Download PC 4-2 The Unit Circle

Survey
yes no Was this document useful for you?
   Thank you for your participation!

* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project

Document related concepts

Mathematics of radio engineering wikipedia , lookup

Sociocracy wikipedia , lookup

Transcript
Chapter 4
Trigonometric Functions
1
4.2 The Unit Circle
Objectives:
Evaluate trigonometric functions using
the unit circle.
Use domain and period to evaluate sine
and cosine functions.
Use a calculator to evaluate trigonometric
functions.
2
What is the Unit Circle?
Equation of the unit circle: x2 + y2 = 1
Center: (0, 0)
Radius = 1
3
Unit Circle with Number Line
Imagine that the real number line is
wrapped around the unit circle, as shown.
Note: the positive numbers wrap towards
the positive y-axis and the negative numbers
wrap towards the negative y-axis.
4
More Unit Circle
Each real number t corresponds to a point
(x, y) on the circle.
Each real number t also corresponds to a
central angle θ whose radian measure is t.
5
Compare Values (8 Segments)
6
Compare Values (12 Segments)
7
Definition of Trig Functions
Let t be a real number and let (x, y) be the
point on the unit circle corresponding to t.
Then the six trig functions are defined:
8
Example 1
Evaluate the six trig functions at each real
number.

1. t 
3. t  
6
5
2. t 
4

3
4. t  
9
Exploration
Complete the activity (handout) in which
you will investigate the periodic nature of
the sine function as it relates to the unit
circle. You will need a graphing calculator.
10
Sine and Cosine
Domain:
Range:
What happens when
we add 2π to t?
So,
sin t  2   sin t
cost  2   cos t
11
In General
For n revolutions around the unit circle,
What is the period for sine and cosine?
12
Example 2
 13
Evaluate sin 
 6

 using its period as an aid.

13
Even and Odd Functions
Even Function if f (–t) = f (t).
Odd Function if f (–t) = – f (t).
14
Our Friend, the Calculator
What do we need to always check before
solving a trig problem with a calculator?
We can easily solve for sine, cosine, or
tangent. How do we solve for cosecant,
secant, and cotangent?
15
Homework 4.2
Worksheet 4.2
16