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I'm working on a C++ program that determines and prints the prime numbers between 3 and an integer 'x' the user inputs. I'm assuming that I need a double nested loop for this, one to iterate from 3 to x and the other to check if the number is prime. I think it needs to do something like go from 2 to x-1? I'm just really not sure how to do this syntax-wise. Thanks for any help! :)

EDIT: This is what I have:

#include <iostream>
#include <cmath>

using std::cout;
using std::endl;
using std::cin;

int main(){

   int x;
   int i;
   int j;

   cout << "Please enter an integer 'x' greater than 3: " << endl;

   cin >> x;

   if (x <= 3){

        cout << "Please enter new value 'x' greater than 3: " << endl;

        cin >> x;
        for(int i=3; i<=x; i++){
                for(j=2; j<i; j++){
                   if(i%j == 0)
                   else if(i == j+1);
                        cout << i << endl;
        return 0;

And I when I enter 10 as 'x' I get the output: 3 5 5 5 7 7 7 7 7 9

Can anyone tell me how to fix this?

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closed as too localized by Crappy Experience Bye, sashoalm, SWeko, Anders R. Bystrup, alxx Jan 29 '13 at 9:13

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You should check out the Sieve of Erastothenes. –  Code-Apprentice Jan 29 '13 at 2:47
You are on the right track, I think, but your question is not really well-formed. It would be more appropriate if it asked a very specific question like: what is the syntax for a loop in C++, or do I need nested loops to compute primes from 1 to N or something. Also, there are many examples showing how to do this already posted in various places, easily accessible, so you might want to do just a bit of research and ask again if you're still confused. –  Mike Sokolov Jan 29 '13 at 2:50
What have you tried so far? Have you searched for other questions here that relate to the same topic? –  Ken White Jan 29 '13 at 2:51
minimal edit to fix your code: hpaste.org/81471 . Consider posting such questions on codereview.stackexchange.com . –  Will Ness Jan 29 '13 at 14:49

3 Answers 3

Provided your X is small enough, you can use the Sieve of Eratosthenes to do it more efficiently. This is ideal for the "primes up to X" case since it maintains a memory of previously discarded primes. It does so by keeping a set of flags for each candidate number, all initially set to true (except for 1, of course).

Then you take the first true value (2), output that as a prime, and then set the flags for all multiples of that to false.

Then carry on with:

  • 3;
  • 5 (since 4 was a multiple of 2);
  • 7 (since 6 was a multiple of 2 and 3);
  • 11 (since 8 and 10 were multiples of 2 and 9 was a multiple of 3);
  • 13 (since 12 was a multiple of 2);
  • 17 (since 14 and 16 were multiples of 2 and 15 was a multiple of 3 and 5);
  • and so on.

Pseudo-code would be similar to:

def showPrimesUpTo (num):
    // create array of all true values

    array isPrime[2..num] = true

    // start with 2 and go until finished

    currNum = 2
    while currNum <= num:
        // if prime, output it

        if isPrime[currNum]:
            output currNum

            // also flag all multiples as nonprime

            clearNum = currNum * 2
            while clearNum <= num:
                isprime[clearNum] = false
                clearNum = clearNum + currNum

        // advance to next candidate

        currNum = currNum + 1

Otherwise, you can do trial division as per your suggestion. The basic idea is to check each number from 2 up to the square root of your target number to see if it's a multiple. In pseudo-code, that would be something like:

def isPrime (num):
    // val is the value to check for factor

    val = 2

    // only need to check so far

    while val * val <= num:
        // check if an exact multiple

        if int (num / val) * val == num:
            return false

        // no, carry on

        val = val + 1

    // if no factors found, it is a prime

    return true

The reason you only need to check up to the square root is because, if you find a factor above there, you would have already found the corresponding factor below the square root.

For example, 3 x 17 is 51. If you're checking the numbers from 2 through 50 to see if 51 is prime, you'll find 3 first, meaning you never need to check 17.

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int main (char argv) 
    int tempNum = atoi(argv);
    for (int i=3; i<=tempNum; i++) 
        for (int j=2; j*j<=i; j++)
            if (i % j == 0) 
            else if (j+1 > sqrt(i)) {
                cout << i << " ";



    return 0;

Printing prime numbers from 1 through 100 Basically this, but modified

share|improve this answer
you check the j+1 > sqrt(i) test for each j <= sqrt(i) but it can succeed only once, for the very last one. Plus, what you really mean is whether you exited the loop due to break or not. So better make that apparent in your code. :) You can do this with an additional flag variable, or a GOTO, like e.g. this here. –  Will Ness Jan 29 '13 at 16:09

I find this one pretty fast and efficient

 int main(){
    for(int i=3; i<=X; i++)    

 bool IsPrime(int num){
    /* use commented part if want from 2

            return false;


            return true;

            return false;

        int sRoot = sqrt(num*1.0);

        for(int i=3; i<=sRoot; i+=2)



                return false;


        return true;
share|improve this answer
Well then you must only be doing small primes. –  Crappy Experience Bye Jan 29 '13 at 3:12
@LokiAstari didn't get you? In what reference? If there is any flaw with above code? please suggest. –  exex zian Jan 29 '13 at 13:38
This is not efficient: Its O(n^2), thus only useful for small primes. There are several good optimizations on-top of this technique that make it much more efficient. But really you want Sieve of Eratosthenes. –  Crappy Experience Bye Jan 29 '13 at 16:22
@LokiAstari thanks alot .. will definitely look for that –  exex zian Jan 29 '13 at 17:08
while searching for Sieve of Eratosthenes got to know that sieve of Atkins faster than Sieve of Eratosthenes –  exex zian Jan 29 '13 at 17:40

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