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

Find the values of x satisfying the inequalities: log_(0.1)(4x^(2)-1)>log_(0.1)3x

The value of x satisfying the inequalities hold: qquad log_(0.2)(x+5)>0

The value of x satisfying the equation 2log_(3)x+8=3.x log_(9)4

Find the values of x satisfying the inequalities : log_(0.1) (4x^2-1)gtlog_(0.1) 3x

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

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 value of x satisfying the equation 2^(log3x)+8=3*x^(log_(9)4), is

The set of real values of x satisfying the inequality log_(x+1/x)(log_2((x-1)/(x+2))) gt 0, is equal to

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

Sum of integral values of x satisfying the inequality 3((5)/(2))log_(3)(12-3x)