2 Answers

Ethan Choi · Answer 1 · 2023-02-16T12:15:44+0000

Answer:

813.4 cm² (nearest tenth)

Explanation:

Volume of a cylinder

$\sf V=\pi r^2 h \quad\textsf{(where r is the radius and h is the height)}$

Given:

Use the Volume of a Cylinder formula and the given values to find the radius of the cylinder:

$\implies \sf 1715=\pi r^2 (18)$

$\implies \sf r^2=(1715)/(18 \pi)$

$\implies \sf r=\sqrt{(1715)/(18 \pi)$

Surface Area of a Cylinder

$\sf SA=2 \pi r^2 + 2 \pi r h \quad\textsf{(where r is the radius and h is the height)}$

Substitute the given value of h and the found value of r into the formula and solve for SA:

$\implies \sf SA=2 \pi \left(\sqrt{(1715)/(18 \pi)\right)^2 + 2 \pi \left(\sqrt{(1715)/(18 \pi)\right)(18)$

$\implies \sf SA=2 \pi \left((1715)/(18 \pi) \right) + 36 \pi \left(\sqrt{(1715)/(18 \pi)\right)$

$\implies \sf SA=(1715)/(9) + 36 \pi \left(\sqrt{(1715)/(18 \pi)\right)$

$\implies \sf SA=813.3908956...$

Therefore, the surface area of the cylinder is 813.4 cm² (nearest tenth)

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