What is the axis of symmetry for the graph $y= -x^2-8x+10$ ?

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What is the axis of symmetry for the graph $y= -x^2-8x+10$ ?

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Answer 1 · 2017-08-02T15:27:31

$x=-4$

Explanation:

$"the axis of symmetry passes through the vertex and has "$
$"equation"$

$•color(white)(x)x=c$

$"where c is the value of the x-coordinate of the vertex"$

$"for a parabola in standard form "ax^2+bx+c$

$x_(color(red)"vertex")=-b/(2a)$

$y=-x^2-8x+10" is in standard form"$

$"with "a=-1,b=-8,c=10$

$rArrx_(color(red)"vertex")=-(-8)/(-2)=-4$

$rArr"axis of symmetry is "x=-4$
graph{(y+x^2+8x-10)(y-1000x-4000)=0 [-80, 80, -40, 40]}

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What is the axis of symmetry for the graph $y= -x^2-8x+10$ ?

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What is the axis of symmetry for the graph $y= -x^2-8x+10$ ?