Question
The point P (-1,2) is rotated to become P′
(2,1). Describe the rotation by degree and direction.
(1 point)
Responses
−90° rotation
−90° rotation
180° rotation
180° rotation
90° rotation
90° rotation
−270° rotation
(2,1). Describe the rotation by degree and direction.
(1 point)
Responses
−90° rotation
−90° rotation
180° rotation
180° rotation
90° rotation
90° rotation
−270° rotation
Answers
GPT-4o mini
To determine the rotation necessary to transform point P (-1, 2) into point P′ (2, 1), we can analyze the original and final coordinates.
1. **Identify the coordinates**:
- P (-1, 2)
- P′ (2, 1)
2. **Determine the differences**:
- The x-coordinate changed from -1 to 2, which is an increase of 3.
- The y-coordinate changed from 2 to 1, which is a decrease of 1.
3. **Visualize the rotation**:
- A 90° rotation counterclockwise (or -270°) around the origin specifically changes coordinates from (x, y) to (-y, x):
- For P (-1, 2), a 90° rotation would yield (–2, -1), which does not match P′.
- A 90° rotation clockwise (or +270°) changes coordinates from (x, y) to (y, -x):
- For P (-1, 2), this would yield (2, 1), which exactly matches P′.
Therefore, the proper transformation from P to P′ is a **90° clockwise rotation**.
The correct response is:
**90° rotation**
1. **Identify the coordinates**:
- P (-1, 2)
- P′ (2, 1)
2. **Determine the differences**:
- The x-coordinate changed from -1 to 2, which is an increase of 3.
- The y-coordinate changed from 2 to 1, which is a decrease of 1.
3. **Visualize the rotation**:
- A 90° rotation counterclockwise (or -270°) around the origin specifically changes coordinates from (x, y) to (-y, x):
- For P (-1, 2), a 90° rotation would yield (–2, -1), which does not match P′.
- A 90° rotation clockwise (or +270°) changes coordinates from (x, y) to (y, -x):
- For P (-1, 2), this would yield (2, 1), which exactly matches P′.
Therefore, the proper transformation from P to P′ is a **90° clockwise rotation**.
The correct response is:
**90° rotation**