# Comparing growth rate of exponential function?

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

= 22n

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?

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This question appears to be off-topic because it is about mathematics. –  Paul R Sep 5 '13 at 17:55
You assume `a/b=(log a)/(log b)` which is generally wrong. –  WolframH Nov 1 '13 at 1:55
This question appears to be off-topic because it is about maths. –  Derek 朕會功夫 Jan 31 at 19:25

Where you went wrong: "ignoring the constant term".

t(n) = (n+1)/n = n/n + 1/n = 1 + 1/n > 1

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1 + 1/n is bounded above by the constant 2, though. –  templatetypedef Nov 1 '13 at 2:41
@Scott Hunter Yeah you are right. I got it where I made mistake –  Atinesh Jan 31 at 16:42

I think your error is assuming the following:

If log log f(x) / log log g(x) is a constant, then f(x) = Θ(g(x)).

Here's an easy counterexample to this. Let f(x) = x2 and g(x) = x. Then

log log f(x) = log log x2 = log (2 log x) = log 2 + log log x

and

log log g(x) = log log x

Here, log log f(x) and log log g(x) differ just by a constant (namely, log 2), but clearly it's not true that f(x) and g(x) grow at the same rates. In other words, it's not safe to ignore constants after taking the logs of the growth rates of two functions.

There's a second error in your logic. If you compute f(n) / g(n), you get

22n + 1 / 22n

= 22n+1 - 2n

= 22n

If you take the log of this twice, you get

lg lg 22n

= lg 2n

= n

So it's not even true that the log log of the ratio is (n + 1) / n; instead, it's n, which still tends onward toward infinity. This would also tell you that f(n) grows much more rapidly than g(n).

Hope this helps!

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