write a go solution for Description:
You have given tree consist of n vertices. Select a vertex as root vertex that satisfies the condition below.

- For all vertices v_1 and v_2, if distance(root, v_1) =distance(root, v_2) then degree(v_1) =degree(v_2), where degree means the number of vertices connected to that vertex, and distance means the number of edges between two vertices.

Determine and find if there is such root vertex in the tree. If there are multiple answers, find any of them.

Input Format:
The first line contains a single integer n (1<=n<=10^5) — the number of vertices.

Each of the next n-1 lines contains two integers v_i and u_i (1<=v_iltu_i<=n) — it means there is an edge exist between v_i and u_i. It is guaranteed that the graph forms tree.

Output Format:
If there is such root vertex exists, print any of them. Otherwise, print -1.

Note:
This is the picture for the first example. 1, 5, 7 also can be a valid answer.

This is the picture for the second example. You can see that it's impossible to find such root vertex.. Output only the code with no comments, explanation, or additional text.