Show `f(x) = (1)/(|x|)` has discontinuity of second kind at x = 0.

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x) . Then, The points of discontinuity of g(x) is

f(x)= (1)/((x-1) (x-2)) and g(x)= (1)/(x^(2)) . Find the points of discontinuity of the composite function f(g(x))?

If the function f(x)= (1)/(x+2) , then find the points of discontinuity of the composite function y= f {f(x)}

If function f(x) = (sqrt(1+x) - root(3)(1+x))/(x) is continuous function at x = 0, then f(0) is equal to

The function f(x)= cot x is discontinuous on the set

A function f(x) is defined by, f(x) = {{:(([x^(2)]-1)/(x^(2)-1)",","for",x^(2) ne 1),(0",","for",x^(2) = 1):} Discuss the continuity of f(x) at x = 1.

f(x)= {((1)/(e^(4x) + 1)",",x ne 0),(0",",x = 0):} Examine the continuity of f(x) at x= 0

Show that f(x)= {(x^(3)+3",",x ne0),(1",",x=0):} is a discontinuous function at x= 0.

Find all the points of discontinuity of the function f defined by f(x)= {(x+2",",if x lt 1),(0, if x =1),(x-2",", if xgt 1):}

Draw the graph of the function f(x) = x - |x - x^(2)|, -1 le x le 1 and discuss the continuity or discontinuity of f in the interval -1 le x le 1