Radius of Sphere
A sphere is a solid 3D shape. Radius of the Sphere is the distance between its centre and any point on its surface.
It can easily be calculated when the volume of the sphere or the surface area of the sphere is given.
Given Parameter | Radius Formula | |
---|---|---|
When Volume (V) is Given | R = 3√{(3V) / 4π} units | V = Volume, π ≈ 3.14 |
Surface Area (A) | R = √(A / 4π) units | A = Surface Area, π ≈ 3.14 |
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Radius of Circle
Radius of Circle: The radius of a circle is the distance from the circle’s center to any point on its circumference. It is commonly represented by ‘R’ or ‘r’. The radius is crucial in nearly all circle-related formulas, as the area and circumference of a circle are also calculated using the radius.
In this article, we are going to learn about the Radius of the Circle in detail, including its Formula, Equation, and How to Find it with the help of Examples.
Table of Content
- What is the Radius of Circle?
- Radius of a Circle Definition
- Diameter of Circle
- Radius, Diameter and Chord
- Secant to Circle
- Tangent to Circle
- Non-Intersecting Lines
- Radius Formula
- How to Find Radius of Circle?
- Radius of Sphere
- Radius of Circle Equation
- Chord of Circle Theorems
- Radius of Circle Examples
- Practice Questions on Radius of Circle