Areas related to Circles Class 10 Notes Maths Chapter 12

CBSE Class 10 Maths Notes Chapter 12 Areas related to Circles Pdf free download is part of Class 10 Maths Notes for Quick Revision. Here we have given NCERT Class 10 Maths Notes Chapter 12 Areas related to Circles. According to new CBSE Exam Pattern, MCQ Questions for Class 10 Maths Carries 20 Marks. https://www.cbselabs.com/areas-related-to-circles-class-10-notes/

CBSE Class 10 Maths Notes Chapter 12 Areas related to Circles

Areas Related To Circles Class 10 Notes Chapter 12

Circumference of a circle = 2Ï€r
Area of a circle = Ï€r2 …[where r is the radius of a circle]
Area of a semi-circle = \(\frac { { \pi r }^{ 2 } }{ 2 }\)
Area of a circular path or ring:
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 1
Let ‘R’ and ‘r’ he radii of two circles
Then area of shaded part = Ï€R2 – Ï€r2 = Ï€(R2 – r2) = Ï€(R + r)(R – r)

Minor arc and Major Arc: An arc length is called a major arc if the arc length enclosed by the two radii is greater than a semi-circle.
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 2
If the arc subtends angle ‘θ’ at the centre, then the
Length of minor arc = \(\frac { \theta }{ 360 } \times 2\pi r=\frac { \theta }{ 180 } \times \pi r\)
Length of major arc = \(\left( \frac { 360-\theta }{ 360 } \right) \times 2\pi r\)

Area Related To Circle Class 10 Notes Chapter 12

Sector of a Circle and its Area
A region of a circle is enclosed by any two radii and the arc intercepted between two radii is called the sector of a circle.
(i) A sector is called a minor sector if the minor arc of the circle is part of its boundary.
\(\hat { OAB }\) is minor sector.
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 3
Area of minor sector = \(\frac { \theta }{ 360 } \left( { \pi r }^{ 2 } \right)\)
Perimeter of minor sector = \(2r+\frac { \theta }{ 360 } \left( { 2\pi r } \right) \)

(ii) A sector is called a major sector if the major arc of the circle is part of its boundary.
\(\hat { OACB }\) is major sector
Area of major sector = \(\left( \frac { 360-\theta }{ 360 } \right) \left( { \pi r }^{ 2 } \right)\)
Perimeter of major sector = \(2r+\left( \frac { 360-\theta }{ 360 } \right) \left( { 2\pi r } \right)\)

Area Related To Circle Class 10 Notes Pdf Chapter 12

Minor Segment: The region enclosed by an arc and a chord is called a segment of the circle. The region enclosed by the chord PQ & minor arc PRQ is called the minor segment.
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 4
Area of Minor segment = Area of the corresponding sector – Area of the corresponding triangle
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 5

Major Segment: The region enclosed by the chord PQ & major arc PSQ is called the major segment.
Area of major segment = Area of a circle – Area of the minor segment
Area of major sector + Area of triangle
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 6
Areas related to Circles Class 10 Notes Maths Chapter 12 Img 7

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