Consider the function defined on `[0,1] -> R, f(x) = (sinx - x cosx)/x^2 and f(0) = 0`, then the function f(x)-(A) has a removable discontinuity at x = 0(B) has a non removable finite discontinuity at x = 0(C) has a non removable infinite discontinuity at x = 0(D) is continuous at x = 0

If the function f(x)=(1)/(In|x|) has irremovable discontinuity at x=a&b and removable discontinuityat x=c, then find a^(2)+b^(2)+c^(2)

Function f(x)=x-|x| is discontinuous at x=0

A function f is said to be removable discontinuity at x = 0, if lim_(x to 0)f(x) exists and

If the function f(x) defined as : f(x)=(x^(4)-64x)/(sqrt(x^(2)+9)-5), for x!=4 and =3, for x=4 show that f(x) has a removable discontinuity at x=4

Which of the following function(s) not defined at x =0 has / have removable discontinuity at x = 0 ?

which of the following function(s) not defined at x=0 has/have removable discontinuity at x = 0 .

which of the following function(s) not defined at x=0 has/have removable discontinuity at x = 0 .

which of the following function(s) not defined at x=0 has/have removable discontinuity at x=0

Show the function, f(x)={((e^(1//x)-1)/(e^(1//x)+1), "when x" le 0),(0, "when x"=0):} has non-removable discontinuity at x=0

Let f(x) =x[1/x]+x[x] if x!=0 ; 0 if x =0 where[x] denotes the greatest integer function. then the correct statements are (A) Limit exists for x=-1 (B) f(x) has removable discontinuity at x =1 (C) f(x) has non removable discontinuity at x =2 (D) f(x) is non removable discontinuous at all positive integers