Lesson 12

The purpose of this warm-up is to encourage students to think about possible heights of prisms with the same height and volume based on the area of a base. This is a review of previous work students have done with volume in which they found the volume of a rectangular prism by multiplying the area of a base and height. The ideas in this warm-up are revisited later in this lesson, so it is important students can clearly explain how they ordered their prisms based on them having the same volume and how they found the height of the prism with base C. 

Arrange students in groups of 2. Give students 1 minute of quiet work time followed by time to discuss their explanations with a partner. Follow with a whole-class discussion.

Select students to share the prism they found to have the greatest and least volume and the tallest and shortest height. Record and display their responses for all to see. Poll the class if they agree or disagree. If students all agree, ask a few students to share their reasoning. If they do not agree, ask students to share their reasoning until they reach an agreement.

If there is time, display this question for all to see: “If each prism has the same volume and the prism associated with base B has a height of 6 units, what is the height of the prism associated with base C?”

Have students share the volume of the prism with base C and their reasoning. Record and display the responses for all to see.

In grades 5 and 6, students worked with the volume of rectangular prisms. In this activity, students extend their understanding to see that even when the base is not a rectangle, they can still calculate the volume of a prism by multiplying the area of the base times the height of the prism.

Students use snap cubes to build a prism with a base that matches the shape from the blackline master. Each group needs 30 snap cubes for the first question and a total of 60 snap cubes for the second question. If there are not enough snap cubes, two groups of 3 students may combine together after answering the first question to form one group of 6 students.

If using snap cubes that measure \(\frac34\) inch, make copies of the first page of the blackline master, with the slightly smaller shapes. If using snap cubes that measure 2 cm, make copies of the second page of the blackline master, with the slightly larger shapes.

Select students to share their reasoning.

Consider asking some of the following questions:

• “How do you know this figure is a prism?” (Cross sections parallel to the base are identical copies.)
• “What is the area of the base of this figure?” (It is the number of cubes in one layer of the prism.)
• “How do you calculate the total number of cubes to make the prism?” (Multiply the number of cubes in one layer by the number of layers.)
• “What is the volume of this prism?” (The volume is the same as calculating the number of cubes to make the prism.)
• “If you find the area of the base, how do you use that information to calculate the volume of the prism?” (Multiply the area of the base by the height of the prism.)
• “How would the volume of the prism change if we changed the shape of the base but still used 27 cubes to build it?” (The volume would not change.)

If not mentioned by students, explain that calculating the total number of cubes to make the prism is the same as calculating the volume of the prism. We can find the area of the base of the prism and multiply that by the number of layers in the prism which is the same as the height of the prism.  The height of the prism is measured in units, the area of the base is measured in units² and the volume of the prism is measured in units³.

The purpose of this activity is for students get hands-on experience with polyhedra, recognizing whether a figure is a prism and if so, determining which face is the base of the prism. Once students determine which face is the base, they use a ruler marked in inches to measure the height of the prism. The area of each face is labeled on the shape so that students do not get bogged down with calculating the base area and can focus on using the area to find the volume.

Instead of creating enough sets of polyhedra for every group to have one of every shape at the same time, consider having the students pass the shapes from one group to the next or rotate around to different stations so that fewer sets of shapes have to be constructed.

Some students may say that Figure A is not a prism because it is a cube. Ask them whether the cross sections would be identical if you made various cuts parallel to one side. Explain that a cube is a special type of square prism where the height of the prism matches the side lengths of the base. Consider making a comparison to the fact that a square is a special type of rectangle.

Poll the class for answers to the first column of the table. Make sure the class agrees about answers before proceeding. Select students to provide their answers to each part of the table and an explanation. Display answers on the table for all to see. Ask students: 

• “What is different about the structure of non-prisms in comparison to prisms?" (The prisms have multiple layers of the same base, where the non-prism does not have that.)
• “Why can’t you use ‘area of the base times the height’ to calculate the volume of the figures that were not prisms?" (Because the non-prism isn't made up of multiple layers of the same base.)

The purpose of this activity is for students to work backwards from the volume to the height of a prism. Students see that for two prisms to have the same volume, the one with the smaller base has the taller height and the one with the larger base has the shorter height. The grid helps students find the area of the base so they can focus their attention on what it means to have a prism made out of stacks of layers of the same base.

Arrange students in groups of 2. Give students 5 minutes of quiet work time followed by time to discuss their thinking with a partner. Follow with a whole-class discussion.

Select students to share their responses and reasoning. If not brought up in student's explanation, explain that for the last problem, there is more than one possible correct answer. The smallest possible volume that involves all whole number side lengths is \(120 \text{ units}^3\), but there is nothing in the problem that requires all the heights to be whole numbers.

To highlight connections to calculating volume, ask:

• “How do you calculate the volume of a prism?” (Display the equation for all to see: \(V = B \boldcdot h\).)
• “Since \(V = B \boldcdot h\), how could we find the area of the base if we knew the volume and height of the prism?” (Display the equation for all to see: \(B = V \div h\).)
• “If we keep the volume the same, what happens to the height when we increase the area of the base?” (It decreases.)
• “If we keep the height the same, what happens to the volume when we increase the area of the base?” (It increases.)