# A basic confusion on quicksort

Suppose we choose a pivot as the first element of an array in case of a quicksort. Now the best/worst case complexity is `O(n^2)` whereas in average case it is `O(nlogn)`. Is not it weird (best case complexity is greater than worst case complexity)?

• The best case is `O(nlogn)`, instead of `O(n^2)`. Commented Jun 5, 2013 at 17:29

The best case complexity is `O(nlogn)`, as the average case. The worst case is `O(n^2)`. Check http://en.wikipedia.org/wiki/Quick_sort.
While other algorithms like Merge Sort and Heap Sort have a better worst case complexity (`O(nlogn)`), usually Quick Sort is faster - this is why it's the most common used sorting algorithm. An interesting answer about this can be found at Why is quicksort better than mergesort?.
The best-case of quicksort `0(nlogn)` is when the chosen pivot splits the subarray in two +- equally sized parts in every iteration.
So choosing the first element as the pivot in an already sorted array, will get you `0(n^2)`. ;)