We can identify the rotation that has taken place by looking at the coordinates of A and B in the pre-image and comparing them to the coordinates of A' and B' in the image.

We can see that A\to A' maps \left(3, 3\right) \to \left(-3,-3\right) and B\to B' maps \left(2, 1\right) \to \left(-2,-1\right). Both are of the form\left(x,y\right)\to\left(-x,-y\right) which corresponds to a 180\degree rotation about the origin.

We can see that the entire shape has moved from the first quadrant to the third quadrant which, when rotating about the origin, will always coincide with a 180\degree rotation in either clockwise or counterclockwise direction.

We know the functional notation mapping is R_{\theta\degree,P}(\text{Shape being rotated}) where \theta\degree is the angle of rotation in the counterclockwise direction, and P is the point of rotation.

We know that the point of rotation is the origin, O\left(0,0\right).

We also found in part (a) A\to A' and B\to B' followed the mapping \left(x,y\right)\to\left(-x,-y\right) which corresponds to a 180\degree rotation about the origin.

Function notation: R_{180\degree,O}(\overline{AB})=\overline{A'B'}

We can determine the image of each corner rotated 180\degree about A by considering their translation from A and then rotating that translation.

Consider that, when rotating 180\degree, we have that:

• Right \to Left
• Down \to Up
• Left \to Right
• Up \to Down

In the pre-image, we can get to the other corners from A by the following translations:

• A\to B: translate 2 units to the right
• A\to C: translate 2 units to the right and 2 units up
• A\to D: translate 2 units up

If we apply a rotation of 180\degreeto these translations, we can get the images of the corners:

• A\to B': translate 2 units to the left
• A\to C': translate 2 units to the left and 2 units down
• A\to D': translate 2 units down

We can plot this as:

A rotation of 90\degree clockwise will have the following effect on translations:

• Left \to Up
• Up \to Right
• Right \to Down
• Down \to Left

Using the same approach as for part (a), we can note that:

• \left(2,0\right)\to A: translate 1 unit left and 1 unit down
• \left(2,0\right)\to B: translate 1 unit right and 1 unit down
• \left(2,0\right)\to C: translate 1 unit right and 1 unit up
• \left(2,0\right)\to D: translate 1 unit left and 1 unit up

If we apply a rotation of 90\degree clockwise to these translations, we can get the images of the corners:

• \left(2,0\right)\to A': translate 1 unit up and 1 unit left
• \left(2,0\right)\to B': translate 1 unit down and 1 unit left
• \left(2,0\right)\to C': translate 1 unit down and 1 unit right
• \left(2,0\right)\to D': translate 1 unit up and 1 unit right

Using these translations, we can see that

• A'=D
• B'=A
• C'=B
• D'=C

In other words, the rotation maps ABCD onto itself.