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, ... (sequence A005898 in the OEIS).
FormulasEdit
The centered cube number for a pattern with Template:Mvar concentric layers around the central point is given by the formula<ref>Template:Citation</ref>
- <math>n^3 + (n + 1)^3 = (2n+1)\left(n^2+n+1\right).</math>
The same number can also be expressed as a trapezoidal number (difference of two triangular numbers), or a sum of consecutive numbers, as<ref>Template:Citation.</ref>
- <math>\binom{(n+1)^2+1}{2}-\binom{n^2+1}{2} = (n^2+1)+(n^2+2)+\cdots+(n+1)^2.</math>
PropertiesEdit
Because of the factorization Template:Math, it is impossible for a centered cube number to be a prime number.<ref>Template:Cite OEIS</ref> The only centered cube numbers which are also the square numbers are 1 and 9,<ref>Template:Citation.</ref><ref>Template:Citation.</ref> 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.
See alsoEdit
ReferencesEdit
External linksEdit
Template:Figurate numbers Template:Classes of natural numbers