given, 

     The figure above shows a box of length $l=40$ inches, width $w$ inches, and height $h$ inches.

The sum of the length and girth of the box is at least $84$ inches and no greater than $108$ inches.  

The girth of the box is, 

    $w+h+w+h=2w+2h$

The sum of the girth and the length is, 

     $2w+2h+l=2(w+h)+40$

The range of values of this sum is, 

      $\begin{array}{r}84\le 2(w+h)+40\le 108\\ 22\le w+h\le 34\end{array}$

The volume of the box is, 

     $V=lwh=40wh$

Substitute $l$ in terms of $w$ for maximum value,

    $h=34-w$

Therefore, the volume is, 

      $\begin{array}{r}V\left(w\right)=40w(34-w)\\ =1360w-40w^2\end{array}$

Differentiate the function with respect to $w$,

     $V^{\mathrm{\prime }}\left(w\right)=1360-80w$

Equate this derivative to zero and solve for $w$,

     $\begin{array}{r}1360-80w=0\\ w=17\end{array}$

The height is, 

      $h=34-17=17$

Therefore volume is,

    $V=40\times 17\times 17=11560$

Therefore, the maximum volume of the box is $11560$ cubic inches.

    $\begin{array}{r}S=2wh+2\left(40w\right)+2\left(40h\right)\\ =2wh+80w+80h\end{array}$

Substitute $l$ in terms of $w$ for maximum value, 

      $\begin{array}{r}S=22w(34-w)+80w+80(34-w)\\ =748w-22w^2+80w+2720-80w\\ =748w-22w^2+2720\end{array}$

    $S^{\mathrm{\prime }}\left(w\right)=748-44w$

Equate this derivative to zero and solve for $w$,

     $$\begin{gathered} 748-44w=0 \\ w=17 \end{gathered}$$

The height is,

      $h=34-17=17$

The surface area of the box is,

      $\begin{array}{r}S=2\left(17\right)\left(17\right)+80\left(17\right)+80\left(17\right)\\ \approx 3298\end{array}$

Therefore, the maximum surface area of the box is $3298$ square inches.