Generalized taxicab number

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Unsolved problems in mathematics: Does there exist any number that can be expressed as a sum of 2 positive 5th powers in at least 2 different ways, i.e., a⁵ + b⁵ = c⁵ + d⁵?

In mathematics, the generalized taxicab number Taxicab(k, j, n) is the smallest number which can be expressed as the sum of j kth positive powers in n different ways. For k = 3 and j = 2, they coincide with Taxicab numbers.

It has been shown by Euler that

Taxicab(4,2,2) = 635318657 = 59 4 + 158 4 = 133 4 + 134 4

However, Taxicab(5, 2, n) is not known for any n ≥ 2; No positive integer is known at all which can be written as the sum of two fifth powers in more than one way.

[edit] External links

Walter Schneider: Taxicab numbers

Categories: Number theory

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This page was last modified 19:27, 20 January 2008 by Wikipedia user Bkell. Based on work by Wikipedia user(s) PrimeHunter, Paxinum, Aznph8playa2, Oleg Alexandrov, FvdP and Schneelocke and Anonymous user(s) of Wikipedia.
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