Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I just wrote this exam, in which there was question: Consider a array of size 2n, where the numbers in odd positions are sorted in ascending order and the the numbers in even positions in descending order. Now, if I have to search for a number in this array, which is a good way to do this? The options were:

  1. Quick sort and then binary search
  2. Merge the two sorted arrays and then binary search
  3. Sequential search

In 1, Quick Sort takes O(n log n) and binary search, O(log n)

In 2, Merge takes O(n) and then O(log n) for binary search

In 3, it takes O(n).

So 3 turns out to be the way to go. Is that correct? Is there a better choice which might not have been given?

EDIT: I accepted Lukas's answer since he was the first. Sigh, that was the other option. I get a -1. :(

share|improve this question

4 Answers 4

up vote 6 down vote accepted

You can do two binary searches -- that's O(log n), because you ignore constants (2 in this case).

share|improve this answer

Would it not be easier if you just did a binary search on both sets? Thus O(log n) and O(log n)?

Would that not be easier, so if found in the first, the second step is not even required?

share|improve this answer

Check whether it's even or odd, and binary search on the part of the array you're interested in. O(log n).

share|improve this answer
Heh, that part bit me too: It doesn't say that odd numbers are in ascending order; it says that numbers in odd positions of the array are in ascending order. –  Tordek Dec 13 '09 at 8:12

I think second option fits your criteria.

Merge sort: We can easily get full array of sorted numbers from two half sorted arrays with time complexity of O(n)

And then binary search will have time complexity of O(logn)

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.