Let a function `f (x) =[x] {x} -|x| ` where `[.], {.}` are greatest integer and fractional part respectively then match the following List-I with List-II.

The function, f(x)=[|x|]-|[x]| where [] denotes greatest integer function:

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

Solve the equation [x]{x}=x, where [] and {} denote the greatest integer function and fractional part, respectively.

Domain of f(x)=sin^(-1)(([x])/({x})) , where [*] and {*} denote greatest integer and fractional parts.

Range of the function f defined by (x) =[(1)/(sin{x})] (where [.] and {x} denotes greatest integer and fractional part of x respectively) is

The value of int_(0)^(|x|){x} dx (where [*] and {*} denotes greatest integer and fraction part function respectively) is

lim_(xtoc)f(x) does not exist when where [.] and {.} denotes greatest integer and fractional part of x

Solve : [x]^(2)=x+2{x}, where [.] and {.} denote the greatest integer and the fractional part functions, respectively.

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

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] .