Respuesta :
Answer:
a) Minimize Z =30 X1 +25 X2+18 X3
subject to following constraints
[tex]1.X1\geq 0.4\left ( X1+X2 \right )\\2.X3\geq 0.15\left ( X1+X2+X3 \right )\\3.X1+X2+X3\leq 150\\4.X3\geq 0.25\left ( X1+X2 \right )\\5.X1\leq 50\\6.X1,X2,X3\geq 0[/tex]
b) Total cost=[tex]30 \times 48+15\times72+18\times30[/tex] = $3180.
c) As the dual price for constraint five is zero hence additional work hours for Lisa won't change the optimum solution.
Step-by-step explanation: Â
Step 1:-
a) Â
Let's take Â
X1 to be the number of hours assigned to Lisa Â
X2 to be the number of hours assigned to David Â
X3 to be the number of hours assigned to Sarah. Â
The objective function is to attenuate the entire cost of the project by deciding an optimum number of hours for every person. the target function is given by - Â
Minimize Z =30 X1 +25 X2+18 X3
subject to following constraints
[tex]1.X1\geq 0.4\left ( X1+X2 \right )\\2.X3\geq 0.15\left ( X1+X2+X3 \right )\\3.X1+X2+X3\leq 150\\4.X3\geq 0.25\left ( X1+X2 \right )\\5.X1\leq 50\\6.X1,X2,X3\geq 0[/tex] Â
Constraints and explanation: Â
1. Lisa must be assigned a minimum of 40% of the entire number of hours assigned to the 2 senior designers. Â
2. Sarah must be assigned a minimum of 15% of the entire project time. Â
3. The corporate estimates that 150 hours are going to be required to finish the project. Â
4. The number of hours assigned to Sarah must not exceed 25% of the entire number of hours assigned to the 2 senior designers. Â
5. Lisa features a maximum of fifty hours available to figure on this project. Â
6. Non-negative condition. Â
Step 2:- Â
b)
From the above equations, we get Â
The number of hours assigned to Lisa is 48 hours Â
The number of hours assigned to David 72 hours Â
The number of hours assigned to Sarah 30 hours. Â
Total cost=[tex]30 \times 48+15\times72+18\times30[/tex] = $3180. Â
Step 3:-
c) Â
As the dual price for constraint five is zero hence additional work hours for Lisa won't change the optimum solution.
