The function `f(x)=(1-sinx+cosx)/(1+sinx+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)=(1-sinx+cosx)/(1+sinx+cosx) is nto defined at x=pi . The value of f(pi) so that f(x) is continuous at x=pi 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) = (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)=(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

f(x)= (1-sinx+cosx)/(1+sinx+cosx) discontinuous at x=pi . Find f(pi) so that f(x) is continuous x=pi

If f(x)=(1+sinx-cosx)/(1-sinx-cosx), x ne 0 . The value of f(0) so that f is a continuous function is

If f(x)=(sqrt(2)cosx-1)/(cotx-1),x!=pi/4dot Find the value of f(pi/4) so that f(x) becomes continuous at x=pi/4dot

If f(x)=(sqrt(2)cosx-1)/(cotx-1) , x!=pi/4 . Find the value of f(pi/4) so that f(x) becomes continuous at x=pi//4 .

The function f(x) =(1-sinx)/((pi-2x)^(2)) is underfined at x=(pi)/(2) .Redefine the function f(x) so as to make it continuous at x=(pi)/(2) .