Question 1
What is the relationship between the following compounds?
![](data:image/png;base64, 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)
◦ isotopes
◦ constitutional isomers
◦ empirical isomers
◦ resonance isomers
◦ There is no relationship
Question 2
Which of the following compounds are constitutional isomers?
![](data:image/png;base64, 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◦ I and III
◦ I, II and IV
◦ I and II
◦ II, III and IV
◦ I, II, and III