Refer to the information provided in Figure 4.1 below to answer the question(s) that follow.
![](data:image/png;base64, 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![](data:image/png;base64, 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)
Refer to Figure 4.1. Assume that initially there is free trade. The quantity demanded of apples will be reduced by 2 million per day if the United States imposes a tax of ________ per apple.
◦ 10 cents
◦ 20 cents
◦ 30 cents
◦ 40 cents