Question 1
Refer to the information provided in Figure 8.8 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 8.8. If this farmer is producing the profit-maximizing level of output, her profit is
◦ $0.
◦ $2,800.
◦ $3,000.
◦ $12,000.
Question 2
Refer to the information provided in Figure 8.8 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 8.8. What is the total cost of producing the profit-maximizing level of output?
◦ $9
◦ $1,000
◦ $5,600
◦ $9,000