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Math 9: Review for final
1
Lesson 1.1: Square Roots of Perfect Squares
1. Use each diagram to determine the value of the square root.
a)
1
9 b)
0.16
2. Which numbers below are perfect squares? How do you know?
a)
25
121 b) 2.89 c)
2
50 d) 0.004
3. Calculate the number whose square root is:
a)
5
7 b) 1.6 c) 0.92 d)
10
9
4. Determine the value of each square root.
a)
225
49 b)
9
25 c)
6.76 d)
327.61
5. The area of a square garden is 12.25 m2.
a) Determine the perimeter of the garden.
b) The owner decides to put a gravel pathway around the garden. This reduces the area
of the garden by 4.96 m2. What is the new side length of the garden?
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Lesson 1.2: Square Roots of Non-Perfect Squares
6. Use benchmarks to approximate each square root to the nearest tenth.
a)
11.6 b)
0.39 c)
21
2 d)
11
52
7. In each triangle, determine the unknown length to the nearest tenth of a unit where necessary.
a) b)
Lesson 1.3: Surface Areas of Objects Made from Right Rectangular Prisms
8. Each cube has edge length 1 unit. Determine the surface area of each object.
a) b) c)
9. Determine the surface area of this composite object.
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Lesson 2.1: What Is a Power?
10. Complete this table.
Power Base Exponent Repeated Multiplication Standard Form
44
(–10)3
–6 2
1 × 1 × 1 × 1 × 1
11. Evaluate each power. For each power:
• Are the brackets needed?
• If your answer is yes, what purpose do the brackets serve?
a) (–6)5
b) –(6)5
c) –(–6)5
d) (–65)
12. Predict whether each answer is positive or negative, then evaluate.
a) (–3)2 b) (–3)
3 c) –3
2 d) –(–3)
3
13. Is the value of –24 different from the value of (–2)
4? Explain.
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14 . Stamps are sold in a 10 by 10 sheet. The total value of a sheet of stamps is $60.00.
a) Express the number of stamps as a power and in standard form.
b) What is the value of one stamp?
Lesson 2.2: Powers of Ten and the Zero Exponent
15. Evaluate each power.
a) 40 b) 23
0 c) (–6)
0
d) 10 e) –1
0 f) (–1)
0
16. Write each number as a power of 10.
a) 10 000 b) 1 000 000 c) ten
Lesson 2.3: Order of Operations with Powers
17. . Evaluate.
a) 52 + 3 b) 5
2 – 3 c) 4
3 × 2 d) 4
3 ÷ 2
e) (4 × 2)3
f) (18 ÷ 32 + 1)
4 – 4
2 b) g) 3
3 ÷ 9(3
0 – 2
2)
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h) [(–3)4 – (–2)
3]0 ÷ [(–4)
3 – (–3)
2]
0
Lesson 2.4: Exponent Laws 1
18. Write each product as a single power.
a) 43 × 4
2 b) 5
0 × 5
0 c) (–2)
2 × (–2)
4
a) 87 ÷ 8
5 b) 10
4 ÷ 10
0 c) (–1)
6 ÷ (–1)
3
d) 4
4
3
3 e)
5
10
9
9
f)
9
6
11
11
a) 23 × 2
6 ÷ 2
9 b) (–5)
8 ÷ (–5)
4 × (–5)
3 c)
42
53
66
66
19. Simplify, then evaluate each expression.
a) (42 × 4
3)0 – (3
2)2 b) (2
3 ÷ 2
2)3 + (7
4 × 7
3)0
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Lesson 3.1: What Is a Rational Number?
20. Write the rational number represented by each letter as a decimal.
21. In each pair, which rational number is greater? Explain how you know.
a) 7.3, 7.2 b) 4 5
, 5 4
c) 1.2, 1.3 d) 10 10
, 13 11
Lesson 3.2: Adding Rational Numbers
22. Write the addition statement that each number line represents.
a)
b)
23. Determine each sum.
a) 3 1
4 2 b)
3 1
4 2
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24. Sarah borrowed $40.25 from her parents for a new sweater. She earns $17.50 for a night of
baby-sitting and gives this to her parents.
a) Write an addition statement to represent this situation. _________________________
b) How much does Sarah now owe? __________________________________________
Lesson 3.3: Subtracting Rational Numbers
25. Determine each difference. Describe the strategies you used.
a) 3 1
4 2 b)
3 13 5
5 2
26. Two climbers leave base camp at the same time. Climber A ascends 20.4 m, while climber B
descends 35.4 m. How far apart are the climbers? Write a subtraction statement using
rational numbers to solve the problem.
Lesson 3.4: Multiplying Rational Numbers
27. Predict the sign of each product. Determine each product.
a) ( 1.2) 0.3 b) 0.34 ( 0.5)
c) 2 1
5 2
d) 3 1
2 7
Lesson 3.5: Dividing Rational Numbers
28. Determine each quotient.
a) 16 2 b) ( 0.6) ( 3)
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c) 3 5
4 2
d) 5 2
9 3
Lesson 3.6: Order of Operations with Rational Numbers
29. Evaluate this expression. Round the answer to the nearest hundredth.
9.6 12.6 5.1 ( 7.4) 0.6
( 2.9) 1.3 ( 6.5)
Lesson 4.1: Writing Equations to Describe Patterns
31. The pattern in this table continues. Which equation below relates the figure number n, to the
perimeter of the figure P?
Figure Number, n Perimeter, P
1 7
2 10
3 13
4 16
a) P = 3n + 7 b) P = 7n + 3 c) P = 3n + 4 d) n = 3P + 7
32. In each equation, determine the value of A when n is 3.
a) A = 2n + 1 b) A = 3n – 2
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33. Rachel takes care of homes during the summer while their owners are away on vacation.
She charges $8, plus $2.50 a day.
a) Create a table that shows the charges when the owners are away for up to 5 days.
b) Write an equation that relates the charge, C dollars, to the number of days, n,
that the owners are away.
c) What will the charge be when the owners are away for 14 days?
d) How many days were the owners away when the charge was $33?
Lesson 4.2: Linear Relations
34. For each table of values below:
i) Does it represent a linear relation?
ii) If the relation is not linear, explain how you know.
iii) If the relation is linear, describe it.
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a) x y b) x y
1 5 1 1
2 12 3 3
3 19 5 7
4 26 7 13
5 33 9 21
35. Create a table of values for each linear relation and then graph the relation.
Use values of x from –2 to 2.
a) y = x + 4 b) y = 2x + 1
36. A computer repair company charges $80 for a service call, plus $50 an hour for labour.
a) Create a table to show the relation between the time in hours for the service call
and the total cost.
b) Is this relation linear? Justify your answer.
c) Let n represent the time in hours for the service call and C represent the total cost in
dollars. Write an equation that relates C and n.
d) How much will a 7-h service call cost? Lesson 4.3: Another Form of the Equation for a Linear Relation
37. Which equation below describes each graph?
a) b)
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i) x = 2 ii) x = –2
iii) y = 2 iv) y = –2
38. Graph each line. Explain your work.
a) x = 4 b) y – 2 = –6
Lesson 4.4: Matching Equations and Graphs
39 . Match each equation with a graph on this grid.
a) y = 2x – 1
b) y = –x + 4
c) y = 3x – 3
Lesson 4.5: Using Graphs to Estimate Values
40. Determine the value of y for each value of x.
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i) x = 2 ii) x = 8
iii) x = –6
41. The graph shows how the cost of a long distance
call changes with the time for the call.
a) Estimate the cost of a 7-min call.
Is this interpolation or extrapolation? Explain.
b) The cost of a call was $1.00.
Estimate the time for the call.
c) The cost of a call was $1.50.
Estimate the time for the call.
Lesson 5.1: Modelling Polynomials
42. . Identify the polynomials in the following expressions.
a) 2m2 + 1 b)
123x c) –4x d)
1
x2+ x
e) 0.25y2
43 . Name the coefficients, variable, degree, and constant term of each polynomial.
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44. Use algebra tiles to model each polynomial. Sketch the tiles.
a) –5 + y2 b) 2x – 1
45. Write a polynomial to match the following conditions.
a) 2 terms, degree 1, with a constant term of 4
b) 3 terms, degree 2, with the coefficient on the 2nd degree term –2
Lesson 5.2: Like Terms and Unlike Terms
46. Simplify each polynomial.
a) 3a2 – 2a – 4 + 2a – 3a
2 + 5 b) 7z – z
2 + 3 + z
2 – 7
c) d2 + 3d + 1 + 4d
2 + 2 d) –6x
2 + 10x – 4 + 4 – 12x – 7x
2
coefficients variable degree constant
–8y
12
–2b2 – b + 10
–4 – b
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Lesson 5.3: Adding Polynomials
47. Add.
a) (y2
+ 6y – 5) + (–7y2
+ 2y – 2) b) (–2n + 2n2
+ 2) + (–1 – 7n2
+ n)
c) (3m2
+ m) + (–10m2
– m – 2) d) (–3d2
+ 2) + (–2 – 7d2
+ d)
48. a) For each shape below, write the perimeter as a sum of polynomials and in simplest form.
i) ii)
Lesson 5.4: Subtracting Polynomials
49. Subtract.
a) (mn – 5m – 7) – (–6n + 2m + 1)
b) (2a + 3b – 3a2 + b
2) – (–a
2 + 8b
2 + 3a – b)
c) (xy – x – 5y + 4y2) – (6y
2 + 9y – xy)
Lesson 5.5: Multiplying and Dividing a Polynomial by a Constant
50 . Divide.
a) 12d ÷ 4 b) –20d ÷ 5 c) 8d ÷ –4
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51. Determine each product.
a) 4(3a + 2) b) (d2 + 2d)(–3)
Lesson 5.6 Multiplying and Dividing a Polynomial by a Monomial
52. Write the multiplication sentence modelled by each set of algebra tiles.
a) b)
c)
53. .Multiply.
a) v(3v + 1) b) 3c(5c + 2) c) (8 + 4y)(6y)
54. Divide.
a) (6x + 3) ÷ 3 b) (14w – 7) ÷ –7 c) (–15 – 10q) ÷ 5
Lesson 6.1: Solving Equations by Using Inverse Operations
55. Solve each equation and verify the solution.
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a) 1137
d
b) 26
16 p
c) 5.12.01.3 a
56 . A taxicab charges $2.50, plus $1.78 per kilometre.
How long is a trip that costs $21.19?
57. Solve each equation and verify the solution.
a) 622 x b) 8.1232.3 v
Lesson 6.2: Solving Equations by Using Balance Strategies
58. Solve each equation and verify the solution.
a) yy 963 b) aa 342 c) 9.423.14 cc
59. The sum of three times a number, plus five is equal to seven less than seven times the
number. Write an equation to model this situation. Solve the equation to determine the
number. Verify the solution.
60. Solve the following equation and verify the solution.
3312 hh
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Lesson 6.3: Introduction to Linear Inequalities
61. State 3 values of the variable that satisfy each inequality.
a) c < 7 b) 3a c) 5 < n d) y1
62. Write the inequality that is graphed on each number line.
a)
b)
c)
63. Write an inequality to describe each situation, then graph it.
a) The gas tank in a car contains no more than 55 L of gas. _________________
b) The minimum age you must be to watch the movie is 13. _________________
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64. Match each inequality with the graph of its solution.
a) 93 g b) 25 m c) 42 y d) 31 f
i)
ii)
iii)
iv)
Lesson 6.5: Solving Linear Inequalities by Using Multiplication and Division
65. Solve each inequality and graph the solution.
a) 6.63.15.3 aa
b) 52.01.15.23.1 xx
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66. Nadia gets paid $1000 per month plus 5% commission on her sales. She wants to earn at
least $2200 this month. Write an inequality to represent this situation, then solve it to
determine how much Nadia must sell to reach her goal.
Lesson 7.1 Scale Diagrams and Enlargements
67. The actual length of a needle is 6 cm. The length of the needle on a scale diagram is 9 cm.
What is the scale factor of the diagram?
68. Scale diagrams of different circles are to be drawn. The diameter of each circle, and the
scale factor are given. Determine the diameter of each circle on its scale diagram.
Write the answers.
Diameter of
original circle
Scale factor Diameter of
scale diagram
a) 8 cm 6
b) 40 mm
4
15
c) 3.5 cm 5.8
d) 0.6 mm 20.5
Lesson 7.2 Scale Diagrams and Reductions
69. Here is scale diagram of a picnic table.
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The actual length of the picnic table is 180 cm with legs 60 cm.
What is the scale factor for this diagram?
70. A rectangular playground has dimensions 24 m by 16 m.
Draw a scale diagram of this playground with a scale factor of 200
1 .
Lesson 7.3 Similar Polygons
71. Which rectangles are similar? Give reasons for your answer.
Lesson 7.4 Similar Triangles
72. A person who is 1.9 m tall has a shadow that is 1.5 m long.
At the same time, a flagpole has a shadow that is 8 m long.
Determine the height of the flagpole to the nearest tenth of a metre.
Draw a diagram.
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73. A surveyor wants to determine the width of a river.
She measures distances and angles on land,
and sketches this diagram.
What is the width of the river, PQ?
74. Determine the length of XY in each pair of similar triangles.
a)
b)
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Lesson 7.5 Reflections and Line Symmetry
75. Draw in the lines of symmetry in each design
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Lesson 7.6 Reflections and Line Symmetry
77. Which polygons have rotational symmetry? State the order of rotation and the angle of
rotation symmetry for each.
a) b) c)
Lesson 7.7 Identifying Types of Symmetry on the Cartesian Plane
78. For each pair of shapes, determine whether they are related by line symmetry,
by rotational symmetry, by both line and rotational symmetry, or by neither.
Describe the symmetry, if any.
a) b)
Lesson 8.1 Properties of Tangents to a Circle
79. Draw and label a diagram to illustrate the property of a tangent to a circle.
Point O is the centre of the circle.
Points P and Q are points of tangency.
Determine the values of x and y.
Justify your solutions.
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80. Point O is the centre of the circle. Point P is a point of tangency.
Determine the value of x to the nearest tenth.
Lesson 8.2 Properties of Chords in a Circle
81. Point O is the centre of the circle.
Determine the values of x and y.
82. Point O is the centre of the circle; OF = 18 cm; and GJ = 14 cm.
Determine the values of x and y to the nearest tenth of a centimetre where necessary.
Lesson 8.3 Properties of Angles in a Circle
83. Point O is the centre of each circle. Determine the values of x and y. Justify your
solutions.
a) b) c)
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Lesson 9.1: Probability in Society
84. Indicate whether each decision is based on theoretical probability, experimental probability, or
subjective judgment. Explain how you know.
a) The last 10 times Jerome tried to access a certain Internet website, he got an error message
saying that the site was unavailable. So, he decides the site no longer works and does not try to
access it again.
b) When Karen’s mother learns she is pregnant, she celebrates by buying a pink baby blanket
because she has a feeling the baby will be a girl.
c) Aaron chooses a long email password because it is more difficult to determine a long password
than a short one.
Lesson 9.2: Potential Problems with Collecting Data
85. Name a problem with each data collection.
a) To discover common fears, Chris asks his classmates if they are frightened by spiders, snakes,
rats, or slugs.
c) To find out the proportion of people who recycle tin cans, a person counts the number of
households with tin cans in their recycling bins.
c) To estimate how much meat to buy for a barbecue party, Sarah asks her guests: “Do you prefer
beef or chicken kebabs?”
Lesson 9.3: Using Samples and Populations to Collect Data
86. In each case, describe the population.
a) A social networking site wants to know the typical age of a person who uses the site.
b) A book retailer wants to know which demographic groups buy travel books.
d) A music store wants to know how many school-aged students take piano lessons.