Texas Go Math

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Lesson 7.3 Answer Key Using Ratios and Rates to Solve Problems.

Texas Go Math Grade 6 Lesson 7.3 Answer Key Using Ratios and Rates to Solve Problems

Reflect

Question 1.
Explain the Error Marisol makes the following claim: “Bailey’s lemonade is stronger because it has more lemonade concentrate. Bailey’s lemonade has 3 cups of lemonade concentrate, and Anna’s lemonade has only 2 cups of lemonade concentrate” Explain why Marisol is incorrect.
Answer:
The strength of the Lemonade also depends on the amount of water

Question 2.
In the science club, there are 2 sixth graders for every 3 seventh graders. At this year’s science fair, there were 7 projects by sixth graders for every 12 projects by seventh graders. Is the ratio of sixth graders to seventh graders in the science club equivalent to the ratio of science fair projects by sixth graders to projects by seventh graders? Explain.
Answer:
The ratio of sixth-graders to seventh-graders in the science club is given by 2 : 3 or \(\frac{2}{3}\)

Reflect

Go Math Lesson 7.3 Answer Key Grade 6 Question 3.
In fifteen minutes, Lena can finish 2 math homework problems. How many math problems can she finish in 75 minutes? Use a double-number line to find the answer.

Answer:
Find the unit rate. How long does Leny need to solve the problem?

Divide to find the unit rate
\(\frac{15 \text { minutes }}{2 \text { problems }}=\frac{7.5 \text { minutes }}{1 \text { problems }}\)

Lena solves one prob1em in 7.5 minutes
Divide
75 minutes ÷ 7.5 minutes = 10 problems

In 75 minutes, Lena solves 10 problems
Final solution = 10

Texas Go Math Grade 6 Lesson 7.3 Guided Practice Answer Key

Question 1.
Celeste is making fruit baskets for her service club to take to a local hospital. The directions say to fill the boxes using 5 apples for every 6 oranges. Celeste is filling her baskets with 2 apples for every 3 oranges.

a. Complete the tables to find equivalent ratios.

Answer:

b. Compare the ratios. Is Celeste using the correct ratio of apples to oranges?
Answer:
No, Celeste is not using the correct ratio of apples to oranges. It can be seen that when there are 6 oranges in the 2nd table, there are 4 apples white the direction is of 5 apples.

Question 2.
Neha used 4 bananas and 5 oranges in her fruit salad. Daniel used 7 bananas and 9 oranges. Did Neha and Daniel use the same ratio of bananas to oranges? If not, who used the greater ratio of bananas to oranges?
Answer:
The ratio of bananas to oranges is Neha’s salad is 4 : 5 or \(\frac{4}{5}\) = 0.8.
The ratio of bananas to oranges is Daniel’s salad is 7 : 9 or \(\frac{7}{9}\) = 0.\(\overline{7}\)
Since 0.8 > 0. bar 7, it can be said that the banana to oranges ratio was more in Neha’s salad
The banana to oranges ratio was higher in Neha’s salad.

Go Math Grade 6 Lesson 7.3 Answer Key Question 3.
Tim is a first-grader and reads 28 words per minute. Assuming he maintains the same rate, use the double number line to find how many words he can read in 5 minutes.

Answer:
He can read 140 words in 5 minutes.

Question 4.
A cafeteria sells 30 drinks every 15 minutes. Predict how many drinks the cafeteria sells every hour.
Answer:

120 drinks are sold every hour.

Essential Question Check-In

Question 5.
Explain how to compare two ratios.
Answer:
Decimal value: The decimal value of the 2 given ratios is evaluated and their values are compared. If the decimal value of both is equal then this implies that they are equivalent, otherwise not.

Same denominator: The 2 given ratios are converted to an equivalent denominator and then their numerators are compared. If the numerators are equal, then this implies that they are equivalent, otherwise not.

Comparing the decimals values or using the same denominator method

Question 6.
Last week, Gina’s art teacher mixed 9 pints of red paint with 6 pints of white paint to make pink. Gina mixed 4 pints of red paint with 3 pints of white paint to make pink.

a. Did Gina use the same ratio of red paint to white paint as her teacher? Explain.
Answer:
To compare this to ratios, find the decjmaL value of both fractions.
Gina’s teacher:
\(\frac{9}{6}=\frac{3}{2}\) = 1.5
Gina:
\(\frac{4}{3}\) = 1.33
They did not use the same ratio of red to white paint

b. Yesterday, Gina again mixed red and white paint and made the same amount of paint, but she used one more pint of red paint than she used last week. Predict how the new paint color will compare to the paint she mixed last week.
Answer:
To compare this to ratios, find the decimal value of both fraction&
Gina’s last week:
\(\frac{4}{3}\) = 1.33
Gina’s current week:
\(\frac{5}{3}\) = 1.33
The new paint has more red paint.

Question 7.
The Suarez family paid $15.75 for 3 movie tickets. How much would they have paid for 12 tickets?
Answer:
Given rate is $ 15.75 for 3 movie tickets. This implies that the cost of 1 ticket is \(\frac{15.75}{3}\) = $5.25. Therefore the cost of 12 tickets will be 12 × $5.25 = $63.

Suarez family will have to pay $63 for 12 tickets.

Go Math Answer Key Grade 6 Lesson 7.3 Question 8.
A grocery store sells snacks by weight. A six-ounce bag of mixed nuts costs $3.60. Predict the cost of a two-ounce bag.
Answer:
Given rate is $:3.60 for 6 ounces bag. This implies that the cost of 1 ounce of snacks is \(\frac{3.60}{6}\) = $ 0.60. Therefore, the cost of 2 ounces will be 2 × $ 0.6 = $ 1.20

The cost of the 2-ounce bag is $1.20

Question 9.
The Martin family’s truck gets an average of 25 miles per gallon. Predict how many miles they can drive using 7 gallons of gas.
Answer:
Given rate is 25 miles per gallon so the truck will travel 25 × 7 = 175 miles on 7 gallons of gas.
The truck will travel 175 miles on 7 gallons of gas.

Question 10.
Multistep The table shows two cell phone plans that offer free minutes for each given number of paid minutes used. Pablo has Plan A and Sam has Plan B.

a. What is Pablo’s ratio of free to paid minutes? Cell Pl
Answer:
Pablo’s ratio of free to paid minutes is 2 : 10 or \(\frac{2}{10}\) = 0.2

b. What is Sam’s ratio of free to paid minutes? ________
Answer:
Sam’s ratio of free to paid minutes is 8: 25 or \(\frac{8}{25}\) = 0.32

c. Does Pablo s cell phone plan offer the same ratio of free to paid minutes as Sam’s? Explain.
Answer:
It can be seen that 0.2 ≠ 0.32 this implies that the 2 ratios are not equivalent and that Pablo’s cell phone plan does not offer the same ratio of free to paid minutes as Sam’s.

Question 11.
Consumer Math A store has apples on sale for $3.00 for 2 pounds.

a. If an apple is approximately 5 ounces, how many apples can you buy for $9? Explain.
Answer:
There are 16 ounces in 1 pound.
For $9 dollars we can buy
3. $3 = $9 ⇒ 3. 2 pounds = 6 pounds
Therefore, 6 pounds equals to
6 ∙ 16 = 96 ounces
If an apple is approximately 5 ounces,
\(\frac{96}{5}\) = 19.2
We can buy 19 apples.

b. If Dabney paid less per pound for the same number of apples at a different store, what can you predict about the total cost of the apples?
Answer:
The price of the apples at the other store will be cheaper.

Question 12.
Sophie and Eleanor are making bouquets using daisies and tulips. Each bouquet will have the same total number of flowers. Eleanor uses fewer daisies in her bouquet than Sophie. Whose bouquet will have the greater ratio of daisies to total flowers? Explain.
Answer:
If Eleanor uses fewer daisies, that means she uses more tulips. Therefore, hers bouquet will have the greater ratio of daisies to total flowers (both ratios have the same denominator (number of total flowers) but Eleanor’s has greater denominator).

Go Math Lesson 7.3 Answer Key Grade 6 Pdf Question 13.
A town in east Texas received 10 inches of rain in two weeks. If it kept raining at this rate for a 31-day month, how much rain did the town receive?
Answer:
There are 7 days in a week so the given rate becomes \(\frac{10}{14}\) inches per day. This means that in 31 days, it would have rained \(\frac{10}{14}\) × 31 = 22.143 inches.

The town received 22.143 inches of rain in the month.

Question 14.
One patterned blue fabric sells for $15.00 every two yards, and another sells for $37.50 every 5 yards. Do these fabrics have the same unit cost? Explain.
Answer:
The unit cost of the first fabric is \(\frac{\$ 15}{2}\) = $ 7.50 per yard.
The unit cost of the second fabric is \(\frac{\$ 37.5}{5}\) = $ 7.50 per yard.
It can be seen that the unit cost of both the fabrics is same and equal to $7.50 per yard.
These fabrics have the same unit cost.

H.O.T. Focus On Higher Order Thinking

Question 15.
Problem Solving Complete each ratio table.

Answer:
Table a: The table is completed using the ratio \(\frac{24}{18}\) = \(\frac{4}{3}\)

Table b: The table is completed using the ratio \(\frac{40.4}{512}\)

Go Math Problems for 6th Graders with Answers Lesson 7.3 Question 16.
Represent Real-World Problems Write a real-world problem that compares the ratios 5to 9 and 12 to 15.
Answer:
Juice A is made of 5 cups of concentrate mixed with 9 cups of water Juice B is made of 12 cups of concentrate mixed with 15 cups of water Which of the 2 is more concentrated?

Question 17.
Analyze Relationships Explain how you can be sure that all the rates you have written on a double number line are correct.
Answer:
A double number line consists of 2 different quantities on both sides of the double number line. It can be seen that the double number line is made correctly by checking the interval between each successive entry on both sides of the number line. This interval should be constant.

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Module 7 Quiz Answer Key.

Texas Go Math Grade 6 Module 7 Quiz Answer Key

Texas Go Math Grade 6 Module 7 Ready to Go On? Answer Key

Use the table to find each ratio. _____________

Question 1.
white socks to brown socks Color _____________
Answer:
Write the ratio of white socks to brown socks in three different ways

part to part
8 : 5 , \(\frac{8}{5}\), 8 white socks to 5 brown socks
8 : 5 = Final solution

Grade 6 Math Module 7 Answer Key Question 2.
blue socks to non blue socks _____________
Answer:
The solution to this example is given below
Non blue socks = 8 + 6 + 5 = 19
Write the ratio of blue socks to non blue socks in three different ways

part to part
4 : 19, \(\frac{4}{9}\), 4 blue socks to 19 non blue socks
4 : 19 = Final Solution

Question 3.
black socks to all of the socks _____________
Answer:
Solution to this example is given below
All of the socks = 8 + 6 + 4 + 5 = 23
Write the ratio of black socks to alt of the socks in three different ways

part to part
6 : 23, \(\frac{6}{23}\) 6 black socks to 23 all of the socks
6 : 23 = Final solution

Question 4.
Find two ratios equivalent to the ratio in Exercise 1.
Answer:
There are 8 white socks and 5 brown socks so the ratio of white socks to brown socks is 8 : 5 which can be written
as \(\frac{8}{5}\) 2 equivalent ratios of this are \(\frac{8 \times 2}{5 \times 2}=\frac{16}{10}\) and \(\frac{8 \times 3}{5 \times 3}=\frac{24}{15}\)

7.2 Rates

Find each rate.

Question 5.
Earl runs 75 meters in 30 seconds. How many meters does Earl run per second? _____________
Answer:
Find the unit rate. How many meters Earl ran in a second

Divide to find the unit rate
\(\frac{75 \text { meters }}{30 \text { seconds }}=\frac{2.5 \text { meters }}{1 \text { second }}\)

Earl ran 2.5 meters per second
2.5 = Final solution

Ratio Quiz Grade 6 Pdf Answer Key Question 6.
The cost of 3 scarves is $26.25. What is the unit price? _____________
Answer:
Find the unit rate. What is the unit price?

Divide to find the unit rate
\(\frac{26.25 \text { dollars }}{3 \text { scarves }}=\frac{8.75 \text { dollars }}{1 \text { scarf }}\)

The cost of 1 scarf is 8.75 dollars
8.75 = Final solution

7.3 Using Ratios and Rates to Solve Problems

Question 7.
Danny charges $35 for 3 hours of swimming lessons. Martin charges $24 for 2 hours of swimming lessons. Who offers a better deal?
Answer:
Evaluate the cost of 1 hour of swimming. Danny charges $35 for 3 hours so \(\frac{\$ 35}{3}\) = $ 11.6 per hour while Martin charges $24 for 2 hours so \(\frac{\$ 24}{2}\) = $12 per hour. Since 12 > 11.6, Danny’s charges less so offers a better deal.

Danny offers a better deal.

Question 8.
There are 32 female performers in a dance recital. The ratio of men to women is 3:8. How many men are in the dance recital?
Answer:
Multiply the numerator and denominator by the \(\frac{4}{4}\).
\(\frac{3}{8}=\frac{3}{8} \cdot \frac{4}{4}=\frac{12}{32}\)
There are 12 men.

Essential Question

Question 9.
How can you use ratios and rates to solve problems?
Answer:
Ratios and rates are used to solve problems as they numerically define the relationship between the 2 quantities under consideration.

Texas Go Math Grade 6 Module 7 Mixed Review Texas Test Prep Answer Key

Selected Response

Ratio Quiz Grade 6 Pdf Module 7 Test Answers Question 1.
Which ratio is not equivalent to the other three?
(A) \(\frac{2}{3}\)
(B) \(\frac{6}{9}\)
(C) \(\frac{12}{15}\)
(D) \(\frac{18}{27}\)
Answer:
(C) \(\frac{12}{15}\)

Explaination:
It can be seen \(\frac{2}{3}=\frac{2 \times 3}{3 \times 3}=\frac{6}{9}\) and \(\frac{2}{3}=\frac{2 \times 9}{3 \times 9}=\frac{18}{27}\), so option C.

Question 2.
A lifeguard received 15 hours of first aid training and 10 hours of cardiopulmonary resuscitation (CPR) training. What is the ratio of hours of CPR training to hours of first aid training?
(A) 15:10
(B) 15:25
(C) 10:15
(D) 25:15
Answer:
(C) 10:15

Explaination:
The ratio of hours of CPR training to hours of first aid training is 10 : 15, therefore Option C.

Question 3.
Jerry bought 4 DVDs for $25.20. What was the unit rate?
(A) $3.15
(B) $4.20
(C) $6.30
(D) $8.40
Answer:
(C) $6.30

Explaination:
The divisor has one decimal place, so multiply both the dividend and the divisor by 10 so that the divisor is a whole number
4 × 10 = 40
25.20 × 10 = 252

Divide:

Ratios Quiz 6th Grade Module 7 Answer Key Question 4.
There are 1,920 fence posts used in a 12-kilometer stretch offence. How many fence posts are used in 1 kilometer offence?
(A) 150
(B) 160
(C) 155
(D) 180
Answer:
(B) 160

Explaination:
Solution to this example is given below

160 fence posts are used in 1 kilometer of fence.

Question 5.
Sheila can ride her bicycle 6,000 meters in 15 minutes. How far can she ride her bicycle in 2 minutes?
(A) 400 meters
(B) 600 meters
(C) 800 meters
(D) 1 ,000 meters
Answer:
(C) 800 meters

Explaination:
Solution to this example is given below

So in 1 minute can ride 400 meters
Therefore in 2 minutes, she can travel a distance of 800 meters.

Question 6.
Lennon has a checking account. He withdrew $130 from an ATM Tuesday. Wednesday he deposited $240. Friday he wrote a check for $56. What was the total change in Lennon’s account?
(A) – $74
(B) $54
(C) $166
(D) $184
Answer:
(D) $184

Explaination:
First, he withdrew $130. So the change in the account is – $130.
After that, he deposited $240. So the change in the account is
– $130 + 240 = $110
And finally, he wrote a check for $56. So the total change in the account is
$240 + (- 56) = $ 184

Question 7.
Cheyenne is making a recipe that uses 5 cups of beans and 2 cups of carrots. Which combination below uses the same ratio of beans to carrots?
(A) 10 cups of beans and 3 cups of carrots
(B) 10 cups of beans and 4 cups of carrots
(C) 12 cups of beans and 4 cups of carrots
(D) 12 cups of beans and 5 cups of carrots
Answer:
(B) 10 cups of beans and 4 cups of carrots

Explaination:
The combination given in option B is according to the ratio of the recipe. Both items are increased by the same constant 2, that is are doubted.

Go Math 6th Grade Answer Key Module 7 Review Quiz Question 8.
\(\frac{5}{8}\) of the 64 musicians in a music contest are guitarists. Some of the guitarists play jazz solos, and the rest play classical solos. The ratio of the number of guitarists playing jazz solos to the total number of guitarists in the contest is 1:4. How many guitarists play classical solos in the contest?
(A) 10
(B) 20
(C) 30
(D) 40
Answer:
Multiply the numerator and denominator by \(\frac{8}{8}\):
\(\frac{5}{8}=\frac{5}{8} \cdot \frac{8}{8}=\frac{40}{64}\)
There are 40 guitarists.
Multiply the numerator and denominator by \(\frac{10}{10}\):
\(\frac{1}{4}=\frac{1}{4} \cdot \frac{10}{10}=\frac{10}{40}\)
10 guitarists play classical solos.

Gridded Response

Grade 6 Module 7 Quiz Answers Question 9.
Mikaela is competing in a race in which she both runs and rides a bicycle. She runs 5 kilometers in 0.5 hours and rides her bicycle 20 kilometers in 0.8 hours. At this rate, how many kilometers can Mikaela ride her bicycle in one hour?

Answer:
She runs for 0.5 hour and bicycles for 0.8 hour.
That is 1.3 hours in total. Let us find the unit rate of bicycling time to total time:

Now, find the unit rate of kilometers to time:

To find the solution, multiply this unit rate by \(\frac{0.62}{0.62}\).
\(\frac{25}{1}=\frac{25}{1} \cdot \frac{0.62}{0.62}=\frac{15.5}{0.62}\)
15.5 kilometers.

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Lesson 7.2 Answer Key Rates.

Texas Go Math Grade 6 Lesson 7.2 Answer Key Rates

Reflect

Question 1.
Analyze Relationships Describe another method to compare the costs.
Answer:
The total cost can be divided by the total number of ounces. The result of this division will be the cost per ounce or cost of 1 ounce The greater this number, the more expensive the juice is.

Question 2.
Analyze Relationships In all of these problems, how is the unit rate related to the rate given in the original problem?
Answer:
Unit rate multiplied by the number of ounces equals to the given rate.

Your Turn

Go Math Grade 6 Lesson 7.2 Answer Key Question 3.
There are 156 players on 13 teams. How many players are on each team? ________ players per team
Answer:
In order to find how many players are in each team,
we have divide 156 by 13.

12 players in each term

Question 4.
A package of 36 photographs costs $18. What is the cost per photograph? $ _______ per photograph
Answer:
To find the unit rate, divide the numerator and denominator by 2:

The cost per photograph is $2.

Reflect

Question 5.
What If? Suppose each group has 12 campers and 3 canoes. Find the unit rate of campers to canoes.
Answer:
To find the unit rate, divide the numerator by 3:

= \(\frac{4}{1}\)

Question 6.
Petra jogs 3 miles in 27 minutes. At this rate, how long would it take her to jog 5 miles?
Answer:
To find the unit rate, divide the numerator and denominator by 3:

Multiply the numerator and denominator by 5 to find the solution:

It would take 45 minutes.

Go Math Grade 6 Chapter 7 Lesson 7.2 Answer Key Question 7.
When Jerry drives 100 miles on the highway, his car uses 4 gallons of gasoline. How much gasoline would his car use if he drove 275 miles on the highway?
Answer:
To find the unit rate, divide the numerator and denominator by 100:

Multiply the numerator and denominator by 5 to find the solution:

It would use 11 gallons of gasoline.

Texas Go Math Grade 6 Lesson 7.2 Guided Practice Answer Key

The sizes and prices of three brands of laundry detergent are shown in the table. Use the table for 1 and 2.

Question 1.
What is the unit price for each detergent?
Brand A: $ ________________ per ounce
Brand B: $ ________________ per ounce
Brand C: $ ________________ per ounce
Answer:
A: To find the unit rate, divide the numerator and denominator by 32:

$ 0.15 per ounce.

B: To find the unit rate, divide the numerator and denominator by 48:

$ 0.12 per ounce.

C: To find the unit rate, divide the numerator and denominator by 48:

$ 0.14 per ounce.

Question 2.
Which detergent is the best buy? ________________
Answer:
Brand B. (lowest price per ounce)

Mason’s favorite brand of peanut butter is available in two sizes. Each size and its price are shown in the table. Use the table for 3 and 4.

Lesson 7.2 Answer Key Go Math Grade 6 Question 3.
What is the unit rate for each size of peanut butter?
Regular: $ _________________ per ounce
Family size: $ _________________ per ounce
Answer:
Form the rate fraction by using the given data, therefore:
Rate = \(\frac{\text { Cost }}{\text { Quantity }}\)
Substitute values for Regular:
Rate = \(\frac{3.36}{16}\) = 0.21
This implies that the unit rate for regular size peanut butter is $0.21 per ounce.

Form the rate fraction by using the given data, therefore:
Rate = \(\frac{\text { Cost }}{\text { Quantity }}\)
Substitute values for Regular:
Rate = \(\frac{7.6}{40}\) = 0.19
This implies that the unit rate for regular size peanut butter is $0.19 per ounce.

Question 4.
Which size is the better buy?
Answer:
0.21 > 0.19 implies that the family size is a better buy because it costs lesser per ounce than the regular size one.

Find the unit rate. (Example 1)

Question 5.
Lisa walked 48 blocks in 3 hours. _____________ blocks per hour
Answer:
Find the unit rate. How many blocks Lisa passes in an hour

Divide to find the unit rate
\(\frac{48 \text { blocks }}{3 \text { hours }}=\frac{16 \text { blocks }}{1 \text { hours }}\)

Liza passes 16 blocks in an hour
Final solution = 16

Question 6.
Gordon types 1,800 words in 25 minutes. _____________ words per minute
Answer:
Find the unit rate. How many words he types per minute

Divide to find the unit rate
\(\frac{1800 \text { words }}{25 \text { minutes }}=\frac{72 \text { words }}{1 \text { minute }}\)

Gordon types 72 words per minute.
Final solution = 72

Solve.

Lesson 7.2 Go Math Answer Key Grade 6 Question 7.
A particular frozen yogurt has 75 calories in 2 ounces. How many calories are in 8 ounces of yogurt?
Answer:
Find the unit rate. How many calories are in one ounce

Divide to find the unit rate
\(\frac{75 \text { calories }}{2 \text { ounces }}=\frac{37.5 \text { calories }}{1 \text { ounce }}\)

Yogurt has 37.5 calories in 1 ounce
37.5 calories × 8 ounces = 300 calories

In yogurt there are 300 calories
Final Solution = 300

Question 8.
The cost of 10 oranges is $1.00. What is the cost of 5 dozen oranges?
Answer:
Form the rate fraction by using the given data. therefore:
Rate = \(\frac{\text { Calories }}{\text { Ounces }}\)
Substitute values:
Rate = \(\frac{1}{10}\) = 0.1
Unit rate is equal to $0.1 per orange.

5 dozens of oranges are 5 × 12 = 60. Therefore Go oranges will cost 60 × $0.1 = $6.
5 dozens of oranges will cost $6.

Question 9.
On Tuesday, Donovan earned $11 for 2 hours of babysitting. On Saturday, he babysat for the same family and earned $38.50. How many hours did he babysit on Saturday?
Answer:
To find the unit rate, divide the numerator and denominator by 2:

For every hour lie earns 5.5$. Multiply the numerator and denominator by 7 to find the solution:

He babysat 7 hours on Saturday.

Essential Question Check-In

Question 10.
How can you use a rate to compare the costs of two boxes of cereal that are different sizes?
Answer:
Divide the cost of the cereal box with the total amount of cereal in the box for both boxes. This will give the cost per amount. The larger this number, the more expensive the cereal box is with respect to its content.

Practice and Homework Lesson 7.2 Answer Key 6th Grade Question 11.
Abby can buy an 8-pound bag of dog food for $7.40 or a 4-pound bag of the same dog food for $5.38. Which is the better buy?
Answer:
Evaluate the unit rate of each bag. Therefore the 8 pounds bags costs \(\frac{\$ 7.40}{8}\) = $ 0.925 per pound, while the 4 pounds bags costs = \(\frac{\$ 5.38}{4}\) = $1 .345 per pound. Since 1.315 > 0.925. the 8 pounds bag is a better buy because it costs lesser per pound.

8 pound bag is a better buy.

Question 12.
A bakery offers a sale price of $3.50 for 4 muffins. What is the price per dozen?
Answer:
To find the unit rate, divide the numerator and denominator by 4:

The cost per muffin is = $ 0.875 .
Multiply the numerator and denominator by 12 to find the solution:

The cost per dozen is $ 10.50

Taryn and Alastair both mow lawns. Each charges a flat fee to mow a lawn. The table shows the number of lawns mowed in the past week, the time spent mowing lawns, and the money earned.

Question 13.
How much does Taryn charge to mow a lawn?
Answer:
Find the unit rate. How much does Taryn charge for lawn?

Divide to find the unit rate
\(\frac{112.5 \text { dollars }}{9 \text { lawns }}=\frac{12.5 \text { dollars }}{1 \text { lawn }}\)

Tarny charges 12.5 dollars for lawn
Final solution = 12.5

Question 14.
How much does Alastair charge to mow a lawn?
Answer:
Find the unit rate. How much does Alastair charge for the lawn?

Divide to find the unit rate
\(\frac{122.5 \text { dollars }}{7 \text { lawns }}=\frac{17.5 \text { dollars }}{1 \text { lawn }}\)

Alastair charges 17.5 dollars for lawn
final solution = 17.5

Question 15.
Who earns more per hour, Taryn or Alastair?
Answer:
Alastair earns more per hour. It can be seen that he has earned $ 122.5 > $ 112.5 after moving for 5 hours then Taryn earned after working for 7.5 hours.

Question 16.
What If? If Taryn and Alastair want to earn an additional $735 each, how many additional hours will each spend mowing lawns? Explain.
Answer:
Alastair earns 17.5 per hour. Multiply the denominator and numerator by 42 to find the solution: $:

Taryn earns $12.5 per hour. Multiply the denominator 58.8 to find the solution: $:

Alastair: 42 hours
Taryn: 58.8 hours

Question 17.
Multistep Tomas makes balloon sculptures at a circus. In 180 minutes, he uses 252 balloons to make 36 identical balloon sculptures.
a. How many minutes does it take to make 1 balloon sculpture?
Answer:
To find the unit rate, divide the numerator and denominator by 36:

It takes 5 minutes.

b. How many balloons are used in one balloon sculpture?
Answer:
To find the unit rate, divide the numerator and denominator by 36:

7 ballons.

c. What is Tomas’s unit rate for balloons used per minute?
Answer:
To find the unit rate, divide the numerator and denominator by 180:

Go Math Grade 6 Pdf Lesson 7.2 Answer Key Question 18.
Quan and Krystal earned the same number of points playing the same video game. Quan played for 45 minutes and Krystal played for 30 minutes. Whose rate of points earned per minute was higher? Explain.
Answer:
Krystal’s rate of points earned per minute is higher. Number of points divided by 30 minutes will give higher rate then divided by 45 minutes.

For example, let number of points equals to 90.
Krystal’s rate of points:
\(\frac{90}{30}=\frac{3}{1}\)
Quan’s rate of points:
\(\frac{90}{45}=\frac{2}{1}\)

Mrs. Jacobsen is a music teacher. She wants to order toy instruments online to give as prizes to her students. The table below shows the prices for various order sizes.

Question 19.
What is the highest unit price per kazoo?
Answer:
25 items:
To find the unit rate, divide the numerator and denominator by 25:

The cost per item is $ 0.4

50 items:
To find the unit rate, divide the numerator and denominator by 50:

The cost per item is $ 0.37

80 items:
To find the unit rate, divide the numerator and denominator by 80:

The cost per item is $ 0.34

The highest price is $ 0.4

Question 20.
Persevere in Problem Solving If Mrs. Jacobsen wants to buy the item with the lowest unit price, what item should she order and how many of that item should she order?
Answer:
She Should order 80 kazoos.

H.O.T. Focus On Higher Order Thinking

Question 21.
Draw Conclusions There are 2.54 centimeters in 1 inch. How many centimeters are there in 1 foot? in 1 yard? Explain your reasoning.
Answer:
There are 254 centimeters in 1 inch, and there are 12 inches in 1 foot, so there are 2.54 × 12 = 30.48 centimeters in 1 foot.

There are 30.48 centimeters in 1 foot and there are 3 feet in a yard, so there are 3 × 30.48 = 91.44 centimeters in 1 yard.

Grade 6 Go Math Answer Key Lesson 7.2 Question 22.
Critique Reasoning A 2 pound box of spaghetti costs $2.50. Philip says that the unit cost is \(\frac{2}{2.50}\) = $0.80 per pound. Explain his error.
Answer:
He has divided the total pounds with the total price giving pounds of spaghetti per dollar instead of unit cost. The correct rate is \(\frac{2.5}{2}\) = $ 1 .25 per pound.

He divided the total pounds with the total price.

Question 23.
Look for a Pattern A grocery store sells three different quantities of sugar. A 1-pound bag costs $1.10, a 2-pound bag costs $1.98, and a 3-pound bag costs $2.85. Describe how the unit cost changes as the quantity of sugar increases.
Answer:
Evaluate the unit price of each packing Therefore:
Cost of 1 pound in the 1 pound bag \(\frac{\$ 1.10}{1}\) = $ 1.10
Cost of 1 pound in the 2 pounds bag \(\frac{\$ 1.98}{2}\) = $ 0.99
Cost of 1 pound in the 3 pounds bag \(\frac{\$ 2.85}{3}\) = $ 0.95
It can be seen as the size of the packing increases, the unit cost decreases.

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Module 9 Answer Key Percents.

Texas Go Math Grade 6 Module 9 Answer Key Percents

Texas Go Math Grade 6 Module 9 Are You Ready? Answer Key

Write the equivalent fraction.

Question 1.

Answer:
Solution to this example is given below
\(\frac{9}{18}=\frac{9 \div 3}{18 \div 3}\) = (Divide the numerator and denominator by the same)
= \(\frac{3}{6}\) (number to find an equivalent fraction.)
Final solution = \(\frac{3}{6}\)

Question 2.

Answer:
Solution to this example is given below
\(\frac{4}{6}=\frac{4 \times 3}{6 \times 3}\) = (Multiply the numerator and denominator by the same)
= \(\frac{12}{18}\) (number to find an equivalent fraction.)
Final solution = \(\frac{12}{18}\)

Question 3.

Answer:
The solution to this example is given below
\(\frac{25}{30}=\frac{25 \div 5}{30 \div 5}\) = (Divide the numerator and denominator by the same)
= \(\frac{5}{6}\) (number to find an equivalent fraction.)
Final solution = \(\frac{5}{6}\)

Go Math Grade 6 Module 9 Answer Key Question 4.

Answer:
Solution to this example is given below
\(\frac{12}{15}=\frac{12 \times 3}{15 \times 3}\) = (Multiply the numerator and denominator by the same)
= \(\frac{36}{45}\) (number to find an equivalent fraction.)
Final solution = \(\frac{36}{45}\)

Question 5.

Answer:
Solution to this example is given below
\(\frac{15}{24}=\frac{15 \div 3}{24 \div 3}\) = (Divide the numerator and denominator by the same)
= \(\frac{5}{8}\) (number to find an equivalent fraction.)
Final solution = \(\frac{5}{8}\)

Question 6.

Answer:
Solution to this example is given below
\(\frac{24}{32}=\frac{24 \div 4}{32 \div 4}\) = (Divide the numerator and denominator by the same)
= \(\frac{6}{8}\) (number to find an equivalent fraction.)
Final solution = \(\frac{6}{8}\)

Question 7.

Answer:
Solution to this example is given below
\(\frac{50}{60}=\frac{50 \div 5}{60 \div 5}\) = (Divide the numerator and denominator by the same)
= \(\frac{10}{12}\) (number to find an equivalent fraction.)
Final solution = \(\frac{10}{12}\)

Question 8.

Answer:
Solution to this example is given below
\(\frac{5}{9}=\frac{5 \times 4}{9 \times 4}\) = (Divide the numerator and denominator by the same)
= \(\frac{20}{36}\) (number to find an equivalent fraction.)
Final solution = \(\frac{20}{36}\)

Multiply. Write each product in simplest form.

Question 9.
\(\frac{3}{8} \times \frac{4}{11}\) = _____________
Answer:
Write the problem as a single fraction
\(\frac{3 \times 4}{8 \times 11}\)
\(\frac{12}{88}\) (Multiply numerators, Multiply denominators.)
\(\frac{12 \div 4}{88 \div 4}\) (Simplify by dividing by the GCF.)
\(\frac{3}{22}\) (Write the answer in simplest form.)

Question 10.
\(\frac{8}{15} \times \frac{5}{6}\) = _____________
Answer:
Write the problem as a single fraction
\(\frac{8 \times 5}{15 \times 6}\)
\(\frac{40}{90}\) (Multiply numerators, Multiply denominators.)
\(\frac{40 \div 10}{90 \div 10}\) (Simplify by dividing by the GCF.)
\(\frac{4}{9}\) (Write the answer in simplest form.)

Question 11.
\(\frac{7}{12} \times \frac{3}{14}\) = _____________
Answer:
Write the problem as a single fraction
\(\frac{7 \times 3}{12 \times 14}\)
\(\frac{21}{168}\) (Multiply numerators, Multiply denominators.)
\(\frac{21 \div 21}{168 \div 21}\) (Simplify by dividing by the GCF.)
\(\frac{1}{8}\) (Write the answer in simplest form.)

Question 12.
\(\frac{9}{20} \times \frac{4}{5}\) = _____________
Answer:
Write the problem as a single fraction
\(\frac{9 \times 4}{20 \times 5}\)
\(\frac{36}{100}\) (Multiply numerators, Multiply denominators.)
\(\frac{36 \div 4}{100 \div 4}\) (Simplify by dividing by the GCF.)
\(\frac{9}{25}\) (Write the answer in simplest form.)

Module 9 Answer Key Go Math Grade 6 Question 13.
\(\frac{7}{10} \times \frac{20}{21}\) = _____________
Answer:
Given expression:
\(\frac{7}{10} \times \frac{20}{21}\)

Simplify, dividing out the common factor:
= \(\frac{1}{1} \times \frac{2}{3}\)
Evaluate:
= \(\frac{2}{3}\)
\(\frac{7}{10} \times \frac{20}{21}\) = \(\frac{2}{3}\)

Question 14.
\(\frac{8}{18} \times \frac{9}{20}\) = _____________
Answer:
Write the problem as a single fraction
\(\frac{8 \times 9}{18 \times 20}\)
\(\frac{72}{360}\) (Multiply numerators. Multiply denominators.)
\(\frac{72 \div 72}{360 \div 72}\) (Simplify by dividing by the GCF.)
\(\frac{1}{5}\) (Write the answer in simplest form.)

Multiply.

Question 15.
20 × 0.25 ___________
Answer:
Solution to this example is given below

Question 16.
0.3 × 16.99 ________
Answer:
Solution to this example is given below

Question 17.
0.2 × 75 __________
Answer:
Solution to this example is given below

Question 18.
5.5 × 1.1 __________
Answer:
Solution to this example is given below

Question 19.
11.99 × 0.8 ________
Answer:
Solution to this example is given below

Question 20.
7.25 × 0.5 _________
Answer:
Solution to this example is given below

Question 21.
4 × 0.75 ___________
Answer:
Solution to this example is given below

Question 22.
0.15 × 12.50 _________
Answer:
Solution to this example is given below

Question 23.
6.5 × 0.7 __________
Answer:
Solution to this example is given below

Texas Go Math Grade 6 Module 9 Reading Start-Up Answer Key

Visualize Vocabulary

Use the ✓ words to complete the graphic. You may put more than one word in each box.

Understand Vocabulary

Match the term on the left to the correct expression on the right.

Answer:

1.  – A
2.  – C
3.  – B

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Lesson 9.3 Answer Key Solving Percent Problems.

Texas Go Math Grade 6 Lesson 9.3 Answer Key Solving Percent Problems

Reflect

Question 1.
Justify Reasoning How did you determine the labels along the bottom of the bar model in Step D?
Answer:
Study the interval difference between 2 successive labels in the bottom label. Here it is 80 – 40 = 40 – 0 = 40.
This suggests that each unit represents 40 units so the next label after the 80 label is therefore 80 + 40 = 120 and so on.

Question 2.
Communicate Mathematical Ideas How can you use the bar model to find the number of left-handed gloves?
Answer:
Here 10% of gloves imply 40 gloves, so 30% would imply 40 × 3 = 120 gloves. This means that there are 120 left-handed gloves in the shipment.

Percent Problems 6th Grade Lesson 9.3 Answer Key Question 3.
Analyze Relationships In B, the percent is 35%. What is the part and what is the whole?
Answer:
The expression says: 35% of 60 so here 60 is the whole and 35% of 60 = \(\frac{35}{100}\) × 60 = 21 is the portion of it.

60 is whole and 21 is 35% of 60.

Question 4.
Communicate Mathematical Ideas Explain how to use proportional reasoning to find 35% of 600.
Answer:
Multiply by a fraction to find 35 % of 600

Write the percent as a fraction.
35% of 600 = \(\frac{35}{100}\) of 600

Multiply
\(\frac{35}{100}\) of 600 = \(\frac{35}{100}\) × 600
= \(\frac{21000}{100}\)
= 210

Final solution = 210
35% of 600 is 210

Your Turn

Find the percent of each number.

Question 5.
38% of 50 _____________
Answer:
Multiply by a fraction to find 38 % of 50

Write the percent as a fraction.
38% of 50 = \(\frac{38}{100}\) of 50

Multiply
\(\frac{38}{100}\) of 50 = \(\frac{38}{100}\) × 50
= \(\frac{1900}{100}\)
= 19

Final solution = 19
38% of 50 is 19

Go Math Grade 6 Practice and Homework Lesson 9.3 Answer Key Question 6.
27% of 300 ____________
Answer:
Multiply by a fraction to find 27 % of 300

Write the percent as a fraction.
27% of 300 = \(\frac{27}{100}\) of 300

Multiply
\(\frac{27}{100}\) of 300 = \(\frac{27}{100}\) × 300
= \(\frac{8100}{100}\)
= 81

Final solution = 81
27% of 300 is 81

Question 7.
60% of 75 ____________
Answer:
Multiply by a fraction to find 60 % of 72

Write the percent as a fraction.
60% of 75 = \(\frac{60}{100}\) of 75

Multiply
\(\frac{60}{100}\) of 75 = \(\frac{60}{100}\) × 75
= \(\frac{4500}{100}\)
= 45

Final solution = 45
60% of 75 is 45

Reflect

Question 8.
Communicate Mathematical Ideas Write 57% as a ratio. Which number in the ratio represents the part and which number represents the whole? Explain.
Answer:
57% when written as an equivalent fraction is \(\frac{57}{100}\) or 57 : 100 as a rati0. Here 100 is the whole and 57 is the portion.

Your Turn

Question 9.
Out of the 25 students in Mrs. Green’s class, 19 have a pet. What percent of the students in Mrs. Green’s class have a pet? ______________
Answer:
There are a total of 25 students in the class out of which 19 have pets, so the fraction of students who have pets is \(\frac{19}{25}\).
Multiply this fraction with 100% to convert to an equivalent percentage, therefore: \(\frac{19}{25}\) × 100% = 76%.

76% of the students in Mrs. Green’s class have a pet.

Reflect

Go Math 9.3 Answer Key Lesson 9.3 Homework Answers Question 10.
Multiple Representations Sixteen students in the school band play clarinet. Clarinet players make up 20% of the band. Use a bar model to find the number of students in the school band.

Answer:

20% of the number of students is 16.
Divide this number by 2 to find the 10%
10% is equal to 8.

Your Turn

Question 11.
6 is 30% of __________.
Answer:
let the total number here be x, then the equation of its portion is therefore:
30% of x = 6

Convert the given expression to an algebraic expression by replacing the percentage sign with × \(\frac{1}{100}\) and the word of with ×, so the expression becomes:
30 × \(\frac{1}{100}\) × x = 6
Solve for x:
x = \(\frac{6}{0.3}\)
Evaluate:
x = 20

6 is 30% of 20

Question 12.
15% of ___________ is 75.
Answer:
let the total number here be x, then the equation of its portion is therefore:
15% of x = 75

Convert the given expression to an algebraic expression by replacing the percentage sign with × \(\frac{1}{100}\) and the word of with ×, so the expression becomes:
15 × \(\frac{1}{100}\) × x = 75
Solve for x:
x = \(\frac{75}{0.15}\)
Evaluate:
x = 500

75 is 15% of 500.

Texas Go Math Grade 6 lesson 9.3 Guided Practice Answer Key

Question 1.
A store has 300 televisions on order, and 80% are high definition.

a. Use the bar model and complete the bottom of the bar.

Answer:

b. Complete the diagram to model this situation.

Answer:

C. How many televisions on the order are high definition?
Answer:
We can see that 80% of 300 is equal to 240

Lesson 9.3 Answer Key 6th Grade Go Math Question 2.
Use proportional reasoning to find 65% of 200.

Answer:
Multiply by a fraction to find 65 % of 200

Write the percent as a fraction
65% of 200 = \(\frac{65}{100}\) of 200

Multiply
\(\frac{65}{100}\) of 200 = \(\frac{65}{100}\) × 200
= \(\frac{13000}{100}\)
= 130

Final solution = 130
65% of 200 is 130

Question 3.
Use multiplication to find 5% of 180

5% of 180 is ___________ .
Answer:
Multiply by a fraction to find 5 % of 180

Write the percent as a fraction
5% of 180 = \(\frac{5}{100}\) of 180

Multiply
\(\frac{5}{100}\) of 180 = \(\frac{5}{100}\) × 180
= \(\frac{900}{100}\)
= 9

Final solution = 9
5% of 180 is 9

Question 4.
Ala na spent $21 of her $300 paycheck on a gift. What percent of her paycheck was spent on the gift? (Example 2)

Alana spent _____ of her paycheck on the gift.
Answer:
\(\frac{\text { gift }}{\text { paycheck }}=\frac{21}{300}=\frac{x}{100}\)
100 is a common denominator:
\(\frac{21}{300} \div \frac{3}{3}=\frac{x}{100}\)
\(\frac{7}{100}=\frac{x}{100}\)
⇒ x = 7 ⇒ 7%

Question 5.
At Pizza Pi, 9% of the pizzas made last week had extra cheese. If 27 pizzas had extra cheese, how many pizzas in all were made last week? ExampIe 3)

There were ______ pizzas made last week.
Answer:
\(\frac{\text { extra cheese }}{\text { pizza }}=\frac{9}{100}=\frac{27}{x}\)
127 is a common numerator:
\(\frac{9}{100} \cdot \frac{3}{3}=\frac{27}{x}\)
\(\frac{27}{300}=\frac{27}{x}\)
⇒ x = 300

Essential Question Check-In

Question 6.
How can you use proportional reasoning to solve problems involving percent?
Answer:
Proportional reasoning to solve problems involving percent by converting the given percentage to an equivalent fraction and equating it with the given fraction of \(\frac{\text { Portion }}{\text { Whole }}\)

Find the percent of each number.

Question 7.
64% of 75 tiles
Answer:
Multiply by a fraction to find 64 % of 75

Write the percent as a fraction
64% of 75 = \(\frac{64}{100}\) of 75

Multiply
\(\frac{64}{100}\) of 75 = \(\frac{64}{100}\) × 75
= \(\frac{4800}{100}\)
= 48

Final solution = 48
64% of 75 is 48 tiles

Go Math Grade 6 Lesson 9.3 Answer Key Question 8.
20% of 70 plants
Answer:
Multiply by a fraction to find 20 % of 70 plants

Write the percent as a fraction
20% of 70 = \(\frac{20}{100}\) of 70

Multiply
\(\frac{20}{100}\) of 70 = \(\frac{20}{100}\) × 70
= \(\frac{1400}{100}\)
= 14

Final solution = 14
20% of 70 is 14 plants

Question 9.
32% of 25 pages
Answer:
Multiply by a fraction to find 32 % of 25 pages

Write the percent as a fraction
32% of 25 = \(\frac{32}{100}\) of 25

Multiply
\(\frac{32}{100}\) of 25 = \(\frac{32}{100}\) × 75
= \(\frac{800}{100}\)
= 8

Final solution = 8
32% of 25 is 8 pages.

Question 10.
85% of 40 e-mails
Answer:
Multiply by a fraction to find 85% of 40 e-mails

Write the percent as a fraction
85% of 40 = \(\frac{85}{100}\) of 40

Multiply
\(\frac{85}{100}\) of 40 = \(\frac{85}{100}\) × 40
= \(\frac{3400}{100}\)
= 34

Final solution = 34
85% of 40 is 34 e-mails

Question 11.
72% of 350 friends
Answer:
Multiply by a fraction to find 72% of 350 friends

Write the percent as a fraction
72% of 350 = \(\frac{72}{100}\) of 350

Multiply
\(\frac{72}{100}\) of 350 = \(\frac{72}{100}\) × 350
= \(\frac{25200}{100}\)
= 252

Final solution = 252
72% of 350 is 252 friends

Question 12.
5% of 220 files
Answer:
Multiply by a fraction to find 5% of 220 friends

Write the percent as a fraction
5% of 220 = \(\frac{5}{100}\) of 220

Multiply
\(\frac{5}{100}\) of 220 = \(\frac{5}{100}\) × 220
= \(\frac{1100}{11}\)
= 11

Final solution = 11
5% of 350 is 220 is 11 files.

Complete each sentence.

Practice and Homework Lesson 9.3 Answer Key 4th Grade Question 13.
4 students is ______ % of 20 students.
Answer:
Multiply by a fraction to find 4 students is ? of 20 students

Multiply
Percent = \(\frac{4}{20}\) × 100%
= \(\frac{400}{20}\)
= 20%

Final Solution = 20%
4 students is 20% of 20 students

Question 14.
2 doctors is ______ % of 25 doctors.
Answer:
Multiply by a fraction to find 2 doctors is ? of 25 doctors

Multiply
Percent = \(\frac{2}{25}\) × 100%
= \(\frac{200}{25}\)
= 8%

Final Solution = 8%
2 doctors is 8% of 25 doctors.

Question 15.
_______ % of 50 shirts is 35 shirts.
Answer:
Multiply by a fraction to find ? % of 50 shirts is 35 shirts

Multiply
Percent = \(\frac{35}{50}\) × 100%
= \(\frac{3500}{50}\)
= 70%

Final Solution = 70%
70% of 50 shirts is 35 shirts

Question 16.
______ % of 200 miles is 150 miles.
Answer:
Multiply by a fraction to find ? % of 200 miles is 150 miles

Multiply
Percent = \(\frac{150}{200}\) × 100%
= \(\frac{15000}{200}\)
= 75%

Final Solution = 75%
75% of 200 miles is 150 miles

Question 17.
4% of ______ days is 56 days.
Answer:
Multiply by a fraction to find 4 % of ? days is 56 days

Multiply
Percent = \(\frac{56}{4}\) × 100%
= \(\frac{56000}{4}\)
= 1400

Final Solution = 1400
4% of 1400 days is 56 days.

Question 18.
60 minutes is 20% of ______ minutes.
Answer:
Multiply by a fraction to find 60 minutes is 20% of ? minutes.

Multiply
Percent = \(\frac{60}{20}\) × 100%
= \(\frac{6000}{20}\)
= 300

Final Solution = 300
60 minutes is 20% of 300 minutes.

Go Math 6th Grade Practice and Homework Lesson 9.3 Question 19.
80% of ______ games is 32 games.
Answer:
Multiply by a fraction to find 80% of ? games is 32 games

Multiply
Percent = \(\frac{32}{80}\) × 100%
= \(\frac{3200}{80}\)
= 40

Final Solution = 40
80% of 40 games is 32 games

Question 20.
360 kilometers is 24% of ______ kilometers.
Answer:
Multiply by a fraction to find 360 kilometers is 24% of ? kilometers.

Multiply
Percent = \(\frac{360}{24}\) × 100%
= \(\frac{36000}{24}\)
= 1500

Final Solution = 1500
360 kilometers is 24% of 1500 kilometers

Question 21.
75% of ______ peaches is 15 peaches.
Answer:
Multiply by a fraction to find 75% of ? peaches is 15 peaches.

Multiply
Percent = \(\frac{15}{75}\) × 100%
= \(\frac{1500}{75}\)
= 20

Final Solution = 2
75% of 20 peaches is 15 peaches

Question 22.
9 stores is 3% of ______ stores.
Answer:
Multiply by a fraction to find 9 stores is 3 % of ? stores

Multiply
Percent = \(\frac{9}{3}\) × 100%
= \(\frac{900}{3}\)
= 300

Final Solution = 300
9 stores is 3% of 300 stores

Question 23.
At a shelter, 15% of the dogs are puppies.
There are 60 dogs at the shelter.

How many are puppies? _______ puppies
Answer:
Multiply by a fraction to find 15 % of 60
Write the percent as a fraction.
15% of 60 = \(\frac{15}{100}\) of 60

Multiply
\(\frac{15}{100}\) of 60 = \(\frac{15}{100}\) × 60
= \(\frac{900}{100}\)
= 9

Final solution = 9
15% of 60 is 9 puppies

Question 24.
Carl has 200 songs on his MP3 player. Of these songs, 24 are country songs. What percent of Carl’s songs are country songs? ______
Answer:
Multiply by a fraction to find ? % of 200 songs is 24 country songs

Multiply
Percent = \(\frac{24}{100}\) × 100%
= \(\frac{2400}{200}\)
= 12%

Final Solution = 12%
12% of 200 songs is 24 country songs

Question 25.
Consumer Math The sales tax in the town where Amanda lives is 7%. Amanda paid $35 in sales tax on a new stereo. What was the price of the stereo? ______
Answer:
Multiply by a fraction to find 7 % is 35 of × dollars

Write the percent as a fraction.
7% = \(\frac{35}{x}\) × 100

Multiply
x = \(\frac{35}{7}\) × 100%
= \(\frac{3500}{100}\)
= 500

Final Solution = 500
7 % is 35 dollars of 500 dollars

The price of the stereo was 500 dollars

Question 26.
Financial literacy Ashton is saving money to buy a new bike. He needs $120 but has only saved 60% so far. How much more money does Ashton need to buy the scooter?
Answer:
Portion = x
Total = 120
Percent = 60

Write equation of percentage:

Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
60% = \(\frac{x}{120}\) × 100%

Solve for x:
x = \(\frac{120 \times 60 \%}{100 \%}\)

Evaluate:
x = 72
He has saved $72 so he needs 120 – 72 = $ 48 more.

Ashton needs $48 more to buy the scooter.

Question 27.
Consumer Math Monica paid sales tax of $1.50 when she bought a new bike helmet. If the sales tax rate was 5%, how much did the store charge for the helmet before tax? ______
Answer:
Portion = 1.5
Total = x
Percent = 5

Write equation of percentage:

Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
5% = \(\frac{1.5}{x}\) × 100%

Solve for x:
x = \(\frac{1.5 \times 100 \%}{5 \%}\)

Evaluate:
x = 30
The store charged $30 for the helmet before tax.
Ashton needs $48 more to buy the scooter.

Question 28.
Use the circle graph to determine how many hours per day Becky spends on each activity.

School: ______ hours
Eating: ______ hours
Sleep: ______ hours
Homework: ______ hours
Free time: ______ hours
Answer:
There are a total of 24 hours in day, so evaluate the time in hours spent ¡n each activity by converting the given percentage to an equivalent fraction by removing the percentage sign and dividing it by 100 and multiplying it with 24, therefore:

Time spent in eating = \(\frac{10}{100}\) × 24 = 2.4
Time spent in free time = \(\frac{15}{100}\) × 24 = 3.6
Time spent in homework = \(\frac{10}{100}\) × 24 = 2.4
Time spent in school = \(\frac{25}{100}\) × 24 = 6
time spent in sleeping = \( \frac{40}{100}\) × 24 = 9.6

H.O.T. Focus On Higher Order Thinking

Question 29.
Multistep Marc ordered a rug. He gave a deposit of 30% of the cost and will pay the rest when the rug is delivered. If the deposit was $75, how much more does Marc owe? Explain how you found your answer.
Answer:
Portion = 75
Total = x
Percent = 30

Write equation of percentage:

Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
30% = \(\frac{75}{x}\) × 100%

Solve for x:
x = \(\frac{75 \times 100 \%}{30 \%}\)

Evaluate:
x = 250
The total cost of the rug was $250. Since, $75 is paid, only 250 – 75 = $ 175 remains to be paid.
$175 remains to be paid.

Question 30.
Earth Science Your weight on different planets is affected by gravity. An object that weighs 150 pounds on Earth weighs only 56.55 pounds on Mars. The same object weighs only 24.9 pounds on the Moon.

a. What percent of an object’s Earth weight is its weight on Mars and on the Moon?
Answer:
\(\frac{\text { Mars }}{\text { Earth }}=\frac{56.55}{150}=\frac{x}{100}\)
100 is a common denominator:
\(\frac{56.55}{150} \div \frac{1.5}{1.5}=\frac{x}{100}\)
\(\frac{37.7}{100}=\frac{x}{100}\)
⇒ x = 37.7 ⇒ 37.7%
\(\frac{\text { Moon }}{\text { Earth }}=\frac{24.9}{150}=\frac{x}{100}\)
100 is a common denominator:
\(\frac{24.9}{150} \div \frac{1.5}{1.5}=\frac{x}{100}\)
\(\frac{16.6}{100}=\frac{x}{100}\)
⇒ x = 16.6 ⇒ 16.6%

b. Suppose x represents an object’s weight on Earth. Write two expressions: one that you can use to find the object’s weight on Mars and another that you can use to write the object’s weight on the Moon.
Answer:

c. The space suit Neil Armstrong wore when he stepped on the Moon for the first time weighed about 180 pounds on Earth. How much did it weigh on the Moon?
Answer:
Moon = \(\frac{37.7}{100}\) ∙ Earth
Moon = \(\frac{37.7}{100}\) ∙ 180 = 67.86
67.86 pounds.

d. What If? If you could travel to Jupiter, your weight would be 236.4% of your Earth weight. How much would Neil Armstrong’s space suit weigh on Jupiter?
Answer:
Jupiter = \(\frac{236.4}{100}\) ∙ Earth = \(\frac{236.4}{100}\) ∙ 180 = 425.52
425.52 pounds

Question 31.
Explain the Error Fifteen students in the band play clarinet. These 15 students make up 12% of the band. Your friend used the proportion \(\frac{12}{100}=\frac{?}{15}\) to find the number of students in the band. Explain why your friend is incorrect and use the grid to find the correct answer.

Answer:
Friends used the wrong proportion The correct proportion would be:
\(\frac{12}{100}=\frac{15}{?}\)
because 15 students make up 12% of the whole group.

12% represents 15 students.
100 squares represents 100%.
12 squares represents 12%.
Since \(\frac{15}{12}\) = \(\frac{5}{4}\) ⇒ 1 square represents \(\frac{5}{4}\) student.
100 ∙ \(\frac{5}{4}\) = 125
so 100 squares represent 125 students.

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Lesson 8.1 Answer Key Comparing Additive and Multiplicative Relationships.

Texas Go Math Grade 6 Lesson 8.1 Answer Key Comparing Additive and Multiplicative Relationships

Texas Go Math Grade 6 Lesson 8.1 Explore Activity Answer Key

Discovering Additive and Multiplicative Relationships

(A) Every state has two U.S. senators. The number of electoral votes a state has is equal to the total number of U.S. senators and U.S. representatives.

The number of electoral votes is _________________ the number of representatives.

Complete the table.

Describe the rule: The number of electoral votes is equal to the number of representatives [Plus/times] _______________ .
Answer:

(B) Frannie orders three DVDs per month from her DVD club. Complete the table.

Complete the table.

Describe the rule: The number of electoral votes is equal to the number of representatives [Plus/times] _______________ .
Answer:

Reflect

Question 1.
Look for a Pattern What operation did you use to complete the tables in (A) and (B)?
Answer:
Adding and multiplying

Your Turn

Additive Relationship Lesson 8.1 Answer Key 6th Grade Question 2.
Ky is seven years older than his sister Lu. Graph the relationship between Ky’s age and Lu’s age. Is the relationship additive or multiplicative? Explain.


Answer:

Lu’s age	Ky’s age
1	8
2	9
3	10
4	11
5	12

The relationship is additive because
Ky’s age = Lu’s age + 7

Texas Go Math Grade 6 Lesson 8.1 Guided Practice Answer Key

Question 1.
Fred’s family already has two dogs. They adopt more dogs. Complete the table for the total number of dogs they will have. Then describe the rule. (Explore Activity)

Answer:

Dogs adopted	Total number of dogs
1	3
2	4
3	5
4	6

Total number of dogs = Number of dogs they already have + Adopted dogs

Question 2.
Graph the relationship between the number of dogs adopted and the total number of dogs. (Example 1)

Answer:

List the ordered pairs from the table:
(1, 3), (2, 4), (3. 5). (4, 6)
and graph them on a coordinate plane.

Lesson 8.1 Answer Key 6th Grade Additive Relationship Graph Question 3.
Frank’s karate class meets three days every week. Complete the table for the total number of days the class meets. Then describe the rule.

Answer:

Weeks	Days of class
1	3
2	6
3	9
4	12

Days of class = Weeks ∙ Three days

Question 4.
Graph the relationship between the number of weeks and the number of days of class.

Answer:

List the ordered pairs from the table:
(1, 3), (2, 6), (3, 9), (4, 12)
and graph them on a coordinate plane.

Go Math Grade 6 Lesson 8.1 Answer Key Question 5.
An internet cafe charges ten cents for each page printed. Graph the relationship between the number of pages printed and the printing charge. Is the relationship additive or multiplicative? Explain.

Answer:

Pages Printed	Cost
1	10
2	20
3	30
4	40
5	50

Cost = Pages printed ∙ 10 cents
The relationship is multiplicative.

List the ordered pairs from the table:
(1, 10), (2, 20), (3, 30), (4, 40), (5, 50)
and graph them on a coordinate plane.

The relationship is multiplicative.

Essential Question Check-In

Question 6.
How do you represent, describe, and compare additive and multiplicative relationships?
Answer:
We use tables and ordered pairs to represent and describe additive and multiplicative relationships. You can compare these relationships by graphing them on a coordinate plane.

An additive relationship involves a constant that is added to another number.
A multiplicative relationship involves a constant that is multiplied by another number.

The tables give the price of a kayak rental from two different companies.

Question 7.
Is the relationship shown in each table multiplicative or additive? Explain.
Answer:
First table:
Cost = Hours ∙ 9
The relationship is multiplicative.

Second table
Cost = Hours + 40
The relationship is additive.

Go Math Lesson 8.1 6th Grade Multiplicative Relationships Question 8.
Yvonne wants to rent a kayak for 7 hours. How much would this cost to each company? Which one should she choose?
Answer:
First company:
Cost = Hours ∙ 9
She wants to rent it for 7 hours, so:
Cost = 7 ∙ 9 = 64

Second Company:
Cost = Hours + 40
She wants to rent it for 7 hours, so:
Cost = 7 + 40 = 47
She should choose the second company.

Question 9.
After how many hours is the cost for both kayak rental companies the same? Explain how you found your answer.
Answer:
Let y represent the cast and z represents the hours.
First company:
y₁ = 9x
Second company:
y₂ = x + 40
If the casts are the same,
y₁ = y₂
Substitute y₁ with 9x and y₂ with x + 40:
y₁ = y₂
9x = x + 40
9x – x = 40
8x = 40
x = 5

Check the answer After 5 hours, in the first company the cost is:
y = 9 ∙ 5 = 45
and in the second company:
y = 5 + 40 = 45.
After 5 hours.

The graph represents the distance traveled by a car and the number of hours it takes.

Lesson 8.1 Answer Key Additive and Multiplicative Relationships Worksheets Pdf Question 10.
Persevere in Problem Solving Based on the graph, was the car traveling at a constant speed? At what speed was the car traveling?
Answer:
The ordered pairs on the graph are:
(1, 60), (2, 120), (3, 180), (4, 240)
Distance = Time ∙ 60
The car was traveling at a constant speed.
Speed = \(\frac{\text { Distance }}{\text { Time }}\) = 60 mi per hour

Constant speed; 60 mi per hour

Question 11.
Make a Prediction If the pattern shown in the graph continues, how far will the car have traveled after 6 hours? Explain how you found your answer.
Answer:
Distance = Time ∙ 60
After 6 hours, distance is equal to
Distance = 6 ∙ 60 = 360
= 360 mi

Question 12.
What If? If the car had been traveling at 40 miles per hour, how would the graph be different?
Answer:
Distance = Time ∙ 40

Time	Distance
1	40
2	80
3	120
4	160
5	200

List the ordered pairs from the table:
(1, 40), (2, 80), (3, 120), (4, 160), (5, 200)
and graph them on a coordinate plane.

Use the graph for Exercises 13 – 15.

Go Math Grade 6 Lesson 8.1 Answer Key Multiplicative Relationship Graph Question 13.
Which set of points represents an additive relationship? Which set of points represents a multiplicative relationship?
Answer:
Ordered pairs on the graph:
(1, 6), (2, 12), (3, 18), (4, 24)
y = 6x
This set of points represents a multiplicative relationship.

(1, 9), (2, 10), (3, 11), (4. 12)
y = x + 8
This set of points represents an additive relationship.

Question 14.
Represent Real-World Problems What is a real-life relationship that might be described by the red points?
Answer:
Ana is 8 years older than Ben
How old is he if she is 11 years old?

Question 15.
Represent Real-World Problems What is a real-life relationship that might be described by the black points?
Answer:
In Gunther’s class there are 6 times more girls than boys.
If there are 24 girls, how many boys there are?

H.O.T. Focus On Higher Order Thinking

Question 16.
Explain the Error An elevator Tin leaves the ground floor and rises three feet per second. Lili makes the table shown to analyze the relationship. What error did she make?

Answer:
Distance = Time ∙ 3

Time	Distance
1	3
2	6
3	9
4	12

This is a multiplicative relationship, not an additive. If an elevator rises three feet per second, that means, in 2 seconds it will rise 3 + 3 = 2 ∙ 3 = 6 seconds, instead of 5

Question 17.
Analyze Relationships Complete each table. Show an additive relationship in the first table and a multiplicative relationship in the second table.

Use two columns of each table. Which table shows equivalent ratios?
Name two ratios shown in the table that are equivalent.
Answer:
First table.
B = A + 2

A	B
1	3
2	4
3	5

First table.
B = A ∙ 16

A	B
1	16
2	32
3	48

The second table shows equivalent ratios because
\(\frac{1}{16} \cdot \frac{2}{2}=\frac{2}{32}\)
\(\frac{1}{16} \cdot \frac{3}{3}=\frac{3}{48}\)

Lesson 8.1 Answer Key 6th Grade Additive or Multiplicative Question 18.
Represent Real-World Problems Describe a real-world situation that represents an additive relationship and one that represents a multiplicative relationship.
Answer:
Additive relationship:
Cart is 2 years older than his sister Julie. If she is 9 years old, how old is he?
Carl’s age = Julie’s age + 2

Multiplicative relationship:
One apple pie costs $3. Find the price of 4 pies.
Price = Pies ∙ 3

Additive relationship:
Carl is 2 years older than his sister Julie. If she is 9 years old, how old is he?
Multiplicative relationship:
One apple pie costs $3. Find the price of 4 pies.

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Unit 3 Study Guide Review Answer Key.

Texas Go Math Grade 6 Unit 3 Study Guide Review Answer Key

Module 7 Representing Ratios and Rates

Write three equivalent ratios for each ratio.

Question 1.
\(\frac{18}{6}\)
Answer:
Solution to this example is given below

Texas Go Math Grade 6 Unit 3 Study Guide Answer Key Question 2.
\(\frac{5}{45}\)
Answer:
Solution to this example is given below

Question 3.
\(\frac{3}{5}\)
Answer:
Given ratio: \(\frac{3}{5}\)

Evaluate an equivalent ratio of the given ratio by multiplying both the numerator and the denominator of the given ratio with the same number, therefore:
\(\frac{3}{5}=\frac{3 \times 2}{5 \times 2}=\frac{6}{10}\)

And:
\(\frac{3}{5}=\frac{3 \times 3}{5 \times 3}=\frac{9}{15}\)

And:
\(\frac{3}{5}=\frac{3 \times 4}{5 \times 4}=\frac{12}{20}\)

\(\frac{3}{5}=\frac{6}{10}=\frac{9}{15}=\frac{12}{20}\)

Question 4.
To make a dark orange color, Ron mixes 3 ounces of red paint with 2 ounces of yellow paint. Write the ratio of red paint to yellow paint three ways. (lesson 7.1)
Answer:
The ratio of red paint to yellow paint is 3 : 2 = \(\frac{3}{2}\)
Expand that fraction (multiply its numerator and denominator with the same number) to get fractions equivalent to it, i.e. to get ratios equivalent to 3 : 2

So, the corresponding equivalent ratios of red paint to yellow paint are:
6 : 4, 9 : 6, and 15: 10

Go Math Grade 6 Unit 3 Study Guide Answer Key Question 5.
A box of a dozen fruit tarts costs $15.00. What is the cost of one fruit tart? (lesson 7.2)
Answer:
1 dozen contains 12 units. Here this implies that 12 fruit tarts cost $ 15 so the cost of 1 fruit tart is equal to \(\frac{15}{12}\) = $ 1.25

The cost of 1 fruit tart is $ 1.25

Compare the ratios.

Question 6.
\(\frac{2}{5}\) ____________ \(\frac{3}{4}\)
Answer:
It can be seen that the denominators of the given fractions are not equal so they can not be directly compared.
Therefore, evaluate the decimal equivalent of the given fractions to compare them, therefore:
\(\frac{2}{5}\) = 0.4
And:
\(\frac{3}{4}\) = 0.75
Here 0.4 < 0.75 so \(\frac{2}{5}\) < \(\frac{3}{4}\)

Question 7.
\(\frac{9}{2}\) ____________ \(\frac{10}{7}\)
Answer:
Expand the given fractions so they have common denominators (the best candidate is always the lCM of those denominators):

Now we easily see that
\(\frac{9}{2}=\frac{63}{14}\) > \(\frac{20}{14}=\frac{10}{7}\)

Question 8.
\(\frac{2}{11}\) ____________ \(\frac{3}{12}\)
Answer:
It can be seen that the denominators of the given fractions are not equal so they can not be directly compared.
Therefore, evaluate the decimal equivalent of the given fractions to compare them, therefore:
\(\frac{2}{11}\) = \(0 . \overline{1} \overline{8}\)
And:
\(\frac{3}{12}\) = 0.25
Here \(0 . \overline{1} \overline{8}\) < 0.25 so \(\frac{2}{11}\) < \(\frac{3}{12}\)

Unit 3 Study Guide Go Math 6th Grade Answer Key Question 9.
\(\frac{6}{7}\) ____________ \(\frac{8}{9}\)
Answer:
Expand the given fractions so they have common denominators (the best candidate is always the lCM of those denominators):

Now we easily see that
\(\frac{6}{7}=\frac{54}{63}\) < \(\frac{56}{63}=\frac{8}{9}\)
\(\frac{6}{7}\) < \(\frac{8}{9}\)

Module 8 Applying Ratios and Rates

Question 1.
Thaddeus already has $5 saved. He wants to save more to buy a book. Complete the table, and graph the ordered pairs on the coordinate graph. (lesson 8.1, 8.2)


Answer:

New savings	Total savings
4	9
6	11
8	13
10	15

Total savings = New Savings + 5

list the ordered pairs from the table:
(4, 9), (6, 11), (8, 13), (10, 15)
and graph them on a coordinate plane.

Question 2.
There are 2 hydrogen atoms and 1 oxygen atom in a water molecule. Complete the table, and list the equivalent ratios shown on the table. (lesson 8.1, 8.2)

Answer:

New savings	Total savings
8	4
12	6
16	8
20	10

Hydrogen atoms = Oxygen atoms ∙ 2

Equivalent ratios:
\(\frac{8}{4}=\frac{12}{6}=\frac{16}{8}=\frac{20}{10}\)

Grade 6 Unit 3 Answer Key Go Math Question 3.
Sam can solve 30 multiplication problems in 2 minutes. How many can he solve in 20 minutes? (Lesson 8.3)
Answer:
To find the unit rate, divide the numerator and denominator by 2:

He can solve 15 problems in 1 minute.
Therefore, in 20 minutes he can solve
20 ∙ 15 = 300 problems

Question 4.
A male Chihuahua weighs 5 pounds. How many ounces does he weigh?
Answer:
1 pound = 16 ounces
⇒ 5 ∙ 16 = 80 ounces

Module 9 Percents

Write each fraction as a decimal and a percent. (lessons 9.1, 9.2)

Question 1.
\(\frac{3}{4}\)
Answer:
Write an equivalent fraction with a denominator of 100
\(\frac{3}{4}=\frac{3 \times 25}{4 \times 25}=\frac{75}{100}\) (Multiply both the numerator and denominator by 25)

Write the decimal equivalent
\(\frac{75}{100}\) = 0.75

Write the percent equivalent.
\(\frac{75}{100}\) = 0.75 = 75% (Move the decimal point 2 places to the right)

Final Solution ⇒ \(\frac{3}{4}\) = 0.75 = 75%

Question 2.
\(\frac{7}{20}\)
Answer:
Write an equivalent fraction with a denominator of 100
\(\frac{7}{20}=\frac{7 \times 5}{20 \times 5}=\frac{35}{100}\) (Multiply both the numerator and denominator by 25)

Write the decimal equivalent
\(\frac{35}{100}\) = 0.35

Write the percent equivalent.
\(\frac{35}{100}\) = 0.35 = 35% (Move the decimal point 2 places to the right)

Final solution ⇒ \(\frac{7}{20}\) = 0.35 = 35%

6th Grade Unit 3 Study Guide Answer Key Question 3.
\(\frac{8}{5}\)
Answer:
Write an equivalent fraction with a denominator of 100
\(\frac{8}{5}=\frac{8 \times 20}{5 \times 20}=\frac{160}{100}\) (Multiply both the numerator and denominator by 25)

Write the decimal equivalent
\(\frac{160}{100}\) = 1.60

Write the percent equivalent.
\(\frac{160}{100}\) = 1.60 = 160% (Move the decimal point 2 places to the right)

Final solution ⇒ \(\frac{8}{5}\) = 1.6 = 160%

Complete each statement. (lessons 9.1, 9.2)

Question 4.
25% of 200 is ______________ .
Answer:
Explanation A:

Multiply by a fraction to find 25 % of 200
Write the percent as a fraction.

Multiply
\(\frac{25}{100}\) of 200 = \(\frac{25}{100}\) × 200
= \(\frac{5000}{100}\)
= 50

Final Solution = 50
25% of 200 is 50

Explanation B

Data:
Portion = x
Total = 200
Percent = 25

Write equation of percentage:
Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
25% = \(\frac{x}{200}\) × 100%

Solve for x:
x = \(\frac{200 \times 25 \%}{100 \%}\)

Evaluate:
x = 50
25% of 200 is 50

Question 5.
16 is ___________ of 20.
Answer:
Data:
Portion = 16
Total = 20
Percent = x

Write equation of percentage:
Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
x = \(\frac{16}{20}\) × 100%

Evaluate:
x = 80%

Explanation B:

Multiply by a fraction to find 16 is x of 20
Write the percent as a fraction.

Multiply
\(\frac{16}{20}\) of 100 = \(\frac{16}{20}\) × 100%
= \(\frac{1600}{20}\)
= 80%

Final Solution = 80%
16 is 80% of 20

Unit 3 Review/Test 6th Grade Math Answer Key Question 6.
21 is 70% of ______________ .
Answer:
Multiply by a fraction to find 21 is 70% of x
Write the percent as a fraction.

Multiply
\(\frac{21}{70}\) of 100 = \(\frac{21}{70}\) × 100%
= \(\frac{2100}{70}\)
= 30

Final Solution = 30
21 is 70% of 30

Explanation B

Data:
Portion = 21
Total = x
Percent = 70

Write the equation of percentage:
Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
70% = \(\frac{21}{x}\) × 100%

Solve for x:
x = \(\frac{21 \times 100 \%}{70 \%}\)

Evaluate:
x = 30
21 is 70% of 30

Question 7.
42 of the 150 employees at Carlo’s Car Repair wear contact lenses. What percent of the employees wear contact lenses? (lesson 9.3)
Answer:
Multiply by a fraction to find 42 is x of 50
Write the percent as a fraction.

Multiply
x = \(\frac{42}{150}\) of 100 = \(\frac{42}{150}\) × 100%
x = \(\frac{4200}{150}\)
x = 28%

Final Solution = 28%
42 is 28% of 150

Explanation B

Data:
Portion = 42
Total = 150
Percent = x

Write equation of percentage:
Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
x = \(\frac{42}{150}\) × 100%

Evaluate:
x = 28%
28% of the employees at Carlo’s Car Repair wear Contact lenses.

Question 8.
last week at Best Bargain, 75% of the computers sold were laptops. If 340 computers were sold last week, how many were laptops? (lesson 9.3)
Answer:
Multiply by a fraction to find 75% of 340
Write the percent as a fraction.

Multiply
x = \(\frac{75}{100}\) of 340 = \(\frac{75}{100}\) × 340
x = \(\frac{25500}{100}\)
x = 255

Final Solution = 255
75% of 340 is 255

255 laptops were sold last week.

Explanation B

Data:
Portion = x
Total = 340
Percent = 75

Write equation of percentage:
Percent = \(\frac{\text { Portion }}{\text { Total }}\) × 100%

Substitute values:
75% = \(\frac{x}{340}\) × 100%

Solve for x:
x = \(\frac{340 \times 75 \%}{100 \%}\)

Evaluate:
x = 255
21 is 70% of 30

255 laptops were sold.

Texas Go Math Grade 6 Unit 3 Performance Task Answer Key

Question 1.
CAREERS IN MATH Residential Builder Kaylee, a residential builder, is working on a paint budget for a custom-designed home she is building. A gallon of paint costs $38.50, and its label says it covers about 350 square feet.

a. Explain how to calculate the cost of paint per square foot. Find this value. Show your work.
Answer:
To find the unit rate, divide the numerator and denominator by 350

The cost per square foot is
$0.11

b. Kaylee measured the room she wants to paint and calculated a total area of 825 square feet. If the paint is only available in one-gallon cans, how many cans of paint should she buy? Justify your answer.
Answer:
\(\frac{825}{350}\) = 2.35 ⇒ 3 cans
She should buy 3 cans (because she can not buy 2.35 cans, and if she buy 2 cans, she would not have enough for the whole room).

Question 2.
Davette wants to buy flannel sheets. She reads that a weight of at least 190 grams per square meter is considered high quality.

a. Davette finds a sheet that has a weight of 920 grams for 5 square meters. Does this sheet satisfy the requirement for high-quality sheets? If not, what should the weight be for 5 square meters? Explain.
Answer:
To find the unit rate, divide the numerator and denominator by 5:

Since 184 < 190, this sheet does not satisfy the requirement for high-quality sheets.
The weight should be
5 ∙ 190 = 950

b. Davette finds 3 more options for flannel sheets:
Option 1:1,100 g of flannel in 6 square meters, $45
Option 2: 1,260 g of flannel in 6.6 square meters, $42
Option 3: 1,300 g of flannel in 6.5 square meters, $52
She would like to buy the sheet that meets her requirements for high quality and has the lowest price per square meter. Which option should she buy? Justify your answer.
Answer:
Option 1:
To find the unit rate, divide the numerator and denominator by 6:

Since 183.33 < 190, this sheet does not satisfy the requirement for high-quality sheets.

Option 2:
To find the unit rate, divide the numerator and denominator by 6.6:

Since 190.9 > 190, this sheet does satisfy the requirement for high-quality sheets.
To find the unit rate, divide the numerator and denominator by 6.6:

The price per square meter is
= $ 6.361

Option 3:
To find the unit rate, divide the numerator and denominator by 6.5:

Since 200 > 190, this sheet does satisfy the requirement for high-quality sheets.

The price per square meter is $8

Texas Go Math Grade 6 Unit 1 Texas Test Prep Answer Key

Selected Response

Question 1.
The deepest part of a swimming pool is 12 feet deep. The shallowest part of the pool is 3 feet deep. What is the ratio of the depth of the deepest part of the pool to the depth of the shallowest part of the pool?
(A) 4:1
(B) 12:15
(C) 1:4
(D) 15:12
Answer:
(A) 4 : 1

Explanation:
The deepest part of a swimming pool is 12 feet deep The shallowest part of the pool is 3 feet deep. Therefore, the ratio of the depth of the deepest part of the pool to the depth of the shallowest part of the pool is 12 : 3. This in fraction form is equal to \(\frac{12}{3}=\frac{4}{1}\) = 4 : 1.

Question 2.
How many centimeters are in 15 meters?
(A) 0.15 centimeters
(B) 1.5 centimeters
(C) 150 centimeters
(D) 1,500 centimeters
Answer:
(D) 1,500 centimeters

Explanation:
There are 100 centimeters in 1 meter. Therefore in 15 meters there are 15 × 100 = 1500 centimeters.

Go Math 6th Grade Answers Unit 3 Answer Key Question 3.
Barbara can walk 3,200 meters in 24 minutes. How far can she walk in 3 minutes?
(A) 320 meters
(B) 400 meters
(C) 640 meters
(D) 720 meters
Answer:
(B) 400 meters

Explanation:
Barbara can walk 3,200 meters in 24 minutes This implies that her rate is \(\frac{3200}{24}\) = 133.\(\overline{3}\) meters per minute.
Therefore, she can walk 133.\(\overline{3}\) × 3 = 400 meters in 3 minutes.

Question 4.
The table below shows the number of windows and panes of glass in the windows.

Which represents the number of panes?
(A) windows × 5
(B) windows × 6
(C) windows + 10
(D) windows + 15
Answer:
(B) windows × 6

Explanation:
It can be seen that the number of panes is always 6 times that of the windows, therefore Option B.

Question 5.
The graph below represents Donovan’s speed while riding his bike.

Which would be an ordered pair on the line?
(A) (1,3)
(B) (2, 2)
(C) (6,4)
(D) (9, 3)
Answer:
(D) (9, 3)

Explanation:
It can be seen that only point (9, 3) lies on the line.

Hot Tip! Read the graph or diagram as closely as you read the actual test question. These visual aids contain important information.

Question 6.
Which percent does this shaded grid represent?

(A) 42%
(B) 48%
(C) 52%
(D) 58%
Answer:
(B) 48%

Explaination:
Count the number of shaded boxes. It can be seen that 48 out of 100 are shaded, this means that 48% of them are shaded.

Question 7.
Ivan saves 20% of his monthly paycheck for music equipment. He earned $335 last month. How much money did Ivan save for music equipment?
(A) $65
(B) $67
(C) $70
(D) $75
Answer:
(B) $67

Explanation:
Multiply by a fraction to find 20% of 335
Write the percent as a fraction.

Multiply
x = \(\frac{20}{100}\) of 335 = \(\frac{20}{100}\) × 355
x = \(\frac{6700}{100}\)
x = 67

20% of 335 is 67
Ivan saves 67 dollars

Unit 3 Test Study Guide Answer Key Go Math Grade 6 Question 8.
How many 0.6-liter glasses can you fill up with a 4.5-liter pitcher?
(A) 1.33 glasses
(B) 3.9 glasses
(C) 7.3 glasses
(D) 7.5 glasses
Answer:
(D) 7.5 glasses

Explanation:
The divisor has one decimal place, so multiply both the dividend and the divisor by 10 so that the divisor is a whole number
0.6 × 10 = 6
4.5 × 10 = 45

Divide

Question 9.
Which shows the integers in order from greatest to least?
(A) 22, 8, 7, 2, – 11
(B) 2, 7, 8, – 11, 22
(C) – 11, 2, 7, 8, 22
(D) 22, – 11, 8, 7, 2
Answer:
(A) 22, 8, 7, 2, – 11

Explanation:
We can easily see that A) is correct because:
22 > 8 > 7 > 2 > – 11

Let’s check the other options:
B) is incorrect because, for example: 2 7
C) is incorrect because, for example: – 11 2
D) is incorrect because, for example: – 11 8

Note: There was not really any need to check the other options once we noticed that the same 5 numbers appeared in all options – one set of numbers can be ordered from greatest to least in I was only

Gridded Response

Question 10.
Melinda bought 6 bowls for $13.20. What was the unit rate, in dollars?

Answer:
To find the unit rate, divide the numerator and denominator by 6:

The cost per bowl is $2.2

Question 11.
A recipe calls for 6 cups of water and 4 cups of flour. If the recipe is increased, how many cups of water should be used with 6 cups of flour?

Answer:
\(\frac{\text { water }}{\text { flour }}=\frac{6}{4}=\frac{x}{6}\)
6 is a common denominator:
\(\frac{6}{4} \cdot \frac{1.5}{1.5}=\frac{x}{6}\)
\(\frac{9}{6}=\frac{x}{6}\)
⇒ x = 9

9 cups of water.

Hot Tip! Estimate your answer before solving the question. Use your estimate to check the reasonableness of your answer.

Question 12.
Broderick answered 21 of the 25 questions on his history test correctly. What decimal represents the fraction of problems he answered incorrectly?

Answer:
If 21 questions were answered correctly,
25 – 21 = 4 questions
were answered wrongly.
⇒ \(\frac{4}{25}\) = 016 = 16%

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Lesson 8.2 Answer Key Ratios, Rates, Tables, and Graphs.

Texas Go Math Grade 6 Lesson 8.2 Answer Key Ratios, Rates, Tables, and Graphs

Reflect

Question 1.
Look for a Pattern When the amount of solvent increases by 1 milliliter, the amount of distilled water increases by ____________ milliliters. So 6 milliliters of solvent requires ____________ milliliters of distilled water.
Answer:
1 ∙ 50 = 50
6 ∙ 50 = 300
50 milliliters, 300 milliliters.

Go Math Grade 6 Lesson 8.2 Ratio Tables Answer Key Question 2.
Communicate Mathematical Ideas How can you use the graph to find the amount of distilled water to use for 4.5 milliliters of solvent?
Answer:
Locate the point x = 4.5 on the graph and then study its corresponding value of y. This value of y is the amount of distilled water required for 4.5 ml of ammonia and will be equal to 4.5 × 50 = 225 ml.

Your Turn

Question 3.
A shower uses 12 gallons of water in 3 minutes. Complete the table and graph.


Answer:
To find the unit rate, divide the numerator and denominator by 3:

The shower uses 4 gallons per minute.
Use this rate to complete the table.
If you need to find the amount of used water, multiply the time by 4.
If you need to find the time, divide the amount of used water by 4.

time	gallon
2	8
3	12
3.5	14
5	20
6.5	26

List the ordered pairs from the table:
(2,8), (3. 12), (3.5. 14), (5, 20), (6.5, 26)
and graph them on a coordinate plane.

The shower uses 4 gallons per minute.

Texas Go Math Grade 6 Lesson 8.2 Guided Practice Answer Key

Lesson 8.2 Answer Key 6th Grade Go Math Question 1.
Sulfur trioxide molecules all have the same ratio of oxygen atoms to sulfur atoms. A number of molecules of sulfur dioxide have 18 oxygen atoms and 6 sulfur atoms. Complete the table.

What are the equivalent ratios shown in the table?
Answer:
To find the unit rate, divide the numerator and denominator by 6:

To find the number of sulfur atoms, multiply the number of oxygen atoms by 3.
To find the number of oxygen atoms, divide the number of sulfur atoms by 3.

Sulfur	Oxygen
6	18
9	27
21	63
27	81

Equivalent ratios are:
\(\frac{6}{18}=\frac{9}{27}=\frac{21}{63}=\frac{27}{81}\)

Question 2.
Graph the relationship between sulfur atoms and oxygen atoms.

Answer:

List the ordered pairs from the table:
(6, 18), (9, 27), (21, 63), (27, 81)
and graph them on a coordinate plane.

Ratio Tables and Graphs Answer Key Lesson 8.2 Question 3.
Stickers are made with the same ratio of width to length. A sticker 2 inches wide has a length of 4 inches. Complete the table.

What are the equivalent ratios shown in the table?
Answer:

Width (in)	Length (in)
2	4
4	8
7	14
8	16
For every 2 inches of width the length is 4 inches.	This implies that there is \( \frac{4}{2} \) = 2 inches of length per inch of width.

Equivalent ratio of width to length is 1 : 2

Question 4.
Graph the relationship between the width and the length of the stickers.

Answer:

List the ordered pairs from the table:
(2, 4), (4, 8), (7, 14), (8, 16)
and graph them on a coordinate plane.

Go Math Lesson 8.2 Ratios Rates Tables and Graphs Question 5.
Five boxes of candles contain a total of 60 candles. Each box holds the same number of candles. Complete the table and graph the relationship.


Answer:
There are 60 candles in 5 boxes so each box can hold up to \(\frac{60}{5}\) = 12 candles so the rate is 12 candles per box.
Use this function to complete the table.

Table:

Graph of y = 12x:

Essential Question Check-In

Question 6.
How do you represent real-world problems involving ratios and rates with tables and graphs?
Answer:
Real-world problems involving ratios and rates are represented with tables as ordered pairs and then these ordered pairs are graphed to study the relation between the 2 given variables or quantities.

We can study the relation between the two given variables or quantities.

The table shows information about the number of sweatshirts sold and the money collected at a fund raiser for school athletic programs. For Exercises 7 – 12, use the table.

Question 7.
Find the rate of money collected per sweatshirt sold. Show your work.
Answer:
According to the given data, the sale of 3 sweatshirts collected $60, so this means that 1 sweatshirt collected \(\frac{\$ 60}{3}\) = $20
$20 is collected per sweatshirt sold.

Question 8.
Use the unit rate to complete the table.
Answer:
$20 is collected per sweatshirt sold, so the sale of 5 sweatshirts will generate 5 × $20 = $100.
$20 is collected per sweatshirt sold, so the sale of 8 sweatshirts will generate 8 × $20 = $160.
$20 is collected per sweatshirt sold, so the sale of 12 sweatshirts will generate 12 × $20 = $240.
$20 is collected per sweatshirt sold, so $180 was collected by selling \(\frac{\$ 180}{\$ 20}\) = 9 sweatshirts.

Go Math 6th Grade Ratios and Rates Answer Key Question 9.
Explain how to graph Information from the table.
Answer:
List the ordered pairs from the table:
(3, 60), (5, 100), (8, 160), (9, 180), (12. 240)
and graph them on a coordinate plane.

Question 10.
Write the information in the table as ordered pairs. Graph the relationship from the table.
Answer:
The information in the tabLe can be written as ordered pairs (x, y) so this becomes:
(3, 60), (5, 100), (8, 160), (9, 180) and (12, 240). Plot these on a graph and join them using a straight line to graph the function:

Question 11.
What If? How much money would be collected if 24 sweatshirts were sold? Show your work.

Answer:
Each sweatshirt sold, collects $20 so the sale of 24 will collect 24 × $20 = $480.

The sale of 24 sweatshirts will collect $480.

Question 12.
Analyze Relationships Does the point (5.5, 110) make sense in this context? Explain.
Answer:
The point (5.5, 110) does not make sense in this context because the independent variable x, the number of shirts sold is discrete and not continuous. This means that selling 5.5 sweatshirts does not make sense, the number of sweatshirts sold MUST be a whole number.

Question 13.
Communicate Mathematical Ideas The table shows the distance Randy drove on one day of her vacation. Find the distance Randy would have gone if she had driven for one more hour at the same rate. Explain how you solved the problem.

Answer:
From the data given in the table, it can be seen that she covers a distance of 55 miles in 1 hour, so in 6 hours she would have covered a distance of 6 × 55 = 330 miles.

She would have covered a distance of 330 miles.

Use the graph for Exercises 14 – 15.

Question 14.
Analyze Relationships Does the relationship show a ratio or a rate? Explain.
Answer:
The ratio because it represents the relationship between the two numbers.

Go Math Grade 6 Lesson 8.2 Ratios and Rates Question 15.
Represent Real-World Problems What is a real-life relationship that might be described by the graph?
Answer:
We can find out how many days are in, for example, one, two, or three weeks.
Ordered pair on the graph (4, 28) tells us there are
28 days in 4 weeks.

H.O.T. Focus On Higher Order Thinking

Question 16.
Make a Conjecture Complete the table.
Then find the rates \(=\frac{\text { distance }}{\text { time }}\) and \(\frac{\text { time }}{\text { distance }}\)

\(\frac{\text { distance }}{\text { time }}\) = _______________
\(\frac{\text { time }}{\text { distance }}\) = _______________
Answer:

Time	Distance
1	5
2	10
5	25
20	100

\(\frac{\text { distance }}{\text { time }}\) = \(\frac{5}{1}\)
\(\frac{\text { time }}{\text { distance }}\) = \(\frac{1}{5}\)

a. Are the \(\frac{\text { time }}{\text { distance }}\) rates equivalent? Explain.
Answer:
They are equivalent because
\(\frac{1}{5} \cdot \frac{2}{2}=\frac{2}{10}\)
\(\frac{1}{5} \cdot \frac{5}{5}=\frac{5}{25}\)
\(\frac{1}{5} \cdot \frac{20}{20}=\frac{20}{100}\)

b. Suppose you graph the points (time, distance) and your friend graphs (distance, time). How will your graphs be different?
Answer:
The graph of (time, distance) will grow slower than the graph of (distance, time)

Lesson 8.2 Answer Key 6th Grade Go Math Question 17.
Communicate Mathematical Ideas To graph a rate or ratio from a table, how do you determine the scales to use on each axis?
Answer:
The maximum values of the 2 given quantities are considered and based on that, the scales of the axes of the graphs are decided.

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Module 7 Answer Key Representing Ratios and Rates.

Texas Go Math Grade 6 Module 7 Answer Key Representing Ratios and Rates

Texas Go Math Grade 6 Module 7 Are You Ready? Answer Key

Write each fraction in simplest form.

Question 1.
\(\frac{6}{9}\)
Answer:
List the factors of 6 and 9.
Then circle the common factors.

Go Math Grade 6 Answer Key Representing Rates Question 2.
\(\frac{4}{10}\)
Answer:
List the factors of 4 and 10.
Then circle the common factors.

Question 3.
\(\frac{15}{20}\)
Answer:
Simplify \(\frac{15}{20}\)
List the factors of 15 and 20.
Then circle the common factors.

Question 4.
\(\frac{20}{24}\)
Answer:
Simplify \(\frac{20}{24}\)
List the factors of 20 and 24.
Then circle the common factors.

Go Math Grade 6 Module 7 Answer Key Question 5.
\(\frac{16}{56}\)
Answer:
Simplify \(\frac{16}{56}\)
List the factors of 16 and 56.
Then circle the common factors.

Question 6.
\(\frac{45}{72}\)
Answer:
Simplify \(\frac{45}{72}\)
List the factors of 45 and 72.
Then circle the common factors.

Question 7.
\(\frac{18}{60}\)
Answer:
Simplify \(\frac{18}{60}\)
List the factors of 18 and 60.
Then circle the common factors.

Module 7 Go Math Grade 6 Rate and Ratio Question 8.
\(\frac{32}{72}\)
Answer:
Simplify \(\frac{32}{72}\)
List the factors of 32 and 72.
Then circle the common factors.

Write the equivalent fraction.

Question 9.

Answer:
Switch sides

Question 10.

Answer:
Switch sides

Question 11.

Answer:
Solution to this example is given below

Question 12.

Answer:
Solution to this example is given below

Go Math Grade 6 Module 7 Answer Key Representing Ratios Question 13.

Answer:
Solution to this example is given below

Question 14.

Answer:
Solution to this example is given below

Question 15.

Answer:
Solution to this example is given below

Grade 6 Module 7 Answer Key Go Math Question 16.

Answer:
Given expression
\(\frac{2}{7}=\frac{18}{x}\)

Multiply both sides of the equation with \(\) to isolate the variable on 1 side of the equation:
\(\frac{2}{7} \times \frac{7 x}{2}=\frac{18}{x} \times \frac{7 x}{2}\)
Evaluate:
x = 63
Therefore the equivalent fraction is:
\(\frac{2}{7}=\frac{18}{63}\)

Texas Go Math Grade 6 Module 7 Reading Start-Up Answer Key

Visualize Vocabulary
Use the ✓ words to complete the chart. Choose the review words that describe multiplication and division.

Understand Vocabulary

Match the term on the left to the definition on the right.

Answer:

1. – D
2. – B
3. – A
4. – C

Refer to our Texas Go Math Grade 6 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 6 Unit 2 Study Guide Review Answer Key.

Texas Go Math Grade 6 Unit 2 Study Guide Review Answer Key

Module 3 Multiplying and Dividing Fractions

Multiply, Write the answer in simplest form.

Question 1.
\(\frac{1}{7} \times \frac{4}{5}\)
Answer:
Solution to this example is given below

Question 2.
\(\frac{5}{6} \times \frac{2}{3}\)
Answer:
Solution to this example is given below

Grade 6 Unit 2 Texas Go Math Answer Key Question 3.
\(\frac{3}{7} \times \frac{14}{15}\)
Answer:
Solution to this example is given below

Question 4.
\(1 \frac{1}{3} \times \frac{5}{8}\)
Answer:
Solution to this example is given below

Question 5.
\(1 \frac{2}{9} \times 1 \frac{1}{2}\)
Answer:
Solution to this example is given below

Question 6.
\(2 \frac{1}{7} \times 3 \frac{2}{3}\)
Answer:
Solution to this example is given below

Divide. Write the answer in the simplest form.

Unit 2 End of Unit Assessment Answer Key Grade 6 Question 7.
\(\frac{3}{7} \div \frac{2}{3}\)
Answer:
Solution to this example is given below

Question 8.
\(\frac{1}{8} \div \frac{3}{4}\)
Answer:
Solution to this example is given below

Question 9.
\(1 \frac{1}{5} \div \frac{1}{4}\)
Answer:
Solution to this example is given below

Question 10.
Ron had 20 apples. He used \(\frac{2}{5}\) of the apples to make pies. How many apples did Ron use for pies?
Answer:
Solution to this example is given below

Question 11.
The area of a rectangular garden is 38\(\frac{1}{4}\) square meters. The width of the garden is 4\(\frac{1}{2}\) meters. Find the length of the garden. (Lesson 3.4)
Answer:
Solution to this example is given below

Module 4 Multiplying and Dividing Decimals

Multiply

Question 1.

Answer:
Solution to this example is given below

Go Math Study Guide 6th Grade Unit 2 Answer Key Question 2.

Answer:
Solution to this example is given below

Question 3.

Answer:
Solution to this example is given below

Divide.

Question 4.

Answer:
Solution to this example is given below

Question 5.

Answer:
The divisor has one decimal place, so multiply both the dividend and the divisor by 10 so that the divisor is a whole number

0.6 × 10 = 6
25.2 × 10 = 252

Divide

Question 6.

Answer:
The divisor has one decimal place, so multiply both the dividend and the divisor by 10 so that the divisor is a whole number

2.1 × 10 = 21
36.75 × 10 = 367.5

Divide

Question 7.
Olga worked 37.5 hours last week at the library and earned $12.50 an hour. If she gets a $2.50 per hour raise, how many hours will she have to work to make the same amount of money as she did last week?
Answer:
First, calculate the amount of money that she earned last week:
37.5 × 12.5 = 468.75
She earned $ 468.75.
Now, divide 468.75 by 12.5 + 2.5 to find how many ¡tours site will have to work to make t he same amount of money:
468.75 ÷ (12.5 + 2.5)
Find the stun in the brackets:
468.75 ÷ 15
Use rules for dividing decimals to find the final result:
468.75 ÷ 15 = 31.25
Olga will have to work 31.25 hours to make the same amount of money.

Olga will have to work 3125 hours to make the same amount of money like last week.
Calculate the amount of money she earned last week and divide it by new hourly rate to find the number of hours she will have to work.

Texas Go Math Grade 6 Unit 2 Assessment Answers Question 8.
A pound of rice crackers costs $2.88. Matthew purchased pound of crackers. How much did he pay for the crackers? (Lesson 4.3)
Answer:
Solution to this example is given below
\(\frac{1}{4}\) = 0.25

For the crackers he pay 0.72 dollars

Module 5 Adding and Subtracting Integers

Add.

Question 1.
– 10 + (- 5)
Answer:
First find absolute values of given integers:
|- 10| = 10 and |- 5| = 5
Then, sum that absolute values
10 + 5 = 15
Final result would be 15 or – 15, depending on sign of given integers (both positive then +, both negative then -).
Given integers are negative so final result is – 15.
Find absolute values, sum them and add minus if both integers were negative.

Question 2.
9 + (- 20)
Answer:
Find absolute values and subtract lesser absolute value from greater:
|9| = 9 and |- 20| = 20
20 – 9 = 11
Final result would be 11 or – 11, depending on signs of given integers.
To find the final result, use the sign of number with greater absolute value:
9 + (- 20) = – 11

The sum is – 11.
Find absolute values, subtract them and add minus if the integer with the greater absolute value was negative.

Question 3.
– 13 + 32
Answer:
Find absolute values and subtract lesser absolute value from greater:
|- 13| = 13 and |32| = 32
32 – 13 = 19
Final result would be 19 or – 19, depending on signs of given integers.
To find the final result use the sign of number with greater absolute value:
– 13 + 32 = – 19

The sum is – 19.
Find absolute values, subtract them and add minus if the integer with the greater absolute value was negative.

Subtract.

Question 4.
– 12 – 5
Answer:
Subtracting 5 is equal to adding its additive inverse – 5 so you can find sum:
– 12 + (- 5)
To calculate sum, find absolute values of given integers:
|- 12| = 12 and |- 5| = 5
Then, sum that absolute values:
12 + 5 = 17
Result would be 17 or – 17. depending on sign of given integers.
Given integers are negative so final result is – 17
Since finding difference – 12 – 5 is the same as finding sum – 12 + (- 5), the difference is – 17.

The difference is – 17
To subtract 5, add its additive inverse – 5 and find sum using rules for adding integers.

Question 5.
25 – (- 4)
Answer:
Subtracting – 4 is equal to adding its additive inverse 4 so you can find sum:
25 + 4
The sum S:
25 + 4 = 29
Since finding difference 25 – (- 4) is the same as finding sum 25 + 4, the difference is 29.

The difference is 29.
To subtract – 4, add its additive inverse 4 and find sum using rules for adding integers.

Question 6.
– 3 – (- 40)
Answer:
Subtracting – 40 is equal to adding its additive inverse 40 so you can find sum:
– 3 + 40
To calculate sum, subtract lesser absolute value from greater:
|40| – |- 3| = 37
Result would be 37 or – 37, depending on signs of given integers.
Use the sign of integer with greater absolute value to find the sum:
– 3 + 40 = 37
Since finding difference – 3 – (- 40) is the same as finding sum – 3 + 40, the difference is 37.

The difference is 37
To subtract – 40, add its additive inverse 40 and find the sum using rules for adding integers.

Unit 2 Study Guide Answer Key Texas Go Math Grade 6 Question 7.
Antoine has $13 in his savings account. He buys some school supplies and ends up with $5 in his account. What was the overall change in Antoine’s account? (Lesson 5.4)
Answer:
The difference:
5 – 13
represents the change in his account
Subtracting 13 is equal to adding its additive inverse – 13 so you can find sum:
5 + (- 13)
To calculate sum, subtract lesser absolute value from greater:
|- 13| – |5| = 8
Result would be 8 or – 8, depending on signs of given integers.
Use the sign of integer with greater absolute value to find the sum:
5 + (- 13) = – 8
Since finding difference
5 – 13
is the same as finding sum
5 + (- 13)
the difference is – 8.
The overall change in his account was – $ 8.
To subtract 13, add its additive inverse – 13 and find sum using rules for adding integers.

Question 8.
Steve finds the value of – 12 + 18. Marion finds the value of – 10 – (- 15). Whose expression has the greater value? (Lesson 5.4)
Answer:
Calculate value of Steve’s expression first
Find absolute values and subtract lesser absolute value from greater:
|18| – |- 12| = 6
Result would be 6 or – 6, depending on signs of given integers.
To find the result use the sign of number with greater absolute value
– 12 + 18 = 6
The value of Steve’s expression is 6.

Then, calculate value of Marion’s expression.
Subtracting – 15 is equal to adding its additive inverse 15 so you can find sum:
– 10 + 15
To calculate sum, subtract lesser absolute value from greater:
|15| – |- 10| = 5
Result would be 5 or – 5, depending on signs of given integers.
Use the sign of integer with greater absolute value to find the sum:
– 10 + 15 = 5
Since finding difference – 10 – (- 5) is the same as finding sum -10 + 5, the difference is 5.
The value of Marion’s expression is 5.
Compare values:
6 > 5
Steve’s expression has greater value.
Use rules for subtracting integers and rules for adding integers to find values and compare them.

Module 6 Multiplying and Dividing Integers

Multiply or divide.

Question 1.
– 9 × (- 5) ____________
Answer:
First, determine if the product will be positive or negative
Since – 9 is negative and – 5 is negative (they have the same sign), the product will, be positive.
Then, multiply absolute values of given integers:
|- 9| = 9 and |- 5| = 5
9 × 5 = 45
The result is 45 or – 45, depending on signs of given integers.
Product is positive so final result is 45.

Result is 45.
Find the sign of the product, multiply absolute values of integers and add minus if the sign of product is minus ().

Question 2.
0 × ( – 10) ____________
Answer:
The result is 0.
When you multiply any integer with 0, the result you get is 0.

Question 3.
12 × (- 4) ____________
Answer:
First, determine if the product will be positive or negative
Since 12 is positive and – 4 is negative (they have opposite signs), the product will be negative.
Then, multiply absolute values of given integers:
|12| = 12 and |- 4| = 4
12 × 4 = 48
The result is 48 or – 48, depending on signs of given integers.
Product is negative so final result is – 48.

Result is – 48
Find the sign of the product, multiply absolute values of integers and add minus if the sign of product is minus (-).

Question 4.
– 32 ÷ 8 ____________
Answer:
First, determine if the quotient will be positive or negative
Since – 32 is negative and 8 is positive (they have opposite signs), the quotient will be negative.
Divide given integers:
– 32 ÷ 8 = – 4

Result is – 4.
Find the sign of the quotient (opposite signs of integers then -, the same sign of integers then +) and divide given integers.

Question 5.
– 9 ÷ (- 1) ____________
Answer:
First determine if the quotient will be positive or negative
Since – 9 is negative and – 1 is negative (they have the same sign), the quotient will be positive.
Divide given integers:
(- 9) ÷ (- 1) = 9

Result is 9.
Find the sign of the quotient (opposite signs of integers then -, the same sign of integers then +) and divide given integers.

Question 6.
– 56 ÷ 8 ____________
Answer:
First determine if the quotient will be positive or negative
Since – 56 is negative and 8 is positive (they have the opposite sign), the quotient will be negative.
Divide given integers:
– 56 ÷ 8 = – 7

Result is – 7.
Find the sign of the quotient (opposite signs of integers then -, the same sign of integers then +) and divide given integers.

Simplify.

Question 7.
– 14 ÷ 2 – 3 ____________
Answer:
The expression you want to simplify is:
– 14 ÷ 2 – 3
First, calculate the quotient using rules for dividing integers:
– 7 – 3
Then, find the difference using rules for subtracting integers:
– 7 – 3 = – 10
The expression is equal to – 10

The expression – 14 ÷ 2 – 3 is equal to – 10.
Use rules for dividing integers and rules for subtracting integers to simplify it.

Question 8.
8 + (- 20) × 3 ____________
Answer:
The expression you want to simplify is:
8 + (- 20) × 3
First calculate the product using rules for multiplying integers:
8 + (- 60)
Then, find the sum using rules for adding integers:
8 + (- 60) = – 52
The expression is equal to – 52

The expression 8 + (-20) 3 is equal to – 52.
Use rules for multiplying integers and rules for adding integers to simplify it.

Question 9.
36 ÷ (- 6) – 15 ____________
Answer:
The expression you want to simplify is:
36 ÷ (-6) – 15
First calculate the quotient using rules for dividing integers:
– 6 – 15
Then, find the difference using rules for subtracting integers:
– 6 – 15 = – 21
The expression is equal to – 21

The expression 36 ÷ (- 6) – 15 is equal to – 21.
Use rules for dividing integers and rules for subtracting integers to simplify it

Write an expression to represent the situation. Evaluate the expression and answer the question.

Question 10.
Steve spent $24 on dog grooming supplies. He washed 6 dogs and charged the owners $12 per dog wash. How much money did Steve earn? (Lesson 6.3)
Answer:
Use negative integer to represent the money he spent and positive integer to represent the money he earned for each dog wash
The expression you get is:
– 24 + 6 × 12
First calculate the product using rules for multiplying integers:
– 24 + 72
Then, find the sum using rules for adding integers:
– 24 + 72 = 48
Steve earned $48.
Write an expression that represents his earnings and use rules for multiplying and adding integers to find its value.

6th Grade Unit 2 Math Review Answer Key Question 11.
Tony and Mario went to the store to buy school supplies. Tony bought 3 packs of pencils for $4 each and a pencil box for $7. Mario bought 4 binders for $6 each and used a coupon for $6 off. Who spent more money? (Lesson 6.3)
Answer:
Calculate how much money was spent Tony and how much money spent Mario and compare results to find who spent more money.
The expression that represents Tony’s costs is:
3 × 4 + 7
First calculate the product using rules for multiplying integers:
12 + 7
Then, find the sum using rules for adding integers:
12 + 7 = 19
Tony spent
$ 19.

The expression that represents Mario’s costs is:
4 × 6 – 6
First calculate the product using rules for multiplying integers:
24 – 6
Then, find the difference using rules for subtracting integers:
24 – 6 = 18
Mario spent
$ 18.
Compare their costs
19 > 18
Therefore, Tony spent more money.

Tony spent more money for school supplies.
Use rules for multiplying, adding and subtracting integers to calculate their costs and compare that costs to find who spent more money.

Texas Go Math Grade 6 Unit 2 Performance Task Answer Key

Question 1.
CAREERS IN MATH Chef Chef Alonso is creating a recipe called Spicy Italian Chicken with the following ingredients: \(\frac{3}{4}\) pound chicken, 2\(\frac{1}{2}\) cups tomato sauce, 1 teaspoon oregano, and \(\frac{1}{2}\) teaspoon of his special hot sauce.

a. Chef Alonso wants each serving of the dish to include \(\frac{1}{2}\) pound of chicken. How many \(\frac{1}{2}\) pound servings does this recipe make?
Answer:
The expression that represents number of servings is:
\(\frac{3}{4} \div \frac{1}{2}\)
Use the reciprocal of the divisor to rewrite that expression as multiplication:
\(\frac{3}{4} \times \frac{2}{1}\)
Then, multiply the numerators and multiply the denominators to find the result:
\(\frac{3}{4} \times \frac{2}{1}=\frac{6}{4}\)
Simplify the answer and write ¡tin simplest form:
\(\frac{6 \div 2}{4 \div 2}=\frac{3}{2}\)
Therefore:
\(\frac{3}{4} \div \frac{1}{2}=\frac{3}{2}\), or 1\(\frac{1}{2}\)
That recipe makes 1\(\frac{1}{2}\) servings that each includes \(\frac{1}{2}\) pound of chicken.

b. What is the number Chef Alonso should multiply the amount of chicken by so that the recipe will make 2 full servings, each with \(\frac{1}{2}\) pound of chicken?
Answer:
Calculate the product
2 × \(\frac{1}{2}\)
to find the amount of chicken that is used for 2 servings.
Use rules for multiplying fractions to find that product:
2 × \(\frac{1}{2}\) = \(\frac{2}{2}\)
Simplify the answer and write it in simplest form:
\(\frac{2 \div 2}{2 \div 2}\) = 1
Then, divide the amount of chicken that is used for 2 servings by the amount of chicken from the recipe:
1 ÷ \(\frac{3}{4}\)
Use rules for dividing fractions to find that quotient:
1 × \(\frac{4}{3}\) = \(\frac{4}{3}\)
Therefore:
1 ÷ \(\frac{3}{4}\) = \(\frac{4}{3}\)
Chef should multiply the amount of chicken in recipe by \(\frac{4}{3}\).

c. Use the multiplier you found in part b to find the amount of all the ingredients in the new recipe.
Answer:
Use rules for multiplying fractions to find the solution.

The amount of chicken ¡n new recipe is 1 pound.

The amount of tomato sauce in new recipe is 3\(\frac{1}{3}\) cups.

The amount of oregano in new recipe is 1\(\frac{1}{3}\) teaspoons.

The amount of Chef’s special hot sauce in new recipe is \(\frac{2}{3}\) teaspoon.

d. Chef Alonso only has three measuring spoons: 1 teaspoon, \(\frac{1}{2}\) teaspoon, and \(\frac{1}{4}\) teaspoon. Can he measure the new amounts of oregano and hot sauce exactly? Explain why or why not.
Answer:
New amounts of oregano and hot sauce are 1\(\frac{1}{3}\) teaspoons and \(\frac{2}{3}\) teaspoon.
Convert the amounts of oregano and hot sauce to a decimals You get:
1\(\frac{1}{3}\) = 1,33333…. = 1,\(\dot{3}\)
\(\frac{2}{3}\) = 0,66666… = 0, \(\dot{6}\)
Convert \(\frac{1}{4}\) and \(\frac{1}{2}\) to a decimals:
\(\frac{1}{4}\) = 0,25
\(\frac{1}{2}\) = 0, 5
Numbers that represent the amounts of oregano and hot sauce are not finite and numbers 1, \(\frac{1}{4}\) and \(\frac{1}{2}\) are finite so Chef Alonso cannot measure that amounts exactly with the measuring spoons he has.

Question 2.
Amira is painting a rectangular banner 2\(\frac{1}{4}\) yards wide on a wall in the cafeteria. The banner will have a blue background. Amira has enough blue paint to cover 1\(\frac{1}{2}\) square yards of wall.

a. Find the height of the banner If Amira uses all of the blue paint. Show your work.
Answer:
Write mixed numbers as fractions:
2\(\frac{1}{4}\) = \(\frac{9}{4}\)
1\(\frac{1}{2}\) = \(\frac{3}{2}\)
Since the formula for calculating area of rectangle is:
area = width × height,
the quotient
area ÷ width
represents the height of rectangle.
Therefore, quotient
\(\frac{3}{2} \div \frac{9}{4}\)
represents the height of the banner.
Use the reciprocal of the divisor to rewrite that exDression as multiplication:
\(\frac{3}{2} \times \frac{4}{9}\)
Then, multiply the numerators and multiply the denominators to find the result:
\(\frac{3}{2} \times \frac{4}{9}=\frac{12}{18}\)
Simplify the answer and write it in simplest form:
\(\frac{12 \div 6}{18 \div 6}=\frac{2}{3}\)
The height of the banner is \(\frac{2}{3}\) yards.

b. The school colors are blue and yellow, so Amira wants to add yellow rectangles on the left and right sides of the blue rectangle. The yellow rectangles will each be \(\frac{3}{4}\) yard wide and the same height as the blue rectangle. What will be the total area of the two yellow rectangles? Explain how you found your answer.
Answer:
The height of the yellow rectangles will be \(\frac{2}{3}\) yards.
Find the area of one yellow rectangle and multiply it by 2 to find the total area.
The expression you get is:
\(\left(\frac{3}{4} \times \frac{2}{3}\right)\) × 2
First multiply the numerators and multiply the denominators to find the product in the brackets:
\(\frac{6}{12}\) × 2
Then, use rules for multiplying fractions to find the final result:
\(\frac{6}{12}\) × 2 = \(\frac{12}{12}\)
Simplify the answer and write it in simplest form:
\(\frac{12 \div 12}{12 \div 12}\) = 1
The total area of two yellow rectangles will be 1 square yard.

c. What are the dimensions of the banner plus yellow rectangles? What is the total area? Show your work.
Answer:
Width of blue banner is \(\frac{9}{4}\) yards and width of each yellow rectangle is \(\frac{3}{4}\) yard so total width is:
\(\frac{9}{4}\) + 2 × \(\frac{3}{4}\)
Use rules for multiplying fractions and rules for adding fractions to find the result:
\(\frac{9}{4}+\frac{6}{4}\)
\(\frac{9}{4}+\frac{6}{4}=\frac{15}{4}\)
Total width is \(\frac{15}{4}\) yards.
Height of blue banner is the same as height of yellow rectangles so
total height is \(\frac{2}{3}\) yard
Multiply total width and total height using rules for multiplying fractions to find the total area:
\(\frac{15}{4} \times \frac{2}{3}=\frac{30}{12}\)
Simplify the answer and write it in simplest form:
\(\frac{30 \div 6}{12 \div 6}=\frac{5}{2}\) or 2\(\frac{1}{2}\)
The total area is 2\(\frac{1}{2}\) square yards.

Texas Go Math Grade 6 Unit 1 Texas Test Prep Answer Key

Selected Response

Question 1.
Which of the following statements is correct?
(A) The product of \(\frac{5}{6}\) and \(\frac{9}{10}\) is greater than.
(B) The product of 1\(\frac{3}{4}\) and \(\frac{3}{4}\) is less than 1\(\frac{1}{5}\).
(C) The product of \(\frac{6}{7}\) and \(\frac{5}{6}\) is greater than \(\frac{5}{6}\).
(D) The product of 1\(\frac{3}{4}\) and \(\frac{2}{5}\) is less than \(\frac{2}{5}\).
Answer:
(B) The product of 1\(\frac{3}{4}\) and \(\frac{3}{4}\) is less than 1\(\frac{1}{5}\).

Explaination:
(A) Calculate the product:
\(\frac{5}{6} \times \frac{9}{10}\)
Multiply the numerators and multiply the denominators to find the result:
\(\frac{5}{6} \times \frac{9}{10}=\frac{45}{60}\)
Write in form in which it has the same denominator as previous product, \(\frac{45}{60}\):
\(\frac{9 \times 6}{10 \times 6}=\frac{54}{60}\)
Compare the product with that fraction:
\(\frac{45}{60}<\frac{54}{60}\)
The product is less than \(\frac{9}{10}\).
Therefore, statement A) is incorrect.

(B) Write mixed number as fraction:
1 \(\frac{1}{5}\) = \(\frac{6}{5}\)
Calculate the product:
\(\frac{6}{5} \times \frac{6}{7}\)
Multiply the numerators and multiply the denominators to find the result:
\(\frac{6}{5} \times \frac{6}{7}=\frac{36}{35}\)
Write \(\frac{6}{5}\) in form in which it has the same denominator as previous product, \(\frac{36}{35}\):
\(\frac{6 \times 7}{5 \times 7}=\frac{42}{35}\)
Compare the product with that fraction:
\(\frac{36}{35}<\frac{42}{35}\)
The product is less than 1\(\frac{1}{5}\) so the correct answer is B.

Use same rules to check statements C and D:

(C)

The product is less than \(\frac{5}{6}\).

(D)

The product is greater than \(\frac{2}{5}\).
Therefore, statements (C) and (D) are incorrect.

Question 2.
Which of these is the same as \(\frac{8}{9} \div \frac{2}{3}\)
(A) \(\frac{8}{9} \div \frac{3}{2}\)
(B) \(\frac{2}{3} \div \frac{8}{9}\)
(C) \(\frac{8}{9} \times \frac{2}{3}\)
(D) \(\frac{8}{9} \times \frac{3}{2}\)
Answer:
(D) \(\frac{8}{9} \times \frac{3}{2}\)

Explaination:
Given expression:
\(\frac{8}{9} \div \frac{2}{3}\)
Convert the divide sign to a multiply sign by taking the reciprocal of the fraction after the divide sign, therefore:
= \(\frac{8}{9} \times \frac{3}{2}\)

Question 3.
A rectangular tabletop has a length of 4\(\frac{3}{4}\) feet and an area of 11\(\frac{7}{8}\) square feet. What is the width of the tabletop?
(A) 1\(\frac{1}{16}\) feet
(B) 2\(\frac{1}{2}\) feet
(C) 4\(\frac{1}{4}\) feet
(D) 8\(\frac{1}{2}\) feet
Answer:
(B) 2\(\frac{1}{2}\) feet

Exaplaination:
Write mixed numbers as fractions:
4\(\frac{3}{4}\) = \(\frac{19}{4}\)
11\(\frac{7}{8}\) = \(\frac{95}{8}\)
Since the formula for calculating the area of rectangle is:
area = length × width,
the quotient
area ÷ length
represents the width of rectangle.
Therefore, the quotient
\(\frac{95}{8} \div \frac{19}{4}\)
represents me width of the tabletop.
Use the reciprocal of the divisor to rewrite that expression as multiplication:
\(\frac{95}{8} \times \frac{4}{19}\)
Then, multiply the numerators and multiply the denominators to find the result:
\(\frac{95}{8} \times \frac{4}{19}=\frac{380}{152}\)
Simplify the answer and write it in the simplest form:
\(\frac{380 \div 76}{152 \div 76}=\frac{5}{2}\), or 2\(\frac{1}{2}\)
The width of the rectangular tabletop is 2\(\frac{1}{2}\) feet.

Go Math 6th Grade Answer Key Unit 2 Test Answers Question 4.
Dorothy types 120 words per minute. How many words does Dorothy type in 1.75 minutes?
(A) 150 words
(B) 180 words
(C) 200 words
(D) 210 words
Answer:
(D) 210 words

Explaination:
Solution to this example is given below

Question 5.
What is the opposite of 17?
(A) – 17
(B) –\(\frac{1}{17}\)
(C) \(\frac{1}{17}\)
(D) 17
Answer:
(A) – 17

Explaination:
Solution to this example is given below
17 × (- 1)
– 17 × 1 (Remove parentheses)
– 17 (Multiply the numbers)

Question 6.
Each paper clip is of an inch long and costs $0.03. Exactly enough paper clips are laid end to end to have a total length of 56 inches. What is the total cost of these paper clips?
(A) $0.49
(B) $0.64
(C) $1.47
(D) $1.92
Answer:
(D) $1.92

Explaination:
The number of paper clips required to make a length of 56 inches is evaluated as \(\frac{56}{\frac{7}{8}}=\frac{56 \times 8}{7}\) = 64.
Total cost to buy these 64 clips is 64 × $0.03 = $1.92.

Question 7.
Which expression simplifies to 5?
(A) \(\frac{27}{3}\) – 14
(B) \(\frac{27}{3}\) + 14
(C) \(\frac{-27}{3}\) – 4
(D) \(\frac{-27}{3}\) + 14
Answer:
(D) \(\frac{-27}{3}\) + 14

Explaination:
(A) \(\frac{27}{3}\) – 14
Calculate the quotient using rules for dividing integers:
9 – 14
Find the difference using rules for subtracting integers:
9 – 14 = – 5
The expression is equal to – 5 so it is not the answer.

(B) \(\frac{27}{3}\) + 4
Calculate the quotient using rules for dividing integers:
9 + 4
Find the difference using rules for subtracting integers:
9 + 4 = 13
The expression is equal to 13 so it is not the answer.

(C) \(\frac{-27}{3}\) – 4
Calculate the quotient using rules for dividing integers:
– 9 – 4
Find the difference using rules for subtracting integers:
– 9 – 4 = – 13
The expression is equal to – 13 so it is not the answer.

(D) \(\frac{-27}{3}\) + 14
Calculate the quotient using rules for dividing integers:
– 9 + 14
Find the difference using rules for subtracting integers:
– 9 + 14 = 5
The expression is equal to 5 so the correct answer is D.

Question 8.
What is the absolute value of – 36?
(A) -36
(B) 0
(C) 6
(D) 36
Answer:
(D) 36

Exaplaination:
Solution to this example is given below
|- 36| = 36 (This option is correct answer)

Apply absolute rule: |- a| = a

Question 9.
Which number can you add to 13 to get a sum of 0?
(A) – 26
(B) – 13
(C) 0
(D) 13
Answer:
(B) – 13

Explaination:
Add each number to 13 using rules for adding integers to find the result of 0.
(A) 13 + (- 26)
Find absolute values and subtract lesser absolute value from greater:
|- 26| – |13| = 13
Final result would be 13 or – 13, depending on signs of given integers.
Use the sign of the number with the greater absolute value to find the result:
13 + (- 26) = – 13
– 13 is not equal to 0 so A) is not the answer

(B) 13 + (- 13)
Find absolute values and subtract lesser absolute value from greater:
|- 13| – |13| = 0
Final result is 0 so the correct answer is B.

Question 10.
Joseph owes his older brother $15, so he has a balance of – $15 with his brother. Joseph borrows some more money from his brother, bringing his balance to 5 times the previous amount. What is Joseph’s new balance with his brother?
(A) – $ 90
(B) – $ 75
(C) – $ 10
(D) $ 60
Answer:
(B) – $ 75

Multiply Josephs balance of – $15 by 5 to find bis new balance.
The expression you get is:
5(- 15)
First, determine if the product will be positive or negative.
Since 5 is positive and – 15 is negative (they have opposite signs), the product will be negative.
Then, multiply absolute values of given integers:
|5| = 5 and |- 15| = 15
5 × 15 = 75
The result is 75 or – 75. depending on signs of given integers.
Product is negative so final result is – 75.
he answer is B. His new balance with his brother is – $ 75.

Question 11.
Which expression simplifies to a positive answer?
(A) a negative number divided by a positive number
(B) a positive number divided by a negative number
(C) a negative number multiplied by a negative number
(D) a positive number multiplied by a negative number
Answer:
(C) a negative number multiplied by a negative number

Explaination:
The product of two integers with the same sign is positive so the correct answer is C.

The quotient of two integers with different signs is negative as well as the product of two integers with different signs so results of expressions A), B) and D) are negative.

Question 12.
Which expression has the least value?
(A) (- 9) ÷ 3 – 2
(B) (- 24) ÷ 6 + 2
(C) 36 ÷ (- 4) + 7
(D) (- 32) ÷ 8 – 4
Answer:
(D) (- 32) ÷ 8 – 4

Exaplaination:
Find value of each expression and compare results you get
(A) (- 9) ÷ 3 – 2
Calculate the quotient using rules for dividing integers:
– 3 – 2
Find the difference using rules for subtracting integers:
– 3 – 2 = – 5
(- 9) ÷ 3 – 2 = – 5

(B) (- 24) ÷ 6 + 2
Calculate the quotient using rules for dividing integers:
– 4 + 2
Find the sum using rules for adding integers:
– 4 + 2 = – 2
(- 24) ÷ 6 + 2 = – 2

(C) 36 ÷ (-4) + 7
Calculate the quotient using rules for dividing integers:
– 9 + 7
Find the sum using rules for adding integers:
– 9 + 7 = – 2
36 ÷ (- 4) + 7 = – 2

(D) (- 32) ÷ 8 – 4
Calculate the quotient using rules for dividing integers:
– 4 – 4
Find the difference using rules for subtracting integers:
– 4 – 4 = -8
(- 32) ÷ 8 – 4 = – 8
Compare results:
– 8 < – 5 < – 2
The expression D) has the least value.

Gridded Response

Hot Tip! Make sure that your answer makes sense before marking it as your response. Reread the question and determine whether your answer is reasonable.

Question 13.
A fish is 73 feet below sea level. It then swims 14 feet toward the surface. How many feet below sea level is the fish now?

Answer:
Use negative integer to represent where fish was at the beginning and positive integer to represent the distance it moves toward the surface.
The expression you get is:
– 73 + 14
Find absolute values and subtract lesser absolute value from greater:
|- 73| – |14| = 59
Final result would be 59 or – 59, depending on signs of given integers.
Use sign of number with greater absolute value to find the final result:
– 73 + 14 = – 59
The fish is 59 feet below the surface.
Use rules for adding integers to find how many feet below sea level the fish is now.

Question 14.
A box contained 162 matches. A bigger box contained 1\(\frac{4}{9}\) times as many matches. How many matches did the bigger box contain?

Answer:
Multiply 162 by 1\(\frac{4}{9}\) to find how many matches the bigger box contained.
The expression you get is:
162 × 1\(\frac{4}{9}\)
First, write 1\(\frac{4}{9}\) as a fraction:
1\(\frac{4}{9}\) = \(\frac{13}{9}\)
Then, multiply the numerators and multiply the denominators to find the result:
\(\frac{162}{1} \times \frac{13}{9}=\frac{2106}{9}\)
Simplify the answer and write it in simplest form:
\(\frac{2106 \div 9}{9 \div 9}\) = 234
The bigger box contained 234 matches.
Use rules for multiplying fractions to find the result.

Question 15.
Colby and his 3 friends buy lunch. The total is $30.60. If they share the cost equally, how much, in dollars, should each person pay?

Answer:
Divide 30.60 by 4 to find how much money each person should pay.
The expression you get is:
30.60 ÷ 4
Use rules for dividing decimals to find the final result:
30.60 ÷ 4 = 7.65
Each person should pay $7.65.
Use rules for dividing decimals to calculate how much money each person should pay.