Problem B: Consider a graph G with 20 vertices, that has an Euler cycle. Prove that...

State the sufficient and necessary condition for an undirected graph to have an Euler cycle. Prove...

State the sufficient and necessary condition for an undirected graph to have an Euler cycle. Prove that if an undirected graph has an Euler cycle then all vertex degrees are even. Show all steps and draw a diagram it will help me understand the problem. Thanks

Draw an Euler graph on an even number of vertices, that does not have perfect matching....

Draw an Euler graph on an even number of vertices, that does not have perfect matching. Prove it.

Prove that if a graph has 1000 vertices and 4000 edges then it must have a...

Prove that if a graph has 1000 vertices and 4000 edges then it must have a cycle of length at most 20.

I.15: If G is a simple graph with at least two vertices, prove that G has...

I.15: If G is a simple graph with at least two vertices, prove that G has two vertices of the same degree.    Hint: Let G have n vertices. What are possible different degree values? Different values if G is connected?

Draw an undirected graph with 6 vertices that has an Eulerian Cycle and a Hamiltonian Cycle.  The...

Draw an undirected graph with 6 vertices that has an Eulerian Cycle and a Hamiltonian Cycle.  The degree of each vertex must be greater than 2.  List the degrees of the vertices, draw the Hamiltonian Cycle on the graph and give the vertex list of the Eulerian Cycle. Draw a Bipartite Graph with 10 vertices that has an Eulerian Path and a Hamiltonian Cycle.  The degree of each vertex must be greater than 2.  List the degrees of the vertices, draw the Hamiltonian Cycle...

Let G be a graph on 10 vertices that has no triangles. Show that Gc (G...

Let G be a graph on 10 vertices that has no triangles. Show that Gc (G complement) must have K4 subgraph

Let G be a graph in which there is a cycle C odd length that has...

Let G be a graph in which there is a cycle C odd length that has vertices on all of the other odd cycles. Prove that the chromatic number of G is less than or equal to 5.

6. If a graph G has n vertices, all of which but one have odd degree,...

6. If a graph G has n vertices, all of which but one have odd degree, how many vertices of odd degree are there in G, the complement of G? 7. Showthatacompletegraphwithmedgeshas(1+8m)/2vertices.

Let G be a simple graph with at least two vertices. Prove that there are two...

Let G be a simple graph with at least two vertices. Prove that there are two distinct vertices x, y of G such that deg(x)= deg(y).

Suppose that a connected graph without loops or parallel edges has 11 vertices, each of degree...

Suppose that a connected graph without loops or parallel edges has 11 vertices, each of degree 6. a. Must the graph have an Euler Circuit? Explain b. Must the graph have a Hamilton Circuit? Explain c. If the graph does have an Euler Circuit, how many edges does the circuit contain? d. If the graph does have a Hamilton Circuit, what is its length?