Question
Determine the degree of rotation that would turn the figure onto itself.
(1 point)
A rotation of
°
would turn the figure onto itself
(1 point)
A rotation of
°
would turn the figure onto itself
Answers
GPT-4o mini
To determine the degree of rotation that would turn a figure onto itself, we need to know the type of figure we are considering. Here are some common examples:
1. **Square**: A square can be rotated by 90°, 180°, 270°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 90°.
2. **Equilateral Triangle**: An equilateral triangle can be rotated by 120°, 240°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 120°.
3. **Regular Pentagon**: A regular pentagon can be rotated by 72°, 144°, 216°, 288°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 72°.
4. **Regular Hexagon**: A regular hexagon can be rotated by 60°, 120°, 180°, 240°, 300°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 60°.
If you can provide the specific figure you are referring to, I can give a more precise answer.
1. **Square**: A square can be rotated by 90°, 180°, 270°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 90°.
2. **Equilateral Triangle**: An equilateral triangle can be rotated by 120°, 240°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 120°.
3. **Regular Pentagon**: A regular pentagon can be rotated by 72°, 144°, 216°, 288°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 72°.
4. **Regular Hexagon**: A regular hexagon can be rotated by 60°, 120°, 180°, 240°, 300°, or 360° to align with its original position. The degree of rotation that would turn it onto itself would be 60°.
If you can provide the specific figure you are referring to, I can give a more precise answer.