# Project Euler: Summation of primes… Why won't this work?

I keep getting the wrong answer of 1179908154. At first I blamed it on my summation variable being type int, rather than long. I gave it long type but I get the same answer. Thoughts?

``````// Project Euler

// Problem 10

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

void main()
{

int p = 3;
long sum = 2;
bool isPrime;
for (p; p < 2000000; p++)
{
isPrime = true;

for (int i = 2; i <= sqrt(static_cast<double>(p)); i++) // cast into double for sqrt function
{
if (p % i == 0)
{
isPrime = false;
break;

}
}
if (isPrime == true)
{
cout << p << endl; // show each prime
sum += p; // add prime to sum
}

}
cout << sum << endl; // show sum

system("pause");
``````

}

-
I bet `sizeof(long)` is 4 in your implementation. 32 bits is too small to hold the sum. –  Daniel Fischer Apr 28 '13 at 19:32
This was correct. Thank you! I used long long instead. –  Shane Apr 29 '13 at 10:52

Maybe on your platform the long is not enough to hold the value too. Try a long long instead.

-

Do not write prime numbers generator by yourself, it's really not easy. Just use this http://cr.yp.to/primegen.html , it's really good enough for project euler.

-
I don't think the purpose of Project Euler is to be easy :) It is supposed to challenge you until you get that A-ha! moment. –  Juha Untinen Dec 29 '14 at 21:05

When putting the bounds on your for loop, you should check numbers up until sqrt(p) + 1. You can get floating point errors when calculating the square root (it might underestimate it slightly), so it's possible that some potential factors are not checked in the loop.

-
doubles have 53 bits of precision, so can represent 53 bit integers exactly. int are (normally) 32-bits. So casting to double is not a problem. –  ronalchn Apr 28 '13 at 1:25
I tried running this code and it will not run as-is. The compiler says to change the type of main to int, which I did, and I got rid of that system("pause") at the end because I'm not why it's even there. Anyway, when I run I get a different answer than 1179908154. Are you sure you're not running an older version of the code? –  SparkleStilettos Apr 28 '13 at 3:56
Actually, the better way of doing it is `i*i <= p` because squaring is faster than square-rooting and there are no floating point answers. –  Justin Apr 28 '13 at 5:15
@SparkleStilettos What answer do you get? –  Shane Apr 28 '13 at 18:15