If f(x)=`(tan(pi/4-x))/(cot2x) ` for `x!=pi/4,` find the value of which can be assigned to f(x) at `x=pi/4` so that the function f(x) becomes continuous every where in `[0,pi/2]`

If f(x)=(tan((pi)/(4)-x))/(cot2x) for x!=(pi)/(4), find the value which can be assigned to f(x) at x=(pi)/(4) so that the function f(x) becomes continuous every where in [0,(pi)/(2)]

If f(x)=(tan(pi/4-x))/(cot2x) for x!=pi/4, find the value which can be assigned to f(x) at x=pi/4 so that the function f(x) becomes continuous every where in [0,pi/2]dot

If f(x)=(tan(pi/4-x))/(cot2x) for x!=pi/4, find the value which can be assigned to f(x) at x=pi/4 so that the function f(x) becomes continuous every where in [0,pi/2]dot

Let f(x)=(tan(pi/4-x))/(cot2x),x!=pi/4 . The value which should be assigned to f(x) at x=pi/4, so that it is continuous everywhere is (a) 1 (b) 1/2 (c) 2 (d) none of these

Let f(x)=(tan(pi/4-x))/(cot2x),x!=pi/4 . The value which should be assigned to f(x) at x=pi/4, so that it is continuous everywhere is (a) 1 (b) 1/2 (c) 2 (d) none of these

Let f(x)=(tan(pi/4-x))/(cot2x),x!=pi/4 . The value which should be assigned to f(x) at x=pi/4, so that it is continuous everywhere is 1 (b) 1/2 (c) 2 (d) none of these

Let f(x) = (tan ((pi)/(4) - x))/(cot 2 x), x ne pi//4 , the value which should be assigned to f at x = pi//4 , so that it is continuous everywhere is :

If f(x)=tan (pi//4 -x)//cot2x for x ne pi//4 . The value of f(pi//4) so that f is continuous at x=pi//4 is

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