The number of integers do not satisfy the inequality `|x-6| <= x^2 - 5x + 9` is

Find the number of integers which do not satisfy the inequality log_((1)/(2))(x+5)^(2)>log_((1)/(2))(3x-1)^(2)

The number of integers that satisfy the inequality x^(2)+48lt16x is

The number of integers satisfying the inequality |n^(2)-100|lt50 is

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

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 :

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

The number of integers satisfying the inequation |x-1|le[(sqrt(2)+1)^(6)+(sqrt(2)-1)^(6)] where [.] denotes greatest integer function is greater than and equal to :

The number of integers satisfying the inequation |x-1|le[(sqrt(2)+1)^(6)+(sqrt(2)-1)^(6)] where [.] denotes greatest integer function is greater than and equal to :

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