Volume of Rectangular Pyramid
A rectangular pyramid is not just about its surface area; it also encloses a certain volume of space within its structure. Calculating the volume of a rectangular pyramid helps us quantify this space.
Volume Formula for Rectangular Pyramid
The volume of a rectangular pyramid quantifies the space enclosed by the pyramid. To calculate the volume (V), the following formula is employed:
V = (1/3) × l × w × h
OR
V = (1/3) × A × h
Where,
- l is the length of rectangular base,
- w is width of rectangular base,
- h is the height of the pyramid, and
- A is the area of the base of Rectangular Pyramid.
Rectangular Pyramid
Rectangular Pyramid is one of the many pyramid structures in Geometry. A pyramid is a three-dimensional structure that has a polygon as its base and triangular faces covering its sides, meeting at a common point known as the apex of the pyramid. In the case of a rectangular pyramid, the base is a rectangle, which is why it is called a rectangular pyramid, with four triangular faces connecting the sides of the rectangle to the apex.
A Rectangular Pyramid can be either right or oblique, depending on the alignment of the apex and the center of the base. If the apex aligns with the center of the base at a right angle, then it is a right rectangular pyramid; if not, then it is an oblique rectangular pyramid.
This article provides a well-rounded description of the geometric solid known as the Rectangular Pyramid, including its definition, shapes, and types. In addition to that, we will also discuss the formulas for surface area and volume for the Rectangular Pyramid.
Table of Content
- What is Rectangular Pyramid?
- Types of Rectangular Pyramid
- Properties of Rectangular Pyramid
- Surface Area of Rectangular Pyramid
- Volume of Rectangular Pyramid
- Rectangular Pyramid Formula
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