Chapter Review. Things to Know. Objectives. 564 CHAPTER 7 Applications of Trigonometric Functions. Section You should be able to Review Exercises

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1 564 CHPTER 7 pplications of Trigonometric Functions Chapter Review Things to Know Formulas Law of Sines (p. 5) Law of Cosines (p. 54) sin a = sin b = sin g a b c c = a + b - ab cos g b = a + c - ac cos b a = b + c - bc cos a rea of a triangle (pp ) = bh = ab sin g = bc sin a = ac sin b Objectives Á = 4 ss - as - bs - c, where s = a + b + c Section You should be able to Review Exercises 7. Find the value of trigonometric functions of acute angles (p. 58) 4 Use the Complementary ngle Theorem (p. 50) 5 0 Solve right triangles (p. 5) 4 4 Solve applied problems using right triangle trigonometry (p. 5) 45, 46, Solve S or S triangles (p. 5) 5 6, Solve SS triangles (p. 5) 7 0,, 7 8,

2 Chapter Review 565 Solve applied problems using the Law of Sines (p. 56) 47, 49, Solve SS triangles (p. 544), 5 6, 4 Solve SSS triangles (p. 544) 4, 9 0 Solve applied problems using the Law of Cosines (p. 545) 48, Find the area of SS triangles (p. 550) 5 8, 5 55 Find the area of SSS triangles (p. 550) Find an equation for an object in simple harmonic motion (p. 555) nalyze simple harmonic motion (p. 558) 6 64 nalyze an object in damped motion (p. 558) Graph the sum of two functions (p. 560) 69, 70 Review Exercises In Problems 4, find the exact value of the six trigonometric functions of the angle u in each figure In Problems 5 0, find the exact value of each expression. Do not use a calculator. sec cos 6 - sin 8 6. tan 5 - cot csc 5 tan cos 40 + cos tan 40 - csc 50 cot 50 In Problems 4, solve each triangle c b c 5 0 b a a 5 In Problems 5 4, find the remaining angle(s) and side(s) of each triangle, if it (they) exists. If no triangle exists, say No triangle. 5. a = 50, b = 0, a = 6. a = 0, g = 40, c = 7. a = 00, a = 5, c = 8. a =, c = 5, a = a =, c =, g = 0 0. a =, c =, g = 0. a =, c =, b = 00. a =, b = 5, b = 80. a =, b =, c = 4. a = 0, b = 7, c = 8 5. a =, b =, g = a = 4, b =, g = a = 5, b =, a = a =, b =, a = a =, b =, c =. a =, a = 0, b = 4.. c = 5, b = 4, a = a =, b =, g = 60 a =, b =, c = 4 a = 4, a = 0, b = 00 In Problems 5 44, find the area of each triangle. 5. a =, b =, g = b = 5, c = 5, a = 0 7. b = 4, c = 0, a = a =, b =, g = a = 4, b =, c = a = 0, b = 7, c = 8 4. a = 4, b =, c = 5 4. a =, b =, c = 4. a = 50, b = 0, a = 44. a = 0, g = 40, c = 45. Finding the Grade of a Mountain Trail straight trail with a uniform inclination leads from a hotel, elevation 5000 feet, to a lake in a valley, elevation 400 feet. The length of the trail is 400 feet. What is the inclination (grade) of the trail? 46. Geometry The hypotenuse of a right triangle is feet. If one leg is 8 feet, find the degree measure of each angle.

3 566 CHPTER 7 pplications of Trigonometric Functions 47. Navigation n airplane flies from city to city, a distance of 00 miles, and then turns through an angle of 0 and heads toward city C, as indicated in the figure. If the distance from to C is 00 miles, how far is it from city to city C? 0 00 mi 50. Constructing a Highway highway whose primary directions are north south is being constructed along the west coast of Florida. Near Naples, a bay obstructs the straight path of the road. Since the cost of a bridge is prohibitive, engineers decide to go around the bay. The illustration shows the path that they decide on and the measurements taken. What is the length of highway needed to go around the bay? C 0 00 mi 48. Correcting a Navigation Error Two cities and are 00 miles apart. In flying from city to city, a pilot inadvertently took a course that was 5 in error. Ocean mi Clam ay 4 mi 4 mi 5 00 mi 5 (a) If the error was discovered after flying 0 minutes at a constant speed of 40 miles per hour, through what angle should the pilot turn to correct the course? (Consult the figure.) (b) What new constant speed should be maintained so that no time is lost due to the error? (ssume that the speed would have been a constant 40 miles per hour if no error had occurred.) 49. Determining Distances at Sea Rebecca, the navigator of a ship at sea, spots two lighthouses that she knows to be miles apart along a straight shoreline. She determines that the angles formed between two line-of-sight observations of the lighthouses and the line from the ship directly to shore are and 0. See the illustration. (a) How far is the ship from lighthouse? (b) How far is the ship from lighthouse? (c) How far is the ship from shore? P Error discovered mi 5. Correcting a Navigational Error sailboat leaves St. Thomas bound for an island in the ritish West Indies, 00 miles away. Maintaining a constant speed of 8 miles per hour, but encountering heavy crosswinds and strong currents, the crew finds after 4 hours that the sailboat is off course by 5. (a) How far is the sailboat from the island at this time? (b) Through what angle should the sailboat turn to correct its course? (c) How much time has been added to the trip because of this? (ssume that the speed remains at 8 miles per hour.) St. Thomas 5 00 mi ritish West Indies 5. Surveying Two homes are located on opposite sides of a small hill. See the illustration. To measure the distance between them, a surveyor walks a distance of 50 feet from house to point C, uses a transit to measure the angle C, which is found to be 80, and then walks to house, a distance of 60 feet. How far apart are the houses? 0 50 ft 60 ft 80 C

4 Chapter Review pproximating the rea of a Lake To approximate the area of a lake, Cindy walks around the perimeter of the lake, taking the measurements shown in the illustration. Using this technique, what is the approximate area of the lake? [Hint: Use the Law of Cosines on the three triangles shown and then find the sum of their areas.] 6.5 in..5 in. 50 5' 00' 70' 00 50' ft. 58. Rework Problem 57 if the belt is crossed, as shown in the figure. 50' 6.5 in..5 in. 54. Calculating the Cost of Land The irregular parcel of land shown in the figure is being sold for $00 per square foot. What is the cost of this parcel? 0 ft 50 ft ft 55. rea of a Segment Find the area of the segment of a circle whose radius is 6 inches formed by a central angle of Finding the earing of a Ship The Majesty leaves the Port at oston for ermuda with a bearing of S80 E at an average speed of 0 knots. fter hour, the ship turns 90 toward the southwest. fter hours at an average speed of 0 knots, what is the bearing of the ship from oston? 57. Pulleys The drive wheel of an engine is inches in diameter, and the pulley on the rotary pump is 5 inches in diameter. If the shafts of the drive wheel and the pulley are feet apart, what length of belt is required to join them as shown in the figure? In Problems 59 and 60, an object attached to a coiled spring is pulled down a distance a from its rest position and then released. ssuming that the motion is simple harmonic with period T, write an equation that relates the displacement d of the object from its rest position after t seconds. lso assume that the positive direction of the motion is up. 59. a = ; T = 4 seconds 60. a = 5; T = 6 seconds In Problems 6 64, the distance d (in feet) that an object travels in time t (in seconds) is given. (a) Describe the motion of the object. (b) What is the maximum displacement from its rest position? (c) What is the time required for one oscillation? (d) What is the frequency? 6. d = 6 sint 6. d = cos4t ft. 6. d = - cospt 64. d = - sinc p t d. In Problems 65 and 66, an object of mass m attached to a coiled spring with damping factor b is pulled down a distance a from its rest position and then released. ssume that the positive direction of the motion is up and the period is T under simple harmonic motion. (a) Write an equation that relates the distance d of the object from its rest position after t seconds. (b) Graph the equation found in part (a) for 5 oscillations. 65. m = 40 grams; a = 5 centimeters; b = 0.75 gram>second; T = 5 seconds 66. m = 5 grams; a = centimeters; b = 0.65 gram>second; T = 4 seconds In Problems 67 and 68, the distance d (in meters) of the bob of a pendulum of mass m (in kilograms) from its rest position at time t (in seconds) is given. (a) Describe the motion of the object. (b) What is the initial displacement of the bob? That is, what is the displacement at t = 0? (c) Graph the motion using a graphing utility. (d) What is the displacement of the bob at the start of the second oscillation? (e) What happens to the displacement of the bob as time increases without bound? d = -0e -0.5t>60 cos a p d = -5e-0.6t>40 cos a p C b C 5 b t t

5 568 CHPTER 7 pplications of Trigonometric Functions In Problems 69 and 70, use the method of adding y-coordinates to graph each function. Verify your result using a graphing utility. x 69. y = sin x + cosx 70. y = cosx + sin

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