Consider a bipartite graph with two groups of labeled vertices A and B, where |A| = m and |B| = n (labeled vertices mean

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Consider a bipartite graph with two groups of labeled vertices A
and B, where |A| = m and |B| = n (labeled vertices means that we
label A’s vertices with 1, 2, ..., m and label B’s vertices with 1,
2, ..., n). If the graph does not need to be connected, how many
possible graphs could be drawn on this vertex set? Describe how you
know your answer is correct. This is discrete mathematics.