Hexagonal number

A hexagonal number is a figurate number, The nth hexagonal number will be the number of points in a hexagon with n regularly spaced points on a side.

The formula for the nth hexagonal number

${\displaystyle h_{n}=n(2n-1)\,\!}$

The first few hexagonal numbers (sequence A000384 in the OEIS) are:

1, 6, 15, 28, 45, 66, 91, 120, 153, 190, 231, 276, 325, 378, 435, 496, 561, 630, 703, 780, 861, 946

Every hexagonal number is a triangular number, but not every triangular number is a hexagonal number. Like a triangular number, the digital root in base 10 of a hexagonal number can only be 1, 3, 6, or 9.

The largest number that cannot be written as a sum of at most four hexagonal numbers is 130. Adrien-Marie Legendre proved in 1830 that any integer greater than 1791 can be expressed in this way.

Hexagonal numbers can be rearranged into rectangular numbers n long and 2n−1 tall (or vice versa).

Hexagonal numbers should not be confused with centered hexagonal numbers, which model the standard packaging of Vienna sausages. To avoid ambiguity, hexagonal numbers are sometimes called "cornered hexagonal numbers".

One can efficiently test whether a positive integer x is an hexagonal number by computing

${\displaystyle n={\frac {{\sqrt {8x+1}}+1}{4}}.}$

If n is an integer, then x is the nth hexagonal number. If n is not an integer, then x is not hexagonal.

The nth number of the hexagonal sequence can also be expressed by using the summation (Sigma notation).

${\displaystyle \!\ \sum _{i=1}^{n}{4i-3}}$

• Mathworld entry on Hexagonal Number