Find the points of inflection for (a)`f(x)=sinx` (b)`f(x)=3x^4-4x^3`

Find the points of inflection for f(x)=sinx f(x)=3x^4-4x^3 f(x)=x^(1/3)

Find the points of local maxima, local minima and the points of inflection of the function f(x)=x^5-5x^4+5x^3-1. Also, find the corresponding local maximum and local minimum values.

Find the points of local maxima, local minima and the points of inflection of the function f(x)=x^5-5x^4+5x^3-1 . Also, find the corresponding local maximum and local minimum values

Find the points of local maxima, local minima and the points of inflection of the function f(x)=x^5-5x^4+5x^3-1 . Also, find the corresponding local maximum and local minimum values

Find f '(x) If f(x)=sinx/x

Which of the following function/functions has/have point of inflection? f(x)=x^(6/7) (b) f(x)=x^6 f(x)=cosx+2x (d) f(x)=x|x|

Concavity and convexity : if f''(x) gt 0 AA x in (a,b) then the curve y=f(x) is concave up ( or convex down) in (a,b) and if f''(x) lt 0 AA x in (a,b) then the curve y=f(x) is concave down (or convex up ) in (a,b) Inflection point : The point where concavity of the curve changes is known as point of inflection (at inflection point f''(x) is equal to 0 or undefined) Number of point of inflection for f(x) =(x-1)^(3) (x-2)^(2) is :

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

Let f(x) be real valued continous funcion on R defined as f(x) = x^(2)e^(-|x|) Number of points of inflection for y = f(x) is (a) 1 (b) 2 (c) 3 (d) 4

Find the domain of the following following functions: (a) f(x)=(sin^(-1))/(x) (b) f(x)=sin^(-1)(|x-1|-2) (c ) f(x)=cos^(-1)(1+3x+2x^(2)) (d ) f(x)=(sin^(-1)(x-3))/(sqrt(9-x^(2))) (e ) f(x)="cos"^(-1)((6-3x)/(4))+"cosec"^(-1)((x-1)/(2)) (f) f(x)=sqrt("sec"^(-1)((2-|x|)/(4)))