Answer:
 (a) A(r) = 4r² +729/r
 (b) r = 4.5 inches; h = 5.73 inches
Step-by-step explanation:
(a) For a given radius, the volume is given by the formula ...
 V = πr²h
so the height is ...
 h = V/(πr²)
Then the area of the rectangle required to form the curved side is ...
 A = 2πrh = (2πr)(V/(πr²)) = 2V/r
The area required for the bottom is a square that is 2r on each side, so is ...
 A = (2r)² = 4r²
The total area of required material is ...
 A(r) = 4r² +2V/r
 A(r) = 4r² +729/r
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(b) The material will be minimized when the derivative of A(r) with respect to r is zero:
 A' = 0 = 8r -2V/r²
 2V/r² = 8r
 V/4 = r³
 r = ∛(V/4) = ∛(364.5/4) ≈ 4.5 . . . inches
 h = (364.5)/(π·4.5²) = 18/π ≈ 5.73 . . . inches
Material will be minimized for a radius of 4.5 inches, and a height of 5.73 inches.
