What is the derivative of #f(x)=-ln(1/x)+lnx#?

1 Answer
VNVDVI
Apr 11, 2018

#f'(x)=2/x#

Explanation:

We could jump right in and apply the Chain Rule, but it is worthwhile to apply the very convenient properties of logarithms. It will avoid a lot of messy work and eliminate room for trivial errors.

#ln(1/x)=ln(1)-ln(x)#

#ln(1)=0,# so

#ln(1/x)=-lnx# and we end up with

#f(x)=-(-lnx)+lnx=lnx+lnx=2lnx#

Now, recalling that #d/dxlnx=1/x,#

#f'(x)=2/x#

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