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Linear Programming

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Linear Programming Optimal Solutions and Models Without Unique Optimal Solutions Finding the Optimal Point - Review Minimization Objective Function Different ... – PowerPoint PPT presentation

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Title: Linear Programming


1
Linear Programming
  • Optimal Solutions
  • andModels Without Unique Optimal Solutions

2
Finding the Optimal Point - Review
Move the objective function line parallel to
itself until it touches the last point of the
feasible region.
3
Minimization Objective Function
4
Different Objective Function
5
Another Objective Function
6
Still Another Objective Function
7
Extreme Points andOptimal Solutions
  • Fundamental Linear Programming Theorem
  • Why not simply list all extreme points?
  • More cumbersome than solving the model in most
    cases.
  • Model may not have an optimal solution.

If a linear programming model has an optimal
solution, then an extreme point will be optimal.
8
Models With No SolutionsInfeasibility
Max 8X1 5X2 s.t. 2X1 1X2 1000 3X1 4X2
2400 X1 - X2 350 X1, X2 0
.
No points in common.No points satisfy all
constraints simultaneously.
No Solutions!Problem is INFEASIBLE.
9
Infeasibility
  • A problem is infeasible when there are no
    solutions that satisfy all the constraints.
  • Infeasibility can occur from
  • Input Error
  • Misformulation
  • Simply an inconsistent set of contraints
  • Excel When Solve is clicked

10
Models With An Unbounded Solution
Max 8X1 5X2 s.t. X1 - X2 350 X1
200 X2 200
Unbounded Solution
11
Models With An UnboundedFeasible Region
Optimal Solution
Min 8X1 5X2 s.t. X1 - X2 350 X1
200 X2 200
12
Unboundedness
  • An unbounded feasible region extends to infinity
    in some direction.
  • If the problem is unbounded, the feasible region
    must be unbounded.
  • If the feasible region is unbounded, the problem
    may or may not be unbounded.
  • An unbounded solution means you left out some
    constraints you cannot make an infinite
    profit.
  • Excel When Solve is clicked

Means the problem is unbounded
13
Multiple Optimal Solutions
s.t. 2X1 1X2 1000 3X1 4X2 2400 1X1 -
1X2 350 X1, X2 0
2X1 1X2 1000
1X1 - 1X2 350
3X1 4X2 2400
14
Multiple Optimal Solutions
  • When an objective function line is parallel to a
    constraint the problem can have multiple optimal
    solutions.
  • The constraint must not be a redundant constraint
    but must be a boundary constraint.
  • The objective function must move in the direction
    of the constraint
  • In the previous example if the objective function
    had been MIN 8X1 4X2, then it is moved in the
    opposite direction of the constraint and (0,0)
    would be the optimal solution.
  • Multiple optimal solutions allow the decision
    maker to use secondary criteria to select one of
    the optimal solutions that has another desirable
    characteristic (e.g. Max X1 or X1 3X2, etc.)

15
Generating the Multiple Optimal Solutions
  • Any weighted average of optimal solutions is also
    optimal.
  • In the previous example it can be shown that the
    two optimal extreme points are (320,360) and
    (450, 100).
  • Thus .5(320,360) .5(450,100) (385,230) is
    also an optimal point that is half-way between
    these two points.
  • .8(320,360) .2(450,100) (346,308) is also an
    optimal point that is 8/10 of the way up the line
    toward (320,360).

16
Multiple Optimal Solutions in Excel
  • Excel Identification of multiple solutions

We discuss how to generate and choose an
appropriate alternate optimal solution using
Excel later.
17
Review
  • When a linear programming model is solved it
  • Has a unique optimal solution
  • Has multiple optimal solutions
  • Is Infeasible
  • Is unbounded
  • Identification of each
  • By graph
  • By Excel
  • If a linear program has an optimal solution, then
    an extreme point is optimal.
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