What is the derivative of #arctan(x)/(1+x^2)#?
1 Answer
Feb 27, 2017
Explanation:
The quotient rule states that the derivative of a function
#f'(x)=(g'(x)h(x)-g(x)h'(x))/(h(x))^2#
Here we see that:
#g(x)=arctan(x)" "=>" "g'(x)=1/(1+x^2)# #h(x)=1+x^2" "=>" "h'(x)=2x#
Then:
#d/dx(arctan(x)/(1+x^2))=((1/(1+x^2))(1+x^2)-arctan(x)(2x))/(1+x^2)^2#
#color(white)(d/dx(arctan(x)/(1+x^2)))=(1-2xarctan(x))/(1+x^2)^2#
