0% found this document useful (0 votes)

47 views99 pages

Reteach 7th

The document provides a series of lessons on adding, subtracting, multiplying, and dividing integers, including operations with the same and different signs. It includes examples, step-by-step instructions, and practice problems for students to complete. Additionally, it covers converting mixed numbers to decimals and adding rational numbers using a balance scale method.

Uploaded by

Joe Ko

We take content rights seriously. If you suspect this is your content, claim it here.

Available Formats

Download as PDF, TXT or read online on Scribd

0% found this document useful (0 votes)

47 views99 pages

Reteach 7th

Uploaded by

Joe Ko

We take content rights seriously. If you suspect this is your content, claim it here.

Available Formats

Download as PDF, TXT or read online on Scribd

You are on page 1/ 99

Name ____________________ Date Class

LESSON
Adding Integers with the Same Sign
1-1
Reteach

How do you add integers with the same sign?

Add 4 + 5 . Add −3 + ( −4 ) .

Step 1 Check the signs. Are the integers Step 1 Check the signs. Are the integers
both positive or negative? both positive or negative?
4 and 5 are both positive. −3 and −4 are both negative.
Step 2 Add the integers. Step 2 Ignore the negative signs for now.
4+5 = 9 Add the integers.
Step 3 Write the sum as a positive number. 3+4 = 7
4+5 = 9 Step 3 Write the sum as a negative
number.
−3 + ( −4 ) = −7

Find each sum.

1. 3 + 6 2. −7 + ( −1)
a. Are the integers both positive or a. Are the integers both positive or

negative? _ negative? _

b. Add the integers. b. Add the integers.

c. Write the sum. 3 + 6 = c. Write the sum. −7 + ( −1) =

3. −5 + ( −2 ) 4. 6 + 4
a. Are the integers both positive or a. Are the integers both positive or

negative? _ negative? _

b. Add the integers. b. Add the integers.

c. Write the sum. −5 + ( −2 ) = c. Write the sum. 6 + 4 =

Find each sum.

5. −10 + ( −3 ) = 6. −4 + ( −12 ) =

7. 22 + 15 = 8. −10 + ( −31) =

9. −18 + ( −6 ) = 10. 35 + 17 =

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
4
Name ________________________________________ Date __________________ Class __________________

LESSON
Adding Integers with Different Signs
1-2
Reteach

This balance scale “weighs” positive and negative numbers. Negative

numbers go on the left of the balance, and positive numbers go on the right.

Find −11 + 8. Find −2 + 7.

The scale will tip to the left side because the The scale will tip to the right side because
sum of −11 and +8 is negative. the sum of −2 and +7 is positive.
−11 + 8 = −3 −2 + 7 = 5

Find 3 + (−9).

1. Should you add or subtract 3 and 9? Why?

_________________________________________________________________________________________

2. Is the sum positive or negative? ___________________________

3 + (−9) = −6

the sign of the integer

with the greater
absolute value

Find the sum.

3. 7 + (−3) = 4. −2 + (−3) = 5. −5 + 4 =

6. −3 + (−1) = 7. −7 + 9 = 8. 4 + (−9) =

9. 16 + (−7) = 10. −21 + 11 = 11. −12 + (−4) =

12. When adding 3 and −9, how do you know that the sum is negative?

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
10
Name ________________________________________ Date __________________ Class __________________

LESSON
Subtracting Integers
1-3
Reteach

The total value of the three cards shown is −6.

3 + (−4) + (−5) = −6

What if you take away the 3 card?

Cards −4 and −5 are left. The new value is −9.
−6 + −(3) = −9
What if you take away the −4 card?
Cards 3 and −5 are left. The new value is −2.
−6 − (−4) = −2

Answer each question.

1. Suppose you have the cards shown.

The total value of the cards is 12.

a. What if you take away the 7 card? 12 − 7 = ________

b. What if you take away the 13 card? 12 − 13 = ________

c. What if you take away the −8 card? 12 − (−8) = ________

2. Subtract. −4 − (−2).
a. −4 < −2. Will the answer be positive or negative? ___________________

b. | 4 | − | 2 | = ________

c. –4 – (−2) = ________

Find the difference.

3. 31 − (−9) = 4. 15 − 18 = 5. −9 − 17 =

6. −8 − (−8) = 7. 29 − (−2) = 8. 13 − 18 =

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
16
Name ________________________________________ Date __________________ Class __________________

LESSON
Applying Addition and Subtraction of Integers
1-4
Reteach

How do you find the value of expressions involving addition and

subtraction of integers?
Find the value of 17 − 40 + 5.
(17 + 5) − 40 Regroup the integers with the same sign.
22 − 40 Add inside the parentheses.
22 − 40 = −18 Subtract.
So, 17 − 40 + 5 = −18.

Find the value of each expression.

1. 10 − 19 + 5 2. −15 + 14 − 3
a. Regroup the integers. a. Regroup the integers.

___________________________________ ____________________________________

b. Add and subtract. b. Add and subtract.

___________________________________ ____________________________________

c. Write the sum. 10 − 19 + 5 = c. Write the sum. −15 + 14 − 3 =

3. −80 + 10 − 6 4. 7 − 21 + 13
a. Regroup the integers. a. Regroup the integers.

___________________________________ ____________________________________

b. Add and subtract. b. Add and subtract.

___________________________________ ____________________________________

c. Write the sum. −80 + 10 − 6 = c. Write the sum. 7 − 21 + 13 =

5. −5 + 13 − 6 + 2 6. 18 − 4 + 6 − 30
a. Regroup the integers. a. Regroup the integers.

___________________________________ ____________________________________

b. Add and subtract. b. Add and subtract.

___________________________________ ____________________________________

c. Write the sum. −5 + 13 − 6 + 2 = c. Write the sum.18 − 4 + 6 − 30 =

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
22
Name ________________________________________ Date __________________ Class __________________

LESSON
Multiplying Integers
2-1
Reteach

You can use patterns to learn about multiplying integers.

6(2) = 12
−6
6(1) = 6 Each product is 6 less than the previous product.
−6
6(0) = 0 The product of two positive integers is positive.
−6
6(−1) = −6 The product of a positive integer and a negative
−6 integer is negative.
6(−2) = −12

Here is another pattern.

−6(2) = −12
+6 Each product is 6 more than the previous
−6(1) = −6 product.
+6
−6(0) = 0 The product of a negative integer and a positive
+6 integer is negative.
−6(−1) = 6
+6 The product of two negative integers is positive.
−6(−2) = 12

Find each product.

1. 1(−2) 2. −6(−3)
Think: 1 × 2 = 2. A negative and a Think: 6 × 3 = 18. Two negative
positive integer have a negative product. integers have a positive product.

________________________________________ ________________________________________

3. (5)(−1) 4. (−9)(−6) 5. 11(4)

____________ _ ______________

Write a mathematical expression to represent each situation.

Then find the value of the expression to solve the problem.
6. You are playing a game. You start at 0. Then you score −8 points on
each of 4 turns. What is your score after those 4 turns?

_________________________________________________________________________________________

7. A mountaineer descends a mountain for 5 hours. On average, she

climbs down 500 feet each hour. What is her change in elevation after
5 hours?

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
29
Name ________________________________________ Date __________________ Class __________________

LESSON
Dividing Integers
2-2
Reteach

You can use a number line to divide a negative integer by a positive

integer.
−8 ÷ 4

Step 1 Draw the number line.

Step 2 Draw an arrow to the left

from 0 to the value of the
dividend, −8.

Step 3 Divide the arrow into the

same number of small
parts as the divisor, 4.

Step 4 How long is each small

arrow? When a negative
is divided by a positive Each arrow is −2.
the quotient is negative,
so the sign is negative.

So, −8 ÷ 4 = −2.

On a number line, in which direction will an arrow that represents the

dividend point? What is the sign of the divisor? Of the quotient?
−39
1. 54 ÷ −9 2. −4 −52 3.
3
Dividend: _________________ Dividend: _________________ Dividend: ______________
Sign of Sign of Sign of
Divisor: _________________ Divisor: _________________ Divisor: ________________
Sign of Sign of Sign of
Quotient: _________________ Quotient: _________________ Quotient: _______________

Complete the table.

4.
Divisor Dividend Quotient
+ +
+
− −
+

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
35
Name ________________________________________ Date __________________ Class __________________

LESSON
Applying Integer Operations
2-3
Reteach

To evaluate an expression, follow the order of operations.

1. Multiply and divide in order from left to right. (−5)(6) + 3 + (−20) ÷ 4 + 12

−30 + 3 + (−20) ÷ 4 + 12

−30 + 3 + (−20) ÷ 4 + 12
−30 + 3 + (−5) + 12

2. Add and subtract in order from left to right. −30 + 3 + (−5) + 12

−27 + (−5) + 12
−32 + 12 = −20

Name the operation you would do first.

1. −4 + (3)(−8) + 7 2. −3 + (−8) − 6

________________________________________ ________________________________________

3. 16 + 72 ÷ (−8) + 6(−2) 4. 17 + 8 + (−16) − 34

________________________________________ ________________________________________

5. −8 + 13 + (−24) + 6(−4) 6. 12 ÷ (−3) + 7(−7)

________________________________________ ________________________________________

7. (−5)6 + (−12) − 6(9) 8. 14 − (−9) − 6 −5

________________________________________ ________________________________________

Find the value of each expression.

9. (−6) + 5(−2) + 15 10. (−8) + (−19) − 4 11. 3 + 28 ÷ (−7) + 5(−6)

____________ _ ______________

12. 15 + 32 + (−8) −6 13. (−5) + 22 + (−7) + 8(−9) 14. 21 ÷ (−7) + 5(−9)

____________ _ ______________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
41
Name ________________________________________ Date __________________ Class __________________

LESSON
Rational Numbers and Decimals
3-1
Reteach

A teacher overheard two students talking about how to write a mixed

number as a decimal.
1 1 1
Student 1: I know that is always 0.5, so 6 is 6.5 and 11 is 11.5.
2 2 2
1
I can rewrite any mixed number if the fraction part is .
2
Student 2: You just gave me an idea to separate the whole number part
1
and the fraction part. For 5 , the fraction part is
3
1 1
= 0.333... or 0.3 , so 5 is 5.333... or 5.3 .
3 3
I can always find a decimal for the fraction part, and then
write the decimal next to the whole number part.
The teacher asked the two students to share their ideas with the class.

For each mixed number, find the decimal for the fraction part. Then
write the mixed number as a decimal.
3 5
1. 7 2. 11
4 6

________________________________________ ________________________________________

3 5
3. 12 4. 8
10 18

________________________________________ ________________________________________

For each mixed number, use two methods to write it as a decimal.

Do you get the same result using each method?
2
5. 9
9

_________________________________________________________________________________________

5
6. 21
8

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
48
Name ________________________________________ Date __________________ Class __________________

LESSON
Adding Rational Numbers
3-2
Reteach

This balance scale “weighs” positive and negative numbers.

Negative numbers go on the left of the balance. Positive numbers go on the right.

The scale will tip to the left The scale will tip to the right Both −0.2 and −1.5 go on
side because the sum of −11 side because the sum of the left side. The scale will
tip to the left side because
and + 8 is negative. 1
−2 and + 7 is positive. the sum of −0.2 and −1.5 is
2
negative.
1 1
−11 + 8 = −3 −2 + 7 = +4 −0.2 + (−1.5) = −1.7
2 2

Find 3 + (−9).
Should you add or subtract?
Will the sum be positive or negative?

3 + (−9) = −6

Find each sum.

1. −2 + 4 = _________ 2. 3 + (−8) = _ 3. −5 + (−2) = _____

4. 2.4 + (−1.8) = ____ 5. 1.1 + 3.6 = _ 6. −2.1 + (−3.9) = _

4 ⎛ 1⎞ 1 ⎛ 1⎞ 7 3
7. + ⎜ − ⎟ = _____________ 8. −1 + − = ____________ 9. − + = _____________
5 ⎝ 5⎠ 3 ⎜⎝ 3 ⎟⎠ 8 8

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
54
Name ________________________________________ Date __________________ Class __________________

LESSON
Subtracting Rational Numbers
3-3
Reteach

The total value of the three cards shown is −4 1 .

3 1 −5
−2
2

1
What if you take away the −2 card?
2 What if you take away the −5 card?
Cards 3 and −5 are left. 1
Cards 3 and −2 are left.
Their sum is −2. 2
1
Their sum is .
1 ⎛ 2
− −2 ⎞ = −2 .
1
So, −4
2 ⎜⎝ 2 ⎟⎠ 1
So, −4 − ( −5) =
1
2 2

Answer each question.

1. The total value of the three cards shown is 12.

7 13 −8

a. What is the value if you take away just the 7? _________________

b. What is the value if you take away just the 13? _________________

c. What is the value if you take away just the −8? _________________

2. Subtract −4 − (−2).

a. −4 < −2. So the answer will be a _________________ number.

b. |4| − |2| = c. −4 − (−2) =

Subtract.

3. 31 − (−9) = 4. 15 − 18 = 5. −9 − 17 =

6. 2.6 − (−1.6) = 7. 4.5 − 2.5 = 8. −2.0 − 1.25 =

4 ⎛ 1⎞ 1 ⎛ 1⎞ 7 3
9. − − = ________ 10. −2 − − = ________ 11. − − = ________
5 ⎜⎝ 5 ⎟⎠ 3 ⎜⎝ 3 ⎟⎠ 8 8

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
60
Name ________________________________________ Date __________________ Class __________________

LESSON
Multiplying Rational Numbers
3-4
Reteach

You can use a number line to multiply rational numbers.

5 × ⎛⎜ − ⎞⎟
1
⎝ 2 ⎠
1
How many times is the − multiplied?
2
1
Five times, so there will be 5 jumps of unit each along the number line.
2
Your first jump begins at 0. In which direction should you move?
1
− is negative, and 5 is positive. They have different signs. So, each
2
jump will be to the left.
(When both numbers have the same sign, each jump will be to the right.)

Name the numbers where each jump ends, from the first to the fifth
jump.
1 1 1
− , −1, −1 , −2, −2
2 2 2

So, 5 × ⎛⎜ − ⎞⎟ = −2 .
1 1
⎝ 2⎠ 2

Find each product. Draw a number line for help.

1
1. 6 ×
4
1
Multiply how many times? ____
4
Which direction on the number line? _________________
Move from 0 to where? ____ Product: _________________

2. −8 (−3.3)
Multiply (−3.3) how many times? ____
Move from 0 to where? ____ Product: _________________

3. 4.6 × 5
Multiply 4.6 how many times? ____
Move from 0 to where? ____ Product: _________________
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
66
Name ________________________________________ Date __________________ Class __________________

LESSON
Dividing Rational Numbers
3-5
Reteach
To divide fractions:
• Multiply the first, or “top,” number by the reciprocal of the second, or
“bottom,” number.
• Check the sign.
3 2
Divide: − ÷
5 3

Step 1: Rewrite the problem to multiply by the reciprocal.

3 2 3 3
− ÷ = − ×
5 3 5 2

Step 2: Multiply.
3 3 −3 × 3 −9
− × = =
5 2 5×2 10

Step 3: Check the sign.

A negative divided by a positive is a negative.
−9
So, is correct.
10
3 2 9
− ÷ = −
5 3 10

Write the sign of each quotient. Do not do the problem.

1 1 5 2 ⎛ 3⎞
1. 4 ÷3 2. −3.5 ÷ 0.675 3. 4. − ÷ −
4 2 ⎛ 3⎞ 9 ⎜⎝ 8 ⎟⎠
⎜− ⎟
⎝ 5⎠
_________________ _________________ _________________ ________________

Complete the steps described above to find each quotient.

1 ⎛ 5⎞ 7 8
5. − ÷ − 6. ÷
7 ⎜⎝ 9 ⎟⎠ 8 9

Step 1: _ Step 1: _

Step 2: _ Step 2: _

Step 3: _ Step 3: _

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
72
Name ________________________________________ Date __________________ Class __________________

LESSON
Applying Rational Number Operations
3-6
Reteach
To multiply fractions and mixed numbers:
Step 1: Write any mixed numbers as improper fractions. Remember, positive
Step 2: Multiply the numerators. times negative equals
Step 3: Multiply the denominators. negative.
Step 4: Write the answer in simplest form.
⎛ 4⎞
1
Multiply : 6i ⎜ −1 ⎟
4 8 4 ⎝ 5⎠
Multiply : i
9 3 1 ⎛ 4 ⎞ 25 ⎛ −9 ⎞
Divide numerator 6 i ⎜ −1 ⎟ = i⎜ ⎟
4 3 4i3 and denominator 4 ⎝ 5⎠ 4 ⎝ 5 ⎠
i =
9 8 9i8 by 12, the GCF. 25 i ( −9)
=
12 4i5
=
72 −225
=
1 20
=
6 1
= −11
4

Use the models to solve the problems.

4 1
1. One cup of dog food weighs 1 ounces. A police dog eats 6 cups of
5 3
food a day. How many ounces of food does the dog eat each day?

_________________________________________________________________________________________

2
2. A painter spends 3 hours working on a painting. A sculptor spends 2
3
as long working on a sculpture. How long does the sculptor work?

_________________________________________________________________________________________

7
3. A meteorite found in the United States weighs as much as one
10
found in Mongolia. The meteorite found in Mongolia weighs 22 tons.
How much does the one found in the United States weigh?

_________________________________________________________________________________________

1
4. A chicken salad recipe calls for pound of chicken per serving. How
8
1
many pounds of chicken are needed to make 8 servings?
2

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
78
Name ________________________________________ Date __________________ Class __________________

LESSON
Unit Rates
4-1
Reteach

A rate is a ratio that compares two different kinds of quantities or

measurements.

3 aides for 24 students 135 words in 3 minutes 7 ads per 4 pages

3 aides 135 words 7 ads
24 students 3 minutes 4 pages

Express each comparison as a rate in ratio form.

1. 70 students per 2 teachers 2. 3 books in 2 months 3. $52 for 4 hours of work

In a unit rate, the quantity in the denominator is 1.

300 miles in 6 hours 275 square feet in 25 minutes

300 miles 300 ÷ 6 50 miles 275 ft 2 275 ÷ 25 11 ft 2
= = = =
6 hours 6÷6 1 hour 25 min 25 ÷ 25 1 min

Express each comparison as a unit rate. Show your work.

4. 28 patients for 2 nurses _____________________________________________________

5. 5 quarts for every 2 pounds __________________________________________________

When one or both of the quantities being compared is a fraction, the rate
is expressed as a complex fraction. Unit rates can be used to simplify
rates containing fractions.

1 1 2
15 miles every hour cup for every minute
2 4 3
1 3
c c
15 miles 1 15 2 30 miles 1 2 1 3
= 15 ÷ = × = 4 = ÷ = × = 8
1 2 1 1 1 hour 2 4 3 4 2 1 min
hour min
2 3

Complete to find each unit rate. Show your work.

3 2 11
6. 3 ounces for every cup 7. 3 feet per hour
4 3 60

________________________________________ ________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
85
Name ________________________________________ Date __________________ Class __________________

LESSON
Constant Rates of Change
4-2
Reteach

A proportion is an equation or statement that two rates are the same.

In 1 hour of babysitting, Rajiv makes $8.
He makes $16 in 2 hours, and $24 in 3 hours.
The same information is shown in the table below.

Time Worked (h) 1 2 3

Total Wage ($) 8 16 24

To see if this relationship is proportional, find out if the rate of change is

constant. Express each rate of change shown in the table as a fraction.
8 16 24
=8 =8 =8
1 2 3
The rate of change for each column is the same. Because the rate of
change is constant, the relationship is proportional.
You can express a proportional relationship by using the equation y = kx,
where k represents the constant rate of change between x and y.
In this example: k = 8 . Write the equation as y = 8 x .

The table shows the number of texts Terri received in certain

periods of time.

Time (min) 1 2 3 4
Number of Texts 3 6 9 12

1. Is the relationship between number of texts and time a proportional

relationship? _________________________

2. For each column of the table, write a fraction and find k, the constant
of proportionality.
_________________________________________________________________________________________

3. Express this relationship in the form of an equation: _________________________

4. What is the rate of change? _________________________

Write the equation for each table. Let x be time or weight.

5. 6.
Time (h) 1 2 3 4 Weight (lb) 3 4 5 6
Distance (mi) 35 70 105 140 Cost ($) 21 28 35 42

________________________________________ ________________________________________
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
91
Name ________________________________________ Date __________________ Class __________________

LESSON
Proportional Relationships and Graphs
4-3
Reteach

The graph of a proportional relationship is a line that passes through the

origin. An equation of the form y = kx represents a proportional
relationship where k is the constant of proportionality.
The graph below shows the relationship between the number of peanut
butter sandwiches and the teaspoons of peanut butter used for the
sandwiches.
A line through the points
The y-values passes through the origin,
represent the which shows a proportional
amount of relationship.
peanut butter.
Point (6, 18) represents the
amount of peanut butter (18 tsp)
used for 6 sandwiches.

The x-values represent the

number of sandwiches.

The constant of proportionality k is equal to y divided by x. Use the point

(6, 18) to find the constant of proportionality for the relationship above.
y amount of peanut butter 18
k= = = =3
x number of sandwiches 6

Using k = 3, an equation for the relationship is y = 3x.

Fill in the blanks to write an equation for the given proportional

relationship.

1. 2.

The x-values represent _. The x-values represent _.

The y-values represent _. The y-values represent _.

y y
Using point _____, k = = = _____. Using point _____, k = = = _____.
x x
An equation for the graph is _____________. An equation for the graph is _____________.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
97
Name ________________________________________ Date __________________ Class __________________

LESSON
Percent Increase and Decrease
5-1
Reteach

A change in a quantity is often described as a percent increase or

percent decrease. To calculate a percent increase or decrease, use this
equation.
amount of increase or decrease
percent of change = i 100
original amount

Find the percent of change from 28 to 42.

• First, find the amount of the change. 42 − 28 = 14
• What is the original amount? 28
14
• Use the equation. i 100 = 50%
28

An increase from 28 to 42 represents a 50% increase.

Find each percent of change.

1. 8 is increased to 22 2. 90 is decreased to 81

amount of change: 22 − 8 = _ amount of change: 90 − 81 = _

original amount: _ original amount: _

__ i 100 = _% i 100 = ___%

3. 125 is increased to 200 4. 400 is decreased to 60

amount of change: 200 − 125 = _ amount of change: 400 − 60 = _

original amount: _ original amount: _

___ i 100 = _% i 100 = ___%

5. 64 is decreased to 48 6. 140 is increased to 273

________________________________________ ____________________________________

7. 30 is decreased to 6 8. 15 is increased to 21

________________________________________ ____________________________________

9. 7 is increased to 21 10. 320 is decreased to 304

________________________________________ ____________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
104
Name ________________________________________ Date __________________ Class __________________

LESSON
Rewriting Percent Expressions
5-2
Reteach

A markup is an example of a percent A markdown, or discount, is an example of

increase. a percent decrease.
To calculate a markup, write the markup To calculate a markdown, write the
percentage as a decimal and add 1. markdown percentage as a decimal and
Multiply by the original cost. subtract from 1. Multiply by the original
price.
A store buys soccer balls from a supplier
for $5. The store’s markup is 45%. Find A store marks down sweaters by 20%.
the retail price. Find the sale price of a sweater
originally priced at $60.
Write the markup as a decimal and add 1.
0.45 + 1 = 1.45 Write the markup as a decimal and subtract
it from 1.
Multiply by the original cost.
1 − 0.2 = 0.8
Retail price = $5 × 1.45 = $7.25
Multiply by the original cost.
Sale price = $60 × 0.8 = $48

Apply the markup for each item. Then, find the retail price. Round to
two decimal places when necessary.
1. Original cost: $45; Markup %: 20% 2. Original cost: $7.50; Markup %: 50%

________________________________________ ________________________________________

3. Original cost: $1.25; Markup %: 80% 4. Original cost: $62; Markup %: 35%

________________________________________ ________________________________________

Apply the markdown for each item. Then, find the sale price. Round to
two decimal places when necessary.
5. Original price: $150; Markdown %: 40% 6. Original price: $18.99; Markdown: 25%

________________________________________ ________________________________________

7. Original price: $95; Markdown: 10% 8. Original price: $75; Markdown: 15%

________________________________________ ________________________________________

9. A clothing store bought packages of three pairs of sock for $1.75.

The store owner marked up the price by 80%.
a. What is the retail price? _________________
b. After a month, the store owner marks down the retail price by 20%.
What is the sales price? _________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
110
Name ________________________________________ Date __________________ Class __________________

LESSON
Applications of Percent
5-3
Reteach

For any problem involving percent, you can use a simple formula to
calculate the percent.
amount = percent × total
The amount will be the amount of tax, tip, discount, or whatever you are
calculating. Use the formula that has your unknown information before
the equal sign.
For simple-interest problems, time is one factor.
So, you must also include time in your formula.

amount (interest) = total (principal) × percent (rate) × time

A. Find the sale price after the discount. B. A bank offers simple interest on a
certificate of deposit. Jamie invests
Regular price = $899
$500 and after one year earns $40 in
Discount rate = 20% interest. What was the interest rate on
his deposit?
You know the total and the percentage.
You don’t know the discount amount. You know the total deposited—the principal.
Your formula is: You know the amount earned in interest. You
amount = % × total don’t know the percentage rate of interest.
= 0.20 × $899 Since the time is 1 year, your formula is:

= $179.80 % = amount ÷ total

The amount of discount is $179.80. = $40 ÷ $500
The sale price is the original price minus the = 0.08
discount. = 8%
$899 − $179.80 = $719.20
The interest rate is 8%.
The sale price is $719.20

Johanna purchases a book for $14.95. There is a sales tax of 6.5%.

How much is the final price with tax?
1. What is the total in this problem? _________________

2. What is the percent? _________________

3. Use the formula amount = total × percent to find the amount of

the sales tax.
_________________

4. To find the final price, add the cost of the book to the amount of tax.
_________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
116
Name ________________________________________ Date __________________ Class __________________

LESSON
Algebraic Expressions
6-1
Reteach

Algebraic expressions can be written from verbal descriptions. Likewise,

verbal descriptions can be written from algebraic expressions. In both
cases, it is important to look for word and number clues.

Algebra from words Words from algebra

“One third of the participants increased by 25.” 1
“Write 0.75n − m with words.”
2
Clues Clues
Look for “number words,” like Identify the number of parts of the problem.
• “One third.” • “0.75n” means “three fourths of n” or 75
• “Of” means multiplied by. hundredths of n. The exact meaning will
• “Increased by” means add to. depend on the problem.
• “−” means “minus,” “decreased by,” less,”
Combine the clues to produce the expression. etc., depending on the context.
1 p 1
• “One third of the participants.” p or . • “ m” is “one half of m” or “m over 2.”
3 3 2
• “Increased by 25.” +25 Combine the clues to produce a description.
“75 hundredths of the population minus half
“One third of the participants increased by 25.” the men.”
1 p
p + 25 or + 25
3 3

Write a verbal description for each algebraic expression.

3m − 8n
1. 100 − 5n 2. 0.25r + 0.6s 3.
13

____________ _ ______________

Write an algebraic expression for each verbal description.

4. Half of the seventh graders and one third of the eighth graders were
divided into ten teams of mixed seventh and eighth graders.

_________________________________________________________________________________________

5. Thirty percent of the green house flowers are added to 25 ferns for the
school garden.

_________________________________________________________________________________________

6. Four less than three times the number of egg orders and six more than
two times the number of waffle orders.

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
123
Name ________________________________________ Date __________________ Class __________________

LESSON
One-Step Equations with Rational Coefficients
6-2
Reteach
Using Addition to Undo Subtraction Using Subtraction to Undo Addition
Addition “undoes” subtraction. Adding the Subtraction “undoes” addition. Subtracting a
same number to both sides of an equation number from both sides of an equation
keeps the equation balanced. keeps the equation balanced.
x − 5 = −6.3 3
n+
= −15
x − 5 + 5 = −6.3 + 5 4
x = −1.3 3 3 3
n + − = −15 −
4 4 4
3
n = −15
4

Be careful to identify the correct number that is to be added or

subtracted from both sides of an equation. The numbers and variables
can move around, as the problems show.

Solve using addition or subtraction.

7
1. 6 = m − 2. 3.9 + t = 4.5 3. 10 = −3.1 + j
8

____________ _ ______________

Multiplication Undoes Division Division Undoes Multiplication

To “undo” division, multiply both sides of an To “undo” multiplication, divide both sides of
equation by the number in the denominator of an equation by the number that is multiplied
a problem like this one. by the variable as shown in this problem.
m 4.5p = 18
=6
3 4.5 p 18
= =4
m 4.5 4.5
3× = 3×6
3
m = 18

Notice that decimals and fractions can be handled this way, too.

Solve using division or multiplication.

y a
4. =5 5. 0.35w = −7 6. − =1
2.4 6

____________ _ ______________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
129
Name ________________________________________ Date __________________ Class __________________

LESSON
Writing Two-Step Equations
6-3
Reteach

Many real-world problems look like this:

one-time amount + number × variable = total amount
You can use this pattern to write an equation.

Example:

At the start of a month a customer spends $3 for a reusable coffee cup. She pays
$2 each time she has the cup filled with coffee. At the end of the month she has
paid $53. How many cups of coffee did she get?

one-time amount: $3

number × variable: 2 × c or 2c, where c is the number of cups of coffee

total amount: $53

The equation is: 3 + 2c = 53.

Write an equation to represent each situation.

Each problem can be represented using the form:
one-time amount + number × variable = total amount
1. The sum of twenty-one and five times a number f is 61.

____________ _ ______________

one-time amount + number × variable = total amount

2. Seventeen more than seven times a number j is 87.

_____________________________________

3. A customer’s total cell phone bill this month is $50.50. The company
charges a monthly fee of $18 plus five cents for each call. Use n to
represent the number of calls.

_____________________________________

4. A tutor works with a group of students. The tutor charges $40 plus $30
for each student in the group. Today the tutor has s students and
charges a total of $220.

____________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
135
Name ________________________________________ Date __________________ Class __________________

LESSON
Solving Two-Step Equations
6-4
Reteach
Here is a key to solving an equation.

Example: Solve 3x − 7 = 8.

Step 1: • Describe how to form the expression 3x − 7 from the variable x:

• Multiply by 3. Then subtract 7.

Step 2: • Write the parts of Step 1 in the reverse order and use inverse operations:
• Add 7. Then divide by 3.

Step 3: • Apply Step 2 to both sides of the original equation.

• Start with the original equation. 3x − 7 = 8
• Add 7 to both sides. 3x = 15
• Divide both sides by 3. x=5

Describe the steps to solve each equation. Then solve the equation.
1. 4x + 11 = 19

_________________________________________________________________________________________

2. −3y + 10 = −14

_________________________________________________________________________________________

r − 11
3. = −7
3

_________________________________________________________________________________________

4. 5 − 2p = 11

_________________________________________________________________________________________

2
5. z + 1 = 13
3

_________________________________________________________________________________________

w − 17
6. =2
9

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
141
Name ________________________________________ Date __________________ Class __________________

LESSON
Writing and Solving One-Step Inequalities
7-1
Reteach

When solving an inequality, solve it as if it is an equation. Then decide

on the correct inequality sign to put in the answer.
When adding or subtracting a number from each side of an inequality,
the sign stays the same. When multiplying or dividing by a positive
number, the sign stays the same. When multiplying or dividing by a
negative number, the sign changes.

x + 5 > −5 x−3≤8 −2x ≥ 8 Dividing by a x

< −6
x + 5 − 5 > −5 − 5 x−3+3≤8+3 −2 x 8 negative, so 3
≤ reverse the x
x > −10 x ≤ 11 −2 −2 (3) < (−6)(3)
inequality (3)
x ≤ −4 sign.
x < −18
Check: Check: Check:
Check: Think: −21 is
Think: 0 is a Think: 0 is a Think: −6 is a solution
a solution because
solution because solution because because −6 ≤ −4.
−21 < −18.
0 > −10. Substitute 0 ≤ 11. Substitute 0 Substitute −6 for x to see
Substitute −21 for x
0 for x to see if for x to see if your if your answer checks.
to see if your
your answer answer checks. −2x ≥ 8 answer checks.
checks.
x−3≤8 −2 • −6 ? 8 x
x + 5 > −5 < −6
0−5?8 12 ≥ 8 9 3
0 + 5 ? −5
−5 ≤ 8 9 −21
5 > −5 9 ? −6
3
−7 < −6 9

Solve each inequality. Check your work.

1. n + 6 ≥ −3 2. −2n < −12

________________________________________ ________________________________________

n
3. ≤ −21 4. n − (−3) ≥ 7
3

________________________________________ ________________________________________

5. −15 + n < −8 6. 6n > −12

________________________________________ ________________________________________

n
7. −6 + n < −9 8. > −2
−6

________________________________________ ________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
148
Name ________________________________________ Date __________________ Class __________________

LESSON
Writing Two-Step Inequalities
7-2
Reteach

Two-step inequalities involve

• a division or multiplication
• an addition or subtraction.

Step 1 Step 2
The description indicates whether division or The description indicates whether addition
multiplication is involved: or subtraction is involved:

“One half of a “...less 25...” or

number...” “...decreased by 25...”

1 n
“ n or ”
2 2 “ −25”

Step 3 Step 4
Combine the two to give two steps: Use an inequality symbol:

“One half of a “...is more than

number less 25...” 15.” means “>.”

1 1
n − 25 n − 25 > 15
2 2

Fill in the steps as shown above.

1. Five less than 3 times a number is 2. Thirteen plus 5 times a number is no
greater than the opposite of 8. more than 30.

Step 1: _ Step 1: _

Step 2: _ Step 2: _

Step 3: _ Step 3: _

Step 4: _ Step 4: _

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
154
Name ________________________________________ Date __________________ Class __________________

LESSON
Solving Two-Step Inequalities
7-3
Reteach
When you solve a real-world two-step inequality, you have to
• be sure to solve the inequality correctly, and
• interpret the answer correctly in light of the problem.

Example
The catfish pond contains 2,500 gallons of water. The pond can hold no
more than 3,000 gallons. It is being filled at a rate of 110 gallons per hour.
How many whole hours will it take to fill but not overfill the pond?

Step 1: Solve the inequality. Step 2: Interpret the results.

• The pond already contains 2,500 gallons. The problem asks for how many whole
• The pond can be filled at a rate of 110 gallons hours would be needed to fill the pond
per hour, or 110h for the number of gallons with not more than 3,000 gallons.
added in h hours. Since h ≤ 4.5 hours, 5 hours would fill
• The pond can hold no more than 3,000 gallons, the pool to overflowing. So, the
so 2,500 + 110h ≤ 3,000. nearest number of whole hours to fill it
• Solve the inequality: but not to overfill it would be 4 hours.
2,500 − 2,500 + 110h ≤ 3,000 − 2,500
110h ≤ 500, or h ≤ 4.5 hours.

1. A cross-country racer travels 20 kilometers before she realizes that

she has to cover at least 75 kilometers in order to qualify for
the next race. If the racer travels at a rate of 10 kilometers per hour,
how many whole hours will it take her to reach the 75-kilometer mark?

_________________________________________________________________________________________

With inequality problems, many solutions are possible. In real-world problems,

these have to be interpreted in light of the problem and its information.

Example
An animal shelter has $2,500 in its reserve fund. The shelter charges $40 per
animal placement and would like to have at least $4,000 in its reserve fund. If
the shelter places 30 cats and 10 dogs, will that be enough to meet its goal?

Step 1 Step 2
Write and solve the inequality: If the shelter places 30 cats and 10 dogs,
2,500 + 40a ≥ 4,000, or 40a ≥ 1,500 or 40 animals, that will be enough to meet
a ≥ 37.5 its goal, because a = 40 is a solution to the
inequality a ≥ 37.5.

2. How many bird boxes need to be sold to reduce the inventory from $75
worth of boxes to no fewer than $10 worth of boxes if each box sells for $7?

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
160
Name ________________________________________ Date __________________ Class __________________

LESSON
Similar Shapes and Scale Drawings
8-1
Reteach

The dimensions of a scale model or scale drawing are related to the

actual dimensions by a scale factor. The scale factor is a ratio.
The length of a model car is 9 in. 9in. 9÷9 1
= =
The length of the actual car is 162 in. 162 in. 162 ÷ 9 18

9 1 1
can be simplified to . The scale factor is .
162 18 18

If you know the scale factor, you can use a proportion to find the
dimensions of an actual object or of a scale model or drawing.
1
• The scale factor of a model train set is . A piece of track in the
87
model train set is 8 in. long. What is the actual length of the track?
model length 8 8 1
= = x = 696
actual length x x 87
The actual length of track is 696 inches.
• The distance between 2 cities on a map is 4.5 centimeters. The map
scale is 1 cm : 40 mi.
distance on map 4.5 cm 1 cm 4.5
= = = x = 180
actual distance x mi 40 mi x
The actual distance is 180 miles.

Identify the scale factor.

1. Photograph: height 3 in. 2. Butterfly: wingspan 20 cm
Painting: height 24 in. Silk butterfly: wingspan 4 cm
photo height in. silk butterfly cm
= = = =
painting height in. butterfly cm

Solve.
3. On a scale drawing, the scale factor 4. On a road map, the distance between
1 2 cities is 2.5 inches. The map scale
is . A plum tree is 7 inches tall on the
12 is 1 inch:30 miles. What is the actual
scale drawing. What is the actual height distance between the cities?
of the tree?

________________________________________ ________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
167
Name ________________________________________ Date __________________ Class __________________

LESSON
Geometric Drawings
8-2
Reteach

In this lesson, you learned two different sets of conditions for drawing a triangle.

Three Sides Two Angles and a Side

Can these three sides form a triangle? Why is a common, or included, side
needed? Do these angles and side form
a triangle?

The condition that a triangle can be formed is

based on this fact:
The sum of the lengths of two shorter
sides is greater than the length of the The condition that a triangle can be formed
longest side. is based on this fact:
What are the lengths of the shorter sides? The sum of the measures of the angles in
4 and 5 units a plane triangle is 180 degrees.
What is the length of the longest side? What would be the measure of the third
angle in a triangle formed from these parts?
8 units
180° = 53° + 34° + x°
Is 4 + 5 > 8? Yes.
x° = 180° − 87°
x = 93°
A triangle can be formed, with the angles
53° and 93° having the 5-meter side in
common.

Answer the questions about triangle drawings.

1. Can a triangle be formed with three sides of equal length? Explain
using the model above.

_________________________________________________________________________________________

2. Can a triangle be formed with angles having measures of 30°, 70°, and 110°? Explain
using the model above.

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
173
Name ________________________________________ Date __________________ Class __________________

LESSON
Cross Sections
8-3
Reteach

Cross sections can take a variety of shapes, but they are generally related to the
parts of the figures from which they are formed. The angle at which the
intersecting plane “cuts” the figure is also a factor in determining the shape of the
cross section. However, the cross section is always defined as a plane figure in
the situations presented here.

Example 1 Example 2
When the intersecting plane is parallel to the When the intersecting plane is
base(s) of the figure, the cross section is perpendicular to the base(s) of the figure,
often related to the shape of the base. In this the cross section is not always the same
cylinder, the cross section is congruent to the shape as the base. In this cylinder, the
bases. cross section is a rectangle, not a circle.

What is the shape of the cross section? What is the cross section?
The cross section is a circle that is congruent A rectangle having a length equal to the
to each of the bases of the cylinder. height of the cylinder and a width equal to
the diameter of the cylinder.

For each solid, draw at least two different cross sections that have at
least two different shapes. Describe the cross sections.
1. 2.

________________________________________ ________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
179
Name ________________________________________ Date __________________ Class __________________

LESSON
Angle Relationships
8-4
Reteach

Complementary Angles Supplementary Angles Vertical Angles

Two angles Two angles Intersecting lines

whose measures whose measures have a form two pairs
have a sum of 90°. sum of 180°. of vertical angles.

Use the diagram to complete the following.

1. Since ∠AQC and ∠DQB
are formed HJJJJG
HJJJJG by intersecting lines,
AQB and CQD , they are:

________________________________________

2. The sum of the measures

of ∠AQV and ∠VQT is: ___________
So, these angles are:

________________________________________

3. The sum of the measures of ∠AQC and ∠CQB is: ___________

So, these angles are: ________________________________

Find the value of x in each figure.

4. 5.

________________________________________ ________________________________________

6. 7.

________________________________________ ________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
185
Name ________________________________________ Date __________________ Class __________________

LESSON
Circumference
9-1
Reteach

The distance around a circle is called the circumference. To find

the circumference of a circle, you need to know the diameter or the
radius of the circle.
The ratio of the circumference of any circle to its diameter ⎛⎜ ⎞⎟
C
⎝d⎠
is always the same. This ratio is known as π (pi) and has a value
of approximately 3.14.
To find the circumference C of a circle if you know the diameter
d, multiply π times the diameter. C = π • d, or C ≈ 3.14 • d.
C=π •d
C ≈ 3.14 • d
C ≈ 3.14 • 6
C ≈ 18.84
The circumference is about 18.8 in.
to the nearest tenth.
The diameter of a circle is twice as long as the radius r, or d = 2r.
To find the circumference if you know the radius, replace d with 2r in
the formula. C = π • d = π • 2r

Find the circumference given the Find the circumference given the radius.
diameter. 2. r = 13 in.
1. d = 9 cm C = π • 2r
C=π •d C ≈ 3.14 • (2 • ________)
C ≈ 3.14 • ________
C ≈ 3.14 • ________
C ≈ ___________
The circumference is ________ cm to C ≈ ___________
the nearest tenth of a centimeter. The circumference is ________ in. to
the nearest tenth of an inch.

Find the circumference of each circle to the nearest tenth.

Use 3.14 for π .
3. 4. 5.

____________ _ ______________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
192
Name ________________________________________ Date __________________ Class __________________

LESSON
Area of Circles
9-2
Reteach
The area of a circle is found by using the formula A = πr 2. To find the area,
first determine the radius. Square the radius and multiply the result by π.
This gives you the exact area of the circle.
Example:
Find the area of the circle in terms of π.
The diameter is 10 cm. The radius is half the diameter, or 5 cm.
Area is always given in square units.
52 = 25
A = 25π cm2

Find the area of each circle in terms of π.

1. A vinyl album with a diameter of 16 inches. 2. A compact disc with a diameter of 120 mm.

_________________ _________________
Sometimes it is more useful to use an estimate of π to find your answer.
Use 3.14 as an estimate for π.
Example:
Find the area of the circle. Use 3.14 for π and round your answer to the
nearest tenth.
The radius is 2.8 cm.
Area is always given in square units.
2.82 = 7.84
A = 7.84π cm2
A = 7.84 × 3.14 cm2
A = 24.6176 cm2
Rounded to the nearest tenth, the area is 24.6 cm2.

Find the area of each circle. Use 3.14 for π and round your answer to
the nearest tenth.
3. A pie with a radius of 4.25 inches. 4. A horse ring with a radius of 10 yards.

_________________ _________________

5. A round pond with a diameter of 24 m. 6. A biscuit with a diameter of 9.2 cm.

_________________ _________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
198
Name ________________________________________ Date __________________ Class __________________

LESSON
Area of Composite Figures
9-3
Reteach

When an irregular figure is on graph paper, you can estimate

its area by counting whole squares and parts of squares.
Follow these steps.
• Count the number of whole squares. There are
10 whole squares.
• Combine parts of squares to make whole squares
or half-squares.

Section 1 = 1 square • Add the whole and partial squares

1 1
1 10 + 1 + 1 + 1 = 14
Section 2 ≈ 1 squares 2 2
2
The area is about 14 square units.
1
Section 3 ≈ 1 squares
2

Estimate the area of the figure.

1. There are _______ whole squares in the figure.

Section 1 ≈ _______ square(s)

Section 2 = _______ square(s)

Section 3 = _______ square(s)

A = ___ + _ + _ + _ = _____ square units

You can break a composite figure into shapes that you know. Then use
those shapes to find the area.
A (rectangle) = 9 × 6 = 54 m2
A (square) = 3 • 3 = 9 m2
A (composite figure) = 54 + 9 = 63 m2

Find the area of the figure.

2. A (rectangle) = _______ ft2

A (triangle) = _______ ft2

A (composite figure) = ___ + _ = _____ ft2

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
204
Name ________________________________________ Date __________________ Class __________________

LESSON
Solving Surface Area Problems
9-4
Reteach

The surface area of a three-

dimensional figure is the combined
areas of the faces.
You can find the surface area of a
prism by drawing a net of the
flattened figure.
Notice that the top and bottom have
the same shape and size. Both sides
have the same shape and size. The
front and the back have the same
shape and size.
Remember: A = lw
Since you are finding area, the answer will be in square units.

Find the surface area of the prism formed by the net above.

1. Find the area of the front face: A = ____ • ____ = _________________ in2.

The area of the front and back faces is 2 • ____ = _________________ in2.

2. Find the area of the side face: A = ____ • ____ = _________________ in2.

The area of the 2 side faces is 2 • = _____________ in2.

3. Find the area of the top face: A = ____ • ____ = _________________ in2.

The area of the top and bottom faces is 2 • ____ = _________________ in2.

4. Combine the areas of the faces: ____ + ____ + ____ = _________________ in2.

5. The surface area of the prism is _________________ in2.

Find the surface area of the prism formed by each net.

6. 7.

. ___________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
210
Name ________________________________________ Date __________________ Class __________________

LESSON
Solving Volume Problems
9-5
Reteach
The volume of a solid figure is the number of cubic units inside the figure.

A prism is a solid figure that has Each small cube represents

length, width, and height. one cubic unit.

Volume is measured in cubic units, such as

in3, cm3, ft3, and m3.

The volume of a solid figure is the product of

the area of the base (B) and the height (h). V = Bh
Rectangular Prism Triangular Prism Trapezoidal Prism

The base is a triangle. The base is a trapezoid.

The base is a rectangle. To find the area of the base, To find the area of the base,
To find the area of the base, 1 1
use B = lw. use B = bh. use B = (b1 + b2)h.
2 2

Find the volume of each figure.

1. 2. 3.

____________ _ ______________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
216
Name ________________________________________ Date __________________ Class __________________

LESSON
Populations and Samples
10-1
Reteach

Survey topic: number of books read by seventh-graders

in Richmond

A population is the whole group that is Population: all seventh-graders in

being studied. Richmond

A sample is a part of the population. Sample: all seventh graders at Jefferson

Middle School

A random sample is a sample in which Random sample: Have a computer

each member of the population has a select every tenth name from an
random chance of being chosen. A alphabetical list of each seventh-grader
random sample is a better in Richmond.
representation of a population than a
non-random sample.

A biased sample is a sample that does Biased sample: all of the seventh
not truly represent a population. graders in Richmond who are
enrolled in honors English classes.

Tell if each sample is biased. Explain your answer.

1. An airline surveys passengers from a flight that is on time to
determine if passengers on all flights are satisfied.

_________________________________________________________________________________________

2. A newspaper randomly chooses 100 names from its subscriber

database and then surveys those subscribers to find if they read
the restaurant reviews.

_________________________________________________________________________________________

3. The manager of a bookstore sends a survey to 150 customers

who were randomly selected from a customer list.

_________________________________________________________________________________________

4. A team of researchers surveys 200 people at a multiplex movie theater

to find out how much money state residents spend on entertainment.

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
223
Name ________________________________________ Date __________________ Class __________________

LESSON
Making Inferences from a Random Sample
10-2
Reteach

Once a random sample of a population has been selected, it can be

used to make inferences about the population as a whole. Dot plots of
the randomly selected data are useful in visualizing trends in a
population from which a random sample of multiple outcomes occurs.
Numerical results about the population can often be obtained from the
random sample using ratios or proportions as these examples show.

Making inferences from a dot plot

What will be the median number of motorcycle-tire blowouts in a
population of 400 motorcycles in a road race if this random sample
of 20 motorcycles holds for the population as a whole?

Solution The median value in a sample of 20 data points will be between

the 10th and 11th data points. The 10th and 11th data points are the same
in this dot plot, so the median number of blowouts is 6. Set up a
proportion to find the median number of blowouts predicted for 400
motorcycles:

20 6
= ; 20 x = 2, 400; x = 120
400 x

So, 120 blowouts is the median number of blowouts predicted for the
population.

Random sampling of events that have two outcomes does not require
plots, but they still use ratios and proportions. This problem is of that type.

1. In a random sample, 3 of 400 computer chips are defective. Based on

the sample, how many chips out of 100,000 would you expect to be
defective?

_________________________________________________________________________________________

2. In a sample 5 of 800 T-shirts were defective. Based on this sample, in

a production run of 250,000 T-shirts, how many would you expect to
be defective?

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
229
Name ________________________________________ Date __________________ Class __________________

LESSON
Generating Random Samples
10-3
Reteach

A random sample of equally-likely events can be generated with

random-number programs on computers or by reading random
numbers from random-number tables in mathematics textbooks that
are used in the study of statistics and probability.
In your math class, random samples can be modeled using coins or
number cubes. For example, consider the random sample that consists
of the sum of the numbers on two number cubes.

Example 1 Solution

Generate 10 random samples of the sum Rolling the number cubes gives these
of the numbers on the faces of two number random samples:
cubes. 2, 6, 6, 4, 3, 11, 11, 8, 7, and 10

Example 2 Solution

What are the different possible outcomes from List the outcomes as ordered pairs:
rolling the two number cubes in Example 1? (1, 1), (1, 2), (1, 3), (1, 4), (1, 5), (1, 6),
Write the outcomes as sums. (2, 1), (2, 2), (2, 3), (2, 4), (2, 5), (2, 6),
(3, 1), (3, 2), (3, 3), (3, 4), (3, 5), (3, 6),
(4, 1), (4, 2), (4, 3), (4, 4), (4, 5), (4, 6),
(5, 1), (5, 2), (5, 3), (5, 4), (5, 5), (5, 6),
(6, 1), (6, 2), (6, 3), (6, 4), (6, 5), (6, 6)
Then, write the sums of the ordered pairs:
2, 3, 4, 5, 6, 7, 3, 4, 5, 6, 7, 8, 4, 5, 6, 7, 8,
9, 5, 6, 7, 8, 9, 10, 6, 7, 8, 9, 10, 11, 7, 8, 9,
10, 11, and 12

Example 3 Solution

How do the frequency of the outcomes of In Example 1, there is one each of 2, 3, 4, 7,

the 10 random samples in Example 1 8, and 10, two 6’s, and two 11’s. In Example
compare with the frequency of their sums in 3, there is one 2, two 3’s, three 4’s, four 5’s,
Example 2? five 6’s, six 7’s, five 8’s, four 9’s, three 10’s,
two 11’s, and one 12.

Answer the questions about the examples.

1. How do the random samples compare 2. How do you think the outcomes in 100
with the predicted number of outcomes? random samples would compare with
the expected results?

________________________________________ ________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
235
Name ________________________________________ Date __________________ Class __________________

LESSON
Comparing Data Displayed in Dot Plots
11-1
Reteach

A dot plot is a visual way to show the spread of data. A number line is
used to show every data point in a set. When the data are symmetric
about the center, and the median has the greatest number of data, then
the shape is described as a normal distribution. Recall that symmetric
means that the two halves are mirror images. In a data set with normal
distribution, the mean, median, and mode are equal.

This dot plot shows a normal distribution.

• The data are symmetric about the center, 5.
• The median has the greatest number of data.
• The mean, median, and mode are all 5.
Data sets do not always have normal distribution. The data may cluster
more to the left or right of center. This is called a skewed distribution.
The measures of center for a skewed data set with skewed distribution
are not all equal.

This dot plot shows a skewed distribution.

• The data are not symmetric.
• The mean, median, and mode vary.
• The data are skewed to the left.

Describe the shape of the data distribution for the dot plot.
1.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
242
Name ________________________________________ Date __________________ Class __________________

LESSON
Comparing Data Displayed in Box Plots
11-2
Reteach

A box plot separates a set of data into four equal parts.

Use the data to create a box plot on the number line: 35, 24, 25, 38, 31,
20, 27
1. Order the data from least to greatest. 2. Find the least value, the greatest value,
and the median.

________________________________________ ________________________________________

3. The lower quartile is the median of the lower half of the data.
The upper quartile is the median of the upper half of the data.
Find the lower and upper quartiles.

Lower quartile: _ Upper quartile: _

4. Above the number line, plot points for the numbers you found in
Exercises 2 and 3. Draw a box around the quartiles and the median.
Draw a line from the least value to the lower quartile. Draw a line from
the upper quartile to the greatest value.

Use the data to create a box plot: 63, 69, 61, 74, 78, 72, 68, 70, 65

5. Order the data. __________________________________________________

6. Find the least and greatest values, the median, the lower and
upper quartiles.

_________________________________________________________________________________________

7. Draw the box plot above the number line.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
248
Name ________________________________________ Date __________________ Class __________________

LESSON
Using Statistical Measures to Compare Populations
11-3
Reteach

The Thompson family of 5 has a mean weight of 150 pounds. The

Wilson family of 5 has a mean weight of 154 pounds. Based on that
information, you might think that the Thompson family members
and the Wilson family members were about the same weight.
The actual values are shown in the tables below.

Thompson Family Wilson Family

55, 95, 154, 196, 250 132, 153, 155, 161, 169

By comparing the means to a measure of variability we can get a better

sense of how the two families differ.
The Thompson family’s mean absolute deviation is 60. The Wilson
family’s mean absolute deviation is 9.2.
The difference of the two means is 4. This is 0.07 times the mean
absolute deviation for the Thompson family, but 0.4 times the mean
absolute deviation for the Wilson family.

The tables show the number of pets owned by 10 students in a rural

town and 10 students in a city.

Rural Town City

3, 16, 3, 6, 4, 5, 0, 2, 12, 8 2, 0, 1, 2, 4, 0, 1, 0, 0, 1

1. What is the difference of the means as a multiple of each range?

_________________________________________________________________________________________

A survey of 10 random people in one town asked how many phone calls
they received in one day. The results were 1, 5, 3, 2, 4, 0, 3, 6, 8 and 2.
The mean was 3.4.
Taking 3 more surveys of 10 random people added more data. The means
of the new surveys were 1.2, 2.8, and 2.2. Based on the new data, Ann’s
assumption that 3.4 calls was average seems to be incorrect.

2. Raul surveyed 4 groups of 10 random people in a second town to ask

how many phone calls they receive. The means of the 4 groups were
3.2, 1.4, 1.2, and 2.1. What can you say about the number of phone
calls received in the towns surveyed by Ann and Raul?

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
254
Name ________________________________________ Date __________________ Class __________________

LESSON
Probability
12-1
Reteach

Picturing a thermometer can help you rate probability.

A M E R
At right are 8 letter tiles that spell AMERICAN.
If something will always happen, its probability is certain. I C A N
If you draw a tile, the letter will be in the word “American.”
P(A, M, E, R, I, C, or N) = 1
If something will never happen, its probability is impossible.
If you draw a tile, you cannot draw a “Q.”
P(Q) = 0
The probability of picking a vowel is as likely as not because there are
4 vowels and 4 consonants.
4 vowels 1
P(a vowel) = =
8 letters 2
Picking the letter “C” is unlikely because there is only one “C.”
1 “c ” 1
P(C) = =
8 letters 8
Picking a letter besides “A” is likely because there are 6 letters that
are not “A”.
6 letters 3
P(not A) = =
8 letters 4
Another way to find P(not A) is to subtract P(A) from 1.
1 3
P(not A) = 1 − P(A) = 1 − =
4 4

Tell whether each outcome is impossible, unlikely, as likely as not,

likely, or certain. Then write the probability in simplest form.
1. choosing a red crayon from a box of 24 different colored crayons,
including red crayons

_________________________________________________________________________________________

2. rolling an odd number on a number cube containing numbers

1 through 6

_________________________________________________________________________________________

3. randomly picking a white card from a bag containing all red cards

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
261
Name ________________________________________ Date __________________ Class __________________

LESSON
Experimental Probability of Simple Events
12-2
Reteach

Experimental probability is an estimate of the probability that a

particular event will happen.
It is called experimental because it is based on data collected from
experiments or observations.
number of times a particular event happens
Experimental probability ≈
total number of trials
JT is practicing his batting. The pitcher makes 12 pitches. JT hits 8 of the
pitches. What is the experimental probability that JT will hit the next pitch?
• A favorable outcome is hitting the pitch.
• The number of favorable outcomes is the number JT hit: 8.
• The number of trials is the total number of pitches: 12.
8 2
• The experimental probability that JT will hit the next pitch is = .
12 3

1. Ramon plays outfield. In the last game, 15 balls were hit in his
direction. He caught 12 of them. What is the experimental probability
that he will catch the next ball hit in his direction?

a. What is the number of favorable events? _________________

b. What is the total number of trials? _________________

c. What is the experimental probability that Ramon will catch the next
ball hit in his direction?

_____________________________________________________________________________________

2. In one inning Tori pitched 9 strikes and 5 balls. What is the

experimental probability that the next pitch she throws will be a strike?

a. What is the number of favorable events? _________________

b. What is the total number of trials? _________________

c. What is the experimental probability that the next pitch Tori throws
will be a strike?

_____________________________________________________________________________________

3. Tori threw 5 pitches for one batter. Kevin, the catcher, caught 4 of
those pitches. What is the experimental probability that Kevin will
not catch the next pitch? Show your work.

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
267
Name ________________________________________ Date __________________ Class __________________

LESSON
Experimental Probability of Compound Events
12-3
Reteach
A compound event includes two or more simple events.

The possible outcomes of flipping a coin are heads and tails.

A spinner is divided into 4 equal sections, each one a different color.

The possible outcomes of spinning are red, yellow, blue, and green.

If you toss the coin and spin the spinner, there are 8 possible outcomes.

2 possible coin 4 possible spinner

outcomes outcomes
Red Yellow Blue Green
Heads 9 11 11 14 8 possible
Tails 10 12 7 6 compound
outcomes
To find the experimental probability that the next trial will have an
outcome of Tails and Blue:

a. Find the number of times Tails and Blue was the outcome: 7.

b. Find the total number of trials: 9 + 11 + 11 + 14 + 10 + 12 + 7 + 6 = 80.

7
c. Write a ratio of the number of tails and blue outcomes to the number of trials: .
80

A store hands out yogurt samples: peach, vanilla, and strawberry. Each
flavor comes in regular or low-fat. By 2 P.M. the store has given out these
samples:
Peach Vanilla Strawberry
Regular 16 19 30
Low-fat 48 32 55

Use the table to answer the questions.

1. What is the total number of samples given out? _________________

2. What is the experimental probability that the next sample will be regular vanilla?

_________________________________________________________________________________________

3. What is the experimental probability that the next sample will be strawberry?

_________________________________________________________________________________________

4. What is the experimental probability that the next sample will not be peach?

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
273
Name ________________________________________ Date __________________ Class __________________

LESSON
Making Predictions with Experimental Probability
12-4
Reteach

When you have information about previous events, you can use that
information to predict what will happen in the future.
If you can throw a basketball into the basket 3 out of 5 times, you can
predict you will make 6 baskets in 10 tries. If you try 15 times, you will
make 9 baskets. You can use a proportion or multiply to make
predictions.

A. Use a proportion. B. Multiply.

A survey found that 8 of 10 people chose Eric’s baseball coach calculated that Eric
apples as their favorite fruit. If you ask hits the ball 49 percent of the time. If Eric
100 people, how many can you predict will receives 300 pitches this season, how many
choose apples as their favorite fruit? times can Eric predict that he will hit the
ball?
8 x Write a proportion.
= 0.49 × 300 = x
10 100 8 out of 10 is how
many out of 100? 147 = x
8 x Since 10 times 10 is Eric can predict that he will hit the ball
=
10 100 100, multiply 8 147 times.
x 10 times 10 to find the
value of x.
x = 80

You can predict that 80 of the people will

choose apples as their favorite fruit.

Solve.
1. On average, 25 percent of the dogs who go to ABC Veterinarian need
a rabies booster. If 120 dogs visit ABC Veterinarian, how many of them
will likely need a rabies booster?

x
Set up a proportion: =
100

Solve for x: x = ________

__________ dogs will likely need a rabies booster.

2. About 90 percent of seventh graders prefer texting to emailing.

In a sample of 550 seventh graders, how many do you predict will
prefer texting?

0.9 × 550 = ________

__________ seventh graders will likely prefer texting.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
279
Name ________________________________________ Date __________________ Class __________________

LESSON
Theoretical Probability of Simple Events
13-1
Reteach

The probability, P, of an event is a ratio.

It can be written as a fraction, decimal, or percent.
the number of outcomes of an event
P(probability of an event) =
the total number of all events

Example 1 Example 2
There are 20 red apples and green apples in a A bag contains 1 red marble, 2 blue
bag. The probability of randomly picking a red marbles, and 3 green marbles.
apple is 0.4. How many red apples are in the
1
bag? How many green apples? The probability of picking a red marble is .
6
Total number of events 2
To find the probability of not picking a red
number of red apples marble, subtract the probability of picking a
Probability, P: 0.4 =
20 red marble from 1.
So: 1 5
P = 1− =
number of red apples = 0.4 × 20 = 8 6 6

number of green apples = 20 − 8 = 12 The probability of not picking a red marble

5
There are 8 red apples and 12 green apples. from the bag is .
6

Solve.
1. A model builder has 30 pieces of balsa wood in a box. Four pieces are
15 inches long, 10 pieces are 12 inches long, and the rest are 8 inches
long. What is the probability the builder will pull an 8-inch piece from
the box without looking?

_________________________________________________________________________________________

2. There are 30 bottles of fruit juice in a cooler. Some are orange juice,
others are cranberry juice, and the rest are other juices. The probability
of randomly grabbing one of the other juices is 0.6. How many bottles
of orange juice and cranberry juice are in the cooler?

_________________________________________________________________________________________

3. There are 13 dimes and 7 pennies in a cup.

a. What is the probability of drawing a penny out without looking?
_________________

b. What is the probability of not drawing a penny? _________________

4. If P(event A) = 0.25, what is P(not event A)? _________________

5. If P(not event B) = 0.95, what is P(event B)? _________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
286
Name ________________________________________ Date __________________ Class __________________

LESSON
Theoretical Probability of Compound Events
13-2
Reteach

Compound probability is the likelihood of two or more events occurring.

1. To identify the sample space, use a list, tree diagram, or table. If order
does not matter, cross out repeated combinations that differ only by
order.
2. Count the number of outcomes in the desired event.
3. Divide by the total number of possible outcomes.

A student spins the spinner and rolls a

number cube What is the probability that
she will randomly spin a 1 and roll a
number less than 4?
1. Identify the sample space.
2. Count the number of desired outcomes: 3.
3. Divide by the total number possibilities: 18.
3 1
Probability (1 and < 4) = =
18 6

At a party, sandwiches are served on 5 types of bread:

multi-grain, pita, rye, sourdough, and whole wheat. Sam
and Ellen each randomly grab a sandwich. What is the
probability that Ellen gets a sandwich on pita or rye and
Sam gets a sandwich on multi-grain or sourdough?
Ellen
1. The table shows the sample space. Draw an X in each
cell in which Ellen gets a sandwich on pita or rye. M P R S W
2. Draw a circle in each cell in which Sam gets a M
sandwich on multi-grain or sourdough.
P
3. Count the number of possibilities that have both
Sam

an oval and a rectangle. R

S
_____________________________________
W
4. Divide the number you counted in Step 4 by the
total number of possibilities in the sample space.

_____________________________________

This is the probability that Ellen gets a pita or a rye sandwich and that
Sam gets a multi-grain or a sourdough sandwich.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
292
Name ________________________________________ Date __________________ Class __________________

LESSON
Making Predictions with Theoretical Probability
13-3
Reteach

Predictions are thoughtful guesses about what will happen.

You can create an “outcome tree” to keep track of outcomes.
Sally is going to roll a number cube 21 times.
She wants to know how many times she can expect to roll a 1 or 4.
There are a total of 6 outcomes.
Of these, two outcomes (1 and 4) are desirable.

Use probability to predict the number of times Sally would roll a 1 or 4.

number of desirable outcomes 2 1
P (1 or 4) = = =
number of possible outcomes 6 3
Set up a proportion relating the probability to the number of tries.
1 x
=
3 21
3x = 21 Cross-multiply.
x =7 Simplify.
In 21 tries, Sally can expect to roll seven 1s or 4s.

For each odd-numbered question, find the theoretical probability.

Use that probability to make a prediction in the even-numbered
question that follows it.
1. Sandra flips a coin. What is the probability 2. Sandra flips the coin 20 times. How many
that the coin will land on tails? times can Sandra expect the coin to land
on tails?

_________________________________________
_________________________________________

3. A spinner is divided into four equal sections 4. If the spinner is spun 80 times, how often
labeled 1 to 4. What is the probability that can you expect it to land on 2?
the spinner will land on 2?

_________________________________________
_________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
298
Name ________________________________________ Date __________________ Class __________________

LESSON
Using Technology to Conduct a Simulation
13-4
Reteach

Use a graphing calculator to help you conduct a probability simulation.

There is a 20 percent possibility of rain during the week of the
school fair. What is the experimental probability that it will rain
on at least one of the days of the festival, Monday through Friday?

20 1
Step 1 Choose a model. Probability of rain: 20% = =
100 5
Use whole numbers 1–5 for the days.
Rain: 1 No rain: 2–5

Step 2 Generate random numbers from Example: 1, 2, 2, 5, 2

1 to 5 until you get a 1. This trial counts as an outcome that it will
rain on at least one of the days of a week.

Step 3 Perform multiple trials by repeating Step 2:

Numbers Numbers
Trial Rain Trial Rain
Generated Generated
1 1, 2, 2, 5, 2 1 6 1, 4, 5, 5, 3 1
2 5, 2, 2, 2, 3 0 7 3, 4, 5, 2, 2 0
3 5, 2, 3, 1, 5 1 8 4, 1, 2, 2, 2 1
4 3, 2, 3, 2, 2 0 9 2, 2, 2, 4, 2 0
5 3, 2, 2, 2, 2 0 10 2, 2, 4, 3, 3 0

Step 4 In 10 trials, the experimental probability that it will rain on 1 of the

2
school days is 4 out of 10 or 40 percent, 0.4, or (two-fifths).
5

Find the experimental probability. Draw a table on a separate sheet

of paper and use 10 trials.
1. An event has 5 outcomes. Each outcome: 50-50 chance or more.

_________________________________________________________________________________________

2. An event has a 40 percent probability. Each outcome: exactly 3-in-5

chance.

_________________________________________________________________________________________

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
304
UNIT 1: The Number System

MODULE 1 Adding and of red apples and green apples. It sold

more green apples than red apples, so it
Subtracting Integers had more red apples left.
LESSON 1-1 2. a. −2 + ( −3) + ( −13) = −18
Practice and Problem Solving: A/B b. The hotel guest got off on the 14th floor.
The manager started on the 19th floor
1. a. 8
and rode 2 floors down to the 17th floor
b. negative when the hotel guest got on. They rode
c. −8 the elevator down 3 floors. 17 − 3 = 14,
so the hotel guest got off on the
2. a. 11
14th floor.
b. negative
c. −11
Practice and Problem Solving: D
1. a. 7
3. −6
b. positive
c. +7
2. a. 10
4. −10
b. negative
c. −10
3. −5
5. −9

4. −6
6. −12

5. −7
7. −8
8. −9
6. −7
9. −53
10. −93
11. 224
7. −4
12. −95
8. −8
13. −600
9. −19
14. −1310
10. −35
15. −3 + ( −2) + ( −4) = −9; −9 feet
11. −$8
Practice and Problem Solving: C
Reteach
1. a. −42 + ( −87) + ( −29) = −158
1. a. positive
b. −57 + ( −75) + ( −38) = −170 b. 3 + 6 = 9
c. The store had more red apples left over. c. 98
The store started with the same number
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
308
2. a. negative 7. −2
b. 7 + 1 = 8 8. 4
c. −8 9. 8
3. a. negative 10. 2
b. 5 + 2 = 7 11. 43
c. −7 12. 21
4. a. positive 13. −29
b. 6 + 4 = 10 14. −10
c. 10 15. 11°F
5. −13 16. 3 yards
6. −16 17. −9 points
7. 37 18. a. negative
8. −41 b. loss of 6, or −6
9. −24 Practice and Problem Solving: C
10. 52 1. negative; −10
Reading Strategies 2. positive; 5
1. Each counter represents −1. 3. negative; −7
2. Each counter represents a dollar that 4. positive; 5
Sarah withdrew. The counters make it is 5. positive; 6
easier to see how many dollars Sarah
withdrew each day. 6. positive; 15
3. You can simply count the counters to find 7. negative; −1
the sum. 8. positive; 1
4. −3 + (−5) + (−4) + (−1) = −13 9. the same sign as the integers
10. It is the sign of the integer whose absolute
Success for English Learners
value is greater.
1. positive counters
11. −15
2. because you are adding a negative
number 12. −24
3. Answers will vary. Sample answer: Erica 13. 13
bought stamps three times this week. She 14. −30
bought 5 stamps on Monday, 3 stamps on 15. 0
Wednesday, and 4 stamps on Friday.
How many stamps did Erica buy this 16. −18
week? (5 + 3 + 4 + 12) 17. −5°F
LESSON 1-2 18. $150
19. Rita; 11 points
Practice and Problem Solving: A/B
1. −1 Practice and Problem Solving: D
2. 1 1. −1
3. 5 2. −7
4. −1 3. −5
5. −1 4. −1
6. −3 5. −1
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
309
6. 12 LESSON 1-3
7. 4
Practice and Problem Solving: A/B
8. 8
1. −5
9. −5
10. −10
11. −6
2. 6
12. 5°F
13. −22°F
14. −97 ft
15. 17,500 ft 3. −10
Reteach 4. 5
1. subtract; the numbers have different 5. −4
signs 6. 24
2. negative 7. 0
3. 4 8. 46
4. −5 9. −1
5. −1 10. 42
6. −4 11. −6
7. 2 12. −26
8. −5 13. 30

9. 9 14. −5
15. 9°C
10. −10
16. 14°F
11. −16
17. 4°C
12. Sample answer: I look at 3 and 9 and see
that 9 > 3. Since the sign on 9 is negative, 18. 7°C
the answer is negative. 19. 240°C
Reading Strategies Practice and Problem Solving: C
1. on zero 1. 16
2. right; 6 2. −22
3. left; 4 3. 7
4. 2 4. 0
5. on zero 5. 29
6. left; 5 6. 9
7. left; 3 7. −2
8. −8 8. 0
Success for English Learners 9. −10
1. negative number 10. when x < y
2. No, the sum can be positive or negative. 11. when x > y
3. negative 12. 12°F, −2°F
4. positive 13. Pacific; 2,400 m

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
310
14. 11,560; −185; −185 is closer to Success for English Learners
sea level; 11,375 ft 1. positive
15. Saturday 2. negative
16. 3°
LESSON 1-4
Practice and Problem Solving: D
1. −5 Practice and Problem Solving: A/B
2. −4 1. −2 − 19 + 7 = −14; 14 feet below the
surface of the water
3. −7
2. 45 − 8 + 53 − 6 = 84; 84 points
4. −5
5. 6 3. 20
6. −16 4. −27
7. 0 5. 18
8. 1 6. 110
9. 7 7. 52
10. 16 8. 34
11. −11 9. <
12. 610°C 10. >
13. $35,000 11. a. 225 + 75 − 30 = 270; 270 points
14. 9°F b. Maya
Reteach Practice and Problem Solving: C
1. a. 5 1. −35 − 29 + 7 − 10 = −67; Jana is 67 ft from
b. −1 the end of the fishing line.
c. 20 2. a. 500 + 225 − 105 + 445 = 1065; 1065 ft
2. a. negative above the ground
b. 2 b. Kirsten is closer to the ground;
c. −2 Gigi’s balloon position is
3. 40 500 + 240 + 120 + 460 = 1080 ft,
which is greater than 1065 ft.
4. −3
3. a. 20 + 20 + 30 + 30 − 10 − 10 − 10 = 100;
5. −26 100 points
6. 0 b. David and Jon tied. Jon scored
7. 31 20 + 20 + 20 + 30 + 30 − 10 − 10 = 100,
8. −5 or 100 points, which is the same
number of points that David scored.
Reading Strategies
Practice and Problem Solving: D
1. left
1. −2 − 9 + 3 = −8; 8 ft below the surface of
2. 7
the water
3. right
2. 20 − 5 + 10 = 25; 25 points
4. 3
3. −1
5. −4
6. right; 2 4. −24
7. left; 6 5. 20
8. −4 6. −9
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
311
7. 8 6. a. 18 + 6 − 4 − 30
8. 100 b. 24 − 34 = −10
9. < c. −10
10. >
Reading Strategies
11. 200 − 30 + 70 = 240; 240 points
1. +700; above
Reteach 2. when the balloon rises; rise
1. a. 10 + 5 − 19 3. when the balloon drops; drop
b. 15 − 19 = −4 4. 700 − 200 + 500 − 100 = 900
c. −4 5. 900 ft above the ground
2. a. 14 − 15 − 3 6. Angelo is higher than where he started
b. 14 − 18 = −4 because 900 is greater than 700.
c. −4 Success for English Learners
3. a. 10 − 80 − 6 1. When money is withdrawn, it is taken out
b. 10 − 86 = −76 of the bank account. So, you subtract.
c. −76 2. When money is deposited, it is put into the
bank account. So, you add.
4. a. 7 + 13 − 21
3. Answers may vary. Sample answer: Jose
b. 20 − 21 = −1
has $25. He spends $5, and then earns
c. −1 and saves $15. How much money does
5. a. 13 + 2 − 5 − 6 Jose have at the end? (25 − 5 + 15 = 35)
b. 15 − 11 = 4
c. 4

MODULE 1 Challenge
1. Calculate the difficulty using the method shown in the example.
Trail Mile 1 Mile 2 Mile 3 Mile 4 Mile 5 Total

Breakneck 100 − (−2) = 102 −2 − 100 = −102 150 − (−2) = 152 −8 − 150 = −158 250 − (−8) = 258 252

Lake Shore 0 − (−10) = 10 6−0=6 55 − 6 = 49 −1 − 55 = −56 60 − (−1) = 61 70

Mountain
−2 − 40 = −42 120 − (−2) = 122 35 − 120 = −85 200 − 35 = 165 180 − 200 = −20 140
View

The most difficult trail is Breakneck.

2. The greatest possible value is obtained by filling the boxes as follows.

−3 + 5 − −4 − −10 + 18 = 34

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
312
MODULE 2 Multiplying and 17. 1
Dividing Integers 18. negative; positive

LESSON 2-1 Practice and Problem Solving: D

1. −6
Practice and Problem Solving: A/B
2. 0
1. −80
3. 8
2. −72
4. −28
3. 40
5. 12
4. −39
6. −36
5. 0
7. −50
6. −80
7. 189 8. −18
8. −11 9. −70
9. −72 10. 1
10. 80 11. −12
11. −54 12. 4
12. 49 13. 5(−3) = −15; −15 points
13. 4(−6) = −24; −24 points 14. 3(−1) = −3; −3°
14. 5(−3) = −15; −15° 15. 2(−4) = −8; −8 yd
15. 8(−18) = −144; 200 + (−144) = 56; $56 16. 7(−9) = −63; −$63
16. 3(−5) = −15; 8 + (−15) = −7; −7° 17. 5(−5) = −25; −$25
17. 6(−25) = −150; 325 + (−150) = 175; $175 Reteach
Practice and Problem Solving: C 1. −2
1. −98 2. 18
2. 120 3. −5
3. −144 4. 54
4. 135 5. 44
5. −24 6. 4(−8) = −32; −32 points
6. −36 7. 5(−500) = −2,500; −2,500 ft
7. 0 Reading Strategies
8. −1,440 1. gaining 10 points
9. 1,176 2. losing 17 points
10. 3(−4) = −12; −12 + 9 = −3; −3 yd 3. left
11. 4(−35) = −140; −140 + 220 = 80; $80 4. 4
12. 3(−50) = −150; −125 + (−150) = −275; 5. left
−275 ft 6. 4
13. 1 7. left
14. −1 8. 4
15. 1 9. The score decreased by 12.
16. −1 10. −12 points
11. −16 points
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
313
Success for English Learners 7. +1 produces +2.
1. −20 8. −16 ÷ 4 = −4; −4 points for each event
2. 3 9. a. 58°F; 70°F − (6 yd)(2°F/yd) = 70°F −
3. (−20) × (3) 12°F = 58°F; from 6 yd to 15 yd deep,
the temperature is constant, so at 10 yd
4. −$60
deep, the temperature is 58°F.
5. Sample answer: You know the product will 2
be either 400 or −400. It will be 400 b. 73°F; 50 ft = 16 yd below the surface;
3
because both factors are negative, so the at 15 yd below the surface, the
product is positive.
temperature is 58°F. But, from 15 yd to
6. Yes. The product of both will be negative 20 yd the temperature increases 3°F
because there is one positive factor and 2 2 2
one negative factor. Since 4 × 8 = 32, per ft. 16 yd is 16 − 15 or 1 yd,
3 3 3
each product will be −32. which is 5 ft, so the temperature there
LESSON 2-2 is 58°F + (5 ft)(3°F/ft) or 58°F + 15°F =
73°F.
Practice and Problem Solving: A/B c. 70°F − (6 yd)(2°F/yd) + (5)(3 ft)(3°F) =
1. −12 103°F at the spring source
2. 19
Practice and Problem Solving: D
3. −3
1. 5
4. −4
2. −9
5. 11
3. −4
6. −8.75
4. >
7. −5
5. <
8. −10
6. =
9. −1
7. −45 ÷ 5 = −9
10. 32 ÷ (−4)
55
−30 8. = −5
11. + ( −8) −11
6
9. −38 ÷ 19 = −2
12. 12 ÷ (−3) + (−14)4
10. −4 ÷ −2 = 2
13. $3,000 ÷ 40 = $75; $75 − $40 = $35
11. −24 ÷ 4 = −6; On average, each investor
14. a. −240 ÷ (−15) = 16; 16 weeks lost 6%.
b. 20 × −$15 = $300; $300 − $240 = $60 12. −760 ÷ 4 = −190; On average, the
Practice and Problem Solving: C temperature dropped 190°/h.

1. −16 13. −5,100 ÷ 3 = −1,700; On average, the

car’s value decreased $1,700/yr.
2. 2
2 Reteach
3. 3
3 1. right; negative; negative
4. +2 produces +2; +3 produces +6. 2. left; negative; positive
5. +2 produces +2. 3. left; positive; negative
6. None of the integers from −3 to 3
produces a positive, even integer.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
314
4. 10. (−12) + (−11) + (−8) = −31; falls by 31 ft
Divisor Dividend Quotient 11. 5(3) + 2(−12) = −9; 9-yd loss
+ + + 12. 7(−3) + (−12) + 5 = −28; $28 less

− + − Practice and Problem Solving: C

+ − − 1. +10
2. −18
− − +
3. +104
Reading Strategies 4. −28
1. 3,600 km; 225 kmh; 16 hours 5. 8(−2 + 9 + 6)
2. 35 degrees; 7 hours; 5 degrees per hour 6. gained $68
3. 1,600 liters; 2-liters/bottle; 800 bottles 7. 4(−45) + 112 = −68; 68 ft lower
4. Answers will vary. Sample answers: 8. 17(5) + 5(−2) + 8 = 83; She got an 83.
“102 divided by negative 6.” “Negative
6 goes into 102 how many times?.” 9. 3(−20) + 2(−12) + (−42) + 57 − 15 = −84;
$84 less
5. Answers will vary. Sample answers: “The
10. a. Positive, because there is an even
opposite of 17 divided into negative 221.”
number of negative factors.
“Negative 221 divided by negative 17.”
b. 2,880
Success for English Learners
−210
Practice and Problem Solving: D
1. = −3 1. 15 + (−12); 3
70
2. 300 −4200 = −14 2. 15 + 18; 33
3. −7 + 23; 16
3. −50 ÷ 10 = −5
4. 52 + (−5); 47
4. 27 54 = 2 5. (−50) + (−112) + (−46) = −208; He has
5. +; 1 $208 less.

6. −; −32 6. 8 + (−4) + 7 + 3 + (−11) = 3; They had a

3-yd gain.
7. −; −4
7. 4(−2) + 2(−1) + 3 = −7; She had $7
8. +; 5 less.
LESSON 2-3 8. 3(−4) + 4(−2) = −20; The water was 20 in.
lower.
Practice and Problem Solving: A/B
1. 14
Reteach
1. multiplication
2. −16
2. addition
3. −27
3. division
4. 15
4. addition
5. −29
5. multiplication
6. −40
6. division
7. >
7. multiplication
8. >
8. subtraction
9. 15(2 − 5) = −45; $45 less
9. −1
10. −31
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
315
11. −31 3. Sample answer:
12. 33 First find multiplication and division signs
and do these operations first.
13. −62
1. Multiply (−4)(7) = −28. The product is
14. −48
negative because one of the factors is
Reading Strategies negative.
1. paid; gave; 4(−3) + 7 = −12 + 7 = −5; (−8) + (−3) + (−28) ÷ 14 + 9 (−2)
$5 less 2. Divide (−28) ÷ 14 = −2. The quotient is
2. below; −48 ÷ 4 = −12; 12 feet below the negative because the dividend is
surface negative and the divisor is positive.
3. lost; gained; 3(−5) + 32 = −15 + 32 = 17; (−8) + (−3) + (−2) + 9 (−2)
gained 17 yards 3. Multiply (9)(−2) = −18. Same reason
as step 1.
Success for English Learners
(−8) + (−3) + (−2) + (−18)
1. 39
Now go back and add and subtract
2. −5 from left to right.
3. 6
4. (−8) + (−3) = (−11) because you are
4. a. Sample answer: Tom bought 3 DVDs
adding two negative numbers.
for $20 each. He had a coupon for $5
off one DVD. After his purchase, what is (−11) + (−2) + (−18)
the change in the amount of money 5. (−11) + (−2) = (−13), for the same
Tom has? reason. (−13) + (−18)
b. −3(20) + 5 = −60 + 5 = −55; Tom has
$55 less now. 6. (−13) + (−18) = (−31)

MODULE 2 Challenge MODULE 3 Rational Numbers

1. Sample answer: LESSON 3-1
81 ÷ ( −9) + ( −4) − 17 + (4)(3) + 1 Practice and Problem Solving: A/B
−9 + ( −4) − 17 + 12 + 1 1. 0.95
−13 − 17 + 12 + 1
2. −0.125
−30 + 12 + 1
3. 3.4
−18 + 1
4. −0.777... or 0.7
−17
5. 0.7333... or 0.73
2. Sample answer: Play with 2−4 players.
Shuffle the integer cards and deal 6. 2.666... or 2.6
them out. Place the operations card 29
face-up on the table. One player starts 7. ; 3.222...; repeating or 3.2
making an expression by placing one card 9
on the table. The next player can choose 301
8. ; 15.05; terminating
an operation card and an integer card 20
from his/her hand and extend the 53
expression. Each player does the same 9. − ; −5.3; terminating
10
until the cards are gone or one player
wins. To win, a player makes the
expression equal to 0.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
316
10. a. Answers may vary. Sample answer: Reteach
3 2 3 3
2 , 2.75; 3 , 3.5 1. = 0.75 so 7 = 7.75
4 4 4 4
b. Answers may vary. Sample answer:
5 5
2 2. = 0.833... or 0.83 so 11 = 11.833...
4 , 4.666... or 4.6 6 6
3
or 11.83
11. They all convert to terminating decimals.
3 3
Practice and Problem Solving: C 3. = 0.3 so 12 = 12.3
10 10
25
1. ; 1.3888... or 1.38; repeating 5 5
18 4. = 0.277... or 0.27 so 8 = 8.277...
18 18
200 or 8.27
2. ; 13.333... or 13.3; repeating
15 5. Sample answer:
5 18 3 Method 1: Start with the fraction part.
3. Possible answer: , , ; the
20 20 20 2 2
decimals are 0.25, 0.9, 0.15. They = 0.222... or 0.2 so 9 = 9.222... or
9 9
terminate because a rational number
9.2
with 20 in the denominator is equivalent
to a rational number with 100 in the 2 83
Method 2: 9 = . Using long division,
denominator, which always terminates. 9 9
30 5 83
4. Possible answer: = 2.0; = 0.333... = 9.222... or 9.2 ; the results agree.
15 15 9
or 0.3 ; To find a repeating decimal, select 6. Sample answer:
a multiple of 5 that is less than 15. To find
Method 1: Start with the fraction part.
a terminating decimal, select a numerator
that is a multiple of 15. 5 5
= 0.625 so 21 = 21.625.
8 8
1.5 15
5. Possible answer: = , which 5 173
7.5 75 Method 2: 21 = . Using long
is written as a ratio of two integers; 8 8
15 173
= 0.2 division, = 21.625; the results agree.
75 8

Practice and Problem Solving: D Reading Strategies

1. 0.65; terminating 1. Both −3 and 5 are integers.
2. 4.666... or 4.6; repeating 2. 2 is an integer but 1.17 is not an integer
2
3. 0.555... or 0.5; repeating (but that does not mean that is not a
1.17
4. 3.833... or 3.83; repeating rational number).

5. 8.75; terminating 1
3. 1 is an integer but is not an integer
3
6. 10.625; terminating
1
7. 1.3125 (but that does not mean that is not a
1
8. 7.3125 3
9. 26.3125 rational number).
10. 1.266... or 1.26 4. 2 is not an integer and 4 is not an
11. 17.266… or 17.26 integer (but 4 can be written as the
integer 2).
12. 23.266... or 23.26
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
317
1 LESSON 3-3
14. 2
3
Practice and Problem Solving: A/B
3
15. 1. −9
4
2. 9
16. −3.4
3. 9
17. −3.2
1
18. −0.5 4. −5
2
1
19. −1 2
2 5. −
7
20. −3 6. 1.2
21. −0.9 3
7.
Reteach 4
1. 2 8. −3.7
2. −5 1
9. −5
3. −7 2
4. 0.6 10. 8.3
5. 4.7 11. −9.08
6. −6 12. 3.75
3 13. −6.2
7.
5 3
14. −1
2 5
8. −1
3 15. −4.1°C
1 3
9. − 16. 1 m
2 5

Reading Strategies Practice and Problem Solving: C

1. 0 2
1. −6
2. to the right; 6 3
3. to the left; 4 1
2. 1
4. 0 21
5. to the left; 5.5 3. −10
6. to the left; 3 4. −7.2
Success for English Learners 1
5. −2
8
1. Answers will vary. Sample answer: so the
digits of the same place value get added 6. −12.179
together 5
2. the total number of pieces of pizza 7. −1
9

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
319
8. 0.36 3. 40
9. −13.19 4. −3
10. −4.35 5. −26
11. −1.05 6. 4.2
12. −7 7. 2
13. 3.55 8. −3.25
14. Alex by 7.1 points 9. 1
15. 7°C 10. −2
Practice and Problem Solving: D 5
11. −
1. 2 4
2. 6 Reading Strategies
3. −3 1. Sample answer: One number is placed in
4. −7 each square.
5. −3 2. as a placeholder to show that there is no
number in that place
6. 8
3.
7. 1.5
4 0 • 3
8. −3
9. −1.5 − 6 • 5 4
1
10. 1
2 4. yes; in the hundredths place of the first
11. −1 number
1 5. 33.76
12. −1
2 Success for English Learners
13. 7 1. −9
4 1
14. − or −1 2. You are not adding or subtracting −4, you
3 3 are subtracting 3 from −4.
1
15. − 3. No, in 3 − 5 you are subtracting 5
2 (or adding −5) to 3. In 5 − 3 you are
16. 1.4 subtracting 3 from 5.
17. −2.2 4. Find a common denominator
18. −7.8 2
5.
19. −2 15
20. −6.5 LESSON 3-4
21. −1
Practice and Problem Solving: A/B
Reteach 1. −2
1. a. 5
b. −1
c. 20 1
2. 3
2. a. negative 3
b. 2
c. −2
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
320
3. −6.2 3
4 ⎛ 1 ⎞ 4π π 3
8. V1 = π = = ft ;
4. −21.6 3 ⎜⎝ 2 ⎟⎠ 24 6
5. −19.8 3
4 ⎛ 3 ⎞ 108π 9π 3
V2 = π ⎜ ⎟ = = ft ; V2 > V1,
6. 16.8 3 ⎝4⎠ 192 16
7. 36 9π π
since = 0.5625π and = 0.16π .
8. −2.1 16 6
4 3 2r
9. −8.2 9. V = π r . If r becomes , then
3 3
10. 31.5 3
4 ⎛ 2r ⎞ 8 ⎛ 4 3⎞
11. −20 V2 = π ⎜ ⎟ = π r ⎟ . Therefore, if
3 ⎝ 3 ⎠ 27 ⎜⎝ 3 ⎠
4 the radius is reduced to one third of its
12. −
9 8
original value, the volume is or 0.296
13. 9 27
1 of the original volume.
14.
2 Practice and Problem Solving: D
⎛3⎞ ⎛ 1⎞ ⎛ 1⎞ ⎛ 1⎞ ⎛ 1⎞ ⎛ 1⎞
15. 12 ⎜ ⎟ = 9; 9 yards 1. ⎜ − ⎟ ;
⎝4⎠ ⎜ − 2 ⎟; ⎜ − 2 ⎟; ⎜ − 2 ⎟; ⎜ − 2 ⎟;
⎝ 2⎠ ⎝ ⎠ ⎝ ⎠ ⎝ ⎠ ⎝ ⎠
⎛ 1⎞ ⎛2⎞ ⎛3⎞ 1 1 3 ⎛ 1⎞ 6
16. ⎜ ⎟ ⎜ ⎟ ⎜ ⎟ = ; m − or −3
⎝ 4 ⎠ ⎝ 3 ⎠ ⎝ 5 ⎠ 10 10 ⎜ − 2 ⎟; 2
⎝ ⎠
17. (−3 °F/half hour) × (2 half hours/hour) × 4 ⎛ 2⎞ ⎛ 2⎞ ⎛ 2⎞ 6
hours = −24 °F; 75 °F − 24 °F = 51 °F 2. ⎜ − ⎟ ; ⎜ − ⎟ ; ⎜ − ⎟ ; or 2
⎝ 3⎠ ⎝ 3⎠ ⎝ 3⎠ 3
Practice and Problem Solving: C 3. Answers may vary. Sample answer:
1. <; The product of 3 positive numbers, ⎛ 5 ⎞ 20 5 1
4⎜− ⎟ ; or or − 2
each of which is less than 1, is less ⎝ 8⎠ 8 2 2
than 1.
4. Answers may vary. Sample answer:
2. <; The product of 3 negative numbers is a 2(−2.5); −5
negative number. 5. Answers may vary. Sample answer:
3. >; The product of 3 positive numbers is ⎛ 2⎞ 2
greater than the product of the opposite of 3⎜− ⎟ ; −
⎝ 9⎠ 3
each of the positive numbers.
1 ⎛ −6 ⎞ 6 3
4. <; the product of a positive and a negative 6. − ×⎜ ⎟ = = or 0.06
number is less than 0. 4 ⎝ 25 ⎠ 100 50
5. False; A negative number raised to an 7. 4 × 2.5 × 0.8 = 10 × 0.8 = 8
even power is a positive number. 8. a. (−3.5) + (−3.5) + (−3.5) + (−3.5) +
6. True; A number that is greater than (−3.5) = −17.5 m; −17.5 m
1 raised to a positive power is greater b. 5 × (−3.5) = −17.5; −17.5 m
than 1.
7. False; A positive number that is less than Reteach
one raised to a power is less than 1. 6 1
1. 6; right; ; 1
4 2
2. 8 times; 26.4; 26.4
3. 5 times; 23; 23

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
321
Practice and Problem Solving: D 7 8 7 9 7 9 63
6. ÷ = × ; × = ;
4 8 9 8 8 8 8 64
1. ; −8 63
3 is positive since a positive divided by a
64
1 1
2. ; positive is positive.
8 10
−4 1 Reading Strategies
3. ;
7 2 1. +
8 −40 19 2. −
4. ; = −1
7 21 20 3. +
9 −9 4. −
5. ;
4 2 5. −
1 3 6. +
6. ; −1
4 16
7. −
1
7. 8. +
40
9. +
−21 5 10. −
8. = −2
8 8 11. +
7 1
9. = 3 12. −
2 2
13. −
10. 0.40; 0.16
14. −
11. 0.30; −15.83 15. +
12. 8.0; 3.2
Success for English Learners
3 1
13. a. 6 ÷ 7
4 8 1. 2
88
b. 54 markers
2. 2
c. The town spaced the markers every
eighth of a mile. They used LESSON 3-6
3 Practice and Problem Solving: A/B
54 markers. Since 6 is evenly
4 1. Answers may vary. Sample answer: One
1 estimate would be 4 times 6 or 24 feet
divisible by , they used a whole
8 long. The actual answer is greater than
number of markers. 24 feet.
2. Answers may vary. Sample answer:
Reteach 3 liters divided by a third of a liter makes
1. + about 9 servings. The actual answer is
more than 9 servings.
2. −
3. Answers may vary. Sample answer: The
3. − perimeter is greater than 15 inches.
4. + 4. Answers may vary. Sample answer:
1 5 1 9 1 9 −9 3-gram eggs would be 36 grams, but
5. − ÷− = − ×− ; − ×− = ; 4 gram eggs would be 48 grams, so
7 9 7 5 7 5 −35
3.5-gram eggs should be about 42 grams.
−9 9
= .
−35 35
A negative divided by a negative is
positive.
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
323
5. Answers may vary. Sample answer: 1 4 3 9 4 9 13
8 divided by one half is 16, so the number 3. = , = ; + = ;
of peas is greater than 16. 6 24 8 24 24 24 24
6. These numbers can be used as they are 24 24 13 11
1= ; − = of the budget
since there would be 8 drops in a milliliter, 24 24 24 24
or 240 drops in 30 milliliters.
7. The second strip is 0.25 longer than 3.5,
Reteach
or 3.5 + 0.875, or 4.375 yards. The length 2
1. 11 oz
of the third strip can be written as 6.25, so 5
the total length is 3.5 + 4.375 + 6.25, or 2. 8 h
14.125 yards. 0.125 yards is one eighth of
a yard, so the answer might be written as 2
3. 15 t
1 5
14 yd.
8 1
4. 1 lb
Practice and Problem Solving: C 16
37 Reading Strategies
1. 29 m/s × 3,600 s/h = 107,064 mi
50 1
37 3 37 6 31 1. 2 feet
2. 29 − 8 = 29 − 8 = 21 mi/s 2
50 25 50 50 50 2. one half ft
2 3. 5 servings
3. 32,508 mi ÷ 6 mi/s = 5,400 s
100 4. 5
19 3 5. 5 ft
4. 21 mi/s × 60 s/min = 1,305 mi/min
25 5
6. 5
Practice and Problem Solving: D 7. Answers may vary, but students should
1. Bottles, paper, and cardboard boxes were observe that the answers are the same,
11 and divisor is the reciprocal of the factor 2.
of the total amount of recycled
20 Success for English Learners
material collected by the middle school.
1. the number of pieces of pizza
1 3 1 2 3 2 5 5 2. Find the common denominator.
2. = , = ; + = ; of the family
2 6 3 6 6 6 6 6
3. Add the numerators, and write the sum
budget
over the common denominator.

MODULE 3 Challenge
1. Calculate the daily temperature change as shown.
Daily Temperature Change (°C)

Monday Tuesday Wednesday Thursday

City
to Tuesday to Wednesday to Thursday to Friday
1 ⎛ 1⎞ 3 1 1 3 4 ⎛ 1⎞ 3 1 4 3
City A 2 − ⎜− ⎟ = 2 −3 − 2 = −5 5 − ⎜ –3 ⎟ = 9 −12 − 5 = −18
4 ⎝ 8⎠ 8 2 4 4 5 ⎝ 2⎠ 10 2 5 10
3 1 4 1 3 1 1 ⎛ 1⎞ 3 3 1 9
City B −1 − 4 = −5 −8 − 1 = −6 11 − ⎜ −8 ⎟ = 19 3 − 11 = −7
5 5 5 10 5 2 5 ⎝ 10 ⎠ 10 10 5 10
5 1 1 2 5 1 1 ⎛ 2⎞ 1 1 ⎛ 1⎞ 1
City C 2 − 11 = −8 −3 − 2 = −6 −9 − ⎜ −3 ⎟ = − 5 2 − ⎜ −9 ⎟ = 11
6 3 2 3 6 2 6 ⎝ 3⎠ 2 3 ⎝ 6⎠ 2
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
324
UNIT 2: Rates and Proportional Relationships

MODULE 4 Rates and Practice and Problem Solving: D

Proportionality 1. 3; 3
2. 45; 45
LESSON 4-1
3. $9/h
Practice and Problem Solving: A/B 4. $0.09/oz
1. 2 eggs per batch 3 1
oz oz
2. 53 mph 3 3 3 1 1
5. 4 = ÷ = × = 4 ; oz/h
3. $8/h 3h 4 1 4 3 1h 4
4. 14 points per game 3
6. mi/min
5. $0.20/oz 10
3 150 cal 150 3
6. 1 gal/h 7. = ÷
4 3 1 4
serving
1 4
7. ft/min
2 150 4 200 cal
= × = ;
8. Food A: 200 cal/serving; Food B: 375 1 3 1 serving
cal/serving; Food A has fewer calories 200 cal/serving
per serving.
Reteach
Practice and Problem Solving: C
70 students
1 1.
1. ac/h 2 teachers
2
3 books
1 2.
2. 2 mph 2 mo
5
$52
1 3.
3. of a wall 4h
80
28 patients 28 ÷ 2 14 patients
2 4. = =
4. oz 2 nurses 2÷2 1 nurse
9 5 qt 5÷2 2.5 qt
5. = =
1 2 lb 2÷2 1 lb
5 c
2 88 3.52 c 35.2 c 3 oz 3 3 4 4 oz
5. = = = ; 35.2 > 35, 6. = 3÷ = × =
9 25 1 lb 10 lb 3 4 1 3 1c
1 lb c
16 4
so there are more than 35 cups of flour in 2
10 lb of flour. 3ft
3 2 11 11 60 20 ft
7. = 3 ÷ = × =
6. Tank #1 is filling at a rate of 0.892857… 11 3 60 3 11 1h
h
gallons per hour while tank #2 is filling at 60
a rate of 0.83 gallons per hour. Since
Reading Strategies
0.892857… > 0.83 , tank #1 is filling
faster. 1. No; It does not compare values that have
different units.
2. Yes; It compares a number of yards to a
number of seconds.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
326
3. It compares miles to gallons. Practice and Problem Solving: C
4. Yes 1. a.
25 mi Number
5. No; 1 2 3 4 5
1 gal of tickets
800 ft 2 Total Cost ($) 27 54 81 108 135
6. No;
1h
b. 27
2 8
lb lb c. Sample answer: c = 27t
7. No; 45 or 3
1 min 1h 2. 32

Success for English Learners 3. yes; Sample answers: p = 35h; h is

number of hours; p is pages read
3 mi
1. 3 miles per hour or 4. yes; Sample answers: y = 6x; x is number
1h
of ounces; y is grams of protein
3
3 mi 5. yes; Sample answers: c = 4.5w; w is
3
2. 3 miles per hour or 4 weight; c is total cost
4 1h
6. no; You cannot write an equation for the
3. Briana has the faster speed per hour.
pairs in the table as they are not
proportional.
LESSON 4-2
Practice and Problem Solving: D
Practice and Problem Solving: A/B
1. a. yes
1. a. yes
b. y = 6x
b. Sample answer: c = 27t
c. x
c. t
d. y
d. c
2. a. yes
2. a. yes
b. c = 3h
b. Sample answer: c = 4.35w
c. h
c. w
d. c
d. c
3. yes; Sample answer: c = 0.75w;
3. not proportional
w = weight (oz); c = total cost
4. yes; Sample answers: d = 40t;
4. not proportional
d = distance; t = time
1 1
1 1 5. k = ; Sample answer: b = a;
5. k = ; Sample answers: b = p; 5 5
3 3
a = apples; b = bags
b = boxes; p = pens
6. k = 12; Sample answer: e = 12c;
6. k = 6; Sample answers: m = 6p;
c = cartons; e = eggs
m = muffins; p = packs
7. a. Reteach
Days 1 2 3 4 5
1. yes
Hours 24 48 72 96 120
3 6 9 12
2. = 3; = 3; = 3; =3
b. yes 1 2 3 4
c. Sample answer: h = 24d where is 3. Sample answer: y = 3x
d is the number of days and h is the
4. 3
number of hours

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
327
5. y = 35x Practice and Problem Solving: C
6. y = 7x 1. Employee B; Answers may vary. Sample
answer: Employee A earns $7.50 per
Reading Strategies hour, and employee B earns $10 per hour,
3 6 9 12 so employee B earns more money.
1. = 3; = 3; = 3; =3
1 2 3 4 2. Employee A: 15 × $7.50 = $112.50;
2. 3 employee B: 15 × $10.00 = $150.00
3. yes 3. Sample answer: y = 8x
35 4. Company A: proportional because a graph
4. comparing months of service and total
1
cost will form a line passing through the
4.35 origin; Company B: not proportional
5.
1 because the line formed will not pass
through the origin
Success for English Learners
5. Yes; y = 2x
1.
6 3 9 12 15 6. Sample answer: Graph the points and
analyze the graph. The graph of a
2 1 3 4 5 proportional relationship is a line that
passes through the origin.
2. 3
Practice and Problem Solving: D
LESSON 4-3 1. proportional; The cost is always 10 times
the number of shirts.
Practice and Problem Solving: A/B 2. proportional; The number of crayons is
1. always 50 times the number of boxes.
Time (h) 2 4 5 9
3. proportional; The line will pass through the
Pay ($) 16 32 40 72 origin.
Earnings are always 8 times the number 4. not proportional; The line will not pass
of hours. through the origin.
2. 5. y = 6x
Weight (lb) 2 3 6 8
6. y = 4x
Price ($) 1.40 2.10 4.20 5.60
1
7. y = x
Cost is always 0.7 times the number of 3
pounds. 8. Use the point (1, 8) to find the constant
3. Not proportional; The line will not pass 8
of proportionality, 8 or , or
through the origin. 1
4. Proportional; The line will pass through Reteach
the origin. 1. hours worked; pay (in dollars); Sample
5. The car uses 2 gal of fuel to travel 40 mi. 14
answer: (2, 14), = 7; y = 7x
6. y = 20x, where x is the gallons of fuel 2
used, y is the distance traveled (in miles), 2. number of students; cost of admission
and k is the constant of proportionality (in dollars); Sample answer: (12, 24),
7. The graph for the compact car would be 24
= 2; y = 2x
steeper. 12

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
328
d. No, Rodrigo sold a total of 3. in the denominator (or bottom part) of the
87 magazines but he needed to sell 99 fraction
magazines to meet the goal of
increasing sales by 15% each week. 4. 25
Samantha sold a total of 5. 20
77 magazines but needed to sell 20
86 magazines to meet the goal. 6. = 0.8 × 100 = 80%; percent increase
25
3. 2.7%
Success for English Learners
Practice and Problem Solving: D 1. A percent increase is when the amount
1. 40% increases or goes up. A percent decrease
2. 300% is when the amount decreases or goes
down.
3. 90%
2. Sample answer: The height of a child from
4. 75%
one year to the next.
5. 81%
3. Retail is the price for the customer.
6. 75% Wholesale is the amount that the store
7. 33% bought the item for.
8. 67% 4. wholesale price
9. $27.50 5. Answers will vary. Sample answer:
Mr. Jiro buys a pack of T-shirts for $4.95.
10. 128 bananas
He plans to sell them at an 80 percent
11. 50 books increase. What is the selling price of each
12. 39 companies pack of T-shirts? ($4.95 • 80 = $3.96;
13. 420 students selling price: $4.95 + $3.96 = $8.91.)
14. $27.30
LESSON 5-2
Reteach Practice and Problem Solving: A/B
14 1. $0.30; $1.80
1. 14; 8; ; 175%
8
2. $1.30; $4.55
9
2. 9; 90; ; 10% 3. $2.40; $12.00
90
4. $9.75; $22.25
75
3. 75; 125; ; 60% 5. $42.90; $120.90
125
6. $4.49; $7.48
340
4. 340; 400; ; 85% 7. $57.20
400
5. 25% 8. $19.99
6. 95% 9. $35.70
7. 80% 10. $276.68
8. 40% 11. 0.57c or 0.57
12. 1 + 0.57c or 1.57c
9. 200%
13. $70.65
10. 5%
14. $25.65
Reading Strategies
Practice and Problem Solving: C
1. $50
1. $89.99
2. decrease
2. $30

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
330
3. 50% Retail price = Original cost + markup
4. $90.75 = c + 07c
5. $113.44 = 1.7c = 1.7($80) = $136
6. $76.00 1. the bar for the cost of a camera, c
7. 1.07c 2. the bar that shows the markup, 70% of c,
8. 1.02c or 0.7c
9. Store B 3. the original cost plus the markup, c + 0.7c.
Practice and Problem Solving: D 4. $136

1. a. 0.40p Success for English Learners

b. p + 0.4p 1. A markup is when the price increases or
goes up. A markdown is when the price
c. $78.40
decreases or goes down.
d. $22.40 2. The retail price is the original cost of an
2. $6; $36 item plus a markup. The sales price is the
3. $3.50; $13.50 original price of an item minus a
markdown.
4. $10; $50
3. Answers will vary. Sample answer: A store
5. $58.50
buys shirts for $15. The store’s markup is
6. $21.35 50%. What is the retail price? ($22.50)
7. $26.25
LESSON 5-3
8. $276.25
9. c + 0.4c Practice and Problem Solving: A/B
1.
Reteach
1. $45.00 + $9.00 = $54.00 Sale 5% Sales Total Amount
2. $7.50 + $3.75 = $11.25 Amount Tax Paid
3. $1.25 + $1.00 = $2.25 $67.50 $3.38 $70.88
4. $21.70 + $62.00 =$83.70
$98.75 $4.94 $103.69
5. $150.00 − $60.00 = $90.00
$399.79 $19.99 $419.78
6. $18.99 − $4.75 = $14.24
$1250.00 $62.50 $1,312.50
7. $95.00 − $9.50 = $85.50
8. $75.00 − $11.25 = $63.75 $12,500.00 $625.00 $13,125.00
9. a. $3.15 2.
b. $2.52 Interest New
Principal Rate Time
Earned Balance
Reading Strategies
1–4. $300 3% 4 years $36.00 $336.00
$450 5% 3 years $67.50 $517.50
$500 4.5% 5 years $112.50 $612.50
$675 8% 2 years $108.00 $783.00

3. $1,250
4. salesperson A; $7,428.30
5. 18%
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
331
6. a. $780 2.
b. $900 Interest
Principal Rate Time
c. $450 Earned
d. $300 $400 5% 2 years $40
e. $570 $950 10% 5 years $475
Practice and Problem Solving: C $50 4% 1 year $2
1.
$1,000 8% 2 years $160
Sale Amount of
Tax Total Cost 3. 0.5 × 32 = 16; Karl is 16 years old.
Amount Tax
4. 0.10 × 20 = 2.0; Jacquie saves $2 for
$49.95 8% $4.00 $53.95 referring a friend.
$128.60 5% $6.43 $135.03 5. 0.15 × 8.40 = 1.26; Tyler’s tip should be
$1.26.
$499.99 7.5% $37.50 $537.49
Reteach
$2,599 4% $103.96 $2,702.96
1. $14.95
$12,499 7% $874.93 $13,373.93
2. 6.5%
2. 3. amount = $14.95 × 6.5% = $0.97
Interest 4. $14.95 + $0.97 = $15.92
Principal Rate Time New Balance
Earned
Reading Strategies
$2,400 3.5% 6 months $42.00 $2,442.00 1. $756
$45.00 4.9% 2 years $4.41 $49.41 2. $68.06
$9,460.12 5.5% 5 years $2,601.51 $12,061.65 3. $1,160.34
4. a. $800
$3,923.87 2.2% 9 months $64.74 $3,988.61
b. 4%
3. Jorge earned $8,046. Harris earned
c. 5 years
$8,493. Harris’ commission rate is 9.5%.
5. principal, rate, and time
4. The total at Big Box store comes to
$47.88. The total online comes to $48.95. Success for English Learners
It is cheaper at the Big Box store. 1. $1,116
5. The first item is full price: $100. The
second item is half off: $50. The total
comes to $150. A 50% discount on $200
would be $100.
Practice and Problem Solving: D
1.
Sale Amount 5% Sales Tax
$50 0.05 × $50 = 2.5 = $2.50
$120 0.05 × 120 = $6
$480 0.05 × 480 = $24
$2,240 0.05 × 2,240 = $112
$12,500 0.05 × 12,500 = $625

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
332
UNIT 3: Expressions, Equations, and Inequalities

MODULE 6 Expressions and Practice and Problem Solving: D

Equations 1. 50 −; 2; 2; 2; 2; 50 −; 0.2m;
50 − 0.20m
LESSON 6-1
2. 10 −; 3; 3; 3; 10 − 0.3n
Practice and Problem Solving: A/B 1 1 6 14 3 7
3. ; 6x; ; 14y; x; y ; x; y
1. p + 4 4 4 4 4 2 2
2. 3L − 5 1 1 15 20 5 10
4. ; 15a; ; 20b; a; b; a; b
3. Answers will vary. Sample answer: 6 6 6 6 2 3
$25 less six-tenths of x 5. 5; 5; 2; 3; 5; 5; 6
4. Answers will vary. Sample answer: four 6. 7; 7; 2; 3; 7; 7; 6
more than two thirds of y.
7. 4(x + 3)
5. 2,000 + 80z
8. 3(2s + 6t + w)
6. 2.625a − 4.5b
7. 5(9c + 2d) Reteach
8. 3(9 − 3x + 5y) 1. Answers will vary. Sample answer: one
hundred less five times the number of cars.
9. 20 − 3j
2. Answers will vary. Sample answer:
10. 5 + 18y
twenty-five hundredths of the apartments
Practice and Problem Solving: C and six tenths of the condos.
1. 4a + 5b 3. Answers will vary. Sample answer: one
thirteenth of the difference between three
2. 4a + 5b = 120 times the number of hammers and eight
3. a. 20 times the number of pliers.
b. 20 1 ⎛1 1 ⎞
c. $100
4. ⎜ s + e⎟
10 ⎝ 2 3 ⎠
d. 10 5. 0.3f + 25
e. $40 6. (3e − 4) + (6 + 2w)
f. $80
Reading Strategies
g. $60
1. 0.35(50m + 75a)
h. 12
2. 0.35(50m + 75a) = 17.5m + 26.25a
i. $60
3. The original expression shows how much
j. 20
was contributed to the charity and to pay
k. $80 for the others costs of the event. The
l. 8 simplified expression might be easier to
use to directly calculate the amount going
m. $40
to the charity.
4. The total price of the high-energy lamp is
4. 20d + 12c, where d is the drill price and c
a whole-number multiple of 4. The total
is the charger price
price of the low-energy lamp is a whole-
number multiple of 5. 5. 4(5d + 3c); Answers will vary.
5. 20 high-energy lamps at $5 = $100; Sample answer: The factor 5d + 3c
$120 − $100 = 20; $20 ÷ 4 = 5; 5 low- shows that for every 5 drills purchased,
energy lamps can be bought 3 chargers were purchased.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
334
6. The un-factored expression, 20d + 12c, 3. y = 2.76
gives the total amount paid for both drills 4. z = 2.76
and chargers. The factored form of
4
20d + 12c which is 4(5d + 3c) gives a 5. s = 5
quick way to see how many chargers (3) 7
are sold when a certain number of drills 13
6. r = 5
(5) are sold. 25
Success for English Learners 1
7. f = 2
1. 10 + 3n 4
2. Three times the prize of a pizza and two 5
8. m = 1
drinks shows factoring, since it can be 9
represented as the product of two 9. a. 5h = 37.5, h = 7.5; She worked 7.5 h
factors—3 and p + 2d. Sample answers: on average per day.
3p + 6d; 3(p + 2d) b. $118.125; She made $118.13 per
3. 3(p + 2d) = 3p + 6d day.
LESSON 6-2 2 1
10. 3 • x = 7 ; x = 2; He doubled the
3 3
Practice and Problem Solving: A/B recipe.
1 2 2 4 1
1. n = 13 11. 3 + 3 = 6 = 7 , addition;
3 3 3 3 3
2. y = 1.6 2 4 1
3 • 2 = 6 = 7 ; multiplication
3. a = 24 3 3 3
4. v = −3 12. 1.89x ≈ 6; x ≈ 3; She bought 3 bottles.
15.5z −77.5 13. 38.4 in = 3.2 ft; 15.3 − x = 3.2, x = 12.1;
5. = ; z = −5
15.5 15.5 The piece he cut was 12.1 feet long.
⎛ t ⎞ Practice and Problem Solving: D
6. −11⎜ ⎟ = −11(11); t = −121
⎝ −11 ⎠ 1. 8; 8; 19
0.5m 0.75 2. 3; 3; 1
7. = ; m = 1.5
0.5 0.5 3. 5; 5; 3
⎛r ⎞ 4. 7; 7; −21
8. 4 ⎜ ⎟ = 4(250) ; r = 1,000
⎝4⎠ a
5. 3 × = 3 × 5 ; 15
1 3
9. n − 8 = −13
3 6. 4.5; 4.5; 6
10. −12.3f = −73.8 7. 5; 5; 30
11. 10 = T + 12; T = −1°C 8. 7.35; 7.35; 4
12. 3.2d = 48; d = 15 days 9. 110°; x; 180°; 110 + x = 180; x = 70°
10. miles; gallon; 72.9, 2.7, 27; 27
13. 15t = 193.75; t = $12.92 (to the nearest
cent) Reteach
1 1 3 7
14. d = ; d = mi 1. m = 6
3 4 4 8
Practice and Problem Solving: C 2. t = −0.6
1 3. j = 13.1
1. x = 5
3 4. y = 12
2. m = 7.1 5. w = −20

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
335
Reading Strategies z + 22
5. = 12
p z
1. 8 × = −2 × 8 ; −16
8 6. 75 + 255c = 1,605
2. 1.5 − 1.5 + q = −0.6 − 1.5; −2.1 Practice and Problem Solving: D
−9.5a −38 1.
3. = ;4
−9.5 −9.5
14v 269.50
4. 14v = 269.50; = ; v = $19.25
14 14
3 2.
5. g = 18 ; 3g = 4 times 18; g = 24 games
4
Success for English Learners
3.
1. The “7.2” has to be written as “7.20” so it
will have the same number of decimal
places as “3.84.”
a 1 1 4. 3d +5 = 17
2. can be written as − a, so − is a
−3 3 3 5. 40 + 25m = 240
rational number coefficient.
6. 10 + 7r = 45
1 x
3. x could be written as or as 0.25x. Reteach
4 4
1. 21 + 5f = 61
LESSON 6-3
2. 7j + 17 = 87
Practice and Problem Solving: A/B
3. 18 + 0.05n = 50.50
1.
4. 40 + 30s = 220
Reading Strategies
1. Equation: 50 − 5n = 15
Number of steps and description:
2.
Two steps: Multiply a number n by 5, and
subtract the result from 50.
2. Equation: m + 8 = 27
3. 6t + 15 = 81 Number of steps and description:
4. 40 + 55h = 190 One step: Add 8 to a number m.
5. 1.75 + 0.75m = 4.75 3. Equation: 4b + 3 = 23
Number of steps and description:
Practice and Problem Solving: C
Two steps: Multiply a number b by 4, then
p+7 add 3.
1. =3
12 4. Equation: 15f = 90
16 Number of steps and description:
2. =4
q +1 One step: Multiply a number f by 15.
7−s
3. =2 Success for English Learners
3
4. 12.3 + 5.013d = 15.302 1. Sample answer: Eighteen less three times
a number equals three.
2. 5x − 7 = −11
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
336
LESSON 6-4 1
3. Subtract 5 from both sides; z = 6. Then
Practice and Problem Solving: A/B 2
multiply both sides by 2; z = 12.
1. x = 3
4. Subtract 15 from both sides; −4t = −12.
2. p = −3 Then divide both sides by −4; t = 3.
3. a = 4
5. Multiply both sides by 3; q + 3 = 15. Then
4. n = −2 subtract 3 from both sides; q = 12.
5. g = 2 6. m = 1
6. k = −18 7. p = 8
7. s = 18 8. 2n − 3 = 17; n = 10
8. c = −8 1
9. x + 5 = 9; x = 8
9. a = −6 2
10. v = 9 10. 15 + 2y = 29; y = 7
11. x = −2
Reteach
12. d = 24
1. Subtract 11 from both sides. Then divide
13. 24s + 85 = 685; s = $25 both sides by 4. x = 2
14. x + x + 1 = 73; 36 and 37 2. Subtract 10 from both sides. Then divide
Practice and Problem Solving: C both sides by −3. y = 8
1. 2x − 17 = 3; x = 10 3. Multiply both sides by 3. Then add 11
to each side. r = −10
5x − 1
2. = 4; x = 2.6 4. Subtract 5 from each side. Then divide
3
both sides by −2. p = −3
3 − 4x
3. = −7, x = 9.5 5. Subtract 1 from each side. Then multiply
5
3
4. 8 + 5x = −12 or 5x + 6 = −14; x = −4 both sides by .
2
5. −4x + 7 = −9 or 7 = 4x − 9; x = 4 ⎛ 2⎞
x + 11 ⎜ or divide both sides by ⎟ z = 18
6. = 6; x = 7 ⎝ 3⎠
3
6. Multiply both sides by 9. Then add 17
u −t to each side. w = 35
7. s = ; Subtract t from both sides,
r
then divide both sides by r. Reading Strategies
u 1. Multiply by −2, then subtract 3.
8. t = − s; Divide both sides by r, then
r Add 3 to each side, then divide each side
subtract s from both sides. by −2.
9. n = pq − m; Multiply both sides by p, then x = 11
subtract m from both sides. 2. Add 1, then divide the result by 3.
m+n Multiply both sides by 3, then subtract 1
10. p = ; Multiply both sides by p, then
q from each side.
divide both sides by q. x = −16
Practice and Problem Solving: D 3. Multiply by −4, then add 5.
1. Subtract 3 from both sides; 5x = 30. Then Subtract 5 from each side, then divide
divide both sides by 5; x = 6. each side by −4.
2. Add 1 to both sides; 8y = 32. Then divide x = −3
both sides by 8; y = 4.
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
337
9. −20t ≤ −4,200; t ≥ 210; No, 3 minutes is LESSON 7-2
180 seconds. The time needs to be at
least 210 seconds. Practice and Problem Solving: A/B
1. 10n + 4 ≤ 25
Practice and Problem Solving: D
2. 4n − 30 > −10
1. a ≤ −3;
1
3. − (5 − n ) < 20
4
2. −3 > n 4. Answers will vary. Sample answer: “The
opposite of 5 times a number increased
by 3 is greater than 1.”
3. b ≥ 0
5. Answers will vary. Sample answer:
“Twenty-seven less two times a number is
less than or equal to the opposite of 6.”
4. e < −2
6. Answers will vary. Sample answer: “Half
of the sum of 1 and a number is 5 or
greater.”
5. t ≥ 1
7. a. 10p;
b. 10p − 75;
6. c > 4
c. 10p − 75 ≥ 50

Practice and Problem Solving: C

Reteach 1. 24 + 4n ≤ 400, or n ≤ 94
1. n ≥ −9 2. 120 ≤ 24 + 4n, or n ≥ 24
2. n > 6 3. 24 ≤ n ≤ 94
3. n ≤ −63 4. Answers will vary. Sample answer:
4. n ≥ 4 2x + 7 < 17
5. n < 7 5. Answers will vary. Sample answer:
1
6. n > −2 ( x + 2) ≥ 7
2
7. n < −3
6. Answers will vary. Sample answer:
8. n < 12 2x − 5 > −55
Reading Strategies 7. Each of the parts of the compound
inequality, −5 < 3x and 3x < 10, is a
1. add 5; no
one-step inequality. The only operation
2. multiply by −6; yes needed to simplify the compound
3. divide by 3; no inequality is to divide each term by 3.

Success for English Learners Practice and Problem Solving: D

1. ≥ 1. 4x ≥ 2
2. > 1
2. − x < 12
3. ≤ 3
4. ≥ 3. x + 5 < 7
5. < 4. n − 10 > 30
6. > 5. 5n + 2 ≥ 3
7. When you multiply or divide by a negative 6. 2n − 6 ≤ 17
number, the inequality sign reverses.
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
339
7. Twelve times the number of cars she z
washes minus $50 for her savings must 7. − 6 ≥ −5
7
be greater than or equal to $100. Twelve
z
times the number of cars, n, is 12n. − 6 + 6 ≥ −5 + 6
Subtract $50 for her savings: 7
12n − 50. This has to be at least $100, z
≥1
so 12n − 60 ≥ 100. 7
8. 49 times the number of games plus $400 z≥7
for the video player must be less than or 8. 50x + 1,250 ≥ 12,500 or x ≥ $225
equal to the saved $750, so
49n + 400 ≤ 750 or 750 ≥ 400 + 49x. 9. 2n + 3.50 ≤10
9. The number of samples saved for display, 2n ≤ 6.50
50, plus the distribution at the rate of n ≤ 3.25
25 per hour must be less than or equal to
She can buy no more than 3.25 lb.
250, so 50 + 25t ≤ 250.
Practice and Problem Solving: C
Reteach
1. −5a > 15; −5a + 2 > 15 + 2
1. 3n; 5 −; 3n − 5; 3n − 5 > −8
2. 3b ≤ 3; 3b + 4 ≥ 3 + 4; 3b ≥ 7
2. 5n; + 13; 5n + 13; 5n + 13 ≤ 30
3. 3x + 7 > 12; 3x + 12 > 7; 7 + 12 > 3x
Reading Strategies 5 5 19
1 4. x > ; x > − ;x <
1. (a + 6) ≥ 20 3 3 3
2 5. All three solutions overlap at
2. 12 + 3b ≤ −11 5 19
< x < , which gives the common
3. 2c − 8 < 5 3 3
solution for all three inequalities.
Success for English Learners 6. Answers will vary. Sample answer:
1. Sample answer: Five minus two times a
“The opposite of three is no less than a
number is greater than the opposite of four.
third of the difference of 6 and a number.”
2. 3n − 7 ≤ −10 x ≥ 15
7. Answers will vary. Sample answer:
LESSON 7-3
“Four times the sum of one and twice a
Practice and Problem Solving: A/B number is less than the opposite of one
1. 5, 5; 24; 3, 24, 3; 8 9
half.” x < − .
16
2. 12, 12; −16; −2, −16, −2; 8
3. Because of dividing by a positive number. Practice and Problem Solving: D
4. Because of dividing by a negative 1. y > 2
number. 2. d ≤ −4
5. −7d + 8 > 29
−7d + 8 − 8 > 29 − 8
3. r > −12
−7d > 21
d < −3
6. 12 − 3b < 9 4. Answers will vary. Accept any answer
greater than 2.
12 − 12 −3b < 9 − 12
5. Answers will vary. Accept any answer less
−3b < −3 than or equal to −135.
b>1
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
340
6. Answers will vary. Sample answer: MODULE 7 Challenge
1, 2, 3
1. 2(20 + x) ≤ 100; x ≤ 30
7. 14 cars
2. 20x > 400; x > 20
8. 7 games
3. 0.5(20x) ≤ 350; x ≤ 35
Reteach 4. 0.15(20x) ≥ 45; x ≥ 15
1. h ≥ 5.5, or 6 whole hours; 5 hours would 5. Accept any scale drawing that shows a
not be enough to reach the 75-kilometer garden with a width of 20 feet (10 units)
goal. and a length greater than 20 feet
2. b ≤ 9.29 bird boxes, so 9 bird boxes would (10 units) and less than or equal to 30 feet
be the greatest number that could be sold (15 units).
and still leave $10 worth of boxes in
inventory.

Reading Strategies
1. 12n ≤ (750 − 50) 10
12n ≤ 7000
n ≤ 583.3
n ≤ 583.3, so 583 people can be given
meals in 10 hours
2. 24h > 2,500 − 1,400
24h > 1,100
h > 45.8
h > 45.8, so it will take 46 whole hours
to recycle more than what is left of
2,500 liters of used oil.
Success for English Learners
1. No, x is less than 125, not less than or
equal to 125.
2. There was no multiplication or division by
a negative number.
3. Answers will vary. Accept any answer less
than 40.
4. Answers will vary. Accept any answer less
than or equal to −4.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
341
UNIT 4: Geometry

MODULE 8 Modeling Geometric 3. 24 ft; 12 ft; 288 ft2

Figures 4. 10 units by 8 units

LESSON 8-1 Reteach

Practice and Problem Solving: A/B 1
1. 3 in.; 24 in.;
8
1. 15 ft; 6 ft; 90 ft2
1
2. 16 m; 12 m; 192 m2 2. 4 cm; 20 cm;
5
3. The scale drawing is 10 units by 8 units.
3. 84 in.
4. a. 1 ft = 125 m 4. 75 mi
b. 84 sheets of plywood tall
Reading Strategies
5. a. 40 bottle caps tall
1. 3 cm
b. approximately 3 popsicle sticks tall
1 3
Practice and Problem Solving: C 2. Sample answer: =
10 x
1. 25.5 ft; 23.8 ft; 606.9 ft2 3. 5 cm
2. Because the scale is 8 mm: 1 cm, and 1 5
because 1 cm is longer than 8 mm, the 4. Sample answer: =
10 x
actual object will be larger.
3. a. 42 cm by 126 cm Success for English Learners
b. 5,292 cm2 1. Sample answer: The car would not be in
proportion.
c. approximately 1.386 ft by 4.158 ft
2. Sample answer: If the photo does not
d. approximately 5.763 ft2 have the same proportions as the
4. 64 in. painting, the face will be stretched tall or
5. 35.2 ft stretched wide.

Practice and Problem Solving: D LESSON 8-2

1. Practice and Problem Solving: A/B
Blueprint 1.
5 10 15 20 25 30
length (in.)
Actual
8 16 24 32 40 48
Length (ft)
a. 48 ft
b. 2.5 in. 2.
2.
Blueprint
2 4 6 8 10 12
length (in.)
Actual
1 2 3 4 5 6 No triangle can be formed because the
Length (ft)
sum of the measures of the two shorter
a. 6 ft sides has the same measure as the
longest side.
b. 16 in.
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
342
3. Yes, because the sum of the measures of to 8 feet, which is less than the 10-foot
the two shorter sides is greater than the board, so no triangle can be formed with
measure of the longest side, the boards.
1 1 1 2. Diagrams and calculations may vary, but
e.g., + > .
3 4 2 students should first find the hypotenuse
4. No, because the sum of the measures of of the right triangle formed by the 5 and
the two shorter sides is less than the 6-inch sides, which is 61 inches. Then,
measure of the longest side, e.g., 0.02 + they should find the length of the
0.01 < 0.205. hypotenuse formed by the 25-inch side
5. One, since the sum of the angles is less and 61 inches, which is 686 inches, or
than 180° and a side is included. about 26 inches. A 30-inch bat would not
fit in the box.
6. Many, since the sum of the measures of
the angles is less than 180° but no side is Success for English Learners
included. 1. The compass could be used to make two
arcs of radii equal in length to the shorter
Practice and Problem Solving: C
segments from each end of the longer
1. They are angles ACB and ADB, formed by segment. The point of intersection of the
Earth’s radii and the tangent lines running arcs would be where the shorter sides of
to the planet. the triangle intersect.
2. Both are Earth’s radii. 2. Yes, the sum of the measures of the
3. AC is much less than BC. angles given is 90°, so the third angle has
4. AB and BC are approximately equal. to be 90 degrees for the sum of the three
angle measures to be 180°.
5. AB > BC
6. Isosceles triangle, since AB and BC are LESSON 8-3
approximately equal. Practice and Problem Solving: A/B
7. The astronomer knows that ACB is a right 1. cross section; The circle is a plane figure
angle and the angle CAB could be intersecting a three-dimensional curved
measured. This is enough information to surface. The figure formed is a curved line
compute AB using similar triangles or on the surface of the cone.
trigonometry.
2. intersection; The edge of a square is a
Practice and Problem Solving: D straight line and the base of the pyramid is
a plane figure. A straight line is formed.
1. 3 and 4 units; less than 7 units, but
greater than 1 unit; Diagrams will vary. 3. cross section; A square is formed.
2. 3 and 7 units; less than 10 units, but 4. cross section; The circle is a plane figure.
greater than 4 units; Diagrams will vary. A polygon results that is similar to the
polygon that forms the base.
3. 101°; 79°
5. trapezoid
4. 129°; 51° 6. triangle
Reteach 7. circle
1. Yes; if x is the length of each side, then 8. ellipse or oval
x + x > x or 2x > x, so the condition for a Practice and Problem Solving: C
triangle to be formed is met.
1. It is a square. The length of each of its
2. No. The sum of the measures of the three sides is the same as the length of the side
angles is greater than 180°. of the square.
Reading Strategies 2. An equilateral triangle; Since each of the
1. Diagrams may vary, but students should segments from the vertex of the cube to
realize that the two 4-foot boards add up the midpoint of the side is equal and the
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
343
angles at the vertex are 90º, the third 6. Diagrams will vary but should show a
sides of each triangle are equal and form circular cross section of radius less than
the cross section. the radius of the sphere.
3. A: circle; B and C: ellipses or ovals; D: a 7. circle
plane of length, h, the cylinder’s height, 8. similar to a circle that is the circumference
and width, d, the cylinder’s diameter of the sphere but smaller than that circle
4. Area A < Area B < Area C < Area D 9. Diagrams will vary but should show a
plane passing through the cone’s vertex,
Practice and Problem Solving: D
its lateral surface in two lines, and
1. a triangle that is similar to the base bisecting its base.
2. a rectangle or a square 10. isosceles triangle
3. a trapezoid 11. The two sides of the triangle that are
4. a circle equal length are the same length as the
slant height of the cone. The third, shorter
5. Drawings will vary, but the cross section
side is equal to the diameter of the cone’s
should be a regular octagon that is
base.
congruent to the bases of the prism.
6. Drawings will vary, but the cross section Success for English Learners
should be a regular pentagon that is 1. It is a trapezoid; the edge of the cross
similar to the base of the pyramid. section in the base is longer than and
parallel to the edge of the cross section in
Reteach
the face of the pyramid.
1. Drawings will vary. Sample answers: a
2. Both cross sections are parallel to the
triangular cross section formed by a plane
bases. Each cross section is similar to the
that is perpendicular to the base of the
figure’s base.
pyramid and including its apex point; a
rectangular cross section formed by a LESSON 8-4
plane that is parallel to the base of the
pyramid Practice and Problem Solving: A/B
2. Drawings will vary, Sample answers: a 1. ∠AEB and ∠DEF
triangular cross section formed by a plane
2. ∠AEB and ∠BEC
that is parallel to the prism’s bases and
congruent to them; a rectangular cross 3. Sample answer: ∠AEF and ∠DEF
section formed by a plane that is 4. 120°
perpendicular to the bases and having a
length that is equal to the height of the 5. 13°
prism 6. 70°
Reading Strategies 7. 115°
1. Diagrams will vary but should show a 8. 28
rectangular cross section that is parallel to 9. 18
the base and similar to it. 10. 22
2. rectangle 11. 15
3. Diagrams will vary but should show a
pentagonal cross section that is congruent Practice and Problem Solving: C
to the bases. 1. 66°
4. parallel to the bases 2. 125°
5. congruent to bases 3. 114°
4. 156°
5. 39
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
344
6. 43 3. VB part 1 = AB(x) = (24x2)x = 24x3
7. 24 1 1
4. VB part 2 = AB (3 x ) = (24 x 2 )(3 x ) = 36x3
8. 19 2 2
9. 41.25° 5. VB total = 24x3 + 36x3 = 60x3
10. 33° 6. A sphere; one fourth of a sphere;
1⎛4 3⎞ 64 3
VC = ⎜ π ( 4 x ) ⎟ = πx
Practice and Problem Solving: D 4⎝3 ⎠ 3
1. ∠MSN and ∠PSQ 7. Vtotal = VA + VB total + VC = 24x3 + 60x3 +
2. ∠PSQ and ∠QSR 64 3 ⎛ 16 ⎞
π x = 4 x 3 ⎜ 21 + π ⎟ or approx.
3. Sample answer: ∠MSN and ∠NSP 3 ⎝ 3 ⎠
3
4. 60° 151x .
5. 100° 8. Divide 33,000 by 151 to get about 218.
Take the cube root; x is about 6 feet.
6. 130°
7. 55°
8. 30
9. 40
10. 35
11. 135
Reteach
1. vertical angles;
2. 90°; complementary angles
3. 180°; supplementary angles
4. 80
5. 20
MODULE 9 Circumference,
6. 6
Area, and Volume
7. 25
LESSON 9-1
Reading Strategies
1. 30° Practice and Problem Solving: A/B
2. 60° 1. 12 ft
3. 150° 2. 8 ft
4. 90° 3. 6 ft
4. 4 ft
Success for English Learners
12 6
1. 90°; 180° 5. Yes; =
8 4
2. 180° 7 3
6. a. =
21 x
Module 8 Challenge b. 9 cm
1. A rectangular solid; VA = 4x(6x)x = 24x3 7. 100.48 in.
1 8. 141.3 yd
2. A trapezoid; AB = h( b1 + b2 ) =
2
9. about 2.9 in.
1 2
4 x(4 x + 8 x ) = 24x
2
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
345
Practice and Problem Solving: C 2. Set up a proportion:
1. about 2 in. 21 15
= . Since
7 diameter of small circle
2. 31.4 cm 21 divided by 7 is 3, divide 15 by 3 to find
3. greater than the diameter of the smaller circle. The
4. 439.6 ft diameter of the smaller circle is 5 cm.
5. a. 116.18 cm
LESSON 9-2
b. 80.07 cm
6. a. 1.88 in. Practice and Problem Solving: A/B
b. 2.51 in. 1. 18.84 in.
2. 56.52 cm
Practice and Problem Solving: D
3. 4.71 ft
1. 4 m
4. 25.12 m
2. 16 m
5. 37.68 ft
3. 2 m
6. 12.56 yd
4. 8 m
7. 43.96 in.
4 2
5. Yes; = 8. 26.26 cm
16 8
8 2 9. 7.85 m
6. a. = 10. 66 ft
25 x
b. 6.25 cm 11. 132 mm
7. a. 8 cm 12. 88 cm
b. 24 cm Practice and Problem Solving: C
4 12 1. 3.93 in.
c. =
25 x
2. 11.30 yd
d. 75 cm 3. 13.19 mm
Reteach 4. 2.36 cm
1. 18 cm 5. 4.19 ft
2. 21 ft 6. 3.14 in.
7. 3.5 in.
Reading Strategies
8. 18 yd
1. 2
9. 9.55 in.
2. 3.14
10. 16
3. 24 ft
4. 47.1 in. Practice and Problem Solving: D
1. 50.2 m
Success for English Learners
2. 62.8 in.
1. All circles are similar. Corresponding
measures in similar shapes are 3. 9.4 ft
proportional. The ratio of circumference to 4. 22.0 mm
diameter of one circle is proportional to
5. 18.8 cm
the ratio of circumference to diameter of
C 6. 12.6 yd
any circle. = π.
d 7. 110 yd
8. 28.3 in.
9. 125.7 cm
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
346
Reteach Practice and Problem Solving: C
1. 9; 28.26; 28.3 1. 1.2544π cm2; 3.9 cm2
2. 13; 26; 81.64; 81.6 2. 0.0625π in.2; 0.2 in2
3. 40.8 cm 3. 0.16π in.2; 0.5 in2
4. 31.4 ft 4. 54.76π cm2; 171.9 cm2
5. 9.4 in. 5. 36,864π yd2; 115,753 yd2
Reading Strategies 6. 0.49π m2; 1.5 m2
1. C = 2π r 7. A = π
2. C = π d 8. A = 6.25π
3. It is twice as long. 9. A = 16π
22 10. The 10-inch chocolate cake’s area is
4. Sample answer: 3.14 or 28.26 in2 larger.
7
5. The circumference of a circle is the 11. The square’s area is 1.935 m2 larger than
distance around a circle. It is given in the circle’s area.
units. The perimeter of a polygon is the
Practice and Problem Solving: D
distance around a polygon. It is given in
units. 1. 19.6 cm2
2. 379.9 in.2
Success for English Learners
3. 28.3 mm2
1. the length of the diameter.
4. 78.5 in2
2. 18 cm
5. 132.7 cm2
3. Take half of the diameter, 17 ft, and
substitute that value into the formula for r. 6. 162.8 yd2
4. d = 10 so r = 5 7. 36π cm2
C = 2π r C = πd 8. 90.25π in2
= 2 • 3.14 • 5 = 3.14 • 10 9. 12.25π yd2
= 31.4 = 31.4 10. 121π yd2
11. 9π m2
LESSON 9-3
12. 36π ft2
Practice and Problem Solving: A/B
Reteach
1. A
1. 64π in2
2. B
2. 3600π m2
3. 50.2 in.2
3. 56.7 in.2
4. 153.9 m2
4. 314 yd2
5. 254.3 yd2
5. 452.2 m2
6. π cm2
6. 66.4 cm2
7. 54.76π cm2
8. 25π in.2 Reading Strategies
9. 121π mm2 1. 49π cm2; 153.86 cm2
10. 6.25π ft2 2. 6.25π yd2; 19.625 yd2
11. 9π m2

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
347
Success for English Learners 7. 158.13 ft2
1. 10.24π mm2; 32.2 mm2 8. 288 m2
2. 90.25π yd2; 283.4 yd2 9. 189.25 ft2

LESSON 9-3 Reteach

1 1 1 1
Practice and Problem Solving: A/B 1. 9, 1 , ,1, 9, 1 , , 1, 12
2 2 2 2
Answers may vary for Exercises 1 and 2. 2. 32, 6, 32, 6, 38
1. 21 ft2
Reading Strategies
2. 24 ft2
1. 63 m2
3. 90 ft2
2. 76 m2
4. 208 m2
3. 30.28 m2
5. 140 ft2
6. 23.13 m2 Success for English Learners
2
7. 100 ft 1. Separate the figures into simpler figures
8. 33.28 m2 whose areas you can find.
9. 57.12 m2 LESSON 9-4
Practice and Problem Solving: C Practice and Problem Solving: A/B
Answers may vary for Exercises 1 and 2. 1. 142 in2
1. 22 ft2 2. 190 cm2
2. 30 ft2 3. 1,236 cm2
3. 104 ft2 4. 3,020 ft2
4. 223.4m2 5. Possible answer: I would find the total
surface area of each cube and then
5. 60.75 m2
subtract the area of the sides that are not
6. 258.39 m2 painted, including the square underneath
7. A = 52 units2; P = 36 units the small cube.
6. 384 in2
Practice and Problem Solving: C
1. 101.4 in2
2. 797.4 m2
3. Check student’s guesses.
4. B; 384 in2
5. C; 340 in2
6. A; 338.8 in2
7. Discuss student guesses and whether
Practice and Problem Solving: D they were correct or not.
1. C
2. B
3. 17 ft2
4. 30.28 m2
5. 174 ft2
6. 84 m2
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
348
Practice and Problem Solving: D 5. 312 cm3
1. 286 ft2 6. 15.6 kg
2. 1,160 ft2 7. 1.95 kg
3. 80 in2
Practice and Problem Solving: C
4. 124 in2
2
1. 124.4 in3
5. 96 in
2
2. 477.8 cm3
6. 384 in
3. 120 m3
7. 480 in2
4. 20.2 cm3
Reteach 5. 135 cm3
1. 5 • 8 = 40 in2; 2 • 40 = 80 in2 6. Marsha got the units confused. The
2
2. 5 • 3 = 15 in ;2 • 15 = 30 in 2 volume of one marble is 7,234.5 mm3.
2 2 Marsha needs to convert that volume to cm3,
3. 3 • 8 = 24 in ;2 • 24 = 48 in which is about 7.2 cm3.
4. 80 + 30 + 48 = 158 in2 7. No, the marbles will not completely fill the
5. 158 in2 container. There will be spaces between them.
The number of marbles would be fewer than
6. 340 in2 the quotient.
7. 592 cm2
Practice and Problem Solving: D
Reading Strategies 1. 12 cubes
1. 756 square feet 2. 24 cubes
2. 600 square inches 3. 105 in3
Success for English Learners 4. 48 m3
1. 32 cm2 5. length: 10 mm; width: 10 mm; height:
2. 32 cm 2 10 mm
3. 8 cm2 6. 1,000 mm3
4. 8 cm2 7. 6 cubes
5. 16 cm2 8. 6,000 mm3
6. 16 cm2 Reteach
2
7. 112 cm 1. 80 m3
8. Sample answer: There are 3 pairs of 2. 120 in3
surfaces with the same areas: the top and 3. 72 cm3
bottom, the left side and right side, the
front and back. Reading Strategies
LESSON 9-5 1. 60 m3
2. 720 in3
Practice and Problem Solving: A/B
3
3. 108 cm3
1. 84 in
2. 180 cm3 Success for English Learners
3. 600 ft3 1. 216 in3
4. 360 cm3 2. 108 cm3

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
349
UNIT 5: Statistics

MODULE 10 Random Samples would have the greatest impact on

infrastructure. It is not clear if this precinct
and Populations would benefit from the new jobs, either.
LESSON 10-1 2. Some streets may have more residents
than others. Some residents may not have
Practice and Problem Solving: A/B private telephones; they may use cell
1. Answers may vary, but students should phones or public phones.
realize that the number of road runners 3. a. They are not random across all
born within a 50-mile radius of Lubbock, persons in the city center who might
Texas is a subset of the number of road rent a scooter, but they could be
runners born everywhere or in Texas. random across the two clusters that the
2. Answers may vary, but students should owner wants to sample, office workers
realize that the cars traveling at and apartment residents.
75 kilometers per hour between
Beaumont and Lufkin, Texas is a subset b. The questionnaire with the lower
of the cars traveling between Beaumont weekend rates is biased against the
and Lufkin at all speeds. weekday office workers and in favor of
possible weekend rentals by apartment
3. Answers may vary, but Method B is
probably more representative of the residents.
opinions of any student chosen at random Practice and Problem Solving: D
from the entire school population.
1. Home runs hit in 2014–2015; Home runs
4. Answers may vary, but Method C may be hit one week in July
more representative of all voters than a
sample that consists of 25-year town 2. All of the sugar maples in the 12-acre
residents who may or may not be voters. forest; the six sugar maples
5. Biased; library patrons have a vested 3. Sample C is the best method of getting a
interest in seeing that the library is random sample.
expanded. 4. Sample Z is the best method of getting a
6. Not biased, if the cable company samples random sample.
customers, regardless of their history and 5. The question shows bias because it only
experience with the company. mentions the benefits of having a
professional sports stadium and teams.
Practice and Problem Solving: C
1. Sample A is random within each precinct Reteach
but not across the city as a whole. If the 1. The sample is biased. The passengers on
precincts have different populations, the one on-time flight are likely to feel
sampling from one precinct might differently about their flight than
outweigh that of another, less-populous passengers on some other flights.
precinct. There is no way to tell about the 2. The sample is not biased. It is a random
bias of the sampling since the content of sample.
questionnaire is not included.
3. The sample is not biased. It is a random
Sample B is random across the city. sample.
There is no way to tell about the bias of
the sampling since the content of 4. The sample is biased. The people who go
questionnaire is not included. to movies are more likely to spend money
on movies than on other entertainment.
Sample C is not random and is biased in
concentrating on the precinct in which the
factory would be located and where it
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
351
2. a. Team Y; LESSON 10-3
b. 10 times, since 6, 7, and 8 Practice and Problem Solving: A/B
observations are 50 percent of the
observations between the lower and 1. The sample is representative of the
expected number of integers from 1 to 25
upper quartiles;
in a sample of 5 integers, which would be
c. 50 percent of the time; none or zero
d. 25 percent of the time. 2. A sample of 80 integers would be
expected to have two integers from
Reteach 1 to 25.
1. 750 chips would be defective. 3. Three numbers from 1 to 25 is higher than
2. about 1,563 expected since a sample of 40 numbers
would be expected to have one number
Reading Strategies from 1 to 25, and a sample of 80 numbers
1. Answers will vary, e.g. the data is skewed would be expected to have two numbers
to the right. from 1 to 25.
2. 10 blooms per plant is an outlier. 4. The 25 highlighted collars in this sample
3. Sample answer: With the outlier, the would be OK to ship, so 25 times 20 or
median is shown as 17 blooms per plant. 500 collars from a production run of 720
If the outlier is removed, the median will could be shipped.
shift to the right. 17, 14, 14, 16, 14, 15, 15, 15, 16, 14, 16,
The amount of the shift is unknown since 14, 15, 15, 15, 16, 13, 13, 13, 13, 13, 14,
no information is provided about the 14, 13, 17, 14, 15, 13, 14, 15, 16, 17, 14,
values of the data points in each quartile 17, 14, 15
of the data. 5. The 4 highlighted collars in this sample
4. Answers will vary. Sample answer: the contain more than the allowable biocide,
greatest concentration of data is the so 4 times 20 or 80 of the collars from a
25 percent of the data points between production run of 720 would not be shipped.
the lower quartile and the median. Since 17, 14, 14, 16, 14, 15, 15, 15, 16, 14, 16,
there is less variation in this data, it 14, 15, 15, 15, 16, 13, 13, 13, 13, 13, 14,
provides the statistic of the sample that 14, 13, 17, 14, 15, 13, 14, 15, 16, 17, 14,
can be used with the most confidence to 17, 14, 15
make an inference about the entire of
population of plants. Practice and Problem Solving: C
Success for English Learners 1. A sample of 240 individuals would have to
have 20 endangered species to meet the
1. There could be times when there would grant requirement of 1,000 endangered
be more or fewer than nine cardinals at species in a population of 12,000 fish.
the birdbath. The nine cardinals may visit
the birdbath several times each day, too, 2. None of the samples have 20 endangered
especially early and late in a day. individuals, even though one of Hatchery
A’s samples had 19.
2. Answers will vary, but students should
realize that there are limits to drawing 3. Answers will vary. Student solutions
conclusions from a limited sample like this might include averaging the number of
one to a larger population. An observer endangered in each sample, using the
could watch the feeder over a longer largest number of endangered as an
period of time, e.g. several days or hours. indicator of the population etc.
Observers could also record the number 4. Answers will vary, but students should
of sightings of birds that visit the bird bath notice that the extreme values of the
infrequently, e.g. thrashers, to see if their number of galaxies are 1 and 30.
numbers change. Students might use decades of 10 for a

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
353
range, e.g. 11 to 20, 21 to 30 etc. in which Success for English Learners
case students might observe that there
1. 7 teams
are 12 samples between 1 and 10, 9
samples between 11 and 20, and 2. 2 teams
15 samples between 21 and 30, inclusive. 3. 9 goals; 8 times
Practice and Problem Solving: D 4. 3, 8, and 10 goals; 2 times each
1. a. Answers will vary. Sample answer: There
could be as few as one or as many as 9 MODULE 10 Challenge
cattle grazing on an acre, or an average 1. Population: all of the school’s teachers;
of about 5 cattle grazing per acre. Sample: every third teacher from an
b. If 250 cattle are divided by 40 acres, alphabetical list. Within this population,
the sample is a random sample only if
an average of about 6 cows should be
every teacher on the list has an equal
grazing on each acre.
chance of being selected, which would be
c. Answers will vary. Sample answer: a function of the number of teachers in the
some of the pasture might not have school and its correlation to the 26 letters
enough food for the cattle, or there of the alphabet.
might be parts of the pasture that 2. Population: all schools in the system;
provide food, such as bare ground, Sample: 5 randomly-selected schools in
creeks, or other such features. the system. The schools are selected
2. a. Answers will vary. Sample answer: As randomly.
many as 40 as few as one or two, an 3. Population: all math-science classes in
average of “about” 20 etc. but no more the school; or the ten math-science
than 40. classes. Sample: The sample is described
as 3 math and 3 science teachers. There
b. Answers will vary. Sample answer: The is no stated randomness in any of these
average of the twelve samples is 23.5, choices. For example, how did the director
which is higher than the average of six select the principal, how did the principal
samples. The estimate should increase. select the math-science classes, and why
This estimate will have a little more only math-science classes, and not
“certainty” than the estimate based on classes of other subject areas?
six samples. 4. Population: broken into two parts: teachers
with 12 or more years of experience and
Reteach
teachers with less than 12 years of
1. Answers will vary, but students should experience; Sample: 10 teachers in each of
observe that in both outcomes, there are the population categories. Splitting the
more 6’s than most of the other numbers. teacher population decreases the
2. Answers will vary, but students may infer randomness of the sampling process. Also,
that the random sample outcomes will it is not stated why “12 years” is used to
become more like the predicted results as break the population into two parts.
the number of random samples increases. 5. Population: all schools in the system;
Sample: 4 randomly-selected schools.
Reading Strategies
The sample is described as random.
1. Answers will vary. Sample answer: These
6. Population: all schools in the system;
results are close to what the farmer wants,
Sample: different numbers of schools in
even if they are a percent less.
each of three categories. It is not stated
2. Answers will vary. Sample answer: The why the system’s schools are separated
numbers 1, 3, and 5 are representative of into these categories, even though it is
the number of females in all 18 litters. One sensible. It is not stated why 10, 5, and
female occurs four times, 3 females 5 schools in each category were selected,
occurs three times, and 5 females occurs or if they were randomly selected.
two times.
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
354
MODULE 11 Analyzing and Reteach
Comparing Data 1. The data are not symmetric about the
center. The distribution is skewed slightly
LESSON 11-1 to the right. The mode is 6, the median is
6, and the range is 10.
Practice and Problem Solving: A/B
1. 7; 25; 25 Reading Strategies
2. 0.07; 0.15; 0.15 and 0.16 (bi-modal 1. Mean: 6.9; median: 7; mode: 7
distribution) 2. Mean: 7.3; median: 7; mode: 7
3. Both are 3. Success for English Learners
4. Plot A has 7 dots; plot B has 9 dots. 1. If there are 12 dots, the median is the
5. Plot A’s mode is 21; plot B’s mode is average of the 6th and 7th dots’ values.
23 and 24 (bi-modal). 2. There would be two modes, “1” and “3.”
6. Plot A’s median is 21; plot B’s median
is 23. LESSON 11-2
7. Plot A is skewed to the left so its central Practice and Problem Solving: A/B
measures are shifted toward the lower
values. Plot B is skewed to the right so its 1.
central measures are shifted toward the
higher values.
2. Amy
Practice and Problem Solving: C 3. Ed
1. The median is 21 pounds, the mode is
4. Ed
22 pounds, and the range is 9 pounds.
5. Amy; The range and interquartile range
2. By both central measures median and
are smaller for Amy than for Ed, so Amy’s
mode, each shearing does not produce
test scores are more predictable.
the 25 pounds he needs.
6. Port Eagle
3. The median is 25 pounds, but the mode is
24 pounds. The range is 9 pounds. 7. Port Eagle
4. The distribution is “almost” bi-modal with 8. Surfside; The interquartile range is smaller
24 and 27 pounds. Because of this and for Surfside for than for Port Eagle, so
the fact that the median is 25 pounds, the Surfside’s room prices are more
rancher should feel confident that he is predictable.
very close to the 25 pound target. If he
Practice and Problem Solving: C
needs more data, he could sample a
larger population to see how its measures
compare to the 50-animal sample. 1.

Practice and Problem Solving: D

1. 15 2. It increases the interquartile range by 1.
2. 15 3. The range is more affected since the
3. 15 difference is 16.
4. Plot Y; Plot X range is 13 − 11 = 2. Plot Y 4. If the farmer is concerned about “average”
range is 42 − 6 = 36 production, either box plot will do, since
the medians are similar.
5. Plot X; 4 values of 11
5. Answers may vary, but students should
6. 11 observe that the IQR for the top box plot is
7. 30 symmetric about the median, implying no
skewing. The 3rd quartile of the bottom

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
355
box plot is larger than its 1st quartile, 25% above the upper quartile, and any
which implies some skew to the right. other combination that reflects the
6. The range of the top plot is 1 unit greater definition of quartiles.
than the range of the bottom plot. The IQR 2. The only measure of “average” on this
of the bottom plot is greater than the IQR page is the median, so the team with the
of the top plot. median of 54 fish had the greater average
measure.
Practice and Problem Solving: D
1. The smallest data point value is 12; the LESSON 11-3
largest data point value is 24. Practice and Problem Solving: A/B
2. 18 1. mean: 14.9; MAD: 1.9
3. 12; 23 2. mean: 14.6; MAD: 1.92
4. 50% 3. 0.3
5. 4. The means of the two data sets differ by
about 6.3 times the variability of the two
data sets.
6. 17 5. Sample answer: The median of the mean
7. 15 incomes for the samples from City A is
8. 11; 19 higher than for City B. According to these
samples it appears that adults in City A
9. 8 earn a higher average income than adults
10. The data is almost symmetrical, except for in City B. Also, there is a greater range of
the extreme points, 6 and 23, which skew mean incomes in City A and a greater
it slightly to the right. interquartile range.

Reteach Practice and Problem Solving: C

1. 20, 24, 25, 27, 31, 35, 38 1. mean: 69.7; MAD: 18.3
2. 20, 38, and 27 2. mean: 73.4; MAD: 16
3. 24, 35 3. 3.7
4. 4. 2.3
5. The means of the two data sets differ by
5. 61, 63, 65, 68, 69, 70, 72, 74, 78 about 1.6 times the variability of the two
data sets.
6. 61, 78, 69, 64, and 73
6. Sample answer: The median of the mean
7. incomes for the samples from City C is
higher than for City D. However, they are
close and there is a lot of overlap, so it is
Reading Strategies difficult to make a convincing comparison.
1. Class B; 8
Practice and Problem Solving: D
2. Class B
1. mean: 65; MAD: 6.4
3. Class A
2. mean: 60.5; MAD: 6.4
4. 25%
3. 4.5
Success for English Learners 4. The difference of the MADs is zero, and
1. Answers may vary, but students should 4.5 is not a multiple of zero.
understand that the quartiles divide the 5. Sample answer: Adults in City P
data set into four fourths: 25% below the clearly have higher incomes than adults
lower quartile, 50% below the median, in City Q.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
356
Reteach
1. The difference of the means is 4.8. This is
0.3 times the range of the first group, and
1.2 times the range of the second group.
2. Based on the means, the people in the
town Raul surveyed seem to receive
fewer phone calls.
Reading Strategies
1. Survey more samples of students.
Success for English Learners
1. No, this is not enough information. You
need the difference of two means.
2. Sample answer: Track the customers for
more hours for a longer period of time and
then analyze the data.

MODULE 11 Challenge
1. Sample answer: 8, 10, 11, 11, 12, 14
2. 10, 12, 12, 16, 17, 18, 20
3. 8, 9, 9, 10, 14, 14, 15, 17
4. 14
5. 8
6. 33

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
357
UNIT 6: Probability

MODULE 12 Experimental Practice and Problem Solving: D

Probability 1. A
2. C
LESSON 12-1
3. B
Practice and Problem Solving: A/B
4. E
1. certain; 1
5. D
1
2. as likely as not; 7
2 6.
3. impossible; 0 9
2 5
4. 7.
3 6
4 8. as likely as not; Since he gets up by 7:15
5.
5 about half the time, he will ride his bicycle
1 about half the time. The probability is
6. 1
2 about , or as likely as not.
7. No, 6 of the 9 cards involve forward 2
moves. The probability of moving 9. likely; The probability of choosing a short-
1 4
backward is . sleeved shirt is , or likely.
3 5
8. No; Only two cards will let him win. The
probability that he will not win on his next Reteach
7 1
turn is . 1. unlikely;
9 24
Practice and Problem Solving: C 1
2. as likely as not;
4 2
1.
5 3. impossible; 0
4 Reading Strategies
2.
11
1. unlikely
3
3. 2. impossible
8
3. certain
2
4.
3
1
5.
2
6. There were 8 cans in the cabinet,
including 1 chicken noodle. Mother added
2 cans of chicken noodle soup and 5 cans
of vegetable soup. So, there are 15 cans
of soup, 3 of which are chicken noodle.
7. Answers will vary. Sample answer: The
spinner is marked with numbers 1, 2, 3, 3,
4, 5, 5, 5. What is the probability that the
⎛5⎞
spinner will not land on 5? ⎜ ⎟ .
⎝8⎠
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
358
4. 9
Desired Outcomes 2. a.
200
Possible Greater
6 Factor of 4 b. 270
Outcomes than 0
24
0 no no no 3. a.
25
1 no yes yes b. 400
2 no yes yes 13
4. a.
3 no no yes 8000
b. Yes. The percent of defective spark
4 no yes yes
plugs is 0.1625%, which is less
5 no no yes than 2%.
Results 0 out of 6 3 out of 6 5 out of 6 23
5. a.
300
as likely as
Probability impossible likely b. No. The percent of defective switches
not
is 7.67%, which is greater than 1.5%.
Success for English Learners Practice and Problem Solving: D
1. as likely as not; Sample answer: because 1. a. 9
there are 3 even numbers and 3 numbers
that are not even b. 15
2. impossible; There are no purple marbles 9 3
c. =
in the bag. 15 5

LESSON 12-2 2. a. 40
b. 48
Practice and Problem Solving: A/B
40 5
11 c. =
1. 48 6
15
3. a. 36
7
2. b. 132
20
36 3
2 c. =
3. 132 11
7
96 8
99 d. =
4. a. 132 11
130
31 Reteach
b.
130 1. a. 12
5 b. 15
5. a. , 0.625, 62.5%
8
12 4
3 c. =
b. , 0.375, 37.5% 15 5
8 2. a. 9
Practice and Problem Solving: C b. 14
1 9
1. a. c.
150 14
4 4 1
b. 14 3. P(catch) = ; P(no catch) = 1 − =
5 5 5

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
359
Reading Strategies for the artistry points, and a number cube
1. 3; Sample: There are more 3’s than for the precision points.
any other number, so the probability 3. Sample answer: Tossing two number
that you will land on 3 is would be cubes to advance around a board game.
greater than the probability for the other 4. Sample answer: Boys and girls being
numbers. assigned to either a science class or a
2. 1; Sample: There is only one 1, so the reading class when the number of boys
probability that you will on 1 is lower than and girls is not equal.
the probability you will land on the other
numbers. Practice and Problem Solving: D
3. Sample: No, I predicted the cube would 1. a. 32
land on 1 the least number of times. b. 100
4. Sample: No, I predicted the cube would 32 8
land on 3 most often. c. =
100 25
Success for English Learners 8 4
2. =
50 25
1. a. 28
45 9
b. 40 3. =
200 40
28 7
c. = Reteach
40 10
18 9 9 17 1. 200
2. = ; 1− =
52 26 26 26 19
2.
3. Sample answer: Elena tossed a coin 200
30 times. It landed on heads 18 times. 85 17
3. =
What is the experimental probability the 200 40
coin will land on heads on the next
136 17
4. =
toss? ⎛⎜ = ⎞⎟
18 3 200 25
⎝ 30 5 ⎠
Reading Strategies
LESSON 12-3 1.
Section Heads Tails
Practice and Problem Solving: A/B
1 3 4
62 31
1. = 2 2 3
354 177
39 3 5 3
2.
160
3
23 2.
3. 20
137
1
170 17 3.
4. = 10
190 19
9
4.
Practice and Problem Solving: C 10
1. a. 50; 1
5.
182 91 2
b. =
250 125 Success for English Learners
2. Sample answer: You could use a spinner 1. a. 5
with 3 equal sections for the individual,
pair, and team. You could use notecards 5 1
b. =
50 10
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
360
2. a. 4 + 3 + 6 + 4 + 4 + 5 = 26 Reading Strategies
26 13 1. 4;
b. =
50 25
13 12
c. 1 − =
25 25
LESSON 12-4
Practice and Problem Solving: A/B
1. 140 times 2. 9
2. 135 serves 3. Yes. The subway has been on time about
3. 64 days 90% of the time. The elevated train is on
4. 330 people time about 96% of the time.
5. 298 times Success for English Learners
6. 49 shots 32 x
1. No; = ; x = 4.9, or about 5 days;
7. in Classes 1 and 3, because the percents 91 14
preferring digital were 80% and 81% 14 − 5 = 9 days
Practice and Problem Solving: C 10 x
2. Yes; = ; x = 2.3, or about 2 days;
62 14
1. Yes, they should keep their plans. The
location is likely to provide over 9 days 14 − 2 = 12 days
without rain.
2. The train is more reliable. The bus is MODULE 12 Challenge
on-time 87.5% of the time, while the train 1. The expected daily number of defective
is on-time 90% of the time. toys produced in each factory is
3. No. It is likely to snow heavily more than calculated by multiplying the probability
two of the days. of producing a defective toy by the total
production in each factory.
4. a. DEF provides more reliable service.
2
They are late only 13% of the time, Factory A: × 3,000 ≈ 122
49
while ABC is late more than 14% of the
17
time. Factory B: × 3,300 ≈ 567
99
b. DEF did better than its average on 13
Thursday and Friday, with delays of Factory C: × 2,900 ≈ 539
70
9% and 10%. 11
Factory D: × 3,200 ≈ 424
Practice and Problem Solving: D 83
Factory A produces the least defective toys.
1. 40; 40
2. Shlomo can select Factory A or Factory D.
2. 570; 570
Factory A produces 3,000 − 122 = 2,878
3. 15.675; 16 toys that can be sold.
4. a. Math: 45 h; Science: 20 h; Social Factory D produces 3,200 − 424 = 2,776
Studies: 18 h; Language Arts: 17 h toys that can be sold.
b. Math: 33.8 h; Science: 15 h; Social 3. Factory A produces 3,000 − 122 = 2,878
Studies: 13.5 h; Language Arts: 12.8 h toys that can be sold.
Factory C produces 2,900 − 539 = 2,361
Reteach toys that can be sold.
25 x The two factories produce 2,878 + 2,361 =
1. = ; 30; 30 5,239 toys that can be sold in one day.
100 120
The total revenue produced by the factory
2. 495; 495
Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
361
is 5,239 × $29.99 = $157,117.61. 6. 10 cats
Each day Factory A spends 3,000 × 4
$2.39 = $7,170 to produce toys. 7.
17
Each day Factory C spends 2,900 ×
$1.89 = $5,481 to produce toys. 9
8.
The total expenses in Factory A and 34
Factory C are $7,170 + $5,481 = $12,651. 34
The profit earned in one day is 9. or 1. Since there are no goldfish in the
34
$157,117.61 − $12,651 = $144,466.61. show, it is certain that one will not be
picked.
MODULE 13 Theoretical Practice and Problem Solving: D
Probability and Simulations 7
1.
LESSON 13-1 25

Practice and Problem Solving: A/B 1

2.
5
1
1. 1 3
2 3. ;
4 4
1
2. 3 37
3 4. ;
40 40
3. 0.3
3
7 5. ; 0.3; 30%
4. 10
9
1
5. D 6. ; 0.1; 10%
10
6. C
6 3
7. E 7. or ; 0.6; 60%
10 5
8. B
9. A Reteach
4 8
10. 1.
23 15
18 2. 12 bottles of orange juice and cranberry
11. juice
23
4 19 7
12. 1 − = 3. a.
23 23 20
13. 0 13
b.
20
Practice and Problem Solving: C
4. 0.75
9
1. 5. 0.05
14
4 Reading Strategies
2.
13 1. a. heads or tails
3 b. heads
3.
4 1
c. 0.5 or
4. 20 2
5. 250 2. a. any of the 9 players

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
362
b. an outfielder 3. The values of P(B) and P(W) can be used
with either row of brands X, Y, and Z to
3 1
c. or find those values by a process of
9 3 elimination:
3. a. outcomes P(X) = 0.3; P(Y) = 0.2; P(Z) = 0.5
b. event 4. P(B) • P(Y) = 0.6 • 0.2 = 0.12
c. theoretical probability 5. P(W) • P(Z) = 0.4 • 0.5 = 0.2
Success for English Learners 6. a. P(metamorphic) • P(pebbles) =
6 1 0.6 • 0.6 = 0.36
1. or
18 3 b. P(igneous) = 0.25, so pebbles: (0.25)
(0.6) = 0.15; small rocks: (0.25)(0.2) =
5
2. 0.05; medium rocks: (0.25)(0.15) =
13
0.0375; boulders: (0.25)(0.05) = 0.0125
LESSON 13-2
Practice and Problem Solving: D
Practice and Problem Solving: A/B 1 1 1 1
1. calculator: ; ; ; ; ruler:
1. (Taco, Cheese), (Taco, Salsa), 4 4 4 4
(Taco, Veggie) 1 1 1 1 1 1 1 1 1 1 1 1
; ; ; ; ; ; ; ; ; ; ;
2. (Burrito, Cheese), (Taco, Cheese), 3 3 3 3 3 3 3 3 3 3 3 3
(Wrap, Cheese) each combination of calculator and
1 1 1 1 1 1 1 1 1 1
3. P(Burrito/Cheese) = ; P(Taco or Wrap ruler: ; ; ; ; ; ; ; ; ;
9 12 12 12 12 12 12 12 12 12
2 1 1 1
with salsa) = ; ; ;
9 12 12 12
P(Burrito/Cheese and Taco or Wrap with 1
1 2 2 2.
Salsa) = × = , since these are 4
9 9 81
1
independent events. 3.
3
1
4. 1 1 1
8 4. × =
3 4 12
3 17
5. 1 − = 5. a. two: (heads, tails)
20 20
b. six: (1, 2, 3, 4, 5, 6)
1 17 17
6. P = × = , since these are c. twelve: (H1, H2, H3, H4, H5, H6,
8 20 160
independent events. T1, T2, T3, T4, T5, T6)
7. P = 0. There are no pliers in the second Reteach
basket.
1–2.
Practice and Problem Solving: C Ellen
1. P(blue) + P(white) = P(blue or white) = 1 M P R S W
2. Let B = blue and W = white. P(X) • P(B) = M { ⊗ ⊗ { {
0.18; P(X) • P(W) = 0.12; 0.18 • P(W) = P × ×
0.12 • P(B) and from Ex. 1, P(B) +
Sam

R × ×
P(W) = 1, which gives P(B) = 0.6 and
P(W) = 0.4. S { ⊗ ⊗ { {
W × ×

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
363
3. 4 possibilities Practice and Problem Solving: C
4 1. a. 36
4. P =
25 5
b.
Reading Strategies 36
1. There are 3 events: picking pants, shirts, c. 25
and scarves; 2 pants × 2 shirts × d. 25
2 scarves give 8 choices. Answers will
2. a. 36
vary. Sample answer: Use a tree diagram.
2. There are two events: person, movie b. 20
genre; 2 people × 2 movie genres give c. 30
4 choices. Answers will vary. Sample d. 85
answer: Use a list.
3. a. 16
3. There are more than three events:
36 products and 36 sums. For an even b. 36
product, there are 27 choices; for an c. 24
even sum, there are 18 choices. Use
a table. Practice and Problem Solving: D
Success for English Learners 1
1.
2
1. They are duplicates.
2. Sample answer: The “doubles” such as 1
2.
C-C ad GO-GO form a diagonal from 3
upper left to lower right. 1
3. Sample answer: tree diagram 3.
5
LESSON 13-3 2
4.
5
Practice and Problem Solving: A/B
1 1 4 4
1 5. ×4 = × = = 2
1. 2 2 1 2
2
2. 32
1 1 16 16
6. × 16 = × = =4
4 4 1 4
1
3. 1 1 12 12
5 7. × 12 = × = =2
4. 12 6 6 1 6
1 1 1 15 15
5. 8. × 15 = × = =5
3 3 5 1 3
6. 13 Reteach
5 1
7. 1.
8 2
8. 125 2. 10
9. 26
1
10. about 26 3.
4
11. about 153 4. 20
12. 4

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
364
1 Success for English Learners
3. 5; 0.5 or
2 1. Answers will vary. Results or outcomes
of 5 should be counted. Experimental
Reteach probability should be near 17%.
1. Results will vary. Sample answer: 2. Answers will vary. Results or outcomes
Numbers Numbers
of 1, 3, and 5 should be counted.
Trial
Generated
Result Trial
Generated
Result Experimental probability should be
1 1, 1, 1, 1, 1 5 6 1, 0, 1, 0, 0 2
near 50%.
2 0, 0, 1, 1, 1 3 7 1, 1, 0, 1, 1 4
3. Choices will vary. Some possibilities
include the number 3, numbers less than
3 1, 0, 1, 0, 1 3 8 1, 1, 0, 0, 1 3
4, and numbers divisible by 3.
4 0, 0, 1, 0, 0 1 9 0, 1, 1, 0, 0 2

5 1, 0, 0, 0, 0 1 10 0, 1, 0, 0, 1 2
MODULE 13 Challenge
The experimental probability is 5 out 10, 1. The probability that the arrow will land
0.5, 50 percent, or one half or more that inside the circle is equal to the area of the
an outcome has a 50–50 chance or circle divided by the area of the square.
greater of occurring. Let the side of the square have length x.
2. Results will vary. Sample answer: Let 1 The area of the square is then x(x) = x2.
and 2 represent the probability that an The diameter of the circle is x, since the
event occurs; let 3–5 be the probability circle is inscribed in the square.
that it does not occur. The radius of the circle is half the length of
x
Trial
Numbers
Result Trial
Numbers
Result
the diameter, or .
Generated Generated 2
1 4, 4, 3, 4, 4 0 6 3, 2, 1, 5, 3 2
The area of the circle is given by the
2
⎛x⎞ πx 2
2 3, 5, 2, 4, 2 1 7 2, 1, 3, 4, 2 3 formula A = π r ; π ⎜ ⎟ =
2
.
3 2, 5, 5, 4, 3 1 8 2, 2, 1, 5, 3 3 ⎝2⎠ 4
The probability of the arrow landing inside
4 3, 3, 4, 4, 1 1 9 2, 3, 2, 4, 1 3
π x2
5 2, 2, 1, 4, 1 4 10 2, 5, 5, 1, 3 1 π
the circle equals 42 = ≈ 0.785.
The experimental probability is 3 out of x 4
10, 0.3, 30 percent, or three tenths that an 2. Tobias is not correct. According to the
outcome has a 3 in 5 chance of occurring. simulation the probability of two or more
days of rain per week equals 0.3 (Trials 1,
Reading Strategies 8, and 10 are weeks in which there were
1. 1 out of 4; use the numbers 1–4 for two or more rainy days). The probability of
randomization with 1 being the favorable no rainy days in a week is 0.3 (Trials 4, 6,
outcome. Experimental probability results and 7 produced no rainy days). The
will vary, but only the outcome of 1 will be probability of no rainy days is the same as
counted as a favorable result when it the probability of two or more rainy days.
occurs exactly twice out of 10 3. The probability of 0 rainy days is 0.3
randomizations of the numbers 1–4, (Trials 4, 6, 7).
e.g. 1, 2, 4, 2, 1, 3, 4, 2, 2, 4 The probability of 1 rainy day is 0.4
2. 7 out of 8; use the numbers 1–8 for (Trials 2, 3, 5 and 9).
randomization with 1–7 being favorable The probability of 2 rainy days is 0.
outcomes. Experimental probability results The probability of 3 rainy days is 0.2
will vary, but only one of the outcomes (Trials 1 and 8).
1–7 will be counted as a favorable result The probability of 4 rainy days is 0.1
out of 10 randomizations of the numbers (Trial 10).
1–8, e.g. 6, 5, 4, 6, 3, 8, 1, 5, 3, 7 The probability of 5, 6 or 7 rainy days is 0.
One rainy day per week is most likely.

Original content Copyright © by Houghton Mifflin Harcourt. Additions and changes to the original content are the responsibility of the instructor.
366

Second Form Mathematics Module 5
100% (1)
Second Form Mathematics Module 5
48 pages
G7 Math Q1 Week 3 - Fundamental Operations
No ratings yet
G7 Math Q1 Week 3 - Fundamental Operations
83 pages
Integer Operations for Beginners
No ratings yet
Integer Operations for Beginners
3 pages
Integer Operations for Students
No ratings yet
Integer Operations for Students
83 pages
Fundamental Operations of Integers
No ratings yet
Fundamental Operations of Integers
51 pages
Detailed Lesson Plan
No ratings yet
Detailed Lesson Plan
14 pages
+ - Integers - Addition & Subtraction
100% (2)
+ - Integers - Addition & Subtraction
14 pages
MATH 7 Q1 Week 3
No ratings yet
MATH 7 Q1 Week 3
8 pages
Adding and Subtracting Integers: Essential Question
No ratings yet
Adding and Subtracting Integers: Essential Question
30 pages
Integers
No ratings yet
Integers
19 pages
(EDITED) Math7 - q1 - Mod3 - Absolute - Value - Integers - Beverly - Wanawan - Bgo - v2
No ratings yet
(EDITED) Math7 - q1 - Mod3 - Absolute - Value - Integers - Beverly - Wanawan - Bgo - v2
13 pages
Lesson Plan Example
No ratings yet
Lesson Plan Example
6 pages
MATH 6 Q2 WEEK 9 Day 1-4 Performs Basic Operations On Integers
50% (4)
MATH 6 Q2 WEEK 9 Day 1-4 Performs Basic Operations On Integers
81 pages
DLL - Mathematics 6 - Q2 - W9
No ratings yet
DLL - Mathematics 6 - Q2 - W9
7 pages
WEEK 9 Day 1-4 Performs Basic Operations On Integers (Autosaved)
No ratings yet
WEEK 9 Day 1-4 Performs Basic Operations On Integers (Autosaved)
83 pages
Consolidated Learner Guide - Mathematics in The Modern World
No ratings yet
Consolidated Learner Guide - Mathematics in The Modern World
109 pages
WEEK 9 Day 1-4 Performs Basic Operations On Integers
100% (1)
WEEK 9 Day 1-4 Performs Basic Operations On Integers
81 pages
Grade-6-Q2 M9
No ratings yet
Grade-6-Q2 M9
28 pages
7thgrademath Unit2
No ratings yet
7thgrademath Unit2
25 pages
4th - Operations On Integers
No ratings yet
4th - Operations On Integers
6 pages
Adding Subtracting Integers
No ratings yet
Adding Subtracting Integers
46 pages
Grade 8 Mathematics Notes
100% (1)
Grade 8 Mathematics Notes
4 pages
Teacher'S Activity Learner'S Activity
No ratings yet
Teacher'S Activity Learner'S Activity
5 pages
Math - Gr6 - Q2 - WEEK 09 - Perform Basic Operation On Integers Final
100% (1)
Math - Gr6 - Q2 - WEEK 09 - Perform Basic Operation On Integers Final
31 pages
Chapter 1 1 Review Answers
No ratings yet
Chapter 1 1 Review Answers
4 pages
Operations With Integers
No ratings yet
Operations With Integers
2 pages
G7 Math Q1 Week 3 - Fundamental Operations
No ratings yet
G7 Math Q1 Week 3 - Fundamental Operations
81 pages
Operations With Integers Powerpoint
50% (2)
Operations With Integers Powerpoint
25 pages
NMP Las #3 (Operations On Integers)
No ratings yet
NMP Las #3 (Operations On Integers)
4 pages
Module - Operations of Integers
100% (3)
Module - Operations of Integers
15 pages
C ABbmuwbu LR 8 HJ WMi 4 Gs
No ratings yet
C ABbmuwbu LR 8 HJ WMi 4 Gs
6 pages
Lesson Plan Four Fundamental On Integers
No ratings yet
Lesson Plan Four Fundamental On Integers
6 pages
Integers: Whole Number
0% (1)
Integers: Whole Number
3 pages
Adding Integers Examples + + + + Subtracting Integers Examples
No ratings yet
Adding Integers Examples + + + + Subtracting Integers Examples
2 pages
A Detailed Lesson Plan in Mathematics G11
No ratings yet
A Detailed Lesson Plan in Mathematics G11
9 pages
Fundamental Operations On Integers
No ratings yet
Fundamental Operations On Integers
13 pages
G7. WK3. T3. Maths
No ratings yet
G7. WK3. T3. Maths
6 pages
Math 1.2
No ratings yet
Math 1.2
12 pages
Math Detail
No ratings yet
Math Detail
18 pages
Lesson-4 1-4 2
No ratings yet
Lesson-4 1-4 2
9 pages
Integer Basics for Students
No ratings yet
Integer Basics for Students
4 pages
LP For MDAS Positive and Negative
100% (1)
LP For MDAS Positive and Negative
4 pages
Interesting Integers
No ratings yet
Interesting Integers
46 pages
Integers: The Number Line and Comparing Integers
No ratings yet
Integers: The Number Line and Comparing Integers
12 pages
Integer Subtraction Basics
No ratings yet
Integer Subtraction Basics
19 pages
Adding Integers: Example
No ratings yet
Adding Integers: Example
6 pages
DLL Math Q2 W9
No ratings yet
DLL Math Q2 W9
7 pages
4.1 Adding and Subtracting Integers
No ratings yet
4.1 Adding and Subtracting Integers
3 pages
Class 6 Chapter 6
No ratings yet
Class 6 Chapter 6
11 pages
DLL Mathematics 6 q2 w9
100% (1)
DLL Mathematics 6 q2 w9
5 pages
Topic 4 Operations On Integers
No ratings yet
Topic 4 Operations On Integers
46 pages
1.2 Basic Operation Involving Integers
No ratings yet
1.2 Basic Operation Involving Integers
10 pages
SLG 2.5.1 Properties of Integers, Operations On Integers
No ratings yet
SLG 2.5.1 Properties of Integers, Operations On Integers
6 pages
Lecture-Handout and Worksheet: Grades
No ratings yet
Lecture-Handout and Worksheet: Grades
46 pages
Gr7-Unit 3 Note Packet-Integers-final
No ratings yet
Gr7-Unit 3 Note Packet-Integers-final
9 pages
INTEGERS
No ratings yet
INTEGERS
21 pages
DLL - Mathematics 6 - Q2 - W9
No ratings yet
DLL - Mathematics 6 - Q2 - W9
5 pages
0.1 Integers
No ratings yet
0.1 Integers
6 pages
DLL Math 6 Q2 Week 9
No ratings yet
DLL Math 6 Q2 Week 9
5 pages
G4 Diana Practice 1
No ratings yet
G4 Diana Practice 1
4 pages
Rules For Operations of Integers
No ratings yet
Rules For Operations of Integers
2 pages
G4 Diana Practice 3
No ratings yet
G4 Diana Practice 3
4 pages
Unit1lesson1 Summary
No ratings yet
Unit1lesson1 Summary
1 page
Adding Like Fractions Worksheet 2
No ratings yet
Adding Like Fractions Worksheet 2
6 pages
Worksheet 1
No ratings yet
Worksheet 1
1 page
M67 3B - Multiply-Divide Integers
No ratings yet
M67 3B - Multiply-Divide Integers
6 pages
G4 Cliff Online Practice 1
No ratings yet
G4 Cliff Online Practice 1
10 pages
Math10merged Histogram
No ratings yet
Math10merged Histogram
29 pages
Math0300 Multipy and Divide Integers
No ratings yet
Math0300 Multipy and Divide Integers
5 pages
Solving Equations Using Addition or Subtraction 7.2
No ratings yet
Solving Equations Using Addition or Subtraction 7.2
8 pages
10.22.15 Using Models To Add Integers 8-1
No ratings yet
10.22.15 Using Models To Add Integers 8-1
4 pages
Adding Like Fractions Worksheet 1
No ratings yet
Adding Like Fractions Worksheet 1
6 pages
Adding and Subtracting Fractions With Different Denominators Word Problems
No ratings yet
Adding and Subtracting Fractions With Different Denominators Word Problems
9 pages
HSCC SRH 0201 A
No ratings yet
HSCC SRH 0201 A
1 page
T9.2 - Surface Area of Prisms and Cy Inder - Done
No ratings yet
T9.2 - Surface Area of Prisms and Cy Inder - Done
8 pages
Dilations Worksheet
No ratings yet
Dilations Worksheet
3 pages
Plan Your Infographic
No ratings yet
Plan Your Infographic
1 page
Shape Translation Rules
No ratings yet
Shape Translation Rules
2 pages
Worksheet Multiplication and Division of Mixed Numbers
No ratings yet
Worksheet Multiplication and Division of Mixed Numbers
4 pages
Infographics #4 - Answer
No ratings yet
Infographics #4 - Answer
1 page
MPM1D Course Preview
No ratings yet
MPM1D Course Preview
2 pages
MPM1D Preview Answers
No ratings yet
MPM1D Preview Answers
8 pages
Integers and Powers
No ratings yet
Integers and Powers
6 pages
Artificial Intelligence: Tutorial 1 Solutions Prolog
No ratings yet
Artificial Intelligence: Tutorial 1 Solutions Prolog
3 pages
Class X Holidays Home Work
No ratings yet
Class X Holidays Home Work
5 pages
E Book Da Costa PDF
100% (1)
E Book Da Costa PDF
413 pages
19 RA - (Function - ITF)
No ratings yet
19 RA - (Function - ITF)
4 pages
Exam 6
No ratings yet
Exam 6
3 pages
Final Paper Resit Exam For Python Programming
No ratings yet
Final Paper Resit Exam For Python Programming
6 pages
Tutors Self Study
No ratings yet
Tutors Self Study
2 pages
7th Class Math Cbse (Ncert) Chapter Integer Important Questions
No ratings yet
7th Class Math Cbse (Ncert) Chapter Integer Important Questions
2 pages
EECE 7200 Syllabus 2017
No ratings yet
EECE 7200 Syllabus 2017
2 pages
Assignment 6
No ratings yet
Assignment 6
9 pages
(Solution) Maths - Race#036
No ratings yet
(Solution) Maths - Race#036
4 pages
Solution Manual For Precalculus Enhanced With Graphing Utilities 6th Edition Sullivan 0321795466 9780132854351 Updated 2025
100% (63)
Solution Manual For Precalculus Enhanced With Graphing Utilities 6th Edition Sullivan 0321795466 9780132854351 Updated 2025
59 pages
SG EXPNoCalc
No ratings yet
SG EXPNoCalc
17 pages
SUMMATIVE TEST - q3-wk 1
100% (2)
SUMMATIVE TEST - q3-wk 1
2 pages
CS-304 Digital Systems Mid Sem - I Oct 2023
No ratings yet
CS-304 Digital Systems Mid Sem - I Oct 2023
2 pages
6.report Face Recognition
No ratings yet
6.report Face Recognition
45 pages
Liceo de Cagayan University: Student Activity Sheet No. - 3
100% (1)
Liceo de Cagayan University: Student Activity Sheet No. - 3
3 pages
Pragyan 10th Paper Set (EM)
No ratings yet
Pragyan 10th Paper Set (EM)
47 pages
Help
No ratings yet
Help
21 pages
Kampala Junior Academy Primary 4 Set 2 Mathematics
50% (2)
Kampala Junior Academy Primary 4 Set 2 Mathematics
7 pages
MMW Module 2 - MATHEMATICAL LANGUAGE AND SYMBOLS
No ratings yet
MMW Module 2 - MATHEMATICAL LANGUAGE AND SYMBOLS
12 pages
Math Basics For The Health Care Professional, 5th Edition Complete DOCX Download
100% (16)
Math Basics For The Health Care Professional, 5th Edition Complete DOCX Download
14 pages
D10Z Twin Prime Analysis
No ratings yet
D10Z Twin Prime Analysis
18 pages
Earthquake Engineering Analysis
No ratings yet
Earthquake Engineering Analysis
127 pages
Math Series & Convergence Guide
No ratings yet
Math Series & Convergence Guide
2 pages
An Inequality Is Preserved If Both Sides Are Multiplied by
No ratings yet
An Inequality Is Preserved If Both Sides Are Multiplied by
2 pages
Numerical Methods Ch. 5 Problem Solution
No ratings yet
Numerical Methods Ch. 5 Problem Solution
6 pages
MATH3161 Lecture 1
No ratings yet
MATH3161 Lecture 1
7 pages
Week 10
No ratings yet
Week 10
24 pages
Computer Arithmetic Guide
No ratings yet
Computer Arithmetic Guide
41 pages

Reteach 7th

Uploaded by

Reteach 7th

Uploaded by

Name ________________________________________ Date __________________ Class __________________

How do you add integers with the same sign?

Find each sum.

negative? _________________ negative? _________________

b. Add the integers. ________ b. Add the integers. ________

c. Write the sum. 3 + 6 = ________ c. Write the sum. −7 + ( −1) = ________

negative? _________________ negative? _________________

b. Add the integers. ________ b. Add the integers. ________

c. Write the sum. −5 + ( −2 ) = ________ c. Write the sum. 6 + 4 = ________

Find each sum.

5. −10 + ( −3 ) = ________ 6. −4 + ( −12 ) = ________

7. 22 + 15 = ________ 8. −10 + ( −31) = ________

9. −18 + ( −6 ) = ________ 10. 35 + 17 = ________

This balance scale “weighs” positive and negative numbers. Negative

Find −11 + 8. Find −2 + 7.

1. Should you add or subtract 3 and 9? Why?

2. Is the sum positive or negative? ___________________________

the sign of the integer

Find the sum.

3. 7 + (−3) = ________ 4. −2 + (−3) = ________ 5. −5 + 4 = ________

6. −3 + (−1) = ________ 7. −7 + 9 = ________ 8. 4 + (−9) = ________

9. 16 + (−7) = ________ 10. −21 + 11 = ________ 11. −12 + (−4) = ________

The total value of the three cards shown is −6.

What if you take away the 3 card?

Answer each question.

1. Suppose you have the cards shown.

a. What if you take away the 7 card? 12 − 7 = ________

b. What if you take away the 13 card? 12 − 13 = ________

c. What if you take away the −8 card? 12 − (−8) = ________

Find the difference.

3. 31 − (−9) = ________ 4. 15 − 18 = ________ 5. −9 − 17 = ________

6. −8 − (−8) = ________ 7. 29 − (−2) = ________ 8. 13 − 18 = ________

How do you find the value of expressions involving addition and

Find the value of each expression.

b. Add and subtract. b. Add and subtract.

c. Write the sum. 10 − 19 + 5 = ______ c. Write the sum. −15 + 14 − 3 = ______

b. Add and subtract. b. Add and subtract.

c. Write the sum. −80 + 10 − 6 = ______ c. Write the sum. 7 − 21 + 13 = ______

b. Add and subtract. b. Add and subtract.

c. Write the sum. −5 + 13 − 6 + 2 = ____ c. Write the sum.18 − 4 + 6 − 30 = ____

You can use patterns to learn about multiplying integers.

Here is another pattern.

Find each product.

3. (5)(−1) 4. (−9)(−6) 5. 11(4)

________________________ _______________________ ________________________

Write a mathematical expression to represent each situation.

7. A mountaineer descends a mountain for 5 hours. On average, she

You can use a number line to divide a negative integer by a positive

Step 1 Draw the number line.

Step 2 Draw an arrow to the left

Step 3 Divide the arrow into the

Step 4 How long is each small

On a number line, in which direction will an arrow that represents the

Complete the table.

To evaluate an expression, follow the order of operations.

1. Multiply and divide in order from left to right. (−5)(6) + 3 + (−20) ÷ 4 + 12

2. Add and subtract in order from left to right. −30 + 3 + (−5) + 12

Name the operation you would do first.

3. 16 + 72 ÷ (−8) + 6(−2) 4. 17 + 8 + (−16) − 34

5. −8 + 13 + (−24) + 6(−4) 6. 12 ÷ (−3) + 7(−7)

7. (−5)6 + (−12) − 6(9) 8. 14 − (−9) − 6 −5

Find the value of each expression.

9. (−6) + 5(−2) + 15 10. (−8) + (−19) − 4 11. 3 + 28 ÷ (−7) + 5(−6)

________________________ _______________________ ________________________

12. 15 + 32 + (−8) −6 13. (−5) + 22 + (−7) + 8(−9) 14. 21 ÷ (−7) + 5(−9)

________________________ _______________________ ________________________

A teacher overheard two students talking about how to write a mixed

For each mixed number, use two methods to write it as a decimal.

This balance scale “weighs” positive and negative numbers.

Find each sum.

1. −2 + 4 = _________________ 2. 3 + (−8) = _________________ 3. −5 + (−2) = _____________

4. 2.4 + (−1.8) = ____________ 5. 1.1 + 3.6 = _________________ 6. −2.1 + (−3.9) = _________

The total value of the three cards shown is −4 1 .

Answer each question.

a. What is the value if you take away just the 7? _________________

a. −4 < −2. So the answer will be a _________________ number.

Name ____________________ Date Class

negative? _ negative? _

b. Add the integers. b. Add the integers.

c. Write the sum. 3 + 6 = c. Write the sum. −7 + ( −1) =

negative? _ negative? _

b. Add the integers. b. Add the integers.

c. Write the sum. −5 + ( −2 ) = c. Write the sum. 6 + 4 =

5. −10 + ( −3 ) = 6. −4 + ( −12 ) =

7. 22 + 15 = 8. −10 + ( −31) =

9. −18 + ( −6 ) = 10. 35 + 17 =

3. 7 + (−3) = 4. −2 + (−3) = 5. −5 + 4 =

6. −3 + (−1) = 7. −7 + 9 = 8. 4 + (−9) =

9. 16 + (−7) = 10. −21 + 11 = 11. −12 + (−4) =

3. 31 − (−9) = 4. 15 − 18 = 5. −9 − 17 =

6. −8 − (−8) = 7. 29 − (−2) = 8. 13 − 18 =

c. Write the sum. 10 − 19 + 5 = c. Write the sum. −15 + 14 − 3 =

c. Write the sum. −80 + 10 − 6 = c. Write the sum. 7 − 21 + 13 =

c. Write the sum. −5 + 13 − 6 + 2 = c. Write the sum.18 − 4 + 6 − 30 =

____________ _ ______________

____________ _ ______________

____________ _ ______________

1. −2 + 4 = _________ 2. 3 + (−8) = _ 3. −5 + (−2) = _____

4. 2.4 + (−1.8) = ____ 5. 1.1 + 3.6 = _ 6. −2.1 + (−3.9) = _

b. |4| − |2| = c. −4 − (−2) =

3. 31 − (−9) = 4. 15 − 18 = 5. −9 − 17 =

6. 2.6 − (−1.6) = 7. 4.5 − 2.5 = 8. −2.0 − 1.25 =

Step 1: _ Step 1: _

Step 2: _ Step 2: _

Step 3: _ Step 3: _

The x-values represent _. The x-values represent _.

The y-values represent _. The y-values represent _.

amount of change: 22 − 8 = _ amount of change: 90 − 81 = _

original amount: _ original amount: _

__ i 100 = _% i 100 = ___%

amount of change: 200 − 125 = _ amount of change: 400 − 60 = _

original amount: _ original amount: _

___ i 100 = _% i 100 = ___%

____________ _ ______________

____________ _ ______________

____________ _ ______________

____________ _ ______________