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 $n$th triangular number is the number of dots in the triangular arrangement with $n$ dots on each side, and is equal to the sum of the $n$ natural numbers from 1 to $n$. The sequence of triangular numbers, starting with the 0th triangular number, is

Formula
The triangular numbers are given by the following explicit formulas:

where $$\textstyle {n+1 \choose 2}$$ is notation for a binomial coefficient. It represents the number of distinct pairs that can be selected from $n + 1$ objects, and it is read aloud as "$n$ plus one choose two".

The fact that the $$n$$th triangular number equals $$n(n+1)/2$$ can be illustrated using a visual proof. For every triangular number $$T_n$$, imagine a "half-rectangle" arrangement of objects corresponding to the triangular number, as in the figure below. Copying this arrangement and rotating it to create a rectangular figure doubles the number of objects, producing a rectangle with dimensions $$n \times (n+1)$$, which is also the number of objects in the rectangle. Clearly, the triangular number itself is always exactly half of the number of objects in such a figure, or: $$T_n = \frac{n(n+1)}{2} $$. The example $$T_4$$ follows:

This formula can be proven formally using mathematical induction. It is clearly true for $$1$$:

$$T_1 = \sum_{k=1}^{1}k = \frac{1(1 + 1)}{2} = \frac{2}{2} = 1.$$

Now assume that, for some natural number $$m$$, $$T_m = \sum_{k=1}^{m}k = \frac{m(m + 1)}{2}$$. Adding $$m + 1$$ to this yields

$$ \begin{align} \sum_{k=1}^{m}k + (m + 1) &= \frac{m(m + 1)}{2} + m + 1\\ &= \frac{m(m + 1) + 2m + 2}{2}\\ &= \frac{m^2 + m + 2m + 2}{2}\\ &= \frac{m^2 + 3m + 2}{2}\\ &= \frac{(m + 1)(m + 2)}{2}, \end{align} $$

so if the formula is true for $$m$$, it is true for $$m+1$$. Since it is clearly true for $$1$$, it is therefore true for $$2$$, $$3$$, and ultimately all natural numbers $$n$$ by induction.

The German mathematician and scientist, Carl Friedrich Gauss, is said to have found this relationship in his early youth, by multiplying $n⁄2$ pairs of numbers in the sum by the values of each pair $n + 1$. However, regardless of the truth of this story, Gauss was not the first to discover this formula, and some find it likely that its origin goes back to the Pythagoreans in the 5th century BC. The two formulas were described by the Irish monk Dicuil in about 816 in his Computus. An English translation of Dicuil's account is available.

The triangular number $T_{n}$ solves the handshake problem of counting the number of handshakes if each person in a room with $n + 1$ people shakes hands once with each person. In other words, the solution to the handshake problem of $n$ people is $T_{n−1}$. The function $T$ is the additive analog of the factorial function, which is the products of integers from 1 to $n$.

This same function was coined as the "Termial function" by Donald Knuth's The Art of Computer Programming and denoted n? (analog for the factorial notation n!)

For example, 10 termial is equivalent to:

$$ 10? = 1+2+3+4+5+6+7+8+9+10 = 55 $$

which of course, corresponds to the tenth triangular number.

The number of line segments between closest pairs of dots in the triangle can be represented in terms of the number of dots or with a recurrence relation: $$L_n = 3 T_{n-1}= 3{n \choose 2};L_n = L_{n-1} + 3(n-1), ~L_1 = 0.$$

In the limit, the ratio between the two numbers, dots and line segments is $$\lim_{n\to\infty} \frac{T_n}{L_n} = \frac{1}{3}.$$

Relations to other figurate numbers
Triangular numbers have a wide variety of relations to other figurate numbers.

Most simply, the sum of two consecutive triangular numbers is a square number, with the sum being the square of the difference between the two (and thus the difference of the two being the square root of the sum). Algebraically, $$T_n + T_{n-1} = \left (\frac{n^2}{2} + \frac{n}{2}\right) + \left(\frac{\left(n-1\right)^2}{2} + \frac{n-1}{2} \right ) = \left (\frac{n^2}{2} + \frac{n}{2}\right) + \left(\frac{n^2}{2} - \frac{n}{2} \right ) = n^2 = (T_n - T_{n-1})^2.$$

This fact can be demonstrated graphically by positioning the triangles in opposite directions to create a square:

The double of a triangular number, as in the visual proof from the above section, is called a pronic number.

There are infinitely many triangular numbers that are also square numbers; e.g., 1, 36, 1225. Some of them can be generated by a simple recursive formula: $$S_{n+1} = 4S_n \left( 8S_n + 1\right)$$ with $$S_1 = 1.$$

All square triangular numbers are found from the recursion $$S_n = 34S_{n-1} - S_{n-2} + 2$$ with $$S_0 = 0$$ and $$S_1 = 1.$$



Also, the square of the $n$th triangular number is the same as the sum of the cubes of the integers 1 to $n$. This can also be expressed as $$ \sum_{k=1}^n k^3 = \left(\sum_{k=1}^n k \right)^2.$$

The sum of the first $n$ triangular numbers is the $n$th tetrahedral number: $$ \sum_{k=1}^n T_k = \sum_{k=1}^n \frac{k(k+1)}{2} = \frac {n(n+1)(n+2)} {6}.$$

More generally, the difference between the $n$th $n$-gonal number and the $n$th $m$-gonal number is the $n$th triangular number. For example, the sixth heptagonal number (81) minus the sixth hexagonal number (66) equals the fifth triangular number, 15. Every other triangular number is a hexagonal number. Knowing the triangular numbers, one can reckon any centered polygonal number; the $(m + 1)$th centered $(n − 1)$-gonal number is obtained by the formula $$Ck_n = kT_{n-1}+1$$

where $n$ is a triangular number.

The positive difference of two triangular numbers is a trapezoidal number.

The pattern found for triangular numbers $$ \sum_{n_1=1}^{n_2}n_1=\binom{n_2+1}{2}$$ and for tetrahedral numbers $$ \sum_{n_2=1}^{n_3}\sum_{n_1=1}^{n_2} n_1=\binom{n_3+2}{3},$$ which uses binomial coefficients, can be generalized. This leads to the formula: $$ \sum_{n_{k-1}=1}^{n_k}\sum_{n_{k-2}=1}^{n_{k-1}} \dots \sum_{n_2=1}^{n_3}\sum_{n_1=1}^{n_2}n_1 =\binom{n_k+k-1}{k}$$

Other properties
Triangular numbers correspond to the first-degree case of Faulhaber's formula.

Alternating triangular numbers (1, 6, 15, 28, ...) are also hexagonal numbers.

Every even perfect number is triangular (as well as hexagonal), given by the formula $$M_p 2^{p-1} = \frac{M_p (M_p + 1)}2 = T_{M_p}$$ where $k$ is a Mersenne prime. No odd perfect numbers are known; hence, all known perfect numbers are triangular.

For example, the third triangular number is (3 × 2 =) 6, the seventh is (7 × 4 =) 28, the 31st is (31 × 16 =) 496, and the 127th is (127 × 64 =) 8128.

The final digit of a triangular number is 0, 1, 3, 5, 6, or 8, and thus such numbers never end in 2, 4, 7, or 9. A final 3 must be preceded by a 0 or 5; a final 8 must be preceded by a 2 or 7.

In base 10, the digital root of a nonzero triangular number is always 1, 3, 6, or 9. Hence, every triangular number is either divisible by three or has a remainder of 1 when divided by 9:

0 = 9 × 0

1 = 9 × 0 + 1

3 = 9 × 0 + 3

6 = 9 × 0 + 6

10 = 9 × 1 + 1

15 = 9 × 1 + 6

21 = 9 × 2 + 3

28 = 9 × 3 + 1

36 = 9 × 4

45 = 9 × 5

55 = 9 × 6 + 1

66 = 9 × 7 + 3

78 = 9 × 8 + 6

91 = 9 × 10 + 1

...

The digital root pattern for triangular numbers, repeating every nine terms, as shown above, is "1, 3, 6, 1, 6, 3, 1, 9, 9".

The converse of the statement above is, however, not always true. For example, the digital root of 12, which is not a triangular number, is 3 and divisible by three.

If $T$ is a triangular number, then $k$ is also a triangular number, given $M_{p}$ is an odd square and $x$. Note that $ax + b$ will always be a triangular number, because $a$, which yields all the odd squares are revealed by multiplying a triangular number by 8 and adding 1, and the process for $b = a − 1⁄8$ given $b$ is an odd square is the inverse of this operation. The first several pairs of this form (not counting $8T_{n} + 1 = (2n + 1)^{2}$) are: $b$, $a$, $1x + 0$, $9x + 1$, $25x + 3$, $49x + 6$, ... etc. Given $81x + 10$ is equal to $121x + 15$, these formulas yield $169x + 21$, $x$, $T_{n}$, $T_{3n + 1}$, and so on.

The sum of the reciprocals of all the nonzero triangular numbers is $$ \sum_{n=1}^{\infty}{1 \over {{n^2 + n} \over 2}} = 2\sum_{n=1}^{\infty}{1 \over {n^2 + n}} = 2 .$$

This can be shown by using the basic sum of a telescoping series: $$ \sum_{n=1}^{\infty}{1 \over {n(n+1)}} = 1 .$$

Two other formulas regarding triangular numbers are $$T_{a+b} = T_a + T_b + ab$$ and $$T_{ab} = T_aT_b + T_{a-1}T_{b-1},$$ both of which can easily be established either by looking at dot patterns (see above) or with some simple algebra.

In 1796, Gauss discovered that every positive integer is representable as a sum of three triangular numbers (possibly including $T_{5n + 2}$ = 0), writing in his diary his famous words, "ΕΥΡΗΚΑ! num = Δ + Δ + Δ". This theorem does not imply that the triangular numbers are different (as in the case of 20 = 10 + 10 + 0), nor that a solution with exactly three nonzero triangular numbers must exist. This is a special case of the Fermat polygonal number theorem.

The largest triangular number of the form $T_{7n + 3}$ is 4095 (see Ramanujan–Nagell equation).

Wacław Franciszek Sierpiński posed the question as to the existence of four distinct triangular numbers in geometric progression. It was conjectured by Polish mathematician Kazimierz Szymiczek to be impossible and was later proven by Fang and Chen in 2007.

Formulas involving expressing an integer as the sum of triangular numbers are connected to theta functions, in particular the Ramanujan theta function.

The sum of two consecutive triangular numbers is a square number since:


 * $$T_{n - 1} + T_{n}$$
 * $$= \frac{1}{2} \, n(n-1) + \frac{1}{2} \, n (n + 1)$$
 * $$= \frac{1}{2} \, n\Bigl((n - 1) + (n + 1)\Bigr)$$
 * $$= n^2$$

This property, colloquially known as the theorem of Theon of Smyrna, is visually demonstrated in the following sum, which represents $$T_{4} + T_{5} = 5^2$$ as digit sums:

$$\begin{array}{ccccccc} & 4 & 3 & 2 & 1 & \\ +  & 1 & 2 & 3 & 4 & 5 \\ \hline & 5 & 5 & 5 & 5 & 5 \end{array}$$

Applications
A fully connected network of $T_{9n + 4}$ computing devices requires the presence of $T_{0}$ cables or other connections; this is equivalent to the handshake problem mentioned above.

In a tournament format that uses a round-robin group stage, the number of matches that need to be played between $2^{k} −&thinsp;1$ teams is equal to the triangular number $n$. For example, a group stage with 4 teams requires 6 matches, and a group stage with 8 teams requires 28 matches. This is also equivalent to the handshake problem and fully connected network problems.

One way of calculating the depreciation of an asset is the sum-of-years' digits method, which involves finding $T_{n −&thinsp;1}$, where $n$ is the length in years of the asset's useful life. Each year, the item loses $T_{n −&thinsp;1}$, where $T_{n}$ is the item's beginning value (in units of currency), $n$ is its final salvage value, $(b − s) × n − y⁄T_{n}$ is the total number of years the item is usable, and $b$ the current year in the depreciation schedule. Under this method, an item with a usable life of $s$ = 4 years would lose $4⁄10$ of its "losable" value in the first year, $3⁄10$ in the second, $2⁄10$ in the third, and $1⁄10$ in the fourth, accumulating a total depreciation of $10⁄10$ (the whole) of the losable value.

Board game designers Geoffrey Engelstein and Isaac Shalev describe triangular numbers as having achieved "nearly the status of a mantra or koan among game designers", describing them as "deeply intuitive" and "featured in an enormous number of games, [proving] incredibly versatile at providing escalating rewards for larger sets without overly incentivizing specialization to the exclusion of all other strategies".

Triangular roots and tests for triangular numbers
By analogy with the square root of $x$, one can define the (positive) triangular root of $x$ as the number $n$ such that $y$: $$n = \frac{\sqrt{8x+1}-1}{2}$$

which follows immediately from the quadratic formula. So an integer $x$ is triangular if and only if $n$ is a square. Equivalently, if the positive triangular root $n$ of $x$ is an integer, then $x$ is the $n$th triangular number.

Alternative name
As stated, an alternative name proposed by Donald Knuth, by analogy to factorials, is "termial", with the notation $n$? for the $T_{n} = x$th triangular number. However, although some other sources use this name and notation, they are not in wide use.