The range of y such that the equation of `x,y+cos x=sin x` has a real solutiions is

The range of y such that the equation in x , y cos x = sin x has a real solution is

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

The range of alpha for which the equation sin^(4)x+cos^(4)x+sin2x+alpha=0 has solution

The solution of (dy)/(dx) + y cos x = sin x cos x is

The range of cos^(2) x + sin^(4) x is

Form the differential equation by eliminating the arbitrary constant from the equation y = a cos x + b sin x + x sin x

If the equation sin x(sin x + cos x)=k has real solutions then k may lie in the interval

If y _(k) is the kth derivative of y with respect to x,y= cos (sin x) then y _(1) sin x + y_(2) cos x =