A lattice point (r, s) ∈ N 2 is said to be visible from the origin if no other integer lattice point lies on the line segment joining the origin and (r, s).It is a well-known result that the proportion of lattice points visible from the origin is given by 11 n s denotes the Riemann zeta function.Goins, Harris, Kubik and Mbirika, generalized the notion of lattice point visibility by saying that for a fixed b ∈ N, a lattice point (r, s) ∈ N 2 is b-visible from the origin if no other lattice point lies on the graph of a function f (x) = mx b , for some m ∈ Q, between the origin and (r, s).In their analysis they establish that for a fixed b ∈ N, the proportion of b-visible lattice points is i=1 bi) .Finally, we give a notion of visibility for vectors b ∈ (Q * ) n , compatible with the previous notion, that recovers the results of Harris and Omar for b ∈ Q * in 2-dimensions; and show that the proportion of b-visible points in this case only depends on the negative entries of b.