# Median nodes in a binary tree

I had an exam with the following question I couldn't answer: We have a binary tree where each node has a certain height(from bottom) and a certain depth(from root). We start counting both from zero; for example: For a tree with a root with a single child, the depth of the child would be 1 and the height would be 0.

Find an recursive algorithm which prints all of the median nodes, that is, when a node's height is equal to its depth.

A hint was given which was: Give d(depth) as an argument for the function and the height as a return value...

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Python implementation where node is an object with attribute `children`.

``````def R(node, d):
if not node.children: # No children, leaf node
height = 0
else:
height = max( R(child, d+1) for child in node.children ) + 1
if height == d:
print node  # Or some node.id
return height

R(root, 0)  # Call with a root node
``````
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void medianInTree(class tree* root, int depth, int height) {

``````if(root)
{
if(height == depth)
cout<<"   "<<root->data;
medianInTree(root->left, depth-1, height+1);
medianInTree(root->right, depth-1, height+1);
}
``````

}

Pass depth as height of tree(considering height of root=1).

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