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2 de out. de 2009 · Lambert, Johann Heinrich, 1728-1777; Anding, E. (Ernst), 1860-Publication date 1892 Topics Photometry Publisher ... PDF download. download 1 file ...
JOHANN HEINRICH LAMBERT (August 26, 1728 – September 25, 1777) by HEINZ KLAUS STRICK, Germany. If you look at the conditions under which JOHANN HEINRICH LAMBERT spent the first years of his life, you can only marvel at what he became. His family, originally from Lorraine, had settled in the free imperial city of Mulhouse because they could ...
Johann Heinrich Lambert (alemán: [ˈlambɛɐ̯t], Jean-Henri Lambert en francés; 26 o 28 de agosto de 1728 - 25 de septiembre de 1777) fue un erudito de la República de Mulhouse, generalmente conocido como suizo o el francés, que hizo importantes contribuciones a las materias de matemáticas, física (particularmente óptica), filosofía, astronomía y proyecciones cartográficas.
Johann Heinrich Lambert (born August 26, 1728, Mülhausen, Alsace—died September 25, 1777, Berlin, Prussia [Germany]) was a Swiss German mathematician, astronomer, physicist, and philosopher who provided the first rigorous proof that π (the ratio of a circle’s circumference to its diameter) is irrational, meaning that it cannot be expressed as the quotient of two integers.
25 de mar. de 2024 · Gestorben 1777. Mann. Johann Heinrich Lambert. (Lithographie von Godefroy Engelmann, 1829) Johann Heinrich Lambert (* 26. August 1728 in Mülhausen (Elsass); † 25. September 1777 in Berlin) war ein schweizerisch-elsässischer Mathematiker, Logiker, Physiker und Philosoph der Aufklärung, der u. a. die Irrationalität der Zahl Pi bewies.
Andreas Kraus: Lambert, Johann Heinrich. In: Neue Deutsche Biographie (NDB). Band 13, Duncker & Humblot, Berlin 1982, ISBN 3-428-00194-X, S. 437–439 MDZ München; Weblinks [Bearbeiten] Weitere Digitalisate: Johann Heinrich Lambert (1728–1777) Collected Works - Sämtliche Werke Online kuttaka.org
In the 1760s, Johann Heinrich Lambert was the first to prove that the number π is irrational, meaning it cannot be expressed as a fraction , where and are both integers. In the 19th century, Charles Hermite found a proof that requires no prerequisite knowledge beyond basic calculus.
