Question 1
Which aldose would produce D-ribose and D-arabinose when subjected to the Kiliani-Fischer synthesis?
◦ D-allose
◦ D-lyxose
◦ D-erythrose
◦ D-xylose
◦ D-threose
Question 2
What are the predicted products of the Kiliani-Fischer synthesis shown?
![](data:image/png;base64, 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)
◦ D-ribose and D-arabinose
◦ D-galactose and D-talose
◦ D-altrose and D-mannose
◦ D-glucose and D-galactose
◦ D-gulose and D-iodose