Euler's formula

The relationship between the faces, edges and vertices of the Platonic solids

Complete this investigation in pairs or small groups.

1. For each Platonic solid shown in the first column, write down the number of edges (\(e\)), the number of faces (\(f\)) and the number of vertices (\(v\)).

   	Number of faces (\(f\))	Number of edges (\(e\))	Number of vertices (\(v\))
   Hexahedron
   Octahedron
   Dodecahedron

2. Check your values with another group in the class. Make sure that you agree with each other’s answers.
3. Look at the numbers in each row. Can you deduce a relationship between the number of faces, edges and vertices?
4. Express this relationship mathematically using the symbols \(e\), \(f\) and \(v\).

5. Now use the Platonic solids in the table below to test your formula. Do the values satisfy the equation?

   	Number of faces (\(f\))	Number of edges (\(e\))	Number of vertices (\(v\))
   Tetrahedron
   Icosahedron

6. For each Platonic solid, what do you notice about the number of faces at each vertex?
7. For each vertex, what do you notice about the number of edges that meet at the vertex?
8. Look at each Platonic solid. What do you notice about the lengths of the edges?