To find the areas of circles, sectors, and segments of circles. Getting Ready! Length of Side, s. Number of Sides, n
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1 07 Areas of Circles and Sectors Mathematics Florida Standards MAFS.912.G-C.2.5 Derive.,.the formula for the area of a sector. MP1. MP 3, MP4, MP6, MP 8 Objective To find the areas of circles, sectors, and segments of circles Getting Ready! Each of the regular polygons in the table has radius 1. Use a calculator to complete the table for the perimeter and area of each polygon. Write out the first five decimol places. X C II Try to find a pattern in these perimeters and areas to tell you what the circumference and area of a circle should be. MATHEMATICAL PRACTICES Polygon Number of Sides, n Length of Side, s Apothem, a Perimeter {P = ns) Area (A = yap) Decagon 10 2(sin18 ) cos ZO-gon 20 2(sln 9 ) cos 9 50-gon 50 2(sin 3.6'') cos gon 100 2(sin 1.8 ) cos gon (sin 0.18 ) cos 0.18 Look at the results in your table. Notice the perimeter and area of an n-gon as n gets very large. Now consider a circle with radius 1. What are the circumference and area of the circle? Explain your reasoning. ^ In the Solve It, you explored the area of a circle. Lesson Vocabulary Essential Understanding You can find the area of a circle when you know its sector of a circle segment of a I radius. You can use the area of a circle to find the area of part of a circle formed by two circle radii and the arc the radii form when they intersect with the circle. Theorem Area of a Circle The area of a circle is the product of ir and the square of the radius. A = irr^ 660 Chapter 10 Area
2 Problem 1 Finding the Area of a Circle What do you need in order to use the area formula? You need the radius. The diameter is given, so you can find the radius by dividing the diameter by 2. Sports What is the area of the circular region on the wrestling mat? Since the diameter of the region is 32 ft, the radius is Y' or 16 ft A = 7rr^ = 7t(16)^ = 2567r Use the area formula. Substitute 16 forr. Simplify. «= Use a calculator. The area of the wrestling region is about 804 ft^. Gotit? 1. a. What is the area of a circular wrestling region with a 42-ft diameter? b. Reasoning If the radius of a circle is halved, how does its area change? Explain. A sector of a circle is a region bounded by an arc of the circle and the two radii to the arc's endpoints. You name a sector using one arc endpoint, the center of the circle, and the other arc endpoint. The area of a sector is a fractional part of the area of a circle. The area of a sector formed by a 60 arc is or of the area of the circle. Sector RPS Theorem Area of a Sector of a Circle The area of a sector of a circle is the product of the ratio measure of the arc and the area of the circle. Area of sector AOS = mab Trr Finding the Area of a Sector of a Circle What is the area of sector GPH? Leave your answer in terms of tt. What fraction of a circle's area Is the area of a sector formed by a 72 arc? The area of a sector formed by a 72 arc is or the circle. of the area of area of sector GPH = ingh TTr * """tls)' = 457r The area of sector GPH is 45-7r cm^. Substitute 72 for mgh and 15 for r. Simplify. Got It? 2. A circle has a radius of 4 in. What is the area of a sector bounded by a 45 minor arc? Leave your answer in terms of tt. 15 cm C PowerGeometry.com Lesson 10-7 Areas of Circles and Sectors 661
3 A part of a circle bounded by an arc and the segment joining its endpoints is a segment of a circle. To find the area of a segment for a minor arc, draw radii to form a sector. The area of the segment equals the area of the sector minus the area of the triangle formed. Segment of a circle Key Concept Area of a Segment Area of sector Area of triangle = Area of segment Problem 3 Finding the Area of a Segment of a Circle What is the area of the shaded segment shown at the right? Round your answer to the nearest tenth. The radius and m AS CA = CB and m^acb The area of sector ACS and the area of AACS Subtract the area of AACS from the area of sector ACS. What kind of triangle is AACB7 Since ^ =CB, the base angles of AACS are congruent. By the Triangle- Angle-Sum Theorem, maa = m/lb = 60. So, AACS is equiangular, and therefore equilateral. area of sector A CB = mab Trr^ Use the formula for area of a sector. = ^ '7r(18)^ Substitute 60 for mab and 18 for r. = 547r Simplify. AACB is equilateral. The altitude forms a triangle, area of AACB = ^bh Use the formula for area of a triangle. = (18) (9V3) Substitute 18 for b and 9v5 forh. = 8lV3 Simplify, area of shaded segment = area of sector ACS - area of AACB = 54ir 81V3 Substitute. == Use a calculator. The area of the shaded segment is about 29.3 in.^. 18 in, 5 Got It? 3. What is the area of the shaded segment shown at the right? Round your answer to the nearest tenth. 662 Chapter 10 Area
4 & Lesson Check Do you know HOW? 1. What is the area of a circle with diameter 16 in.? Leave your answer in terms of tt. Find the area of the shaded region of the circle. Leave your answer in terms of tt = MATHEMATICAL Do you UNDERSTAND? WSHPRACTICES 14. Vocabulary What is the difference between a sector of a circle and a segment of a circle? 5. Reasoning Suppose a sector of OP has the same area as a sector of GO. Can you conclude that OP and 00 have the same area? Explain. 6. Error Analysis Your class must find the area of a sector of a circle determined by a 150 arc. The radius of the circle is 6 cm. What is your classmate's error? Explain. y Practice and Problem-Solving Exercises ^^PRAalcE^^ Practice Find the area of each circle. Leave your answer in terms of it. ^ See Problem ft 11. Agriculture Some farmers use a circular irrigation method. An irrigation arm acts as the radius of an irrigation circle. How much land is covered with an irrigation arm of 300 ft? 12. You use an online store locator to search for a store within a 5-mi radius of your home. What is the area of your search region? Find the area of each shaded sector of a circle. Leave your answer in terms of 97. ^ See Problem cm 16 cm C PowerGeometry.com Lesson 10-7 Areas of Circles and Sectors 663
5 Find the area of sector TOP in OO using the given information. Leave your answer in terms of r = 5m, mtp = rf = 16m., m^ = r = 6 ft, mtp = d= 15 cm, mpot = 180 Find the area of each shaded segment. Round your answer to the nearest tenth. ^ See Problem ^ Apply Find the area of the shaded region. Leave your answer in terms of tt and in simplest radical form n 32. Transportation A town provides bus transportation to students living beyond 2 mi of the high school. What area of the town does not have the bus service? Round to the nearest tenth. 33. Design A homeowner wants to build a circular patio. If the diameter of the patio is 20 ft, what is its area to the nearest whole number? 34. Think About a Plan A circular mirror is 24 in. wide and has a 4-in. frame around it. What is the area of the frame? How can you draw a diagram to help solve the problem? What part of a circle is the width? Is there more than one area to consider? 35. Industrial Design Refer to the diagram of the regular hexagonal nut. What is the area of the hexagonal face to the nearest millimeter? 36. Reasoning AB and CD are diameters of O. Is the area of sector AOC equal to the area of sector BOD? Explain. 37. A circle with radius 12 mm is divided into 20 sectors of equal area. What is the area of one sector to the nearest tenth? 2 mm 4 mm mm 664 Chapter 10 Area
6 38. The circumference of a circle is 267r in. What is its area? Leave your answer in terms of IT. 39. In a circle, a 90 sector has area SOtt in.^. What is the radius of the circle? 40. Open-Ended Draw a circle and a sector so that the area of the sector is IOtt cm^. Give the radius of the circle and the measure of the sector's arc. 41. A method for finding the area of a segment determined by a minor arc is described in this lesson. a. Writing Describe two ways to find the area of a segment determined by a major arc. b. If mab = 90 in a circle of radius 10 in., find the areas of the two segments determined by AB. Find the area of the shaded segment to the nearest tenth Challenge Find the area of the shaded region. Leave your answer in terms of tt ft.- 10 m Recreation An 8 ft-by-lo ft floating dock is anchored in the middle of a pond. The bow of a canoe is tied to a corner of the dock with a lo-ft rope, as shown in the picture below. a. Sketch a diagram of the region in which the bow of the canoe can travel. b. What is the area of that region? Round your answer to the nearest square foot. 'V C PowerGeometry^com^ Lesson 10-7 Areas of Circles and Sectors 665
7 49. O O at the right is inscribed in square ABCD and circumscribed A about square PQRS. Which is smaller, the blue region or the yellow region? Explain. 50. Circles T and U each have radius 10 and TU = 10. Find the area of the region that is contained inside both circles. {Hint: Think about where T and U must lie in a diagram of O Tand O U.) D : i Apply What You've Learned Look back at the information given about the target on page 613. The diagram of the target is shown again below. In the Apply Wliat You Learned in Lesson 10-1, you found tlie area of one red triangle, and in the Apply What You've Learned in Lesson 10-5, you found the area of the regular octagon. MATHEMATICAL PRACTICES MR 1, MR 7 9 in. a. Is each yellow region of the target called a segment or a sector of O? b. Do the eight yellow regions all have the same area? Justify your answer. c. What information do you need in order to find the area of the yellow regions of the target? Describe a method to find this information. d. Describe a method to find the total area of the yellow regions of the target. Then find the total area of the yellow regions. Round your answer the nearest tenth of a square inch. e. Use a different method to find the total area of the yellow regions of the target and check that you get the same result as in part (d). 666 Chapter 10 Area
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