Solving Quadratic Equations (Edexcel IGCSE Maths)

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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 to use the side where 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 A × B = 0, then either A = 0 or B = 0
  • Factorise the quadratic and solve each bracket equal to zero
  • To solve open parentheses x minus 3 close parentheses open parentheses x plus 7 close parentheses equals 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 have the opposite signs to the numbers in the brackets
  • To solve open parentheses 2 x minus 3 close parentheses open parentheses 3 x plus 5 close parentheses equals 0
    • …solve “first bracket = 0”
      • 2x – 3 = 0
      • add 3 to both sides: 2x = 3
      • divide both sides by 2: x3 over 2
    • …solve “second bracket = 0”
      • 3x + 5 = 0
      • subtract 5 from both sides: 3x = -5
      • divide both sides by 3: xnegative 5 over 3
    • The two solutions are x = 3 over 2 or xnegative 5 over 3
  • To solve x open parentheses x minus 4 close parentheses equals 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 both sides by x at the beginning - you will lose a solution (the x = 0 solution)

Examiner Tip

  • Use a calculator to check your final solutions!
    • Calculators also help you to factorise (if you're struggling with that step)
    • A calculator gives solutions to 6 x squared plus x minus 2 equals 0 as xnegative 2 over 3  and x1 half
      • "Reverse" the method above to factorise!
      • 6 x squared plus x minus 2 equals open parentheses 3 x space plus space 2 close parentheses open parentheses 2 x space minus space 1 close parentheses
    • Warning: a calculator gives solutions to 12x2 + 2x – 4 = 0 as xnegative 2 over 3 and x1 half
      • But 12x2 + 2x – 4 ≠ open parentheses 3 x plus 2 close parentheses open parentheses 2 x minus 1 close parentheses as these brackets expand to 6x2 + ... not 12x2 + ...
      • Multiply by 2 to correct this
      • 12x2 + 2x – 4 = 2 open parentheses 3 x plus 2 close parentheses open parentheses 2 x minus 1 close parentheses

Worked example

(a)

Solve open parentheses x minus 2 close parentheses open parentheses x plus 5 close parentheses equals 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 open parentheses 8 x plus 7 close parentheses open parentheses 2 x minus 3 close parentheses equals 0
 

Set the first bracket equal to zero

8x + 7 = 0

Subtract 7 from both sides

8x = -7

Divide both sides by 8

xnegative 7 over 8

Set the second bracket equal to zero

2x - 3 = 0

Add 3 to both sides

2x = 3

Divide both sides by 2

x3 over 2

 

Write both solutions together using “or”

x = bold minus bold 7 over bold 8 or xbold 3 over bold 2

(c)

Solve x open parentheses 5 x minus 1 close parentheses equals 0
 

Do not divide both sides by(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

x1 fifth

Write both solutions together using “or”

x = 0 or xbold 1 over bold 5

Solving by Completing the Square

How do I solve a quadratic equation by completing the square?

  • To solve x2 + bx + c = 0 
    • replace the first two terms, x2 + bx, with (x + p)2 - p2 where p is half of b
    • this is called completing the square
      • x2 + bx + c = 0 becomes
        • (x + p)2 - p2 + c = 0 where p is half of b
    • rearrange this equation to make x the subject (using ±√)
  • For example, solve x2 + 10x + 9 = 0 by completing the square
    • x2 + 10x becomes (x + 5)2 - 52
    • so x2 + 10x + 9 = 0 becomes (x + 5)2 - 52 + 9 = 0
    • make x the subject (using ±√)
      • (x + 5)2 - 25 + 9 = 0
      • (x + 5)2 = 16
      • x + 5 = ±√16
      • x  = ±4 - 5
      • x  = -1 or x  = -9
  • If the equation is ax2 + bx + c = 0 with a number in front of x2, then divide both sides by a first, before completing the square 

How does completing the square link to the quadratic formula?

  • The quadratic formula actually comes from completing the square to solve ax2 + bx + c = 0
    • a, b and c are left as letters, to be as general as possible
  • You can see hints of this when you solve quadratics 
    • For example, solving x2 + 10x + 9 = 0 
      • by completing the square, (x + 5)2 = 16 so x  = ± 4 - 5 (from above) 
      • by the quadratic formula,  x equals fraction numerator negative 10 plus-or-minus square root of 64 over denominator 2 end fraction equals negative 5 plus-or-minus 8 over 2 = ± 4 - 5 (the same structure)

Examiner Tip

  • When making x the subject to find the solutions at the end, don't expand the squared brackets back out again!
    •  Remember to use ±√ to get two solutions

Worked example

Solve 2 x squared minus 8 x minus 24 equals 0 by completing the square

Divide both sides by 2 to make the quadratic start with x2 
 

x squared minus 4 x minus 12 equals 0
 

Halve the middle number, -4, to get -2
Replace the first two terms, x2 - 4x, with (x - 2)2 - (-2)2

 

open parentheses x minus 2 close parentheses squared minus open parentheses negative 2 close parentheses squared minus 12 equals 0
 

Simplify the numbers
 

table attributes columnalign right center left columnspacing 0px end attributes row cell open parentheses x minus 2 close parentheses squared minus 4 minus 12 end cell equals 0 row cell open parentheses x minus 2 close parentheses squared minus 16 end cell equals 0 end table
 

Add 16 to both sides
 

open parentheses x minus 2 close parentheses squared equals 16
 

Square root both sides
Include the ± sign to get two solutions

 

x minus 2 equals plus-or-minus square root of 16 equals plus-or-minus 4
 

Add 2 to both sides
 

x equals plus-or-minus 4 plus 2
 

Work out each solution separately

x = 6 or x = -2

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Quadratic Formula

How do I use the quadratic formula to solve a quadratic equation?

  • A quadratic equation has the form:

    ax2 + bx + c = 0 (as long as a ≠ 0)

    • you need "= 0" on one side
  • The quadratic formula is a formula that gives both solutions:
    • x equals fraction numerator negative b plus-or-minus square root of b squared minus 4 a c end root over denominator 2 a end fraction
  • Read off the values of a, b and c from the equation
  • Substitute these into the formula
    • write this line of working in the exam
    • Put brackets around any negative numbers being substituted in
  • To solve 2x2 - 7x - 3 = 0 using the quadratic formula:
    • a = 2, b = -7 and c = -3
    • x equals fraction numerator negative open parentheses negative 7 close parentheses plus-or-minus square root of open parentheses negative 7 close parentheses squared minus 4 cross times 2 cross times open parentheses negative 3 close parentheses end root over denominator 2 cross times 2 end fraction
    • Type this into a calculator
      • once with + for  ± and once with - for  ±
    • The solutions are x = 3.886 and x = -0.386 (to 3 dp)
      • Rounding is often asked for in the question
      • The calculator also gives these solutions in exact form (surd form), if required
      • xfraction numerator 7 plus square root of 73 over denominator 4 end fraction and xfraction numerator 7 minus square root of 73 over denominator 4 end fraction

What is the discriminant?

  • The part of the formula under the square root (b2 – 4ac) is called the discriminant
  • The sign of this value tells you if there are 0, 1 or 2 solutions
    • If b2 – 4ac > 0 (positive)
      • then there are 2 different solutions
    • If b2 – 4ac = 0 
      • then there is only 1 solution
      • sometimes called "two repeated solutions"
    • If b2 – 4ac < 0 (negative)
      • then there are no solutions
      • If your calculator gives you solutions with i terms in, these are "complex" and not what we are looking for
    • Interestingly, if b2 – 4ac is a perfect square number ( 1, 4, 9, 16, …) then the quadratic expression could have been factorised!

Can I use my calculator to solve quadratic equations?

  • Yes to check your final answers, but a method must still be shown as above

Examiner Tip

  • Make sure the quadratic equation has "= 0" on the right-hand side, otherwise it needs rearranging first
  • Always look for how the question wants you to leave your final answers
    • for example, correct to 2 decimal places

Worked example

Use the quadratic formula to find the solutions of the equation 3x2 - 2x - 4 = 0, giving your answers correct to 3 significant figures.

Write down the values of a, b and c
 

a = 3, b = -2, c = -4
 

Substitute these values into the quadratic formula, x equals fraction numerator negative b plus-or-minus square root of b squared minus 4 a c end root over denominator 2 a end fraction
Put brackets around any negative numbers
 

x equals fraction numerator negative open parentheses negative 2 close parentheses plus-or-minus square root of open parentheses negative 2 close parentheses squared minus 4 cross times 3 cross times open parentheses negative 4 close parentheses end root over denominator 2 cross times 3 end fraction
 

Input this into a calculator
Use + for ± to get the first solution
 

x = 1.53518...
 

Input this into a calculator a second time
Use - for ± to get the second solution
 

x = 0.86851...
 

Present both answers together (using the word "or" between them)
Round the answers correct to 3 significant figures (note how this affects the number of decimal places)
 

x = 1.54 or x = 0.869

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Mark

Author: Mark

Expertise: Maths

Mark graduated twice from the University of Oxford: once in 2009 with a First in Mathematics, then again in 2013 with a PhD (DPhil) in Mathematics. He has had nine successful years as a secondary school teacher, specialising in A-Level Further Maths and running extension classes for Oxbridge Maths applicants. Alongside his teaching, he has written five internal textbooks, introduced new spiralling school curriculums and trained other Maths teachers through outreach programmes.