show/hide this revision's text 2 added 2 characters in body 
n = abs(number);
result = 1;
if (n mod 2 == 0) {
  result = 2;
  while (n mod 2 = 0) n /= 2;
}
for(i=3; i<sqrt(n); i+=2) {
  if (n mod i == 0) {
    result = i;
    while (n mod i = 0)  n /= i;
  }
}
return max(n,result)

There are some modulo tests that are superflous, as n can never be divided by 6 if all factors 2 and 3 have been removed. You could only allow primes for i, which is shown in several other answers here.

You could actually intertwine the sieve of Eratosthenes here:

  • First create the list of integers up to sqrt(n).
  • In the for loop mark all multiples of i up to the new sqrt(n) as not prime, and use a while loop instead.
  • set i to the next prime number in the list.

Also see this question.
show/hide this revision's text 1 
n = abs(number);
result = 1;
if (n mod 2 = 0) {
  result = 2;
  while (n mod 2 = 0) n /= 2;
}
for(i=3; i<sqrt(n); i+=2) {
  if (n mod i = 0) {
    result = i;
    while (n mod i = 0)  n /= i;
  }
}
return max(n,result)

There are some modulo tests that are superflous, as n can never be divided by 6 if all factors 2 and 3 have been removed. You could only allow primes for i, which is shown in several other answers here.

You could actually intertwine the sieve of Eratosthenes here:

  • First create the list of integers up to sqrt(n).
  • In the for loop mark all multiples of i up to the new sqrt(n) as not prime, and use a while loop instead.
  • set i to the next prime number in the list.

Also see this question.