We have a Directed Graph with 100 vertexes. v1 --> v2 --> ... v100 and all edges weights is equal to 1. we want to used bellman-ford for finding all shortest paths from v1 to other vertexes. this algorithm in each step check all edges in arbitrary order. if in each step the shortest distance v1 to all others vertexes is not changed, this algorithm halt. the number of steps is related to checking order of edges. what is the minimum and maximum of steps in this problem?
ُSolution says 2 and 100.
anyone can say how the min and max steps is calculated?