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26 Apr 2019, 07:02
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The figures above show a sealed container that is a right circular cylinder filled with liquid to \(\frac{1}{2}\) its capacity. If the container is placed on its base, the depth of the liquid in the container is 10 centimeters and if the container is placed on its side, the depth of the liquid is 20 centimeters. How many cubic centimeters of liquid are in the container?
A. \(4,000\pi\)
B. \(2,000\pi\)
C. \(1,000\pi\)
D. \(400\pi\)
E. \(200\pi\)
PS16602.01
Quantitative Review 2020 NEW QUESTION
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ShukhratJon
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28 Apr 2019, 09:36
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28 Apr 2019, 06:35
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cylinder is filled half its capacity. therefore, volume of cylinder = \(\pi\)\(r^{2}\)h and volume of liquid is \(\pi\)\(r^{2}\)h/2
When cylinder is at base the volume of liquid = 10\(\pi\)\(r^{2}\). This is half the capacity. therefore, full capacity =\(\pi\)\(r^{2}\)20
this gives us the height of the cylinder (h)= 20
when cylinder is at side then r=h. therefore, volume of container = \(\pi\)\(20^{2}\)20 = 8000\(\pi\).
we are asked to find out the volume of liquid which is half the capacity of cylinder = 1/2 x8000\(\pi\) = 4000\(\pi\)
When cylinder is at base the volume of liquid = 10\(\pi\)\(r^{2}\). This is half the capacity. therefore, full capacity =\(\pi\)\(r^{2}\)20
this gives us the height of the cylinder (h)= 20
when cylinder is at side then r=h. therefore, volume of container = \(\pi\)\(20^{2}\)20 = 8000\(\pi\).
we are asked to find out the volume of liquid which is half the capacity of cylinder = 1/2 x8000\(\pi\) = 4000\(\pi\)
