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33 votes
33 votes
-3w^2+7y-wy+21wFactor by grouping.

User James Hurford
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1 Answer

19 votes
19 votes

\begin{gathered} -3w^2+7y-wy+21w \\ \text{ rearrange the terms so that the first two and the last two terms become factorable} \\ \text{ expressions} \\ 7y-wy+21w-3w^2 \\ \text{ In order to factor the polynomial above, independently factor the first two} \\ \text{and the last two terms} \\ y((7y)/(y)-(wy)/(y))+3w((3\cdot7w)/(3w)-(3w^2)/(3w)) \\ y(\frac{7\cancel{y}}{\cancel{y}}-\frac{w\cancel{y}}{\cancel{y}})+3w(\frac{\cancel{3}\cdot7\cancel{w}}{\cancel{3w}}-\frac{\cancel{3}w^{\cancel{2}}}{\cancel{3}\cancel{w}}) \\ y(7-w)+3w(7-w) \\ \text{Result: }(-w+7)(y+3w) \end{gathered}

User Greg Lukosek
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3.3k points
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