How to Find Volume of a Tetrahedron
Volume of a regular tetrahedron is a3/(6β2) where a is the edge of the tetrahedron. Pyramid with a triangular base is called a tetrahedron, it is a solid with four triangular faces.
In this article, we will explore how to find the volume of tetrahedrons with solved examples related to the volume of tetrahedrons.
Table of Content
- What is Tetrahedron?
- How to Find Volume of a Tetrahedron
- Tetrahedron Volume Formula
- Tetrahedron Volume Formula When Four Points are Given
- Regular Tetrahedron Formula
- Examples on Volume of Tetrahedron
What is Tetrahedron?
A tetrahedron is a pyramid with a triangular base. It consists of 4 triangles forming a pyramid. In other words, a tetrahedron is a 3-D shape with 4 triangles and 6 edges. The below diagram represents a tetrahedron.
How to Find Volume of a Tetrahedron
To find the volume of a tetrahedron we use the formula of volume of tetrahedron. In this formula we first find the cube of edge of tetrahedron and then divide it by 6β2. The resultant value gives us the volume of the tetrahedron.
Tetrahedron Volume Formula
Formula for the volume of tetrahedron is given by:
Volume of Tetrahedron = a3 / (6β2)
where,
- a is Edge of Tetrahedron
Tetrahedron Volume Formula When Four Points are Given
In this formula we first find three vectors from given four points. Then we apply the formula:
Volume of Tetrahedron = (1/6) Γ Scalar Product of Three Vectors determined from Given 4 Points
Regular Tetrahedron Formulas
Various Tetrahedron formulas are:
Area of One Face of Regular Tetrahedron Formula |
A = 1/4β(3)a2 |
Total Surface Area of Regular Tetrahedron Formula |
A = a2β(3) |
Slant Height of a Regular Tetrahedron Formula |
l = aβ(3/2) |
Altitude of a Regular Tetrahedron Formula |
h = aβ(6)/3 |
Volume of a Regular Tetrahedron Formula |
V = a3β(2)/12 |
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Examples on Volume of Tetrahedron
Example 1: Find the volume of the tetrahedron with edge 6 units.
Solution:
Volume of tetrahedron is given by:
Volume of Tetrahedron = a3 / (6β2)
Volume of tetrahedron = 63 / (6β2)
= 36 / (β2)
= 18β2 cubic units.
Example 2: If edge of the tetrahedron is 4 units then, find the volume of tetrahedron.
Solution:
Volume of tetrahedron is given by:
Volume of Tetrahedron = a3/(6β2)
Volume of tetrahedron = 43 / (6β2)
= 64/ (6β2)
= 32 / (3β2)
= (16β2) / 3 = 7.54 cubic units
Example 3: Find the edge of the tetrahedron if the volume of tetrahedron given is 144β2 cubic units.
Solution:
Volume of tetrahedron is given by:
Volume of Tetrahedron = a3/(6β2)
a3 = Volume of tetrahedron Γ 6β2
a3 = 144β2 Γ 6β2
a3 = 1728
a = β1728
a = 12 units
Therefore, the edge of given tetrahedron is 12 units.
Practice Problems on Volume of Tetrahedron
Q1. Find the volume of the tetrahedron with edge 18 units.
Q2. If edge of the tetrahedron is 9 units then, find the volume of tetrahedron.
Q3. Find the edge of the tetrahedron if the volume of tetrahedron given is 52 cubic units.
FAQs on Volume of Tetrahedron
What is Formula for a Tetrahedron?
Regular Tetrahedron Formula
Area = β3xΒ² (x is Side Length)
How to Calculate Volume of a Tetrahedral?
Volume of tertahedral is calculated using volume of terahedral formula as discussed in the article.
What is Surface Area of a Tetrahedron?
Total Surface Area of Regular Tetrahedron Formula: A = a2β(3).
What is Perimeter of a Tetrahedron?
Perimeter of any regular terahedron with side a is, P = 6a units.
What is Formula for Volume of a Tetrahedron?
Formula for volume of tetrahedron is given by:
Volume of Tetrahedron = a3 / (6β2)
What is Volume of a Tetrahedron Given 4 Points?
Volume of a tetrahedron given 4 points is calculated using formula:
Volume of Tetrahedron = (1/6) Γ Scalar Product of Three Vectors determined from Given 4 Points
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