In two dimensions, the equations of rotation about the origin are:
x' = x cos t - y sin t
y' = x sin t + y cos t.
where t is the angle of rotation, counterclockwise.
tumahri maa ki chut
Transformation
Rotation
Sounds more like a translation.
Rotation
rotation
reflection!!
yes
list all out of geomatric transformation
tumahri maa ki chut
Horizontal reflection.
congruence transformation
The centre of rotation, the angle of rotation and, unless the angle is 180 degrees, the direction of rotation.
Yes, a reflection followed by a rotation can indeed be described as a single rotation under certain conditions. Specifically, if the line of reflection is positioned at an angle that bisects the angle of rotation, the combined transformation can be expressed as a single rotation about a point. This is often seen in geometric transformations where the resulting effect maintains the rotational symmetry. However, not all combinations of reflection and rotation will yield a single rotation; it depends on their relative orientations.
Transformation
rotation
transformation