student companion answers - mr. cereola's math resources
TRANSCRIPT
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Vocabulary
2-1 Relations and Functions
Review
1. For every input of a function there is exactly / at least / at most one output.
Vocabulary Builder
relation (noun) ree LAY shun
Related Words: input, output, domain, range, function
Definition: A relation is a set of ordered pairs of input and output values.
Examples: {(0, 1), (2, 3), (0, 4)}, f(x) 5 x2
Use Your Vocabulary
2. Circle the output values in the relation.
{(1, 0), (22, 3), (3, 2), (5, 24)}
3. Write the domain of the relation {(22, 3), (22, 1), (5, 4)}.
Representing a Relation
Got It? The average water temperature of the Gulf of Mexico in Key West, Florida varies during the year. In January, the average water temperature is 69° F; in February, 70° F; in March, 75° F; and in April, 78° F. How can you represent this relation in four different ways?
Complete each representation of the relation.
4. Mapping Diagram 5. Ordered Pairs
e Q Jan., 69 R , QFeb., R , QMar., R , QApr., R f
Problem 1
Chapter 2 26
relation
input (domain)
{(0, 1), (2, 3), (0, 4)}
output (range)
69
70
75
78
Jan.
Feb.
Mar.
Apr.
522, 56
70 75 78
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27 Lesson 2-1
6. Table 7. Graph
Finding Domain and Range
Got It? What are the domain and range of this relation?
{(23, 14), (0, 7), (2, 0), (9, 218), (23, 299)}
8. Complete the reasoning model below.
Identifying Functions
Got It? Is the relation a function? Domain Range
23 46
3136
11. Circle the range value(s) that correspond to domain value 2.
23 21 3 6
Complete each sentence with the word domain or range.
9. The set of x-coordinates is the 9 of the relation.
10. The set of y-coordinates is the 9 of the relation.
Problem 2
Problem 3
Jan.
Feb.
Mar.
Apr.
x (Month) y (°F)
69
70
75
78
80787674727068
0Jan. Feb. Mar. Apr.
Month
Tem
pera
ture
(°F)
First, I write the set of x-coordinates.
Then I write the set of y-coordinates.
{ 3,
{ 14,
,
Think Write
7
0 ,2 ,9 23 }
, ,0 ,18 99 }
Write T for true or F for false.
12. Every element of the input corresponds to exactly one element of the range.
13. The relation is a function.
domain
range
F
F
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Using Function Notation
Got It? For f(x) 5 24x 1 1, what is f(22)?
17. Circle the given input.
2 22 x 2x
18. Substitute the input into the function rule and simplify.
f Q R 5 24Q R 1 1
5
Writing and Evaluating a Function
Got It? You are buying bottles of a sports drink mix for a softball team. Each bottle costs $1.19. What function rule models the total cost of a purchase? Evaluate the function for 15 bottles.
19. Let c 5 9. Circle your choice.
cost per bottle cost of 15 bottles number of bottles bought total cost
20. Th en f(c) 5 9. Circle your choice.
cost per bottle cost of 15 bottles number of bottles bought total cost
Problem 5
Problem 6
Using the Vertical-Line Test
Got It? Use the vertical-line test. Which graph(s) represent(s) a function?
14. On each graph below, draw vertical lines through at least five different x-values on the graph.
A B C
15. Underline the correct word(s) to complete the sentence.
If a vertical line passes through more than one point on a graph, the graph
represents / does not represent a function.
16. Cross out each graph that is NOT a function.
Graph A Graph B Graph C
Problem 4
Chapter 2 28
y
x
y
x
y
x
22 22
9
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Lesson Check
Math Success
Now Iget it!
Need toreview
0 2 4 6 8 10
29 Lesson 2-1
• Do you UNDERSTAND?
Error Analysis Your friend writes, “In a function, every vertical line must intersect the graph in exactly one point.” Explain your friend’s error and rewrite his statement so that it is correct.
23. Draw a vertical line on each graph that does not intersect the function.
21. Complete the model to write the function.
22. Now evaluate the function for 15 bottles.
24. Now rewrite your friend’s statement.
In a function, a vertical line 9.
_______________________________________________________________________
_______________________________________________________________________
Check off the vocabulary words that you understand.
relation function domain range
Rate how well you can represent and interpret functions.
Relate is times
Write
total cost cost per cannumber of
cans bought
∙ c$ 1.19f c
y
xO 1 2 3 4 5
12345
y
xO 1 2 3
12345
23
y
xO 1 2 3
1234
231
f(c) 5 1.19 ? 155 17.85
Answers may vary. Sample: cannot intersect the graph in more
than one point.
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Vocabulary
Chapter 2 30
2-2 Direct Variation
Review
1. Cross out the ratio that is NOT equal to the others.
3.51 7
2 10.53 9
4
Solve each proportion.
2. 32 5
9x 3. x
3 51612 4. x
2 557 5. 2
9 5x
18
x 5 x 5 x 5 x 5
Vocabulary Builder
direct (adjective) duh REKT
Other Word Forms: directly (adverb), directions (plural noun)
Main Idea: Direct describes two quantities that vary in the same way: increasing together or decreasing together.
Definition: Something that is direct is proceeding from one point to another, in time or space, without interruption.
Use Your Vocabulary
Choose the correct word from the list to complete each sentence.
directly direct directions
6. Tomás gave the visitor 9 to the stadium.
7. The fans went 9 to their seats.
8. There was a 9 connection between the team’sscoring and the fans’ cheering.
6
3x 5 18 12x 5 48 7x 5 10 9x 5 36
4 107 4
directions
directly
direct
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31 Lesson 2-2
Identifying Direct Variation From Tables
Got It? For the table at the right, determine whether y varies directly with x. If so, what are the constant of variation and the function rule?
9. Write the ratio of the input-output pairs in simplest form.
(3, 21)Input-Output Pair
Ratio 213 7
(2, 14)
2 714
(1, 7)
17
1
10. Underline the correct word(s) to complete the sentence.
Since the ratio yx is / is not the same for all of the input-output pairs,
the function is / is not a direct variation.
11. If possible, identify the constant of variation and write a function rule.
k 5 y 5 x
Problem 1
Identifying Direct Variation From Equations
Got It? For the function 5x 1 3y 5 0, determine whether y varies directly with x. If so, what is the constant of variation?
12. Solve the equation for y.
13. Circle the constant of variation.
2 53 35 53 None
Using a Proportion to Solve a Direct Variation
Got It? Suppose y varies directly with x, and y 5 15 when x 5 3. What is y when x 5 12?
14. Complete the proportion below.
5y
16. When x 5 12, the value of y is .
Problem 2
Problem 3
15. Simplify the proportion you wrote in Exercise 14.
x
y3
21
2
14
1
7
27 27
60
15
3 123y 5 15 ? 12
y 5 180 4 3 5 60
5x 1 3y 5 0 3y 5 25x y 5 2
53 x
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Chapter 2 32
Graphing Direct Variation Equations
Got It? What is the graph of the direct variation equation y 5 2 23 x?
20. Complete the table.
x
y
3 0 3
2 0 2
21. Graph the direct variation.
y
xO1234 1 2 3 41234
1234
Problem 5
Using a Proportion to Solve a Problem
Got It? The number of Calories varies directly with the mass of cheese. If 50 grams of cheese contain 200 Calories, how many Calories are in 70 grams of cheese?
17. Complete the model below. Let c 5 Calories.
Relate is the same as
Write
the ratio of200 Calories to
50 grams
the ratio ofc Calories to
70 grams
c
70
200
50
18. Solve the proportion for c.
19. There are about Calories in 70 grams of cheese.
Problem 4
280
20050 5 c
70
4 5 c70
280 5 c
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33 Lesson 2-2
• Do you UNDERSTAND?
Reasoning Explain why the graph of a direct variation function always passes through the origin.
22. Write direct variation if the graph is a direct variation. Write linear if the graph is a linear function that is not a direct variation.
y
xO2 2
2
2
y
x2 2
2
2
y
xO2 2
2
2
23. Write D if the equation describes a direct variation. Write L if the equation describes a linear function that is not a direct variation.
y 5 22x
y 5 x
y 5 2x 1 2
24. Circle the true statement.
A linear function is always a direct variation. A direct variation is always a linear function.
25. Write the direct variation equation of a 26. Evaluate the function you wrote infunction with constant of variation k. Exercise 25 for x 5 0.
27. Why does the graph of a direct variation function always pass through the origin?
_______________________________________________________________________
Check off the vocabulary words that you understand.
direct variation constant of variation
Rate how well you can identify and use direct variation functions.
direct variation direct variation linear
D D L
Answers may vary. Sample: (0, 0) is always a solution of y 5 kx
y 5 kx y 5 k (0) 5 0
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Vocabulary
x y
2
3
4
5
3
1
Output
470
Input
23
y
x4 2 2 4
4
2
4a
b
cd
Chapter 2 34
2-3 Linear Functions andSlope-Intercept Form
Review
1. Circle the relation that is also a function.
{(0, 1), (21, 3), (0, 4)}
Vocabulary Builder
slope (noun) slohp
Definition: Slope is the ratio of the vertical change to the horizontal change between two points.
Main Idea: Slope describes the steepness of a line in the coordinate plane.
Example: The slope of a hill is its steepness.
Use Your Vocabulary
2. Use the graph at the right. Draw a line from the slope in Column A to the line with that slope in Column B.
Column A Column B
positive line a
negative line b
zero line c
undefined line d
slope riserun
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Horizontalline
O
y
x2 2
2
Verticalline
O
y
x2
2
2
Line rises fromleft to right
y
O
2
2 2x
Line falls fromleft to right
O
y
x2 2
2
35 Lesson 2-3
Finding Slope
Got It? What is the slope of the line that passes through the points (5, 4) and (8, 1)?
5. Let x1 5 5 and x2 5 8. Then y1 5 and y2 5 .
6. Complete the model below to find the slope.
slope 5
change
change
5 2 2 y1
2 2 x1
51 2
2
5
7. The slope of the line through the points (5, 4) and (8, 1) is .
Problem 1
Th e slope of a non-vertical line is the ratio of the vertical change to a corresponding horizontal change.
slope 5vertical change (rise)
horizontal change (run)5
y2 2 y1x2 2 x1
, where x2 2 x1 2 0
Underline the correct word to complete each sentence.
3. If x1 is less than x2, and y1 is less than y2, then the slope is positive / negative .
4. If x1 is less than x2, and y1 is greater than y2, then the slope is positive / negative .
8. Label each graph positive, negative, zero, or undefined slope.
Underline the correct word to complete each sentence.
9. A line that has zero slope is horizontal / vertical .
10. A line that has undefined slope is horizontal / vertical .
Key Concept Slope
Summary Slope of a Line
4 1
zero undefined positive negative
21
21
horizontal
vertical y
x
4
8 5
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y
xO4 4
4
4
y
xO4 4
4
4y
xO4 4
4
y
xO4 4
4
Chapter 2 36
Writing Equations in Slope-Intercept Form
Got It? Write the equation 3x 1 2y 5 18 in slope-intercept form. What are the slope and y-intercept?
17. Use the justifications at the right to solve the equation for y.
3x 1 2y 5 18 Write the original equation.
2y 5 18 2 Subtract from each side.
y 5 18 2
Divide each side by .
y 5 9 2 x Simplify.
18. In slope-intercept form, the equation is y 5 .
19. The slope is , and the y-intercept is .
Problem 3
Writing Linear Equations
Got It? What is the equation of the line with m 5 6 and y-intercept (0, 5)?
15. Write a phrase to describe each constant value.
m 5
, b 5
16. The equation of the line in slope-intercept form is .
Problem 2
Th e slope-intercept form of an equation of a line is y 5 mx 1 b, where m is the slope of the line and (0, b) is the y-intercept.
11. Place a ✓ in the box if the equation is in slope-intercept form. Place an ✗ if it is not.
y 5 3x 1 7 8y 5 x 2 11 y 5 x
12. The slope of the line with equation y 5 4x 1 2 is .
13. The y-intercept of the line with equation y 5 22x 2 3 is Q0, R .
14. Circle the graph that can be represented by the equation y 5 22x 1 3.
Key Concept Slope-Intercept Form
✓ ✗ ✓
4
3x
2
3x
3x
2
32
the slope of the line the y-coordinate of the y-intercept
y 5 6x 1 5
23
(0, 9)
2 32 x 1 9
2 32
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Lesson Check
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Now Iget it!
Need toreview
0 2 4 6 8 10
y
xO12345 1 2 3 4 51234
1234
y
xO 2 6
2
4
2
4
37 Lesson 2-3
• Do you UNDERSTAND?
Check off the vocabulary words that you understand.
linear function slope-intercept form
Rate how well you can write and graph equations of lines.
Graphing a Linear Equation
Got It? What is the graph of 4x 2 7y 5 14?
20. Write the equation in slope-intercept form.
21. Graph the function on the coordinate plane at the right.
Problem 4
Explain why the slope of a vertical line is called “undefined.”
22. Cross out the points below that are NOT on the line at the right.
(0, 4) (4, 1) (3, 4) (4, 23)
23. Find the slope of the line at the right.
m 5y2 2 y1x2 2 x1
52 Q R2
5
24. The x-coordinate of all of the points on this line is .
The difference x2 2 x1 always equals for this line.
25. Now explain why the slope of a vertical line is undefined.
_______________________________________________________________________
_______________________________________________________________________
4
0
1
4 4 0
423
Answers may vary. Sample: For any vertical line, the denominator
is always 0. Since division by 0 is undefined, the slope is undefined.
4x 2 7y 5 14 27y 5 24x 1 14
y 5 47 x 2 2
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Vocabulary
2-4 More About Linear Equations
Review
1. Write each sentence as an equation.
The sum of x and y is eight. The product of p and q is seven. The square root of y, cubed, is two.
Vocabulary Builder
intercept (noun) IN tur sept
Related Words: x-intercept, y-intercept
Definition: An intercept of a line is a point where the line crosses an axis.
Use Your Vocabulary
Use the graph at the right. Write T for true or F for false.
2. The x-intercept of the line is (4, 0).
3. The x-intercept of the line is (0, 4).
4. The y-intercept of the line is (21, 0).
5. The y-intercept of the line is (0, 21).
Slope-Intercept Form Point-Slope Form Standard Form
y 5 mx 1 b y 2 y1 5 m(x 2 x1) Ax 1 By 5 C
Use this form when you know the slope and the y-intercept.
Use this form when you know the slope and a point, or when you know two points.
A, B, and C are real numbers. A and B cannot both be zero.
Concept Summary Writing Equations of Lines
Chapter 2 38
s.
intercepts
y
xO4 2 4
2
4
2
4
x 1 y 5 8 pq 5 7 A!y B3 5 2
T
F
F
T
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39 Lesson 2-4
Writing an Equation Given a Point and the Slope
Got It? What is an equation of the line through (27, 1) with slope 23?
7. Complete the model to write the equation in point-slope form.
Writing an Equation Given Two Points
Got It? A line passes through (25, 0) and (0, 7). What is an equation of the line in point-slope form?
9. Circle the slope of the line through the points (25, 0) and (0, 7).
275 5
27 57 7
5
10. Now write the equation of the line in point-slope form.
Writing an Equation in Standard Form
Got It? What is an equation of the line y 5 9.1x 1 3.6 in standard form?
11. Error Analysis Karina made two errors while writing y 5 9.1x 1 3.6 in standard form without decimals. What are Karina’s errors? Explain how to correct them.
_______________________________________________________________________
_______________________________________________________________________
_______________________________________________________________________
6. Write I if the equation is in slope-intercept form, P if it is in point-slope form, or S if it is in standard form.
r 5 5s 1 7
8m 1 6n 5 2
y 2 3 5 x 2 1
p 5 q 1 9
Problem 1
Problem 2
Problem 3
8. Now write the equation.
Point-Slope Form
Write
y y1 x x1
∙
∙
y 1 x 73
m
y = 9.1x + 3.610y = 10(9.1x + 3.6)10y = 91x + 3.6
Karina
I S P I
y 2 1 5 23(x 1 7)
Answers may vary. Sample:
(y 2 0) 5 75(x 2 (25))
y 5 75(x 1 5)
Answers may vary. Sample: She did not distribute 10 over both 9.1x and
3.6. She also should have moved 91x to the other side of the equal sign.
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Graphing an Equation Using Intercepts
Got It? What are the intercepts of 2x 2 4y 5 8?
13. Find each intercept.
2x 2 4y 5 8 Write the original equation. 5
2x 2 4 ? 5 8 Substitute 0 for the variable. 2 ? 2 4y 5 8
2x 5 Simplify. 5 8
x 5 Simplify. y 5
14. Now plot the intercepts and draw the line.
Drawing and Interpreting a Linear Graph
Got It? The office manager of a small office ordered 140 packs of printer paper. Based on average daily use, she knows that the paper will last about 80 days. What graph represents this situation?
15. Complete the table of values. 16. Graph the situation. Label the graph.
Problem 4
Problem 5
12. Now write the equation in standard form.
Chapter 2 40
y
xO1
2
3 24 1 2 3 41
34
1234
0
140
Packs of PrinterPaper UsedDays
80
0
y
xO 80 160
80
160
Number of
Days
Pack
s o
f
Pap
er U
sed
291x 1 10y 5 36
0
8
4
8
0
24y
22
2x 2 4y
HSM11A2MC_0204_40 40HSM11A2MC_0204_40 40 3/20/09 10:06:48 AM3/20/09 10:06:48 AM
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Lesson Check
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Now Iget it!
Need toreview
0 2 4 6 8 10
41 Lesson 2-4
• Do you UNDERSTAND?
If the intercepts of a line are (a, 0) and (0, b), what is the slope of the line?
20. Use the points to calculate the slope.
slope 5y2 2 y1x2 2 x1
5Qb 2 RQ0 2 R 5
21. The slope of the line through (a, 0) and (0, b) is .
Writing Equations of Parallel and Perpendicular Lines
Got It? What is the equation, in slope-intercept form, of the line through (24, 2) and parallel to 4x 1 2y 5 7?
17. Circle the slope of the line 4x 1 2y 5 7.
272 22 2 7
2
18. Circle the form you will use to write the equation.
Slope-Intercept Form Point-Slope Form Standard Form
y 5 mx 1 b y 2 y1 5 m(x 2 x1) Ax 1 By 5 C
19. Now write and simplify the equation.
Problem 6
Check off the vocabulary words that you understand.
point-slope form slope-intercept form standard form
Rate how well you can write forms of linear equations.
y 2 2 5 22fx 2 (24)g
y 2 2 5 22(x 1 4)
y 2 2 5 22x 2 8
y 5 22x 2 6
2ba
0 b
a 2a
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Vocabulary
Chapter 2 42
2-5 Using Linear Models
Review
1. Circle the set(s) of data that you can model with a linear function.
3, 6, 9, 12, c birthdays of your classmates amount of rain each day of the week
2. Cross out the graphs that do NOT show a linear function.
y
xO 4
4
4
y
xO4 4
4
4
y
x4 4
4
4
y
xO4 4
4
4
Vocabulary Builder
correlation (noun) kawr uh LAY shun
Related Words: correspond, relate, correlation coefficient
Definition: A correlation is a relationship between two sets of data points.
Use Your Vocabulary
Choose the correlation that most closely represents each situation below. Write the letter of your choice in the box. Use each letter once.
A B C
x
y
PositiveCorrelation
x
y
NegativeCorrelation
x
y
NoCorrelation
3. the age of a used car and the car’s value
4. the color of your hair and the weather in Venezuela
5. the number of hours you work at an after-school job and the amount of your paycheck
B
C
A
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Hours Online
y
x0 1 2 3 4 5
100
90
80
70
60
50
Test
Sco
res
Years Since 1940
y
x0 10 20 30 40 50 60
250,000
200,000
150,000
100,000
50,000
Pric
e ($
)
California Median Home Prices
43 Lesson 2-5
Using a Scatter Plot
Got It? The table shows the number of hours students spent online the day before a test, and the scores on the test. Make a scatter plot. How would you describe the correlation?
100 94 98 88 92 89 75 70 78 72 57
0 0 1 1 1.5 1.75 2 2 3 4 4.5 5
60
Computer Use and Test Scores
Number of Hours Online
Test Score
6. Plot the data pairs on the coordinate plane at the right. Label the graph.
7. Place a ✔ in the box if the statement is correct. Place an ✘ if it is incorrect.
The data pairs are tightly clustered around a line.
As online time increases, test scores increase.
8. Underline the correct word(s) to complete the sentence.
There is a strong positive / weak positive / strong negative correlation between hours online and test scores.
Problem 1
Writing the Equation of a Trend Line
Got It? The table shows median home prices in California. What is an equation for a trend line that models the relationship between time and home prices?
9. Graph the data on the coordinate plane at the right. (Hint: Use 0 to represent 1940.)
10. Choose two data points on the graph through which to draw a trend line. About half of the points should be above the line and about half should be below it.
Point 1
Point 2
11. Draw the trend line on the graph.
Problem 2
1940
36,700
1950
57,900
1960
74,400
1970
88,700
1980
167,300
1990
249,800
2000
211,500
California Median Home Prices
Year
Median Price ($)
✔
✘
(10; 57,900)
(60; 211,500)
Accept reasonable selections.
Lines may vary. Check students’ work.
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Cost of 2% Milk
1998 2000 2002 2004 2006 2008Year
2.56 2.82 2.89 2.93 3.11 3.67Average cost forone gallon ($)
Chapter 2 44
Finding the Line of Best Fit
Got It? The table lists the cost of 2% milk. Use a table to find the equation of the line of best fit. Based on your linear model, how much would you expect to pay for a gallon of 2% milk in 2025?
13. Use the information in the table and 14. Use the LinReg screen below to write anthe STAT screen below to complete equation for the line of best fit. Roundeach sentence. to the nearest hundredth if necessary.
0.00002.00004.00006.00008.000010.0000
L12.56002.82002.89002.93003.11003.6700
L2 L3 1 LinRegy=ax+ba=.0923b=2.5352r2=.8469064982r=.9202752296
is year 0. y 5 x 1
2025 is year .
15. Use your equation from Exercise 14 to estimate how much you will pay for a gallon of 2% milk in 2025.
16. I would expect to pay for a gallon of 2% milk in the year 2025.
Problem 3
12. Now write an equation for the line in point-slope form.
(211,500 2 57,900) 5 m(60 2 10) 153,600 5 50m 3,072 5 mSo, y 2 211,500 5 3,072(x 2 60)
y 5 0.09(27) 1 2.54y 5 2.43 1 2.54y 5 4.97
1998
27
0.09 2.54
$4.97
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Now Iget it!
Need toreview
0 2 4 6 8 10
45 Lesson 2-5
• Do you UNDERSTAND?
Compare and Contrast What is the difference between a positive correlation and a negative correlation? How might you relate positive correlation with direct variation?
17. Use the situations in the box at the right. Write each situation in the correct oval.
Positive Correlations Negative Correlations
18. Underline the correct words to complete each sentence.
The equation of a trend line showing direct variation will look like y 5 kx.
If there is a positive correlation, k will be positive / negative , and if there is
a negative correlation, k will be positive / negative .
Check off the vocabulary words that you understand.
scatter plot correlation line of best fi t correlation coeffi cient
Rate how well you can make a scatter plot.
• As the value of one variable increases, the other decreases.
• As the value of one variable increases, the other increases.
• Example: As absences increase, test scores decrease.
• Example: As study time increases, test scores increase.
• Data points are clustered around a trend line with negative slope.
• Data points are clustered around a trend line with positive slope.
• As the value of one variable increases, the other increases.
• Example: As study time increases, test scores increase.
• Data points are clustered around a trend line with positive slope.
• As the value of one variable increases, the other decreases.
• Example: As absences increase, test scores decrease.
• Data points are clustered around a trend line with negative slope.
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Vocabulary
Chapter 2 46
2-6 Families of Functions
Review
1. Cross out the item(s) that are NOT vertical.
the y-axis the x-axis the horizon columns rows
Vocabulary Builder
translation (noun) trans LAY shun
Other Word Forms: translate (verb), translatable (adjective), translation (noun)
Definition: A translation is a change from one form, state, or appearance to another.
Math Usage: A translation shifts the graph of a parent function horizontally, vertically, or both without changing its size or shape.
Use Your Vocabulary
2. Complete each statement with the correct form of the word translation.
NOUN The graph shows a vertical 9 of the function.
ADJECTIVE The toddler’s language was not 9 .
VERB The Spanish teacher helped the town mayor 9 the letter.
3. Complete the graphic organizer below.
translationTransformations
Vertical
translation
Horizontal
k units,y f(x) k,
k 0
up
k units,y f(x) k,
k 0
down
h units,y f(x h),
h 0
right
h units,y f(x h),
h 0
left
translation
translatable
translate
HSM11A2MC_0206_46 46HSM11A2MC_0206_46 46 3/13/09 10:41:35 AM3/13/09 10:41:35 AM
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Airplane Altitude
Alt
itud
e(t
hous
ands
of f
eet)
Hours After Noon42
00
3
9
15
21
lane Altitu
f(x)
Airplane Altitude
Alt
itud
e(t
hous
ands
of f
eet)
Hours After Noon42
00
3
9
15
21
Airplane Altitude
Alt
itud
e(t
hous
ands
of f
eet)
Hours After Noon42
00
3
9
15
21
Airplane Altitude
Alt
itud
e(t
hous
ands
of f
eet)
Hours After Noon20
02
3
9
15
21
2
1
0
1
2
y 2xx
4
2
0
2
4
y 2x 3
7
5
3
1
1
y
xO12345 1 2 3 4 512345
12345
y 2x 3
y 2x
47 Lesson 2-6
Vertical Translation
Got It? How are the functions y 5 2x and y 5 2x 2 3 related? How are their graphs related?
4. Complete the table of values. 5. Draw the graphs on the coordinate plane below.
6. Write T for true or F for false.
Each output value for y 5 2x 2 3 is three less than the corresponding output value for y 5 2x .
The graph of y 5 2x 2 3 is the graph of y 5 2x stretched vertically two units.
The graph of y 5 2x 2 3 is the graph of y 5 2x translated down three units.
The graphs of y 5 2x 2 3 and y 5 2x are parallel.
Problem 1
Horizontal Translation
Got It? The graph shows the projected altitude f(x) of an airplane scheduled to depart an airport at noon. If the plane leaves 30 minutes early, what function represents this transformation?
7. Circle the graph below that shows the plane leaving 30 minutes early.
Problem 2
T
F
T
T
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y
xO2345 1 3 5
345
12345
f(x)
h(x)
5 2
f(x) h(x)x
23
23
13
23
1
5 2
2 2
0 3
3 1
y
xO1234 1 2 3 41234
1234
h(x) 3x 3
f(x) 3x 3
Chapter 2 48
Stretch and Compression
Got It? For the function f (x) in the table below, what are the corresponding table and graph for the transformation h(x) 5 1
3 f (x)?
11. Complete the table of output values. 12. Graph h(x) on the coordinate plane below.
Problem 4
Reflecting a Function Algebraically
Got It? Let h(x) be the reflection of f (x) 5 3x 1 3 in the x-axis. What is a function rule for h(x)?
9. Circle the function that shows f (x) reflected in the x-axis.
f (2x) 2f (x)
10. Write the function rule for h(x) below. Then graph h(x) and f(x) to check the reflection.
Problem 3
8. Circle the function that represents this transformation.
f (x 1 30) f (x 2 30) f Qx 1 12R f Qx 2 1
2R
h(x) 5 2f(x)h(x) 5 2(3x 1 3)h(x) 5 23x 2 3
HSM11A2MC_0206_48 48HSM11A2MC_0206_48 48 3/13/09 10:41:52 AM3/13/09 10:41:52 AM
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Lesson Check
Math Success
Now Iget it!
Need toreview
0 2 4 6 8 10
y
xO2345 1 3 5
345
12345
f(x) 0.5x 1
h(x) xg(x) x 2
1 2 412
49 Lesson 2-6
• Do you UNDERSTAND?
Compare and Contrast The graph below shows f (x) 5 0.5x 2 1. Graph g(x) by translating f(x) up 2 units and then stretching it vertically by a factor of 2. Graph h(x) by stretching f(x) by a factor of 2 and then translating it up 2 units. Compare the graphs of g(x) and h(x).
15. Graph g(x) and h(x). 16. Underline the correct word(s) or expression to complete each sentence or equation.
g(x) and h(x) are / are not the same function.
g(x) 5 x 1 2 / x 2 2 / x / 2x
h(x) 5 x 1 2 / x 2 2 / x / 2x
g(x) and h(x) are
the same / parallel / perpendicular lines.
Check off the vocabulary words that you understand.
translation reflection transformation stretch compression
Rate how well you can transform linear functions.
Combining Transformations
Got It? The function f(x) 5 x. The graph of g(x) is f(x) stretched vertically by a factor of 2 and translated down 3 units. What is the function rule for g(x)?
13. Underline the correct word or expression to complete each sentence.
The function f (x) 5 x stretched vertically by a factor of 2 is
x 1 2 / x 2 2 / 2x / 22x .
The function f (x) 5 x stretched vertically by a factor of 2 and then translated
down 3 units is 22x 1 3 / 2x 2 3 / 22x 2 3 / 2x 1 3 .
14. The function rule for the combined transformation is .
Problem 5
g(x) 5 2x 2 3
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Vocabulary
2-7 Absolute Value Functions and Graphs
Review
Simplify each absolute value expression.
1. u 3(5 2 7) u 5 2. 2u28 u 5 3. u 4 u 2 u 9 u 5 4. u 2 2 u 5 u u 5
5. Absolute values are always negative / non-negative / zero .
Vocabulary Builder
symmetry (noun) SIM uh tree
Related Words: axis of symmetry, symmetrical, symmetric
Definition: Symmetry is a correspondence in size, shape, and relative position of parts on opposite sides of an axis of symmetry.
Math Usage: The graph of y 5 u x u is a mirror image of itself over its axis of symmetry, x 5 0.
Use Your Vocabulary
6. Draw a line of symmetry through each fi gure.
7. Cross out the graph that does NOT show symmetry around the y-axis.
The Ms inSYMMETRY aresymmetric.
SYMMETRY
y
xO4 2 2 4
2
4
6
y
xO4 2 2 4
2
4
2
y
xO4 2 2 4
2
2
4
Chapter 2 50
6 28 25 3
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51 Lesson 2-7
Graphing an Absolute Value Function
Got It? What is the graph of the function y 5 »x… 1 2? How is this graph different from the parent function f (x) 5 »x…?
8. Complete the table of values.
9. Use the table from Exercise 8. Circle the graph of y 5 u x u 1 2.
10. Describe how the graph of y 5 u x u 1 2 differs from the graph of the parent function.
_______________________________________________________________________
_______________________________________________________________________
Problem 1
Parent Function y 5 »x…
Vertical Translation Horizontal Translation
Translation up k units, k . 0 Translation right h units, h . 0 y 5 u x u 1 k y 5 u x 2 h u
Translation down k units, k . 0 Translation left h units, h . 0 y 5 u x u 2 k y 5 u x 1 h u
Vertical Stretch and Compression Refl ection
Vertical stretch, a . 0 In the x-axis y 5 a u x u y 5 2u x u
Vertical compression, 0 , a , 1 In the y-axis y 5 a u x u y 5 u2x u
11. Place a ✓ in the box if the statement describes a transformation of the parent
function y 5 u x u for g(x) 5 213 u x 1 5 u 1 2. Place an ✗ if it does not.
translation right 5 units translation left 5 units compression by a factor of 13
refl ection in the x-axis translation up 2 units refl ection in the y-axis
Key Concept The Family of Absolute Value Functions
x
y
3 1 0 1 3
5 3 2 3 5
y
xO4 2 2 4
2
4
2
4y
xO4 2 2 4
2
4
4y
xO4 2 2 4
2
4
2
4
Answers may vary. Sample: The graph of y 5 »x… 1 2 is the graph of
the parent function translated up 2 units.
✗
✓
✔
✔
✓
✗
HSM11A2MC_0207_51 51HSM11A2MC_0207_51 51 3/19/09 3:14:37 PM3/19/09 3:14:37 PM
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Chapter 2 52
Vertical Stretch and Compression
Got It? What is the graph of the function y 5 2»x…?
12. Complete the table of values. 13. Plot the points and connect them.
14. Error Analysis A student compares the shapes of the graphs of y 5 u x u 1 2 and y 5 2 u x u . She concludes that when a graph is compressed, the value of its slope increases. Explain her error.
_______________________________________________________________________
_______________________________________________________________________
_______________________________________________________________________
_______________________________________________________________________
Problem 3
Identifying Transformations
Got It? What are the vertex, axis of symmetry, and transformations of the function y 5 22»x 2 1… 2 3?
15. Compare y 5 22 u x 2 1 u 2 3 with the general form y 5 a u x 2 h u 1 k. Write the values of a, h, and k.
a 5 h 5 k 5
Underline the correct equation, point, value, or word to complete each sentence.
16. In the function y 5 22 u x 2 1 u 2 3, the vertex is (1, 3) / (0, 0) / (1, 23) .
17. The axis of symmetry is y 5 1 / x 5 0 / y 5 23 / x 5 1 .
18. The function is translated 1 / 2 / 3 unit(s) to the right and 1 / 2 / 3 unit(s) up / down .
19. The function is stretched / compressed by a factor of 1 / 2 / 22 and reflected
across the x-axis / y-axis .
Problem 4
x y
2
1
0
1
2
0
2
4
4
2
y
xO12345 1 2 3 4 512345
12345
Answers may vary. Sample: The graph of y 5 2»x… is more narrow than
the graph of y 5 »x… 1 2, so, she concludes that y 5 2»x… is compressed.
However, y 5 2»x… is actually stretched by a factor of 2. Therefore, when
a graph is stretched, the absolute value of its slope increases.
22 1 23
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Now Iget it!
Need toreview
0 2 4 6 8 10
O62 x
y
53 Lesson 2-7
• Do you UNDERSTAND?
Is it true that, without making a graph of an absolute value function, you can describe its position on a graph? Explain with an example.
Circle each function.
22. The function y 5 u x u reflected across the x-axis.
y 5 2u x u y 5 u2x u y 5 u x u 2 1 2y 5 2u x u
23. The function y 5 u x u translated 3 units to the left and 2 units up.
y 5 u x 2 2 u 1 3 y 5 u x 1 2 u 2 3 y 5 u x 1 3 u 1 2 y 5 u x 2 3 u 2 2
Check off the vocabulary words that you understand.
absolute value function axis of symmetry vertex
Rate how well you can graph absolute value functions.
.
Writing an Absolute Value Function
Got It? What is the equation of the absolute value function?
20. Complete the model to write the equation.
21. The equation of the absolute value function is .
Problem 5
1Identify the stretch or compression.
a 14
Identify the vertex.
(h, k) ,2 2 1
Substitute the values of a, h, and k
into the general form, y a x h k.
y
314 2 1x
y 5 14»x 2 2… 2 1
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Vocabulary
Chapter 2 54
2-8 Two-Variable Inequalities
Review
1. Circle each inequality.
15 , 32 45 , 46 227 2 3x 17x 5 34
Complete each inequality with R or S.
2. 22 1 3. 0.05 0.5 4. 86 16
6 5. 2 25 7
4
Vocabulary Builder
boundary (noun) BOWN dree
Math Usage: A boundary is the line that separates the coordinate plane into two half-planes, one of which consists of the solutions of an inequality.
Example: y 5 2x 1 1 is the boundary of y # 2x 1 4.
Use Your Vocabulary
6. Circle the inequalities that have a dashed boundary line. Underline the inequalities that have a solid boundary line.
y , 3x 2y 2 3x # 9 4y $ x 2 1 y . 25x 1 4
Graphing a Linear Inequality
Got It? What is the graph of the inequality y L 22x 1 1?
Underline the correct word(s) to complete each sentence.
7. The boundary line of the graph is a solid / dashed line.
8. The test point (0, 0) satisfies / does not satisfy the inequality.
9. The graph of the solution should be shaded above / below the boundary line.
Problem 1
R R R S
HSM11A2MC_0208_54 54HSM11A2MC_0208_54 54 3/13/09 10:43:00 AM3/13/09 10:43:00 AM
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d.y
xO1234 1 2 3 41234
1234
Tickets to Ride
Small Rides3 Tickets
Large Rides5 Tickets
y
xO 8 16 24 32 40
24
16
8
No. of Small Rides
No
. of
Larg
e R
ides
Tickets to Ride
55 Lesson 2-8
Using a Linear Inequality
Got It? The sign shows the number of tickets needed for small or large rides at the fair. You would like to get on both types of rides. You can buy 60 tickets with $15. You decide to spend no more than $30 for tickets. What are the possible combinations of small and large rides that you can take? Use a graph to find your answer.
11. Circle the greatest number of tickets you can buy with $30.
30 60 120
12. Circle the symbol that represents no more than.
, . # $
13. Complete the model below.
the number of tickets for large rides.
Relate plus is no more than
Write
120
120
the number oftickets for large rides
the number oftickets for small rides
Define Let x the number of tickets for small rides.
Let y
x3 y5
14. Graph the inequality that represents the combinations of rides.
Problem 2
10. Graph the inequality.
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x
y
22610
4
2 x
Chapter 2 56
Writing an Inequality Based on a Graph
Got It? What inequality does this graph represent?
18. Circle the parent function.
y 5 u x u y 5 2u x u
19. Circle the function that shows a reflection over the x-axis.
y 5 u x u y 5 2u x u
Problem 4
Graphing an Absolute Value Inequality
Got It? What is the graph of y 2 4 L 2»x 2 1…?
16. Complete the reasoning model at the right.
I need to solve theinequality for y.
Now I can compare theboundary line of theinequality with theparent function.
I need to pick a test pointto decide which half of theplane to shade.
WriteThink
y 2 x 1 4
The boundary line is narrower.
It is shifted unit right
and units up.
1
4
Point (1, 5) is / is not
a solution of the inequality.
Shade above / below
the boundary line.
17. Graph the absolute value inequality y 2 4 $ 2 u x 2 1 u.
y
xO12345 1 2 3 4 52468
2468
Problem 3
15. Complete the sentence with the words below. Use each word once.
combinations shaded whole
All points with 9 number coordinates in the 9
region represent possible 9 of small and large rides.
shaded
combinations
whole
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Lesson Check
Math Success
Now Iget it!
Need toreview
0 2 4 6 8 10
57 Lesson 2-8
• Do you UNDERSTAND?
Reasoning Is the ordered pair Q 34
, 0R a solution of 3x 1 y S 3? Explain.
Underline the word(s) or number(s) to complete each sentence.
24. The value of 3x 1 y when x 5 34 and y 5 0 is 64 / 94 / 9
12 .
25. Substituting Q 34
, 0R into 3x 1 y . 3 results / does not result in a true inequality.
26. The ordered pair Q 34
, 0R is / is not a solution of 3x 1 y . 3.
Check off the vocabulary words that you understand.
absolute value inequality linear inequality boundary
Rate how well you can graph two-variable inequalities.
20. Underline the correct word(s) to complete each sentence.
The graph is / is not stretched.
The graph is / is not compressed.
21. Circle the function rule that completes the sentence.
Transformations of the parent function are shown by 9.
f (x) 5 2a u x 1 h u 1 k f (x) 5 a u x 2 h u 1 k f (x) 5 2a u x 2 h u 2 k
22. The vertex of the function is (24, 3). Choose from the words left of, right of, up from, or down from to complete each description.
left of up from
( 4, 3)
4 units 3 units
x -axisthe the y -axis
23. Use your answers to Exercises 18–22 to write the function.
y S 2»x 1 4… 1 3
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