simplex method with no fractions only on outside (3x + y 55 Use the simplex method to maximize p= 2x + y, subject to x+2y 2 . x>0, y20
Use the simplex method to solve the following maximum problem: Maximize P= x1 +2:02 Subject to the constraints: 2x1 + x2 < 8 21 +2y < 5 X1 > 0 22 > 0 and using your final tableau answer the questions below by entering the correct answer in each blank box. Please enter fractions as 3/5, -4/7, and so on. 21 2 P=
(9 pts) 3. Solve the linear programming problem graphically. Minimize c = 2x - 5y, subject to (x + y 510 3x - y 26. x20,20 (3x + y 55 (9 pts) 4. Use the simplex method to maximize p= 2x+y, subject to <x+2y52. x 20, y20
(2 points) Use the simplex method to maximize P = 7xı + 13x2 subject to < 5x1 x1 + + x2 5x2 10 15 x120 x2 > 0 P =
find the solution simplex method Maximize 2x + 5y subject to the constraints 5x + y = 60 5x + 2y = 80 X20,y20 5x + 2y + y = 80 2x + 5y + M = 0 D. 5x +y+c= 60 5x + 2y + y = 80 - 2x - 5y + M = 0 Find the solution x= y=(,m=0 (Type integers or decimals.) ne Enter your answer in the edit fields and then click Check Answer.
We will use u and v as our dual variables. Maximize 12x +15y subject to 5x+4y < 40 Given the following Maximize 3x +2y < 36 x,y 20 Set up the dual problem The dual objective function is One constraint is Another constraint is The variables are You are given the following problem; Maximize 10x+15y subject to 6x+3y < 96 x+y = 18 X.y 20 Based on this information which tableau represents the correct solution for this scenario?
Excel Use Simplex method and Exel To solve the following LPPs. Maximize Maximize P-3x + x2 subject to the constraints x1 + x2 = 2 2x) + 3x2 s 12 3x + = 12 x 20 x220 P = 5x1 + 7x2 subject to the constraints 2xy + 3x2 = 12 3x + x2 = 12 x 20 *2 2 0 Maximize Maximize P = 2x2 + 4x2 + x3 subject to the constraints -*1 + 2x2 + 3x3 5...
Solve the linear programming problem by simplex method. . Minimize C= -x - 2y + z. subject to 2x + y +2 < 14 4x + 2y + 3z < 28 2x + 5y + 5z < 30 x = 0, y>02 > 0
both questions require different ways of solving. Solve the linear programming problem graphically. Minimize c= 2x–5y, subject to (x+ y = 10 {3x – y 26 (x20, y20 (3x + y = 5 Use the simplex method to maximize p = 2x + y, subject to {x+2y 2 . x>0, y20
5. Waner p 302 #1) Given the LP problem: Maximize p = 2x + y subject to: Constraint 1: x + 2y <= 6 Constraint 2: -x + y<=4 Constraint 3: x + y = 4 XX. >= 0 The final simplex tableau is as follows: Basic 10 0 Answer the following questions: Find the new value of the objective function when b3 is changed from 4 to 6. g) The range of values of 4 (63) such that the...