Question 1
What is the IUPAC name for the compound shown?
![](data:image/png;base64, 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)
◦ 1-isopropyl-4-hydroxycyclopentane
◦ 1-isopropyl-3-cyclopentanol
◦ 3-isopropylcyclopentanol
◦ 1-isopropyl-4-cyclopentanol
◦ None of these
Question 2
What is the correct structure for 1-chloro-3-ethyl-2-pentanol?
![](data:image/png;base64, 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◦ I
◦ II
◦ III
◦ IV
◦ None of these