Higher dimensional visual proofs, Nicomachus' 4D Theorem and the mysterious irreducible factor (3n2+3n-1) in the sum of fourth powers

Abstract

Sums of powers Sp(n)=Σk=1n kp can be described by Faulhaber's formula in terms of the Bernoulli numbers. The first cases of this formula admit visual proofs of various kinds, which lead to factorized Faulhaber polynomials. In this article we present a technique that yields higher-dimensional visual proofs for these factorized formulas, providing a geometric interpretation of the roots that appear. In particular, we prove Nicomachus's Theorem in four dimensions, and we visually explain the appearance, in dimension five, of the irreducible factor (3n2 +3n-1) in the polynomial ring over the rational numbers.