What is the vertex of $y= 2(x - 4)^2 - x^2+4x-1$ ?

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What is the vertex of $y= 2(x - 4)^2 - x^2+4x-1$ ?

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Answer 1 · 2015-12-16T03:30:25

vertex $=(6,-5)$

Explanation:

Start by expanding the brackets, then simplifying the terms:

$y=2(x-4)^2-x^2+4x-1$
$y=2(x-4)(x-4)-x^2+4x-1$
$y=2(x^2-8x+16)-x^2+4x-1$
$y=2x^2-16+32-x^2+4x-1$
$y=x^2-12x+31$

Take the simplified equation and rewrite it in vertex form:

$y=x^2-12x+31$
$y=(x^2-12x)+31$
$y=(x^2-12x+(12/2)^2-(12/2)^2)+31$
$y=(x^2-12x+(6)^2-(6)^2)+31$
$y=(x^2-12x+36-36)+31$
$y=(x^2-12x+36)+31-(36*1)$
$y=(x-6)^2+31-36$
$y=(x-6)^2-5$

Recall that the general equation of a quadratic equation written in vertex form is:

$y=a(x-h)^2+k$

where:
$h=$ x-coordinate of the vertex
$k=$ y-coordinate of the vertex

So in this case, the vertex is $(6,-5)$ .

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What is the vertex of $y= 2(x - 4)^2 - x^2+4x-1$ ?

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What is the vertex of y= 2(x - 4)^2 - x^2+4x-1 y= 2(x - 4)^2 - x^2+4x-1 ?

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