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C
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Difficulty:
25%
(medium)
Question Stats:
76% (02:07) correct
24%
(02:19)
wrong
based on 1352
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If the perimeter of square region S and the perimeter of circular region C are equal, then the ratio of the area of S to the area of C is closest to:
A. \(\frac {3}{2}\)
B. \(\frac {4}{3}\)
C. \(\frac {3}{4}\)
D. \(\frac {2}{3}\)
E. \(\frac {1}{2}\)
A. \(\frac {3}{2}\)
B. \(\frac {4}{3}\)
C. \(\frac {3}{4}\)
D. \(\frac {2}{3}\)
E. \(\frac {1}{2}\)
20 Jun 2010, 08:03
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chintzzz
Given: \(P_{square}=4x=2\pi{r}=P_{circle}\) --> \(x=\frac{\pi{r}}{2}\).
\(\frac{A_{square}}{A_{circle}}=\frac{x^2}{\pi{r^2}}=\frac{\pi^2{r^2}}{4\pi{r^2}}=\frac{\pi}{4}\approx(\frac{3}{4})\).
Answer: C.
Similar question: https://gmatclub.com/forum/if-the-perim ... 27004.html
General Discussion
10 Mar 2011, 10:51
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If Perimeter of square = Perimeter of Circle, then:
4a = 2\(\pi\)r, where a = side of square and r is radius of the circle
a/r = \(\pi\)/2
Area of S/Area of C = \(a^2\)/ \(\pi\) \(r^2\)
= \((\pi/2)^2\) * 1/\(\pi\)
= \(\pi\)/4 = 3.14/4
= \(\approx\) 3/4 = C
4a = 2\(\pi\)r, where a = side of square and r is radius of the circle
a/r = \(\pi\)/2
Area of S/Area of C = \(a^2\)/ \(\pi\) \(r^2\)
= \((\pi/2)^2\) * 1/\(\pi\)
= \(\pi\)/4 = 3.14/4
= \(\approx\) 3/4 = C
