[" 1f "f(x)=x+{-x}+[x]" ,where I and "{}" denote the fractional part and greatest "],[" integer function.Discuss the continuity of "f" in "[-2,2].]

If f(x)={x}&g(x)=[x] (where {.}&[.] denotes the fractional part and the integral part functionsrespectively),then discuss the continuity of

Discuss the minima of f(x)={x}, where {,} denotes the fractional part of x

If f(x)=[x], where [.] denotes greatest integer function. Then check the continuity on [1,2]

f (x)= {x} and g(x)= [x]. Where { } is a fractional part and [ ] is a greatest integer function. Prove that f(x)+ g(x) is a continuous function at x= 1.

f(x)=[x^(2)]-{x}^(2), where [.] and {.} denote the greatest integer function and the fractional part function , respectively , is

If f(x) = [x^2] + sqrt({x}^2 , where [] and {.} denote the greatest integer and fractional part functions respectively,then

The function f(x)=[x], where [x] denotes the greatest integer function,is continuous at

If f(x)=x+{-x}+[x] , where [x] and {x} denotes greatest integer function and fractional part function respectively, then find the number of points at which f(x) is both discontinuous and non-differentiable in [-2,2] .

If f(x)=x+{-x}+[x] , where [x] and {x} denotes greatest integer function and fractional part function respectively, then find the number of points at which f(x) is both discontinuous and non-differentiable in [-2,2] .