# asymptotic complexity

suppose a computer executes one instruction in a microsecond and an algorithm is known to have a complexity of O(2^n), if a maximum of 12 hours of computer time is given to this algorithm, determine the largest possible value of n for which the algorithm can be used

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This doesn't make sense. O(2^n) could mean just 2^n, but it could also mean 1000000000 * 2^n. –  Henrik Sep 20 '10 at 14:40
Could be made sensible if the givens included the N for which running time was, say, 4 hours...if there are no lower order terms dominating the shorter run time. In short this question is broken and hard to fix. –  dmckee Sep 20 '10 at 14:43
This sounds so much like homework. Also, please use punctuation and capitalization. –  Björn Pollex Sep 20 '10 at 14:49
I suspect this is homework, so I outlined a method for finding the answer instead of giving the answer away. –  Vatine Sep 20 '10 at 14:52
At least have the honesty to say "I need help with this homework problem...". –  Klay Sep 20 '10 at 16:44

No can do.

`O(2^n)` means that there exists `C` such that `limit n->infinity f(n)<=C*(2^n)`.
But this `C` can also be the number of `023945290378569237845692378456923847569283475635463463456` so even 12 hours cannot ensure that it will run even on small input.

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So the smallest possible value is clearly 0. :) –  Vatine Sep 20 '10 at 14:50
@Vatine not necessarily, since only the limit is guaranteed even that might take 14 hours. –  cobbal Sep 20 '10 at 14:53