2 Answers

Bcasp · Answer 1 · 2021-11-20T12:16:37+0000

Given:

Given that two similar cylinder have surface areas 24π cm² and 54π cm².

The volume of the smaller cylinder is 16π cm³

We need to determine the volume of the larger cylinder.

Volume of the larger cylinder:

The ratio of the two similar cylinders having surface area of 24π cm² and 54π cm², we have;

$(24 \pi)/(54 \ pi)=(4)/(9)$

=(2^2)/(3^2)

Thus, the ratio of the surface area of the two cylinders is
(2^2)/(3^2)

The volume of the larger cylinder is given by

$(2^2)/(3^2)* (2)/(3)=(16 \pi )/(x)$

where x represents the volume of the larger cylinder.

Simplifying, we get;

$(2^3)/(3^3)=(16 \pi )/(x)$

$(8)/(27)=(16 \pi )/(x)$

Cross multiplying, we get;

$8x=16 \pi * 27$

$8x=432 \pi$

$x=54 \pi \ cm^3$

Thus, the volume of the larger cylinder is 54π cm³

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