Question
Determine the degree of rotation that 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 number of sides or the specific type of figure.
For regular polygons, the angle of rotation that maps the figure onto itself can be calculated using the formula:
\[
\text{Rotation angle} = \frac{360°}{n}
\]
where \( n \) is the number of sides (or vertices) of the polygon.
- For a triangle (3 sides): \( \frac{360°}{3} = 120° \)
- For a square (4 sides): \( \frac{360°}{4} = 90° \)
- For a pentagon (5 sides): \( \frac{360°}{5} = 72° \)
- For a hexagon (6 sides): \( \frac{360°}{6} = 60° \)
If you can specify the figure, I can provide the exact degree of rotation.
For regular polygons, the angle of rotation that maps the figure onto itself can be calculated using the formula:
\[
\text{Rotation angle} = \frac{360°}{n}
\]
where \( n \) is the number of sides (or vertices) of the polygon.
- For a triangle (3 sides): \( \frac{360°}{3} = 120° \)
- For a square (4 sides): \( \frac{360°}{4} = 90° \)
- For a pentagon (5 sides): \( \frac{360°}{5} = 72° \)
- For a hexagon (6 sides): \( \frac{360°}{6} = 60° \)
If you can specify the figure, I can provide the exact degree of rotation.