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

If f(x)={{:(,x[x], 0 le x lt 2),(,(x-1)[x], 2 le x lt 3):} where [.] denotes the greatest integer function, then (x) is continuous at x=2

Let f_k(x) = 1/k(sin^k x + cos^k x) where x in RR and k gt= 1. Then f_4(x) - f_6(x) equals

A particle free to move along the (x - axis) hsd potential energy given by U(x)= k[1 - exp(-x^2)] for -o o le x le + o o , where (k) is a positive constant of appropriate dimensions. Then.

Examine the differentiability of f, where f is defined by f(x) = {(x.[x]",","if " 0 le x lt 2),((x-1)x,"if " 2 le x lt 3):} at x= 2

Let f(x) be a periodic function with period 3 and f(-2/3)=7 and g(x) = int_0^x f(t+n) dt .where n=3k, k in N . Then g'(7/3) =

Find the values of k so that the function f is continuous at the indicated point f(x) = {((sqrt(1+ kx)-sqrt(1-kx))/(x)",","if " -1 le x lt 0),((2x+1)/(x-1)",","if " 0 le x lt 1):} at x= 0

A random variable X takes the values 0,1,2,3,..., with probability P(X=x)=k(x+1)((1)/(5))^x , where k is a constant, then P(X=0) is.

Let f(x) = {{:(sgn(x)+x",",-oo lt x lt 0),(-1+sin x",",0 le x le pi//2),(cos x",",pi//2 le x lt oo):} , then number of points, where f(x) is not differentiable, is/are