# Running time of nested loops (Big O)

What is the running time of this algorithm:

``````for i=1 to n^2
for j=1 to i
// some constant time operation
``````

I want to say O(n^4) but I can't be certain. How do you figure this out?

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It is obviously `O(n^4)`. It's also (not so obviously) `Θ(n^4)`. –  ypercube Jan 17 '12 at 0:37
Never mind, I calculated wrong. –  Rabbit Jan 17 '12 at 0:37

n^4 is correct. The inner loop takes an average of (n^2)/2 time to run, because `i` goes up to n^2 linearly, and it is run (n^2) times.

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Oh that's the missing link: the average time of the inner loop is (n^2)/2. Thanks, that makes sense. It also confirms the numbers that I crunched. –  styfle Jan 17 '12 at 0:45

You are correct, it is `N^4`.

Do the substitution `M = N^2`. Now your loops change to this:

``````for i in 0..M
for j in 0..i
``````

This is your familiar `O(M^2)`, hence the result is `O((N^2)^2) = O(N^4)` after the reverse substitution.

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The constant time operation is run:

``````  1 + 2 + 3 + ... + n^2        (n^2 adders)
``````

times which is less than:

``````  n^2 + n^2 + ... + n^2        (n^2 adders)
= n^2 * n^2
= n^4
``````

So, it's obviously `O(n^4)`

To prove it's `Θ(n^4)`, you can use a liitle math:

``````   1 + 2 + 3 + ... + n^2
= n^2 * (n^2 + 1) / 2
= n^4 / 2 + n^2 / 2
>= n^4 / 2
``````
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That makes sense for proving it is O(n^4) but I don't think that proves it is the tightest upper bound. –  styfle Jan 17 '12 at 0:52
No, it doesn't. –  ypercube Jan 17 '12 at 0:56
Well when analyzing algorithms, it doesn't seem very useful to give an upper bound if it isn't the tightest upper bound. For example, the algorithm is also O(n^5) and O(n!) but that doesn't help to determine the run time. –  styfle Jan 17 '12 at 0:59
That's what `O` notation is. An upper bound. –  ypercube Jan 17 '12 at 6:31

With nested loops the Big Oh run time multiplicative. So Big Oh of the outer loop (N^2) is multiplied by the Big Oh of the inner (N^2). Therefore the Big Oh is (N^2 * N^2) and if you remember how to add exponents of a similar base you get N^(2+2) or N^4.

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``````n^5 = outer * inner
In your notation: `inner = 1+1+...+1` –  ypercube Jan 17 '12 at 6:33