Find the range of `f(x)=[sin{x}],` where `{}` represents the fractional part function and `[]` represents the greatest integer function.

Find the domain and range of f(f)=log{x}, where {} represents the fractional part function).

Find the domain and range of f(x)=sin^(-1)[x] where [] represents the greatest function).

Find the range of f(x)=(x-[x])/(1-[x]+x'), where [] represents the greatest integer function.

Find the range of each of the following functions: (where {.} and [.] represents fractional part and greatest integer part functions respectively) f(x)=[1/(sin{x})]

Find the range of the following functions: (where {.} and [.] represent fractional part and greatest integer part functions respectively) f(x)=sin^(2)xcos^(4)x

Find the range of each of the following functions: (where {.} and [.] represents fractional part and greatest integer part functions respectively) f(x)=[1/(sin{x})]

Find the range of the following functions: (where {.} and [.] represent fractional part and greatest integer part functions respectively) f(x)=sin^(2)xcos^(4)x

Find the range of the following functions: (where {.} and [.] represent fractional part and greatest integer part functions respectively) f(x)=1-|x-2|