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A **pyramid** has a base and triangular sides which rise to meet at the same point. The base may be any polygon such as a square, rectangle, triangle, etc.

Learn what a triangular **pyramid** is and how to find its **volume** and surface area. We will use examples and definitions to familiarize ourselves with these types of pyramids.

**How to Calculate the Volume of a** **Pyramid**. To **calculate the volume of a** **pyramid**, use the **formula** V = \frac{1}{3}lwh, where l and w are the length and width of the base, and h is the height.

The **volume** of a **pyramid**, right or oblique, has the following **formula**: **Volume** = (length * width * height) / 3 . To solve for the **volume**, plug the value of each of the dimensions into the **formula** ...

Within our area section, we had to provide a definition for the meaning of area.That definition rested upon the square -- particularly a unit square. We saw the area of a figure was nothing more than the sum of all unit squares of a figure.

In geometry, a **tetrahedron** (plural: tetrahedra or tetrahedrons), also known as a triangular **pyramid**, is a polyhedron composed of four triangular faces, six straight edges, and four vertex corners.

The **volume** enclosed by **a pyramid** is one third of the base area times the perpendicular height. As a **formula**: Where: b is the area of the base of the **pyramid** h is its height.

The **volume** of a **pyramid** (also any cone) is =, where b is the area of the base and h the height from the base to the apex. This works for any polygon, regular or non-regular, and any location of the apex, provided that h is measured as the perpendicular distance from the plane containing the base.

**Pyramids**. When we think of **pyramids** we think of the Great **Pyramids** of Egypt.. They are actually Square **Pyramids**, because their base is a Square.. Parts of a **Pyramid**. A **pyramid** is made by connecting a base to an apex

Example #1: A square **pyramid** has a height of 9 meters. If a side of the base measures 4 meters, what is the **volume** of the **pyramid**? Since the base is a square, area of the base = 4 × 4 = 16 m 2