# Mergesort running time BigO

Snape’s “Unfriendly Algorithms for Wizards” textbook claims the running time of merge sort is O(n^4). Is this claim correct?

Solution: Yes. This claim is technically correct, because O(n^4) only gives an upper bound for how long the algorithm takes. However, it’s an obnoxiously unhelpful answer, since the tight bound is `Θ(n log n).`

I'm not quite understanding what the solution is stating. How can O(n^4) be correct?

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Big O notation is an upperbound on the worst case for an algorithm runtime.

Since O(n^4) is above the worst case time of mergesort it is technically correct because it does provide a bound - ie. Mergesort will never have a performance worse than O(n^4).

However, it's unhelpful because a better expression of the running time is O(n log n), which is the "tightest" bound for merge sort

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Ahh ok I see..so O(n^1000) would also be 'technically' correct? –  moby Oct 31 '10 at 1:03
Yes, because it's true that you won't ever get performance worse than O(n^1000) from mergesort –  Martin Oct 31 '10 at 1:04
Yes, O(n^1000) is another, even less helpful upper bound. –  Thilo Oct 31 '10 at 1:05
Ok while we're on this topic, if we say that mergesort is BigOmega of (x), then whats the 'english' way to think about that? What about BigTheta? Does BigTheta mean that its the maximum running time of the function? –  moby Oct 31 '10 at 1:09
BigOmega - It will not run faster than this. BigTheta - This is a combination of Big O and Big Omega, there's no "special" input that will make it run faster or slower. –  Zareth Oct 31 '10 at 1:12