Question 1
Refer to the information provided in Figure 8.10 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 8.10. Panel ________ represents the demand curve facing a perfectly competitive producer of wheat.
◦ A
◦ B
◦ C
◦ D
Question 2
Refer to the information provided in Figure 8.10 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 8.10. Panel ________ represents the industry demand curve for the perfectly competitive wheat industry.
◦ A
◦ B
◦ C
◦ D