Math resources Geometry

Circle math

Area of a Circle

Area of a circle

Here you will learn about calculating the area of a circle, including how to calculate the area of a circle given the radius, how to calculate the area of a circle given the diameter and how to calculate the area of a circle given the circumference.

Students will first learn about the area of a circle as a part of geometry in 7 th grade and will expand on their knowledge into high school.

What is the area of a circle?

The area of a circle can be found by using the area of a circle formula which is made by using a specific relationship between the radius of a circle and its area. The formula to find the area of a circle is pi times the square of the radius r.

Area of a circle formula:

\pi\times{r}\times{r}

which is simplified to

\text {Area}=\pi{r^2}

Area of a Circle 1 US

For example,

What is the area of a circle with radius 3 \, cm?

Area of a Circle 2 US

\begin{aligned}\text {Area}&=\pi{r^2} \\\\ &=\pi\times{3^2} \\\\ &=9\pi\mathrm{~cm}^{2} \\\\ &=28.3\mathrm{~cm}^{2} \text{ (1 dp)} \end{aligned}

What is pi?

\pi (pronounced pi) represents the ratio of the circumference of a circle to its diameter. Pi is a special mathematical constant.

For all circles, if you divide the length of the circumference by the length of the diameter, you get the value \pi.

For example,

If the diameter of a circle was 1 \, m, its circumference would be \pi \, m.

\pi is an irrational number which means it cannot be written as a fraction, and in a non recurring decimal has an approximate value of 3.14159…

Sometimes the question may ask you to give the answer ‘in terms of \pi ’.

This means you do not give the numerical answer when you multiply it by \pi.

For example, 6\times\pi=6\pi is an answer given in terms of pi.

What is the area of a circle?

What is the area of a circle?

Common Core State Standards

How does this relate to 7 th grade math?

  • Grade 7: Geometry (7.G.B.4)
    Know the formulas for the area and circumference of a circle and use them to solve problems; give an informal derivation of the relationship between the circumference and area of a circle.

[FREE] Area Worksheet (Grade 4 to 6)

[FREE] Area Worksheet (Grade 4 to 6)

[FREE] Area Worksheet (Grade 4 to 6)

Use this quiz to check your grade 4 to 6 students’ understanding of area. 15+ questions with answers covering a range of 4th, 6th and 7th grade area topics to identify areas of strength and support!

DOWNLOAD FREE
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[FREE] Area Worksheet (Grade 4 to 6)

[FREE] Area Worksheet (Grade 4 to 6)

[FREE] Area Worksheet (Grade 4 to 6)

Use this quiz to check your grade 4 to 6 students’ understanding of area. 15+ questions with answers covering a range of 4th, 6th and 7th grade area topics to identify areas of strength and support!

DOWNLOAD FREE

How to calculate the area of a circle

IIn order to calculate the area of a circle, you will:

  1. Find the radius of the circle.
  2. Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.
  3. State answer with the correct units.

Area of a circle examples

Example 1 : calculating the area of the circle given the radius

A circle has a radius of 6\mathrm{~cm}. Calculate its area. Give your answer to 2 \text{ dp}.

Area of a Circle 3 US

  1. Find the radius of the circle.

The length of the radius is given in the question, r=6\mathrm{~cm}.

2Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.

\begin{aligned}A&=\pi{r^2} \\\\ &=\pi\times{6^2} \\\\ &=36\pi \\\\ &=113.0973355 ... \\\\ &=113.10\text{ (2 dp)} \end{aligned}

3State answer with the correct units.

113.10\mathrm{~cm}^2

Example 2 : calculating the area of the circle given the diameter

A circle has a diameter of 10\mathrm{~mm}. Calculate its area. Give your answer to 1 \text{ dp}.

Area of a Circle 4 US

Find the radius of the circle.

Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.

State answer with the correct units.

Example 3: area of the circle, given the radius, answer in terms of π.

A circle has a radius of 8\mathrm{~m}. Calculate its area. Give your answer in terms of \pi.

Area of a Circle 5 US

Find the radius of the circle.

Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.

State answer with the correct units.

Example 4 : calculating the area of the circle given the diameter

A circle has a diameter of 420\mathrm{~km}. Calculate its area. Give your answer in terms of \pi.

Area of a Circle 4 US-1

Find the radius of the circle.

Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.

State answer with the correct units.

Example 5 : calculating the area of the circle given the circumference of a circle

A circle has a circumference of 21\mathrm{~cm}. Calculate its area. Give your answer to 2 \text { dp}.

Area of a Circle 7 US

Find the radius of the circle.

Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.

State answer with the correct units.

Example 6 : finding the radius of a circle when given the area

A circle has an area of 16\pi\mathrm{~cm}^2. Find the length of the radius.

Find the radius of the circle.

Use the formula \bf{\textbf{A}=\pi \textbf{r}^2} to calculate the area of the circle.

State answer with the correct units.

Teaching tips for area of a circle

  • For students struggling with the area of a circle, make sure that they have the basics down, including the parts of a circle, specifically the diameter and radius.

  • Students need ample opportunities to practice with the area of a circle. The use of worksheets with increased levels of difficulty is an easy way to provide this to students.

  • Use of technology tools, such as an area of a circle calculator or online practice opportunities is a way to engage students and provide another means of practice.

  • Show students real world applications of finding the area of a circle, including finding the area of a pizza or a circle tile within the school. Real-life examples provide students with context as to why the content is important to learn.

Easy mistakes to make

  • Not using the radius
    You must have the radius to find the area of a circle from the formula.
    A question may not give you the radius directly, for example it may give you the diameter. You must use the information given to find the radius of circle first.

  • Not including the correct unit of area
    When working with area you will use square units, including square centimeters (cm^2), square inches (in^2), square meters (m^2), etc.

  • Not giving answer in terms of \bf{\pi}
    Sometimes the question may ask you to give the answer ‘in terms of \pi ’. This means you do not give the numerical answer that is produced when you multiply it by \pi.

    For example,
    6\times \pi=6\pi (this is an answer in terms of pi)
    6\times \pi=18.8495592… (this answer is not in terms of pi)

Practice area of a circle questions

1. A circle has a diameter of 6\mathrm{~cm}. What is the radius of the circle?

6\mathrm{~cm}
GCSE Quiz False

3\mathrm{~cm}
GCSE Quiz True

12\mathrm{~cm}
GCSE Quiz False

6\pi\mathrm{~cm}
GCSE Quiz False

The diameter of the circle is twice the size of the radius. Therefore to find the radius you can divide the diameter by 2.

 

6\div{2}=3\mathrm{~cm}

2. Find the area of the circle. Round your answer to two decimal places.

 

Area of a Circle 8 US

9.42\mathrm{~in}^2
GCSE Quiz False

21.39\mathrm{~in}^2
GCSE Quiz False

28.27\mathrm{~in}^2
GCSE Quiz True

19.26\mathrm{~in}^2
GCSE Quiz False
\begin{aligned}A&=\pi{r^2} \\\\ &=\pi\times{r}\times{r} \\\\ &=\pi\times{3}\times{3} \\\\ &=9\pi \\\\ &=28.2743… \end{aligned}

 

A=28.27\mathrm{~in}^2

3. Find the area of the circle. Give your answer in terms of \pi.

 

Area of a Circle 9 US

40\pi
GCSE Quiz False

26\pi
GCSE Quiz False

158\pi
GCSE Quiz False

169\pi
GCSE Quiz True
\begin{aligned}A&=\pi{r^2} \\\\ &=\pi\times{r^2} \\\\ &=\pi\times{13^2} \\\\ &=169\pi \end{aligned}

4. A circle has a diameter of 360\mathrm{~km}. Calculate its area and give your answer in terms of \pi.

 

Area of a Circle 10 US

32,400\pi
GCSE Quiz True

16,200\pi
GCSE Quiz False

129,600\pi
GCSE Quiz False

62,800\pi
GCSE Quiz False

First, calculate the radius by dividing the diameter by 2.

 

360\div{2}=180\mathrm{~km}

 

Then, use the formula A=\pi{r^2} to find the area.

 

\begin{aligned}A&=\pi{r^2} \\\\ &=\pi\times{r}\times{r} \\\\ &=\pi\times{180}\times{180} \\\\ &=32,400\pi \end{aligned}

5. A circle has a diameter of 425\mathrm{~km}. Calculate its area and give your answer to two decimal places.

 

Area of a Circle 11 US

45,156.25\mathrm{~km}^2
GCSE Quiz False

141,862.54\mathrm{~km}^2
GCSE Quiz True

14,862.54\mathrm{~km}^2
GCSE Quiz False

41,862.54\mathrm{~km}^2
GCSE Quiz False

First, calculate the radius by dividing the diameter by 2.

 

425\div{2}=212.5\mathrm{~km}

 

Then, use the formula A=\pi{r^2} to find the area.

 

\begin{aligned}A&=\pi{r^2} \\\\ &=\pi\times{r}\times{r} \\\\ &=\pi\times{212.5}\times{212.5} \\\\ &=45,156.25\pi \\\\ &=141,862.54\mathrm{~km}^2 \end{aligned}

6. A circle has an area of 100\pi\mathrm{~cm}^2.  Find the length of the radius.

450\mathrm{~cm}
GCSE Quiz False

25\mathrm{~cm}
GCSE Quiz False

30\mathrm{~cm}
GCSE Quiz False

10\mathrm{~cm}
GCSE Quiz True
\begin{aligned}A&=\pi{r^2} \\\\ 100\pi&=\pi{r^2} \end{aligned}

 

Divide both sides by \pi, and you are left with

 

100=r^2

 

Now, take the square root of each side of the equation.

 

\begin{aligned}\sqrt{100}&=\sqrt{r^2} \\\\ 10&=r \\\\ r&=10\mathrm{~cm} \end{aligned}

Area of a circle FAQs

What is the formula for the surface area of a circle?

Surface area typically refers to 3D shapes, so you would not find the surface area of a circle, but the surface area of a sphere. The formula for finding the surface area of a sphere is 4\pi{r^2}.

How do you find the area of a semicircle?

The area of a semicircle is half the area of a circle. You can find the area of the circle using the formula A=\pi{r^2} and then divide it by 2. Or you can use the formula A=\cfrac{1}{2}\times\pi{r^2}.

The next lessons are

  • Sector arcs and segments
  • Circle theorems
  • Prism shape
  • Trigonometry

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