[" 14.Number of integral values of "x" the inequality "log_(10)((2x-2007)/(x+1))<=0" holds true,is "],[[" (A) "1004," (B) "1005," (C) "2007," (D) "2008]]

The number of integer values of x for which the inequality "log "_(10) ((2x-2007)/(x+1))ge0, is true, is

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

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 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 :

If number of integral values of x satisfying the inequality ((x)/(100))^(7logx-log^(2)x-6)le10^(12) are alpha then

If number of integral values of x satisfying the inequality ((x)/(100))^(7logx-log^(2)x-6)ge10^(12) are alpha then

The number of integral values of K the inequality |(x^(2)+kx+1)/(x^(2)+x+1)|<3 is satisfied for all real values of x is...]|

Number of integral values of x satisfying the inequality ((e^(x)-pi^(x))log_(2)((x^(2)-5x+6)/(2))(x-8)^(31)(x-5)^(5))/((x+2)^(3)(x^(8)-x^(6)+x^(4)-x^(2)+1))ge0 is/are