Negative & Directed Numbers (Cambridge (CIE) IGCSE International Maths)
Revision Note
Written by: Jamie Wood
Reviewed by: Dan Finlay
Negative & Directed Numbers
What are negative numbers?
Negative numbers are any number less than zero
They may also be referred to as directed numbers
Negative numbers are indicated by a minus sign (-)
To avoid confusion between subtraction and negative numbers, sometimes the following is used:
negative numbers are written in brackets
a longer dash is used for subtraction (—)
the minus for a negative number is raised (superscript), e.g. -4
Negative numbers are read by using the word 'negative' or 'minus' before the value
e.g. -8 would be read/said as "negative eight" or "minus eight"
What are the rules for working with negative numbers?
When multiplying and dividing with negative numbers
Two numbers with the same sign make a positive
Two numbers with different signs make a negative
When adding and subtracting with negative numbers
Subtracting a negative number is the same as adding the positive
e.g.
Adding a negative number is the same as subtracting the positive
e.g.
Where are negative numbers used in real-life?
Temperature is a common context for negative numbers
If the temperature is 3°C, and it cools by 5°C, the new temperature will be -2°C
This is equivalent to 3 - 5 = - 2
If the temperature is -4°C, and it warms up by 6°C, the new temperature will be 2°C
This is equivalent to (-4) + 6 = 2
To explain why (-5) - (-6) = 1, you could think of it as follows:
A room is -5°C, then -6°C of cold air is 'removed'
The room now warms to 1°C
Money and debt is another common context for negative numbers
A negative sign means you owe money
If someone has a debt of $200, and they borrow another $400, their total debt is now $600
This is equivalent to (-200) + (-400) = -600
If someone is in debt by $300, but then pays off $200 of their debt, they are now only $100 in debt
This is equivalent to (-300) + 200 = -100
Examiner Tips and Tricks
Your calculator isn't always as clever as you may think!
Using brackets around negative numbers will always make sure the calculator is doing what you want
e.g. The square of negative three is
On many calculators, but
The second one is the required calculation
Worked Example
Complete the following table.
Calculation | Answer |
---|---|
3 + (-4) |
|
(-5) + (-8) |
|
7 - (-10) |
|
(-8) - (-6) |
|
(-3) × 6 |
|
(-9) × (-2) |
|
(-9) ÷ (-3) |
|
(-10) ÷ 5 |
|
Calculation | Working | Answer |
---|---|---|
3 + (-4) | 3 - 4 | -1 |
(-5) + (-8) | (-5) - 8 | -13 |
7 - (-10) | 7 + 10 | 17 |
(-8) - (-6) | (-8) + 6 | -2 |
(-3) × 6 | 3 × 6 = 18 | -18 |
(-9) × (-2) | 9 × 2 = 18 | 18 |
(-9) ÷ (-3) | 9 ÷ 3 = 3 | 3 |
(-10) ÷ 5 | 10 ÷ 5 = 2 | -2 |
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