What is the antiderivative of # 1/(xlnx)#?

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Answer 1 · 2015-09-26T11:51:52

#ln(lnx)#

antiderivative of #1/(xlnx)# could be written as #int(1/(xlnx)dx)#

Or as #int1/(lnx)*1/xdx#

Recall that : the derivative of #lnx# is #1/x#
This means that : #(d(lnx))/(dx)=1/x#

Implying : #d(lnx)=1/x(dx)#

Hence, #int1/lnx*1/xdx=int1/lnx*d(lnx)#

we are left with the antiderivative of #1/lnx# with respect to #lnx#

This case is simlar to finding the antiderivative of say, #1/u# wrt #u#
The answer would be #lnu#

Similarly, the antiderivative of #1/lnx# with respect to #lnx# is #color(blue)(ln(lnx))#