Arcs, Sectors, and Central Angles
Arcs, Sectors, and Central Angles
When working with circles, it is important to understand the relationship between the angles at the center of the circle and the pieces of the circle they create.
Degrees and Radians
Before calculating lengths and areas, you need to know how to measure angles. Angles can be measured in degrees or radians. A full circle is 360â, which is exactly equal to 2Ï radians.
This gives us the fundamental conversion ratio: 180â=ÏÂ radians
- To convert radians to degrees: Multiply by Ï180ââ
- To convert degrees to radians: Multiply by 180âÏâ
Example: Convert 65Ïâ radians to degrees. 65ÏâÃÏ180ââ=65Ã180ââ=150â
Arc Length
An arc is a portion of the circumference of a circle. A central angle is an angle whose vertex is at the center of the circle. The length of an arc (s) is directly proportional to its central angle (Ξ).
If the angle is in degrees, the arc length is a fraction of the total circumference (2Ïr): s=360âΞâÃ2Ïr
If the angle is in radians, the formula simplifies beautifully to: s=rΞ
Example: Find the arc length of a 120â arc in a circle with radius 9. s=360â120ââÃ2Ï(9)=31âÃ18Ï=6Ï
Area of a Sector
A sector is a "slice of pie" formed by two radii and the intercepted arc. Just like arc length, the area of a sector (A) is proportional to the central angle.
If the angle is in degrees, the sector area is a fraction of the total circle area (Ïr2): A=360âΞâÃÏr2
If the angle is in radians, the formula is: A=21âr2Ξ
By matching the angle measure (degrees or radians) to the correct formula, you can easily find the exact size of any slice of a circle.