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Kind of a math question, but very programming related. Doing some Big-O problems and I have an algorithm where a for loop will run n times, where k = input size, n = max power of 4 where (k)/(4^n) >= 1. How can I represent max power of 4 where (k)/(4^n) >= 1 in one mathematic statement?

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closed as off-topic by bmargulies, Michael J. Barber, Patricia Shanahan, Abbas, PeterM Mar 3 '14 at 8:21

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "This question does not appear to be about programming within the scope defined in the help center." – bmargulies, Michael J. Barber
If this question can be reworded to fit the rules in the help center, please edit the question.

As you say, this is really a Mathematics question. I agree that it's programming related, but that isn't sufficient to make it a programming question. That said, once you've established the expression you wish to evaluate, asking "how do I calculate expression using {some language/library}", that's a programming question, so do come back and ask that here if you need to :) –  AakashM Feb 1 '12 at 9:22
This question appears to be off-topic because it is about mathematics. –  Patricia Shanahan Mar 2 '14 at 21:37

4 Answers 4

up vote 2 down vote accepted
floor ( (log k)/(log 4) ).

Or something along those lines.

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Mathematic statement: [log_4(k)]

Code: floor( log(k) / log(4) )

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i think you mean log_4(k) –  Mitch Wheat Feb 1 '12 at 2:46
yes, of course. Thanks! –  Petar Ivanov Feb 1 '12 at 7:10

log base 4 of k? Can take the floor if you only care about integer n.

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Taking (k)/(4^n) >= 1, multiply both sides by 4^n to get k >= 4^n, and then take the log base 4 (log_4) of both sides to get log_4 k >= n, or n <= log_4 k. (Equivalently, take log of both sides and get log k >= log(4^n), then note log(4^n) = n log(4), and divide to get (log k)/(log 4) >= n). Choose the largest integer n satisfying this inequality, which is floor(log_4 k).

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