A rotation of 360 degrees around the origin of (0, 0) will carry a rhombus back onto itself.
Rotate 360 degrees
It would require 36 degrees.
reflect across the x-axis and then reflect again over the x-axis
The identity transformation.
A rotation of 360 degrees will map a parallelogram back onto itself.
Rotate 360 degrees
It will do so.
It would require 36 degrees.
Translations, in the direction of a side of the triangle by a distance equivalent to any integer multiple of its length.Rotation about any vertex by 180 degrees.
reflect across the x-axis and then reflect again over the x-axis
The identity transformation.
A transformation: there are many different types of transformations.
A rotation of 360 degrees will map a parallelogram back onto itself.
f(x) map onto itself means f(x) = x the image is the same as the object
There are the identity transformations:translation by (0, 0)enlargement by a scale factor of 0 - with any point as centre of enlargement.In addition, it can be reflection about the perpendicular bisector of any side of the rectangle, or a rotation of 180 degrees about the centre of the rectangle.
Itself
Rotation