Assume G is a simple undirected graph and some vertices of G are of odd degree. Add a node \( v \) to G and make it adjacent to each odd degree vertex of G, then the resultant graph is sure to be _______.
Show Hint
- Euler
- Complete
- Hamiltonian
- Clique
The Correct Option is A
Solution and Explanation
By adding a node \( v \) and connecting it to all vertices with an odd degree, we are ensuring that all vertices in the resultant graph have an even degree.
A graph in which all vertices have even degrees is Eulerian, meaning it has an Eulerian circuit (a closed path that uses each edge exactly once).
Thus, the resultant graph is Eulerian. Hence, the correct answer is option (1).
Top Questions on Graph Theory
Suppose a minimum spanning tree is to be generated for a graph whose edge weights are given below. Identify the graph which represents a valid minimum spanning tree?
\[\begin{array}{|c|c|}\hline \text{Edges through Vertex points} & \text{Weight of the corresponding Edge} \\ \hline (1,2) & 11 \\ \hline (3,6) & 14 \\ \hline (4,6) & 21 \\ \hline (2,6) & 24 \\ \hline (1,4) & 31 \\ \hline (3,5) & 36 \\ \hline \end{array}\]
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Match LIST-I with LIST-II
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