Sales Toll Free No: 1-855-666-7446

How to Find the Height of a Cube?

TopCube is a type of Square box which is has all sides of equal length. It looks like a regular hexahedron. All angles present in the Cube are right angled. The shape of a cube is three dimensional.
Faces: A cube has six faces. All the faces of a cube are square. And the angles of a cube are Right Angle. It means all the angles are of 90 degree.
Edges: In a cube there are 12 edges because all the faces of a cube are squares. All the edges of a cube are of same length.
Vertex: In a cube eight vertices are present.
Face diagonal: The total Numbers of face diagonals are 12.
Space diagonal: The total numbers of space diagonals are 4.
Now we will see how to find the height of a cube.
For finding the height of a cube we have to follow some of the steps:
The steps are:
Step1: when we find the height of a cube, it is necessary to know the value of volume of a cube.
Step2: Then we find the side of a cube.
Step2: If we have the volume of a cube and the side of a cube then we can easily find the height of a cube.
Volume of a cube = Side3;
Side = 3√(volume);
We know that the volume of a cube is s3.
Or in short form
V = s3;
Let’s see example for finding the height of a cube.
Example: find the height of a cube where Volume of Cube is 1728 inch3?
Solution: we know that volume of a cube is:
Volume of a cube = s3;
If we assume‘s’ is the height of a cube so we can write it as:
Volume of a cube = H3;
So the height of a cube = 3√volume;
Given, volume of a cube = 1728 inch3;
Now put the volume in the formula:
So the height of a cube = 3√volume;
Height = 3√ 1728
Height = 12 inch.