# Universal Peculiar Linear Mean Relationships in All Polynomials

**Authors:** Gregory Gerard Wojnar, Daniel Sz. Wojnar, Leon Q. Brin

arXiv: 1706.08381 · 2017-10-24

## TL;DR

This paper uncovers universal linear mean relationships involving polynomial roots and their derivatives across all degrees, revealing new patterns and connections to classical polynomials and number sequences.

## Contribution

It generalizes mean slope relationships for polynomials of any degree and provides a systematic procedure to determine these relationships, extending known cases to all dimensions.

## Key findings

- Established explicit relationships for polynomials up to degree 40.
- Discovered a single universal relationship in even dimensions and a two-parameter family in odd dimensions.
- Connected these relationships to classical polynomials and Stirling numbers.

## Abstract

In any cubic polynomial, the average of the slopes at the $3$ roots is the negation of the slope at the average of the roots. In any quartic, the average of the slopes at the $4$ roots is twice the negation of the slope at the average of the roots. We generalize such situations and present a procedure for determining all such relationships for polynomials of any degree. E.g., in any septic $f$, letting $\overline{f}_n$ denote the mean $f$ value over all zeroes of the derivative $f^{\left(n\right)}$, it holds that $37$ $\overline{f}_1-150$ $\overline{f}_3+200\,\overline{f}_4-135\,\overline{f}_5+48\,% \overline{f}_6=0$; and in any quartic it holds that $5$ $\overline{f}_1-6$ $\overline{f}_2+1\,\overline{f}_3=0$. Having calculated such relationships in all dimensions up to 40, in all even dimensions there is a single relationship, in all odd dimensions there is a two-dimensional family of relationships. We come upon connections to Tchebyshev, Bernoulli, \& Euler polynomials, and Stirling numbers.

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## References

13 references — full list in the complete paper: https://tomesphere.com/paper/1706.08381/full.md

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Source: https://tomesphere.com/paper/1706.08381