A340644 -id:A340644 - cp's OEIS frontend

A340639 The number of regions inside a Reuleaux triangle formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

1, 24, 145, 516, 1432, 3084, 6106, 10638, 17764, 27336, 41233, 58902, 82675, 111864, 149497, 194430, 250534, 316020, 395728, 487122, 596434, 720162, 865321, 1027974, 1216291, 1425348, 1664539, 1928022, 2226658, 2553204, 2920378, 3319536, 3764848, 4246638, 4780489, 5355414, 5988973

Offset: 1

Scott R. Shannon and N. J. A. Sloane, Jan 14 2021

nonn

The terms are from numeric computation - no formula for a(n) is currently known.

Scott R. Shannon, Regions for n = 2.
Scott R. Shannon, Regions for n = 3.
Scott R. Shannon, Regions for n = 4.
Scott R. Shannon, Regions for n = 5.
Scott R. Shannon, Regions for n = 6.
Scott R. Shannon, Regions for n = 10.
Scott R. Shannon, Regions for n = 11.
Scott R. Shannon, Regions for n = 9 with random distance-based coloring.
Scott R. Shannon, Regions for n = 10 with random distance-based coloring.
Wikipedia, Reuleaux triangle.

Cf. A340644 (vertices), A340613 (edges), A340614 (n-gons), A007678, A092867.

A340613 The number of edges on a Reuleaux triangle formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

Original entry on oeis.org

3, 42, 264, 957, 2763, 5946, 11976, 20808, 35121, 53853, 81822, 116658, 164409, 222072, 297654, 386613, 499305, 629124, 789156, 970404, 1189923, 1435689, 1726980, 2050254, 2428101, 2843862, 3323646, 3847863, 4446861, 5096730, 5833128, 6627840, 7520769, 8480367, 9550638, 10695942, 11966043

Offset: 1

Scott R. Shannon and N. J. A. Sloane, Jan 14 2021

nonn

The terms are from numeric computation - no formula for a(n) is currently known.

See A340639 for images of the regions and A340644 for images of the vertices.

Wikipedia, Reuleaux triangle.

Cf. A340639 (regions), A340644 (vertices), A340614 (n-gons), A007678, A092867.

A340614 Irregular table read by rows: Take a Reuleaux triangle with all diagonals drawn, as in A340639. Then T(n,k) = number of k-sided polygons in that figure for k >= 3.

Original entry on oeis.org

1, 18, 6, 79, 51, 12, 3, 252, 192, 60, 6, 6, 576, 600, 168, 73, 15, 1170, 1380, 390, 126, 6, 12, 2248, 2589, 894, 288, 66, 18, 3, 4026, 4332, 1662, 480, 108, 30, 6426, 7182, 2988, 943, 189, 36, 9942, 11268, 4470, 1266, 300, 84, 0, 6, 14508, 16941, 7098, 2119, 435, 120, 6, 6

Offset: 1

Scott R. Shannon and N. J. A. Sloane, Jan 14 2021

See A340639 for images of the regions and A340644 for images of the vertices.

			A Reuleaux triangle with 1 point dividing its edges, n = 2, contains 18 triangles, 6 quadrilaterals and no other n-gons, so the second row is [18, 6]. A Reuleaux triangle with 2 points dividing its edges, n = 3, contains 79 triangles, 51 quadrilaterals, 12 pentagons, 3 hexagons and no other n-gons, so the third row is [79, 51, 12, 3].
The table begins:
1;
18, 6;
79, 51, 12, 3;
252, 192, 60, 6, 6;
576, 600, 168, 73, 15;
1170, 1380, 390, 126, 6, 12;
2248, 2589, 894, 288, 66, 18, 3;
4026, 4332, 1662, 480, 108, 30;
6426, 7182, 2988, 943, 189, 36;
9942, 11268, 4470, 1266, 300, 84, 0, 6;
14508, 16941, 7098, 2119, 435, 120, 6, 6;
21234, 23598, 10194, 3090, 636, 132, 12, 6;
28881, 34086, 13935, 4528, 1041, 177, 24, 3;
39588, 45384, 19470, 5796, 1380, 198, 48;
52197, 60744, 26409, 7831, 1914, 366, 21, 15;
68646, 78492, 33810, 10668, 2358, 396, 60;
87642, 100701, 44670, 13942, 2931, 555, 66, 21, 6;
111084, 127290, 55818, 17082, 3912, 696, 132, 6;
138453, 158907, 70158, 22233, 4869, 1002, 87, 15, 0, 4;
171276, 194622, 87312, 26748, 6132, 846, 174, 6, 6;

Wikipedia, Reuleaux triangle.

Cf. A340639 (regions), A340644 (vertices), A340613 (edges), A007678, A092867.

A340686 The number of vertices on a concave circular triangle formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

Original entry on oeis.org

3, 10, 24, 76, 168, 391, 819, 1447, 2949, 4153, 6393, 8293, 12048, 14857, 20670, 25972, 33123, 41026, 50379, 63700, 76560, 96628, 113262, 135076, 160050, 183484, 215355, 244435, 288861, 322276, 371742, 424279, 470838, 534376, 597033, 682264, 760959, 854755, 941706, 1039255, 1141569, 1254190

Offset: 1

Scott R. Shannon and N. J. A. Sloane, Jan 16 2021

nonn

The terms are from numeric computation - no formula for a(n) is currently known.

Scott R. Shannon, Vertices for n = 2.
Scott R. Shannon, Vertices for n = 3.
Scott R. Shannon, Vertices for n = 4.
Scott R. Shannon, Vertices for n = 6.
Scott R. Shannon, Vertices for n = 8.
Scott R. Shannon, Vertices for n = 10.
Scott R. Shannon, Vertices for n = 14.
Scott R. Shannon, Vertices for n = 15.
Wikipedia, Circular triangle.

Cf. A340685 (regions), A340687 (edges), A340688 (n-gons), A340644, A007678, A092867.

A341878 The number of vertices on a vesica piscis formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

Original entry on oeis.org

2, 5, 19, 65, 203, 429, 963, 1643, 2929, 4173, 7179, 9985, 14747, 19503, 27043, 34511, 46011, 57171, 73339, 87509, 111219, 132809, 162459, 190703, 229419, 266285, 315041, 361179, 423067, 480201, 556451, 627039, 718923, 805217, 915091, 1017379, 1148595, 1270569, 1423907, 1564359

Offset: 1

Scott R. Shannon and N. J. A. Sloane, Feb 22 2021

nonn

The terms are from numeric computation - no formula for a(n) is currently known.

Scott R. Shannon, Vertices for n = 4.
Scott R. Shannon, Vertices for n = 5.
Scott R. Shannon, Vertices for n = 10.
Scott R. Shannon, Vertices for n = 15.
Scott R. Shannon, Vertices for n = 16.
Wikipedia, Vesica piscis.

Cf. A341877 (regions), A342152 (edges), A342153 (n-gons), A007569, A092866, A340644, A340686.

cp's OEIS Frontend

A340639 The number of regions inside a Reuleaux triangle formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

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A340613 The number of edges on a Reuleaux triangle formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

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A340614 Irregular table read by rows: Take a Reuleaux triangle with all diagonals drawn, as in A340639. Then T(n,k) = number of k-sided polygons in that figure for k >= 3.

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A340686 The number of vertices on a concave circular triangle formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

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Author

Keywords

Comments

Links

Crossrefs

A341878 The number of vertices on a vesica piscis formed by the straight line segments mutually connecting all vertices and all points that divide the sides into n equal parts.

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Author

Keywords

Comments

Links

Crossrefs