If the shortest distance between `2y^(2)-2x+1=0` and `2x^(2)-2y+1=0` is d then the number of solution of `|sin alpha|=2sqrt2 d(alpha in [-pi, 2pi])` is.

find the number of solution of sin^(2) x-sin x-1=0 in [-2pi, 2pi] .

Find the number of solutions of sin^(2)x-sin x-1=0 in [-2 pi,2 pi]

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

Let alpha be a solution of tan x+sin2x=sec x and alpha in[-2 pi,2 pi] ,then

If the shortest distance between the lines (x-1)/(alpha)=(y+1)/(-1)=(z)/(1) and x+y+z+1=0=2x-y+z+3 is (1)/(sqrt(3)) then value of alpha

The value of int_(0)^((pi)/(2))sin|2x-alpha|dx, where alpha in[0,pi], is

Statement -1 the solution of the equation (sin x)/(cos x + cos 2x)=0 is x=n pi, n in I Statement -2 : The solution of the equation sin x = sin alpha , alpha in [(-pi)/(2),(pi)/(2)] x={npi+(-1)^(n)alpha,n in I}

If (pi)/(2)

Find the shortest distance between the lines (x-2)/(-1)=(y-5)/2=(z-0)/3\ a n d\ (x-0)/2=(y+1)/(-1)=(z-1)/2dot