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

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Answer 1 · 2018-07-10T14:11:39

$y=-18/(6*sqrt(3)*pi+pi^2)*x+pi^2/(6*sqrt(3))+6/(6*sqrt(3)+pi)$

We have given

$f(x)=x^2sin(x)$
then we get by the product rule

$(uv)'=u'v+uv'$
$f'(x)=2xsin(x)+x^2cos(x)$

$f'(pi/3)=2*pi/3*sin(pi/3)+(pi/3)^2cos(pi/3)$
$f'(pi/3)=pi/sqrt(3)+pi^2/18$
Note that $sin(pi/3)=sqrt(3)/2,cos(pi/3)=1/2$

so the slope of the normal line is given by

$m=-18/(6*sqrt(3)*pi+pi^2)$
We have
$f(pi/3)=pi^2/(6*sqrt(3))$
the searched equation hase the form

$y=mx+n$
We know $m$ and $n$ is given by

$pi^2/(6*sqrt(3))+6/(6*sqrt(3)+pi)=n$

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