The Königsberg Bridge Problem

1. The Königsberg Bridge Problem

3. Leonhard “my name rhymes with boiler” Euler (1707-1783)

6. “The problem, which I understand is quite well known, is stated as follows:  In the town of Könisberg in Prussia there is an island called Kneiphof, with two branches of the river Pregel flowing around it.  There are 7 bridges - a, b, c, d, e, f, and g - crossing the two branches.  The question is whether a person can plan a walk in such a way that he will cross each of these bridges once but not more than once.  I was told that while some denied the possibility of doing this and others were in doubt, no one maintained that it was actually possible.  On the basis of the above I formulated the following very general problem.....”

8. a b c d e g f

9. a b c d g f e

10. R A B L

11. R a b c A d B e g f L

12. R A B L

13. R a A

14. R A

15. R A B L

16. R R R A

17. R A B L

18. R R R A A A B B A A B L L L

19. R R R B A B B L L L

20. R R R B A B B L L L

21. R B A B B L L L

22. R B A B B L L L

23. R A B L L L

24. R A B L L L

25. R A B L

26. R A B L

27. The resulting figure is called a graph. The dots are its vertices and the lines are its edges. Leonard Euler was able to solve the Königsberg Bridge Problem by first modeling it with this graph.

28. R A B L

29. Can we trace all the edges in Euler’s graph without retracing any? If yes, how? If not, why not?