f(x)={[(x^(2)-9)/(x-3),,x!=3],[k,,quad x=3]

Determine the value of k for which the following function is continuous at x=3.f(x)={(x^(2)-9)/(x-3),quad x!=3k,quad x=3

Determine the value of k for which the following function is continuous at x=3.f(x)={(x^(2)-9)/(x-3),x!=3 and k when x=3

Determine the value of k for which the following function is continuous at x=3. f(x)={(x^2-9)/(x-3) , x!=3 and k when x=3

If f(x) = {((x^2-9)/(x-3),,x,ne,3),(m,,x,=,3):} is continuous at x = 3 , then value of m is :

Determine the constant k, so that the function f(x) = {{:((x^2- 9)/(x -3)"," ,x != 3),(k",", x = 3):} is continuous at x=3.

Determine the value of k for which the following function is continuous at x=3. f(x)={(x^2-9)/(x-3),\ \ \ x!=3 ,\ \ \f(x)=k, x=3

If f(x) is continuous at x=3 , where f(x)={:{((x^(2)-9)/(x-3),", for"x!=3),(2x+k,", otherwise"):} , then k=

Find k, if f(x) = [(x^2-9) , x!=3] , [k , x=3]] is continuous at x=3,

f(x)={{:((x^(2)-9)/(x-3)",when "xne3),(k", when "x=3):} at x = 3

If f(x) = {((x^(2)-9)/(x-3),",", "if"x != 3),(2x+k,",", "otherwise"):} , is continuous at x = 3, then k =