What are the critical values of $f(x)=(x-lnx)/e^(x+ln(x^2))-x$ ?

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Answer 1 · 2017-08-19T17:58:51

$f$ has no critical values.

Note the simplification that can occur in the denominator: $e^(x+ln(x^2))=e^xe^ln(x^2)=x^2e^x$ .

We also might note that the domain of $f$ is $x>0$ .

$f(x)=(x-lnx)/(x^2e^x)-x$

To find critical values, we find where the derivative $f'$ equals $0$ or does not exist within the domain of $f$ .

To differentiate $f$ , we'll need the quotient rule:

$f'(x)=((d/dx(x-lnx))x^2e^x-(x-lnx)(d/dxx^2e^x))/(x^2e^x)^2-1$

$f'(x)=((1-1/x)x^2e^x+(lnx-x)(2xe^x+x^2e^x))/(x^4e^(2x))-1$

Factoring $e^x$ from the numerator and taking one $x$ from $x^2$ into the parentheses:

$f'(x)=(x(x-1)+(lnx-x)x(2+x))/(x^4e^x)-1$

$f'(x)=(x-1+(lnx-x)(x+2))/(x^3e^x)-1$

The derivative doesn't exist for $x<=0$ , which is the same as $f$ , so there are no critical points to be found there.

Other critical points could occur when $f'(x)=0$ :

$0=(x-1+(lnx-x)(x+2))/(x^3e^x)-1$

Continuing to manipulate gives an equation which cannot be solved algebraically:

$x-1+(lnx-x)(x+2)-x^3e^x=0$

Graph this to find that is has no zeros.

This means that $f$ has no critical values.

What are the critical values of f(x)=(x-lnx)/e^(x+ln(x^2))-xf(x)=(x-lnx)/e^(x+ln(x^2))-x?