Question 1
Refer to the information provided in Figure 26.1 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 26.1. This economy is most likely experiencing excess capacity at aggregate output levels
◦ above $1,500 billion.
◦ between $1,000 billion and $1,500 billion.
◦ between $500 billion and $1,000 billion.
◦ below $500 billion.
Question 2
Refer to the information provided in Figure 26.1 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 26.1. This economy is most likely experiencing costs increasing as fast as output prices are increasing at aggregate output levels
◦ above $1,500 billion.
◦ between $1,000 billion and $1,500 billion.
◦ between $500 billion and $1,000 billion.
◦ below $500 billion.