# Big-O analysis with functions within functions

I'm confused about how Big-O works when dealing with functions within functions (when analyzing worst case). For example, what if you have something like:

``````for(int a = 0; a < n; a++)
{
*some function that runs in O(n*log(n))*
for(int b = 0; b < n; b++)
{
*do something in constant time*
}
}
``````

Would this entire block run in O(n^2*log(n)), because within the first for loop, you have an O(n) and an O(n*log(n)), so O(n*log(n)) is greater, and therefore the one we take? Or is it O(n^3*log(n)) because you have an O(n) and an O(n*log(n)) within the outer for loop?

Any help is appreciated! Thanks!

-

It's

``````O(N) * (O(N lg N) + O(N) * O(1)) = O(N) * (O(N lg N) + O(N))
= O(N) * O(N lg N)
= O(N^2 lg N)
``````

Because you have `O(N)` iterations of an `O(N lg N)` function and `O(N)` constant time operations. The `O(N lg N) + O(N)` simplifies to `O(N lg N)` because `O(N lg N) > O(N)`.

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Awesome explanation. Thanks! –  Mason Sep 20 '11 at 0:26

When calculating this type of complexity you should add inline or sequential functions and multiply nested functions.

For example, this would be `O(n)`:

``````// O(n) + O(n) = O(2n)` which is `O(n)` (as constants are removed)
for (int i = 0; i < n; i++)
{
/* something constant */
}
for (int j = 0; j < n; j++)
{
/* something constant */
}
``````

But when the functions are nested, multiply their complexity:

``````// O(n) * O(n) = O(n^2)
for (int i = 0; i < n; i++)
{
for (int j = 0; j < n; j++)
{
/* something constant */
}
}
``````

Your example is a combination - you've got some sequential operations nested inside another function.

``````// this is O(n*logn) + O(n), which is O(n*logn)
*some function that runs in O(n*log(n))*
for(int b = 0; b < n; b++)
{
*do something in constant time*
}

// multiplying this complexity by O(n)
// O(n) * O(n*logn)
for(int a = 0; a < n; a++)
{