Question 1
Refer to the information provided in Figure 30.2 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 30.2. Labor productivity at time
t
3 is
◦ larger than labor productivity at time
t1.
◦ less than labor productivity at time
t4.
◦ larger than labor productivity at time
t2.
◦ larger than labor productivity at time
t2, but less than labor productivity at time
t4.
Question 2
Refer to the information provided in Figure 30.2 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 30.2. Labor productivity at time
t
2 is
◦ larger than labor productivity at time
t1.
◦ less than labor productivity at time
t4.
◦ less than labor productivity at time
t3.
◦ larger than labor productivity at time
t1, but less than labor productivity at time
t3.