The set of values of x which satisfy the inequality `(x log_(1/10) (x^2+x+1)) gt 0` can be

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

For x>1,y=log x satisfy the inequality

Number of integral values of x which satisfy the inequality log_(x+(1)/(x))(1+5x-x^(2))>0, is :

The set of all values of x satisfying the inequations (x-1)^(3) (x+1) lt 0 is

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

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 values of x satisfying the inequality (1)/(log_(4)((x+1)/(x+2)))<=(1)/(log_(4)(x+3)) is

The smallest value of x satisfying the inequality ""^(10)C_(x-1)gt 2""^(10)C_x is :

The comlete set of values of m for which the inequality (x ^(2) -mx-2)/( x ^(2) + mx +4)gt-1 is satisfied aa x in R, is :