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.

`2^n = 2*2*...*2 < 1*2*3*...*n = n!`

(at least for large n) – ypercube May 5 '13 at 20:33some 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 20:35asymptoticcomplexity. There are n^2 algorithms with terrible constants in practice. – Pascal Cuoq May 5 '13 at 20:35