Here is the question:

The sum of the primes below 10 is 2+3+5+7=17.

Find the sum of all the primes not greater than given N.

Input Format : The first line contains an integer T i.e. number of the test cases. The next T lines will contains an integer N.

Output Format : Print the value corresponding to each test case in seperate line.

Constraints : 1≤T≤104 1≤N≤106

https://www.hackerrank.com/contests/projecteuler/challenges/euler010 This is the link to the question.

So, i attempted to solve this question using sieve of Eratosthenes. I pre calculated all primes below 10^6 which is the given limit for N.

6 out of the 7 test cases were accepted but the last test case give Timeout(TLE) .

I read the discussion forum and there they say that in order to solve the question we need to pre-calculate the sums of primes also.

So, i tried making an array of long long ints and tried storing all the sums in it. But this is giving me a segmentation fault.

So, how am I supposed to precalculate the sums of the primes?

Here is my code:

```
#include "header.h" //MAX is defined to be 1000000
bool sieve[MAX + 1]; // false = prime, true = composite
int main(void){
//0 and 1 are not primes
sieve[0] = sieve[1] = true;
//input limiting value
int n = MAX;
//cross out even numbers
for(int i = 4; i <= n; i += 2){
sieve[i] = true;
}
//use sieve of eratosthenes
for(int i = 3; i <= static_cast<int>(sqrt(n)); i += 2){
if(sieve[i] == false){
for(int j = i * i; j <= n; j += i)
sieve[j] = true;
}
}
long long p, ans = 0;
int t;
std::cin >> t;
while(t--){
std::cin >> p;
for(int i = 0; i <= p; ++i)
if(sieve[i] == false)
ans += i;
std::cout << ans << std::endl;
ans = 0;
}
return 0;
}
```