What are the points of inflection, if any, of #f(x)=x^4/(x^3+6 #? Calculus Graphing with the Second Derivative Determining Points of Inflection for a Function 1 Answer Jim H Dec 12, 2016 #(root(3)12, (2root(3)12)/3)# Explanation: #f''(x) = -(36x^2(x^3-12))/(x^3+6)^3# An inflection point of #f# is a point on the graph of #f# at which the concavity changes. #f''# changes signs at #x=root(3)12# and at #-root(3)6# #-root(3)6# is not in the domain of #f#, so there is no point on the graph pf #f# with #x = -root(3)6#. #root(3)12# is in the domain of #f#, and #f(root(3)12) = (2root(3)12)/3# Answer link Related questions How do you find the inflection points for the function #f(x)=8x+3-2 sin(x)#? How do you find the inflection point of a cubic function? How do you find the inflection point of a logistic function? What is the inflection point of #y=xe^x#? How do you find the inflection points for the function #f(x)=x^3+x#? How do you find the inflection points for the function #f(x)=x/(x-1)#? How do you find the inflection points for the function #f(x)=x/(x^2+9)#? How do you find the inflection points for the function #f(x)=xsqrt(5-x)#? How do you find the inflection points for the function #f(x)=e^sin(x)#? How do you find the inflection points for the function #f(x)=x-ln(x)#? See all questions in Determining Points of Inflection for a Function Impact of this question 1189 views around the world You can reuse this answer Creative Commons License