Factor 36(a^2 - b^3)^4 - 18(a^2 - b^3)^7 - QAmmunity.org

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Factor 36(a^2 - b^3)^4 - 18(a^2 - b^3)^7

asked Jun 11, 2023 116k views

2 votes

Factor 36(a^2 - b^3)^4 - 18(a^2 - b^3)^7

Mathematics
college

Travis Schettler asked

by Travis Schettler

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1 Answer

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Solution

We are required to factorize

36(a^2-b^3)^4-18(a^2-b^3)^7

$=18(a^2-b^3)^4\text{ is a common factor}$
$\begin{gathered} Thus,\text{ we have } \\ =18(a^2-b^3)^4(2-(a^2-b^3)^3) \end{gathered}$
$\begin{gathered} Expand\text{ \lparen2-\lparen a}^2-b^2))^3 \\ =(2-a^6+3a^4b^3-3a^2b^6+b^9) \end{gathered}$

Thus, the answer is

Factor 36(a^2 - b^3)^4 - 18(a^2 - b^3)^7-example-1

JGeer answered Jun 17, 2023

by JGeer

7.3k points

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