Example 1

Move the triangle [[$ ABC $]]​ in the direction [[$ s $]]​ = ”[[$ 2 $]]​ units down and [[$ 10 $]]​ units to the right".

A rotationally symmetric figure is reflected as a rotation of the angle [[$ \ alpha $]] for itself, in which case it is said that the figure is symmetric with respect to rotation at an angle of [[$ \ alpha $]].

Example 2

Rotate the triangle [[$ ABC $]] counterclockwise by [[$ 90 $]] degrees around point [[$ O $]].

Example 3

If the adjacent figure is rotated around its center by [[$ 180 ° $]], it will look exactly the same as the original pattern, and it will be in exactly the same place. Therefore, the figure can be considered rotationally symmetric at an angle of [[$ 180 ° $]].

Since a [[$ 180 ° $]] rotation with respect to the figure's center can be performed twice before a full rotation is reached, the figure's order of rotational symmetry is two.