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

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

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

The number of negative integral values of x satisfying the inequality log_((x+(5)/(2)))((x-5)/(2x-3))^(2)lt 0 is :

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

Number of integral values of x satisfying the inequality (x^(2)(x+1)(x^(2)-1)(x+2))/(x^(2)-2x-3)<=0

Number of integral value of x satisfying log_(4)|x|<1 is equal to

Sum of integral value(s) of x satisfying the inequality (x^(2)-3x-10)/(x^(2)+x+1)le0 , is

Sum of integral value(s) of x satisfying the inequality (x^(2)-3x-10)/(x^(2)+x+1)<0, is

" The number of integral values of "'x'" satisfying the inequality "(1)/((x^(2)+x))<=(1)/((2x^(2)+2x+3))" is/are "

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