Number of integral points satisfying the `log_(2)|x+3|-(1)/(log_(|x-1|)2)>2` inequality is -

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

Sum of integers satisfying sqrt(log_(2)x-1)-(1)/(2)log_(2)(x^(3))+2>0 is

Number of integers satisfying the inequality log_((1)/(2))|x-3|>-1 is...

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

Number of integers satisfying the inequality log_(1//2)|x-3| gt -1 is ________.

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

Number of integers <=10 satisfying the inequality 2log_((1)/(2))(x-1)<=(1)/(3)-(1)/(log_(x)2-x^(8)) is........

Number of integers le 10 satisfying the inequality 2 log_(1//2) (x-1) le 1/3 - 1/(log_(x^(2)-x)8) is ________.

Number of solution satisfying,sqrt(5-log_(2)x)=3-log_(2)x are 1(b)2(c)3(d)