A function defined for all real numbers is defined for `x>-0` as follows `f(x)={x|x|, 0<=x<=1, 2x, x>=1}` How if f defined for `x<=0`. If (i) f is even ? (ii) f is odd ?

A function f, defined for all positive real numbers, satisfies the equation f(x^(2))=x^(3)=x^(3) for every gt0. Then the value of f'(4) is

Let f be a real valued periodic function defined for all real umbers x such that for some fixed a gt 0 , f(x+a)=(1)/(2)+sqrt(f(x)-{f(x)}^(2)) for all x . Then , the period of f(x) is

If a funciton f(x) is defined for x in [0,1] , then the function f(2x+3) is defined for

If R denotes the set of all real number,then the function f:R to R defined f(x) = |x| is :

A function f(x) is defined as follows f(x)={(sin x)/(x),x!=0 and 2,x=0 is,f(x) continuous at x=0? If not,redefine it so that it become continuous at x=0 .

A function f(x) is defined as follows: f(x)=1 if x>0;-1 if x<0;0 if x=0. Prove that lim_(x rarr0)f(x) does not exist

Let f be a differentiable real function defined on (a;b) and if f'(x)>0 for all x in(a;b) then f is increasing on (a;b) and if f'(x)<0 for all x in(a;b) then f(x) is decreasing on (a;b)