# Big-O Notation Homework Question

Is 2^(n+1) = O(2^n)? I believe that this one is correct because n+1 ~= n.

Is 2^(2n) = O(2^n)? This one seems like it would use the same logic, but I'm not sure.

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Note that

`2n+1 = 2(2n)`
and
`22n = (2n)2`

From there, either use the rules of Big-O notation that you know, or use the definition.

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To answer these questions, you must pay attention to the definition of big-O notation. So you must ask:

is there any constant C such that `2^(n+1) <= C(2^n)` (provided that n is big enough)?

And the same goes for the other example: is there any constant C such that `2^(2n) <= C(2^n)` for all n that is big enough?

Work on those inequalities and you'll be on your way to the solution.

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`2^(n+1) = O(2^n)` is common, incredibly unfortunate notation for saying "The order of 2^(n+1) is Big-O (2^n)" If I had my way, instead of this terrible O, Ω, Θ notation, we'd use one symbol Θ in conjunction with ≤, ≥, and = to specify order; the above statement would then be written as `Θ(2^(n+1)) ≤ Θ(2^n)`. Unfortunately, this is simply not the way it works :( –  BlueRaja - Danny Pflughoeft Jan 31 '11 at 21:45