Suppose
x kg of fertiliser
F1 and
y kg of fertiliser
F2 is used to reach the minimum requirement of the soil. Then
Minimum cost (in Rs)
=6x+5y
Let
Z=6x+5y
We now have the following mathematical model for the given problem.
Minimize
Z=6x+5y⋯(i)
subject to the constraints :
2x+y≥280⋯(ii) (nitrogen requirement constraint)
3x+5y≥700⋯(iii) (phosphoric requirement constraint)
x≥0, y≥0⋯(iv) (non-negative constraint)
The feasible region (shaded) determined by the linear inequalities
(i) to
(iv) is shown in the figure. Note that the feasible region is unbounded.
Let us evaluate the objective function
Z at each corner point as shown below :
Corner point |
Z=6x+5y |
A(0,280) |
1400 |
B(100,80) |
1000→ Minimum |
C(233.33,0) |
1400 |
We find that minimum value of
Z is Rs
1000 at
(100,80).
Hence, farmer should buy
100 kg of fertiliser
F1 and
80 kg of fertiliser
F2 to meet the requirements at minimum cost and the minimum cost will be Rs
1000.