How do you differentiate $y = x^{x - 1}$ $y=x^(x-1)$ ?

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How do you differentiate $y = x^{x - 1}$ $y=x^(x-1)$ ?

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Answer 1 · 2016-06-29T16:41:07

Use logarithmic differentiation to get $y'=(lnx+1-1/x)x^(x-1)$ .

Explanation:

Take the natural logarithm of both sides, to drop the exponent:
$lny=(x-1)lnx$

Now differentiate both sides with respect to $x$ :
$d/dx(lny=(x-1)lnx)$

Note that this will require knowledge of implicit differentiation, because the derivative of $lny$ w.r.t.x is $1/y*y'$ . The derivative of $(x-1)lnx$ is found with the product rule:
$d/dx((x-1)(lnx))=(x-1)'(lnx)+(x-1)(lnx)'$
$=(1)(lnx)+(x-1)*(1/x)$
$=lnx+(x-1)/x$
$=lnx+1-1/x$

Since $d/dx(lny)=1/y*y'$ , and $d/dx((x-1)(lnx))=lnx+1-1/x$ , we have:
$1/y*y'=lnx+1-1/x$

Multiply both sides by $y$ to isolate $y'$ :
$y'=(lnx+1-1/x)y$

Since $y=x^(x-1)$ :
$y'=(lnx+1-1/x)x^(x-1)$

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