The function `f(x) = (x-1)^(1/((2-x))` is not defined at x = 2. The value of f(2) so that f is continuous at x = 2 is

The function f(x)=(sinx)^(tan^(2)x) is not defined at x=(pi)/(2) . The value of f((pi)/(2)) such that f is continuous at x=(pi)/(2) is

The function f(x)=(sin 2x)^(tan^(2)2x) is not defined at x=(pi)/(4) . The value of f(pi//4) , so that f is continuous at x=pi//4 , is

The function f(x) = (1-sin x + cos x)/(1+sin x + cosx) is not defined at x = pi . The value of f(pi) , so that f(x) is continuous at x = pi is

The function f(x) = (x^(3)+x^(2)-16x+20)/(x-2) is not defined at x = 2. In order to make f(x) continuous at x = 2 , the value of f(2) should be defined as

The function f(x)=(x^2-1)/(x^3-1) is not defined for x=1. The value of f(1) so that the function extended by this value is continuous is

Value of f(-2) so that f(x)= (x^(3)+8)/(x+2) is continuous at x = -2 is

Let f(x)={(log(1+x)^(1+x)-x)/(x^(2))}. Then find the value of f(0) so that the function f is continuous at x=0.