# Is there a more efficient way to write the following Prime Number code?

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I have the following code which spits out prime numbers between 1 and N. A friend came up with this solution but I believe there is a more efficient way to write this code. Such as making it so that if (i%j!=0) {System.out.print (i + " ");}. However I found this spat out numbers randomly all over the place...

import java.util.Scanner;

public class AllPrime {

public static void main(String[] args) {

System.out.println("Enter a number:\n");
Scanner input = new Scanner(System.in);
int a = input.nextInt();

for (int i = 2; i < a; i++) {
for(int j=2; j<i; j++) {
if (i%j==0) {
}
}
System.out.print(i + " ");
}
}
}
}
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If you handle the case '2' separately, you can go from 3 +=2 with i and j, because no other even number is prime. – user unknown Aug 9 '11 at 4:15
A second advice is, to just run to Math.sqrt(i) with j, because if you didn't find a divisor below, you will not find a divisor above. – user unknown Aug 9 '11 at 4:17

Look at proper sieves, like the Sieve of Eratosthenes. You don't need to be checking for % each time.

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Excellent visualization on that Wikipedia page. – Thilo Aug 9 '11 at 4:11
I think this is a bit out of my league for what I'm trying to do. – maclunian Aug 9 '11 at 4:11
@Thilo yes but I can't figure out what the implementation code means... – maclunian Aug 9 '11 at 4:12
for(int j=2; j<i; j++) {
if (i%j==0) {
}
}

This is not a very efficient algorithm, but at the very least, put a break in there...

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 What would you suggest as a better algorithm then? – maclunian Aug 9 '11 at 4:09 Sieve of Eratosthenes for starters: stackoverflow.com/questions/5329126/… – Thilo Aug 9 '11 at 4:10
public static boolean [] createPrimes (final int MAX)
{
boolean [] primes = new boolean [MAX];
// Make only odd numbers kandidates...
for (int i = 3; i < MAX; i+=2)
{
primes[i] = true;
}
// ... except No. 2
primes[2] = true;

for (int i = 3; i < MAX; i+=2)
{
/*
If a number z is already eliminated
(like No. 9), because it is a multiple of -
for example 3, then all multiples of z
*/
if (primes[i] && i < MAX/i)
{
int j = i * i;
while (j < MAX)
{
if (primes[j])
primes[j] = false;
j+=2*i;
}
}
}
return primes;
}

### updated after comment of Will Ness:

Improves the speed to about 2/1, it checks 100 Million ints in 5s on my 2Ghz single core.

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 the inner while loop in the second for loop is suboptimal here. You should really start from i*i, not from 2*i, and increment with steps of 2*i instead of just i. That way you're guaranteed to only visit the odd multiples of the prime i, thus eliminating the need for any additional testing. I've suggested this edit here but it was rejected by two reviewers as "changing the original intent" (it does no such thing): if(primes[i]){ for(int j=i*i; j
private static void generatePrimes(int maxNum) {

boolean[] isPrime = new boolean[maxNum + 1];
for (int i = 2; i <= maxNum; i++)
isPrime[i] = true;

// mark non-primes <= N using Sieve of Eratosthenes
for (int i = 2; i * i <= Math.sqrt(maxNum); i++) {

// if i is prime, then mark multiples of i as nonprime
if (isPrime[i]) {
for (int j = i; i * j <= maxNum; j++)
isPrime[i * j] = false;
}
}

// count primes
int primes = 0;
for (int i = 2; i <= maxNum; i++)
if (isPrime[i]) {
System.out.println("Prime - " + i);
primes++;
}
System.out.println("The number of primes <= " + maxNum + " is "+ primes);
}
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 There must be a simpler way to do it though... – maclunian Aug 9 '11 at 4:14 did you want "simple" or "efficient" ? The algorithm in the original question is the simplest possible. – Thilo Aug 9 '11 at 4:16 Also, why is it private and not public and why isn't there a main function area?? – maclunian Aug 9 '11 at 4:16 I think the code is better, because once we know that a number 'x' is not prime, then we do not check multiples of 'x' for prime. Hence we save the CPU cycles in doing some time consuming math operations. BTW, there are 2 thing, simple and efficient. Which one you want? Your code is already simple, though not efficient. – Sathwick Aug 9 '11 at 4:17 The code is based on the algorithm shown here - en.wikipedia.org/wiki/Sieve_of_Eratosthenes – Sathwick Aug 9 '11 at 4:23
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