$\backslash$table$[[\backslash$table$[[$Constraint$],[$Number$]],$Name,$\backslash$table$[[$Final$],[$Value$]],\backslash$table$[[$Shadow$],[$Price$]],\backslash$table$[[$Constraint$],[$R$.$H$.$ Side$]],\backslash$table$[[$Allowable$],[$Increase$]],\backslash$table$[[$Allowable$],[$Decrease$]]],[1,\backslash$table$[[$Cutting and Dyeing Hours$],[$Used$]],665\mathrm{.}000,0\mathrm{.}000,800\mathrm{.}000,1E+30,135\mathrm{.}000],[2,$Finishing Hours Used,$220\mathrm{.}000,3\mathrm{.}000,220\mathrm{.}000,180\mathrm{.}000,86\mathrm{.}667],[3,\backslash$table$[[$Packaging and Shipping$],[$Hours Used$]],100\mathrm{.}000,28\mathrm{.}000,100\mathrm{.}000,27\mathrm{.}000,45\mathrm{.}000]]$

Determine the objective coefficient ranges. $($Round your answers to two decimal places.$)$

regular glove $$ to

catcher's mitt $$ to

Interpret the ranges in part $($a$).($Round your answers to two decimal places.$)$

As long as the profit contribution for the regular glove is between $ $$ and $ $12\mathrm{.}00,$ the current solution

$$ optimal. As long as the profit contribution for the catcher's mitt is between $$ and $ $,$ the current solution $$ optimal.

Interpret the right$-$hand$-$side ranges.

The shadow prices for the resources are applicable over the following ranges. $($If there is no upper or lower limit$,$ enter NO LIMIT. Round your answers to two decimal places.$)$

cutting and sewing $$ to

finishing $$ to

$$

$$

packaging and shipping $$ to

$($d$)$ How much will the value of the optimal solution improve $($in $ $)$ if $10$ extra hours of packaging and shipping time are made available?