What is the equation of the line normal to $f(x)=(xsinx)/tanx$ at $x=pi/3$ ?

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Answer 1 · 2016-06-20T09:13:20

Equation of normal is $(y-pi/6)=(2sqrt3)/(pi-sqrt3)xx(x-pi/3)$

As $f(x)=(xsinx)/tanx$ , at $x=pi/3$ , $f(x)=(pi/3xxsqrt3/2)/sqrt3=pi/6$

Hence,m we are seeking equation of normal at $(pi/3,pi/6)$

As slope of tangent is given by $f'(x)$ , as $f(x)=(xsinx)/(sinx/cosx)=xcosx$

Hence $f'(x)=cosx-xsinx$ and at $x=pi/3$ , $f'(pi/3)=cos(pi/3)-pi/3xxsin(pi/3)=1/2-pi/3xxsqrt3/2$

= $1/2-pi/(2sqrt3)=(sqrt3-pi)/(2sqrt3)$

Hence slope of tangent is $(sqrt3-pi)/(2sqrt3)$

and that of normal would be $(-1)/((sqrt3-pi)/(2sqrt3))=(2sqrt3)/(pi-sqrt3)$

and equation of normal would be

$(y-pi/6)=(2sqrt3)/(pi-sqrt3)xx(x-pi/3)$

What is the equation of the line normal to f(x)=(xsinx)/tanx f(x)=(xsinx)/tanx at x=pi/3 x=pi/3?