How do you find the equation of the tangent and normal line to the curve $y=9x^-1$ at x-3?

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How do you find the equation of the tangent and normal line to the curve $y=9x^-1$ at x-3?

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Answer 1 · 2016-10-31T10:52:59

I'm not sure if you meant $x=3$ or $x=-3$

If $x=3$ Then
Tangent is $y=-x+6$ and Normal is $y=x$

If $x=-3$ Then
Tangent is $y=-x-6$ and Normal is $y=x$

Explanation:

I'm not sure if you meant $x=3$ or $x=-3$ so let's do both:

First we need the derivative, which will give us the slope of the tangent at any point:

$y=9/x = 9x^-1 => dy/dx = 9(-x^-2)$

$:. dy/dx = -9/x^2$

We will use the formula $y-y_1=m(x-x_1)$ to find the tangents and normals, and use the fact that the tangents and normals are [perpendicular (so their product is -1)

When x=3
$x=3 => y=3 ; y'=-9/9=-1$

Tangent:
Passes through $(3,3)$ and has slope $m=-1$
$:. y-3=-1(x-3)$
$:. y-3=-x+3$
$:. y=-x+6$

Normal:
Passes through $(3,3)$ and has slope $m=1$
$:. y-3=1(x-3)$
$:. y-3=x-3$
$:. y=x$

When x=-3
$x=-3 => y=-3 ; y'=-1$

Tangent:
Passes through $(-3,-3)$ and has slope $m=-1$
$:. y-(-3)=-1(x-(-3))$
$:. y+3=-x-3$
$:. y=-x-6$

Normal:
Passes through $(-3,-3)$ and has slope $m=1$
$:. y-(-3)=1(x-(-3))$
$:. y+3=x+3$
$:. y=x$

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How do you find the equation of the tangent and normal line to the curve $y=9x^-1$ at x-3?

1 Answer

Explanation:

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