What is the equation of the normal line of $f (x) = ln (\frac{1}{x})$ $f(x)=ln(1/x)$ at $x = 5$ $x=5$ ?

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What is the equation of the normal line of $f (x) = ln (\frac{1}{x})$ $f(x)=ln(1/x)$ at $x = 5$ $x=5$ ?

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Answer 1 · 2015-11-20T22:28:13

$y = 5 x - 25 + ln (\frac{1}{5})$ $y=5x-25+ln(1/5)$

Explanation:

According to the Chain Rule,

$f'(x)=(d/dx[1/x])/(1/x)$

Let's find the derivative. (Remember that $1/x=x^-1$ .)

$d/dx[x^-1]=-x^-2=-1/x^2$

Plug back in to find that:

$f'(x)=(-1/x^2)/(1/x)=-1/x^2(x/1)=-1/x$

We want the equation of the normal line at the point $(5,ln(1/5))$ . The normal line is perpendicular to the tangent line, so it has an opposite reciprocal slope.

We can find the slope of the tangent line at $x=5$ by calculating $f'(5)=-1/5$

Therefore, the slope of the normal line is $5$ .

We can use point-slope form to write an equation:

$y-ln(1/5)=5(x-5)$

Or, in slope-intercept form:

$y=5x-25+ln(1/5)$

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What is the equation of the normal line of $f (x) = ln (\frac{1}{x})$ $f(x)=ln(1/x)$ at $x = 5$ $x=5$ ?

1 Answer

Explanation:

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What is the equation of the normal line of $f (x) = ln (\frac{1}{x})$ $f(x)=ln(1/x)$ at $x = 5$ $x=5$ ?