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Cantor, Georg Ferdinand Ludwig Philipp (1845-1918) Fig 1. Georg Cantor. Georg Cantor was a Russian-born German mathematician who founded set theory and introduced the concept of transfinite numbers. His shocking and counterintuitive ideas about infinity drew widespread criticism before being accepted as a cornerstone of modern mathematical theory.
غيورغ فرديناند لودفيغ فيليب كانتور ( ( بالإنجليزية: Georg Ferdinand Ludwig Philipp Cantor ) عاش ما بين 3 مارس 1845 - 6 يناير 1918م عالم رياضيات ألماني يشار إليه بأنه واضع نظرية المجموعات الحديثة. [11] [12] [13] ويعتبر أول ...
16 de ago. de 2023 · Cantor-Bernstein-Schröder Theorem (with Felix Bernstein and Friedrich Wilhelm Karl Ernst Schröder) (also known as Bernstein-Schröder Theorem) Cantor-Dedekind Hypothesis (with Julius Wilhelm Richard Dedekind) Real Numbers are Uncountable; Results named for Georg Ferdinand Ludwig Philipp Cantor can be found here.
"Cantor, Georg Ferdinand Ludwig Philipp" published on by Oxford University Press. (1845–1918) German mathematicianThe son of a prosperous merchant of St. Petersburg, at that time the capital of Russia, Cantor...
Georg Ferdinand Ludwig Philipp Cantor, nemški matematik, * 3. marec (19. februar, ruski koledar) 1845, Sankt Peterburg, Ruski imperij (sedaj Rusija), † 6. januar 1918, Halle, Saška, Nemško cesarstvo (sedaj Nemčija).:351. Cantor je najbolj znan kot tvorec teorije množic, ki je postala ena osnovnih teorij v matematiki.
23 de mai. de 2018 · The German mathematician Georg Ferdinand Ludwig Philipp Cantor (1845-1918) was noted for his theory of sets and his bold analysis of the "actual" infinite, which provoked a critical examination of the foundations of mathematics and eventually transformed nearly every branch. Georg Cantor was born in St. Petersburg, Russia, on March 3, 1845.
30 de mai. de 2021 · Tam adı: Georg Ferdinand Ludwig Philipp Cantor’dur. Kümeler kuramının kurucusudur. Kümeler arasında birebir eşlemenin önemini belirterek, “sonsuz küme” kavramına matematiksel bir tanım getirmiş ve gerçel sayıların sonsuzluğunun doğal sayıların sonsuzluğundan “daha büyük” olduğunu kanıtlamıştır.
