*a.b.4-17. Estimate a range for the optimal objective value for the following LPs:subject toMaximize z = ₁+ 5x₂ + 3x3subject toMinimize z = 5x₁ + 2x₂x1 - X₂ > 32x1 +3₂ 2 51, 20x₁ + 2x₂ + 3 = 32x1x2X1, X2, X3 204

Estimate a range for the optimal objective value for the following LPs:a. Minimize subject to , ,…

Answered: "a. b. 4-17. Estimate a range for the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

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Problem 1RQ

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Q2) Using Graphical Method to determine the optimal value of X1 & X2 that maximize value of Z, Max. Z = 5 X1 + 14 X2 Subject to; X1 + 3 X2 0
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P= 18x1 + X2 2x1 + X2 5 4 X1 + 8x2 5 4 X1, X2 20 Maximize subject to e.
New program: Objective function: Maximize Z = 2x, + xz + 3x3 + Os, + Os, + Os3 Subject to: X + x2 + 2x, + 1s, = 25 (1) X + X, + 1s2 = 8 (2) X2 + X3 + 1s, = 10 (3) X1, X2, X3, 15,, 1s2,1s, 20
Q4. Consider the following LP problem and its optimal final tableau shown below: (LP): max z = 2x1 + x2-x3 Basic x1 x2 x3 x4 x5 RHS s.t. Z 0 3 x1 + 2x2 + x3 ≤8 -x1 + x2-2x3 ≤4 x1 12 1 x1, x2, x3 20 x5 0 3 -1 x4 and x5 are slack variables in the 1s., and 2nd constraints respectively, a) Fill out the empty cells in the given optimal simplex tableau. b) What is the optimality range for c, ? What is the feasibility range for b₂ ? If the coefficient of x2 in the objective function is changed from 1 to 3, calculate the corresponding changes, detemine whether the current optimum is changed? c) d) 1 1 0 1
6) The following data is available for a simple hedonic home price model. Lot size and house size are continuous variables. For example, for every 100 square feet in house size, the value of the home increases by $150x100=15,000. Regarding proximity to a hospital, any home within 3 miles of a hospital is worth an additional $10,000 premium. Beyond 3 miles, there is no premium. What is the value of a 2,000 square foot home on a 5,000 square foot lot 2 miles from the hospital? Coefficient Value Description Lot size in Sq Ft House in Sq Ft Within 3 Miles of Hospital 60 150 10,000

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"a. b. 4-17. Estimate a range for the optimal objective value for the following LPs: subject to Maximize z = ₁+5x₂ + 3x3 subject to Minimize z = 5x1 + 2x₂ *1 - ₂ 2 3 2x1 + 3x₂ 25 #1, ₂0 x₁ + 2x₂ + x3 = 3 211 = 4 I2 F1, F2, F3 ≥0