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# Algorithm Big O Notation [duplicate]

Possible Duplicate:
If f(n) = O(g(n)) , then is exp(f(n)) = O(exp(g(n)))

I stumbled upon this question in the Cormen book.

If f(n) is O (g(n)) then 2^f(n) is also O (2^g(n)). Is this true? I was trying to prove it using limit rules but totally stuck. My instincts are saying it is false but how can we deduce that?

Thanks

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## marked as duplicate by Bill the LizardApr 19 '11 at 4:41

my instincts are saying this is homework for CS 201 – Woot4Moo Apr 19 '11 at 2:16
haha niiice one – locrizak Apr 19 '11 at 2:21

`f(n) = 2n` is `O(n)`, but `e^(2n)` is `O((e^2)^n)`, which is obviously slower than `O(e^n)` because of the larger base.
@Ozzah: Eh, depends on how you look at it. I assumed the larger exponent wasn't obvious, so I rearranged it to show that the base is `e^2` instead of `e`. Same difference. – Mehrdad Apr 19 '11 at 3:31