Calculate the Volume of a Parallelepiped
A parallelepiped is generally defined as a 6-faced polyhedron, all of whose faces are parallelograms lying in pairs of parallel planes. A parallelepiped can also be defined as a polyhedron with six faces (hexahedron), each of which is a parallelogram, or a hexahedron with three pairs of parallel faces, or a prism of which the base is a parallelogram.
These volume calculations are provided for a standard parallelepiped using the three parallelepiped edge lengths and the three internal angles between the edges.
Method #1 - Parallelepiped Volume Calculator
A parallelepiped is generally defined as a 6-faced polyhedron, all of whose faces are parallelograms lying in pairs of parallel planes. A parallelepiped can also be defined as a polyhedron with six faces (hexahedron), each of which is a parallelogram, or a hexahedron with three pairs of parallel faces, or a prism of which the base is a parallelogram.
These volume calculations are provided for a standard parallelepiped using the three parallelepiped edge lengths and the three internal angles between the edges.
Method #1 - Parallelepiped Volume Calculator
Method #2 – Volume of a Parallelepiped Formula
The volume of a parallelepiped can be calculated by using the formula:
In this formula, a, b, and c are the parallelepiped edge lengths, and α, β, and γ are the internal angles between the edges.