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I am supposed to make a class PrimeNumberGenerator which has a method nextPrime that will print out all prime numbers up to a number the user inputs.


Enter a Number: 

Our teacher told us that we should use a nested for loop. I tried, but when I tried to make the inner (nested) loop, I got really confused.

I'm lost and I don't really know the logic I have to use. Please help? All suggestions welcome!


Here is my code: (I'm going to make a tester class later)

public class PrimeGenerator {

    private int num;
    boolean isPrime;

    public PrimeGenerator(int n)
        num = n;

    public int nextPrime (int num)
        for (int i=2; i < num; i++) // The first prime number is 2 and the prime numbers only have to go up to a number the user inputs. 
            for (int j = 3; j<=i/2; j+=2) // The next prime number is 3 and I attempted to loop through to get the next odd number.
                if (num % i == 0) //if the number (upper limit) mod a "prime number" is 0, then that means that number is not really "prime" after all. 

        return num;

share|improve this question
if you think you have parts right, say why. If you have question marks next to lines of code, explain what think the code does. The final // ? is unacceptable, because it implies you did not write this code and don't know why you have that block there (despite it being the right block to have). So: describe the algorithm you want to implement in words (i.e. "I'm basically looking at every number and seeing for which smaller numbers it cannot be cleanly divided") and then show where you implement which bit of that description. Then show where it breaks down. –  Mike 'Pomax' Kamermans Dec 6 '13 at 23:20
@Mike'Pomax'Kamermans Here you go, I added comments. –  Lily Dec 6 '13 at 23:25
excellent. so now you've described what you think the code does, which means you now get to show where your expectation and the result of your code breaks down. (Note that at this point you're doing the kind of debugging that is normally expected to be done before posting on SO, so you can tell people what you've tried, what you expected, and where it stopped doing what you expected, with which descrepancy between expectation and result) –  Mike 'Pomax' Kamermans Dec 6 '13 at 23:27
@Mike'Pomax'Kamermans thanks for your input. –  Lily Dec 6 '13 at 23:30
Are you sure nextPrime() needs an input arg? It seems each time you call nextPrime(), it should give you the next prime number, and maybe a -1 when it reaches the end. You would then use 'nextPrime()' in a loop to print all of the prime numbers. That is typically how a generator works. –  dansalmo Dec 6 '13 at 23:55

2 Answers 2

Check this algorithm based on the sieve of Eratosthenes for prime numbers. Of course you need to adapt it to your program.

boolean isPrime[] = new boolean [N+1];

    for (int i=2; i <=N; i++)

        isPrime[i] = true;

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

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

                   for (int i=2; i<=N; i++) 
                   if (isPrime[i])

                    //Do something.......   
share|improve this answer
better avoid multiplications where possible, additions are faster. –  Will Ness Dec 7 '13 at 13:50

Simple definition of a prime number: A number that is only divisible by one and by itself. By definition 1 isn't prime. Here is a brute force algorithm to determine if a number is prime or not.

    boolean isPrime(int n)
        for (int i = 2; i < n; i++)
            if (n % i == 0)
                return false;
        return true;
share|improve this answer
i <= sqrt(n) is better. So is checking n % 2 before entering the loop, then starting the loop at i = 3 and incrementing by twos. –  nhgrif Dec 6 '13 at 23:24
It is so brute force it does not even stop checking at the square root of the number. –  CMate Dec 6 '13 at 23:24
@nhgrif Equality should also be checked. –  CMate Dec 6 '13 at 23:25
@Lily Lets assume that a * b = n, where a > sqrt(n). In this case b < sqrt(n) must be true. So if n does not have a divisor lesser than its square root, it won't have one greater than it. –  CMate Dec 6 '13 at 23:33
@Lily, Why to stop at square root involves some mathematical proves. Check this other question: stackoverflow.com/questions/5811151/… –  rendon Dec 6 '13 at 23:34

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