Question 1
The result of applying 12 consecutive 90° clockwise rotations with the same center is
◦ a 90° clockwise rotation.
◦ a 90° counterclockwise rotation.
◦ a reflection.
◦ the identity motion.
◦ none of these
Question 2
Use the figure shown below to answer the question(s).![](data:image/png;base64, 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)
Reflecting any point A through H on the circle about the line L and then about the line M is equivalent to
◦ the identity motion.
◦ a reflection about the vertical line through A and E.
◦ a reflection about the horizontal line through C and G.
◦ a 180° rotation about the rotocenter O.
◦ none of these