Suppose we have two functions f(n) = 22n+1 and g(n)=22n. I want to compare their growth rates by two different methods, which I've done below but give different results.
Method One: Take the Ratio
Let's define t(n) = f(n) / g(n). Then
t(n) = f(n) / g(n)
= 22n+1 / 22n
= 22n + 1 - 2n
So we'd expect that f(n) grows much faster than g(n), since this function tends toward infinity very rapidly.
Method Two: Use Logarithms
As before, let t(n) = f(n) / g(n). Now, let's take log base two of both sides:
lg t(n) = lg (f(n) / g(n))
= lg (22n+1 / 22n)
= lg 22n+1 - lg 22n)
= 2n+1 - 2n
Now, let's take the log base two of both sides:
lg lg t(n) = (n + 1) lg 2 / n lg 2
= (n + 1) / n
Ignoring constant term, we get lg lg t(n) = 1, which is a constant, so f(n) and g(n) should have the same growth rate.
Why am I getting the wrong answer using method two?