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

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Answer 1 · 2016-03-19T17:16:12

Equation of the line normal to $f(x)$ at $x=pi/3$ will be
$(y-pi^2/27)=(27sqrt3)/(8pi^2-6sqrt3pi)(x-pi/3)$

As $f(x)=x^2cot^2x$ , $f(pi/3)=(pi/3)^2cot^2(pi/3)$ or

$f(pi/3)=(pi)^2/9xx(1/sqrt3)^2=pi^2/27$

Now $(df)/(dx)=2xcot^2x+x^2xx2cotx xx(-csc^2x)$

= $2xcot^2x-2x^2cotxcsc^2x$

At $x=pi/3$ , $(df)/(dx)=2pi/3cot^2(pi/3)-2(pi/3)^2cot(pi/3)csc^2(pi/3)$

= $2pi/3(1/3)-2(pi/3)^2(1/sqrt3)(2/sqrt3)^2$

= $2pi/9-2pi^2/9xx(4/(3sqrt3))=2pi/9-(8pi^2)/(27sqrt3)$

= $(6sqrt3pi-8pi^2)/(27sqrt3)$

This will be the slope of tangent and hence slope of normal would be $(-27sqrt3)/(6sqrt3pi-8pi^2)$ or $(27sqrt3)/(8pi^2-6sqrt3pi)$

Hence equation of normal would be

$(y-pi^2/27)=(27sqrt3)/(8pi^2-6sqrt3pi)(x-pi/3)$

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