A376188 - OEIS

A376188

For a line L in the plane, let C(L) denote the number of prime points [k, prime(k)] on L, and let M(L) denote the maximum prime(k) of any of these points; a(n) = minimum M(L) over all lines with C(L) >= n.

2, 3, 7, 23, 47, 73, 73, 73, 509, 509, 509, 509, 509, 509, 509, 509, 509, 509, 509, 509, 4021, 4021, 4021, 4021, 4021, 4021, 4021, 4027, 4027, 4027, 4027, 26759, 26759, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947, 26947

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OFFSET

1,1

COMMENTS

To avoid any confusion, C(L) is the total number of prime points on L, by definition.

See A376187 (which considers lines L with C(L) equal to n) for further information.

LINKS

Max Alekseyev, Table of n, a(n) for n = 1..79

CROSSREFS

Cf. A005115, A373813, A376187, A376190.

Sequence in context: A267504 A000057 A037231 * A248525 A366929 A376187

Adjacent sequences: A376185 A376186 A376187 * A376189 A376190 A376191