Square triangular number explained

In mathematics, a square triangular number (or triangular square number) is a number which is both a triangular number and a square number. There are infinitely many square triangular numbers; the first few are:

Explicit formulas

Write

N_k

for the

th square triangular number, and write

s_k

and

t_k

for the sides of the corresponding square and triangle, so that

Define the triangular root of a triangular number

N=\tfrac{n(n+1)}{2}

to be

. From this definition and the quadratic formula,

Therefore,

is triangular (

is an integer) if and only if

8N+1

is square. Consequently, a square number

M²

is also triangular if and only if

8M²⁺¹

is square, that is, there are numbers

and

such that

x^2-8y²⁼¹

. This is an instance of the Pell equation

x^2-ny²⁼¹

with

n=8

. All Pell equations have the trivial solution

x=1,y=0

for any

; this is called the zeroth solution, and indexed as

(x_0,y_0)=(1,0)

. If

(x_k,y_k)

denotes the

th nontrivial solution to any Pell equation for a particular

, it can be shown by the method of descent that the next solution isHence there are infinitely many solutions to any Pell equation for which there is one non-trivial one, which is true whenever

is not a square. The first non-trivial solution when

n=8

is easy to find: it is

(3,1)

. A solution

(x_k,y_k)

to the Pell equation for

n=8

yields a square triangular number and its square and triangular roots as follows:

Hence, the first square triangular number, derived from

(3,1)

, is

, and the next, derived from

6 ⋅ (3,1)-(1,0)-(17,6)

, is

The sequences

N_k

s_k

and

t_k

are the OEIS sequences,, and respectively.

In 1778 Leonhard Euler determined the explicit formula^[1] ^[2]

Other equivalent formulas (obtained by expanding this formula) that may be convenient include

The corresponding explicit formulas for

s_k

and

t_k

are:

Recurrence relations

There are recurrence relations for the square triangular numbers, as well as for the sides of the square and triangle involved. We have

We have

Other characterizations

All square triangular numbers have the form

b^2c²

, where

\tfrac{b}{c}

is a convergent to the continued fraction expansion of

\sqrt2

, the square root of 2.^[3]

A. V. Sylwester gave a short proof that there are infinitely many square triangular numbers: If the

th triangular number

\tfrac{n(n+1)}{2}

is square, then so is the larger

4n(n+1)

th triangular number, since:

The left hand side of this equation is in the form of a triangular number, and as the product of three squares, the right hand side is square.^[4]

The generating function for the square triangular numbers is:^[5]

	1+z
	(1-z)\left(z²-34z+1\right)

=1+36z+1225z²+ …

External links

Triangular numbers that are also square at cut-the-knot
- Michael Dummett's solution

Notes and References

Book: Dickson . Leonard Eugene . Leonard Eugene Dickson . . 2 . American Mathematical Society . Providence . 1999 . 1920 . 16 . 978-0-8218-1935-7 .
Euler . Leonhard . Leonhard Euler . 1813 . Regula facilis problemata Diophantea per numeros integros expedite resolvendi (An easy rule for Diophantine problems which are to be resolved quickly by integral numbers) . Mémoires de l'Académie des Sciences de St.-Pétersbourg . 4 . 3–17 . la . 2009-05-11 . According to the records, it was presented to the St. Petersburg Academy on May 4, 1778..
Book: Ball . W. W. Rouse . W. W. Rouse Ball . Coxeter . H. S. M. . Harold Scott MacDonald Coxeter . Mathematical Recreations and Essays . limited . Dover Publications . New York . 1987 . 59. 978-0-486-25357-2 .
Pietenpol . J. L. . A. V. . Sylwester . Erwin . Just . R. M. . Warten . February 1962 . Elementary Problems and Solutions: E 1473, Square Triangular Numbers . American Mathematical Monthly . 69 . 2 . 168–169 . 0002-9890 . 2312558. Mathematical Association of America . 10.2307/2312558.
Web site: Simon . Plouffe . Simon Plouffe . 1031 Generating Functions . University of Quebec, Laboratoire de combinatoire et d'informatique mathématique . A.129 . August 1992 . 2009-05-11 . 2012-08-20 . https://web.archive.org/web/20120820012535/http://www.plouffe.fr/simon/articles/FonctionsGeneratrices.pdf . dead .