Question 1
Refer to the information provided in Figure 6.5 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 6.5. Molly's budget constraint is
CD. If the price of CDs increases, her new budget constraint becomes
◦
AD.
◦
AO.
◦
BE.
◦
EF.
Question 2
Refer to the information provided in Figure 6.5 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 6.5. Molly's budget constraint is
AD. If her income decreases, her new budget constraint is
◦
CD.◦
BD.
◦
EF.
◦ not shown on this graph.