May 17, 2019 · In this paper we generalize the definition of taxicab numbers, as there is really nothing special about using exactly two cubes (except for ...

In this paper we prove that for any given positive integers $m$ and $t$, there exists a number $s$ such $T(s+k,m,t) =T(s,m,t) +k$ for every $k \geq 0$. The ...

Jan 25, 2019 · Abstract. The generalized taxicab number T(n, m, t) is equal to the smallest number that is the sum of n positive mth powers in t ways.

It is proved that for any given positive integers $m and $t, there exists a number $s$ such as T(s+k,m,t) =T(s, m, t) +k for every $k \geq 0$, the smallest ...

This paper brings numbers in such a way that both sides of the expressions are with same digits. One side is digits with factorial and other side are with same ...

Missing: Seeds | Show results with:Seeds

Jun 1, 2019 · "Seeds for Generalized Taxicab Numbers" New paper from @JeffDinitz & colleagues https://t.co/hRLiI6Sp7I.

Apr 12, 2020 · The taxicab number G.H. Hardy said was an uninteresting number. The great Ramanujan countered that it was a very interesting number. 1729 is the ...

Math. Contemp, 17 (2019), 369 – 395. Seeds for generalized taxicab numbers (with R. Games and R. Roth), J. Integer Seq. 22 (2019), Article 19.3.3, 16 pages ...