running time for print out all primes under N

``````int main() {
int i, a[N];
// initialize the array
for(i = 2; i < N; i++) a[i] = 1;
for(i = 2; i < N; i++)
if(a[i])
for(int j = i; j*i < N; j++) a[i*j] =0;
// pirnt the primes less then N
for(i = 2; i < N; i++)
if(a[i]) cout << "  " << i;
cout << endl;
}
``````

It was given in algorithm book i am reading running time of above program is proportional to `N+N/2+N/3+N/5+N/7+N/11+...`,

Please help me in understanding how author came up with above equation from the program. Thanks! Venkata

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This is the "Sieve of Eratosthenes" method for finding primes. For each prime, the `if(a[i])` test succeeds and the inner loop gets executed. Consider how this inner loop terminates at each step (remember, the condition is `j*i < N`, or equivalently, `j < N/i`):

• i = 2 -> j = 2, 3, 4, ..., N/2
• i = 3 -> j = 3, 4, 5, ..., N/3
• i = 4 -> not prime
• i = 5 -> j = 5, 6, 7, ..., N/5
• ...

Summing the total number of operations (including initialising the array/extracting the primes) gives the runtime mentioned in the book.

See this question for more, including a discussion of how, in terms of bit operations, this turns into an expansion of O(n(log n)(log log n)) as per the Wikipedia article.

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Thanks for the help. Now i understood how running time of the alogorithm is anlayzed. –  Venkata Oct 30 '10 at 16:47
The inner loop (inside `if(a[i])`) is executed for prime `i`s only. I.e., for `i` equal to 2, 3, 5, 7, 11, ... And for single `i`, this loop has approximately `N/i` iterations. Thus, we have `N/2 + N/3 + N/5 + N/7 + N/11 + ...` iterations overall.