The sum of the perimeter of a circle and square isk, where k is some constant. Prove that the sum of their areas is least whenthe side of square is double the radius of the circle.

The sum of the perimeter of a circle and square isk, where k is some c

1.	The sum of the perimeter of a circle and square isk, where k is some constant. Prove that the sum of their areas is least whenthe side of square is double the radius of the circle.
Answer» Let x be the side of the square and r be the radius of the circle. According to the problem Let P = perimeter of square+ circumference of circle ` rArr P = 4x + 2 pi r` ….(1) Let `A = pi r^(2) + x^(2)` ` = pi r^(2) = ((P-2 pi r )/4)^(2)` [ From eqn. (1)] ` = pi r^(2) + 1/16 (P-2pi r)^(2)` ` rArr (dA)/(dr) = 2 pi r +2/16 (-2pi)(p-2 pi r)` ` = 2 pi r - pi/4 (P-2 pi r)` and ` (d^(2)A)/(dr^(2)) = 2 pi + pi^(2)/2` From maxima/minima ` (dA)/(dr) = 0 ` ` 2 pi r - pi/4 (P-2 pi r) =0` ...(2) ` rArr 2 pi r = pi/4 4 x` ` rArr 2 r = x ` at x = 2r, ` (d^(2)A)/(dr^(2)) gt 0 ` ` rArr` A is minimum. Therefore, total area will be minimum if the side of the square is equal to the diameter of the circle.

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The sum of the perimeter of a circle and square isk, where k is some constant. Prove that the sum of their areas is least whenthe side of square is double the radius of the circle.

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