Question 1
For the following reaction, identify the Brønsted-Lowry base and the corresponding conjugate base.
![](data:image/png;base64, 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)
◦ I and II
◦ I and III
◦ I and IV
◦ II and IIII
◦ II and IV
Question 2
For the following reaction, identify the Brønsted-Lowry acid and the conjugate base.
![](data:image/png;base64, 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)
◦ I and II
◦ I and III
◦ I and IV
◦ II and IIII
◦ II and IV