Formulas where Subject Appears Once (Edexcel IGCSE Maths B): Revision Note

Exam code: 4MB1

Simple rearranging

What are formulas?

  • A formula is a rule, definition or relationship between different quantities, written in shorthand using letters (variables)

    • Formulas include an equals sign

  • Some examples you should be familiar with are:

    • The equation of a straight line

      • y = mx + c

    • The area of a trapezium

      • Area = (a + b)h2

    • Pythagoras' theorem

      • a2 + b2 = c2

How do I rearrange formulas?  

  • The letter (variable) that is on its own on one side is called the subject

    • y  is the subject of y = mx + c

  • To make a different letter the subject, we need to rearrange the formula

    • This is also called changing the subject

  • The method is as follows:

    • First, remove any fractions

      • Multiply both sides by the lowest common denominator

    • Then use inverse (opposite) operations to get the variable on its own

      • This is similar to solving equations

  • For example, make x the subject of 5x+62=y

    • First remove fractions

      • Multiply both sides by 2
        5x+6=2y

    • Then get x on its own

      • Subtract 6 from both sides
        5x=2y6

      • Divide both sides by 5
        x=2y65

    • There may be more than one correct way to write an answer

      • The following are acceptable alternative forms 
        x=2y565
        x=2(y3)5
        x=0.4(y3)
        x=0.4y1.2

Should I expand brackets?

  • If the variable is inside the brackets, you can either:

    • expand the brackets

    • or divide both by the coefficient if it is not zero

  • For example, make x the subject of 3(1+x)=y

    • You can expand and then rearrange

      • 3+3x=y

      • 3x=y3

      • x=y33

    • You can divide and then rearrange

      • 1+x=y3

      • x=y31

    • Both answers are equivalent

      • y33 is the same as y31

Examiner Tips and Tricks

Stop and think when you see a bracket. If the variable you are trying to make the subject is not inside the bracket, then you do not need to expand.

For example, to make x the subject of (1+k)x=y, you can simply divide both sides by (1+k) to get x=y1+k.

What if I get fractions in fractions?

  • Some rearrangements can lead to fractions in fractions 

    • x= 3t 2

  • Either rewrite with a divide sign, ÷, then use the method of dividing two fractions

    • x=3t÷2
      x=3t÷21x=3t×12x=32t

  • Or multiply top and bottom by the lowest common denominator of the two fractions and cancel

    • x=  5y  t8 becomes x=  5y×8y  t8×8y=40ty

What if I end up dividing by a negative?

  • Remember that ab (minus below) is the same as ab (minus above) and the same as ab (minus outside)

    • Though be careful, as ab is ab

  • 2x=y3 becomes x=y32 (minus below)

    • This is the same as x=(y3)2 (minus above) or  y32 (minus outside)

      • brackets are required for minus above

      • brackets are assumed for minus outside

    • You can also expand the brackets
      (y3)2=y+32=3y2

Examiner Tips and Tricks

Mark schemes will accept different forms of the same answer, as long as they are correct and fully simplified.

Worked Example

Make x the subject of the following.

(a) 4m+5x=3

Answer:

Get 5x  on its own by subtracting 4m  from both sides

5x=34m

Get x  on its own by dividing both sides by 5

x=34m5

(b) 3t=2x

Answer:

Remove fractions by multiplying both sides by the denominator, x

3tx=2

Get x  on its own by dividing both sides by 3t

x=23t

(c) A=9(14x)2g

Answer:

Remove fractions by multiplying both sides by the denominator, 2g

2gA=9(14x)

is inside the brackets
Expand the brackets to release the x  term

2gA=936x

One way to get x  on its own is by subtracting 9 then dividing by -36
Or you can first add 36 to both sides, to create positive 36x  on the left

2gA+36x=9

Now get x  on its own by subtracting 2gA then dividing by 36

36x=92gAx=92gA36

x=92gA36

Other accepted forms of the answer are 2gA936 ,   (2gA9)36 ,   2gA936 ,   14gA18


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