Diagonal of Cube and Cuboid Formula
The diagonal in a cube and cuboid is a line segment that joins the two opposite vertices of a face or two opposite vertices of the body. Based on this there are two types of diagonals Face Diagonals and Body Diagonals. Let’s learn this in detail
Diagonal of Cube Formula
The formula for Diagonal of Cube is mentioned below:
Face Diagonal of Cube = √2 × side
Body Diagonal of Cuboid = √3 × side
Diagonal of Cuboid Formula
The formula for Diagonal of Cuboid is mentioned below:
Face Diagonal of Cuboid = √{(side1)2 + (side2)2}
Body Diagonal of Cuboid = √(l2 + b2 + h2)
Cube and Cuboid
Cube and Cuboid are the most used 3-D shapes in geometry. Cube and cuboid both have 6 faces, 12 edges, and 8 vertices. There are various examples of cubes and cuboids in real life like matchboxes, dice, a box, etc.
In this article, we will learn about cubes and cuboids in detail with their formulas for area and volume as well as diagonals. It also covers the properties of cubes and cuboids along with the solved examples. Let’s start our learning on the topic of Cubes and Cuboid.
Table of Content
- What is Cube and Cuboid?
- Cube Definition
- Cuboid Definition
- Examples of Cube and Cuboid
- Cube and Cuboid Formulas
- Surface Area of Cube
- Lateral Surface Area (LSA)
- Total Surface Area (TSA)
- Surface Area of Cuboid
- Lateral Surface Area (LSA) of Cuboid
- Total Surface Area (TSA) Cuboid
- Volume of Cube and Cuboid
- Volume of Cube
- Volume of Cuboid
- Diagonal of Cube and Cuboid Formula
- Diagonal of Cube Formula
- Diagonal of Cuboid Formula
- Properties of Cube and Cuboid
- Properties of Cube
- Properties of Cuboid
- Cube and Cuboid Difference
- Solved Examples on Cube and Cuboid
- Practice Questions on Cube and Cuboid