The solution of the inequality `"log"_(1//2) sin^(-1) x gt "log"_(1//2) cos^(-1) x` is

The solution of the inequality "log"_(2) sin^(-1) x gt "log"_(1//2) cos^(-1) x is

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

The solution set of the inequation "log"_(1//2) "sin" x gt "log"_(1//2) "cos" x "in" [0, 2pi] , is

The solution of the inequality log_(x)(4x^(2)-1)<2, is

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

Solve the inequality: log_(1//2)(x+1) gt log_(2)(2-x)

The solution of the inequality (log)_((1)/(2)sin^(-1)x>(log))1/x in((0,1)/(sqrt(2)))(d) none of these x in[(1)/(sqrt(2)),1]x in((0,1)/(sqrt(2)))(d) none of these