Table $3\mathrm{.}1$: Regular & Super Consider the following linear program, which maximizes profit for two products$--$regular $($R$)$ and super $($S$)$: MAX $50$R $+755$ s$.$t$.1\mathrm{.}2$ R$+1\mathrm{.}6$ S s $600$ assembly $($hours$)0\mathrm{.}8$ R $+0\mathrm{.}5$ S s $300$ paint $($hours$)\mathrm{.}16$ R$+0\mathrm{.}4$ S s $100$ inspection $($hours$)$ Sensitivity Report: Cell $B$$7$ $C$$7$ Name Regular Super$-$ Final Reduced Value Cost $291\mathrm{.}670\mathrm{.}00133\mathrm{.}330\mathrm{.}00$ Objective Allowable Allowable Coefficient Increase Decrease $5070207543\mathrm{.}7550$ Cell $E$$3$ $E$$4$ $E$$5$ Final Shadow Name Value Price Assembly $($hr$/$unit$)563\mathrm{.}330\mathrm{.}00$ Paint $($hr$/$unit$)300\mathrm{.}0033\mathrm{.}33$ Inspect $($hr$/$unit$)100\mathrm{.}00145\mathrm{.}83$ Constraint Allowable Allowable R$.$H$.$ Side Increase Decrease $6001$E$+3036\mathrm{.}6730039\mathrm{.}2917510012\mathrm{.}9440$ If the company wanted to increase the available hours for one of their constraints $($assembly$.$ painting, or inspection$)$ by two hours, they should increase