For the solid described below, find the dimensions giving the minimum surface area, given that the volume is 64 cm3. a closed cylinder with radius r cm and height h cm.
The volume of the cylinder is: V = pi * r ^ 2 * h = 64 The surface area is: A = 2 * pi * r ^ 2 + 2 * pi * r * h We write the area as a function of r: A (r) = 2 * pi * r ^ 2 + 2 * pi * r * (64 / (pi * r ^ 2)) Rewriting: A (r) = 2 * pi * r ^ 2 + 2 * (64 / r) A (r) = 2 * pi * r ^ 2 + 128 / r Deriving: A '(r) = 4 * pi * r - 128 / r ^ 2 We equal zero and clear r: 0 = 4 * pi * r - 128 / r ^ 2 128 / r ^ 2 = 4 * pi * r r ^ 3 = 128 / (4 * pi) r = (128 / (4 * pi)) ^ (1/3) r = 2.17 cm The height is: h = 64 / (pi * r ^ 2) h = 64 / (pi * (2.17) ^ 2) h = 4.33 cm Answer: The dimensions giving the minimum surface area are: r = 2.17 cm h = 4.33 cm
