The Unit Circle

4.2 TRIGONOMETRIC FUNCTIONS: THE UNIT CIRCLE

• Identify a unit circle and describe its relationship

to real numbers.

• Evaluate trigonometric functions using the unit

circle.

• Use the domain and period to evaluate sine and

cosine functions.

• Use a calculator to evaluate trigonometric

functions.

What You Should Learn

The Unit Circle

The unit circle

x2 + y2 = 1

The Unit Circle

Each real number t also corresponds to a central angle

(in standard position) whose radian measure is t.

The real number t is the (directional) length of the arc

intercepted by the angle , given in radians.

The Trigonometric Functions

The unit circle has been divided into eight equal arcs,

corresponding to t-values of

The Trigonometric Functions

The unit circle has been divided into 12 equal arcs,

corresponding to t-values of

Example 1 – Evaluating Trigonometric Functions

Evaluate the six trigonometric functions at each real

number.

a. b. c. t = 0 d. t =

Solution:

a. corresponds to the point (x, y) = .

Example 1 – Solution cont’d

Example 1 – Solution

b. corresponds to the point (x, y) = .

cont’d

c. t = 0 corresponds to the point (x, y) = (1, 0).

sin 0 = y

cos 0 = x

tan 0 =

cont’d

is undefined.

cont’d

d. t = corresponds to the point (x, y) = (–1, 0).

sin = y

cos = x

cont’d

= –1

is undefined.

cont’d

Domain and Period of Sine and Cosine

The domain of the sine and cosine functions is the set of all

real numbers.

–1 y 1

–1 Sin t 1

–1 x 1

–1 cos t 1

sin (t + 2 n) = sin t

cos (t + 2 n) = cos t

Example 3 – Using the Period to Evaluate the Sine and Cosine

a. Because , you have

b. Because , you have

Example 3 – Using the Period to Evaluate the Sine and Cosine

c. For , because the sine function is

cont’d

The Unit Circle - UTEP

Documents

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