What is the equation of the line that is normal to $f(x)= ln(sin^2x)$ at $x=(4pi)/3$ ?

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Answer 1 · 2016-12-28T17:51:48

$y(x) =ln(3/4)-sqrt(3)/2(x-(4pi)/3)$

The equation of the line normal to the curve $y=f(x)$ at $x=barx$ , provided that $f(x)$ is differentiable is:

$y(x) = f(barx)-1/(f'(barx))(x-barx)$

In our case:

$f(x) = ln(sin^2x)$
$f'(x) = (2sinxcosx)/(sin^2x) = 2cotx$

and

$f((4pi)/3) = ln(sin^2((4pi)/3) )=ln((sqrt(3)/2)^2) =ln(3/4)$

$f'((4pi)/3) = 2 cot ((4pi)/3) = 2/sqrt(3)$

So the normal line is:

$y(x) =ln(3/4)-sqrt(3)/2(x-(4pi)/3)$

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What is the equation of the line that is normal to f(x)= ln(sin^2x) f(x)= ln(sin^2x) at x=(4pi)/3 x=(4pi)/3 ?