Decagonal number

From Free net encyclopedia

Revision as of 17:23, 3 March 2006; view current revision
←Older revision | Newer revision→

A decagonal number is a figurate number that represents a decagon. The decagonal number for n is given by the formula 4n2 - 3n, with n > 0. The first few decagonal numbers are

1, 10, 27, 52, 85, 126, 175, 232, 297, 370, 451, 540, 637, 742, 855, 976, 1105, 1242, 1387, 1540, 1701, 1870, 2047, 2232, 2425, 2626, 2835, 3052, 3277, 3510, 3751, 4000, 4257, 4522, 4795, 5076, 5365, 5662, 5967, 6280, 6601, 6930, 7267, 7612, 7965, 8326, 8695, 9072, 9457, 9850

The decagonal number for n can also be calculated by adding the square of n to thrice the nth heteromecic number, or to put it algebraically, <math>D_n = n^2 + 3(n^2 - n)</math>.

Decagonal numbers consistently alternate parity.

Image:Integer.gif This number article is a stub. You can help by expanding it.
fr:Nombre décagonal

it:Numero decagonale

Retrieved from "http://www.netipedia.com/index.php/Decagonal_number"