Question 1
Refer to the information provided in Figure 23.1 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 23.1. A(n) ________ in the amount of ________ this household makes when this household's income is zero shifts the saving function downward.
◦ decrease; consumption
◦ decrease; spending
◦ increase; saving
◦ increase; consumption
Question 2
Refer to the information provided in Figure 23.1 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 23.1. A decrease in the
MPS
◦ makes the consumption function flatter.
◦ makes the saving function flatter.
◦ shifts the consumption function upward.
◦ shifts the saving function downward.