Let f(x) = log ({x}) [x] g (x) =log (...

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 :

`(2,3)`

`(1,3)`

`(1,2)`

None of these

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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 :

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VIKAS GUPTA (BLACK BOOK) ENGLISH-FUNCTION -COMPREHENSION TYPE PROBLEMS

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 :