Find the set of all possible real value of a such that the inequality `(x-(a-1))(x-(a^2+2))<0` holds for all `x in (-1,3)dot`

Illustration 1.2 Find the set of all possible real values of a such that the inequality (x (a 1) (x (a2 2) 0 holds for all x E (-1,3)

The set of all possible real values of a such that the inequality (x-(a-1))(x-(a^(2)-1))<0 holds for all x in(-1,3) is (0,1) b.(oo,-1] c.(-oo,-1) d.(1,oo)

The set of all possible real values of a such that the inequality (x-(a-1))(x-(a^2-1))<0 holds for all x in (-1,3) is (0,1) b. (oo,-1] c. (-oo,-1) d. (1,oo)

The set of all possible real values of a such that the inequality (x-(a-1))(x-(a^2-1))<0 holds for all x in (-1,3) is a. (0,1) b. (oo,-1] c. (-oo,-1) d. (1,oo)

Find the set of all real values of x satisfying the inequality sec^(-1)xgt tan^(-1)x .

Find the set of all real values of x satisfying the inequality sec^(-1)xgt tan^(-1)x .

The set of real values of x satisfying the inequality log _(x+(1)/(x))(log_(2)((x-1)/(x+2)))>0, is equal to

The set of real values of x satisfying the inequality |x^(2) + x -6| lt 6 , is

The set of real values of x satisfying the inequality |x^(2) + x -6| lt 6 , is

Set of all real values of x satisfying the inequation sqrt(4-x^(2))>=(1)/(x) is