In Problems 3-8, determine the value
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- 2arrow_forwardWrite the payoff matrix for the given game, use Rachel as the row player. Two players, Rachel and Charlie, each have two cards. Rachel has one black card with the number 3 and one red card with the number 5. Charlie has a black card with a 6 written on it and a red card with a 1. They each select one of their cards and simultaneously show the cards. If the cards are the same color, Rachel gets, in dollars, the sum of the two numbers shown. If the cards are different colors, Charlie gets, in dollars, the difference of the two numbers shown.arrow_forwardRefer to the payoff matrix below: B1 B2 A1 2 -1 A2 -2 3 Determine the optimal strategy for both players and the value of the game.arrow_forward
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- The pay off matrix of a two person zero sum game is: Player B B, B2 Bg A, 1 1 Player A A, 0. -4 -1 A3 1 -2arrow_forwardTwo-Finger Morra is a game in which two players each hold up one or two fingers. The payoff, in dollars, is the total number of fingers shown. R receives the payoff if the total is even, and C receives the payoff if the total is odd. Write the payoff matrix. с R 1 2 1 2arrow_forwardSolve the matrix game M, indicating the optimal strategies P and Q for row player R and column player C, respectively, and the value v of the game. (First determine if the game is strictly or nonstrictly determined.) 5-7 10 M= -5-8 0 7 3 -7 COOR P=(Type an integer or simplified fraction for each matrix element)arrow_forward
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