Volume of a Sphere
The volume of a sphere indicates the space it occupies. Cubic units, such as cubic meters (m3), cubic centimeters (cm3), and cubic inches (in3), are used to measure this quantity. A sphere, known as a three-dimensional sphere, has uniformly spaced points from its center. Basketballs and soccer balls serve as examples of commonly used spheres, each possessing a unique volume.
Sphere Volume Formula
Volume of a sphere is the amount of space occupied by the sphere’s interior. The following formula is applicable to spheres of various sizes and is a fundamental concept in geometry and mathematics.
Volume of Sphere = 4/3 πr3
How to Find Volume of a Sphere?
- Check the radius of the specified sphere. To get the radius if you only have the diameter, divide it by 2.
- Calculate the cube of this radius, represented by the symbol ‘r3‘.
- (4/3)π, Multiply the fraction by the result of the second step.
- The final result shows the volume of the sphere.
Read more on How to Find Volume of Sphere?
Sphere: Definition, Formulas, Examples, Shapes, Properties
Sphere is a three-dimensional object that is perfectly round and symmetrical in shape. It is a set of points in 3-D space that are all equidistant from a fixed point(center). The distance from the center to any point on the surface of the sphere is the same, and this distance is called the radius. A sphere is defined in 3 axis whereas a sphere is defined only in 2 axis.
In this article, we have explained everything about the Sphere from the Definition of Sphere, Volume, and Surface Area Formula, to Real-life Examples of Spheres. Let’s get a closer look at Sphere in Detail.
Table of Content
- Sphere Definition
- Shapes of Sphere
- Examples of Sphere
- Sphere Formulas
- Surface Area of a Sphere
- Volume of a Sphere
- Sphere Equation in 3D