Question
A Solid is in the form of a right circular cone mounted on a hemisphere. The radius of hemisphere is 3.5 cm and height of the cone is 4 cm . The solid is placed in a cylindrical vessel , full of water , in such a way that the whole solid is submerged in water. If the radius of cylindrical vessel is 5 cm and its height is 10.5 cm . Find the volume of water left in the cylindrical vessel
Hint:
Volume of hemisphere ![equals 2 over 3 pi r cubed](data:image/png;base64,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)
The correct answer is: 683.84cm3
Explanation:
- We have given a Solid is in the form of a right circular cone mounted on a hemisphere. The radius of hemisphere is 3.5 cm and height of the cone is 4 cm . The solid is placed in a cylindrical vessel , full of water , in such a way that the whole solid is submerged in water. If the radius of cylindrical vessel is 5 cm and its height is 10.5 cm
- We have to find volume of water left in the cylindrical vessel.
Step 1 of 1:
We have given radius of the hemisphere is 3.5cm
Now the solids is in the form of a right circular cone mounted on a hemisphere, then radius of the base of the cone will be equal to radius of the hemisphere.
Radius of the base of the cone is
Height of the cone is
So,
Volume of the solid = volume of the cone + volume of hemisphere.
So,
![V subscript text solid end text end subscript equals 1 third pi r squared h plus 2 over 3 pi r cubed](data:image/png;base64,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)
![equals 1 third pi r squared left parenthesis h plus 2 r right parenthesis](data:image/png;base64,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)
![equals 1 third pi 3.5 squared left parenthesis 4 plus 7 right parenthesis](data:image/png;base64,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)
= 141.109
Now the radius of the base of the cylindrical vessel is 5cm
Height of the cylindrical vessel is 10.5cm
So, Volume of the water in the cylindrical vessel will be
![V equals pi r squared h](data:image/png;base64,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)
![equals 22 over 7 cross times 25 cross times 10.5](data:image/png;base64,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)
= 825cm3
Now, when the solid is completely submerged in the cylindrical vessel full of water,
The
Volume of the water left in the vessel = volume of the water in the vessel – volume of solid
= (825 - 141.16)cm3
= 683.84cm3
Now the radius of the base of the cylindrical vessel is 5cm
Height of the cylindrical vessel is 10.5cm
So, Volume of the water in the cylindrical vessel will be
Now, when the solid is completely submerged in the cylindrical vessel full of water,
The
Volume of the water left in the vessel = volume of the water in the vessel – volume of solid
Related Questions to study
A path of uniform width 4m runs around the outside a rectangular field 24m by 18 m.Find the area of the path ?
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)
A path of uniform width 4m runs around the outside a rectangular field 24m by 18 m.Find the area of the path ?
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)
The perimeter of a rectangle is 28 cm and its length is 8 cm. Find its:
(i) breadth (ii) area
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)
The perimeter of a rectangle is 28 cm and its length is 8 cm. Find its:
(i) breadth (ii) area
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)
How many square tiles of the side 20 cm will be needed to pave a footpath which is 2 m wide and surrounds a rectangular plot 40 m long and 22 m wide.
![](data:image/png;base64,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)
How many square tiles of the side 20 cm will be needed to pave a footpath which is 2 m wide and surrounds a rectangular plot 40 m long and 22 m wide.
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)
A circle has a diameter of 120 metres. Your average walking speed is 4 kilometres per hour. How many minutes will it take you to walk around the boundary of the circle 3 times? Round your answer to the nearest integer.
A circle has a diameter of 120 metres. Your average walking speed is 4 kilometres per hour. How many minutes will it take you to walk around the boundary of the circle 3 times? Round your answer to the nearest integer.
Find the total area in the given figure.
![](data:image/png;base64,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)
As per the given diagram, rectangles EFGC is in rectangular shape. However, all sides of rectangles EFGC are equal to 30 units, making it a square.
Although final answer remains the same, we should ideally consider it to be a square and solve accordingly.
Find the total area in the given figure.
![](data:image/png;base64,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)
As per the given diagram, rectangles EFGC is in rectangular shape. However, all sides of rectangles EFGC are equal to 30 units, making it a square.
Although final answer remains the same, we should ideally consider it to be a square and solve accordingly.