If x satisfies the inequality `log_(x+3) (x^2-x) < 1` then x may belong to the interval

Number of integers satisfying the inequality log_((x+3))(x^2-x) lt 1 is

Number of integers satisfying the inequality log_((x+3))(x^2-x) lt 1 is

If x=(4)/(9) then number of distinct integral values of x satisfying the inequality log_(a)(x^(2)-x+2)>log_(a)(-x^(2)+2x+3) ,is

The least positive integer x, which satisfies the inequality log_(log(x/2)) (x^2-10x+22) > 0 is equal to

The value of x, satisfying the inequality log_(0.3)(x^(2)+8)>log_(0.3)9x, lies in

The least positive integer x, which satisfies the inequality log _( log )(x^(2)-10x+22)>0 is equal to

Find the values of x satisfying the inequalities: log_(2)(x^(2)-24)>log_(2)(5x)

Number of integers satisfying the inequality log_((x + 3)/(x - 3))4 lt 2 [log_(1/2)(x - 3)-log_(sqrt(2)/2)sqrt(x + 3)] is greater than

Number of prime numbers satisfying the inequality log_(3)((|x^(2)-4x|+3)/(x^(2)+|x-5|))>=0 is equal to