Maths-
General
Easy
Question
A Solid sphere and hemisphere have the same total surface areas. Find the ratio of their volumes ?
Hint:
Volume of a sphere ![equals 4 over 3 pi r cubed](data:image/png;base64,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)
Volume of a hemisphere ![equals 2 over 3 pi r cubed](data:image/png;base64,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)
The correct answer is: 1/√2
Explanation:
- We have given a Solid sphere and hemisphere have the same total surface areas
- We have to find the ratio of volumes of sphere and hemisphere
Step 1 of 1:
Let the radius of solid sphere be and hemisphere be r'
![table attributes columnalign right left right left right left right left right left right left columnspacing 0em 2em 0em 2em 0em 2em 0em 2em 0em 2em 0em end attributes row cell 4 pi r squared equals 2 pi r to the power of straight prime 2 end exponent end cell row cell square root of 2 r equals r to the power of straight prime end cell end table](data:image/png;base64,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)
Volume of sphere will be ![V subscript s s end subscript equals 4 over 3 pi r cubed](data:image/png;base64,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)
And volume of hemisphere will be
![V subscript h s end subscript equals 2 over 3 pi r to the power of straight prime 3 end exponent](data:image/png;base64,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)
![equals 2 over 3 pi left parenthesis square root of 2 r right parenthesis cubed](data:image/png;base64,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)
![equals square root of 2 4 over 3 pi r cubed](data:image/png;base64,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)
Now Ratio of their volumes will be
![V subscript S S end subscript over V subscript h s end subscript equals fraction numerator 4 over 3 pi r cubed over denominator square root of 2 4 over 3 pi r cubed end fraction](data:image/png;base64,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)
![V subscript s s end subscript over V subscript h s end subscript equals fraction numerator 1 over denominator square root of 2 end fraction](data:image/png;base64,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)
Now Ratio of their volumes will be
Related Questions to study
Maths-
Bloom’s category: Application
Level: Medium
I) Name the intersection of the lines AB and BF.
II) Name the intersection of the planes ABC and BFG.
![](data:image/png;base64,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)
Bloom’s category: Application
Level: Medium
I) Name the intersection of the lines AB and BF.
II) Name the intersection of the planes ABC and BFG.
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)
Maths-General
Maths-
A square room with 12 m side is to be tiled with square tiles with 2 m side. How many tiles will be required?
A square room with 12 m side is to be tiled with square tiles with 2 m side. How many tiles will be required?
Maths-General
Maths-
The perimeter of the two squares is 12 cm and 24 cm. The area of the bigger square is how many times that of the smaller?
The perimeter of the two squares is 12 cm and 24 cm. The area of the bigger square is how many times that of the smaller?
Maths-General
Maths-
Bloom’s category: Application
Level: Medium
State the relationship of the lines l and m with the page of the notebook (plane).
![](data:image/png;base64,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)
Bloom’s category: Application
Level: Medium
State the relationship of the lines l and m with the page of the notebook (plane).
![](data:image/png;base64,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)
Maths-General
Maths-
A square garden has a boundary of 80 m. Find its area
A square garden has a boundary of 80 m. Find its area
Maths-General
Maths-
Bloom’s category: Application
Level: Medium
The line CD intersects the given plane in a
![](data:image/png;base64,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)
Bloom’s category: Application
Level: Medium
The line CD intersects the given plane in a
![](data:image/png;base64,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)
Maths-General
Maths-
If the sum of the lengths of the diagonals is 144cm. What will be the perimeter of a square ?
If the sum of the lengths of the diagonals is 144cm. What will be the perimeter of a square ?
Maths-General
Maths-
Alex runs along the boundary of a square ground with 8 m side. How much does he run in 3 rounds?
Alex runs along the boundary of a square ground with 8 m side. How much does he run in 3 rounds?
Maths-General
Maths-
Find the perimeter of a square with side 7 cm
Find the perimeter of a square with side 7 cm
Maths-General
Maths-
Two pages of a notebook intersect in _____.
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)
Two pages of a notebook intersect in _____.
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)
Maths-General
Maths-
Bloom’s category: Application
Level: Medium
Two walls of a room intersect in a
Bloom’s category: Application
Level: Medium
Two walls of a room intersect in a
Maths-General
Maths-
Bloom’s category: Understanding
Level: Medium
i) Give another name for RS and PQ.
ii) Identify all the rays with starting point C.
iii) Are the rays PQ and CQ the same?
![](data:image/png;base64,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)
Bloom’s category: Understanding
Level: Medium
i) Give another name for RS and PQ.
ii) Identify all the rays with starting point C.
iii) Are the rays PQ and CQ the same?
![](data:image/png;base64,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)
Maths-General
Maths-
Floor of a square room of side 10 m is to be completely covered with square tiles, each having length 50 cm. Find the smallest number of tiles needed ?
Floor of a square room of side 10 m is to be completely covered with square tiles, each having length 50 cm. Find the smallest number of tiles needed ?
Maths-General
Maths-
![](data:image/png;base64,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)
Identify and name the line, line segment and rays.
![](data:image/png;base64,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)
Identify and name the line, line segment and rays.
Maths-General
Maths-
Name three collinear points
![](data:image/png;base64,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)
Name three collinear points
![](data:image/png;base64,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)
Maths-General