2. Decision Maths Graphs

3. Wiltshire Graphs A graph is just a diagram made up of “dots” and “lines”. These are all graphs. The dots are called “nodes” or “vertices” (singular is vertex) The lines are called “edges” or “arcs”

4. Wiltshire Definitions 1 An edge with the same vertex at each end is called a loop. The degree or order of a vertex is the number of edges incident on it. Question – For any graph the total of the orders of its verticies is even, why? A simple graph is one in which there are no loops, and in which there is no more than one edge connecting any pair of vertices.

5. Wiltshire Definitions 3 A walk is a sequence of edges in which the end of one edge (except the last) is the beginning of the next. A trail is a walk in which no edge is repeated.

6. Wiltshire Definitions 4 A path is a trail in which no vertex is repeated. A graph is connected if there exists a path between every pair of vertices.

7. Wiltshire Definitions 5 A cycle is a closed path if the end of the last edge is the start of the first. A Hamiltonian cycle is a cycle which visits every vertex once and only once.

8. Wiltshire Definitions 6 A tree is a simple connected graph with no cycles. A tree Not trees

9. Wiltshire Definitions 7 A Digraph (Directed Graph) is a graph in which at least one edge has a direction associated with it. A complete graph is a simple graph in which every pair of vertices is connected by an edge.

10. Wiltshire Definitions 8 An incidence matrix is a way of representing the number of edges between nodes in a matrix. The graph below is represented by the matrix next to it.

11. Wiltshire Definitions 9 Two graphs are Isomorphic if one can be stretched, twisted or otherwise distorted into the other. Which two graphs below are Isomorphic? If two graphs are isomorphic then the labels on them must correspond to each other.

12. Wiltshire Definitions 10 A planar graph is one which can be drawn without any edges crossing. Which graph(s) below is Planar? Draw two examples of Planar graphs.

13. Wiltshire Definitions 11 A bipartite graph is one in which the vertices fall into two sets and in which each edge has a vertex from one set at one end and from the other set at its other end.

14. Wiltshire Question 1 X = { 2,3,4,5,6} Draw a graph to represent the relationship ‘share a common factor other than 1’

15. Wiltshire Question 2 X = { London, Oxford, Birmingham, Cambridge, Leicester} Let X x X be the set of all possible pairs from the set X. (there exists a road between the two towns) X x X = { (London, Oxford)(London, Birmingham) (London, Cambridge)(London, Leicester) (Oxford, London)(Oxford, Birmingham) (Birmingham, London)(Birmingham, Oxford) (Birmingham, Leicester)(Cambridge, London) (Leicester, London)(Leicester, Birmingham) } Draw a graph to show the set X x X.

16. Wiltshire Question 2

17. Wiltshire Question 3 – Ex 2A q13 pg 54 Each node represents a section of land. And each arc is the route over the bridges.

18. Wiltshire Eulerian A graph is called Eulerian or traversable if each can be traced once and only once, without lifting pencil from paper. A graph is traversable if it has no odd vertices or just two odd vertices. Prove that the graph below is traversable.