FUNCTIONS AND GRAPHS

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FUNCTIONS AND GRAPHS

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Title: FUNCTIONS AND GRAPHS

1
FUNCTIONS AND GRAPHS
2
Aim 1.2 What are the basics of functions and
their graphs?

Lets Review
What is the Cartesian Plane or Rectangular
Coordinate Plans?
How do we find the x and y-intercepts of any
function?
How do we interpret the viewing rectangle
-10,10, 1 by -10, 10,1?

3
IN THIS SECTION WE WILL LEARN

How to find the domain and range?
Determine whether a relation is a function
Determine whether an equation represents a
function
Evaluate a function
Graph functions by plotting points
Use the vertical line to identify functions

4
WHAT IS A RELATION?

A relation is a set of ordered pairs.
Example (4,-2), (1, 2), (0, 1), (-2, 2)
Domain is the first number in the ordered pair.
Example(4,-2)
Range is the second number in the ordered pair.
Example (4,30)

5
EXAMPLE 1

Find the domain and range of the relation.
(Smith, 1.0006), (Johnson, 0.810), (Williams,
0.699), (Brown, 0.621)

6
PRACTICE

Find the domain and range of the following
relation.

7
HOW DO WE DETERMINE IF A RELATION IS A FUNCTION?

A relation is a function if each domain only has
ONE range value.
There are two ways to visually demonstrate if a
relation is a function.
Mapping
Vertical Line Test

8
DETERMINE WHETHER THE RELATION IS A FUNCTION

(1, 6), (2, 6), (3, 8), (4, 9)
(6, 1), (6, 2), (8, 3), (9, 4)

9
FUNCTIONS AS EQUATIONS

Functions are usually given in terms of equations
instead of ordered pairs.
Example y 0.13x2 -0.21x 8.7
The variable x is known the independent variable
and y is the dependent variable.

10
HOW DO WE DETERMINE IF AN EQUATION REPRESENTS A
FUNCTION?

x2 y 4

Steps
Solve the equation for y in terms of x.
Note
If two or more y values are found then the
equation is not a function.

11
HOW DO WE DETERMINE IF AN EQUATION REPRESENTS A
FUNCTION

x2 y2 4

Steps
Solve the equation for y in terms of x.
Note
If two or more y values are found then the
equation is not a function.

12
PRACTICE

Solve each equation for y and then determine
whether the equation defines y as a function of
x.
2x y 6
x2 y2 1

13
WHAT IS FUNCTION NOTATION?

We use the special notation f(x) which reads as f
of x and represents the function at the number x.
Example f (x) 0.13x2 -0.21x 8.7
If we are interested in finding f (30), we
substitute in 30 for x to find the function at
30.
f (30) 0.13(30)2 -0.21 (30) 8.7
Now lets try to evaluate using our calculators.

14
HOW DO WE EVALUATE A FUNCTION?

F (x) x2 3x 5
Evaluate each of the following
f (2)
f (x 3)
f (-x)

Substitute the 2 for x and evaluate.
Then repeat.

15
GRAPHS OF FUNCTIONS

The graph of a function is the graph of the
ordered pairs.
Lets graph
f (x) 2x
g (x) 2x 4

16
USING THE VERTICAL LINE TEST

The Vertical Line Test for Functions
If any vertical line intersects a graph in more
than one point, the graph does not define y as a
function of x.

17
Practice

Use the vertical line test to identify graphs in
which y is a function of x.

18
SUMMARY ANSWER IN COMPLETE SENTENCES.

What is a relation?
What is a function?
How can you determine if a relation is a
function?
How can you determine if an equation in x and y
defines y as a function of x? Give an example.

19
AIM 1.2B WHAT KIND OF INFORMATION CAN WE OBTAIN
FROM GRAPHS OF FUNCTIONS?

Note the closed dot indicates the graph does not
extend from this point and its part of the graph.
Open dot indicates that the point does not extend
and the point is not part of the graph.

20
HOW DO WE IDENTIFY DOMAIN AND RANGE FROM A
FUNCTIONS GRAPH?

Domain set of inputs
Found on x axis
Range set of outputs
Found on y -axis

Using set builder notation it would look like
this for the domain
Using Interval Notation -4, 2
What would it look like for the range using both
set builder and interval notation?

22
IDENTIFY THE DOMAIN AND RANGE OF A FUNCTION FROM
ITS GRAPH

Use Set Builder Notation.
Domain
Range

23
IDENTIFY THE DOMAIN AND RANGE OF A FUNCTION FROM
ITS GRAPH
24
IDENTIFYING INTERCEPTS FROM A FUNCTIONS GRAPH

We can say that -2, 3, and 5 are the zeros of the
function. The zeros of the function are the
x- values that make
f (x) 0.
Therefore, the real zeros are the x-intercepts.
A function can have more than one x-intercept,
but at most one y-intercept.

25
SUMMARY ANSWER IN COMPLETE SENTENCES.

Explain how the vertical line test is used to
determine whether a graph is a function.
Explain how to determine the domain and range of
a function from its graph.
Does it make sense? Explain your reasoning.
I graphed a function showing how paid vacation
days depend on the number of years a person works
for a company. The domain was the number of paid
vacation days.

26
AIM 1.3 HOW DO WE IDENTIFY INTERVALS ON WHICH A
FUNCTION IS INCREASING OR DECREASING?

Increasing, Decreasing and Constant Functions
A function is increasing on a open interval, I if
f (x1) lt f(x2) whenever x1ltx2 for any x1 and
x2 in the interval.

A function is decreasing on an open interval, I,
if f(x1) gt f (x2) whenever x1 gt x2
for any x1 and x2 in the interval.

A function is constant on an open interval, I,
f(x1) f (x2) for any x1 and x2 in the interval.

Note
The open intervals describing where function
increase, decrease or are constant use
x-coordinates and not y-coordinates.

30
Example 1 Increases, Decreases or Constant

State the interval where the function is
increasing, decreasing or constant.

31
Practice

State the interval where the function is
increasing, decreasing or constant.

32
WHAT IS A RELATIVE MAXIMA?

Definition of a Relative Maximum
A function value f (a) is a relative maximum of f
if there exists an open interval containing a
such that f (a) gt f (x) for all x ? a in the open
interval.

33
WHAT IS A RELATIVE MINIMA?

Definition of a Relative Minimum
A function value f (b) is a relative minimum of f
if there exists an open interval containing b
such that f (b) lt f (x) for all x ? b in the open
interval.

34
HOW DO WE IDENTIFY EVEN AND ODD FUNCTIONS AND
SYMMETRY?

Definition of Even and Odd Functions
The function f is an even function if
f (-x) f (x) all x in the domain of f.
The right side of the equation of an even
function does not change if x is replaced with
x.
The function f is an odd function if f (-x) -f
(x)
for all x in the domain of f.
Every term on the right side of the equation of
an odd function changes its sign if x is replaced
with x.

35
DETERMINE IF FUNCTION IS EVEN,ODD OR NEITHER

f (x) x3 - 6x

Steps
Replace x with x and simplify.
If the right side of the equation stays the same
it is an even function.
If every term on the right side changes sign,
then the function is odd.

36
DETERMINE IF FUNCTION IS EVEN, ODD OR NEITHER

g (x) x4 - 2x2
h(x) x2 2 x 1

Steps
Replace x with x and simplify.
If the right side of the equation stays the same
it is an even function.
If every term on the right side changes sign,
then the function is odd.

37
PRACTICE

Determine if function is Even, Odd or Neither
f (x) x2 6
g(x) 7x3 x
h (x) x5 1

The function on the left is even.
What does that mean in terms of the graph of the
function?
The graph is symmetric with respect to the
y-axis. For every point (x, y) on the graph, the
point (-x, y) is also on the graph.
All even functions have graphs with this kind of
symmetry.

The graph of function f (x) x3 is odd.
It may not be symmetrical with respect to the
y-axis. It does have symmetry in another way.
Can you identify how?

For each point (x, y) there is a point (-x, -y)
is also on the graph.
Ex. (2, 8) and (-2, -8) are on the graph.
The graph is symmetrical with respect to the
origin.
All ODD functions have graphs with origin
symmetry.

41
SUMMARYANSWER IN COMPLETE SENTENCES.

What does it mean if a function f is increasing
on an interval?
If you are given a functions equation, how do
you determine if the function is even, odd or
neither?
Determine whether each function is even, odd or
neither.
a. f (x) x2- x4 b. f (x) x(1- x2)1/2

42
AIM 1.3B HOW DO WE UNDERSTAND AND USE PIECEWISE
FUNCTIONS?

A piecewise function is a function that is
defined by two (or more) equations over a
specified domain.

43
Example ( DO NOT COPY) READ

A cellular phone company offers the following
plan
20 per month buys 60 minutes
Additional time costs 0.40 per minute

44
HOW DO WE EVALUATE A PIECEWISE FUNCTION?
45
PRACTICE

Find and interpret each of the following
a. C (40) b. C (80)

46
HOW DO WE GRAPH A PIECEWISE FUNCTION?
47

We can use the graph of a piecewise function to
find the range of f.
What would the range be for the piecewise
function? ( For previous piecewise function)

Some piecewise functions are called step
functions because the graphs form discontinuous
steps.
One such function is called the greatest integer
function, symbolized by int (x) or
int (x) greatest integer that is less than or
equal to x.
For example
a. int (1) 1, int (1.3) 1, int (1.5) 1,
int (1.9) 1
b. int (2) 2, , int (2.3) 2 , int (2.5)
2, int (2.9) 2

49
Graph of a Step Function
50
FUNCTION AND DIFFERENCE QUOTIENTS

Definition of the Difference Quotient of a
Function
The expression for
h?0 is called
the difference quotient of the function f.

51
HOW DO WE EVALUATE AND SIMPLIFY A DIFFERENCE
QUOTIENT?

If f (x) 2x2 x 3, find and simplify each
expression
f ( x h)
Try

Steps
Replace x with (x h) each time x appears in the
equation.

52
PRACTICE

If f (x) -2x2 x 5, find and simplify each
expression
f (x h)

53
SUMMARY ANSWER IN COMPLETE SENTENCES.

What is a piecewise function?
Explain how to find the difference quotient of a
function f,
If an equation for f is given.

54
AIM 1.4 HOW DO WE IDENTIFY A LINEAR FUNCTION AND
ITS SLOPE?
Data presented in a visual form as a set of
points is called a scatter plot. A scatter plot
shows the relationship between two types of data.
55

Regression line is the line that passes through
or near the points. This is the line that best
fits the data points.
We can write an equation that models the data and
allows us to make predictions.

56
WHAT IS THE DEFINITION OF A SLOPE OF A LINE?
57
PRACTICE

Find the slope of a line.
(-3, 4) and (-4, -2)
(4, -2) and (-1, 5)

58
POINT-SLOPE FORM EQUATION

The point-slope of the equation of a nonvertical
line with slope m that passes through the point
(x1,y1) is
y y1m (x x1)

59
HOW DO WE WRITE AN EQUATION IN POINT-SLOPE FORM?

Write an equation in point-slope form for the
line with slope 4 that passes through the point
(-1, 3).
Then solve the equation for y.
Steps
Write the point-slope form equation.
y y1m (x x1)
Substitute the given values.
Then solve for y.

60
PRACTICE

Write an equation in point-slope form for the
line with slope 6 that passes through the point
(2, -5).
Then solve the equation for y.

61
HOW DO WE WRITE AN EQUATION FOR A LINE WHEN WE
ONLY HAVE TWO POINTS?

Write an equation in point-slope form for the
line that passes through the points (4, -3) and
(-2, 6).
Then solve the equation for y.
What would you need to do first?
Steps
Find the slope.
Then choose any pair of points and substitute
into the point-slope form equation.
Then solve the equation for y.

62
PRACTICE

Write an equation in point-slope form for the
line that passes through the points (-2,-1) and
(-1, -6).
Then solve the equation for y.

63
SUMMARY ANSWER IN COMPLETE SENTENCES.

What is the slope of a line and how is it found?
Describe how to write an equation of a line if
you know at least two points on that line.
How do you derive the slope-intercept equation
from y y1m (x x1)?

64
AIM 1.4B HOW DO WE WRITE AND GRAPH LINEAR
EQUATIONS IN THE FORM OF Y MXB?

Slope intercept equation is y mx b where m
is the slope and b is the y-intercept of the
equation.
Graphing y mx b using the slope and
y-intercept.
Graph the y-intercept first. (0, b)
Then use the slope to get to the other points on
the line.
Lets try

65
EQUATIONS OF HORIZONTAL LINES

A horizontal line has a m0. Therefore the
equation is y0x b which can be simplified to
y b.
Graph y 3 or f (x) 3
Note This is a constant function

66
EQUATIONS OF VERTICAL LINES

The slope of a vertical line is undefined. The
equation of a vertical line is x a, where a is
the x-intercept of the line.
Note
No vertical line represents a function.

67
WHAT IS THE GENERAL FORM OF THE EQUATION OF A
LINE?

Every line has an equation that can be written in
the general form
Ax By C or Ax By- C 0
Where A, B, C are real numbers and A and B are
not both zeros.

68
FINDING THE SLOPE AND THE Y-INTERCEPT

Find the slope and the y-intercept of the line
whose equation is 3x 2y 4 0.
Steps
The equation is given in general form. Express in
y mx b by solving for y.
Then the slope and y-intercept can be identified.

69
PRACTICE

Find the slope and the y-intercept of the line
whose equation is 3x 6y 12 0.
Then use slope and y-intercept to graph the line.

70
HOW DO WE FIND THE INTERCEPTS FROM THE GENERAL
FORM OF THE EQUATION OF A LINE?

Graph using the intercepts 4x 3y 60
Steps
To find the x-intercept. Set y 0 and solve for
x.
To find the y-intercept. Set x 0 and solve for
y.
Graph the points and draw a line connecting these
points.

71
PRACTICE

Graph using the intercepts 3x 2y 60

72
REVIEW OF THE VARIOUS EQUATIONS OF LINES
73
SUMMARYANSWER IN COMPLETE SENTENCES.

How would you graph the equation x 2. Can this
equation be expressed in slope-intercept form?
Explain.
Explain how to use the general form of a lines
equation to find the lines slope and
y-intercept.
How do you use the intercepts to graph the
general form of a lines equation?

74
Aim 1.5 How do we find the average rate of
change?

Slope as a rate of change
Example 1
The line on the graph for the number of women
and men living alone are shown in the graph.
Describe what the slope represents.

Solution Note x represents the year and y-
number of women.
Choose two points from the womens graph.
Find the slope and then describe the slope.
Remember to include the units.

76
Practice

Use the ordered pairs and find the rate of change
for the green line or men graph. Express slope
two decimal places and describe what it
represents.

77
Average Rate of Change

If the graph of the function is not a straight
line, the average rate of change between any two
points is the slope of the line containing the
two points.
This line is called the secant line.

78
Problem

Looking at the graph, what is the mans average
growth rate between the ages 13 and 18.

79
The Average Rate of Change of a Function
80
Example 1

Find the average rate of change of f (x) x2
from

Steps
Use

Find the average rate of change of f (x) x2
from

82
Average Velocity of an Object

Suppose that a function expresses an objects
position, s (t), in terms of time, t. The average
velocity of the object from t1 to t2 is

83
Example 2

The distance, s (t), in feet, traveled by a ball
rolling down a ramp is given by the function
s (t) 5t2,
where t is the time, in seconds after the ball
is released. Find the balls average velocity
from
t1 2 seconds to t2 3 seconds
t1 2 seconds to t2 2.5 seconds
t1 2 seconds to t2 2.01 seconds

84
Summary Answer in complete sentences.

If two lines are parallel, describe the
relationship between their slopes and
y-intercept.
If two line are perpendicular, describe the
relationship between their slopes.
What is the secant line?
What is the average rate of change of a function?

85
Aim 1.6 How do we recognize transformations?

Review Algebras Common Graphs (distribute)
Vertical Shift

86
Vertical Shifts

In general if c is positive, y f (x) c shifts
upward c units. If c is negative it shifts
downward c units.

87
Example 1
88
Practice

Use the graph of to obtain the
graph of

89
Horizontal Shifts

In general, if c is positive, y f (x c)
shifts the graph of f to the left c units and y
f (x c) shifts the graphs of f to the right c
units.
These are called horizontal shifts of the graph
of f.

90
Example 2
91
Note
92
Example 3

Use the graph of f (x ) x2 to obtain the graph
of h (x) (x 1)2 3.
Steps to combining a shift
Graph the original function.
Then shift horizontally.
Then shift vertically.

93
Reflections of Graphs

Reflection about the x-axis
The graph of y - f (x) is the graph of y f
(x) reflected about the x- axis.

94
Example 4

Use the graph of to obtain the
graph of

95
Reflections of Graphs

Reflection about the y-axis
The graph of y f (-x) is the graph of y f (x)
reflected over the y axis.
Example The point (2, 3) reflected over the
y-axis is (-2, 3).

96
Vertical Stretching

Let f be a function and c be a positive real
number.
If c gt 1 the graph of y c f (x) is the graph y
f (x) vertically stretched.
How?
By multiplying the y-coordinates by c.

97
Vertical Shrinking

Let f be a function and c be a positive real
number.
If 0 lt c lt 1 the graph of y c f (x) is the
graph y f (x) vertically shrunk.
How?
By multiplying the y-coordinates by c.

98
Example 6

Use the graph of f (x) x3 to obtain the graph
of
h (x)

99
Horizontal Shrinking

Let f be a function and c be a positive real
number.
If c gt 1 the graph of y f (cx) is the graph
y f (x) horizontal shrink.
How?
By dividing x- coordinates by c.

100
Horizontal Stretching

Let f be a function and c be a positive real
number.
If 0 lt c lt 1 the graph of y f (cx) is the graph
y f (x) horizontal stretch.
How?
By dividing x- coordinates by c.

101
Example 7

Use the graph y f (x) to obtain each of the
following graphs.
a. g (x) f (2x) b. h( x) f( 1/2x)

102
Sequences of Transformations

Transformations involving more than one
transformation can be graphed performing the
transformations in the following order
Horizontal shifting
Stretching or shrinking
Reflecting
Vertical shifting

103
Summary Answer in complete sentences.

What must be done to a functions equation so
that its graph is shifted vertically upward?
What must be done to a functions equation so
that its graph is shifted horizontally to the
right?
What must be done to a functions equation so
that its graph is reflected about the x-axis?
What must be done to a functions equation so
that its graph is stretched vertically?

104
Aim 1.7 What are composite functions?

Finding the domain of a function (w/ no graph).
Example 1 Find the domain of each function.

105
The Algebra of Functions

We can combine functions by addition,
subtraction, multiplication and division by
performing operations with the algebraic
expressions that appear on the right side of the
equations.
Example 2 Let f (x)2x 1 and g (x) x2 x
2
Find the following function.
Sum (f g ) (x) f (x ) g (x)
( 2x 1) (x2 x 2) 1. Substitute
given functions.
2. Simplify.

106
The Algebra of Functions
107
Example 3 Adding Functions and Determining the
Domain

Find each of the following
(f g) (x)
The domain of (f g)

108
Composite Functions

This is another way to combine functions.
Example f (g (x)) can be read as f of g of x
and it is written as

109
Example 4 Forming Composite Functions

Given f (x) 3x 4 and g (x) x2 2x 6, find
each of the following

110
Example 5 Forming a Composite Function
and Finding Its Domain
111
Practice

Given and g(x)
Find each of the following
1.
2. the domain of

112
Summary Answer in complete sentences.

Explain how to find the domain of a function of a
radical and a rational equation.
If equations for f and g are given, explain how
find f- g.
If equations for two functions are given, explain
how to obtain the quotient of the two functions
and its domain. ( ex. f/g(x))
Describe a procedure for finding .
What is the name of this function?

113
Aim 1. 8 What is an inverse function?
114
Example 1 Verifying Inverse Functions

Show that each function is the inverse of the
other
Steps
To show that f and g are inverses of each other,
we must show that f (g (x)) x and f (g (x))
x.
Begin with f (g (x))
Then with g (f (x))
Do you get x?

115
Practice

Show that each function is the inverse of the
other

116
How do we find the inverse?

Find the inverse of
f (x) 7x 5

Steps
Replace f (x) with y.
Switch x and y.
Solve for y.
Then replace y with f-1 (x)

117
How do we find the inverse?

Find the inverse of
f (x ) x3 1

Steps
Replace f (x) with y.
Switch x and y.
Solve for y.
Then replace y with f-1 (x)

118
How do we find the inverse?

Find the inverse of

Steps
Replace f (x) with y.
Switch x and y.
Solve for y.
Then replace y with f-1 (x)

119
Practice

Find the inverse for the following

Steps
Replace f (x) with y.
Switch x and y.
Solve for y.
Then replace y with f-1 (x)

120
Properties of Inverse Functions

1. A function f has an inverse that is a
function, f-1, if there is no horizontal line
that intersects the graph of the function f at
more than one point.

121
Properties of Inverse Functions

2. The graph of a functions inverse is a
reflection of the graph of f about the line y x.

122
Summary Answer in complete sentences.

Explain how to determine if two functions are
inverse of each other.
Describe how to find the inverse of a function.
What are some properties of a function and its
inverse? Draw an illustration to support your
written statement.

123
Aim 1.9 How do we find the distance and
midpoint of a segment?