You are given an acyclic directed graph, consisting of $$$n$$$ vertices and $$$m$$$ edges. The graph contains no multiple edges and no self-loops.

The vertex is called a source if it has no incoming edges. The vertex is called a sink if it has no outgoing edges. These definitions imply that some vertices can be both source and sink.

The number of sources in the given graph is equal to the number of sinks in it, and each of these numbers doesn't exceed $$$20$$$.

The following algorithm is applied to the graph:

1. if the graph has no sources and sinks then quit;
2. choose arbitrary source $$$s$$$, arbitrary sink $$$t$$$, add an edge from $$$t$$$ to $$$s$$$ to the graph and go to step $$$1$$$ (that operation pops $$$s$$$ out of sources and $$$t$$$ out of sinks). Note that $$$s$$$ and $$$t$$$ may be the same vertex, then a self-loop is added.

At the end you check if the graph becomes strongly connected (that is, any vertex is reachable from any other vertex).

Your task is to check that the graph becomes strongly connected no matter the choice of sources and sinks on the second step of the algorithm.