Regular Hexagonal Pyramid Formula
There are two formulas for a regular hexagonal pyramid, i.e.,
- Surface Area of a Regular Hexagonal Pyramid
- Volume of a Regular Hexagonal Pyramid
To calculate the surface area or the volume of a regular hexagonal pyramid, we need to know its four major aspects, i.e., the length of the side of the base; the apothem, which is the distance from the center of the base to any point on the side of the base; the height of the pyramid, which is the perpendicular distance from the apex to the center of the base; and finally the slant height of the pyramid, which is the height of the triangular faces or the perpendicular distance from the apex to any point on the boundary of the base of the 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