A367015 - OEIS

A367015

Number of regions formed after n points have been placed in general position on each edge of the triangle in A365929.

1, 4, 28, 136, 445, 1126, 2404, 4558, 7921, 12880, 19876, 29404, 42013, 58306, 78940, 104626, 136129, 174268, 219916, 274000, 337501, 411454, 496948, 595126, 707185, 834376, 978004, 1139428, 1320061, 1521370, 1744876, 1992154, 2264833, 2564596, 2893180, 3252376, 3644029, 4070038

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OFFSET

0,2

COMMENTS

See A365929 for more information.

LINKS

Table of n, a(n) for n=0..37.

Scott R. Shannon, Image for n = 2.

Scott R. Shannon, Image for n = 3. Note that although the number of k-gons will vary as the edge points change position the total number of regions will stay constant (at 136 for n = 3) as long as all internal vertices remain simple.

FORMULA

Conjecture: a(n) = (9*n^4 - 12*n^3 + 15*n^2 + 4)/4.

a(n) = A366932(n) - 3*A366478(n) + 1 by Euler's formula.

CROSSREFS

Cf. A365929 (internal vertices), A366932 (edges), A366478 (vertices/3).

Sequence in context: A270275 A296638 A270721 * A270892 A271603 A139736

Adjacent sequences: A367012 A367013 A367014 * A367016 A367017 A367018

KEYWORD

nonn

AUTHOR

Scott R. Shannon, Nov 01 2023

STATUS

approved