Chapter 7 Multiplying and Dividing Polynomials PDF

Summary

This document is a chapter from a math textbook, covering the topic of multiplying and dividing polynomials. It details the use of models, symbols and algebra tiles.

Full Transcript

CHAPTER

7
Multiplying
and Dividing
Polynomials
Polynomials have been used for
centuries to explore and describe
relationships. These expressions are
useful in everyday life. For example,
a landscape designer might use a
polynomial to help with calculating
the cost of a landscaping project. The
landscaper can calculate a number
of different possible costs using a
polynomial expression. This saves a
lot of time. For what other jobs might
polynomials be helpful?

What You Will Learn
to multiply and divide polynomials
using models and symbols
to simplify polynomial expressions
by combining like terms

250 Chapter 7 NEL
 Key Words
monomial binomial
polynomial distributive property

Literacy Link
A spider map can help you understand and connect
new terms and concepts. This spider map is
designed to be used throughout the chapter.
Create a spider map in your math journal or
notebook. As you work through the chapter,
complete the map.
After completing section 7.1, beside each heading
on the upper left and upper right legs, provide
your own examples and methods for multiplying
monomials and dividing monomials.
After completing section 7.2, beside each heading
on the lower left leg, provide your own examples
and methods for multiplying polynomials by
monomials.
After completing section 7.3, beside each heading
on the lower right leg, provide your own examples
and methods for dividing polynomials
by monomials.
Mult omials
Mon

ls
Mon iding
omia
iplyi

Div
ng

Multiplying
And Dividing
Polynomials
ials ials

Divid y Monom
m
by M g Polyno

b
ing P
onom

olyn als
n
iplyi

omia
i
Mult

ls

NEL Chapter 7 251
 FOLDABLES TM
Study Tool

Making the Foldable Step 3

Materials Stack three sheets of grid paper so that the bottom
sheet of 11 × 17 paper edges are 2.5 cm apart. Fold the top edge of the sheets
two sheets of 8.5 × 11 paper and align the edges so that all tabs are the same size.
scissors Staple along the fold. Label as shown.
three sheets of 8.5 × 11 grid paper
ruler Multiplying and Dividing
stapler Polynomials by Monomials
7.2 Multiply a Polynomial by a
Step 1 Monomial Using an Area Model
7.2 Multiply a Polynomial by a
Monomial Using Algebra Tiles
Fold the long side of a sheet of 11 × 17 paper in half. 7.2 Multiply a Polynomial by a
Pinch it at the midpoint. Fold the outer edges of the Monomial Using Symbols
7.3 Divide a Polynomial by a
paper to meet at the midpoint. Label it as shown. Monomial Using a Model
7.3 Divide a Polynomial by a
Monomial Using Symbols

Step 4
Staple the three booklets you made into the Foldable
from Step 1 as shown.

7.1
Multiplying and Dividing 7.1
Multiply
Polynomials by Monomials Divide
Monomials
7.2 Multiply a Polynomial by a Monomials
Using a Monomial Using an Area Model Using a
Model 7.2 Multiply a Polynomial by a
Monomial Using Algebra Tiles Model
Step 2 7.2 Multiply a Polynomial by a
Monomial Using Symbols
Fold the short side of a sheet of 8.5 × 11 paper in half. 7.1 7.3 Divide a Polynomial by a 7.1
Monomial Using a Model
Fold in half the opposite way. Make a cut as shown Multiply Divide
7.3 Divide a Polynomial by a
through one thickness of paper, forming a two-tab Monomials Monomial Using Symbols Monomials
Using Key Words: Using
book. Repeat Step 2 to make another two-tab book. monomial
Label them as shown.
Symbols polynomial Symbols
binomial
distributive property

7.1
7.1
Multiply
Divide
Monomials
Monomials Using the Foldable
Using a
Using a
Model As you work through the chapter, write the Key Words
Model
in the remaining space in the centre panel, and provide
definitions and examples. Beneath the tabs in the left,
7.1 7.1 right, and centre panels, provide examples, show work,
Multiply Divide and record main concepts.
Monomials Monomials
Using Using On the front of the right flap of the Foldable, record
Symbols Symbols ideas for the Wrap It Up! On the back of the Foldable,
make notes under the heading What I Need to Work
On. Check off each item as you deal with it.

252 Chapter 7 NEL
Math Link
Landscape Design
Gardeners and landscapers are often required to calculate areas when designing a
landscape for a backyard, commercial property, or park. When determining how
much soil, sand, gravel, mulch, and seed they need for a project, landscape designers
also calculate volumes. Here is a landscape design created for a property.

Herb
Garden
8.5 m
Driveway 3m 2m

Patio 2.3 m 27 m
House
Pool 4 m

4m
9m

36 m

1. a) The circular herb garden has a radius of 4.5 m. What is the area of the
herb garden?
b) If the herb garden must have soil that is 0.5 m deep, what volume of soil
is needed?
c) What is the difference between the units used to measure the area and the
units used to measure the volume of the herb garden?
2. The house is square. What fraction of the property does the house take up?
Show two ways to express the answer.
3. The pool is in the shape of a square with a trapezoid attached to it. For the water
in the pool to have a depth of 1.7 m, what volume of water is needed? Describe
how you calculated the volume.
4. a) The patio has a surface area of 18 m2. If it takes 48 paving stones to cover 1 m2,
how many paving stones are needed for the patio?
b) Does your answer need to be exact? Explain.

5. What total area is grass? Explain how you calculated the area.

In this chapter, you will explore how to multiply and divide polynomials to help you
create a landscape design for a park. What types of materials will you use?

NEL Math Link 253
 7.1 Multiplying and Dividing
Monomials
Focus on…
After this lesson, you
will be able to…
multiply a monomial
by a monomial
divide a monomial
by a monomial

The band council would like to design a Medicine Wheel
Did You Know? similar to the one shown above for a square area of the new
The Medicine Wheel school courtyard. According to the design, the edges of 2x
represents harmony the outer circular pathway will just touch the edges of the
and connection. It is square. The outer radius of the circle can be represented
an important symbol
of the peaceful
by 2x. How could you determine the relationship between
relationships among the area of the circle and the area of the square?
all living things.
Explore Multiplying and Dividing Monomials
1. What is the side length of the square in terms of x?
Literacy Link
A monomial has one 2. a) Write an expression for the area of the circle.
term. For example, 5,
n4 b) Write an expression for the area of the square.
2x, 3s2, -8cd, and __
3
are all monomials. Do not use an
3. Show how to compare the two areas using
approximate value for
a ratio expressed in lowest terms.
π. Leave π in the ratio.

4. How does the area of the square compare to the area of the circle?

Reflect and Check
5. Would this relationship be the same for any circle inscribed in a
square? Explain.

6. a) How would you multiply the monomials 4x and 3x?
b) How would you divide the monomial 10x2 by the monomial 5x?

254 Chapter 7 NEL
Link the Ideas
Example 1: Multiply Monomials
Determine each product.
a) (5x)(2x) b) (3x)(2y)

Solution
a) Method 1: Use a Model You can use algebra
You can use x-tiles and x2-tiles to model (5x)(2x). tiles to model
algebraic expressions.

positive x-tile

positive y-tile

positive xy-tile
Each square has an area of (x)(x) = x2. There are 10 positive x2-tiles.
So, (5x)(2x) = 10x2.
Method 2: Algebraically
Multiply the numerical coefficients. positive x2-tile
Then, multiply the variables. The same tiles in
(5x)(2x) white represent
How can you use the
= (5)(2)(x)(x) exponent laws to help you
negative quantities.
= 10x2 multiply the variables?

b) Method 1: Use a Model
You can use x-tiles, y-tiles, and xy-tiles to model (3x)(2y).

Each grey rectangle has an area of (x)(y) = xy.
There are 6 positive xy-tiles. So, (3x)(2y) = 6xy.
Method 2: Algebraically
(3x)(2y)
= (3)(2)(x)(y)
= 6xy

Show You Know
Determine each product in two different ways.
a) (4x)(2y) b) (-x)(7x)

NEL 7.1 Multiplying and Dividing Monomials 255
 Example 2: Apply Monomial Multiplication 4.3x

What is an expression for the area of the rectangle? 2x

Solution
You can calculate the area, A, of a rectangle by multiplying the length by
the width.
A = (4.3x)(2x)
A = (4.3)(2)(x)(x)
A = (8.6)(x2)
A = 8.6x2
An expression for the area of the rectangle is 8.6x2.

Show You Know
Calculate each product.
a) (11a)(2b) b) (-5x)(3.2)

Example 3: Divide Monomials
Determine each quotient.
-10x2 8xy
a) ______ b) ____
2x 4x

Solution
Strategies a) Method 1: Use a Model
Model It You can divide using algebra tiles.
-10x2 by representing the numerator with 10 negative x2-tiles.
Model ______
2x
Arrange the 10 tiles into a rectangle so that one of the sides is
2 x-tiles long.
?

The unknown side length of the rectangle is made up of 5 negative x-tiles.

-10x = -5x
______
2

2x

256 Chapter 7 NEL
 Method 2: Algebraically
You can divide the numerator and the denominator by 2x.
-10x
______
2

2x How can you use the
-5x
exponent rules to help
-10x 2 you divide the variables?
= ______
2x
1

= -5x

b) Method 1: Use a Model
8xy
Model ____ by representing the numerator with 8 xy-tiles. Arrange
4x
the 8 tiles into a rectangle so that one of the sides is 4 x-tiles long.

?

The unknown side length of the rectangle is made up of 2 y-tiles.

8xy
____ = 2y
4x
Method 2: Algebraically
Divide common factors in the numerator and denominator.
8xy
____
4x
2
8xy
= ____
4x
1
= 2y

Show You Know
Determine each quotient.
12xy -14x 2
a) _____ b) ______
3y -2x

NEL 7.1 Multiplying and Dividing Monomials 257
 Example 4: Apply Monomial Division
The area of a triangle is given by the expression 18x2. The base of
the triangle is represented by 4x. What is the height of the triangle
in terms of x?

Strategies Solution
Draw a Diagram

Area = 18x2

4x

The area of a triangle can be calculated by multiplying the base by the
height, then dividing by 2.
Area = base × height ÷ 2
So, if the area and base are known, then
Height = 2 × ____area
base
(2)(18x2)
Height = ________
4x
Height = 36x
_____
2

4x
Divide the numerical coefficients.
Then, divide the variables.
Height = 9x
The height of the triangle is 9x.

Show You Know
Calculate each quotient.
18x2
a) _____
3x
b) 14y ÷ (-2)
-18.6mn
c) _________
-3n

258 Chapter 7 NEL
 Key Ideas
You can represent the multiplication and division of monomials
using a model.
(2x)(-3x)
There are 6 negative x2-tiles.
(2x)(-3x) = -6x2

8xy
___ The unknown side length of the
2x
rectangle is made up of 4 positive
y-tiles.
8xy
___ = 4y
? 2x

To multiply monomials algebraically, you can multiply the numerical
coefficients and use the exponent rules to multiply the variables.
To divide monomials algebraically, you can divide the numerical
coefficients and use the exponent rules to divide the variables.

Check Your Understanding
Communicate the Ideas
1. Explain to a partner at least two ways you could find the product
of (3x) and (5x).

2. Laurie used the following method to divide 16n2 by 2n.
16n2
____
2n
= (16 - 2)(n2 - n)
= 14n
Does Laurie’s method have any errors? If so, what are her errors and
what is the correct solution?

NEL 7.1 Multiplying and Dividing Monomials 259
Practise
For help with #3 to #8, refer to Example 1 on page 255. b) c)
3. What multiplication statement is represented
by each set of algebra tiles?
a)

5. Model and complete each multiplication
statement.
a) (2x)(4x) b) (-4x)(2x)
b) c) (-4x)(-2x) d) (-2x)(4x)

6. Represent each multiplication statement
with a model. Then, give the product.
a) (3x)(5x) b) (x)(-6x)
c) (-3x)(2x) d) (-x)(x)

For help with #7 to #10, refer to Example 2 on page 256.
c)
7. Find the product of each pair of monomials.
a) (2y)(5y) b) (3a)(-6b)

c) (-q)(-9q) d) ( __32x )(3x)
e) (-3r)(-2t) f) (1.5p)(-3p)

8. Multiply each pair of monomials.
4. Determine the multiplication statement a) (3n)(2n) b) (-4k)(-7k)
shown by each set of algebra tiles.
a)
c) (-4w)(2.5w) d) ( ___
5 )
-3 x (15x)

e) (8m)(-0.5n) f) (t)(-7t)

9. A rectangle has a width of 3.9x and a length
of 5x. What is an expression for the area of
the rectangle?

10. A parallelogram has a base of 8.1z and
a height of 4.2z. What is an expression
for the area of the parallelogram?

4.2z

8.1z

260 Chapter 7 NEL
For help with #11 to #16, refer to Example 3 on b) ?
pages 256-257.
11. Write the division statement represented
by each set of algebra tiles.
a)

?
c)

b) ?
?

c)
13. Model and complete each division.
8x 2 5xy
a) ____ b) ____
2x 5y
-12x 2
c) ______
2x2
d) ____
? 4x -x

14. Model and complete each division.
-15x 2 10xy
a) ______ b) _____
3x 2x
12x 2
c) _____
-9x 2
d) _____
12. Determine the division statement shown -3x -3x
by each set of algebra tiles.
a) 15. Find the quotient of each pair of monomials.
7x
a) ____
2
25st
b) ____
125t
c) _____
x 5s 5
-8m 81rs 4.5p2
d) _____ e) ____ f) _____
-2m 3rs -3p
?
16. Divide.
a) 12.4x2 ÷ x b) -15r ÷ (-4r)
c) 0.6t ÷ 0.2t
2 2
d) -18pn ÷ 3n

e) k ÷ 4k
2
f) __x2 ÷ 2x
3

NEL 7.1 Multiplying and Dividing Monomials 261
Apply 21. The diagram shows that x is the radius of
the large circle and the diameter of the small
17. Find an expression for the area of each
circle. Write the ratio of the area of the large
figure. circle to the area of the small circle. Simplify
a) the expression.
3x

11x
b)
x
4p

10p
c)

_1 w 22. A circle is inscribed in a square as shown.
2

r

18. What is the missing dimension in each
figure?
a) b)
A = 3.3w2 In terms of the radius, r, determine each
1.1w of the following ratios.
A = 15x2 a) the area of the square to the area of
5x
the circle
b) the perimeter of the square to the
circumference of the circle

19. The area of a rectangle is 72d2 and its length
is 20d. What is an expression for its width? Literacy Link
An inscribed circle fits exactly into another figure so that
the edges of the two figures touch, but do not intersect.
20. Claire wants to build a patio outside her
café. The rectangular space outside of
Claire’s café is three times as long as it is 23. Jonasie and Elisa
wide. The area of the space is 48 m2. Claire are taking two
would like to build a patio with dimensions tourists on a trip to
3.5 m by 12.5 m in this space. Will it fit? photograph caribou.
Explain. The visitors will be
travelling by dogsled.
The dogsled’s length
is 4 times its width.
The sled has a
rectangular base
area of 3.2 m2. The
equipment to be loaded on the sled measures
0.8 m wide by 3.5 m long. Will the
equipment fit on the sled as it is presently
packed? Explain your answer.

262 Chapter 7 NEL
Extend 27. A contractor needs to order the glass for a
window. The window is in the shape of an
24. A rectangular prism has a volume in cubic
isosceles triangle and the height of the
centimetres expressed as the monomial window is 2.5 times the base width.
60xy. The length and width of the prism,
in centimetres, are 4x and 3y respectively.
a) Determine the height.
b) Write an expression for the surface area
of the rectangular prism.

9n
25. How is determining ____2 similar to and
3n
9n2 ? a) Determine an expression for the area
different from determining ____
3n of the window in terms of the width
of its base.
26. A and B represent monomials. When A is b) If the width of the base must be 85 cm,
multiplied by B, the result is A. When A is what is the largest window area the
divided by B, the result is A. What is the contractor can use?
monomial B?

Landscape designs for gardens may
include rectangular and circular
areas for flower beds, lawns, patios,
and pools. As a landscape designer,
you sometimes need to:
calculate the volume of material,
such as soil, gravel, water, or
mulch, needed to fill these areas
to a certain depth
calculate the area that a known
volume of material will cover
The following are the formulas for
these calculations:
Volume = area × depth
volume
Area = _______
depth

Draw a rectangle and circle that might be used in landscaping. Label the
You may wish to create
design element that each shape represents.
a spreadsheet that
Use variables for the dimensions of the shapes. allows you to enter the
Create an area formula for each shape. values to calculate
For each shape, tell what type of material you will use to fill it. areas and volumes.
Also, tell what the depth of the material will be.
Create a volume formula for each shape.
Along with each formula, include an explanation concerning any coefficients How do these
you use. For example, you may have to convert centimetre measurements coefficients relate to
your landscape design?
to metres.

NEL 7.1 Multiplying and Dividing Monomials 263
 7.2 Multiplying Polynomials by
Monomials
Focus on…
After this lesson, you
will be able to…
multiply a
polynomial by
a monomial

In the 1880s, braking a train was a tough job. The engineer “whistled
down” for brakes and reversed his engine. Two people were responsible
for the brakes. One rode in the cab on the engine and the other rode in
the caboose. These people would run toward each other over the swaying,
rocking car tops, tightening each car’s brake control wheel as they went.

Physics Link
Air brakes on trains became
commonplace in the 1900s, making
the task of stopping a train much
easier. Air brakes use compressed air
in a piston to push the brake shoe
onto the train wheel. The system
works like a bicycle brake.

264 Chapter 7 NEL
Explore Multiplying a Polynomial by a Monomial Literacy Link
When a train’s brakes are applied, the train travels a distance before it A polynomial is made
stops. After t seconds, the distance, in metres, that the train travels is up of terms connected
given by the polynomial 2t(20 - t). by addition or
subtraction.
1. What part of the diagram does 2t(20 - t) represent? Examples:
20 x+5
t 2d - 2.4
x
3s2 + 5s - 6
h2 __
2t
__ -h
2 4

2. What polynomial represents the unknown length in the diagram?
How did you determine this polynomial?

3. Find three rectangles in the diagram. What is an expression for the
area of the largest rectangle? What is an expression for the area of
the smallest rectangle?

4. What is the difference in area between the largest and smallest
rectangles? Show two ways to find your answer.

5. Calculate the area of the medium-sized rectangle using the
dimension you determined in #2.

Reflect and Check
6. Describe the steps you used in #5 to calculate the area of the
medium-sized rectangle.

7. How is the area of the medium-sized rectangle related to the areas
of the large rectangle and the small rectangle?

8. How far does the train travel in 10 s? Show how you arrived at
your answer.

NEL 7.2 Multiplying Polynomials by Monomials 265
 Link the Ideas
Example 1: Multiply a Polynomial by a Monomial Using an
Area Model
Determine the product.
(3x)(2x + 4)

Solution
Strategies Draw a rectangle with side dimensions that represent 3x and 2x + 4.
Draw a Diagram 2x + 4
2x 4

3x A1 A2

Calculate the area of each rectangle.
A1 = (3x)(2x)
A1 = 6x2 A1= 6x2 A2= 12x

A2 = (3x)(4)
A2 = 12x
The total area is A1 + A2 = 6x2 + 12x.

Show You Know
Calculate each product.
a) (2x)(x + 3) b) (2 + c)(c)

Example 2: Multiply a Polynomial by a Monomial Using
Algebra Tiles
Find the product.
(2x)(3x - 5)

Solution
You can use x-tiles and negative 1-tiles to model 2x and 3x - 5.

266 Chapter 7 NEL
 Use x2-tiles and negative x-tiles to model (2x)(3x - 5).

There are 6 positive x2-tiles and 10 negative x-tiles.
So, (2x)(3x - 5) = 6x2 - 10x.

Show You Know
Find each product.
a) (2 + 3x)(3x) b) (4x)(2x - 1)

Example 3: Multiply a Polynomial by a Monomial Algebraically
The dimensions of a rectangular gym floor are
represented by the expressions 4x and 5x - 3.
What is a polynomial expression for the area 4x
of the gym floor? Write the expression in
simplified form.
5x - 3

Solution
You can calculate the area of a rectangle, A, by multiplying the width
by the length. Literacy Link
The distributive
A = (4x)(5x - 3) property allows you
to expand algebraic
You can apply the distributive property. Multiply 4x by each term expressions. Multiply
in the binomial 5x - 3. the monomial by each
term in the polynomial.
A = (4x)(5x - 3) a(b + c) = ab + ac
A = (4x)(5x) - (4x)(3)
A = (4)(5)(x)(x) -(4)(3)(x)
A = 20x2 - 12x Literacy Link
A binomial is a
A simplified expression for the area of the gym floor is 20x2 - 12x. polynomial with two
terms, such as 6y2 + 3
and 2x - 5.
Show You Know
Calculate each product.
a) (-3x)(2x + 5) b) (5y)(11 - x)

NEL 7.2 Multiplying Polynomials by Monomials 267
 Key Ideas
You can represent the multiplication of a polynomial by a monomial
using models.
area model algebra tiles

2x + 2
2x 2

3x A1= 6x2 A2= 6x

(3x)(2x + 2)
The product is represented by A1 + A2.
(3x)(2x + 2) = 6x2 + 6x (2x)(-2x + 3)
There are 4 negative x2-tiles and 6 positive x-tiles.
(2x)(-2x + 3) = -4x2 + 6x

To multiply a polynomial by a monomial algebraically, you can
expand the expression using the distributive property. Multiply
each term of the polynomial by the monomial.

(-1.2x)(3x - 7)
= (-1.2x)(3x) - (-1.2x)(7)
= -3.6x2 + 8.4x

Check Your Understanding
Communicate the Ideas
1. Describe two methods you could use to multiply polynomials by
monomials.

2. Sara is going to simplify the expression (3x)(2x + 4). Can she add
the terms in the brackets and then multiply? Explain.

3. Mahmoud used the following method to expand the expression
(5x)(2x + 1).
(5x)(2x + 1) = 10x2 + 1

a) Show that Mahmoud’s solution is incorrect.
b) How would you correct his solution?

268 Chapter 7 NEL
Practise
For help with #4 to #7, refer to Example 1 on page 266. b)
4. What multiplication statement
is represented by each area model?
a) 2x 4 b) 4k

3k c)
3x

3.6

c) 3.2k 5.1

k

5. Determine the multiplication statement
shown by each area model.
a) 3y 7 b) 3.5f

4y f
9. Determine the multiplication statement
shown by the algebra tiles.
2
a)

c) 7 0.9k

2k

6. Expand each expression using an area model.

a) (3.2r + 1)(4r) b) ( __21 a )(3a + 6)
7. Use an area model to expand each expression.
a) (2x)(4x + 2) b) (6k + 2)(4.5k) b)

For help with #8 to #11, refer to Example 2 on
pages 266-267.
8. What multiplication statement is represented
by the algebra tiles?
a)

c)

NEL 7.2 Multiplying Polynomials by Monomials 269
10. Expand each expression, using algebra tiles. 15. Lee has decided to build a shed on a square
a) (x - 5)(3x) b) (2x)(-2x + 3) concrete slab. The shed has the same width, w,
as the slab. Its length is 2 m shorter than the
11. Use algebra tiles to expand each expression. width of the slab.
a) (4x + 2)(-3x) b) (-4x)(3x - 1) a) What is an expression for the area of
the shed?
For help with #12 and #13, refer to Example 3 on b) If the width, w, of the slab is 4 m, what
page 267. is the area of the shed?
12. Expand using the distributive property.
a) (2x)(3x - 1)
b) (3p)(2p - 0.8)
c) (0.5m)(7 - 12m)

d) ( __21r - 2 )(-r)
2m
e) (2n - 7)(8.2)
w
f) (3x)(x + 2y + 4)
16. The basketball court for the Jeux de la
13. Multiply. Francophonie is 5.5 m longer than 1.5 times
a) (4j)(2j - 3) the width.
b) (-1.2w)(3w - 7) a) What is an expression for the area of the
c) (6x)(4 - 2.4x) basketball court?
b) If the length is 28 m, what is the area of
d) ( __73 v + 7 )(-1) the basketball court?
e) (3 - 9y)(y)
f) (-8a - 7b - 2)(8a) Did You Know?
The Jeux de la Francophonie are games for
Apply French-speaking people. They are held every four
years in different locations around the world. The
14. A rectangular Kwakiutl button blanket games include sports and artistic events. Canada is
has a width of 3x and a length of 4x - 3. represented by three teams: Québec, New Brunswick,
and a third team representing the rest of Canada.

Digital rights not available. Digital rights not available.

a) What is an expanded expression for the 17. A rectangular field is (4x + 2) m long. The
area of the blanket? width of the field is 2 m shorter than the
b) What is a simplified expression for the length. What is an expression for the area
perimeter of the blanket? of the field?

270 Chapter 7 NEL
18. A rectangular skateboard park is (3x) m 20. The surface area, SA, of a cylinder is
long. Its width is 4 m less than the length. SA = 2πr2 + 2πrh, where r is the radius and
a) What is an expression for the area of h is the height. The formula for the volume,
the park? V, of a cylinder is V = πr2h. What is the
surface area of a cylinder that has a height
b) If x = 15, what is the area of the park?
of 5 cm and a volume of 80π cm3?
Extend r

19. A rectangluar packing crate has the h
dimensions shown, in metres.

21. A rectangle measuring (12n) m by 8 m has
a square of side length 2 m cut out in the
2x + 2
four corners. The cut-out shape forms an
open box when the four corners are folded
and taped.
x a) Draw the box and label its dimensions.
2x
b) What is the surface area of this
a) What is an expression for the total
open box?
surface area of the crate?
c) What is the capacity of this box?
b) What is an expression for the volume
of the crate?

You are drawing up plans for a
landscape design. You are going
to include one of the following
design elements, which will be
in the shape of a rectangle:
swimming pool
concrete patio
hockey rink
beach volleyball pit

The rectangular shape is 2 m longer than twice the width. You must choose
For example, a swimming pool
an appropriate depth for your design element.
may have a depth of 1.5 m.
a) Create a formula for calculating the volume of material needed to fill
your design element.
b) Use your formula to calculate the volume of material needed for widths Is a pool filled right to the top
of 2 m, 3 m, 4 m, and 5 m. Which width would you prefer for your design with water? How might this
element? Why? affect your formula?

NEL 7.2 Multiplying Polynomials by Monomials 271
 7.3 Dividing Polynomials by Monomials
Focus on…
After this lesson, you
will be able to…
divide a polynomial
by a monomial

When you are buying a fish tank, the size of the tank
depends on the size and habits of the fish. A tank for a
jaguar cichlid, or Parachromis managuensis, should
have the minimum dimensions shown, in metres.
The volume of the rectangular tank can be
represented by the polynomial expression
7.5w2 - 3w. How could you determine a
polynomial expression that represents the 0.6 m
length of the tank in terms of w?
w

Materials Explore Dividing a Polynomial by a Monomial
algebra tiles
A rectangular solid has a width of 2x, a height of 3, and
an unknown length. The area of the base of the solid
is represented by the polynomial 2x2 + 4x.
1. Show that the volume of the solid shown can be 3
represented by the polynomial 6x2 + 12x.
2x
2. Use algebra tiles to represent the area of the
rectangular base.

3. Count the number of x-tiles and 1-tiles required for the missing
dimension of the rectangle. What expression represents the
missing dimension?

Reflect and Check
What happens if you
multiply your 4. Show that your expression for the missing dimension in #3 is correct.
expression by the
width of the
5. Describe the steps you would take to find an expression for the
rectangular solid?
ratio of the volume to the side measuring 2x.

272 Chapter 7 NEL
Link the Ideas
Example 1: Divide a Polynomial by a Monomial Using a Model
Determine the quotient.
6x2 - 8x
________
2x
Solution
You can use algebra tiles. ? Strategies
Use 6 positive x2-tiles and Model It
8 negative x-tiles to represent
the polynomial 6x2 - 8x.
The vertical side of the rectangle
represents the monomial divisor, 2x.

Count the number of positive x-tiles
and negative 1-tiles required to
complete the horizontal side of the
rectangle.
There are 3 positive x-tiles and
4 negative 1-tiles, or 3x - 4. This
expression represents the result of
dividing the polynomial, 6x2 - 8x,
by the monomial, 2x.
You can also determine
6x - 8x = 3x - 4
2
________ the quotient
2x algebraically.
6x2 - 8x
________
Check: 2x
Multiply the quotient, 3x - 4, by the divisor, 2x. 6x 2
8x
= ___ - ___
2x 2x
3x 4
(2x)(3x - 4) How do you know
6x2 ⁄
⁄ 8x
= ___ - ___
= (2x)(3x) - (2x)(4) that the answer is 2x ⁄
⁄ 2x
1 1
= 6x2 - 8x correct? = 3x - 4

Show You Know
Determine each quotient.
3x2 + 6x 8x - 2x
2
a) ________ b) ________
3x 2x

NEL 7.3 Dividing Polynomials by Monomials 273
 Example 2: Dividing a Polynomial by a Monomial Algebraically
a) What is the ratio of the surface area to the radius
The formula for the r
surface area of a of the cylinder? Write the ratio in simplified form.
h
cylinder is 2πr2 + 2πrh. b) If the height, h, of the cylinder is the same as the
radius, r, what is the ratio of the surface area to
the radius? Write the ratio in simplified form.
Solution
surface area 2πr2 + 2πrh
a) ___________ = ____________ b) Substituteh = r into the ratio
radius r
from part a).
The expression can be broken surface area
___________
down into two parts. radius
surface area
___________ = 2πr + 2πh
radius = 2πr + 2π(r)
= _____ 2πrh
2πr2 + _____ = 2πr + 2πr
r r = 4πr
rr 1

= _____ 2πrh
2πr + _____
2

r r
1 1

= 2πr + 2πh

Show You Know
Determine each quotient.
15x2 - 12x -2t + 4t
2
a) ___________ b) _________
3x 2t

Key Ideas
You can divide a polynomial by a monomial using a model. ?
4x - 6x
2
________
2x
The unknown side length of the rectangle is made up of 2x - 3 tiles.
4x2 - 6x
________ = 2x - 3
2x
When you divide a polynomial by a monomial algebraically,
you can divide the numerical coefficients and apply the
exponent laws to the variables.
4x - 8x
________
2

2x
4x2
8x
= ___ - ___
2x 2x
2x 4
8x
4x - ___ 2
= ___
2x 2x
1 1
= 2x - 4

274 Chapter 7 NEL
Check Your Understanding
Communicate the Ideas
3x + 6x 2
1. Explain how you would perform the following division: ________.
2x
2. Anita used the following method to simplify an expression: 9k - 3k2
________
a) Show that Anita’s solution is incorrect. 3
9k
___ 3k
2

b) How would you correct her solution? = - ___
3 3
= 3k - 1

3. Use a model to show a polynomial division statement with a quotient of 3x + 2.

Practise
For help with #4 to #7, refer to Example 1 on page 273. 5. Determine the division statement
4. What division statement is represented by represented by the algebra tiles and give
the algebra tiles? Determine the quotient. the quotient.
a) ? a) ?

b) ?

b) ?

c) ?

c) ?

NEL 7.3 Dividing Polynomials by Monomials 275
 6. Divide each expression, using a model. 11. A rectangular fish tank has the dimensions
5x - 10x
2 shown, in metres. The volume of the tank
a) __________
5x can be represented by 7.5w2 - 3w.
4x + 12x
2
b) __________
2x

7. Use a model to divide each expression.
-8x - 4x
2
a) __________
4x
-3x2 + 5x
b) __________
-x
0.6 m

For help with #8 and #9, refer to Example 2 on w
page 274.
a) What polynomial expression represents
8. Divide.
the area of the base of the tank?
2y + 4.2y
2
a) __________ b) What polynomial expression represents
2y
the length of the tank?
12m - 6.2m + 24
2
b) _________________ c) What is the length of the tank if the
2 width is 0.6 m? What is the volume
-18y - 6y 2
of the tank?
c) ___________
-6y
3cv - 2.7c 12. For their Valentine’s Day dance, the grade
d) __________
3c 9 students want to decorate the end wall
of the gym with red poster paper. The
9. Determine each quotient. area of the wall is given by the polynomial
2.7c + 3.6c
2 45x2 + 20x. One sheet of poster paper
a) ___________ covers an area given by the monomial 5x.
3c
2x2
+ 8xy What polynomial expression represents the
b) _________ number of sheets of paper the students will
x
need to cover the wall?
-s - 1.5st
2
c) ___________
5s
13. A rectangle has an area of 9x2 - 3x square
-14w - 7w + 0.5
2
units. The width of the rectangle is 3x units.
d) __________________
0.5 What is the length?

Apply
10. A dump truck holds 10 m3 of soil. You are 9x2 - 3x 3x
filling a rectangular space in a yard with
the dimensions of (2x + 3) by 5x by 2,
in metres. What polynomial expression
represents the number of truck loads of
soil you will need?

276 Chapter 7 NEL
14. The formula used to predict the distance an 16. Two rectangles have common sides with
object falls is d = 4.9t2 + vt. In the formula, a right triangle, as shown. The areas and
d is the distance, in metres, t is the time, in widths of the rectangles are shown. What
seconds, and v is the starting velocity of the is a simplified expression for the area of
object, in metres per second. the triangle?
a) The average speed of a falling object is 2x

calculated as s = __d , where s is the average
t A = 4x2 + 2x
speed, in metres per second. Use this
information to develop a formula for the
average speed of a falling object in terms x
of t and v.
A = 3x
b) What is the average speed of an object
that falls for 5 s, if it starts from a resting 17. What is the ratio of the area of the shaded
position? rectangle to the area of the large rectangle?

Extend x
15. Divide.
3.6gf + 0.93g 2x - 3 x 2x - 3
a) _____________
0.3g
x+6
2 b2 - __
__ 1 ab + __
1b x
3 3 3
b) ________________
1b
__
3 18. If a rectangle has length 2xy and area
-4.8x + 3.6x - 0.4
2 12x2y + 6xy2, what is its perimeter?
c) ___________________
0.2

You are designing a park that includes a large parking lot that will be
covered with gravel. xm

a) Design two different-shaped parking lots using any single shape (x + 4) m
or combination of regular shapes. Include the dimensions on a
1m
drawing of each parking lot design. Note that you will need to
be able to calculate the area of your parking lots. Each area
should be a different shape. Make them no less than 200 m2
and no greater than 650 m2.
b) A truck with dimensions similar to those shown in the picture will deliver the gravel. Write an
expression for the approximate area that a single load of gravel will cover to a depth of 5 cm.
c) There are three sizes of trucks that can deliver the gravel. The widths are 1.5 m, 2 m, and 3 m.
Approximately how many truckloads would it take for each truck size to deliver the required
amount of gravel for each of your parking lots? You will cover each parking lot to a depth of 5 cm.
Show your work.
d) Which truck size do you think would be the most efficient to use for each of your parking lots?
Explain your reasoning.

NEL 7.3 Dividing Polynomials by Monomials 277
 Chapter 7 Review
Key Words 10. A square is inscribed in a circle with radius r
as shown. What is the ratio of the area of
For #1 to #4, match the polynomial in Column A with
the square to the area of the circle?
an equivalent polynomial in Column B. Polynomials in
Column B may be used more than once or not at all.
Column A Column B r
8xy A 4xy - 2x
1. ____
2x
B 4x2 - 2x
12x2 - 6x
2. __________
3x C 4y
3. (-2x + 1)(-2x)
D 2x2 - 2x
12xy - 6x 7.2 Multiplying Polynomials by Monomials,
4. __________ E 4xy
3 pages 264–271
F 4x - 2 11. What polynomial multiplication statement
is represented by each area model?
a) 3y 5 b) 1.2f
7.1 Multiplying and Dividing Monomials,
pages 254–263 1.3y f
5. Use a model to complete each monomial
multiplication statement. 4
a) (3x)(5x)
b) (4x)(-5y) 12. What polynomial multiplication statement
is represented by the algebra tiles?
6. Find each product.
a)
a) (-3.2x)(-2.7y)

b) ( __73 a )(-14a)
7. Use a model to complete each monomial
division statement.
6x2
a) ____
2x
b) 15a2 ÷ (-3a)

8. Determine each quotient. b)
-4.8r
a) ______
2

-1.2r
b) 2xy ÷ 2x

9. A rectangle is four times as long as it
is wide. If the area of the rectangle is
1600 cm2, what are its dimensions?

278 Chapter 7 NEL
13. Expand. 17. A triangle has an area represented by
a) (20x)(2.3x - 1.4) 3x2 + 6x. If the base of the triangle is
3x, what is the height?
b) ( __32 p )( p - __43 )
14. The length of a piece of rectangular A = 3x2 + 6x
cardboard in centimetres is 6x + 3.
1 of the length.
The width is 1 cm less than __
3
What is an expression for the area of the 3x
cardboard?
18. A rectangular wall has a circular window.
The area of the wall can be represented
by 32x2 + 16x. The length of the wall is
8x. The diameter of the circular window
has a measurement that is half the width
6x + 3 of the wall. What is the radius of the
window written as an expression in terms
7.3 Dividing Polynomials by Monomials, of x?
pages 272-277
15. Determine the division statement
represented by the algebra tiles.
Give the quotient.
a) ?
8x
A = 32x2 + 16x

b) ?

19. Naullaq is cutting ice blocks from the
lake for her mother's drinking water
tank. The cylindrical tank has a volume
of 4x2π. Once each block has melted, it
will have a volume of 3x2. How many
blocks does she need to cut so that her
mother’s tank will be filled when the ice
16. Divide. melts? Give your answer to the nearest
12n - 2n2
a) __________ whole block. Explain your answer.
2n
15x - 3x
b) __________
2

1.5x
Use the π key on your
calculator.

NEL Chapter 7 Review 279
Chapter 7 Practice Test
For #1 to #6, select the best answer. 4. Which is equivalent to -27q2 ÷ 9q?
1. Which monomial multiplication statement A 3q2 B 3q
is represented by the algebra tiles? C -3q D -3q2

2
(3 )
5. Which is equivalent to __x (-3x - 6)?

A -2x - 4x
2
B -2x - 4
C 2x - 4 D 2x2 - 4x

15y - 10y
2
6. Calculate __________.
-5y
A (3x)(-2x) = -6x2
A -3y - 2 B -3y + 2
B (2x)(-3x) = -6x2
C 3y - 2 D 3y + 2
C (2x)(3x) = 6x2
D (-2x)(-3x) = 6x2 Complete the statements in #7 and #8.
-24x + 8xz 2
7. The expression ____________ is equivalent
2. What is the product of 3y and 2.7y? 4x
to.
A 0.9y B 8.1y
C 0.9y2 D 8.1y2 8. A polynomial multiplication expression
2
that is equivalent to 24d - 12d is.
3. Which monomial division statement
is represented by the algebra tiles? Short Answer
?
For #9 to #11, show all of the steps in your solutions.
9. Calculate (2.4x)(4y).

-3
10. What is the product of 12h and ___ h + 2?
4
2x2 + 3x
11. Simplify ________.
-3x
12. Paula is building a rectangular patio. It will
have a square flower bed in the middle. The
rest will have paving stones. The patio will
-6x 2 have a length of 4x and a width of 3.1x. The
A _____ = -2x
-3x area of the flower bed will be 3.5x2. What
-6x 2
B _____ = 2x
area of the patio will need paving stones?
-3x
6x2
C ____ = -2x A = 3.5x2
-3x
6x2
D ____ = 2x
4x
-3x

3.1x

280 Chapter 7 NEL
13. A sports field is 15 m longer than twice its Extended Response
width. What is an expression for the area of 15. a) What error did Karim make when
the field in terms of its width, w? Expand completing the division statement shown?
the expression. -18d - 6d
2
_________
3d
14. The area of a rectangular sandbox can be -18d2 ___
_____ 6d
= +
expressed as 24xy + 36x. The width of the 3d 3d
sandbox is 6x. What is the perimeter of = -6d + 2
the sandbox? b) Show the correct method.

A = 24xy + 36x 16. A square with a side length of 2s has a
smaller square inscribed. The vertices of the
smaller square are at the midpoints of the
sides of the larger square. What is the ratio
of the area of the larger square to the area of
the smaller square? Express your answer in
its simplest form.

6x

2s

You have been hired to create a landscape design for a park. The park is rectangular
and covers an area of 500 000 m2. The park includes the following features:
a play area covered with bark mulch
a sand area for playing beach volleyball
a wading pool
The features in your design include the following shapes:
a circular area
a rectangular area
a parallelogram-shaped area with the base three times the height
The features of your park have varying depths.
Include the following in your design:
a scale drawing showing the layout of each of the required
features
a list showing the area of each feature and the volume of each
material (mulch, sand, and water) required to complete the park
a polynomial expression for the area and volume of each feature,
using a variable for one of the dimensions

NEL Chapter 7 Practice Test 281
 Challenges
Design a Card Game Materials
at least 30 index cards
You are a game designer. You are going to create a skill-testing card game per pair of students , or
that involves the multiplication and division of polynomial expressions. heavy paper for cutting
out cards

Work with a partner. You will create at least 15 pairs of cards, using the
following guidelines:
For each pair, on one card write a polynomial expression that involves
One card might be
multiplication or division. On the other card write an equivalent (5x)(4x), and the
expression. equivalent card might
Include the types of polynomial expressions found in each section of be 20x2.
Chapter 7.
Use a variety of constants, monomials, and polynomials.

1. Create a list of the pairs of expressions for your game.

2. Create the cards.

3. Write the rules for your game. Your game should be suitable for two
or more players.

4. Exchange your cards and rules with another set of partners. Play the
game.

282 Chapter 7 NEL
Polynomial Puzzle Materials
sample polynomial
1. Try the nine-piece puzzle below. puzzle per student
-3x + 2
3x - 4 scissors

z)
9xz ÷ (-3x

(4x)(-5y)
24x2
15 2
__x__ -
__10
__x_
5x(3 - 2y) -5x -5y (2x + 3y)
x+3

-4.8x 2 ÷ 1.2x
2xy ÷ 2x
-20xy

12yz

y
2 - 12x
9x
________
2x(3x - 5) 3x
15x - 10xy -10xy - 15
6x2 - 10x y2
(-3x)(-8x)
(3yz)(4)

-4x
-3

3xy + 9y
________
3y

a) Cut out the pieces of a copy of the puzzle.
b) Solve the puzzle. Polynomial expressions involving multiplication
or division are red. Matching equivalent expressions are blue.
Match each multiplication or division expression with its equivalent
expression. The diagram shows how a solved nine-piece puzzle
would look.

2. Design your own 16-piece puzzle.
a) Draw 16 equal-sized squares on a piece of paper.
b) Write your own matching expressions. Place them the same way as
in the small diagram above so that each expression and its equivalent
are across from each other.
Include the types of polynomial expressions found in Chapter 7.
Include a variety of constants, monomials, and polynomials.
Cover a variety of difficulty levels.
c) Cut out your sixteen puzzle pieces. Mix them up.
d) Exchange your puzzle with a classmate’s. Solve your classmate’s
puzzle.

NEL Challenges 283
 Chapters 5-7 Review
Chapter 5 Introduction to Polynomials a) Write an algebraic expression for the
1. The following diagram of algebra tiles antique shop’s total income from the
models a backyard. sale of comics, hardcover books, and
paperbacks. Tell what each variable
represents.
b) Use your expression to show the total
income after the sale of 15 comics,
7 hardcover books, and 5 paperbacks.
a) What is an expression for the perimeter c) One day, the store sold $100 worth of
of the backyard? comics, hardcovers, and paperbacks.
b) What is an expression for the area of the What number of each item did the store
backyard? sell? Show that more than one answer
is possible.
2. Use materials or diagrams to show the
collection of like terms in each expression. 6. A park is divided equally into three square
a) 8c + 3 - 5c + 1
sections. Each section will have a side
measurement of 2n + 4. The park will have
b) -1 + x - 1 - x + 1
fencing built as shown. Each opening has
c) g2 - g + 5 + 2g - 4g2 length n and does not need any fencing.
What is the total length of fencing needed
3. Write the following expressions in to complete the job?
simplest form.
a) (2m - 3) + (5m + 1)
b) (w2 - 4w + 7) + (3w2 + 5w - 3)
c) (9y2 - 6.8) + (4.3 - 9y - 2y2)

4. Write a simpler expression.
a) (-7z + 3) - (-4z + 5)
Chapter 6 Linear Relations
7. a) Describe the relationship between the
b) (3d - 2d - 7) - (d 2 - 5d + 6cd - 2)
figure number and the number of tiles.
c) (2x2 + 3xy) - (-xy + 4x2)

5. The Better Buys antique shop sells comic
books for $10, hardcover books for $8,
and paperback novels for $3.

Figure 1 Figure 2 Figure 3
$8
$3 b) Develop a linear equation to model the
pattern.
c) If the pattern were continued, how many
$10 squares would be in Figure 8?

284 Chapter 7 NEL
 8. Monika is saving money for a ski trip. She 10. A computer salesperson earns a monthly
starts with $112 in her bank account. She salary plus a 10% commission on each sale.
decides to deposit $25 every week until she The sales, commission, and earnings are
has enough money to pay for the trip. shown in the table.
a) Create a table of values for the first Sales ($) Commission ($) Earnings ($)
five deposits. 0 0 2000
b) What linear equation models 5 000 500 2500
this situation?
10 000 1000 3000
c) If Monika needs at
15 000 1500 3500
least $450 for
her trip, for 20 000 2000 4000
how many 25 000 2500 4500
months a) Draw a graph showing the linear relation
does she between sales and earnings.
need to
b) The salesperson earns $3750 in one
deposit
money into her bank account? month. What are the approximate total
sales for that month?
9. A car mechanic charges a $35 base fee for c) The salesperson earns $5500 the next
labour plus an hourly rate of $60. The month. What are the approximate total
graph shows this linear relation. sales for that month?
C Repair Costs d) Approximately how much would the
350
salesperson have to sell in order to earn
300
$4250 in one month?
Cost ($)

250
200
11. Draw the graph that represents this table
150
100
of values.
50 Time (h) 0.25 0.50 0.75 1.00 1.25 1.50 1.75
0 1 2 3 4 5 6 7 8 t Cost ($) 0.5 1.0 1.5 2.0 2.5 3.0 3.5
Time (h)
a) Describe a situation to represent the data
a) Approximately how much would the on the graph.
mechanic charge after working on a b) Write an equation to model the data.
vehicle for 8 h? c) What is the cost for 3.25 h?
b) Approximately how many hours would
a mechanic work to charge $225 in
labour costs?
c) Another mechanic charges at the same
rate, but in half-hour increments.
What would be
the cost of a repair
that took 9.5 h to
complete?

NEL Chapters 5–7 Review 285
Chapter 7 Multiplying and Dividing 16. Determine each quotient.
Polynomials 12g + 8g
2
a) _________
12. Find the product of each pair of monomials. 4g
a) (3x)(4x) -6x + 3xy
2
b) ___________
b) (2.5y)(-4y) 3x
c) (s)(-0.5s) c) (9.3ef 2 - 62e) ÷ (-3.1e)
t
( )
d) __ (10t)
5
d) (24n2 + 8n) ÷ (0.5n)

17. A rectangle has an area represented
13. Divide.
by the expression 10x2 - 5x. If the
a) 8.4x ÷ x
2
length of the rectangle is 5x, what is
b) (-12h2) ÷ 2h an expression for the width, w, of
c) (-0.6n2) ÷ (-0.2n) the rectangle in terms of x?
4.8p 2
d) ______
-1.2p
w
14. Use an area model to expand each
expression.
a) (3x)(2x + 1) 5x

b) (5w + 3)(1.5w)

15. If a foosball table is 3 cm longer than twice
its width, what is an expression for the area
of the foosball table? Express your answer
in expanded form.

Digital rights not available.

286 Chapter 7 NEL
 Task
Choosing a Television to Suit Your Room
You want to find a television that Materials
best suits your needs, and measuring tape
considers your room size and the location for the television. grid paper

Does a standard or high-definition television (HDTV) make the most
sense for your room? How large of a screen should you get?
1. The following table gives you the best viewing distance for the screen
size for two types of TVs.
Screen Size Viewing Distance (cm)
(cm) Standard TV HDTV
68.8 205.7 172.7
81.3 243.8 203.2
94.0 281.9 233.7
a) Given this information, what size
of television would be best for your
classroom? Make a sketch of your
classroom, including where you plan
to place the TV and the best place for a
student to view it from.
b) If the television is 320 cm away from your
seat, how large of a standard TV would
be best?
c) How will your answer for part b) change if you have a HDTV?

2. The diagram shows
the viewing angles
for various types of
televisions.
Calculate the
viewing area of the standard
TV type and size of plasma
LCD
your choice.

3. What type and size
of TV would be best Viewing angle:
for a room in your standard: 120°
home? Justify your plasma: 160°
response. LCD: 170°

NEL Task 287