Question #3168f

2 Answers
Matt B.
Nov 22, 2016

I don't believe you should've applyied L'H's rule since you would've been left with oo^oo.

Jim H
Nov 22, 2016

No you cannot apply l'Hopital infinitely many times.

Explanation:

One problem with your approach is that the derivative of x^x cannot be found by the power rule. (It is not a power function.) We differentiate x^x by some version of logarithmic differentiation.

x^x = e^(xlnx)

so d/dx (x^x ) = x^x(1+lnx)

and the second derivative is

d^2/dx^2 (x^x ) = x^x(1+lnx)^2+(x^x)/x.

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