Centered cube number

Template:Short description Template:Use American English Template:Use mdy dates Template:Infobox integer sequence A centered cube number is a centered figurate number that counts the points in a three-dimensional pattern formed by a point surrounded by concentric cubical layers of points, with Template:Math points on the square faces of the Template:Mvarth layer. Equivalently, it is the number of points in a body-centered cubic pattern within a cube that has Template:Math points along each of its edges.

The first few centered cube numbers are

1, 9, 35, 91, 189, 341, 559, 855, 1241, 1729, 2331, 3059, 3925, 4941, 6119, 7471, 9009, ... Template:OEIS.

The centered cube number for a pattern with Template:Mvar concentric layers around the central point is given by the formula^[1]

${\displaystyle n^3+(n+1{)}^3=(2n+1)(n^2+n+1).}$

The same number can also be expressed as a trapezoidal number (difference of two triangular numbers), or a sum of consecutive numbers, as^[2]

${\displaystyle {\displaystyle (\genfrac{}{}{0ex}{}{(n+1{)}^2+1}{2})}-{\displaystyle (\genfrac{}{}{0ex}{}{n^2+1}{2})}=(n^2+1)+(n^2+2)+\cdots +(n+1{)}^2.}$

Because of the factorization Template:Math, it is impossible for a centered cube number to be a prime number.^[3] The only centered cube numbers which are also the square numbers are 1 and 9,^[4][5] which can be shown by solving Template:Math, the only integer solutions being (x,y) from {(0,0), (1,2), (3,6), (12,42)}, By substituting a=(x-1)/2 and b=y/2, we obtain x^2=2y^3+3y^2+3y+1. This gives only (a,b) from {(-1/2,0), (0,1), (1,3), (11/2,21)} where a,b are half-integers.

• Cube number

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• Template:Mathworld

Template:Figurate numbers Template:Classes of natural numbers