   Chapter 10.3, Problem 20ES ### Discrete Mathematics With Applicat...

5th Edition
EPP + 1 other
ISBN: 9781337694193

#### Solutions

Chapter
Section ### Discrete Mathematics With Applicat...

5th Edition
EPP + 1 other
ISBN: 9781337694193
Textbook Problem
1 views

# Draw four nonisomorphic graphs with six vertices, two of degree 4 and four of degree 3.

To determine

Draw four nonisomorphic graphs with six vertices, two of degree 4 and four of degree 3.

Explanation

Given information:

nonisomorphic graphs with six vertices, two of degree 4 and four of degree 3.

Calculation:

Two graphs are G and G’ (with vertices V ( G ) and V(G) respectively and edges E ( G ) and E(G) respectively) are isomorphic if there exists one-to-one correspondence such that

[u,v] is an edge in G[g(u),g(v)] is an edge of G.

We are interested in all nonisomorphic simple graphs with 6 vertices of which 2 vertices have degree 4 and 4 vertices have degree 3

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