Let `g(x)=sqrt(x-2k), AA 2k le x lt 2(k+1)` where, `k in l` , then

Let g(x)=sqrt(x-2k),AA2k<=x<2(k+1) where k in integer.Check whether g(x) is periodic or not.

If f(x) = {((sqrt(1+kx)-sqrt(1-kx))/(x), "if" -1 le x lt 0),((2x+k)/(x-1), "if" 0 le x le1):} is continuous at x = 0, then the value of k is

If the function g (x ) = {{:( k sqrt (x + 1)",", 0 le x le 3),( mx + 2 "," , 3 lt x le 5):} is differentiable, then the value of k + m is :

If f(x) is continuous in [0, 3], where f(x)={:{(3x-4", for " 0 le x le 2),(2x+k", for " 2 lt x le 3):} , then k=

Consider f(x)= minimum (x+2, sqrt(4-x)), AA x le 4 . If the area bounded by y=f(x) and the x - axis is (22)/(k) square units, then the value of k is

Let f(x)=4x^(2)-2x+k, where k in R If both roots of tho equation f(x)=0 lie in (-1,1) then k can be equal to

If f(x) {:(=3x-4", if " 0 le x le 2 ),(= 2x + k ", if "2lt x le 3 ):} is continuous x = 2 , then k = ……