Calculator Use

Surface Area and Volume of Sphere Calculator is a free online tool that displays the Area and Volume of a Sphere. This online Surface Area and Volume of Sphere Calculator tool performs the calculation faster, and it displays the result in a fraction of seconds.

The procedure to use the Surface Area and Volume of Sphere Calculator is as follows:

Step 1: Enter a values in the input field

Step 2: Now click the "What is this value" button to get the result

Step 3: Finally, The Surface Area and Volume of a Sphere will be displayed in the output field

What is a sphere?

A sphere is a three-dimensional round-shaped object.

A sphere does not have any edges or vertices, like other 3D shapes.

All the points on its surface are equidistant from its center. Hence, the distance from the center of the sphere to any point on the surface is equal. This distance is called the radius of the sphere.

A sphere has an only a curved surface, no flat surface, no edges and no vertices

Radius: The distance between surface and center of the sphere is called its radius

Diameter: The distance from one point to another point on the surface of the sphere, passing through the center, is called its diameter.

Surface area: The region occupied by the surface of the sphere is called it’s surface area

Volume: The amount of space occupied by any spherical object is called its volume

What is the Formulas for calculating the circumference,surface area and volume of a sphere?

Given the radius r of a sphere calculate the circumference C, surface area A and volume V (Given r calculate C, A, V)

Circumference of a sphere:

C = 2 π r

Surface area of a sphere:

A = 4 π r²

Volume of a sphere:

V = (4/3) π r³

Given the surface area A of a sphere calculate the radius r, circumference C and volume V (Given A calculate r, C, V)

Radius of a sphere:

r = √(A / 4π)

Circumference of a sphere:

C = √(A π)

Volume of a sphere:

V = A^3/2 / (6 · √π)

Given the circumference C of a sphere calculate the radius r, surface area A and volume V (Given C calculate r, A, V)

Radius of a sphere:

r = C / 2π

Surface area of a sphere:

A = C² / 2

Volume of a sphere:

V = C³ / (6 · π²)

Given the volume V of a sphere calculate the radius r, circumference C and surface area A (Given V calculate r, C, A)

Radius of a sphere:

r = (3V / 4π)^1/3

Circumference of a sphere:

C = π^2/3 (6V)^1/3

Surface area of a sphere:

A = π^1/3 (6V)^2/3

What are the Properties of a sphere?

A sphere is perfectly symmetrical

A sphere is not a polyhedron

All the points on the surface are equidistant from the center

A sphere does not have a surface of centers

A sphere has constant mean curvature

A sphere has a constant width and circumference.