*Yuanxin (Amy) Yang Alcocer*Show bio

Amy has a master's degree in secondary education and has been teaching math for over 9 years. Amy has worked with students at all levels from those with special needs to those that are gifted.

Lesson Transcript

Instructor:
*Yuanxin (Amy) Yang Alcocer*
Show bio

Amy has a master's degree in secondary education and has been teaching math for over 9 years. Amy has worked with students at all levels from those with special needs to those that are gifted.

The mathematical models of Euler circuits and Euler paths can be used to solve real-world problems. Learn about Euler paths and Euler circuits, then practice using them to solve three real-world practical problems.
Updated: 10/29/2021

In this video lesson, we are going to see how Euler paths and circuits can be used to solve real-world problems. You will see how the mailman and the salesman make use of these paths and circuits. You will also be presented with a seemingly complex problem to see if such a feat is possible. Keep watching!

First, let's quickly review what we know of Euler paths and circuits. An **Euler path** is a path in a graph where each edge is crossed exactly once. An Euler path can have any starting point with a different end point. A graph with an Euler path can have either zero or two vertices that are odd. The rest must be even.

An **Euler circuit** is a circuit in a graph where each edge is crossed exactly once. The start and end points are the same. All vertices must be even for the graph to have an Euler circuit. Let's get on with the problems now.

Our first problem deals with delivering the mail. Imagine our postman with a stack of mail in his hand. He needs to deliver this mail to addresses on five different streets. He looks on the map, and he sees how the roads connect with each other. He draws a simplified version of the map. He marks each intersection with a number. Since he has a car, he would like to end at the same point where he began.

To make the best use of his time, he needs to walk each road just once. Can he do so and if so, how?

Looking at his graph, we see that yes, it is possible to walk each road just once. He can park his car at intersection one, walk to intersection two, then three, then four, then five, and then back to one. Doing this, he will have walked each road only once. Since he ended up where he began, he actually walked an Euler circuit.

Are there other ways he could have done an Euler circuit? Yes. There are actually ten different Euler circuits he could have taken. He could have started at point one, gone to point five, then four, three, two, and then back to one again. He can actually begin at any one of the points and go either way. We have five points and two ways to go from each point. This makes for a total of ten possible routes he could have taken; ten possible Euler circuits.

Now, let's look at the traveling salesman problem. His is similar to the postman's. Since our salesman travels, he doesn't mind ending up at a different point from where he began. But just like the postman, he wants to make best use of his time and travel each road just once. This salesman did what the postman did and drew a simplified version of the roads he wants to travel.

He also has five roads to reach. Can he go through all five roads just once? Yes, he can. If he begins at point three, he can then go to point two, one, five, four, and then one again. He will have visited all five roads just once. Since he ended up at a different spot from where he began, he has traveled an Euler path. Are there more Euler paths that our salesman could have taken? Yes, there are. Can you spot them?

This last example is a tricky one. This was actually a problem posed to the mathematician Leonhard Euler back in the 1700s. Recognize the name? Yes, this problem solved by the mathematician Leonhard Euler is where our study of graph theory began. Hence, we have the name Euler paths and Euler circuits named after this mathematician. Are you ready for this problem? Okay. Here it is.

Here we have a map of Konigsberg and its seven bridges back in the 1700s. The problem posed to Euler was that of being able to visit all the bridges but crossing each bridge only once. Yes, we are looking for an Euler path or an Euler circuit. How can we go about solving this problem? We can begin by making a simplified graph of our bridges. We will mark each land area as a point.

We have four main land areas, and so we end up with four points. We have drawn the bridges as lines connecting these points. Now, the question is can we pass all of these lines just once without skipping? Well, let's analyze our graph for just a minute. We see that each vertex of our graph is actually odd. The point to the very left has five lines coming out of it, while the rest have three. What do we know about the vertices of graphs with Euler paths and circuits in them? Recall that a graph with an Euler path can have at most two odd vertices, while a graph with an Euler circuit must have none. Since we have four odd vertices in our graph, this means that there is no solution to our problem, since the number of odd vertices exceeds the permissible for either graph.

Let's review what we've learned now. An **Euler path** is a path in a graph where each edge is crossed exactly once. An Euler path can have any starting point with a different end point. A graph with an Euler path can have either zero or two vertices that are odd. The rest must be even.

An **Euler circuit** is a circuit in a graph where each edge is crossed exactly once. The start and end points are the same. All the vertices must be even for the graph to have an Euler circuit.

Euler paths and Euler circuits are used in the real world by postmen and salesmen when they are planning the best routes to take. There can be multiple routes that they can take given a graph of the roads they need to pass by.

After this lesson, you should be able to:

- Describe the Euler path and Euler circuit
- Identify the required number of odd versus even vertices in each
- Explain real-world uses of Euler paths and circuits

To unlock this lesson you must be a Study.com Member.

Create your account

Mathematical Models of Euler's Circuits & Euler's Paths Quiz

Instructions: Choose an answer and click 'Next'. You will receive your score and answers at the end.

1/5 completed

Create Your Account To Take This Quiz

Try it now
Are you a student or a teacher?

Already a member? Log In

BackRelated Study Materials

Browse by subject