Question 1
Refer to the information provided in Figure 30.1 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 30.1. If the economy is currently at Point
C, ________ in aggregate output moves the economy to
I
3.
◦ optimism about past growth
◦ pessimism about past growth
◦ optimism about future growth
◦ pessimism about future growth
Question 2
Refer to the information provided in Figure 30.1 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 30.1. Suppose the economy is currently at Point
B. If investors are ________ in aggregate output, investment moves the economy to
I
2.
◦ optimistic about past growth
◦ pessimistic about past growth
◦ optimistic about future growth
◦ pessimistic about future growth