So I'm trying out Problem 7 of Project Euler.

By listing the first six prime numbers: 2, 3, 5, 7, 11, and 13, we can see that the 6th prime is 13. What is the 10 001st prime number?

```
#include <iostream>
#include <cmath>
using namespace std;
bool isPrime(int a){
if (a==2||a==3){
return true;
}
if (a%2==0){
return false;
}
bool prime=true;
for (int b=2;b<sqrt(a);b++){
if (a%b==0)
prime=false;
}
if (prime==true)
return true;
else
return false;
}
int main(){
int infinite=0;
long long int primecounter=0;
for (int c=2;infinite==0;c++){
if (isPrime(c)==true){
primecounter++;
//cout<<c<<endl;
if (primecounter==10001)
{cout<<c;
break;}
}
}
return 0;}
```

This is what I've come up with so far. It works for the few numbers that I tested, like the 6th prime number etc. However, when I run it for the 10001st prime, it gives me 104021, and the answer is wrong. Can someone tell me what is wrong with my code?

`b`

from`3`

and use`b += 2`

. Even better, if you keep the previous primes in memory, you need only to get the`%`

over those prime numbers and not all numbers. – Shahbaz Apr 2 '12 at 12:21`for(int c=2;infinite==0;c++)`

- if you mean never terminate you can just leave it empty`for(int c=2;;c++)`

. – Rup Apr 2 '12 at 12:23`return prime;`

! Also, instead of`infinite == 0`

, you can write`true`

(or even nothing) and remove infinite altogether. Furthermore,`if (isPrime(c))`

is perfectly valid. – Shahbaz Apr 2 '12 at 12:23`10001`

(`primes`

), each time write`c`

to`primecounter`

(so 2 would get in location 0). Pass`primes`

to`isPrime`

. Change`for (int b=2;b<sqrt(a);b++)`

to`for (int i = 1; primes[i]*primes[i] <= a; ++i)`

and check`a%primes[i] == 0`

. I started`i`

from 1, because`primes[0]`

is 2, and you have already checked`a%2`

. – Shahbaz Apr 2 '12 at 13:17