Find the value of k for which the function `f(x)={k x+5, if\ x\ lt=2x-1, if\ x >2}\ ` is continuous at `x=2`

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 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

Determine the value of the constant k so that the function f(x)={k x^2,\ \ \ if\ xlt=2 3,\ \ \ if\ x >2 is continuous at x=2 .

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

Find the value of ' a ' if the function f(x) defined by f(x)={2x-1,\ \ \ x 2 is continuous at x=2

Find the value of k, such that the function f(x) = {(k(x^2-2x), if x = 0):} at x=0 is continuous.

If the function f(x)={{:(k +x, "for " x lt1),(4x+3, "for " x ge1):} is continuous at x=1 then k=