Question
What is the volume of a cylindrical container with base radius 5 cm and height 20 cm?
Hint:
The volume of a cylindrical container with base radius r and height h, is
cubic units.
The correct answer is: The required volume of the cylindrical container is 1571.43 cm3
Explanations:
Step 1 of 1:
Given, r = 5 and h = 20.
Therefore, the volume of the cylindrical container is given by
![pi r squared h](data:image/png;base64,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)
![equals 22 over 7 cross times 5 squared cross times 20](data:image/png;base64,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)
![equals 1571.428](data:image/png;base64,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)
![almost equal to 1571.43 cm cubed](data:image/png;base64,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)
Final Answer:
The required volume of the cylindrical container is 1571.43 cm3
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The velocity v , in meters per second, of a falling object on Earth after t seconds, ignoring the effect of air resistance, is modeled by the equation v = 9.8t . There is a different linear relationship between time and velocity on Mars, as shown in the table below.
![](data:image/png;base64,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)
If an object dropped toward the surface of Earth has a velocity of 58.8 meters per second after t seconds, what would be the velocity of the same object dropped toward the surface of Mars after t seconds, ignoring the effect of air resistance?
Note:
When we get time t = 6 seconds, we can find the answer directly from the options. As 6 is between 4 and 8, and the relation is linear,
so the velocity is between 14.8 metres per second and 29.6 metres per second.
The velocity v , in meters per second, of a falling object on Earth after t seconds, ignoring the effect of air resistance, is modeled by the equation v = 9.8t . There is a different linear relationship between time and velocity on Mars, as shown in the table below.
![](data:image/png;base64,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)
If an object dropped toward the surface of Earth has a velocity of 58.8 meters per second after t seconds, what would be the velocity of the same object dropped toward the surface of Mars after t seconds, ignoring the effect of air resistance?
Note:
When we get time t = 6 seconds, we can find the answer directly from the options. As 6 is between 4 and 8, and the relation is linear,
so the velocity is between 14.8 metres per second and 29.6 metres per second.