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

The value of lim_(xto0)((tan({x}-1))sin{x})/({x}({x}-1) is where {x} denotes the fractional part function

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:

lim_(xto-1) (1)/(sqrt(|x|-{-x})) (where {x} denotes the fractional part of x) is equal to

lim_(xrarroo) {(e^(x)+pi^(x))^((1)/(x))} = (where {.} denotes the fractional part of x ) is equal to

lim_(x->1) (x-1){x}. where {.) denotes the fractional part, is equal to:

lim_(xto0)((e^(x)-1)/x)^(1//x)

lim_(xto0) (1)/(x)cos^(1)((1-x^(2))/(1+x^2)) is equal to

lim_(x->oo ){(e^x+pi^x)^(1/x)}= where {.} denotes the fractional part of x is equal to

lim_(x to 0) {(1+x)^((2)/(x))} (where {.} denotes the fractional part of x) is equal to

Lim_(x rarr 0^+) ((pi/2-cot^(-1){x})x)/("sgn"x-cosx) (where {.} and sgn(.) denotes fractional part function and signum function respectively) is equal to