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Multiplying and dividing integers

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visibility 113update 8 months agobookmarkshare

🎯 In this topic you will

Multiply and divide with positive and negative integers
Multiply and divide integers, especially when both are negative
Understand that brackets, indices, and operations follow a particular order

🧠 Key Words

brackets
conjecture
inverse
investigate
product

Show Definitions

brackets: Symbols used in mathematics to group parts of an expression, usually to show which operations to do first.
conjecture: A statement believed to be true based on patterns or reasoning, but not yet proven.
inverse: An operation that reverses the effect of another, such as subtraction undoing addition.
investigate: To explore or examine a mathematical idea or problem in detail to understand it better.
product: The result you get when two or more numbers are multiplied together.

✖️ Multiplying positive and negative integers

3 × 4 = 3 + 3 + 3 + 3 = 12

In a similar way, –3 × 4 = –3 + –3 + –3 + –3 = –12.

5 × 2 = 2 + 2 + 2 + 2 + 2 = 10

In a similar way, 5 × –2 = –2 + –2 + –2 + –2 + –2 = –10.

📘 Worked example

Work out:

a) $6 \times (-4)$ b) $-9 \times 3$

Answer

a) $6 \times 4 = 24$
So $6 \times (-4) = -24$

b) $9 \times 3 = 27$
So $-9 \times 3 = -27$

a) Multiply as if both numbers are positive: $6 \times 4 = 24$. One number is negative, so the answer is negative: $-24$.

b) Multiply $9 \times 3 = 27$. Since only one factor is negative, the result is $-27$.

➗ Division as the inverse of multiplication

Division is the inverse operation of multiplication.

3 × 4 = 12 So 12 ÷ 4 = 3.

This is also true when you divide a negative integer by a positive integer.

–3 × 4 = –12 So –12 ÷ 4 = –3.

The product of a positive and a negative integer is always negative.
For example, 6 × –9 = –54 and –4 × 12 = –48.

The same is true for division. When one integer is positive and the other is negative, the answer is negative. For example, –48 ÷ 6 = –8 and 63 ÷ –7 = –9.

📘 Worked example

Work out:

a) $-20 \div 5$ b) $20 \div (-10)$ c) $5 \times (1 + (-4))$

Answer

a) $20 \div 5 = 4$, so $-20 \div 5 = -4$

b) $20 \div 10 = 2$, so $20 \div (-10) = -2$

c) $1 + (-4) = -3$
$5 \times (1 + (-4)) = 5 \times (-3) = -15$

a) Divide as normal: $20 \div 5 = 4$. Then apply the negative sign: $-20 \div 5 = -4$.

b) Divide $20 \div 10 = 2$, then apply the negative sign because the divisor is negative: $-2$.

c) First, do the addition inside the brackets: $1 + (-4) = -3$.
Then multiply the result by 5: $5 \times (-3) = -15$.

❓ EXERCISES

1. Work out:

a) $3 \times -2$
b) $5 \times -7$
c) $10 \times -4$
d) $6 \times -6$

👀 Show answer

a) $-6$
b) $-35$
c) $-40$
d) $-36$

2. Work out:

a) $-15 \div 3$
b) $-30 \div 6$
c) $-24 \div 4$
d) $27 \div -9$

👀 Show answer

a) $-5$
b) $-5$
c) $-6$
d) $-3$

3. Work out the missing numbers.

a) $9 \times \square = -18$
b) $5 \times \square = -30$
c) $-2 \times \square = -14$
d) $-8 \times \square = -40$

👀 Show answer

a) $-2$
b) $-6$
c) $7$
d) $5$

4. Work out the missing numbers.

a) $-12 \div \square = -3$
b) $18 \div \square = -9$
c) $\square \div 4 = -4$
d) $\square \div 10 = -2$

👀 Show answer

a) $4$
b) $-2$
c) $-16$
d) $-20$

5. The product of two integers is $-10$.
Find the possible values of the two integers.

👀 Show answer

Possible pairs: $-1 \times 10$, $-2 \times 5$, $1 \times -10$, $2 \times -5$

6. Copy and complete this multiplication table.

×	$-3$	$-5$
$5$
$7$

👀 Show answer

×	$-3$	$-5$
$5$	$-15$	$-25$
$7$	$-21$	$-35$

7. Estimate the answers to these calculations by rounding to the nearest whole number.

a) $-3.2 \times 6.8$
b) $9.8 \times -5.35$
c) $-16.1 \div 1.93$
d) $7.38 \div -1.86$

👀 Show answer

a) $-3 \times 7 = -21$
b) $10 \times -5 = -50$
c) $-16 \div 2 = -8$
d) $7 \div -2 = -3.5 \approx -4$

8. Estimate the answers to these calculations by rounding the numbers.

a) $-53 \times 39$
b) $32 \times -61$
c) $-38 \times 9.3$
d) $493 \div -5.1$

👀 Show answer

a) $-50 \times 40 = -2000$
b) $30 \times -60 = -1800$
c) $-40 \times 9 = -360$
d) $500 \div -5 = -100$

9. Work out these calculations. Do the calculation in the brackets first.

a) $3 \times (-6 + 2)$
b) $-4 \times (-1 + 7)$
c) $5 \times (-2 - 4)$
d) $-2 \times (3 - (-7))$

👀 Show answer

a) $3 \times (-4) = -12$
b) $-4 \times 6 = -24$
c) $5 \times (-6) = -30$
d) $-2 \times 10 = -20$

10.

a) Copy and complete these divisions. For example, $-20 \div 2 = -10$.

Division diagram with -20 in the centre and four division paths

b) Can you add any more lines to the diagram? You must divide by a positive integer. The answer must be an integer.
c) Draw a similar diagram with $-28$ in the centre.
d) Compare your answer to part c with a partner’s. Do you agree?

👀 Show answer

a) $-20 \div 2 = -10$, $-20 \div 4 = -5$, $-20 \div 5 = -4$, $-20 \div 10 = -2$
b) No other positive integers divide $-20$ to give whole number answers.
c) Possible answers for $-28$: divide by $2$, $4$, $7$, $14$ → gives $-14$, $-7$, $-4$, $-2$
d) Discuss with your partner if they used the same divisors or different ones.

11. In these diagrams, the integer in a square is the product of the integers in the circles next to it. For example, $-3 \times 4 = -12$.

Copy and complete the diagrams.

Product diagrams with numbers in squares and circles

👀 Show answer

a) Bottom square: $2 \times -5 = -10$.
Left square: $-3 \times 2 = -6$.
Right square: $4 \times -5 = -20$.
b) Top right circle: $-18 \div 6 = -3$.
Bottom right circle: $-12 \div -3 = 4$.
Bottom square: $-5 \times 4 = -20$.
Left square: $6 \times -5 = -30$.

🧠 Think like a Mathematician

Question: Can you complete a diagram using integers that satisfy all given operations? How many solutions are possible?

Equipment: Pencil, paper

Copy the diagram below, placing circles in the corners and squares on the sides.
The numbers inside the circles must be integers.
The number in each square is the result of subtracting the left circle from the right circle.
Use the known values in the squares to find numbers that satisfy the relationships.
Explore whether more than one valid solution exists.

Circle-subtraction diagram showing squares with values −10, −30, −24, −8

Follow-up Questions:

1. What is one possible set of values for the circles that fits all the given differences?

2. Is there more than one way to complete the diagram using integers? Explain.

3. How can you systematically find all possible solutions?

Show Answers

1: One possible solution is top-left = $2$, top-right = $-5$, bottom-right = $6$, bottom-left = $−4$.
2: Yes, multiple solutions are possible. Adding a constant to all four circle values keeps the differences the same.
3: Choose any starting value for one circle (e.g., top-left), then use the subtraction relationships to find the others. The system is underdetermined, so you can generate a family of solutions using the same relative differences.

🍬 Learning Bridge

Now that you've practised multiplying and dividing with both positive and negative numbers, it's time to take things a step further. You'll explore what happens when both numbers are negative — and learn how to solve problems that follow a specific order, using brackets, indices, and operation rules to guide you.

➕➖ Multiplying and dividing integers

You can add and subtract any two integers.

For example:
2 + –4 = –2 –2 + –4 = –6 –2 – 4 = –6 –2 – –4 = 2

You can also multiply and divide a negative integer by a positive one.

For example:
2 × –9 = –18 –6 × 3 = –18 –18 ÷ 3 = –6 20 ÷ –5 = –4

In this section you will investigate how to multiply or divide any two integers. You will use number patterns to do this.

📘 Worked example

Look at this sequence of subtractions.

$3 - 6 = -3$
$3 - 4 = -1$
$3 - 2 = \;$
$3 - 0 = \;$
$3 - (-2) = \;$
$3 - (-4) = \;$

a) Copy the sequence and fill in the missing answers.
b) Write the next three lines in the sequence.
c) Describe any patterns in the sequence.

Answer

$3 - 2 = 1$
$3 - 0 = 3$
$3 - (-2) = 5$
$3 - (-4) = 7$

$3 - (-6) = 9$
$3 - (-8) = 11$
$3 - (-10) = 13$

The first number, 3, does not change.
The number being subtracted decreases by 2 each time.
The answer increases by 2 each time.

This is an arithmetic sequence formed by subtracting increasingly negative values from 3. As the number subtracted becomes more negative, the result increases by 2 each time.

🧠 Think like a Mathematician

Question: What patterns can you find in sequences of multiplications involving negative integers?

Equipment: Pencil, paper, calculator

Study this multiplication sequence:
- $-3 \times 4 = -12$
- $-3 \times 3 = -9$
- $-3 \times 2 = -6$
a) Copy the sequence and write six more terms. Use a pattern to fill in the answers.
b) Describe the patterns in the sequence.
Now try this second multiplication sequence:
- $-5 \times 4 = -20$
- $-5 \times 3 = -15$
- $-5 \times 2 = -10$
c) Copy the sequence and write six more terms. Describe any patterns in the sequence.
d) In the sequences in parts a and c, you have some products of two negative integers. What can you say about the product of two negative integers?
e) Make up a sequence of your own like the ones in a and c.
f) Share your answers to parts d and e with a partner. Are your partner’s sequences correct?

Follow-up Questions:

1. What patterns do you notice in the products as the multiplier decreases?

2. What is the result when two negative numbers are multiplied?

3. Can you describe your own multiplication pattern involving negative integers?

Show Answers

1: Each time the second factor decreases by 1, the product increases by 3 (for −3 × ...), or by 5 (for −5 × ...). The results form arithmetic sequences.
2: The product of two negative numbers is a positive number. For example, $-3 \times -2 = 6$.
3: Example sequence: $-4 \times 5 = -20$, $-4 \times 4 = -16$, ..., leading to $-4 \times -1 = 4$, $-4 \times -2 = 8$, etc.

❓ EXERCISES

12. Work out these multiplications.

a) $5 \times -2$
b) $-5 \times 2$
c) $-5 \times -2$
d) $-2 \times -5$

👀 Show answer

a) $-10$
b) $-10$
c) $10$
d) $10$

13. Work out these multiplications.

a) $-6 \times -4$
b) $-7 \times -7$
c) $-10 \times -6$
d) $-8 \times -11$

👀 Show answer

a) $24$
b) $49$
c) $60$
d) $88$

14. Copy and complete this multiplication table.

Multiplication table with partially completed values

👀 Show answer

Top row: $4 \times -5 = -20$, $4 \times 3 = 12$, $4 \times -8 = -32$
Middle row: $-3 \times -5 = 15$, already given: $-3 \times 3 = -9$, $-3 \times -8 = 24$
Bottom row: already given: $-6 \times -5 = 30$, $-6 \times 3 = -18$, $-6 \times -8 = 48$

15. Work out:

a) $(3 + 5) \times -4$
b) $(-3 + -5) \times -6$
c) $-4 \times (5 - 8)$
d) $-6 \times (-2 - -7)$

💡 Tip

Do the calculation in brackets first.

👀 Show answer

a) $8 \times -4 = -32$
b) $-8 \times -6 = 48$
c) $-4 \times -3 = 12$
d) $-6 \times 5 = -30$

16. Round these numbers to the nearest whole number to estimate the answer.

a) $3.9 \times -6.8$
b) $-11.2 \times 2.95$
c) $(-6.1)^2$
d) $(-4.88)^2$

👀 Show answer

a) $4 \times -7 = -28$
b) $-11 \times 3 = -33$
c) $(-6)^2 = 36$
d) $(-5)^2 = 25$

17.a) Put these multiplications into groups based on the answers:

$3 \times -4$, $-6 \times -2$, $12 \times 1$, $-4 \times -3$, $2 \times -6$, $-12 \times -1$

b) Find one more product to put in each group.

👀 Show answer

Group 1 (positive results):
$-6 \times -2 = 12$, $12 \times 1 = 12$, $-4 \times -3 = 12$, $-12 \times -1 = 12$
Extra: $-3 \times -4 = 12$

Group 2 (negative results):
$3 \times -4 = -12$, $2 \times -6 = -12$
Extra: $-1 \times 12 = -12$

18. These are multiplication pyramids.

Multiplication pyramids showing parts of a, b, and c

Each number is the product of the two numbers below it. For example, in a, $2 \times -4 = -8$.

Copy and complete the multiplication pyramids.

👀 Show answer

a) Middle: $2 \times -4 = -8$, $-4 \times -3 = 12$ → Top: $-8 \times 12 = -96$
b) Middle: $-3 \times 5 = -15$, $5 \times -1 = -5$ → Top: $-15 \times -5 = 75$
c) Middle: $-4 \times -5 = 20$, $-5 \times -2 = 10$ → Top: $20 \times 10 = 200$

19.a) Draw a multiplication pyramid like those in Question 8, with the integers $-2$, $3$ and $-5$ in the bottom row, in that order. Complete your pyramid.

b) Is this idea correct?

Idea: If you change the order of the bottom numbers, the number at the top of the pyramid is the same.

Test this idea by changing the order of the numbers in the bottom row of your pyramid.

👀 Show answer

a) $-2 \times 3 = -6$, $3 \times -5 = -15$, then $-6 \times -15 = 90$
b) Try reordering (e.g. $3, -5, -2$ → $3 \times -5 = -15$, $-5 \times -2 = 10$, then $-15 \times 10 = -150$). Result is different, so this idea is not correct.

20. Find the missing numbers in these multiplications.

a) $-3 \times \square = -12$
b) $-5 \times \square = 45$
c) $\square \times -6 = 24$
d) $\square \times -10 = 80$

👀 Show answer

a) $4$
b) $-9$
c) $-4$
d) $-8$

🧠 Think like a Mathematician

Question: How can multiplication statements be written as divisions? Can you spot consistent rules when dividing by negative integers?

Equipment: Pencil, paper

🔎 Reasoning Tip

Conjecture: A conjecture is a possible value based on what you already know.

A multiplication can be written as a division. For example:
$5 \times 8 = 40$ can be written as:
$40 \div 8 = 5$ or $40 \div 5 = 8$
a) Here is a multiplication: $-4 \times 6 = -24$
Write it as a division in two different ways.
b) Write a multiplication of a positive integer and a negative integer. Then write it as a division in two different ways.
c) Here is a multiplication: $-7 \times -2 = 14$
Write it as a division in two different ways.
d) Write a multiplication of two negative integers. Then write it as a division in two different ways.
e) Can you make a conjecture about the answer when you divide an integer by a negative integer? Test your conjecture.
f) Compare your answer with a partner’s. Have you made the same conjectures?

Follow-up Questions:

1. What are two different ways to write $-4 \times 6 = -24$ as a division?

2. What do you notice about division involving a negative divisor?

3. What is your conjecture about dividing by a negative number?

Show Answers

1:$-24 \div 6 = -4$ and $-24 \div (-4) = 6$
2: When dividing by a negative number, the result changes sign. For example, $12 \div (-3) = -4$
3:Conjecture: Dividing a positive number by a negative number gives a negative result; dividing two negative numbers gives a positive result.

❓ EXERCISES

21. Work out these divisions.

a) $18 \div -6$
b) $-28 \div -4$
c) $30 \div -6$
d) $-30 \div -10$
e) $42 \div -6$
f) $-24 \div -4$
g) $60 \div -5$
h) $-25 \div -5$

👀 Show answer

a) $-3$
b) $7$
c) $-5$
d) $3$
e) $-7$
f) $6$
g) $-12$
h) $5$

22. Here are three multiplication pyramids. Copy and complete each pyramid.

Multiplication pyramids labeled a, b, and c

💡 Tip

Remember, division is the inverse of multiplication so you will divide as you work down the pyramid.

👀 Show answer

a) Bottom: $6 \div -1 = -6$ → Middle: $5 \times -1 = -5$ → Top: $-5 \times 6 = -30$
b) Bottom left: $12 \div -2 = -6$ → Bottom right: $-8 \div -2 = 4$ → Top: $12 \times -8 = -96$
c) Middle: $-200 \div -20 = 10$ → Bottom middle: $-20 \div -4 = 5$ → Bottom left: $10 \div 5 = 2$

23. Work out:

a) $(3 \times -4) \div -2$
b) $(2 - 20) \div -3$
c) $(-3 + 15) \div -4$
d) $24 \div (2 \times -4)$

👀 Show answer

a) $-12 \div -2 = 6$
b) $-18 \div -3 = 6$
c) $12 \div -4 = -3$
d) $24 \div -8 = -3$

24. Find the value of $x$.

a) $x \div -4 = 8$
b) $x \div -3 = -15$
c) $16 \div x = -2$
d) $-15 \div x = 3$

👀 Show answer

a) $-32$
b) $45$
c) $-8$
d) $-5$

25. Round these numbers to the nearest whole number to estimate the answer.

a) $-8.75 \div 2.8$
b) $18.1 \div -5.9$
c) $-28.2 \div -3.8$
d) $-35.2 \div -6.9$

👀 Show answer

a) $-9 \div 3 = -3$
b) $18 \div -6 = -3$
c) $-28 \div -4 = 7$
d) $-35 \div -7 = 5$

26. Round these numbers to the nearest 10 to estimate the answer.

a) $-48 \times -29$
b) $-18.1 \times 61.5$
c) $-71.4 \div -11.8$
d) $-99.4 \div 19$

👀 Show answer

a) $-50 \times -30 = 1500$
b) $-20 \times 60 = -1200$
c) $-70 \div -10 = 7$
d) $-100 \div 20 = -5$

📘 What we've learned

We learned how to multiply and divide positive and negative integers.
We used repeated addition to understand multiplication with negative numbers.
We saw that the product of two integers with the same sign is positive, and with different signs is negative.
We used division as the inverse of multiplication: $a \div b = c$ is true if $b \times c = a$.
We practiced applying the rules of signs in worked examples and structured exercises.
We used brackets to group operations and followed the correct order of operations (BIDMAS).
We explored number patterns to discover rules about multiplying and dividing negative integers.
We used multiplication pyramids and reasoning diagrams to investigate integer relationships.
We made and tested conjectures about operations involving negative integers.
We estimated answers by rounding to the nearest whole number or ten.

Multiplying and dividing integers

🎯 In this topic you will

🧠 Key Words

✖️ Multiplying positive and negative integers

➗ Division as the inverse of multiplication

❓ EXERCISES

🧠 Think like a Mathematician

🍬 Learning Bridge

➕➖ Multiplying and dividing integers

🧠 Think like a Mathematician

❓ EXERCISES

💡 Tip

🧠 Think like a Mathematician

🔎 Reasoning Tip

❓ EXERCISES

💡 Tip

📘 What we've learned

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