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KBoek · Answer 1 · 2019-09-03T07:00:54+0000

if k is the scale factor between the dimensions of the similar solids, the areas are related by k² and the volumes are related by k³. That is

$\ \ (V_(a))/(V_(b))=k^(3)$

$\ \ k=((V_(a))/(V_(b)))^{(1)/(3)}$

The areas are related by k², so

$\ \ (A_(a))/(A_(b))=k^(2) = ((V_(a))/(V_(b)))^{(2)/(3)}$

$\ \ (A_(a))/(A_(b)) = ((28\ m^(3))/(1792\ m^(3)))^{(2)/(3)}=(4^(-3))^{(2)/(3)}$

$\ \ =4^(-2)=(1)/(16)$

The ratio of the surface area of solid A to that of solid B is ...
1/16

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