Question 1
Refer to the information provided in Figure 23.2 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 23.2. A decrease in Jerry's income is represented by
◦ an upward shift in Jerry's consumption function.
◦ a decrease in the slope of Jerry's consumption function.
◦ a movement from Point
B to
A.
◦ a movement from Point
C to
A.
Question 2
Refer to the information provided in Figure 23.2 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 23.2. Suppose Jerry's
MPC decreases. At income
Y
1, Jerry's
◦ consumption will be greater than his income.
◦ consumption will be less than his income.
◦ saving will be zero.
◦ All of these