Want to calculate the volume of a sphere? Cool, try this calculator.

About This Calculator

This volume of a sphere calculator will figure out the volume of any sphere given the radius, the diameter, the circumference, or the surface area of the sphere.

Terminology

"Sphere" - A three dimensional object contained by a surface that has all points at the same distance from the center. Basically, it's something that has a perfectly round ball shape.

"Surface Area" - The total area occupied by the surface of a three dimensional object. It is expressed in square units of measurement, for example square feet, square meters, square inches, square yards, etc.

"Volume" - The amount of space occupied by a three dimensional object. It is expressed in cubic units of measurement, for example cubic feet, cubic meters, cubic inches, cubic yards, etc.

"Circumference" - If you a cut a sphere in half, the circumference would be the distance around the outside edge of the cut surface.

"Diameter" - The distance of a straight line that extends from any point on the surface of the sphere to the surface point directly opposite, while passing through the center of the sphere.

"Radius" - The distance of a straight line that extends from the center of the sphere to any point on the surface of the sphere.

Calculating the Volume of a Sphere Using Radius

V = ( 4 / 3 ) ϖ r^{3}

where

V = Volume
ϖ = Pi = 3.14159265...
r = Radius

Calculating the Volume of a Sphere Using Diameter

If you know the diameter of a sphere, you can calculate the volume based on the following formula:

V = ϖ d^{3} / 6

where

V = Volume
ϖ = Pi = 3.14159265...
d = Diameter

Calculating the Volume of a Sphere Using Circumference

If you know the circumference of a sphere, you can calculate the volume based on the following formula:

V = C^{3} / 6 ϖ^{2}

where

V = Volume
ϖ = Pi = 3.14159265...
C = Circumference

Calculating the Volume of a Sphere Using Surface Area

If you know the surface area of a sphere, you can calculate the volume based on the following formula:

where

V = Volume
ϖ = Pi = 3.14159265...
A = Surface Area