# C - how to test easily if it is prime-number? [duplicate]

Possible Duplicates:
C - determine if a number is prime

Is there any way to test easily in C whether a selected number is prime or not?

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## marked as duplicate by Ferdinand Beyer, paxdiablo, Eimantas, Eli Bendersky, Bill the LizardMar 12 '11 at 13:26

–  Sanjeevakumar Hiremath Mar 12 '11 at 9:49
I've flagged it as duplicate. –  vissi Mar 12 '11 at 9:53
@Sanjeevakumar Hiremath, "Duplicate 1" is for Haskell code; it would be annoying to try to translate that into C. :) –  sarnold Mar 12 '11 at 10:02
@Sanjeevakumar: At least look for questions using the same language. –  Bill the Lizard Mar 12 '11 at 13:27

The easiest way is writing a loop, like:

``````int is_prime(int num)
{
if (num <= 1) return 0;
if (num % 2 == 0) return 1;
for(int i = 3; i < num / 2; i+= 2)
{
if (num % i == 0)
return 0;
}
return 1;
}
``````

You can then optimize it, iterating to `floor(sqrt(num))`.

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A loop like that, but preferably which doesn't test 0 or 1 as factors ;-p –  Steve Jessop Mar 12 '11 at 9:57
You can further optimise by first checking `num % 2` then starting i from 3 and incrementing by 2 as you'll have already eliminated all even numbers. –  Lazarus Mar 12 '11 at 9:57
Thanks, I've fixed the code. –  vissi Mar 12 '11 at 10:32
some say that 1 is also prime... –  Vladp Mar 12 '11 at 12:12
@Vlad: for the last 100 years or so that has not been the convention among mathematicians, so "some" are either contrarian or dead. Obviously if you want to use an unusual definition of "prime" then you need unusual code. With this code you also need to be aware that `is_composite(n)` shouldn't be implemented as `!is_prime(n)` if it's supposed to give the right answer for 1, since 1 isn't composite either. –  Steve Jessop Mar 12 '11 at 12:18

You could try to use Sieve of Eratosthenes:

http://en.wikipedia.org/wiki/Sieve_of_Eratosthenes

Easily you will find various implementations of this algorithm.

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I have implemented it here: gsamaras.wordpress.com/code/eratostheness-sieve-c –  gsamaras Aug 29 '14 at 21:32

The fastest way is to precalculate a bit array (indicating prime/nonprime) of all possible integers in the range you're interested in. For 32-bit unsigned integers, that's only 512M, which will easily fit in modern address spaces (and, even if it didn't, it would be a fast file lookup).

This will almost certainly be faster than calculating it via a sieve each time.

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