To compare the asymptotic order of the two functions, I calculated the limit of first function over second function, when n goes to infinity.
The answer was 2 (I had to use l'hopital's rule), which means that for really high values of n, log(n^2) is larger than log(5n)
My question is: is it incorrect to say that log(n^2) is asymptotically larger than log(5n)?
My friend told me that when the limit of first function over the second function is a constant, that means that their asymptotic order is equal. Can someone confirm?