Answer: A
Step-by-step explanation:
Let's first review how turning about the origin changes a point's coordinates:
After rotating and translating some points, one can see the following pattern:
- 180° Rotation: (x,y) -> (-x,-y)
- 90° Clockwise Rotation: (x,y) -> (y, -x)
- 90° Counter-clockwise Rotation: (x,y) -> (-y, x)
- Translation a units to the left: (x, y) -> (x-a, y)
Using these patterns will make it much easier to find the correct series of transformations than graphing each one.
A: A 90-degree counterclockwise rotation about the origin followed by a translation 1 unit to the left
Using the patterns found above, this set of transformations would make (x,y) move first to (-y, x), then (-y-1, x).
- A(2,-2) -> A'(1,2)
- B(4,-2) -> B'(1,4)
- D(5,-3) -> D'(2,5)
- C(1,-3) -> C'(2,1)
B: A translation 1 unit to the left followed by a 90-degree counterclockwise rotation about the origin
This would make (x,y) move first to (x-1,y), then to (-y, x-1)
- A(2,-2) -> A'(2, 1)
- B(4,-2) -> B'(2,3)
- D(5,-3) -> D'(3,4)
- C(1,-3) -> C'(3,0)
C: A 270-degree counterclockwise rotation about the origin followed by a translation 1 unit to the left
This would make (x,y) move first to (y, -x), then (y-1, -x)
- A(2,-2) -> A'(-3, -2)
- B(4,-2) -> B'(-3,-4)
- D(5,-3) -> D'(-4, -5)
- C(1,-3) -> C'(-4, -1)
D: A translation 1 unit to the left followed by a 270-degree counterclockwise rotation about the origin
This would make (x,y) move first to (x-1,y), then (y, -x+1)
- A(2,-2) -> A'(-2, -1)
- B(4,-2) -> B'(-2, -3)
- D(5,-3) -> D'(-3, -4)
- C(1,-3) -> C'(-3, 0)
Therefore, the answer is A, as only it correctly matches to polygon A'B'D'C'.
