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?
n^4 is correct. The inner loop takes an average of (n^2)/2 time to run, because 


You are correct, it is Do the substitution
This is your familiar 


The constant time operation is run:
times which is less than:
So, it's obviously To prove it's



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. 


Using Sigma Notation, you end up getting the order of growth methodically: 





O(n^4)
. It's also (not so obviously)Θ(n^4)
. – ypercube Jan 17 '12 at 0:37