Let f:A→R+ be a function defined by f(x)=log{x}(x−[x]|x|), where [ – InterviewSolution

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1.	Let f:A→R+ be a function defined by f(x)=log{x}(x−[x]\|x\|), where [.] and {.} represent greatest integer function and fractional part function respectively. If B is the range of f, then the number of integer(s) in R+−B is
Answer» Let $f : A \to R^{+}$ be a function defined by $f (x) = {log}_{{x}} (\frac{x - [x]}{\| x \|})$ , where $[.]$ and ${.}$ represent greatest integer function and fractional part function respectively. If $B$ is the range of $f$ , then the number of integer(s) in $R^{+} - B$ is

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