I am trying to do problem 254 in project euler and arrived at this set of functions and refactor in Haskell:
f n = sum $ map fac (decToList n) sf n = sum $ decToList (f n) g i = head [ n | n <- [1..], sf n == i] sg i = sum $ decToList (g i) answer = sum [ sg i | i <- [1 .. 150] ]
f (n)finds the sum of the factorials of each digit in
sf (n)is the sum of the digits in the result of
g (i)is the smallest integer solution for
sf (i). As there can be many results for
sg (i)is the sum of the digits in the result of
But not long into running the compiled version of this script, it sucked up all my RAM. Is there a better way to implement the function
g (i)? If so what can they be and how could I go about it?
Just out of clarity, my functions for:
fac is :
`fac 0 = 1` `fac n = n * fac (n-1)`
decToList which makes a number into a list:
decToList1 x = reverse $ decToList' x where decToList' 0 =  decToList' y = let (a,b) = quotRem y 10 in [b] ++ decToList' a
Although I did since update them to Yairchu's solution for optimisation sake.