# Powerful numbers in $(1^{\ell}+q^{\ell})(2^{\ell}+q^{\ell})\cdots   (n^{\ell}+q^{\ell})$

**Authors:** Quan-Hui Yang, Qing-Qing Zhao

arXiv: 1706.03350 · 2017-06-13

## TL;DR

This paper extends previous results by proving that certain products involving powers and a positive integer q are not powerful numbers for large enough n, covering odd prime powers and all positive odd integers.

## Contribution

It generalizes earlier work by establishing non-powerfulness of products for broader classes of exponents and sufficiently large n, including odd prime powers and all positive odd integers.

## Key findings

- For odd prime powers , the product is not powerful if n ;
- For all positive odd , there exists N_{q,} such that for n  N_{q,}, the product is not powerful.
- The results extend the non-powerfulness property to more general exponents and larger ranges of n.

## Abstract

Let $q$ be a positive integer. Recently, Niu and Liu proved that if $n\ge \max\{q,1198-q\}$, then the product $(1^3+q^3)(2^3+q^3)\cdots (n^3+q^3)$ is not a powerful number. In this note, we prove that (i) for any odd prime power $\ell$ and $n\ge \max\{q,11-q\}$, the product $(1^{\ell}+q^{\ell})(2^{\ell}+q^{\ell})\cdots (n^{\ell}+q^{\ell})$ is not a powerful number; (2) for any positive odd integer $\ell$, there exists an integer $N_{q,\ell}$ such that for any positive integer $n\ge N_{q,\ell}$, the product $(1^{\ell}+q^{\ell})(2^{\ell}+q^{\ell})\cdots (n^{\ell}+q^{\ell})$ is not a powerful number.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1706.03350/full.md

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Source: https://tomesphere.com/paper/1706.03350