Lesson 17

This activity reinforces what students learned in the previous lesson. Students are given two contextual situations and determine if the situation requires surface area or volume to be calculated.

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

Select students to share their responses. Ask students to describe why the bird house situation calls for surface area and why the clay context calls for volume. To highlight the differences between the two uses of the box, ask:

• “What are the differences in how Noah is using the boxes in these situations?”
• “How can you determine if a situation is asking you to calculate surface area or volume?”

The goal is to ensure students understand the differences between situations that require them to calculate surface area and volume.

In this activity, students apply what they have learned previously about surface area and volume to different situations (MP4). Students have to consider whether they are finding the surface area or volume before answering each question. In addition, students apply proportional reasoning to find the cost of the vinyl that is needed. This is an opportunity for students to revisit this prior understanding in a geometry context.

As students work on the task, monitor for students who are using different methods to decompose or compose the base of the object to calculate the area.

Arrange students in groups of 2. Make sure students are familiar with the terms “foam” and “vinyl.” For example, it may help to explain that many binders are made out of cardboard covered with vinyl. In the diagram, all measurements have been rounded to the nearest inch.

Give students 3–5 minutes of quiet work time followed by time to share their answers with a partner. Follow with a whole-class discussion.

For the first question, students may try to figure out the total mass of foam needed instead of the total volume. Point out that they are not given any information about how much the foam weighs and prompt them to look for a different way of answering the question “how much foam?”

Some students might see the 0.8¢ for the unit price and confuse that with $0.80. Remind students of their work with fractional percentages in a previous unit and that 0.8¢ must be less than 1¢.

Select previously identified students to share how they calculated the area of the base. 

Consider asking some of the following questions:

• “Are there other ways to calculate the area of the base?”
• “How did you know if you had to calculate surface area or volume for this problem?”
• “If Kiran buys a big block of foam that is 36 inches wide, 20 inches deep, and 10 inches tall and cuts it into this shape, what shapes would he be cutting off?” (A rectangular prism for the step on the left side and a triangular prism for the slide part on the right.)
• “How much more would the big block of foam cost than your calculations?” (This method wastes a volume of \(36 \boldcdot 20 \boldcdot 10 - 4,\!960 = 2,\!240\) cubic inches of foam. This would be an extra $17.92 since \(2,\!240 \boldcdot 0.008 = 17.92\).)
• If Kiran decides not to cover the bottom of the structure with vinyl, how much would he save?” (This reduces the area of vinyl needed by another \(36\boldcdot 20 = 720\) square inches. This would save $4.32 since \(720 \boldcdot 0.006 = 4.32\).) 

This activity provides another opportunity for students to apply what they have previously learned about surface area and volume to different situations. Students will practice using proportions as they apply to volumes of prisms in a real-world application.

As students work on the task, monitor for students who use different strategies to answer the questions.

Arrange students in groups of 2. If desired, have students close their books or devices and display this regular hexagon with the dimensions of the sandbox in the problem for all to see. Ask students to calculate the base area of the sandbox.

Give students 2–3 minutes of quiet work time followed by time to discuss their work with a partner. Follow with a whole-class discussion.

Students may think that Andre’s father needs to purchase 15 bags of sand, because they rounded their answers to 5 and 10 for the individual sandboxes and then added \(5 + 10 = 15\). Point out to students that he could pour some of the sand from the same bag into both sandboxes.

Select previously identified students to share their methods of solving the problem. Consider asking the following questions:

• “Are there any other ways to solve this problem?”
• “Did you use any answers from one question (or multiple questions) to help you answer another question? If so, why?”
• “Did you use volume or surface area to help you answer any questions?” (yes, volume)
• “How did you calculate how much the daycare would spend on sand?”