# how to find the height of a node in binary tree recursively

``````path = 0 # the lenght of the path
while self.right != None or self.left != None:
while self.right != None:
self = self.right
path = path +1
while self.left != None:
self = self.left
path = path +1
return path
``````

this is my sample code for find the Height, is defined as the length of the longest path by number of nodes from self to a leaf. The height of a leaf node is 1.

it doesn't work.

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Do you have a question? –  georg Nov 10 '12 at 13:53
@thg435 The question, even if implicit, is rather obvious, don't you think? –  Bolo Nov 10 '12 at 13:54
@Bolo: this implicit question being "gimme teh codez", right? –  georg Nov 10 '12 at 13:56
Actually, I just need an algorithm. Because, my code doesn't work. And if you know the solution, maybe pseudo code :P –  TGulmammadov Nov 10 '12 at 13:58
@thg435 My guess is: "why doesn't it work?" The poster seems to be struggling with English, so I would give him a break here. That being said, I wouldn't give the code (since it looks like a homework to me), but explain some of the more blatant mistakes that he made. –  Bolo Nov 10 '12 at 13:59

What you're doing isn't recursive, it's iterative. Recursive would be something like:

``````def height(node):
if node is None:
return 0
else:
return max(height(node.left), height(node.right)) + 1
``````
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You were given the solution by mata, but I suggest you also look at your code and understand what it is doing:

``````    while self.right != None:
self = self.right
path = path +1
``````

What will this do? it will find the right child, then its right child, and so on. So this checks only one path of the "rightmost" leaf.

This does the same for the left:

``````   while self.left != None:
self = self.left
path = path +1
``````

The idea in recursion is that for each subproblem, you solve it using the exact same recipe for all other subproblems. So if you would apply your algorithm only to a subtree or a leaf, it would still work.

Also, a recursive definition calls itself (although you can implement this with a loop, but that is beyond the scope here).

Remeber the definition:

Recursion: see definition of Recursion.

;)

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