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05 Feb 2014, 02:19
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A
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Difficulty:
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84% (00:51) correct
16%
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If a square region has area n, what is the length of the diagonal of the square in terms of n ?
(A) \(\sqrt{2n}\)
(B) \(\sqrt{n}\)
(C) \(2\sqrt{n}\)
(D) 2n
(E) 2n^2
(A) \(\sqrt{2n}\)
(B) \(\sqrt{n}\)
(C) \(2\sqrt{n}\)
(D) 2n
(E) 2n^2
05 Feb 2014, 02:20
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SOLUTION
If a square region has area n, what is the length of the diagonal of the square in terms of n ?
(A) \(\sqrt{2n}\)
(B) \(\sqrt{n}\)
(C) \(2\sqrt{n}\)
(D) 2n
(E) 2n^2
The area of a square is \(\frac{diagonal^2}{2}\).
\(\frac{diagonal^2}{2}=n\) --> \(diagonal=\sqrt{2n}\).
Answer: A.
If a square region has area n, what is the length of the diagonal of the square in terms of n ?
(A) \(\sqrt{2n}\)
(B) \(\sqrt{n}\)
(C) \(2\sqrt{n}\)
(D) 2n
(E) 2n^2
The area of a square is \(\frac{diagonal^2}{2}\).
\(\frac{diagonal^2}{2}=n\) --> \(diagonal=\sqrt{2n}\).
Answer: A.
gdediegoi
Joined: 26 Feb 2012
Last visit: 11 Dec 2019
Posts: 12
Concentration: Strategy, International Business
Schools: INSEAD Jan '16
GMAT 1: 640 Q49 V29
05 Feb 2014, 05:03
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Bunuel
Area of square = n,
Hence each of the sides of the square are \(\sqrt{n}\)
Now the sides of any rectangular isosceles triangle have a ratio of 1:1:\(\sqrt{2}\).
Applying this ratio to a rectangular isosceles triangle whose equal sides are \(\sqrt{n}\), the ratio of the sides for this triangle becomes:
\(\sqrt{n}:\sqrt{n}:\sqrt{2}\sqrt{n}\)
Which is equivalent to
\(\sqrt{n} : \sqrt{n} : \sqrt{2n}\)
Answer: A
