Unit 3, Lesson 9: Applying Area of Circles

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Unit 3, Lesson 9: Applying Area of Circles Lesson Goals Use the formula Represent exact answers in terms of. to solve problems involving the areas of circles. Required Materials four-function calculators 9.1: Still Irrigating the Field (5 minutes) Setup: Remind students that the circular field is set into a square that is 800 m on a side. 2 minutes quiet work time followed by whole-class discussion. Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles 1

The area of this field is about 500,000 m 2. What is the field s area to the nearest square meter? Assume that the side lengths of the square are exactly 800 m. C, 502,655 m 2 A. 502,400 m 2 B. 502,640 m 2 C. 502,655 m 2 D. 502,656 m 2 E. 502,857 m 2 Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles 2

9.2: Comparing Areas Made of Circles (20 minutes) Setup: Groups of 2. 30 seconds of quiet think time to make a prediction on first problem, partner discussion, more quiet work time, then wholeclass discussion. Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles 3

1. Each square has a side length of 12 units. Compare the areas of the shaded regions in the 3 figures. Which figure has the largest shaded region? Explain or show your reasoning. 1. The areas of all 3 shaded regions are equal: about 30.96 square units. 2. Figure E s area is approximately 0.43 square units larger than Figure D s area. The area of Figure D is, and the area of Figure E is. 2. Each square in Figures D and E has a side length of 1 unit. Compare the area of the two figures. Which figure has more area? How much more? Explain or show your reasoning. Anticipated misconceptions In the first question, students may not know how to find the radius of the circles. Suggest having them cut off the shaded regions and rearrange them to show that the length of each side fits half way across the circle (marking the radius). In the second question, students might benefit from cutting and rearranging the figures. Some students might assume, based on previous activities, that the areas of both figures are equal. Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles 4

However, Figure D has more pieces that are parts of a circle, and Figure E has more units that are a full square. Ask students whether the fourth of the circle has the same area as the square. Are you ready for more? Which figure has a longer perimeter, Figure D or Figure E? How much longer? Possible Responses Figure D s perimeter is units longer than Figure E s because. Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles 5

9.3: The Running Track Revisited (Optional, 10 minutes) Setup: Students in groups of 2. 3 4 minutes partner work time followed by small-group and whole-class discussions. The field inside a running track is made up of a rectangle 84.39 m long and 73 m wide, together with a halfcircle at each end. The running lanes are 9.76 m wide all the way around. ) (or about Anticipated misconceptions Some students may think they can calculate the area of the running track by multiplying half of the perimeter times the radius, as if the shape were just a circle. Prompt them to see that they need to break the overall shape into rectangular and circular pieces. What is the area of the running track that goes around the field? Explain or show your reasoning. Lesson Synthesis (5 minutes) What is the area, in terms of, of a circle with a radius of 10? What is the area of a quarter-circle with a diameter of 12? Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles 6

GRADE 7 MATHEMATICS 9.4: Area of an Arch (Cool-down, 5 minutes) Setup: None. Here is a picture that shows one side of a child's wooden block with a semicircle cut out at the bottom. (or about ) Anticipated misconceptions Students may think the word side refers to the length of the outer sides in the block. Tell these students that side, in this context, refers to the face of the block they are given. Students might correctly find the areas of the rectangle and the half-circle but add these values instead of subtracting. Find the area of the side. Explain or show your reasoning. Unit 3: Measuring Circles, Lesson 9: Applying Area of Circles Students might forget to divide the area of the circle by 2 to find the area of the half-circle. 7

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