I had the following problem in a test a week ago. I haven't gotten my grade back, but I'm sure my solution didn't fully target all the base cases of the problem.

The statement is the following:

For a Binary Searcht tree, Write an algorithm (using Pseudo-code) that computes the number of nodes with a key greater or equal to a given integer k. Your algorithm should run in the worst-case time O(h), where h is the height of the Binary Search Tree.

Assume you're given a method subtreeSize(treeNode n) that runs in time O(1), and returns the number of nodes in the subtree rooted at n, including n itself.

This is my solution:

```
nbNodesGreaterEqual(treeNode n, int k){
if(n == null) return 0;
if(n.getValue() >= k) return 1 + substreeSize(n.getRightChild()) + nbNodesGreaterEqual(n.getLeftChild(), k);
if(n.getValue < k) return nbNodesGreaterEqual(n.getRightChild,k);
```

}

Is my algorithm complete? Also, is there a way to write this same algorithm for a regular binary tree (not a BST) that doesn't traverse through all the nodes?

Thank you for your help!

`subtreeSize()`

will take`O(h)`

only if you are storing and updating height information in the tree. Otherwise it will be an`O(n)`

operation, where n is the number of nodes in the tree (i.e.`n = O(2^h)`

). – Chthonic Project Nov 9 '13 at 14:37