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

Prove that a bipartite simple graph with n vertices must have at most n2/4 edges. (Here’s...

Prove that a bipartite simple graph with n vertices must have at most n2/4 edges. (Here’s a hint. A bipartite graph would have to be contained in Kx,n−x, for some x.)

Prove that a simple graph with p vertices and q edges is complete (has all possible...

Prove that a simple graph with p vertices and q edges is complete (has all possible edges) if and only if q=p(p-1)/2. please prove it step by step. thanks

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?

Graph Theory . While it has been proved that any tree with n vertices must have...

Graph Theory . While it has been proved that any tree with n vertices must have n − 1 edges. Here, you will prove the converse of this statement. Prove that if G = (V, E) is a connected graph such that |E| = |V | − 1, then G is a tree.

How many vertices and edges does the complete tripartite graph K_m,n,p have? Prove your conjecture.

How many vertices and edges does the complete tripartite graph K_m,n,p have? Prove your conjecture.

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

Problem B: Consider a graph G with 20 vertices, that has an Euler cycle. Prove that the complement graph (G¯) does not have an Euler cycle.

In lecture, we proved that any tree with n vertices must have n − 1 edges....

In lecture, we proved that any tree with n vertices must have n − 1 edges. Here, you will prove the converse of this statement. Prove that if G = (V, E) is a connected graph such that |E| = |V| − 1, then G is a tree.

Let G be a connected simple graph with n vertices and m edges. Prove that G...

Let G be a connected simple graph with n vertices and m edges. Prove that G contains at least m−n+ 1 different subgraphs which are polygons (=circuits). Note: Different polygons can have edges in common. For instance, a square with a diagonal edge has three different polygons (the square and two different triangles) even though every pair of polygons have at least one edge in common.

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.

Graph Theory. A simple graph G with 7 vertices and 10 edges has the following properties:...

Graph Theory. A simple graph G with 7 vertices and 10 edges has the following properties: G has six vertices of degree a and one vertex of degree b. Find a and b, and draw the graph. Show all work.