So if given

4n^2, log3(n), 20n, n^2.5, log(n!), n^n, 3^n, n log (n), 100n^(2/3), 2^n, 2^(n+1), n!, (n-1)!, 2^2n

The order (increasing order of their big O complexity) would be

log3(n) < 20n < n logn < 4n^2 < 100n^(2/3) < log(n!) < n^(2.5) < 2^n < 2^(n+1) < 3^n < 2^(2n) < (n-1)! < n^n < n!

this is when n is a large number. Is that right?