Let f(x)=sqrt(|x|-{x}), where {.} denote...

Let `f(x)=sqrt(|x|-{x})`, where `{.}` denotes the fractional part of x an X,Y and its domain and range respectively, then

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Let f(x)=sqrt(|x|-{x})(w h e r e{ } denotes the fractional part of (x)a n dX , Y are its domain and range, respectively). Then

f(x)=sqrt((x-1)/(x-2{x})) , where {*} denotes the fractional part.

f(x)=sqrt((x-1)/(x-2{x})) , where {*} denotes the fractional part.

f(x)=sqrt((x-1)/(x-2{x})) , where {*} denotes the fractional part.

The domain of f(x)=sqrt(x-2{x}). (where {} denotes fractional part of x ) is

if f(x) ={x^(2)} , where {x} denotes the fractional part of x , then

If f(x)=|x|-{x} where {x} denotes the fractional part of x , then f(x) is dreasing in

Find the domain of f(x) = sqrt (|x|-{x}) (where {*} denots the fractional part of x.

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