Negative & Directed Numbers (Cambridge (CIE) IGCSE International Maths)

Revision Note

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Expertise

Maths

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"

When multiplying and dividing with negative numbers
- Two numbers with the same sign make a positive
  - $(- 12) \div (- 4) = 3$
  - $(- 6) \times (- 4) = 24$
- Two numbers with different signs make a negative
  - $(- 12) \div 4 = - 3$
  - $6 \times (- 4) = - 24$
When adding and subtracting with negative numbers
- Subtracting a negative number is the same as adding the positive
  - e.g. $5 - (- 3) = 5 + 3 = 8$
- Adding a negative number is the same as subtracting the positive
  - e.g. $7 + (- 3) = 7 - 3 = 4$

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

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 $(- 3) \times (- 3) = 9$
  On many calculators, $- 3^{2} = - 9$ but ${(- 3)}^{2} = 9$
  The second one is the required calculation

Complete the following table.

the (exam) results speak for themselves:

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