What is value of `(cos x)^(1/x)` at `x=0` so that it becomes continuous at `x=0`

Let f(x)=(log(1+x/a)-log(1-x/b))/x ,x!=0. Find the value of f at x=0 so that f becomes continuous at x=0

if f(x)=x^2sin(1/x) , x!=0 then the value of the function f at x=0 so that the function is continuous at x=0

if f(x)=x^2sin(1/x) , x!=0 then the value of the function f at x=0 so that the function is continuous at x=0

Let f(x)=(log(1+(x)/(a))-log(1-(x)/(b)))/(x),x!=0 Find the value of f at x=0 so that f becomes continuous at x=0 .

Let f(x)=(log(1+x/a)-log(1-x/b))/x ,\ \ x!=0 . Find the value of f at x=0 so that f becomes continuous at x=0 .

Let f(x)=(log(1+x/a)-log(1-x/b))/x ,\ \ x!=0 . Find the value of f at x=0 so that f becomes continuous at x=0 .

If f(x)=x^(2)"sin"(1)/(x) , where xne0 then the value of the function f at x=0, so that the function is continuous at x=0, is

Let f(x)=(log(1+(x)/(a))-log(1-(x)/(b)))/(x),x!=0 Find the value of f at x=0 so that f becomes continuous at x=0,x!=0

If f(x)=x sin ((1)/(x)),x ne 0 then the value of the function at x=0, so that the function is continuous at x=0 is

If f(x) = x . (sin)1/x, x ne 0 , then the value of the function at x = 0, so that the function is continuous at x = 0 is