# merging two binary search trees [duplicate]

Possible Duplicate:
How i can merge two binary trees

I'm new to trees codes and I've been asked to write a code for merging two binary search trees by writing a function

``````void mergeBst (BST & othertree)
``````

This function will receive another Bst and insert all non- redundant values from that tree to the current tree so can you please tell me how to do that?

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## marked as duplicate by Kerrek SB, A--C, Beta, Thomas Matthews, Yehuda KatzJan 18 '13 at 7:35

You take all the elements from one tree and add them to the other. – Lee Taylor Jan 17 '13 at 23:10
How much code do you already have? – Lee Meador Jan 17 '13 at 23:11
Think about how you would merge two sorted ranges abstractly first. Then apply this thinking to trees. – Kerrek SB Jan 17 '13 at 23:11
Here's a clue. Google for the words in the title of your question here and read what it finds. – Lee Meador Jan 17 '13 at 23:14
I have lots of other functions to write and I'm working on them but in the merging code I have none – user1988805 Jan 18 '13 at 19:43

Create two sorted list using two trees. This will be O(m+n).Then merge two sorted list maintaining order.(O(m+n)) Create composed tree using the merged list.(O(m+n))

Or simply for every node in the input tree, find the position to insert node into the source tree. Then insert it.

How i can merge two binary trees

how to merge two BST's efficiently?

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To merge tree B into tree A (`A.mergeBst(B)`):

Compare the root of B to the root of A.
If the root of B is greater, merge `B.left` into A, and the rest of B into `A.right`.
If it's less, merge `B.right` into A, and the rest of B into `A.left`.
If they're equal, merge `B.left` into `A.left`, `B.right` into `A.right`, and discard the root of B.

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I don't think this will always yield the correct merge. Consider trees (1,2,3) with 2 as root and (1,3,5) with 3 as root. Your algorithm will have 1 appear twice. – jxh Jan 17 '13 at 23:27
@user315052: drat, you're right. Hang on... – Beta Jan 17 '13 at 23:31
I think your new algorithm is now much closer. But, you have to also consider that the result of a merge may cause the root value to change. So, for example, the step "merge the rest of B into A.right" may not be correct after the first step of "merge B.left into A". For that particular case, I would change the order of the merges. – jxh Jan 17 '13 at 23:42
@user315052: can you give an example that requires the root value to change? – Beta Jan 17 '13 at 23:50
The BST may be self-balancing (e.g. Red-Black or AVL). – jxh Jan 17 '13 at 23:50

Considering two Binary Search Trees:

1. Source - the BST on which you will iterate
2. Target - the BST you wish to add source's values

There is a pretty simple algorithm.

for each "values" in source search if they are in target if they are, discard them, if not insert them.

EDIT: by "iterate" i meant: http://en.wikipedia.org/wiki/Tree_traversal

Pre-order iteration:

1. Visit the root.
2. Traverse the left subtree.
3. Traverse the right subtree.
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Your answer is about as vague as the original question. What does it mean to iterate over a binary search tree, to "for each 'values'" in it? – David Gorsline Jan 17 '13 at 23:52