What is the derivative of #y = ln(2x^3-x^2)#? Calculus Basic Differentiation Rules Chain Rule 1 Answer Henry W. Oct 8, 2016 #d/(dx)lnf(x)=(f'(x))/f(x)# Explanation: Recall that #d/(dx)lnx=1/x# #y=ln(2x^3-x^2)# is a function within a function; we can apply chain rule. Let #u=2x^3-x^2#, then #y=lnu# #(dy)/(du)=1/u# and #(du)/(dx)=6x^2-2x# #(dy)/(dx)=(dy)/(du)#x#(du)/(dx)=1/(2x^3-x^2)*(6x^2-2x)=(6x^2-2x)/(2x^3-x^2)# Answer link Related questions What is the Chain Rule for derivatives? How do you find the derivative of #y= 6cos(x^2)# ? How do you find the derivative of #y=6 cos(x^3+3)# ? How do you find the derivative of #y=e^(x^2)# ? How do you find the derivative of #y=ln(sin(x))# ? How do you find the derivative of #y=ln(e^x+3)# ? How do you find the derivative of #y=tan(5x)# ? How do you find the derivative of #y= (4x-x^2)^10# ? How do you find the derivative of #y= (x^2+3x+5)^(1/4)# ? How do you find the derivative of #y= ((1+x)/(1-x))^3# ? See all questions in Chain Rule Impact of this question 12288 views around the world You can reuse this answer Creative Commons License