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We were assigned to make a java program which paralleled Sieve of Eratosthenes algorithm. I have tried several times in every which way i know of, but haven't been able to get it right. Im supposed to use fill arrays with prime numbers less than the number that was imputed. Here is the code I have, Can someone please help me in double checking the program and/or figuring out why I am getting this error? Any help is appreciated.

import java.text.DecimalFormat;
import java.util.Scanner;

import java.util.Arrays;



public class Lab6st
{
static int MAX = 100;
static int i;
static int k;
static int intArray;
static int isPrime;

public static void main(String args[]) 
{
    System.out.println("\nLAB12 100 Point Version");
    Scanner input = new Scanner(System.in);
    boolean primes[] = new boolean[MAX];
    computePrimes(primes);
    displayPrimes(primes);
    Arrays.fill(primes,true);
}

public static void computePrimes(boolean primes[])
{
    System.out.println("\nCOMPUTING PRIME NUMBERS");
    for (int i = 1; i < MAX; i++);
    {
        for (i=1; i < MAX; i++ );
        for (k=2; k<i; k++){
            int n = i%k;
            if (n==0)
            {
                break;
            }
        }
        if (i==k);
        {
            primes[i] = true;
        }       
    }
}

public static void displayPrimes(boolean primes[])
{
    System.out.println("\n\nPRIMES BETWEEN 1 AND "+ primes.length);
    for (int isPrime = 0; isPrime < MAX; isPrime++);
        if (primes[isPrime] == true);
            System.out.println(Arrays.asList(primes));              
}

}
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1 Answer 1

Your algorithm is not the Sieve of Eratosthenes; it's a poor implementation of trial division (the modulo operator gives it away). My essay Programming with Prime Numbers describes the Sieve of Eratosthenes algorithm in detail, discusses the very common error that you made, and includes this implementation in Java:

public static LinkedList sieve(int n)
{
    BitSet b = new BitSet(n);
    LinkedList ps = new LinkedList();

    b.set(0,n);

    for (int p=2; p<n; p++)
    {
        if (b.get(p))
        {
            ps.add(p);
            for (int i=p+p; i<n; i+=p)
            {
                b.clear(i);
            }
        }
    }

    return ps;
}
share|improve this answer
    
Just a side note. Since you are trying to make this fast, it might pay to make the list ps into an ArrayList instead of a LinkedList. Despite the fact that an ArrayList may have to be resized, it still usually outperforms a LinkedList. You might want to benchmark it though. Even better would be to reserve sufficient space for the ArrayList in places where that can be done. –  Paresh Oct 31 '12 at 5:15
    
Actually, I was going for clarity of code, not speed. It's easy to make this run much faster. See my essay referenced above for an optimized Sieve of Eratosthenes. –  user448810 Oct 31 '12 at 12:41

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