Graph a triangle LMN with vertices L(-5, -3), M(-3, -5), and N(0, -1). Rotate the triangle 90 about the origin.

Given coordinates of the figure, A(1, 2), B(5, 2), and C(3, 5).
For a rotation of 180 degrees, coordinate rule (a, b) → (-a, -b).
A(1, 2) → A’(-1, -2)
B(5, 2) → B’(-5, -2)
C(3, 5) → C’(-3, -5)
Image coordinates of the figure are A’(-1, -2), B’(-5, -2), and C’(-3, -5).

Coordinate of the line AB, A= (1, 2) and B= (5, 2)
For a rotation of 90, coordinate rule (a, b) → (-b, a).
A(1, 2) → A’(-2, 1)
B(5, 2) → B’(-2, 5)
Image vertices of the line AB are A’(-2, 1) and B’(-2, 5).

Coordinate of point V = (-3, -2)
For a rotation of 270 degrees, coordinate rule (a, b) → (b, -a).
V(-3, -2) →  V’(-2, 3)
The coordinate V(-3, -2) and its image V’(-2, 3).

For a rotation of 270 degrees, (a, b) → (b, -a)
(9, -2) →(-2, -9)

For a rotation of 180 degrees, (a, b) → (-a, -b).
(5, -4) → (-5, 4)

Angle of rotation is the angle that makes by the ray of center of rotation and the real object and the ray that joins the ray of center of rotation and the image object.
>>>Therefore, the angle of rotation is 105 degrees.

Rotate the point exactly to 360 degrees to obtain the point  of rotation.

Rotate the given point in the plane through 270 degrees angle of rotation to obtain the new coordinates.

Rotate the point in the plane at 180 degrees of angle of rotation to obtain the point of rotation.

When a point (a, b) is rotated 90 counterclockwise about the origin, then the coordinates of the image point will be (-b, a).

Therefore, we can say that the Rotation can be done both in clockwise or counter clockwise direction.

The angle of rotation is nothing but the angle between the line that joins center of rotation to the real point and the line that joins the center of rotation and the image point.

>>>>The center of rotation is the point that rotates the given figure about a point.

The required matrix representation is:

Therefore, the required matrix is: