Trigonometry Review

Trigonometry Review

radians, so radians To convert from degrees to radians, multiply by To convert from radians to degrees, multiply by Angle Measurement

r=1 Special Angles

π/2 π/3 3π/4 2π/3 π/4 5π/6 π/6 π 0 3π/2 r=1 Special Angles - Unit Circle Coordinates

r (x,y)  Trig Functions - Definitions

hyp opp  adj Trig Functions - Definitions

Trig Functions - Definitions

Trig Functions Signs by quadrants sin, csc positive all functions positive tan, cot positive cos, sec positive

example: Special Angles - Triangles

Special Angles - Triangles

r=1 Special Angles - Unit Circle

(0,1) r = 1 (-1,0) (1,0) (0,-1) Use the unit circle points (1,0), (0,1), (-1,0) and (0,-1) or look at the graphs for the trig functions example: Special Angles For the angles

y = sin x 1 -π/2 π/2 π 3π/2 2π -1 Period is and amplitude is 1. Graphing Trigonometry Functions Basic Graphs

y = cos x 1 -π/2 π/2 π 3π/2 2π -1 Period is and amplitude is 1. Graphing Trigonometry Functions Basic Graphs

Using the graph for Special Angles and Graphs

y = a sin x a -π/2 π/2 π 3π/2 2π -a Period is and amplitude is a. Graphing Trig Functions Amplitude Change y= a sin x stretches or compresses the graph vertically

y = sin(x -b) 1 b 2π+b -1 Period is and amplitude is 1. Graphing Trig Functions Phase Shift y = sin(x -b) slides graph right by bunits

y = sin(x +b) 1 -1 -b 2π -b Period is and amplitude is 1. Graphing Trig Functions Phase Shift y = sin(x + b) slides graph left by bunits

1 2π/c -1 Period is and amplitude is 1. Graphing Trig Functions Period Change y = sin cx stretches or compresses the graph horizontally

Trig Identities Reciprocal Quotient

Trig Identities Pythagorean

Trig Identities Double Angle

TrigIdentities Sum and difference

is equivalent to is equivalent to Inverse Trig Functions

example: if and since in quadrants I and II Solving Trig Equations Use algebra, then inverse trig functions or knowledge of special angles to solve.

Trigonometry Review