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I'm trying to Implement types of primes in my program. In one of the type Exponent Of Mersenne, the formula to calculate is (2 power P) -1 Here P is Prime. and check the output is prime.

In calculating, I'm able to get the power but while checking for prime, the process is Hanging . and if I leave it for a very long long time then it is being calculated.

example would be, (2 power 10090) -1 and calculate if this is prime

I'm using Big Integer

I'musing this code

int prime1 = CalculatePrime(n);
BigInteger powerPrime = BigInteger.Pow(2, prime1);
bool isPrime = CheckPrime(powerPrime - 1);

private bool CheckPrime(BigInteger num)
    if (num == 0 || num == 1) 
        return false;

    bool isPrime = true;
    for (int j = 2; j < num; j++)
        if ((num % j) == 0)
            isPrime = false;
    return isPrime;

How would be this - http://www.dotnetperls.com/prime

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marked as duplicate by Reed Copsey, cadrell0, Servy, Lion, Steve Feb 27 '13 at 20:27

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Are you sure it's hanging and not just taking a very long time? This is a particularly poor algorithm for finding primes, so being as slow as it is it will take a very long time for all but the most trivial input values. –  Servy Feb 27 '13 at 18:34
for starters, you can do j < (num/2) –  Martin Feb 27 '13 at 18:35
Its taking a very long time. –  Krishna Thota Feb 27 '13 at 18:36
The list of related questions shows quite a few questions on the topic of calculating primes. I’d suggest you to start there. –  poke Feb 27 '13 at 18:37
Google/wikipedia are also good resources. –  Servy Feb 27 '13 at 18:38

3 Answers 3

The Lucas-Lehmer test is specialized for checking whether Mersenne numbers are prime. You should use it in preference to the test you have implemented, which as you noticed can be very slow.

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The Sieve of Eratosthenes is a particularly good algorithm for generating prime numbers that are less than a few million.

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2^10090 - 1 is a lot bigger than “a few million” though… ^^ –  poke Feb 27 '13 at 18:40
@poke He edited in those numbers later, but yes, that's correct. –  Servy Feb 27 '13 at 18:40

You can get a bit less work to do because of following:

  1. You have to check only for j < sqrt(num), not j < num
  2. You don't have to check every even number: just try with 2 at the beginning and then check only odd numbers (that's because every even number can be divided by 2, so if x cannot be divided by 2 it cannot be divided by any other even number)
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While this can help a bit, the general algorithm is just so poor that it just won't scale at all to very large numbers. –  Servy Feb 27 '13 at 18:41
You've got even and odd mixed up. –  juharr Feb 27 '13 at 18:43
True, thanks for that! –  MarcinJuraszek Feb 27 '13 at 18:59

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