Soup Can Solution

A large soup can is to be designed so that the can will hold 
36 cubic inches of soup.

    

Find the values of  and  for which the amount of metal
needed is as small as possible.

What is the value of ?

What is the value of ?

The soup can consists of metal for a top, a bottom, and the piece that wraps around for the side. The total amount of metal used is $C=\pi x^2+\pi x^2+2\pi xh=2\pi x^2+2\pi xh$ where both $h$

and

must be positive numbers. Since the total volume of the soup can must be 36 cubic inches, it follows that $V=\pi x^2 h=36$ from which one may solve for $h$

to get $h={36\over\pi x^2}$ . Substitute into the expression for the total amount of metal. $C=2\pi x^2+{2\pi x}\Big({36\over\pi x^2}\Big) =2\pi x^2+72 x^{-1}$ Differentiate. $C'=4\pi x-72 x^{-2}=4\pi x-{72\over x^2}$ Set the derivative equal to zero and solve for $x$

. $4\pi x-{72\over x^2}=0$
$x^3={72\over 4\pi}$
Hence $x=\Big({72\over 4\pi}\Big)^{1/3}=1.789400458$ inches and $h={36\over\pi (1.789400458)^2}=3.578800913$ inches This is indeed the dimensions for minimum amount of metal since $C$

becomes infinite as $x\to 0$ and also as $x\to\infty$ .