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41 votes
Convert y = 3x^2+ 60x - 150 to vertex form by completing the square. Choose thecorrect equation.a)y = 3(x + 10)2 - 450b) yy = 3(x + 10)2 + 250c) y = 3(x + 10)2 - 250d) y = 3(x + 10)2 - 50

User Porschiey
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1 Answer

13 votes
13 votes

We have the quadratic equation:


y=3x^2+60x-150

And want to write in the vertex form by completing the square, so we take the coefficient of squared x as a factor:


\begin{gathered} y=3x^2+60x-150 \\ y=3(x^2+20x-50) \end{gathered}

Take the coefficient of x and divided by 2 and the calculate the square, and add and substract the result into the parenthesys, so:


\begin{gathered} y=3(x^2+20x-50+((20)/(2))^2-((20)/(2))^2) \\ y=3(x^2+20x+100-50-100) \\ y=3(x^2+20x+100-150) \\ y=3(x^2+20x+100)-3\cdot150 \\ y=3(x^2+20x+100)-450 \end{gathered}

Now, write the parenthesys as a binomial squared:


y=3(x+10)^2-450

The option a) is the correct answer.

User Richard Stokes
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