for f = n(log(n))^5 g = n^1.01 is f = O(g) f = 0(g) f = Omega(g)? I tried dividing both by n and i got f = log(n)^5 g = n^0.01 But I am still clueless to which one grows faster. Can someone ...
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 ...
I am currently learning about Big O Notation running times and amortized times. I understand the notion of O(n) linear time, meaning that the size of the input affects the growth of the algorithm ...