Calculus
posted by Anonymous .
Find the inflection point(s), if any, of the function.
g(x)= 4x(^3)4x

They are the places where the second derivative is zero.
Respond to this Question
Similar Questions

Precalculus
Find the critical point of the function y=2(x1)^23. Then, determine whether the point represents a maximum, a minimum, or a point of inflection. 
Precalculus
Find the critical point of the function y=2(x1)^23. Then, determine whether the point represents a maximum, a minimum, or a point of inflection. 
calculus
Find all relative extrema and points of inflection of the function: f(x) = sin (x/2) 0 =< x =< 4pi =< is supposed to be less than or equal to. I can find the extrema, but the points of inflection has me stumped. The inflection … 
Calculus
The number of people who donated to a certain organization between 1975 and 1992 can be modeled by the equation D(t)=10.61t^(3)+208.808t^(2)168.202t+9775.234 donors, where t is the number of years after 1975. Find the inflection … 
calculus
Find the cubic function of the form y=ax^3 + bx^2 + cx + d which has a relative maximum point at (0,2) and a point of inflection at (1,2). How do I even start this one? 
calculus ..>steve
Given a function f(x)2/3x^3+5/2x^23x. a) Find i. The inflection point. ii. The yintercept and xintercept. b) Sketch the graph of f(x). i have already try it..but i don't understand.. which graph that is true.. the first or second … 
Calculus
If f(x) is a continuous function with f"(x)=5x^2(2x1)^2(3x+1)^3 , find the set of values for x for which f(x) has an inflection point. A. {0,1/3,1/2} B. {1/3,1/2} C. {1/3} D. {1/2} E. No inflection points 
Calculus AB
Find the xcoordinates of any relative extrema and inflection point(s) for the function f(x) = 3x(1/3) + 6x(4/3). You must justify your answer using an analysis of f '(x) and f "(x). My start to a solution: xvalues: (1/8) and (1/4) … 
Calculus
find the point(s) of inflection on the function f(x)= 10x + 10/x 
Math Calc
Find the xcoordinates of any relative extrema and inflection point(s) for the function f(x) = 3x(1/3) + 6x(4/3). You must justify your answer using an analysis of f '(x) and f "(x) I got 1/8 for a minimum point and 1/4 for inflection …