(b) Find the value of K so that the function `f(x)=[(Kx+1),(3x-5),if xle5,ifxgt5] atx=5` is a continuous function.

Find the value of K so that the function f(x) = {{:(kx+1,"if"x le 5),(3x-5,"if"x ge5):} at x=5 is a continuous function.

Find the value of k so that the function: f(x) = [{:(kx + 1, if x le 5),(3x-5, if x gt 5):}] at x=5 is a continous function:

Find the value of k , so that the function f(x) = {(kx^2 + 5, if x le 1), (2, if x gt 1):} is continuous at x = 1

Find the value of k, so that the function f(x) = {(kx^2 + 5, if x le 1), (2, if x gt 1):} is continuous at x = 1

Find the value of k, so that the function f(x) = {(kx^2 + 5, if x le 1), (2, if x gt 1):} is continuous at x = 1

Find the value of k, so that the function f(x) = {(kx^2 + 5, if x le 1), (2, if x gt 1):} is continuous at x = 1

Find the value of k for which the function f(x)={{:(3x-8, if x le 5),(2k, if x gt 5) :} is continuous at x = 5

Find the values of k so that the function f, defined by f(x)={(kx+1,"if",xle5),(3x-5,"if",xgt5):} is continuous at x=5.

The value of k, so that the function f(x)={:{(kx)-5k, xle2),(3,xgt2):} is continuous at x = 2, is:

Find the value of k so that the function f(x) = {:{(kx + 5, x le 2),(x-1,x>2):} may be continuous.