Question
Download Solution PDFThree circles of radius 7 cm are placed in such a way that each circle touches the other two. What will be the area of the portion enclosed by these three circles?
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFGiven:-
(1) Three circles of radius(r) 7 cm are placed in
such a way that each circle touches the other two
Formula used:-
(1) Area of a Sector of Circle = (θ /360) × πr2
[ where, r = Radius ]
(2) Area of equilateral triangle = (√3/4 )a2
[where, a = Length of the side ]
Solution:-
We can conclude that the centers of circles form
an equilateral triangle with = r + r = 2r
The area enclosed between circles =
Area of a triangle - 3 (Area of the sector)
The angle subtended by sector in an equilateral triangle = 60
Area of a Sector of Circle = (θ /360) × πr2
⇒ ( 60/360) × (22/7) × 72 ⇒ 77/3
3 (Area of the sector) =77 ----(1)
Area of equilateral triangle = (√3/4 )a2
a = Length of the side = 2r = 2(7) =14 cm
⇒ (√3/4 ) × 142 = 49√3 ---(2)
Subtraction equation(2) - equation(1)
∴ The area enclosed between circles = 49√3 - 77 cm2.
Last updated on May 28, 2025
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