What is the equation of the line normal to $f (x) = - (x + 6) (x + 3) + 4 x^{2} - 8 x + 2$ $f(x)=-(x+6)(x+3)+4x^2-8x+2$ at $x = 0$ $x=0$ ?

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What is the equation of the line normal to $f (x) = - (x + 6) (x + 3) + 4 x^{2} - 8 x + 2$ $f(x)=-(x+6)(x+3)+4x^2-8x+2$ at $x = 0$ $x=0$ ?

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Answer 1 · 2017-03-27T05:38:35

$y = - \frac{1}{17} x - 16$ $y=-1/17x-16$

Explanation:

To find the slope of the normal line, we need to differentiate to get $f'(x)$ , then plug in zero to find slope of tangent line at $x=0$ , then finally find the opposite reciprocal .

$f(x)=-(x+6)(x+3)+4x^2-8x+2$

Differentiate using the product rule and power rule:
$f'(x)=-[(x+6)(1)+(1)(x+3)]+8x-8$

$f'(x)=-x-6-x-3+8x-8$

$f'(x)=6x-17$

Plug in zero:
$f'(0)=6(0)+17=17$

Find opposite reciprocal of tangent line slope to get normal line slope:
$"Slope of normal line"=-1/17$

Equation of normal line (point-slope form):
$f(0)=-16$
$y+16=-1/17(x-0)$

$y=-1/17x-16$

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What is the equation of the line normal to $f (x) = - (x + 6) (x + 3) + 4 x^{2} - 8 x + 2$ $f(x)=-(x+6)(x+3)+4x^2-8x+2$ at $x = 0$ $x=0$ ?

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What is the equation of the line normal to f(x)=-(x+6)(x+3)+4x^2-8x+2f(x)=−(x+6)(x+3)+4x2−8x+2 f(x)=-(x+6)(x+3)+4x^2-8x+2 at x=0x=0 x=0?

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What is the equation of the line normal to $f (x) = - (x + 6) (x + 3) + 4 x^{2} - 8 x + 2$ $f(x)=-(x+6)(x+3)+4x^2-8x+2$ at $x = 0$ $x=0$ ?