please-clarify-the-below-question-Consider-a-square-S-which-is-inside-a-circle-A-such-that-the-four-corner-points-of-the-square-touch-the-circumference-of-the-circle--A-second-circle-B-is-inside-the-s

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please clarify the below question.

Consider a square S which is inside a circle A such that the four corner points of the square touch the circumference of the circle. A second circle B is inside the square S so that its four sides touches the circumference of B. Then, the ratio of the areas of the circle A:B equals :

kindly do the needful

Asked by 11 months ago

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Answers (1)

By , 11 months ago

The radius of outer circle = R
Radius of inner circle = r
Diagonal of Square = Diameter of outer circle

So area of outer circle is twice of area of inner circle.

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