Mathematics
Grade9
Easy
Question
Find the volume of the Sphere
![](data:image/png;base64,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)
- 78.5 m3
- 392.5 m3
- 523.6 m3
- 62.8 cm3
Hint:
The volume of a sphere is given by ![4 over 3 cross times straight pi cross times left parenthesis radius right parenthesis cubed](data:image/png;base64,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)
The correct answer is: 523.6 m3
Volume ![equals 4 over 3 πr cubed](data:image/png;base64,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)
![equals 4 over 3 cross times straight pi cross times 5 cubed](data:image/png;base64,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)
= 523.6 meters3
Related Questions to study
Mathematics
Jack wants to know how much water a sphere can hold with a radius of 8 cm. Find the volume.
Jack wants to know how much water a sphere can hold with a radius of 8 cm. Find the volume.
MathematicsGrade9
Mathematics
Calculate the volume of the composite solid (round to nearest whole number)
![](data:image/png;base64,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)
Calculate the volume of the composite solid (round to nearest whole number)
![](data:image/png;base64,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)
MathematicsGrade9
Mathematics
Find the volume of the sphere with the radius of 6.4 inches. Use 3.14 for pi.
Find the volume of the sphere with the radius of 6.4 inches. Use 3.14 for pi.
MathematicsGrade9
Mathematics
If a tennis ball has a diameter of 14, find the volume of the tennis ball.
If a tennis ball has a diameter of 14, find the volume of the tennis ball.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with radius of 7.38cm
Find the surface area of the sphere with radius of 7.38cm
MathematicsGrade9
Mathematics
Calculate the volume of the composite solid.
![](data:image/png;base64,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)
Calculate the volume of the composite solid.
![](data:image/png;base64,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)
MathematicsGrade9
Mathematics
Pick the word that best matches the definition: A segment of a sphere that is a chord that contains the center.
Pick the word that best matches the definition: A segment of a sphere that is a chord that contains the center.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 3.2cm.
Find the surface area of the sphere with diameter of 3.2cm.
MathematicsGrade9
Mathematics
Calculate the surface area of the sphere with radius of 286cm
Calculate the surface area of the sphere with radius of 286cm
MathematicsGrade9
Mathematics
A sphere have _________________ vertices.
A sphere have _________________ vertices.
MathematicsGrade9
Mathematics
Calculate the surface area of the sphere with radius of 19.6cm
Calculate the surface area of the sphere with radius of 19.6cm
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 182cm.
Find the surface area of the sphere with diameter of 182cm.
MathematicsGrade9
Mathematics
Find the volume of the sphere with the radius of 7 inches.
Find the volume of the sphere with the radius of 7 inches.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 13.6cm.
Find the surface area of the sphere with diameter of 13.6cm.
MathematicsGrade9
Mathematics
The formula to calculate surface area of a sphere is _______________
The formula to calculate surface area of a sphere is _______________
MathematicsGrade9