Chapter 3, Problem 15CT

To determine

To solve : the inequalities to find acceptable range for the length l and the width w.

Answer to Problem 15CT

the acceptable range of the length of the rectangle is from 18.50 in. to 18.60 in. and acceptable range of the width of the rectangle is from 36.70 in. to 36.80 in.

Explanation of Solution

Given information: A manufacturer is cutting fabric into rectangles that are 18.55 in. long by 36.75 in. wide. Each rectangle’s length and width must be within 0.05 in. of the desired size. Calculation: Let l and w be the length and width of the rectangles.

Each rectangle’s length and width must be within 0.05 in. of the desired size.

Therefore, the acceptable range of length is given by the inequality

  $\begin{array}{l}\left|l-18.55\right|\le 0.05\\ -0.05\le l-18.55\le 0.05\\ 18.55-0.05\le l\le 18.55+0.05\\ 18.50\le l\le 18.60\end{array}$

The acceptable range of the width is given by the inequality

  $\begin{array}{l}\left|w-36.75\right|\le 0.05\\ -0.05\le w\le 0.05\\ 36.75-0.05\le w\le 36.75+0.05\\ 36.70\le l\le 36.80\end{array}$

Thus, the acceptable range of the length of the rectangle is from 18.50 in. to 18.60 in. and acceptable range of the width of the rectangle is from 36.70 in. to 36.80 in.