If `f(x) = (tan(pi/4-x))/(cot2x), x != pi/4`, is continuous in `(0, pi/2)`, then `f((pi)/(4))` is equal to

Find the value of 'a' so that If f(x) = (1 - tanx)/(4x -pi) , x ne (pi)/(4) , is continuous on (0, (pi)/(2)), " find f " ((pi)/(4)) .

f(x) = (cos x - sinx)/(cos (2x)) , x ne (pi)/(4) is continuous on [ 0, (pi)/(2)] " then " f((pi)/(4)) =

If f(x)-[tan x]*x in(0,(pi)/(3)), then f'((pi)/(4)) is equal to

Value of f (pi/4) so that the function f(x) = (tan(pi/4-x))/(cot 2x), x != pi/4 is continuous everywhere is

Let f(x) = (tan (pi//4-x))/(cot 2x)"for x" ne pi//4 , then for f to be continuous at x = pi//4, f(pi//4) must be equal to :

Let f(x) = (1-tanx)/(4x-pi), x != (pi)/4, x in [0,(pi)/2] . If f(x) is continuous in [0,(pi)/2] , then f((pi)/(4)) is

Let f(x) = (1-tanx)/(4x-pi), x != (pi)/4, x in [0,(pi)/2] . If f(x) is continuous in [0,(pi)/2] , then f((pi)/(4)) is

Let f(x) = (1-tanx)/(4x-pi),x ne (pi)/(4), x in [0, (pi)/(2)] , if f(x) is continuous in [0, (pi)/(4)] , then f((pi)/(4)) is :