Consider the following linear program, which maximizes profit for two products--regular (R) and super (S): MAX Z - 50R + 755 s.t. 1.2 R+ 1.6 S 600 assembly (hours) 0.8 R +0.5 S s 300 paint (hours) .16 R +0.45 s 100 inspection (hours) Sensitivity Report: Final Reduced Cell Objective Allowable Allowable Name Value Cost Coefficient Increase Decrease $B$7 Regular 291.67 0.00 50 70 20 $C$7 Super- 133.33 0.00 75 50 43.75 Final Shadow Constraint Allowable Allowable Cell Name Value Price R.H. Side Increase Decrease $E$3 Assembly (hr/unit) 563.33 0.00 600 1E+30 36.67 $E$4 Paint (hr/unit) 300.00 33.33 300 39.29 175 $E$5 Inspect (hr/unit) 100.00 145.83 100 12.94 40 If the company wanted to increase the available hours for one of their constraints (assembly, painting, or inspect) by one hours, which one should not be chosen. O paint inspect O assembly none of these three constraints should be chosen The unit profit on the super product could increase by without affecting the product mix. O 64 o 40 O 70 O 81