I'm working on Interview Street's "Unfriendly Numbers" puzzle.

It goes like this:

Given an integer, and another list of integers, find the factors that are only unique to the given integer, and are not shared with the other list of integers.

So if set 1 (set Y) is (and n is the given number):

∃Y{z|n % z = 0}

Basically: There is a Y for every z, where z is a number where n % z is 0.

We want the set difference for Y minus the set that contains all the factors of the other list of numbers.

So how would you approach this?

Find the factors of integer n? All the factors of the other numbers and just weed out the non-unique factors?

Or would you only find the factors of n and just use them to divide the other numbers and weed out the non-unique ones?

Or is there a way to do it without factoring the number?

Thus far I've used Trial Division, Pollard's Rho, Brent's variation of Pollard's Rho and Fermat's method for factorization. I've also made use of the Lucas-Lehmer primality test and Euclids GCD.

But thus far, nothing, just a combination of wrong answers or exceeding the time limit. A known solution supposedly involves the wheel prime sieve but I'm unsure what that is.

Thanks anyways.

`Interview Street`

and never come back to say thank you? – kasavbere Apr 24 '12 at 23:34