Final answer:
To find the height h(r) for the can with minimum surface area, take the derivative of the surface area function and set it equal to zero. The height for the can with minimum surface area is equal to the radius of the bottom of the can. The minimum surface area is given by 4πr² in terms of the portion size V.
Step-by-step explanation:
In order to minimize the surface area of a cylinder, we need to find the height that corresponds to the minimum surface area. Let's assume the radius of the bottom of the cylinder is r and the height is h.
a. To find the height h(r) for the can with minimum surface area, we need to minimize the surface area function. The surface area of a cylinder is given by:
A = 2πr² + 2πrh
To minimize the surface area, we can take the derivative of the surface area function with respect to h and set it equal to zero:
dA/dh = 2πr + 2πr(1 - h/r) = 2πr(2 - h/r) = 0
Solving for h, we find h(r) = r. Therefore, the height for the can with minimum surface area is equal to the radius of the bottom of the can.
b. The minimum surface area for the can in terms of the portion size V can be obtained by substituting the height h(r) into the surface area function:
A = 2πr² + 2πr(r) = 4πr²
The minimum surface area is given by 4πr² in terms of the portion size V.