`bb"Statement I"` The period of `f(x)=2cos""1/3(x-pi)+4sin""1/3(x-pi) " is " 3pi`.
`bb"Statement II"` If T is the period of f(x), then the period of f(ax+b) is `T/abs(a)`.

Find the period of f(x)=cos^(-1)(cos x)

The period of f(x)=cos(abs(sinx)-abs(cosx)) is

Period of f(x) = sin^4 x + cos^4 x

Find period of f(x)=tan3x+sin(x/3) .

bb"Statement I" The range of log(1/(1+x^(2))) " is " (-infty,infty) . bb"Statement II" " when " 0 lt x le 1, log x in (-infty,0].

The period of the function f(x) = cos 4x + tan 3x is :

bb"Statement I" The range of f(x)=sin(pi/5+x)-sin(pi/5-x)-sin((2pi)/5+x)+sin((2pi)/5-x) is [-1,1]. bb"Statement II " cos""pi/5-cos""(2pi)/5=1/2

bb"Statement I" The function f(x) =xsinx and f'(x)=xcosx+sinx are both non-periodic. bb"Statement II" The derivative of differentiable functions (non-periodic) is non-periodic function.

Consider two functions f(x)=1+e^(cot^(2)x) " and " g(x)=sqrt(2abs(sinx)-1)+(1-cos2x)/(1+sin^(4)x). bb"Statement I" The solutions of the equation f(x)=g(x) is given by x=(2n+1)pi/2, forall "n" in I. bb"Statement II" If f(x) ge k " and " g(x) le k (where k in R), then solutions of the equation f(x)=g(x) is the solution corresponding to the equation f(x)=k.

bb"Statement I" The equation f(x)=4x^(5)+20x-9=0 has only one real root. bb"Statement II" f'(x)=20x^(4)+20=0 has no real root.