The domain of `f(x)= sqrt(cos(sinx))+sqrt(log_x{x})` where {x} denotes fractional part of x.

The domain of f(x)=sqrt(cos(sin x))+sqrt(log_(x){x}) where {x} denotes fractional part of x .

The number of integral values of x in the domain of f(x)=sqrt(3-x)+sqrt(x-1)+log{x}, where {} denotes the fractional part of x, is

The domain of f(x)=(1)/(sqrt(-x^(2)+{x})) (where {.} denotes fractional part of x) is

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

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

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

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

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

The domain of f(x)=sqrt(2{x}^(2)-3{x}+1) where {.} denotes the fractional part in [-1,1]

Domain of f(x)=sqrt(log_({x})[x])