Consider the objective function z = 5x+10y subject to the following constraints:Find the feasible region and list the corner points.Corner points:If there is more than one corner point, type the points separated by a comma (i.e. (1,2), (3,4));Find the maximum and minimum values of z.Maximum value of zis:Minimum value of 2 is:when x =when x =and y =and y =-3x+y >xyxyAI AI VI AI AI>06<25>00

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Answered: Consider the objective function z =…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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A store store is looking to stock the following: necklaces, bracelets, rings, and earrings. The objective function measuring profit and constraints are given below. Constraint 1 measures display space in units, constraint 2 measurestime to set up the display in minutes. Constraints 3 and 4 are marketing restrictions. Setup an LP program in Tab "#1" and run additional reports (leave reports in your file) in order to answer the following questions.MAX 100X1+120X2+150X3+125X4S.T.1) X1+2X2+2X3+2X4<1082) 3X1+5X2+X4<1203) X1+X3<254) X2+X3+X4>50a. How many necklaces should be stocked?b. Now many bracelets should be stocked?c. How many rings should be stocked?d. How many earrings should be stocked?e. How much space will be left unused?f. How much time will be used?g. By how much will the second marketing restriction be exceeded?h. What is the profit?i. To what value can the profit on necklaces drop before the solution would change?j. By how much can the profit on rings increase…
a. Determine the solution to the following function:Maximize 2xy subject to 4x + 2y = 200b. Determine the solution to the following function:Minimize 2x2 + 2y2 subject to 2x + 4y = 8
In the feasible area on a graph the following points are the vertices: (0,0), (0,5), (4,10), (10,12), (18,5) and (20,0). Determine the values of x and y such that the objective function 4x + 3y is maximized.
A decision problem has the following three constraints: 37X + 23Y <= 851; 19X + 21Y= 399; and 19X - Y <= 0.90476227 . The objective function is Min 3X + 33Y . The objective function value is : a. 0 b. unbounded c. 1200.2856 d. infeasible e. 600.14282
A LP model is given as Max z = 3x1+ 2x2 Subj to 2x1 + 2x2 0 Obtain the dual of the model. Use the variables y1, Y2, Y3, · . . Objective function: Min w= Constraint 1: Constraint 2: With: >0
Needed to be solved correctly in 1 hour and get the thumbs up please show neat and clean work for it by hand solution needed Kindly solve ? percent correct by Hand please
Find X₁ and X₂ that maximize the objective function Z = 3x₁ + 5×₂2 with the constraint function 2x, 8 3X₁ ≤ 15 6X₁ + 5X₂ > 30 = Using the simplex method.
Find the minimum and maximum values of z= 6x + 3y, if possible, for the following set of constraints. 5x + 4y2 20 x+ 4y 28 x20, y20 Select the correct choice below and, if necessary, fill in the answer box to complete your choice. O A. The minimum value is (Round to the nearest tenth as needed.) O B. There is no minimum value.
Find the minimum and maximum values of z=9x+6y, if possible, for the following set of constraints. 3x+6y 2 18 x+6y ≥ 12 x20, y 20 *** Select the correct choice below and, if necessary, fill in the answer box to complete your choice. ⒸA. The minimum value is. (Round to the nearest tenth as needed.) B. There is no minimum value.

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