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[4.37] Consider the following problem: Maximize 2x + 3x2 subject to X1 + 2x2 5 10...
4.6-1.* Consider the following problem. Maximize Z= 2x1 + 3x2, subject to x1 + 2x2 54 x1 + x2 = 3 and X120, X2 0. DI (a) Solve this problem graphically. (b) Using the Big M method, construct the complete first simplex tableau for the simplex method and identify the corresponding initial (artificial) BF solution. Also identify the initial entering basic variable and the leaving basic variable. I (c) Continue from part (b) to work through the simplex method step...
Solve the linear programming problem using the simplex method Maximize P=2x2 + 3x2 + 4x3 subject to X1 + x3 s 12 X2 + x3 s 9 *2, X2, X3 20 Use the simplex method to solve the problem. Select the correct choice below and, if necessary, fill in the answer boxes to complete your choice. O A. The maximum value of Pis when xy = X2 and x3 = OB. There is no optimal solution
2a. Consider the following problem. Maximize 17-Gri +80 Subject to 5x1 + 2x2 320 i 212 10 and Construct the dual problem for the above primal problem solve both the primal problem and the dual problem graphically. Identify the corner- point feasible (CPF) solutions and comer-point infeasible solutions for both problems. Calculate the objective function values for all these values. Identify the optimal solution for Z. I 피 University 2b. For each of the following linear programming models write down...
x1.x2 Subject to 4x1-3x2 S 20 x1 +2x2 s 10 a) Is this problem convex? Justify your answer. (5 Points) b) Form the Lagrangian function. (5 Points) c) Formulate KKT conditions. (10 Points) d) Recall that one technique for finding roots of KKT condition is to check all permutations of the switching conditions. Find an optimal solution (x*) via e) Compute the objective function and identify each constraint as active or f) Solve this problem using graphical optimization to check...
Consider the following LP: Max x1 +x2 +x3 s.t. x1 +2x2 +2x3 ≤ 20 Solve this problem without using the simplex algorithm, but using the fact that an optimal solution to LP exists at one of the basic feasible solutions.
3. Consider the following LP. Maximize u = 4x1 + 2x2 subject to X1 + 2x2 < 12, 2x1 + x2 = 12, X1, X2 > 0. (a) Use simplex tableaux to find all maximal solutions. (b) Draw the feasible region and describe the set of all maximal solutions geometrically.
Problem #5 -- Consider the following linear programming problem: Maximize Z = 2x1 + 4x2 + 3x3 subject to: X1 + 3x2 + 2x3 S 30 best to X1 + x2 + x3 S 24 3x1 + 5x2 + 3x3 5 60 and X120, X220, X3 2 0. You are given the information that x > 0, X2 = 0, and x3 >O in the optimal solution. Using the given information and the theory of the simplex method, analyze the...
i can't solve 1-(b)....
1. Consider the following problem Minimize Z= X1+2X2, subject to 90 30 and (a) Solve this problem graphically (b) Work through the simplex method to solve the problem. Mark BFSs of the simplex method in the graph from (a)
1. Consider the following problem Minimize Z= X1+2X2, subject to 90 30 and (a) Solve this problem graphically (b) Work through the simplex method to solve the problem. Mark BFSs of the simplex method in the graph...
Consider the following linear program: Max Z = X1 – 2X2 Subject to – 4X1 + 3X2 <= 3 X1 – X2 <= 3 X1, X2 >= 0 a) Graph the feasible region for the problem. b) Is the feasible region unbounded? Explain. c) Find the optimal solution. d) Does an unbounded feasible region imply that the optimal solution to the linear program will be unbounded?
Maximize:-x 3x2 subject to: + S8 (resource 1). -xx (resource 2). s6 (resource 3). xi20.x2 20. The optimal tableau determined by the simplex method is given below Current Basic variablesvax x x5 Using the above optimal tableau determined by the simplex method, determine i) the optimal solution. ii) the shadow prices on the three constraints ii the range on the objective coefficient ofeach variable, holding the coefficient of the other variable at its current value, for which the solution to...