# Maximum number of edges in unconnected graph [closed]

In an undirected graph with `n` vertices and no edges, what is the maximum number of edges that can be added so that the graph remains unconnected? This is an interview question.

1. NC2
2. (N-1)C2
3. N!
4. (N-1)!
-
This question appears to be off-topic because it is about an interview question that does not relate to programming. –  BoltClock Aug 5 '13 at 18:49

## closed as off-topic by BoltClock♦Aug 5 '13 at 18:49

• This question does not appear to be about programming within the scope defined in the help center.
If this question can be reworded to fit the rules in the help center, please edit the question.

The maximum number of edges in a graph with N vertices is NC2 (link).

Note that, to remain unconnected, one of the vertices should not have any edges. More formally, there has to be a cut (across which there won't be any edges) with one side having only one vertex. Why not more than one vertex? Proof by induction:

The cases for 0, 1 and 2 vertices are trivial.

Consider a graph with 3 vertices. The best cut will be one with 2 vertices on one side and 1 vertex on the other side.

Now assume the best cut is one with N-1 vertices on one side and 1 vertex on the other with N >= 3. Now try to add a vertex. Adding the vertex to the side with one vertex will result in one edge that can be added. Adding the vertex to the other side will result in N-1 possible edges. Clearly N-1 > 1 for N >= 3. Thus it's always better to add the vertex to the side with N-1 vertices.

Now there are two ways to go from here:

1. Consider the graph without one of the edges. The maximum number of edges of this sub-graph is `(N-1)C2`.

2. Consider the maximum number of edges of the graph as is and subtract the number of edges from one vertex. This gives `NC2 - (N-1)` = `N(N-1)/2 - 2(N-1)/2` = `(N-2)(N-1)/2` = `(N-1)C2`.

So the answer is `(N-1)C2`, i.e. option 2.

-