Nonagonal number: Difference between revisions

A nonagonal number (or an enneagonal number) is a figurate number that extends the concept of triangular and square numbers to the nonagon (a nine-sided polygon).^[1] However, unlike the triangular and square numbers, the patterns involved in the construction of nonagonal numbers are not rotationally symmetrical. Specifically, the nth nonagonal number counts the number of dots in a pattern of n nested nonagons, all sharing a common corner, where the ith nonagon in the pattern has sides made of i dots spaced one unit apart from each other. The nonagonal number for n is given by the formula:^[2]

${\displaystyle {\frac {n(7n-5)}{2}}.}$

The first few nonagonal numbers are:

0, 1, 9, 24, 46, 75, 111, 154, 204, 261, 325, 396, 474, 559, 651, 750, 856, 969, 1089, 1216, 1350, 1491, 1639, 1794, 1956, 2125, 2301, 2484, 2674, 2871, 3075, 3286, 3504, 3729, 3961, 4200, 4446, 4699, 4959, 5226, 5500, 5781, 6069, 6364, 6666, 6975, 7291, 7614, 7944, 8281, 8625, 8976, 9334, 9699. (sequence A001106 in the OEIS)

The parity of nonagonal numbers follows the pattern odd-odd-even-even. The digital root pattern for nonagonal numbers, repeating every nine terms, as shown above, is "1, 9, 6, 1, 3, 3, 1, 6, 9".

Letting ${\displaystyle N_{n}}$ denote the n^th nonagonal number, and using the formula ${\displaystyle T_{n}={\frac {n(n+1)}{2}}}$ for the n^th triangular number,

${\displaystyle 7N_{n}+3=T_{7n-3}.}$

${\displaystyle {\mathsf {Let}}~x={\frac {{\sqrt {56n+25}}+5}{14}}.}$

If x is an integer, then n is the x-th nonagonal number. If x is not an integer, then n is not nonagonal.

• Centered nonagonal number

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