# Why is the height of every binary search tree not O(log n)

Studying for an algorithms exam, and I read that the height of every BST is not O(log n). Does this fact have something to do with the tree being balanced? Is the height of every balanced BST O (log n), and unbalanced tree something else (if so what is it)?

• Yes, it has to do with balanced/unbalanced. Imagine a tree where the root is the minimum item, and none of the nodes have left children. Its height would be N (the number of items). Jun 5, 2015 at 2:08
• You could say that `h = Ω(log n)`, I suppose. Jun 5, 2015 at 2:09

The height of every unbalanced BST is not `O(lg n)` because imagine a tree with keys in increasing/decreasing order, where the tree becomes skewed to one side. This happens to be the `O(n)` worst-case for an unbalanced BST where the height is equal to `n`.
On the other hand, with a balanced tree such as an AVL tree, rotations during insertion/deletion allow these trees to maintain an approximate (not perfect) `O(lg n)` height.