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प्रश्न
A metal wire, when bent in the form of an equilateral triangle of largest area, encloses an area of 484 `sqrt3` cm2. If the same wire is bent into the form of a circle of largest area, find the area of this circle.
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उत्तर
Let 'a' be the length of each side of an equilateral triangle formed.
Now, the area of an equilateral triangle formed = 484√3 cm2
⇒ `sqrt3/4`a2 = 484√3
⇒ a2 = 4 x 484
⇒ a = 2 x 22 = 44 cm
Then, perimeter of equilateral triangle = 3a = 3 x 44 = 132 cm
Now, length of wire = perimeter of equilateral triangle = circumference of circle
⇒ circumference of circle = 132 cm
⇒ 2πr = 132 .....( r is radius of circle )
⇒ r = `[ 132 xx 7 ]/[ 2 xx 22 ]` = 21 cm
∴ Area of circle = πr2 = `22/7` x 21 x 21 = 1386cm2.
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