Question 1
Refer to the information provided in Figure 24.5 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 24.5. The
MPC equals ________ and the
MPS equals ________.
◦ 0.5; 0.5
◦ 0.75; 0.25
◦ 0.8; 0.2
◦ 0.9; 0.1
Question 2
Refer to the information provided in Figure 24.5 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 24.5. If the economy is in equilibrium and the government increases spending by $200 billion, equilibrium aggregate expenditures increase to $________ billion.
◦ 1,800
◦ 2,000
◦ 2,400
◦ 3,200