Does anybody know how to **prove** that if two binary trees have the same inorder and preorder traversals, then they are identical? (perhaps by showing that you can't have two different binary trees with identical inorder and preorder traversals)

Alternatively, show a case that would disprove this, or show why can't it be done?

(I'll admit, this is purely academic but it's not homework or anything. My instincts tell me that it's true, but I don't think I ever did any proofs on graphs.)