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Difference between revisions of "Leyland number"

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==Reservation history==
 
==Reservation history==
 +
:x=20001-40000, y=11-200 completed by [[Serge Batalov]], 2014-05-03
 +
:x=15001-20000, y=1001-2000 completed by [[Serge Batalov]], 2014-05-14
 +
:x=40001-330000, y=11-17 completed by [[Serge Batalov]], 2014-05-16
 +
:x=330001-400000, y=11-17 completed by [[Serge Batalov]], 2014-05-17
 +
:x=400001-500000, y=11-17 completed by [[Serge Batalov]], 2014-05-19
 +
:x=20001-30000, y=801-1000 reserved by [[Dylan Delgado]], 2019-07-24
  
 
==Contribution of Leyland numbers==
 
==Contribution of Leyland numbers==

Revision as of 01:21, 1 August 2019

A Leyland number is a number that can be expressed in the form [math]\displaystyle{ x^y+y^x }[/math], where x and y are positive integers with the condition 1 < x ≤ y. These numbers are named after Paul Leyland, who first studied these numbers in 1994. The first few nontrivial Leyland numbers are given by OEIS sequence A076980.

A Leyland prime is a Leyland number which is also a prime (see sequence A094133 in OEIS).

The second kind of numbers are of the form [math]\displaystyle{ x^y-y^x }[/math].

History

Data

The data tables contains for every number the x and y values, the number of digits, the Leyland number[1], dates and persons of finding and prooving if available and the program used to proove a prime.

Leyland numbers

There are Expression error: Unrecognized punctuation character ",". numbers: 307 proven primes and 1,507 PRP's

Leyland numbers second kind

Reservation history

x=20001-40000, y=11-200 completed by Serge Batalov, 2014-05-03
x=15001-20000, y=1001-2000 completed by Serge Batalov, 2014-05-14
x=40001-330000, y=11-17 completed by Serge Batalov, 2014-05-16
x=330001-400000, y=11-17 completed by Serge Batalov, 2014-05-17
x=400001-500000, y=11-17 completed by Serge Batalov, 2014-05-19
x=20001-30000, y=801-1000 reserved by Dylan Delgado, 2019-07-24

Contribution of Leyland numbers

This graph can be found here:

Leyland P contrib.png

References

External links

Number classes
General numbers
Special numbers
Prime numbers