The full length around a circle is known as its circumference, and a part of the circumference of a circle is called an arc. Arcs can be further classified as follows:
Any arc of a circle has a corresponding central angle formed by the radii which meet the arc at its endpoints.
The measure of the length of an arc is called the arc length. We can calculate this as a portion of the total circumference by considering the central angle of the arc as a portion of a full rotation:
Adjacent arc lengths can be combined by the following postulate:
This theorem is helpful to connect the central angle with the minor arc.
An arc and the radii which form its corresponding central angle border a region inside a circle. We call this region a sector of a circle.
We can find the perimeter of a sector using the arc length formula:
We can calculate the area of the sector in a similar way to its arc length, by taking a portion of the total area of the circle corresponding to the central arc's portion of a full rotation:
For the following sector, where AB = 5 inches:
Find the arc length of \overset{\large\frown}{BC}.
Find the area of the sector.
Consider the given diagram:
Use the Arc addition postulate to write an expression that represents m\overset{\large\frown}{JL}
Find m\overset{\large\frown}{JL}
For the following sector, where AB = 12 feet:
Find the proportion that the given sector is, of a circle with radius 12.
Find the perimeter of the sector.