How do you find the equation of the tangent and normal line to the curve $y=lnx$ at x=17?

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How do you find the equation of the tangent and normal line to the curve $y=lnx$ at x=17?

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Answer 1 · 2016-11-02T18:44:32

Tangent Equation : $y=x/17+ln17-1$
Normal Equation : $y=-17x+ln17+289$

Explanation:

If $y=lnx$ then $dy/dx=1/x$

When $x=17$
$=> y=ln17$
$=> dy/dx=1/17$

so the tangent passes through $(17,ln17)$ and has gradient $m_T=1/17$

Using $y-y_1=m(x-x_1)$ the equation of the tangent is:

$y-ln17=1/17(x-17)$
$:. y-ln17=x/17-1$
$:. y=x/17+ln17-1$

The normal is perpendicular to the tangent, so the product of their gradients is -1 hence normal passes through $(17,ln17)$ and has gradient $m_N=-17$

so the equation of the normal is:
$y-ln17=-17(x-17)$
$:. y-ln17=-17x+289$
$:. y=-17x+ln17+289$

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How do you find the equation of the tangent and normal line to the curve $y=lnx$ at x=17?

1 Answer

Explanation:

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How do you find the equation of the tangent and normal line to the curve $y=lnx$ at x=17?