Polyhedra, Geometric Solids, and Euler's Formula
One of the great things about my math class is that we use a lot of food in our math activities. Seriously, you should see the excitement on college students faces when they find out that they get to eat the math "tools" when they are done with the activity. It definitely gets everyone motivated to start the activity. If it works that well for a bunch of college students, just imagine how well it would work for elementary school students.
In our latest "eat your work" activity, we started out making gumdrop polyhedras. A polyhedron is a three dimensional figure with flat polygonal (at least three straight sides and angles) faces, straight edges, and verticies (point where two or more curves, lines, or edges meet.) Here is the activity sheet we were given in the first station, along with a bag of gumdrops and a box of toothpicks.
As you can see, the gumdrops are supposed to represent the verticies and the toothpicks are supposed to represent the edges. We had five people in our group so we each made one shape. Here is a picture of our completed polyhedras.
We were also provided these cards to fill out for each shape to record the information such as the number of verticies, faces, and edges.
And when we were all done, we got to toss the toothpicks and eat the gumdrops....yum!
At the next station, we were given nets (a two-dimensional figure that can be folded into a three-dimensional object) to cut which, when folded properly, formed polyhedras. You have to put some thought into the shapes on the paper because if you fold it the wrong way it won't form the shape you are intending to construct. It is a good way to tap into your students critical thinking abilities. Here are some pictures of our completed nets.
The next station played off of the puzzle shape station but included the use of technology. The station had ipads that were set to this activity on The National Council of Teachers of Mathematics website. Here you are given several different nets and you have to decide if each one will fold into a cube or not. After you pick yes or no for each shape, the interactive will show you if it will or if it won't. There is also a timer and a final score, so the more competitive students can race each other to see who gets the best score in the fastest time. Try it out for yourself, it's kind of addicting!
Another station built off of the first station where you look at a polyhedron and figure out the number of faces, verticies, and edges. On the table were physical examples of each (sorry, forgot to take a picture of that) and this activity sheet.
Included on this sheet was the section "Where in the World?" This is good for students because it connects the math they are doing to real life examples. Based off the activity sheet, can you find the relationship between the number of verticies, faces, and edges? Yes? Well good for you! No? Well don't feel bad. Only one person in my class did. The relationship is something referred to as Euler's Formula. It states that Verticies - Edges + Faces = 2. If you look at my sheet, this holds true for all (except the sphere.) My math teacher taught it to us this way... V + F - E = 2. It works out the same way mathematically and I kind of like that way better because you tend to not end up with a negative number in the beginning. The classmate that figured it out came up with V + F - 2 = E, which also works out the same way.
So there you have it - four activities you can have your students do to help learn about polyhedras and Euler's Formula. We were able to complete all stations in one day, but our class is an hour and forty minutes long so you would probably have to split this up into several days. Have fun with it and happy teaching! 😊