# Finding the prime factor of a Long number using Java

``````public class prime
{
public static void main(String[] args)
{
long thing = 600851475143L;
for(long i = 300425737571L ; i == 0 ; i-- ){
if (thing % i == 0)
{
break;
}
}

}

}
``````

This is the code I currently have, however I have been running it in DrJava for a few minutes and it has returned no results. I'm guessing there are roughly a million ways my code can be optimised though ; would anyone be able to give me some tips ?

Trying to work through a few programming problems today and this one is causing me some trouble.

Thanks a lot :)

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Have you tried searching Google for "java prime"? – Thorbjørn Ravn Andersen Oct 23 '10 at 10:59
Yes, if I hadn't I wouldnt have brought the question over here ! :) I'm looking for tips rather than solution so that I can get better as a programmer. – user476033 Oct 23 '10 at 11:03

You only need iterate down to sqrt(thing), though.

And in general it's going to be quicker to iterate starting from 2, since half the numbers will have a factor of two (and 1/3 a factor of 3 etc.

You're also breaking only on the first factor so will miss any others

`````` long thing = 600851475143L;
for(long i = 0; i < 300425737571L ; i++ ){
if (i * i > thing) {
break;
}
if (thing % i == 0) {
break;
}
}
``````
• more sophisticated methods are available as aioobe says
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`300425737571L ; ; i++ ){` one `;` too many! – Ishtar Oct 23 '10 at 12:29
Thanks. Fixed it. – The Archetypal Paul Oct 23 '10 at 14:14

No, it's terminating right away, since

``````i == 0
``````

will not hold on the first iteration.

You probably wanted to write something like this:

``````public class Test {
public static void main(String[] args) {
long thing = 600851475143L;
for (long i = 16857 /* 300425737571L */; i > 0; i--) {
if (thing % i == 0) {

// Print the largest prime factor, then break loop (and quit)
break;
}
}
}
}
``````

This naive factorization method however is extremely inefficient. Since the factorization of `600851475143` is `71 * 839 * 1471 * 6857` you would have to iterate from 300425737571 to 6857 and do a modulo each time. There are many, not that complicated methods that would solve factorization for longs in an instant.

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So it should be i==0L ? – user476033 Oct 23 '10 at 11:04
+1 for explaining why this is inefficient, though – Thilo Oct 23 '10 at 11:06
I see...so can you offer any pointers for devising a more optimised solution please ? :) Thank you. – user476033 Oct 23 '10 at 11:09
@Thilo, I don't get your comment. "It would only break if the condition was true.", but `for (; true; );` is an infinite loop... that is, it will not break if the condition is true. – aioobe Oct 23 '10 at 11:10
@user476033: sure, here for instance. – aioobe Oct 23 '10 at 11:11

For calculating prime factors on not extremely big values, it would be much more efficient to generate primes up to square root of "thing", and then try them one by one.

Primes generation may be done:

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