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Practice the problems of Math in Focus Grade 5 Workbook Answer Key Chapter 7 Practice 3 Real-World Problems: Ratios to score better marks in the exam.

Math in Focus Grade 5 Chapter 7 Practice 3 Answer Key Real-World Problems: Ratios

Solve. Show your work.

Question 1.
Ms. Grande bought 24 apples and 1 8 oranges for a party after a class play. Find the ratio of the number of apples to the total pieces of fruit Ms. Grande bought.
Answer:
24 : 42 = 4 : 7
Explanation:
Given,
Ms. Grande bought 24 apples and 18 oranges for a party,
Total number of fruits we get,
By adding 24 with 18 we get 42,
The ratio of the number of apples to the total number of number of fruits is 24 : 42,
To get into simplest form 24 and 42 can be divisible by 6 we get 4 : 7

Question 2.
There are 44 chicken and fish filets altogether in a freezer. There are 1 2 chicken filets. What is the ratio of the number of chicken filets to the number of fish filets in the freezer?
Answer:12 : 32 = 3 : 8
Explanation:
Given,
There are 44 chicken and fish fillets altogether in a freezer,
There are 12 chicken filets,
By subtracting 12 from 44 we get 32,
So there are 32 fish filets,
The ratio of number of chicken filets to the number of fish filets in the freezer is 12 : 32.
To get into simplest form 12 and 32 can be divisible by 4 we get 3 : 8.

Solve. Show your work.

Question 3.
There were 1 2 boys and 1 8 girls in a class. Then, 3 more boys joined the class and 2 girls left. What is the ratio of the number of boys to the number of girls in the class now?
Answer:15 : 16
Explanation:
Given,
There were 12 boys and 3 more boys joined the class, by adding 12 with 3 we get 15,
There were 18 girls and 2 girls left, by subtracting 2 from 18 we get 16,
The ratio of the number of boys to the number of girls in the class is 15 : 16

Question 4.
Monica had $42 and Naomi had $18 at first. Monica then gave $6 to Naomi. What is the ratio of the amount of money Monica has to the amount of money Naomi has in the end?
Answer:36 : 24 = 3 : 2
Explanation:
Given,
Monica had $42 and gave $6 to Naomi, by subtracting 6 from 42 we get 36
Naomi had $18 and by adding 18 with 6 we get 24,
The ratio of the amount of money Monica has to the amount of money Naomi is 36 : 24,
To get into simplest form 36 and 24 can be divisible by 12 we get 3 : 2.

Solve. Show your work.

Question 5.
In a competition, the ratio of the number of tickets Mark collected to the number of tickets Julia collected is 4 : 3. Julia collected 36 tickets. How many tickets did they collect altogether?
Answer:84 tickets
Explanation:
Given,
The ratio of number of tickets Mark collected to the number of tickets Julia collected is 4 : 3,
Julia collected is 36 tickets,
1 unit is equal to 12 tickets,
So 3 units is equal to 36 tickets which Julia has and 4 units is equal to 48 tickets which Mark has,
By adding 48 with 36 we get 84,
So Mark and Julia collected 84 tickets altogether.

Question 6.
The ratio of the number of stamps Calvin has to the number of stamps Roger has is 7 : 3. Roger has 18 stamps. How many stamps do they have altogether?
Answer:60 stamps
Explanation:
Given,
The ratio of the number of stamps Calvin to the number of stamps Roger is 7 : 3,
Roger has 18 stamps,
1 unit is equal to 6 stamps,
So 3 units is equal to 18 tickets which Roger has and 7 units is equal to 42 tickets which Calvin has,
By adding 42 with 18 we get 60,
So Calvin and Roger have 60 tickets altogether.

Solve. Show your work.

Question 7.
On a Saturday, the ratio of the amount of water used by Household A to the amount of water used by Household B was 13:5. Household A used 260 gallons of water for that day. Find the total amount of water used by the two households on that Saturday.
Answer: 360 Gallons
Explanation:
Given,
The ratio of the amount of water used by Household A to the amount of water used by Household B was 13 : 5,
Household A used 260 gallons of water,
1 unit is equal to 20 gallons,
So 13 units is equal to 260 gallons of water used by Household A and 5 units is equal to 100 gallons of water used by Household B,
By adding 260 with 100 we get 360,
So the total amount of water used by two households is 360 gallons of water.

Question 8.
A cleaning solution and water are mixed in the ratio 4 : 15. The amount of water in the mixture is 1,200 milliliters. What is the total volume of the mixture?
Answer:1520 milliliters
Explanation:
Given,
A cleaning solution and water are mixed in the ratio is 4 : 5,
The amount of water in the mixture is 1200 milliliters,
1 unit is equal to 80,
So 4 units is equal to 320 milliliters and 15 units is equal to 1200 milliliters,
By adding 320 with 1200 we get 1520,
So the total volume of the mixture is 1520 milliliters.

Practice the problems of Math in Focus Grade 5 Workbook Answer Key Chapter 7 Ratio to score better marks in the exam.

Math in Focus Grade 5 Chapter 7 Answer Key Ratio

Math Journal

Andy and Clara each drew a model to solve this word problem.

Mr. Marcos bought chicken and beef from the butcher and fish from the fish market for a barbecue. The ratio of the weight of chicken to the weight of beef to the weight of fish he bought was 3 : 1 : 5. He bought 10 pounds of fish.
What was the total weight of meat he bought from the butcher?

Both models however are incorrect.
Explain the mistakes that they each made.

Draw the correct model. Then solve the problem.

Answer:
8 pounds
Explanation:
Given,
Ratio of the weight of chicken to the weight of beef to the weight of fish is = 3 : 1 : 5
Mr. Marcos bought fish of = 10 pounds,
Total ratio = 3 + 1 + 5 = 9
Total pounds of chicken, beef and fish bought = X
Equation for pounds of fish bought = 5 / 9 x X = 10
=> X = 10 x 9 / 5
=> X = 2 x 9
=> X = 18
Pounds of chicken bought = 3 / 9 x 18 = 6 pounds
Pounds of beef bought = 1 / 9 x 18 = 2 pounds
Total weight of meat bought = 6 + 2 = 8 pounds
Therefore, Total weight of meat bought is 8 pounds.

Put on Your Thinking cap!

Challenging Practice

Question 1.
A small square with an area of 16 square centimeters is cut from a larger square with sides that measure 6 centimeters. Find the ratio of the area of the small square to the area of the remaining part of the larger square.

Answer:

Explanation:
Given,
Area of small square = 16 square centimeters
Side of larger square = 6 centimeters
Area of small sqaure : Area of remaining part
16 square centimeters : ?
Area of remaining part = Area of large square – Area of small square
= 6 x 6 – 16
= 36 – 16
= 20 square centimeters
Ratio = area of small square : area of remaining part
= 16 : 20
= 4 : 5

Question 2.
The perimeters of two squares are in the ratio 2 : 4. The perimeter of the larger square is 16 centimeters.

a. What is the perimeter of the smaller square?
Answer: The perimeter of smaller square is 8 cm
Explanation:
Given,
The ratio of two squares are 2 : 4,
The perimeter of larger square is 16 centimeters,
By multiplying 2 and 4 with 4 we get the ratio 8 : 16,
Therefore, the perimeter of smaller square is 8 cm

b. What is the length of one side of the smaller square?
Answer: The length of one side of the smaller sqaure is 2 cm

Put on Your Thinking Cap!

Problem Solving

Solve.

Question 1.
The ratio of the number of plants Trish bought to the number of plants Sarah bought is 2 : 5. Trish bought 16 plants.
a. What is the total number of plants Trish and Sarah bought altogether?
Answer: The total number of plants Trish and Sarah bought are 56 plants
Explanation:
Given,
Ratio of plants Trish and Sarah bought are = 2 : 5,
Trish bought number of plants = 16,
By multiplying both the ratios 2 : 5 with 8, then we get 16 : 40,
By adding 16 with 40 we get 56,
Therefore, the total number of plants Trish and Sarah bought are 56 plants.

b. If each plant cost $1 7, what is the total cost of the plants Trish and Sarah bought?
Answer: The total cost of the plants Trish and Sarah bought is $952.
Explanation:
Given,
Number of plants Trish and Sarah bought are = 56,
Each plant costs = $17,
By multiplying 56 with 17 we get the sum as 952,
Therefore, the total cost of 56 plants is $952.

Question 2.
The ratio of the number of boys to the number of girls at a town fair is 5 : 8 There are 60 boys at the fair.

a. What is the total number of boys and girls at the fair?
Answer:The total number of boys and girls at the fair is 156.
Explanation:
Given,
The ratio of number of boys to the number of girls = 5 : 8,
The number of boys at the fair = 60,
Total number of boys and girls = 5 : 8
By multiplying both 5 and 8 with 12 we get the ratio as 60 : 96,
Therefore, there are 60 boys and 96 girls,
By adding 60 with 96 we get the sum as 156.

b. The admission fee for each child is $3. Find the total admission fees for the boys and girls.
Answer: The total admission fees for the boys and girls is $468.
Explanation:
Given,
Number of boys and girls = 156,
Admission fee for each child is = $3,
By multiplying 156 with 3 we get the sum as 468,
Therefore, the total admission fees for the boys and girls is $468.

This handy Math in Focus Grade 6 Workbook Answer Key Chapter 13 Lesson 13.2 Dot Plots detailed solutions for the textbook questions.

Math in Focus Grade 6 Course 1 B Chapter 13 Lesson 13.2 Answer Key Dot Plots

Math in Focus Grade 6 Chapter 13 Lesson 13.2 Guided Practice Answer Key

Math in Focus Course 1B Practice 13.2 Answer Key

Question 1.
A group of 15 students was asked how many times they have traveled on a plane. The results are recorded in the table.

Answer:

Explanation:
A dot plot is a graphical display of data using dots.
In a dot plot, data points (dots) are stacked in a column over a category.
The height of the column represents the frequency of observations in a given category.
These graphs stack dots along the horizontal X-axis to represent the frequencies of  values.
More dots indicate greater frequency.
Each dot represents a set number of observations.
Title the dot plot based on the problem.

Question 2.
The results of the high jumps at a track meet are recorded in the table.

Answer:

Explanation:
A dot plot is a graphical display of data using dots.
In a dot plot, data points (dots) are stacked in a column over a category.
The height of the column represents the frequency of observations in a given category.
These graphs stack dots along the horizontal X-axis to represent the frequencies of  values.
More dots indicate greater frequency.
Each dot represents a set number of observations.
Title the dot plot based on the problem.

Describe the data.

Question 3.
The weekly savings (in dollars) of 10 students in a class are shown in the dot plot. Briefly describe the distribution of the weekly savings of the students.

Answer:

Explanation:
Given that, the weekly savings (in dollars) of 10 students in a class are shown in the dot plot.
So, there are 10 students in the class as per the dots on the dot plot.
The distribution of the weekly savings of the students are:
$0 weekly savings = 0 students
$1 weekly savings = 1 student
$2 weekly savings = 2 students
$3 weekly savings = 2 students
$4 weekly savings = 4 students
$5 weekly savings = 1 student

Question 4.
The number of points scored by 12 members of a volleyball team in a game is shown in the dot plot. Briefly describe the number of points scored by the group of players.

Answer:

Explanation:
Given that, The number of points scored by 12 members of a volleyball team in a game is shown in the above dot plot.
So, there are 12 members of a volleyball team in a game.
The different players scored different points are listed on the above table.

Hands-On Activity

CONSTRUCTING A DISTRIBUTION

Materials:

• 2 number cubes, numbered 1-6
• blank table

Work in pairs.
Step 1: Toss two number cubes. Record the difference between the two numbers in a tally chart.
Step 2: Repeat 20 times and add your results to another group’s results. Record the results for 40 tosses in a copy of the table below.

Step 3: Represent the data with a dot plot.
Step 4: Repeat Step 1 to Step 3, but record the SUM of the two numbers each time.

Answer:
Step 1: Toss two number cubes. Record the difference between the two numbers in a tally chart.

Step 2: Repeat 20 times and add your results to another group’s results.

Record the results for 40 tosses in a copy of the table below.

the results for 40 tosses in a copy of the table below.

Represent the data with a dot plot.

a) What is the least sum you can get?
Answer:
2

Explanation:
Toss two number cubes and record the difference between the two numbers in a tally chart,
ass shown above.
Repeat 20 times and add results to another group’s results.
Record the results for 40 tosses.
So, the lest sum we get after tossing is only 2 times of 4 number toss recorded after 40 experiments.

b) What is the greatest sum you can get?
Answer:
11

Explanation:
Toss two number cubes and record the difference between the two numbers in a tally chart,
ass shown above.
Repeat 20 times and add results to another group’s results.
Record the results for 40 tosses.
The difference between the two cubes is 0 and 2 are 11  times 4 number toss recorded after 40 experiments.

Math journal
a) Describe the distribution of the differences.
Answer:
The Sampling Distribution of the Difference between two Means shows the distribution of means of two samples drawn from the two independent populations, such that the difference between the population means can possibly be evaluated by the difference between the sample means.

Explanation:
To find the distribution of the differences between two numbers,
subtract the number with the smallest value from the number with the largest value.
The product of this sum is the difference between the two numbers.
for example; the difference between 45 and 100 is 55.

b) Describe the distribution of the sums.
Answer:
We can form new distributions by combining random variables.
If we know the mean and standard deviation of the original distributions,
we can use that information to find the mean and standard deviation of the resulting distribution.

Explanation:
So, the normal distribution has a mean equal to the original mean multiplied by the sample size and a standard deviation.

c) Discuss with your partner why one distribution is skewed, and the other is symmetric (or nearly so). Why are the shapes of the two distributions different?
Answer:
In a symmetrical distribution the two sides of the distribution are a mirror image of each other.

Explanation:
A distribution of data item values may be symmetrical or asymmetrical.
Two common examples of symmetry and asymmetry are the normal distribution and the skewed distribution.
In a symmetrical distribution the two sides of the distribution are a mirror image of each other.

Math in Focus Course 1B Practice 13.2 Answer Key

Represent each set of data with a dot plot.

Question 1.
The years of service for each of the 18 employees in a company are as follows:

Answer:

Explanation:
A dot plot is a graphical display of data using dots.
In a dot plot, data points (dots) are stacked in a column over a category.
The height of the column represents the frequency of observations in a given category.
These graphs stack dots along the horizontal X-axis to represent the frequencies of  values.
More dots indicate greater frequency.
Each dot represents a set number of observations.
Title the dot plot based on the problem.
Dot plot drawn with the data given in the table,
as years of service for each of the 18 employees in a company.
Each data is one employee, there are total 18 employees.

Question 2.
A group of 24 students was asked how many states they have visited. The results are recorded in the table.

Answer:

Explanation:
A dot plot is a graphical display of data using dots.
In a dot plot, data points (dots) are stacked in a column over a category.
The height of the column represents the frequency of observations in a given category.
These graphs stack dots along the horizontal X-axis to represent the frequencies of  values.
More dots indicate greater frequency.
Each dot represents a set number of observations.
Title the dot plot based on the problem.
Dot plot drawn with the data given in the table,
a group of 24 students was asked how many states they have visited.

A group of teens was asked to indicate how many pairs of shoes they have in their closet. The results are shown in the dot plot. Use the dot plot to answer questions 3 to 5.

Question 3.
How many data values are there?
Answer:
2 data values.

Explanation:
Number of pairs of shoes and Number of teens.

Question 4.
What conclusions can you draw with regard to the number of pairs of shoes the teens have?
Answer:
More number of teens have 2 pairs of shoes.

Explanation:
As per the dot plot more dots or more teens are marked in orange who consists 2 pairs of shoes.
The conclusion is more number of teens have 2 pairs of shoes.

Question 5.
What percent of the teens indicated 3 pairs of shoes in their closet?
Answer:
25%

Explanation:
Total number of teens are 20.
The teens who indicated 3 pairs of shoes are 5.
5/20 = 0.25
0.25 X 100 =25%

The dot plot shows the number of weeks each movie that was number 1 at the box office during one year stayed in the number 1 position. Use the dot plot to answer questions 6 and 7.

Question 6.
How many movies are represented by the dots altogether?
Answer:
20 movies.

Explanation:
In the above dot plot, total 20 dots present,
it means 20 movies are represented by the dots altogether.

Question 7.
Give a reason why more dots are above the numbers 1 to 3 than above the numbers 4 and 5 on the horizontal axis.
Answer:
More dots on plot shows the number of weeks each movie that was number 1 at the box office during one year stayed in the number 1 position between the numbers 1 to 3 than above the numbers 4 and 5 on the horizontal axis.

Explanation:
A dot plot is a graphical display of data using dots.
In a dot plot, data points (dots) are stacked in a column over a category.
The height of the column represents the frequency of observations in a given category.
These graphs stack dots along the horizontal X-axis to represent the frequencies of  values.
More dots indicate greater frequency.
Each dot represents a set number of observations.
Title the dot plot based on the problem.

Copy and complete the dot plot. Use the dot plot to answer each question.

Question 8.
The incomplete dot plot shows the result of a survey in which each student was asked how many dimes were in their pockets or wallets. The results for “4 dimes” are not shown. Each dot represents one student. It is known that 12.5% of the students had one dime.

a) Find the number of students surveyed. Then complete the dot plot.
Answer:
32 students were surveyed.
So, dots for 4 dimes is 3.

Explanation:
let x be the number of students surveyed,
If 12.5% of the students had one dime,
then, 0.125x = students had one dime.
From the dot plot, 4 students had one dime.
So, 0.125x = 4
Dividing both sides by 0.125 gives,
x= 4/0.125
x = 32
Therefore 32 students were surveyed.
Counting the total number of dots in the incomplete dot plot gives:
2 + 4 + 8 + 9 + 4 + 2 = 29
Hence there must be 32 dots in all to represent all 32 of the students.
Then there should be
32 − 29 = 3
dots for “4 dimes” are 3.

b) What percent of the students had either 0 or 6 dimes?
Answer:
6.25% students have 0 or 6 dimes in their pocket.

Explanation:
Total dots = 32
percent of the students had either 0 or 6 dimes,
2 students have either 0 or 6 dimes in their pocket.
2/32 = 0.625
0.625 x 100 = 6.25%

c) What percent of the students had either 1 or 5 dimes?
Answer:
12.5% students have 1 or 5 dimes in their pocket.

Explanation:
Total dots = 32
percent of the students had either 1 or 5 dimes,
4 students have either 1 or 5 dimes in their pocket.
4/32 = 0.125
0.125 x 100 = 12.5%

d) Briefly describe the distribution of the data.

Answer:
The distribution of the data given in the dot plot is number of students and the number of dimes in their pocket.

Explanation:
The distribution of the data given in the dot plot is number of students and the number of dimes in their pocket.
2 students have no dimes in their pocket.
4 students have 1 dime in their pocket.
8 students have 2 dimes in their pocket.
9 students have 3 dimes in their pocket.
4 students have 4 dimes in their pocket.
5 students have 5 dimes in their pocket.
2 students have 6 dimes in their pocket.

Practice the problems of Math in Focus Grade 5 Workbook Answer Key Chapter 9 Practice 1 Multiplying Decimals to score better marks in the exam.

Math in Focus Grade 5 Chapter 9 Practice 1 Answer Key Multiplying Decimals

Multiply. Write the product as a decimal.

Example
2 × 0.3 = 2 × 3 tenths
= 6 tenths
0.6
So, 2 × 0.3 = 0.6

Question 1.
5 × 0.6 = 5 × ____ tenths
= ___ tenths
= ____ or ____
So, 5 × 0.6 = ____
Answer:
5 × 0.6 = 5 × 6 tenths
= 30 tenths
= 3.0 or 3
So, 5 × 0.6 = 3
Explanation:
To multiply a decimal number by a decimal number,
we first multiply the two numbers ignoring the decimal points and then;
place the decimal point in the product in such a way that;
decimal places in the product is equal to the sum of the decimal places in the given numbers.

Question 2.
7 × 0.8 = 7 × ___ tenths
= ___ tenths
= _____
So, 7 × 0.8 = ___
Answer:
7 × 0.8 = 7 × 8 tenths
= 56 tenths
= 5.6
So, 7 × 0.8 = 5.6
Explanation:
To multiply a decimal number by a decimal number,
we first multiply the two numbers ignoring the decimal points and then;
place the decimal point in the product in such a way that;
decimal places in the product is equal to the sum of the decimal places in the given numbers.

Question 3.
10 × 0.4 = 10 × ___ tenths
= ___ tenths or
= ___ or ___
So, 10 × 0.4 = ___
Answer:
10 × 0.4 = 10 × 4 tenths
= 4 tenths or
= 4.0 or 4
So, 10 × 0.4 = 4
Explanation:
To multiply a decimal number by a decimal number,
we first multiply the two numbers ignoring the decimal points and then;
place the decimal point in the product in such a way that;
decimal places in the product is equal to the sum of the decimal places in the given numbers.

Multiply. Write the product as a decimal.

Example
3 × 0.03 = 3 × 3
= 9 hundredths
= 0.09
So, 3 × 0.03 = 0.09

Question 4.
5 × 0.02 = 5 × ___ hundredths
= ____ hundredths
= ___ or _____
So, 5 × 0.02 = ____
Answer:
5 × 0.02 = 5 × 2 hundredths
= 10 hundredths
= 10/100 or 0.1
So, 5 × 0.02 = 0.1
Explanation:
To multiply decimals, first multiply as if there is no decimal.
Next, count the number of digits after the decimal in each factor.
Finally, when only one factor has decimal place value,
the product will have as many decimal place values as that one factor.

Question 5.
7 × 0.07 = 7 × ___ hundredths
= ____ hundredths
= ___ or _____
So, 7 × 0.07 = ____
Answer:
7 × 0.07 = 7 × 7 hundredths
= 49 hundredths
=  49/100 or 0.49
So, 7 × 0.07 = 0.49
Explanation:
To multiply decimals, first multiply as if there is no decimal.
Next, count the number of digits after the decimal in each factor.
Finally, when only one factor has decimal place value,
the product will have as many decimal place values as that one factor.

Question 6.
6 × 0.12 = 6 × ___ hundredths
= ____ hundredths
= ___
So, 6 × 0.12 = ____
Answer:
6 × 0.12 = 6 × 12 hundredths
= 72 hundredths
= 0.72
So, 6 × 0.12 = 0.72
Explanation:
To multiply decimals, first multiply as if there is no decimal.
Next, count the number of digits after the decimal in each factor.
Finally, when only one factor has decimal place value,
the product will have as many decimal place values as that one factor.

Follow the steps to multiply 2.6 by 3. Fill in the blanks.

Question 7.

Multiply the tenths by 3.
3 × 6 tenths = _18_ tenths
Regroup the tenths.
18___ tenths = _1__ one and __6_ tenths
Step 2

Multiply the tenths by 3.
3 × 2 ones = _6__ ones
Add the ones.
_6__ ones + _1_ one = _7_ ones
So, 3 × 2.6 = _7.8__

Multiply.

Question 8.

Answer: 2.4
Explanation:
Multiply the tenths by 8.
8 × 3 tenths = 24 tenths
Regroup the tenths.
24 tenths = 2 one and  4 tenths
Step 2

Multiply the tenths by 8.
8 × 0 ones = 0 ones
Add the ones.
0 ones + 2 one = 2 ones
So, 0.3 × 8 = 2.4

Question 9.

Answer: 10.4
Explanation:
Multiply the tenths by 4.
4 × 6 tenths = 24 tenths
Regroup the tenths.
24 tenths = 2 one and  4 tenths
Step 2

Multiply the tenths by 4.
4 × 2 ones = 8 ones
Add the ones.
8 ones + 2 one = 10 ones
So, 2.6 × 4 = 10.4

Question 10.

Answer: 39.5
Explanation:
Multiply the tenths by 5.
5 × 9 tenths = 45 tenths
Regroup the tenths.
45 tenths = 4 one and  5 tenths
Step 2

Multiply the tenths by 5.
5 × 7 ones = 35 ones
Add the ones.
35 ones + 4 one = 39 ones
So, 7.9 × 5 = 39.5

Question 11.

Answer: 86.8
Explanation:
Multiply the tenths by 7.
7 × 4 tenths = 28 tenths
Regroup the tenths.
28 tenths = 2 one and  8 tenths
Step 2

Multiply the tenths by 5.
7 × 12 ones = 84 ones
Add the ones.
84 ones + 2 one = 86 ones
So, 12.4 × 7 = 86.8

Question 12.
Step 1

Answer: 8.76
Explanation:
Multiply the hundredths by 6.
6 × 6 hundredths =36 hundredths
Regroup the tenths.
36 hundredths = 3 tenths and 6 hundredths

Step 2

Multiply the tenths by 6.
6 × 4 tenths = 24 tenths
Add the tenths.
24 tenths + 3 tenths = 27 tenths
Regroup the tenths.
27 tenths = 2 ones and 7 tenths

Step 3

Multiply the ones by 6.
6 × 1 ones = 6 ones
Add the ones.
6 ones + 2 ones = 8 ones
So, 6 × 1.46 = 8.76

Multiply.

Question 13.

Answer: 50.07
Explanation:
Multiply the hundredths by 5.
5 × 7 hundredths =35 hundredths
Regroup the tenths.
35 hundredths = 3 tenths and 5 hundredths

Step 2

Multiply the tenths by 5.
5 × 0 tenths = 0 tenths
Add the tenths.
0 tenths + 3 tenths = 3 tenths
Regroup the tenths.
3 tenths = 0 ones and 3 tenths

Step 3

Multiply the ones by 6.
5 × 10 ones = 50 ones
Add the ones.
50 ones + 0 ones = 50 ones
So, 5 × 10.07 = 50.35

Question 14.

Answer: 3
Explanation:
Multiply the tenths by 4.
4 × 5 tenths = 20 tenths
Regroup the tenths.
20 tenths = 2 one and  0 tenths
Step 2

Multiply the tenths by 4.
4 × 7 ones = 28 ones
Add the ones.
28 ones + 2 one = 2 ones
So, 0.75 × 4 = 3

Question 15.

Answer: 27.54
Explanation:
Multiply the hundredths by 9.
9 × 6 hundredths =54 hundredths
Regroup the tenths.
54 hundredths = 5 tenths and 4 hundredths

Step 2

Multiply the tenths by 9.
9 × 0 tenths = 0 tenths
Add the tenths.
0 tenths + 54 tenths = 54 tenths
Regroup the tenths.
54 tenths = 5 ones and 4 tenths

Step 3

Multiply the ones by 9.
9 × 3 ones = 27 ones
Add the ones.
27 ones + 0 ones = 27 ones
So, 9 × 3.06 = 27.54

Question 16.

Answer: 121.92
Explanation:
Multiply the hundredths by 8.
8 × 4 hundredths =32 hundredths
Regroup the tenths.
32 hundredths = 3 tenths and 2 hundredths

Step 2

Multiply the tenths by 8.
8 × 2 tenths = 16 tenths
Add the tenths.
16 tenths + 3 tenths = 3 tenths
Regroup the tenths = 19

Step 3

Multiply the ones by 8.
8 × 15 ones = 120 ones
Add the ones.
120 ones + 1 ones = 121 ones
So, 8 × 15.24 = 121.92

Question 17.
4 × 2.08 = ___
Answer: 8.32
Explanation:
Multiply the hundredths by 4.
4 × 8 hundredths =32 hundredths
Regroup the tenths.
32 hundredths = 3 tenths and 2 hundredths

Step 2

Multiply the tenths by 4.
4 × 0 tenths = 16 tenths
Add the tenths.
0 tenths + 3 tenths = 3 tenths

Step 3

Multiply the ones by 4.
4 × 2 ones = 8 ones
Add the ones.
8 ones + 32 ones = 8.32 ones
So, 4 × 2.o8 = 8.32

Question 18.
3 × 3.29 = ___
Answer: 9.87
Explanation:
Multiply the hundredths by 3.
9 × 3 hundredths =27 hundredths
Regroup the tenths.
27 hundredths = 2 tenths and 7 hundredths

Step 2

Multiply the tenths by 3.
3 × 2 tenths = 6 tenths
Add the tenths.
6 tenths + 0 tenths = 6 tenths
Regroup the tenths
6 tenths + 2 tenths = 8 tenths

Step 3

Multiply the ones by 6.
6 × 3 ones = 18 ones
Add the ones.
8 ones + 1 ones = 9 ones
So, 3 × 3.29 = 9.87

Question 19.
7 × 5.71 = ___
Answer: 39.97
Explanation:
Multiply the hundredths by 7.
1 × 7 hundredths =7 hundredths
Regroup the tenths.
7 hundredths = 0 tenths and 7 hundredths

Step 2

Multiply the tenths by 7.
7 × 7 tenths = 49 tenths
Add the tenths.
49 tenths + 0 tenths = 49 tenths
Regroup the tenths
49 tenths = 4 ones and 7 tenths

Step 3

Multiply the ones by 7.
5 × 7 ones = 35 ones
Add the ones.
35 ones + 4 ones = 39 ones
So, 7 × 5.71 = 39.97

Question 20.
6 × 4.81 = ___
Answer: 28.86
Explanation:
Multiply the hundredths by 6.
1 × 6 hundredths =6 hundredths
Regroup the tenths.
6 hundredths = 0 tenths and 6 hundredths

Step 2

Multiply the tenths by 6.
8 × 7 tenths = 48 tenths
Add the tenths.
48 tenths + 0 tenths = 48 tenths
Regroup the tenths
48 tenths = 4 ones and 8 tenths

Step 3

Multiply the ones by 6.
4 × 6 ones = 24 ones
Add the ones.
24 ones + 4 ones = 28 ones
So, 6 × 4.81 = 28.81

Question 21.
9 × 7.46 = ___
Answer: 67.14
Explanation:
Multiply the hundredths by 9.
9 × 6 hundredths =54 hundredths
Regroup the tenths.
54 hundredths = 5 tenths and 4 hundredths

Step 2

Multiply the tenths by 9.
9 × 4 tenths = 36 tenths
Add the tenths.
36 tenths + 5 tenths = 41 tenths
Regroup the tenths
41 tenths = 4 ones and 1 tenths

Step 3

Multiply the ones by 9.
9 × 7 ones = 63 ones
Add the ones.
63 ones + 4 ones = 67 ones
So, 9 × 7.46 = 67.14

Question 22.
8 × 6.52 = ___
Answer: 52.16
Explanation:
Multiply the hundredths by 8.
8 × 2 hundredths =16 hundredths
Regroup the tenths.
16 hundredths = 1 tenths and 6 hundredths

Step 2

Multiply the tenths by 8.
8 × 5 tenths = 40 tenths
Add the tenths.
40 tenths + 1 tenths = 41 tenths
Regroup the tenths
41 tenths = 4 ones and 1 tenths

Step 3

Multiply the ones by 8.
8 × 6 ones = 48 ones
Add the ones.
48 ones + 4 ones = 52 ones
8 × 6.52 = 52.16

Write the correct decimal in each box.

Example

Question 23.

Answer: 21.38

Explanation:
0.46 x 3
3 × 0.46 = 3 × 46 hundredths
= 138 hundredths
= 1.38
So, 3 × 0.46 = 1.38
20+1.38 = 21.38

Question 24.

Answer:20.04

Explanation:
6 x 0.84
6 × 0.84 = 6 × 84 hundredths
= 504 hundredths
= 5.04
So, 6 × 0.84 = 5.04
15+5.04 = 20.04

Question 25.

Answer: 31.4

Explanation:
5×1.28
5 × 1.28 = 5 ×128 hundredths
= 640 hundredths
= 6.40
So, 5 × 1.28 = 6.40
25+6.40 = 31.4

Go through the Math in Focus Grade 3 Workbook Answer Key Chapter 6 Practice 4 Multiply by 8 to finish your assignments.

Math in Focus Grade 3 Chapter 6 Practice 4 Answer Key Multiply by 8

Complete the multiplication fact. Then show on the number line.

Question 1.
3 × 8 = ____

Answer:
3 × 8 = 24.

Explanation:
Here we have represented the number line of 3 × 8 which is 24, as it has 3 jumps of 8.

Complete the multiplication fact. Then shade to show on the area model.

Question 2.
6 × 8 = ____

Answer:
6 × 8 = 48.

Explanation:
The model of 6 × 8  is

Fill in the missing numbers.

Question 3.
8 eights = 8 × ___
Answer:
8 eights = 8 × 8 64.

Explanation:
Given that 8 eights which means 8 × 8 are 64.
So the missing digit is 8.

Question 4.
3 eights = 8 × ____
Answer:
3 eights = 8 × 3 = 24.

Explanation:
Given that 3 eights which means 3 × 8 are 24.
So the missing digit is 3.

Question 5.
6 + 6 + 6 + 6 + 6 + 6 + 6 + 6 = 8 × ____
Answer:
6 + 6 + 6 + 6 + 6 + 6 + 6 + 6 = 8 × 6 = 48.

Explanation:
Given that 6 + 6 + 6 + 6 + 6 + 6 + 6 + 6, and we can write this as 8 × 6 which is 64.
So the missing digit is 6.

Question 6.
8 + 8 + 8 + 8 + 8 + 8 = 6 × ____
Answer:
8 + 8 + 8 + 8 + 8 + 8 = 6 × 8 = 48.

Explanation:
Given that 8 + 8 + 8 + 8 + 8 + 8, and we can write this as 6 × 8 which is 48.
So the missing digit is 8.

Question 7.
5 × 8 = 8 × ____
Answer:
5 × 8 = 8 × 5 = 40.

Explanation:
Here, by using commutative property we can write 5 × 8 = 8 × 5 which is 40.

Question 8.
5 eights = 8 + 8 + ___ + ___ + ____
Answer:
5 eights = 8 + 8 + 8 + 8 + 8 = 40

Explanation:
Given that 5 eights which means 5 × 8 are 40.
So 8 + 8 + 8 + 8 + 8 = 40.

Multiply. Use multiplication facts you know to find other multiplication facts.

Question 9.
8 × 4 = 10 groups of 4 – ___ groups of 4
= ___ – ____
= ____
Answer:
8 × 4 = 10 groups of 4 – 2 groups of 4
= 32.

Explanation:
Given that
8 × 4 = 10 groups of 4 – 2 groups of 4 which is
= 40 – 16
= 32.

Question 10.
10 × 8 = ___
8 × 8 = ___ groups of 8
= 10 groups of 8 – ____ groups of 8
= ____ – ____
= ____
Answer:
10 × 8 = 80,
8 × 8 = 8 groups of 8 = 64.

Explanation:
Given that 10 × 8 = 80 and
8 × 8 = 8 groups of 8
= 10 groups of 8 – 2 groups of 8
= 80-16
= 64.

Question 11.
5 × 8 = ____
7 ×8 = ___ groups of 8
= 5 groups of 8 + ___ groups of 8
= ___ + ____
= ___
Answer:
5 × 8 = 40.
7 ×8 = 7 groups of 8 = 56.

Explanation:
Given that 5 × 8 which is 40 and
7 ×8 = 7 groups of 8 which is
= 5 groups of 8 + 2 groups of 8
= 40+16
= 56.

Multiply and match.

Question 12.

Answer:

Question 13.
What is the missing multiplication fact? ___
Answer:
8×1 =8.

Explanation:
The missing multiplication fact is 8×1 which is 8.

Solve.

Example
An octagon has 8 equal sides.
How many sides do 5 octagons have?
5 × 8 = 40

5 octagons have 40 sides.

Question 14.
8 children make up a team.
How many children make up 7 teams?
____ children make up 7 teams.
Answer:
56 children make up 7 teams.

Explanation:
Given that 8 children make up a team. So the number of children makeup 7 teams is
8×7 which is 56 children.

Question 15.
A chocolate cake has 8 cherries.
How many cherries do 6 such cakes have?
6 such cakes have ___ cherries.
Answer:
6 such cakes have 48 cherries.

Explanation:
Given that a chocolate cake has 8 cherries. So for 6 cakes, there will be
6×8 which is 48 cherries.

Go through the Math in Focus Grade 3 Workbook Answer Key Chapter 7 Practice 2 Multiplying Without Regrouping to finish your assignments.

Math in Focus Grade 3 Chapter 7 Practice 2 Answer Key Multiplying Without Regrouping

Fill in the missing numbers.

Example
2 × 13 = ?
2 × 3 ones = 6 ones.
2 × 1 ones = 2 tens.
so, 2 × 13 = 26

Question 1.
2 × 342 = ?
2 × ___ ones = ___ ones
2 × ___ tens = ___ tens
2 × ___ hundreds = ___ hundreds
So, 2 × 342 = ___

Answer:
2 × 342 = 684.

Explanation:
Given to find 2 × 342, so in the first step, we will multiply
2 × 2 ones = 4 ones, and then we will multiply
2 × 4 tens = 8 tens, and then we will multiply
2 × 3 hundreds = 6 hundreds
So, 2 × 342 = 684.

Question 2.
3 × 312 = ?
3 × ___ ones = ___ ones
3 × ___ tens = ___ tens
3 × ___ hundreds = ___ hundreds
So, 3 × 312 = ___

Answer:
3 × 312 = 936.

Explanation:
Given that to find 2 × 342, so in the first step, we will multiply
3 × 2 ones = 6 ones, and then we will multiply
3 × 1 tens = 3 tens, and then we will multiply
3 × 3 hundreds = 9 hundreds
So, 3 × 312 = 936.

Question 3.
4 × 201 = ?
4 × ___ one = ___ ones
3 × ___ tens = ___ tens
4 × ___ hundreds = ___ hundreds
So, 4 × 201 = ___

Answer:
4 × 201 = 804.

Explanation:
Given that 4 × 201, so in the first step, we will multiply
4 × 1 one = 4 ones, and then we will multiply
4 × 0 tens = 0 tens, and then we will multiply
4 × 2 hundreds = 8 hundreds
So, 4 × 201 = 804.

Multiply.

Example

Question 4.

Answer:
321 × 3 = 963.

Explanation:
Here, the multiplication of 321 × 3 is 963.

Question 5.

Answer:
102 × 4 = 408.

Explanation:
Here, the multiplication of 102 × 4 is

Question 6.

Answer:
101 × 5 = 505.

Explanation:
Here, the multiplication of 101 × 5 is

Match each caterpillar to its leafs.

Question 7.

Answer:
Here, we have matched the product and the expression.

Multiply and complete.

Question 8.
Frederick Frog is hungry. He is out hunting for his lunch. Clever Frederick Frog eats only non-poisonous flies. Flies carrying a product greater than 400 are non-poisonous. Which flies should Frederick Frog eat?

Frederick Frog Should eat flies _____
Answer:
Frederick Frog Should eat flies is B, D, F, G, H, I.

Explanation:
Given that Frederick Frog eats only non-poisonous flies, as the frog only eats non-poisonous which carries a product greater than 400. So the product which is greater than 400 is
432 × 2 is 864,
122 × 4 is 488,
222 × 3 is 666,
111 ×  5 is 555,
214 × 2 is 428,
212 × 2 is 424.
So Frederick Frog Should eat flies is B, D, F, G, H, I.

Solve.

Example
Curtis scores 22 points in a game.
He wants to score the same number of points for every game. How many points does he hope to score in 4 games?

Answer:
The number of points does he hope to score in 4 games is 88 points.

Explanation:
Given that Curtis scores 22 points in a game and he wants to score the same number of points for every game. So the number of points does he hope to score in 4 games is 22 × 4 which is 88 points.

Question 9.
143 people ride the train every hour. How many people ride the train in 2 hours?
Answer:
The number of people riding the train in 2 hours is 268 people.

Explanation:
Given that 143 people ride the train every hour, so the number of people riding the train in 2 hours is 143 × 2 which is 268 people.

Question 10.
A bakery sells 213 muffins a day. How many muffins does it sell in 3 days?
Answer:
The bakery sells in 3 days is 639 muffins.

Explanation:
Given that a bakery sells 213 muffins a day, so the number of muffins do the bakery sells in 3 days is 213×3 which is 639 muffins.

Question 11.
A website has 232 hits in the first week. In the second week, the website has the same number of hits. How many hits does the website have in both weeks?
Answer:
The number of hits does the website has in both weeks is 464 hits.

Explanation:
Given that a website has 232 hits in the first week and in the second week, the website has the same number of hits. So the number of hits does the website has in both weeks is 232+232 which is 464 hits.

Question 12.
A grocery store sells 202 cartons of milk a week. How many cartons of milk does it sell in 4 weeks?
Answer:
The number of cartons of milk does a grocery store sells in 4 weeks is 808 cartons.

Explanation:
Given that a grocery store sells 202 cartons of milk a week, so the number of cartons of milk does a grocery store sells in 4 weeks is 202 × 4 which is 808 cartons.

Go through the Math in Focus Grade 4 Workbook Answer Key Cumulative Review Chapters 1 and 2 to finish your assignments.

Math in Focus Grade 4 Cumulative Review Chapters 1 and 2 Answer Key

Concepts and Skills

Write each number in standard form. (Lesson 1.1)

Question 1.
forty-eight thousand, six ____
Answer: 48,006
Explanation:
– A standard form of a number in Maths is basically mentioned for the representation of large numbers or small numbers. We use exponents to represent such numbers in standard form.
– The standard form of a number is introduced to avoid the difficulty of reading large numbers. Any number that can be written in the decimal form between 1.0 to 10.0 multiplied by the power of 10.
How to write a standard form of a number:
The steps to write the standard form of a number are as follows:
Step 1: Write the first number from the given number.
Step 2: Add the decimal point after the first number.
Step 3: Now, count the number of digits after the first number from the given number and write it in the power of 10.
By using the above steps we can write the number in standard form: 48,006
The above-given is word form, that we need to convert into the standard form:
Step 1:The first number is 4.
Step 2: Adding the decimal point after the number 4, it becomes “4.”
Step 3: The number of digits after 4 is 4
Hence, the standard form of 48,006 is 4.8006× 10⁴.

Question 2.
one hundred thousand ____
Answer:100,000
Explanation:
– A standard form of a number in Maths is basically mentioned for the representation of large numbers or small numbers. We use exponents to represent such numbers in standard form.
– The standard form of a number is introduced to avoid the difficulty of reading the large numbers. Any number that can be written in the decimal form between 1.0 to 10.0 multiplied by the power of 10.
How to write a standard form of a number:
The steps to write the standard form of a number are as follows:
Step 1: Write the first number from the given number.
Step 2: Add the decimal point after the first number.
Step 3: Now, count the number of digits after the first number from the given number and write it in the power of 10.
By using the above steps we can write the number in standard form: 100,000
The above-given is word form, that we need to convert into the standard form:
Step 1:The first number is 1.
Step 2: Adding the decimal point after the number 1, it becomes “1.”
Step 3: The number of digits after 1 is 5
Hence, the standard form of 100,000 is 1× 10⁵.

Question 3.
sixty-nine thousand, two hundred eleven ____
Answer:69,212
Explanation:
– A standard form of a number in Maths is basically mentioned for the representation of large numbers or small numbers. We use exponents to represent such numbers in standard form.
– The standard form of a number is introduced to avoid the difficulty of reading the large numbers. Any number that can be written in the decimal form between 1.0 to 10.0 multiplied by the power of 10.
How to write a standard form of a number:
The steps to write the standard form of a number are as follows:
Step 1: Write the first number from the given number.
Step 2: Add the decimal point after the first number.
Step 3: Now, count the number of digits after the first number from the given number and write it in the power of 10.
By using the above steps we can write the number in standard form: 69,212
The above-given is word form, that we need to convert into the standard form:
Step 1:The first number is 1.
Step 2: Adding the decimal point after the number 6, it becomes “6.”
Step 3: The number of digits after 6 is 4
Hence, the standard form of 69,212 is 6.9212× 10^4.

Write each number in word form. (Lesson 1.1)

Question 4.
53,900 _____
Answer: fifty-three thousand nine hundred
Explanation:
Numbers in words are written using the English alphabet. Numbers can be expressed both in words and figures. For example, 100,000 in words is written as One Lakh or One hundred thousand. Numbers in words can be written for all the natural numbers, based on the place value of digits, such as ones, tens, hundreds, thousands, and so on.
Likewise, 53,900 can be written in words by using the place value of digits.

1. On putting the commas, the number is represented by 53, 900.
2. The first digits places are ten thousand and thousands place, this can be written as fifty-three thousand.
3. The comma present on the rightmost side represents nine hundred.
4. Now write the overall word form: fifty-three thousand nine hundred.

Question 5.
16,658 ____
Answer: sixteen thousand, six hundred fifty-eight.
Explanation:
Numbers in words are written using the English alphabet. Numbers can be expressed both in words and figures. For example, 100,000 in words is written as One Lakh or One hundred thousand. Numbers in words can be written for all the natural numbers, based on the place value of digits, such as ones, tens, hundreds, thousands, and so on.
Likewise, 16,658 can be written in words by using the place value of digits.

1. On putting the commas, the number is represented by 16,658.
2. The first digits places are ten thousand and thousands place, this can be written as sixteen thousand.
3. The comma present on the rightmost side represents six hundred fifty-eight.
4. Now write the overall word form: sixteen thousand, six hundred fifty-eight.

Question 6.
20,306 _____
Answer: twenty thousand, three hundred six.
Explanation:
Numbers in words are written using the English alphabet. Numbers can be expressed both in words and figures. For example, 100,000 in words is written as One Lakh or One hundred thousand. Numbers in words can be written for all the natural numbers, based on the place value of digits, such as ones, tens, hundreds, thousands, and so on.
Likewise, 20,306 can be written in words by using the place value of digits.

1. On putting the commas, the number is represented by 20,306.
2. The first digits places are ten thousand and thousands place, this can be written as twenty thousand.
3. The comma present on the rightmost side represents three hundred six.
4. Now write the overall word form: twenty thousand, three hundred six.

Fill in the blank to write the number in expanded form. (Lesson 1.1)

Question 7.
13,901 = 10,000 + ___ + 900 + 1
Answer: 10,000+3000+900+0+1
Explanation:
The expanded form of the numbers helps to determine the place value of each digit in the given number. It means that the expansion of numbers is based on the place value. The expanded form splits the number, and it represents the number in units, tens, hundreds and thousands form.
How to write the numbers in expanded form:
Go through the below steps to write the numbers in expanded form:
Step 1: Get the standard form of the number.
Step 2:Identify the place value of the given number using the place value chart.
Step 3: Multiply the given digit by its place value and represent the number in the form of (digit × place value).
Step 4: Finally, represent all the numbers as the sum of (digit × place value) form, which is the expanded form of the number.

Now the expanded form of 13,901:
Step 1: The standard form of the number is 13901.
Step 2: The place value of the given number is:
1 – Ten thousand
3 – Thousands
9 – Hundreds
0 – Tens
1 – Ones
Step 3:Multiply the given number by its place value.
(i.e.,) 1×10, 000, 3×1000, 9×100, 0×10, 1×1
Step 4:Expanded form is 10,000+ 3000+900+0+1
Finally, the expanded form of the number 35713 is 10,000+ 3000+900+0+1.

Fill in the blanks. (Lesson 1.2)

Question 8.
100 more than 26,542 is ____
Answer:26,642
Explanation:
We are looking for a new number which is 100 more than 26542.
We will get the new number by adding 100 to 26542.
We write it down as:
26542+100=26642
And finally the solution for: What number is 100 more than 26542?
is 26642.

Question 9.
____ is 100 less than 79,023.
Answer:78,923
Explanation:
We are looking for a new number which is 100 less than 79,023
We will get the new number by subtracting 100 from 78,923.
We write it down as:
79,023-100=78,923.
And finally the solution for: What number is 100 less than 79,023?
is 78,923.

Circle the number that is greater. (Lesson 1.2)

Question 10.
12,630 or 6,238
Answer:

Explanation:
12,630 > 6,238
The greater than symbol in maths is placed between two values in which the first number is greater than the second number.
Now we need to compare the numbers:
Rules to compare the numbers:
There are certain rules, based on which it becomes easier to compare numbers. These rules are:
– Numbers with more digits
– Numbers starting with a larger digit
Rule 1: Numbers with more digits
When we compare numbers, then check if both the numbers are having the same number of digits or not. If a number has more digits, then it is greater than the other number.
For example,
33 > 9 or else,
take the above-given numbers. Those are 12,630 and 6,238.
By comparing these two numbers the first number is having more digits than the second number.
So here rule 1 is applicable.
the first number is greater than the second number.
Therefore, 12,630 is greater than 6,238.

Question 11.
45,200 or 45,496
Answer:

Explanation:
Now we need to compare the numbers:
Rules to compare the numbers:
There are certain rules, based on which it becomes easier to compare numbers. These rules are:
– Numbers with more digits
– Numbers starting with a larger digit
Rule 1: Numbers with more digits
When we compare numbers, then check if both the numbers are having the same number of digits or not. If a number has more digits, then it is greater than the other number.
Rule 2: Numbers starting with a larger digit
This rule is applicable when two numbers are having the same number of digits. In such cases, we need to check the digit at the leftmost place, whichever is greater. Therefore, the number with a greater digit at the leftmost place of the number is greater than the other number.
the above-given numbers are having the same number of digits. So rule 2 is applicable here.
– 45,200 and 45,496 both the numbers have an equal number of digits, therefore, we will compare the left-most digit of both the numbers.
– As we can see the first two digits are the same for both the numbers, thus we need to compare the next left-most digit of both numbers.
– Now compare 2 and 4, here we need to circle the greatest number. So check out the number having 4 in the hundreds place, that could be the greatest number.
4 > 2
Therefore, the second number is having 4 in the hundreds place.
Thus, 45,496 > 45,200
Hence, the second number is greater than the first number.
45,496 is greater than 45,200.

Question 12.
62,529 or 69,522
Answer:

Explanation:
Rule 2 is applicable here because both numbers are having the same number of digits.
Now we compare the place value of digits in both numbers.
– 62,529 or 69,522 both the numbers have an equal number of digits, therefore, we will compare the left-most digit of both the numbers.
– As we can see the first digits are the same for both the numbers, thus we need to compare the next left-most digit of both numbers.
– Now compare 2 and 9, here we need to circle the greatest number. So check out the number 9 having in the thousands place, that could be the greatest number.
9 > 2
Therefore, the second number is having 4 in the hundreds place.
Thus, 69,522 > 62,529
Hence, the second number is greater than the first number.
69,522 is greater than 62,529.

Question 13.
90,236 or 87,415
Answer:

Explanation:
Rule 2 is applicable because both the numbers are having the same number of digits.
90,236 and 87,415 both the numbers have an equal number of digits, therefore, we will compare the left-most digit of both the numbers.
9 > 8
Therefore,
90,236 > 87,415
Hence, 90,236 is greater than 87,415.

Circle the number that is less. (Lesson 1.2)

Question 14.
6,563 or 48,200
Answer:

Explanation:
– Compare the numbers. The second number is having more digits than the first number. So rule 1 is applicable.
Rule 1: Number with more digits
When we compare numbers, then check if both the numbers are having the same number of digits or not. If a number has more digits, then it is greater than the other number.
According to rule 1, which number is having more digits is the greatest number. But here we need to circle the number which is less.
since 6,563 has 4 digits and 48,200 has 5 digits, therefore, according to rule 1, the number with more digits is greater than the number with fewer digits.
Here clearly shows that 6,563 is the less number than the second number. Because the second number is having more digits.
6,563 < 48,200
Hence, 6,563 is less than 48,200.

Question 15.
67,186 or 67,254
Answer:

Explanation:
– Compare the numbers. Both numbers are having the same digits. So the rule 2 is applicable.
Rule 2: Number starting with a greater digit
This rule is applicable when two numbers are having the same number of digits. In such cases, we need to check the digit at the leftmost place, whichever is greater. Therefore, the number with a greater digit at the leftmost place of the number is greater than the other number.
– 67,186 and 67,254 both the numbers have an equal number of digits, therefore, we will compare the left-most digit of both the numbers.
– As we can see the first two digits are the same for both the numbers, thus we need to compare the next left-most digit of both numbers.
– 1 < 2
Therefore,
67,186 < 67,254
Hence, 67,186 is smaller than 67,254.

Question 16.
74,258 or 71,852
Answer:

Explanation:
– 74,258 and 71,852 both the numbers have an equal number of digits, therefore, we will compare the left-most digit of both the numbers.
– But the left-most digit is also the same for both numbers, i.e.,7. So, we need to check the second left-most digit.
– Now compare 4 and 1. Here we need to circle the least number. So check the number having 1 in the thousands place and that number is the less number than the other number.
1 < 4
– The number 1 is having in the second number so the second number is less than the first number.
Therefore,
71,852 < 74,258
Hence, 71,852 is the smallest number than 74,258.

Question 17.
96,125 or 69,521
Answer:

Explanation:
– 96,125 and 69,521 both the numbers have an equal number of digits, therefore, we will compare the first left-most digit of both the numbers.
– Compare 9 from the first number and 6 from the second number. Here we need to circle the less number so check the number which is having the least.
6 < 9
Therefore,
69,521 < 96,125
Hence, 69,521 is the smallest number than 96,125.

Write the set of numbers in order from least to greatest. (Lesson 1.2)

Question 18.

Answer:

Explanation:
– By applying rule 1 and rule 2 we can write the numbers from least to greatest.
– Here four numbers are given. Those are 8654, 56207, 56719, 68543.
– Three numbers are having the same digits and the first number is having 4 digits. So by applying rule 1, we can conclude that the first number is the least number that is 8,654.
– Now we need to compare the remaining three numbers. For these three numbers, we need to apply rule 2.
– 56207, 56719, 68543 the three numbers have an equal number of digits, therefore, we will compare the left-most digit of both the numbers.
– 56207 and 56719 As we can see the first two digits are the same for both the numbers, thus we need to compare the next left-most digit of both numbers.
– 2 < 7
Therefore,
56207 < 56719
Hence, 56207 is smaller than 56719.
– Now compare the 56207, 56719, 68543. As we already know, 56207 is smaller so let us check for 56719 and 68543.
– 5 < 6
Therefore,
56719 < 68543.
– hence, 56719 is smaller than 68543.
Now finally we can say:
8654 < 56207 < 56719 < 68543.

Continue or complete each number pattern. (Lesson 1.2)

Question 19.
11,500 11,000 10,500 _____ ____ ______
Answer: 10,000  9,500  9,000
Explanation:
Number patterns: A list of numbers that follow a certain sequence is known as patterns or number patterns.
– In Mathematics, a pattern is a repeated arrangement of numbers, shapes, colours and so on. The Pattern can be related to any type of event or object. If the set of numbers is related to each other in a specific rule, then the rule or manner is called a pattern. Sometimes, patterns are also known as a sequence. Patterns are finite or infinite in numbers.
Now the above-given pattern is an arithmetic pattern:
The arithmetic pattern is also known as the algebraic pattern. In an arithmetic pattern, the sequences are based on the addition or subtraction of the terms. If two or more terms in the sequence are given, we can use addition or subtraction to find the arithmetic pattern.
Here we need to find out the missing terms in the sequence.
– Here we can use the subtraction process to figure out the missing terms in the patterns.
In the pattern, the rule used is “ subtract 500  to the previous term to get the next term”.
The above-given numbers, take the second term (11,000). If we subtract  “500” to the second term (11,000), we get the third term of 11,000-500=10,500
Similarly, we can find the unknown terms in the sequence.
First missing term: The previous term is 10,500. Therefore, 10,500-500 = 10,000.
Second missing term: The previous term is 10,000. So, 10,000-500 = 9,500
Third missing term: The previous term is 9,500. So, 9,500-500=9,000
hence, the complete arithmetic pattern is 11,500  11,000  10,500  10,000   9,500   9,000

Question 20.
63,800 64,100 64,400 ___ ___ _____
Answer: 64,700   65,000   65,300
Explanation:
Now the above-given pattern is an arithmetic pattern:
The arithmetic pattern is also known as the algebraic pattern. In an arithmetic pattern, the sequences are based on the addition or subtraction of the terms. If two or more terms in the sequence are given, we can use addition or subtraction to find the arithmetic pattern.
Here we need to find out the missing terms in the sequence.
– Here we can use the addition process to figure out the missing terms in the patterns.
In the pattern, the rule used is “ add 300  to the previous term to get the next term”.
The above-given numbers, take the second term (64,100). If we add  “300” to the second term (64,100), we get the third term of 64,400.
Similarly, we can find the unknown terms in the sequence.
First missing term: The previous term is 64,400. Therefore, 64,400+300 = 64,700
Second missing term: The previous term is 64,700. So, 64,700+300 = 65,000
Third missing term: The previous term is 65,000. So, 65,000+300=65,300
hence, the complete arithmetic pattern is 63,800   64,100    64,400   64,700   65,000    65,300

Question 21.
27,852 29,853 ____ 33,855 35,856
Answer:31,854
Explanation:
Now the above-given pattern is an arithmetic pattern:
The arithmetic pattern is also known as the algebraic pattern. In an arithmetic pattern, the sequences are based on the addition or subtraction of the terms. If two or more terms in the sequence are given, we can use addition or subtraction to find the arithmetic pattern.
Here we need to find out the missing terms in the sequence.
– Here we can use the addition process to figure out the missing terms in the patterns.
In the pattern, the rule used is “ add 2001  to the previous term to get the next term”.
The above-given numbers, take the second term (29,853). If we add  “2001” to the second term (29,853), we get the third term of 31,854.
Similarly, we can find the unknown terms in the sequence.
First missing term: The previous term is 29,853. Therefore, 29,853+2001 = 31,854
hence, the complete arithmetic pattern is 27,852 29,853  31,854  33,855   33,856

Find each sum or difference. Then use rounding to check that your answers are reasonable. (Lesson 2.1)

Question 22.
522 – 389
Answer:
522-389=133
The round off a number to 133 is 100.
Here we need to round off the numbers to get reasonable answers.
Rounding off means a number is made simpler by keeping its value intact but closer to the next number. It is done for whole numbers, and for decimals at various places of hundreds, tens, tenths, etc. Rounding off numbers is done to preserve the significant numbers. The number of significant figures in a result is simply the number of figures that are known with some degree of reliability.
– There are some rules for rounding off the number:
1. To get an accurate final result, always choose the smaller place value.
2. Look for the next smaller place which is towards the right of the number that is being rounded off to. For example, if you are rounding off a digit from hundreds place, look for a digit in the tens place.
3. If the digit in the smallest place is less than 5, then the digit is left untouched. Any number of digits after that number becomes zero and this is known as rounding down.
4. If the digit in the smallest place is greater than or equal to 5, then the digit is added with +1. Any digits after that number become zero and this is known as rounding up.
The above-given numbers are 522 and 389
Step 1: Round off the given number to the nearest 100

Step 2: subtract the numbers rounded off at step 1.
Estimated difference:500-400
Estimated difference=100.
Therefore, the answer is reasonable.

Question 23.
456 + 790
Answer: 1246
456+790=1246
The round off a number to 1246 is 1000
Here we need to round off the numbers to get reasonable answers.
Rounding off means a number is made simpler by keeping its value intact but closer to the next number. It is done for whole numbers, and for decimals at various places of hundreds, tens, tenths, etc. Rounding off numbers is done to preserve the significant numbers. The number of significant figures in a result is simply the number of figures that are known with some degree of reliability.
– There are some rules for rounding off the number:
1. To get an accurate final result, always choose the smaller place value.
2. Look for the next smaller place which is towards the right of the number that is being rounded off to. For example, if you are rounding off a digit from hundreds places, look for a digit in the tens place.
3. If the digit in the smallest place is less than 5, then the digit is left untouched. Any number of digits after that number becomes zero and this is known as rounding down.
4. If the digit in the smallest place is greater than or equal to 5, then the digit is added with +1. Any digits after that number become zero and this is known as rounding up.
The above-given numbers are 456 and 790
Step 1: Round off the given number to the nearest 100

Step 2: add the numbers rounded off at step 1.
Estimated difference:500+800
Estimated difference=1300.
1300 can be rounded off to the number 1000.
Therefore, the answer is reasonable.

Find each sum or difference. Then use front-end estimation to check that your answers are reasonable. (Lesson 2.1)

Question 24.
432 + 759
Answer:
Front-end estimation definition: It is a rounding technique used to get an approximate answer to a mathematical operation. It is the process of replacing the numbers in mathematical problems with numbers that are approximate (close to) to the original numbers.
432 can be rounded down to 400
– because the tens place is less than 5, so it rounded down.
759 can be rounded up to 800
– because the tens place is equal to 5, so the hundreds digit is added by ‘+1’ and the rest of the digits will become zero.
Now add the rounded off the numbers:
=400+800
=1200
Therefore, the front-end estimation is 1200.

Question 25.
816 – 532
Answer:
Front-end estimation definition: It is a rounding technique used to get an approximate answer to a mathematical operation. It is the process of replacing the numbers in mathematical problems with numbers that are approximate (close to) to the original numbers.
816 can be rounded down to 800
– because the tens place is less than 5, so it rounded down.
532 can be rounded up to 500
– because the tens place is less than 5, so it rounded down.
Now add the rounded off the numbers:
=800-500
=300
Therefore, the front-end estimation is 300.

Find each product. Then use rounding to check that your answers are reasonable. (Lesson 2.1)

Question 26.
383 × 3
Answer: 1149
Explanation:
383 × 3=1149
The rounding of the number 1149 is 1000.
Explanation:
– 383 can be rounded as 400
– because the tens place is greater than 5 so the hundreds place value of a digit is added by ‘+1’ then it becomes 4 and the remaining digits become zero that is 400.
– Now multiply 400×3=1200
The number 1200 also rounded of t0 1000
– because if we round up by thousand or hundred the values are less than 5 s0 it becomes 1000.

Question 27.
241 × 4
Answer:964
Explanation:
241 × 4=964
The rounding of the number 964 is 1000.
Explanation:
– 241 can be rounded as 200
– because the tens place is less than 5 s0 the hundreds place remains constant with the number 2 and the remaining places becomes zero that is 200.
– Now multiply 200×4=800
Therefore, the estimated value=800

Find each product. Then use front-end estimation to check that your answers are reasonable. (Lesson 2.1)

Question 28.
308 × 3
Answer:
The original product of 308 × 3=924
The round off value for 924 is 900
First, we need to find out the estimated values:
For the number 308, the round off value is 300
– because the tens place is less than 5 so the hundreds place remains constant that is 3 and the remaining place values will become zero then it becomes 300.
Now multiply 300 by 3
300×3=900
Thus, the front-end estimation value is 900
Therefore, the answer is reasonable.

Question 29.
126 × 5
Answer:
The original product of 126 × 5=630
The round off value for 630 is 600
First, we need to find out the estimated values:
For the number 126, the round off value is 100
– because the tens place is less than 5 so the hundreds place remains constant that is 1 and the remaining place values will become zero then it becomes 100.
Now multiply 100 by 5
100×5=500
Thus, the front-end estimation value is 500
Therefore, the answer is reasonable.

Find each quotient. Then use related multiplication facts to check that your answers are reasonable. (Lesson 2.1)

Question 30.
92 ÷ 4
Answer: 23
The division is a method of distributing a group of things into equal parts. It is one of the four basic operations of arithmetic, which gives a fair result of sharing.
Dividend  ÷ divisor = quotient
quotient is 23
the remainder is 0.

Explanation:
here we need to write the multiplication facts:
The multiplication facts of 92 are:
1 × 92 = 92
2 x 46 = 92
4 x 23 = 92
therefore, the multiplication facts (1, 92)  (1, 46)  (4, 23).

Question 31.
78 ÷ 3
Answer:
The division is a method of distributing a group of things into equal parts. It is one of the four basic operations of arithmetic, which gives a fair result of sharing.
Dividend  ÷ divisor = quotient
quotient is 26
the remainder is 0.

here we need to write the multiplication facts:
A multiplication fact is an answer to a multiplication calculation.
1  x  78 = 78
2  x  39 = 78
3  x  26 = 78
6  x  13 = 78.
therefore, the multiplication facts (1, 78)  (2, 39)  (3, 26)  (6, 13).

Find the factors of each number. (Lesson 2.2)

Question 32.
36 ____________
Answer:1, 2, 3, 4, 6, 9, 12, 18, 36
Explanation:
– The factors of 36 are the numbers that divide 36 exactly without leaving the remainder. The factors of 36 can be positive as well as negative, but the factors of 36 cannot be decimal or fraction.
– The factors of 36 are the numbers, which are multiplied in pairs resulting in the original number 36. As the number 36 is a composite number, it has many factors other than one and the number itself. Thus, the factors of 36 are 1, 2, 3, 4, 6, 9, 12, 18, and 36.

– Likewise, we need to check and write the factors.

Question 33.
40 ____________
Answer: 1, 2, 4, 5, 8, 10, 20, 40
Explanation:
– Factors of 40 are the numbers that can divide the original number 40 and result in the whole number as a quotient. Basically, when we multiply any two factors in pairs we get the original number. Whereas multiples of 40 are the extended times of it, such as 40, 80, 120, 160, 200, 240 and so on. This is the difference between factors and multiples. 40 is a composite number same as 36, 24, 18, 60, 45, etc and have more than 2 factors.
– The numbers that divide 40 exactly without leaving a remainder are the factors of 40. In other words, the factors of 40 are the numbers that are multiplied in pairs resulting in an original number. As the number 40 is an even composite number, it has many factors other than 1 and 40. Therefore, the factors of 40 are 1, 2, 4, 5, 8, 10, 20 and 40.
Factors by division method:
The factors of 40 can be found using the division method. In the division method, we need to divide 40 by different consecutive integers. The integers that divide 40 exactly without leaving any remainder are the factors of 40. Now, let’s start dividing 40 by 1.
: 40/1 = 40 (Factor 1 and remainder 0)
: 40/2 = 20 (Factor 2 and remainder 0)
: 40/4 = 10 ( Factor 4 and remainder 0)
: 40/5 = 8 (Factor 5 and remainder 0)
: 40/8 = 5 (Factor 8 and remainder 0)
: 40/10 = 4 (Factor 10 and remainder 0)
: 40/20 = 2 (Factor 20 and remainder 0)
: 40/40 = 1 (Factor 40 and remainder 0)
Thus, the factors of 40 are 1, 2, 4, 5, 8, 10, 20 and 40.
Note:
If we divide 40 by any numbers other than 1, 2, 4, 5, 8, 10, 20 and 40, it leaves the remainder and hence, they are not the factors of 40.

Question 34.
96 ____________
Answer: 1, 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, and 96.
Explanation:
-Factors of 96 are those numbers that can divide the original number evenly and leave no remainder. For example, if 2 is the factor of 96 then 96 divided by 2 is a whole number and not a fraction.
96 ÷ 2 = 48   [Remainder = 0]
– Since 96 is a composite number, therefore it will have factors more than two.
How to calculate the factors of 96:
-To find the factors of the natural number, 96, we need to check by which number 96 is evenly divisible and leaves no remainder.
– As we know, 1 and the number itself are the two common factors that all the integers will have apart from 1. Hence, 1 and 96 are the two factors of 96. By this, we can conclude that rest of the factors lies between 1 and 96.
: 96 ÷ 1 = 96  [Remainder = 0]
: 96 ÷ 2 = 48  [Remainder = 0]
: 96 ÷ 3 = 32  [Remainder = 0]
: 96 ÷ 4 = 24  [Remainder = 0]
: 96 ÷ 6 = 16  [Remainder = 0]
: 96 ÷ 8 = 12  [Remainder = 0]
: 96 ÷ 12 = 8  [Remainder = 0]
: 96 ÷ 16 = 6  [Remainder = 0]
: 96 ÷ 24 = 4  [Remainder = 0]
: 96 ÷ 32 = 3  [Remainder = 0]
: 96 ÷ 48 = 2  [Remainder = 0]
: 96 ÷ 96 = 1  [Remainder = 0]
therefore, the factors of 96 are 1, 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, and 96.

Find the common factors of each pair of numbers. (Lesson 2.2)

Question 35.
36 and 40
Answer:
FACTORS OF 36:
The factors of 36 are the numbers, which are multiplied in pairs resulting in the original number 36. As the number 36 is a composite number, it has many factors other than one and the number itself. Thus, the factors of 36 are 1, 2, 3, 4, 6, 9, 12, 18, and 36.
FACTORS OF 40:
The numbers that divide 40 exactly without leaving a remainder are the factors of 40. In other words, the factors of 40 are the numbers that are multiplied in pairs resulting in an original number. As the number 40 is an even composite number, it has many factors other than 1 and 40. Therefore, the factors of 40 are 1, 2, 4, 5, 8, 10, 20 and 40.
Then the common factors are those that are found in both lists:
The common factors are 1, 2, 4.

Question 36.
40 and 96
Answer:
FACTORS OF 40:
The numbers that divide 40 exactly without leaving a remainder are the factors of 40. In other words, the factors of 40 are the numbers that are multiplied in pairs resulting in an original number. As the number 40 is an even composite number, it has many factors other than 1 and 40. Therefore, the factors of 40 are 1, 2, 4, 5, 8, 10, 20 and 40.
FACTORS OF 96:
Factors of 96 are those numbers that can divide the original number evenly and leave no remainder.
Therefore, the factors of 96 are 1, 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, 96
Then the common factors are those that are found in both lists:
The common factors are 1, 2, 4, 8.

Find the greatest common factor of each pair of numbers. (Lesson 2.2)

Question 37.
30 and 16
_____
Answer:
The Greatest Common Factor (GCF) for 30 and 16, notation GCF(30,16), is 2.
The largest number, which is the factor of two or more numbers is called the Greatest Common Factor (GCF). It is the largest number (factor) that divide them resulting in a Natural number. Once all the factors of the number are found, there are few factors which are common in both. The largest number that is found in the common factors is called the greatest common factor. The GCF is also known as the Highest Common Factor (HCF)
Explanation:
–  The factors of 30 are 1,2,3,5,6,10,15,30.
– The factors of 16 are 1,2,4,8,16.
So, as we can see, the Greatest Common Factor or Divisor is 2, because it is the greatest number that divides evenly into all of them.

Question 38.
48 and 18
______
Answer: 6
The Greatest Common Factor (GCF) for 48 and 18, notation CGF(48,18), is 6.
Explanation:
–  The factors of 48 are 1,2,3,4,6,8,12,16,24,48;
– The factors of 18 are 1,2,3,6,9,18
So, as we can see, the Greatest Common Factor or Divisor is 6, because it is the greatest number that divides evenly into all of them.

Find the prime and composite numbers. (Lesson 2.2)

Question 39.
The prime numbers are ______
Answer: 31, 47
Definition: A prime number is a positive integer having exactly two factors. If p is a prime, then its only factors are necessarily 1 and p itself. Any number that does not follow this is termed a composite number, which can be factored into other positive integers. Another way of defining it is a positive number or integer, which is not a product of any other two positive integers other than 1 and the number itself.
Properties of prime numbers:
Some of the properties of prime numbers are listed below:
– Every number greater than 1 can be divided by at least one prime number.
– Every even positive integer greater than 2 can be expressed as the sum of two primes.
– Except for 2, all other prime numbers are odd. In other words, we can say that 2 is the only even prime number.
– Two prime numbers are always coprime to each other.
– Each composite number can be factored into prime factors and individually all of these are unique in nature.

Question 40.
The composite numbers are _____
Answer:
Definition 1: In Mathematics, composite numbers are numbers that have more than two factors.
Definition 2: The numbers which can be generated by multiplying the two smallest positive integers and containing at least one divisor other than the number ‘1’ and itself are known as composite numbers. These numbers always have more than two factors.
Fact: Any even number which is greater than 2 is a composite number.
Properties of composite numbers:
The properties of composite numbers are easy to remember.
– Composite numbers have more than two factors
– Composite numbers are evenly divisible by their factors
– Each composite number is a factor in itself
– The smallest composite number is 4
– Each composite number will include at least two prime numbers as its factors (Eg. 10 = 2 x 5, where 2 and 5 are prime numbers)
– Composite numbers are divisible by other composite numbers also
Composite number examples:
The examples of composite numbers are 6, 14, 25, 30, 52, etc, such that:
The factors of 6 are: 1, 2, 3, 6
The factors of 14 are: 1, 2, 7, 14
The factors of 25 are: 1, 5, 25
The factors of 30 are: 1, 2, 3, 5, 6, 10, 15, 30
The factors of 52 are: 1, 2, 4, 13, 26, 52
In all the above examples, we can see the composite numbers have more than two factors.

List the first eight multiples of each number. (Lesson 2.3)

Question 41.
4 ______
Answer:
Any number that can be expressed in the form of 4n where n is an integer, is a multiple of 4. As we know, if two values, p and q, are there, we say that q is a multiple of p if q = np for some integer n. In other words, the multiples of 4  are the numbers that leave no remainder (i.e. Remainder = 0), when it is divided by 4.
First 8 multiples of 4 are: 4, 8, 12, 16, 20, 24, 28, 32.
For example, 24, 28, 32 are said to be the multiples of 4 for the following reasons.
4 × 6 = 24; 4 multiplied by 6 to get 24
4 × 7 = 28; 4 multiplied by 7 to get 28
4 × 8 = 32; 4 multiplied by 8 to get 32
Also, we can say
24/4 = 6 and the remainder is 0
28/4 = 7 and the remainder is 0
32/4 = 8 and the remainder is 0.
Since the numbers are exactly divided by 4, the numbers 24, 28, 32 are multiples of 4.

Question 42.
6 ______
Answer:6, 12, 18, 24, 30, 36,42, 48
Multiples of 6 explanations:
The multiples for 6 are the numbers that are generated when 6 is multiplied by any natural number, such as 1, 2, 3, 4, 5, 6, 7, etc. That means any number that can be expressed in the form of 6n where n is an integer is a multiple of 6. As we know, if two values, p and q, are there, we say that q is a multiple of p if q = np for some integer n.
The first eight multiples of 6 are  6, 12, 18, 24, 30, 36, 42, 48.
6 × 1 = 6
6 × 2 = 12
6 × 3 = 18
6 × 4 = 24
6 × 5 = 30
6 × 6 = 36
6 × 7 = 42
6 × 8 = 48
– We can also find the multiples through the repeated addition of a number as many times as required. For example, to get the first five multiples of 6, we have to multiply 6 by 1, 2, 3, 4 and 5 or add the number of times as shown below:
: The first multiple of 6 is: 6 × 1 = 6
: The second multiple of 6 is: 6 × 2 = 12 Or 6 + 6 = 12 {here 6 is added for twice}
: The third multiple of 6 is: 6 × 3 = 18 Or 6 + 6 + 6 = 18 {here 6 is added for thrice}
: The fourth multiple of 6 is: 6 × 4 = 24 Or 6 + 6 + 6 + 6 = 24
: The fifth multiple of 6 is: 6 × 5 = 30 Or 6 + 6 + 6 + 6 + 6 = 30
Similarly, we write several multiples of the given numbers.

Question 43.
9 ______
Answer:9, 18, 27, 36, 45, 54, 63, 72
Multiples of 9 explanations:
Any number that can be denoted in the form 9n where n is a natural number, is a multiple of 9. So if two values p and q are there, we say that q is a multiple of p if q = np. In other words, the multiples of 9 are the numbers that leave no remainder (i.e. Remainder = 0), when it is divided by 9.
The first 8 multiples of 9 are:9, 18, 27, 36, 45, 54, 63, 72
For example, 54, 63, 72 are said to be the multiples of 4 for the following reasons.
9 × 6 = 54; 4 multiplied by 6 to get 54
9 × 7 = 63; 4 multiplied by 7 to get 63
9 × 8 = 72; 4 multiplied by 8 to get 72
Also, we can say
54/9 = 6 and the remainder is 0
63/9 = 7 and the remainder is 0
72/9 = 8 and the remainder is 0.
Since the numbers are exactly divided by 9, the numbers 54, 63, 72 are multiples of 9.

Find the first two common multiples of each pair of numbers. (Lesson 2.3)

Question 44.
4 and 6
______
Answer: 12, 24
Explanation:
– Common multiples of 4 and 6 are numbers that both 4 and 6 can be divided into evenly with no remainder.
– To find the common multiples of 4 and 6, we compare the list of multiples of 4 with the list of multiples of 6 to see what they have in common.
– To create a list of multiples of 4, we multiply 4 by 1, 4 by 2, and so on like this:
4 x 1 = 4
4 x 2 = 8
4 x 3 = 12
4 x 4 = 16…
– Similarly, to create a list of multiples of 6, we multiply 6 by 1, 6 by 2, and so on like this:
6 x 1 = 6
6 x 2 = 12
6 x 3 = 18
6 x 4 = 24…
When we compare the two lists to see what they have in common, we get the answer to “What are the common multiples of 4 and 6?”
– 12, 24, 36, 48, etc.
Since 12 is the first number they have in common, 12 is the least common multiple of 4 and 6.
Therefore, the first two common multiples are 12 and 24.
Question 45.
6 and 9
______
Answer: 18 and 36
Explanation:
– Common multiples of 6 and 9 are numbers that both 6 and 9 can be divided into evenly with no remainder.
– To find the common multiples of 6 and 9, we compare the list of multiples of 6 with the list of multiples of 9 to see what they have in common.
– To create a list of multiples of 6, we multiply 6 by 1, 6 by 2, and so on like this:
6 x 1 = 6
6 x 2 = 12
6 x 3 = 18
6 x 4 = 24…
– Similarly, to create a list of multiples of 9, we multiply 9 by 1, 9 by 2, and so on like this:
9 x 1 = 9
9 x 2 = 18
9 x 3 = 27
9 x 4 = 36
…
– When we compare the two lists to see what they have in common, we get the answer to “What are the common multiples of 6 and 9?”
– 18, 36, 54, 72, etc.
– Since 18 is the first number they have in common, 18 is the least common multiple of 6 and 9.
– Therefore, the first two common multiples of 6 and 9 are 18 and 36.

Find the least common multiple of each pair of numbers. (Lesson 2.3)

Question 46.
8 and 12
____________
Answer:
LCM is the method to find the smallest possible multiple of two or more numbers. LCM stands for Least common multiple. LCM of two numbers is divisible by both numbers.
We can find the LCM in two ways
– By listing the multiples
– By prime factorisation
LCM of 8 and 12:
First Method: Listing the multiples
– First, write the common multiples of all three numbers.
– Common Multiples of 8: 8,16,24,32,40,48,56,64,72,80….
– Common Multiples of 12: 12,24,36,48,60,72,………..
– Hence the Least common multiple of 8 and 12= 24

Question 47.
27 and 36
____________
Answer:
LCM is the method to find the smallest possible multiple of two or more numbers. LCM stands for Least common multiple. LCM of two numbers is divisible by both numbers.
We can find the LCM in two ways
– By listing the multiples
– By prime factorisation
LCM of 27 and 37:
Solution by using division method:
This method consists of grouping by separating the numbers that will be decomposed on the right side by commas while on the left side we put the prime numbers that divide any of the numbers on the right side. We start with the lowest prime numbers, divide all the rows of numbers by a prime number that is evenly divisible into ‘at least one of the numbers. We stop when it is no longer possible to divide (the last row of results is all 1’s). See below how it works step-by-step.
2 | 27, 36
2 | 27, 18
3 | 27, 9
3 | 9, 3
3 | 3, 1
1 | 1, 1
The LCM is the product of the prime numbers in the first column, so:
LCM = 2 . 2 . 3 . 3 . 3 = 108
Solution by listing multiples:
This method consists of listing the multiples of all the numbers that we want to find the LCM. Multiples of a number are calculated by multiplying that number by the natural numbers 2, 3, 4, …, etc. See below:
* The multiples of 27 are 27, 54, 81, 108
* The multiples of 36 are 36, 72, 108
Because 108 is the first number to appear on both lists of multiples, 108 is the LCM of 27 and 36.

Problem Solving

Solve. Show your work.

Question 48.
Make a 5-digit number using these clues.
The digit in the thousands place is 5.
The value of the digit in the ten thousand places is 20,000.
The digit in the tens place is 8.
One of the digits is a 0 and it is next to the digit 8.
The digit in the one’s place is 2 less than the digit in the tens place.

Answer:

Explanation:
2 is in the ten thousand place
5 is in the thousands place.
0 is in the hundreds place.
8 is in the tens place.
2 is in the one’s place.

Question 49.
3,219 millilitres of water and 185 millilitres of orange syrup are mixed to make orange juice. About how much orange juice will there be?
Answer: 3,404 millilitres.
Explanation:
The number of millilitres of water=3,219
The number of millilitres of orange syrup=185
When we mix both water and orange syrup to make orange juice. Now, how many millilitres of orange juice is there. Assume it as X.
Add both water and orange syrup
X=3219+185
X=3,404 millilitres.

Question 50.
An empty parking lot has 300 spaces. 215 cars and 89 SUVs drive into the parking lot. How many vehicles do not have parking spaces?
Answer:4 vehicles.
Explanation:
The number of spaces an empty parking has=300
The total number of spaces for cars and SUVs=215+89=304
We need to find out the number of vehicles that do not have parking spaces=X
The total number of spaces needed for vehicles=304
The number of spaces is there=300
To find out X we need to subtract the 304 and 300
X=304-300
X=4.
therefore, 4 vehicles do not have parking space.

Question 51.
Find a 2-digit number less than 50 using these clues. It can be divided by 4 exactly.
When 4 is added to it, it can be divided by 5 exactly.
The number is ____
Answer: 36
Explanation:
It is divisible by 4, but when 4 is added to it, it is divisible by 5 means that the number is a multiple of 4 and when 4 is added to it, it becomes a multiple of 5. Therefore, the number will be 4 less than a MULTIPLE of 4 & 5. Multiples of 4 & 5 that are less than 50 are: 20 and 40.
The number that’s 4 is less than 20: 16
The number that’s 4 is less than 40: 36.

Question 52.
Finch divides 12 peaches and 18 nectarines into the same number of equal groups. How many possible groups of each fruit can he make? How many are in each group?
Answer: 3 possible groups.
Explanation:
The number of peaches is there=12
the number of nectarines is there=18
She has to divide both groups into the same number of equal groups.
You need to find the common divisor of 12 and 18:
12 = 2*2*3
18 = 2*3*3
the common divisors of 12 and 18 are: 2, 3, and 6
he can make 3 possible groups:
group the fruits in 2 groups with 12/2 = 6 peaches and 18/2 = 9 nectarines in each.
group the fruits in 3 groups with 12/3 = 4 peaches and 18/3 = 6 nectarines in each.
group the fruits in 2 groups with 12/6 = 2 peaches and 18/6 = 3 nectarines in each.

This handy Math in Focus Grade 6 Workbook Answer Key Chapter 14 Measures of Central Tendency detailed solutions for the textbook questions.

Math in Focus Grade 6 Course 1 B Chapter 14 Answer Key Measures of Central Tendency

Math in Focus Grade 6 Chapter 14 Quick Check Answer Key

Divide.

Question 1.
16.5 ÷ 2
Answer:
8.25
Explanation:
The given expression is:
16.5 ÷ 2
We know that,
The number before “÷” is called a “Dividend”
The number after “÷” is called a “Divisor”
Now, by using the Long Division,

Hence, from the above,
We can conclude that the value of 16.5 ÷ 2 is: 8.25

Question 2.
48.09 ÷ 7
Answer:
6.87
Explanation:
The given expression is:
48.09 ÷ 7
We know that,
The number before “÷” is called a “Dividend”
The number after “÷” is called a “Divisor”
Now, by using the Long Division,

Hence, from the above,
We can conclude that the value of 48.09 ÷ 7 is: 6.87

Find the average of each data set.

Question 3.
2, 4, 16, 18
Answer:
10
Explanation:
The given data set is:
2, 4, 16, 18
We know that,
Average = \(\frac{The sum of the given data set}{The number of data present in the data set}\)
So, Average = \(\frac{2 + 4 + 16 + 18}{4}\)
= \(\frac{40}{4}\)
= 10
Hence, from the above,
We can conclude that the average of the given Data set is: 10

Question 4.
3, 5, 7, 8, 21, 31
Answer:
12.5
Explanation:
The given data set is:
3, 5, 7, 8, 21, 31
We know that,
Average = \(\frac{The sum of the given data set}{The number of data present in the data set}\)
So, Average = \(\frac{3 + 5 + 7 + 8 + 21 + 31}{6}\)
= \(\frac{75}{6}\)
= 12.5
Hence, from the above,
We can conclude that the average of the given Data set is: 12.5

Question 5.
$14, $30, $32, $50
Answer:
$31.5
Explanation:
The given data set is:
$14, $30, $32, $50
We know that,
Average = \(\frac{The sum of the given data set}{The number of data present in the data set}\)
So, Average = \(\frac{$14 + $30 + $32 + $50}{4}\)
= \(\frac{$126}{4}\)
= $31.5
Hence, from the above,
We can conclude that the average of the given Data set is: $31.5

Question 6.
25 ft, 32 ft, 45 ft, 55 ft, 75 ft
Answer:
46.4 ft
Explanation:
The given data set is:
25 ft, 32 ft, 45 ft, 55 ft, 75 ft
We know that,
Average = \(\frac{The sum of the given data set}{The number of data present in the data set}\)
So, Average = \(\frac{25 ft + 32 ft + 45 ft + 55 ft + 75 ft}{5}\)
= \(\frac{232 ft}{5}\)
= 46.4 ft
Hence, from the above,
We can conclude that the average of the given Data set is: 46.4 ft

Practice the problems of Math in Focus Grade 3 Workbook Answer Key Chapter 12 Real-World Problems: Measurement to score better marks in the exam.

Math in Focus Grade 3 Chapter 12 Answer Key Real-World Problems: Measurement

Put On Your Thinking Cap!

Challenging Practice

Ron puts two sticks into the ground as shown. Stick B is 10 centimeters longer than Stick A. What is the length of Stick A that is above the ground?

Answer:
The length of Stick A that is above the ground = 26 Centimeters
Explanation:
Ron puts two sticks into the ground as shown.
The length of stick B = 52 + 5 = 57
Stick B is 10 centimeters longer than Stick A.
57 – 10 = 47
the length of Stick A that is above the ground = 47 – 21 = 26

Put On Your Thinking Cap!

Problem Solving

The mass of a completely filled glass of sand is 200 grams. When half of the sand is poured out, the total mass of the glass of sand is 1 20 grams. What is the mass of the empty glass?
Answer:
20 grams
Explanation:
The mass of a completely filled glass of sand is 200 grams.
When half of the sand is poured out,
200 ÷ 2 = 100
the total mass of the glass of sand is 1 20 grams.
120 – 100 = 20
20 grams is  the mass of the empty glass

Go through the Math in Focus Grade 3 Workbook Answer Key Chapter 2 Practice 3 More Mental Addition to finish your assignments.

Math in Focus Grade 3 Chapter 2 Practice 3 Answer Key More Mental Addition

Add mentally. First, add 100. Then, subtract the extra ones.

Example

Question 1.
26 + 96 = ?
26 + 100 = ___
26 + 96 = ___ – ___ – ___
= ____
So, 26 + 96 = ___

Answer:

26 + 100 = 126
26 + 96 = 126 – 4
= 122
So, 26 + 96 = 122

Question 2.
38 + 95 = ?
38 + 100 = ___
___ – ___ = ___
So, 38 + 95 = ___

Answer:

38 + 100 = 138
138 – 5 = 133
So, 38 + 95 = 133

Add mentally.
First, add the hundreds. Then, subtract the extra ones.

Example

Question 3.
98 + 96 = ?
100 + 100 = ___
98 + 96 = ___ – ___ – ___
= ___
So, 98 + 96 = ____

Answer:

100 + 100 = 200
98 + 96 = 200 – 2 – 4
= 194
So, 98 + 96 = 194

Question 4.
94 + 98 = ?
100 + 100 = ___
94 + 98 = ___ – ___ – ____
= ____
So, 94 + 98 = ___

Answer:

100 + 100 = 200
94 + 98 = 200 – 6 – 2
= 192
So, 94 + 98 = 192