Factor
3\left(3p-2\right)q^{2}\left(9p^{2}+6p+4\right)
Evaluate
3q^{2}\left(27p^{3}-8\right)
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3\left(27p^{3}q^{2}-8q^{2}\right)
Factor out 3.
q^{2}\left(27p^{3}-8\right)
Consider 27p^{3}q^{2}-8q^{2}. Factor out q^{2}.
\left(3p-2\right)\left(9p^{2}+6p+4\right)
Consider 27p^{3}-8. Rewrite 27p^{3}-8 as \left(3p\right)^{3}-2^{3}. The difference of cubes can be factored using the rule: a^{3}-b^{3}=\left(a-b\right)\left(a^{2}+ab+b^{2}\right).
3q^{2}\left(3p-2\right)\left(9p^{2}+6p+4\right)
Rewrite the complete factored expression. Polynomial 9p^{2}+6p+4 is not factored since it does not have any rational roots.
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