Ch 01

July 17, 2017 | Author: Vincents Genesius Evans | Category: Division (Mathematics), Fraction (Mathematics), Multiplication, Arithmetic, Numbers
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Maths Quests Grade 7...

Description

Whole numbers

1 Look at the photograph. How many people are there? How quickly were you able to work this out? You have used your understanding of numbers and counting. In this chapter, you will reinforce your skills in adding, subtracting, multiplying and dividing whole numbers to find faster ways of solving problems like this as well as more difficult ones.

2

Maths Quest 7 for Victoria

The need for numbers Stone Age people had little need for precise quantities and probably had a vague and limited sense of number. People began to use pebbles, knots tied in a rope, or notches cut in a stick to count or record numbers. As the need arose to use larger numbers, many civilisations developed their own number systems. Our number system is based on the number 10 and is known as the Hindu– Arabic system. It is believed that it was used by the Hindus and brought to Spain by the Moors in the 8th or 9th century AD. Nine symbols were used. These symbols, called digits, were 1, 2, 3, 4, 5, 6, 7, 8 and 9 and are still used today. Place value, or the position of the digit was important. A symbol for zero was developed to replace the empty space which could be misleading. Now 10 digits are used 0, 1, 2, 3, 4, 5, 6, 7, 8 and 9.

WORKED Example 1 Using the digits 4 and 5 (these digits may be used more than once), write all the 2 digit numbers possible. THINK 1

2

WRITE

List the 2 digit numbers that can be made beginning with one of the given digits. List the 2 digit numbers that can be made beginning with the other given digit.

44

45

54

55

remember remember Digits are the first nine counting numbers and zero: 0, 1, 2, 3, 4, 5, 6, 7, 8, 9.

Chapter 1 Whole numbers

1A

3

The need for numbers

1 Using the digits 2 and 8 (these digits can be used more than once), write all the: a 2 digit numbers that are possible 1 b 3 digit numbers that are possible.

WORKED

Example

2 Write these sets of numbers in: a ascending order (smallest number first) i 297 302 203 310 ii 9987 100 592 12 423 10 241 iii 674 299 647 300 674 298 675 289

1.1

b descending order (largest number first) i 534 435 489 623 ii 9783 10 327 93 451 54 678 iii 46 512 100 000 46 521 569 531 3 Write in words and digits the value of the 5 in each of these numbers (for example, the value of the 5 in the number 859 is fifty — 50). a 85 290 b 4 502 468 c 192 681 765 d 23 503 4 State the value of the 9 in words and digits in each of these numbers: a

b No. of visitors to this Web Site:

Darwin 2149 km

18 927 c

d

SEA COVE Population 80 908

Thank you for your donations to the Good Friday Hospital Appeal. The amount raised was

QUEST

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$9 748 381

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1 Write the largest 4 digit number that has 3 and 8 as two of its digits. 2 Write the smallest 5 digit number which has one 0, one 7 and no digit is repeated. Be careful where you place the zero.

4

Maths Quest 7 for Victoria

History of mathematics T H E A B AC U S — c 5 0 0 B C T O N OW !

The abacus is a primitive computer that when used properly can perform the four main operations of addition, subtraction, multiplication and division as fast as a pocket calculator. It has been around for about 2500 years and is still used in some countries today. The original abacus was a board with sand used to record the numbers. The name abacus comes from the Greek word ‘abax’ which means calculating board or from the Phoenician word ‘abak’ which means sand. History records that Archimedes was killed by a soldier while working with figures drawn in the sand — it is thought he may have been looking at an abacus. At the next stage of development, an abacus had grooves for the stones that became the number markers used for calculations. Eventually this was replaced by rods or wires similar to the present style of abacus. The abacuses used by the Greeks and Romans had a position for the zero value but the concept of zero as a written place holder was not introduced in writing until about 1200 AD. This was about 2000 years after it had been seen on an abacus. The abacus was used in most parts of the world. The European abacus that we are familiar with has 2 counters above the bar and 5 below giving you 10 for each column. In Japan it is called the Sorabon and has 1 counter above the bar and 4 below it giving you 5 for each column. The Aztecs called their device the Nepohualtzitzin. It had quite a different format, with 3 counters above and 4 below, and was made of strings of maize kernels attached to a wooden frame. It dated back to about 1000 AD. The Chinese have been using their Suan Pan,

which translates as ‘calculating plate’, since about 500 BC. The Japanese device was based on the Chinese one and then improved. This is still used in many areas today and can perform at least as fast as a calculator. A contest was held in 1946 between the champion user (Thomas Wood) of an American calculating device, and Kiyoshi Matsuzaki who was a champion with the abacus. The competition involved a series of tests with complex examples of the 4 operations. The abacus won in 4 out of 5 tests. Mr. Matsuzaki had spent most of his life working with the abacus every day for his calculations. The world’s smallest abacus When most people think of an abacus they think either of the toy ones that are often used as an ornament or the larger wooden ones that are used in some shops, but there is an even smaller one. In 1996 the IBM Research Division built an abacus with the counters being made from individual molecules so that the counters were approximately one millionth of a millimetre (1 nanometre) in size. The counters were moved by a single atom using a scanning tunnelling microscope. This abacus has no commercial value and was built as a method of controlling very small molecules. However, similar principles are being used to develop nanotechnology which may have numerous benefits to us.

Questions 1. Where does the word abacus come from? 2. What is an abacus called in Japan? 3. What was the Aztecs’ abacus called? 4. Who won the contest between the abacus and the calculating machine in 1946? Research 1. Make your own abacus and use it to do addition and subtraction. 2. Use the Internet to find out more about the abacus and how it is used for various mathematical operations.

Chapter 1 Whole numbers

5

Adding whole numbers To add larger numbers write them in columns according to place value and then add them.

WORKED Example 2 Arrange these numbers in columns, then add them. 1462 + 78 + 316 THINK 1 2

3

4

5

WRITE

Set out the sum in columns. Add the digits in the units column in your head (2 + 8 + 6 = 16). Write the 6 in the units column of your answer and carry the 1 to the tens column as shown in red. Now add the digits in the tens column (1 + 6 + 7 + 1 = 15). Write the 5 in the tens column of your answer and carry the 1 to the hundreds column as shown in blue. Add the digits in the hundreds column (1 + 4 + 3 = 8). Write 8 in the hundreds column of your answer as shown in green. There is nothing to carry. There is only a 1 in the thousands column. Write 1 in the thousands column of your answer.

1462 78 + 31116 1856

A calculator can be used to check your answers. On a graphics calculator remember to press ENTER to obtain the answer after the last digit is entered.

remember remember 1. When adding, it is important to line numbers up vertically so that the digits of the same place value are in the same column. 2. When adding numbers in your head, look for pairs of numbers which add to 10, 20, 100 and so on. For example, 3 + 5 + 7 + 2 + 5 + 8 can be paired and easily added. (3 + 7) + (5 + 5) + (2 + 8) = 30

6

Maths Quest 7 for Victoria

1B

Adding whole numbers

Adding numbers

1 Answer these questions, doing the working in your head. a 7+8= b 18 + 6 = c d 80 + 41 = e 195 + 15 = f g 420 + 52 = h 1000 + 730 = i j 17 000 + 1220 = k 125 000 + 50 000 = l m 6+8+9+3+2+4+1+7= n

Adding numbers

2 Add these numbers, setting them out in columns as shown. a 34 b 65 c + 65 + 77

20 + 17 = 227 + 13 = 7300 + 158 = 2+8+1+9= 12 + 5 + 3 + 7 + 15 + 8 = 86 + 95

d

482 + 517

e

123 + 89

f

1418 + 2765

g

419 1 708 + 20 111

h

68 069 317 8 + 4 254

i

123 48 097 34 + 6 276

j

347 2818 692 + 180 + 1000

k

696 3 421 811 + 63 044

l

399 1489 2798 + 8943

Check your answers using a calculator. WORKED

Example

2

3 Arrange these numbers in columns then add them. a 137 + 841 b 723 + 432 c 149 + 562 + 55 d 47 + 198 + 12 e 376 + 948 + 11 f 8312 + 742 + 2693 g 8 + 12 972 + 59 + 1423 h 465 + 287 390 + 45 012 + 72 + 2 i 1 700 245 + 378 + 930 j 978 036 + 67 825 + 7272 + 811 Check your answers with a calculator.

$85

$39

4 Nicholas was going on a fly-fishing trip and went shopping for a pair of boots, a tackle basket and a fishing rod. How much did he spend in total? $27

Chapter 1 Whole numbers

7

5 The Melbourne telephone directory has 1544 pages in the A–K book and 1488 pages in the L–Z book. How many pages does it have in total? 6 The waitress shown in the photograph at right has brought your family’s dessert order. How much will it cost for dessert? 7 Hussein’s family drove from Melbourne to Perth. In the first 2 days they drove from $3 Melbourne to Adelaide, a distance of 738 kilometres. $6 After a couple of days’ sightseeing in Adelaide, $5 Hussein’s family took a day to drive 321 kilometres to Port $8 Augusta, and another to drive the 468 kilometres to Ceduna. They drove 476 kilometres to Norseman the following day, then took 3 more days to travel the remaining 1489 kilometres to Perth. a How many days did it take for Hussein’s family to drive from Melbourne to Perth? b How far is Norseman from Melbourne? c How many kilometres is Perth from Melbourne? d How far is Adelaide from Perth?

$5

$7

$8

8 Of all the world’s rivers, the Amazon in South America and the Nile in Africa are the two longest. The Amazon is 6437 kilometres in length and the Nile is 233 kilometres longer than the Amazon. How long is the Nile River? 9 Palindromes are words, sentences or numbers which read the same forwards as they do backwards. For example, the word DAD is a palindrome and the number 14541 is a palindrome. a List 2 other words that are palindromes. b List 5 numbers that are palindromes. c How many palindromes are there between 100 and 250? List them. 10 Numbers that are not palindromes can produce palindromes. We need to reverse the digits and then add this new number to the original number. For example, starting with 17 which is not a palindrome, we get 17 + 71 = 88. Palindromes The number 88 is a palindrome. a Produce palindromes starting with the following numbers. i 34 ii 27 iii 521 b Apply a ‘reverse and add’ step to 84. Does this produce a palindrome? Try another ‘reverse and add’ step. Have you now produced a palindrome? How many steps did it take to produce a palindrome? Palindromes c Produce palindromes starting with the following numbers. In each case, write down how many steps it took to achieve this. i 75 ii 153 iii 97 iv 381 v 984 vi 7598 d Choose 5 different starting numbers. Produce palindromes from these numbers. Check your answers by clicking on the Excel icon shown at right. The file ‘Palindromes’ will produce a palindrome from any starting number and show you how many steps were needed.

8

Maths Quest 7 for Victoria

11 An arithmagon is a triangular figure in which the two numbers at the end of each line add to the number along the line. An example is shown at right.

2 8 6

7 5

11

a Work in pairs to try and solve each of these arithmagons. i ii iii 7

8 5

13

12 9

14

iv

7

20

v 17

21

25

30

37

17

34

25

26

16

viii 29

14

vi

14

vii 30

11

21

ix 28

44

56

122

57

69

b Working in the same pairs, write a statement describing the method you used to solve the arithmagons. Compare your statement with that of other groups. c Did all groups in the class use the same method? d Write down which method of solving arithmagons you think would be the easiest.

QUEST

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1 Arrange the digits 1 to 9 (once only) in the diagram at right so that when you add the numbers horizontally, vertically and diagonally the total is the same. 2 Copy the diagram at right into your workbook and try to arrange the numbers from 1 to 7 in the circles so that the numbers in each line add to 10. 3 Each letter below stands for a digit from 0 to 9. Find the value of each letter so that the addition statement is true. BIG + JOKE = HAHA

Chapter 1 Whole numbers

Tenpin bowling In the cartoon series the Simpsons, Homer is a very keen tenpin bowler. Have you been tenpin bowling? Do you remember how to score? The method for scoring is described below. • A game consists of 10 frames. • There are 10 pins to knock down in each frame. • You bowl 2 balls in each frame unless your first is a strike — all 10 pins down with one ball. • If you get a strike in the 10th frame you are entitled to 2 bonus balls. • If you get all 10 pins down with 2 balls this is called a spare. • If you get a spare in the 10th frame you are entitled to one bonus ball. • If you don’t get all 10 pins down with 2 balls you just score the number you knocked down. • A strike scores 10 points plus the pins you get with your next 2 balls. • A spare scores 10 points plus the pins you get with your next ball. The score is totalled progressively from frame to frame. Below is a copy of one of Homer Simpson’s games. 1

2

3

63 7 1 8 9 17 34

4

5

7 2 X 43 61

6

7

6 2 7 69 89

8

X 107

9

10

X 8- 7 115 135

Frame 1: Homer knocked down 6 pins with his first ball then 3 pins with his second ball. A total of 9 points. Frame 2: Homer knocked down 7 pins with his first ball and 1 pin with his second ball. Overall total is now 9 + 7 + 1 = 17 points. Frame 3: Homer knocked down 8 pins with his first ball and the last 2 pins with his second ball. As he knocked down all 10 pins with 2 balls this is called a spare and is marked as / on the scorecard. We cannot calculate his points until he bowls his next ball. Frame 4: With his first ball, Homer knocked down 7 pins. Now we can calculate his total at the end of Frame 3 as 17 + 8 + 2 + 7 = 34 points. The second ball hits 2 pins. His total at the end of Frame 4 is 34 + 7 + 2 = 43 points. Notice that he scores the 7 points twice. Frame 5: Well done, Homer! All 10 pins down with 1 ball. For a strike, marked as X on the scorecard, we need to wait until Homer bowls the next 2 balls before we can calculate the points for Frame 5.

9

10

Maths Quest 7 for Victoria

Frame 6: Homer knocks down 6 pins then 2 pins. His total at the end of Frame 5 is 43 + 10 + 6 + 2 = 61 points. We can now calculate the score at the end of Frame 6. The score is 61 + 6 + 2 = 69 points. It is now your turn to explain the rest of Homer’s scorecard. 1. Explain what has happened and what the total score is at the end of each frame for Frames 7, 8, 9 and 10. 2. Why are there 3 boxes for recording the results in Frame 10? Below are two actual scorecard results from Moorabbin Bowl. (The symbol – means that the ball did not knock down any pins.) 1

2

3

4

5

6

7

June

63 8- 7 - 6- 7 1 6 2 X

Ron

X

1

2

8

3

X

4

5

6

8

9

8 1 5

7

8

9

8 1 8 1 7 1 9

6

7

10

-10

8

6

3. Copy June and Ron’s scorecards into your workbook and fill in the frame totals. 4. Write a sentence to explain who won the game and by how many points.

1 1 Using the digits 3, 8 and 6 once only, write all the 2 digit numbers possible. 2 Using the digits 7 and 1 (they can be used more than once), write all the 3 digit numbers possible. 3 Write the following set of numbers in ascending order: 782, 453, 87, 907, 362, 127 4 Write the following set of numbers in descending order: 3220, 68 441, 89 065, 58 732, 45 111, 7668 5 Write in words the value of the 5 in 16 521. 6 Write the value of the 2 in 12 673. 7 Find 3876 + 1034. 8 Find 65 328 + 67 + 3278. 9 On a recent holiday, members of a family were driving from Geraldton to Broome in Western Australia and split their drive into the following stages: Geraldton–Newman: 855 kilometres; Mt Whaleback–Port Hedland: 256 kilometres; Newman–Mt Whaleback: 196 kilometres; Port Hedland–Broome: 560 kilometres How far did they travel in total? 10 The Western Warriors are an Australian Rules football team and in their last game they scored the following points: first quarter 34 points second quarter 12 points third quarter 62 points final quarter 40 points Find the total number of points that the team scored for the match.

Chapter 1 Whole numbers

11

Subtracting whole numbers There are two commonly used methods of subtraction — the equal additions method and the decomposition method. You may have already learned one of these methods.

1. The equal additions method In this case, the same number is added to both of the given numbers without changing the difference between them. For example, 9 − 2 = 7. If 10 is added to both numbers the difference is still 7. 19 − 12 = 7 29 − 22 = 7 20 − 13 = 7 The subtraction 32 − 14 can be written as 32 30 + 2 − 14 or − (10 + 4)

4 can’t be subtracted from 2, so 10 is added to both numbers in the following manner: 3 12 30 + 12 − 11 4 − (20 + 4)

Now 4 can be subtracted from 12 and 20 can be subtracted from 30. 30 + 12 3 12 − 11 4 − (20 + 4) 1 8

− (10 + 8 = 18

WORKED Example 3

Find 6892 − 467 using the equal additions method. THINK 1

2 3 4 5

WRITE

Since 7 cannot be taken from 2, add 10 units to the top number (so 2 becomes 12 in the units column) and add 10 to the bottom number (so the 6 becomes 7 in the tens column). The answer will not be changed. Subtract 7 units from the 12 units (12 − 7 = 5). Subtract the tens (9 − 7 = 2). Subtract the hundreds (8 − 4 = 4). Subtract the thousands (6 − 0 = 6).

6 8 9 12 − 4 61 7 642 5

Hint: This method can also help to subtract numbers in your head more easily. So 64 − 28 can be changed to 66 − 30 and it is easy to see that the answer is 36. Two has been added to both parts of the question so that the number being taken away is a multiple of 10.

12

Maths Quest 7 for Victoria

2. The decomposition method Here the larger number is decomposed. The 10 which is added to the top number is taken from the previous column of the same number. So 32 − 14 is written as 32 30 + 2 − 14 or − (10 + 4) and becomes 2 1 32 2 2 −14

20 + 12 − (10 + 4)

Now 4 can be taken from 12 and 10 from 20 to give 18. 2 1 32 − 114 18

WORKED Example 4

Use the decomposition method to find: a 6892 − 467 b 3000 − 467. THINK

WRITE

a

Since 7 cannot be subtracted from 2, take one ten from the tens column of the larger number and add it to the units column of the same number. So the 2 becomes 12, and the 9 tens become 8 tens. Subtract the 7 units from the 12 units (12 − 7 = 5). Now subtract 6 tens from the 8 remaining tens (8 − 6 = 2). Subtract 4 hundreds from the 8 hundreds (8 − 4 = 4). Subtract 0 thousands from the 6 thousands (6 − 0 = 6).

a 6 88912 −467

Since 7 cannot be taken from 0, 0 needs to become 10. We cannot take 10 from the tens column, as it is also 0. The first column that we can take anything from is the thousands, so 3000 is decomposed to 2 thousands, 9 hundreds, 9 tens and 10 units. Now the subtraction will be straightforward. Subtract the units (10 − 7 = 3). Subtract the tens (9 − 6 = 3). Subtract the hundreds (9 − 4 = 5). Subtract the thousands (2 − 0 = 2).

b −239090100 −239496107

1

2 3 4 5

b

1 2

3 4 5 6

6425

−229593103

Chapter 1 Whole numbers

13

WORKED Example 5 Year 7 students were selling Chupa Chups to raise money for Kids with Cancer. Class 7E had 500 Chupa Chups to sell. They sold 100 on Monday, 60 on Tuesday and 32 on Wednesday. How many did they have left? THINK 1

2

3

4

WRITE

Write the number of Chupa Chups the students had to start with and subtract the number of Chupa Chups sold on Monday. Subtract the number of Chupa Chups sold on Tuesday from the number left after Monday’s sale. Subtract the number of Chupa Chups sold on Wednesday from the number left after Tuesday’s sale.

Monday

500 − 100 = 400

Tuesday

400 − 60 = 340

Write the answer in a sentence.

There were 308 Chupa Chups left.

Wednesday 340 − 32 =

33410 3 4 10 −31 2 or −3 2 308

308

remember remember 1. When subtracting small numbers the calculations can be done easily in your head. 2. When subtracting large numbers they need to be arranged in columns of the same place value.

1C

Subtracting whole numbers

1 Answer these questions without using a calculator. a 11 − 5 b 20 − 12 d 100 − 95 e 87 − 27 g 820 − 6 h 1100 − 200 j 22 000 − 11 500 k 100 − 20 − 10 m 1000 − 50 − 300 − 150 n 80 − 8 − 4 − 5 p 54 − 28 (Hint: Use the method of equal addition.) q 78 − 39 (Hint: Use the method of equal addition.)

c f i l o

53 − 30 150 − 25 1700 − 1000 75 − 25 − 15 24 − 3 − 16

Subtracting numbers

2 Answer these questions which involve adding and subtracting whole numbers. a 10 + 8 − 5 + 2 − 11 b 40 + 15 − 35 c 16 − 13 + 23 d 120 − 40 − 25 e 53 − 23 + 10 f 15 + 45 + 25 − 85 g 100 − 70 + 43 h 1000 − 400 + 250 + 150 + 150 WORKED

Example

3, 4

3 Find: a 98 − 54 d 149 − 63

b 167 − 132 e 642 803 − 58 204

Subtracting numbers

c f

47 836 − 12 713 3642 − 1811

MQ 7 Ch 01 Page 14 Thursday, June 19, 2003 8:02 AM

14

Maths Quest 7 for Victoria

g 664 − 397 h 12 900 − 8487 i 69 000 − 3561 j 406 564 − 365 892 k 2683 − 49 l 70 400 − 1003 m 64 973 − 8797 n 27 321 − 25 768 o 518 362 − 836 p 812 741 − 462 923 q 23 718 482 − 4 629 738 Check your answers using a calculator. WORKED

Example

5

4 Hayden received a box of 36 chocolates. He ate 3 on Monday, 11 on Tuesday and gave 7 away on Wednesday. How many did he have left? 5 In July 1994, a Melbourne Tigers versus South East Melbourne Magic basketball game at Flinders Park drew a record crowd of 15 129 spectators. Assuming all the spectators were supporting a team, if 7847 spectators were supporting Magic, how many were following Tigers? 6 A school bus left Laurel Secondary College with 31 students aboard. Thirteen of these passengers alighted at Hardy Railway Station. The bus collected 24 more students at Hardy Secondary College and a further 11 students disembarked at Laurel swimming pool. How many students were still on the bus? 7 Ocki wants to buy a surfboard for $389. So far he has saved $195. How much more does he need to save? 8 The most commonly spoken language in the world is Mandarin, spoken by approximately 575 000 000 people (in north and east central China). Approximately 360 000 000 people speak English and 140 000 000 Spanish. a How many more people speak Mandarin than English? b How many more people speak English than Spanish? 9 The photographs show 3 of the largest waterfalls in the world. Iguazu Falls (Brazil)

56 metres high

108 metres high

Niagara Falls (Canada)

82 metres high

How much higher are the: a Victoria Falls than the Iguazu Falls? Victoria Falls (Zimbabwe) b Iguazu Falls than the Niagara Falls? c Victoria Falls than the Niagara Falls?

Chapter 1 Whole numbers

15

10 In the 2000 Australian Open Tennis Tournament, the prize money for the winner of the Men’s Singles was $755 000 and the runner up received $377 500. The winner of the Women’s Singles received $717 000 and the runner up $358 500. a What was the difference in prize money for the winner of the men’s and women’s singles competition? b How much more did the male winner receive than the male runner-up? c How much more did the female winner receive than the female runner-up? In 1998, the prize money for the Men’s Singles winner was $615 000 and for the Women’s Singles winner was $572 000. d Write a sentence comparing the prize money offered in 2000 with the prize money offered in 1998 for both male and female winners. Who received the bigger increase? Can you think of a reason for this? Sydney

nc es 34 High 7k wa m y

Narooma

Pri

Hu

m e 86 Hig 7 k hw m ay

11 Lucy and Ty were driving from Melbourne to Sydney for a holiday. The distance via the Hume Highway is 867 kilometres, but they chose the more scenic Princes Highway even though the distance is 1039 kilometres. They drove to Lakes Entrance the first day (339 kilometres), a further 347 kilometres to Narooma on the second day and arrived in Sydney on the third day. a How much further is Melbourne to Sydney 339 km via the Princes Highway than via the Melbourne Hume Highway? b How far did Lucy and Ty travel on the third day?

Lakes Entrance

12 The following table shows how many medals Australia has won at each Olympic Games from the 1956 Melbourne Olympics to the 1996 Atlanta Olympics. Copy and complete the table by filling in the missing numbers.

Year

Location of Olympic Games

1996

Medals won by Australia Gold

Silver

Atlanta, U.S.A.

9

9

1992

Barcelona, Spain

7

9

1988

Seoul, South Korea

3

1984

Los Angeles, U.S.A.

1980

Moscow, U.S.S.R.

1976

Montreal, Canada

1972

Munich, Germany

1968

Mexico City, Mexico

1964

Tokyo, Japan

1960

Rome, Italy

1956

Melbourne, Australia

8 2

Bronze

Total 41

11 5

14

12

24

2

9

1

4

8

7

2

5

7

5

2

10

18

6

22

8 13

8

14

5

16

Maths Quest 7 for Victoria

13 A lift can carry a maximum of only 20 people or a combined mass of 1360 kilograms.

a If the crowded lift already contains a mass of 1156 kilograms, list the possible number of people (and their masses) that could enter the lift from the information supplied in the photograph at right. b If the lift already contains 18 people, list the possible number of people (and their masses) that could now enter the lift. What available mass is left over in each case? c Which combination of people, in terms of numbers and masses, would you allow in the lift? Give a reason for your answer.

GAM

me E ti

79 kg

60 kg 82 kg

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Whole numbers 01

65 kg

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1 Can you fill in the blanks? The * can represent any digit. a 6*8 *2* b 3*9* − 488 417 − *6*5 *49 9*4

1*07

2 Without using a calculator, and in less than 10 seconds, find the answer to 6 849 317 − 999 999. 3 A beetle has fallen into a hole that is 15 metres deep. It is able to climb a distance of 3 metres during the day but at night the beetle is tired and must rest. However, during the night it slides back 1 metre. How many days will it take the beetle to reach the top of the hole to freedom?

Chapter 1 Whole numbers

17

Roman numerals Numbers can also be expressed using Roman numerals. You may have seen them used on clock or watch faces or at the end of the credits of a film. Can you think of other places you have seen them used? The Roman numerals for 1 to 10 are: I II III IV V VI VII VIII IX X where I stands for 1, V stands for 5 and X stands for 10. 1. What happens when I is just before V in the number? 2. What happens when I is just after V in the number? 3. What happens when I is just before X in the number? 4. What would you expect to happen if I is straight after X in the number? 5. Write the Roman numerals for 11 to 20 using I, V and X. 6. What numbers are represented by the following Roman numerals: (a) XXV? (b) XXXIV? 7. Write the Roman numerals for the following numbers: (a) 26 (b) 39. L which stands for 50 C which stands for 100 D which stands for 500 M which stands for 1000. 8. What numbers are represented by the following Roman numerals? (a) LV (b) XL (c) CC (d) DC (e) CM (f) XLII (g) LXXIV (h) MDCCCXXIII 9. Write the Roman numerals for the following numbers. (a) 356 (b) 1650 (c) 94 (e) 2243 (f) 931 (g) 428

(d) 179 (h) 1085

10. What time is indicated on the clock face shown? 11. In the credits at the end of a film the date of the production is often shown in Roman numerals. For the following films, state what year each film was produced. (a) The Princess Bride MCMLXXXVII (b) Titanic MCMXCVII (c) ET MCMLXXXII (d) Snow White and the Seven Dwarfs MCMXXXVII 12. If the production of a film is completed this year, write the date that would appear in the credits in Roman numerals.

18

Maths Quest 7 for Victoria

Multiplying whole numbers Short multiplication Short multiplication can be used when multiplying a large number by a single digit number.

WORKED Example 6

Calculate 1456 × 5. THINK 1 2

3

4

WRITE

2 2 3 1456 Multiply the units (5 × 6 = 30). Write the 0 and carry the 3 × 5 to the tens column. Multiply the tens digit of the question by 5 and add the 7280 carried number (5 × 5 + 3 = 28). Write the 8 in the tens column and carry the 2 to the hundreds column. Multiply the hundreds digit by 5 and add the carried number (5 × 4 + 2 = 22). Write the last 2 in the hundreds column and carry the other 2 to the thousands column. Multiply the thousands digit by 5 and add the carried number (5 × 1 + 2 = 7). Write 7 in the thousands column of the answer.

Long multiplication We use long multiplication to multiply larger numbers. The process is the same as in short multiplication, but repeated for each digit. Remember to add the extra zero when multiplying by each new digit (1 zero when multiplying by the ‘tens’ digit, 2 zeros for the ‘hundreds’ digit etc.).

WORKED Example 7

Calculate 1456 × 132 using long multiplication. THINK 1

2

3

4

Multiply the first number by 2 using short multiplication (1456 × 2 = 2912). Write the answer directly below the question as shown. Put a zero in the units column when multiplying 1456 by the tens digit; that is, when multiplying 1456 by 3. This is because we are really working out 1456 × 30 = 43 680. Write the answer directly below the previous answer as shown. Put zeros in the units and tens columns when multiplying 1456 by the hundreds digit; that is, when multiplying 1 456 by 1. This is because we are really working out 1456 × 100 = 145 600. Write the answer directly below the previous answer as shown. Add the rows.

WRITE 1456 × 132 2 912 43 680 145 600 192 192

Chapter 1 Whole numbers

Graphics Calculator tip!

19

Multiplying numbers

To multiply numbers using a graphics calculator, enter the calculation in the same order that it is written. Remember to press ENTER to obtain the answer. Notice that the multiplication sign × is shown as ✶ on the screen. For the calculation in worked example 7, the following screen would be obtained.

Multiplying numbers that are multiples of ten When multiplying numbers that are multiples of ten, you can simply multiply the digits, disregarding the zeros and then add the zeros to your answer.

WORKED Example 8

Find 9000 × 600. THINK 1 2

Write the question. The question contains five zeros. Disregarding the zeros, the question becomes 9 × 6 = 54. Write the answer with the five zeros.

WRITE 9000 × 600 = 5 400 000

WORKED Example 9 Naomi wants to ring a friend who lives in Israel. The call will cost her $2 per minute. If Naomi speaks to her friend for 19 minutes: a what will the call cost? b what would Naomi pay if she made this call every month for a year? THINK

WRITE

a

Write down the cost for 1 minute. For the total cost, multiply the cost of 1 minute by the number of minutes. Write the answer in a sentence.

a 1 minute costs $2. 19 minutes cost $2 × 19 = $38

Consider how many months there are in a year so the number of calls made can be found. For the total cost, multiply the cost of a 19 minute phone call by the number of times the call will be made. Write the answer in a sentence.

b There are 12 months in a year, so there will be 12 phone calls.

1 2 3

b

1

2

3

The total cost is $38.

Total cost is $38 × 12 = $456.

It would cost $456 to make a 19 minute phone call every month for a year.

20

Maths Quest 7 for Victoria

remember remember 1. When multiplying a large number by a single digit number, use short multiplication; for example 1357 × 6. Short multiplication can also be used when multiplying by 11 or by 12. 2. When multiplying a large number by a number with more than 1 digit, use long multiplication; for example 25 427 × 24. 3. When using long multiplication add 1 zero when multiplying by the tens digit, 2 zeros when multiplying by the hundreds digit and so on. 4. When multiplying numbers that are multiples of 10, disregard the zeros, perform the multiplication, and then add the total number of zeros to your answer.

1D

Multiplying numbers

Multiplying whole numbers

1 Write the answer to each of the following without using a calculator. a 4×3 b 9×5 c 2 × 11 d 8×7 e 12 × 8 f 10 × 11 g 6×9 h 12 × 11 i 9×8

Multiplying numbers

2 Multiply the following without using a calculator. a 13 × 2 b 15 × 3 d 3 × 13 e 25 × 4 g 16 × 2 h 35 × 2 j 21 × 3 k 54 × 2 m 3×4×6 n 2×5×9 p 5×6×3 q 5×4×5

Tangle tables

Tables WORKED

Example

6

1.2

WORKED

Example

7

WORKED

Example

8

c f i l o r

25 × 2 45 × 2 14 × 3 25 × 3 3×3×3 8×5×2

3 Calculate these using short multiplication. a 16 × 8 b 29 × 4 d 857 × 3 e 4920 × 5 g 7888 × 8 h 472 × 4 j 10 597 × 6 k 34 005 × 11 Check your answers using a calculator.

c f i l

137 × 9 15 984 × 7 2015 × 8 41 060 × 12

4 Calculate these using long multiplication. a 52 × 44 b 97 × 31 d 16 × 57 e 173 × 41 g 407 × 53 h 47 × 2074 j 19 × 256 340 k 57 835 × 476 Check your answers using a calculator.

c f i l

59 × 28 850 × 76 80 055 × 27 8027 × 215

c f i l

600 × 800 1100 × 5000 800 × 7000 12 000 × 1100

5 Find each of the following. a 200 × 40 d 90 × 80 g 900 000 × 7 000 j 9000 × 6000

b e h k

30 × 700 120 × 400 120 000 × 1200 4000 × 110

Chapter 1 Whole numbers

WORKED

Example

9

21

6 John wants to make a telephone call to his friend Rachel who lives in San Francisco. The call will cost him $3 per minute. If John speaks to Rachel for 24 minutes: a what will the call cost? b what would John pay if he made this call every month for 2 years? 7 Chris is buying some generators. The generators cost $12 000 each and she needs 11 of them. How much will they cost her? 8 Jason is saving money to buy a camera. He is able to save $75 each month. a How much will he save after 9 months? b How much will he save over 16 months? c If Jason continued to save at the same rate, how much will he save over a period of 3 years? 9 A car can travel 14 kilometres using 1 litre of fuel. How far could it travel with 35 litres? 10 As Todd was soaking in the bath, he was contemplating how much water was in the bath. If Todd used 85 litres of water each time he bathed and had a bath every week: a how much bath water would Todd use in 1 year? b how much would he use over a period of 5 years? 11 A team of British soldiers at Hameln, Germany constructed the fastest bridge ever built, in 1995. The bridge spanned an 8 metre gap and it took the soldiers 8 minutes and 44 seconds to build it. How many seconds did it take them to build it? 12 You are helping your Dad build a fence around your new swimming pool. He estimates that each metre of fence will take 2 hours and cost $65 to build. a How long will it take you and your Dad to build a 17 metre fence? b How much will it cost to build a 17 metre fence? c How much would it cost for a 29 metre fence? 13 Narissa does a paper round each morning before school. She travels 2 kilometres each morning on her bicycle, delivers 80 papers and gets paid $35. She does her round each weekday. a How far does she travel in 1 week? b How much does she get paid in 1 week? c How far does she travel in 12 weeks? d How much would she be paid over 52 weeks? e How many papers would she deliver in 1 week? f How many papers would she deliver in 52 weeks?

QUEST

GE

S

Maths Quest 7 for Victoria

EN

MAT H

22

CH

AL

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1 In AFL football, a goal scores 6 points and a behind scores 1 point. Find a score which is the same as the product of the number of goals and the number of behinds. For example, 2 goals 12 behinds = 2 × 6 + 12 = 24 points. Also 2 × 12 = 24. Find two other similar results. 2 a Consider numbers with 2 identical digits multiplied by 99. Work out each of the following. 11 × 99 = 22 × 99 = 33 × 99 = Can you see a pattern? Without using long multiplication or a calculator, write down the answers to 44 × 99, 55 × 99, 66 × 99, 77 × 99, 88 × 99 and 99 × 99. b Try it again but this time multiply numbers with 3 identical digits by 99. Use only long multiplication or a calculator with the first 3 calculations. Look for a pattern and then write down the answers to the remaining multiplications. c What about numbers with 4 or 5 identical digits which are multiplied by 99? Try these as well.

Addition pairs Can you add all the numbers from 1 to 100 in less than 20 seconds? Even entering all numbers into a calculator would take you longer. But it can be done! First let’s try a simpler problem like adding all numbers from 1 to 6. 1+2+3+4+5+6

If we pair them up, we have 3 pairs where each pair adds to 7. So the total would be 7 × 3 = 21. Check to see if this is correct. Next try adding all numbers from 1 to 10. 1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10

Each pair adds to 11 and there are 5 pairs so the total is 11 × 5 = 55. 1. Now use addition pairs to add all numbers: (a) from 1 to 20 (b) from 1 to 50 (c) from 1 to 86. 2. Add all numbers from 1 to 100 in less than 20 seconds. 3. Can you add all numbers from 1 to 1000 in less than 20 seconds? Try it.

Chapter 1 Whole numbers

23

So far we have had an even quantity of numbers to add so we were able to pair each number. What about adding all numbers from 1 to 201? Again, first try a simpler problem like adding all numbers from 1 to 7. 1+2+3+4+5+6+7

We can pair all numbers except the last number. So there are 3 pairs which add to 7 plus an additional 7. The total is 7 × 3 + 7 = 28. 4. Add all numbers: (a) from 1 to 15 (b) from 1 to 33 (c) from 1 to 67. 5. Add all numbers from 1 to 201. 6. Add all numbers from 1 to 1025. 7. Make up 5 more addition problems. Have a race with a partner to see who can add them up the quickest.

Dividing whole numbers Short division We can use short division when dividing by numbers up to 12.

WORKED Example 10

Calculate 89 657 ÷ 8. THINK 1

2

3

4

5 6

WRITE

Divide 8 into the first digit and carry the remainder to the next digit. 8 goes into 8 once. Write 1 above the 8 as shown. There is no remainder. Divide 8 into the second digit and carry the remainder to the next digit. 8 goes into 9 once with 1 left over. Write 1 above the 6 and carry 1 to the hundreds column. Divide 8 into the third digit and carry the remainder to the next digit. 8 goes into 16 twice with no remainder. Write 2 above the 6 as shown. Divide 8 into the fourth digit and carry the remainder to the next digit. 8 doesn’t go into 5. Write the 0 above the 5. Carry 5 to the next digit. Divide 8 into 57 and write the remainder as shown. 8 goes into 57 seven times with 1 remainder. Write the answer.

1 1 2 0 7 Rem 1 8 ) 8 916 557

89 657 ÷ 8 = 11 207 remainder 1

Long division Long division is used when the divisor is larger than 12. It involves the same process as short division, but all working is shown. The divisor is the number that you are dividing by.

24

Maths Quest 7 for Victoria

WORKED Example 11

Use long division to calculate 356 ÷ 15. THINK 1 2 3 4

WRITE

Divide 15 into the first digit. If it doesn’t go write 0 above the first digit. Divide 15 into the first two digits. 15 goes into 35 twice. Write the 2 above the second digit. Multiply (15 × 2 = 30). Write 30 below the first two digits. Subtract 30 from 35. The answer is the 5 remaining from the division in step 2.

5

Bring down the third digit; that is, bring down the 6. The process is repeated.

6

7

Divide 15 into the last number which is 56. 15 goes into 56 three times. Multiply (15 × 3 = 45) and write the 3 above the third digit and 45 below 56. Subtract 45 from 56 as shown.

8

Write the answer.

02 15 ) 356

02 15 ) 356 −30 5 02 15 )356 −30 56 023 15 )356 −30 56 −45 11 356 ÷ 15 = 23 remainder 11

For larger numbers the process is repeated until the problem is completed.

Graphics Calculator tip!

Dividing numbers

To divide numbers using a graphics calculator, enter the calculation in the same order that it is written. Remember to press ENTER to obtain the answer. Notice that the division sign ÷ is shown as / on the screen. For the calculation 875 ÷ 25, the following screen would be obtained.

Dividing numbers that are multiples of ten

WORKED Example 12

Calculate 48 000 ÷ 600. THINK 1 Write the question. 2

Write the question as a fraction.

WRITE 48 000 ÷ 600 48 000 ---------------600

Chapter 1 Whole numbers

THINK

WRITE

4

Cancel as many zeros as possible, crossing off the same number in both numerator and denominator. Perform the division.

5

Write your answer.

3

25

480 --------6 080 6) 480 48 000 ÷ 600 = 80

remember remember 1. Use short division when dividing by numbers up to 12 (or higher, if you know the tables for it, for example 13, 15, 20). 2. Use long division when you are dividing by a number larger than 12. Repeat the same process — divide, multiply, subtract, bring down. 3. When dividing numbers that are multiples of 10, write the question as a fraction, cancel as many zeros as possible and then divide.

1E

Dividing whole numbers

1 Evaluate these divisions without using a calculator. There should be no remainder. a 24 ÷ 6 b 24 ÷ 8 c 36 ÷ 9 d 72 ÷ 8 e 49 ÷ 7 f 96 ÷ 12 g 108 ÷ 9 h 56 ÷ 7 i 16 ÷ 4 j 28 ÷ 7 k 40 ÷ 2 l 26 ÷ 2 m 45 ÷ 15 n 32 ÷ 16 o 27 ÷ 3 ÷ 3 p 96 ÷ 8 ÷ 6 q 48 ÷ 12 ÷ 2 r 72 ÷ 2 ÷ 9 s 56 ÷ 7 ÷ 4 t 100 ÷ 2 ÷ 10 u 90 ÷ 3 ÷ 2 2 Perform these calculations which involve a combination of multiplication and Dividing division. Always work from left to right. numbers a 4×5÷2 b 9 × 8 ÷ 12 c 80 ÷ 10 × 7 d 45 ÷ 9 × 7 e 144 ÷ 12 × 7 f 120 ÷ 10 × 5 g 4 × 9 ÷ 12 h 121 ÷ 11 × 4 i 81 ÷ 9 × 6 WORKED

Example

10

WORKED

Example

11

3 Calculate each of the following using short division. a 3 ) 1455 b 4 ) 27 768 c 7 ) 43 456 ) ) e 11 30 371 f 8 640 360 g 3 ) 255 194 i 12 ) 103 717 j 7 ) 6 328 530 k 5 ) 465 777 Check your answers using a calculator. 4 Calculate each of these using long division. a 16 ) 4144 b 21 ) 20 328 ) d 32 214 496 e 43 ) 26 703 g 18 ) 11 557 h 24 ) 725 916 Check your answers using a calculator.

d 9 ) 515 871 h 6 ) 516 285 l 8 ) 480 594

c f i

25 ) 2 075 375 13 ) 27 989 14 ) 75 383

Dividing numbers

Four operations (DIY)

1.3

26

Maths Quest 7 for Victoria

WORKED

Example

12

5 Divide these numbers which are multiples of ten. a 4200 ÷ 6 b 700 ÷ 70 d 720 000 ÷ 800 e 8100 ÷ 900 g 600 000 ÷ 120 h 560 ÷ 80

c f i

210 ÷ 30 4 000 000 ÷ 8000 880 000 ÷ 1100

6 Spiro travels 140 kilometres per week travelling to and from work. If Spiro works 5 days per week: a how far does he travel each day? b what distance is his work from home? 7 Kelly works part time at the local pet shop. Last year she earned $2496. a How much did Kelly earn each month? b How much did Kelly earn each week? 8 David makes kites from a special lightweight fabric. An Australian company is able to supply this fabric but only in rolls of 50 metres. It is worth buying this roll only if he can make more than 18 kites from 1 roll. He needs to decide whether he should order from this company.

Each kite requires 250 cm of fabric from a roll.

a How many centimetres of fabric are in a roll if there are 100 centimetres in 1 metre? b How many kites could he make with the fabric from one roll? c Will he order fabric from this company? 9 At the milk processing plant, the engineer asked Farid how many cows he had to milk each day. Farid said he milked 192 cows because he obtained 1674 litres of milk each day and each cow produced 9 litres. Does Farid really milk 192 cows each day? If not, calculate how many cows he does milk. 10 When Juan caters for a celebration such as a party or wedding he fills out a form for the client to confirm the arrangements. Juan has been called to answer the telephone so it has been left to you to fill in the missing details. Copy and complete the planning form on the next page.

27

Chapter 1 Whole numbers

Juan’s catering service Celebration type

Wedding

Number of guests

152

Number of people per table

8

Number of tables required Number of courses for each guest

4

Total number of courses to be served Number of courses each waiter can serve

80

Number of waiters required Charge per guest

$55

Total charge for catering 11 Janet is a land developer and has bought 10 450 square metres of land. She intends to subdivide the land into 11 separate blocks. a How many square metres will each block be? b If she sells each block for $72 250, how much will she receive for the subdivided land? 12 Shea has booked a beach house for a week over the summer period for a group of 12 friends. The house costs $1344 for the week. If all 12 people stayed for 7 nights, how much will the house cost each person per night?

GAME time

QUEST

GE

S

EN

M AT H

13 Mario is a farmer who has to shear 4750 sheep. Whole a If each sheep produces 5 kilograms of wool, how much wool will Mario have to numbers 02 sell? b If Mario packs 250 kilograms of wool into each bale, how many bales will he 1.2 have? c If he sells the wool for $4 per kilogram, how much money will Mario receive for the wool?

CH

AL

L

1 What is the smallest number of pebbles greater than 10 for which grouping them in heaps of 7 leaves 1 extra and grouping them in heaps of 5 leaves 3 extra? 2 Choose a digit from 2 to 9. Write it 6 times. For example, if 4 is chosen the number is 444 444. Divide the 6 digit number by 33. Next divide the result by 37 and finally divide this last result by 91. What is the final result? Try this again with another 6 digit number formed as before. (Divide by 33, then 37, then 91.) What is your final result in this case? Try to explain how this works.

28

Maths Quest 7 for Victoria

2 1 Calculate 874 − 732. 2 Calculate 123 654 − 107 555. 3 There were 56 781 people in attendance at a recent St Kilda versus Essendon football match. If each person was supporting one of the teams and there were 30 982 St Kilda supporters, how many people were barracking for Essendon? 4 Calculate 34 761 × 7. 5 Calculate 89 428 × 62. 6 Calculate 148 673 × 364. 7 At the local primary school each student is given 200 millilitres of milk to drink each day. If there are 524 students in the school, how many millilitres of milk are required each day? 8 Calculate 345 ÷ 5. 9 Calculate 83 472 ÷ 18. 10 A youth group are having a pizza night. If they order 12 pizzas which are each cut into 8 pieces and there are 15 people attending the night, how many pieces would each person get? Would there be any slices of pizza left over?

Order of operations Five-year-old Lois had been told by her mother to put her knickers on first and then her tights. This was a convention that everybody followed and Lois did as she was told. Everybody understood that this was the correct order in which to dress. Everybody but her hero Super Dan . . .

In mathematics, conventions are also followed. Tran and Liz discovered that they had different answers to the same question. The question was 6 + 6 ÷ 3. Tran thought the answer was 8, but Liz thought it was 4. Who do you think is right?

Chapter 1 Whole numbers

29

There is a set order in which mathematicians calculate problems. The order is: 1. brackets 2. multiplication and division (from left to right) 3. addition and subtraction (from left to right).

WORKED Example 13

Calculate 6 + 12 ÷ 4. THINK 1 2 3

WRITE

Write the question. Perform the division before the addition. Calculate the answer.

6 + 12 ÷ 4 =6+3 =9

WORKED Example 14

Calculate 12 ÷ 2 + 4 × (4 + 6). THINK 1 2 3 4

WRITE

Write the question. Remove the brackets by working out the addition inside. Perform the division and multiplication next, working from left to right. Complete the addition last.

Graphics Calculator tip!

12 ÷ 2 + 4 × (4 + 6) = 12 ÷ 2 + 4 × 10 = 6 + 40 = 46

Order of operations

A graphics calculator will automatically calculate the answer using the correct order of operations. You need to enter the numbers and operations as they are written from left to right and then press ENTER to obtain the answer. Also include brackets if required. Notice that the multiplication sign × is shown as ✶ and the division sign ÷ is shown as / on the screen. For the calculation in worked example 14, the following screen would be obtained.

remember remember 1. The operations inside brackets are always calculated first. 2. If there is more than one set of brackets, calculate the operations inside the innermost brackets first. 3. Multiplication and division operations are calculated in the order that they appear. 4. Addition and subtraction operations are calculated in the order that they appear.

30

Maths Quest 7 for Victoria

1F

Order of operations

1 Was Tran or Liz correct in finding the answer to 6 + 6 ÷ 3?

3 Insert one set of brackets in the appropriate place to make these statements true. a 12 − 8 ÷ 4 = 1 b 4 + 8 × 5 − 4 × 5 = 40 c 3 + 4 × 9 − 3 = 27 d 3 × 10 − 2 ÷ 4 + 4 = 10 e 12 × 4 + 2 − 12 = 60 f 17 − 8 × 2 + 6 × 11 − 5 = 37 g 10 ÷ 5 + 5 × 9 × 9 = 81 h 18 − 3 × 3 ÷ 5 = 9 4 multiple choice 20 − 6 × 3 + 28 ÷ 7 is equal to: A 46 B 10

C 6

D 4

E 2

5 multiple choice The two signs marked with * in the equation 7 * 2 * 4 − 3 = 12 are: A −,+ B ×,+ C −,÷ D +,× E ×,÷ 6 Insert brackets if necessary to make each statement true. a 6 + 2 × 4 − 3 × 2 = 10 b 6 + 2 × 4 − 3 × 2 = 26 c 6 + 2 × 4 − 3 × 2 = 16 d 6+2×4−3×2=8

S

QUEST

GE

The four operations

Example

EN

Order of operations

2 Calculate each of these, following the order of operations rules. a 3+4÷2 b 8 + 1 × 12 13, 14 c 24 ÷ (12 − 4) d 15 × (17 − 15) e 11 + 6 × 8 f 30 − 45 ÷ 9 g 56 ÷ (7 + 1) h 12 × (20 − 12) i 3 × 4 + 23 − 10 − 5 × 2 j 42 ÷ 7 × 8 − 8 × 3 k 10 + 40 ÷ 5 + 14 l 81 ÷ 9 + 108 ÷ 12 m 16 + 12 ÷ 2 × 10 n (18 − 15) ÷ 3 × 27 o 4 + (6 + 3 × 9) − 11 p 52 ÷ 13 + 75 ÷ 25 q (12 − 3) × 8 ÷ 6 r 88 ÷ (24 − 13) × 12 s (4 + 5) × (20 − 14) ÷ 2 t (7 + 5) − (10 + 2) u {[(16 + 4) ÷ 4] − 2} × 6 v 60 ÷ {[(12 − 3) × 2] + 2}

WORKED

M AT H

1.4

CH

AL

L

1 What number am I? I am a whole number between 10 and 99. The sum of my digits is 8. My units digit is 3 times my tens digit. 2 Use each of the digits 1, 2, 3, 4, 5, 6, 7, 8 and 9 once only to create an addition problem with the total ninety-nine thousand, nine hundred and ninety-nine. 3 Use any one of the numbers from 1 to 10 any number of times and any mathematical symbols to make an expression equal to 7. For example, (5 + 5) ÷ 5 + 5 = 7. See how many different symbols you can use.

31 What’s special about the speed 370 km/h? The letter beside each question and its Chapter 1 Whole numbers

answer gives the puzzle solution code.

A

7+6÷2 =

+8+9 W 12 =

A

30 x 20 – 520 =

N

8 – 18 ÷ 6 + 10 =

C

15 – 9 + 6 =

A

47 – 12 – 4 =

D

79 ÷ 1 + 8 =

S

69 – 13 + 8 =

D

8x7+5 =

D

6 x 12 + 18 =

E

12 x 2 x 3 =

T

5 + 20 ÷ 2 x 3 =

E

2+9x4 =

E

75 ÷ 5 + 7 =

H

19 – 8 ÷ 4 =

E

8 + 21 ÷ 7 – 9 =

G

3x4x5 =

G

5x6x7 =

I

71 – 52 + 8 =

H

12 x 11 – 33 =

H

15 + 21 – 6 =

H

120 – 40 – 10 =

N

8x9x0 =

I

200 ÷ 5 + 15 =

I

8÷2+2 =

I

45 ÷ 5 + 7 =

R

80 ÷ 4 ÷ 5 =

S

1 + 16 x 7 x 0 =

8 + 37 – 3 =

S

42 ÷ 6 + 6 =

T

13 + 7 x 7 =

90 ÷ 18 + 3 =

E

8 + 17 + 9 – 1 =

÷5x2 M M 100 =

N

7 x 9 + 12 =

N

128 – 48 x 2 =

T

O

63 – 18 ÷ 2 =

O

5 + 38 + 16 =

x 2 – 12 H W 54 =

11 x 3 + 6 =

P

90 – 20 + 15 =

P

72 – 13 + 6 =

A

3+7x9 =

I

48 ÷ 8 + 5 =

R

10 + 20 x 2 =

R

82 ÷ 2 + 2 =

+ 16 x 2 D 15 =

S

34 x 2 + 6 =

S

63 ÷ 9 x 7 =

S 8= x 12 ÷ 4

E

18 ÷ 9 + 5 =

T

15 x 5 + 14 =

T

20 x 5 – 14 =

T

H

5 + 8 – 7 + 14 =

E

6x8÷4–9 =

U

400 ÷ 20 ÷ 4 =

÷ 5 + 18 W 250 =

I

73 x 1 ÷ 1 =

E

14 ÷ 2 ÷ 7 + 8 =

16

8

29 73

6

24

13 x 4 – 4 =

35 17

0 61 64 85

.

80 86 42 48 68

7

10

22 39 27 60 20

2 47 4

1

30

33 49 62

9 12 54 43 87 3 90

11



15 210 89 59 75



32 72 96 70 66 40 65 74 99 55 50 38

5

13 31

32

Maths Quest 7 for Victoria

Estimation How would listeners react if a football commentator announced that there were 58 271 people sitting in the stands at the MCG waiting for the match to begin? Does anyone care? It is more usual to hear that there are 58 000 or 60 000 spectators as it is often not necessary to know the exact number of people or things. An estimate is enough, so the nearest rounded number is used. An estimation is not the same as a guess because it is based on information. For example, we may know how many people are able to fit into the football ground and the approximate percentage of seats filled. We can use this information to produce our estimate. Estimation is also useful when we are working with calculators. By mentally estimating an approximate answer, we increase our chances of noticing if we have pressed a wrong button on the calculator. To estimate the answer to a mathematical problem, round the numbers to the first digit and find an approximate answer. This can be done in your head and used to check your calculations. If the exact answer is not required, then this estimate can be calculated with very little effort.

Rounding If the second digit is 0, 1, 2, 3 or 4, the first digit stays the same. If the second digit is 5, 6, 7, 8 or 9, the first digit is rounded up. Therefore: 6512 would be rounded to 7000 as it is actually closer to 7000 6397 would be rounded to 6000 as it is actually closer to 6000 6500 would be rounded to 7000. It is exactly halfway between 6000 and 7000. So to avoid confusion, if it is halfway (if the second digit is 5) the number is rounded up. Estimations can be made when multiplying, dividing, adding or subtracting. They can also be used when there is more than one operation in the same question.

WORKED Example 15

Estimate 48 921 × 823. THINK 1 2 3

WRITE

Write the question. Round each part of the question to the first digit. Multiply.

48 921 × 823 ≈ 50 000 × 800 = 40 000 000

The actual answer is 40 261 983 which is higher than the estimation. 48 921 has been rounded up by roughly 1000 to reach the approximation of 50 000 and 823 has been rounded down by 23 to 800. We are rounding up quite a lot more than we are rounding down. This estimate is accurate enough when an exact answer is not needed.

Chapter 1 Whole numbers

33

remember remember 1. An estimation can be used when the exact answer is not required. 2. An estimation can be used to check a calculation. 3. A useful estimation can be made by rounding each number to the first digit and then performing the appropriate calculation. 4. If the second digit is 0, 1, 2, 3 or 4, the first digit stays the same. If the second digit is 5, 6, 7, 8 or 9, the first digit is increased by 1 or rounded up.

1G WORKED

Example

Estimation

1 Estimate 67 451 × 432. Estimation

15

2 Copy and complete the following table by rounding the numbers to the first digit. The first row has been completed as an example. In the column headed ‘Prediction’, guess whether the actual answer will be higher or lower than your estimation. Then use a calculator to work out the actual answer and record it in the final column titled ‘Calculation’ to determine whether it was higher or lower than your estimate. Is the actual answer higher or lower than the estimate? Estimate

Example 4129 ÷ 246 a

487 + 962

b

33 041 + 82 629

c

184 029 + 723 419

d

1127 + 6302

e

29 + 83

f

55 954 + 48 312

g

93 261 − 37 381

h

321 − 194

Estimated answer

4000 ÷ 200 20

Prediction

lower

Calculation

16.784 553 so lower

(continued)

The four operations

34

Maths Quest 7 for Victoria

Is the actual answer higher or lower than the estimate? Estimate

i

468 011 − 171 962

j

942 637 − 389 517

k

64 064 − 19 382

l

89 830 − 38 942

m

36 × 198

n

8631 × 9

o

87 × 432

p

623 × 12 671

q

29 486 × 39

r

222 × 60

s

31 690 ÷ 963

t

63 003 ÷ 2590

u

867 910 ÷ 3300

v

8426 ÷ 3671

w

69 241 ÷ 1297

x

37 009 ÷ 180

Estimated answer

Prediction

Calculation

3 multiple choice a The best estimate of 4372 + 2587 is: A 1000 B 5527 C 6000 b The best estimate of 672 × 54 is: A 728 B 30 000 C 35 000 c The best estimate of 67 843 ÷ 365 is: A 150 B 175 C 200 4 Estimate the answers to each of these. a 5961 + 1768 b 432 − 192 d 9701 × 37 e 98 631 + 608 897 g 11 890 − 3642 h 83 481 ÷ 1751 j 66 501 ÷ 738 k 392 × 113 486

D 7000

E 7459

D 36 000

E 42 000

D 230

E 250

c f i l

48 022 ÷ 538 6501 + 3790 112 000 × 83 12 476 ÷ 24

Chapter 1 Whole numbers

35

5 Su-Lin was using her calculator to answer some mathematical questions, but found she obtained a different answer each time she performed the same calculation. Using your estimation skills, predict which of Su-Lin’s answers is most likely to be correct. a 217 × 489 i 706 ii 106 113 iii 13 203 iv 19 313 b 89 344 ÷ 256 i 39 ii 1595 iii 89 088 iv 349 c 78 × 6703 i 522 834 ii 52 260 iii 6781 iv 56 732 501 d 53 669 ÷ 451 i 10 ii 1076 iii 53 218 iv 119 6 Julian is selling tickets for his school’s theatre production. So far he has sold 439 tickets for Thursday night’s performance, 529 for Friday’s and 587 for Saturday’s. The cost of the tickets is $9.80 for adults and $4.90 for students. a Round the figures to the first digit to estimate the number of tickets Julian has sold so far. b If approximately half the tickets sold were adult tickets and the other half were student tickets, estimate how much money has been received so far by rounding the cost of the tickets to the first digit. 7 During the show’s intermission, Jia is planning to run a stall selling hamburgers to raise money for the school. She has priced the items she needs and made a list in order to estimate her expenses. a By rounding the item price to the first digit, use the table below to estimate how much each item will cost Jia for the quantity she requires.

Item

Item price

Quantity required

Bread rolls

$2.90/dozen

25 packets of 12

Hamburgers

$2.40/dozen

25 packets of 12

Tomato sauce

$1.80/litre

2 litres

Margarine

$2.20/tub

2 tubs

Onions

$1.85/kilogram

2 kilograms

Tomatoes

$3.50/kilogram

2 kilograms

Lettuce

$1.10 each

5 lettuces

Estimated cost

b Estimate what Jia’s total shopping bill will be. c If Jia sells 300 hamburgers over the 3 nights for $2 each, how much money will she receive for the hamburgers? d Approximately how much money will Jia raise through selling hamburgers over the 3 nights?

1.3

36

Maths Quest 7 for Victoria

Estimating Estimating skills can be used to work out large totals that would be impractical to count separately. An estimate is not a guess, it is based on information. 1. Look at the photograph below. Can you estimate how many chocolate chips are shown?

The following steps will guide you in solving this problem. (a) Lightly draw a grid in pencil over the photograph. We need to divide the photograph into equal-sized sections. (You may like to draw lines which make sections that are squares of side length 2 centimetres.)

Chapter 1 Whole numbers

37

(b) How many equal-sized sections do you have? (c) Select one section and count the number of chocolate chips in this section. (d) What calculation needs to be performed to work out the number of chocolate chips in all the sections? (e) Perform the calculation and write out your answer to this problem in a sentence. 2. Repeat this estimating process for the following photograph. Estimate the number of people waving in this crowd. Compare this method with that which you used to calculate the number of people in the crowd in the photograph on page 1. .

3. Estimate the number of people shown in the photograph below. If the stadium holds 12 times this amount, estimate the total capacity of the stadium. Show all your working and write a sentence explaining how you solved this problem.

38

Maths Quest 7 for Victoria

summary Copy the sentences below. Fill in the gaps by choosing the correct word or expression from the word list below. 1

Our number system is based on the number the system.

2

When or subtracting, line numbers up vertically so that numbers of the same place value are in the same .

3

Short multiplication is generally used when multiplying by less.

4

Short division is generally used when

5

Long multiplication and division are used to multiply or divide by numbers.

6

To multiply numbers which are multiples of ten, disregard the zeros, perform the multiplication, then add the total number of to the answer.

7

To divide numbers that are multiples of ten, write the question as a , cancel as many zeros as possible, then perform the division.

8

Rules for the order of operations

and is known as

or

by 12 or less.

Multiplication and division (from left to right) Addition and (from left to right) 9

One method of answers to mathematical questions is to round the numbers to the first digit then calculate an approximate answer.

10

If the second digit is 0, 1, 2, 3 or 4, the first digit doesn’t

11

If the second digit is 5, 6, 7, 8 or 9, the first digit is rounded

WORD estimating 10 fraction brackets

LIST subtraction adding larger 12

column Hindu–Arabic dividing

zeros up change

. .

Chapter 1 Whole numbers

39

CHAPTER review 1 Write the following numbers in ascending order. a 245, 25, 269, 263 b 12 627, 12 629, 12 269, 13 962

1A

2 Write the following numbers in descending order. a 763, 636, 367, 663 b 25 418, 35 418, 26 712, 34 218

1A

3 What is the value of the 1 in the speed sign shown at right?

1A

4 Write in words the value of the 3 in these numbers. a 4038 b 631 981 c 6 003 059

1A

5 Add these numbers. a 43 + 84 b 139 + 3048 c 3488 + 91 + 4062 d 3 486 208 + 38 645 + 692 803

1B

6 Uluru is a sacred Aboriginal site. The map below shows some roads between Uluru and Alice Springs. The distances (in kilometres) along particular sections of road are indicated.

1B

Fin

ke

sealed road unsealed road Map not to scale

Ri

Simpsons Stanley Gap Chasm

ve

r

Hermannsberg

Kings Canyon resort

Wallace Rockhole me Henbury rR ive Meteorite r Craters

100 Ayers Rock resort

83 Curtin Springs

Uluru

100 70 53

54

Alice Springs

127

195 Pal

To Darwin

132

70 56

Mt Ebenezer Kulgera To Adelaide

a How far is Kings Canyon resort from Ayers Rock resort near Uluru? b What is the shortest distance by road if you are travelling from Kings Canyon resort to Alice Springs? c If you are in a hire car, you must travel only on sealed roads. Calculate the distance you need to travel if driving from Kings Canyon resort to Alice Springs.

40

Maths Quest 7 for Victoria

1C

7 Calculate each of the following. a 20 − 12 + 8 − 14 c 300 − 170 + 20

1C

8 Complete these subtractions. a 688 − 273 d 46 234 − 8476

1D

b 35 + 15 + 5 − 20 d 18 + 10 − 3 − 11 c f

68 348 − 8026 1370 × 30

9 Multiply these numbers using short multiplication. a 621 × 8 b 10 083 × 11 d 2000 × 70 e 900 × 600

c f

4987 × 7 760 201 − 664 656

1D

10 Multiply these numbers using long multiplication. a 305 × 16 b 1435 × 27

c

68 344 × 63

1D

11 Multiply these multiples of ten. a 30 × 60 b 200 × 120

c

40 000 × 700

1E

12 Calculate each of these using short division. a 4172 ÷ 7 b 101 040 ÷ 12

c

15 063 ÷ 3

1E

13 Calculate each of these. a 6×4÷3 d 81 ÷ 9 × 5

c f

49 ÷ 7 × 12 12 ÷ 2 × 11 ÷ 3

1E

14 Calculate these using long division. a 8910 ÷ 22 b 14 756 ÷ 31

c

34 255 ÷ 17

1E

15 Divide these multiples of ten. a 84 000 ÷ 120

c

12 300 ÷ 30

1D,E

b 400 − 183 e 286 005 − 193 048

b 4 × 9 ÷ 12 e 6×3÷9÷2

b 4900 ÷ 700

16 In summer, an ice-cream factory operates 16 hours a day and makes 28 ice-creams each hour. a How many ice-creams are produced each day? b If the factory operates 7 days a week, how many ice-creams are produced in one week? c If there are 32 staff who run the machines over a week, how many ice-creams would each person produce?

1F 1F

17 Write the rules for the order of operations.

1G

19 By rounding each number to its first digit, estimate the answer to each of the calculations. a 6802 + 7486 b 8914 − 3571 c 5304 ÷ 143 d 5706 × 68 e 49 581 + 73 258 f 17 564 − 10 689 g 9480 ÷ 2559 h 289 × 671

18 Follow the rules for the order of operations to calculate each of the following. a 35 ÷ (12 − 5) b 11 × 3 + 5 c 8×3÷4 d 5 × 12 − 11 × 5 e (6 + 4) × 7 f 6+4×7 g 3 × (4 + 5) × 2 h 5 + [21 − (5 × 3)] × 4

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