`f(x)=[tan(pi/4+x)]^(1/x), x!=0` and `f(x)=k, x=0` is continuous at x=0 then k=

if f(x)=(sin^(-1)x)/(x),x!=0 and f(x)=k,x=0 function continuous at x=0 then k==

If f(x)=[tan((pi)/(4)+x)]^((1)/(x)),xne0" " f(x)=k , "x=0 , " is continuous at x=0 " Then k= . . . .

If f(x) = (x-sin x)/x for x!= 0 , and f(x) = k , for x = 0 is continuous at x = 0 ,then k = ….

The function f(x)={sinx/x +cosx , x!=0 and f(x) =k at x=0 is continuous at x=0 then find the value of k

If f(x)={((1-cosx)/(x),xne0),(k, x=0):} is continuous at x=0 then k=

If f(x) = {((tan3x)/(x),,, x!=0,),(4k,,,x,=0):} is continuous at x=0' then K=

If {:(f(x),=((4x+1)/(1-4x))^(1/x),",",x != 0),(,=k, ",",x = 0):} is continuous at x = 0, then k =

If {:(f(x),=((4x+1)/(1-4x))^(1/x),",",x != 0),(,=k, ",",x = 0):} is continuous at x = 0, then k =

let f(x)=[tan((pi)/(4)+x)]^((1)/(x)),x!=0 and f(x)=k,x=0 then the value of k such that f(x) hold continuity at x=0