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LPP graphical solution
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Graphical solution to LPP
https://www.youtube.com/watch?v=8IRrgDoV8Eo
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Graphical Solution Method
1. Plot model constraint on a set of coordinates
in a plane
2. Identify the feasible solution space on the
graph where all constraints are satisfied
simultaneously
3. Plot objective function to find the point on
boundary of this space that maximizes (or
minimizes) value of objective function
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Maximize Z = 50x1 + 50x2
Subject to the constraints
4 x1 + 3 x2 120 lb
Convert the constraints into
equalities
4 x1 + 3 x2 =120
x1 + 2 x2 =40
Find two coordinates for each
equality; if x1 = 0 then x2 = ?; if x2 = 0
then x1 = ?;
For 4 x1 + 3 x2 =120 – (0, 40) and
(30,0)
For x1 + 2 x2 =40 – (0, 20) and
(40,0)
x1 + 2 x2 40 hr
x1, x2 0
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Graphical Solution: Example
4 x1 + 3 x2 120 lb
x1 + 2 x2 40 hr
Area common toboth constraints
50 –
40 –
30 –
20 –
10 –
0 – |
10
|
60
|
50
|
20
|
30
|
40 x1
x2
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Computing Optimal Values x1 + 2x2 = 40
4x1 + 3x2 = 120
4x1 + 8x2 = 160
-4x1 - 3x2 = -120
5x2 = 40
x2 = 8
x1 + 2(8) = 40
x1 = 24
4 x1 + 3 x2 120 lb
x1 + 2 x2 40 hr
40 –
30 –
20 –
10 –
0 – |
10
|
20
|
30
|
40
x1
x2
24
8
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Extreme Corner Points
x1 = 24
x2 =8
Z = 1600 x1 = 30
x2 =0
Z = 1,500
x1 = 0
x2 =20
Z = 1,000
A
B
C|
20
|
30
|
40
|
10 x1
x2
40 –
30 –
20 –
10 –
0 –
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Substituting the coordinates at points A, B, C
in the objective function Z = 50x1 + 50x2
At point A (0,20) Z = 50(0) + 50(20) = 1000
At point B (24,8) z = 50(24) + 50(8) = 1600
At point C (30,0) z = 50(30) + 50(0) = 1500
Maximum value is 1600 and corresponds to point B;
Therefore, optimal solution is Z = 1600; x1 = 24 and x2 = 8;
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4x1 + 3x2 120 lb
x1 + 2x2 40 hr
40 –
30 –
20 –
10 –
0 –
B
|
10
|
20
|
30
|
40
x1
x2
C
A
Optimal point:
x1 = 24
x2 =8
Z = 1600
Objective Function
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Minimization Problem
Two brands of fertilizer available - Super-gro,
Crop-quick.
Field requires at least 16 pounds of nitrogen and 24
pounds of phosphate.
Super-gro costs $6 per bag, Crop-quick $3 per bag.
Problem : How much of each brand to purchase to
minimize total cost of fertilizer given following data ?
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Minimize Z = $6x1 + $3x2
subject to
2x1 + 4x2 16 lb of nitrogen
4x1 + 3x2 24 lb of phosphate
x1, x2 0
CHEMICAL CONTRIBUTION
Brand Nitrogen (lb/bag) Phosphate (lb/bag)
Gro-plus 2 4
Crop-fast 4 3
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Graphical method
Complete model formulation:
minimize Z = $6x1 + 3x2
subject to
2x1 + 4x2 16 lb of
nitrogen
4x1 + 3x2 24 lb of
phosphate
x1, x2 0
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A Minimization Model Example
Feasible Solution Area
minimize Z = $6x1 + 3x2
subject to
2x1 + 4x2 16 lb of nitrogen
4x1 + 3x2 24 lb of phosphate
x1, x2 0
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A Minimization Model Example
Optimal Solution Point
minimize Z = $6x1 + 3x2
subject to
2x1 + 4x2 16 lb of nitrogen
4x1 + 3x2 24 lb of phosphate
x1, x2 0
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Irregular Types of Linear Programming Problems
For some linear programming models, the general
rules do not apply.
Special types of problems include those with:
1. Multiple optimal solutions
2. Infeasible solutions
3. Unbounded solutions
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Multiple Optimal Solutions
Objective function is parallel to a
constraint line:
maximize Z=$40x1 + 30x2
subject to
1x1 + 2x2 40 hours of labor
4x2 + 3x2 120 pounds of clay
x1, x2 0
where x1 = number of bowls
x2 = number of mugs
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An Infeasible Problem
Every possible solution violates
at least one constraint:
maximize Z = 5x1 + 3x2
subject to
4x1 + 2x2 8
x1 4
x2 6
x1, x2 0
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An Unbounded Problem
Value of objective function
increases indefinitely:
maximize Z = 4x1 + 2x2
subject to
x1 4
x2 2
x1, x2 0
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Degeneracy in LPP
LP is degenerate if in a basic feasible solution, one of the basic variables takes on a zero value
Degeneracy is caused by redundant constraint(s)
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Degeneracy
(0,2) Max Z = 3x1+9x2 = 3*0 + 9 *2 = 18
(4,0) 3*4 + 9*0 = 12
Optimum solution is Z = 18 for x1 = 0 & x2 = 2
Since one of the variables is zero in the optimum solution, the given LPP has
degenerate solution
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Dual LPP
The dual of a given linear program (LP) is another LP that is derived from the original (the primal) LP
Duality in Linear Programming states that every linear programming problem has another linear programming problem related to it and thus can be derived from it.
The original linear programming problem is called “Primal,” while the derived linear problem is called “Dual”
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Formulating Dual
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Dual of LPP
Primal
Maximisation form
No of variables
No of constraints
Lesser than or equal to
Equality constraint
Coefficient of variables in
objective function
RHS of constraint
Dual
Minimisation form
No of constraints
No of variables
Greater than or equal to
Unrestricted variable
RHS of constraint
Coefficient of variables in
objective function
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Dual LPP
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Formulating Dual LPP