I'm interested in the worst-case efficiency of stepping forwards and backwards through binary search trees.

**Unbalanced tree:**

```
5
/
1
\
2
\
3
\
4
```

It looks like the worst case would be 4->5, which takes 4 operations.

**Balanced tree:**

```
2
/ \
1 4
/ \
3 5
```

Worst case is 2->3, which takes 2 operations.

Am I right in thinking that the worst case for any BST is O(height-1), which is O(log n) for balanced trees, and O(n-1) for unbalanced trees?

`O(height-1)`

=`O(height)`

... – Oliver Charlesworth May 19 '12 at 12:15`binary-tree`

and`binary-search-tree`

tags be synonyms? – Alex L May 19 '12 at 12:18