Question

How do you differentiate `y= ln(1-x^2)^(1/2)`?

Answer 1

`dy/dx=(-x)/(1-x^2)`

Explanation:

`color(green)(lna^b=blna)`

`y=ln(1-x^2)^(1/2)=1/2ln(1-x^2)`

`color(green)(d/dxlnu=1/u*color(blue)((du)/dx` `rarrcolor(red)("Chain Rule")`

Differentiate,

`dy/dx=1/2*(1/(1-x^2))*color(blue)((0-2x)`

Simplify,

`dy/dx=(-x)/(1-x^2)`