# Balanced Binary Trees Depth

When given a number of nodes we are able to calculate the min depth of the binary tree by doing log2(n)

Where n is the number of nodes.

If you draw the tree out for the maximum depth for example 12 nodes you work out that the maximum depth can only be 4 if the tree is to remained balanced.

``````                0
/   \
0     0
/  \   / \
0    0 0   0
/\     \     \
0   0      0    0
``````

Sorry for the bad ascii art. Does anyone know of a forumla that is able to calculate the max depth of a binary tree when given the number of nodes? Or at least point me in the right direction?

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By using the root element :

``````int maxHeight(BinaryTree *p) {
if (!p) return 0;
int left_height = maxHeight(p->left);
int right_height = maxHeight(p->right);
return (left_height > right_height) ? left_height + 1 : right_height + 1;
}
``````

By using the number of nodes and some math logic (which I definitely cannot express properly (I'm by no means a math guru); but here it is) :

Observation :

• 2-3 nodes => maxDepth = 1 (2 = 2^1, 3 = 2^1,.. < 2^2 )
• 4-7 nodes => maxDepth = 2 (4 = 2^2, 5 = 2^2,.., 6 = 2^2,.., 7 = 2^2,... < 2^3)
• 8-15 nodes => maxDepth = 3
• ...

Analysis :

• m => max Depth (actual the INT part of the depth, discard any decimal places)
• n => number of nodes

• ln => natural logarithm (=log[e])

• 2^m = n

• ln(2^m) = ln(n)

• m*ln(2) = ln(n)
• m = ln(n)/ln(2)

Conclusion :

Now, if m = 2,... , then the maximum depth is 2. Just get the int part of it. ;-)

NOTE: I'm definitely re-inventing the wheel here; but that's probably part of the fun of dealing with something you know nothing about; and doing it, solely following your instinct and observations... :-)

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The simplest answer looks like this:

``````int getMaxDepth(Node node)
{
if(node == null) {
return 0;
}

int leftDepth = 1 + getMaxDepth(node.left);
int rightDepth = 1 + getMaxDepth(node.right);

return left > right ? left : right;
}
``````

The concept explained

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Let no of nodes given(n)=15 Formula is- log2n (log n base 2) now take a max value which must be less than 15 and must be a power result of 2. As here 15 is given the no will be 8. Now, n=8 log2(8)= 3 ,which is our required answer

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