What is the equation of the normal line of $f(x)=xlnx-e^-x$ at $x=2$ ?

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Answer 1 · 2016-03-26T06:58:21

$0.5469x+y=2.34477$

As $f(x)=xlnx-e^-x$ , at $x=2$ , we have

$f(2)=2ln2-e^-2=2xx0.69315-0.13533=1.25097$

Hence normal passes through $(2,1.25097)$

As $f(x)=xlnx-e^-x$ , $f'(x)$ is given by

$(1xxlnx+x xx1/x)-e^(-x)xx(-1)$ or

$(lnx+1)+e^(-x)$ and at $x=2$ , slope of tangent would be

$f'(2)=(ln2+1)+e^(-2)=0.69315+1+0.13533=1.82848$

Hence slope of normal would be $-1/1.82848=-0.5469$

Hence equation of normal would be

$(y-1.25097)=-0.5469(x-2)$ or

$y-1.25097=-0.5469x+2xx0.5469$ or

$0.5469x+y=1.0938+1.25097$ or

$0.5469x+y=2.34477$

What is the equation of the normal line of f(x)=xlnx-e^-xf(x)=xlnx-e^-x at x=2x=2?