# Slowest Computational Complexity (Big-O)

Out of these algorithms, I know Alg1 is the fastest, since it is n squared. Next would be Alg4 since it is n cubed, and then Alg2 is probably the slowest since it is 2^n (which is supposed to have a very poor performance).

However Alg3 and Alg5 are something I have yet to come across in my reading in terms of speed. How do these two algorithms rank up to the other 3 in terms of which is faster and slower? Thanks for any help.

Edit: Now that I think about it, is Alg3 referring to O(n log n)? If the ln inside of it means 'log', then that would make it the fastest.

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O(n logn) is actually faster than O(n²), since O(logn) < O(n) –  Gothmog May 5 '13 at 20:31
and `2^n = 2*2*...*2 < 1*2*3*...*n = n!` (at least for large n) –  ypercube May 5 '13 at 20:33
Big Oh doesn't tell you one algorithm is slower/faster than another in any sense of the word you're likely thinking of. It just tells you how some quantity (sometimes execution time or memory consumption on an idealized machine, sometimes the number of times some operation is performed, sometimes an entirely different quantity) changes asymptotically, i.e. as `n` grows. –  delnan May 5 '13 at 20:35
“Out of these algorithms, I know Alg1 is the fastest, since it is n squared” Is this how your exam/homework question is phrased? the O() notation is about asymptotic complexity. There are n^2 algorithms with terrible constants in practice. –  Pascal Cuoq May 5 '13 at 20:35
Well the question phrased it 'which is the more efficient or asymptotically fastest' but I was in a bit of a rush posting that question and just wanted a quick response so I can move onto the next bit of my studying lol –  JimmyK May 5 '13 at 20:41