The set of values of x for which the inequality
`|x-1|+|x+1| lt 4`
always holds true is :

The set of values of a for which the inequality, x^2 + ax + a^2 + 6a < 0 is satisfied for all x in (1, 2) lies in the interval:

Solve the inequality -12 lt 4 - (3x)/(-5) le 2

Find all values of the parameter a for which the inequality a.9^x +4(a-1)3^x+a gt 1 is satisfied for all real values of x

The set of real values of x satisfying | x -1 | le 3 and |x - 1| ge 1 is :

Write the values of x for which tan^(-1)"" 1/x=cot^(-1)x holds.

The solution set of the inequation |x-1|+|x-2|+|x-3|ge 6 is

Write the set of values of x for which 2 tan^(-1)x="tan"^(-1)(2x)/(1-x^(2)) holds.

Writeh the set of values of x for which 2tan^(-1)x="sin"^(-1)(2x)/(1+x^(2)) holds.

The inequality (x-1)In(2-x)lt0 holds, if x satisfies

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....