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, you can use the following formula:
\[
\text{Degree of rotation} = \frac{360^\circ}{n}
\]
where \( n \) is the number of symmetrical portions (sides) of the figure.
If you can provide the specific figure or its properties (like whether it's a triangle, square, pentagon, etc.), I can help you find the exact degrees of rotation. Common shapes and their degrees of rotation onto themselves are:
- Triangle (3 sides): \( \frac{360^\circ}{3} = 120^\circ \)
- Square (4 sides): \( \frac{360^\circ}{4} = 90^\circ \)
- Pentagon (5 sides): \( \frac{360^\circ}{5} = 72^\circ \)
- Hexagon (6 sides): \( \frac{360^\circ}{6} = 60^\circ \)
Please specify the figure to get the precise degree of rotation!
\[
\text{Degree of rotation} = \frac{360^\circ}{n}
\]
where \( n \) is the number of symmetrical portions (sides) of the figure.
If you can provide the specific figure or its properties (like whether it's a triangle, square, pentagon, etc.), I can help you find the exact degrees of rotation. Common shapes and their degrees of rotation onto themselves are:
- Triangle (3 sides): \( \frac{360^\circ}{3} = 120^\circ \)
- Square (4 sides): \( \frac{360^\circ}{4} = 90^\circ \)
- Pentagon (5 sides): \( \frac{360^\circ}{5} = 72^\circ \)
- Hexagon (6 sides): \( \frac{360^\circ}{6} = 60^\circ \)
Please specify the figure to get the precise degree of rotation!