Question 1
Refer to the information provided in Figure 8.9 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 8.9. This farmer's ________ level of output is 500 units of output.
◦ profit-maximizing
◦ loss-minimizing
◦ break-even
◦ shut-down
Question 2
Refer to the information provided in Figure 8.9 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 8.9. If this farmer is producing the profit-maximizing level of output, her total revenue is
◦ $0.
◦ $8,400.
◦ $12,000.
◦ $16,800.