If `lim _(e to e ^(-)) {ln x} and lim _(xto x ^(+)) {ln x}` exist finitely but they are not equal (where {.} denotes fractional part function), then:

If lim _(x to c ^(-)) {ln x} and lim _(xto c ^(+)) {ln x} exist finitely but they are not equal (where {.} denotes fractional part function), then:

If lim_(x rarr oo){In x} and lim_(x rarr oo){ln x} exists finitely but they are not equal (where {:} denotes fractional part function),then: :

The value of lim_(xto0)sin^(-1){x} (where {.} denotes fractional part of x) is

lim_(x rarr1)({x})^((1)/(n pi x)) ,where {.} denotes the fractional part function

lim _(xto 1 ^(-)) (e ^({x}) - {x} -1)/( {x}^(2)) equal, where {.} is fractional part function and I is aan integer, to :

The domain of f(x)=log_(e)(1-{x}); (where {.} denotes fractional part of x ) is

If f(x)=e^(x), then lim_(x rarr oo)f(f(x))^((1)/()(x)})); is equal to (where {x} denotes fractional part of x).

lim_ (x rarr e ^ (+)) (ln x) ^ (xe)

Let f (x) = lim _(n to oo) n ^(2) tan (ln(sec""(x)/(n )))and g (x) = min (f(x), {x}} (where {.} denotes fractional part function) Left derivative of phi(x) =e ^(sqrt(2f (x)))at x =0 is:

lim_(xtoc)f(x) does not exist when where [.] and {.} denotes greatest integer and fractional part of x