In these lessons, we will look at Trigonometric Functions for any angle in the Cartesian Plane by using the reference angle.
Steps to solving trigonometric functions for any angle
Step 1: Find the Reference Angle, which is always acute
Step 2: Find Trig Function Value for the reference angle
Step 3: Determine the Sign (positive or negative) of the trig function based on the quadrant
Example:
Find
a) sin 120°
b) cos 150°
c) tan 210°
d) csc 300°
Solution:
a) sin 120°
Step 1: Find the reference angle
180° – 120° = 60°
Step 2: Find Trig Function Value for the reference angle
sin 60° = 0.866
Step 3: Determine the Sign (positive or negative) of the trig function based on the quadrant
120° is in the second quadrant, where sin is positive.
So, sin 120° = sin 60° = 0.866
b) cos 150°
Step 1: Find the reference angle
180° – 150° = 30°
Step 2: Find Trig Function Value for the reference angle
cos 30° = 0.866
Step 3: Determine the Sign (positive or negative) of the trig function based on the quadrant
150° is in the second quadrant, where cos is negative
So, cos 150° = –cos 30° = –0.866
c) tan 210°
Step 1: Find the reference angle
210° – 180° = 30°
Step 2: Find Trig Function Value for the reference angle
tan 30° = 0.5774
Step 3: Determine the Sign (positive or negative) of the trig function based on the quadrant
210° is in the third quadrant, where tan is positive
So, tan 210° = tan 30° = 0.5774
d) csc 300°
Step 1: Find the reference angle
360° – 300° = 60°
Step 2: Find Trig Function Value for the reference angle
csc 60° = 1.155
Step 3: Determine the Sign (positive or negative) of the trig function based on the quadrant
300° is in the fourth quadrant, where csc is negative
So, csc 300° = –csc 60° = –1.155
Example:
Given that sin 56˚ = 0.83 and cos 56˚ = 0.56, find the value of
2 sin 304˚ + cos 124˚
Solution :
Reference angle for 304˚ = (360˚ – 304˚) = 56˚
sin 304˚ = – (sin 56˚) = –0.83
Reference angle for 124˚ = (180˚ – 124˚) = 56˚
cos 124˚ = – (cos 56˚) = –0.56
2 sin 304˚ + cos 124˚ = 2 (–0.83) + (–0.56) = –2.22
Example:
Given that 0˚ ≤ x ≤ 360 ˚, find the angle x for each of the following:
a) sin x = –0.6691
b) cos x = 0.2079
c) tan x = –1.4281
Solution:
a) sin x = –0.6691
reference angle = sin -1 (0.6691)
reference angle = 42˚ (round to the nearest degree)
sin is negative in the quadrant III and IV
So, x = 180 + 42 = 222˚ or
x = 360 – 42 = 318˚
b) cos x = 0.2079
reference angle = cos -1 (0.2079)
reference angle = 78˚ (round to the nearest degree)
cos is positive in quadrant I and IV
So, x = 78˚ or
x = 360 – 78 = 282˚
c) tan x = –1.4281
reference angle = tan -1 (1.4281)
reference angle = 55˚ (round to the nearest degree)
tan is negative in quadrant II and IV
So, x = 180 – 55 = 125˚ or
x = 360 – 55 = 305˚
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