The number of prime numbers satisfying the inequality `(x^2-1)/(2x+5)<3` is

Number of prime numbers satisfying the inequality log_(3)((|x^(2)-4x|+3)/(x^(2)+|x-5|))>=0 is equal to

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

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)

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

The number of integers satisfying the inequality cos^(-1)(cos((x^(2)+3)/(x^(2)+1)))+tan(tan^(-1)((7-3x^(2))/(1+x^(2))))>=2

The number of integral values of x satisfying the inequality ((3)/(4))^(6x+10-x^(2))<(27)/(64)is_(-)-...-

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

Find the number of integral values of x satisfying the inequality, x^2-5x-6<0 .

The set of all real numbers satisfying the inequality X - 2 lt 1 is