Chapter 5.7, Problem 28PS

Solution

(a)

To find: Compare the minimum surface areas and corresponding values of $d$ .

The surface area of cylinder is less than the prism and diameter of prism is lee than the cylinder.

Given information:

Given that the ordered pair of surface area and diameter for prism is given as:

  $\left(9.4,687.4\right),\left(9.8,681.9\right),\left(10.2,678.7\right),\left(10.6,677.6\right),\left(11,678.4,\left(11.4,681.0\right)\right)$

The graph of the surface area corresponding to diameter of cylinder is given as:

  

Calculation:

It is observed from the given data for prism the minimum surface area is 677.6 and corresponding diameter is 10.6.

It is observed from the graph that the minimum surface area of cylinder is $6250c{m}^2$ and corresponding diameter is $11$ .

The surface area of cylinder is less than the prism and diameter of prism is lee than the cylinder.

(b)

To find: Compare the height that corresponds to the minimum surface area of the containers.

The height of cylinder is greater than the height of prism.

Given information:

The height of the prism is $h^2=\frac{1200}{d^2}$ and the height of the cylinder is $h^2=\frac{4800}{\pi d^2}$ .

The surface area of cylinder is $2\pi rh+2\pi r^2$ which can be written as:

  $\begin{array}{l}S=2\pi h\left(\frac{d}{2}\right)+2\pi {\left(\frac{d}{2}\right)}^2\\ S=\pi hd+\frac{\pi d^2}{2}\mathrm{........}(1)\end{array}$

The minimum surface area of the cylinder Is $6250$ and the diameter is $11$ .

Substitute the value of diameter in equation $h^2=\frac{4800}{\pi d^2}$ :

  $h^2=\frac{4800}{\pi {\left(11\right)}^2}$

Further simplifying the above expression:

  $h^2=\frac{4800}{\pi 121}$

Substitute the value of $\pi =3.14$ gives:

  $\begin{array}{l}{h}^2=\frac{4800}{3.14\cdot 121}\\ h^2=\frac{4800}{379.94}\\ h^2=12.63\\ h=3.55\end{array}$

The height of the cylinder is 3.55 cm.

The height of prism is given by $h^2=\frac{1200}{d^2}$ .The minimum surface area of prism is is 677.6 and corresponding diameter is 10.6.

Substitute $d=10.6$ in $h^2=\frac{1200}{d^2}$ gives:

  $\begin{array}{l}{h}^2=\frac{1200}{{\left(10.6\right)}^2}\\ h^2=\frac{\left(1200\right)}{112.36}\\ h^2=10.67\\ h=3.22\end{array}$

The height of cylinder is greater than the height of prism.