Skills Practice Skills Practice for Lesson 7.1

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1 Skills Practice Skills Practice for Lesson.1 Name Date Tangent Ratio Tangent Ratio, Cotangent Ratio, and Inverse Tangent Vocabulary Match each description to its corresponding term for triangle EFG. F E G 1. leg EG in relation to G a. tangent ratio 2. EG in relation to G EF b. cotangent ratio 3. EF in relation to G EG c. opposite side 4. leg EF in relation to G d. adjacent side 5. tan in relation to G EG 1 EF e. inverse tangent Chapter Skills Practice 563

2 Problem Set Calculate the tangent of the indicated angle in each triangle. Rationalize the denominator when necessary ft B ft 2 ft 3 2 ft B tan B 2 1 tan B C 25 m 40 m C 20 m 32 m tan C tan C m 15 m D 6. 3 ft 5 5 ft tan D tan D D 564 Chapter Skills Practice

3 Name Date Calculate the cotangent of the indicated angle in each triangle. Rationalize the denominator when necessary.. 8. A A 4 ft 3 ft 6 ft 8 ft cot A 4 3 cot A 9. F 10. yd 6 yd 15 yd 2 6 yd F cot F cot F ft m A 4 2 ft 40 m A cot A cot A Use a calculator to evaluate each tangent ratio. Round your answers to the nearest hundredth. 13. tan tan tan tan tan tan 180 Chapter Skills Practice 565

4 Use a calculator to evaluate each cotangent ratio. Round your answers to the nearest hundredth. 19. cot cot cot cot cot cot 30 Use a tangent ratio or a cotangent ratio to calculate the missing length of each triangle. Round your answers to the nearest hundredth ft x x 60 6 ft tan 40 x 2 2 tan 40 x x 1.68 ft x 15 m x 5 2 m 566 Chapter Skills Practice

5 Name Date 29. x x 11 yd 3 2 yd 25 Use a tangent ratio or a cotangent ratio to solve each problem. Round your answers to the nearest hundredth. 31. A boat travels in the following path. How far north did it travel? N tan 23 N tan 23 N N mi miles 32. During a group hike, a park ranger makes the following path. How far west did they travel? 2 miles 12 N 33. A surveyor makes the following diagram of a hill. What is the height of the hill? ft Chapter Skills Practice 56

6 34. To find the height of a tree, a botanist makes the following diagram. What is the height of the tree? 0 20 ft Calculate the measure of angle X for each triangle. Round your answers to the nearest hundredth. 35. B 36. X 9 in. 5 in. 30 m X T S 43 m R tan X 5 9 m X tan 1 ( 5 9 ) K 8 3 cm M 38. Y 6 2 cm X 5.94 km Z 5.66 km X 568 Chapter Skills Practice

7 Name Date 39. X 40. E 15 in yd 1.1 yd U 49 in. V X F Solve each problem. Round your answers to the nearest hundredth. 41. A moving truck is equipped with a ramp that extends from the back of the truck to the ground. When the ramp is fully extended, it touches the ground 12 feet from the back of the truck. The height of the ramp is 2.5 feet. Calculate the measure of the angle formed by the ramp and the ground. 2.5 ft 12 ft? tan x x tan 1 ( ) 11. The angle formed by the ramp and the ground is approximately 11.. Chapter Skills Practice 569

8 42. A park has a skateboard ramp with a length of 14.2 feet and a length along the ground of 12.9 feet. The height is 5.9 feet. Calculate the measure of the angle formed by the ramp and the ground ft 5.9 ft? 12.9 ft 43. A lifeguard is sitting on an observation chair at a pool. The lifeguard s eye level is 6.2 feet from the ground. The chair is 15.4 feet from a swimmer. Calculate the measure of the angle formed when the lifeguard looks down at the swimmer.? 6.2 ft 15.4 ft 50 Chapter Skills Practice

9 Name Date 44. A surveyor is looking up at the top of a building that is 140 meters tall. His eye level is 1.4 meters above the ground, and he is standing 190 meters from the building. Calculate the measure of the angle from his eyes to the top of the building. 140 m? 190 m 1.4 m Chapter Skills Practice 51

10 52 Chapter Skills Practice

11 Skills Practice Skills Practice for Lesson.2 Name Date Sine Ratio Sine Ratio, Cosecant Ratio, and Inverse Sine Vocabulary Write the term from the box that best completes each statement. sine ratio cosecant ratio inverse sine 1. The of an acute angle in a right triangle is the ratio of the length of the hypotenuse to the length of a side that is opposite the angle. 2. The of x is the measure of an acute angle whose sine is x. 3. The of an acute angle in a right triangle is the ratio of the length of the side that is opposite the angle to the length of the hypotenuse. Problem Set Calculate the sine of the indicated angle in each triangle. Rationalize the denominator when necessary. 1. B 2. ft 3 3 ft 6 ft 14 ft sin B sin B B Chapter Skills Practice 53

12 3. 4. C 35 m 25 m C 15 m 2 2 m sin C sin C 5. D m 3 m 36 3 m 54 m sin D sin D Calculate the cosecant of the indicated angle in each triangle. Rationalize the denominator when necessary.. 8. A D 12 ft 8 ft 2 2 ft A csc A ft csc A 54 Chapter Skills Practice

13 Name Date 9. F yd 20 yd 6 3 yd 12 yd 15 yd 6 yd F csc F csc F 11. P mm 50 mm 4 2 m 3 3 m P csc P csc P Use a calculator to evaluate each sine ratio. Round your answers to the nearest hundredth. 13. sin sin sin sin sin sin 180 Use a calculator to evaluate each cosecant ratio. Round your answers to the nearest hundredth. 19. csc csc csc csc 30 Chapter Skills Practice 55

14 23. csc csc 60 Use a sine ratio or a cosecant ratio to calculate the missing length of each triangle. Round your answers to the nearest hundredth x x 2 ft 6 ft 60 sin 40 x 2 2 sin 40 x x 1.29 ft x 15 m 5 x 2 m 56 Chapter Skills Practice

15 Name Date yd x x 3 2 m Use a sine ratio or a cosecant ratio to solve each problem. Round your answers to the nearest hundredth. 31. A scout troop traveled 12 miles from camp, as shown on the map below. How far north did they travel? N miles sin 18 N sin 18 N N 3.1 mi 32. An ornithologist tracked a Cooper s hawk that traveled 23 miles. How far east did the bird travel? miles N Chapter Skills Practice 5

16 33. An architect needs to use a diagonal support in an arch. Her company drew the following diagram. How long does the diagonal support have to be? ft 34. A hot air balloon lifts 125 feet into the air. The diagram below shows that the hot air balloon was blown to the side. How long is the piece of rope that connects the balloon to the ground? 125 ft 9 Calculate the measure of angle X for each triangle. Round your answers to the nearest hundredth ft X H 36. X sin X 8 15 m X sin 1 ( 8 15 ) R ft 42 mm T R 30 mm 58 Chapter Skills Practice

17 Name Date 3. L 38. E X 4 3 yd 8 yd 1 in. F 5 in. K X 39. X 40. X M 1.1 cm 25 ft 5.2 cm N D 20 ft A Solve each problem. Round your answers to the nearest hundredth. 41. Jerome is flying a kite on the beach. The kite is attached to a 100-foot string and is flying 45 feet above the ground, as shown in the diagram. Calculate the measure of the angle formed by the string and the ground. 45 ft 100 ft? sin x x sin 1 ( ) 26.4 The angle formed by the string and the ground is approximately Chapter Skills Practice 59

18 42. An airplane ramp is 58 feet long and reaches the cockpit entrance 19 feet above the ground, as shown in the diagram. Calculate the measure of the angle formed by the ramp and the ground. 19 ft 58 ft? 43. Bleachers in a stadium are 4 meters tall and have a length of 12 meters, as shown in the diagram. Calculate the measure of the angle formed by the bleachers and the ground. 4 m 12 m? 580 Chapter Skills Practice

19 Name Date 44. A 20-foot flagpole is raised by a 24-foot rope, as shown in the diagram. Calculate the measure of the angle formed by the rope and the ground. 24 ft 20 ft? Chapter Skills Practice 581

20 582 Chapter Skills Practice

21 Skills Practice Skills Practice for Lesson.3 Name Date Cosine Ratio Cosine Ratio, Secant Ratio, and Inverse Cosine Vocabulary Describe the similarities and differences between each pair of terms. 1. cosine ratio and secant ratio Define each term in your own words. 2. trigonometric ratios 3. inverse cosine Problem Set Calculate the cosine of the indicated angle in each triangle. Rationalize the denominator when necessary. 1. B 3 3 ft 2. 6 ft cos B ft 14 ft cos B B Chapter Skills Practice 583

22 3. C m 25 m 35 m C 2 2 m cos C cos C D 6 3 m 36 3 m 3 m 54 m D cos D cos D Calculate the secant of the indicated angle in each triangle. Rationalize the denominator when necessary.. 12 ft ft 2 ft A 8 ft A 9. sec A F 20 yd 25 yd 15 yd 10. sec A 6 3 yd 6 yd 12 yd F sec F sec F 584 Chapter Skills Practice

23 Name Date P 1 P R Q 15 sec P sec P Use a calculator to evaluate each cosine ratio. Round your answers to the nearest hundredth. 13. cos cos cos cos cos cos 180 Use a calculator to evaluate each secant ratio. Round your answers to the nearest hundredth. 19. sec sec cos(45 ) 21. sec sec sec sec 60 Chapter Skills Practice 585

24 Use a cosine ratio or a secant ratio to calculate the missing length of each triangle. Round your answers to the nearest hundredth ft 6 ft 60 x 40 x cos 40 x 2 2 cos 40 x x 1.53 ft m x x 2 m x x yd yd 586 Chapter Skills Practice

25 Name Date Use a cosine ratio or a secant ratio to solve each problem. Round your answers to the nearest hundredth. 31. The path of a model rocket is shown below. How far east did the rocket travel? N 4230 ft 21 cos 21 E cos 21 E E ft 32. An ichthyologist tags a shark and charts its path. Examine his chart below. How far south did the shark travel? N 38 km A kite is flying 120 feet away from the base of its string, as shown below. How much string is let out? ft 34. A pole has a rope tied to its top and to a stake 15 feet from the base. What is the length of the rope? ft Chapter Skills Practice 58

26 Calculate the measure of angle X for each triangle. Round your answers to the nearest hundredth. 35. D in. X V 10 m V 9 in. 16 m D X cos X m X cos 1 ( ) V D 38. V 12 ft 4 ft X 8 cm D 6 cm X 588 Chapter Skills Practice

27 Name Date 39. D 3 mm V X 8 mm 40. X 5 yd D V 2 yd Solve each problem. Round your answers to the nearest hundredth. 41. You park your boat at the end of a 20-foot dock. You tie the boat to the opposite end of the dock with a 35-foot rope. The boat drifts downstream until the rope is extended as far as it will go, as shown in the diagram. What is the angle formed by the rope and the dock? 35 ft downstream 20 ft? cos x x cos 1 ( ) Dock The angle formed by the rope and the dock is approximately Chapter l Skills Practice 589

28 42. Rennie is walking her dog. The dog s leash is 12 feet long and is attached to the dog 10 feet horizontally from Rennie s hand, as shown in the diagram. What is the angle formed by the leash and the horizontal at the dog's collar? Leash 12 ft? 10 ft 43. A ladder is leaning against the side of a house, as shown in the diagram. The ladder is 24 feet long and makes a 6 angle with the ground. How far from the edge of the house is the base of the ladder? House Ladder 24 ft 6? 590 Chapter Skills Practice

29 Name Date 44. A rectangular garden 9 yards long has a diagonal path going through it, as shown in the diagram. The path makes a 34 angle with the longer side of the garden. Calculate the length of the path. Garden? path 34 9 yd Chapter Skills Practice 591

30 592 Chapter Skills Practice

31 Skills Practice Skills Practice for Lesson.4 Name Date Angles of Elevation and Depression Angles of Elevation, Angles of Depression, and Equivalent Trigonometric Ratios Vocabulary Write the term that best completes each statement. 1. A(n) is the angle that is formed by a horizontal line and a line from an observer s eye to a point below the horizontal line. 2. A(n) is the angle that is formed by a horizontal line and a line from an observer s eye to a point above the horizontal line. Problem Set Determine the trigonometric ratio that you would use to solve for x in each triangle. Explain your reasoning. You do not need to solve for x cm 2. x x The sine ratio because the hypotenuse is given and the length of the side opposite the given angle needs to be determined. in. Chapter Skills Practice 593

32 3. x m x 1 yd x mm ft 1 x Use the angle of elevation to solve each problem. Round your answers to the nearest hundredth.. You are standing 40 feet away from a building. The angle of elevation from the ground to the top of the building is 5. What is the height of the building? tan 5 h tan 5 h h ft 8. A surveyor is 3 miles from a mountain. The angle of elevation from the ground to the top of the mountain is 15. What is the height of the mountain? 594 Chapter Skills Practice

33 Name Date 9. The angle of elevation from a ship to a 135-foot-tall lighthouse is 2. How far is the ship from the lighthouse? 10. The Statue of Liberty is about 151 feet tall. If the angle of elevation from a tree in Liberty State Park to the statue s top is 1.5, how far is the tree from the statue? 11. The angle of elevation from the top of a person s shadow on the ground to the top of the person is 45. The top of the shadow is 50 inches away from the person. How tall is the person? 12. A plane is spotted above a hill that is 12,000 feet away. The angle of elevation to the plane is 28. How high is the plane? 13. During the construction of a house, a 6-foot-long board is used to support a wall. The board has an angle of elevation from the ground to the wall of 6. How far is the base of the wall from the board? Chapter Skills Practice 595

34 14. Museums use metal rods to position the bones of dinosaurs. If an angled rod needs to be placed 1.3 meters away from a bone, with an angle of elevation from the ground of 51, what must the length of the rod be? Use the angle of depression to solve each problem. Round your answers to the nearest hundredth. 15. The angle of depression from the top of a building to a telephone line is 34. If the building is 25 feet tall, how far from the building does the telephone line reach the ground? tan d d 25 tan 34 d 3.06 ft 16. An airplane flying 3500 feet from the ground sees an airport at an angle of depression of. How far is the airplane from the airport? 1. To determine the depth of a well s water, a hydrologist measures the diameter of the well to be 3 feet. She then uses a flashlight to point down to the water on the other side of the well. The flashlight makes an angle of depression of 9. What is the depth of the well water? 596 Chapter Skills Practice

35 Name Date 18. A zip wire from a tree to the ground has an angle of depression of 18. If the zip wire ends 250 feet from the base of the tree, how far up the tree does the zip wire start? 19. From a 50-foot-tall lookout tower, a park ranger sees a fire at an angle of depression of 1.6. How far is the fire from the tower? 20. The Empire State Building is 448 meters tall. The angle of depression from the top of the Empire State Building to the base of the UN building is 4. How far is the UN building from the Empire State Building? 21. A factory conveyor has an angle of depression of 18 and drops 10 feet. How long is the conveyor? 22. A bicycle race organizer needs to put up barriers along a hill. The hill is 300 feet tall and from the top makes an angle of depression of 26. How long does the barrier need to be? Chapter Skills Practice 59

36 Calculate the six trigonometric ratios for the two acute angles in each triangle. Round your answers to three decimal places. 23. X Y 24. Q 56 Z P 15 cm 8 cm R sin X sin Z sin P sin Q cos X cos Z cos P cos Q tan X 0.65 tan Z tan P tan Q csc X 1.88 csc Z csc P csc Q sec X sec Z 1.88 sec P sec Q cot X cot Z 0.65 cot P cot Q 25. N 26. E 13 in. 14 in. 33 P M F G sin M sin P sin E sin G cos M cos P cos E cos G tan M tan P tan E tan G csc M csc P csc E csc G sec M sec P sec E sec G cot M cot P cot E cot G 598 Chapter Skills Practice

37 Name Date 2. U 45 V 28. A 4.3 m B 3.1 m W C sin U sin V sin A sin C cos U cos V cos A cos C tan U tan V tan A tan C csc U csc V csc A csc C sec U sec V sec A sec C cot U cot V cot A cot C Chapter Skills Practice 599

38 600 Chapter Skills Practice

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