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for(i = 1; i < n*n; i++){
    for(j = 1; j < i*i; j++){
        if(j % i == 0){
            for(k=0; k < j; k++){
                count++;
            }
        }
    }
}

My attempt at a solution:

j iterates up to i*i = n^4. For the 'k' loop, we have the sum of k from 1 to n^4 which is n^4(n^4-1)/2. So the runtime is O(n^8). This strikes me as too high, but I don't see an error.

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1  
The 2nd loop's increment is i++ or j++? –  nhahtdh Oct 22 '12 at 2:44

2 Answers 2

up vote 2 down vote accepted

The outer loop executes n2 times. The next loop executes a total of ∑i=1n2 i2, which is O(n6).

The innermost loop only runs when j is a multiple of i, which happens i times for each value of i. The innermost loop executes j times for each such value of j: i, 2i, 3i, and so forth until i*i. Thus, the innermost loop executes ∑j=1i ij times, which is O(i3), for each i.

Therefore, the total running time is ∑i=1n2 O(i3) + O(n6), which is O(n8) since ∑i=1n2 O(i3) = O(n8).

(Note that I'm assuming the second loop increments j++, not i++. The answer is rather different if it's i++).

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Yes the second loop increments j++, i've edited the original post –  Matt Oct 22 '12 at 3:51

So:

i goes from 1 to n*n.
j goes from 1 to i*i

But the inner most loop only runs when i divides j. There are exactly i numbers between 1 and i*i, which are divisible by i. Therefore the inner most loop will run i times for each i from 1 to n*n.

So far that's n^4.

But now j can be at most i*i, so at most n^4.

So yes, the complexity is O(n^8).

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