Let p(k) denote the k-th prime; a(n) = smallest p(m) > p(n) such that the n-2 differences between [p(n), p(n+1), ..., p(2n-2)] are the same as the n-2 differences between [p(m), p(m+1), ..., p(m+n-2)].
A236411
Let p(k) denote the k-th prime; a(n) = smallest p(m) > p(n) such that the n-2 differences between [p(n), p(n+1), ..., p(2n-2)] are the same as the n-2 differences between [p(m), p(m+1), ..., p(m+n-2)].
Terms
- a(0) =5a(1) =11a(2) =13a(3) =101a(4) =37a(5) =1277a(6) =1279a(7) =1616603a(8) =57405419a(9) =51448351a(10) =76623356077
External references
- oeis: A236411