# What is the total number of nodes in a full k-ary tree, in terms of the number of leaves?

I am doing a unique form of Huffman encoding, and am constructing a k-ary (in this particular case, 3-ary) tree that is full (every node will have 0 or k children), and I know how many leaves it will have before I construct it. How do I calculate the total number of nodes in the tree in terms of the number of leaves?

I know that in the case of a full binary tree (2-ary), the formula for this is 2L - 1, where L is the number of leaves. I would like to extend this principle to the case of a k-ary tree.

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Is this homework? If so, please tag accordingly. –  PengOne Oct 20 '11 at 21:21
No, it's not homework. Thanks for the -2 vote, that was nice. –  Andrew Oct 20 '11 at 23:59
Though no one but those who voted can know for certain, the down votes are most likely due to the fact that you showed no research effort on this problem, or perhaps because it is not directly related to coding. –  PengOne Oct 21 '11 at 0:02
oh, ok, got it. –  Andrew Oct 21 '11 at 0:30

Think about how to prove the result for a full binary tree, and you'll see how to do it in general. For the full binary tree, say of height `h`, the number of nodes `N` is

`N = 2^{h+1} - 1`

Why? Because the first level has `2^0` nodes, the second level has `2^1` nodes, and, in general, the `k`th level has `2^{k-1}` nodes. Adding these up for a total of `h+1` levels (so height `h`) gives

``````N = 1 + 2 + 2^2 + 2^3 + ... + 2^h = (2^{h+1} - 1) / (2 - 1) = 2^{h+1} - 1
``````

The total number of leaves `L` is just the number of nodes at the last level, so `L = 2^h`. Therefore, by substitution, we get

``````N = 2*L - 1
``````

For a `k`-ary tree, nothing changes but the `2`. So

``````N = 1 + k + k^2 + k^3 + ... + k^h = (k^{h+1} - 1) / (k - 1)

L = k^h
``````

and so a bit of algebra can take you the final step to get

``````N = (k*L - 1) / (k-1)
``````
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great answer, thanks! –  Andrew Oct 21 '11 at 0:31