How to Find Arc Length

Determining the arc length of a circle is easy with these simple formulas
If you're learning about arc lengths in geometry, your teacher probably just assigned you a bunch of problems for homework. You've got the circle's radius and the central angle, so how do you find the length of the arc? Well, you've come to the right place! Arc length is the distance between one endpoint of an arc on a circle to the other. In this article, we'll tell you what formulas you need and how to use them to find a circle's arc length. Read on to learn more!

[Edit]Things You Should Know
When the circle's central angle is measured in degrees, use the formula arc length=2π(r)(θ360){\displaystyle {\text{arc length}}=2\pi (r)({\frac {\theta }{360}})}.
If the central angle is in radians, use the formula arc length=θ(r){\displaystyle {\text{arc length}}=\theta (r)}.
Plug in the circle's radius and the central angle's measurement to solve either formula.
[Edit]Steps
[Edit]Solving When the Central Angle is in Degrees
Set up the formula for arc length. The formula is arc length=2π(r)(θ360){\displaystyle {\text{arc length}}=2\pi (r)({\frac {\theta }{360}})}, where r{\displaystyle r} equals the radius of the circle and θ{\displaystyle \theta } equals the measurement of the arc's central angle, in degrees.[1]
Plug the length of the circle's radius into the formula. This information is typically given to you in a problem. Otherwise, measure the circle's radius with a ruler or protractor. Simply substitute the radius' value for the variable r{\displaystyle r}.
For example, if the circle's radius is 10 cm, set up the formula like this: arc length=2π(10)(θ360){\displaystyle {\text{arc length}}=2\pi (10)({\frac {\theta }{360}})}.
Insert the value of the arc's central angle into the formula. Typically, the problem you're working on provides this information. Make sure to convert the angle to degrees if it's currently in radians. Then, substitute the central angle's measurement for θ{\displaystyle \theta } in the formula.
For example, if the arc's central angle is 135 degrees, your formula now looks like: arc length=2π(10)(135360){\displaystyle {\text{arc length}}=2\pi (10)({\frac {135}{360}})}.
Multiply the radius by 2π{\displaystyle 2\pi }. If you are not using a calculator, use the approximation π=3.14{\displaystyle \pi =3.14} for your calculations. Rewrite the formula using this new value, which represents the circle's circumference.[2]
For example, your formula now looks like:
arc length=2π(10)(135360){\displaystyle {\text{arc length}}=2\pi (10)({\frac {135}{360}})}
=2(3.14)(10)(135360){\displaystyle =2(3.14)(10)({\frac {135}{360}})}
=(62.8)(135360){\displaystyle =(62.8)({\frac {135}{360}})}
Divide the arc's central angle by 360 degrees. Since a circle has 360 degrees total, dividing the central angle by 360 degrees gives you the portion of the circle that the sector represents. Using this information, find what portion of the circumference the arc length represents.
For example, simplify the formula to get:
arc length=(62.8)(135360){\displaystyle {\text{arc length}}=(62.8)({\frac {135}{360}})}
=(62.8)(.375){\displaystyle =(62.8)(.375)}
Multiply the two numbers together. This gives you the length of the arc.
Solve the formula:
arc length=(62.8)(.375)=23.55{\displaystyle {\text{arc length}}=(62.8)(.375)=23.55}
So, the arc length of a circle with a radius of 10 cm and a central angle of 135 degrees is about 23.55 cm.
[Edit]Solving When the Central Angle is in Radians
Set up the formula for arc length. The formula is arc length=θ(r){\displaystyle {\text{arc length}}=\theta (r)}, where θ{\displaystyle \theta } equals the arc's central angle in radians, and r{\displaystyle r} equals the length of the circle's radius.[3]
Plug the length of the circle's radius into the formula. The math problem you're working on typically provides this information. Just substitute the length of the radius for the variable r{\displaystyle r}.
For example, if the circle's radius is 10 cm, your formula looks like this: arc length=θ(10){\displaystyle {\text{arc length}}=\theta (10)}.
Plug the measurement of the arc's central angle into the formula. When using this formula, the arc's central angle needs to be in radians. If the central angle is in degrees, just convert it into radians.
For example, if the arc's central angle is 2.36 radians, your formula now looks like this: arc length=2.36(10){\displaystyle {\text{arc length}}=2.36(10)}.
Multiply the radius by the arc's central angle. The product gives you the length of the arc.
For example:
arc length=2.36(10)=23.6{\displaystyle {\text{arc length}}=2.36(10)=23.6}
So, the length of an arc of a circle with a radius of 10 cm and a central angle of 23.6 radians, is about 23.6 cm.
[Edit]Practice Problems and Answers
Practice Problems and Answers to Find Arc LengthPractice Problems and Answers to Find Arc Length
[Edit]Video
[Edit]Tips
If you only know the diameter of the circle, just divide the diameter by 2 to get the radius. A circle's radius is half of its diameter.[4] For example, if the diameter of a circle is 14 cm, divide 14 by 2. 14÷2=7{\displaystyle 14\div 2=7}. So, the radius of the circle is 7 cm.
[Edit]References
[Edit]Quick Summary
↑ [v161672_b01]. 19 January 2021.

↑ http://mathbitsnotebook.com/Geometry/Circles/CRArcLengthRadian.html

↑ ​​https://mathbitsnotebook.com/Geometry/Circles/CRArcLengthRadian.html

↑ http://www.mathopenref.com/diameter.html