Refer to the information provided in Figure 3.15 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
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Refer to Figure 3.15. The current price of a bag of pretzels is $1.10. You accurately predict that in this market,
◦ price tends to remain constant, and quantity supplied increases.
◦ price, quantity demanded, and quantity supplied decrease.
◦ price and quantity demanded increase, and quantity supplied decreases.
◦ price and quantity supplied decrease, and quantity demanded increases.