# Mathematical proof for a binary tree

I am not hiding this is a part of my homework but I've tried enough before posting here.

So...
I need to prove for a binary tree that a node k have its left child on 2k and right child on 2k + 1 position. I've proved this with induction.

Now I need to prove for a binary tree that a node k have its parent on `(floor)(k/2)` position. I took two cases.
Tried it with induction as well. It's true for a tree of 3 nodes.
If it's true for node k I'll prove for node k + 1.

1. If node k+1 shares parent with node k it's obviously true.
2. If node k+1 has difference parent with node k....

I am trying to make a general binary tree but the types won't help me to use induction assumption. I assume maybe I'll have to use what I proved before for child's position.

Any help?

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Can't you just apply the first part of the question? –  Ziyao Wei May 14 '13 at 1:09
How? I don't think it's right blackmail the result by using the first part of the question for any k node because it will be obviously true. –  user2147971 May 14 '13 at 1:12