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How much does it cost the search operation in a Binary tree? Is it O(n)?

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Though given an answer however you could have easily got the answer to your question if you would have typed your question in the search box in either Google or Stack Overflow. –  Yavar Mar 26 '12 at 11:42
Do you mean a binary search tree? –  svick Mar 26 '12 at 12:17

3 Answers 3

up vote 2 down vote accepted
        Average     Worst case
Space   O(n)        O(n)
Search  O(log n)    O(n)
Insert  O(log n)    O(n)
Delete  O(log n)    O(n)
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@AndreasBrinck, When you have degenerated tree (in other words each node has only 1 child). So, we can consider that tree became linkedlist. –  Kirill Polishchuk Mar 26 '12 at 11:49
Yes, I stupidly just read the question as binary search (in an array). Sorry. –  Andreas Brinck Mar 26 '12 at 11:53

Average Case for searching an element: O(log n)

Worst Case: O(n)

You can check out for balanced trees (AVL, Red Black) if you need better (logarithmic) worst case running complexities.

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Yes, it is O(n), since it is Binary Tree and NOT binary search tree.

Since it is not possible to judge to which way (Left or Right) to branch in a "Binary tree", we have to search the entire tree in the worst case.

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