Question 1
Refer to the information provided in Figure 23.4 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 23.4. If income is
Y
1, aggregate consumption is the smallest when the aggregate consumption function is
◦
C3.
◦
C2.
◦
C1.
◦ cannot be determined from the figure.
Question 2
Refer to the information provided in Figure 23.4 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 23.4. The society's consumption is equal along
C
2 and
C
3 if
◦ income is
Y1.
◦ income is
Y2.
◦ saving is positive.
◦ saving is negative.