Consider the function `f(x) = {{:(2, x le 0),(2, x gt 0):} ` Find `lim_(x->2)`

If the function f (x) = {{:(3,x lt 0),(12, x gt 0):} then lim_(x to 0) f (x) =

Consider the function : f(x)={{:(x+2",", x ne 1), (0",", x =1.):} To find lim_(x to 1)f(x) .

Consider the functions f(x)={(x+1",",x le 1),(2x+1",",1lt x le 2):} and g(x)={(x^(2)",", -1 le x lt2),(x+2",",2le x le 3):} The domain of the function f(g(x)) is

Consider the functions f(x)={(x+1",",x le 1),(2x+1",",1lt x le 2):} and g(x)={(x^(2)",", -1 le x lt2),(x+2",",2le x le 3):} The range of the function f(g(x)) is

Discuss the continuity of the function = f(x) ={(3-x", "x le 0),(x", "x gt 0):} at x=0.

Consider the function f(x)=1/x^(2) for x gt 0 . To find lim_(x to 0) f(x) .

Consider the function : " "f(x)={{:(x-2",", x lt 0), (" 0,", x=0), (x+2",", x gt 0.):} To find lim_(x to 0) f(x) .

Consider the following in respect of the function f(x)={{:(2+x","xge0),(2-x","xlt0):} 1. lim_(x to 1) f(x) does not exist. 2. f(x) is differentiable at x=0 3. f(x) is continuous at x=0 Which of the above statements is /aer correct?