I am trying to understand how n^2 is faster than nlogn for n < 100 and opposite when n >= 100. In general this is not the case but this is an exercise that I do not want an answer for but to lead ...
List the following growth functions in the order from the most efficient to the most complex: nlog2(n)+n2 n2-nlog(n) nlog(n) n2log(n) 2n+100n4 n3-100n2 I understand that the function is deemed ...
Order the following expressions in increasing Θ-order (if two functions are of the same order of growth, you should state this fact): n log n, n^−1, log n, n^log n, 10n + n^3/2, π^n, 2^n, 2^log n, ...
I've been having some problems trying to grasp the concept of big O notation. So, by definition big O is as follows, T(n) ∈ O(G(n)) if T(n) <= G(n) * C. Since the the constant "C" can be any ...