This is the problem, I'm trying to solve in SPOJ. I am getting time limit exceeded problem. I can't find a way to optimize the algorithm. Can you give me some tips.

Here is the problem:

Leonard had to find the number of continuous sequence of numbers such that their sum is zero.

For example if the sequence is- 5, 2, -2, 5, -5, 9

There are 3 such sequences

2, -2

5, -5

2, -2, 5, -5

Since this is a golden opportunity for Leonard to rewrite the Roommate Agreement and get rid of Sheldon's ridiculous clauses, he can't afford to lose. So he turns to you for help. Don't let him down.

Input

First line contains T - number of test cases

Second line contains n - the number of elements in a particular test case.

Next line contain n elements, ai (1<=i<= n) separated by spaces.

Output

The number of such sequences whose sum if zero.

Constraints

1<=t<=5

1<=n<=10^6

-10<= ai <= 10

Below is my code:

```
#include<stdio.h>
main()
{
int t, j, k, l, sum;
long long int num, out = 0;
long long int ai[1000001];
scanf("%d",&t);
while(t--)
{
for(j=0;j<=num;j++)
{
scanf("%lld",&ai[j]);
}
for(l=0;l<=num;l++)
{
for(k=l; k<=num; k++)
{
if(sum == 0)
{
num++;
}
else
{
sum = sum + ai[k];
}
}
printf("%d", &num);
}
}
return 0;
}
```