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Which is the fastest algorithm to find prime numbers?

is there any way to make this more optimize..

#include <vector>
    int main()
        std::vector<int> primes;
        for(int i=3; i < 100; i++)
            bool prime=true;
            for(int j=0;j<primes.size() && primes[j]*primes[j] <= i;j++)
                if(i % primes[j] == 0)
                cout << i << " ";

        return 0;
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marked as duplicate by Oded, Ed S., MSalters, Justin Satyr, joran Nov 3 '11 at 17:48

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.

You could change the i++ part of your loop to i +=2 since we know all even numbers aren't going to be prime anyways – Akron Nov 2 '11 at 18:13
do you need to add the homework tag? – Muad'Dib Nov 2 '11 at 18:16
There are lots of SO questions on this topic already. – mydogisbox Nov 2 '11 at 18:16

6 Answers 6

Yes, Sieve of Eratosthenes is the best option (If you need most than 100 numbers this is the best implementation). This is my implementation:

#include <vector>
#include <iostream>
#include <cmath>
using namespace std;

vector<int> sieve(int n){
    vector<bool> prime(n+1,true);
    vector<int> res;
    int m = (int)sqrt(n);
    for(int i=2; i<=m; i++){
            for(int k=i*i; k<=n; k+=i)
    for(int i=0; i<n ;i++)
    return res;

int main(){
    vector<int> primes = sieve(100);
    for(int i=0; i<primes.size() ;i++){
        if(i) cout<<", ";
        if(primes[i]) cout<<i;
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An interesting question is whether using vector<bool> is faster than using, say vector<char> (with 0 and 1 for false and true). vector<bool> certainly requires a lot of extra effort to read or write any single value, but vector<char> will take 8 times more memory, reducing locality, and causing a lot more cache misses. – James Kanze Nov 2 '11 at 19:01
In C++ bools and chars use 8bits, but bool doesn't use all of them. – vudduu Nov 2 '11 at 19:32
In C++, the size of a bool or a char is implementation defined. I'm aware of machines today where char is 8, 9 or 32 bits, and bool can be a single char, or more---there are definitely systems where it is the same size as an int (4 or 6 bytes, on the two platforms I'm aware of where this is the case). None of which is relevant here, since std::vector<bool> is specialized to only use 1 bit per boolean value. Whence my comment. – James Kanze Nov 3 '11 at 8:58
Interesting, because the answers in those two articles skirt around the issue. The reason why a bool is at least the size of a char is because the standard doesn't allow sizeof(bool) to be less than 1, and requires sizeof(char) to be 1. The addressing issues are motivation for this, somewhat; it would certainly be possible to generate code to address bits, if the standard allowed it, but it would be inefficient, and worse, would create no end of problems with sizeof and pointer arithmetic. – James Kanze Nov 16 '11 at 17:14
int main(int argc, char *argv[]) {
    cout << "2 3 5 7 11 13 17 19 23 29 31 37 41 43 47 53 59 61 67 71 73 79 83 89 97 ";


More seriously, you could avoid repeatedly squaring the primes by caching primes[j] * primes[j] and save on multiplications.

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What about 101, you forgot it! – Michael Goldshteyn Nov 2 '11 at 18:16
+1: A good answer for the given range. – Jørgen Fogh Nov 2 '11 at 18:17
haha, I like this response. It is truly the fastest way to output all primes under 100 – Akron Nov 2 '11 at 18:17
But he asked to print 100 prime numbers, not prime numbers<100, even though that's what his program did! – Michael Goldshteyn Nov 2 '11 at 18:18
The OP's code contradicts the title. The OP wants to generate prime numbers under 100 it seems (?) unless the code/logic is wrong. – Marlon Nov 2 '11 at 18:19

Yes. As Marion has suggested, you can use the Sieve of Eratosthenes but you should be aware of the details. The code you have written looks superficially like the sieve, but it isn't. It's called trial division and it has a different algorithmic complexity than the sieve.

The sieve performs a pass which takes Theta(n/p) time for each prime p. This results in a total complexity of O(n log log n). IIRC the proof is a bit complicated and involves the prime number theorem.

Your algorithm performs pi(sqrt(p)) divisions for each prime number p and a smaller number of divisions for non-primes. (where pi is the prime-counting function). Unfortunately I can't come up with the total complexity off the top of my head.

In short, you should change the code to use an array and mark all the non-primes. This article addresses the same topic in functional programming languages.

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True. I apparently didn't think it through. – Jørgen Fogh Nov 2 '11 at 18:33
  1. do not do primes[j]*primes[j] <= i just check primes[j] <= 7
  2. use i+=2
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Considering that primes[3]==7, it's even simpler to write j <=3 . (primes[j] < 11 would be more obvious). – MSalters Nov 3 '11 at 12:22

Yes, change i++ to i+=2 and it will work twice as fast.

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no it won't... just microoptimization – Karoly Horvath Nov 2 '11 at 18:15
Why wouldn't it make it twice as fast, if you only test half the numbers? – Michael Goldshteyn Nov 2 '11 at 18:16
because you test it against the first prime, which is 2, exiting the loop immediately. – Karoly Horvath Nov 2 '11 at 18:16
true, you would stop the search early – Michael Goldshteyn Nov 2 '11 at 18:17
Or better, except for 2 and 3 all primes are of the form 6n ± 1. – Greg Hewgill Nov 2 '11 at 18:19

Sieve of Eratosthenes is a great algorithm for generating prime numbers up to a certain number (which is not what your title states, but what your code implies).

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I don't think Sieve algorithm works better than nave algorithm in the case of numbers within [1..100] – Saeed Amiri Nov 2 '11 at 18:18
@SaeedAmiri Any reason why you don't think this? – Paŭlo Ebermann Nov 2 '11 at 18:32
@Paŭlo Ebermann, because there are to many number dividable to 2,3,5,7 in this range and you will check them multiple time, but by nave algorithm you skip this type of checking and because there are just 3,5,7 which should be checked in nave algorithm, there isn't to many performance issue in fact it's at most 150 checking, but in sieve algorithm I don't know how many checking should have but it should be more than 150, It's just guess it's not hard to compute it. – Saeed Amiri Nov 2 '11 at 18:40
@SaeedAmiri The proportion of numbers dividable by 2,3,5,7 are the same in greater ranges (1/2, 1/3, 1/5, 1/7), so I don't see why the sieve should get faster there. – Paŭlo Ebermann Nov 2 '11 at 19:49
@Paŭlo Eberman because in greater range bigger primes will be included in nave algorithm. in fact sqrt n and log n will have meaning there not here. (asymptomatic functions are can see there not in small range). – Saeed Amiri Nov 2 '11 at 19:57

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