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Given n nodes, if every node is connected to every other node (except itself) the number of connections will be n*(n-1)/2

How does one prove this ?

This is not a homework question. I have been away from CS text books for long and have forgotten the theory on how to prove this.

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This question appears to be off-topic because it is about mathematics. – Emrakul Nov 4 '14 at 10:30
up vote 6 down vote accepted

And one more solution, combinatorial: The problem is equivalent to the number of possible pairs of nodes in the graph, i.e.:

enter image description here

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+1, this is my favorite proof out of the alternatives. I like the combinatorial approach. – amit Dec 5 '12 at 22:56

you have n - nodes, each have n -1 conections( he is connected to every node except itself), so is n*(n-1), because of connection (x,y) and (y,x) is the same, so n*(n-1)/2.

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Great explanation. Many thanks! – user405398 Feb 23 '15 at 5:43

Sorry for the bad nomenclature, I'm a physicists, not a CS/Math guy.

Every single node (of which there are n) has to be connected to every one else. There are (n-1) "every one else".

So each n nodes have n-1 connections coming out of them. n(n-1)

But since each connection is "bidirectional" (a to b = b to a), you end up with a factor of 1/2

so n*(n-1)/2

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Proof by induction. Base case - for 2 nodes there is 1 connection and 2 * 1 / 2 == 1. Now assuming that for N nodes we have N * (N-1) / 2 connections. Adding one more node has to establish N additional connections, and:

N * (N-1) / 2 + N =
(N^2 - N + 2N) / 2 =
(N^2 + N) / 2 =
(N + 1) * N / 2

This last line is exactly N * (N - 1) / 2 with N replaced with N+1, so the proof is good.

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The degree of each vertex is n-1 (because it has n-1 neighbors).
Handshaking lemma, says: Sigma(deg(v)) (for each node) = 2|E|. Thus:

Sigma(deg(v)) (for each node) = 2|E|
Sigma(n-1) (for each node) = 2|E|
(n-1)*n = 2|E|
|E| = (n-1)*n /2 

QED

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for 1 node: n connection

for 2 node: n-1 connections(already first node connected )

for 3 node: n-2 connections .. for n node: n-(n-1) connections

Therefore total connections = n + n-1 + n-2 + ........1

                        = n(n-1)/2 (sum of first n natural numbers)
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