Chapter 7.6, Problem 34E

Toy Production For Exercises 33 and 34, use the following information. A small toy-manufacturing firm has 200 squares of felt, 600 ounces of stuffing, and 90 feet of trim available to make two types of toys: a small bear and a monkey. The bear requires 1 square of felt and 4 ounces of stuffing. The monkey requires 2 squares of felt, 3 ounces of stuffing, and 1 foot of trim. The firm makes $1 profit on each bear and $1.50 profit on each monkey. The linear programming problem to maximize profit is

$\begin{array}{cc}\text{Maximize}\text{subject}\text{to}& z=x_1+1.5x_2\\ & x_1+2x_2\le 200\\ & 4x_1+3x_2\le 600\\ & x_2\le 90\\ & x_1\ge 0,x_2\ge 0.\end{array}$

The final simplex tableau is

$\left[\begin{array}{cccccc}1& 0& -.6& .4& 0& 12\\ 0& 0& -.8& .2& 1& 50\\ 0& 1& .8& -.2& 0& 40\\ 0& 0& .6& .1& 0& 180\end{array}\right]$

How much profit will the firm make if its supply of stuffing is cut to 590 ounces and its supply of trim is cut to 80 feet?