A383806 -id:A383806 - cp's OEIS frontend

A384071 Number of connected components of n faces of the truncated cuboctahedron up to the 48 rotations and reflections of the truncated cuboctahedron.

1, 3, 3, 11, 28, 100, 319, 1114, 3538, 10313, 25470, 52474, 88257, 121329, 136282, 125885, 95956, 60675, 31943, 14009, 5123, 1549, 398, 84, 17, 3, 1

Offset: 0

Peter Kagey, May 18 2025

Two faces are connected if they share an edge.
These are "free" polyforms because both rotations and reflections are allowed.
The truncated cuboctahedron is the polyhedral dual of the disdyakis dodecahedron.

			a(1) = 3 because the truncated cuboctahedron is not face-transitive but has three distinct types of faces: square faces, hexagonal faces, and octagonal faces.

Peter Kagey, Illustration of a(1)-a(3).
Wikipedia, Truncated cuboctahedron

Cf. A383806 (disdyakis dodecahedron).

Cf. A384067 (cuboctahedron), A384068 (truncated cube), A384069 (truncated octahedron), A384070 (rhombicuboctahedron), A384071 (truncated cuboctahedron), A384072 (snub cube).

a(12)-a(26) from Bert Dobbelaere, May 22 2025

A383802 Number of polyforms with n cells on the faces of a tetrakis hexahedron up to rotation and reflection.

Original entry on oeis.org

1, 1, 2, 2, 6, 8, 21, 36, 84, 164, 356, 691, 1361, 2342, 3707, 4830, 5082, 3843, 2128, 798, 248, 50, 12, 1, 1

Offset: 0

Peter Kagey, May 10 2025

These are "free" polyforms.

The tetrakis hexahedron is the polyhedral dual of the truncated octahedron.

Peter Kagey, Example of a(5)=8.
Wikipedia, Tetrakis hexahedron

Cf. A383803 (one-sided).
Octahedral symmetry: A333333 (row 3), A383800, A383802, A383804, A383806.
Icosahedral symmetry: A030135, A030136, A340635, A383490, A383492, A383494, A383496.
Cf. A197465 (tetrakis square tiling).

A383800 Number of polyforms with n cells on the faces of a triakis octahedron up to rotation and reflection.

Original entry on oeis.org

1, 1, 2, 2, 4, 4, 10, 13, 28, 42, 81, 130, 239, 369, 587, 817, 1072, 1170, 1054, 594, 217, 46, 11, 1, 1

Offset: 0

Peter Kagey, May 10 2025

These are "free" polyforms.

The triakis octahedron is the polyhedral dual of the truncated cube.

Wikipedia, Triakis octahedron

Cf. A383801 (one-sided).
Octahedral symmetry: A333333 (row 3), A383800, A383802, A383804, A383806.
Icosahedral symmetry: A030135, A030136, A340635, A383490, A383492, A383494, A383496.

A383804 Number of polyforms with n cells on the faces of a deltoidal icositetrahedron up to rotation and reflection.

Original entry on oeis.org

1, 1, 2, 4, 10, 23, 65, 166, 453, 1157, 2849, 6252, 11894, 18183, 21614, 19139, 12966, 6691, 2813, 901, 253, 49, 11, 1, 1

Offset: 0

Peter Kagey, May 10 2025

These are "free" polyforms.

The deltoidal icositetrahedron is the polyhedral dual of the rhombicuboctahedron.

Peter Kagey, Illustration of a(5)=23.
Wikipedia, Deltoidal icositetrahedron

Cf. A383805 (one-sided).
Octahedral symmetry: A333333 (row 3), A383800, A383802, A383804, A383806.
Icosahedral symmetry: A030135, A030136, A340635, A383490, A383492, A383494, A383496.

A383807 Number of polyforms with n cells on the faces of a disdyakis dodecahedron up to rotation.

Original entry on oeis.org

1, 2, 3, 6, 13, 28, 66, 148, 348, 812, 1921, 4524, 10708, 25178, 59211, 138578, 323063, 747758, 1716982, 3896986, 8715931, 19121954, 40976038, 85326888, 171723106, 331830856, 611054918, 1062626406, 1726666853, 2589026208, 3530928400, 4306815278, 4608896060, 4238344482

Offset: 0

Peter Kagey, May 10 2025

These are "one-sided" polyforms.

The disdyakis dodecahedron is the polyhedral dual of the truncated cuboctahedron.

Bert Dobbelaere, Table of n, a(n) for n = 0..48
Peter Kagey, Illustration of a(3)=6.
Wikipedia, Disdyakis dodecahedron

Cf. A383806 (free).
Tetrahedral symmetry: A383826.
Octahedral symmetry: A383799 (row 3), A383801, A383803, A383805, A383807, A383808.
Icosahedral symmetry: A030137, A030138, A383491, A383493, A383495, A383497, A383498, A383786.

Corrected a(1) and more terms from Bert Dobbelaere, Jun 08 2025

A383825 Number of polyforms with n cells on the faces of a triakis tetrahedron up to rotation and reflection.

Original entry on oeis.org

1, 1, 2, 2, 4, 4, 9, 9, 14, 10, 5, 1, 1

Offset: 0

Peter Kagey, May 11 2025

These are "free" polyforms.

The triakis tetrahedron is the polyhedral dual of the truncated tetrahedron.

Peter Kagey, Illustration of a(0)-a(4).
Wikipedia, Triakis tetrahedron

Cf. A383826 (one-sided).
Octahedral symmetry: A333333 (row 3), A383800, A383802, A383804, A383806.
Icosahedral symmetry: A030135, A030136, A340635, A383490, A383492, A383494, A383496.

cp's OEIS Frontend

A384071 Number of connected components of n faces of the truncated cuboctahedron up to the 48 rotations and reflections of the truncated cuboctahedron.

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A383802 Number of polyforms with n cells on the faces of a tetrakis hexahedron up to rotation and reflection.

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A383800 Number of polyforms with n cells on the faces of a triakis octahedron up to rotation and reflection.

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A383804 Number of polyforms with n cells on the faces of a deltoidal icositetrahedron up to rotation and reflection.

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A383807 Number of polyforms with n cells on the faces of a disdyakis dodecahedron up to rotation.

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A383825 Number of polyforms with n cells on the faces of a triakis tetrahedron up to rotation and reflection.

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