What is the vertex form of $y= x^2/10 + x/4 + 1/6$ ?

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What is the vertex form of $y= x^2/10 + x/4 + 1/6$ ?

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Answer 1 · 2018-01-23T14:22:07

$y=1/10(x+5/4)^2+1/96$

Explanation:

$"the equation of a parabola in "color(blue)"vertex form"$ is.

$color(red)(bar(ul(|color(white)(2/2)color(black)(y=a(x-h)^2+k)color(white)(2/2)|)))$

$"where "(h,k)" are the coordinates of the vertex and a"$
$"is a multiplier"$

$"to obtain this form use "color(blue)"completing the square"$

$• " the coefficient of the "x^2" term must be 1"$

$rArry=1/10(x^2+5/2x+5/3)$

$• " add/subtract "(1/2"coefficient of x-term")^2" to"$
$x^2+5/2x$

$y=1/10(x^2+2(5/4)xcolor(red)(+25/16)color(red)(-25/16)+5/3)$

$color(white)(y)=1/10(x+5/4)^2+1/10(-25/16+5/3)$

$color(white)(y)=1/10(x+5/4)^2+1/96larrcolor(red)"in vertex form"$

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What is the vertex form of $y= x^2/10 + x/4 + 1/6$ ?

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What is the vertex form of y= x^2/10 + x/4 + 1/6 y= x^2/10 + x/4 + 1/6 ?

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What is the vertex form of $y= x^2/10 + x/4 + 1/6$ ?