5. A sausage company needs to det hot dogs it should manufacture, in order to maximize its profit. Each pound of premium hoo beef, 0. ermine how many pounds of premium hot dogs and how many pound...
5. A sausage company needs to det hot dogs it should manufacture, in order to maximize its profit. Each pound of premium hoo beef, 0. ermine how many pounds of premium hot dogs and how many pounds of regular por and 0.25 lb of filler for its manufacture. Each pound of regular hot dogs uses 0.20 Ib of beef, bok and 3000 lb of filler. d requirements. The company makes a profit of $0.45 per Ib on premium hot dogs and S0.75 per lb on regular 55 Ib of filler. Suppliers can provide the company with a maximum of 1500 Ib of beef, 2000 The company needs to produce at least 1500 lb of premium hot dogs to meet con- 0. lb of pork tract re hot dogs. Formulate, but DO NOT SOLVE, a linear program, the solution of which would tell the company how many pounds of each variety of hot dog it should make. In your formulation: (1) Clearly specify the variables (2) Give the objective function and specify whether the objective is max or min (3) List all the constraints. Do NOT attempt to solve your model-just give the formulation.
5. A sausage company needs to det hot dogs it should manufacture, in order to maximize its profit. Each pound of premium hoo beef, 0. ermine how many pounds of premium hot dogs and how many pounds of regular por and 0.25 lb of filler for its manufacture. Each pound of regular hot dogs uses 0.20 Ib of beef, bok and 3000 lb of filler. d requirements. The company makes a profit of $0.45 per Ib on premium hot dogs and S0.75 per lb on regular 55 Ib of filler. Suppliers can provide the company with a maximum of 1500 Ib of beef, 2000 The company needs to produce at least 1500 lb of premium hot dogs to meet con- 0. lb of pork tract re hot dogs. Formulate, but DO NOT SOLVE, a linear program, the solution of which would tell the company how many pounds of each variety of hot dog it should make. In your formulation: (1) Clearly specify the variables (2) Give the objective function and specify whether the objective is max or min (3) List all the constraints. Do NOT attempt to solve your model-just give the formulation.