How do you differentiate x^lnx?

1 Answer
Steve M
Nov 21, 2016

dy/dx = 2x^(ln(x)-1)lnx

Explanation:

Let y = x^(lnx)

Take Natural logarithms of both sides:
lny = ln{x^(lnx)}
:. lny = (lnx)(ln{x) as ln a^b = blna
:. lny = (lnx)^2

Differentiate Implicitly (LHS), and apply chain rule to RHS:
:. 1/y dy/dx = 2(lnx)(1/x)
:. 1/(x^(lnx)) dy/dx = 2(lnx)x^-1
:. dy/dx = (x^(lnx))2(lnx)x^-1
:. dy/dx = 2x^(ln(x)-1)lnx

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