The function `f: R-{0} -> R` given by `f(x)=1/x-2/[e^(2x)-1]` can be made continuous at x=0 by defining f(0) as

The function f:R-{0}rarr R given by f(x)=(1)/(x)-(2)/(e^(2)x-1) can be made continuous at x=0 by defining f(0) as

If the function f:R backslash{0}rarr given by f(x)=(1)/(x)-(2)/(e^(2x)-1) is continuous at x=0 then find the value of f(0)

The function f:R rarr R defined as f(x)=(x^(2)-x+1)/(x^(2)+x+1) is

If the function f defined as f(x)=(1)/(x)-(k-1)/(e^(2x)-1),x!=0, is continuous at x=0, then the ordered pair (k,f(0)) is equal to:

The value of f (0), such that f( x) =( 1)/(x^(2)) ( 1 -cos( sin x )) can be made continuous at x=0 , is

If the function f(x) = (x(e^(sinx) -1))/( 1 - cos x ) is continuous at x =0 then f(0)=