Draw graph of f(x) `=x|x-2|` and hence find points of local maxima`//`minima.

Draw the graph of f(x) = x^(2)e^(-|x|) i) Find the point of maxima/minima. ii) Find the asymptote is any. iii) Find the range of the function. iv) Find the number of roots of the equation f(x)=1

In each of following graphs identify if x= a is point of local maxima minima or neither

Show that f(x) =(x^(3) -6x^(2)+12x-8) does not have any point of local maxima or minima . Hence draw graph

Find points of local maxima // minima of f(x) =x^(2) e^(-x) .

Let f(x) =x^(3) -x^(2) -x-4 (i) find the possible points of maxima // minima of f(x) x in R (ii) Find the number of critical points of f(x) x in [1,3] (iii) Discuss absolute (global) maxima // minima value of f(x) for x in [-2,2] (iv) Prove that for x in (1,3) the function does not has a Global maximum.

The function f(x)=|x^2-2|/|x^2-4| has, (a) no point of local maxima (b) no point of local minima (c) exactly one point of local minima (d) exactly one point of local maxima

For the function f(x)=4/3x^3-8x^2+16 x+5,x=2 is a point of (1)local maxima (2) local minima (3)point of inflexion (4) decreasing/increasing

if lim_(h->0) [f(a-h)/f(a)]=c where f(x) is a continuous function such that f(x)> 0 for all x in R and [.] denotes greatest integer function then which of the following statements is always true ? (A) If x=a is a point of local minima then c in N (B) if x = a is a point of local maxima then c in N (C) If x=a is a pioint of local minima then c in I (D) If x= a is a point of local maximka then c in I

Let f(x) =x^(2) , x in (-1,2) Then show that f(x) has exactly one point of local minima but global maximum Is not defined.

Find the points of local maxima or minima and corresponding local maximum and minimum values of f(x)=x^3-6x^2+9x+15 . Also, find the points of inflection, if any: