What is the derivative of this function #y=1/arcsin(2x)#?

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Answer 1 · 2016-11-08T19:13:55

Start by differentiating #y = arcsin(2x)#.

#y = arcsin(2x) -> siny = 2x#

#cosy(dy/dx) = 2#

#dy/dx = 2/(cosy)#

Apply the identity #cosy = sqrt(1 - sin^2(y))#

#dy/dx = 2/sqrt(1 - sin^2y) = 2/sqrt(1 - 4x^2) ->" since siny = 2x"#

So, now we can differentiate the entire expression using the quotient rule.

#dy/dx = (0 xx arcsin(2x) - 2/sqrt(1 - 4x^2))/(arcsin(2x))^2#

#dy/dx = -2/((sqrt(1 - 4x^2))(arcsin(2x))^2)#

Hopefully this helps!