The number of values of x in the interval `[0, 3pi]` satisfying the equation `2sin^2x + 5sin x- 3 = 0` is

The number of values of y in [-2pi,2pi] satisfying the equation abs(sin2x)+abs(cos2x)=abs(siny) is

The solution of the equation sin 2x + sin 4x = 2 sin 3x is

The number of value of alpha in the interval [-pi,0] satisfying sin alpha +int_(alpha )^(2alpha) cos 2 x dx =0 , then

sin x + sin 3x + sin 5x =0

If 0 le x le 2pi , then the number of real values of x, which satisfy the equation cos x + cos 2x + cos 3x + cos 4x=0 , is

The total number of solutions of cos x= sqrt(1- sin 2x) in [0, 2pi] is equal to

At what points in the interval [0, 2pi] , does the function sin (2x) attain its maximum value ?

For x in (0,pi) the equation sinx+2sin2x-sin3x=3 has

The value of y which will satisfy the equations 2x^(2)+6x +5y +1 = 0 and 2x +y +3 = 0 may be found by solving:-

Let x, y, z be elements from interval [0,2pi] satisfying the inequality (4+ sin 4 x )(2+ cot^(2) y)(1+ sin^(4) z) le 12 sin^(2) z , then