I came across this problem:
The problem basically is about graphs. You are given a graph with up to 70 nodes, and an adjacency matrix which tells how many edges exist between two nodes. Each edge is bidirectional.
Now the question asks you to find out the number of distinct paths OF A FIXED LENGTH N between any two nodes N1 and N2. The path can have repetitions. I.e., the path can go through an already included node.
The naivest algo is to run a breadth first search and check how many N2 appear in the Nth layer with the BFS tree rooted at N1. But this wont work.
How to go about it?