Question 1
Refer to the information provided in Figure 7.2 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 7.2. The average product with two workers is ________ lawns mowed.
◦ 4
◦ 5
◦ 5.5
◦ 11
Question 2
Refer to the information provided in Figure 7.2 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 7.2. The marginal product of the first worker is ________ lawns moved.
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