Prasanna

Refer to our Texas Go Math Grade 3 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 3 Lesson 3.4 Answer Key Model Equivalent Fractions.

Texas Go Math Grade 3 Lesson 3.4 Answer Key Model Equivalent Fractions

Essential Question
How can you use models to find equivalent fractions?
Answer:
Two fractions are equivalent (equal) if they are of the same size or are at the same point on a number line.

Investigate
Materials sheet of paper crayon or color pencil

Two or more fractions that name the same amount are called equivalent fractions. You can use a sheet of paper
to model fractions equivalent to \(\frac{1}{2} \text {. }\)

A. First, fold a sheet of paper into two equal parts. Open the paper and count the parts.
There are 2 equal parts. Each part is \(\frac{1}{2}\) of the paper.
Shade one of the halves. Write \(\frac{1}{2}\) on each of the halves.

B. Next, fold the paper in half two times. Open the paper.
Now there are 4 equal parts. Each part is \(\frac{1}{4}\) of the paper.
Write \(\frac{1}{4}\) on each of the fourths.
Look at the shaded parts. \(\frac{1}{2}\) = \(\frac{2}{4}\)

C. Last, fold the paper in half three times.
Now there are 8 equal parts. Each part is \(\frac{1}{8}\) of the paper.
Write \(\frac{1}{8}\) on each of the eighths.
So,
\(\frac{1}{2}\) = \(\frac{4}{8}\)
Find the fractions equivalent to \(\frac{1}{2}\) on your paper.
So,
\(\frac{1}{2}\), \(\frac{2}{4}\), and \(\frac{4}{8}\) are equivalent.

Make Connections

You can use a number line to find equivalent fractions
Find a fraction equivalent to \(\frac{2}{3}\).

Materials fraction strips

Math Talk
Mathematical Processes
Explain how the number of sixths in a distance on the number line is related to the number of thirds in the same distance.
Answer:
The given number line is:

Now,
We know that,
\(\frac{1}{6}\) = \(\frac{1}{2}\) × \(\frac{1}{3}\)
So,
We will obtain the sixths by dividing \(\frac{1}{3}\) into 2 parts
Hence, from the above,
We can conclude that
The number of sixths in a distance on the number line is \(\frac{1}{2}\) times the number of thirds in the same distance

Step 1
Draw a point on the number line to represent the distance \(\frac{2}{3}\).
Answer:
The given number line is:

Hence,
The representation of \(\frac{2}{3}\) on the given number line is:

Step 2
Use fraction strips to divide the number line into sixths. At the end of each strip, draw a mark on the number line and label the marks to show sixths.
Answer:
The given number line is:

Hence,
The representation of the sixths on the given number line is:

Step 3
Identify the fraction that names the same point as \(\frac{2}{3}\).
So, \(\frac{2}{3}\) = \(\frac{4}{6}\)

Share and Show

Shade the model. Then divide the pieces to find the equivalent fraction.

Question 1.

Answer:
The representation of the model with the original and equivalent fractions is:

Hence, from the above,
We can conclude that
\(\frac{1}{4}\) = \(\frac{2}{8}\)

Go Math Grade 3 Lesson 3.4 Model Equivalent Fractions Question 2.

Answer:
The representation of the model with the original and equivalent fractions is:

Hence, from the above,
We can conclude that
\(\frac{2}{3}\) = \(\frac{4}{6}\)

Use fraction strips or the number line to find the equivalent fraction.

Question 3.

Answer:
The given number line is:

Now,
From the given number line,
We can observe that
\(\frac{1}{2}\) = \(\frac{3}{6}\)
Hence, from the above,
We can conclude that

Question 4.

Answer:
The given number line is:

Now,
From the given number line,
We can observe that
\(\frac{3}{4}\) = \(\frac{6}{8}\)
Hence, from the above,
We can conclude that

Problem Solving

Use the pictures to solve 5-9.

Question 5.
H.O.T. Multi-Step Mrs. Akers bought three sandwiches that were the same size. She cut the first one into thirds. She cut the second one into fourths and the third one into sixths. Marian ate 2 pieces of the first sandwich. Jason ate 2 pieces of the second sandwich. Marcos ate 3 pieces of the third sandwich. Which children ate the same amount of a sandwich?

The first sandwich was cut into 3 parts.
Manan ate 2 pieces of the sandwich. Shade the part Manan ate.

Manan ate \(\frac{2}{3}\) of the first sandwich.

The second sandwich was cut into 4 pieces
Jason ate 2 pieces of the sandwich. Shade the part Jason ate.

Jason ate\(\frac{2}{4}\) of the second sandwich.

The third sandwich was cut into 6 pieces.
Marcos ate 3 pieces of the sandwich. Shade the part Marcos ate.

Marcos ate \(\frac{3}{6}\) of the third sandwich.

Go Math Grade 3 Lesson 3.4 Answer Key Question 6.
Are all the fractions equivalent?
Answer:
From the above problem,
The fractions we obtained are:
\(\frac{2}{3}\), \(\frac{2}{4}\), and \(\frac{3}{6}\)
So,
From the above fractions,
We can observe that
\(\frac{2}{4}\) = \(\frac{3}{6}\) = \(\frac{1}{2}\)
Hence, from the above,
We can conclude that
All the fractions are not equivalent

Question 7.
Which fractions are equivalent?
Answer:
From the above problem,
The fractions we obtained are:
\(\frac{2}{3}\), \(\frac{2}{4}\), and \(\frac{3}{6}\)
So,
From the above fractions,
We can observe that
\(\frac{2}{4}\) = \(\frac{3}{6}\) = \(\frac{1}{2}\)
Hence, from the above,
We can conclude that
The fractions that are equivalent is:
\(\frac{2}{4}\) = \(\frac{3}{6}\)

Question 8.
So, __ and ___ ate the same amount of a sandwich.
Answer:
So,
Jason and Marcos ate the same amount of a sandwich

Question 9.
Analyze What if Mrs. Akers cut a fourth sandwich into sixths? What fraction is equivalent to the amount Manan ate?
Answer:
It is given that
Mrs. Akers cut the fourth sandwich into sixths
So,
The amount of each sandwich Mrs. Akers will cut from the fourth sandwich = \(\frac{1}{6}\)
Now,
From the above problem,
We can observe that
The fraction of the sandwich that Marian ate is: \(\frac{2}{3}\)
Hence, from the above,
We can conclude that
The fraction of the sandwich that is equivalent to Marian ate is: \(\frac{4}{6}\) (or) \(\frac{6}{9}\)

Daily Assessment Task

Fill in the bubble for the correct answer choice.

Go Math Lesson 3.4 Answer Key 3rd Grade Question 10.
Three brothers want an equal share of an apple. Each will get \(\frac{1}{3}\) of the apple. They cut the apple into thirds and then into sixths. How many \(\frac{1}{6}\) parts are equal to \(\frac{1}{3}\) ?
(A) 1
(B) 3
(C) 2
(D) 6
Answer:
It is given that
Three brothers want an equal share of an apple. Each will get \(\frac{1}{3}\) of the apple. They cut the apple into thirds and then into sixths
Now,
We know that,
\(\frac{1}{6}\) = \(\frac{1}{2}\) × \(\frac{1}{3}\)
So,
\(\frac{1}{3}\) = 2 × \(\frac{1}{6}\)
Hence, from the above,
We can conclude that
The number of \(\frac{1}{6}\) parts that are equal to \(\frac{1}{3}\) is:

Question 11.
Use Tools Kenny ate \(\frac{3}{4}\) of an orange. Which fraction is equivalent to \(\frac{3}{4}\)?

(A) \(\frac{1}{8}\)
(B) \(\frac{2}{8}\)
(C) \(\frac{3}{8}\)
(D) \(\frac{6}{8}\)
Answer:
It is given that
Kenny ate \(\frac{3}{4}\) of an orange
Now,
The given number line is:

Now,
From the above number line,
We can observe that
\(\frac{3}{4}\) = \(\frac{6}{8}\)
Hence, from the above,
We can conclude that
The fraction that is equivalent to \(\frac{3}{4}\) is:

Question 12.
Use Diagrams Multi-Step Look at the pizza at the right Which shows an equivalent fraction of eaten pizza?


Answer:
The given figure that represents thee aten pizza is:

Now,
From the above figure,
We can observe that
The fraction of the eaten pizza = \(\frac{1}{3}\)
So,
The fractions that are equivalent to \(\frac{1}{3}\) are: latex]\frac{2}{6}[/latex] (or) \(\frac{3}{9}\)
Hence, from the above,
We can conclude that
The figure that shows an equivalent fraction of eaten pizza is:

Texas Test Prep

Question 13.
Maria has \(\frac{1}{2}\) of an obstacle course left to finish. What fraction is equivalent to \(\frac{1}{2}\)?

(A) \(\frac{2}{1}\)
(B) \(\frac{5}{6}\)
(C) \(\frac{3}{6}\)
(D) \(\frac{2}{6}\)
Answer:
It is given that
Maria has \(\frac{1}{2}\) of an obstacle course left to finish
Now,
The given number line is:

Now,
From the above number line,
We can observe that
\(\frac{1}{2}\) = \(\frac{3}{6}\)
Hence, from the above,
We can conclude that
The fraction that is equivalent to \(\frac{1}{2}\) is:

Texas Go Math Grade 3 Lesson 3.4 Homework and Practice Answer Key

Shade the model. Then divide the pieces to find the equivalent fraction.

Question 1.

Answer:
The representation of the model with the original and equivalent fractions is:

Hence, from the above,
We can conclude that
\(\frac{3}{4}\) = \(\frac{6}{8}\)

Practice and Homework Lesson 3.4 Answer Key 3rd Grade Question 2.

Answer:
The representation of the model with the original and equivalent fractions is:

Hence, from the above,
We can conclude that
\(\frac{1}{2}\) = \(\frac{2}{4}\)

Question 3.

Answer:
The representation of the model with the original and equivalent fractions is:

Hence, from the above,
We can conclude that
\(\frac{1}{3}\) = \(\frac{2}{6}\)

Question 4.

Answer:
The representation of the model with the original and equivalent fractions is:

Hence, from the above,
We can conclude that
\(\frac{1}{2}\) = \(\frac{4}{8}\)

Problem Solving

Question 5.
Jason cut a sandwich into three equal pieces and ate two of the pieces. Carl cut a same-size sandwich into six pieces. Carl ate the same fraction of his sandwich as Jason did. What fraction of the sandwich did Carl eat?

Answer:
It is given that
Jason cut a sandwich into three equal pieces and ate two of the pieces. Carl cut a same-size sandwich into six pieces. Carl ate the same fraction of his sandwich as Jason did
Now,
According to the given information,
The number of pieces Jason ate the sandwich = \(\frac{2}{3}\)
Now,
Let the number of pieces Carl ate be: x pieces
So,
The number of pieces Carl ate the sandwich = \(\frac{x}{6}\)
So,
\(\frac{2}{3}\) = \(\frac{x}{6}\)
x = 4 pieces
Hence, from the above,
We can conclude that
The fraction of the sandwich did Carl eat is: \(\frac{4}{6}\)

Lesson Check

Fill in the bubble completely to show your answer. Use the number lines for 6-7.

Question 6.
After finishing \(\frac{1}{4}\) of the soccer practice, players take a water break. Which fraction is equivalent to \(\frac{1}{4}\)?

(A) \(\frac{0}{8}\)
(B) \(\frac{2}{8}\)
(C) \(\frac{6}{8}\)
(D) \(\frac{3}{8}\)
Answer:
It is given that
After finishing \(\frac{1}{4}\) of the soccer practice, players take a water break
Now,
The given number line is:

Now,
From the above number line,
We can observe that
\(\frac{1}{4}\) = \(\frac{2}{8}\)
Hence, from the above,
We can conclude that
The fraction that is equivalent to \(\frac{1}{4}\) is:

Go Math Practice and Homework Lesson 3.4 Answer Key 3rd Grade Question 7.
Carlos practiced the piano for \(\frac{2}{3}\) hour. Which fraction is equivalent to \(\frac{2}{3}\)?

(A) \(\frac{1}{6}\)
(B) \(\frac{3}{6}\)
(C) \(\frac{1}{6}\)
(D) \(\frac{4}{6}\)
Answer:
It is given that
Carlos practiced the piano for \(\frac{2}{3}\) hour
Now,
The given number line is:

Now,
From the above number line,
We can observe that
\(\frac{2}{3}\) = \(\frac{4}{6}\)
Hence, from the above,
We can conclude that
The fraction that is equivalent to \(\frac{2}{3}\) is:

Question 8.
Multi-Step Look at the circle below. Which model shows an equivalent fraction?


Answer:
The given figure is:

Now,
From the above model,
We can observe that
The fraction of the shaded part in the given figure = \(\frac{1}{2}\)
So,
The fraction that is equivalent to \(\frac{1}{2}\) is: \(\frac{2}{4}\) (or) \(\frac{3}{6}\)
Hence, from the above,
We can conclude that
The model that shows the equivalent fraction for the given model is:

Lesson 3.4 Equivalent Fractions Homework Answer Key Question 9.
Multi-Step A banner is divided into six equal parts and four parts are blue. Which fraction is equivalent to the blue parts of the banner?

(A) \(\frac{1}{3}\)
(B) \(\frac{2}{4}\)
(C) \(\frac{3}{4}\)
(D) \(\frac{2}{3}\)
Answer:
It is given that
A banner is divided into six equal parts and four parts are blue
Now,
The given model is:

Now,
According to the given information,
The fraction that is equivalent to the blue parts of the banner = (The number of parts that are blue) ÷ (The total number of parts)
= \(\frac{4}{6}\)
= \(\frac{2}{3}\)
Hence, from the above,
We can conclude that
The fraction that is equivalent to the blue parts of the banner is:

Refer to our Texas Go Math Grade 5 Answer Key Pdf to score good marks in the exams.
Test yourself by practicing the problems from Texas Go Math Grade 5 Lesson 9.1
Answer Key Formulas for Area and Perimeter.

Texas Go Math Grade 5 Lesson 9.1 Answer Key Formulas for Area and Perimeter

Unlock the Problem

A formula is an equation that expresses a mathematical rule.
You can use formulas to find the perimeter and area of rectangles.

Lloyd is planting a rectangular garden that measures 40 feet by 24 feet.
He wants to put a fence around it to protect his vegetables from rabbits.
How many feet of fencing does he need?

Use a formula to find the perimeter.
P = l + w + l + w, P = perimeter; l = length; w = width
P = 40 + ___24____ + __40_____ + ___24____ Replace the
unknowns with the lengths and the widths.
P = ___128____ Add.
The perimeter is ___128____ feet. So, Lloyd needs ___128____ feet of fencing.

Remember
Area is measured in square units, such as square feet or sq ft.
Answer:
The perimeter is 128 feet, So Lloyd needs 128 feet of fencing,

Explanation:
Lloyd is planting a rectangular garden that measures 40 feet by 24 feet.
He wants to put a fence around it to protect his vegetables from rabbits.
So number of feet of fencing does he need is using a formula to
find the perimeter P = l + w + l + w, P = perimeter; l = length; w = width is
P= 40 + 24 + 40 + 24 = 128 feet, So Lloyd needs 128 feet of fencing.

Lloyd needs to find how large his garden is so he can order enough mulch for the garden.
What is the area of Lloyd’s garden?

Use a formula to find the area.
A = l × w, A = area; I = length; w = width
A = ____40____ × __24_____ Replace the unknowns with the length and the width.
A = ____960_______ Multiply.
So, the area of Lloyd’s garden is _____960___ square feet.
Answer:
The area of the garden is 960 square feet,

Explanation:
Given Lloyd is planting a rectangular garden that measures
length 40 feet by width 24 feet, therefore the area of
Lloyd’s garden is 40 X 24 = 960 square feet.

Try This!

You can also use the formula P = 2l + 2w to find the perimeter.
What is the perimeter of a rectangle that is 12 feet long and 16 feet wide?
P = 2 × ____12_____ + 2 × ___16_______
Replace the unknowns with the length and the width.
P = __24 + 32_______
The perimeter is ___56___ feet.
Answer:
The perimeter is 56 feet,

Explanation:
Given to find the perimeter of a rectangle that is 12 feet long and 16 feet wide,
by using the formula p = 2l + 2w,
so p = 2 X 12 + 2 X 16,
p = 24 + 32,
p = 56 feet. therefore the perimeter is 56 feet.

Math Talk
Mathematical Processes

Explain how you can use the properties of operations to write P = l + w + l + w as P = 2l + 2w.
Answer:
By using properties of operations addition we write
p = l + w + l + w as P = 2l + 2w,

Explanation:
Given to write p = l + w + l + w by using properties of operations addition
we add common terms l with l and w with w we get p = (l + l) + (w + w),
p = 2l + 2 w.

Example

Find the area.

STEP 1: Separate the figure into a rectangle and a square.

STEP 2: Find the area of the rectangle.
A = l × w
A = __3 X 3_________
A = ___9________
The area of the rectangle is _____9______ square meters.

STEP 3: Find the area of the square.
A = ___5 X 4________
A = ____20_______
A = ___________
The area of the square is _____20______ square meters.

STEP 4: Find the area of the complex figure by adding the areas.
A = ____9_______ + ___20________
A = ____29_______
So, the area of the complex figure is ____29_______ square meters.
Answer:
The area of the complex figure is 29 square meters,

Explanation:
STEP 1: Separate the figure into a rectangle and a square,
STEP 2: Finding the area of the rectangle as
A = l × w,
A = 3 X 3,
A = 9,
The area of the rectangle is 9 square meters,
STEP 3: Finding the area of the square
A = 5 X 4,
A = 20,
The area of the square is 20 square meters.

STEP 4: Find the area of the complex figure by adding the areas.
A = 9 + 20,
A = 29,
So, the area of the complex figure is 29 square meters.

Share and Show

Question 1.
Find the perimeter of the square.

P = ____14_____ + ___14_____ + ___14______ + ___14______
P = _____56______
The perimeter is _____56______ meters
Answer:
The perimeter of the square is 56 meters,

Explanation:
Given the side of the square is 14 meters,
therefore the perimeter of a square is 14 + 14 + 14 + 14 = 56 meters.

5th Grade Area and Perimeter Answer Key Lesson 9.1 Question 2.
Find the area of the rectangle.

A = ____25___ × ____12_____
A = ____300_____
The area is ___300______ square feet.
Answer:
Given width 25 feet and 12 feet wide rectangle,
Therefore area of rectangle is 25 X 12 = 300 square feet.

Problem Solving

Question 3.
H.O.T. Explain how you can use s to write the formula for the
perimeter of a square with side length s.
Answer:
Perimeter= 4s,

Explanation:
Given s to write the formula for the perimeter of a square with side length s
is s + s + s + s =  4s.

Question 4.
H.O.T. A rectangle has an area of 96 square feet.
If the length of the rectangle is 12 feet,
what is the width of the rectangle?
Answer:
8 feet is the width of the rectangle,

Explanation:
Given a rectangle has an area of 96 square feet.
If the length l of the rectangle is 12 feet, let w be the
width of the rectangle as we know area of rectangle
is A = l X w substituting 96 square feet= 12 feet X w,
w = 96 square feet  ÷ 12 feet = 8 feet.

Problem Solving

Question 5.
Brent plans to stain a deck that is 14 feet by 8 feet. If one can of
stain covers an area of 100 square feet, how many cans of stain
will he need? Explain.
Answer:
2 cans of stain Brent need,

Explanation:
Brent plans to stain a deck that is 14 feet by 8 feet. If one can of
stain covers an area of 100 square feet, So a deck is of area
14 feet X 8 feet = 112 square feet  as one can of
stain covers an area of 100 square feet therefore  number of
cans of stain Brent will need is 2.

Texas Go Math Area and Perimeter Grade 5 Lesson 9.1 Question 6.
H.O.T. Multi-Step Latoya uses 50 feet of wood to make a rectangular garden bed.
If the length of the garden bed is 10 feet, what is the width?

Answer:
Width is 15 feet,

Explanation:
Latoya uses 50 feet of wood to make a rectangular garden bed,
So number of feet of fencing does he need is using a formula
for finding the perimeter P = l + w + l + w, P = perimeter; l = length; w = width is
50 = 10 + w + 10 + w upon solving we get 2w = 50 – 20 = 30,
2 w = 30 therefore w = 30 ÷ 2 = 15 feet.

Question 7.
H.O.T. What’s the Error? Maggie wants to fence off two side-by-side sections of her garden.
Each section is 14 feet long and 6 feet wide. She says she needs 80 feet of fencing.
Explain what is wrong with her thinking. How much fencing does she really need?

Answer:
Maggie really needs 160 feet of fencing not 80 feet,

Explanation:
Given Maggie wants to fence off two side-by-side sections of her garden
and each section is 14 feet long and 6 feet wide,
She says she needs 80 feet of fencing, but wrong with her thinking,
as if we see 80 feet(14 + 6 + 14 + 6) will cover only one section off the garden
fence for two side-by-side sections of her garden she needs 2 X 80 feet = 160 feet.

Daily Assessment Task

Fill in the bubble for the correct answer choice.

Question 8.
Apply Tina is fixing a rectangular sign. She plans to place metal trim around the sign edges.
The rectangle measures 32 inches by 9 inches. How much trim will Tina need?
(A) 36 inches
(B) 41 inches
(C) 72 inches
(D) 82 inches
Answer:
(D) 82 inches,

Explanation:
Given Tina is fixing a rectangular sign. She plans to place
metal trim around the sign edges.
The rectangle measures 32 inches by 9 inches. So trim will Tina need is
32 inches + 9 inches + 32 inches + 9 inches = 82 inches which matches
with (D).

Question 9.
A rectangle has a length of 5 meters and a width of 4 meters.
Which equation can you use to find the perimeter?
(A) P = 4 × 5
(B) P = 4 × 4
(C) P = 4 + 4 + 5 + 5
(D) P = 4 + 5
Answer:
(C) P = 4 + 4 + 5 + 5,

Explanation:
Given rectangle has a length of 5 meters and a width of 4 meters
we know perimeter P = l + w + l + w, where P = perimeter; l = length;
w = width so we get the equation to find the perimeter is
P = 4 + 4 + 5 + 5 which matches with (C).

5th Grade Math Formulas for Area and Perimeter Lesson 9.1 Answer Key Question 10.
Multi-Step Lana had an “L” shaped piece of felt. Her mom cut it into two rectangles.
One rectangle measured 4 inches by 9 inches, and the other measured 4 inches by 3 inches.
What is the total area of the two rectangles?
(A) 40 square inches
(B) 48 square inches
(C) 72 square inches
(D) 24 square inches
Answer:
(B) 48 square inches,

Explanation:
Given Lana had an “L” shaped piece of felt. Her mom cut it into two rectangles.
One rectangle measured 4 inches by 9 inches, and the other measured 4 inches by 3 inches.
So area of one rectangle is 4 inches X 9 inches = 36 square inches,
other area of rectangle is 4 inches X 3 inches = 12 square inches,
so the total area of the two rectangles is
36 square inches + 12 square inches = 48 square inches which matches
with (B).

TEXAS Test Prep

Question 11.
Mai wants to tile the floor of her kitchen.
Each tile has an area of 1 square foot. The floor of her kitchen is
11 feet by 16 feet. How many tiles does she need?
(A) 150
(B) 54
(C) 176
(D) 352
Answer:
(C) 176,

Explanation:
Given Mai wants to tile the floor of her kitchen.
Each tile has an area of 1 square foot. The floor of her kitchen is
11 feet by 16 feet. So total area of Mai kitchen is
11 feet X 16 feet = 176 square foot matches with (c).

Texas Go Math Grade 5 Lesson 9.1 Homework and Practice Answer Key

Question 1.
Find the perimeter of the rectangle.

P = ___21__ + ____15___ + ___21___ + ___15____
P = _____72_______
The perimeter is _____72_______ feet.
Answer:
The perimeter of a rectangle is 72 feet,

Explanation:
Given rectangle has a length of 21 feet and a width of 15 feet
we know perimeter P = l + w + l + w, where P = perimeter; l = length;
w = width so the perimeter of rectangle is P = 21 + 15 + 21 + 15 = 72 feet.

Go Math Grade 5 Lesson 9.1 Answer Key Homework Question 2.
Find the area of the square.

A = ___17______ × ___17_______
A = ___289_____
The area is ____289___ square inches.
Answer:
The area of the given square is 289 square inches,

Explanation:
Given the side of the square is 17 inches,
the area of square is 17 inches X 17 inches = 289 square inches.

Question 3.
A rectangle has a perimeter of 68 inches. 1f the width of the rectangle is 10 inches,
what is the length of the rectangle? Explain how you know.
Answer:
The length of the rectangle is 24 inches,

Explanation:
Given a rectangle that has a perimeter of 68  inches.
If the width of the rectangle is 10 inches, let l be the
length of the rectangle as we know perimeter P = l + w + l + w,
where P = perimeter; l = length; w = width so the length of rectangle l is
68 = 10 + 10 + l + l, so 2l = 68 – 20 = 48, l = 48 ÷ 2 = 24 inches.

Question 4.
A square has an area of 81 square feet. What is the length of
each side of the square? Explain how you know.
Answer:
The length of side of the square is 9 feet,

Explanation:
Given a square has an area of 81 square feet. The length of
each side of the square will be as area of square is s X s ,
so 81 square feet = s X s,
s X s = 9 feet X 9 feet , therefore s = 9 feet.

Problem Solving

Question 5.
Lea wants to put a fence around her garden. Her garden measures 14 feet by 15 feet.
She has 50 feet of fencing. How many more feet of fencing does
Lea need to put a fence around her garden?
Answer:

Go Math Grade 5 Lesson 9.1 Formulas of Area and Perimeter Question 6.
Lea wants to put a new layer of soil on her 14 feet by 15 feet garden.
She finds the area of her garden so she knows how much soil to buy.
If one bag of soil covers 20 square feet, how many bags of soil will Lea need? Explain.
Answer:
11 bags of soil Lea needs,

Explanation:
Given Lea wants to put a new layer of soil on her 14 feet by 15 feet garden.
She finds the area of her garden as 14 feet X 15 feet = 210 square feet,
she knows how much soil to buy If one bag of soil covers 20 square feet,
210 square feet requires 210 ÷ 20 = 10 bags remainder 10 square feet,
therefore 11 bags of soil Lea needs.

Lesson Check

Fill in the bubble completely to show your answer.

Question 7.
A soccer field has a length of 100 yards and a width of 60 yards.
Which equation can you use to find the area of the soccer field?
(A) A = 100 × 60
(B) A = 100 + 60 + 100 + 60
(C) A = 100 + 60
(D) A = 160 × 4
Answer:
(A) A = 100 × 60,

Explanation:
Given a soccer field has a length of 100 yards and a width of 60 yards,
as we know area of square is Area is equal to length X width
so the equation for the area of the soccer field is A = 100 X 60 which
matches with (A).

Question 8.
A baseball diamond is a square with a perimeter of 360 feet.
What is the length of one side?
(A) 80 feet
(B) 180 feet
(C) 90 feet
(D) 60 feet
Answer:
(C) 90 feet,

Explanation:
Given a baseball diamond is a square with a perimeter of 360 feet.
So the length of one side will be as perimeter of square with side s is
p = 4s so 360 feet = 4 X s, therefore one side is 360 ÷ 4 = 90 feet matches
with (C).

Question 9.
Zoey wants to cover her bedroom floor with carpet squares.
Each square has an area of 1 square foot.
Her bedroom measures 12 feet by 14 feet.
How many carpet squares does Zoey need?
(A) 168
(B) 144
(C) 336
(D) 52
Answer:
(A) 168,

Explanation:
Given Zoey wants to cover her bedroom floor with carpet squares.
Each square has an area of 1 square foot.
Her bedroom measures 12 feet by 14 feet.
So number of squares does Zoey need is 12 X 14 = 168 square feet
matches with (A).

Go Math Homework Lesson 9.1 Area and Perimeter Answer Key Question 10.
Edward wants to put a string of lights around a rectangular window
that is 32 inches wide and 40 inches high. How long will the string of lights
need to be to go around the window?
(A) 72 inches
(B) 1,280 inches
(C) 144 inches
(D) 112 inches
Answer:
(B) 1,280 inches,

Explanation:
Given Edward wants to put a string of lights around a rectangular window
that is 32 inches wide and 40 inches high. The string of lights
need to be to go around the window is 32 X 40 = 1,280 inches matches
with (B) 1,280 inches.

Question 11.
Multi-Step Chantal buys two small rugs for her kitchen.
One rug measures 3 feet by 5 feet. The other rug measures 4 feet by 6 feet.
What is the area of the part of the kitchen the two rugs will cover?
(A) 39 square feet
(B) 30 square feet
(C) 24 square feet
(D) 36 square feet
Answer:
(A) 39 square feet,

Explanation:
Given Chantal buys two small rugs for her kitchen.
One rug measures 3 feet by 5 feet. The other rug measures 4 feet by 6 feet.
First rug covers 3 feet by 5feet is 5 X 3 = 15 square feet,
Other rug covers 4 feet by 6 feet is 4 X 6 = 24 square feet,
The area of the part of the kitchen the two rugs will cover is
15 square feet + 24 square feet = 39 square feet.

Area and Perimeter 5th Grade Lesson 9.1 Homework Answer Key Question 12.
Multi-Step Isaac is painting a wall that is 9 feet by 18 feet. So far,
he has painted a part of the wall that is a 4 feet by 7 feet rectangle.
What is the area of the part of the wall that Isaac has left to paint?
(A) 190 square feet
(B) 134 square feet
(C) 22 square feet
(D) 151 square feet
Answer:
(B) 134 square feet,

Explanation:
Given Isaac is painting a wall that is 9 feet by 18 feet. So far,
he has painted a part of the wall that is a 4 feet by 7 feet rectangle.
Total area of the wall is 9 feet X 18 feet = 162 square feet,
Part of the wall painted is 4 feet by 7 feet = 28 square feet,
The area of the part of the wall that Isaac has left to paint is
162 square feet – 28 square feet = 134 square feet matches with (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 10.1 Answer Key Exponents.

Texas Go Math Grade 6 Lesson 10.1 Answer Key Exponents

Texas Go Math Grade 6 Lesson 10.1 Explore Activity Answer Key

Identifying Repeated Multiplication

A real-world problem may involve repeatedly multiplying a factor by itself.

A scientist observed the hourly growth of bacteria and recorded his observations in a table.

(A) Complete the table. What pattern(s) do you see in the Total bacteria column?

(B) Complete each statement.
At 2 hours, the total is equal to the product of two 2s.
At 3 hours, the total is equal to the product of ___________________ 2s.
At 4 hours, the total is equal to the product of ___________________ 2s.

Reflect

Question 1.
Communicate Mathematical Ideas How is the time, in hours, related to the number of times 2 is used as a factor?
Answer:
The number of times 2 is used as a factor is equal to the time in hours. It can be seen that when t = 1, 2 is used only once, while when t = 2, 2 is used twice and so on.

Your Turn

Use exponents to write each expression.

Go Math Grade 6 Lesson 10.1 Answer Key Question 2.
4 × 4 × 4
Answer:
4 × 4 × 4

Find the base, or the numbers being multiplied. The base is 4.
Find the exponent by counting the number of 4s being multiplied.
The exponent is 3.

Final Solution:

= 4³

Question 3.
6 = ___________
Answer:
6

Find the base, or the numbers being multiplied. The base is 6.
Find the exponent by counting the number of 6s being multiplied.
The exponent is 1

Final Solution:

Question 4.
\(\frac{1}{8}\) × \(\frac{1}{8}\)
Answer:
\(\frac{1}{8}\) × \(\frac{1}{8}\)

Find the base, or the numbers being multiplied. The base is \(\frac{1}{8}\).
Find the exponent by counting the number of times \(\frac{1}{8}\) appears in the expression.
The exponent is 2

Final Solution:

Question 5.
5 × 5 × 5 × 5 × 5 × 5
Answer:
5 × 5 × 5 × 5 × 5 × 5

Find the base, or the numbers being multiplied. The base is 5.
Find the exponent by counting the number of 6s being multiplied.
The exponent is 6.

Final Solution:

Your Turn

Find the value of each power.

Question 6.
3⁴ ____________
Answer:
Solution to this example is given below = 3⁴
Identify the base and the exponent.
The base s 3, and the exponent is 4

Final Solution:
Evaluate: 3⁴ = 3 × 3 × 3 × 3 = 81

Question 7.
(- 1)⁹ ___________
Answer:
Simplify the given expression by identifying the base and exponent
The base is – 1 and the exponent is 9
= (- 1) ∙ (- 1) ∙ (- 1) ∙ (- 1) ∙ (- 1) ∙ (- 1) ∙ (- 1) ∙ (- 1) ∙ (- 1) multiply the case by itself nine times
= – 1
The value of the expression is – 1.

Question 8.
\(\left(\frac{2}{5}\right)^{3}\) _____________
Answer:
Solution to this example is given below = \(\left(\frac{2}{5}\right)^{3}\)
Identify the base and the exponent.
The base is \(\frac{2}{5}\), and the exponent is 3

Final Solution:
Evaluate: \(\left(\frac{2}{5}\right)^{3}=\left(\frac{2}{5}\right) \times\left(\frac{2}{5}\right) \times\left(\frac{2}{5}\right)=\frac{8}{125}\)

Go Math Grade 6 Answers Pdf Exponents Answer Key Question 9.
– 12² ___________
Answer:
Simplify the given expression by identifying the base and exponent.
The base is 12 and the exponent is 2.
= – (12 × 12) multiply the base by itself twice
= – 144
The value of the expression is – 144

Texas Go Math Grade 6 Lesson 10.1 Guided Practice Answer Key

Question 1.
Complete the table.

Answer:

Exponential form	Product	Simplified Product
51	5	5
52	5 × 5	25
53	5 × 5 × 5	125
54	5 × 5 × 5 × 5	625
55	5 × 5 × 5 × 5 × 5	3125

Use an exponent to write each expression.

Question 2.

Answer:
6 × 6 × 6
Find the base, or the numbers being multiplied The base is 6
Find the exponent by counting the number of 6s being multiplied.
The exponent is 3.

Final Solution:

Question 3.
10 × 10 × 10 × 10 × 10 × 10 × 10
Answer:
10 × 10 × 10 × 10 × 10 × 10 × 10
Find the base, or the numbers being multiplied The base is 10
Find the exponent by counting the number of 6s being multiplied.
The exponent is 7.

Final Solution:

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

Find the base, or the numbers being multiplied The base is \(\frac{3}{4}\)
Find the exponent by counting the number of \(\frac{3}{4}\) appears in.
the expression. The exponent is 5.

Final Solution:

Lesson 10.1 Answer Key 6th Grade Exponents Question 5.
\(\frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9}\)
Answer:
The solution to this example is given below
\(\frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9} \times \frac{7}{9}\)

Find the base, or the numbers being multiplied The base is \(\frac{7}{9}\)
Find the exponent by counting the number of \(\frac{7}{9}\) appears in.
the expression. The exponent is 5.

Final Solution:

Find the value of each power.

Question 6.
8³
Answer:
Solution to this example is given below 8³
Identify the base and the exponent
The base is 8, and the exponent is 3

Final Solution:
Evaluate: 8³ = 8 × 8 × 8 = 512

Question 7.
7⁴
Answer:
Solution to this example is given below 7⁴
Identify the base and the exponent
The base is 7, and the exponent is 4

Final Solution:
Evaluate: 7⁴ = 7 × 7 × 7 × 7 = 2401

Question 8.
10³
Answer:
Solution to this example is given below 10³
Identify the base and the exponent
The base is 10, and the exponent is 3

Final Solution:
Evaluate: 10³ = 10 × 10 × 10 = 1000

Question 9.
\(\left(\frac{1}{4}\right)^{2}\)
Answer:
Solution to this example is given below \(\left(\frac{1}{4}\right)^{2}\)
Identify the base and the exponent
The base is \(\frac{1}{4}\), and the exponent is 4

Final Solution:
Evaluate: \(\left(\frac{1}{4}\right)^{2}=\left(\frac{1}{4}\right) \times\left(\frac{1}{4}\right)=\frac{1}{16}\)

Question 10.
\(\left(\frac{1}{3}\right)^{3}\)
Answer:
Solution to this example is given below \(\left(\frac{1}{3}\right)^{3}\)
Identify the base and the exponent
The base is \(\frac{1}{3}\), and the exponent is 3

Final Solution:
Evaluate: \(\left(\frac{1}{3}\right)^{3}=\left(\frac{1}{3}\right) \times\left(\frac{1}{3}\right) \times\left(\frac{1}{3}\right)=\frac{1}{27}\)

Question 11.
\(\left(\frac{6}{7}\right)^{2}\)
Answer:
Solution to this example is given below \(\left(\frac{6}{7}\right)^{2}\)
Identify the base and the exponent
The base is \(\frac{6}{7}\), and the exponent is 2

Final Solution:
Evaluate: \(\left(\frac{6}{7}\right)^{2}=\left(\frac{6}{7}\right) \times\left(\frac{6}{7}\right)=\frac{36}{49}\)

Question 12.
0.8²
Answer:
Solution to this example is given below 0.8²
Identify the base and the exponent
The base is 0.8, and the exponent is 2

Final Solution:
Evaluate: 0.8² = 0.8 × 0.8 = 0.64

Exponents Grade 6 Lesson 10.1 Answer Key 6th Grade Question 13.
0.5³
Answer:
Solution to this example is given below 0.5³
Identify the base and the exponent
The base is 0.5, and the exponent is 3

Final Solution:
Evaluate: 0.5³ = 0.5 × 0.5 × 0.5 = 0.125

Question 14.
1.1²
Answer:
Solution to this example is given below 1.1²
Identify the base and the exponent
The base is 1.1, and the exponent is 2

Final Solution:
Evaluate: 1.1² =1.1 × 1.1 = 1.21

Question 15
8⁰
Answer:
Given expression 8⁰
Any power raised to exponent 0 is always equal to 1, therefore:
8⁰ = 1

Question 16.
12¹
Answer:
Given expression 12¹
Any power raised to exponent 1 is equal to the base of the given power, therefore
12¹ = 12

Question 17.
\(\left(\frac{1}{2}\right)^{0}\)
Answer:
Given expression \(\left(\frac{1}{2}\right)^{0}\)
Any power raised to exponent 0 is always equal to 1, therefore:
\(\left(\frac{1}{2}\right)^{0}\) = 1

Question 18.
(- 2)³
Answer:
Simplify the given expression by identifying the base and exponent
The base is – 2 and the exponent is 3.
= (- 2) × (- 2) × (- 2) multiply the base by itself three times
= – 8
The value of the expression is – 8

Question 19.
\(\left(-\frac{2}{5}\right)^{2}\)
Answer:
Simplify the given expression by identifying the base and exponent
The base is \(\left(-\frac{2}{5}\right)^{2}\) and the exponent is 2.
= \(\left(-\frac{2}{5}\right) \times\left(-\frac{2}{5}\right)\) multiply the base by itself three times
= \(\frac{4}{25}\)
The value of the expression is \(\frac{4}{25}\)

Question 20.
– 9²
Answer:
Simplify the given expression by identifying the base and exponent
The base is 9 and the exponent is 2.
= – (9 × 9) multiply the base by itself three times
= – 81
The value of the expression is – 81

Essential Question Check-In

Question 21.
How do you use an exponent to represent a number such as 16?
Answer:
The number 16 is written as its factors: 16 = 2 × 2 × 2 × 2 which can be condensed to a power as 2⁴.
The number 16 is written as it other factor: 16 = 4 × 4 which can be condensed to a power as 4²,
16 = 2⁴ = 4²

Write the missing exponent.

Question 22.
Answer:
Solution to this example is given below
100 = 10^x
100 = 10² (Convert 100 to base 10)
10² = 10^x (Divide both sides by 10)
2 = x
x = 2
100 = 10²
The missing exponent is 2

Question 23.

Answer:
Solution to this example is given below
8 = 2^x
8 = 2³ (Convert 8 to base 2)
2³ = 2^x (Divide both sides by 2)
3 = x
x = 3
8 = 2³
The missing exponent is 3

Exponential Form 6th Grade Lesson 10.1 Question 24.

Answer:
Solution to this example is given below
25 = 5^x
25 = 5² (Convert 25 to base 5)
5² = 5^x (Divide both sides by 5)
2 = x
x = 2
25 = 5²
The missing exponent is 2

Question 25.

Answer:
Solution to this example is given below
27 = 3^x
27 = 3³ (Convert 27 to base 3)
3³ = 3^x (Divide both sides by 3)
3 = x
x = 3
27 = 3³
The missing exponent is 3

Question 26.

Answer:
Given expression:
\(\left(\frac{1}{169}\right)=\left(\frac{1}{13}\right)^{x}\)
Rewrite the given expression by writing the left hand side of the equation as a power of base \(\left(\frac{1}{13}\right)\), therefore:
\(\left(\frac{1}{13}\right)^{2}=\left(\frac{1}{13}\right)^{x}\)
Now the bases are same, so compare the exponents to evaluate x, therefore:
x = 2
So the expression becomes:
\(\left(\frac{1}{169}\right)=\left(\frac{1}{13}\right)^{2}\)

Question 27.

Answer:
Given expression:
14 = 14^x
Since the number on both sides of the equation is same, this implies that x = 1
So the expression becomes:
14 = 14¹

Question 28.

Answer:
Solution to this example is given below
32 = 2^x
32 = 2⁵ (Convert 32 to base 2)
2⁵ = 2^x (Divide both sides by 2)
5 = x
x = 5
32 = 2⁵
The missing exponent is 5

Question 29.

Answer:
Solution to this example is given below
\(\frac{64}{81}=\left(\frac{8}{9}\right)^{x}\)
\(\frac{64}{81}=\left(\frac{8}{9}\right)^{2}\) (Convert \(\frac{64}{81}\) to base \(\frac{8}{9}\))
\(\left(\frac{8}{9}\right)^{2}=\left(\frac{8}{9}\right)^{x}\) (Divide both sides by \(\frac{8}{9}\))
2 = x
x = 2
\(\frac{64}{81}=\left(\frac{8}{9}\right)^{2}\)
The missing exponent is 2

Write the missing base.

Question 30.

Answer:
Solution to this example is given below
1000 = x³
1000 = 10³ (Convert 1000 to base 10)
10³ = x³
10 = x
x = 10
1000 = 10³
The missing base is 10

Question 31.

Answer:
Solution to this example is given below
256 = x⁴
256 = 4⁴ (Convert 256 to base 4)
4⁴ = x⁴
4 = x
x = 4
256 = 4⁴
The missing base is 4

Question 32.

Answer:
Solution to this example is given below
16 = x⁴
16 = 2⁴ (Convert 16 to base 2)
2⁴ = x⁴
2 = x
x = 2
16 = 2⁴
The missing base is 2

Question 33.

Answer:
Solution to this example is given below
9 = x²
9 = 3² (Convert 9 to base 3)
3² = x²
3 = x
x = 3
9 = 3²
The missing base is 3

Question 34.

Answer:
Solution to this example is given below
\(\frac{1}{9}\) = x²
\(\frac{1}{9}\) (Convert \(\frac{1}{9}\) to base \(\frac{1}{3}\))
\(\left(\frac{1}{3}\right)^{2}\) = x²
\(\frac{1}{3}\) = x
x = \(\left(\frac{1}{3}\right)^{2}\)
\(\frac{1}{9}=\left(\frac{1}{3}\right)^{2}\)
The missing base is \(\frac{1}{3}\).

Question 35.

Answer:
Solution to this example is given below
729 = x²
729 = 8² (Convert 729 to base 9)
9³ = x²
9 = x
x = 9
729 = 9³
The missing base is 9

Go Math Grade 6 Answer Key Pdf Exponent Problems Question 36.

Answer:
The solution to this example is given below
\(\frac{9}{16}\) = x²
\(\frac{9}{16}=\left(\frac{3}{4}\right)^{2}\) (Convert \(\frac{9}{16}\) to base \(\frac{3}{4}\))
\(\left(\frac{3}{4}\right)^{2}\) = x²
\(\frac{3}{4}\) = x
x = \(\left(\frac{3}{4}\right)\)
\(\frac{9}{16}=\left(\frac{3}{4}\right)^{2}\)
The missing base is \(\frac{3}{4}\).

Question 37.

Answer:
Solution to this example is given below
729 = x³
729 = 9³ (Convert 729 to base 9)
8² = x²
8 = x
x = 8
64 = 8²
The missing base is 8

Question 38.
Hadley’s softball team has a phone tree in case a game is canceled. The coach calls 3 players. Then each of those players calls 3 players, and soon. How many players will be notified during the third round of calls?
Answer:
1st round = 3 = 3¹ = 3
2nd round = 3 × 3 = 3² = 9
3rd round = 3 × 3 × 3 = 3³ = 27
On the third round of calls, 27 players were notified

Question 39.
Tim is reading a book. On Monday he reads 3 pages. On each day after that, he reads triple the number of pages as the previous day. How many pages does he read on Thursday?
Answer:
Monday – 3 = 3¹ = 3
Tuesday – 3 × 3 = 3² = 9
Wednesday – 3 × 3 × 3 = 3³ = 27
Thursday – 3 × 3 × 3 × 3 = 3⁴ = 81
Tim was able to read 81 pages on Thursday.

Question 40.
Which power can you write to represent the area of the square shown? Write the power as an expression with a base and an exponent, and then find the area of the square.

Answer:
Determine the area of the square.
A = s² formula to get the area of a square
A = (8.5)² substitute for the given values
Identify the base and the exponent
The base is 8.5 and the exponent is 2.
= 8.5 mm × 8.5 mm multiply the base by itself twice
= 72.25 mm² area of the square
The area of the square is 72.25 mm²

Question 41.
Antonia is saving for a video game. On the first day, she saves two dollars in her piggy bank. Each day after that, she doubles the number of dollars she saved on the previous day. How many dollars does she save on the sixth day?
Answer:

• 1st day – 2 = 2¹ = 82
• 2nd clay – 2 × 2 = 2² = $1
• 3rd day – 2 × 2 × 2 = 2³ = $8
• 4th day – 2 × 2 × 2 × 2 = 2⁴ = $16
• 5th day – 2 × 2 × 2 × 2 × 2 = 2⁵ = $32
• 6th day – 2 × 2 × 2 × 2 × 2 × 2 = 2⁶ = $64

Antonia saved $64 on the sixth day.

Question 42.
A certain colony of bacteria triples in length every 10 minutes. Its length is now 1 millimeter. How long will it be in 40 minutes?
Answer:

• 0 minutes = 1 mm
• 10 minutes = 1 × 3 = 3¹= 3 mm
• 20 minutes = 3 × 3 = 3² = 9 mm
• 30 minutes = 3 × 3 × 3 = 3³ = 27 mm
• 40 minutes = 3 × 3 × 3 × 3 = 3⁴ = 81 mm

After 40 minutes, the length of the bacteria will be 81 mm.

Question 43.
Write a power represented with a positive base and a positive exponent whose value is less than the base.
Answer:
The base is 4 and the exponent is \(\frac{1}{2}\).
Evaluate:
\(4^{\frac{1}{2}}\) = √4 = 2
The expression is \(4^{\frac{1}{2}}\) = 2.

Question 44.
Which power can you write to represent the volume of the cube shown?
Write the power as an expression with a base and an exponent, and then find the volume of the cube.

Answer:
Determine the volume of the cube.
V = s³ formula to get the volume of a cube
\(\left(\frac{1}{3}\right)^{3}\) = substitute for the given values

Identify the base and the exponent
The base is \(\frac{1}{3}\) and the exponent is 3
= \(\frac{1}{3}\) in × \(\frac{1}{3}\) in × \(\frac{1}{3}\) in multiply the base by itself thrice
= \(\frac{1}{27}\) in volume of the cube
The volume of the cube is \(\frac{1}{27}\) in³

H.O.T. Focus On Higher Order Thinking

Question 45.
Communicate Mathematical Ideas What is the value of 1 raised to the power of any exponent? What is the value of 0 raised to the power of any nonzero exponent? Explain.
Answer:
When 1 is raised to any number, the value of that expression is always equal to 1 because of its identity property. (1ⁿ = 1)
When 0 is raised to any nonzero exponent, the value of that expression is always zero because of its zero property. (0ⁿ = 0 where: n > 0)
The va1ue of 1ⁿ = 1 while the value of 0ⁿ = 0

Question 46.
Look for a Pattern Find the values of the powers in the following pattern: 10¹, 10², 10³, 10⁴ ……. 10⁶ Describe the pattern, and use it to evaluate 106 without using multiplication.
Answer:
Given pattern: 10¹, 10², 10³, when expanded according to rules of power expansion reveals the pattern: 10, 100, 1000. 10000…. and according to this 10⁶ = 1000000

Question 47.
Critical Thinking Some numbers can be written as powers of different bases. For example, 81 = 9² and 81 = 3⁴. Write the number 64 using three different bases.
Answer:
Write the given number as a product of it factor 2, therefore:
64 = 2 × 2 × 2 × 2 × 2 × 2 = 2⁶
Write the given number as a product of it factor 4, therefore:
64 = 4 × 4 × 4 = 4³
Write the given number as a product of it factor 8, therefore:
64 = 8 × 8 = 8²
64 = 2⁶ = 4³ = 8²

Question 48.
Justify Reasoning Oman said that it ¡s impossible to raise a number to the power of 2 and get a negative value. Do you agree with Oman? Why or why not?
Answer:
It is possible to have a negative value when a number is raised to the power of 2. It is when the base has a negative sign outside the parenthesis like – (2) When the given expression will be evaluated, it will be – (2 × 2) which will give a result of – 4

Refer to our Texas Go Math Grade 8 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 8 Lesson 11.2 Answer Key Equations with Rational Numbers.

Texas Go Math Grade 8 Lesson 11.2 Answer Key Equations with Rational Numbers

Example 1

Solve \(\frac{7}{10}\)n + \(\frac{3}{2}\) = \(\frac{3}{5}\)n + 2

Reflect

Question 1.
What is the advantage of multiplying both sides of the equation by the least common multiple of the denominators in the first step?
Answer:
By multiplying both sides by the common multiple of the denominators in the first step, the denominator is completely divided.

Question 2.
What If? What happens in the first step if you multiply both sides by a common multiple of the denominators that are not the LCM?
Answer:
If we multiply both sides by a common multiple of the denominators that is not the LCM. we eliminate the fractions from the equation, but the coefficients in front of the variable and the constants will be greater.

Your Turn

Solve.

Question 3.
\(\frac{1}{7}\)k – 6 = \(\frac{3}{7}\)k + 4 ___________
Answer:
Given
\(\frac{1}{7}\)k – 6 = \(\frac{3}{7}\)k + 4
Determine the least common multiple of the denominators
LCM : 7
Multiply both sides of the equation by the LCM
7(\(\frac{1}{7}\)k – 6) = 7(\(\frac{3}{7}\)k + 4)
Simplify
k – 42 = 3k + 28
Subtract k from both sides
k – 42 – k = 3k + 28 – k
-42 = 2k + 28
Subtract 28 from both sides
-42 – 28 = 2k + 28 – 28
2k = -70
Divide both sides by 2
k = \(\frac{-70}{2}\) = -35

Go Math Grade 8 Answer Key Lesson 11.2 Question 4.
\(\frac{5}{6}\)y + 1 = –\(\frac{1}{2}\)y + \(\frac{1}{4}\) ___________
Answer:
Given
\(\frac{5}{6}\)y + 1 = –\(\frac{1}{2}\)y + \(\frac{1}{4}\)
Determine the least common multiple of the denominators
LCM : 12
MultipLy both sides of the equation by the LCM
12(\(\frac{5}{6}\)y + 1) = 12(-\(\frac{1}{2}\)y + \(\frac{1}{4}\))
Simplify
10y + 12 = -6y + 3
Add 6y to both sides
10y + 12 + 6y = -6y + 3 + 6y
16y + 12 = 3
Subtract 12 from both sides
16y + 12 – 12 = 3 – 12
16y = -9
Divide both sides by 16
y = \(\frac{-9}{16}=-\frac{9}{16}\)

Question 5.
Logan has two aquariums. One aquarium contains 1.3 cubic feet of water and the other contains 1.9 cubic feet of water. The water in the larger aquarium weighs 37.44 pounds more than the water in the smaller aquarium. Write an equation with a variable on both sides to represent the situation. Then find the weight of 1 cubic foot of water.
Answer:
Given
Weight of the smaller aquarium = Weight of the larger aquarium
Write the equation where x is the weight of cubic feet of water
1.3x + 37.44 = 1.9x
Subtract 1.3x from both sides
1.3x + 37.44 – 1.3x = 1.9x – 1.3x
0.6x = 37.44
Divide both sides by 0.6
x = \(\frac{37.44}{0.6}\) = 62.4
The weight of $1$ cubic foot of water is $62.4$ pounds.

Question 6.
Write a real-world problem that can be modeled by the equation
\(\frac{1}{3}\)x + 10 = \(\frac{3}{5}\)x.
Answer:
\(\frac{1}{3}\)x + 10 = \(\frac{3}{5}\)x
There is 10 cubic meter of water in pool A and water is added at a rate of \(\frac{1}{3}\) per minute
There is 0 cubic meter of water in pool B and water is added at a rate of \(\frac{3}{5}\) per minute
The equation gives the number of minutes after which the quantity of the water in two pools will be the same.

Texas Go Math Grade 8 Lesson 11.2 Guided Practice Answer Key

Texas Go Math Grade 8 Pdf Lesson 11.2 Geometry Answers Question 1.
Sandy is upgrading her Internet service. Fast Internet charges $60 for installation and $50.45 per month. Quick Internet has free installation but charges $57.95 per month. (Example 2)
a. Write an equation that can be used to find the number of months after which the Internet service would cost the same.
Answer:
Write an equation for Fast Internet, where x is the number of months:
Charge per Month*Number of Month + Installation Fee
50.45x + 60
Write an equation for Quick Internet, where x is the number of months:
Charge per Month*Number of Month + Installation Fee
57.95x
Write an equation to find the number of months for which the total cost is the same
50.45x + 60 = 57.95x

b. Solve the equation.
Answer:
Solve for x
50.45x + 60 = 57.95x
Subtract 50.45x from both sides
50.45x + 60 – 50.45x = 57.95x – 50.45x
7.5x = 60
Divide both sides by 7.5
x = \(\frac{60}{7.5}\) = 8
The total cost will be the same for $8 months.

Solve. (Example 1 and 2)

Question 2.
\(\frac{3}{4}\)n – 18 = \(\frac{1}{4}\)n – 4
Answer:
Given
\(\frac{3}{4}\)n – 18 = \(\frac{1}{4}\)n – 4
Determine the least common multiple of the denominators
LCM : 4
Multiply both sides of the equation by the LCM
4(\(\frac{3}{4}\)n – 18) = 4(\(\frac{1}{4}\)n – 4)
Simplify
3n – 72 = n – 16
Subtract n from both sides
3n – 72 – n = n – 16 – n
2n – 72 = 16
Add 72 from both sides
2n – 72 + 72 = 16 + 72
2n = 56
Divide both sides by 2
n = \(\frac{56}{2}\) = 28

Go Math Answer Key 8th Grade Rational Numbers Question 3.
6 + \(\frac{4}{5}\)b = \(\frac{9}{10}\)b
Answer:
Determine the least common multiple of the denominators:
LCM(10, 5) = 10
Multiply both sides of the equation by the LCM
10(6 – \(\frac{4}{5}\)b) = 10(\(\frac{9}{10}\))
10(6) + 10(\(\frac{4}{5}\)b) = 10(\(\frac{9}{10}\)b)
60 + 8b = 9b
60 + 8b – 8b = 9b – 8b (Subtract 8b from both sides)
60 = b
or
b = 60

Question 4.
\(\frac{2}{11}\)m + 16 = 4 + \(\frac{6}{11}\)m
Answer:
Determine the least common multiple of the denominators:
LCM = 11
Multiply both sides of the equation by the LCM
11(\(\frac{2}{11}\)m + 16) = 11(4 + \(\frac{6}{11}\)m)
11(\(\frac{2}{11}\)m) + 11(16) = 11(4) + 11(\(\frac{6}{11}\)m)
2m + 176 = 44 + 6m
(Subtract 2m from both sides) 2m + 176 – 2m = 44 + 6m – 2m
176 = 44 + 4m
(Subtract 44 from both sides.) 176 – 44 = 44 + 4m – 44
132 = 4m
(Divide both sides by 4) \(\frac{132}{4}\) = \(\frac{4m}{4}\)
33 = m
or
m = 33

Question 5.
2.25t + 5 = 13.5t + 14
Answer:
2.25t + 5 = 13.5t + 14
(Multiply both sides of the equation by 100. Multiplying by 100 clears the equation of decimals.) 100 (2.25t + 5) = 100(13.5t + 14)
225t + 500 = 1350t + 1400
(Subtract 500 from each side)225t + 500 – 500 = 1350t + 1400 – 500
225t = 1350t + 900
(Subtract 1350f from each side.)225t – 1350t = 1350t + 900 – 1350t
-1125t = 900
(Divide by -1125.) \(\frac{-1125}{-1125}\) = \(\frac{900}{-1125}\)
t = -0.8

Question 6.
3.6w = 1.6w + 24
Answer:
Given
3.6w = 1.6w + 24
Subtract 1.6w from both sides
3.6w – 1.6w = 1.6w + 24 – 1.6w
2w = 24
Divide both sides by 2
w = \(\frac{24}{2}\) = 12

Question 7.
-0.75p – 2 = 0.25p
Answer:
Given
0.75p – 2 = 0.25p
Add 0.75p from both sides
-0.75p + 0.75p – 2 = 0.25p + 0.75p
p = -2

Question 8.
Write a real-world problem that can be modeled by the equation 1.25x = 0.75x + 50. (Example 3)
Answer:
Given
1.25x = 0.75x + 50
Left side of the equation has variable minute
Cell offers Plan A for no base fee and $1.25 per minute.
The right side of the equation has variable and constant
Cell offer Plan B for $50 base fee and $0.75 per minute
The equation shows when the total cost of the plan would be equal.

Essential Question Check-In

Question 9.
How does the method for solving equations with fractional or decimal coefficients and constants compare with the method for solving equations with integer coefficients and constants?
Answer:
In solving for equations with fractional coefficients, we need to equate all fractions with their least common denominator (LCD). By multiplying the LCD in all sides of the equation, we can eliminate all fractions then proceed to solve the whole equation as integers.

Texas Go Math Grade 8 Lesson 11.2 Independent Practice Answer Key

Question 10.
Members of the Wide Waters Club pay $105 per summer season, plus $9.50 each time they rent a boat. Nonmembers must pay $14.75 each time they rent a boat. How many times would a member and a non-member have to rent a boat in order to pay the same amount?
Answer:
Members of the Wide Waters Club pay 105 doLLars per summer season, plus 9.50 dollars each time they rent a boat.
Write an expression:
105 + 9.50x
Nonmembers must pay 14.75 dollars each time they rent a boat.
Write an expression:
14.75x
Write an equation for the number of visits for which the member and nonmember would pay the same amount
105 + 9.50x = 14.75x
Solve the equation for x.
(Write the equation.) 105 + 9.50x = 14.75x
(Subtract 9.50 from both sides.) 105 + 9.5x – 9.5x = 14.75x – 9.50x
(MultipLy by 100.) 105 = 5.25x
10500 = 525x
(Divide both sides by 525.) \(\frac{10500}{525}\) = \(\frac{525x}{525}\)
20 = x
or
x = 20
The members and nonmembers will pay the same amount for 20 visits.

Question 11.
Margo can purchase tile at a store for $0.79 per tile and rent a tile saw for $24. At another store she can borrow the tile saw for free if she buys tiles therefore $1.19 per tile. How many tiles must she buy for the cost to be the same at both stores?
Answer:
Margo can purchase tile at a store for 0.79 dollars per tile and rent a tile saw for 24 dollars.
Write an expression:
0.79x + 24
At another store, she can borrow the tile saw for free if she buys tiles there for 1.19 dollars per tile.
Write an expression.
1.19x
Write an equation for the number of tiles for which costs is the same at both stores.
0.79x + 24 = 1.19x
Solve the equation for x.
(Write the equation.) 0.79x + 24 = 1.19x
(Multiply by 100.) 79x + 2400 = 119x
(Subtract 79x from both sides.) 79x + 2400 – 79x = 119x – 79x
2400 = 40x
(Divide both sides by 40.) \(\frac{2400}{40}\) = \(\frac{40x}{40}\)
60 = x
or
x = 60
Margo must buy 60 tiles for the cost to be the same at both stores.

Math Grade 8 Answer Key Pdf Rational Numbers Equations Question 12.
The charges for two shuttle services are shown in the table. Find the number of miles for which the cost of both shuttles is the same.

Answer:
Write an expression of the costs for the shuttles by Easy Ride.
Pickup Charge + Charge per Mile
10 + 0.10x
Write an expression of the costs for the shuttles by Best Charge.
Pickup Charge + Charge per Mile
0 + 0.35x
Write an equation to find the number of miles for which the cost of both shuttles is the same.
Solve the equation for x.
(Write the equation.) 10 + 0.10x = 0.35x
(Multiply by 100) 1000 + 10x = 35x
(Subtract 10x from both sides.) 1000 + 10x – 10x = 35x – 10x
1000 = 25x
(Divide both sides by 25) \(\frac{1000}{25}\) = \(\frac{25x}{25}\)
40 = x
or
x = 40
The cost of shuttles would be the same for 40 miles.

Question 13.
Multistep Rapid Rental Car charges a $40 rental fee, $15 for gas, and $0.25 per mile driven. For the same car, Capital Cars charges $45 for rental and gas and $0.35 per mile.
a. For how many miles is the rental cost at both companies the same?
Answer:
Write the expression for cost of Rapid Rental Car for x mile
Charge per miLe*number of miles + rental fee + gas
0.25x + 40 + 15
0.25x + 55
Write the expression for cost of Capital Car for x mile
Charge per mile*number of miles + rental fee and gas
0.35x + 45
Write an equation for number of miles for which the cost of two rental cars would be same
0.25x + 55 = 0.35x + 45
Subtract 0.25x from both sides
0.25x + 55 – 0.25x = 0.35x + 45 – 0.25x
0.1x + 45 = 55
Subtract 45 from both sides
0.1x + 45 – 45 = 55 – 45
0.1x = 10
Divide both sides by 0.1
x = \(\frac{10}{0.1}\) = 100
The cost of car rentals would be the same for $100 miles

b. What is that cost?
Answer:
Let y be the total cost. Substitute 100 miles in any one of the two equations
y = 0.35x + 45
y= 0.35(100) + 45 = $80
Total cost would be $80.

Question 14.
Write an equation with the solution x = 20. The equation should have the variable on both sides, a fractional coefficient on the left side, and a fraction anywhere on the right side.
Answer:
To write the equation for the given solution, we will perform different operations going backwards from the solution to the equation.
x = 20
Multiply both sides by \(\frac{1}{3}\).
\(\frac{1}{3}\)x = \(\frac{1}{3}\) ∙ 20
Add x on both sides.
\(\frac{1}{3}\)x + x = \(\frac{20}{3}\) + x
Add 10 on both sides.
\(\frac{4}{3}\)x + 10 = \(\frac{20}{3}\) + x + 10
\(\frac{4}{3}\)x + 10 = \(\frac{50}{3}\) + x

Question 15.
Write an equation with the solution x = 25. The equation should have the variable on both sides, a decimal coefficient on the left side, and a decimal anywhere on the right side. One of the decimals should be written in tenths, the other in hundredths.
Answer:
x = 25
(Divide both sides by 50) \(\frac{x}{50}\) = \(\frac{25}{50}\)
0.02x = 0.5
(Add x to both sides.) 0.02x + x = 0.5 + x
1.02x = 0.5 + x
(Add 0.4 to both sides.) 1.02x + 0.4 = 0.5 + x + 0.4
1.02x + 0.4 = x + 0.9
Check for x = 25:
1.02(25) + 0.4 = 25 + 0.9
25.5 + 0.4 = 25.9
25.9 = 25.9
1.02x + 0.4 = x + 0.9

Question 16.
Geometry The perimeters of the rectangles shown are equal. What is the perimeter of each rectangle?

Answer:
Perimeter of the first rectangle
P = 2(n + n + 0.6) = 2(2n + 0.6) = 4 + 1.2
Perimeter of the second rectangle
P = 2(n + 0.1 + 2n) = 2(3n + 0.1) = 6n + 0.2
Since the perimeter is equal
4n + 1.2 = 6n + 0.2
Solve the equation
4n + 1.2 – 4n = 6n + 0.2 – 4n
1.2 = 2n + 0.2
2n + 0.2 – 0.2 = 1.2 – 0.2
2n = 1
n = 0.5
Since the perimeter is equal the perimeter for both rectangles would be same.
P = 4n + 1.2 = 4(0.5) + 1.2 = 3.2

Question 17.
Analyze Relationships The formula F = 1.8C + 32 gives the temperature in degrees Fahrenheit (F) for a given temperature in degrees Celsius (C). There is one temperature for which the number of degrees Fahrenheit is equal to the number of degrees Celsius. Write an equation you can solve to find that temperature and then use it to find the temperature.
Answer:
F = 1.8C + 32
let x be the temperature such that it is same in both celsius and in Fahrenheit
Then the required equation is
x = 18x + 32
subtract 1.8x from both sides
-0.8x = 32
divide by -0.8 on both sides
x = -40
So -40 degree celsius

Question 18.
Explain the Error Agustin solved an equation as shown. What error did Agustin make? What is the correct answer?

Answer:
Agustin didn’t multiply by 12 on both sides in step 2.
The correct answer is:
\(\frac{1}{3}\)x – 4 = \(\frac{3}{4}\)x + 1
(Multiply by 12.) 12(\(\frac{1}{3}\)x – 4) = 12(\(\frac{3}{4}\)x + 1)
4x – 48 = 9x + 12
(Subtract 4x from both sides.) 4x – 48 – 4x = 9x + 12 – 4x
-48 = 5x + 12
(Subtract 12 from both sides) -48 – 12 = 5x + 12 -12
(Divide by 5.) – 60 = 5x
-12 = x
or
x = -12

H.O.T. Focus on Higher Order Thinking

Question 19.
Draw Conclusions Solve the equation \(\frac{1}{2}\)x – 5 + \(\frac{2}{3}\)x = \(\frac{7}{6}\)x + 4. Explain your results.
Answer:
We are given the equation
\(\frac{1}{2}\)x – 5 + \(\frac{2}{3}\)x = \(\frac{7}{6}\)x + 4
The least common multiple of the denominators: LCM(2, 3, 6) = 6
6 ∙ (\(\frac{1}{2}\)x – 5 + \(\frac{2}{3}\)x) = (\(\frac{7}{6}\)x + 4) ∙ 6
6 ∙ \(\frac{1}{2}\)x – 6 ∙ 5 + 6 ∙ \(\frac{2}{3}\)x = 6 ∙ \(\frac{7}{6}\)x + 6 ∙ 4
3x – 30 + 4x = 7x + 24
7x – 30 = 7x + 24
Subtract 7x from both sides
7x – 30 – 7x = 7x + 24 – 7x
-30 = 24
This is not true. As we can see, the equation has no solution.

Question 20.
Look for a Pattern Describe the pattern in the equation. Then solve the equation.
0.3x + 0.03x + 0.003x + 0.0003x + …. = 3
Answer:
Firstly, to solve given task we have to understand the pattern in the equation. Looking at the equation, we can conclude that every coefficient next to variable x is 10 times smaller then the previous one. Also, we can notice that all the terms containing x are on the left side.
Therefore, we can factorize as following:
x(0.3 + 0.03 + 0.003 + …….) = 3
Looking at the expression in the parentheses, we can notice that the sum is \(0 . \overline{3}\). As we are calculating further and further, threes will pile up, so we can write the sum as \(\frac{1}{3}\).
By inserting \(\frac{1}{3}\) in the equation obtained in step 2, we get:
x ∙ \(\frac{1}{3}\) = 3 (multiplying by 3)
x = 9

Question 21.
Critique Reasoning Jared wanted to find three consecutive even integers whose sum was 4 times the first of those integers. He let k represent the first integer, then wrote and solved this equation: k + (k + 1) + (k + 2) = 4k. Did he get the correct answer? Explain.
Answer:
Using Jared’s formulated equation, k + (k + 1) + (k + 2) = 4k, the three integers that can be solved are
k + (k + 1) + (k + 2) = 4k
3k + 3 = 4k
4k – 3k = 3
k = 3 → first integer
k + 1 = 3 + 1
= 4 → second integer
k + 2 = 3 + 2
= 5 → third integer
Jared did not get the correct answer because the problem is looking for the three consecutive even integers, the obtained integers from his equation are 3, 4, and 5 which are not consecutive even integers.
Since Jared’s representation of the three consecutive integers whose sum is 4 times the first of those integers is incorrect, he should represent the following integers needed in the problem, instead.
k as the first even integer,
k + 2 as the second even integer, and
k + 4 as the third even integer
From the representation, we can formuLate an equation that is
(k + 2) + (k + 4) = 4k

Refer to our Texas Go Math Grade 5 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 5 Lesson 4.4 Answer Key Division of Decimals by Whole Numbers.

Texas Go Math Grade 5 Lesson 4.4 Answer Key Division of Decimals by Whole Numbers

Unlock the Problem

In a swimming relay, each swimmer swims an equal part of the total distance. Brianna and 3 other swimmers won a relay in 5.68 minutes. What is the average time each girl swam?

How many swimmers are part of the relay team?

Divide. 5.68 ÷ 4

So, each girl swam an average of __________ minutes.
Answer:1.42
Explanation:

So, each girl swam an average of 1.42 minutes.

Example

Divide. 45.8 ÷ 4

STEP 1:
Share the tens, ones, and tenths.

__________ tenth cannot be shared among 4 groups without regrouping.

STEP 2:
Write a zero in the dividend to show regrouping tenths as hundredths and continue dividing.

Explanation:
STEP 1:
Share the tens, ones, and tenths.

1 tenth cannot be shared among 4 groups without regrouping.
STEP 2:
Written a zero in the dividend to show regrouping tenths as hundredths and continue dividing.

Math Talk
Mathematical Processes

Explain how you would model 45.8 ÷ 4 using base-ten blocks.
Answer:

Explanation:
45.8 ÷ 4 is done in base ten blocks method
above figure shows how it was done
step 1:
4 is shared among 4 groups no ones left over
step 2:
5 tenths shared among 4 groups 1 tenths left over
1 tenths cannot be regrouped
so, converted to hundredths
18 hundredths shared among the 4 groups
4 shared among groups and  2 leftover

Share and Show

Write the quotient with the decimal point placed correctly.

Go Math Answer Key Grade 5 Lesson 4.4 Answer Key Question 1.
4.92 ÷ 2 = 246 ________
Answer: 2.46
Explanation:
The quotient is written appropriately with the
decimal point placed correctly

Question 2.
24.18 ÷ 3 = 806 ___________
Answer: 8.06
Explanation:
The quotient is written appropriately with the
decimal point placed correctly

Divide.

Question 3.

Answer: 1.73

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 4.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 5.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Problem Solving

Practice: Copy end Solve Divide.

Question 6.

Answer:

Explanation:
The quotient is written appropriately with the
decimal point placed correctly
With the division method

Go Math Lesson 4.4 Answer Key 5th Grade Question 7.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 8.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 9.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 10.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 11.

Answer:

Explanation:
The quotient is written appropriately with the
decimal point placed correctly
With the division method

H.O.T. Algebra Write the unknown number for each ☐.

Go Math Lesson 4.4 5th Grade Answer Key Question 12.
☐ ÷ 5 = 1.21
☐ = __________
Answer: 6.05
Explanation:
The dividend of the expression is  6.05

Question 13.
46.8 ÷ 4 = ☐
☐ = ___________
Answer: 11.7
Explanation:
The quotient of the expression is 11.7

Question 14.
10.85 ÷ ☐ = 1.55
☐ = ___________
Answer: 7
Explanation:
The divisor of the equation is 7

Question 15.
Write Math Analyze How is 81.9 ÷ 9 similar to 819 ÷ 9? How is it different?
Answer: 81.9 ÷9 is not equal to 819 ÷ 9
Explanation:
When they are whole number or compatible number they both are same
When their is a decimal point they are change
the quotient varies.

Problem Solving

Question 16.
Multi-Step The standard width of 8 lanes in swimming pools used for competitions is 21.92 meters. The standard width of 9 lanes is 21.96 meters. How much wider is each lane when there are 8 lanes than when there are 9 lanes?
Answer: 0.04
Explanation:
The standard width of 8 lanes in swimming pools used for competitions is 21.92 meters.
The standard width of 9 lanes is 21.96 meters.
21.96 – 21.92 = 0.04
0.04 wider is each lane when there are 8 lanes than when there are 9 lanes.

Question 17.
H.O.T. Multi-Step Mei runs 80.85 miles in 3 weeks. If she runs 5 days each week, what is the average distance she runs each day?

Answer: 5.39
Explanation:
Mei runs 80.85 miles in 3 weeks.
If she runs 5 days each week, 5 x 3 = 15
80.85 ÷ 15 = 5.39
The average distance she runs each day is 5.39

Question 18.
Multi-Step Rob buys 6 tickets to the basketball game. He pays $8.50 for parking. His total cost is $40.54. What is the cost of each ticket?
Answer:  5.34
Explanation:
Rob buys 6 tickets to the basketball game.
He pays $8.50 for parking.
His total cost is $40.54.
40.54 – 8.50 = 32.04
32.04 ÷ 6 = 5.34
each ticket costs  5.34$

Daily Assessment Task

Fill in the bubble completely to show your answer.

Question 19.
In 1849, a gold miner had 4 ounces of gold to sell. The store owner offered him $67.68 for the gold. How much will the store owner pay for each ounce of gold?
(A) $11.28
(B) $15.76
(C) $16.92
(D) $23.64
Answer: C
Explanation:
In 1849, a gold miner had 4 ounces of gold to sell.
The store owner offered him $67.68 for the gold.
67.68 ÷4 = 16.92
the store owner pay for each ounce of gold is $16.92

Question 20.
Use Symbols A grocery store sells 6 ears of corn for $3.54. Which of the following shows how to find the amount of money that each ear of corn costs at the grocery store?
(A) $3.54 × 6
(B) 6 ÷ $3.54
(C) 6 – $3.54
(D) $3.54 ÷ 6
Answer: D
Explanation
The question is based on division so we have to divide
$3.54 ÷ 6 = $0.59

Go Math Grade 5 Lesson 4.4 Answer Key Question 21.
Multi-Step The school in town is building a track around its football stadium. The principal must decide whether to build a track with 6 lanes or 7 lanes. A 6-lane track will be 28.68 feet wide, and a 7-lane track will be 28.98 feet wide. If all lanes are of equal width in each track, how much wider will the lanes be in a 6-lane track than in a 7-lane track?
(A) 4.78 feet
(B) 0.64 foot
(C) 0.50 foot
(D) 4.14 feet
Answer: B
Explanation:
The school in town is building a track around its football stadium.
The principal must decide whether to build a track with 6 lanes or 7 lanes.
A 6-lane track will be 28.68 feet wide, 28.68 ÷  6 = 4.78
and a 7-lane track will be 28.98 feet wide. 28.98 ÷  7 = 4.14
If all lanes are of equal width in each track,
4.78 – 4.14 = 0.64
the lanes  in a 6-lane track than in a 7-lane track is 0.64

Texas Test Prep

Question 22.
A marathon is 26.2 miles long. Sue wants to run a marathon in 4 hours. What is the average number of miles she must run each hour?
(A) 6.5 miles
(B) 6.55 miles
(C) 0.65 mile
(D) 0.655 mile
Answer: B
Explanation:
A marathon is 26.2 miles long.
Sue wants to run a marathon in 4 hours.
26.2 ÷ 4 = 6.55
The average number of miles she must run each hour is 6.55 miles

Texas Go Math Grade 5 Lesson 4.4 Homework and Practice Answer Key

Divide.

Question 1.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Go Math Grade 5 Lesson 4.4 Homework Answer Key Question 2.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 3.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 4.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 5.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 6.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Go Math 5th Grade Lesson 4.4 Homework Answer Key Question 7.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 8.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Question 9.

Answer:

Explanation:
The quotient is written appropriate with the
decimal point placed correctly
With the division method

Write the unknown number for each ☐.

Question 10.
☐ ÷ 9 = 3.4
☐ = _____________
Answer: 30.6
Explanation:
The dividend of the equation is 30.6

Question 11.
84.8 ÷ ☐ = 10.6
☐ = ______________
Answer: 8
Explanation:
The divisor of the equation is 8

Question 12.
30.87 ÷ 7 = ☐
☐ = ______________
Answer: 4.41
Explanation:
The quotient of the equation is 4.41

Problem Solving

Question 13.
Abby and her 7 friends had lunch at the neighborhood burger barn. The bill was $47.60. If they shared the cost of the lunch equally, how much did each person pay?
Answer: $5.95
Explanation:
Abby and her 7 friends had lunch at the neighborhood burger barn.
The bill was $47.60.
$47.60 ÷ 8 = 5.95
The each person should pay $5.95

1Question 4.
Dion practiced the long jump. He jumped 3.05 meters, 2.74 meters, and 3.3 meters. What was the average length of Dion’s jumps?
Answer: 4.54 meters
Explanation:
Dion practiced the long jump.
He jumped 3.05 meters, 2.74 meters, and 3.3 meters.
3.05 + 2.74 + 3.3 = 9.09
To find the average we have to divide by 2
9.09 ÷ 2 = 4.54 meters

Lesson Check

Fill In the bubble completely to show your answer.

Question 15.
An artist uses 49.4 centimeters of decorative molding to make a square picture frame. How long is each side of the frame?
(A) 12.35 centimeters
(B) 24.7 centimeters
(C) 12.2 centimeters
(D) 11.1 centimeters
Answer: A
Explanation:
Square has 4 equal side of length.
So Answer is 12.35 centimeters of each side.
Since 49.4 ÷4 = 12.35
Question 16.
A box of 8 snack bars costs $24.72. A single snack bar costs $3.47. What is the savings on each snack bar if you buy a box of 8 snack bars?
(A) $0.56
(B) $0.38
(C) $0.43
(D) $0.25
Answer: B
Explanation:
A box of 8 snack bars costs $24.72.
if you buy a box of 8 snack bars then each bar costs $3.09.
if buy a single snack bar then costs $3.47. So savings on each snack bar, if buy a box is $0.38.
Since $3.47 -$3.09 = $0.38

Question 17.
Jeremy saves $2.75 each week. How many weeks will it take him to save enough money to buy a model kit that costs $13.75?
(A) 3 weeks
(B) 4 weeks
(C) 5 weeks
(D) 6 weeks
Answer: C
Explanation:
Jeremy saves $2.75 each week.
Model kit cost is $13.75.
So Jeremy needs 5 weeks to save enough money to buy a model kit.
Since 13.75÷ 2.75 =5

Go Math Grade 5 Practice and Homework Lesson 4.4 Answer Key Question 18.
Ari divides by 6 and gets a quotient of 9.3. What is the dividend in Ari’s division problem?
(A) 3.3
(B) 1.55
(C) 55.8
(D) 54.8
Answer:C
Explanation:
Dividend = Divider × quotient
So Answer is 6× 9.3 =55.8

Question 19.
Multi-Step Sam’s van travels 208.8 miles on 9 gallons of gasoline. Hasan’s small car travels 234.4 miles on 8 gallons of gasoline. What is the difference between the vehicles in the gallons of gasoline consumption per mile?
(A) 29.3 miles per gallon
(B) 23.2 miles per gallon
(C) 3.2 miles per gallon
(D) 6.1 miles per gallon
Answer: D
Explanation:
Sam’s van travels 208.8 miles on 9 gallons of gasoline. 208.8 ÷ 9 = 29.3
Hasan’s small car travels 234.4 miles on 8 gallons of gasoline. 23.4 ÷ 8 =23.2
29.3 – 23.2  = 6.1miles per gallon
the difference between the vehicles in the gallons of gasoline consumption per mile is 6.1

Question 20.
Multi-Step Seven students bought a ticket to the science museum. They paid a total of $40.25. Six students bought a ticket to the art museum. The total cost was $31.50. What is the difference in price between a ticket to the science museum and a ticket to the art museum?
(A) $0.50
(B) $1.00
(C) $8.75
(D) $1.25
Answer:
Explanation: A
Seven students bought a ticket to the science museum.
They paid a total of $40.25.
Six students bought a ticket to the art museum.
The total cost was $31.50.
40 .25 ÷ 7 = 5.75
31.50 ÷ 6 = 5.25
The difference in price between a ticket to the science museum and a ticket to the art museum is 0.50

Refer to our Texas Go Math Grade 4 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 4 Lesson 18.1 Answer Key Fixed and Variable Expenses.

Texas Go Math Grade 4 Lesson 18.1 Answer Key Fixed and Variable Expenses

Essential Question

What is the difference between fixed and variable expenses?
Answer:
FIXED EXPENSES:

Fixed expenses are referred to as the cost that does not register a change with an increase or decrease in the number of goods produced by a firm. Fixed costs are those costs that a company should bear irrespective of the levels of production.

Fixed costs are less controllable in nature than variable costs as they are not dependent on the production factors such as volume.

The different examples of fixed costs can be rent, salaries, and property taxes.
VARIABLE EXPENSES:

Variable expenses are referred to as the type of cost that will show variations as per the changes in the levels of production. Depending on the volume of the production in a company, the variable cost increases or decreases.

The various examples of variable costs are the cost of raw materials that are used for production, sales commissions, labor cost, and more.

The money that you need to pay for electricity or phone service is your expense. Expenses that occur regularly and the amount does not change are fixed expenses. Expenses in which the amount does change based on need or choice are variable expenses.

Unlock the Problem

Erin has some fixed and variable expenses. She pays $23.75 every 12 weeks for the newspaper to be delivered to her home every day. She and her family like to eat out. On Monday night, Erin spent $45.78 to eat a meal at Restaurant A. Tuesday night, she spent $58.12 for a meal at Restaurant B. Wednesday night, she spent $37.64 for a meal at Restaurant C.

Example 1 Complete.
Erin’s family is a fixed expense because she pays the same amount and the cost does not change. The money

Erin spends on meals is a ____variable_______ expense because the amount _____varies______ depending on which restaurant she goes to or the type of meal she buys.

Example 2 Find the amount Erin spends on fixed expenses for 24 weeks.

Erin pays $23.75 every 12 weeks for the newspaper

In 24 weeks, she pays $23.75 + $ 23.75 = $ 47.5.

Erin Spends $____47.5________ in fixed expenses for 24 weeks.
Answer: 47.5$ Erin spends in fixed expenses.

Math Talk

Mathematical Processes
What other fixed expenses might a person have?
Answer: Here is a list of categories to include in your fixed expenses: Utility bills (cable, cell, electricity, water, etc.) Life / Disability / Extended health (or other) insurance.

Example 3 Solve.
How much does Erin spend on variable expenses?

So Erin spent $ ___________ on variable expenses.
Answer:  Erin spent $141.54 on variable expenses.

Share and Show

Question 1.
Betsy pays a trash service to pick up the household trash once a week. The cost is $23 a month. Trash pick-up is a _____________ expense. In 6 months, the family pays 6 × _____________ = _____________ .
Answer: Here trash pick-up is a fixed expense because it is constant for every month that is $23 a month. Now, here the question asked was for one month she has to pay $23 a month. For 6 months how much amount of money she has to pay.
In 6 months, the family pays 6×$23=138$.
Therefore, the family pays $138 for 6 months.

Question 2.
Mrs. Beyer goes grocery shopping once a week. In one month she spent $99.65, $122.56, $130.45, and $145. What was the total monthly expense? Grocery bills are a variable expense. In a month, Mrs Beyer spent $497.66 on groceries.
Answer: Grocery bills are a variable expense. Because for every week amount is changing.
Beyer goes shopping weekly once. Here, the question asked about total monthly expenses. We need to add all the amount she spent every week.
The total monthly expenses are $99.65+$122.56+$130.45+$145=$497.66.
Therefore, Beyer’s total expenses are $497.66

Go Math Answer Key Grade 4 Variable Expenses Question 3.

Write Math Use the list at the right. Sort the topics into fixed expenses and variable expenses. Choose one and explain why you placed it there.

Answer:

Explanation:
Up to a certain time like years or monthly payments are always constant like car payments, house payments, loan, gas etc. It won’t change their rates. Coming to variable expenses we pay according to the volume we buy a product like clothes, groceries, cell phones etc. Vacations, entertainments, electric bills definitely vary according to the place, situation. so these all are variable expenses.

Math Talk

Mathematical Processes
Explain why some of the topics could be either fixed or variable expenses.
Answer:
FIXED EXPENSES: Costs that do not change with output means these are operating costs that a business may have that will remain the same, no matter how much they are used. For example, what would be all of the fixed costs of a shoe shop?.
Rent, salaries, insurance, broadband. Assume the costs.

These all things are fixed in a shoe shop. How much you use is not a matter, if we take broadband, there is no limit to use but every month we have to pay $50 it is the fixed cost. Likewise rent, insurance, and salaries.
VARIABLE EXPENSES: Costs that do change with output means these are operating costs that a business may have that will change with use, so the more they are used, the more they will cost. For example, what would be all of the variable costs of a shoe shop?.
Stock, utilities, wages, telephone.

Here every week rates change. How much volume do we use according to that we need to pay, for example, take telephone if it is a weekly payment then we pay weekly and how much we use on that week according to that we have to pay. likewise, wages, if he does extra hours the employer will pay the extra amount to the employee.

Problem Solving

Use the numbers in the picture for 4-5.

Question 4.
How much has the price of gas increased from the lowest to the highest price shown?
Answer: From the above diagram, we can say the lowest rate and highest rate. The lowest rate is 2.99 and the highest rate is 4.02.
The price of the gas increased was 4.02-2.99=1.03.
Therefore, the 1.03 price increased.

Question 5.
Multi-Step Maya filled her car with gas once at each price shown. Her gas tank holds 15 gallons. Estimate the amount that she spent to fill her tank these four times. Is this a fixed or variable expense?
Answer:
Given the question:  Maya filled her car with gas once at each price shown in the above diagram are 2.99, 3.99, 4.02, 3.87
The number of tanks she holds=15 gallons.
Now we have to find the amount she spent each time. And moreover, it’s a variable expense because it is changing every time when she fills the gas to her car.
The amount she spent on the first time=15×2.99=44.85$
The amount she spent on the second time=15×3.99=59.85$
The amount she spent on the third time=15×4.02=60.3$
The amount she spent on the fourth time=15×3.87=58.05$

Go Math Answer Key Variable Expenses 4th Grade Question 6.
Apply Mario paid off his car loan this year. His payments were $259 a month for each of the first 8 months. The last payment, in the ninth month, was $125. What was the total Mario paid in car payments this year? Are the payments Mario paid the first 8 months a fixed or variable expense?
Answer:
Given: Mario paid completely his car loan this year.
The total number of months he paid loan=9
For the first 8 months, he paid 259$ each month. So it was a fixed expense because he paid the same amount every month.
The total amount he paid in 8 months=259$×8=2072$
The amount he paid in 9th month=125$
The total payment Mario paid this year=2072$+125$=2197$
Therefore, he paid 2197$ this year.

Question 7.

H.O.T Multi-Step Mrs. Xavier buys 1 or 2 books a month for $13.99 each. A magazine subscription costs her $19.99 a year. She buys the Sunday paper for $2.05 each week. Estimate the most she could spend for her reading material in a year.
Answer:
The number of books Xavier buys each month=2 (given 1 or 2, but take 2).
The cost of each book is $13.99.
Xavier spent on books every month=13.99×2=$27.98
For a year she could spend only on books=27.98×12=335.76$
The cost of a subscription for a magazine per year is $19.99
The Sunday paper she buys each week is $2.05
Here the question asked was the amount she could spend on her reading material in a year.  So, we need to find the amount for the Sundays paper for the year.
Sundays paper for the year=2.05×48=98.4$(for a year there are 12 months, in a month there are 4 weeks so 12×4=48 weeks. For 12 months there will be 48 weeks so I multiplied with 48).
Now the total amount she could spend=335.76+19.99+98.4=454.15$
Therefore, she spends 454.15$ for the year.

Question 8.
H.O.T. Communicate Wendy’s bakery business has fixed and variable expenses. Her gas and electric bills cost $500 one month. The ingredients cost $700 that month. She pays each of 2 workers $10 an hour to work 40 hours a week. Explain how you can find her total business expenses for a month.
Answer:
The cost for gas and electric bills for one month=500$
The cost of ingredients for a month=700$
The number of workers she has=2
The amount she pays for an hour to each worker is $10. Here 2 workers are there so 10$×2=20$.
The total number of hours a week=40
The total amount she was spending every week for 2 workers=40×20=800$
The question asked for total expenses for a month so we need to calculate the salary for the month that could be 800×4=3200$. (In a month there are 4 weeks so I multiplied with 4).
Now we have to find, her total business expenses for a month.
500+700+3200=4400$.
Therefore, she spent 4400$ every month on her business.

Daily Assessment Task

Fill in the bubble completely to show your answer.

Question 9.
Lexi is taking 3 courses at Community College. She pays $835 for each college course. She spends about $45 a week for 20 weeks to drive to school. How much does she spend on fixed expenses?
(A) $ 2,505
(B) $ 2,400
(C) $ 900
(D) $ 2,700
Answer: Option C is correct.

Explanation:
The number of courses Lexi took at Community College=3
The amount she pays on each course=835$.
The total amount she pays for 3 courses=835×3=2505$.
The amount she spends each week=45$
The amount she spends for 20 weeks=45×20=900$
The amount she spend on fixed expenses=900$.
Because the charges cannot change but the course costs may change. Here the fixed expenses were only asked. So, the answer is 900$ which she is spending every week constantly.

4th Grade Go Math Answer Key Fixed and Variable Expenses Question 10.
Every month, Jack’s mother pays the following expenses: the house payment, the club membership, the car payment, and the cost of food. Which is a variable expense?
(A) the club membership
(B) the house payment
(C) the car payment
(D) the cost of food
Answer: Option D is correct.

Explanation:
The variable expense was asked in the given options. The above three options are coming under fixed expenses because they are constant at their rates. But the cost of food will vary because it depends upon the volume we eat that’s why it comes under variable expense.

Question 11.
Multi-Step Josh has a new cell phone plan. He gets unlimited voice calls and text messages to other devices in his area for $35 a month. Voice calls outside of his area cost $0.10 a minute and text messages cost $0.99 a message. What is Josh’s bill if he uses 10 minutes for calls and makes one text outside his area?
(A) $35.10
(B) $36.10
(C) $35.00
(D) $35.99
Answer: Option D is correct.

Explanation:
Given: For unlimited voice calls and text messages within his area is 35$ per month. If it’s an outside area then the cost will increase. For voice calls outside the area is 0.10$ and for text messages 0.99$. Now we need to find out Josh’s bill if he uses 10 minutes for calls and makes one text outside his area. That can be written as 35+0.99=35.99$.
josh uses 10 minutes for calls=35 { how much you use in a month that cost could be 35$ only it won’t change. It is a fixed expense}.
He texts outside the area so he has to pay an extra 0.99$.
Therefore, 35.99$ he has to pay.

TEXAS Test Prep

Question 12.
Dara makes bracelets and sells them in her shop. Which is a fixed expense for Dara’s business?
(A) the cost of the beads
(B) the cost of the string
(C) the cost of advertising
(D) rent for her shop
Answer: Option D is correct.

Explanation:
In Dara’s business, the cost of beads, string, advertising all are coming under variable expenses because they vary according to their volume, quality. But the rent could not change it fixed up to a certain time. So this rent comes under fixed expense.

Texas Go Math Grade 4 Lesson 18.1 Homework and Practice Answer Key

Question 1.
Bruce buys 7 cans of dog food a week and a hag of dog food every 4 weeks. Cans of dog food cost $1.29 each.

A bag of dog food costs $67.59. Dog food is a __________
expense. In 4 weeks, Bruce spends 28 × _______ + __________ = __________ for dog food.
Answer:
Dog food is a fixed expense. It is a constant rate.
The number of cans of food Bruce buys each week=7 [for 4 weeks 7×4=28].
The number of bags of dog food he buys=1
He buys dog food every 4 weeks. The cost of each can of dog food is 1.29$
The cost of each bag of dog food=67.59$
The amount he spends in a week=7×1.29=9.03$+67.59$×28=2145.36$.
Therefore, he spends 2145.36$ on dog food.

Go Math Answers 4th Grade Fixed Vs Variable Expenses Question 2.

Use the list of Expenses for Dog Owners. Sort the expenses into fixed expenses and variable expenses. Choose one expense and explain why you put it where you did.

Answer:

Explanation:
FIXED EXPENSES: Daily dog walking, training classes, boarding comes under fixed expenses because the cost does not change. we have to pay a fixed amount per month or a year.
VARIABLE EXPENSES: Food, we have to pay according to the volume the dog eats. Toys, treats, bed, collar and leash all those things also cost varies according to their size, quality. Veterinary care also the cost varies depending upon the treatment they gave to the dog.

Problem Solving

Question 3.
Gretchen has a cat. She buys a bag of litter every month. Litter costs $38.59 a bag. How much will litter for a year cost? Is the expense fixed or variable?
Answer: 463.08$
Explanation:
Number of bags of litter she buys every month=1
The cost of a litter of 1 bag=38.59$
The amount she spends in a year on litter=38.59×12=463.08$.
Therefore, she spends 463.08$ a year.   { 1year=12 months}.

Question 4
In March, Gretchen bought a brush and a toy for her kitten. The brush cost $6.79. The toy cost $3.88. In April, she bought a cat carrier for $87.68. How much did she spend for these items? Are the expenses fixed or variable? Explain.
Answer: 98.35$
Explanation:
The cost of brush=$6.79
The cost of the toy is $3.88
The cost of a cat carrier is $87.68
The total amount she spends on these items=6.79+3.88+87.68=$98.35.
These items are variable expenses because they vary costs depending upon quality and size.
Lesson Check

Go Math Answer Key 4th Grade Fixed Expenses Question 5.
Mark pays a gardener $100 each week. He bought a fence for the garden and 2 flats of plants. He also bought a shovel and a hoe. Which expense is fixed?
(A) gardener
(B) plants
(C) fence
(D) shovel
Answer: Option A is correct.

Explanation:
Mark pays the constant(fixed) amount to the gardener. How much the gardener works does not matter, the gardener will be paid by Mark $100 every week. So it is a fixed expense.

Question 6.
Leslie rides the bus to work and back 5 days a week. The bus costs $1.25 each way. Sometimes she buys a newspaper to read on the bus. The newspaper costs $0.75 a day. How much does she spend for fixed expenses every week?
(A) $6.25
(B) $12.50
(C) $18.75
(D) $10.00
Answer: Option D is correct.

The number of days she will take to come back=5
The cost for each way=$1.25
For 5 days=1.25*5=6.25
The cost of a newspaper=$0.75
For 5 days=0.75*5=3.75
The amount she spends on fixed expenses every week=6.25+3.75=10.

Question 7.
Every month, Wesley writes checks to pay each of the bills listed below. Which is a variable expense?
(A) rent
(B) cable television
(C) electricity
(D) gym membership
Answer: Option C is correct.

Explanation:
Electricity comes under variable expense because it depends upon you much power we use every day or every month. If we consume more power then more amount we have to pay. If we consume less then we will pay less.

Question 8.
Which of Victoria’s monthly car expenses is fixed?
(A) car payment
(B) gas
(C) bridge tolls
(D) parking
Answer: Option A is correct.

Explanation:
Car payment is fixed because if we kept instalments to pay then we have to pay a certain amount monthly which is fixed. All other options are coming under variable expenses because their cost depends upon the places. So definitely they will vary.

Question 9.
Multi-Step A store owner pays $1,200 each month for rent. She pays. the clerk who works in the store $15 an hour. The clerk works 60 hours each month. What is the total of the monthly fixed expenses?
(A) $2,100
(B) $1,290
(C) $1,800
(D) $3,00
Answer: Option A is correct.

Explanation:
The rent she pays every month=$1200
She pays the clerk per hour=$15
The number of hours the clerk works=60
The total salary for clerk per month=60*15=900
The total amount she spends monthly on fixed expenses=1200+900=$2100

Go Math Grade 4 Answer Key Variable Vs Fixed Expenses Question 10.
Multi-Step Jenny spends $2.20 for a school lunch every day. She also buys a muffin at the bakery every day on her way home from school. The muffin costs $1.25. What are Jenny’s fixed expenses for a 5-day school week?
(A) $15.05
(B) $15.75
(C) $22.25
(D) $17.25
Answer: Option D is correct.

The cost Jenny spends on lunch every day=$2.20
For 5 days=2.20*5=11
The cost of a muffin she buys every day=$1.25
For 5 days=1.25*5=6.25
The total cost she spends for 5 days=11+6.25=$17.25.

Refer to our Texas Go Math Grade 7 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 7 Lesson 8.3 Answer Key Writing Two-Step Inequalities.

Texas Go Math Grade 7 Lesson 8.3 Answer Key Writing Two-Step Inequalities

Texas Go Math Grade 7 Lesson 8.3 Explore Activity Answer Key

Modeling Two-Step inequalities
You can use algebra tiles to model two-step inequalities.

Use algebra tiles to model 2k + 5 ≥ -3.

A. Using the line on the mat, draw in the inequality symbol shown in the inequality.

Answer:

B. How can you model the left side of the inequality?

C. How can you model the right side of the inequality?

D. Use algebra tiles or draw them to model the inequality on the mat.

Reflect

Question 1.
Multiple Representations How does your model differ from the one you would draw to model the equation 2k + 5 = -3?
Answer:
On each side, we put the same number of tiles as in the model of equation 2k + 5 = -3.
The only difference is that instead of an equality sign, we have an inequality sign.

Go Math Grade 7 Answer Key Pdf Lesson 8.3 Question 2.
Why might you need to change the inequality sign when you solve an inequality using algebra tiles?
Answer:
The reason you need to change the inequality sign when you solve an inequality using algebra tiles is when the variable is negative. When solving an inequality, wherein the variable has a negative coefficient, the inequality sign needs to be changed. When an inequality has a negative variable.

Your Turn

Question 3.
The 45 members of the glee club are trying to raise at least $6,000 so they can compete in the state championship. They already have $1240 What inequality can you write to find the amount each member must raise, on average, to meet the goal?
Answer:
Let x be the amount each member must raise.
$1240 + 45 ∙ x ≥ $6000

Question 4.
Ella has $40 to spend at the State Fair. Admission is $6 and each ride costs $3. Write an inequality to find the greatest number of rides she can go on.
Answer:
Let æ be the number of rides Ella can go on.
$6 + $3 ∙ x ≤ $40

Your Turn

Write a real-world problem for each inequality.

Question 5.
3x + 10 > 30
Answer:
In order to get a bonus this month, leon must sell more than 30 newspaper subscriptions
He sold 10 subscriptions in the first week of the month.
How many subscriptions must leon sell per week if there is three more weeks of the month?

Lesson 8.3 Answer Key Texas Go Math Grade 7 Solutions Question 6.
5x – 50 ≤ 100
Answer:
You have to pay $50 to rent a spot at the flea market to sell your stuff.
You make a $5 profit for each one you sell.
How many do you have to sell to make a $100 profit or less?

Texas Go Math Grade 7 Lesson 8.3 Guided Practice Answer Key

Draw algebra tiles to model each two-step inequality. (Explore Activity)

Question 1.
4x – 5 < 7

Answer:

On the left side of the mat we put 4 positive variable and 5 – 1 tiles. On the right side we put 7 + 1 tiles, and between is the sign of inequality.

Question 2.
-3x + 6 > 9

Answer:

On the left side of the mat, we put 3 negative variables and 6 + 1 times. On the right side, we put 7 +1 tiles, and between is the sign of inequality.

Go Math 7th Grade Answer Key Pdf Lesson 8.3 Question 3.
The booster club needs to raise at least $7,000 for new football uniforms. So far, they have raised $1,250. Write an inequality to find the average amounts each of the 92 members can raise to meet the club’s objective. (Example 1)
Let a represent the amount each member must raise.

The inequality that represents the situation is _____
Answer:

Amount to be raised: $7000
Amount already raised: $1250
Number of members: 92
1250 + 12 ∙ a ≥ 7000

Question 4.
Analyze what each part of 7x – 18 ≤ 32 means mathematically. (Example 2)
x is ____________________. 7x is ________
18 means that ________________________
≤ 32 means that ________________________
Answer:
-Solution.
-Solution multiplied by 7.
-Subtract from 7x.
-At most 32.

Question 5.
Write a real-world problem to represent 7x – 18 ≤ 32.
Answer:
Lenna has $32 and wants to buy the same Christmas sweaters for 7 friends.
Also she has a gift card of $18 that she plans to use.
How much at most can it cost one sweater?

Essential Question Check-In

Question 6.
Describe the steps you would follow to write a two-step inequality you can use to solve a real-world problem.
Answer:
The steps in writing a two-step inequality to solve a real-world problem:

• 1. Read the problem carefully and identify what is needed. Assign a variable for the said needed information.
• 2. Write down the important information that can be used to help to write an inequality.
• 3. Use words in the problem to tie the information together. Translate these words into numbers and variables in order to make an inequality.

The steps in writing a two-step inequality to solve a real-world problem.

Texas Go Math Grade 7 Lesson 8.3  Independent Practice Answer Key

Question 7.
Three friends earned more than $200 washing cars. they paid their parents $28 for supplies and divided the rest of the money equally. Write an inequality to find possible amounts each friend earned. Identify what your variable represents.
Answer:
Three friends paid their parents $28 for supplies. and they earned more than $200 washing cars. Let x be the possible amount each friend earned.
3x – $28 > $200

Texas Go Math Grade 7 Answer Key Pdf Lesson 8.3 Practice Question 8.
Nick has $7.00. Bagels cost $0.75 each, and a small container of cream cheese costs $1.29. Write an inequality to find the number of bagels Nick can buy. Identify what your variable represents.
Answer:
The container of cream cheese costs $ 1.29. and each bagel cost $0.75. Let x be the number of bagels Nick can buy with his $7.
$075 ∙ x + $1.29 < $7

Question 9.
Chet needs to buy 4 work shirts, all costing the same amount. The total cost before Chet applies a $25 gift certificate can be no more than $75. Write an inequality to find the possible amounts that Chet pays per shirt. Identify what your variable represents.
Answer:
Assign a variable for the unknown value. Let x be the cost of each shirt. The inequality for the given problem is:
4x + 25 ≤ 75

Question 10.
Due to fire laws, no more than 720 people may attend a performance at Metro Auditorium. The balcony holds 120 people. There are 32 rows on the ground floor, each with the same number of seats. Write an inequality to find the number of people that can sit in a ground-floor row if the balcony is full. Identify what your variable represents.
Answer:
We have to sum the number of people on the balcony, and how many people can sit in 32 rows on the ground floor, and that sum can not be greater than 720. Let x be the number of people in the rows on the ground floor.
32 ∙ x + 120 < 720

Question 11.
Liz earns a salary of $2,100 per month, plus a commission of 5% of her sales. She wants to earn at least $2,400 this month. Write an inequality to find amounts of sales that will meet her goal. Identify what your variable represents.
Answer:
We have to sum Liz’s month salary and 5% commission of hers sales, to find the amount. of sales that will meet her goal. Let x be the amount of sales.
$2100 + 5% ∙ x < $2400 5% we can write as a fraction 1/20.
$2100 + \(\frac{1}{20}\) ∙ x < $2400
$2100 + \(\frac{x}{20}\) < $2400

Question 12.
Lincoln Middle School plans to collect more than 2,000 cans of food in a food drive. So far, 668 cans have been collected. Write an inequality to find number of cans the school can collect on each of the final 7 days of the drive to meet this goal. Identify what your variable represents.
Answer:
We have to sum 668 cans that had been collected, and how many cans should be collected in 7 days, so that the school achieves the plan. Let x be the number of cans the school should collect each day.
668 + 7 ∙ x > 2000

Go Math Grade 7 Lesson 8.3 Answer Key Question 13.
Joanna joins a CD club. She pays $7 per month plus $10 for each CD that she orders. Write an inequality to find how many CDs she can purchase in a month if she spends no more than $100. Identify what your variable represents.
Answer:
We have to sum $7 and the number of CDs. each costs $10, which Joanna can purchase in a month with no more than $100. Let x be the number of CDs.
$7 + $10 ∙ x < $100

Question 14.
Lionel wants to buy a belt that costs $22. He also wants to buy some shirts that are on sale for $17 each. He has $80. What inequality can you write to find the number of shirts he can buy? Identify what your variable represents.
Answer:
We have to sum the price of the belt $22 and how many shirts, that costs $17, Lionel can buy, and that sum can be at most $80. Let x be the number of shirts Lionel can buy.
$22 + $17 ∙ x ≤ $80

Question 15.
Write and solve a real-world problem that can be represented by 15x – 20 ≤ 130.
Answer:
Given inequality in problem: 15x – 20 ≤ 130
15x – 20 ≤ 130 (Given)
15x – 20 + 20≤ 130 + 20 (Adding 20 on both side)
15x ≤ 150 (Simplifying)
x ≤ \(\frac{150}{15}\) (Dividing both side by 15)
x ≤ 10 (SoLution)
x ∈ (-∞, 10]

Analyze Relationships Write >, <, ≥, or ≤ in the blank to express the given relationship.

Question 16.
m is at least 25 m __________ 25
Answer:
m ≥ 25

Lesson 8.3 Go Math 7th Grade Writing Two Step Inequalities Question 17.
k is no greater than 9 k __________ 9
Answer:
k ≤ 9

Question 18.
p is less than 48 p __________ 48
Answer:
p < 48

Question 19.
b is no more than -5 b __________ -5
Answer:
p ≤ -5

Question 20.
h is at most 56 h __________ 56
Answer:
h ≤ 56

Question 21.
w is no less than 0 w __________ 0
Answer:
w ≥ 0

Question 22.
Critical Thinking Marie scored 95, 86, and 89 on three science tests. She wants her average score for 6 tests to be at least 90. What inequality can you write to find the average scores that she can get on her next three tests to meet this goal? Use s to represent the lowest average score.
Answer:
Let s represent the lowest average score on the next three tests Marie has to take.
\(\frac{95+86+89+s}{6}\) ≥ 90

Question 23.
Communicate Mathematical Ideas Write an inequality that expresses the reason the lengths 5 feet, 10 feet, and 20 feet could not be used to make a triangle. Explain how the inequality demonstrates that fact.
Answer:
The triangle inequality states that the sum of the lengths of any two sides of a triangle must be greater than or equal to the length of the third side. Let a, b and c be the sides of the triangle. The inequalities that should be satisfied are:
a + b ≥ c
a + c ≥ b
b + c ≥ a
However in our case we have
10 + 20 > 5
20 + 5 > 10
the sum of the lengths of the two shorter sides is less than the length of the third side
5 – 10 < 20
Hence, these lengths could not be used to make a triangle.

Go Math Lesson 8.3 7th Grade Two-Step Inequalities Question 24.
Analyze Relationships The number m satisfies the relationship m < 0. Write an inequality expressing the relationship between -m and 0. Explain your reasoning.
Answer:
The number m is less than 0, so m could be 1, -2, -3 etc. If we take the negative value of the number m, we will have
-(-1) = 1, -(- 2) = 2, -(- 3) = 3 etc. Hence, -m will be greater than 0.
Also, we could just multiply inequality m < 0 by (- 1). Because we are multiplying by a negative number, we have to reverse the direction of the inequality.
m < 0
Multiply by -1 on both sides.
-m > 0

Question 25.
Analyze Relationships The number n satisfies the relationship n > 0. Write three inequalities to express the relationship between n and \(\frac{1}{n}\).
Answer:
If 0 < n < 1, then the relationship between n and \(\frac{1}{n}\) is
n < \(\frac{1}{n}\)

If n ≤ 1, then the relationship between n and \(\frac{1}{n}\) is
n ≤ \(\frac{1}{n}\)

If n > 1, then the relationship between n and \(\frac{1}{n}\) is
n > \(\frac{1}{n}\)

Refer to our Texas Go Math Grade 4 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 4 Lesson 15.7 Answer Key Metric Units of Mass and Liquid Volume.

Texas Go Math Grade 4 Lesson 15.7 Answer Key Metric Units of Mass and Liquid Volume

Essential Question

How can you convert metric units of mass and liquid volume?
Answer:

1 kilogram = 1000 grams
1 liter = 1000 milliliters.

Unlock the Problem

Mass is the amoLuu of matter in an object. Metric units of mass include kilograms (kg) and grams (g). Liters (L) and milliliters (mL) are metric units of liquid volume.

The charts show the relationship between these units.

Example 1 Convert larger units to smaller units.

Becky planted a flower garden full of bluebonnets. She used 9 kilograms of soil. How many grams of soil is that?

So, Becky used ___________ grams of soil to plant her blue bonnets.
Answer:

So, Becky used 9000 grams of soil to plant her blue bonnets.

Are kilograms larger or smaller than grams?
Answer: kilograms larger than grams
Explanation:
1 kilogram= 1000 grams

Will the number of grams be greater than or less than the number of kilograms?
Answer: number of grams be less than the number of kilograms

What operation will you use to solve the problem?
Answer:
We used multiplication to solve the problem.

Example 2 Convert smaller units to larger units.

Becky used 5,000 milliliters of water to water her bluebonnet garden. How many liters of water is that?

So, Becky used __________ liters of water.
Answer:

So, Becky used 5 liters of water.

Math Talk

Mathematical Processes
Compare the size of a kilogram to the size of a gram. Then compare the size of a liter to the size of a milliliter.
Answer:

1 kilogram = 1000 grams
1 liter = 1000 milliliters.

Share and Show

Question 1.
There are 3 liters of water in a pitcher. How many milliliters of water are in the pitcher?

There are ___________ milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can ___________ 3 by 1,000 to find the number of milliliters in 3 liters.

So, there are ___________ milliliters of water in the pitcher.
Answer:

There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 3 by 1,000 to find the number of milliliters in 3 liters.

So, there are 3000 milliliters of water in the pitcher.

Complete.

Question 2.
4 liters = ___________ milliliters
Answer: 4000
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 4 by 1,000 to find the number of milliliters in 4 liters.
So, Answer is 4000 milliliters.

Question 3.
6 kilograms = ___________ grams
Answer: 6000
Explanation:
There are 1000 grams in 1 kilogram. Since I am changing from a larger unit to a smaller unit, I can multiply 6 by 1,000 to find the number of grams in 6 kilograms.
So, Answer is  6000 grams.

Question 4.
8,000 grams = ___________ kilograms
Answer: 8 kilograms.
Explanation:
There are 1000 grams in 1 kilogram. Since I am changing from a Smaller unit to a larger unit, I can divide 8000 by 1,000 to find the number of kilograms in 8,000 grams.
So, Answer is  8 kilograms.

Question 5.
7 liters = ___________ milliliters
Answer: 7000
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 7 by 1,000 to find the number of milliliters in 7 liters.
So, Answer is 7000 milliliters.

Math Talk

Mathematical Processes
Explain how you found the number of grams in 6 kilograms in Exercise 3.
Answer:
There are 1000 grams in 1 kilogram. Since I am changing from a larger unit to a smaller unit, I can multiply 6 by 1,000 to find the number of grams in 6 kilograms.
So, Answer is  6000 grams.

Problem Solving

Question 6.
Frank wants to fill a fish tank with 8 liters of water.
How many milliliters is that?
Answer: 8000
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 8 by 1,000 to find the number of milliliters in 8 liters.
So, Answer is 8000 milliliters.

Question 7.
Kim has 3 water bottles. She fills each bottle with 1,000 milliliters of water. How many liters of water does she have?
Answer: 3 liters
Explanation:
There are 1000 milliliters in 1 liter.
So 3x 1000 milliliters = 3000 milliliters
Now convert to liters
Since I am changing from a smaller unit to a larger unit, I can divide 3000 by 1,000 to find the number of liters in 3000 milliliters.
So, the Answer is 3 liters.

Question 8.
H.O.T. Multi-Step A 500-gram bag of granola costs $4, and a 2-kilogram bag of granola costs $15. What is the cheapest way to buy 2,000 grams of granola? Explain.
Answer: To buy a 2-kilogram bag of granola is cheap.
Explanation:
A 500-gram bag of granola costs $4. to buy 2,000 grams of granola need to buy 4 bags. Since 4 x 500 grams = 2000 grams
So cost is  4 x 4 = $16
A 2-kilogram bag of granola costs $15. 1 kilogram is equal to 1000 grams.
2 kilograms = 2 x 1000 grams= 2000 grams
to buy 2,000 grams of granola need to buy $15.

Lesson 15.7 Metric Units of Mass 4th Grade Question 9.
Sense or Nonsense? The world’s largest apple had a mass of 1,849 grams. Sue said the mass was greater than 2 kilograms. Does Sue’s statement make sense? Explain.
Answer: No. It does not make sense
Explanation:
1 kilogram = 1000 grams
2 kilogram = 2000 grams
1849 < 2000. So Sue’s statement does not make sense.

Unlock the Problem

Question 10.

H.O.T. Apply Multi-Step Lori bought 600 grams of cayenne pepper and 2 kilograms of black pepper. How many grams of pepper did she buy?
Answer: 2600 grams
Explanation:
1 kilogram = 1000 grams
2 kilogram = 2000 grams
600 grams of cayenne pepper and 2 kilograms of black pepper = 600 grams + 2000 grams = 2600 grams

a. What are you asked to find?
Answer: How many grams of pepper  she bought in all.

b. What information will you use?
Answer: Lori bought 600 grams of cayenne pepper and 2 kilograms of black pepper

c. Tell how you might solve th€ problem.
Answer: Changing from a larger unit to a smaller unit

d. Show how you solved the problem.
Answer:
1 kilogram = 1000 grams
2 kilogram = 2000 grams
600 grams of cayenne pepper and 2 kilograms of black pepper = 600 grams + 2000 grams = 2600 grams

e. Complete the sentences.
Lori bought __________ grams of cayenne pepper.
She bought __________ grains of black pepper.
__________ + __________ = __________ grams
So, Lori bought __________ grams of pepper in all.
Answer:
Lori bought 600 grams of cayenne pepper.
She bought 2000 grams grains of black pepper.
600 + 2000 = 2600 grams
So, Lori bought 2600 grams of pepper in all.

Daily Assessment Task

Fill in the bubble completely to show your answer.

Question 11.
The largest natural pearl in the world has a mass of about 6,000 grams. What is the mass of the pearl in kilograms?
(A) 600 kilograms
(B) 6 kilograms
(C) 60,000 kilograms
(D) 60 kilograms
Answer: B
Explanation:
There are 6000 grams in 1 kilogram. Since I am changing from a Smaller unit to a larger unit, I can divide 6000 by 1,000 to find the number of kilograms in 6,000 grams.
So, Answer is  6 kilograms.

Question 12.
Jen puts 10 liters of water in her aquarium. How many milliliters of water does she put in the aquarium?
(A) 100,000 milliliters
(B) 1,000 milliliters
(C) 100 milliliters
(D) 10,000 milliliters
Answer: B
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 10 by 1,000 to find the number of milliliters in 10 liters.
So, Answer is 10,000 milliliters.

Question 13.
Multi-Step Terry buys 3 kilograms of peanuts for a baseball game. He puts the peanuts in bags of 200 grams each. How many bags of peanuts does he have?
(A) 3,000 bags
(B) 150 bags
(C) 15 bags
(D) 50 bags
Answer:  C
Explanation:
There are 1000 grams in 1 kilogram. Since I am changing from a larger unit to a smaller unit, I can multiply 3 by 1,000 to find the number of grams in 3 kilograms.
So, it is  3000 grams.
He puts the peanuts in bags of 200 grams each. 3000 ÷ 200 = 15

Texas Test Prep

Question 14.
Caroline bought a bag of onions that was labeled 5 kilograms. She needs to know how many grams that is for her recipe. How many grams is 5 kilograms?
(A) 5,000 grams
(B) 50 grams
(C) 50,000 grams
(D) 500 grams
Answer: A
Explanation:
There are 1000 grams in 1 kilogram. Since I am changing from a larger unit to a smaller unit, I can multiply 5 by 1,000 to find the number of grams in 5 kilograms.
So, it is  5000 grams.

Texas Go Math Grade 4 Lesson 15.6 Homework and Practice Answer Key

Complete.

Question 1.
5,000 grams = ___________ kilograms
Answer: 5
Explanation:
There are 5000 grams in 1 kilogram. Since I am changing from a Smaller unit to a larger unit, I can divide 5000 by 1,000 to find the number of kilograms in 5,000 grams.
So, Answer is  5 kilograms.

Question 2.
3 liters = ___________ milliliters
Answer: 3000
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 3 by 1,000 to find the number of milliliters in 3 liters.
So, Answer is 3,000 milliliters.

Question 3.
9 kilograms = ___________ grams
Answer: 9000
Explanation:
There are 1000 grams in 1 kilogram. Since I am changing from a Smaller unit to a larger unit, I can divide 9000 by 1,000 to find the number of kilograms in 8,000 grams.
So, Answer is  9 kilograms.

Question 4.
6,000 milliliters = ___________ liters
Answer:
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a Smaller unit to a larger unit, I can divide 6000 by 1,000 to find the number of liters in 6000  milliliters .
So, Answer is  6 liters .

Problem Solving

Question 5.
A bucket holds 10 liters of water. How many milliliters of water does it hold?
Answer: 10,000 milliliters
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 10 by 1,000 to find the number of milliliters in 10 liters.
So, Answer is 10,000 milliliters.

Question 6.
Jessie’s cat has a mass of 5 kilograms. How many grams is Jessie’s cat?
Answer: 5000 grams
Explanation:
There are 1000 grams in 1 kilogram. Since I am changing from a larger unit to a smaller unit, I can multiply 5 by 1,000 to find the number of grams in 5 kilograms.
So, it is  5000 grams.

Question 7.
Austin bought 2,500 grams of red apples and 3,500 grams of green apples. How many kilograms of apples did Austin buy?
Answer: 6 kilograms
Explanation:
2500 + 3500 = 6000
There are 1000 grams in 1 kilogram. Since I am changing from a Smaller unit to a larger unit, I can divide 6000 by 1,000 to find the number of kilograms in 6000 grams.
So, Answer is  6 kilograms.

Question 8.
Kendal has a 5 liter bottle of orange juice and a 3 liter bottle of grapefruit juice. How many more milliliters of orange juice than grapefruit juice does she have?
Answer: 2000 milliliters
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 5 by 1,000 to find the number of milliliters in 5 liters.
So, it is 5,000 milliliters orange juice.
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 3 by 1,000 to find the number of milliliters in 3 liters.
So, it is 3,000 milliliters orange juice.
5000 – 3000 = 2000 milliliters
Question 9.
Kent’s backpack has a mass of 6 kilograms. Brent s backpack has a mass of 8 kilograms. How many grams greater is the mass of Brent’s backpack?
Answer:  2000 grams
Explanation:
Kent’s backpack has a mass of 6 kilograms. 6 x 100 grams = 6000 grams
Brent s backpack has a mass of 8 kilograms. 8 x 1000 grams = 8000 grams
8000 – 6000 = 2000 grams

Question 10.
A bottle can hold 2 liters of water. The bottle has 500 milliliters of water in it. How many ’ milliliters more can the bottle hold?
Answer: 1500 milliliters
Explanation:
A bottle can hold 2 liters of water = 2 x 1000 = 2000 milliliters
The bottle has 500 milliliters of water in it.
2000 – 500 =1500 milliliters

Question 11.
The maximum amount a picture hook can hold is 5 kilograms. Can Jamie hang a picture that has a mass of 4,600 grams on the hook? Explain.
Answer: Yes.
Explanation:
The maximum amount a picture hook can hold is 5 kilograms. 5 x 1000=5000 grams

5000 > 4600.

Lesson Check

Fill in the bubble completely to show your answer.

Question 12.
A punch bowl holds 16 liters, How many milliliters does the punch bowl hold?
(A) 1,600 milliliters
(B) 160 milliliters
(C) 16,000 milliliters
(D) 160,000 milliliters
Answer: C
Explanation:
There are 1000 milliliters in 1 liter. Since I am changing from a larger unit to a smaller unit, I can multiply 16 by 1,000 to find the number of milliliters in 16 liters.
So, Answer is 16,000 milliliters.

Question 13.
Tim bought a block of cheese that is labeled 4 kilograms. He wants to cut the cheese into blocks that weigh 200 grams. How? many blocks of cheese can Tim cut?
(A) 20
(B) 80
(C) 8
(D) 200
Answer: B
Explanation:
Tim bought a block of cheese that is labeled 4 kilograms. 4 x 1000 = 4000 grams
4000 ÷ 200 =80

Question 14.
Allen bought a 3-kilogram squash and a 2-kilogram squash. How many grams of squ ash did Allen buy in all?
(A) 50,000 grams
(B) 500 grams
(C) 50 grams
(D) 5,000 grams
Answer: D
Explanation:
1 kilogram = 1000 grams
3-kilogram squash and a 2-kilogram squash = 3 x 1000 + 2 x 1000 = 5000 grams

Question 15.
How many 25 milliliter doses of plant food can Tim get from a 1-liter bottle of plant food?
(A) 40
(B) 4
(C) 400
(D) 4,000
Answer: A
Explanation:
1-liter = 1000 milliliters
1000 ÷25 =40

Question 16.
Multi-Step Maria has a 2-liter bottle of juice. She pours two 300 milliliter glasses of juice. How much juice is left in the bottle?
(A) 1,940 milliliters
(B) 1,400 milliliters
(C) 800 milliliters
(D) 1,700 milliliters
Answer: B
Explanation:
Maria has a 2-liter bottle of juice. 2 x 1000 =2000
She pours two 300 milliliter glasses of juice = 2 x 300 =600
2000 – 600 = 1400 milliliters
Question 17.
Multi-Step Hannah bought a bag of pears that has a mass of 5 kilograms. She used 1,600 grams of pears for a recipe. What is the mass of the pears she has left?
(A) 3,400 grams
(B) 34 kilograms
(C) 3,400 kilograms
(D) 340 grams
Answer: C
Explanation:
Hannah bought a bag of pears that has a mass of 5 kilograms. 5 x 1000 grams = 5000 grams
She used 1,600 grams of pears for a recipe
5000 – 1600 = 3400 grams

Refer to our Texas Go Math Grade 8 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 8 Module 6 Quiz Answer Key.

Texas Go Math Grade 8 Module 6 Quiz Answer Key

Texas Go Math Grade 8 Module 6 Ready to Go On? Answer Key

6.1 Identifying and Representing Functions

Determine whether each relationship is a function.

Question 1.

Answer:
Not a function A relationship is a function when each input is paired with exactly one output. The input 5 has more than one output

Go Math Grade 8 Module 6 Answer Key Question 2.

Answer:
To determine the answer here, we will review the definition of a function.

A certain relationship represents a function if every input is paired with only one output. Considering the fact that in a given table every input has only one output we can conclude that it represents a function.

Question 3.
(2, 5), (7, 2), (-3, 4), (2, 9), (1, 1)
Answer:
Not a function A relationship is a function when each input is paired with exactly one output. Input 2 has more than one output

6.2 Describing Functions

Determine whether each situation is linear or nonlinear, and proportional or nonproportional.

Grade 8 Module 6 Quiz Answer Key Question 4.
Joanna is paid $14 per hour.
Answer:
To determine if the situation is linear or nonlinear. Let us analyze if we can express the situation in a linear equation.
Given the situation Joana is paid $14 per hour, we can express this in a linear equation using the slope-intercept from y = mx + b.
Let y be the amount to be paid to Joana x be the number of hours m is the rate of payment per hour

The equation that can be formed is y = 4x

Since the equation formed is a linear equation, then the situation is linear.

To determine if the given situation is proportional or nonproportional, let us have the equation y = 4x and determine the value of b. If b = 0, then the equation is proportional and if b ≠ 0, then the equation is nonproportional
Since the equation of the given situation is y = 4x, where b = 0, then the equation is proportional.
Thus, the situation is proportional.
linear; proportional

Question 5.
Alberto started out bench pressing 50 pounds. He then added 5 pounds every week.
Answer:
To determine if the situation is linear or nonlinear. Let us analyze if we can express the situation in a linear equation.

Given the problem “Alberto started out bench pressing 50 pounds. He then added 5 pounds every week”. We can
express this in the linear equation using the slope-intercept form y = mx + b.
Let y be the number of Alberto’s bench pressing in pounds
x be the number of weeks
m be the additional pounds every week
b be the number of pounds when Alberto started bench pressing

The equation that can be formed where m = 5 and b = 50 is
y = mx + b
y = 5x + 50
Since the equation formed is a linear equation, then the situation is linear.
To determine if the given situation is proportional or nonproportional, let us have the equation and determine the
value of b. If b = 0, then the equation is proportional if b ≠ 0, then the equation is nonproportional.

Since the equation of the given situation is y = 5x + 50, where b ≠ 0, then the equation is nonproportional.
Thus, the situation is nonproportional.
linear; nonproportional

6.3 Comparing Functions

Question 6.
Which function is changing more quickly? Explain.

Answer:
To determine the answer here, we will calculate the average rate of change for given functions. We will calculate
the rate using following formula:

Therefore, we can calculate the average rate of change for function 1 as following:
Rate of change = \(\frac{0-20}{5-0}\)
= -4

Let’s calculate the rate of change for function 2:
\begin{align*}
\text{ Rate of change}&=\dfrac{2-11}{4-2}\\
&=-4.5
\end{align}

To determine which function is changing more quickly, we have to compare the absolute values of obtained
numbers. Considering the fact that:
|-4| < |-4.5|,
we can conclude that function 2 changes more quickly.

Essential Question

Go Math Grade 8 Module 6 Answer Key Question 7.
How can you use functions to solve real-world problems?
Answer:
The situation gives a graph that is a straight line which is linear since it is stated that Sam is running at a constant
rate, meaning the distance covered per unit of time is always of the same value.

Another thing is that, since the distance covered per unit of time is always of the same value, the graph has a
proportional relationship that passes through the origin.

See the explanation.

Texas Go Math Grade 8 Module 6 Mixed Review Texas Test Prep Answer Key

Selected Response

Question 1.
Which table shows a proportional function?

Answer:

Explanation:
Option C represents a proportional relationship. It contains the ordered pair of the origin (0, 0)

Question 2.
Which term does not correctly describe the relationship shown in the table?

(A) function
(B) linear
(C) proportional
(D) nonproportional
Answer: (B) linear

Option B is the correct answer.

Question 3.
The table below shows some input and output values of a function.

What is the missing output value?
(A) 20
(B) 21
(C) 22
(D) 23
Answer:
17.5 – 14 = 3.5
17.5 + 3.5 = 21

Option B is the correct answer.

Go Math Grade 8 Module 6 Answer Key Pdf Question 4.
Which number is not rational?
(A) -7
(B) \(\sqrt{25}\)
(C) 0.33
(D) \(\sqrt{15}\)
Answer:
(A) -7 is a rational number because 7 corresponds to the definition of a rational number.
(B) \(\sqrt{25}\) is a rational number.
(C) 0.33 is a rational number.
(D) \(\sqrt{15}\) The square root of 15 is not a rational number. It is an irrational number.

Question 5.
Which of the relationships below is a function?

Answer: B is a function

Gridded Response

8th Grade Module 6 Module Quiz Ready To Go On Question 6.
A dance school charges a registration fee in addition to a fee per lesson. The equation y = 30x + 25 represents the total cost y of x lessons. What is the cost per lesson?

Answer:
Given,
A dance school charges a registration fee in addition to a fee per lesson.
The equation y = 30x + 25 represents the total cost y of x lessons.
25 indicates the registration fee
30 indicates the cost per lesson.

Refer to our Texas Go Math Grade 2 Answer Key Pdf to score good marks in the exams. Test yourself by practicing the problems from Texas Go Math Grade 2 Lesson 12.2 Answer Key Describe Multiplication.

Texas Go Math Grade 2 Lesson 12.2 Answer Key Describe Multiplication

Explore

Use counters to model the problem. Then draw a picture of your model. Write o number sentence for it.

Robby has _________ DVDs.

FOR THE TEACHER • Read the problem to children. Then have them model the problem using counters and write a number sentence for it. Robby has 5 boxes of DVDs. Each box holds 7 DVDs. How many DVDs does Robby have?
Answer:
Robby has 35 DVDs.

7 x 5 = 35
Explanation:
Robby has 5 boxes of DVDs.
Each box holds 7 DVDs.
5 x 7 = 35
35 DVDs that Robby have

Math Talk
Mathematical Processes

Describe the groups that you drew.
Answer:
Robby has 5 boxes of DVDs.
Each box holds 7 DVDs.
5 x 7 = 35
35 DVDs that Robby have

Model and Draw

When you multiply, you join equal groups. Use the pictures to describe equal groups.

Answer:

Explanation:
15 ÷ 3 = 5
12 ÷ 4 = 3
15 muffins shared among 3 trays
12 balls shared among 4 boxes

Share and Show

Use the pictures to describe equal groups.

Question 1.

There are _________ boxes of crayons.
Each ___________ has ___________.
So. there are ___________ in all.
Answer:
There are 2 boxes of crayons.
Each box has 12.
So. there are 24 in all.
Explanation:
2 x 12 = 24
With the help of images found the sum

Go Math Grade 2 Lesson 12.2 Answer Key Question 2.

There are ___________ bicycles.
Each ___________ has ___________.
So, there are ___________ in all.
Answer:
There are 5 bicycles.
Each friend has 1 cycle.
So, there are 5 in all.
Explanation:
5 x 1 = 5
With the help of images found the sum

Problem Solving

Use the pictures to describe equal groups.

Question 3.

There are ____________ stacks of books.
Each stack ___________.
So, ___________.
Answer:
There are 5 stacks of books.
Each stack 3 .
So, 15 books.
Explanation:
3 x 5 = 15
With the help of images found the sum

Question 4.

There are ____________ fish bowls.
Each bowl ____________.
So, ____________.
Answer:
There are 6 fish bowls.
Each bowl 2 fishes.
So, 12 fishes in all.
Explanation:
6 x 2 = 12
With the help of images found the sum

Go Math Grade 2 Answer Key Describe Multiplication Question 5.
H.O.T. Multi-Step Use the pictures to describe the equal groups. Then write the total number of legs.

Answer:
5 x 4 = 20
Explanation:
5 dogs with 4 legs
5 x 4 = 20
With the help of images found the sum

Question 6.
H.O.T. Caleb uses 3 toothpicks to make a triangle. He makes 3 triangles. How many toothpicks does he use?
__________ toothpicks
Answer:
9 toothpicks
Explanation:
Caleb uses 3 toothpicks to make a triangle.
He makes 3 triangles.
3 x 3 = 9
9 toothpicks that he use

Daily Assessment Task

Choose the correct answer.

Question 7.
Analyze One egg carton can hold 12 eggs. How many eggs will fit in 2 cartons?
(A) 24
(B) 12
(C) 28
Answer: A
Explanation:
One egg carton can hold 12 eggs.
2 x 12 = 24
24 eggs will fit in 2 cartons

Question 8.
Use the pictures to describe equal groups.

There are ________ bowls of apples.
Each bowl __________________
So, __________________.
Answer:
There are 4 bowls of apples.
Each bowl has 3 apples
So, 12 apples in all.
Explanation:
4 x 3 = 12
With the help of images found the sum

Go Math Grade 2 Answer Key Pdf Lesson 12.2 Question 9.
TEXAS Test Prep Tim has 5 cards. He puts 3 stickers on each card. How many stickers does he use?
(A) 8
(B) 15
(C) 10
Answer: B
Explanation:
Tim has 5 cards.
He puts 3 stickers on each card.
5 x 3 = 15
15 stickers that he use

TAKE HOME ACTIVITY • Ask your child to show how he or she solved an exercise in the lesson.

There are _________ bags of beach balls.
Each bag has __________________ beach balls.
So, there are __________________ balls in all.
Answer:
There are 3 bags of beach balls.
Each bag has  4 beach balls.
So, there are 12 balls in all.
Explanation:
3 x 4 = 12
With the help of images found the sum

Texas Go Math Grade 2 Lesson 12.2 Homework and Practice Answer Key

Use the pictures to describe equal groups.

Question 1.

There are _________ bags of beach balls.
Each bag has __________________ beach balls.
So, there are __________________ balls in all.
Answer:
There are 3 bags of beach balls.
Each bag has  4 beach balls.
So, there are 12 balls in all.
Explanation:
3 x 4 = 12
With the help of images found the sum

Go Math Grade 2 Practice and Homework Lesson 12.2 Answer Key Question 2.

There are __________ starfish.
Each starfish ____________________ .
So, __________________.
Answer:
There are 6 starfish.
Each starfish 5 fingers.
So, 30 fingers.
Explanation:
6 x 5 = 30 fingers
With the help of images found the sum

Question 3.

There are _________ baskets of apples.
Each basket __________________.
So, __________________.
Answer:
There are 4 baskets of apples.
Each basket has 8 apples.
So, 32 apples
Explanation:
4 x 8 = 32
With the help of images found the sum

Problem Solving

Solve. Write or draw to explain.

Question 4.
Multi-Step Use the picture to describe the equal groups of toy animals. Then write the total number of legs.

Answer:
2 cubs
and 2 loins
2 + 2 = 4
4 x 4 = 16
Explanation:
the total number of legs = 16
With the help of images found the sum

Lesson Check

Choose the correct answer.

Question 5.
Ken has 3 boxes of sandwiches. Each box has 6 sandwiches. How many sandwiches does Ken have?
(A) 9
(B) 18
(C) 15
Answer: B
Explanation:
Ken has 3 boxes of sandwiches.
Each box has 6 sandwiches.
3 x 6 = 18
18 sandwiches that Ken have

Go Math Lesson 12.2 Homework Answer Key Grade 2 Question 6.
Three girls are making puppets. Each puppet takes I hour to make. How many puppets will the girls make in 3 hours?
(A) 3
(B) 9
(C) 6
Answer: B
Explanation:
Three girls are making puppets.
Each puppet takes I hour to make.
3 x 3 = 9
9 puppets will the girls make in 3 hours

Question 7.
Carl has 4 stacks of 5 pennies. How many pennies does he have in all?
(A) 20
(B) 50
(C) 100
Answer: A
Explanation:
Carl has 4 stacks of 5 pennies.
4 x 5 = 20
20 pennies that he has in all

Question 8.
There are 6 pigs in a pen. Each pig gets a pail of food twice a day. How many pails of food are used each day?
(A) 14
(B) 8
(C) 12
Answer: C
Explanation:
There are 6 pigs in a pen.
Each pig gets a pail of food twice a day.
6 x 2 = 12
12 pails of food are used each day