Number of integers satisfying the inequality
`(1/3)^(|x+2|/(2-|x|)) > 9` is

The number of positive integers satisfying the inequality C(n+1,n-2) - C(n+1,n-1)<=100 is

The number of positive integers satisfying the inequality : ""^(n+1)C_(n-2)-""^(n+1)C_(n-1)le100 is :

The number of integral pairs (x, y) satisfying the equation 2x^(2)-3xy-2y^(2)=7 is :

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....

The smallest value of x satisfying the inequality ""^(10)C_(x-1)gt 2""^(10)C_x is :

Solve the inequation: |1-(|x|/(1+|x|))|>=1/2

Solve the inequality (x+3)(3x-2)^5(7-x)^3(5x+8)^2 >= 0.

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

The solution of the inequation (1-2 x-3 x^(2))/(3 x-x^(2)-5) gt 0 is

Let S be the set of all non-zero real numbers such that the quadratic equation alphax^2-x+alpha=0 has two distinct real roots x_1a n dx_2 satisfying the inequality |x_1-x_2|<1. Which of the following intervals is (are) a subset (s) of S ?