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Varian · Answer 1 · 2019-02-22T19:40:41+0000

Use chain rule to split the problem into two:

$(d)/(dx)\sin^(-1)(\ln x)=(d sin^(-1)u)/(du)(du)/(dx)$

with
$u = \ln x$

Let

$y = \sin^(-1)u$

since sin^-1 is an inverse to sin we also know that

$\sin y = u$

We are looking for

$(dy)/(du) = (d \sin^(-1)u)/(du)\\(1)/((du)/(dy))= (d \sin^(-1)u)/(du)\\(1)/(\cos y)= (d \sin^(-1)u)/(du)\\(1)/(√(1-sin^2 y))= (d \sin^(-1)u)/(du)\\(1)/(√(1-u^2))= (d \sin^(-1)u)/(du)$

Now the second part of the chain rule:

$(du)/(dx)=(\ln x)/(dx)=(1)/(|x|)=(1)/(x)\,\,\mbox{for}\,\,x>0$

and putting it all together

$(d sin^(-1)u)/(du)(du)/(dx)= (1)/(x√(1-\ln^2 x))$

the last form is the final derivative and your answer

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