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] ]
```

Where:

`f (n)`

finds the sum of the factorials of each digit in`n`

`sf (n)`

is the sum of the digits in the result of`f (n)`

`g (i)`

is the smallest integer solution for`sf (i)`

. As there can be many results for`sf (i)`

`sg (i)`

is the sum of the digits in the result of`g (i)`

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?

EDIT:

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.

254,so I won't expect the brute force algorithm would work. However,I can not think up a smarter algorithm so far. My program has run more a hour but still did not get g(50).. – pierr Oct 11 '09 at 10:04