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

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)_(1/2sin^(-1)x >(log)_(1//2)cos^(-1)x is x in [(0,1)/(sqrt(2))] (b) x in [1/(sqrt(2)),1] x in ((0,1)/(sqrt(2))) (d) none of these

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

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

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

The solution set of inequality log_(1/2) sin^-1 x gt log_(1/2) cos^-1 x

The solution of the inequality "log"_(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