The complete set of values of x satisfying the inequality `sin^(-1)(sin 5) gt x^(2)-4x` is `(2-sqrt(lambda-2pi), 2+sqrt(lambda-2pi))`, then `lambda=`

The complete set of values of x, x in (-(pi)/(2), pi) satisfying the inequality cos 2x gt |sin x| is :

The set of values of x in (-pi, pi) satisfying the inequation |4"sin" x-1| lt sqrt(5) , is

Set of values of x lying in [0, 2pi] satisfying the inequality |sin x | gt 2 sin^(2) x contains

If the maximum value of x which satisfies the inequality sin^(-1)(sinx) ge cos^(-1)(sinx)" for "x in (pi)/(2), 2pi" is " lambda, then (2lambda)/(3) is equal to (take pi=3.14 )

The number of values of x in [0, 4 pi] satisfying the inequation |sqrt(3)"cos" x - "sin"x|ge2 , is

The minimum value of x which satisfies the inequality sin^(-1)x ge cos^(-1)x is lambda , then the value of 2lambda is (use sqrt2=1.41 )

The solution set of x in(-pi,pi) for the inequality sin 2x+1 le cosx+2sin x is

The value of x in (0,(pi)/(2)) satisfying the equation,(sqrt(3)-1)/(sin x)+(sqrt(3)+1)/(cos x)=4sqrt(2) is

The number of integral values of X in the interval [0,pi] satisfying the inequality 2sin^(2)2x-3sin2x+1<0

The set of all x in (-pi,pi) satisfying |4 sin x-1| lt sqrt(5) is given by