EKC Yr 12 Eulerian Graphs Jeopardy Template

Key Concepts

Paths

Circuits

Euler circuits

Random

100

A walk is .........

A walk is a sequence of connect vertices.

100

An Eulerian trail is a ......... with no ......... edges that includes every ....... in a graph.

An Eulerian trail is a walk with no repeated edges that includes every edge in a graph.

100

A path that starts and ends at the same vertex.

Cycle

100

A graph with 8 vertices has an Euler Circuit. What can you say about the degree of each vertex.

Each vertex must have an even degree.

100

What is a Hamiltonian path

a walk with no repeated vertices that includes every vertex in a graph.

200

A trail is ............

A trail is a walk with no repeated edges.

200

An Eulerian graph will only exist if all the vertices are .......

Even

200

A path in a connected graph that passes that starts and ends at the same vertex, and passes through every edge of the graph one and only once.

Euler Circuit

200

A graph with 9 vertices has an Euler path but no Euler Circuit. The graph mus have

2 vertices of odd degree and 7 vertices of even degree.

200

What is a Hamiltonian cycle

a walk with no repeated vertices that includes every vertex in a graph and starts and finishes at the same vertex.

300

A closed trail is ........

A closed trail is a walk with no repeated edges that starts and finishes at the same vertex.

300

A semi Eulerian trail will only exist if ...............

exactly two vertices of odd degrees.

300

Will a complete graph of 3 vertices have an Euler Circuit? Yes or No.

Yes

300

A graph has an Euler path but no Euler circuit. There are 25 vertices in the graph. The graph must have...

2 vertices of odd degree and 23 vertices of even degrees.

300

An edge that connects a vertex with itself

loop

400

A path is .......

A path is a walk with no repeated edges and no repeated vertices.

400

To find the Eulerian trail, you must start at ..........

one of the two odd degree vertex and finish at the other odd degree vertex.

400

Will a complete graph with 4 vertices have an Euler Circuit? Yes or no?

400

For a graph to have an Euler Path it must have 4 odd vertices. True or False

False

400

Two or more edges connecting the two vertices

multiple-edges

500

A cycle is ...........

A cycle is a walk with no repeated edges and no repeated vertices that starts and finishes at the same vertex.

500

A path in a connected graph that passes through every edge of the graph once and only once.

Euler path

500

How do you know if a graph has an Euler Circuit?

If all vertices have even degrees.

500

The process of duplicating edges in a graph to make it have all but even vertices.

Eulerization

500

Number of edges meeting at the vertex

degree