A rotation occurs when we turn an object or shape around a central point. On the $xy$xy-plane we usually rotate about the origin, $\left(0,0\right)$(0,0). The preimage and image are congruent, just rotated around (like going in a circle). Every point on the object or shape has a corresponding point on the image.
Commonly we describe rotations using a degree measure, and as being either clockwise or counterclockwise.
In this example, the image is rotated around the origin by $90^\circ$90° clockwise.
Note how each point creates a $90^\circ$90° angle with the origin.
$\left(1,3\right)$(1,3) becomes $\left(3,-1\right)$(3,−1)
$\left(3,1\right)$(3,1) becomes $\left(1,-3\right)$(1,−3)
$\left(3,4\right)$(3,4) becomes $\left(4,-3\right)$(4,−3)
Generally speaking we can see that for a rotation of $90^\circ$90° clockwise about the origin, that the $\left(a,b\right)$(a,b) becomes $\left(b,-a\right)$(b,−a). We can also say that this object was transformed by a $270^\circ$270° counterclockwise rotation about the origin.
Using the applet below you might like to investigate what happens for rotations of $90^\circ$90°, $180^\circ$180°, $270^\circ$270° and $360^\circ$360° in the clockwise direction.
Use the "Alter angle" slider down at the bottom to rotate the image. Click and drag the large blue dot with the arrow to change the center.
What connections can you make to reflections?
How do the coordinates of the vertices change based on the rotation?
What is the correct image after $Q$Q is rotated $270^\circ$270° clockwise about the origin?
Consider the following.
Plot the points $A\left(5,5\right)$A(5,5), $B\left(9,5\right)$B(9,5), $C\left(9,9\right)$C(9,9) and $D\left(5,9\right)$D(5,9).
Now plot the points $A'$A′, $B'$B′, $C'$C′ and $D'$D′ that would result when we rotate the original points $A$A, $B$B, $C$C and $D$D by $90^\circ$90° clockwise about the origin. Ensure you have rotated all four points before submitting your answer.
Consider the following.
Plot the points $A\left(-5,-5\right)$A(−5,−5), $B\left(-1,-5\right)$B(−1,−5), $C\left(-1,-1\right)$C(−1,−1) and $D\left(-5,-1\right)$D(−5,−1).
Now plot the points $A'$A′, $B'$B′, $C'$C′ and $D'$D′ that would result from a rotation of the original points $A$A, $B$B, $C$C and $D$D by $90^\circ$90° counterclockwise about the origin. Ensure you have rotated all four points before submitting your answer.
Represent transformations as geometric functions that take points in the plane as inputs and give points as outputs. Compare transformations that preserve distance and angle measure to those that do not.
Develop definitions of rotations, reflections, and translations in terms of points, angles, circles, perpendicular lines, parallel lines, and line segments.
Given a geometric figure and a rotation, reflection, or translation, draw the transformed figure. Specify a sequence of transformations that will carry a given figure onto another.