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What is the derivative of #(ln x) ^ cos x#?

1 Answer

Jun 27, 2015

#(lnx)^cosx ( -sinx ln lnx + cosx /(x lnx))#

Explanation:

Let #y=(ln x)^cos x#, so that ln y= cos x ln ln x

Now differentiate both sides,

#1/y dy/dx = -sinx ln ln x + cos x 1/lnx 1/x#

#dy/dx= (lnx)^cosx ( -sinx ln lnx + cosx /(x lnx))#

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