A function f(x) is defined as follows :
f(x)`={{:(x^(2)-2x+3",","for" x lt 1),(2",","for " x=1),(2x^(2)-5x+5",", "for" x gt 1):}`
Examine the continuity of f(x) at x=1.

A function f(x) is defined as follows for real x f(x)={{:(1-x^(2),", for x"lt1),(" 0",", for x = 1"),(1+x^(2),", for x"gt1):} Then

A function f (x) is defined as follows : f(x)={{:(2-x",","when "xlt1),(x^(2)-3x",","when "xge1):} Examine the differentiability of the function f (x) at x= 1 , hence state whether f (x) is continuous at x = 1 or not .

Given {:(f(x)=x^(2)-2x+3," ""when "xlt1),(=2," ""when "x=1),(=2x^(2)-5x+5," ""when "x gt1):} Examine the differentiability of the function at x = 1 .

A function f (x) is defined as follows : f(x)={{:(3x+1,"for "xle1 ),(3-ax^(2),"for " xgt1):} If f (x) is continuous at x = 1 , find the value of a.

A function f (x) is defined as follows : f(x)={{:(5+2x,"when " -(5)/(2)ltxle0),(5-2x,"when "0ltxlt(5)/(2)):} Examine the continuity and differentiability of f (x) at x= 0

A function f(x) is defined as follows : " "f(x)={:{(x-1",","when "x gt 0),(-(1)/(2)",","when "x = 0),( x+1",","when "xlt0):} Draw the graph of the function f(x). From the graph find the value of f(x) at x=-(1)/(2) and examine whether f(x) is continuous at x = 0.

A function f (x) is defined as follows: f(x)={{:(x^(4)-3,"when " xle2),(x^(3)+5,"when "xgt2):} Prove that the function f (x) is continuous at x = 2 .

A continuous function f(x) is defined as follows : f(x)={{:(x,"when "xlt1),(ax+bx^(2),"when "1lexle2),(2x^(2),"when "xgt2):} Find the values of a and b.

A function f(x) is defined as follows : f(x)=x," when "x lt1 =x+1," when "x gt1 =3/2," when "x=1 Draw the graph of f(x) and examine its continuity at x=(1)/(2)and x=1.

A function f (x) is defined as follwos : f(x){:(=2x+1," when "xle 1),(= 3-x," when "xgt1):} Examine whether underset(xrarr1)"lim"f(x) exists or not.