Lateral Surface Area (LSA) of Hexagonal Pyramid
The lateral surface area is the region occupied by the lateral surfaces or triangular faces of a regular hexagonal pyramid. The formula to determine the lateral surface area of the regular hexagonal pyramid (LSA) is given as follows,
The lateral surface area of the regular hexagonal pyramid = The sum of areas of the lateral surfaces (triangles) of the pyramid
= 6 × [½ × base × height] =3 (s × l)
Lateral Surface Area of Regular Hexagonal Pyramid = 3(s Ă— l)
Where,
- “s” is Side Length of Base
- “l” is Slant Height of Pyramid
Regular Hexagonal Pyramid Formula
A hexagonal pyramid is a three-dimensional pyramid that has a hexagonal base along with sides or faces in the shape of isosceles triangles that meet at the apex or the top of the pyramid. A hexagonal pyramid is one of the different types of pyramids, which are classified based on the shape of the base of a pyramid. It is also known as a heptahedron since a hexagonal pyramid consists of 7 faces, which include a hexagonal base and 6 isosceles triangular lateral faces.
Table of Content
- Regular Hexagonal Pyramid
- Regular Hexagonal Pyramid Formula
- Lateral Surface Area (LSA) of Hexagonal Pyramid
- Total Surface Area (TSA) of Hexagonal Pyramid
- Volume of Regular Hexagonal Pyramid
- Practice Problems based on Regular Hexagonal Pyramid