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Simplify (v2 + 10v + 11)(v2 + 3v – 4) using the distributive property of multiplication ove addition(DPMA)

User Mielk
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1 Answer

17 votes
17 votes

Given:


(v^2+10v+11)(v^2+3v-4)

To find- the simplification.

Explanation-

We know that the distribution property of multiplication over addition says


a(b+c)=ab+ac

Use this property to simplify, and we get


\begin{gathered} =(v^2+10v+11)(v^2+3v-4) \\ =v^2(v^2+3v-4)+10v(v^2+3v-4)+11(v^2+3v-4) \end{gathered}

Multiply by opening the bracket, and we get


=(v^4+3v^3-4v^2)+(10v^3+30v^2-40v)+(11v^2+33v-44)

Now, open the bracket and combine the like terms.


\begin{gathered} =v^4+3v^3-4v^2+10v^3+30v^2-40v+11v^2+33v-44 \\ =v^4+(3v^3+10v^3)+(11v^2-4v^2+30v^2)-40v+33v-44 \end{gathered}

On further solving, we get


=v^4+13v^3+37v^2-7v-44

Thus, from the distributive property of multiplication over addition, we get v⁴+13v³+37v²-7v-44.

The answer is v⁴ + 13v³ + 37v² - 7v - 44.

User John Rork
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