Why there are exactly n1 possible rotations on a binary search tree?

In the binary tree there are n nodes. We know that the order of the nodes cannot be changed. Each of the nodes are labelled with a number {1...n}. Lets assume n=4 and the label current root of the tree is 1. how many other possible roots can you have? The only alternatives are 2,3,4 Therefore on the tree, there are only N1 more roots the tree can have and only N1 unique rotations. May not be a theoretical explanation but I hope this helps you visualize it. 

