Please, I want to answer the question correctly and clearly for this question. Course name: Linear Programming Q5.Solve the following LPP by using Big M method.Maximize z = x₁+2x2+3x3x4Subject to constraintsx1+2x2+3x3 = 152x1 + x2+5x3 = 20x1+ 2x2 + x3 + x4 = 10X1, X2, X3, X≥0

Here all constraints are in the form of equality. Therefore, we introduce artificial variables A1,…

Answered: Q5. Solve the following LPP by using…

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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I need to explain how to get the answer and i dont know how. See the pictures for the problem and what I need to explain. Thank you
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I understand that so much better then the last person that helped. could you do the same thing but swap the equation out for -2x=8y instead of x=5
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Q3- You may need to use the appropriate technology to answer this question. The product development group at Landon Corporation has been working on a new computer software product that has the potential to capture a large market share. Through outside sources, Landon's management learned that a competitor is working to introduce a similar product. As a result, Landon's top management increased its pressure on the product development group. The group's leader turned to PERT/CPM as an aid to scheduling the activities remaining before the new product can be brought to the market. The activity time estimates (in weeks) are listed in the following table. Activity Optimistic Most Probable Pessimistic A 3 4 5 B 3 3.5 7 C 4 5 6 D 2 3 4 E 5 8 11 F 8.5 9.5 13.5 G 4.5 6 7.5 H 6 7 14 I 2 2.5 6 J 4 5 6 (a) Develop an activity schedule for this project and identify the critical path activities. (Enter your answers as a comma-separated list.) (b) Based solely…
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You can use the interactive grap y=4x-2 y=x+3
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Q5. Solve the following LPP by using Big M method. Maximize z = x₁+2x2+3x3x4 Subject to constraints x1+2x2+3x3 = 15 2x1 + x2+5x3 = 20 x1+ 2x2 + x3 + x4 = 10 X1, X2, X3, X≥0