Hey guys I'm working out some big-o problems from the Algorithms book by Dasgupta and am stuck on a few.
1) f(n) = n^0.1 g(n) = (log n)^10
According to the top answer on Asymptotic Complexity of Logarithms and Powers , "log(n)^a is always O(n^b), for any positive constants a, b." So for 1), f = omega(g)
2) f(n) = n^1.01 g(n) = n log^2 n My guess is f = omega(g). Is this example correct or a different case because log is squared and multiplied by n?
Please provide any explanation about the steps you take to solve these kind of problems