What is the difference between a binary search tree and a balanced binary search tree? Isn't every BST (Binary search tree) already a BBST (Balanced BST)?


3 Answers 3


"Balanced" is a property that a binary tree may have. It generally means that each node in the tree has approximately the same number of descendant nodes on each subtree underneath it. It more specifically means that the "height" of the tree has been minimized.

For a tree that is not "Balanced", it is possible to have a binary tree where all the "left" child nodes are null, and it still otherwise has the properties of a "binary search tree". This is called a degenerate tree, as it is structurally more like a Linked List, and therefore would have O(N) search time instead of O(log(N)).

  • Basically, in layman terms, can I say that a balanced tree is one where the height of the left and right subtrees differ by at most 1? And in BST, this might not necessarily be true?
    – John Lui
    Commented Jun 24, 2015 at 20:02
  • That is "necessary but not sufficient". It must include where "every sub-tree is also a balanced tree"
    – Daniel
    Commented Jun 24, 2015 at 20:31

the difference is that a balance binary tree has the possibly minimum height


Simply put, no. A BST is not necessarily balanced. From wikipedia

Without rebalancing, insertions or deletions in a binary search tree may lead to degeneration, resulting in a height n of the tree (where n is number of items in a tree), so that the lookup performance is deteriorated to that of a linear search.

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