Prove the following theorem: In any connected undirected graph, there is a vertex whose removal leaves...

a. An edge in an undirected connected graph is a bridge if removing it disconnects the...

a. An edge in an undirected connected graph is a bridge if removing it disconnects the graph. Prove that every connected graph all of whose vertices have even degrees contains no bridges. b.Let r,s,u be binary relations in U. Verify the following property: if both relations r and s are transitive then the intersection of r and s is transitive too.

Let G be an undirected graph with n vertices and m edges. Use a contradiction argument...

Let G be an undirected graph with n vertices and m edges. Use a contradiction argument to prove that if m<n−1, then G is not connected

Let ? be a connected graph with at least one edge. (a) Prove that each vertex...

Let ? be a connected graph with at least one edge. (a) Prove that each vertex of ? is saturated by some maximum matching in ?. (b) Prove or disprove the following: Every edge of ? is in some maximum matching of ?.

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

Prove or disapprove each of the following: (a) Every disconnected graph has an isolated vertex. (b)...

Prove or disapprove each of the following: (a) Every disconnected graph has an isolated vertex. (b) A graph is connected if and only if some vertex is connected to all other vertices. (c) If G is a simple, connected, Eulerian graph, with edges e, f that are incident to a common vertex, then G has an Eulerian circuit in which e and f appear consequently.

Prove that if deg(v) ≤ 4 for all vertices in an (undirected) graph G = (V,...

Prove that if deg(v) ≤ 4 for all vertices in an (undirected) graph G = (V, E), then we can orient all edges in E such that the in-degree of every vertex is at most 2.

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.

Prove that your conjecture will hold for any connected graph. If a graph is connected graph,...

Prove that your conjecture will hold for any connected graph. If a graph is connected graph, then the number of vertices plus the number of regions minus two equals the number of edges

let G be a connected graph such that the graph formed by removing vertex x from...

let G be a connected graph such that the graph formed by removing vertex x from G is disconnected for all but exactly 2 vertices of G. Prove that G must be a path.

Graph Theory Let v be a vertex of a non trivial graph G. prove that if...

Graph Theory Let v be a vertex of a non trivial graph G. prove that if G is connected, then v has a neighbor in every component of G-v.