2) An organization produces two products which have been processed in two assemblage lines. Manufacturing plant 1 offers 100 readily available hours, and assembly line a couple of has forty two available hours. Each merchandise requires 10 hours of processing period on line you, while on range 2, product 1 needs 7 several hours and product 2 requires 3 hours. The profit to get product one particular is $6 per device, and the revenue for product 2 can be $4 per unit. a. Formulate a linear development model with this problem.
b. Solve this model by utilizing graphical analysis.
6) The Pinewood Furniture Organization produces chair and dining tables from two resources-labor and wood. The corporation has eighty hours of labor and 36 pounds of real wood available every day. Demand for chair is limited to 6 per day. Each chair needs 8 several hours of labor and 2 pounds of wood, although a table requires twelve hours of labor and 6 pounds of real wood. The profit produced from each couch is $400 and by each table, $100. The business wants to identify the number of chair and table to produce every day in order to take full advantage of profit. a. Formulate a linear coding model just for this problem.
w. Solve the[desktop] by using visual analysis.
7) In Difficulty 6, simply how much labor and wood will be unused in the event the optimal amounts of chairs and tables are produced?
12) The Elixer Medicine Company produces a drug via two ingredients. Each ingredient contains the same three remedies, in different dimensions. One gram of element 1 adds 3 models, and one particular gram of ingredient two contributes 1 unit of antibiotic one particular; the medicine requires six units. By least doze units of antibiotic several are required; a gram of ingredient 1 contributes two units, and a gram of component 2 adds 6 devices. The cost for any gram of ingredient 1 is $80, and the expense for a gram of element 2 is definitely $50. The business wants to make a geradlinig programming version to determine the volume of grams of each ingredient that has to go into the in order to meet the antiseptic requirements at least cost. a. Formulate a linear programming...