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Here's the binary tree in question. The leaves are a, b, c, d and the edges are labelled 0 or 1.

   / \
  a   .
     / \
    b   .
       / \
      c   d

It seems to me that it is a full binary tree, as every node is either a leaf or has two child nodes, however I have this feeling that we were told it is not a full binary tree. If not, why is it not?

If a node has a child that is a leaf, does that not count as a child node?

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This page will solve all your doubts. – user1386773 May 10 '12 at 9:57
up vote 5 down vote accepted

You are confusing a perfect binary tree with a full binary tree. A perfect binary tree is a full binary tree with all leaf nodes at the same level. So yes, the picture is a full binary tree.

A leaf is defined as a node without a child node.
Thus, a full binary tree is a binary tree in which each node has either zero or two children.

Wikipedia helps very well with definitions. Make sure you check it out.

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I was going to say that it is not balanced. But thanks for a new definition. You learn something everyday. – uriDium May 25 '09 at 16:01
Balanced is another story. It means depth difference between right and left child of each node is at most one. – Mehrdad Afshari May 25 '09 at 16:03
Shouldn't that be "So yes, the picture is a perfect binary tree"? – sharkin May 25 '09 at 16:04
No. The picture doesn't satisfy the condition I said. A perfect binary tree of depth N will have (2^N - 1) nodes. – Mehrdad Afshari May 25 '09 at 16:10

Yes, a tree with each node has zero or two children, it is binary tree.

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