4 units to the right

8 units down

2 units left and 4 units up

reflect over the y axis

reflect over the x axis

reflect over the line y=x

rotate 90 degrees cc

rotate 180 degrees cc

rotate 270 degrees cc

A ( -2, 5), B (2, 4), C (3, -3)
Rotate AB 270 degrees cc

A ( -2, 5), B (2, 4), C (3, -3)
Rotate BC 90 degrees clockwise

A ( -2, 5), B (2, 4), C (3, -3)
Rotate ABC across the line y=x

A ( -2, 5), B (2, 4), C (3, -3)
Translate AC 3 units left and 2 units down

A ( -2, 5), B (2, 4), C (3, -3)
Translate ABC 2 units right and 1 unit up, then dilate by a factor of 2

A ( -2, 5), B (2, 4), C (3, -3)
Dilate AC by a factor of 3 then rotate 90 degrees clockwise

A ( -2, 5), B (2, 4), C (3, -3)
Translate AB up 2 units and down 2 units, then dilate by factor of 2, then rotate 270 degrees clockwise.

Describe
( x-3, y+6 )

If A' was rotated 270 degrees cc what were the original points of A?

parent function of linear equation

direct variation

E (-1, -3.5) F (4, -3) G (0, 1) H (-4, -2)
Scale factor 0.5
Graph