In-order tree traversal obviously has application; getting the contents in order.

Preorder traversal seems really useful for creating a copy of the tree.

Is there a common use for postorder traversal of a binary tree?

  • For getting it in a different order, such as postfix: en.wikipedia.org/wiki/Reverse_Polish_notation Commented Jul 9, 2010 at 20:17
  • The HP calculator syntax springs to mind. +1
    – Dean J
    Commented Jul 9, 2010 at 20:19
  • Yes, postfix is ideal for evaluating expressions on a stack. It's also unambiguous about order of operations, unlike infix. Commented Jul 9, 2010 at 20:24

4 Answers 4


Let me add another one:

Postorder traversal is also useful in deleting a tree. In order to free up allocated memory of all nodes in a tree, the nodes must be deleted in the order where the current node can only be deleted when both of its left and right subtrees are deleted.

Postorder does exactly just that. It processes both of the left and right subtrees before processing the current node.

  • 3
    That's actually the most useful answer I've heard so far; welcome!
    – Dean J
    Commented Oct 29, 2010 at 13:41

If the tree represents a mathematical expression, then to evaluate the expression, a post-order traversal is necessary.


Yes. Postorder is sometimes used to translate mathematical expressions between different notations.


It can also generate a postfix representation of a binary tree.

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