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.
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. 


Note that 2^{n+1} = 2(2^{n})and 2^{2n} = (2^{n})^{2} From there, either use the rules of BigO notation that you know, or use the definition. 


To answer these questions, you must pay attention to the definition of bigO notation. So you must ask: is there any constant C such that And the same goes for the other example: is there any constant C such that Work on those inequalities and you'll be on your way to the solution. 


I'm assuming you just left off the O() notation on the left side. O(2^(n+1)) is the same as O(2 * 2^n), and you can always pull out constant factors, so it is the same as O(2^n). However, constant factors are the only thing you can pull out. 2^(2n) can be expressed as (2^n)(2^n), and 2^n isn't a constant. So, the answer to your questions are yes and no. 

