In a directed acyclic graph with n vertices, what is the maximum possible number of directed edges in it?

Assume N vertices/nodes, and let's explore building up a DAG with maximum edges. Consider any given node, say N1. The maximum # of nodes it can point to, or edges, at this early stage is N1. Let's choose a second node N2: it can point to all nodes except itself and N1  that's N2 additional edges. Continue for remaining nodes, each can point to one less edge than the node before. The last node can point to 0 other nodes. Sum of all edges: (N1) + (N2) + .. + 1 + 0 == (N1)(N)/2 

