the largest negative integer which satisfies `(x^2-1)/((x-2)(x-3))>0`

The largest negative integer that satisfies (x^(2)-1)/((x-2)(x-3))>0 is

The largest negative integer for which ((x-4)(x-2))/((x-1)(x-5))>0 is

The least positive integer x, which satisfies |x-2|>7?

the greatest negative integer satisfying x^(2)+4x-77 4 is

The least positive integer x , which satisfies |x-2| gt 7 ?

The least integer value of x , which satisfies |x|+|(x)/(x-1)|=(x^(2))/(|x-1|) is

If the inequality sin^(2)x+a cos x+a^(2)>1+cos x holds for any x in R, then the largest negative integral value of a is -4(b)-3(c)-2(d)-1

Let 'a' be an integer. If there are 10 inegers satisfying the ((x-a)^(2)(x-2a))/((x-3a)(x-4a))le0 then

The smallest integer x which satisfies teh inequality (x-5)/(x^2+5x-14) gt 0 is