Question 1
Which of the following is the major product of the reaction shown?
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
◦ I
◦ II
◦ III
◦ IV
◦ V
Question 2
Describe the product(s) of the reaction below.
![](data:image/png;base64, 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)
◦ only one stereoisomer
◦ a mixture of diastereomers and their enantiomers
◦ an equal mixture of enantiomers
◦ a mixture of constitutional isomers
◦ a mixture of constitutional isomers and their enantiomers