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Introduction to Sensitivity Analysis
Introduction to Sensitivity Analysis
Sensitivity analysis means determining effects of changes
in parameters on the solution. It is also called What if analysis,
Parametric analysis, Post optimality analysis, etc,. It is not
restricted to LP problems. Here is an example using Data Table.
We will now discuss LP and
sensitivity analysis..
LP: Sensitivity Analysis BU.520.601 2
Primal dual relationship 10x + 8x Max
Primal dual relationship 1 2
0.7x + x ≤ 630
Consider the LP problem shown. We will call 1 2
(½) x + (5/6) x ≤ 600
this as a “primal” problem. For every primal 1 2
x + (2/3) x ≤ 708
problem, there is always a corresponding LP 1 2
problem called the “dual” problem. (1/10) x + (1/4) x ≤ 135
1 2
630y + 600y + 708y + 135y - 150y Min -x - x ≤ -150
1 2 3 4 5 1 2
0.7y + (½)y y (1/10)y -y ≥ 10 x1 ≥ 0, x2 ≥ 0
1 2 3 4 5
y + (5/6)y + (2/3)y + (1/4) - y ≥ 8 Note the
1 2 3 4 2
y ≥ 0, y ≥ 0, y ≥ 0, y ≥ 0, y ≥ 0 following
1 2 3 4 5
• Any one of these can be called “primal”; Min
the other one is “dual”.
• If one is of the size m x n, the other is of optimal
the size n x m.
• If we solve one, we implicitly solve the Max
other.
• Optimal solutions for both have identical
value for the objective function (if an
LP: Sensitivity Analysis 3
optimal solution exists).
BU.520.601
The Simplex Method
The Simplex Method
Consider a simple two product example
with three resource constraints. The
feasible region is shown.
Maximize 15x +10x = Z
1 2
2x + x ≤ 800
1 2
x + 3x ≤ 900
1 2
+ x ≤ 250
2
x1 ≥ 0, x2 ≥ 0
We now add slack variables MaxZ - 15x + 10x = 0
to each constraint to convert 1 2
2x + x + S = 800
these in equations. 1 2 1
x + 3x +S = 900
1 2 2
Primal - dual + x +S = 250
Maximize 15 x + 10 x 2 3
1 2
Minimize 800 y + 900 y + 250 y
1 2 3
LP: Sensitivity Analysis 4
BU.520.601
The Simplex Method: Cont…
The Simplex Method: Cont…
Start with the tableau for Maximize 15 x1 + 10 x2
Z x x S S S
1 2 1 2 3
1 -15 -10 0 0 0 0 Initial solution:
Z = 0, x1 = 0, x2 = 0,
0 2 1 1 0 0 800 S = 800, S = 900
1 2
0 1 3 0 1 0 900 and S = 250.
0 0 1 0 0 1 250 3
After many iterations (moving from one
Z x x S S S corner to the next) we get the final answer.
1 2 1 2 3
1 0 0 7 1 0 6500 Optimal solution:
Z = 6500, x1 = 300, x2 = 200 and S3 = 50.
0 1 0 3/5-1/5 0 300 Z = 15 * 300 + 10 * 200 = 6500
0 0 1 -1/5 -2/5 0 200
0 0 0 0 0 1 50 Notice 7, 1, 0 in the objective row.
These are the values of dual variables, called shadow prices.
Minimize 800 y + 900 y + 250 y gives 800*7 + 900*1 + 250*0 = 6500
1 2 3
LP: Sensitivity Analysis 5
BU.520.601
Maximize 10 x + 8 x = Z
Solver 1 2
Solver Consider the 7/10 x + x 630
“Answer 1 2
“Answer Golf Bag 1/2 x1 + 5/6 x2 600
Report” problem. x1 + 2/3 x2 708
Report”
1/10 x + 1/4 x 135
1 2
x1 ≥ 0, x2 ≥ 0 x1 + x2 ≥ 150
Optimal solution: x = 540, x = 252. Z = 7416
1 2
Binding constraints: constraints intersecting at
the optimal solution. ,
Nonbinding constraint? , and
Now consider the
Solver solution.
Linear Optimization BU.520.601 6
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