the derivative of `tan^-1 (6xsqrtx)/(1-9x^3)` is `sqrtx g(x)` then `g(x)` is:

the derivative of (tan^(-1)(6x sqrt(x)))/(1-9x^(3)) is sqrt(x)g(x) then g(x) is:

If for x(0,(1)/(4)), the derivative of tan^(-1)((6x sqrt(x))/(1-9x^(3))) is sqrt(x)g(x), then g(x) equals: (1)(3x)/(1-9x^(3))(2)(3)/(1+9x^(3))(3)(9)/(1+9x^(3)) (4) (3x sqrt(x))/(1-9x^(3))

What is the derivative of tan^(-1)((sqrtx-x)/(1+x^(3//2))) at x = 1?

tan^(-1){(sqrtx-x)/(1+x^(3//2))}

Find the derivative of : g(x)=x(x-3)(x^(2)+x) .

Derivative of tan ^(-1) ""((x)/(sqrt(1-x^(2)))) with respect sin ^(-1) ( 3x - 4x^(3)) is

The derivative of f(x)=x^(tan^-1 x) with respect to g(x)=sec^-1(1/(2x^2-1)) is