Kahani98 wrote:
Hi, I have uploaded the question as an attachment. I'd really appreciate if someone could tell me how to solve the question
Thanks
Attachment:
The attachment square.jpg is no longer available
The figure above shows a rectangle inscribed within a square. Now many times greater is the perimeter of the square than the perimeter of the Inscribed rectangle?
A. \(\sqrt{2}\)
B. \(\frac{2 + \sqrt{2}}{2}\)
C. \(2\)
D. \(2 \sqrt{2}\)
E. it cannot be determined from the information given.
Refer diagram.
We know that perimeter of a square is 4a and perimeter of a rectangle is 2(l+b).
Now let side of a square a = x+y.
Let c and d be sides of the rectangle.
To get value of c , we have a right triangle value of c = \(\sqrt{2}\)x.
Similarly value of d will be = \(\sqrt{2}\)y.
Now total perimeter of a rectangle will be 2( \(\sqrt{2}\) x + \(\sqrt{2}\) y ) .
=> 2(\(\sqrt{2}\)(x+y)...
Now perimeter of square is 4(x+y).
Now question asks perimeter of sqaure what times greater than perimeter of rectangle.
4(x+y) = a times * 2(\(\sqrt{2}\))(x+y).
Cancel (x+y) on both sides.
4 = a times * 2(\(\sqrt{2}\)) is possible when a is (\(\sqrt{2}\))
So answer is A.
Hope it clears.
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