3511 (number)

	List of numbers — Integers ← 0 [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]] [[{{#expr:{{{1}}}{{{factor}}}1000}} (number)\|{{#ifeq:{{{1}}}\|10\|→\|{{#expr:{{{1}}}{{{factor}}}}}k}}]]
Cardinal	three thousand five hundred eleven
Ordinal	3511th; (three thousand five hundred eleventh)
Factorization	prime
Prime	Yes
Divisors	1, 3511
Greek numeral	,ΓΦΙΑ´
Roman numeral	MMMDXI
Binary	1101101101112
Ternary	112110013
Quaternary	3123134
Quinary	1030215
Senary	241316
Octal	66678
Duodecimal	204712
Hexadecimal	DB716
Vigesimal	8FB20
Base 36	2PJ36

3511 (three thousand, five hundred and eleven) is the natural number following 3510 and preceding 3512.

3511 is a prime number, and is also an emirp: a different prime when its digits are reversed.^[1]

3511 is a Wieferich prime,^[2] found to be so by N. G. W. H. Beeger in 1922^[3] and the largest known^[4] – the only other being 1093.^[5] If any other Wieferich primes exist, they must be greater than 6.7×10¹⁵.^[4]

3511 is the 27th centered decagonal number.^[6]

References

↑ Weisstein, Eric W. "Emirp". MathWorld.
↑ The Prime Glossary: Wieferich prime
↑ Beeger, N. G. W. H. (1922), "On a new case of the congruence 2^{p − 1} ≡ 1 (p²)", Messenger of Mathematics, 51: 149–150, archived from the original on 2011-06-29
1 2 Dorais, F. G.; Klyve, D. (2011). "A Wieferich Prime Search Up to 6.7×10¹⁵" (PDF). Journal of Integer Sequences. 14 (9). Zbl 1278.11003. Retrieved 2011-10-23.
↑ Meissner, W. (1913), "Über die Teilbarkeit von 2^p − 2 durch das Quadrat der Primzahl p=1093", Sitzungsber. D. Königl. Preuss. Akad. D. Wiss. (in German), Berlin, Zweiter Halbband. Juli bis Dezember: 663–667
↑ "Sloane's A062786 : Centered 10-gonal numbers". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-03.

This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.

[mathworld-1] Weisstein, Eric W. "Emirp". MathWorld.

[The_Prime_Glossary-2] The Prime Glossary: Wieferich prime

[3] Beeger, N. G. W. H. (1922), "On a new case of the congruence 2^{p − 1} ≡ 1 (p²)", Messenger of Mathematics, 51: 149–150, archived from the original on 2011-06-29

[Dorais-4] 1 2 Dorais, F. G.; Klyve, D. (2011). "A Wieferich Prime Search Up to 6.7×10¹⁵" (PDF). Journal of Integer Sequences. 14 (9). Zbl 1278.11003. Retrieved 2011-10-23.

[5] Meissner, W. (1913), "Über die Teilbarkeit von 2^p − 2 durch das Quadrat der Primzahl p=1093", Sitzungsber. D. Königl. Preuss. Akad. D. Wiss. (in German), Berlin, Zweiter Halbband. Juli bis Dezember: 663–667

[6] "Sloane's A062786 : Centered 10-gonal numbers". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-03.