Mathematics
Grade9
Easy
Question
Pick the word that best matches the definition: All points in space that are a given distance from a given point called the center.
- Radius
- Chord
- Sphere
- Tangent
Hint:
Starts with the letter S.
The correct answer is: Sphere
All points in space that are a given distance from a given point called the center is sphere.
Related Questions to study
Mathematics
The faces of a shape are:
The faces of a shape are:
MathematicsGrade9
Mathematics
Jack wants to know how much water a sphere can hold with a radius of 8 cm. Find the volume. Use 3.14 for pi.
Jack wants to know how much water a sphere can hold with a radius of 8 cm. Find the volume. Use 3.14 for pi.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 43cm.
Find the surface area of the sphere with diameter of 43cm.
MathematicsGrade9
Mathematics
Calculate the surface area of the sphere with radius of 32cm
Calculate the surface area of the sphere with radius of 32cm
MathematicsGrade9
Mathematics
Find the volume of the sphere with the radius of 4 inches. Use 3.14 for pi.
Find the volume of the sphere with the radius of 4 inches. Use 3.14 for pi.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with radius of 5cm
Find the surface area of the sphere with radius of 5cm
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 20cm.
Find the surface area of the sphere with diameter of 20cm.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 8cm.
Find the surface area of the sphere with diameter of 8cm.
MathematicsGrade9
Mathematics
Find the surface area of the sphere
![](data:image/png;base64,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)
Find the surface area of the sphere
![](data:image/png;base64,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)
MathematicsGrade9
Mathematics
Find the surface area of the sphere with radius of 8.7cm
Find the surface area of the sphere with radius of 8.7cm
MathematicsGrade9
Mathematics
Pick the word that best matches the definition: A segment of a sphere that is a line that intersects the sphere in exactly one point.
Pick the word that best matches the definition: A segment of a sphere that is a line that intersects the sphere in exactly one point.
MathematicsGrade9
Mathematics
Calculate the surface area of the sphere with diameter of 7.3cm.
Calculate the surface area of the sphere with diameter of 7.3cm.
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 2.5 mm
Find the surface area of the sphere with diameter of 2.5 mm
MathematicsGrade9
Mathematics
Find the surface area of the sphere with radius of 8cm
Find the surface area of the sphere with radius of 8cm
MathematicsGrade9
Mathematics
Find the surface area of the sphere with diameter of 14cm.
Find the surface area of the sphere with diameter of 14cm.
MathematicsGrade9