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For this I think to properly solve it I need to show that sigma(logn) is its lower bound. I know all of the comparisons in my book run in O(nlogn), but im not sure how to form this into a concrete answer.

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So far my plan is to explain the proof about how any comparison sort requries omega(nlogn) and then say since thats bigger than sigma(logn), logn is a suitable lower bound. I just feel there is a more concise way to put it. –  jfisk Oct 13 '11 at 16:55
possible duplicate of Is binary search optimal in worst case? –  Nemo Oct 13 '11 at 17:12
@Nemo: yeah, but that totally spoils the homework problem :) No peeking, jfisk! –  ccoakley Oct 13 '11 at 17:17

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  1. I think you've misread the problem: The array you are given is sorted. You are not sorting it. You are accessing it. Let's play a game. I pick a US state and you try to guess it. Every guess I will tell you if my chosen state is alphabetically before or after your guessed state. How many guesses do you need? The problem gives you a great clue with binary search.

  2. Add this to your general algorithm toolbox: To show a lower bound is valid (but not necessarily tight), assume there exists an upper bound that is smaller, and do a proof by contradiction. For your problem, this should be doable.

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Yes I did misread the problem, but I now see why the worst case is logn. Thanks! –  jfisk Oct 13 '11 at 17:15

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