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

lim_(x rarr0){(1+x)^((2)/(x))}( where {x} denotes the fractional part of x ) is equal to.

If f(x) = e^(x) , then lim_(xto0) (f(x))^((1)/({f(x)})) (where { } denotes the fractional part of x) is equal to -

lim_(x rarr1)(x sin{x})/(x-1)," where "{x}" denotes the fractional part of "x," is equal to "

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

lim_(x rarr1)(x-1){x}. where {.) denotes the fractional part,is equal to:

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

lim_(x rarr-1)(1)/(sqrt(|x|-{-x}))( where {x} denotes the fractional part of (x) is equal to (a)does not exist (b) 1(c)oo(d)(1)/(2)

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

Period of the function f(x)=cos(cos pi x)+e^({4x}), where {.} denotes the fractional part of x, is