Let f(x)=2sinx+tax-3x
Statement-1: f(x) does not attain extreme in `(-pi//2,pi//2)`
Statement-2 : f(x) is strictly increasing on `(-pi//2,pi//2)`

Prove that the function f(x)=cos x is strictly increasing in (pi,2 pi)

Statement-2 f(x)=(sin x)/(x) lt 1 for lt x lt pi/2 Statement -2 f(x)=(sin x)/(x) is decreasing function on (0,pi//2)

Let f(x)=|x|+|sin x|, x in (-pi//2,pi//2). Then, f is

Show that f(x) = (x)/(sinx) is increasing on [0, (pi)/(2)]

Statement-1: f(x ) = log_( cosx)sinx is well defined in (0,pi/2) . and Statement:2 sinx and cosx are positive in (0,pi/2)

Let f(x)=|x|+|sinx|, x in (-pi/ 2,3pi/2). Then , f is

Statement 1: For f(x)=sin x,f'(pi)=f'(3 pi). Statement 2: For f(x)=sin x,f(pi)=f(3 pi)

Prove the following f(x)=tan^(-1)(sinx+cosx) is strictly decreasing function on ((pi)/(4),(pi)/(2)) .

Statement 1: Let f(x)=sin(cos x) in [0,(pi)/(2)]* Then f(x) is decreasing in [0,(pi)/(2)] Statement 2:cos x is a decreasing function AA x in[0,(pi)/(2)]

which of the following statement is // are true ? (i) f(x) =sin x is increasing in interval [(-pi)/(2),(pi)/(2)] (ii) f(x) = sin x is increasing at all point of the interval [(-pi)/(2),(pi)/(2)] (3) f(x) = sin x is increasing in interval ((-pi)/(2),(pi)/(2)) UU ((3pi)/(2),(5pi)/(2)) (4) f(x)=sin x is increasing at all point of the interval ((-pi)/(2),(pi)/(2)) UU ((3pi)/(2),(5pi)/(2)) (5) f(x) = sin x is increasing in intervals [(-pi)/(2),(pi)/(2)]& [(3pi)/(2),(5pi)/(2)]