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Title: Warm-up:

1
Warm-up

Find the six trig ratios for a 240 angle.

2
Unit 7 A Little Triggier Chapter 6
Graphs of Trig Functions

In this chapter we will answer
What exactly is a radian? How are radians
related to degrees?
How do I draw and use the graphs of trig
functions and their inverses?
What do I do to find the amplitude, period, phase
shift and vertical shift for trig functions?
When trig functions be used to model a given
situation?

3
7.1 find exact values of trigonometric
functions (6-1)7.2 find length of intercepted
arcs and area of sectors (6-1)

In this section we will answer
What exactly is a radian and why the pi?
Can I switch between radians and degrees?
If they both measure angles why do I need to
learn radians at all?
How can I determine the length of an arc and the
area of a sector?

4
What exactly is a radian and why the pi?

What is a degree?
Radians are based on the circumference of the
circle.
Radian measurements are usually shown in terms of
p.
Radians are unitless. No unit or symbol is used.

5
Degree/Radian Conversions
6
Converting back and forth

Change 115º to a radian measure in terms of pi.
Change radians to degree measure.

7
Learning the standard angles in radians
8
45º- 45º- 90º
9
30º- 60º- 90º
10
The Unit Circle
11
Finding Trig Ratios with Radian Measures

Memorize the radian measures.
Force yourself to think in and recognize radian
measure without having to convert to degrees.

12
Evaluate each expression
13
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14
Arc Length(s)

s r?
? must be a central angle measured in radians

15
Try one

The Swiss have long been highly regarded as the
makers of fine watches. The central angle formed
by the hands of a watch on 12 and 5 is 150º.
The radius of the minute hand is cm. Find the
distance traversed by the end of the minute hand
to the nearest hundredth of a cm.
1.96 cm

16
Area of a Sector

s ½ r2?
? must be a central angle measured in
radians

17
Find the area of the sector with the following
central angle and radius
18
A sector has an arc length of 15 feet and a
central angle of radians.

Find the radius of the circle.
Find the area of the sector.

19
A Mechanics Problem

A single pulley is being used to pull up a
weight. Suppose the diameter of the pulley is
2.5 feet.
How far will the weight rise if the pulley turns
1.5 rotations?
Find the number of degrees the pulley must be
rotated to raise the weight 4.5 feet.

20
Homework

p 348 17 55 odd and 59.
Portfolio 6 due on Thursday
Unit 7 Test probably next Tuesday

21
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22
Homework
23
7.3 use the language of trigonometric graphing
to describe a graph (6-3)7.4 graph sine and
cosine functions from equations (6-3)

In this section we will answer
What does it mean for a function to be periodic?
How do we determine the period of a function?
How are sine and cosine functions alike?
Different?
How can I use a periodic graph to determine the
value of the function for a particular domain
value?
How do I tell whether a graph is a sine or cosine
function?

24
What does it mean for a function to be periodic?
25
Periodic Functions

If the values of a function are repeated over
each given interval of the domain, the function
is said to be PERIODIC.

26
What do we know about sine and cosine?
27
Sine and Cosine as Functions

Lets graph sine!

28
Properties of the sine function

Period
Domain
Range
x-intercepts
y-intercept
Maximum value
Minimum value

29
Using the graph to determine a function value

Find using the graph of the sine
function.

30
Using the graph to determine a function value

Find all the values of ? for which
.

31
Using the graph to determine a function value
32
Using the graph to determine a function value
33
Now lets graph cosine!
34
Properties of the cosine function

Period
Domain
Range
x-intercepts
y-intercept
Maximum value
Minimum value

35
How are sine and cosine alike? Different?
36
Using the graph to determine a function value

Find

37
Using the graph to determine a function value
38
How do I tell whether a graph is a sine or cosine
function?
39
Using sine and cosine functions

p 365 53

40
Partner Work

All work done on one piece of paper.
1st person solves a problem.
The 2nd person coaches or encourages as needed.
When the 2nd person agrees with the solution they
initial the problem.
Now 2nd person solves and 1st coaches, encourages
and initials.
p 363 1-12 all

41
Homework

P 363 13 39 odd, 53 and 55
Portfolio 6 due Thursday.
Unit 6 reassessments due on Friday.
Unit 7 Test Tuesday.

42
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43
Homework
44
7.3 use the language of trigonometric graphing
to describe a graph (6-4)7.4 graph sine and
cosine functions from equations (6-4)

In this section we will answer
Can the period of a function change?
How can I determine the period of a function from
its equation?
What is amplitude?
What causes a change in amplitude?
If I know the type of function, its period and
amplitude, how do I find the equation?
Can I find the equation for a function from just
its graph?

45
Lets sketch our functions
46
Lets graph y sin x on our calculatorsin
radians!
47
Check y cos x in degrees!
48
Amplitude
49
Lets move the constant
50
Period
51
Did you know?

Frequency is related to period.
Period is the amount of time to complete one
cycle. Frequency is the number of cycles per
unit of time.

52
State the amplitude, period and frequency for
each function then sketch the graph.

A
Period or
Frequency

53
State the amplitude, period and frequency for
each function then sketch the graph.

A
Period or
Frequency

54
State the amplitude, period and frequency for
each function then sketch the graph.

A
Period or
Frequency

55
Okay, think about this

A negative multiplying the function will reflect
the function about the x-axis.

56
Build your own function

Write the equation of the sine function with the
given amplitude and period.

57
Build your own function

Write the equation of the cosine function with
the given amplitude and period.

58
Now build the equationfrom a graph!

p 374

59
Group Work

You will receive cards with 3 different
categories
Type of graph sine or cosine
Amplitude and Reflection about x-axis
Period
Choose one card from each category.
Build an equation that meets the specifications.
Sketch the graph.

60
Homework

P 373 17 53 odd, 57, 59
Quiz!

61
Warm-up
62
Homework
63
7.3 use the language of trigonometric graphing
to describe a graph (6-5)7.4 graph sine and
cosine functions from equations (6-5)

In this section we will answer
Can we shift our functions vertically?
Horizontally?
If I move a function horizontally how do I tell
whether it is sine or cosine?
What is a compound function? How do I sketch one?

64
Adding or Subtracting a Constant from the
Function
65
Lets sketch a few
66
What if we have a constant inside the function
with ??
67
Sketch some
68
then put it all together!
69
Build an equation
70
Compound Functions

The sum or products of trig functions.

71
Homework

P383 15 41 odd
Quiz!
Test! Tuesday

72
Warm-up

Graph 2 periods of each

73
Homework
74
7.5 use sine and cosine graphs to model
real-world data (6-6)

In this section we will answer
Can trig functions be used to model real world
situations?
How would I translate data into a function?
How accurate will my predictions be?

75
Can trig functions be used to model real world
situations?

Of course! Would have been a mighty short
section if they couldnt!
When would I use them?
Whenever data shows fairly strong periodic
behavior of some kind, try to fit it to a Trig
Function.

76
How would I translate data into a function?
77
How accurate will my predictions be?
78
Lets Do It!!!
79
Homework