Network Traversal and Odd Vertices

They are drawn in the same color.

They have different numbers of edges.

They have different numbers of vertices.

They have the same number of vertices and edges.

It has too many colors.

It has vertices with odd degrees.

It has overlapping edges.

It is drawn on a large paper.

The color of the vertex.

The number of edges connected to a vertex.

The size of the vertex.

The angle between edges.

They have vertices with even degrees.

They have fewer than three vertices.

They are drawn in a circular shape.

They have more than two vertices with odd degrees.

Four

Two

Three

One

It allows for a complete traversal without repeating edges.

It ensures the network is not traversable.

It allows for multiple starting points.

It makes the network symmetrical.

You will always end at a vertex with an even degree.

You may run out of edges to traverse.

You will end up at the same vertex.

You can complete the traversal without issues.

Add more vertices.

Add extra edges.

Remove some vertices.

Change the color of the edges.

You will have to repeat edges.

You may not be able to complete the traversal.

You will always end at a vertex with an odd degree.

You will end up at the starting vertex.

More than two odd vertices prevent complete traversal without repetition.

Odd vertices make networks more colorful.

Odd vertices are always at the center of the network.

Odd vertices are irrelevant to network functionality.