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 `i`

iteration, ^{th}`j`

increments by `ceil(N/2`

.^{(i - 1)})

`log`

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