Calculation of Spheres with Diameter
Calculating spheres with diameter means using the diameter measurement to find the sphere’s properties. It starts by halving the diameter to find the radius, which is often needed for calculations. With the radius, you can find the sphere’s volume, surface area, or other characteristics as required.
Volume of Sphere using Diameter
Volume of a sphere can be determined by its radius or diameter. When the radius is known, the formula is V = (4/3)πr³. However, if the diameter is given instead, we can use the formula V = (πd³)/6 to calculate the volume.
Surface Area of a Sphere using Diameter
Surface Area of Sphere when its diameter(d) is given is calculated by the formula,
Surface Area of Sphere = π(D)2
Related Resources,
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