Question 1
Refer to the information provided in Figure 31.1 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 31.1. Economic growth is represented by
◦ a movement from Point
A to Point
B along
ppf1.
◦ a movement from Point
C to Point
B.
◦ a movement from Point
B to Point
A.
◦ a shift in the production possibilities frontier from
ppf2 to
ppf3.
Question 2
Refer to the information provided in Figure 31.1 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 31.1. A decrease in the labor force will cause a
◦ movement from Point
A to Point
B.
◦ movement from Point
B to Point
A.
◦ shift from
ppf2 to
ppf1.◦ shift from
ppf2 to
ppf3.