[Graph Theory - Discrete Mathematics] How do you solve this? A connected simple graph

ddaeeric

ddaeeric

Answered question

2021-08-15

[Graph Theory - Discrete Mathematics] How do you solve this?
A connected simple graph G has 202 edges.
a) Determine the minimum and maximum number of vertices it can have. Explain your reasoning.
b) Can G be self-complementary? Why or why not?

Answer & Explanation

wheezym

wheezym

Skilled2021-08-16Added 103 answers

Step 1
Consider the provided question,
A connected simple graph G has 202 edges.
(a)
Let n denote the vertex of G.
We know that the minimum number of edges of a connected graph with n vertices are (n1).
and the maximum number of edges of a connected graph with n vertices are n(n1)2.
Step 2
Since, given a connected simple graph G has 202 edges.
So. n1=202
n=202+1=203
and, n(n1)2=202
n(n1)=404
n2n404=0
n=1±1+16162
n=12±7233
But, n0
So, n=12+7233=20.6
Since, 20.6=20
Therefore, the minimum number of vertices is 20.
and the maximum number of vertices is 203.
Step 3
(b)
For a self complementary graph, its half of the edges must be
4k or 4k+1(kN).
Now, 2022=101=4(25)+1 [that means k=25]
Therefore, G is self-complementary

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