In Problems 3-8, determine the value
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- Solve 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.) M= P* = -3 2 3 -2 (Type an integer or simplified fraction for each matrix element.) Carrow_forwardDetermine whether the two-person, zero-sum matrix game is strictly determined. 4 5 2 −4 If the game is strictly determined, answer the following. (If the game is not strictly determined, enter DNE for each.)(b) Find the optimal strategy for each player. The optimal strategy for the row player is to play row .The optimal strategy for the column player is to play column . (c) Find the value of the game.(d) Determine whether the game favors one player over the other. It favors the row player.It favors the column player. It is fair.It is not strictly determined. (DNE)arrow_forward9. Solve 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. P*=________ (Type an integer or simplified fraction for each matrix element.) Q*= _____________ (Type an integer or simplified fraction for each matrix element.) v=arrow_forward
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