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If a square and a circle have the same perimeter. Which one has a larger area the square or the circle?

+1 vote
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If a square and a circle have the same perimeter. Which one has a larger area the square or the circle?
posted Jun 21, 2017 by anonymous

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2 Answers

+2 votes

If the perimeter is fixed the circle will have the maximum area possible compared to any other shape including that of square.
We can check that as follows.
Let P be perimeter then,
P = 2*π*radius {For Circle} = 4*side {For Square)
therefore
Circle Area = π*radius^(2) = π*(P/(2π))^(2) = P^2/(4π) = 0.07958*P^(2)
Square Area = side^(2) = (P/4)^(2) = P/16 = 0.0625*P^(2)
hence
Circle Area > Square Area

answer Jun 21, 2017 by Tejas Naik
+1 vote

If the side of the square is a, and the radius of the circle is r, then perimeter of the square is 4a and the circle is 2πr.

Given that 4a = 2πr → a = (πr)/2

Hence area of the square = a² or (π²r²)/4 and that of the circle - πr²

So, ratio of the areas = (π²r²)/4 : πr², Multipying by 4/πr² we get π : 4 or 22/7: 4 or multiplying by 7, we get 22 : 28

Therefore, area of the circle is more.

answer Jun 21, 2017 by anonymous



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