Lesson 7-5

1. Lesson 7-5 Application of TrigonometryAngles of Elevation and Depression

2. Transparency 7-5 5-Minute Check on Lesson 7-4 • Use a graphing calculator to find tan 54°. Round to the nearest ten-thousandth. • Find mB to the nearest tenth of a degree if cos B = 0.8926 and B is an acute angle. • Find x. Round the nearest tenth. • 3. 4. 5. • 6. What is the value of tan Θ? 1.3764 26.8° x 18.5 36° x° x 13 9 59° 24 14.1 30.8 46.2° Standardized Test Practice: 13 5 --- 13 12 --- 5 12 --- 13 5 --- 12 Θ A A B C D 5 Click the mouse button or press the Space Bar to display the answers.

3. TrigDefinitions Opposite ---------------- Hypotenuse S-O-H • Sin (angle) = • Cos (angle) = • Tan (angle) = Adjacent ---------------- Hypotenuse C-A-H Opposite ---------------- Adjacent T-O-A

4. Anatomy of a Trig Function A θ Main Trig Functions: Others: Sin Csc Cos Sec Tan Cot hypotenuse C B Use trig functions to help find a missing side in a right triangle. Format: some side Trig Function ( an angle, θ for example) = ----------------------- some other side where the some side or the some other side is the missing side (variable, like x) Use inverse trig functions to help find a missing angle in a right triangle. Format: some side Trig Function -1 (-------------------------) = missing angle, θ for example some other side where the trig function -1 is found using 2nd key then the trig function on calculator

5. Angles of Elevation and Depression Top Horizontal Angle of Depression Line of Sight Angle of Elevation Bottom Horizontal Since the two horizontal lines are parallel, by Alternate Interior Angles the angle of depression must be equal to the angle of elevation.

6. Angles of Depression or Elevation • Step 1: Draw this triangle to fit problem • Step 2: Label sides from angle’s view • Step 3: Identify trig function to use • Step 4: Set up equation • Step 5: Solve for variable • Use inverse trig functions for an angle This is the length of string or distance This is the height (above the ground) or depth Θ angle goes here This is the distance from the base or along the ground

7. Step 1: Draw a triangle to fit problem h Step 2: Label sides from angle’s view opp 53° Step 3: Identify trig function to use adj 50 Step 4: Set up equation h tan 53° = ----- 50 Step 5: Solve for variable 50 tan 53° = h = 66.35 feet S  O / H C  A / H T  O / A Example 1 Before the Mast: At a point on the ground 50 feet from the foot of the flagpole, the angle of elevation to the top of the pole is 53°. Find the height of the flagpole.

8. Step 1: Draw a triangle to fit problem 20 hyp Step 2: Label sides from angle’s view x° Step 3: Identify trig function to use adj 8 Step 4: Set up equation 8 cos x° = ----- 20 Step 5: Solve for variable cos-1 (8/20) = x = 66.42° S  O / H C  A / H T  O / A Example 2 Job Site A 20-foot ladder leans against a wall so that the base of the ladder is 8 feet from the base of the building. What angle does the ladder make with the ground?

9. Step 1: Draw a triangle to fit problem Step 3: Identify trig function to use 30.5 = 25 + 5.5 Step 2: Label sides from angle’s view opp Step 4: Set up equation 27° adj x 30.5 tan 27° = ------- x Step 5: Solve for variable S  O / H C  A / H T  O / A x tan 27° = 30.5 x = (30.5) / (tan 27°) x = 59.9 Example 3 CIRCUS ACTSAt the circus, a person in the audience watches the high-wire routine. A 5-foot-6-inch tall acrobat is standing on a platform that is 25 feet off the ground. How far is the audience member from the base of the platform, if the angle of elevation from the audience member’s line of sight to the top of the acrobat is 27°?

10. 37 = 32 + 6 x° 45 = 50 - 5 Example 4 DIVINGAt a diving competition, a 6-foot-tall diver stands atop the 32-foot platform. The front edge of the platform projects 5 feet beyond the ends of the pool. The pool itself is 50 feet in length. A camera is set up at the opposite end of the pool even with the pool’s edge. If the camera is angled so that its line of sight extends to the top of the diver’s head, what is the camera’s angle of elevation to the nearest degree? Answer: about 39.4°

11. 320 h 63° Example 5 SHORT-RESPONSE TEST ITEMA roller coaster car is at one of its highest points. It drops at a 63° angle for 320 feet. How high was the roller coaster car to the nearest foot before it began its fall? Answer: The roller coaster car was about 285 feet above the ground.

12. angle of depression difference in height between objects line of sight angle of elevation distance between objects Angles of Elevation and Depression • The angle of elevation from point A to the top of the press box is 49°. If point A is 400 ft from the base of the press box, how high is the press box? • Find the angle of elevation of the sun when a 12.5 ft post casts a 18 ft shadow? • A ladder leaning up against a barn makes an angle of 78° with the ground when the ladder is 5 feet from the barn. How long is the ladder? • From the top of the 120 foot fire tower a ranger observes a fire at an angle of depression of 19°. How far from the base of the tower is the fire? • A hill is 1000 yards long with a vertical drop of 208 yards. Find the angle of depression from the top of the hill to the bottom.

13. Angles of Elevation and Depression • The angle of elevation from point A to the top of the press box is 49°. If point A is 400 ft from the base of the press box, how high is the press box?Side; Tan 49° = h/400 400 Tan 49° = h = 460.1 ft • Find the angle of elevation of the sun when a 12.5 ft post casts a 18 ft shadow?Angle; Tan x° = 12.5/18 x = Tan –1 (12.5/18) = 34.78° • A ladder leaning up against a barn makes an angle of 78° with the ground when the ladder is 5 feet from the barn. How long is the ladder?Side; Cos 78° = 5/L L = 5/Cos 78° = 24.05 ft • From the top of the 120 foot fire tower a ranger observes a fire at an angle of depression of 19°. How far from the base of the tower is the fire?Side; Tan 19° = 120/d d = 120/Tan 19° = 348.5 ft • A hill is 1000 yards long with a vertical drop of 208 yards. Find the angle of depression from the top of the hill to the bottom.Angle; Tan x° = 208/1000 x = Tan –1 (208/1000) = 11.75°

14. Quiz 2 Need-to-Know y° 25 x • Sin (angle) = Opposite / Hypotenuse • Cos (angle) = Adjacent / Hypotenuse • Tan (angle) = Opposite / Adjacent • To find an angle use inverse Trig Function • Trig Fnc-1(some side / some other side)= angle • To Solve Any Trig Word Problem • Step 1: Draw a triangle to fit problem • Step 2: Label sides from angle’s view • Step 3: Identify trig function to use • Step 4: Set up equation • Step 5: Solve for variable 33° z Angle of Elevation or of Depression Θ angle goes here

15. Summary & Homework • Summary: • Trigonometry can be used to solve problems related to angles of elevation and depression • Angle always goes in lower left corner • Homework: pg xxx, 5, 6, 8, 9, 17-19