The function `f(x) = sin|x|` is

The function f(x) = (1-sin x + cos x)/(1+sin x + cosx) is not defined at x = pi . The value of f(pi) , so that f(x) is continuous at x = pi is

The function f(x)=x+sinx has

The function f(x)= sin | log (x+ sqrt(x^(2) +1)) | is-

The function f(x)=sin^4x +cos ^4 x increases if

The function f(x) = |x| + (|x|)/x is

Verify Rolle's theorem for the following functions: f(x) = sin x + cos x +5 , x in [0, pi ]

Check the validity of the Rolle's theorem for the following functions: f(x) = sin x -cos x +3, x in [0, 2pi]

If the function f(x) = {(1+sin((pi x)/2),",","for"-oo lt x le 1),(ax+b, ",","for" 1 lt x lt 3),(6tan((pi x)/12),",","for"3 le x lt 6):} is continuous in the interval (-oo, 6) , then the value of a and b are respectively