Let `a >2` be a constant. If there are just 18 positive integers satisfying the inequality `(x-a)(x-2a)(x-a^2)<0,` then find the value of `adot`

let a>2,a in N be a constant.If there are just 18 positive integers satisfying the inequality (x-a)(x-2a)(x-a^(2))<0 then which of the option is correct

Find the sum of all the integers satisfying the inequality (x-1)(2x-7)<0

Find the number of positive integers satisfying the inequality x^(2) -10x+16lt 0.

The number of integers satisfying the inequality is (x)/(x+6)<=(1)/(x)

Find the number of positive integers not satisfying the inequality log_(2)(4^(x)-2.2^(x)+17)>5

Find the greatest integer x satisfying the inequality (2x+1)/(3)-(3x-1)/(2)>1

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

Number of integers satisfying the inequality (1/3)^(|x+2|/(2-|x|))lt9 is

The number of integer satisfying the inequality (x)/(x+6)<(1)/(x) is :

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