Rotational Matrix
With the help of a rotation matrix, rotation can be performed in Euclidean space. The matrix rotates a point in an anticlockwise direction by an angle θ and provides the coordinates of the point after the rotation through that angle in the Cartesian Plane. The rotation matrix R can be represented as:
This matrix can be then multiplied with a point represented using vector V as follows:
Rotation
In real life, we know that the Earth rotates on its own axis and the moon also rotates on its axis. But what basically rotation is? Also, geometry deals with four basic types of transformations that are Rotation, Reflection, Translation, and Resizing. In this article, we shall read about the fundamental concept of rotation.
Contact Us