Number of integral value of `x` satisfying `log_4 |x| lt 1` is equal to

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

Number of integral values of x satisfying ||x-4|+2<5 are

Number of integral values of 'x' satisfying |x+4|+|x-4|=8 is :-

Number of integral value of x, satisfying |x-1|+|x-2|+|x-3|leq6 is equal to :

The number of integral values of x satisfying |x^2-1|leq3 is

The number of integral value of x satisfying the following system of inequalities (sqrt(log_(2)^(2)x-3log_(2)x+2))/(log_(5)((1)/(3)log_(3)5-1))>=&x-sqrt(x)-2>=0 is 0 (2) 1 (3) 2 (4) 3

Number of integral values of x, satisfying function f(x) = log(x-1) + log(3-x)

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

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