Solving Quadratics by Factorising (Edexcel IGCSE Maths A (Modular))

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Jamie Wood

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Maths

Solving Quadratics by Factorising

How do I solve a quadratic equation using factorisation?

Rearrange it into the form ax² + bx + c = 0
- Zero must be on one side
- It is easier if you rearrange so that a is positive
Factorise the quadratic and solve each bracket equal to zero
- If (x + 4)(x - 1) = 0, then either x + 4 = 0 or x - 1 = 0
  - Because if two things multiply together to give zero,
    - then one or the other of them must be equal to zero
To solve $(x - 3) (x + 7) = 0$
- …solve first bracket = 0:
  - x – 3 = 0
  - add 3 to both sides: x = 3
- …and solve second bracket = 0
  - x + 7 = 0
  - subtract 7 from both sides: x = -7
- The two solutions are x = 3 or x = -7
  - The solutions in this example are the numbers in the brackets, but with opposite signs

What if there are numbers in front of the x's in the brackets?

The process is the same
- There's a bit more work to find the solutions
- You can't just write down the answers by changing the signs
To solve $(2 x - 3) (3 x + 5) = 0$
- …solve first bracket = 0
  - 2x – 3 = 0
  - add 3 to both sides: 2x = 3
  - divide both sides by 2: x = $\frac{3}{2}$
- …solve second bracket = 0
  - 3x + 5 = 0
  - subtract 5 from both sides: 3x = -5
  - divide both sides by 3: x = $- \frac{5}{3}$
- The two solutions are x = $\frac{3}{2}$ or x = $- \frac{5}{3}$

What if x is a factor?

The process is the same
- Just be sure to handle the x correctly
- That 'x as a factor' gives one of the solutions
To solve $x (x - 4) = 0$
- it may help to think of x as (x – 0) or (x)
- …solve first bracket = 0
  - (x) = 0, so x = 0
- …solve second bracket = 0
  - x – 4 = 0
  - add 4 to both sides: x = 4
- The two solutions are x = 0 or x = 4
It is a common mistake to divide (cancel) both sides by x at the beginning
- If you do this you will lose a solution (the x = 0 solution)

How can I use my calculator to help with solving quadratics by factorising?

You can use your calculator to help you to factorise
- A calculator gives solutions to $6 x^{2} + x - 2 = 0$ as x = $- \frac{2}{3}$ and x = $\frac{1}{2}$
  - Reverse the method above to factorise!
  - $6 x^{2} + x - 2 = (3 x + 2) (2 x - 1)$
- Be careful: a calculator also gives solutions to 12x² + 2x – 4 = 0 as x = $- \frac{2}{3}$ and x = $\frac{1}{2}$
  - But 12x² + 2x – 4 ≠ $(3 x + 2) (2 x - 1)$
  - The right-hand side expands to 6x² + ... not 12x² + ...
  - Multiply outside the brackets by 2 to correct this
  - 12x² + 2x – 4 = $2 (3 x + 2) (2 x - 1)$

Exam Tip

Remember that you can check your solutions by either
- substituting them back into the original equation
- using a different quadratic method
- or using a calculator

Worked Example

(a) Solve $(x - 2) (x + 5) = 0$

Set the first bracket equal to zero

x – 2 = 0

Add 2 to both sides

x = 2

Set the second bracket equal to zero

x + 5 = 0

Subtract 5 from both sides

x = -5

Write both solutions together using “or”

x = 2 or x = -5

(b) Solve $(8 x + 7) (2 x - 3) = 0$

Set the first bracket equal to zero

8x + 7 = 0

Subtract 7 from both sides

8x = -7

Divide both sides by 8

x = $- \frac{7}{8}$

Set the second bracket equal to zero

2x - 3 = 0

Add 3 to both sides

2x = 3

Divide both sides by 2

x = $\frac{3}{2}$

Write both solutions together using “or”

x = $- \frac{7}{8}$ or x = $\frac{3}{2}$

Do not divide both sides by x (this will lose a solution at the end)
Set the first “bracket” equal to zero

(x) = 0

Solve this equation to find x

x = 0

Set the second bracket equal to zero

5x - 1 = 0

Add 1 to both sides

5x = 1

Divide both sides by 5

x = $\frac{1}{5}$

Write both solutions together using “or”

x = 0 or x = $\frac{1}{5}$

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Solving Quadratics by Factorising (Edexcel IGCSE Maths A (Modular))

Revision Note

Solving Quadratics by Factorising

How do I solve a quadratic equation using factorisation?

What if there are numbers in front of the x's in the brackets?

What if x is a factor?

How can I use my calculator to help with solving quadratics by factorising?

Exam Tip

Worked Example

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Author: Jamie Wood