Chapter 5

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5

5 4567890123 8901234 48901234 1234 NUMBER

Mercury, the planet closest to the Sun, has an average temperature of 350°C while Pluto, the planet furthest from the Sun, has an average temperature of 230°C. The highest recorded temperature in Australia is 53°C at Cloncurry in Queensland and the lowest is 23°C at Charlotte Pass in the Snowy Mountains. The values in these measurements are all examples of integers.

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In this chapter you will: Wordbank

• recognise the direction and magnitude of an integer

• order directed numbers and place them on a number line

• add and subtract integers • multiply and divide integers

• apply ‘order of operations’ to expressions involving integers

• locate and plot points on the number plane • identify the origin and the four quadrants of the

number plane.

• ascending Increasing, from smallest to largest. • coordinates The two values that give the position

of a point on a number plane.

• descending Decreasing, from largest to smallest. • integer A positive or negative whole number or

zero.

• negative number A number less than zero. • number plane A grid that is made up of two

number lines, meeting at right angles.

• origin The centre point of a number plane, with coordinates (0, 0).

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Start up

1 Find the answers to the following.

a 7 + 9 b 12 − 4 c 7 × 4 d 20 ÷ 5

e 13 + 8 f 30 − 5 g 2 × 11 h 15 ÷ 3

i 6 + 7 j 14 − 6 k 3 × 5 l 24 ÷ 4

a 12 + 37 b 652 − 48 c 22 × 5 d 66 ÷ 2

e 79 × 3 f 384 ÷ 3 g 3 + 5 × 4 h 18 ÷ 2 − 7

i 30 − 12 ÷ 6 j 20 × (3 + 17) k 12 − 3 × 2 + 6 l 43 − [5 × 2 + 1]

3 Write true (T) or false (F) for each of the following.

a 15 12 b 8 11 c 6 3

d 4 + 3 10 e 12 − 3 11 f 7 3 × 2

g 15 ÷ 3 12 ÷ 4 h 8 + 3 + 2 6 × 1 i 18 ÷ 3 2 + 2 + 2

4 Write each of these sets of numbers in ascending order (smallest to largest).

a 3, 8, 2, 1, 4 b 2, 18, 5, 7, 3, 16 c 38, 51, 49, 27, 66, 54

5 Write each of these sets of numbers in descending order (largest to smallest).

a 6, 11, 18, 17, 5, 3 b 8, 7, 14, 23, 31, 5, 2 c 89, 91, 37, 69, 41, 3, 46

a 32 b 23 c 52 d 33

5-01 Number lines

A number line is used to show the position and size of numbers:

We have shown the position of 2, 4 and 7. As we move to the right on the number line, the numbers become bigger.

1 Write the whole numbers shown by the arrows on this number line.

2 Estimate the whole numbers pointed to by the arrows on these number lines.

Exercise 5-01

Worksheet 5-01 Brainstarters 5 Skillsheet 5-01 Ordering numbers 8 7 6 5 4 RIGHT 3 2 1 0 0 5 10 15 20 25 F E D C B A 0 4 8 16 20 D C B A a 12 24

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3 Write the temperature shown on each of these thermometers.

4 Draw a number line and use dots to show the numbers 3, 6, 9, 12 and 15.

5 Draw a number line and show all the whole numbers between 3 and 12.

6 Draw a number line marked from 0 to 10 and show all the whole numbers less than 8.

7 Write the next three numbers in the pattern each time:

a 3, 6, 9, 12, … b 18, 19, 20, 21, … c 109, 110, 111, … d 79, 78, 77, 76, …

e 33, 32, 31, … f 161, 160, 159, … g 8, 7, 6, 5, … h 21, 19, 17, …

8

On this number line, where will S be if it moves:

a 4 places to the right? b 10 places to the right? c 19 places to the right?

d 5 places to the left? e 10 places to the left? f 20 places to the left?

9 The temperature was 22°C at 9:00am. If it rose 8°C during the day, what was the

maximum temperature?

10 The temperature was 27°C. When a cool change hit, it dropped by 11°C. What did

the temperature fall to?

5-02 Numbers above and below zero

Numbers greater than zero, such as 5, 8 and 14.37, are called positive numbers. Numbers less than zero, such as −2, −10 and −21.6, are called negative numbers. The number ‘−2’ is read as ‘negative 2’, and not ‘minus 2’.

0 20 40 60 80 100 E D C B A 0 10 20 30 40 50 E D C B A b d e 120 140 0 10 20 40 50 D C B A c 30 60 E F F 0 30 60 120 D C B A 90 E F G 40 0 20 60 80 100°C a b 20 0 10 30 40 °C 50 10 30 70 90 12 14 16 18 20 22 24 26 28 30 32 S 1 2 ---3 4

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Directed numbers and integers

Positive numbers and negative numbers together are called directed numbers. Directed numbers show both direction and magnitude (size). For example, ‘5’ or ‘+5’ means 5 units in the positive direction, while ‘−2’ means 2 units in the negative direction. A directed number that is a whole number (not a fraction) is called an integer. Some examples of integers are −3, 4 and −20.

1 Icebergs

Icebergs can be dangerous to ships because about of their volume lies beneath the water.

a Using the scale, ﬁnd:

i the height of the iceberg above the water

ii the depth of the iceberg below the water

iii the total height of the iceberg.

b Why are ‘+’ and ‘−’ signs useful in

these measurements?

2 Temperature

Temperature is measured in degrees Celsius. It can be above or below zero.

a What is the normal body temperature?

b At what temperature does water freeze?

c At what temperature does dry ice evaporate?

d If the highest temperature recorded last week was +48°C at Salah, in Algeria (in Africa), and

the lowest was −69°C at the South Pole in Antarctica, what is the difference between the two temperatures?

Exercise 5-02

Integers are the positive and negative whole numbers and zero.

!

+40 m 0 m −10 m +30 m +20 m +10 m Height −20 m −30 m −40 m −50 m −60 m −70 m −80 m −90 m −100 m 5 6 ---100°C 20°C 0°C 80°C 60°C 40°C Temperature −20°C −40°C −60°C −80°C −100°C −120°C −140°C −160°C −180°C −200°C water boils body temperature water freezes

dry ice evaporates

liquid nitrogen freezes

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3 Deposits or withdrawals

Here is a business account showing money coming in, and money to be paid to others. (Withdrawals have a minus sign.) Calculate the ﬁnal balance at the end of the day.

Balance at start: $721 −$49 $61 −$1 −$101 $24 −$261 Balance at the end of the day: $

4 Copy this timeline into your book and place each event in the correct place.

A 490 BC Phidippides of Athens set out on his 26-mile run that inspired the marathon.

B 400 BC The ﬁrst temple dedicated to the Greek god Zeus was built.

C 330 BC Euclid showed that an inﬁnite number of prime numbers exist but occur

in no logical pattern.

D 240 BC Eratosthenes estimated the circumference of the Earth using two sticks. E 55 BC Roman forces under Julius Caesar invaded Britain.

F AD 100 The ﬁrst Chinese dictionary was compiled.

G AD 190 The abacus was invented.

H AD 260 The two-year war between Rome and Persia ended.

I AD 370 Hypatia, a female mathematician, was born in Alexandria, Egypt.

J AD 410 Roman forces left Britain.

5 Settlement in Australia

Australian archeologists have found human bones which suggest that people have been living here for 40 000 years. These early inhabitants were ancestors of the Aboriginal people. Europeans settled in Australia in 1788 when Governor Phillip arrived at Botany Bay with English convicts.

a Explain how −40 000 could

describe the settlement of Australia.

b If this year is zero, in what year did Governor Phillip arrive?

c Why do historians use BC

and AD (or BCE and CE) when talking about dates?

d If the year you were born is zero, what year is it now?

e If 1788 is zero, what year is it now?

6 Puzzle

Archeologists found a coin marked 27 BC and tried to sell it to a museum for $1000. Why would you advise the museum not to buy it?

500 0 500

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5-03 Ordering integers

Every integer has an opposite. The opposite of 5 is −5. The opposite of −4 is 4. Integers can be positioned and ordered on a number line.

On a number line, any number is bigger than all the numbers to its left.

Think of the and signs as being the mouths of crocodiles. They always open towards the bigger number.

Just for the record

Oetzi iceman

In 1991, a preserved body of a man was found in a glacier in the Alps between Italy and Austria. This man was probably a shepherd or a hunter who lived about 3300 BC. Oetzi, as he

was named, was wearing a loin cloth and leather shoes stuffed with straw. He also wore a cloak over his tunic. An examination of his body showed that he was killed by an arrowhead that was found beneath his left shoulder. He is now kept in a refrigerated chamber in the town of Bolzano in northern Italy.

How many years ago did Oetzi live?

Skillsheet 5-01 Ordering numbers 4 3 2 1 0 −1 −2 −3 −4

Example 1

Fill in the missing numbers for every mark on this number line.

Solution 0 −2 −5 −7 1 4 5 −6 −5 −4 −3 −2 −1 0 2 3 −7 1 4

means ‘is greater than’. means ‘is less than’.

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3 is greater (or more) than 1. −2 is less than 3.

This can be written as 3 1. This is written as −2 3.

It follows that:

• 3 is greater than −4, or 3 −4 • −5 is less than −3, or −5 −3 • −50 is less than 2, or −50 2 • −8 is more than −9, or −8 −9.

1 Copy these number lines, using a ruler to mark the positions evenly. Fill in the missing number for each mark.

2 Copy each pair of numbers and use or to make true statements.

a 4 1 b 0 9 c 7 −7 d −3 0

e 5 −11 f −1 −6 g −12 8 h −10 −2

i −6 5 j −6 −2 k −2 −6 l 24 −24

m−136 36 n −872 5 o −120 120 p −12 −78

q 17 23 r 8 −47

3 What directed number is opposite of:

a 6? b 1? c −10? d 11? e 0? f −2?

4 Write a word that is the opposite of:

a up b more c down d left e ascending

f south g withdraw h decrease i west

5 Here are some numbers: 1, −2, 3, −4, 5, −6, 7, −8. a Which is the biggest number?

b Which is the smallest number?

c Rewrite the numbers in order, from smallest to biggest.

Exercise 5-03

1

3 −2

3

Ex 1 1 0 −1 −3 −6 9 a b 10 0 −20 −10 40 2 3 6 c d −100 100 e 3 −5 0 5 10 −3 0 0 Scale matters: negatives L 2001

TLF

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6 Rewrite these numbers in ascending order (smallest to largest).

a −3, 2, −1, 3 b 5, −5, 2, −8, −3 c −4, −6, −3, −10, 0 d 6, −3, 4, −2, −5 e −48, 36, −24, 8, 0, −11 f 15, 12, −10, −26, 3, −2 7 Rewrite these numbers in descending order (largest to smallest).

a 4, 3, −1, 5, −2 b −4, 8, −7, −2, 0 c 1, −1, 4, −5, −11, −3 d 8, −4, −18, 3, −2 e −6, −15, −48, −3, 1 f 33, 1, −100, −58, −36 8 The distance between −3 and 1 on a number line is 4.

Find the distance between these pairs of numbers.

a 2 and 4 b −2 and −4 c 0 and 4 d 0 and −3

e −3 and 3 f −10 and 10 g −6 and 1 h −1 and 6

9 Which of the following is true? Select A, B, C and D.

A −6 2 B 4 −5 C0 −3 D12 −2

10 In this question, POS means positive and NEG means negative.

a Start at −3. Move 4 steps in the NEG direction. Move 9 steps in the POS direction.

Move 6 steps in the NEG direction. Where are you now?

b Start at 8. Move 12 steps in the NEG direction. Move 5 steps in the POS direction. Move 7 steps in the NEG direction. Where are you now?

c Start at −5. Move 6 steps in the POS direction. Move 4 steps in the NEG direction.

Move 7 steps in the POS direction. Where are you now?

d Start at 3. Move 5 steps in the POS direction. Move 8 steps in the NEG direction. Move 2 steps in the NEG direction. Where are you now?

e Start at −1. Move 10 steps in the NEG direction. Move 4 steps in the POS direction.

Move 5 steps in the NEG direction. Where are you now?

5-04 Adding and subtracting integers

0 4 −4 −3 −2 −1 1 2 3 −2 −3 −4 −5 −6 −8 −7 −1 0 1 2 3 4 5 6 7 8 Negative Positive

Example 2

1 What is −6 + 7? Solution

• −6 is where you start. • + direction is right.

• 7 is how far you move. −6 + 7 = 1

−2 7

−8 −7 −6 −5 −4 −3 −1 0 1 2 3 4 5 6 8

Worksheet

5-02

Adding and subtracting integers

Skillsheet

5-02

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2 What is 8 + (−6)? Solution

• 8 is where you start. • + direction is right.

• −6 is how far you move in the opposite direction (that is, left). 8 + (−6) = 2

So 8 + (−6) is the same as 8 − 6.

3 What is 2 + (−5)? Solution

• 2 is where you start. • + direction is right.

• −5 is how far you move in the opposite direction (that is, left). 2 + (−5) = −3 So 2 + (−5) is the same as 2 − 5. 0 9 −6 −5 −4 −3 −2 −1 1 2 3 4 5 6 7 8 10 0 9 −6 −5 −4 −3 −2 −1 1 2 3 4 5 6 7 8 10

Example 3

1 What is 3 − 4? Solution

• 3 is where you start. • − direction is left. • 4 is how far you move. 3 − 4 = −1

2 What is −3 − 4? Solution

• −3 is where you start • − direction is left • 4 is how far you move. −3 − 4 = −7

−2 7

−8 −7 −6 −5 −4 −3 −1 0 1 2 3 4 5 6 8

−2 7

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Note: Negative numbers can be entered into a calculator using the sign change key

or .

1 Find the answers to these additions.

a 6 + 9 b 8 + (−9) c 8 + (−5) d 8 + (−15)

e −2 + 2 f −2 + 5 g −4 + (−7) h −2 + (−2)

i −8 + (−18) j 8 + 12 k −11 + 3 l −10 + 10

m 7 + (−9) n −13 + 4 o −16 + 15 p −7 + 13

2 Find the answers to these subtractions.

a 4 − 2 b 13 − 12 c 2 − 13 d 5 − (−1)

e 7 − (−5) f −3 − (−2) g −5 − (−5) h −5 − 5

i −6 − 4 j −3 − (−8) k 5 − 11 l 4 − (−2)

m−6 − 7 n 12 − 18 o 9 − (−3) p −2 − 7

3 Copy each question and work out the answer. Use the number line if you are unsure.

a 6 + (−6) b −2 + 2 c −5 + 12 d −11 + (−9) e 3 + (−8) f −7 + (−7) g 0 + 70 h −27 + 6 i −4 + (−15) j 9 + (−1) k −32 + 0 l −13 + 21

Exercise 5-04

3 What is 4 − (−3)? Solution

• 4 is where you start. • − direction is left.

• −3 is how far you move in the opposite direction (that is, right). 4 − (−3) = 7

So 4 − (−3) is the same as 4 + 3.

4 What is −3 − (−1)? Solution

• −3 is where you start. • − direction is left.

• −1 is how far you move in the opposite direction (that is, right). −3 − (−1) = −2 So −3 − (−1) is the same as −3 + 1. 0 9 −6 −5 −4 −3 −2 −1 1 2 3 4 5 6 7 8 10 0 9 −6 −5 −4 −3 −2 −1 1 2 3 4 5 6 7 8 10 +/− (−) Ex 2 L 585 Integer cruncher

TLF

Ex 3 Ex 2

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4 Find the value of:

a 20 − 9 b 9 − 20 c 20 − (−9) d −9 − 20

e −4 − 7 f −4 − (−7) g 13 − (−3) h −13 − (−3)

i 0 − 8 j 0 − (−8) k 5 − (−5) l −5 − 5

5 Use your calculator to ﬁnd the value of:

a 6 − 13 b 4 − (−2) c −7 + 3 d −5 − (−6) e 3 + (−8) f 8 − (−23) g 11 − (−15) h −83 + (−95) i 12 − (−108) 6 7 − 12 = ? Select A, B, C and D. A 18 B −5 C−19 D5 7 -2 + 7 = ? Select A, B, C and D. A 9 B −9 C5 D−5

8 Simplify the following.

a −3 + (−3) + (−4) b −3 + 3 + (−4) c −3 + (−3) + 4 d 5 + (−5) + (−7) + 7 e 5 + (−5) + (−7) + (−7) f −5 + (−5) + (−7) + 7 g 9 + (−2) + 2 + (−8) + (−9) h 6 − 8 + (−3) + 1

9 Simplify the following.

a 1 − 9 + 9 − 10 − 1 b −4 − 7 − 6 + 7 − 4 c 4 − 7 − 6 − 7 − 4 d −1 − 2 − 3 − 4 − 5 − 6 e 6 − 9 + 4 − 11 f 7 − 10 + 6 − 5 g −13 + 20 − 4 + 10 − 6 h −6 + 10 − 1 + 3

10 Find the missing number for each of the following.

a 7 + = 0 b −3 + = 0 c −3 + = −6

d −8 + 1 = e 5 + = 12 f −5 + = −12

g 10 + = 4 h −10 + = −4 i + −2 = 18

j + −2 = −18 k + 7 = −2 l + (−7) = −2

11 Copy and complete each table by adding the numbers in the left column to the numbers in the top row.

a b c d Ex 3 + −2 −7 −10 4 −5 8 + −3 −5 6 5 4 −2 6 −11 + 2 3 4 −1 2 −3 + 3 −4 5 −2 6 −6 1 −3 −4 6

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5-05 Applying integers

For each question, write a number sentence to calculate the answer.

1 The heights above (and below) sea level of some well-known places are: • The Dead Sea (Jordan Valley) −397 metres

• Death Valley (California, USA) −86 metres • Mt Kosciuszko (Australia) 2230 metres

• Mt Everest (Nepal) 8840 metres

Exercise 5-05

Mental skills 5A

Adding 8 or 9

A quick way to mentally add 9 or 8 to a number is to add 10 and count back 1 or 2 respectively.

1 Examine these examples.

a 17 + 9 = 17 + 10 − 1 b 44 + 8 = 44 + 10 − 2 = 27 − 1 = 54 − 2 = 26 = 52 Count: ‘17, 27, 26’ Count: ‘44, 54, 52’ c 128 + 19 = 128 + 20 − 1 d 256 + 38 = 256 + 40 − 2 = 148 − 1 = 296 − 2 = 147 = 294 Count: ‘128, 148, 147’ Count: ‘256, 296, 294’

2 Now simplify these.

a 146 + 9 b 212 + 9 c 308 + 9 d 1755 + 9

e 29 + 19 f 687 + 39 g 254 + 29 h 933 + 19

i 714 + 8 j 623 + 8 k 207 + 8 l 155 + 8

m 386 + 8 n 418 + 48 o 909 + 28 p 277 + 18

Maths without calculators

Example 4

The temperature on Mars is 23°C and the temperature on Jupiter is −150°C. What is the difference in these temperatures?

Solution

Write a number sentence to calculate the answer. 23 − (−150) = 23 + 150

= 173

The difference in temperature is 173°C.

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a How much higher is Mt Everest than Mt Kosciuszko?

b How much higher is Mt Kosciuszko than Death Valley?

c How much lower is the Dead Sea than Death Valley?

d The highest point on Earth is Mt Everest and the lowest point on land is the Dead Sea. What is the difference in altitude between these two points?

2 The temperature on a day in winter reached a maximum of 11°C. It dropped to a

minimum overnight of −2°C. How many degrees did it drop?

3 A man walked 16 kilometres east and then 20 kilometres west. How far is he from his starting point?

4 Anita left home and walked three kilometres west to her friend’s home. Together, they then walked west for another 4 kilometres. How far from Anita’s home were they then?

5 Mt Etna is an active volcano in Italy. It is 3200 m high. The lava starts 652 m below the Earth’s surface and shoots to a height of 750 metres above Etna. How far does the lava travel?

6 The submarine Nemesis descends from the surface to a depth of 955 metres to inspect a shipwreck. It then ascends 800 metres to send a message. How far below the surface is it when it sends the message?

7 The graph on the right shows the proﬁt made by Moneta Pty Ltd over 6 years.

a In which years did Moneta make a proﬁt?

b In which years did Moneta make a loss?

c What was the decrease in proﬁt between 2003 and 2004?

d Did the company make an overall profit or loss during the six years shown? How much profit or loss did they make?

8 A scuba diver was swimming at a depth of 18 metres. Her diving friend was at a depth of 7 metres. What was the vertical distance between them?

9 Karina had $74 in her bank account yesterday but was allowed to withdraw $121. Today, she deposited $40 into the account. What is her account balance now?

10 What is the correct number sentence for this problem? Select A, B, C or D. ‘The overnight low was −6°C. The temperature rose by 13°C during the day and dropped 5°C after the sun went down. What was the temperature then?’

A −6 + 13 − 5 B −6 − 13 − 5 C−6 + 13 + 5 D−5 − 13 − 6 2002 2003 2005 2006 Year 40 2004 200 160 120 80 0 −40 −80 2007

Moneta Pty Ltd profit

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Using technology

Temperature ranges at Thredbo

The following data shows the minimum and maximum temperatures for Thredbo, recorded each day for two weeks in June, 2007.

1 Enter the data, as shown below (centre data, bold headings), into a spreadsheet.

2 In D1, enter the label ‘Difference’. To ﬁnd the difference between the minimum and

maximum temperatures each day, enter the formula as shown in cell D2 below.

3 To copy this formula into cells D3 to D16, click on cell D2 (with left mouse button)

and position the mouse over the bottom right-hand corner of this cell. Drag down to cell D16 and let go. This is called Fill Down.

4 Using the values you obtained in column D from question 3, answer these questions. a On which day was the largest difference between the maximum and minimum

temperatures recorded? Write your answer in cell E1.

b On which day was the smallest difference between the maximum and minimum

temperatures recorded? Write your answer in cell E2.

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5 In cell A18, enter the label ‘Lowest Minimum’. In cell A19, enter ‘Highest

Minimum’. In cell D18, enter ‘Lowest Maximum’. In cell D19, enter ‘Highest Maximum’. In cell A20, enter ‘Difference’.

6 a To ﬁnd the lowest minimum, in cell B18, enter =min(B2:B16). Now, enter

appropriate formula into cells B19, C18 and C19 to ﬁnd the values for the labels in question 5. (Note: The lowest and highest maximums go in C18 and C19.)

b What do you notice about the value in cell C19, compared to the values in the

other three cells from part a?

7 a Enter the formula shown in cell B20 below. From cell B20, use Fill Right to copy

this formula into cell C20.

b For this fortnight in Thredbo, use your answers from question 6 a and 7 a to

answer these questions.

i Which column (B or C) had the greatest difference in temperature? Write your answer in cell E3.

ii In cell E4, write a formula to ﬁnd the difference between the lowest minimum temperature and the highest maximum temperature.

Just for the record

Brahmagupta

Brahmagupta was a famous Indian mathematician who lived from AD 598 to AD 670.

He wrote important works on mathematics and astronomy.

His writings contained two remarkable ideas that were ahead of his time. • He deﬁned zero as the result of subtracting a number from itself.

• He gave arithmetical rules for positive and negative numbers, which he called fortunes and debts.

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5-06 Multiplying integers

Working mathematically

Multiplying integers

1 Copy the table below onto a large piece of paper and, as a group:

a complete the shaded section

b complete the pattern for the ﬁrst row, that is 25, 20, 15, 10, 5, 0, −5, … c complete the pattern for the next row, that is 20, 16, 12, 8, 4, 0, −4, … d complete the next four rows

e complete the pattern for each column.

2 How do the signs (positive or negative) of the numbers in the question affect the sign of the answer? Look for a pattern.

3 Use your completed table to help you complete the following.

a 4 × (−3) = b −3 × 5 = c −2 × (−2) = d −5 × (−1) = e 2 × 5 = f −3 × 3 = g −1 × 4 = h −5 × 5 = × 5 4 3 2 1 0 −1 −2 −3 −4 −5 5 4 3 2 1 0 −1 −2 −3 −4 −5

Reﬂecting and reasoning

Skillsheet

5-02

Integers using diagrams

The rules for multiplying directed numbers are: positive × positive = positive

positive × negative = negative negative × positive = negative negative × negative = positive

When multiplying two numbers which have the same sign, the answer is positive. When multiplying two numbers which have different signs, the answer is negative.

× + −

+ + −

− − +

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1 Find the answer for each of these. a −3 × 6 b 6 × (−4) c −3 × (−7) d 4 × (−8) e −7 × (−9) f −9 × 5 g 7 × 6 h −7 × (−6) i 3 × (−8) j −9 × 1 k −1 × (−1) l −9 × 6 m5 × (−2) n −7 × 6 o −11 × (−4) p −9 × 9 q −12 × (−5) r 20 × (−3) s −10 × (−10) t −7 × (−8) 2 8 × (−5) = ? Select A, B, C or D. A 13 B −13 C−40 D40 3 −7 × (−3) = ? Select A, B, C or D. A 21 B −21 C−10 D10 4 −2 × 3 × 7 = ? Select A, B, C or D. A 1 B 19 C−35 D−42

5 Complete these multiplication tables, taking care to get the signs correct.

a b c

d e f

6 Find the answer for each of these.

a −6 × (-4) b 2 × 15 c −9 × (−9) d 11 × (−3) e 16 × (−1) f −3 × 81 g 63 × 300 h −104 × (−40) i −99 × 1000 j −56 × (−100) k −1 × (−1) × (−1) l 13 × (−4) m−300 × 100 n −4 × 4 o −9 × (−4) p −6 × 3 × (−5) q 8 × (−70) × (−200) r −13 × 100 s 0 × 4 t 12 × (−3) × (−10)

Exercise 5-06

Example 5

Find the answers for these, taking care to get the signs correct.

a −3 × 2 b −6 × (−7) c 4 × (−4)

Solution

a −3 × 2 = −6 (negative × positive = negative) b −6 × (−7) = 42 (negative × negative = positive) c 4 × (−4) = −16 (positive × negative = negative)

Ex 5 × −3 5 −3 5 × −5 5 5 −5 × 6 −4 −4 6 × −1 1 −1 1 × 7 −3 4 −6 × −3 −6 8 2

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7 Find the value of:

a 42 b (−3)2 c (−7)2

d (−8)2 × (−2) e (5)3 f (−2)3

g −4 × (−1)3 h (−2)3 × (−5)2 i (−3)3 × (−2)3

8 Follow the arrows along all the stepping stones and multiply by the next number as you go. Is your answer positive or negative at the ﬁnish?

9 Use your calculator to ﬁnd the answer for each of the following.

a −8× 6 b −11 × (−4) c −15 × (−16)

d 13× (−5) e 38 × (−11) f −25 × (−12)

g (−5)2 h (−8)3 i −15 × (−7)2

5-07 Dividing integers

Because division is the reverse operation to multiplication, the rules for dividing integers are the same as those for multiplying them.

• 5 × (−4) = −20 so −20 ÷ (−4) = 5 • −6 × 2 = −12 so −12 ÷ 2 = −6 • −3 × (−9) = 27 so 27 ÷ (−9) = −3 START FINISH 1 1 1 1 −1 −1 −1 −1 −1 −1 −1 −1 ₋₁ −1 1 1 1 1 1 1 1

The rules for dividing directed numbers are: positive ÷ positive = positive

positive ÷ negative = negative negative ÷ positive = negative negative ÷ negative = positive

When the two numbers involved in the division have the same signs, the answer is positive. When the two numbers involved in the division have different signs, the answer is negative.

÷ + −

+ + −

− − +

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1 Find the answers for the following divisions. a 15 ÷ (−5) b −8 ÷ 4 c −12 ÷ (−3) d 6 ÷ (−2) e 27 ÷ (−3) f −18 ÷ (−6) g 24 ÷ (−6) h 100 ÷ (−2) i −20 ÷ 5 j −51 ÷ (−3) k 45 ÷ (−5) l −72 ÷ 6 m −80 ÷ (−5) n −10 ÷ 2 o 98 ÷ (−7) p 48 ÷ (−8) q −27 ÷ 9 r −80 ÷ (−4)

2 Find the answers for these divisions.

a b c d e f g h 3 −48 ÷ (−2) = ? Select A, B, C or D. A 24 B −24 C−50 D−46 4 = ? Select A, B, C or D. A 12 B −4 C4 D−20

5 Divide the top row by the left-hand column to complete these tables.

a b

6 This question involves both division and multiplication. Remember to work from left to right, and ﬁnd the answers.

a 5 × (−4) b 6 × (−3) ÷ 9 c 7 × 6 ÷ (−2) d −3 ÷ (−1) × 1 e 24 ÷ (−6) × 50 f −56 ÷ (−8) × 4 g −100 ÷ (−20) ÷ (−5) × 23 h −27 × (−9) ÷ 9 i 3 × 8 ÷ (−4) ÷ (−2) j −14 ÷ 2 × 3 × (−2) k −16 × 5 ÷ 4 ÷ (−5) l 13 × 2 × (−5) ÷ (−10) m500 ÷ (−10) × 4 n −14 × (−5) ÷ (−7) ÷ (−2)

Exercise 5-07

Example 6

Find answers for these, taking care to get the signs correct.

a −15 ÷ 3 b 18 ÷ (−9) c −10 ÷ (−5) d

Solution

a −15 ÷ 3 = −5 (negative ÷ positive = negative) b 18 ÷ (−9) = −2 (positive ÷ negative = negative) c −10 ÷ (−5) = 2 (negative ÷ negative = positive) d = 14 ÷ (−7) = −2 (positive ÷ negative = negative)

14 −7 ---14 −7 ---Ex 6 12 -2 --- 100 -50 --- -18 -3 --- -66 -2 ---126 6 --- 45 -5 --- 100 5 --- -81 -9 ---16 -4 ---÷ −6 −3 3 6 −6 −3 ÷ 8 −8 32 −32 −2 4

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7 Use your calculator to answer the following.

a 45 ÷ (−9) × 2 b −56 × (−4) ÷ 2

c −200 ÷ (−100) ÷ 2 d 32 × (−3) × (−15)

e −40 × (−3) ÷ (−20) f 78 × (−2) × (−5) ÷ (−39)

g −544 × (−15) × (−6) h 48 ÷ 3 × (−12)

5-08 The four operations with integers

Now that you know how to add, subtract, multiply and divide with integers, you can evaluate mixed expressions. Remember to follow the ‘order of operations’ rules. • First: work out the value within any grouping symbols

• Second: work out multiplication and division from left to right • Third: work out addition and subtraction from left to right.

a 6 − 8 b −3 + 5 c −8 − 4 d −7 + 9

e −2 − 12 f 10 − 35 g −8 − 13 h 19 − 22

i 4 − (−7) j −3 − (−11) k −15 + 9 l −12 − (−3)

m9 − 12 n −13 − 10 − (−1) o 4 − 6 + 2 + (−1) p 9 − 12 + 7 − 9 2 Find the answers to the following.

a −3 × 6 b −2 × (−6) c 18 ÷ 2 d −16 ÷ 8 e −25 × (−2) f −30 ÷ (−6) g 12 × (−4) h 48 ÷ (−6) i −100 ÷ (−10) j 21 ÷ (−3) ÷ (−7) k −2 × 5 × (−3) l 15 ÷ (−3) × (−2) m−32 ÷ (−4) × (−2) n 6 ÷ (−3) × (−4) o −24 × 2 ÷ (−3) ÷ (−4) 3 6 + 4 × (−2) = ? Select A, B, C or D. A 14 B −20 C−2 D−14

4 Find the value of each of the following.

a −5 × 2 + 3 b −5 × (2 + 3) c 3 × 6 × (−2) d 12 − 8 ÷ 4 e 12 − 8 ÷ (−4) f −3 × (9 − 10) g 21 ÷ (−7) + 8 h [−6 − (−4)] × (−4) i (−6 − 2) ÷ (−4) j −3 ÷ 3 + 9 k 12 × (6 − 7) + 1 l −4 × 7 ÷ (−7 − 7)

Exercise 5-08

Skillsheet 5-03 Order of operations Worksheet 5-03 Integer review

Example 7

Find the value of 3 × (−4 − 6).

Solution

3 × (−4 − 6) = 3 × −10 (brackets ﬁrst)

= −30

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5 Find the value of: a −5 × 6 − 8 b −5 × (6 − 8) c [18 − (−3)] × 4 d 5 + (−8) × (−7) + 72 e 81 − (−3 × 12) f 102 × (−5 + 3) g 6 × (−2) + (−4) h −7 − 5 + 9 i −19 + 4 × 6 j [−6 − (−9)] × (−2) k (−6 − 3) ÷ (−3) l 25 ÷ (−5) + 6 m−8 + (−9) × (−10) ÷ (−5) n 6 − 9 + 5 − 11 o −15 + 19 × 2 − 8 p 6 − 13 + 14 − 3 × (−5) q −3 − 10 ÷ 2 + 19 r 3 − 10 × (−2) − (−19)

6 A Year 7 student completed these 10 questions. Mark them, and correct the mistakes.

7 Use your calculator to ﬁnd the value of:

a −2 × 15 + 11 b 6 × (13 − 27) c −14 − 6 × (−8) d 25 ÷ (−5) ÷ (−5) e [12 − (−10)] × (−3) + 6 f −3 × (−8) ÷ (−4) + (−11) g 9 − 19 + 36 − 8 × (−6) h −12 − 30 ÷ (−2) + 58 i 6 + 4 × (−5) ÷ (−2) a −3 × 5 = −15 b 6 − 8 = 2 c −6 − 8 = −2 d −11 + 3 = −8 e 12 ÷ (−6) = −2 f (−2 + 6) × 2 = −8 g −7 − 6 + 10 = 3 h (−12 − 3) ÷ (−3) = 3 i 12 − 3 × 5 = 45 j 2 − 9 × (−3) − (−18) = 39

Mental skills 5B

Subtracting 8 or 9

A quick way of mentally subtracting 9 or 8 is to subtract 10 and add back 1 or 2 respectively.

1 Examine these examples.

a 66 − 9 = 66 − 10 + 1 b 83 − 8 = 83 − 10 + 2 = 56 + 1 = 73 + 2 = 57 = 75 Count: ‘66, 56, 57’ Count: ‘83, 73, 75’ c 72 − 49 = 72 − 50 + 1 d 141 − 28 = 141 − 30 + 2 = 22 + 1 = 111 + 2 = 23 = 113 Count: ‘72, 22, 23’ Count: ‘141, 111, 113’

2 Now simplify each of these by counting.

a 26 − 9 b 44 − 9 c 123 − 9 d 270 − 9

e 161 − 29 f 187 − 59 g 75 − 19 h 457 − 39

i 82 − 8 j 131 − 8 k 96 − 8 l 120 − 8

m44 − 8 n 577 − 28 o 203 − 18 p 365 − 48

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Using technology

Spreadsheet formulas involving integers

Remember that a spreadsheet is like a calculator. We use special symbols to do calculations; the basic operations are shown below.

Remember: A spreadsheet formula always begins with an equals (=) sign.

1 Enter the following numbers into cells as shown below, where m represents the

value in cell B1, n is the value in cell B2, p is the value in cell B3, and so on.

2 Enter the following formulas into the given cells. (Try to predict the answer before

you enter each formula.)

a C1, m + r (means enter the formula into cell C1 as shown above)

b C2, n + q c C3, n − q d C4, p − q − m e C5, p − q + m f C6, m − n g C7, n − r h C8, m × n i C9, n × r j C10, n × q × r k C11, n2 l C12, r3 m C13, q ÷ r n C14, m ÷ q o C15,

(When you have obtained the answer, right click on the cell, choose Format

Cells and convert the answer to a fraction.)

p C16, the minimum value from the set of cells B1 to B5 q C18,

r C19, m ÷ (q × r)

(Format Cells as in o above to convert to a mixed numeral.)

s C20, (n + q) × m t C21, n × (r − q)

u C22, m × n + 25 v C23,

w C24, x C25, m2 + n3

Mathematical operation Symbol used in spreadsheet

Addition (+) + Subtraction (−) -Multiplication (×) * Division (÷) / r m ----q n–q r ---m r–q

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---5-09 The number plane

A number plane is a grid made from a horizontal number line called the x-axis, and a vertical number line called the y-axis.

Note: the plural of ‘axis’ is ‘axes’.

Points on the number plane are found by using a pair of numbers called coordinates, for example (3, 2) meaning 3 across and 2 up. A set of coordinates such as (3, 2) can also be called an ordered pair. In the number plane on the right:

• A is the point (2, 1) • B is the point (0, 3).

How do we locate points? Always start from 0. The ﬁrst number tells how far to move across, the second tells how far to move up.

The ﬁrst number is called the x-coordinate. The second number is called the y-coordinate.

Note: The point (0, 0) is called the origin.

3 Use the values for m, n, p, q and r given in Question 1. a i In cell E1, enter =B2/B3

ii In cell E2, enter =B3/B2

iii Compare your answers in cells E1 and E2. In two sentences, explain the validity of each answer.

b Does (m + n)2 = m2 + n2?

i In cell D1, enter a formula for (m + n)2.

ii In cell D2, enter a formula for m2 + n2.

iii Compare your answers in cells D1 and D2 to justify your answer.

1 2 3 4 5 1 0 2 3 4 5 x-axis y-axis Worksheet 5-04 Plane grid 1 Skillsheet 5-04

The number plane

1 2 3 4 5 1 0 2 3 4 5 x y E (3, 4) B (0, 3) D (5, 2) C (3, 2) A (2, 1) Up Across origin

(2, 1) means (2 across, 1 up) • start from 0

• move 2 units across • then 1 unit up

(0, 3) means (0 across, 3 up) • start from 0

• do not move across • move 3 units up

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1 Write the coordinates of the points shown on this number plane.

2 Record the coordinates of the eight points shown on this number plane.

3 Draw a number plane with the numbers from 0 to 6 on each axis. Start at the point (1, 1) and draw a line joining it to (4, 1).

Join (4, 1) to (6, 2), then continue through (3, 2) → (1, 1) → (1, 4) → (3, 5) → (6, 5) → (4, 4) and ﬁnish at (1, 4).

Now join (3, 2) to (3, 5). Join (4, 1) to (4, 4). Join (6, 2) to (6, 5). What have you drawn?

4 Write the letters shown at these points on the grid on the right, to spell some words.

a (3, 1), (4, 3), (2, 4), (3, 5), (5, 2), (1, 5) b (2, 3), (6, 1), (6, 4), (5, 5), (2, 1) c (6, 5), (6, 4), (6, 3), (5, 3), (5, 1) d (2, 4), (5, 2), (6, 3), (5, 1), (5, 3) e (3, 1), (4, 3), (5, 1), (2, 2), (2, 1) f (4, 3), (2, 4), (2, 3), (1, 3), (1, 1), (2, 1)

5 You may use grid paper for these questions.

a Draw a number plane or use the link to print Plane grid 1. On the x-axis, mark 0 to 15. On the y-axis, mark 0 to 20.

b Plot these ordered pairs and join them with lines according to these instructions: (0, 4) → (2, 1) → (13, 1) → (15, 4) → (0, 4) STOP

(0, 6) → (8, 6) → (15, 8) → (8, 20) → (0, 6) STOP (8, 4) → (8, 20)

c What did you draw?

Exercise 5-09

1 2 3 4 5 1 0 2 3 4 5 x y A D E C B F P 6 1 2 3 1 0 2 3 4 5 x y M B E A P N U J 1 2 3 4 5 1 0 2 3 4 5 x y R 6 D B V N W L M K J M A I P F U E T C S G H E K R E N H R L Worksheet 5-04 Plane grid 1 Worksheet 5-05 Bigtop employee

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6 You may use grid paper for this question.

a Draw a number plane or use the link to print Plane grid 1. On the x-axis, mark 0 to 12. On the y-axis, mark 0 to 16.

b Join the following points in order, from left to right:

(0, 6) → (2, 1) → (9, 1) → (8, 3) → (9, 5) → (10, 1) → (12, 1) → (12, 3) → (10, 9) → (12, 11) → (12, 13) → (7, 16) → (4, 11) → (5, 10) → (2, 3) → (0, 6) STOP. (5, 10) → (6, 9) → (8, 11) → (8, 12) → (9, 11) → (10, 9)

c What did you draw?

7 Look at this plan of a country town.

What features appear at:

a F2? b D5? c D3? d C2? e B3? f C1?

8 Use the plan in Question 7 to write the map reference (letter ﬁrst, number second) for:

a the swamp b the library

c the church d the secondary school

e the sports oval f the council ofﬁces.

5-10 The number plane with negative numbers

Now that we have used number lines involving both positive and negative numbers, we can extend the number plane as shown below.

Worksheet 5-04 Plane grid 1 Council offices Shops Park Swamp Swimming pool Tennis courts Car yard Car park Pond Shops Sports oval Primary school Post office Library Secondary school 4 3 2 1 A B C D E F G Golf course Church N Station 5 Worksheet 5-06

The number plane

Worksheet 5-07 Plane grid 2 O origin (0, 0) −1 −2 −3 −4 1 2 3 4 x −1 −3 1 3 y 2nd quadrant 1st quadrant 2 4th quadrant 3rd quadrant −2 Worksheet 5-08

Number plane review

Worksheet

5-09

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The number plane is divided into four regions called quadrants. The centre of the number plane is called the origin.

The number plane is also called a Cartesian plane, named after René Descartes

(pronounced ‘Ren-ay Day-cart’), a French mathematician who developed the idea of the number plane.

A few points are labelled on this number plane as examples.

1 Write the coordinates of these 26 points.

Exercise 5-10

O 1 2 −1 1 2 3 x y 4 −2 −3 −2 −3 −4 4 −4 G (0, −4) E (4, −3) −5 5 F (2, 0) B (3, 1) D(−5, −1) −1 3 C (−2, 3) A (1, 3) −1 O 1 2 3 −1 1 2 3 x y 4 −2 −3 −2 −3 −4 4 −4 A D U B C E V T L P Q K F J X I Z R M S H G W Y N

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2 a Draw a number plane with both axes (lines) extending from −6 to 6. b Mark these points.

A(3, 1) B(−4, 3) C(−3, 4) D(−2, −2) E(0, −2) F(1, −5) G(4, −4) H(−3, 0)

I(−6, 0) J(−1, −6) K(−3, −4) L(0, 5)

M(6, 2) N(−3, 5) P(5, −5) Q(−1, 6)

3 List all of the points from Question 2 that are:

a in the 1st quadrant b in the 2nd quadrant c in the 3rd quadrant

d in the 4th quadrant e on the border of two quadrants.

4 In which quadrant would you ﬁnd each of the following points?

a (3, −5) b (−2, −4) c (−8, 1)

5 Copy this table and complete it by placing a + or a − sign in the blank spaces.

6 a Draw a number plane, with both axes extending from −3 to 3, or use the link to

print Plane grid 2.

b Mark these points:

A(0, 1) B(2, −1) C(−1, 2) D(−2, 3) E(3, −2) F(1, 0)

c What do you notice about the points? Check this with your ruler.

7 a Draw a number plane, on graph paper, extending from −10 to 10 on both axes, or

use the link to print Plane grid 2.

b Start at the ﬁrst point and join the points in the order given:

i (5, 6) → (6, 5) → (8, 1) → (8, −1) → (6, −5) → (4, −6) → (1, −9) → (−1, −9)

→ (−4, −6) → (−6, −5) → (−8, −1) → (−8, 1) → (−6, 5) → (−5, 6) → (−7, 4) → (−8, 4) → (−10, 6) → (−10, 8) → (−8, 10) → (−6, 10) → (−3, 9) → (3, 9) → (6, 10) → (8, 10) → (10, 8) → (10, 6) → (8, 4) → (7, 4) → (6, 5). Stop and lift your pencil from the paper.

ii (−3, 0) → (−1, 2) → (1, 2) → (3, 0) → (3, −1) → (2, −2) → (2, −1) → (1, −1)

→ (1, −2) → (−1, −2) → (−1, −1) → (−2, −1) → (−2, −2) → (−3, −1) → (−3, 0). Stop and lift your pencil from the paper.

iii (−2, 1) → (−3, 2) → (−3, 3) → (−1, 5) → (−1, 2).

Stop and lift your pencil from the paper.

iv (2, 1) → (3, 2) → (3, 3) → (1, 5) → (1, 2).

v (−5, −4) → (−3, −6) → (0, −5) → (3, −6) → (5, −4).

vi (−2, −6) → (−2, −7) → (−1, −8) → (1, −8) → (2, −7) → (2, −6). c What did you draw?

Points in: x-coordinate y-coordinate

1st quadrant + 2nd quadrant − 3rd quadrant 4th quadrant Worksheet 5-07 Plane grid 2 Worksheet 5-10 Quadrilateral man Worksheet 5-07 Plane grid 2 Worksheet 5-11 Coordinates code puzzle

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Power plus

1 Find the answers to the following.

a (−2)3 b (−4)3 c (−2)5

d (−1)5 e (−1)9 f (−1)32

g − × (−3)4 h i

j k l

2 Find the number (or numbers) which make each of these expressions true.

a 2 = 16 b 2 = 100 c 3 = −8

3 a Find two integers which, when added together, give −5. b Find three integers which, when added together, give 7. c Find two integers which, when subtracted, give −1.

d Find two integers which, when multiplied together, give −6. e Find three integers which, when multiplied together, give 36. f Find three integers which, when multiplied together, give −24. 4 a Find the integer midway between −8 and 12.

b Find the integer midway between −1 and −17. c Find the integer midway between −21 and 19.

5 a Draw a number plane extending from −7 to 7 on the x-axis, and from 12 to −8 on

the y-axis, or use the link to print one out.

b Start at the ﬁrst point and join the points in the order given.

i (3 , 0) → (4, 2) → (4, 4) → (3 , 7) → (4 , 8) → (4 , 9) → (5, 10) → (4 , 11 ) → (3 , 10) → (2, 10) → ( , 11 ) → (1, 10) → (1, 8) → (1 , 7) → (2, 6 ) → (1 , 4 ) → (0, 2 ) → (−2 , 1) → (−3, 0) → (−3 , −4) → (−4 , 6) → (−4, −7) → (0, −8) → (2, −7 ) → (2, −6 ) → (0, −7) STOP ii (−2, −7 ) → (1, −6) → (3, −6) → (4 , −6 ) → (4 , −5 ) → (3, −4 ) → (0, −5) → (−3, −6 ) STOP iii ( , −2) → (1, −3) → (0, −5) STOP iv (1 , 0) → (1, −2) → (1 , −4 ) STOP v (2, -6) → (2 , -7 ) → (3 , -7 ) → (3 , -6 ) → (3, -6) STOP vi (2 , -4 ) → (2 , -2) → (3 ) vii (1 , -3) → (1, -5) STOP c Complete the picture as you wish. d What have you drawn?

16 3 8 3 -8 32 5 5 _-32 7 _-1 1 2 --- 1 2 --- 1 2 --- 1 2 ---1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 ---1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 ---1 2 --- 1 2 ---1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 ---1 2 ---1 2 ---1 2 --- 1 2 --- 1 2 ---1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 --- 1 2 ---1 2 --- 1 2 --- 1 2 --- 1 2 ---1 2 ---Worksheet 5-07 Plane grid 2

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Chapter 5 review

Language of maths

ascending axis/axes coordinates descending directed numbers integer magnitude minus negative number line number plane opposite

ordered pair origin plus point

positive quadrant x-axis y-axis

1 What is the difference between a ‘directed number’ and an ‘integer’?

2 ‘Every integer has an opposite.’ True or false?

3 What is the difference between −4 (‘negative 4’) and − 4 (‘minus 4’)?

4 Look up the word ‘coordinate’ in the dictionary. Find both its mathematical and non-mathematical meanings.

5 Why do you think ‘ordered pair’ is another name for coordinates?

6 What is the origin and why does it have that name?

Topic overview

• Write in your own words what integers are. • Write any rules you have learnt about integers.

• What parts of this topic did you ﬁnd difﬁcult? What parts didn’t you understand? Discuss them with a friend or your teacher.

• Give some examples of where negative numbers are used.

• Copy this overview into your workbook and complete it, making any changes you ﬁnd necessary. Ask your teacher to check your chart.

Worksheet

5-12

Integers ﬁnd-a-word

INTEGERS

+ 0

–

Number line Directed numbers

Addition Ordered pair Number plane Subtraction Division Multiplication Origin

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Chapter revision

1 Draw a separate number line to show each of the following sets of numbers.

a 2, 3, 6, 1

b whole numbers between 2 and 5

c whole numbers greater than 1 and less than 7

2 Copy and complete these number patterns.

a −2, −1, 0, , , b 1, 0, −1, , ,

c −6, −8, , , d 2, 0, −2, , ,

e 1, −2, 3, , , f −1, −3, −5, , ,

3 Find the amount left in this bank account after each of these day’s transactions.

a start $37.85 b starting position $65.30

deposit $18.20 withdraw $100.00

deposit $120.00 deposit $230.00

withdraw $45.00 withdraw $150.00

deposit $8.15 deposit $3.75

withdraw $248.20 withdraw $100.00

4 Answer true (T) or false (F) for each of these.

a −4 2 b −2 −3 c −1 1 d 2 −1

e −11 −10 f −3 −4 g −8 11 h −4 −3

i 5 −4 j −16 −17 k 1 −5 l −9 −2

5 Find the opposite of each of these integers.

a −2 b −23 c 56 d −10 e 8 f 0

6 Evaluate the following.

a 3 + (−4) b 3 − (−4) c −8 + (−2) d 10 + (−13) e −5 − (−9) f 7 + 11 g −4 − 8 h −5 − (−5) i −7 − 8 j −3 + 6 k −5 + (−4) + (−2) l −8 + 5 − 4 m8 − 6 − (−4) n 1 − 3 + 0 o −3 − 14 − 5 p −7 + 6 + (−7) q 4 + 6 + 7 r 3 − 8 + (−6)

7 The minimum overnight temperature in Goulburn was −5°C. During the day, it rose

to 11°C. By how much did the temperature rise?

a 6 × (−3) b −8 × (−6) c −2 × 5

d −100 × 4 e 7 × (−9) f 6 × 8

g −6 × (−4) × (−1) h −2 × 3 × 7 i −4 × 2 × (−5)

a −12 ÷ (−4) b 15 ÷ (−5) c −6 ÷ (−6) d 16 ÷ (−4) e −24 ÷ 12 f −1000 ÷ 10 g 24 ÷ (−6) ÷ (−2) h −36 ÷ 3 ÷ 4 i −64 ÷ (−4) ÷ 2 Exercise 5-01 Exercise 5-01 Exercise 5-02 Exercise 5-03 Exercise 5-03 Exercise 5-04 Exercise 5-05 Exercise 5-06 Exercise 5-07 Topic test 5

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a −6 + (−3) × 2 b −4 − 3 × 6

c −12 ÷ 4 − 10 d −3 × 5 + 6 ÷ (−2)

e 30 ÷ (−6) + 5 f −2 × 7 + 15 ÷ (−3)

g −12 + (−3) × (−7) − 2 h 14 + 7 × (−3) + 5

11 Here is the test paper done by a Year 7 student. Mark the test out of 10 and correct any incorrect answers.

a −5 + (−4) = −9 b −5 + 4 = −9

c −2 × 3 = 6 d −2 × (−3) = 6

e 5 × (−4) = −20 f 0 × (−7) = −7

g 8 + (−7) + (−2) = −7 h −4 − (−6) = 2

i [8 × (−9)] + (6 − 7) = −71 j −1 × 2 × (−3) × 4 = 24

12 Draw a number plane with the numbers from 0 to 6 on each axis. Plot these points.

A (2, 3) B (1, 6) C(3, 0) D(0, 4) E (5, 2) F (6, 5)

13 Give the coordinates of each labelled point on this number plane.

14 a In which quadrant is the point (−3, −3)? b Write the coordinates of a point on the y-axis.

c In which quadrant is a point with a positive x-coordinate and a negative y-coordinate?

d Write the coordinates of a point in the 2nd quadrant.

e What are the coordinates of the origin?

15 a Plot the following points on a number plane, joining them with straight lines. (5, 3) → (3, 5) → (−1, 5) → (−3, 3) → (−3, −1) → (−1, −3) → (3, −3) → (5, −1) → (5, 3)

b What shape have you drawn?

16 a Plot these points on a number plane, joining them with straight lines.

(2, −3) → (−2, −3) → (−2, −2) → (−1, −1) → (−1, 5) → (0, 7) → (1, 5) → (1, −1) → (2, −2) → (2, −3)

b What shape have you drawn?

Exercise 5-08 Exercise 5-08 Exercise 5-09 1 2 −1 1 2 3 x y 4 −2 −3 −2 −3 −4 4 −4 A −5 −5 5 C H −1 3 F J D E I K B G Exercise 5-10 Exercise 5-10 Exercise 5-10 Exercise 5-10