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I am stuck with following problem, could anyone help me?

(1) Can a finite 2D figure with a nontrivial rotational symmetry can have exactly one reflection symmetry?

thanks

Myshkin
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2 Answers2

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Let $R_1$ be a nontrivial rotation that preserves the figure. Let $\phi_1$ be a reflection that preserves the figure.

What is $(\phi_1 R_1)^{-1}$?

David K
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  • could you please explain it more bit informally by an example may be? – Myshkin Jan 25 '17 at 19:20
  • Rotate the figure, preserving its symmetry. Reflect the figure preserving its symmetry. Now perform a single transformation that returns all points of the figure to where they started. What is that transformation? This is a lot easier to figure out if you know how to compose two reflections to perform any desired rotation. – David K Jan 25 '17 at 20:30
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No. Assume the figure has one reflection symmetry about a vertical axis. Since the figure is finite, let the topmost point of the figure's boundary intersect this axis at point A. Suppose a forward rotation carries point A to point B. CONJUGATE: Perform a backward rotation carrying B to A, apply the reflective symmetry (which leaves A fixed!), and perform a forward rotation carrying A back to B. This is a reflective symmetry with axis passing through B, which is nearly always a different line. If B is also on the vertical axis, the rotation is a 180-degree rotation, which can always also be achieved by two perpendicular reflections, e.g about the vertical axis and about a horizontal axis.

PMar
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