Prove that every graph has two vertices with the same degree. (hint: what are the possible...

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?

(a) Prove that there does not exist a graph with 5 vertices with degree equal to...

(a) Prove that there does not exist a graph with 5 vertices with degree equal to 4,4,4,4,2. (b) Prove that there exists a graph with 2n vertices with degrees 1,1,2,2,3,3,..., n-1,n-1,n,n.

Let G be a simple graph in which all vertices have degree four. Prove that it...

Let G be a simple graph in which all vertices have degree four. Prove that it is possible to color the edges of G orange or blue so that each vertex is adjacent to two orange edges and two blue edges. Hint: The graph G has a closed Eulerian walk. Walk along it and color the edges alternately orange and blue.

a graph is regular of degree k if every vertex has the same degree, k. show...

a graph is regular of degree k if every vertex has the same degree, k. show that G has a hamiltonian circuit if G has 13 vertices and is regular of degree 6.

please solve it step by step. thanks Prove that every connected graph with n vertices has...

please solve it step by step. thanks Prove that every connected graph with n vertices has at least n-1 edges. (HINT: use induction on the number of vertices n)

Prove that if G is a connected graph with exactly 4 vertices of odd degree, there...

Prove that if G is a connected graph with exactly 4 vertices of odd degree, there exist two trails in G such that each edge is in exactly one trail. Find a graph with 4 vertices of odd degree that’s not connected for which this isn’t true.

Use proof by induction to prove that every connected planar graph with less than 12 vertices...

Use proof by induction to prove that every connected planar graph with less than 12 vertices has a vertex of degree at most 4.

Suppose we are going to color the vertices of a connected planar simple graph such that...

Suppose we are going to color the vertices of a connected planar simple graph such that no two adjacent vertices are with the same color. (a) Prove that if G is a connected planar simple graph, then G has a vertex of degree at most five. (b) Prove that every connected planar simple graph can be colored using six or fewer colors.

a. A graph is called k-regular if every vertex has degree k. Explain why any k-regular...

a. A graph is called k-regular if every vertex has degree k. Explain why any k-regular graph with 11 vertices must conain an Euler circuit. (Hint – think of the possible values of k). b. If G is a 6-regular graph, what is the chromatic number of G? Must it be 6? Explain

Graph Theory Prove that if G is a graph with x(G-v-w)=x(G)-2 for every pair of vertices...

Graph Theory Prove that if G is a graph with x(G-v-w)=x(G)-2 for every pair of vertices v and w in G, then G is complete. Hint: assume G is not complete.