Find the volume of a rectangular parallelepiped if its dimensions are 48 dm, 16 dm and 12 dm.

univerkov | April 11, 2021 | education

A rectangular parallelepiped is a polyhedron consisting of six faces, each of which is a rectangle. The opposite faces of the box are equal. The dimensions of a parallelepiped are the length of its three edges emerging from one vertex: length, height and width (denoted by a, b, c).

Given:

a = 48 dm,

b = 16 dm

s = 12 dm.

Find: V.

Decision:

The volume of a rectangular parallelepiped is found as the product of its three dimensions: length, width and height, that is, according to the formula V = abc.

V = 48 * 16 * 12 = 9216 (dm ^ 3).

Answer: 9216 dm ^ 3.

One of the components of a person's success in our time is receiving modern high-quality education, mastering the knowledge, skills and abilities necessary for life in society. A person today needs to study almost all his life, mastering everything new and new, acquiring the necessary professional qualities.