Answer to Question #306175 in Algebra for suve

Question #306175

Prove or disprove that there exists exactly two regular graphs


1
Expert's answer
2022-03-07T17:20:03-0500

For a graph to be 2-regular, it has to have at least 3 vertices. Considering that, if we take 3 vertices from the 5 vertices available and make them 2-regular, we are left with two other vertices that cannot be 2-regular by themselves:



Similarly, if we take 4 vertices and make them 2-regular, we are left with 1 vertex that cannot be 2-regular by itself:




Hence the only way of getting a 2-regular graph on 5 vertices is to join all 5 of them in a cycle.



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