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In Problems 1-8, is the matrix game strictly determined?
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- 2. Give an example of a 2-player, zero-sum game with the following properties (by giving its payoff matrix from the perspective of the row player): • The row player has strategy set {1, 2} and the column player has strategy set {C1, C2} • The security levels of r₁, r2, C1, and c₂ are respectively −1, −2, 4, and 3.arrow_forward! need asaparrow_forwardd) Solve the following game for optimum strategies and the value of the game given the following matrix; Player A 18 6 11 7 Player B 4 6 4 2 13 7 5 17 3 6 12 2arrow_forward
- 2.)A jar contains 2 red, 3 green, and 6 blue marbles. In a game a player closes their eyes, reaches into the jar and randomly chooses two marbles. The player wins the game if at least one of their marbles is red. Suppose it costs $1 to play the game and the winning prize is $3. Mathematically analyze this game and determine if it is in your financial interest to play the game.arrow_forwardConsider the following game. Players 1 and 2 are partners in a firm. If they both invest 10 ina project, the project will achieve an income of 13 per person, so both will get net earningsof 3. If only one of them invests, the project earns only 5 per person, leading to a payoff of-5 for the person who invested and 5 for the other. If none of them invests, both get nothing.They can only choose to invest 10 or not invest at all. 1. Write down the payoff matrix of the game.2. Assume that both players only care about their own material payoffs. Suppose thesepreferences are commonly known to both players. Derive the Nash equilibrium/equilibriaof the game. Does a player’s best choice depend on the strategy chosen by the otherplayer?arrow_forwardb) Consider the following game matrix: -10 -2 -1 7 -5 20 -10-10 7 -1 2 7 -10 7 -1 -10 Determine optimal mixed strategies to each player and give the value of the game. -1 7 -20 -10 -1 2-10 7 -5 20 -1 -1arrow_forward
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