How do you find the equation of the tangent and normal line to the curve $y=x^2$ at x=-3?

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How do you find the equation of the tangent and normal line to the curve $y=x^2$ at x=-3?

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Answer 1 · 2016-08-26T06:20:08

Equation of the tangent

$y=-6x-9$

Equation of the Normal

$y=1/6x+19/2$

Explanation:

Given -

$y=x^2$

It is a quadratic function. The curve is a upward facing parabola.

Its first derivative gives the slope at any given point on the curve.

$dy/dx=2x$

Slope exactly at $x=-3$

$m_1=2(-3)=-6$

At $x=-3 ; y=(-3)^2=9$

The tangent and Normal are passing through the point $(-3, 9)$

Slope of the tangent is $m_2=-6$

Steps to get Equation of the tangent -

$mx+c=y$

$(-6)(-3)+c=9$

$18+c=9$

$c=9-18=-9$

Equation of the tangent is -

$y=-6x-9$

Steps to get Equation of the Normal -

Normal's slope $m_3=-(1/(m_2))=-(1/(-6))=1/6$

$mx+c=y$
$1/6(-3)+c=9$
$-1/2+c=9$
$c=9+1/2=(18+1)/2=19/2$

Equation of the Normal -

$y=1/6x+19/2$

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How do you find the equation of the tangent and normal line to the curve $y=x^2$ at x=-3?

1 Answer

Explanation:

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How do you find the equation of the tangent and normal line to the curve $y=x^2$ at x=-3?