mize the functi 2x + 2y = 1 19. Explain why it is impossible to maximize z = 3x + 4y subject to the constraints x + y 28 2x + y = 10 x + 2y = 8 + > 0, y = 0. mize the function 20. Explain why it is impossible to maximize the z = 4x + 7y subject to the constraints 8y + 5x 2 40 4y + 9x = 36 11y + 2x =...
LP. Model Maximize Subject to Z X + Y 1X + 2Y6 5X2Y520 (C) C) On the graph on right, the constraints, and have been plotted Using the point drawing tool plot the four comer points for the feasible area The optimum solution is: X r ound your response to two decimal places Ya round your response to two decimal places) Optimal solution value = round your response to decimal places Click the graph, choose a tool in the palette...
(3 points) Maximize the function P = 7x – 8y subject to x > y > 6x + 5y = ( 10x + 2y > ΛΙ ΛΙ V 0 0 30 20 What are the corner points of the feasible set? The maximum value is and it occurs at . Type "None" in the blanks provided if the maximum does not exist.
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.
Find the minimum and maximum values of z = 10x + 8y subject to the following constraints: 2x + 4y = 28 5x -2y = 10 x > 0 y > 0 Minimum value of Preview when x= Preview and y= Preview Maximum value of Preview when x= Preview and y= Preview
(10 points) Linear Programing (SLOI): 4. iven constraints. 2x+Sy subject to the g Graph the Feasible Region, and minimize the quantity z x +2y 21 r +2y s10 2 2x 2 r 20 (10 points) Linear Programing (SLOI): 4. iven constraints. 2x+Sy subject to the g Graph the Feasible Region, and minimize the quantity z x +2y 21 r +2y s10 2 2x 2 r 20
Use graphical methods to solve the following linear programming problem. Maximize: z= 3x + y subject to: x-ys7 3x + 5y = 45 X20, y20 Graph the feasible region using the graphing tool to the right. Click to enlarge graph , at the corner point The maximum value of z is (Simplify your answers.) of T o to 12 14 16
6, Maximize z = 2x1 + x2 + 3x3 subject to x 3x2 5x3 s 10 2x x 20, x, 0, x320. (a) State the dual problem. (b) Solve both the primal and the dual problem with any method that works. (c) Check that your optimal solutions are correct by verifying they are feasible and the primal and dual objective functions give the same value. 6, Maximize z = 2x1 + x2 + 3x3 subject to x 3x2 5x3 s...
I dont know how they got the numbers. I tried different methods and still didnt get the right answer. Doug Turner Food Processors wishes to introduce a new brand of dog biscuits composed of chicken and liver flavored biscuits that meet certain nutritional requirements. The liver flavored biscuits contain 1 unit of nutrient A and 2 units of nutrient B; the chicken flavored biscuits contain 1 unit of nutrient A and 4 units of nutrient B. According to federal requirements,...
-/2 POINTS MY NOTES ASK YOUR TEACHER Solve the following linear programming problem. Restrict x 20 and y 2 0. Maximize f = 3x + 4y subject to x + y s 9 2x + y s 14 y s6. (x, y) = ( ) -/2 POINTS MY NOTES ASK YOUR TEACHER Solve the following linear programming problem. Restrict x 2 0 and y 2 0. Minimize g = 6x + 8y subject to the following. 5x + 2y >...