Question 1
Refer to the information provided in Figure 6.6 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 6.6. Bill's budget constraint was originally
EF. If his new budget constraint is
AD, then his income
◦ increased.
◦ decreased.
◦ increased and the price of bell peppers decreased.
◦ decreased and the price of bell peppers increased.
Question 2
Refer to the information provided in Figure 6.6 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 6.6. Bill's budget constraint is
CD. If the price of bell peppers increases, Bill's new budget constraint is
◦
AD.
◦
AO.
◦
BE.
◦
EF.