product [p-1 | p <- fs]
in Data.List.foldl' div pr fs
``````

You'll need a `factorize` function for that:

``````factorize n | n > 1 = go n (2:[3,5..])  where
go n ds@(d:t)
| d*d > n    = [n]
| r == 0     =  d : go q ds
| otherwise  =      go n t
where
(q,r)  = quotRem n d
``````

Next optimization is to use primes list instead of `(2:[3,5..])`.

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Hi, I keep getting: "Couldn't match expected type `Bool' against inferred type `Int' In the expression: x In the definition of `gcd': gcd x 0 = x" – gorn Mar 5 '12 at 17:25
Will, I got it to work. Thanks for your assistance =) – gorn Mar 5 '12 at 18:48

Your error comes from "gcd x 0 = x". The "x :: Int" is the inferred result but the type declaration of "gcd :: Int->Int->Bool" expects Bool. I expect that "gcd x 0 = (x==1)" is what you ought to have typed.

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