Difference Of Two Squares (Edexcel IGCSE Maths A (Modular))

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Jamie Wood

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Maths

Difference of Two Squares

What is the difference of two squares?

When a "squared" quantity is subtracted from another "squared" quantity, you get the difference of two squares
- For example:
  - a² - b²
  - 9² - 5²
  - (x + 1)² - (x - 4)²
  - 4m² - 25n², which is (2m)² - (5n)²

How do I factorise the difference of two squares?

a² - b² factorises to (a + b)(a - b)
- This can be shown by expanding the brackets
  - $(a + b) (a - b) = a^{2} - a b + b a - b^{2} = a^{2} - b^{2}$
- The brackets can swap order
  - a² - b² = (a + b)(a - b) = (a - b)(a + b)
  - (but terms inside a bracket cannot swap order)
For example, $x^{2} - 9 = (x + 3) (x - 3)$
- This is the same as $(x - 3) (x + 3)$
- But not the same as $(3 + x) (3 - x)$
  - which expands to $9 - x^{2}$

How can the difference of two squares be made harder?

You may find it used with:
- numbers
  - 7² - 3² = (7+3) (7-3) = (10) (4) = 40
- A combination of square numbers and squared variables
  - 4m² - 9n² = (2m)² - (3n)² = (2m + 3n)(2m - 3n)
- Any other powers which can be written as a difference of two squares
  - a⁴ - b⁴ = (a²)² - (b²)² = (a²+ b²) (a²- b²)
  - r⁸ - t⁶ = (r⁴)² - (t³)² = (r⁴+ t³) (r⁴- t³)
You may also need to take out a common factor first
- $2 x^{2} - 18 = 2 (x^{2} - 9)$ giving $2 (x + 3) (x - 3)$
  - The 2 comes out in front

Can I use the difference of two squares to expand?

Using the difference of two squares to expand is quicker than expanding double brackets and collecting like terms
Brackets of the form (a + b)(a - b) expand to a² - b²
- For example $(2 x + 3) (2 x - 3)$ expands to $4 x^{2} - 9$

Exam Tip

The difference between two squares is often the trick required to complete a harder algebraic question in the exam
- Make sure you are able to spot it!

Worked Example

(a) Factorise $9 x^{2} - 16$ .

Recognise that $9 x^{2}$ and $16$ are both squared terms

Therefore you can factorise using the difference of two squares

Rewrite as a difference of two squared terms

$9 x^{2} - 16 = {(3 x)}^{2} - {(4)}^{2}$

Use the rule $a^{2} - b^{2} = (a + b) (a - b)$

$(3 x + 4) (3 x - 4)$

(b) Factorise $4 r^{2} - t^{4}$ .

Recognise that $4 r^{2}$ and $t^{4}$ are both squared terms

Therefore you can factorise using the difference of two squares

Rewrite as a difference of two squared terms

$4 r^{2} - t^{4} = {(2 r)}^{2} - {(t^{2})}^{2}$

Use the rule $a^{2} - b^{2} = (a + b) (a - b)$

$(2 r + t^{2}) (2 r - t^{2})$

This does not appear to be in the form $a^{2} - b^{2}$

There is a common factor of 2, so take this factor out

$2 (y^{2} - 25)$

You can now see $y^{2} - 25$ which has the form $y^{2} - 5^{2}$

Use the rule $a^{2} - b^{2} = (a + b) (a - b)$

$y^{2} - 25 = (y + 5) (y - 5)$

Now multiply this answer by 2 (leaving the 2 on the outside)

$2 (y + 5) (y - 5)$

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Difference Of Two Squares (Edexcel IGCSE Maths A (Modular))

Revision Note

Difference of Two Squares

What is the difference of two squares?

How do I factorise the difference of two squares?

How can the difference of two squares be made harder?

Can I use the difference of two squares to expand?

Exam Tip

Worked Example

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Author: Jamie Wood