Determine the smallest postive value of x which satisfies the equation `sqrt(1 + sin 2 x) - sqrt( 2) cos 3 x = 0 `

The smallest positive values of x and y which satisfy tan (x-y)=1, sec (x+y)=2//sqrt(3) are

The number of values of x in [0, 2 pi] satisfying the equation |cos x - sin x | ge sqrt(2) , is

The smallest positive value of x (in radians ) satisfying the equation log_(cos x) ((sqrt(3))/(2) sin x) = 2 + log _(sec x) tan x)

Solve sin x + cos x - 2sqrt(2) sin x cos x = 0

The equation sqrt(3)sin x + cos x = 4 has

Solve sin x + sqrt(3) cos x = sqrt(2) .

Smallest positive root of the equaiton sqrt(sin ( 1- x)) = sqrt( cos x )

The smallest positive real value of p for which the equation cos (p sin x) = sin (p cos x) has a solution where x in [0, 2pi] is