# Why Modulo When Finding Prime Numbers

I'm trying to understand why one needs modulo operator in writing a program that finds prime numbers; I'm a student analysing some code for learning purposes, and I am confused as to why modulo is needed.

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The modulo operation isn't strictly required. what is needed is a way to determine if one integer exactly divides into another and modulo is a way of doing that, but can be done without using the modulo operator explicitly. Look up sieve of Eratosthenes –  Mitch Wheat Jan 27 '13 at 1:08

Explicit modulo isn't required. Consider an implementation of the sieve of Eratosthenes (in C for the sake of using something):

``````int numbersThatMayBePrime[100];

memset(numbersThatMayBePrime, 0, sizeof(int)*100);

for(int c = 2; c < 100; c++)
{
if(!numbersThatMayBePrime[c])
{
printf("%d\n", c);

for(int strikeThrough = c; strikeThrough < 100; strikeThrough += c)
numbersThatMayBePrime[strikeThrough] = -1;
}
}
``````
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I'm not familiar with C; could you implement it in Java for me? –  user2014704 Jan 27 '13 at 1:43

If the modulo of n % (all numbers between n and zero) is always positive and never zero, the number is prime. I am trying to figure out how to code this in javascript.

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