For the following acid-base reaction, predict the position of the equilibrium and identify the most stable base.
![](data:image/png;base64, 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)
◦ favor the right side with compound I being the most stable base
◦
favor the left side with compound II being the most stable base
◦
favor the right side with compound III being the most stable base
◦ favor the right side with compound II being the most stable base
◦ favor the left side with compound I being the most stable base