If the function `f(x)=(2x-sin^(-1)x)/(2x+tan^(-1)x)` is continuous at each point in its domain, then what is the value of f(0)?

If the function f(x)=(2x-sin^(-1)x)/(2x+tan^(-1)x) is continuous at each point of its domain,then the value of f(0)(A)(4)/(3)(B)(1)/(3)(C)-(1)/(3)(D)(2)/(3)

The function f(x) = (|x+2|)/(tan^(-1)(x+2)) , is continuous for

Domain of the function f(x)=sin^(-1)(1+3x+2x^(2))

If the function f(x) = (1-x) tan ""(pix)/2 is continuous at x =1 then f (1) =

If the function f(x) = ( cos ( sin x ) - cos x )/( x^(4)) is continuous at each point in its domain and f(0) = ( 1)/( K ) , then k is "_______________" .

If the function f(x)=((1-x))/(2)tan.(pix)/(2) is continuous at x = 1, then f(1) is equal to