Best Answer

Volume = area of pentagon x length of prism.

Q: What is the equation for the volume of a pentagonal prism?

Write your answer...

Submit

Still have questions?

Continue Learning about Geometry

Area of Base x Height

Base times height.For details look it up on google.com!

There are 10 vertices on a pentagonal prism. In geometry, a pentagonal prism is a prism that has 7 faces, 15 edges, and 10 vertices.

The base of a pentagonal prism is a pentagon. Just like a square pyramid has a square for a base, a pentagonal prism has a pentagon for a base.

A pentagonal prism has seven sides.

Related questions

There is no equation - the answer is explicit in the name.A pentagonal prism has pentagonal bases. A pentagon has 5 sides. It could not be simpler!

Area of pentagon * length of prism.

Volume = (base area) x height.

Area of Base x Height

Base times height.For details look it up on google.com!

It depends on what dimension(s) of the pentagonal prism are changing. If none then you have only one data point and so nothing to graph. The number of measures that can vary [the degrees of freedom] will range from 2 (for a regular pentagon) to 8 for an irregular pentagonal prism (5 sides of pentagon, 2 diagonals and the length). The reason to include the diagonals is that the lengths of the five sides alone do not uniquely determine the shape of the pentagon and so the volume of the prism. So, in the case of an irregular pentagonal prism, you will need to plot the volume in 9 dimensional space. Have fun!

There are 10 vertices on a pentagonal prism. In geometry, a pentagonal prism is a prism that has 7 faces, 15 edges, and 10 vertices.

There are 10 vertices on a pentagonal prism. In geometry, a pentagonal prism is a prism that has 7 faces, 15 edges, and 10 vertices.

Pentagonal Prism = 2 pentagonal bases , 5 lateral faces, 10 vertices Pentagonal Prism = 7 faces, 15 edges

That is the definition of a pentagonal prism!

There is insufficient information to give an answer. There is no information to indicate that the pentagon is regular and therefore its area is indeterminate. Consequently, the volume of the prism cannot be determined.

A pentagonal prism is a prism with two pentagon-shaped bases.