If there are infinite values of x satisfying |x-3|-|x+4|=k then possible number of integral values of k is/are

Number of integral values of x satisfying ||x-4|+2<5 are

The number of integral values of x satisfying |x^2-1|leq3 is

The number of integral values of x satisfying the equation |x-|x-4||=4 is

Number of integral value of x satisfying log_(4)|x|<1 is equal to

Number of integral value of x, satisfying |x-1|+|x-2|+|x-3|leq6 is equal to :

If the solution set of |x-k| lt 2 is a subset of the solution of the inequality (2x-1)/(x+2) lt 1 , then the number of possible integral value(s) of k is/ are :

If the solution set of |x-k|<2 is a subset of the solution set of the inequality (2x-1)/(x+2)<1 then the number of possible integral value(s) of 'k' is/are-

If the line 3x+4y=k is tangent to the circle x^2+y^2-2x-4y+4=0 , then number of integral values of k is

Number of possible integral values of sqrt(x-2)+sqrt(6-x) is

The number of integral values of x satisfying 5x-1<(x+1)^(2)<7x-3 is