Lesson 13Polyhedra

Let’s investigate polyhedra.

Learning Targets:

  • I can describe the features of a polyhedron using mathematical vocabulary.
  • I can explain the difference between prisms and pyramids.
  • I understand the relationship between a polyhedron and its net.

13.1 What are Polyhedra?

Here are pictures that represent polyhedra:

Different shaped 3D figures are shown.

Here are pictures that do not represent polyhedra:

a sphere, a cylinder, a strip with 3 twists joined end-to-end, and an open-top box.
  1. Your teacher will give you some figures or objects. Sort them into polyhedra and non-polyhedra.

  2. What features helped you distinguish the polyhedra from the other figures?

13.2 Prisms and Pyramids

  1. Here are some polyhedra called prisms.
    Six prisms, labeled A, B, C, D, E, and F.

    Here are some polyhedra called pyramids.

    Four polyhedral labeled P, Q, R, and S. Each figure has a base and a number of sides which share a single vertex.
    1. Look at the prisms. What are their characteristics or features? 
    2. Look at the pyramids. What are their characteristics or features?
  2. Which of the following nets can be folded into Pyramid P? Select all that apply.
    Three figures labeled net1, net 2, and net 3. Net 1 has four small triangles arranged horizontally to create a parallelogram, net two has four small triangles arranged to make a larger triangle, and net 3 has two four small triangles which all meet at their vertices.
  3. Your teacher will give your group a set of polygons and assign a polyhedron.

    1. Decide which polygons are needed to compose your assigned polyhedron. List the polygons and how many of each are needed.
    2. Arrange the cut-outs into a net that, if taped and folded, can be assembled into the polyhedron. Sketch the net. If possible, find more than one way to arrange the polygons (show a different net for the same polyhedron).

Are you ready for more?

What is the smallest number of faces a polyhedron can possibly have? Explain how you know.

13.3 Assembling Polyhedra

  1. Your teacher will give you the net of a polyhedron. Cut out the net, and fold it along the edges to assemble a polyhedron. Tape or glue the flaps so that there are no unjoined edges.

  2. How many vertices, edges, and faces are in your polyhedron?

Lesson 13 Summary

A polyhedron is a three-dimensional figure composed of faces. Each face is a filled-in polygon and meets only one other face along a complete edge. The ends of the edges meet at points that are called vertices.

Prisms are shown with their edges, vertices, and faces labeled.

A polyhedron always encloses a three-dimensional region.

The plural of polyhedron is polyhedra. Here are some drawings of polyhedra:

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A prism is a type of polyhedron with two identical faces that are parallel to each other and that are called bases. The bases are connected by a set of rectangles (or sometimes parallelograms).

A prism is named for the shape of its bases. For example, if the base is a pentagon, then it is called a “pentagonal prism.”

A triangular prism, a pentagonal prism, and a rectangular prism.

A pyramid is a type of polyhedron that has one special face called the base. All of the other faces are triangles that all meet at a single vertex.

A pyramid is named for the shape of its base. For example, if the base is a pentagon, then it is called a “pentagonal pyramid.”

A rectangular pyramid, a hexagonal pyramid, a heptagonal pyramid, and a decagonal pyramid.

A net is a two-dimensional representation of a polyhedron. It is composed of polygons that form the faces of a polyhedron. 

Six squares arranged with 4 in a row, 1 above the second square in the row, and one below the second square in the row.

A cube has 6 square faces, so its net is composed of six squares, as shown here.

A net can be cut out and folded to make a model of the polyhedron.

In a cube, every face shares its edges with 4 other squares. In a net of a cube, not all edges of the squares are joined with another edge. When the net is folded, however, each of these open edges will join another edge.  

It takes practice to visualize the final polyhedron by just looking at a net.

Glossary Terms

base (of a prism or pyramid)

The word base can also refer to a face of a polyhedron.

A prism has two identical bases that are parallel. A pyramid has one base.

A prism or pyramid is named for the shape of its base.

a diagram showing the base of a prism or pyramid
face

Each flat side of a polyhedron is called a face. For example, a cube has 6 faces, and they are all squares.

net

A net is a two-dimensional figure that can be folded to make a polyhedron.

Here is a net for a cube.

Six squares arranged with 4 in a row, 1 above the second square in the row, and one below the second square in the row.
polyhedron

A polyhedron is a closed, three-dimensional shape with flat sides. When we have more than one polyhedron, we call them polyhedra.

Here are some drawings of polyhedra.

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prism

A prism is a type of polyhedron that has two bases that are identical copies of each other. The bases are connected by rectangles or parallelograms.

Here are some drawings of prisms.

A triangular prism, a pentagonal prism, and a rectangular prism.
pyramid

A pyramid is a type of polyhedron that has one base. All the other faces are triangles, and they all meet at a single vertex.

Here are some drawings of pyramids.

an image of different based pyramids

Lesson 13 Practice Problems

  1. Select all the polyhedra.

    Different shaped 3D figures are shown.
    1. Is this polyhedron a prism, a pyramid, or neither? Explain how you know.
    1. How many faces, edges, and vertices does it have?
    A prism as the bases of octagons
  2. Tyler said this net cannot be a net for a square prism because not all the faces are squares.

    Do you agree with Tyler's statement? Explain your reasoning.

    A figure is composed of squares and rectangles
  3. Explain why each of the following triangles has an area of 9 square units.

    Three triangles labeled A, B, and, C. Each triangle has a bas of 6 units and a height of 3 units.
    1. A parallelogram has a base of 12 meters and a height of 1.5 meters. What is its area?
    2. A triangle has a base of 16 inches and a height of \frac18 inches. What is its area?
    3. A parallelogram has an area of 28 square feet and a height of 4 feet. What is its base?
    4. A triangle has an area of 32 square millimeters and a base of 8 millimeters. What is its height?
  4. Find the area of the shaded region. Show or explain your reasoning.

    A triangle is shaded except for a 2 centimeter by 2 centimeter square in the middle.