If `f(x) ={(|x+2|)/tan^-1(x+2), x != -2 and 2, x=-2` then `f(x)` is continuous/discontinuous at `x=-2` ?

If f(x)={(|x+2|)/(tan^(-1)(x+2)),x!=-2 and 2,x=-2 then f(x) is continuoustdiscontinuous at x=-2?

If f(x)={(|x+2|)/(tan^(-1)(x+2)), x!=-2 2, x=-2 , then f(x) is continuous at x=-2 (b) not continuous at x=-2 (c) differentiable at x=-2 (d) continuous but not derivative at x=-2

If f(x)={{:(,(|x+2|)/(tan^(-1)(x+2)),x ne -2),(,2, x=-2):} , then f(x) is

If f(x)={{:(,(|x+2|)/(tan^(-1)(x+2)),x ne -2),(,2, x=-2):} , then f(x) is

If f(x)=(Tan^(-1)(x+2))/(|x+2|), x ne -2 and f(-2)=2"then "

If f(x) = sqrt((1)/(tan^(-1)(x^(2)-4x + 3))) , then f(x) is continuous for

If f(x) = sqrt((1)/(tan^(-1)(x^(2)-4x + 3))) , then f(x) is continuous for

If f(x) = sqrt((1)/(tan^(-1)(x^(2)-4x + 3))) , then f(x) is continuous for

Is f(x) = x^2 continuous at x=2 ?

3.A function f(x) is defined as follows: f(x)={3+2x-(3)/(2) =(3)/(2) Show that f(x) is continuous at x=0 and discontinuous at x=3/2