At x = `(5pi)/(6),` f(x)= 2sin 3x+3 cos 3x is

At x=(5 pi)/(6),f(x)=2sin3x+3cos3x is

At x=(5pi)/6, f(x)=2sin3x+3cos3x is (a) 0 (b) maximum (c) minimum (d) none of these

At x= (5pi)/(6), the value of 2 sin 3x+ 3 cos 3x is

At x=5(pi)/(6) then the value of 2sin x+3cos3x is

lim_ (x rarr (pi) / (6)) (3sin x-sqrt (3) cos x) / (6x-pi)

In the interval ((pi)/(4), (11 pi)/(12)) , then function f (x) = sin 3x - cos 3x, 0 lt x lt pi is:

f:[-3 pi,2 pi]f(x)=sin3x

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)]