Download
1 / 28
290 likes | 474 Vues
9.3 Evaluate Trigonometric Functions of Any Angle. How can you evaluate trigonometric functions of any angle? What must always be true about the value of r? Can a reference angle ever have a negative measure?. General Definitions of Trigonometric Functions. y. x.
E N D
9.3 Evaluate Trigonometric Functions of Any Angle How can you evaluate trigonometric functions of any angle? What must always be true about the value of r? Can a reference angle ever have a negative measure?
General Definitions of Trigonometric Functions y x Sometimes called circular functions
Let (–4, 3) be a point on the terminal side of an angle θ in standard position. Evaluate the six trigonometric functions of θ. 4 5 5 3 4 3 y x – sinθ cosθ = = = = 3 4 3 4 5 5 r r y r – tanθ cscθ = = = = x y r x – secθ – cotθ = = = = x y r √ 25 x2 + y2 (–4)2 + 32 √ √ = = = SOLUTION Use the Pythagorean theorem to find the value of r. = 5 Using x = –4, y = 3, and r =5, you can write the following:
The Unit Circle y x r = 1
Use the unit circle to evaluate the six trigonometric functions of = 270°. 1 0 r x secθ θ cosθ = = = = 0 1 x r –1 0 y x tanθ cotθ = = = = 0 –1 x y Draw the unit circle, then draw the angle θ = 270° in standard position. The terminal side of θ intersects the unit circle at (0, –1), so use x=0 and y= –1 to evaluate the trigonometric functions. 1 1 – y r sinθ cscθ = = = = – 1 1 r y SOLUTION = –1 = –1 undefined = 0 undefined = 0
Evaluate the six trigonometric functions of . Using x = 3, y =–3 , and r =3√2, you can write the following: θ 1. 3 3 y x 3 3 sinθ cosθ = = – – = = 3 3 r r 3√2 3√2 y r – tanθ = = – cscθ = = x y r x secθ = 3√ 2 – cotθ = = = x y r √ 18 x2 + y2 32 + (–3)2 √ √ = = 3√2 = 3√2 = = –√2 = √2 – 3 = = 3 2 2 √ 2 √ 2 SOLUTION Use the Pythagorean Theorem to find the value of r. = –1 = –1
Evaluate the six trigonometric functions of . θ 15 8 – = = 17 17 y x sinθ cosθ = = r r 15 17 – = = y r 8 15 tanθ cscθ = = x y r x 17 8 secθ cotθ = = – – = = x y 8 15 r (–8)2 + (15)2 √ = √ 289 64 + 225 √ = = SOLUTION Use the Pythagorean theorem to find the value of r. = 17 Using x = –8, y = 15, and r =17, you can write the following:
Evaluate the six trigonometric functions of . θ y x 5 sinθ cosθ = = – = r r 13 y r tanθ cscθ = = 12 x y = 5 r x secθ cotθ = = x y 5 = 12 r x2 + y2 √ = √ 25 + 144 (–5)2 + (–12)2 √ = = 13 13 12 – – – = = = 13 12 5 SOLUTION Use the Pythagorean theorem to find the value of r. = 13 Using x = –5, y = –12, and r =13, you can write the following:
r x secθ cosθ = = x r y x 0 tanθ cotθ = = = x y –1 0 –1 –1 –1 –1 = = = = = 1 0 1 0 1 y r sinθ cscθ = = r y 4. Use the unit circle to evaluate the six trigonometric functions of θ= 180°. SOLUTION Draw the unit circle, then draw the angle θ = 180° in standard position. The terminal side of θ intersects the unit circle at (–1, 0), so use x=–1 and y= 0 to evaluate the trigonometric functions. = 0 = –1 undefined = –1 undefined
5π 5π π Find the reference angle θ' for (a) θ= 3 3 3 and (b) θ = – 130°. a. The terminal side of θ lies in Quadrant IV. So, θ' = 2π– . = b. Note that θ is coterminal with 230°, whose terminal side lies in Quadrant III. So, θ' = 230° –180° + 50°. SOLUTION
9.3 Assignment Page 574, 4-15 all
9.3 Evaluate Trigonometric Functions of Any Angle • How can you evaluate trigonometric functions of any angle? • What must always be true about the value of r? • Can a reference angle ever have a negative measure?
The angle –240° is coterminal with 120°. The reference angle is θ' = 180° – 120° = 60°. The tangent function is negative in Quadrant II, so you can write: a. 3 √ tan (–240°) = – tan 60° = – Evaluate (a) tan ( – 240°). SOLUTION 30º 60º
17π 17π 17π Evaluate (b) csc . b. 6 The angle is coterminal with . The reference angle is θ' = π – = . The cosecant function is positive in Quadrant II, so you can write: 6 6 5π 5π π csc = csc = 2 π 6 6 6 6 SOLUTION 30º 60º
Sketch the angle. Then find its reference angle. 5. 210° The terminal side of θ lies in Quadrant III, so θ' = 210° – 180° = 30°
Sketch the angle. Then find its reference angle. 6. – 260° – 260° is coterminal with 100°, whose terminal side of θ lies in Quadrant II, so θ' = 180° – 100° = 80°
– 7. 7π 11π 11π 2π 7π 9 9 9 9 9 The angle – is coterminal with . The terminal side lies in Quadrant III, so θ' = – π = Sketch the angle. Then find its reference angle.
8. 15π 15π 4 4 The terminal side lies in Quadrant IV, so θ' = 2π – = π 4 Sketch the angle. Then find its reference angle.
√ 3 2 9. Evaluate cos ( – 210°) without using a calculator. – 210° is coterminal with 150°. The terminal side lies in Quadrant II, which means it will have a negative value. So, cos (– 210°) = – 30º 150º 30º 60º
sin 2θ d = v2 32 Robotics The “frogbot” is a robot designed for exploring rough terrain on other planets. It can jump at a 45° angle and with an initial speed of 16 feet per second. On Earth, the horizontal distance d(in feet) traveled by a projectile launched at an angle θ and with an initial speed v(in feet per second) is given by: How far can the frogbot jump on Earth?
162 sin (2 45°) d = 32 sin 2θ d = v2 32 SOLUTION Write model for horizontal distance. Substitute 16 for vand 45° for θ. = 8 Simplify. The frogbot can jump a horizontal distance of 8 feet on Earth.
A rock climber is using a rock climbing treadmill that is 10.5 feet long. The climber begins by lying horizontally on the treadmill, which is then rotated about its midpoint by 110° so that the rock climber is climbing towards the top. If the midpoint of the treadmill is 6 feet above the ground, how high above the ground is the top of the treadmill? y Substitute 110° for θ and = 5.25 for r. sin 110° = 5.25 10.5 sin θ = 2 4.9 y y r Rock climbing SOLUTION Use definition of sine. Solve for y. The top of the treadmill is about 6 + 4.9 = 10.9 feet above the ground.
9.3 Assignment day 2 P. 574, 16-30 all
