Answer to Question #175706 in Operations Research for Nomi

Profit per chair = $400

Profit per table = $100

Labor hours required to make a chair = 8 hours

Labor hours required to make a table = 10 hours

Wood used per chair = 2 board-ft.

Wood used per table = 6 board-ft.

Availability labor hours = 80 hours

Availability of wood = 36 board-ft.

Daily demand of chairs is limited to = 6 chairs per day

Formulate the linear programming model for the problem as shown below:

Let x and y represent chair and table respectively.

The problem is converted to canonical form by adding slack, surplus and artificial variables as appropriate

1. As the constraint-1 is of type '≤' we should add slack variable S1

2. As the constraint-2 is of type '≤' we should add slack variable S2

3. As the constraint-3 is of type '≤' we should add slack variable S3

After introducing slack variables

"Max\\ Z_{profit}=400x+100y+0S_1+0S_2+0S_3"

subject to

"x+S_1=6"

"2x+6y+S_2=36"

"8x+10y+S_3=80\\ \\ and"

"x,y,S_1,S_2,S_3\u22650"

Negative minimum "Z_j-C_j"  is -400 and its column index is 1. So, the entering variable is x.

Minimum ratio is 6 and its row index is 1. So, the leaving basis variable is S1.

∴ The pivot element is 1.

Entering =x, Departing =S1, Key Element =1

Negative minimum "Z_j-C_j"  is -100 and its column index is 2. So, the entering variable is y.

Minimum ratio is 3.2 and its row index is 3. So, the leaving basis variable is S3.

 ∴ The pivot element is 10.

Entering =y, Departing =S3, Key Element =10

Since all "Z_j-C_j\u22650"

Hence, optimal solution is arrived with value of variables as :

x=6, y=3.2

"Max \\ \\ Z_{profit}=2720"

It can be observed that the highest value is at point C i.e. 2,720 which means the furniture company should make 6 chairs and 3.2 tables to maximize its profit.