# Complexity analysis of QuickSort from first principles

I am trying to learn about complexity analysis and how to perform it from first principles. Take QuickSort as an example, I would like to be able to derive an O-notation expression for the average-case complexity of this algorithm.

I know QuickSort is O(nlog(n)) and I understand why, it has to make a pass over n elements on each iteration, and the recursion depth is log n. But I dont know how you would show this with first principles, ie counting primitive operations.

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This is precisely covered at e.g. Wikipedia: en.wikipedia.org/wiki/Quicksort#Formal_analysis. See also Introduction to Algorithms. –  Oli Charlesworth May 1 '12 at 15:06
+1 For Cormen reference. –  Dredd May 1 '12 at 15:09
But in relation to deriving the complexity from 'first principles'. Doesn't first principles mean counting primitive operations? –  Jim_CS May 1 '12 at 15:16
@Jim_CS: You don't need to count individual primitive operations. It doesn't matter whether there are 10 or 100 ops per iteration/recursion, so long as that number is constant. The growth is controlled by the number of iterations/recursions. –  Oli Charlesworth May 1 '12 at 15:21
Rather than closing this question, I think it's worth putting the Wikipedia reference in an answer and voting it up. –  Adrian McCarthy May 1 '12 at 17:01