Question 1
Refer to the information provided in Table 14.2 below to answer the question that follows.
![](data:image/png;base64, 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)
Refer to Table 14.2. What is the Nash equilibrium in the game?
◦ (Advertise, Advertise)
◦ (Don't Advertise, Don't Advertise)
◦ (Don't Advertise, Advertise)
◦ (Advertise, Don't Advertise)
Question 2
Refer to the information provided in Table 14.2 below to answer the question that follows.
![](data:image/png;base64, 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)
Refer to Table 14.2. If both firms follow a maximin strategy, the equilibrium in the game is ________.
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