Find the coordinates of the point of inflection of the curve f(x) `=e^(-x^(2))

A point of inflection of the curve y = e^(-x^(2)) is

The point of inflection of the curve y=(x-1)^(3) is

The point of inflection of the curve y = x^(4) is at:

If x_(0) is the x - coordinate of the point of inflection of a curve y=f(x) then (second derivative exists) ………….. .

Find the points of inflection for f(x) = 3x^(4) - 4x^(3)

Find the coordinates of the point on the curve y=(x)/(1+x^(2)) where the tangent to the curve has the greatest slope.

Find the coordinates of the point on the curve y=(x)/(1+x^(2)) where the tangent to the curve has the greatest slope.

Find the points of inflection for f(x)=3x^(4)-4x^(3) .

If f^(11)(x)lt0(gt0) on an interval (a,b) then the curve y=f(x) on this interval is convex (concave) i.e it is below (above) any of its tangent lines If f^(11)(x_(0))=0 or does not exist and the second derivative changes sign when passing through the point x_(0) then the point (x_(0),f(x)) is the = point of inflection of the curve y=f(x) If y=x^(4)+x^(3)-18x^(2)+24x-12 then