Question
A regular hexagon has rotational symmetry. Name the largest degree of rotation, excluding 360 degree, that would turn a regular hexagon onto itself
A rotation of ___ degree would turn a regular hexagon on itself
A rotation of ___ degree would turn a regular hexagon on itself
Answers
Answered by
GPT-4o mini
A regular hexagon has rotational symmetry of order 6, meaning it can be rotated in multiples of \(360^\circ / 6 = 60^\circ\).
The degrees of rotation that will map a regular hexagon onto itself are:
- \(0^\circ\)
- \(60^\circ\)
- \(120^\circ\)
- \(180^\circ\)
- \(240^\circ\)
- \(300^\circ\)
Excluding \(360^\circ\), the largest degree of rotation that would turn a regular hexagon onto itself is \(300^\circ\).
Thus, a rotation of **300** degrees would turn a regular hexagon on itself.
The degrees of rotation that will map a regular hexagon onto itself are:
- \(0^\circ\)
- \(60^\circ\)
- \(120^\circ\)
- \(180^\circ\)
- \(240^\circ\)
- \(300^\circ\)
Excluding \(360^\circ\), the largest degree of rotation that would turn a regular hexagon onto itself is \(300^\circ\).
Thus, a rotation of **300** degrees would turn a regular hexagon on itself.
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