Let ` f(x) = log _({x}) [x]`
` g (x) =log _({x})-{x}`
`h (x) log _({x}) {x}`
where `[], {}` denotes the greatest integer function and fractional part function respectively.
For `x in (1,5)the f (x)` is not defined at how many points :

Let f(x) = log _({x}) [x] g (x) =log _({x})-{x} h (x) log _({x}) {x} where [], {} denotes the greatest integer function and fractional part function respectively. Domine of h (x) is :

Let f(x) = log _({x}) [x] g (x) =log _({x})-{x} h (x) log _({x}) {x} where [], {} denotes the greatest integer function and fractional part function respectively. If A = {x:x in domine of f (x))) and B {x:x domine of g (x)} then AA x in (1,5), A -B will be :

The range of function f(x)=log_(x)([x]), where [.] and {.} denotes greatest integer and fractional part function respectively

f(x)=log(x-[x]), which [,] denotes the greatest integer function.

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

If f(x) = log_([x-1])(|x|)/(x) ,where [.] denotes the greatest integer function,then

If [log_2 (x/[[x]))]>=0 . where [.] denotes the greatest integer function, then :

Let f(x)=(-1)^([x]) where [.] denotes the greatest integer function),then