The range of the function `f(x) = cos[x]` where `-pi/2 lt x lt pi/2` is

I : The range of the function f(x)=cos[x]" for "-pi//2 lt x lt pi//2 is {1, cos 1, cos 2} . II. Every periodic function is one one.

The range of the function cos(pi[x]) is

The range of the function: f(x) = tan^(-1)[x], -pi/4 le x le pi/4 where [.] denotes the greatest integer function:

Statement I : The range of the function f(x)=(sin([x]pi))/(x^(2)+x+1) is {0} Statement II : The range of the function f(x)=(x-[x])/(1+x-[x]) is [0, 1/2) .

Find the domian and range of the function f (x) = (tan pi [x])/(1 + sin pi [x] + [x ^(2)])

If f: D to R be the function with domain: D={x: -pi/2 lt x lt pi/2} and f(x) = 3+4x, R being the set of all real, then which one of the following statement is correct ?

The period of the function f(x)=c^(sin^(2)x +sin^(2)(x+ pi/3) + cos x cos(x + pi/3)) is ( where c is constant)

Observe the following statements: Assertion(A) : If -(pi)/(2) lt theta lt (pi)/(2) and x=log_(e ) ((1+sin theta)/(cos theta)) then sinhx=tan theta Reason (R ) : For -(pi)/(2) lt theta lt (pi)/(2) , the value of sec theta is positive. Then the true statement among the following is