Brilio.net – Pyramids are one of the geometric shapes that are often taught in mathematics. This spatial structure consists of a flat plane as a base, as well as an upright flat plane (triangle) which forms a room. With a geometric character like this, several formulas must be used at once to calculate the volume of the pyramid.
Each plane that forms a pyramid is useful for calculating its volume. Therefore, there are several formulas that you must memorize in order to find the volume of the pyramid.
So that you can better understand the formula for the volume of a pyramid, here is a complete explanation of the volume of a pyramid, complete with example questions and solutions. Reported by brilio.net from various sources, Friday (1/9).
Definition of pyramid volume.
photo: Special
The volume of a pyramid is a measure of the space filled by the pyramid. A pyramid is a three-dimensional geometric shape that has a polygonal base and triangular upright sides that meet at one vertex.
The general pyramid volume formula is:
V = 3/1 × L × t
Where V is the volume of the pyramid, L is the area of the base, and t is the height of the pyramid. This formula applies to all types of pyramids, such as triangular pyramids, quadrilateral pyramids, pentagonal pyramids, and so on.
Basically, pyramid space has several elements, including:
1. The side plane is the side that defines the space of the pyramid, namely between the base side and the upright side
2. An edge is a line that intersects two side planes in a pyramid shape
3. A corner point is the meeting point between two or more edges in a pyramid shape
4. The vertex is the meeting point between the ends of the vertical sides of the pyramid that meet each other
5. The height of a pyramid is the distance between the top of the pyramid and the plane of the base
(brl/wen)