Octahedral number

146 magnetic balls, packed in the form of an octahedron

In number theory, an octahedral number is a figurate number that represents the number of spheres in an octahedron formed from close-packed spheres. The nth octahedral number $O_{n}$ can be obtained by the formula:^[1]

O_{n}={n(2n^{2}+1) \over 3}.

The first few octahedral numbers are:

1, 6, 19, 44, 85, 146, 231, 344, 489, 670, 891 (sequence A005900 in the OEIS).

Properties and applications

The octahedral numbers have a generating function

{\frac {z(z+1)^{2}}{(z-1)^{4}}}=\sum _{n=1}^{\infty }O_{n}z^{n}=z+6z^{2}+19z^{3}+\cdots .

Sir Frederick Pollock conjectured in 1850 that every number is the sum of at most 7 octahedral numbers: see Pollock octahedral numbers conjecture.^[2]

In chemistry, octahedral numbers may be used to describe the numbers of atoms in octahedral clusters; in this context they are called magic numbers.^[3]^[4]

Relation to other figurate numbers

Square pyramids

Square pyramids in which each layer has a centered square number of cubes. The total number of cubes in each pyramid is an octahedral number.

An octahedral packing of spheres may be partitioned into two square pyramids, one upside-down underneath the other, by splitting it along a square cross-section. Therefore, the nth octahedral number $O_{n}$ can be obtained by adding two consecutive square pyramidal numbers together:^[1]

O_{n}=P_{n-1}+P_{n}.

Tetrahedra

If $O_{n}$ is the nth octahedral number and $T_{n}$ is the nth tetrahedral number then

O_{n}+4T_{n-1}=T_{2n-1}.

This represents the geometric fact that gluing a tetrahedron onto each of four non-adjacent faces of an octahedron produces a tetrahedron of twice the size. Another relation between octahedral numbers and tetrahedral numbers is also possible, based on the fact that an octahedron may be divided into four tetrahedra each having two adjacent original faces (or alternatively, based on the fact that each square pyramidal number is the sum of two tetrahedral numbers):

O_{n}=T_{n}+2T_{n-1}+T_{n-2}.

Cubes

If two tetrahedra are attached to opposite faces of an octahedron, the result is a rhombohedron.^[5] The number of close-packed spheres in the rhombohedron is a cube, justifying the equation

O_{n}+2T_{n-1}=n^{3}.

Centered squares

The difference between two consecutive octahedral numbers is a centered square number:^[1]

O_{n}-O_{n-1}=C_{4,n}=n^{2}+(n-1)^{2}.

Therefore, an octahedral number also represents the number of points in a square pyramid formed by stacking centered squares; for this reason, in his book Arithmeticorum libri duo (1575), Francesco Maurolico called these numbers "pyramides quadratae secundae".^[6]

The number of cubes in an octahedron formed by stacking centered squares is a centered octahedral number, the sum of two consecutive octahedral numbers. These numbers are

1, 7, 25, 63, 129, 231, 377, 575, 833, 1159, 1561, 2047, 2625, ... (sequence A001845 in the OEIS)

given by the formula

O_{n}+O_{n-1}={\frac {(2n-1)(2n^{2}-2n+3)}{3}}

for n = 1, 2, 3, ...

References

1 2 3 Conway, John Horton; Guy, Richard K. (1996), The Book of Numbers, Springer-Verlag, p. 50, ISBN 978-0-387-97993-9 .
↑ Dickson, L. E. (2005), Diophantine Analysis, History of the Theory of Numbers, 2, New York: Dover, pp. 22–23 .
↑ Teo, Boon K.; Sloane, N. J. A. (1985), "Magic numbers in polygonal and polyhedral clusters" (PDF), Inorganic Chemistry, 24 (26): 4545–4558, doi:10.1021/ic00220a025 .
↑ Feldheim, Daniel L.; Foss, Colby A. (2002), Metal nanoparticles: synthesis, characterization, and applications, CRC Press, p. 76, ISBN 978-0-8247-0604-3 .
↑ Burke, John G. (1966), Origins of the science of crystals, University of California Press, p. 88 .
↑ Tables of integer sequences from Arithmeticorum libri duo, retrieved 2011-04-07.

External links

Weisstein, Eric W. "Octahedral Number". MathWorld.

Classes of natural numbers

Powers and
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Of the form
a × 2^b ± 1

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Figurate numbers

2-dimensional

centered	Centered triangular Centered square Centered pentagonal Centered hexagonal Centered heptagonal Centered octagonal Centered nonagonal Centered decagonal Star

non-centered	Triangular Square Square triangular Pentagonal Hexagonal Heptagonal Octagonal Nonagonal Decagonal Dodecagonal

3-dimensional

centered	Centered tetrahedral Centered cube Centered octahedral Centered dodecahedral Centered icosahedral

non-centered	Tetrahedral Octahedral Dodecahedral Icosahedral Stella octangula

pyramidal	Square pyramidal Pentagonal pyramidal Hexagonal pyramidal Heptagonal pyramidal

4-dimensional

centered	Centered pentachoric Squared triangular

non-centered	Pentatope

Pseudoprimes

Combinatorial
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Arithmetic functions

By properties of σ(n)	Abundant Almost perfect Arithmetic Colossally abundant Descartes Hemiperfect Highly abundant Highly composite Hyperperfect Multiply perfect Perfect Practical number Primitive abundant Quasiperfect Refactorable Sublime Superabundant Superior highly composite Superperfect

By properties of Ω(n)	Almost prime Semiprime

By properties of φ(n)	Highly cototient Highly totient Noncototient Nontotient Perfect totient Sparsely totient

By properties of s(n)	Amicable Betrothed Deficient Semiperfect

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