What is the vertex of $y= (x-2)^2-3x^2-4x-4$ ?

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What is the vertex of $y= (x-2)^2-3x^2-4x-4$ ?

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Answer 1 · 2017-10-13T17:58:44

$(-2,8)$

Explanation:

The formula for the x-value of the vertex of a quadratic is:

$(-b)/(2a)="x-value of the vertex"$

To get our $a$ and $b$ , it's easiest to have your quadratic in standard form, and to get that, work your quadratic all the way out and simplify, getting you:

$y=x^2-4x+4-3x^2-4x-4$

$y=-2x^2-8x$

In this case, you have no $c$ term, but it doesn't really affect anything. Plug in your $a$ and $b$ into the vertex formula:

$(-(-8))/(2(-2))="x-value of the vertex"$

$"x-value of the vertex"=-2$

Now plug your newly found $"x-value"$ back into your quadratic to solve for its $"y-value"$ , which gives you:

$y=-2(-2)^2-8(-2)$

$y=8$

Concluding that the coordinates of the vertex of this quadratic are:

$(-2,8)$

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What is the vertex of $y= (x-2)^2-3x^2-4x-4$ ?

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What is the vertex of y= (x-2)^2-3x^2-4x-4 y= (x-2)^2-3x^2-4x-4?

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What is the vertex of $y= (x-2)^2-3x^2-4x-4$ ?