Differenciate log x with respect to cot x

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asked Jan 24, 2019 146k views

3 votes

Differenciate log x with respect to cot x

Mathematics
middle-school

Eduardo Sousa asked

by Eduardo Sousa

7.3k points

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1 Answer

4 votes

if you know the chain rule

$\displaystyle(df)/(dx) = (df)/(dg) (dg)/(dx) \implies (df)/(dg) = ( (df)/(dx) )/( (dg)/(dx) )$

hence

$\displaystyle (d \log x)/(d \cot x) = ( (d \log x)/(dx) )/( (d \cot x)/(dx) ) = ((1)/(x \ln 10))/(-\csc^2 x) = - (1)/(x \ln 10 \cdot \csc^2 x)$

Assuming that
$\log x = \log_(10) x$