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

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

The solution of the equation "log"_("cos"x) "sin" x + "log"_("sin"x) "cos" x = 2 is given by

The solution of the equation log _( cosx ^(2)) (3-2x) lt log _( cos x ^(2)) (2x -1) is:

The solution set of the inequation log_(1//3)(x^(2)+x+1)+1 gt 0 , is

The solution set of the inequation |(2x-1)/(x-1)| gt 2 , is

The solution of the inequality x log_((1)/(10)) (x^(2) + x + 1) gt 0 is given by