The number of distinct solutions of the equation `[log_((1)/(2))|sin x|=2-log_((1)/(2))|cos x|` in the interval `"[0,2 pi]"` is

The solution of the inequality log_((1)/(2))sin^(-1)x>log_((1)/(2))cos^(-1)x is

The number of solution of the equation log(-2x)= 2 log(x+1) are

The number of distinct solutions of the equation (5)/(4)cos^(2)2x+cos^(4)x+sin^(4)x+cos^(6)x+sin^(6)x=2 in the interval [0,2 pi] is

The solution of the inequality log_(1/2)sin x>log_(1/2)cos x is

The number of distinct solutions of the equation (5)/(4)cos^(2)2x+cos^(4)x+sin^(4)x+cos^(6)x+sin^(6)x=2 in the intervel [0,2 pi] is

The number of solutions of the equation log_(3)(3+sqrt(x))+log_(3)(1+x^(2))=0 , is

The number of solutions of the equation (log_(2)cos theta)^(2)+log.(4)/(cos theta) (16 cos theta)=2 in the interval [0, 2pi) is

Number of values of x satisfying the equation log_(2)(sin x)+log_((1)/(2))(-cos x)=0 in the interval (-pi,pi), is equal to -

The number of solutions to the equations cos^(4)x+(1)/(cos^(2)x)=sin^(4)x+(1)/(sin^(2)x) in the interval [0,2pi] is