Use the function `f(x)=x^(1/x),x >0,` to determine the bigger of the two numbers `e^(pi)a n dpi^edot`

The function f(x)=2sin x-e^(x), AA x in [0, pi] has

The function f(x)=(ln(pi+x))/(ln(e+x)) is

The function f(x)=(log(pi+x))/(log(e+x)) s is

The function f(x)=(log(pi+x))/(log(e+x)) s is

For the functions f(x)= int_(0)^(x) (sin t)/t dt where x gt 0 . At x=n pi f(x) attains

The function f(x)= xcos(1/x^2) for x != 0, f(0) =1 then at x = 0, f(x) is

Consider the function f(x)={{:(xsin(pi)/(x),"for"xgt0),(0,"for"x=0):} Then, the number of points in (0,1) where the derivative f'(x) vanishes is

Determine whether function, f(x)=(-1)^([x]) is even, odd or neither of two (where [*] denotes the greatest integer function).

If the function f(x) = (x(e^(sinx) -1))/( 1 - cos x ) is continuous at x =0 then f(0)=

Which of the following function is/are periodic? (a)f(x)={1,x is rational 0,x is irrational (b)f(x)={x-[x];2n