# Calculating the number of nodes in a tree when each level has diffrent number of nodes

Let's say have we this kind of tree: http://up400.siz.co.il/up1/tymmh2wylmmo.png

When the height of the tree is some H, and each level in the tree can have different number of nodes. For example, the root level has 3 nodes ("x" in the picture), the next level each node has 2 nodes("y" in the picture), the next level each node has 4 nodes ("z" in the picture), and so on...

Is there any formula for calculating these kind of trees, when the H is given, and the number of nodes (for each node) is given?

Thanks!

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The recursive formula is obvious:

``````def node_count(level):
n = number_of_children_for_level(level)
if n == 0:
return 1
else:
return 1 + n * node_count(level + 1)
``````

supposing that the number of children for level are `3, 4, 2, 0` the total number of nodes will be

``````1 + 3 * (1 + 4 * (1 + 2 * 1))
``````
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If the tree is complete, then...

• The subtree below each leaf has 1 node.
• The subtree below each second-level node has 1 * 4 + 1 = 5 nodes.
• The subtree below each third-level node has 5 * 2 + 1 = 11 nodes.
• The complete tree has 11 * 3 + 1 = 34 nodes.

So the general formula would be ((((m + 1) * n + 1) ... * p + 1) * q + 1), where m...q are the number of nodes on each level. Or you could say recursively that `size_n = size_{n - 1} * branchiness_n + 1`.

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