# Big O Time Complexity for this code

Given the following code -:

``````for(int i = 1; i <= N; i++)
for(int j = 1; j <= N; j = j+i)
{
//Do something
}
``````

I know that the outer loop runs `N` times, and that the inner loop runs approximately `log(N)` times. This is because on each iteration of `i`, `j` runs `ceil(N)`, `ceil(N/2)`, `ceil(N/4)` times and so on. This is just a rough calculation through which one can guess that the time complexity will definitely be `O(N log(N))`.

How would I mathematically prove the same?

I know that for the `ith` iteration, `j` increments by `ceil(N/2(i - 1))`.

• you may like to use the approach I used in myanswer: A puzzle related to nested loops but it take time. Mar 23, 2014 at 4:26
• @Alp j grows by i each iteration, not by 1. Mar 23, 2014 at 4:36
• Not sure but it mat be helpful: what is value of x in term of n? And Here is one more question Mar 23, 2014 at 4:36
• @GrijeshChauhan: The example is nice but I was looking for a proper mathematical proof, where I would apply the `log` to base 2. Mar 23, 2014 at 7:32
• Perhaps I am thinking of iterative recurrence solving, which obviously cannot be applied here. Mar 23, 2014 at 8:11

The total number of iterations of the inner loop for each value of i will be

``````i = 1: j = 1, 2, 3 ..., n ---> total iterations = n
i = 2: j = 1, 3, 5 ..., n ---> total iterations = n/2 if 2 divides n or one less otherwise
i = 3: j = 1, 4, 7 ..., n ---> total iterations = n/3 if 3 divides n or one less otherwise
...
i = m: j = 1, 1 + m, ... , n ---> total iterations ~ n/m
...
1
``````

So approximately the total iterations will be `(n + n/2 + n/3 ... + 1)`.

That sum is the Harmonic Series which has value approximately `ln(n) + C` so the total iterations is approximately `n ln(n)` and since all logarithms are related by a constant, the iterations will be `O(nlogn)`.

• This is exactly what I was looking for. Thanks! Mar 23, 2014 at 8:25
• @TheRedBlackTree You're right, n(n + ... + 1) too much. Thanks for catching that! Mar 23, 2014 at 10:09