What is the equation of the line normal to $f(x)=tan^2x-3x$ at $x=pi/3$ ?

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Answer 1 · 2016-03-13T07:19:46

Equation of normal at $x=pi/3$ is $(3sqrt3-8)y-sqrt3x-2sqrt3pi+8pi/3+3sqrt3=0$

If $f(x)=tan^2x-3x$ ,

$f(pi/3)=tan^2(pi/3)-3xxpi/3=(sqrt3)^2-pi=3-pi$ .

Hence normal should pass through $(3-pi,pi/3)$

Slope of the curve at $x$ is given by differential of $f(x)$ i.e.

$f'(x)=2tanx xxsec^2x-3$ .

Hence slope of tangent at $x=pi/3$ is

$f'(pi/3)=2tan(pi/3)xxsec^2(pi/3)-3=2sqrt3xx(2/sqrt3)^2-3=8/sqrt3-3=(8-3sqrt3)/sqrt3$ and as product of slopes of tangent and normal should be $-1$

Hence, slope of normal is $sqrt3/(3sqrt3-8)$

Hence, equation of normal using point slope form is

$(y-pi/3)=sqrt3/(3sqrt3-8)(x-3+pi)$ or

$(3sqrt3-8)y-sqrt3x-sqrt3pi+8pi/3+3sqrt3-sqrt3pi=0$

or $(3sqrt3-8)y-sqrt3x-2sqrt3pi+8pi/3+3sqrt3=0$

What is the equation of the line normal to f(x)=tan^2x-3x f(x)=tan^2x-3x at x=pi/3 x=pi/3?