Table 3.1: Regular \& Super Consider the following linear program, which maximizes profit for two products--regular (R) and super (S) : MAX50R+75S s.t. 1.2R+1.6S600 assembly (hours) 0.8R+0.5S300 paint (hours) .16R+0.4S100 inspection (hours) Sensitivity Report: 1) The optimal number of regular products to produce is , and the optimal number of super products to produce is , for total profits of Answer: 2) If the company wanted to increase the available hours for one of their constraints (assembly, painting, or inspection) by two hours, they should increase Answer: 3) The profit on the super product could increase by without affecting the product mix. Answer: 4) If downtime reduced the available capacity for painting by 40 hours (from 300 to 260 hours), profits would be reduced by Answer: 5) A change in the market has increased the profit on the super product by $5. Total profit will increase by