In mathematics, the doubly triangular numbers are the numbers that appear within the

sequence In mathematics, a sequence is an enumerated collection of objects in which repetitions are allowed and order matters. Like a set, it contains members (also called ''elements'', or ''terms''). The number of elements (possibly infinite) is calle ...

triangular number A triangular number or triangle number counts objects arranged in an equilateral triangle. Triangular numbers are a type of figurate number, other examples being square numbers and cube numbers. The th triangular number is the number of dots in ...

s, in positions that are also triangular numbers. That is, if

T_n=n(n+1)/2

denotes the

n

th triangular number, then the doubly triangular numbers are the numbers of the form

T_

Sequence and formula

The doubly triangular numbers form the sequence :0, 1, 6, 21, 55, 120, 231, 406, 666, 1035, 1540, 2211, ... The

n

th doubly triangular number is given by the quartic formula

T_ = \frac.

The sums of row sums of Floyd's triangle give the doubly triangular numbers. Another way of expressing this fact is that the sum of all of the numbers in the first

n

rows of Floyd's triangle is the

n

th doubly triangular number.

In combinatorial enumeration

Doubly triangular numbers arise naturally as numbers of of objects, including pairs where both objects are the same: *An example from

mathematical chemistry Mathematical chemistry is the area of research engaged in novel applications of mathematics to chemistry; it concerns itself principally with the mathematical modeling of chemical phenomena. Mathematical chemistry has also sometimes been called com ...

is given by the numbers of overlap integrals between

Slater-type orbital Slater-type orbitals (STOs) are functions used as atomic orbitals in the linear combination of atomic orbitals molecular orbital method. They are named after the physicist John C. Slater, who introduced them in 1930. They possess exponential decay ...

s. *Another example of this phenomenon from

combinatorics Combinatorics is an area of mathematics primarily concerned with counting, both as a means and an end in obtaining results, and certain properties of finite structures. It is closely related to many other areas of mathematics and has many appl ...

is that the doubly-triangular numbers count the number of two-edge undirected

multigraph In mathematics, and more specifically in graph theory, a multigraph is a graph which is permitted to have multiple edges (also called ''parallel edges''), that is, edges that have the same end nodes. Thus two vertices may be connected by more ...

s on

n

labeled vertices. In this setting, an edge is an unordered pair of vertices, and a two-edge graph is an unordered pair of edges. The number of possible edges is a triangular number, and the number of pairs of edges (allowing both edges to connect the same two vertices) is a doubly triangular number. *In the same way, the doubly triangular numbers also count the number of distinct ways of coloring the four corners or the four edges of a

square In Euclidean geometry, a square is a regular quadrilateral, which means that it has four equal sides and four equal angles (90-degree angles, π/2 radian angles, or right angles). It can also be defined as a rectangle with two equal-length adj ...

with

n

colors, allowing some colors to be unused and counting two colorings as being the same when they differ from each other only by rotation or reflection of the square. The number of choices of colors for any two opposite features of the square is a triangular number, and a coloring of the whole square combines two of these colorings of pairs of opposite features. When pairs with both objects the same are excluded, a different sequence arises, the ''tritriangular numbers''

3,15,45,105,\dots

which are given by the formula

\binom

In numerology

Some

numerologists Numerology (also known as arithmancy) is the belief in an occult, divine or mystical relationship between a number and one or more coinciding events. It is also the study of the numerical value, via an alphanumeric system, of the letters in ...

and

biblical studies Biblical studies is the academic application of a set of diverse disciplines to the study of the Bible (the Old Testament and New Testament).''Introduction to Biblical Studies, Second Edition'' by Steve Moyise (Oct 27, 2004) pages 11–12 Fo ...

scholars consider it significant that

666 666 may refer to: * 666 (number) * 666 BC, a year * AD 666, a year * The number of the beast, a reference in the Book of Revelation in the New Testament Places * 666 Desdemona, a minor planet in the asteroid belt * U.S. Route 666, an America ...

, the

number of the beast The number of the beast ( grc-koi, Ἀριθμὸς τοῦ θηρίου, ) is associated with the Beast of Revelation in chapter 13, verse 18 of the Book of Revelation. In most manuscripts of the New Testament and in English translations of ...

, is a doubly triangular number.

References

{{reflist, refs= {{citation , last = Barnett , first = Michael P. , doi = 10.1002/qua.10614 , issue = 6 , journal = International Journal of Quantum Chemistry , pages = 791–805 , publisher = Wiley , title = Molecular integrals and information processing , volume = 95 , year = 2003 {{citation , last = Gulliver , first = T. Aaron , issue = 4 , journal = International Mathematical Journal , mr = 1846748 , pages = 323–332 , title = Sequences from squares of integers , volume = 1 , year = 2002 {{citation, first=Otto William, last=Heick, title=The Antichrist in the Book of Revelation, journal=Consensus, date=January 1985 , volume=11, issue=1, at=Article 3, url=https://scholars.wlu.ca/consensus/vol11/iss1/3/ {{citation, title=Statistics on small graphs, arxiv=1709.09000, year=2017, first=Richard J., last=Mathar, at=row 2 of table 60 {{cite OEIS, A002817, Doubly triangular numbers, mode=cs2 {{cite OEIS, A050534, Tritriangular numbers, mode=cs2 {{citation , last = Watt , first = W. C. , doi = 10.1515/semi.1989.77.4.369 , issue = 4 , journal = Semiotica , title = 666 , volume = 77 , year = 1989 Factorial and binomial topics Integer sequences