Class 10 Exam > Class 10 Notes > Mathematics (Maths) Class 10 > Chapter Notes: Area Related to Circles
Area Related to Circles Class 10 Notes Maths Chapter 11
| Table of contents |
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| Introduction |
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| Area of a Sector of a Circle |
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| Area of Segment of a circle |
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| Solved Examples |
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Introduction
Sector of Circle: The area of a circular region that is bounded by two radii and the arc between them is known as a sector of the circle.
- The portion OAPB of the circle is called the minor sector and the portion OAQB of the circle is called the major sector.
- ∠ AOB is called the angle of the sector.
Arc: An arc is a portion of the circle's circumference.
Chord: A chord is a line segment that joins any two points on the circle's circumference.
Segment of Circle: The area of a circular region that lies between a chord and the corresponding arc is referred to as a segment of the circle.
- A minor segment is made by a minor arc.
- A Major segment is made by a major arc of the circle.
Question for Chapter Notes: Area Related to CirclesTry yourself: What is the area of a circular region that is bounded by two radii and the arc between them known as?View Solution
Area of a Sector of a Circle
Sector: Sector of a Circle is given as part of a Circle enclosed by 2 radii and an arc.
In the diagram, the shaded area OAB is the sector.
Here, θ is the angle subtended by the arc AB on the center O of the circle.
The area of the Sector is given as 
In the whole circle, the angle θ will be 360°
Area of Circle = πr2
Using Unitary Method
Area represented by 360° = πr2
Area represented by
Length of an Arc of a sector of angle θ = 
Solved Examples
Q1: Calculate the area of a sector with a radius of 20 yards and an angle of 90 degrees.
Ans: 
here θ = 90º, r = 20 yards, π = 3.141
= (90º/360º) X 3.141 X (20)2
= (1256.4/4) yards2
= 314.1 yards2
Q2: The area of a sector is 225 m2. If the sector’s radius is 8 m, find the central angle of the sector in radians.
Ans: 
Area of Segment of a circle
In the diagram Shaded portion represents Segment AMB
Area of Segment AMB = Area of Sector OAB- Area of triangle AOB
Solved Examples
Q1: Given that a chord and radius of a circle are each 24 cm. Find the area of the minor circular segment.
Ans: From the diagram, it is clear that ΔOBC is an equilateral triangle.
Hence, the central θ is 60º = π/3 radians
As we know,
Area (A) of a Segment of a Circle in radians = 1/2 X r2 (θ - Sinθ), here
r = 22cm, θ = v
= 1/2 X (24)2 [(π/3 - Sin(π/3)]
= 52.18 cm2
Q2: Find the area of the major segment of a circle if the area of the corresponding minor segment is 88 m2 and the radius is 22 m. Use π = 3.141.
Ans: Area of the major segment = Area of the circle - Area of the minor segment
= πr2 - 88
= [3.141 x (22)2] - 88
= 1432.24 m2
The document Area Related to Circles Class 10 Notes Maths Chapter 11 is a part of the Class 10 Course Mathematics (Maths) Class 10.
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FAQs on Area Related to Circles Class 10 Notes Maths Chapter 11
| 1. What is the formula to find the area of a sector of a circle? |  |
Ans. The formula to find the area of a sector of a circle is (θ/360)πr², where θ is the central angle of the sector in degrees and r is the radius of the circle.
| 2. How do you calculate the area of a segment of a circle? | |
Ans. To calculate the area of a segment of a circle, you first find the area of the sector formed by the segment and then subtract the area of the triangle formed by the segment from the sector's area.
| 3. Can you explain how to find the area of a circle related to circles Class 10? | |
Ans. The area of a circle is given by the formula πr², where r is the radius of the circle. This formula can be used to find the area of a circle in Class 10 mathematics.
| 4. How do you find the area of a sector of a circle when the central angle is given in radians? | |
Ans. When the central angle of a sector of a circle is given in radians, you can use the formula (θ/2) r², where θ is the central angle in radians and r is the radius of the circle.
| 5. What is the difference between the area of a sector and the area of a segment of a circle? | |
Ans. The area of a sector of a circle includes the region enclosed by the two radii and the arc, while the area of a segment of a circle includes the region enclosed by the chord and the arc.
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