Answer
$(8t+3s)(64t^2-24ts+9s^2)$
Work Step by Step
$\bf{\text{Solution Outline:}}$
To factor the given expression, $
512t^3+27s^3
,$ use the factoring of the sum/difference of $2$ cubes.
$\bf{\text{Solution Details:}}$
Using $a^3+b^3=(a+b)(a^2-ab+b^2)$ or $a^3-b^3=(a-b)(a^2+ab+b^2)$ or the factoring of the sum/difference of $2$ cubes, the expression above is equivalent to
\begin{array}{l}\require{cancel}
(8t+3s)[(8t)^2-8t(3s)+(3s)^2]
\\\\=
(8t+3s)(64t^2-24ts+9s^2)
.\end{array}