Given the following complexities list :
n^(log log(n) ) ;2^n ;3^n ;n! ; n^3 ;1/n ;(n+1)! ; 4^log(n) ;n^2 n^log(n) ;log(n!) ;nln(n) ; log(2^n )=nlog2 ;(log(2) )^n ;5n^2+6 ; n^log(n!)
I need to sort them by classes .
I sorted part of them by the following order , but I'm still missing a few :
(n+1)! n! 3^n 2^n (3/2)^n (log(n))^log(n) =n^log(log(n) ) n^3 n^2 = 4*log(n) = 4^log(n) 5n^2+6 = Θ(n^2 ) log(n!) = Θ(n*log(n)) nlog(2) = log(2^n )
Where do I need to put the rest :
n^log(n) ; n*ln(n) ; (log(2))^n ; n^[log(n!)] ; 1/n ;
And , how can I divide them into common classes ?
I'd appreciate any help