# The time complexity of O(n^n) and O(n!)

Get the complexity order of below {O(1), O(log(n)), O(n*log(n)),O(n), O(n^2), O(2^n), O(n!), O(n^n), O(n^3).

The order should be below: O(1)< O(logN) < O(N)< O(NlogN)< O(N^2)< O(N^3)< O(2^N)< O(N^N)< O(N!)

In my opinion, N^N = N*N*N.... however, N! =N(N-1)(N-2)..... so O(N!) < O(N^N)

However, another friend said O(N^N)< O(N!),

because n! =sqrt(2pi*n)(n/e)^n

Thanks very much.

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Homework? It sure looks like that. –  Jongware Aug 18 '13 at 1:34
Hello Jongware, it is not homework, I am practicing some interview questions. –  hellocoding Aug 18 '13 at 1:46
Chris, I modified the question, do you think which has higher complexity? O(N^N) or O(N!)? –  hellocoding Aug 18 '13 at 1:47

Lets Assume N is = 4.

• If you call O(N!), the loop will iterate N! time for each loop. The 1st loop will be 1, the 2nd loop will be 1, 2 the 3rd loop will be 1, 2, 3 and the 4th loop will be 1, 2, 3, 4.
• So you have:
• 1
• 1, 2
• 1, 2, 3
• 1, 2, 3, 4
• And if you call O(N^N), the loop will iterate N times for each loop. 1st loop will be 1, 2, 3, 4 the 2nd loop will be 1, 2, 3, 4 the 3rd loop will be 1, 2, 3, 4 and the 4th loop will be 1, 2, 3, 4
• So you have:
• 1, 2, 3, 4
• 1, 2, 3, 4
• 1, 2, 3, 4
• 1, 2, 3, 4
• So you can see that O(N!) will terminate earlier than O(N^N) because it does not have to loop through to the end of the list for each iteration. Thus the time complexity O(N!) < O(N^N) or rather O(N!) is better than O(N^N).
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Hey, Juniar, this is what I thought. However, the friend who claims O(N!) has higher complexity showed me this: n! =sqrt(2pi*n)(n/e)^n, what confuses me is how to get formula. –  hellocoding Aug 19 '13 at 0:59