Here you will learn perimeter and area of sector of circle formula with examples.
Let’s begin –
What is Sector of a Circle ?
The region bounded by two radii of a circle and the arc intercepted by them is called a sector of the circle.
A sector is measured by the angle which its arc subtends at the centre of the circle.
Also Read : Formula for Length of Arc of Circle with Examples
Perimeter of a Sector Formula
Perimeter = 2r + \(\pi r \theta\over 180\)
Area of a Sector Formula
Area = \(\theta\over 360\) \(\times\) \(\pi r^2\) = \(\pi r^2 \theta\over 360\)
When length of the arc (\(l\)) is given, then area of sector
Area = \(1\over 2\) \(lr\)
Example : A sector is cut from a circle of diameter 21 cm. If the angle of the sector is 150, find its area.
Solution : We have,
Diameter = 21 cm \(\implies\) radius = \(21\over 2\) cm
Angle of sector = 150
Area of the sector = \(\theta\over 360\) \(\times\) \(\pi r^2\) = \(150\over 360\) \(\times\) \(22\over 7\) \(\times\) \(({21\over 2})^2\)
= \(5\over 12\) \(\times\) \(22\over 7\) \(\times\) \(21\over 2\) \(\times\) \(21\over 2\) = \(5\times 11\times 21\over 4\times 2\) = 144.38 \(cm^2\)
Hence, the area of sector is 144.38 \(cm^2\)
Example : The perimeter of a sector of a circle of radius 5.6 cm is 27.2 cm. Find the area of the sector.
Solution : Let O be the centre with radius 5.6 cm, and let OAB be its sector(as shown in figure above) with perimeter 27.2 cm
Then, OA + OB + arc AB = 27.2 cm
\(\implies\) 5.6 + 5.6 + arc AB = 27.2 cm
\(\implies\) arc AB = 16 cm
Area of the sector OAB = \(1\over 2\) \(\times\) radius \(\times\) arc length
= \(1\over 2\) \(\times\) 5.6 \(\times\) 16 = 44.8 \(cm^2\)
Hence, the area of sector is 44.8 \(cm^2\)