Can someone explain how to use witness pairs in the case where you have to show that log n^2 is O(log n) ? Please give an example of how you came up with any particular witness pair.
By the Power Rule for logarithms, we have
Therefore, we have for any choice of n that log (n2) = 2 log n. Therefore, if we pick n0 = 1 and c = 2, we have that for any n ≥ n0 that log (n2) ≤ c log n.
Hope this helps!