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

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.

Area Related to Circles Class 10 Notes Maths Chapter 11

  • 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.

Area Related to Circles Class 10 Notes Maths Chapter 11

  • 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 Circles
Try 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.

Area Related to Circles Class 10 Notes Maths Chapter 11

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  Area Related to Circles Class 10 Notes Maths Chapter 11

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
Area Related to Circles Class 10 Notes Maths Chapter 11

Length of an Arc of a sector of angle θ  = Area Related to Circles Class 10 Notes Maths Chapter 11

Solved Examples

Q1: Calculate the area of a sector with a radius of 20 yards and an angle of 90 degrees.

Ans: Area Related to Circles Class 10 Notes Maths Chapter 11here 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 Related to Circles Class 10 Notes Maths Chapter 11

Area of Segment of a circle 

In the diagram Shaded portion represents Segment AMB

Area Related to Circles Class 10 Notes Maths Chapter 11

Area of Segment AMB = Area of Sector OAB- Area of triangle AOBArea Related to Circles Class 10 Notes Maths Chapter 11

Area Related to Circles Class 10 Notes Maths Chapter 11

Area Related to Circles Class 10 Notes Maths Chapter 11

Solved Examples 

Q1: Given that a chord and radius of a circle are each 24 cm. Find the area of the minor circular segment.

Area Related to Circles Class 10 Notes Maths Chapter 11

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 r(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 

= πr- 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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