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Student BookSERIES
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Patterns and Algebra
Teacher BookSERIES
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Patterns and Algebra
Copyright ©
Series G – Patterns and Algebra
Contents
Topic 1 – Patterns and functions (pp. 1–17)• recursive number sequences ____________________________
• function number sequences _____________________________
• function shape patterns ________________________________
• function machines and function tables ____________________
• real life functions _____________________________________
• function tables – apply _________________________________
• the “I Do” venue – solve ________________________________
• fabulous Fibonacci and the bunnies – solve _________________
• triangular numbers – investigate _________________________
• Pascal’s triangle – investigate ____________________________
Topic 2 – Algebraic thinking (pp. 18–25)• making connections between unknown values ______________
• present puzzle – solve __________________________________
• the lolly box – solve ___________________________________
Topic 3 – Solving equations (pp. 26–33)• introducing pronumerals _______________________________
• using pronumerals in an equation ________________________
• simplifying algebraic statements _________________________
• happy birthday – solve _________________________________
• squelch juiceteria – solve _______________________________
Topic 4 – Properties of arithmetic (pp. 34–41)• order of operations ____________________________________
• commutative rule _____________________________________
• distributive rule _______________________________________
• equation pairs – apply _________________________________
Date completed
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Series Authors:
Rachel Flenley
Nicola Herringer
Copyright ©
Series G – Patterns and Algebra
Contents
Section 1 – Answers (pp. 1–41)• patterns and functions ________________________________ 1
• algebraic thinking ____________________________________ 18
• solving equations ____________________________________ 26
• properties of arithmetic ______________________________ 34
Section 2 – Assessment with answers (pp. 42–53)• patterns and functions – part 1 _________________________ 42
• patterns and functions – part 2 _________________________ 44
• patterns and functions – part 3 _________________________ 46
• algebraic thinking ____________________________________ 48
• solving equations ____________________________________ 50
• properties of arithmetic ______________________________ 52
Section 3 – Outcomes (pp. 54–56)
Series Authors:
Rachel Flenley
Nicola Herringer
SERIES TOPIC
1G 1Copyright © 3P Learning
Patterns and Algebra
a b c
Complete these grid patterns. Look closely at the numbers in the grid and follow the pattern going vertically and horizontally:
What do you notice about patterns a and b in Question 1?
_______________________________________________________________________________________
Figure out the missing numbers in each pattern and write the rule:
Patterns and functions – recursive number sequences
A number pattern is a sequence or list of numbers that is formed according to a rule. Number patterns can use any of the four operations ( +, –, ×, ÷) or a combination of these.There are 2 different types of rules that we can use to continue a number pattern:1 A recursive rule – find the next number by doing something to the number before it.2 A function rule – predict any number by applying the rule to the position of the number.
Here is an example of a number sequence with a recursive rule.The rule is add 8 to the previous number, starting with 5.
a
Rule ____________________
d
Rule ____________________
b
Rule ____________________
e
Rule ____________________
c
Rule ____________________
f
Rule ____________________
9 18 36 45
7 13 25 3149 42 28 21
125 100 50 2510 37 46
3 17 24 31
1
2
3
5 13 21 29 37
+ 8 + 8 + 8 + 8
16 19
26
39
46
10 25
24
33
37 52
45
35
34 52 61
10
19 18
36 28 26
17 15 19
27 27
37
47 42 43
18 20 28
28 29 36
38 38 44
48 47
37
29 34
43 53
49
27 54 19 28
1935
55
3714
75
10
0
38
+ 9
– 7
+ 9
+ 6
– 25
+ 7
Both + 9. Just different starting numbers.
+ 1
+ 10 + 9 + 8
+ 5 + 9
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Patterns and Algebra
Use a calculator to work out where each pattern started to go wrong in these single operation patterns and circle them. Hint: The first 2 numbers in both are correct.
a
The rule is ________________
b
The rule is ________________
Complete these decimal number sequences according to the recursive rule:
a Start at 2.5 and add 0.5 2.5
b Start at 25 and subtract 0.5 25
c Start at 30 and add 2.5 30
Complete the following number patterns and write the rule as 2 operations in the diamond shapes and describe it underneath.
a
The rule is ________________
b
The rule is ________________
Patterns and functions – recursive number sequences
Complete these sequences according to the recursive rule:
a Start at 3 and add 7 3
b Start at 125 and subtract 5 125
c Start at 68 and add 20 68
4
5
6
7
2 3 6 15× __ – __ × __ – __ × __ – __
1 3 7 15× __ + __ × __ + __ × __ + __
78 100 122 144 166 188 211 222 233
500 466 432 398 364 330 298 266 230
10
120
88
3
24.5
32.5
17
115
108
3.5
24
35
24
110
128
4
23.5
37.5
31
105
148
4.5
23
40
+ 22
– 34
3 3
× 3– 3
33 3 3
2 2
× 2 + 1
21 1 1
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Patterns and Algebra
In each table, find the rule and write it in the middle row. Then apply the rule to position 20.
a
b
c
Patterns and functions – function number sequences
There are 2 different types of rules that we can apply to find out more about a sequence:1 A recursive rule – gives the next number by applying a rule to the number before it.2 A function rule – predicts any number by applying a rule to the position of the number.
So far we have practised the recursive rule to work out the next number in a sequence.Now we will apply the function rule to this problem:How can we find out the 20th number in this sequence without writing out all of the numbers?To use the function rule we: • Use a table like this one below.• Write each number of the sequence in position.• Work out the rule, which is the relationship between the position of
a number and the number in the pattern. • Use the rule to work out the 20th number in the sequence.
Position of number 1 2 3 4 5 20
Rule × 3 + 1 × 3 + 1 × 3 + 1 × 3 + 1 × 3 + 1 × 3 + 1
Number sequence 4 7 10 13 16 61
Position of number 1 2 3 4 5 20
Rule
Number sequence 6 11 16 21 26
Position of number 1 2 3 4 5 20
Rule
Number sequence 5 7 9 11 13
Position of number 1 2 3 4 5 20
Rule
Number sequence 8 17 26 35 44
1
HINT: a good way to work out the rule is to see what the sequence is going up by. This tells you what the first operation is and then you adjust. This sequence is the 3
times tables moved up one so it is × 3 + 1.
HINT: All of these function rules consist of 2 operations: × and then + or –.
× 5 + 1
× 2 + 3
× 9– 1
× 5 + 1
× 2 + 3
× 9– 1
× 5 + 1
× 2 + 3
× 9– 1
× 5 + 1
× 2 + 3
× 9– 1
× 5 + 1
× 2 + 3
× 9– 1
× 5 + 1
× 2 + 3
× 9– 1
101
43
179
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Patterns and Algebra
Unscramble the sequence according to this function rule: × 9 – 6.
a Again, use the table below to work out how this sequence should go and cross out numbers that do not belong:
Position of number 1 2 3 4 5 6 7 8 9 10
Rule
Number sequence
b What will be the number in position 50? ____________
Here is another number sequence but this time 4 of these numbers do not belong. Given the function rule and the first 2 numbers, use the table below to work out how this sequence should go, then cross out the numbers that do not belong:
15
23
31
36
47
59
63
74
79
97
Position of number 1 2 3 4 5 6 7 8 9 10
Rule × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7 × 8 + 7
Number sequence
Circle true or false for each of the following:
Patterns and functions – function number sequences
2
3
4
5
Here is part of a number sequence. Write these numbers in the table provided. This will help you to answer the questions below:
8
11
14
17
20
Position of number 1 2 3 4 5 20
Rule
Number sequence
a The number in the 6th position is 24 true / false
c The number in the 20th position is 65 true / false
b 32 is in this sequence true / false
d The number in the 100th position is 305 true / false
489
27
78 6023
63 3633
6684 39
312
57 1821
75
30
× 3 + 5 × 3 + 5 × 3 + 5 × 3 + 5 × 3 + 5 × 3 + 5
65201714118
15 23 31 39 47 55 63 71 79 87
3
× 9– 6 × 9– 6 × 9– 6 × 9– 6 × 9– 6 × 9– 6 × 9– 6 × 9– 6 × 9– 6 × 9– 6
12 21 30 39 48 57 66 75 84
444
SERIES TOPIC
5G 1Copyright © 3P Learning
Patterns and Algebra
Complete the table for each sequence of matchstick shapes. Use the function rule for finding the number of matchsticks needed for each shape including the 50th shape:
a
Shape number 1 2 3 4 5 6 7 8 9 10 50
Number of matchsticks 4 7 10 13 16
Function rule Number of matchsticks = Shape number × ______ + 1
b
Shape number 1 2 3 4 5 6 7 8 9 10 50
Number of matchsticks 6 10 14 18 22
Function rule Number of matchsticks = Shape number × ______ + ______
c
Shape number 1 2 3 4 5 6 7 8 9 10 50
Number of matchsticks 3 5 7 9 11
Function rule Number of matchsticks = Shape number × ______ + ______
d
Shape number 1 2 3 4 5 6 7 8 9 10 50
Number of matchsticks 5 8 11 14 17
Function rule Number of matchsticks = Shape number × ______ + ______
Patterns and functions – function shape patterns
When you are investigating geometric patterns, look closely at the position of each shape and think about how it is changing each time.How many matchsticks are needed for the first shape?How many more are needed for the next shape?
1
19
26
13
20
22
30
15
23
25
34
17
26
28
38
19
29
31
42
21
32
151
202
101
152
3
4 2
2 1
3 2
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Patterns and Algebra
Tyson also made a sequence out of pattern blocks but stopped after the first 3 shapes and decided to continue investigating by using the table.
Shape number 1 2 3 4 5 6 7 8 9 10
Number of crosses 1 2 3
Number of rectangles 0 2 4
Rule for crosses Number of crosses = (2 + number of rectangles) ÷ 2
Rule for rectangles Number of rectangles = (2 × number of crosses) – 2
a How many rectangles will there be in the 12th shape?
b Josie made this shape following Tyson’s sequence.
What is the position of this shape? __________
How do you know?
Patterns and functions – function shape patterns
Gia started to make a sequence out of star and pentagon blocks and recorded her findings in the table as she went. She had to stop when she ran out of pentagons. This is where she got up to:
a Help Gia continue investigating this sequence by using the table below:
Shape number 1 2 3 4 5 6 7 8 9 10 15
Number of stars 1 2 3
Number of pentagons 0 1 2
Rule for stars Number of stars = Number of pentagons + 1
Rule for pentagons Number of pentagons = Number of stars – 1
b How many stars are in the 10th shape?
c How many pentagons are there in the 15th shape?
2
3
4
3
5
4
4
6
10
22
14
6
5
5
8
7
6
6
10
8
7
7
12
9
8
8
14
10
9
9
16
15
10
14
18
9th
Number of crosses = (2 + 16) ÷ 2
= 9
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Patterns and Algebra
Complete these function tables according to the rule:
a
b
Look carefully at the numbers going in these function machines and the numbers coming out. What 2 rules are they following each time?
a b
Patterns and functions – function machines and function tables
Remember function machines? Numbers go in, have the rule applied, and come out again.The rule for this function machine is multiply by 6.
RULE:
× 6
12
9
5IN
72
54
30OUT
1
2
RULE:
9
5
8
IN
66
38
59
OUT RULE:
30
25
100
IN
5
4
19
OUT
The function machines showed us that when a number goes in, it comes out changed by the rule or the function. Function tables are the same idea – the number goes in the rule and the number that comes out is written in the table. The rule goes at the top:
Rule: ÷ 2 + 6
IN 10 24 50 70 48 90 100 80
OUT 11 18 31 41 30 51 56 46
Rule: × 5 – 4
IN 6 9 3 4 7 11 20 8
OUT 26
Rule: × 8 + 1
IN 8 2 3 5 7 9 4 6
OUT 65
× 7 + 3 ÷ 5– 1
17
41
25
11
41
16
57
31
73
51
33
96
49
36
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Patterns and Algebra
Complete the function tables for these real life scenarios:a A pool which fills at a rate of 4 litres every minute.
Rule: Number of minutes × 4 = Amount of litres
Minutes 5 10 15 20 25 30 35 40
Litres 20 40 60 80
How full is it after 1 hour?
b Maya downloads 5 songs a day onto her MP3 player.
Rule: Number of days × ______ = Amount of songs
Days 1 2 3 4 5 6 7 8
Songs 5 10 15 20
How many songs would she have downloaded after 30 days?
c A car is travelling at a speed of 50 km/h.
Rule: Number of hours × ______ = Amount of km travelled
Hours 1 2 3 4 5 6 7 8
Km travelled 50 100 150 200
How long would it take to travel 800 km?
Patterns and functions – real life functions
So far we have seen that functions are relationships between numbers. These numbers are attached to real life situations everywhere you look. It is possible to create a function table to show the relationship between many things, for example:• Your high score Live Mathletics depends on how often you practise mental arithmetic.• The distance that you run depends on how long you run. • The amount that you can save depends on how much you earn.• The amount of US dollars you get when you travel to Los Angeles depends on the exchange rate.There are many, many more examples. Can you think of any?
We can show these relationships on a graph. On the right is a graph of the function table in question c. This is known as a travel graph and shows the relationship between time and distance. Next, we will look at some examples of graphing functions.
1
125
100
75
50
25
1 2
Leah’s journey
Time (hours)
Dist
ance
(km
)
100
25
250
240 litres
150 songs
16 hours
120
30
300
140
35
350
160
40
400
5
50
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Patterns and Algebra
During the day, Crawly’s friend Creepy, crawls 5 cm up a garden wall. At night when he falls asleep, he slides 2 cm back down the wall.
a Complete the table below to show how far he gets in 8 days.
b Write a rule for working out the distance if you know the number of days. Think about the total distance Creepy covers in 24 hours.
c Plot the points on the graph above (just like the one in Question 2), then compare the graphs. How are they different?
___________________________________________________________________________________
Patterns and functions – real life functions
3
Crawly the caterpillar crawls 4 centimetres per day.
a Complete the table to show how far he gets in 8 days.
b Write a rule for working out the distance if you know the number of days.
2
Rule:
Days 1 2 3 4 5 6 7 8
Distance
Rule:
Days 1 2 3 4 5 6 7 8
Distance
This is the graph of my journey shown in the function table. Plot the points and then join the points with a straight line.
Crawly’s journey
Num
ber o
f day
sDistance in cm
876543210
2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32
Creepy’s journey
Num
ber o
f day
s
Distance in cm
876543210
2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32
Number of days × 4 cm
Number of days × 3 cm or (5– 2 cm)
4 cm
3 cm
8 cm
6 cm
12 cm
9 cm
16 cm
12 cm
20 cm
15 cm
24 cm
18 cm
28 cm
21 cm
32 cm
24 cm
Crawly covers more distance over the same amount of time.
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Patterns and Algebra
c Graph this data by plotting the points on the table:
Do not join the points because the data is about whole slices of pizza – not parts of slices. Also you can’t have part of a person, the data is about single people.
d How many slices are needed for 11 people?
e How did you work this out?
f How could the graph help you?
g 10 people confirmed they were coming to the party. How many pizzas will Julie need to buy if each pizza has 12 slices? Will there be any leftovers? Show your working.
Patterns and functions – real life functions
Julie is planning her birthday party and is planning how much food and drink she needs for her guests. She has sent out 15 invitations.
a Complete the table to show how much pizza is needed for different numbers of guests. She has based this table on the estimation that one guest would eat 3 slices of pizza.
b Write a rule in the table for working out the slices of pizzas needed, if you know the number of guests.
4
Rule:
Number of guests 1 2 3 4 5 6 7 8
Slices of pizza 3
Pizza cateringSl
ices
of p
izza
Number of guests
30
28
26
24
22
20
18
16
14
12
10
8
6
4
2
0 1 2 3 4 5 6 7 8 9 10 11 12
Number of guests × 3 slices
11 × 3 = 33 slices
10 × 3 = 30 slices
3 pizzas = 3 × 12 = 36 slices
6 leftover slices
Used the rule.
Continue the plotted points.
6 9 12 15 18 21 24
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Patterns and Algebra
What to do next
What to do
Make up your own scoring table where extra points are given for certain answers.
You could also decide on a ‘killer number’. This number means you wipe out all your points.
1 Each player writes their initials at the top of each column in the scoring tables.2 For each round, roll the dice for and . 3 Use the value for and in the rule.4 Each player writes the answer in the scoring table which becomes their
running score.5 Players add their scores to the previous score.6 The winner is the player with the highest score at the end of each round.
The overall winner is the player who wins the most points after all 3 rounds.For example If I roll the dice and get 4 for and 6 for and I am working with
(2 × ) + , I would calculate (2 × 4) + 6 and my answer would be 16. So I would write 16 in the first row of the table. The next answer I get I add to 16 and so on until the end of the table.
Function tables apply
You and your partner need 2 dice, a pencil and this page.
Total Total Total
Round 1(2 × ) +
Round 2(3 × ) +
Round 3(6 × ) – (2 × )
Getting ready
Answers will vary.
Answers will vary.
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Patterns and Algebra
What to do
The “I Do” venue solve
Table and Chair Arrangement 1 2 3 4 5 6 7 8 9 10
Tables 8 12 16
Chairs 12 16 20 24 28 32 36 40 44 48
Rule for tables
Rule for chairs
A very popular wedding reception venue has a strict policy in the way they put the tables and chairs together. Below is a bird’s eye view of this arrangement. They must only be arranged in this sequence to allow room for their famous ice sculptures in the centre of each table arrangement.
Look carefully at the diagram of the floor plan above.a Complete the table below.b Write the rule in the table for the number of tables needed if you know the table
and chair arrangement number.c Write the rule in the table for the number of chairs needed if you know the table
and chair arrangement number.d Draw what Table and Chair Arrangement 4 would look like in the grid at the
bottom of this page.
Table and Chair Arrangement 4
Table and Chair Arrangement 1
Table and Chair Arrangement 2
Table and Chair Arrangement 3
Getting ready
20
Number of tables = Table number × 4 + 4
Number of chairs = Table number × 4 + 8
24 28 32 36 40 44
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Patterns and Algebra
The “I Do” venue solve
The latest Bridezilla to hire out the “I Do” venue, wants to know how many guests can fit into the space at this venue.
Bridezilla wants to be head of the largest table, which seats 36 guests. This is shown on the floor plan. Work out how many guests she can invite to her wedding by seeing how many will fit in the venue space. The table and chair arrangements must follow the sequence described on the previous page (page 12). So, each table arrangement will be a different size.
Hint: Try to get 5 more tables in this floor plan. Each table should seat fewer than 36 guests. There should be space between the chairs from all the tables so that guests do not bump against each other when getting up from the table.
What to do next
Number of guests: ______
36 guests
136
Answers will vary.
24 guests20 guests
12 guests
28 guests
16 guests
36 guests
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Patterns and Algebra
Look carefully at the table above to understand the problem. If we kept going, the table would get very wide indeed and quite confusing! So it is up to you to figure out the pattern. Here is a closer look. Can you see what is happening? What are the next 2 numbers?
1 1 2 3 5 8
Now, back to the bunnies. Use the table below to answer Mr Fibonacci.“How many pairs of rabbits will there be a year from now?”
What to do next
What to do
Fabulous Fibonacci and the bunnies solve
A famous mathematician by the name of Leonardi di Pisa became known as Fibonacci after the number sequence he discovered. He lived in 13th century Italy, about 200 years before another very famous Italian, Leonardo da Vinci.
His number sequence can be demonstrated by this maths problem about rabbits:
“How many pairs of rabbits will there be a year from now, if …?”
1 You begin with one male rabbit and one female rabbit. These rabbits have just been born.
2 After 1 month, the rabbits are ready to mate.3 After another month, a pair of babies is born – one male and one female.4 From now on, a female rabbit will give birth every month.5 A female rabbit will always give birth to one male rabbit and one female rabbit.6 Rabbits never die.
MonthBabies from
1st PairBabies from
2nd PairBabies from
3rd PairTotal
Pairs of Rabbits
1
2
3
4
5
6
Fibonacci now wants to know:“How many pairs of rabbits will there be 2 years from now?” Use a calculator. Hint: The table below should just continue from the previous one.
Key
= 1 pair of rabbits
Months 1 2 3 4 5 6 7 8 9 10 11 12
Pairs of bunnies 1 1 2 3 5
Months 13 14 15 16 17 18 19 20 21 22 23 24
Pairs of bunnies
Getting ready
8
2 584233
13
4 181377
21
6 765610
34
10 946987
55
17 7111 597
89
28 657
144
13 21
46 368
SERIES TOPIC
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Patterns and Algebra
What to do next
What to do Let’s investigate a faster way to find the 10th number:
1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10
Work from the outside in, until you reach the halfway point adding the numbers.
What is the answer each time? __________
Half of 10 is __________ so that means we have 5 lots of 11, so the 10th triangular
number is __________.
What is the 20th number?
1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10 + 11 + 12 + 13 + 14 + 15 + 16 + 17 + 18 + 19 + 20
Work from the outside in, until you reach the halfway point adding the numbers.
What is the answer each time? __________
Half of 20 is __________ so that means we have __________ lots of __________,
so the 20th triangular number is __________.
Find the 30th triangular number without writing down the numbers. __________
Hint questions:What are the first and the last numbers? ________ What do they add to? ______
Triangular numbers investigate
Write a number sentence for each part of the Triangular number pattern and continue to complete this list:1st 1 = 1 2nd 3 = 1 + 23rd 6 = 1 + 2 + 34th 10 = 1 + 2 + 3 + 4
5th 15 = _______________________________________________
6th 21 = _______________________________________________
7th 28 = _______________________________________________
8th ____ = _______________________________________________
Getting ready
1st 2nd 3rd 4th 5th
1 + 2 + 3 + 4 + 5
1 + 2 + 3 + 4 + 5 + 6
1 + 2 + 3 + 4 + 5 + 6 + 7
1 + 2 + 3 + 4 + 5 + 6 + 7 + 836
11
5
55
21
10
210
10 21
465
1 + 30 31
15 × 31 = 465 So the 30th triangular number is 465.
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Patterns and Algebra
What to do Look carefully at the numbers in
the triangle. Can you see how you might go about completing it? Once you have worked this out, complete the rest of what you see of Pascal’s triangle:
Pascal’s triangle investigate
Pascal’s triangle is named after Blaise Pascal and is fascinating to investigate because of all its hidden patterns. Blaise Pascal was born in France in 1623 and displayed a remarkable talent for maths at a very young age. His father, a tax collector, was having trouble keeping track of his tax collections, so he built his father a mechanical adding machine! (And you thought washing up after dinner was helpful!)
Pascal was actually lucky that this triangle was named after him as it was known about at least 5 centuries earlier in China.
HINT: Start with the 1s at the top of the triangle and add them, you get 2.
Getting ready
1
1
1
1
1
4
3
2
1
6
3
1
4
1
1
Complete the missing sections of Pascal’s triangle below.
a b c
10
9 84 210
45 210
120
252
1 1269 8436 3684 9126 1
1 568 2828 856 170
1 217 721 135 35
1 66 115 20 15
1 15 10 10 5
36 126
120 120
165 462 495
330 165
55 330 792
462
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Patterns and Algebra
Pascal’s triangle investigate
Can you see any other patterns in Pascal’s triangle?
Look along the diagonals and describe as many patterns are you can.
See if you can find Fibonacci’s sequence.
What to do next Check that the Pascal’s triangle on page 16 is correct. Then copy the numbers into
the triangle below and colour in all the multiples of 3 – red; hexagons with 1 less than a multiple of 3 – green; and all hexagons with 2 less than a multiple of 3 – blue.
1
1
1
1
1
4
3
2
1
6
3
1
4
1
1
B = Blue
G = Green
R = Red
l Diagonals on the left and right edges are ones.
l Next row of diagonals is counting numbers in order.
l Next row of diagonals is triangular numbers in order.
1 1269 8436 3684 9126 1
1 568 2828 856 170
1 217 721 135 35
1 66 115 20 15
1 15 10 10 5
B
BB
BGB
BRRB
BBRBB
BGBBGB
BRRGRRB
BBRGGRBB
BGBGBGBGB
BRRRRRRRRB
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Patterns and Algebra2
Find out the value of both symbols:
Algebraic thinking – making connections between unknown values
The balance strategy is what we use when we need to find the value of one symbol. Once we know the value of the first symbol, we can find out the value of the second symbol.
Clue 1 + 40 = 60
Clue 2 × = 100
Use the balance strategy to find the value of + 40 = 60
+ 40 = 60 – 40
= 20
Now we know the value of we can work out the value of
× = 100
20 × = 100
20 × = 100 ÷ 20
= 5
Using the balance strategy we do the same to both sides which gives us the answer.
1
a Clue 1 – 15 = 45
Clue 2 × = 120
– 15 = 45
– 15 = 45 + 15
=
× = 120
× = 120
= 120 ÷ 60
=
b Clue 1 × 9 = 81
Clue 2 – = 96
× 9 = 81
× 9 = 81
=
– = 96
– = 96
= 96
=
Doing the inverse to the other side of the equation cancels out a number and makes things easier to solve. This is called the balance strategy.
60
60
2
÷ 9
9
9
+ 9
105
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Patterns and Algebra 2
Algebraic thinking – making connections between unknown values
Now that you have had practice following the clues and using the step prompts, try these on your own. Set your work out carefully and always use a pencil so that you can erase mistakes and try again.
Find out the value of both symbols:
a Clue 1 6 × + 12 = 84
Clue 2 × = 96
Steps for finding 6 × = 84 –
6 × =
× 6 =
= ÷
=
Now you can find
b Clue 1 9 × – 42 = 21
Clue 2 + = 100
Steps for finding
=
Now you can find
a Clue 1 × 8 = 64
Clue 2 – = 75
b Clue 1 × 7 = 49
Clue 2 + = 100
3
2
It is easier if we put the star on the left hand side. We can swap numbers around with addition and multiplication.
× 7 = 49
= 49 ÷ 7
= 7
7 + = 100
= 100 – 7
= 93
× 8 = 64
× 8 = 64 ÷ 8
= 8
– 8 = 75
= 75 + 8
= 83
9 × – 42 = 21
× 9 = 21 + 42
× 9 = 63
= 63 ÷ 9
+ = 100
7 + = 100
= 100 – 7
= 93
× = 96
12 × = 96
× 12 = 96
= 96 ÷ 12
= 8
12
72
72
72 6
712
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Patterns and Algebra2
This time you have 3 clues to work through. There are no step prompts, you are on your own except for one hint: start with the clue where you can find the value of one symbol. Set your working out clearly. Use each box to work out the value of each symbol.
a
b
Algebraic thinking – making connections between unknown values
4
Clue 1 2 × = 3 × Clue 2 3 × = 4 ×
Clue 3 6 × = 72
=
=
=
Clue 1 5 × = 3 × Clue 2 4 × = 60
Clue 3 45 ÷ = ÷ 4
=
=
=
Find the value of these 3 symbols. You must look closely at each clue. There are hints along the way.
Clue 1 Clue 2 Clue 3
Clue 1 Clue 2 Clue 3
2 × = 3 × 2 × 12 = 3 × 24 = 3 × 3 × = 24
= 24 ÷ 3
= 8
5 × = 3 × 5 × = 3 × 15
5 × = 45
= 45 ÷ 5
= 9
3 × = 4 ×
3 × 8 = 4 ×
24 = 4 ×
4 × = 24
= 24 ÷ 4
= 6
4 × = 60
= 60 ÷ 4
= 15
6 × = 72
= 72 ÷ 6
= 12
45 ÷ = ÷ 4
45 ÷ 9 = ÷ 4
÷ 4 = 5
= 5 × 4
= 20
12
9
8
15
6
20
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If you were able to complete the last few pages, then you are ready for the next level of algebraic thinking. This time you have to work a bit harder to find the value of the first unknown. However it is easy if you follow these steps and look very closely at the clues. There are clues within the clues!This page is a worked example. Each step is worked through to help you do this on your own on the next few pages.
Find the value of:
Clue 2 tells us that: + = + Looking at Clue 1, we can swap the star and triangle for 2 circles:
+ + + = 20 So, = 5
Clue 3 tells us that: = + 4
Looking at Clue 2, we can swap the star for the triangle plus 4, so:
+ + 4 = + We know is 5, so: + + 4 = 10
Use the balance strategy + + 4 = 10 – 4
+ = 6So, = 3
Now that we know the value of the triangle, we can find out the value of the star with Clue 3:
Clue 3 = + 4
= 7
By looking closely at the clues, we have found out the value of all 3 symbols:
= 5
= 3
= 7
Algebraic thinking – making connections between unknown values
Clue 1 + + + = 20
Clue 2 + = + Clue 3 = + 4
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Patterns and Algebra2
Algebraic thinking – making connections between unknown values
This page is very similar to the last page. There are step prompts to help you along the way.
Find the value of these 3 symbols: =
You must look closely at each clue. =
There are hints along the way. =
Clue 2 tells us that: + =
Looking at Clue 1, we can swap the star and triangle for a circle. Now we have + = 50.
+ = So, =
Clue 3 tells us that: = + 15
Looking at Clue 2, we can swap the star for the triangle plus 15 so we have:
+ + 15 =
We know is ______ , so: + + 15 =
Use the balance strategy + =
+ =
So, =
Now that we know the value of the triangle, we can find out the value of the star with Clue 3:
Clue 3 = + 15
=
5
Clue 1 + + = 50
Clue 2 + = Clue 3 = + 15
50 25
25
25
25 – 15
10
5
20
5
20
25
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Patterns and Algebra 2
Algebraic thinking – making connections between unknown values
This time, there are 2 activities where you must use the clues. One has step prompts, the other does not:
a Find the value of these 2 symbols: =
You must look closely at each clue. =
There are hints along the way.
Clue 1 tells us that:
+ =
Looking at Clue 2, this means that:
+ =
So, =
We know the value of , so we can put this into Clue 3:
Clue 3 =
–
So, =
Clue 1 + = Clue 2 + + = 200
Clue 3 = – 50
Clue 1 + + = 100
Clue 2 + = Clue 3 = + 40
6
b Find the value of these 3 symbols: =
You must look closely at each clue. =
=
Clue 1 Clue 2 Clue 3
100
50
200
100
100
50
50
10
40
50
+ + = 100
+ = 100
= 50
+ =
+ 10 = 50
= 50 – 10
= 40
= + 40
50 = + 40
+ 40 = 50
= 50 – 40
= 10
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What to do next
What to do Can you work out how much was spent on each present?
Label each present with the amount it is worth.
Present puzzle solve
Three students each brought in some presents for the Christmas charity drive. Each student spent $36.
Getting ready
$9 $6 $5
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Patterns and Algebra 2
What to do next
What to do Read the clues for Competition 1 and look carefully
at how to solve the problem. This will help you win Competition 2.
Competition 1 clues1 There are 36 lollies in the box which are a mixture
of choc drops, mallow swirls and caramel dreams.2 The number of mallow swirls equals four times the
number of choc drops.3 The number of caramel dreams is equal to the
number of mallow swirls.
Competition 2 clues
See if you could win this box of lollies by using these 3 clues to work out the exact contents in the box. Follow the same steps as shown to you in Competition 1.
1 There are 84 lollies in the box which are a mixture of hokey pokies, pep up chews and chomp stix.
2 The number of pep up chews equals twice the number of chomp stix.3 The number of hokey pokies equals double the number of pep up chews.
The lolly box solve
Miss Harley, the class teacher of 6H, enjoys getting her class to think mathematically by holding guessing competitions. Her most famous guessing competition was when she asked 6H to guess the number of cocoa puffs in a bowl if she used 250 mL of full cream milk.
In her 2 latest competitions, she has said that the person who correctly guesses the exact contents of the box gets to take home all the lollies. This time she has given clues.
Look at the 3 types of lollies as 3 different groups. For every 1 choc drop, there are 4 mallow swirls and 4 caramel dreams.
So 9 × = 36
That means = 4
So there are:4 choc drops16 mallow swirls16 caramel dreams
Choc drops
Mallow swirls
Caramel dreams
= =
Chomp stix Pep up chews Hokey pokies
= =
Getting ready
7 × = 84
= 12
12 chomp stix, 24 pep up chews and 48 hokey pokies
12 + 24 + 48 = 84
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Patterns and Algebra3
Using the balance strategy, solve each equation and then match the letters to the answers to solve this riddle: What gets wetter and wetter the more that it dries? The first one has been done for you:
Use the balance strategy to find out the value of y:
Solving equations – introducing pronumerals
Algebra normally uses letters of the alphabet to stand for unknown parts of an equation. These letters are known as pronumerals and are used in the same manner as symbols such as stars, triangles and boxes. Common letters used in algebra are: x, y, a, b, c, u and v.
– 12 = 38 – 12 = 38 + 12 = 38 + 12 = 50
Same equation
1
2
x – 12 = 38 x – 12 = 38 + 12 x = 38 + 12 x = 50
a y + 6 = 68 b y – 18 = 42 c y × 8 = 72
O x + 9 = 14
x + 9 = 14 – 9
x = 14 – 9
x = 5
W m + 5 = 19
E y – 5 = 29
T y + 8 = 25
A a + 7 = 15
L 8 + x = 24
8 17 5 14 34 16
y = 68– 6
y = 62
y = 42 + 18
y = 60
y = 72 ÷ 8
y = 9
y – 5 = 29 + 5
y = 34
y + 8 = 25 – 8
y = 17
m + 5 = 19 – 5
m = 14
a + 7 = 15 – 7
a = 8
8 + x = 24
x = 24 – 8
x = 16
A T O W E L
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Patterns and Algebra 3
For each question, write an equation using the pronumeral x for the mystery number, then solve it.
a The sum of 7 and a mystery number is 26.
b A mystery number increased by 15 is 48.
c A mystery number doubled is 64.
d The difference between a mystery number and 19 is 42.
Solving equations – using pronumerals in an equation
In algebra, pronumerals are used to represent the unknown number or what we are trying to find out. Look at this example:Amity’s teacher gave the class a mystery number question:
“The sum of a mystery number and 18 is 36. What is the number?”
Amity used a pronumeral x to stand for the mystery number. She wrote: x + 18 = 36This is really saying, “mystery number plus 18 is 36.”Next, Amity used the balance strategy to solve the equation:
x + 18 = 36 x + 18 = 36 – 18 x = 18
1
7 + x = 26
x = 26 – 7
x = 19
x + 15 = 48
x = 48 – 15
x = 33
x × 2 = 64
x = 64 ÷ 2
x = 32
x – 19 = 42
x = 42 + 19
x = 61
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Patterns and Algebra3
Find the length of the side of each of these shapes with algebra. Here you will be using pronumerals to represent the unknown number and the balance strategy to solve the equation. The first one has been done for you.
a If the perimeter of this square is 28 cm, find the length of one side. Call the side x.
x × 4 = 28
x × 4 = 28 ÷ 4
x = 28 ÷ 4
x = 7 cm
b The perimeter of this pentagon is 40 cm. Find the length of one side. Call the side y.
y × 5 = 40
Solving equations – using pronumerals in an equation
2
3
Find the value of x and y. First find the value of x by using the balance strategy, then you will be able to find the value of y. Show your working out:
x
y
a x – 15 = 35
x × y = 250
x =
y =
b x × 9 = 72
x × y = 48
x =
y =
c x ÷ 7 = 8
x + y = 60
x =
y =
x – 15 = 35 + 15
x = 50
x ÷ 7 = 8 × 7
x = 56
x × 9 = 72 ÷ 9
x = 8
50 × y = 250
50 × y = 250 ÷ 50
y = 50
8 × y = 48
8 × y = 48 ÷ 8
y = 6
56 + y = 60
56 + y = 60 – 56
y = 4
50 8 5650 6 4
y × 5 = 40 ÷ 5
y = 8
y = 8 cm
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Patterns and Algebra 3
Read the mystery number riddle, then solve using algebra. Write the information as an equation, use y to stand for the unknown. Show all your working:
Solving equations – using pronumerals in an equation
Algebra can help us find out the value of unknowns or mystery numbers. Look at how this perimeter riddle is solved and then solve the rest in the same way. Call each unknown y. The first one has been done for you.
a I am a length between 1 cm and 10 cm. When you add 4 cm to me you get the total length of one side of a square which has a perimeter of 28 cm. What am I?
(y + 4) × 4 = 28
(y + 4) × 4 = 28 ÷ 4
y + 4 = 7
y + 4 = 7 – 4
y = 3 cm
b I am a length between 1 cm and 10 cm. When you add 2 cm to me you get the total length of one side of an octagon which has a perimeter of 40 cm. What am I?
(y + 2) × = 40
(y + 2) × = 40 ÷
y + 2 = –
y = cm
c I am a length between 1 cm and 10 cm. When you add 5 cm to me you get the total length of one side of a pentagon which has a perimeter of 40 cm. What am I?
(y + 5) × 5 = 40
4
5
y + 4
y + 5
y + 2
a I am thinking of a number between 1 and 10. When I add 2, then divide by 3 and multiply by 5, I get 10. What is the number?
(y + ) ÷ × = 10
(y + ) ÷ × = 10 ÷ 5
y + ÷ =
y + =
y =
b I am thinking of a number between 1 and 10. When I add 5, then divide by 4 and multiply by 5, I get 10. What is the number?
8
8 8
5 2
3
(y + 5) × 5 = 40 ÷ 5
y + 5 = 8 – 5
y = 3 cm
2
2
3
3
2
5
5
3
2
2
6
4
×
–
3
2
(y + 5) ÷ 4 × 5 = 10
(y + 5) ÷ 4 × 5 = 10 ÷ 5
(y + 5) ÷ 4 = 2 × 4
y + 5 = 8 – 5
y = 3
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Patterns and Algebra3
Complete the algebraic addition stacks. Here is a simple example to start you off. The blocks underneath must add to give the block above. In this example, 3a + 4a = 7a.
a b
c d
Simplify these statements. The first one has been done for you:
Match these algebraic statements by connecting them with a line:
k + k + k + 6 3k + 6
k + k + k + k k + k + k + 2
3k + 2 4k
6k + k + k + 10 8k + 10
Solving equations – simplifying algebraic statements
An algebraic statement is part of an equation.Sometimes algebraic statements can have the same variable many times.To simplify a + a + a + a + a, we would rewrite it as 5a.5a means 5 × a which is the same as a + a + a + a + a, but is much easier to work with.
1
2
3
a 3k + k + 4k = 8k
c b + b + 5b =
b 6x + 2x + x =
d 8y + 5y – y =
5b
14b
9b 7b
3a
7a
4a
9a
22a
4a
9a
2x
6x 13x
9x 14y 7y
25y
7b
30b
19x 46y
13a
21y
16b
4x
5a
18y
12y
9x
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Patterns and Algebra 3
Solve this riddle in the same way as the questions above: What is as light as a feather but impossible to hold for long?
Your …
Use what you know about algebraic statements to solve these equations:
a 2a + 3a = 15
5a = 15
5a ÷ 5 = 15 ÷ 5
a = 3
Solving equations – simplifying algebraic statements
Remember with algebraic statements, a letter next to a number just means multiply. 6y means 6 × y.You can add and subtract pronumerals that are the same, just like you would for regular numbers 5y + 9y = 14y 20a – 16a = 4a
b 9b – 5b = 24
= 24
÷ = 24 ÷
b =
c 6c – 2c = 36
= 36
÷ = 36 ÷
c =
Use the balance strategy to find out what a is.5a means 5 × a, so with the balance strategy you must do the inverse which is ÷ 5 to both sides.
4
5
H 16r – 4r = 48
A 8i + 5i = 39
B 7m + 2m = 63
R 9p – 2p = 35
T 10f – 3f = 42
E 7x – x = 54
7 5 9 3 6 4
4b 4c
4b 4c4 44 4
6 9
12r = 48
12r ÷ 12 = 48 ÷ 12
r = 4
7p = 35
7p ÷ 7 = 35 ÷ 7
p = 5
13i = 39
13i ÷ 13 = 39 ÷ 13
i = 3
7f = 42
7f ÷ 7 = 42 ÷ 7
f = 6
9m = 63
9m ÷ 9 = 63 ÷ 9
m = 7
6x = 54
6x ÷ 6 = 54 ÷ 6
x = 9
B R E A T H
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Patterns and Algebra3
Getting ready
What to do
What to do next
1 Read the clues.
2 Show your working.
Clue 1 Maya and Josh have 20 candles.
Clue 2 Maya and Lim have 13 candles.
Clue 3 Lim and Josh have 15 candles.
Clue 4 There are 24 candles altogether.
Draw the right amount of candles on each cake:
Happy birthday solve
Three children are having a birthday party.
Can you work out how many candles need to go on each cake?
HINT: If Maya and Josh’s cakes take up 20 candles what is left for Lim?
Happy Birthday Maya Happy Birthday JoshHappy Birthday Lim
24– 20 = 4 (Lim)
x + 4 = 13– 4
x = 9 (Maya)
4 + x = 15– 4
x = 11 (Josh)
11 candles4 candles9 candles
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Patterns and Algebra 3
Use algebra with the clues below to work out the missing prices.
Look carefully at this first example and follow the steps to work out the rest.
Clue 1 A Mango Tango and a Strawberry Squeeze costs $9.
Clue 2 A Mango Tango costs $3 more than a Strawberry Squeeze.
Use algebra to find out the cost of each. Use m for Mango Tango and s for Strawberry Squeeze.
Clue 1 A Cherry Bliss and an Apple Berry cost $12.
Clue 2 A Cherry Bliss costs $1 more than an Apple Berry.
Use algebra to find out the cost of each. Use c for Cherry Bliss and a for Apple Berry.
Squelch juiceteria solve
Getting ready
What to do
You work at Squelch Juiceteria, a popular juice bar serving delicious concoctions to go.
The manager has left you in charge of writing the daily specials on the board. She has texted you the 4 different juices she wants you to write up but forgot to text the prices and now her phone is turned off.
Squelch Juiceteria Specials
Mango Tango Strawberry Squeeze
Cherry BlissApple Berry
m + s = $9
m – s = $3
m + s + m – s = $9 + $3
m + s + m – s = 12
m + m = $12 m =
+ s = $9 s =
Step 2 Combine the clues into one statement to cancel out one unknown:
Step 3 Work out the cost of the second juice:
Step 1 Write clues as algebra:
c + a =
c – a =
Step 2 Combine the clues into one statement to cancel out one unknown:
Step 3 Work out the cost of the second juice:
Step 1 Write clues as algebra:
c + a + c – a = $12 + $1
c + c = $13
c = $6.50
a = $5.50
$3
$12
$1
$6
$6
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Patterns and Algebra4
Check the following sums based on what you know about the order of operations. Correct any that are wrong:
Practise Rule 2, multiplication and division before addition and subtraction:
Practise Rule 3, working from left to right:
Practise Rule 1, doing the brackets first:
Properties of arithmetic – order of operations
Mr Gain wrote this equation on the board: 4 + 5 × 7 = ?Max performed the operation of addition first, then multiplication; Amity performed multiplication first, then addition. Now they are confused—they can’t both be right!We need a set of rules so that we can avoid this kind of confusion. This is why for some number sentences we need to remember the 3 rules for the order of operations. Rule 1 Solve brackets.Rule 2 Multiplication and division before addition and subtraction.Rule 3 Work from left to right.By following the rules, we can see that Amity was right. Rule 2 says you should always multiply before you add.
1
2
3
4
4 + 5 × 7 = 63
4 + 5 × 7 = 39
a 7 + (6 × 9) =
c 100 – (25 ÷ 5) =
b 8 + (4 × 7) =
d 30 ÷ (4 + 11) =
a 100 – 4 × 8 =
c 8 + 6 × 9 =
b 60 + 25 ÷ 5 =
d 2 × 7 – 5 =
a 42 ÷ 6 × 4 =
c 32 + 4 – 16 =
b 46 + 10 – 20 =
d 72 ÷ 8 × 3 =
a 50 – (45 ÷ 9) + 8 = 53
b 100 – (7 × 5) + (30 – 6) = 41
c (60 – 8) × 2 + (16 ÷ 4) – 32 = 140
61
68
28
95
62
20
36
65
36
2
9
27
89
76
4
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Patterns and Algebra 4
Work with a partner to see who can get the biggest number in each round. Roll a die 3 times and write down the numbers in the equation frame. Compare your answers. The biggest answer wins ten points. The winner is the player with the highest score at the end of Round 3.
Round 1: × ( + ) =
Round 2: + × =
Round 3: ( + ) × =
In each word problem there is an equation frame that solves each problem. Use it to solve the problem:
a
b
c
6
7
5
Properties of arithmetic – order of operations
Make these number sentences true by adding an operation (+, –, ×, ÷):
a 96 3 8 = 40
c 84 12 3 = 21
b 16 4 22 = 26
d 100 5 5 = 15
How much was the total bill if 5 people each had a sandwich worth $8 and 2 people had a drink for $3.
What is the total number of people at a party if 12 invitations were sent to couples, 7 people could not make it and 5 people turned up unannounced?
30 children went to the water park. 12 went on the water slides first. The rest went in 3 equal groups to the swimming pool. How many were in one of the groups that went to the pool?
My score: / 30
( × ) + ( × ) =
( × ) – + =
( 30 – 12 ) ÷ =
Don’t forget the order of operations!
÷ ÷
÷÷
+ +
–×
5
12
3 6
$8
2
2
7
$3
5
$46
22
Answers will vary.
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Patterns and Algebra4
Using brackets and changing the order can make it easier to find unknowns. Look at the first question as an example, then try the rest.
Use brackets to show which pairs you should multiply first to make it easier:
Change the order and use brackets to make these equations easier:
a 325 + 61 + 75 =
+ + =
b 24 + 12 + 276 =
+ + =
Use brackets to show which pairs you should add first to make it easier:
Properties of arithmetic – commutative rule
Look at 13 + 16 + 4. The rules say we go from left to right but this sum is easier to answer if we add it like this: (16 + 4) + 13. The commutative rule lets us do this when it is all addition or all multiplication, no matter which order we do this the answer will be the same. But this is only if the sum is all addition or all multiplication. We can use brackets as a signal of what part of the sum to do first. Look at these examples:7 + 34 + 23 = 64 is the same as (7 + 23) + 34 = 642 × 17 × 5 = 170 is the same as (2 × 5) × 17 = 170
1
2
3
4
a 17 + 3 + 8 = b 43 + 18 + 2 = c 62 + 5 + 15 = d 57 + 3 + 16 =
a ( × 12) × 5 = 120
× (12 × 5) = 120
× 60 = 120 ÷ 60
= 2
c 40 + (160 + ) = 300
b ( + 36) + 14 = 100
d 8 × ( × 9) = 144
a 7 × 25 × 4 = b 6 x 8 × 2 = c 50 × 4 × 3 = d 2 × 9 × 8 =
Can you go both ways with subtraction and division?
Look for complements.
28
700
63
96
82
600
461
312
(325
(276
75)
24)
61
12
461
312
76
144
( )
( )
( )
( )
( )
( )
( )
( )
× (36 + 14) = 100
+ 50 = 100– 50
= 50
(8 × 9) × = 144
72 × = 144 ÷ 72
= 2
(40 + 160) + = 300
200 + = 300 – 200
= 100
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Patterns and Algebra 4
a b c
Write equations for these word problems. Once you are sure of which operation to use, order the numbers in way that suits you.
a Adele loves reading books. One weekend she read 8 pages on Friday night, 17 pages on Saturday night and 12 pages on Sunday afternoon. How many pages did she read that weekend?
b Two classes competed to see who could raise the most money for charity over 3 days. 6H raised $85 on Monday, $38 on Tuesday and $15 on Wednesday. 6F raised $75 on Monday, $29 on Tuesday and $25 on Wednesday. How much did each class raise?
c Luke has been collecting aluminium cans for a sculpture he is making. He has been collecting 5 cans a week for the past 13 weeks but still needs double this amount. How many cans does he need in total?
Properties of arithmetic – commutative rule
5 Let’s practise adding numbers in the order that makes it easier to add. Make a path through each number matrix so that the selected numbers add together to make the total in the shaded box. You can’t go diagonally and not all of the numbers need to be used. Start at the bold number:
325 75 42
61 25 82
12 80 70
250
50 150 42
30 120 75
12 180 25
300
15 85 50
85 70 40
120 80 100
400
6
325 75 42
61 25 82
12 80 70
250
50 150 42
30 120 75
12 180 25
300
15 85 50
85 70 40
120 80 100
400
8 + 17 + 12
= (8 + 12) + 17
= 20 + 17
= 37 pages
6H $85 + $38 + $15
= ($85 + $15) + $38
= $100 + $38
= $138
6F $75 + $29 + $25
= ($75 + $25) + $29
= $100 + $29
= $129
5 × 13 × 2
= (5 × 2) × 13
= 10 × 13
= 130 cans
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Patterns and Algebra4
Colour match each step of the distributive rule. For example, colour the equation frame labelled ‘1’ in yellow and look for all the parts that match this equation and colour them yellow too. Then match equation 2 and so on. By matching all 5 equations, you will have the order of the letters that spell the answer to the question below:
1 (30 + 8) × 6 (20 × 2) + (7 × 2) 40 + 14
54 A
2 (20 + 7) × 2 (30 × 6) + (8 × 6) 180 + 48
228 N
3 (10 + 9) × 3 (10 × 3) + (9 × 3) 30 + 27
57 I
4 (40 + 4) × 4 (70 × 3) + (2 × 3) 210 + 6
216 S
5 (70 + 2) × 3 (40 × 4) + (4 × 4) 160 + 16
176 L
What part of a human is in the Guinness Book of Records for reaching the length of 7.51 metres?
Fill in the missing numbers for the multiplications:
The distributive rule says that you can split a multiplication into two smaller multiplications and add them.
53 × 4
(50 + 3) × 4
(50 × 4) + (3 × 4)
200 + 12 = 212
1
Properties of arithmetic – distributive rule
a 64 × 5 =
(60 + 4) × 5
( × 5) + ( × 5)
+
c 56 × 5 =
( + 6 ) × 5
( × 5) + ( × 5)
+ 30
b 73 × 5 =
(70 + 3) × 5
( × 5) + ( × 5)
+
d 84 × 6 =
( + ) × 6
( × 6) + ( × 6)
480 +
2
______1
______2
______3
______4
______5
This comes in handy when the numbers are bigger than normal times tables questions.
320
280 504
365
60
50 80
70
300
50
Y R R
R Y Y
B B B
O G G
G O O
80
250 24
35020
6 4
15
4
4
3
Yellow = Y Red = R Blue = B Orange = O Green = G
N A I L S
SERIES TOPIC
39GCopyright © 3P Learning
Patterns and Algebra 4
Use the distributive rule in reverse to solve this problem:
a Over the weekend Blake’s dad made 5 batches of cupcakes on Saturday and 7 batches on Sunday. How many were in a batch if the total amount that he made was 180?
(5 × ) + (7 × ) = 180
(5 + 7) × = 180
b Jenna and Mel made up a game where if you score a goal you get a certain number of points. Jenna scored 6 goals and Mel scored 5 goals. How many points did they each get if the total number of points was 66?
(6 × ) + (5 × ) = 66
3
4
Fill in the missing numbers for the divisions:
Properties of arithmetic – distributive rule
The distributive rule can help us find unknowns if we reverse the first 2 steps.
(8 × ) + (3 × ) = 88
(8 + 3) × = 88
11 × = 88
= 8
Both 8 and 3 are to be multiplied by the diamond so we can rewrite this as shown in line 2. Then you can use the balance strategy twice to find the value of the diamond.
a 84 ÷ 4 =
(80 + 4) ÷ 4
( ÷ 4) + ( ÷ 4)
+
b 108 ÷ 4 =
(100 + 8) ÷ 4
( ÷ 4) + ( ÷ 4)
+
You can also use the distributive rule with division.
21 27
80 100
20 251 2
4 8
12 × = 180
12 × = 180 ÷ 12
= 15
(6 + 5) × = 66
11 × = 66
11 × = 66 ÷ 11
= 6 points
Jenna 6 × 6 = 36 points
Mel 5 × 6 = 30 points
SERIES TOPIC
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Patterns and Algebra4
Getting ready
What to do
1 After shuffling the cards, place the 8 question cards and 8 answer cards face down in 2 separate arrays like this:
2 Player 1 selects one card from each set and if the question and answer match, then the player takes both cards and has another turn. If they don’t match then Player 1 must return the cards to the same position and then it is Player 2’s turn.
3 Continue until there are no cards left.
4 The player with the most pairs wins. Both players check through the winner’s pairs together.
Equation pairs apply
Practise what you have learned in this topic by playing equation pairs with a friend. You will need to copy both this page and p. 41, then cut out the cards.
7 × (5 + 3) 56
42 ÷ 6 × 4 28
27 + 11 – 8 30
copy
SERIES TOPIC
41GCopyright © 3P Learning
Patterns and Algebra 4
Equation pairs apply
(40 + 6) × 5 230
(20 × 7) + (20 × 4) 220
60 + 25 ÷ 5 65
8 + 6 × 9 62
50 – (45 ÷ 9) + 8 53
42 Series G Topic 1 Assessment
Copyright © 3P Learning
Patterns and functions – part 1 Name ____________________
Use the table to complete the number sequence.
6
9
12
15
18
Position of number 1 2 3 4 5 6 7 8 20
Rule
Number sequence
Circle true or false for each of the following:
a The number in the 6th position is 27 true / false
b The number in the 20th position is 63 true / false
c 32 is in this sequence true / false
d The number in the 100th position is 303 true / false
Complete these decimal number sequences according to the recursive rule:
a Start at 12 and subtract 0.5
b Start at 20 and add 1.5
Skills Not yet Kind of Got it
• Completes recursive number pattern and writes the rule
• Creates a number pattern according to a rule
• Completes and analyses a function number pattern with more than one operation
1
2
3
Figure out the missing numbers in each pattern and write the rule:
a
Rule ____________________
b
Rule ____________________
45 21 13 49 42 28 21
43Series G Topic 1 Assessment
Copyright © 3P Learning
Patterns and functions – part 1 Name ____________________
Use the table to complete the number sequence.
6
9
12
15
18
Position of number 1 2 3 4 5 6 7 8 20
Rule
Number sequence
Circle true or false for each of the following:
a The number in the 6th position is 27 true / false
b The number in the 20th position is 63 true / false
c 32 is in this sequence true / false
d The number in the 100th position is 303 true / false
Complete these decimal number sequences according to the recursive rule:
a Start at 12 and subtract 0.5
b Start at 20 and add 1.5
Skills Not yet Kind of Got it
• Completes recursive number pattern and writes the rule
• Creates a number pattern according to a rule
• Completes and analyses a function number pattern with more than one operation
1
2
3
Figure out the missing numbers in each pattern and write the rule:
a
Rule ____________________
b
Rule ____________________
45 21 13 49 42 28 2137 29 355 14
– 8 – 7
12
20
× 3 +3 × 3 +3 × 3 +3 × 3 +3 × 3 +3 × 3 +3 × 3 +3 × 3 +3 × 3 +3
6 9 12 15 18 21 24 27 63
11.5
21.5
11
23
10.5
24.5
10
26
44 Series G Topic 1 Assessment
Copyright © 3P Learning
Skills Not yet Kind of Got it
• Completes the table to describe a growing pattern
• Completes the rule to describe a growing pattern for each shape
Patterns and functions – part 2 Name ____________________
Complete the table for each sequence of shapes.
a
b Shape 1 Shape 2 Shape 3
Shape number 1 2 3 4 5 6 7 8 9 10 15
Number of squares 1 2 3
Number of circles 3 5 7
Rule for circles Number of circles = Number of squares ____________
Rule for squares Number of squares = Number of circles ____________
1
Shape number 1 2 3 4 5 20
Number of matchsticks 6 10 14
Function rule Number of matchsticks = Shape number × ______ + ______
Shape 1 Shape 2 Shape 3 Shape 4
45Series G Topic 1 Assessment
Copyright © 3P Learning
Skills Not yet Kind of Got it
• Completes the table to describe a growing pattern
• Completes the rule to describe a growing pattern for each shape
Patterns and functions – part 2 Name ____________________
Complete the table for each sequence of shapes.
a
b Shape 1 Shape 2 Shape 3
Shape number 1 2 3 4 5 6 7 8 9 10 15
Number of squares 1 2 3
Number of circles 3 5 7
Rule for circles Number of circles = Number of squares ____________
Rule for squares Number of squares = Number of circles ____________
1
Shape number 1 2 3 4 5 20
Number of matchsticks 6 10 14
Function rule Number of matchsticks = Shape number × ______ + ______
Shape 1 Shape 2 Shape 3 Shape 4
18
4
9
5
11
6
13
7
15
8
17
9
19
10
21
15
31
22 82
4
× 2 + 1
– 1 ÷ 2
2
46 Series G Topic 1 Assessment
Copyright © 3P Learning
Complete the table and answer the questions about these real life functions.
a A car is travelling at a speed of 80 km/hour.
b A pool fills at a rate of 5 litres every minute.
Skills Not yet Kind of Got it
• Works with input and output relationships and rules
• Can write a rule to describe input and output relationships
Complete the function tables.
a
b
Patterns and functions – part 3 Name ____________________
1
2
Rule: × 8 + 1
IN 8 2 10 5 9 6 7 11
OUT
Rule: × ______ + 5
IN 3 6 2 11 20 9 4 5
OUT 23 41 17 71 125
Rule: Number of hours × ______ = Number of km travelled (or total km travelled)
Hours 1 2 3 4 5 6 7 8
Km travelled 80 160 240 320
How long would it take to travel 480 km?
Rule: Number of minutes × ______ = Number of litres (or total litres)
Minutes 5 10 15 20 25 30 35 40
Litres 25 50 75 100
How many litres after 1 hour?
47Series G Topic 1 Assessment
Copyright © 3P Learning
Complete the table and answer the questions about these real life functions.
a A car is travelling at a speed of 80 km/hour.
b A pool fills at a rate of 5 litres every minute.
Skills Not yet Kind of Got it
• Works with input and output relationships and rules
• Can write a rule to describe input and output relationships
Complete the function tables.
a
b
Patterns and functions – part 3 Name ____________________
1
2
Rule: × 8 + 1
IN 8 2 10 5 9 6 7 11
OUT
Rule: × ______ + 5
IN 3 6 2 11 20 9 4 5
OUT 23 41 17 71 125
Rule: Number of hours × ______ = Number of km travelled (or total km travelled)
Hours 1 2 3 4 5 6 7 8
Km travelled 80 160 240 320
How long would it take to travel 480 km?
Rule: Number of minutes × ______ = Number of litres (or total litres)
Minutes 5 10 15 20 25 30 35 40
Litres 25 50 75 100
How many litres after 1 hour?
65 17 81 41 73
400
125
6 hours
300 L
480
150
560
175
640
200
49
59
57
29
89
35
6
80
5
48
Copyright © 3P Learning
Series G Topic 2 Assessment
Skills Not yet Kind of Got it
• Finds the value of an unknown represented by a symbol by using the balance strategy
• Substitutes the value of one symbol to solve both symbols
• Sets out steps correctly
Algebraic thinking Name ____________________
1 Find out the value of both symbols:
a Clue 1 6 × = 36 Clue 2 – = 14
Find out the value of both symbols:
a Clue 1 5 × + 7 = 52
Clue 2 × = 72
Steps for finding 5 × = 52 –
5 × =
× 5 =
= ÷
=
Now you can find
b Clue 1 8 × – 12 = 44
Clue 2 + = 30
Steps for finding
Now you can find
2
49
Copyright © 3P Learning
Series G Topic 2 Assessment
Algebraic thinking Name ____________________
Skills Not yet Kind of Got it
• Finds the value of an unknown represented by a symbol by using the balance strategy
• Substitutes the value of one symbol to solve both symbols
• Sets out steps correctly
1 Find out the value of both symbols:
a Clue 1 6 × = 36 Clue 2 – = 14
Find out the value of both symbols:
a Clue 1 5 × + 7 = 52
Clue 2 × = 72
Steps for finding 5 × = 52 –
5 × =
× 5 =
= ÷
=
Now you can find
b Clue 1 8 × – 12 = 44
Clue 2 + = 30
Steps for finding
Now you can find
2
6 × = 36
= 36 ÷ 6
= 6
8 × = 44 + 12
8 × = 56
× 8 = 56
= 56 ÷ 8
= 7
9 × = 72
= 72 ÷ 9
= 8
7 + = 30
= 30– 7
= 23
– = 14
– 6 = 14
= 14 + 6
= 20
7
45
45
45 5
9
50
Copyright © 3P Learning
Series G Topic 3 Assessment
Solving equations Name ____________________
Write an equation to solve each mystery number question. Use m for the mystery number.
a A mystery number doubled is 84.
b A mystery number increased by 21 is 94.
Skills Not yet Kind of Got it
• Finds the value of an unknown represented by a pronumeral by using the balance strategy
• Writes an equation using pronumerals to solve an unknown
• Sets out steps correctly
Using the balance strategy, solve each equation and then match the letters to solve this riddle:
What belongs to you but others use it more than you do? Your …
1
2
M x + 5 = 25
E m + 9 = 36
A y – 6 = 46
N y + 8 = 32
24 52 20 27
51
Copyright © 3P Learning
Series G Topic 3 Assessment
Solving equations Name ____________________
Write an equation to solve each mystery number question. Use m for the mystery number.
a A mystery number doubled is 84.
b A mystery number increased by 21 is 94.
Skills Not yet Kind of Got it
• Finds the value of an unknown represented by a pronumeral by using the balance strategy
• Writes an equation using pronumerals to solve an unknown
• Sets out steps correctly
Using the balance strategy, solve each equation and then match the letters to solve this riddle:
What belongs to you but others use it more than you do? Your …
1
2
M x + 5 = 25
E m + 9 = 36
A y – 6 = 46
N y + 8 = 32
24 52 20 27
x = 25 – 5
x = 20
y = 46 + 6
y = 52
m = 36 – 9
m = 27
m × 2 = 84
m = 84 ÷ 2
m = 42
m + 21 = 94
m = 94 – 21
m = 73
y = 32 – 8
y = 24
N A M E
52
Copyright © 3P Learning
Series G Topic 4 Assessment
Skills Not yet Kind of Got it
• Understands and applies rules for order of operations
Properties of arithmetic Name ____________________
Check the following sums based on what you know about the order of operations. Correct any that are wrong.
a 40 – (25 ÷ 5) + 6 = 41
b 100 – (5 × 6) + (15 – 5) = 60
c (60 – 8) × 2 + (16 ÷ 4) – 32 = 140
Add brackets to make these equations true.
a 12 – 6 + 4 × 6 = 8 + 7 + 5 × 3
b 9 + 9 × 9 = 20 + 30 × 2 + 10
c 30 × 2 – 8 + 2 = 7 + 6 × 5 + 13
1
2
3
Show what you know about the order of operations.
a 3 + (4 × 4) – 3 – 3 =
c 20 – (36 ÷ 6) + 5 =
e 30 ÷ (3 × 5) + 4 =
b 20 – (25 ÷ 5) × 2 =
d 7 – 2 + (7 × 9) + 8 =
f 36 ÷ (3 × 3) + 5 =
53
Copyright © 3P Learning
Series G Topic 4 Assessment
Skills Not yet Kind of Got it
• Understands and applies rules for order of operations
Properties of arithmetic Name ____________________
Check the following sums based on what you know about the order of operations. Correct any that are wrong.
a 40 – (25 ÷ 5) + 6 = 41
b 100 – (5 × 6) + (15 – 5) = 60
c (60 – 8) × 2 + (16 ÷ 4) – 32 = 140
Add brackets to make these equations true.
a 12 – 6 + 4 × 6 = 8 + 7 + 5 × 3
b 9 + 9 × 9 = 20 + 30 × 2 + 10
c 30 × 2 – 8 + 2 = 7 + 6 × 5 + 13
1
2
3
Show what you know about the order of operations.
a 3 + (4 × 4) – 3 – 3 =
c 20 – (36 ÷ 6) + 5 =
e 30 ÷ (3 × 5) + 4 =
b 20 – (25 ÷ 5) × 2 =
d 7 – 2 + (7 × 9) + 8 =
f 36 ÷ (3 × 3) + 5 =
13 10
19 76
6
( )
( )
( ) ( ) ( )
( )
( )
9
80
76
4
54 Series G Outcomes
Copyright © 3P Learning
RegionTopic 1 Patterns and functions
Topic 2 Equations and equivalence
Topic 3 Solving equations
NSW
PAS3.1a – Records, analyses and describes geometric and number patterns that involve one operation using tables and wordsPAS3.1b – Constructs, verifies and completes number sentences involving the four operations with a variety of numbers• working through a process of building a simple geometric pattern involving multiples,
completing a table of values, and describing the pattern in words• working through a process of identifying a simple number pattern involving only one
operation, completing a table of values, and describing the pattern in words• completing number sentences that involve more than one operation by calculating
missing values• constructing a number sentence to match a problem that is presented in words and requires
finding an unknown• checking solutions to number sentences by substituting the solution into the original question• identifying and using inverse operations to assist with the solution of number sentences
VIC
VELS Number – Level 4
• students construct and use rules for sequences based on the previous term, recursion (for example, the next term is three times the last term plus two), and by formula (for example, a term is three times its position in the sequence plus two)
• students establish equivalence relationships between mathematical expressions using properties such as the distributive property for multiplication over addition
• students identify relationships between variables and describe them with language and words• students recognise that addition and subtraction, multiplication and division are inverse
operations. They use words and symbols to form simple equations. They solve equations by trial and error
QLD
Level 4
Patterns• rules based on the position of terms (combinations of operations)• calculator number patterns• ordered pairs and graphs (with discrete data only)Functions• input −› output (with combinations of operations)• rules relating two sets of data• backtracking (inverse) − with combination of operations• representations of relationships
Series G – Patterns and Algebra
55Series G Outcomes
Copyright © 3P Learning
RegionTopic 1 Patterns and functions
Topic 2 Equations and equivalence
Topic 3 Solving equations
SA3.9
• describes and generalises relationships between measurable attributes as patterns and explains the impact of varying one aspect of the relationship
TAS
Standards 3–4
• emphasising sorting and patterning and beginning to emphasise number as an attribute for patterning e.g. 2 red, 3 blue, 2 red, 3 blue etc, patterns in skip counting and in doubling small numbers
• providing scaffolds such as Venn diagrams and simple charts for sorting and classification and opportunities to record using these organisers
• emphasising patterns in the environment and in cross-curriculum contexts• creating, extending and orally describing repeating patterns with a wide range of materials and
in a range of contexts e.g. movement and music, visual art• recognising patterns in the environment and in daily life e.g. the pattern of meal times, school
events, family celebrations and seasons• using objects, pictures and other symbols to represent problem situations
NT
N 7.3, N.8.3
A 3 Algebra• recognise, complete or continue number sequence involving repeated multiplication or
division by a constant convert a pattern to a number sequence and use this to construct a table of values complete missing numbers in a given table of values
• precisely describe a number pattern in a way that it could be exactly reproducedA 4 Algebra• recognise, complete or continue a number sequence based on repeatedly applying one or two
operations• convert a number sequence to a table of values and determine a rule linking the value of any
term to its position in the sequence• create and manipulate algebraic expressions and equations involving the four operations in
order to determine unknown values and solve problems
Series G – Patterns and Algebra
56 Series G Outcomes
Copyright © 3P Learning
RegionTopic 1 Patterns and functions
Topic 2 Equations and equivalence
Topic 3 Solving equations
WA
PA 18.3• recognises, describes and uses spatial patterns and patterns involving operations on whole
numbers, following and describing rules for linking materials by changes in shape and size or linking terms in a sequence by multiplication or addition-based or subtraction-based strategies
PA 19.3• uses own strategies to maintain equivalence between two quantities or two expressionsA 18a.5Reason about patterns• recognises, describes and uses patterns in numbers and patterns that can be represented by
numbers, involving one or two operations, and follows, compares and explains rules for linking successive terms in a sequence or paired quantities using one or two operations
A 18b.5Understand symbols• uses a letter to represent a variable quantity in an oral or written expression; uses
conventional notation such as indices; links successive terms in a sequence involving one or two operations
ACT
18.LC.9 inverse and equivalence relationships, including how inverse operations enable them to work out related number facts and solve unknown elements of simple equations involving addition and subtraction
18.LC.11 equations (number sentences) and models to represent mathematical problems and situations based around a single operation
Series G – Patterns and Algebra