Question: "Consider the following linear program, which maximizes profit for two products: regular $($R$)$ and super $($S$)$:$"$

MAX$5$R$+7$SMAX $\backslash$: $5$R $+7$SMAX$5$R$+7$S

Subject to:

$1\mathrm{.}2$R$+1\mathrm{.}6$S$600$assembly$($hours$)1\mathrm{.}2$R $+1\mathrm{.}6$S $\backslash$leq $600\backslash$quad $\backslash$text$\{$assembly $($hours$)\}1\mathrm{.}2$R$+1\mathrm{.}6$S$600$assembly$($hours$)0\mathrm{.}8$R$+0\mathrm{.}5$S$300$paint$($hours$)0\mathrm{.}8$R $+0\mathrm{.}5$S $\backslash$leq $300\backslash$quad $\backslash$text$\{$paint $($hours$)\}0\mathrm{.}8$R$+0\mathrm{.}5$S$300$paint$($hours$)0\mathrm{.}16$R$+0\mathrm{.}4$S$100$inspection$($hours$)0\mathrm{.}16$R $+0\mathrm{.}4$S $\backslash$leq $100\backslash$quad $\backslash$text$\{$inspection $($hours$)\}0\mathrm{.}16$R$+0\mathrm{.}4$S$100$inspection$($hours$)$R$,$S$0$R$,$ S $\backslash$geq $0$R$,$S$0$

Sensitivity Report Provided Below:

Variable CellsNameFinal ValueReduced CostObjective CoefficientAllowable IncreaseAllowable DecreaseSC$528$Regular$-$R$01\mathrm{.}2551\mathrm{.}251$E$+30$SC$529$Super$-$S$250071$E$+306\mathrm{.}25$

Constraints:

CellNameFinal ValueShadow PriceConstraint R$.$H$.$ SideAllowable IncreaseAllowable DecreaseSF$6$assembly $($hours$)60006001$E$+30200$SF$7$paint $($hours$)250125300120175$SF$8$inspection $($hours$)100187\mathrm{.}510050100$

Question: "The upper limit of the super product $($S$)$ objective function coefficient $($profit of S$)$ is $\_\_\_\_"$

$10\mathrm{.}8$

$120$

$6\mathrm{.}25$

$12\mathrm{.}5$

Let me know if you need further clarification or help with the question.