I'm having a go at project Euler Q3 and need to get the largest prime factor of a number. So far I've gotten a pair of functions to return a list of all the factors of the given number but it seems like a really bad way to do it (partly because I only need the largest).

```
get_factors :: (Integral a) => a -> [a] -> [a]
get_factors _ [] = []
get_factors t (x:xs)
| t `mod` x == 0 = x:get_factors t xs
| otherwise = get_factors t xs
factors :: (Integral a) => a -> [a]
factors x = get_factors x [x,x-1..1]
> factors 1000
> [1000,500,250,200,125,100,50,40,25,20,10,8,5,4,2,1]
```

It seems weird to me that I would need to have a "launch" function if you will to start the recursive function off (or have a function where I have to pass it the same value twice, again, seems silly to me).

Can you point me in the right direction of how I should be going about doing this please?

`y`

is the smallest prime factor of`x`

, then`x `div` y`

is the largest one. You may be able to save some computation here. If you use a fast implementation of the Eratosthenes' sieve instead of the linear trial divisors list, you may be able to save some more. – n.m. May 5 '13 at 17:34`x `div` y`

need not be prime. – hammar May 5 '13 at 17:36