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How do you differentiate #f(x)=csc(lnx) # using the chain rule?

1 Answer

Shwetank Mauria

Jun 28, 2016

#(df)/(dx)=-1/xcsc(lnx)cot(lnx)#

Explanation:

As #f(x)=csc(lnx)=csc(g(x))#, where #g(x)=lnx#

As according to chain rule #(df)/(dx)=(df)/(dg)xx(dg)/(dx)#

#(df)/(dx)=-csc(lnx)cot(lnx)xx1/x=-1/xcsc(lnx)cot(lnx)#

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