Difference between revisions of "Pólya conjecture"

Revision as of 18:19, August 8, 2021

In 1919, the Hungarian mathematician Georg Pólya made the following empirische Betrachtung (empirical observation)^[1]:

“

[D]ie Anzahl derjenigen unter den Zahlen 1,2,3,…,n, die eine gerade Anzahl von Primfaktoren haben, ist nicht größer als die Anzahl derjenigen, die eine ungerade Anzahl haben (für n≧2).

”

“

The quantity of number 1,2,3,…,n, having a even number of prime factors is not bigger than the quantity of those having an odd number (for n≧2).

”

This statement is known as the Pólya conjecture.

Footnotes

↑ "Verschiedene Bemerkungen zur Zahlentheorie." by 'Georg Pólya' (1919).

[1] "Verschiedene Bemerkungen zur Zahlentheorie." by 'Georg Pólya' (1919).

[1]

@@ Line 1: / Line 1: @@
 In 1919, the [[Hungary|Hungarian]] [[Mathematics|mathematician]] [[Georg Pólya]] made the following ''empirische Betrachtung'' (''empirical observation'')<ref>[https://zbmath.org/?format=complete&q=an:47.0882.06 "Verschiedene Bemerkungen zur Zahlentheorie." by 'Georg Pólya' (1919).]</ref>:
 {{cquote|[D]ie Anzahl derjenigen unter den Zahlen 1,2,3,…,n, die eine gerade Anzahl von Primfaktoren haben, ist nicht größer als die Anzahl derjenigen, die eine ungerade Anzahl haben (für n≧2). }}
-{{cquote|The quantity of number 1,2,3,…,n, having a even number of [[prime factorization|prime factor]]s is not bigger than the quantity of those having ann odd number (for n≧2).}}
+{{cquote|The quantity of number 1,2,3,…,n, having a even number of [[prime factorization|prime factor]]s is not bigger than the quantity of those having an odd number (for n≧2).}}
+This statement is known as the '''Pólya conjecture'''.
 ==Footnotes==

Difference between revisions of "Pólya conjecture"

Revision as of 18:19, August 8, 2021

Footnotes

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