Question: In a gambling game. Player A and Player B both have a SI and a $5 bill. Each player selects one of the bills without

In a gambling game. Player A and Player B both have

In a gambling game. Player A and Player B both have a SI and a $5 bill. Each player selects one of the bills without the other player knowing the bill selected. Simultaneously they both reveal the bills selected. If the bills do not match, Player A wins Player B's bill. If the bills match. Player B wins Player A's bill. a. Develop the game theory table for this game. The values should be expressed as the gains (or losses) for Player A. b. Is there a pure strategy? Why or why not? c. Determine the optimal strategies and the value of this game. Does the game favor one player over the other

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