Pentatope number

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In number theory, a pentatope number is a number in the fifth cell of any row of Pascal's triangle starting with the 5-term row Template:Nowrap, either from left to right or from right to left. It is named because it represents the number of 3-dimensional unit spheres which can be packed into a pentatope (a 4-dimensional tetrahedron) of increasing side lengths.

The first few numbers of this kind are:

1, 5, 15, 35, 70, 126, 210, 330, 495, 715, 1001, 1365 Template:OEIS

Pentatope numbers belong to the class of figurate numbers, which can be represented as regular, discrete geometric patterns.^[1]

The formula for the Template:Mvarth pentatope number is represented by the 4th rising factorial of Template:Mvar divided by the factorial of 4:

${\displaystyle P_n=\frac{n^{\bar{4}}}{4!}=\frac{n(n+1)(n+2)(n+3)}{24}.}$

The pentatope numbers can also be represented as binomial coefficients:

${\displaystyle P_n={\displaystyle (\genfrac{}{}{0ex}{}{n+3}{4})},}$

which is the number of distinct quadruples that can be selected from Template:Math objects, and it is read aloud as "Template:Math plus three choose four".

Two of every three pentatope numbers are also pentagonal numbers. To be precise, the Template:Mathth pentatope number is always the ${\displaystyle \left(\frac{3k^2-k}{2}\right)}$th pentagonal number and the Template:Mathth pentatope number is always the ${\displaystyle \left(\frac{3k^2+k}{2}\right)}$th pentagonal number. The Template:Mathth pentatope number is the generalized pentagonal number obtained by taking the negative index ${\displaystyle -\frac{3k^2+k}{2}}$ in the formula for pentagonal numbers. (These expressions always give integers).^[2]

The infinite sum of the reciprocals of all pentatope numbers is Template:Sfrac.^[3] This can be derived using telescoping series.

${\displaystyle {\displaystyle \sum _{n=1}^{\mathrm{\infty }}}\frac{4!}{n(n+1)(n+2)(n+3)}=\frac{4}{3}.}$

Pentatope numbers can be represented as the sum of the first Template:Mvar tetrahedral numbers:^[2]

${\displaystyle P_n={\displaystyle \sum _{k=1}^n}{\mathrm{T}\mathrm{e}}_k,}$

and are also related to tetrahedral numbers themselves:

${\displaystyle P_n=\frac{1}{4}(n+3){\mathrm{T}\mathrm{e}}_n.}$

No prime number is the predecessor of a pentatope number (it needs to check only -1 and Template:Nowrap), and the largest semiprime which is the predecessor of a pentatope number is 1819.

Similarly, the only primes preceding a 6-simplex number are 83 and 461.

We can derive this test from the formula for the Template:Mvarth pentatope number.

Given a positive integer Template:Mvar, to test whether it is a pentatope number we can compute the positive root using Ferrari's method:

${\displaystyle n=\frac{\sqrt{5+4\sqrt{24x+1}}-3}{2}.}$

The number Template:Mvar is pentatope if and only if Template:Mvar is a natural number. In that case Template:Mvar is the Template:Mvarth pentatope number.

The generating function for pentatope numbers is^[4]

${\displaystyle \frac{x}{(1-x{)}^5}=x+5x^2+15x^3+35x^4+\dots .}$

In biochemistry, the pentatope numbers represent the number of possible arrangements of n different polypeptide subunits in a tetrameric (tetrahedral) protein.

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