# Every graph node is connected with every other node. There are N * (N - 1)/2 edges [closed]

In a graph, every node is connected with every other node, with no redudant connections.

That is, if A->B then B doesn't need to go to A. It is still one connection.

I know that there are N * (N - 1)/2 Edges.

In a loop, it would look like,

``````for(int i = 0; i < n - 1; i++)
for(int j = i + 1; j < n; j++)
``````

I can't remember the formal definition for this. What is it called?

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## closed as too localized by Gilles, Lucifer, Adam Wagner, Eitan T, skolimaSep 24 '12 at 12:41

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Thank you for self-tagging this as homework. –  Erik Forbes Feb 10 '09 at 0:39
Yes, thank you for tagging this as a depricated tag three years before it would be depricated. You've created an incremental amount of work for the userbase. –  Erick Robertson Sep 28 '12 at 12:14

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Thanks stbuton, I appreciate it. –  Simucal Feb 10 '09 at 0:44

You mean Complete?

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Strongly connected graph I think?

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A complete graph is strongly connected, but a strongly connected graph isn't necessarily complete. Strongly connected just means there's a path from each node to every other node, not necessarily a direct connection. –  Rob Kennedy Feb 10 '09 at 1:08