How do you differentiate #f(x)=x^2 / (1-x)^(1/2)# using the quotient rule?

1 Answer
Guilherme N.
Dec 24, 2015

The quotient rule states that for a function #y=f(x)/g(x)#, its derivative is #(dy)/(dx)=(f'(x)g(x)-f(x)g'(x))/g(x)^2#

Explanation:

Also, here we'll need the chain rule when derivating the second term. The chain rule states that #dy/dx=dy/(du)(du)/dx#. Let's rename #u=1-x#. Done, let's start.

#(dy)/(dx)=(2x(1-x)^(1/2)-x^2(1/(2u^(1/2)))*(-1))/((1-x)^(1/2))^2#

#(dy)/(dx)=(2x(1-x)^(1/2)+x^2/(2(1-x)^(1/2)))/(1-x)#

#(dy)/(dx)=((4x(1-x)+x^2)/(2(1-x)^(1/2)))/(1-x)=((4x-3x^2)(1-x))/(2(1-x)^(1/2))#

#(dy)/(dx)=((4x-3x^2)(1-x)^(1/2))/2#

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