Question 1
For the following acid-base reaction, identify the correct curved arrow mechanism.
![](data:image/png;base64, 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)
◦ I
◦ II
◦ III
◦ IV
◦ V
Question 2
The following reaction mechanism contains mistakes. Which of the following statements correctly describes how the curved arrows should be drawn?
![](data:image/png;base64, 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)
◦ The curved arrow should start at the hydride (IV), go to hydrogen atom (II) with a second arrow starting from the O–H bond and going to the oxygen atom (I).
◦ The curved arrow should start at the oxygen atom labeled (I).
◦ The curved arrow should start at the O–H bond and go to hydride (IV).
◦ There should be and additional arrow from the oxygen atom (I) to the sodium ion (III).
◦ There should be an arrow from the oxygen atom (I) to the hydrogen atom (II).