C++ code for checking for prime numbers not working

I'm having trouble with this C++ code. The integer num is a number that I want to check if it is prime. However this program is always returning false. It's probably something simple but I can't find anything.

for(int i=2;i<num;i++){ //primes are allowed to be divided by 1 so we start at 2
if(num % i == 0){ //can be divided by a number other than itself or 1 so we trip out
return false;
} else if(i == num){ //if we've already done checks as high as possible and not tripped out yet then report success
return true;
}
}
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6 Answers

i == num will never occur, since your loop condition is i<num. Try:

for(int i=2;i<num;i++){ //primes are allowed to be divided by 1 so we start at 2
if(num % i == 0){ //can be divided by a number other than itself or 1 so we trip out
return false;
} else if(i == num-1){ //if we've already done checks as high as possible and not tripped out yet then report success
return true;
}
}

As pointed out below, the else condition here is redundant, and you only need to check from 2 to sqrt(num) - since the remaining factors have already been checked.

There are more improvements that can be made depending on how complex you want to make the problem. Most methods in reality use probabilistic algorithms.

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for(i==2;i<num;i++){if(num%i==0) return false} return true; –  Luka Rahne Aug 1 '12 at 6:48
I would even suggest for(i==2;i*i<=num;i++){if(num%i==0) return false} return true;. –  Axel Aug 1 '12 at 6:52
correct max is const int maxvalue = static_cast<int>(sqrt(num)); –  CyberSpock Aug 1 '12 at 7:13
Everyone seems to be complicating things unnecessarily with multiple returns, break, etc. Why not just simply: int limit = sqrt(num); int i = 3; while ( i <= limit && num % i != 0 ) i += 2; return i <= limit; (with an initial test for even numbers, of course). –  James Kanze Aug 1 '12 at 8:22
@Axel I don't see more code, nor more conditions. And there are several established measures for complexity. (There is more code if you do as I suggest: check for even first, then iterate from 3 with a step of 2. But that's an optimization that you might want to do anyway.) –  James Kanze Aug 1 '12 at 15:07

You don't have to check every number, as a lot of them can easily be ruled out. For example, after checking that num is not divisible by 2, you can skip all other even numbers. That saves you half the tests.

We also definitely know that any other factor must be less than num/2 (or really sqrt(num), but that is harder to compute). That knowledge can save us another half of the tests.

So now we have:

if (num % 2 == 0)
return false;

for(int i = 3; i < num / 2; i += 2){
if(num % i == 0){ //can be divided by a number other than itself or 1 so we trip out
return false;
}
}

// arriving here we have found no factors, so it must be a prime
return true;
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"(or really sqrt(num), but that is harder to compute)" But you have the code in that very sentence. ;-] –  ildjarn Aug 1 '12 at 7:54
Since you ve mentioned, do computing sqrt really overweigh going from srqt -> num/2 ? Won't we get any advantage by stopping at sqrt since computing sqrt is expensive? –  Mohan Kumar Aug 1 '12 at 7:54
I'm just picking some low-hanging fruit here, cutting away 75% of the run time. Anything else we do will obviously just affect the remaining 25% - is it worth the extra effort? It depends. –  Bo Persson Aug 1 '12 at 8:01
@MohanKumar Unless num is very small, sqrt(num) is going to be significantly less than num / 2, which means a lot less times through the loop. And on modern machines, sqrt(num) shouldn't be very expensive either. –  James Kanze Aug 1 '12 at 8:19
When computing num % i some hardware, like the x86, also delivers num / i as a byproduct. We could use that as a continuosly shrinking upper limit. –  Bo Persson Aug 1 '12 at 8:40

A small optimization for Will Ness's code, just calculate the sqrt of the number outside the for. The condition check executes many times and has no sense to calculate sqrt each time.

if( num == 2 ) return true;
if( num < 2 || num % 2 == 0 ) return false;
int sqrt = sqrt(num);

for( int i=3; i<=sqrt; i+=2 ){
if(num % i == 0){
return false;
}
}
return true;

So far I think that this is the most efficient way!

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I assumed compiler will perform that optimization. :) btw I've made an edit to the code which should make it about 30% faster I think. –  Will Ness Aug 1 '12 at 12:45
bool CheckPrime(int num) {
bool yayornay = true;
for(int i = 2; i < num; i++) {
if(num % i == 0) {
yayornay = false;
break;
}
}
return yayornay;
}
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No break? Excessively inefficient. –  ildjarn Aug 1 '12 at 7:58
editing as we speak –  good4m Aug 1 '12 at 8:01
@JeffSchweigler you missed a brackets for if. Without braces, your code will break in the first iteration. Edited to correct the same. –  Mohan Kumar Aug 1 '12 at 8:57
Are you talking about line four? I purposely left out brackets and made line five inline so it didn't need them. =) –  good4m Aug 1 '12 at 15:52
Putting multiple statements on the same line does not group them together somehow. @Mohan is right. –  ildjarn Aug 2 '12 at 3:57
bool isprime(int n)
{
if(n<2) return false;
if(n==2)return true;
for(int i=2;i<=sqrt(n);i++)
if(n%i==0) return false;
return true;
}
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Your solution is very similar to that of @ZelterAdy. However, his algorithm is even more efficient than yours. So what's your reason of posting yet another solution that doesn't provide any added value? –  honk Oct 25 '14 at 14:11

Here's the proper way to write what you meant:

int i=2;                     // move declaration out
for(/*int i=2*/;i<num;i++){
if(num % i == 0){
return false;
} // else            // and the final test too
}
if(i == num){
return true;
}

But that's not efficient. You only have to check for i's not exceeding of sqrt(num). Plus, if you check num%2, there's no more need to check any other even numbers, so you can use an increment of 2. Or you can even count by 6:

if( num == 2 || num == 3 ) return true;
if( num < 2 || num % 2 == 0 || num % 3 == 0 ) return false;
for( int i=5, j=7, lim=sqrt(num); i<=lim; i+=6, j+=6 ){
if( num % i == 0 || num % j == 0 ){
return false;
}
}
return true;

(notice: this is more efficient than another answer here, which says it's an "optimization" of an initial version of this answer).

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