The graph on the left shows an object in the Cartesian plane. A transformation is performed on it, resulting in the graph on the right.

Which of the following transformations best fits the graphs?

Consider regular Hexagon .

On this hexagon, perform the translation . Then perform a clockwise rotation on the image with center at .

Let be the image of under these transformations, be the image of , and so forth. Under these images, which point on the original hexagon does fall?

Consider regular Hexagon .

On this hexagon, perform the translation . Then perform a rotation on the image with center at .

Let be the image of under these transformations, be the image of , and so forth. Under these images, which point on the original hexagon does fall?

Consider regular Hexagon .

On this hexagon, perform the translation . Then perform a rotation on the image with center at . Let be the image of under these transformations, and so forth.

Which of the following correctly shows Hexagon relative to Hexagon ?

Consider regular Hexagon .

On this hexagon, perform the translation . Then reflect the hexagon about . Let be the image of under these transformations, and so forth.

Which point on Hexagon is the image of under these transformations?

Translate the graph of the equation

left four units and down six units. Give the equation of the image.

Translate the graph of the equation

right two units and up five units. Give the equation of the image.

Translate the graph of the equation

right four units and down two units. Give the equation of the image.

Translate the graph of the equation

left three units and down five units. Give the equation of the image.

On the coordinate plane, let , , and be located at the origin, , and . Construct the median of from and let the foot of the median be . On the triangle, perform the translation . Where is the image of ?