Refer to the information provided in Figure 33.3 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 33.3. The domestic price of shoes is $80. After trade the price of a pair of shoes is $60. If shoes are a normal good and income in this country falls, then we would expect
◦ the number of pairs of shoes imported into this country to increase.
◦ the number of pairs of shoes imported into this country to decrease.
◦ the number of pairs of shoes exported from this country to increase.
◦ the number of pairs of shoes exported from this country to decrease.