Why is this code considered O(N^6) in Big Oh notation?

I was just reading another question and this code intrigued me:

``````for(i = 0; i < n; i++)
{
for(j = 0; j < i*i; j++)
{
for(k = 0; k < i*j; k++)
{
pseudo_inner_count++;
for(l = 0; l < 10; l++);
}
}
}
``````

I don't understand how this can be O(N^6). Can someone break it down for me?

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Actually it is:

• The i loop iterates O(N) times, so the value of i is O(N), so we can say O(I)=O(N).
• The j loop iterates O(I^2) = O(N^2) times (when considered on its own, without the outer loop).
• The k loop iterates O(I*J) = O(N*N^2) = O(N^3) times.
• The l loop just iterates 10 times so that is O(1).

The loops are nested so we have to multiply these together (do you understand why?). The total is O(N)*O(N^2)*O(N^3) = O(N^6).

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Ok, so the final result is achieved through a multiplication of the evaluations of each loop, and not through a sum (as @Pascal suggested). Can someone else confirm this? – karlphillip Jul 21 '11 at 5:00
Pascal did not really do the sum. He multiplied n * n^2 * n^2 * n and got n^6. It might look like a sum because the exponents add together but that's just how exponents work in math. – David Grayson Jul 21 '11 at 5:03
Those upvotes are confirms =D – Edgar Velasquez Lim Jul 21 '11 at 5:04
@karl: Well law of exponents say we add the exponents since the terms we're multiplying have the same base. I don't see how you came to the conclusion that he's taking the sum of something. – Jeff Mercado Jul 21 '11 at 5:05
@karlphillip: Think about it, it only makes sense to multiply. For example, if an inner loop performs some operation 5 times, and then an outer loop performs the inner loop 10 times, then the operation is performed 5*10=50 times. Big O notation is similar, except that you are multiplying functions. [Note: this is a useful but non-rigorous way of thinking about it!] – antinome Jul 21 '11 at 5:13

It's

n for the first loop n² for the second loop n³ for the third loop

The inner loop is O(1)

The total is O(n⁶).

The reason the third loop is n³ is because when you think about it j reaches n² and i reaches n, so i*j reaches n³.

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I would say :

• n for the first loop
• n² for the second loop => total of n³
• n² for the third loop => total of n⁵
• yet another n-loop => total of n⁶
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Whoever voted down, please explain why. – karlphillip Jul 21 '11 at 4:51
I didn't downvote, but I don't see how the innermost loop can be O(n) when it executes in constant time, regardless of the value of n. – antinome Jul 21 '11 at 4:53
Yeah, this looks like O(N^5) to me – bdares Jul 21 '11 at 4:57
I downvoted. The loop `for(l = 0; l < 10; l++);` is O(1), not O(N). – David Grayson Jul 21 '11 at 4:58
@karlphillip, @antiome, @bdares, the inner loop is `O(1)`. The whole thing is still `O(n^6)` because the third loop is n^3. – Paulpro Jul 21 '11 at 4:59