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MATHEMATICS STUDY GUIDE 2/2
Grade 5
A member of the FUTURELEARN group
Mathematics Study guide 2/2
CAPS aligned
M Vos L Young
2005-E-MAM-SG02
Í4%È-E-MAM-SG02YÎ
Grade 5
Study Guide 2/2 G05 ~ Mathematics
Contents LESSON ELEMENTS..................................................................................................................................... 1 UNIT 3............................................................................................................................................................. 2 LESSON 19: COMMON FRACTIONS......................................................................................................... 3 ACTIVITY 42................................................................................................................................................3 LESSON 20: MASS........................................................................................................................................ 7 ACTIVITY 43................................................................................................................................................9
LESSON 21: WHOLE NUMBERS Counting, ordering, comparing and representing, and place value of digits (6-digit whole numbers)................................................................................13 ACTIVITY 44.............................................................................................................................................13 LESSON 22: WHOLE NUMBERS (Addition and subtraction).......................................................19 ACTIVITY 45.............................................................................................................................................19 LESSON 23: VIEWS OF OBJECTS............................................................................................................23 ACTIVITY 46.............................................................................................................................................25 LESSON 24: PROPERTIES OF 2D SHAPES...........................................................................................30 ACTIVITY 47.............................................................................................................................................31 LESSON 25: TRANSFORMATIONS.........................................................................................................34 ACTIVITY 48.............................................................................................................................................40 LESSON 26: TEMPERATURE...................................................................................................................45 ACTIVITY 49.............................................................................................................................................46 LESSON 27: DATA HANDLING................................................................................................................51 ACTIVITY 50.............................................................................................................................................52 LESSON 28: NUMBER PATTERNS (Numerical patterns)................................................................58 Input and output values.................................................................................................................................59 The associative property of multiplication............................................................................................61 Types of number sequences.........................................................................................................................64 ACTIVITY 51.............................................................................................................................................65 LESSON 29: WHOLE NUMBERS Multiplication (3-digit whole numbers by 2-digit whole numbers)..................................................................................................................................................................68 ACTIVITY 52.............................................................................................................................................68 UNIT 4...........................................................................................................................................................70 LESSON 30: WHOLE NUMBERS.............................................................................................................71 ACTIVITY 53.............................................................................................................................................71
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Study Guide 2/2 G05 ~ Mathematics
LESSON 31: WHOLE NUMBERS Addition and subtraction (5-digit whole numbers).........77 ACTIVITY 54.............................................................................................................................................77 Addition and subtraction of whole numbers........................................................................................77 LESSON 32: PROPERTIES OF 3D OBJECTS.........................................................................................81 ACTIVITY 55.............................................................................................................................................85 LESSON 33: COMMON FRACTIONS.......................................................................................................89 ACTIVITY 56.............................................................................................................................................89 LESSON 34: WHOLE NUMBERS Division (4-digit whole numbers by 2-digit whole numbers).....................................................................................................................................................91 ACTIVITY 57.............................................................................................................................................94
LESSON 35: PERIMETER, SURFACE AREA AND VOLUME..............................................................95 Perimeter..............................................................................................................................................................95 ACTIVITY 58.......................................................................................................................................... 101 Surface area...................................................................................................................................................... 104 ACTIVITY 59.......................................................................................................................................... 105 Volume................................................................................................................................................................ 107 LESSON 36: POSITION AND DISPLACEMENT................................................................................. 110 ACTIVITY 60.......................................................................................................................................... 111 LESSON 37: TRANSFORMATIONS...................................................................................................... 115 ACTIVITY 61.......................................................................................................................................... 115 LESSON 38: GEOMETRIC PATTERNS................................................................................................ 120 ACTIVITY 62.......................................................................................................................................... 120 LESSON 39: NUMBER SENTENCES.................................................................................................... 124 ACTIVITY 63.......................................................................................................................................... 124 LESSON 40: PROBABILITY................................................................................................................... 128 ACTIVITY 64.......................................................................................................................................... 130 References................................................................................................................................................ 135
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Study Guide 2/2 G05 ~ Mathematics
LESSON ELEMENTS The guide contains various lesson elements. Each element is important for the learning process and indicates the skill you must master. ICON
LESSON ELEMENT
ICON
LESSON ELEMENT
Think for yourself
Take note! Important
Tips
Self-assessment
Research
Activity
Study
Did you know?
New concept or definition
Tip
Remember/Revise
1
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Unit
3
Study Guide 2/2 G05 ~ Mathematics
UNIT 3 This unit covers 19 to 29.
UNIT 3
TOPIC Mental maths: Use Train Your Brain Maths Grade 5 LESSON 19 Common fractions LESSON 20 Mass
LESSON 21 Whole numbers: Counting, ordering, comparing and representing, and place value of digits (6-digit whole numbers) LESSON 22 Whole numbers: Addition and subtraction LESSON 23 Views of objects
LESSON 24 Properties of 2D shapes LESSON 25 Transformations LESSON 26 Temperature
LESSON 27 Data handling
LESSON 28 Number patterns
LESSON 29 Whole numbers: Multiplication (3-digit whole numbers by 2-digit whole numbers) Revision: Use the CAMI programme
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Study Guide 2/2 G05 ~ Mathematics
Unit
3
LESSON 19: COMMON FRACTIONS In lesson 12, you learnt about common fractions and calculating with common fractions. Revise all the methods of working with fractions. Before you compare or add any fractions, you must always make the denominators the same. When you multiply the denominator by a number, you must also multiply the numerator by the same number.
ACTIVITY 42 1.
DATE:
Complete the equivalent fractions. 1 1.1 __ = ___ 15 3
________________________________________________________
1 1.2 __ = ___ 10 2
________________________________________________________
3 1.3 __ = ___ 21 7
1.4
________________________________________________________ ___ = __ 23 18
________________________________________________________
8 1.5 __ = ___ 32 9
________________________________________________________
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Unit
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3
Study Guide 2/2 G05 ~ Mathematics
Use symbols (<; >; =) to show the relationship between the fractions. 4 2 2.1 ___ 10 ______ __ 5
2.2 ___ 10 ______ __ 52 8 2.3 2.4 3.
2__ 23 ______ __ 73
1__ 14 ______ __ 54
2.5 __ 34 ______ __ 12
Calculate the fractions and write the answer in the simplest form. 3 3.1 2 __ 58 – 1 __ = 8
____________________________________________________________________________________________
5 3.2 2 __ 14 + 2 __ = 8
____________________________________________________________________________________________
3 7 3.3 8 ___ 10 – 3 __ = 5
____________________________________________________________________________________________
3 1 3.4 9 __ 78 – (3 __ + 1 __ ) = 4 2
____________________________________________________________________________________________ ____________________________________________________________________________________________
2 3.5 6 ___ 43 – (2 __ 12 + 1 __ ) = 6
____________________________________________________________________________________________ ____________________________________________________________________________________________
10 3 3.6 (5 __ 46 + 3 ___ ) – 4 __ = 4 12
____________________________________________________________________________________________ ____________________________________________________________________________________________
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3
Unit
5 __ 5 3 3.7 ___ 12 + + __ = 6 4
4.
____________________________________________________________________________________________
Indicate the type of fraction (proper fraction, improper fraction or mixed number). 4.1 1 __ 23
_________________________________________________
4.3 3 __ 15
_________________________________________________
4.2 __ 52
5.
4.4 ___ 65
_________________________________________________ _________________________________________________
Write the fractions as a mixed number in the simplest form. 5.1 __ 53 = _________________ 5.2 __ 64 = _________________ 5.3 __ 75 = _________________ 5.4 __ 52 = _________________
6.
5.5 ___ 13 = _________________ 8
Read the scenarios and answer the questions in your exercise book.
2 6.1 Thabang wants to go on holiday. He can take leave for __ of the month. If the month 3 has 30 days, how many days’ leave can he take?
6.2 Thabang has decided on his holiday destination. He will get there by train, which 1 2 will take him 5 __ hours. If he goes by aeroplane, it will take him only 2 __ hours. 3 5 How many hours will Thabang save if he takes the plane? 6.3 Thabang decides to take the plane to save time. Unfortunately, the flight is delayed by 1 __ 56 hours. How long did the flight actually take him?
1 6.4 Thabang bought 6 gifts for his family and friends. Each gift takes up ___ 15 of his suitcase. If he has 2 suitcases, how much space is left for his own luggage?
6.5 Lerato and her mom are making pancakes. They want to increase the recipe to 3 1 make more pancakes. Her mom’s recipe uses __ of a cup of water for every __ of a 4 4 cup of flour. How much water do they need if they want to use 1 cup of flour?
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7.
3
Study Guide 2/2 G05 ~ Mathematics
Which fraction is greater:
7.1 __ 68 of a kilogram or __ 23 of a kilogram?
____________________________________________________________________________________________
9 7.2 ___ 12 of a litre or __ 34 of a litre?
____________________________________________________________________________________________
7.3 ___ 64 of an hour or __ 13 of an hour?
____________________________________________________________________________________________
Self-assessment Do you understand the work? Colour the faces that show what you can do. COMMON FRACTIONS Requirements I can indicate common fractions on a diagram. I can compare and indicate the relationships of common fractions. I can calculate equivalent fractions. I can do calculations with fractions (addition of fractions). I can solve fraction sums with calculations. I can convert between improper fractions and mixed numbers.
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Can I do it?
Study Guide 2/2 G05 ~ Mathematics
Unit
3
LESSON 20: MASS
Mass measures the quantity of matter (particles) in an object. For example, a gold bar is the same size as a box of Smarties (53 mm × 118 mm × 8 mm) but has a mass of 1 kg. This means the gold bar has a higher particle density, or more particles, than the box of Smarties. It is important to remember that mass and weight are not the same, even though mass is used to describe weight. The weight of an object is determined by gravity, while mass is a constant determined by its number of particles. Out in space, where there is no gravity, a brick will have no weight, but its mass will be the same in space and on earth. Mass is measured in gram (g), kilogram (kg) and ton (t). In Grade 5, we only work with gram and kilogram.
You worked with mass in Grades 3 and 4. Revise what you know about mass.
How do you measure mass? We use different measuring instruments to determine mass. Measuring instruments
Bathroom scale
Kitchen scale 7
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Study Guide 2/2 G05 ~ Mathematics
Balancing scale
We measure mass in kilogram and gram.
Kilogram (kg) Gram (g) You use kilogram when measuring objects heavier than 1 000 g. Smaller objects with a mass of less than 1 kg are measured in grams. When you convert between gram and kilogram, remember that there are 1 000 g in every 1 kg. Use the diagram below to help with the conversion between gram and kilogram.
kilogram (kg)
× 1 000 ÷ 1 000
gram (g)
Example Convert 8 153 g from gram (g) to kilogram (kg). = 8 153 g ÷ 1 000 = 8,153 kg (Remember: 8,153 kg is 8 kg 153 g – that is 8 full kilograms and 153 grams that are not enough to make up a full kilogram, therefore, the 153 comes after the comma.) Revise the conversion of volume in lesson 9. To simplify the calculations, you can picture a comma at the end of the number. When you divide by 1 000, move the imaginary comma three place values to the left (because there are three zeros in 1 000). © Impaq
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When you multiply by 1 000, move the imaginary comma three place values to the right (because there are three zeros in 1 000).
8 1 5 3 , g ÷ 1 0 0 0 = 8 , 1 5 3 kg
Convert the following mass to gram. 4 kg × 1 000 = 4 000 g
Use the imaginary comma and three zeros after the whole number. There are three zeros because you are multiplying by 1 000. It is important to first write a comma and then the zeros.
4 , 0 0 0 kg × 1 0 0 0 = 4 0 0 0 g When we work with or compare units of measurement, they must always be the same units.
ACTIVITY 43 1.
DATE:
Read the mass on each scale and give the answer in g or kg. 1.1
Cookies
1.2
4,5 900
0 g
200
700
300
600
500 1
4
100
800
0 kg
3,5
1,5 3
2 2,5
400 500
___________________________________ ___________________________________
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1.3
0 kg
1,8
1.4
200
1,6
400
1,4
600 1,2
0 kg
1,8
800 1
200
1,6
400
1,4
600 1,2
800 1
2.
___________________________________ ___________________________________
Indicate the mass of the objects on the scales. 2.1
2.3 3,625 kg
4,75 kg
4,5
0 kg
9
1
8
4
2.2 175 g
900
0 g
100 200
800 700
300
600
400 500
3.
Calculate the mass. 3.1
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The mass of each
2 2,5
5
1,5 3
3 6
500 1
3,5
2
7
0 kg
4
= ______ g 10
Study Guide 2/2 G05 ~ Mathematics
Unit
3
3.2
4.
The mass of each
= ______ kg
Convert the mass from kilogram to gram, or from gram to kilogram.
4.1 3 kg = _________ g
4.2 5 315 g = _________ kg 4.3 87,23 kg = _________ g 4.4 954 kg = _________ g
4.5 5,20 kg = _________ g
4.6 3 019 g = _________ kg
4.7 3 kg 16 g = _________ g 4.8 7,05 kg = _________ g
4.9 2 kg 134 g = _________ kg 5.
4.10 1 kg 5 216 g = _________ kg _________ g Do the sums with mass.
5.1 6 kg + 750 g + 250 g = _________ kg 5.2 15 kg – 750 g = _________ kg 5.3 150 g × 5 = _________
5.4 250 g × 5 = _________ g = _________ kg _________ g 5.5 3 kg + 200 g + 600 g + 1,6 kg = _________ kg
5.6 The difference between 3 kg 35 g and 1 kg 70 g. _________ 5.7 475 kg ÷ 25 = _________ kg 5.8 __ 23 of 1,5 kg = _________ kg 6.
5.9 3 kg 125 g × 9 = _________ kg
Write the masses in descending order. 6.1 700 g
3 kg
2 600 g
0,8 kg
____________________________________________________________________________________________
6.2 4 500 g
4 kg
4 kg 200 g
4,45 kg
____________________________________________________________________________________________ 11
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Unit
7.
3
Study Guide 2/2 G05 ~ Mathematics
Study the table and answer the questions.
Rolene and her mom buy the following ingredients to bake a cake:
Ingredient 1
Ingredient 2
Ingredient 3
Ingredient 4
Ingredient 5
Ingredient 6
1 orange
150 g butter
1 500 g flour
2 500 g sugar
5 g salt
450 g jam
Ingredient 7 0,1 kg
chocolate
7.1 Which ingredients weigh less than 1 kg? ______________________________________________ 7.2 Which ingredients weigh more than 2 kg? ____________________________________________ 7.3 Which two ingredients weigh 250 g altogether? ______________________________________
7.4 Arrange the masses of the ingredients in ascending order (do not include the orange).
____________________________________________________________________________________________
Self-assessment Do you understand the work? Colour the faces that show what you can do. MASS Requirements
Can I do it?
I can determine the mass of practical objects by estimating and measuring. I know the different measuring instruments and can take readings from them. I know the units of measurement for mass and can use them. I can solve problems of mass in context. I can convert between kilogram and gram.
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Study Guide 2/2 G05 ~ Mathematics
Unit
3
LESSON 21: WHOLE NUMBERS
Counting, ordering, comparing and representing, and place value of digits (6-digit whole numbers) This lesson again covers whole numbers. In terms 1 and 2, you studied whole numbers quite comprehensively, but revise lesson 1 if you need to refresh your memory.
Whole numbers do not have fractions or decimals. Whole numbers are always positive and never negative. Remember: 0 is also a whole number. A set of whole numbers: {0; 1; 2; 3; 4; ...}
You must be able to do the following with whole numbers: • • • • • • • • •
Count on and back in 2s, 3s, 5s, 10s, 25s, 50s and 100s Do calculations with 6-digit numbers (you have not worked with 6-digit numbers before) Arrange number sets Build and arrange different numbers Break down numbers into place values Give number names Indicate place values Use expanded notation (all three methods) Compare whole numbers
Do you still remember place value? You studied the place values of 4-digit numbers in lesson 1. In this lesson, we will work with 6-digit numbers.
ACTIVITY 44
DATE:
1.
Give the set of whole numbers between 613 546 and 613 553.
2.
Are the numbers whole numbers? Only write 'whole number' or 'not a whole number'.
____________________________________________________________________________________________
2.1 123 123 ___________________________________ 2.2 0 ___________________________________
2.3 -952 312 ___________________________________ 2.4 _________ 1369546 ___________________________________
2.5 124 622 ___________________________________ 2.6 9,133 ___________________________________
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3.
3
Study Guide 2/2 G05 ~ Mathematics
Fill in the missing number to complete the number patterns. 3.1 12 232; 12 234; _______________; 12 238 3.2 100 103; 100 100; _______________ 3.3 52; 44; 36; _______________; 20 3.4 7; 14; _______________; 28; 35
3.5 102; 204; 408; _______________
3.6 13 770; _______________; 1 530; 510 4.
3.7 45; 225; _______________; 5 625; 28 125
Do the calculations to complete the diagrams. 4.1
100 029
6 12 9
4.2
4.3
100 019 +
7
1
4
8 2 5
42 221 – 20 = _________________________
270 023
8 12 11 3
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11 10 3
4
6
13
270 027 –
10 1 2
5 7 9
14
Study Guide 2/2 G05 ~ Mathematics
Unit
3
4.4
Rule: ______________________________________
4.5
5.
Arrange the numbers as shown in brackets. (‘Descending’ means from great to small and ‘ascending’ means from small to great.)
5.1 340 034; 304 043; 340 340; 430 040; 430 004 (Descending)
____________________________________________________________________________________________
5.2 609 229; 69 929; 609 292; 690 229; 69 292 (Descending)
____________________________________________________________________________________________
5.3 733 533; 735 553; 733 353; 735 535; 735 335 (Ascending)
____________________________________________________________________________________________
5.4 980 001; 99 800; 988 101; 980 010; 980 100 (Ascending)
____________________________________________________________________________________________ 15
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Unit
6.
3
Study Guide 2/2 G05 ~ Mathematics
Study the digits
5 1 8 9 6 1
6.1 Write the largest number you can make with these digits.
____________________________________________________________________________________________
6.2 Write the number name of the number you made in 6.1.
____________________________________________________________________________________________
6.3 Write the smallest number you can make with these digits.
____________________________________________________________________________________________
6.4 Write the number name of the number you made in 6.3. 7.
____________________________________________________________________________________________
Study the number:
712 054
7.1 What is the numerical value of the 2? __________________________ 7.2 What is the numerical value of the 5? __________________________ 7.3 What is the place value of the 0? ___________________________
7.4 What is the place value of the 7? ____________________________ 7.5 What is the place value of the 4? ____________________________
7.6 Write the number in expanded notation (in all three methods). Method 1
____________________________________________________________________________________________ Method 2
____________________________________________________________________________________________ Method 3
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3
7.7 10 000 less than 421 458 is _________________________________. 7.8 100 more than 421 458 is _________________________________. 8.
7.9 100 000 less than 421 458 is _________________________________. Compare the numbers with <,> or =.
8.1 383 565 ______ 383 656 8.2 945 939 ______ 954 293 8.3 727 989 ______ 721 999 8.4 465 283 ______ 456 283 8.5 103 419 ______ 103 419
9.
Morison is planning his birthday party. He compares the prices of food and snacks at a few shops. His favourite chips are chutney flavoured and he finds the following price options:
Frimax chips Simba chips (48 × 30 g) (1 × 125 g) R139,95 R14,95 9.1 How many packets of Frimax chips are needed to make up 1 packet of Simba chips? ____________________________________________________________________________________________ ____________________________________________________________________________________________
9.2 About how much will 1 packet of Frimax chips cost? Tip: First round off the total amount to the nearest whole number. ____________________________________________________________________________________________
____________________________________________________________________________________________ 17
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Study Guide 2/2 G05 ~ Mathematics
9.3 Will it be cheaper to buy a few packets of Simba chips or to buy the Frimax chips? ____________________________________________________________________________________________ ____________________________________________________________________________________________
9.4 Which option would you choose? Give a reason for your answer.
____________________________________________________________________________________________ ____________________________________________________________________________________________
Self-assessment Do you understand the work? Colour the faces that show what you can do. WHOLE NUMBERS Requirements I can count on and back in 2s, 3s, 5s, 10s, 25s, 50s and 100s. I can work with 6-digit whole numbers. I can arrange number collections in descending and ascending order. I can build and arrange different numbers. I can break down numbers into place values. I can give number names. I can indicate place value. I can do expanded notation (all three methods). I can use symbols (<, > or =) to compare whole numbers.
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Can I do it?
Study Guide 2/2 G05 ~ Mathematics
Unit
3
LESSON 22: WHOLE NUMBERS (Addition and subtraction) In this lesson you will practise adding and subtracting 5-digit numbers. Revise lesson 3 if you need to refresh your memory. Make sure you can use these techniques when you do calculations for written work and mental maths: 1. Breaking down numbers 2. Writing numbers underneath one another 3. Writing numbers next to each other 4. Estimation 5. Rounding 6. Compensating 7. Doubling and halving (remember the new method of breaking down numbers)
Also remember that addition and subtraction are inverse operations of one another and you can use the inverse operations to test your answer.
ACTIVITY 45
DATE:
Addition and subtraction of whole numbers 1. Break down the numbers to complete the addition and subtraction sums. Do the sums in your exercise book.
2.
1.1 1.2 1.3 1.4 1.5
43 120 + 2 572 8 293 + 12 123 41 542 + 32 121 45 852 + 23 628 50 213 + 17 450
1.6 1.7 1.8 1.9 1.10
1 215 – 1 103 20 940 – 10 730 69 112 – 34 124 91 438 – 51 325 95 195 – 62 184
2.1 2.2 2.3 2.4 2.5
41 215 + 76 004 74 147 – 73 132 75 124 + 12 154 96 421 – 37 348 82 436 – 43 456
2.6 2.7 2.8 2.9 2.10
51 002 + 59 980 60 505 + 52 123 31 483 – 12 859 95 154 – 56 754 70 309 + 69 741
Use any valid method to do the calculations. Test your answers with the inverse operations (and show your test). Do the sums in your exercise book.
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Unit
3.
3
Study Guide 2/2 G05 ~ Mathematics
Read the word sums, write down the appropriate number sentence and calculate the answer. Do the sums in your exercise book. 3.1
3.2
3.3
3.4
Tiana and Briana find a scale in the garage. The scale measures in pounds (like in America), not kilograms. Tiana’s dad weighs himself on the scale and gets a reading of 194 pounds. Briana and Tiana get on the scale together and it shows a reading of 273 pounds. How many pounds more do Tiana and Briana weigh than Tiana’s dad?
Ellis sells toffee apples. He makes 12 456 toffee apples to sell in a week. On Monday he sells 1 456. On Tuesday he sells 1 356. On Wednesday and Thursday, he sells an equal number – 2 516 per day – and on Friday he sells 3 002 toffee apples. Does he have enough toffee apples left to sell at least 3 500 on Saturday? Kiara and her friends pick up litter on the playground. Kiara picks up 54 pieces of rubbish. Phia picks up 63 pieces, and Riana and Kabelo pick up 59 pieces. Simon also picks up litter. If they collect 297 pieces of rubbish altogether, how many pieces did Simon pick up?
Thabiso and his brother Samuel are training for cross-country season and follow a specific training programme. The programme recommends that athletes who are not fit yet must do the following: in week 1, run 7 km per day; in week 2, they 1 must run 1 __ times the distance per day; in week 3 they must run double as far; 2 and in week 4, double the distance of week 2. How many kilometres did Thabiso and Samuel run in a month if the month had 4 weeks and they trained for 6 days a week?
Estimation 4. Estimate whether you have enough fuel in your car to travel the given distances. Do the sums in your exercise book. 4.1 4.2
From Piketberg to Springbok. You have enough fuel for 420 km.
From Vanrhynsdorp to Malmesbury. You have enough fuel for 240 km.
4.3 From Keetmanshoop in Namibia to Vanrhynsdorp. You have enough fuel for 650 km.
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Study Guide 2/2 G05 ~ Mathematics
5.
3
Unit
Use estimation to solve the word sums. Do the sums in your exercise book. 5.1 5.2
5.3
Every day PostNet receives 12 452 parcels to courier. 451 parcels are insured. Determine how many parcels are not insured.
CJ’s family enjoys camping and visits the Almega campsite in Dinokeng over the weekend. Almega is 71,2 km away. The campsite manager tells them that Mystic Monkeys is not far, so they decide to drive there on Saturday. CJ’s dad resets the car’s odometer and measures the distance from Almega to Mystic Monkeys as 23,7 km. Estimate how far CJ and his family drove from their house and back again over the weekend. Andrea wants to buy her friend a gift, but she must buy the essentials on her shopping list: • Shampoo: R67,00 • Perfume: R675,25 • Jacket: R230,95 • Colour pens: R199,95
She wants to buy her friend a watch:
If Andrea gets R1 200 pocket money, will she have enough money to buy her friend a gift? Use estimation.
Doubling and halving 6. Double the numbers. You may use any method. Do the sums in your exercise book.
7.
6.1 520 6.4 54 899 6.2 5 625 6.5 63 125 6.3 12 856
Halve the numbers. You may use any method. Do the sums in your exercise book. 7.1 15 966 7.4 98 560 72 10 568 7.5 85 626 7.3 12 322 21
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3
Study Guide 2/2 G05 ~ Mathematics
Rounding 8. Round the numbers to the nearest 5, 10, 100 and 1 000. Number
8.1
405
8.3
27
8.2
732
8.6
2 125
429
8.7
15 956
8.9
19 999
8.8 8.10
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Rounded to the nearest 10
458
8.4 8.5
Rounded to the nearest 5
21 156 10 211
22
Rounded to the nearest 100
Rounded to the nearest 1 000
Study Guide 2/2 G05 ~ Mathematics
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Unit
Self-assessment Do you understand the work? Colour the faces that show what you can do. WHOLE NUMBERS Requirements
Can I do it?
I can add and subtract with whole numbers. I can break down numbers as a method of addition and subtraction of whole numbers. I can write an appropriate number sentence. I can estimate whole numbers. I can work with money, distance and time (estimation, rounding, addition and subtraction). I can round numbers to the nearest 5, 10, 100 and 1 000. I can double whole numbers. I can halve whole numbers. I can do inverse operations to test answers.
LESSON 23: VIEWS OF OBJECTS You studied views of objects in geography this year. Can you recognise and draw the different views of objects? Revise views of objects. An object’s view is the direction from which you look at it. We will work with these views: • Top view: Also called the plan view. What you see when you look at an object from directly above or from the TOP. • Side view: What an object looks like when you look at it from the SIDE. • Front view: What an object looks like when you look at it from the FRONT.
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Your facilitator will show you a video that explains the different views. Examples The different views of a bottle of flavoured water. Front view
The different views of a figurine. Front view
The different views of a tub of clay. Front view
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Side view
Top view
Side view
Top view
Side view
Top view
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