Question: Consider the following linear program, which maximizes profit for two products: regular (R) and super (S): MAX 5R + 755 s.t. 1.2 R + 1.65

Consider the following linear program, which

Consider the following linear program, which maximizes profit for two products: regular (R) and super (S): MAX 5R + 755 s.t. 1.2 R + 1.65 = 0 See the sensitivity report provided below: Variable Cells Name Cell $C$28 Regular - R $C$29 Super-S Final Reduced Objective Allowable Allowable Value Cost Coefficient Increase Decrease 0 -25 5 25 1E+30 250 0 75 1E+30 62.5 Constraints Cell Name $F$6 assembly (hours) $F$7 paint (hours) $F$8 inspection (hours) Final Shadow Constraint Allowable Allowable Value Price R.H. Side Increase Decrease 400 0 600 1E+30 200 125 0 300 175 100 187.5 100 50 100 1E+30 The lower limit of the super product (S) objective function coefficient (profit of S) is Please choose the option that best fit the empty space above. 10.8 120 12.5 It is "infinity", so there is no lower limit. None of the above

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