The derivative of `sec^(-1)(-1/(2x^(2) -1))` with respect to ` sqrt(1-x^(2)) " at " x = 1/2 ` is ……. .

The derivative of sec^(-1)((1)/(2x^(2)-1)) with respect to sqrt(1-x^(2))" at "x=1 , is

The derivative of sec^(-1)((1)/(2x^(2)-1)) with respect to sqrt(1-x^(2))" at "x=0 , is

The derivative of cosec^(-1)((1)/(2x^(2)-1)) with respect to sqrt(1-x^(2))" at "x=(1)/(2) , is

Derivative of y = "sec"^(-1)(1/(2x^2 - 1)) is

Differentiate sec^-1""(1)/(2x^2-1) with respect to sqrt(1-x^2)

Differential coefficient of sec^(-1) (1)/(2x^(2) -1) with respect to sqrt(1 -x^(2) ) " at x " = (1)/(2) is equal to

The derivative of tan^(-1) ((2x)/(1-x^(2))) with respect to cos^(-1) sqrt(1 - x^(2)) is

The derivative of sec ^(-1)((1)/(2x^(2)+1)) with respect to sqrt(1+3x) at x=-1/3( a) does not exist (b) 0(c)1/2(d)1/3

What is the derivative of sec^(2)(tan^(-1)x) with respect to x ?