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How to Find the Radius of a Circle? – Explanation with Examples

Home - Education - How to Find the Radius of a Circle? – Explanation with Examples

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The radius of a circle is one of its most fundamental properties. Whether you’re working on geometry problems for school, real-world applications, or design projects, understanding how to find the radius of a circle is essential. In this comprehensive guide, we’ll explain what the radius is, how to find it using various methods, and provide step-by-step examples for each scenario. By the end of this article, you’ll be well-equipped to tackle problems involving circles and their radius.

What is the Radius of a Circle?

The radius of a circle is the distance from the center of the circle to any point on its circumference. It is a constant distance, meaning it remains the same no matter where you measure it along the edge of the circle. The radius is a crucial measurement because it’s used to calculate other important properties of the circle, such as its diameter, circumference, and area.

  • Symbol for radius: The radius is commonly denoted by the letter “r.”
  • Formula: Radius = Diameter/2

The radius is half the diameter of the circle, as the diameter is the distance across the circle through its center.

Now that we understand what the radius is, let’s explore the various ways to find it, depending on the information available.

  1. Finding the Radius When You Know the Diameter

The diameter of a circle is the distance from one point on the circle to another, passing through the center. If you know the diameter, finding the radius is straightforward.

Formula:

 

Radius = Diameter/2​

Example:

Suppose you have a circle with a diameter of 10 cm. To find the radius:

Radius = 10 cm/2 = 5 cm

So, the radius of the circle is 5 cm.

  1. Finding the Radius from the Circumference

The circumference of a circle is the distance around the edge of the circle. To find the radius from the circumference, you can use the following formula:

Formula: 

Circumference = 2πr

Where π (pi) is approximately 3.14159, and r is the radius.

To solve for the radius, rearrange the formula:

r = Circumference/2π​

Example:

Let’s say the circumference of a circle is 31.4 cm. To find the radius, use the formula:

r =  31.4 cm/2×3.14159 = 31.4 cm/6.28318 = 5 cm

So, the radius is approximately 5 cm.

  1. Finding the Radius from the Area of the Circle

The area of a circle is the space enclosed by its circumference. The formula for the area of a circle is:

Formula:

Area = πrˆ2

Where r is the radius.

To find the radius from the area, rearrange the formula to solve for r:

r = sqrt Area/π

Example:

If the area of a circle is 78.5 square cm, you can find the radius as follows:

r = sqrt 78.5 cm/23.14159 = sqrt 25 + 5 cm.

So, the radius of the circle is 5 cm.

  1. Finding the Radius When You Know the Diameter Using the Formula

You may often encounter situations where you are given the diameter and need to calculate the radius using the formula directly. This is a simple approach, especially when the diameter is provided in word problems or geometry exercises. Simply divide the diameter by 2 to get the radius.

Example:

Suppose you have a circle with a diameter of 14 inches. To find the radius, use the formula:

r = 14/2 = 7 inches

So, the radius is 7 inches.

  1. Finding the Radius Using the Pythagorean Theorem

In some cases, especially when working with geometric shapes that involve right triangles, you can use the Pythagorean theorem to find the radius of a circle. This method comes in handy when the circle is inscribed in or circumscribed around a right triangle.

For example, if you have a right triangle inscribed in a circle, and you know the lengths of the two legs of the triangle, you can find the hypotenuse (which will be the diameter of the circle). Then, the radius is simply half of the hypotenuse.

Formula:

 

aˆ2+bˆ2 = cˆ2

Where a and b are the lengths of the legs of the right triangle, and c is the length of the hypotenuse, which will be the diameter of the circle.

Example:

Suppose you have a right triangle with legs of length 3 cm and 4 cm. To find the hypotenuse (diameter of the circle), use the Pythagorean theorem:

3ˆ2+4ˆ2 = cˆ2

9+16 = cˆ2

25 = cˆ2

c = 5 cm

The hypotenuse is 5 cm, so the diameter of the circle is 5 cm. To find the radius:

r = 5/2 = 2.5 cm

So, the radius of the circle is 2.5 cm.

Conclusion:

In summary, there are several ways to find the radius of a circle depending on the information available. Here’s a quick recap of the methods:

  • From the Diameter: r = d/2
  • From the Circumference: r = C/2π
  • From the Area: r = sqrt A/π
  • Using the Pythagorean Theorem: Calculate the hypotenuse of a right triangle and divide it by 2 to find the radius.

Each of these methods provides a different approach to determining the radius based on the given parameters. With practice, these techniques will become second nature, allowing you to solve any problem involving the radius of a circle.

For more detailed explanations and practice problems on how to find the radius of a circle, you can explore resources from Lumos Learning to enhance your skills and understanding.