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can a node be inserted in a non leaf position in a binary search tree ?

for eg. if we have the following set of numbers to be arranged as a binary serach tree :-


so there is more than 1 way these numbers can be arranged as a bst :-

  1.        20
       17      23
    15    19      25
  2.     20
    15      23
      17       25
  3. 25 make it a root and place the other nodes accordingly....

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Technically, a node can be inserted anywhere in the tree. It's just that if it breaks the order or balance, it will have to be restored (BSTs employ the so-called node rotation for that). So, what's the actual question? – Alexey Frunze Oct 5 '11 at 10:44
@Alex: A simple BST does not have to be balanced. – Björn Pollex Oct 5 '11 at 10:45
@BjörnPollex: yes, it's just that it will lose all its treeish attractiveness when it degrades into something resembling a linked list. – Alexey Frunze Oct 5 '11 at 10:48
@Alex, some types of self-balancing BSTs use rotations, but not all of them. And this question seems to be about plain BSTs, that don't use rotations (or any other way) to balance. – svick Oct 5 '11 at 10:50
up vote 0 down vote accepted

A binary search tree is just a tree with certain properties. You can use different algorithms for inserting nodes into such a tree, as long as these algorithms ensure that the properties required for a BST hold. So, yes, you can add nodes in other places than leafes if you want to.

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I think you could devise some way to do that. But the normal algorithm for inserting into a BST doesn't do it and I don't see any reason why would you want to do that. Also, I don't know about any other publicly known algorithm that does that.

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