Graph-Theory

Question 7

Graph G is obtained by adding vertex s to K_3,4 and making s adjacent to every vertex of K_3,4. The minimum number of colours required to edge-colour G is _____.

A

7

Engineering-MathematicsGraph-TheoryGATE 2020Video-Explanation

Question 7 Explanation:

In k_3×4 there are two sets with sizes 3,4. (it is a complete bipartite graph).
The vertex in the set of size 3 has 4 edges connected to 4 vertices on other set. So, edge color of G is max(3,4) i.e. 4.

When a vertex is added to the graph with 7 vertices ( K_3×4 has 7 vertices), there would be 7 edges associated to that new vertex. As per the edge coloring “no two adjacent edges have same color).

As the new vertex with 7 edges need to be colored with 7 colors, the edge color of graph G is 7.

Correct Answer: A

Question 7 Explanation:

In k_3×4 there are two sets with sizes 3,4. (it is a complete bipartite graph).
The vertex in the set of size 3 has 4 edges connected to 4 vertices on other set. So, edge color of G is max(3,4) i.e. 4.

When a vertex is added to the graph with 7 vertices ( K_3×4 has 7 vertices), there would be 7 edges associated to that new vertex. As per the edge coloring “no two adjacent edges have same color).

As the new vertex with 7 edges need to be colored with 7 colors, the edge color of graph G is 7.

NTA UGC NET Aug 2024 Paper-2

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