Syllabus Edition

First teaching 2021

Last exams 2024

Area & Perimeter (CIE IGCSE Maths: Core)

Revision Note

Test Yourself

Author

Jamie W

Expertise

Maths

Perimeter

What is perimeter?

Perimeter is the total distance around the outside of a 2D shape
It is found by adding the lengths of the sides together
The perimeter of a circle is called the circumference

How do I find the perimeter of a 2D shape?

To find the perimeter of any 2D polygon, add the lengths of its sides together
For any regular 2D shape, the perimeter will be the number of sides, multiplied by the length of one side
- For example, the perimeter of a square of side length x cm will be 4x cm
Often, the shape will not be a straight-forward 2D shape and you will need to use the information given to find the lengths of some of the sides
- Shapes made up of 2 or more 2D shapes are called compound shapes
If the compound shape is made up of two rectangles, for example an L-shape, the length of two shorter sides opposite a longer side will add up to the same as the longer side
If the compound shape is made up of other 2D shapes, you will need to use more information to find the lengths of the individual sides
- To do this you will need to be confident with the properties of 2D shapes
- Look out for sides that are equal, for example in a rectangle, parallelogram, or isosceles triangle.
- Dashes may be used to mark the equal sides, or the question may tell you which sides are equal

Exam Tip

Understanding how to find missing lengths of compound shapes can be essential for questions involving forming algebraic equations
Try it with numbers and then see how that can be transferred to working with algebraic expressions

Worked example

The compound shape below consists of a rectangle with length 5 cm and width 4 cm and a second rectangle of length 15 cm and width 6 cm.

Find the perimeter of the compound shape.

3-5-perimeter-we-diagram

The shape is made up of two rectangles, so all sides meet at right angles
The two shorter sides at the top will be equal to the 15 cm length at the bottom
The missing side on the left will be equal to the sum of the two shorter sides on the right

3-5-perimeter-we-solution-image

You can now find the sum of all the sides to find the total perimeter

P = 5 + 4 + 10 + 6 + 15 + 10 cm

You could also instead consider the four sides of the new, biggest rectangle

P = 2(10 + 15) cm

P = 50 cm

Area

What is area and why do we need to calculate it?

Area is the amount of space taken up by a two-dimensional shape
Volume deals with three-dimensional shapes and space
Some of the uses of area are a little more obvious than in some areas of maths
- Examples include working out the area of a floor if laying a new carpet or the amount of land needed if designing a sports field

How do I find the area of a shape on a square grid?

One of the simplest ways to calculate the area of a shape is using a square grid
Simply count the total number of squares inside the shape
- It is a good idea to shade or mark the squares you have counted so far
There will be a scale, usually each square is 1 cm² (a square with sides of 1 cm) but do check this
Often there will be parts of the shape which do not contain whole squares; they contain half-squares, where the square has been cut in half across its diagonal
- Try to pair-up these half squares to form whole ones

Exam Tip

When counting squares, write down your running total so far in each box
- This saves time and ensures you do not count any squares twice

Worked example

Work out the area of the shaded quadrilateral shown on the 1 cm² grid below.

cie-igce-core-rn-area-we-diagram

Count the number of whole squares, keeping track of which you have counted so far

cie-igce-core-rn-area-we-diagram-2

Count the partially shaded squares. Try to pair-up fractions of the squares to make whole squares

E6YLVyoW_cie-igce-core-rn-area-we-diagram-3

There are 14 whole squares in total, and the shape was drawn on a 1 cm² grid

Total Area = 14 cm²

Area Formulae

Area – using formulae

There are some basic formulae you should know and be comfortable using
Be aware that some area formulae use distances that aren’t necessarily one of the sides of the shape
Make sure you know what the different letters in each formula are referring to

These formulae are essential – anything more complicated will be given in the exam:

Area-Formulae---2D, IGCSE & GCSE Maths revision notes

Exam Tip

You may have to do some work to find the lengths first, e,g, using Pythagoras' Theorem, Trigonometry (SOHCAHTOA) etc

Worked example

The cross section of a sculpture consists of a trapezium, a parallelogram, and a right-angled triangle.

Its dimensions are shown below

3-5-area-formulae-we-diagram

Find the total area of the cross section of the sculpture.

Find the area of the trapezium using $\frac{1}{2} (a + b) h$ .

$\frac{1}{2} (30 + 15) \times 20 = 450 {cm}^{2}$

Find the area of the parallelogram using $b \times h$ .

$15 \times 12 = 180 {cm}^{2}$

Find the area of the right-angled triangle using $\frac{1}{2} b h$ .

$\frac{1}{2} \times 8 \times 7 = 28 {cm}^{2}$

Find the total area

450 + 180 + 28

658 cm²

You've read 0 of your 0 free revision notes

Get unlimited access

to absolutely everything:

Downloadable PDFs
Unlimited Revision Notes
Topic Questions
Past Papers
Model Answers
Videos (Maths and Science)

Join the 100,000+ Students that ❤️ Save My Exams

the (exam) results speak for themselves:

Test yourself Next topic

Did this page help you?

Area & Perimeter (CIE IGCSE Maths: Core)

Revision Note

What is perimeter?

How do I find the perimeter of a 2D shape?

What is area and why do we need to calculate it?

How do I find the area of a shape on a square grid?

Area – using formulae

You've read 0 of your 0 free revision notes

Get unlimited access

Join the 100,000+ Students that ❤️ Save My Exams

Author: Jamie W