Question 1
Which of the choices correctly illustrates a plane of symmetry in the compound shown?
![](data:image/png;base64, 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)
![](data:image/png;base64, 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◦ I
◦ II
◦ III
◦ IV
◦ There are no planes of symmetry present.
Question 2
Draw in the plane of symmetry in the following compound.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
◦ I
◦ II
◦ III
◦ IV
◦ There are no planes of symmetry present.