This question was asked of me in an interview. How can we convert a BT such that every node in it has a value which is the sum of its child nodes?

Here is a solution that can help you: (the link explains it with treediagrams) Convert an arbitrary Binary Tree to a tree that holds Children Sum Property
See the link to see the complete solution and explanation! 


Give each node an attached value. When you construct the tree, the value of a leaf is set; construct interior nodes to have the value If you can change the values of the leaf nodes, then the operation has to go "back up" the tree updating the sum values. This will be a lot easier if you either include back links in the nodes, or implement the tree as a "threaded tree". 


Well as Charlie pointed out, you can simply store the sum of respective subtree sizes in each inner node, and have leaves supply constant values at construction (or always implicitly use 1, if you're only interested in the number of leaves in a tree). This is commonly known as an Augmented Search Tree. What's interesting is that through this kind of augmentation, i.e., storing additional pernode data, you can derive other kinds of aggregate information for items in the tree as well. Any information you can express as a monoid you can store in an augmented tree, and for this, you'll need to specify:
So besides subtree sizes, you can also express stuff like:
(This concept is rather reminiscent of heaps, or more explicitly treaps, which store random priorities with inner nodes for probabilistic balancing. It's also quite commonly described in the context of Finger Trees, although these are not the same thing.) If you also provide a neutral element for your monoid, you can then walk down such a monoidaugmented search tree to retrieve specific elements (e.g., "find me the 5th leaf" for your size example; "give me the leaf with the highest priority"). Uhm, anyways. Might have gotten carried away a bit there.. I just happen to find that topic quite interesting. :) 


Here is the code for the sum problem. It works i have tested it.



With a recursive function you can do so by making the value of each node equal to the sum of the values of it's childs under condition that it has two children, or the value of it's single child if it has one child, and if it has no childs (leaf), then this is the breaking condition, the value never changes. 

