Question 1
What reagents are needed to carry out the conversion shown?
![](data:image/png;base64, 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)
◦ excess CH
3CH
2I/Ag
2O/pyridine
◦ excess CH
3CH
2I/pyridine
◦ excess CH
3I/pyridine
◦ excess CH
2CH
2I/Ag
2O
◦ excess CH
3I/Ag
2O
Question 2
All of the —OH groups on a monosaccharides can be converted to ethers via the Williamson ether synthesis with CH
3I in the presence of ________.
◦ weak acid
◦ strong base
◦ strong acid
◦ weak base