Let E(n,k) denote the k-th smallest Carmichael number such that there are n distinct Carmichael numbers: {x(1), x(2), ..., x(n)} where x_i < E_(n,k), such that for any integer i: 1 <= i <= n, x(i) is a quadratic residue of E(n,k).

A317247

Let E(n,k) denote the k-th smallest Carmichael number such that there are n distinct Carmichael numbers: {x(1), x(2), ..., x(n)} where x_i < E_(n,k), such that for any integer i: 1 <= i <= n, x(i) is a quadratic residue of E(n,k).