Let `f(x)={{:(2x+1,"when "xlt2),(k+2,"when "x=2),(4x-3,"when "xgt2):}` Find the value of k for which f (x) is continuous at x = 2 .

Define the continuity of a function at a point within its domain of definition. The definition of a function is given below: f(x)={{:((1-cos5x)/(x^(2))," when "(xne0)),(k," when x = 0"):} Find the value of k for which f(x) is continuous at x = 0.

f(x)={:{(x^2,"when "x lt0),(x,"when "0 lexlt1),(1/x,"when "x ge1):} Value of f(1/2) is____

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

f(x)={:{(x^2,"when "x lt0),(x,"when "0 lexlt1),(1/x,"when "x ge1):} Value of f(-2) is______

The function f(x)=x^(k) is continuous at x = k when -

The definition of the function f (x) is given below: f(x)={{:((1)/(2)-x,"when "xlt3 ),(1,"when " x=3),(x-(1)/(2),"when " xgt3):} Calculate f (3-0), f(3+0),f(3) and state whether f (x) is continuous at x =3 or not.

A function f (x) is defined as follows: f(x)={{:(x+2,"when "xlt2),(x^(2)-1,"when "xge2):} Show that f (x) is discontinuous at x = 2 and the jump of the function at this point is -1 .

Let f(x)={{:(x^(3)-3x+2,"where "xlt2),(x^(3)-6x^(2)+9x+2,"where "xge2):} . Then-

Find the value of f (0) for which f(x)=(64(sqrt(x+4)-2))/(sin2x) continuous .