Question 1
Refer to the information provided in Figure 28.1 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 28.1. If the value people put on their leisure time increases, the equilibrium wage rate
◦ could change from $9 to $6.
◦ could change from $9 to $15.
◦ would stay at $15.
◦ would increase to $15.
Question 2
Refer to the information provided in Figure 28.1 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 28.1. If the productivity of workers decreases, the equilibrium wage rate
◦ could change from $9 to $6.
◦ could change from $9 to $15.
◦ would stay at $15.
◦ would increase to $15.