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20 Aug 2021, 08:00
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Difficulty:
95%
(hard)
Question Stats:
42% (01:52) correct
58%
(01:57)
wrong
based on 189
sessions
History
Date
Time
Result
Not Attempted Yet
Seven identical square are drawn in the rectangle as shown above. What is the area of one square ?
A. 4
B. 9
C. 16
D. 25
E. 36
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Attachment:
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23 Nov 2021, 02:58
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Official Solution:
Seven identical square are drawn in the rectangle as shown above. What is the area of one square ?
A. \(4\)
B. \(9\)
C. \(16\)
D. \(25\)
E. \(36\)
Consider little right triangle at the bottom right corner of the rectangle. Say its legs are \(x\) and \(y\) and the hypotenuse is \(z\). Notice that the hypotenuse coincides with the side of the square. Place (draw) such right triangles on the sides of other squares as shown in the image below:
Notice that the vertical width of the rectangle equals to \(y+x+x+x+y=17\) and horizontal length equals to \(x+y++y+x+y+y+y=26\)
Solving \(3x+2y=17\) and \(2x+5y=26\) gives \(x=3\) and \(y=4\). Thus, \(z=\sqrt{4^2+3^2}=5\).
Therefore, the area of one square is \(5^2=25\)
Answer: D
Seven identical square are drawn in the rectangle as shown above. What is the area of one square ?
A. \(4\)
B. \(9\)
C. \(16\)
D. \(25\)
E. \(36\)
Consider little right triangle at the bottom right corner of the rectangle. Say its legs are \(x\) and \(y\) and the hypotenuse is \(z\). Notice that the hypotenuse coincides with the side of the square. Place (draw) such right triangles on the sides of other squares as shown in the image below:
Notice that the vertical width of the rectangle equals to \(y+x+x+x+y=17\) and horizontal length equals to \(x+y++y+x+y+y+y=26\)
Solving \(3x+2y=17\) and \(2x+5y=26\) gives \(x=3\) and \(y=4\). Thus, \(z=\sqrt{4^2+3^2}=5\).
Therefore, the area of one square is \(5^2=25\)
Answer: D
General Discussion
20 Aug 2021, 08:55
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Bunuel
A quick way would be estimation
Take the rightmost squares. Green and blue are in straight line and then a purple one on their right. Of course the squares diagonals are not parallel to side 17, but the options are far apart to allow taking them as parallel.
If we take sides of squares as x, then their diagonal will be x\(\sqrt{2}\).
So the side 17 is approximately the size of 2 and half diagonals.
Thus \(2.5*x\sqrt{2}=17…….x=\frac{17\sqrt{2}}{5}\)
Area=\(x^2=\frac{289*2}{25}=11.6*2=23\)
Closest is 25.
D
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