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A polymath [a] [1] or polyhistor [b] [2] ... the polymath is a person with a level of expertise that is able to "put a significant amount of time and effort into ...
Hermann Grassmann, polymath; Michael Faraday, a chemist and physicist. Although Faraday received little formal education and knew little of higher mathematics, such as calculus, he was one of the most influential scientists in history. Some historians [58] of science refer to him as the best experimentalist in the history of science.
A polymath is a person (also known as Renaissance Person), whose expertise spans a significant number of different subject areas and who has extraordinarily broad and comprehensive knowledge. Polymath may also refer to: Polymath, 1974 novel by John Brunner; The Polymath, a non-fiction book by Waqas Ahmed, first published 2018
The shift in meaning for mathema is likely a result of the rapid categorization during the time of Plato and Aristotle of their mathemata in terms of education: arithmetic, geometry, astronomy, and music (the quadrivium), which the Greeks found to create a "natural grouping" of mathematical (in the modern usage; "doctrina mathematica" in the ancient usage) precepts.
Galileo di Vincenzo Bonaiuti de' Galilei (15 February 1564 – 8 January 1642), commonly referred to as Galileo Galilei (/ ˌ ɡ æ l ɪ ˈ l eɪ oʊ ˌ ɡ æ l ɪ ˈ l eɪ /, US also / ˌ ɡ æ l ɪ ˈ l iː oʊ-/; Italian: [ɡaliˈlɛːo ɡaliˈlɛːi]) or mononymously as Galileo, was an Italian [a] astronomer, physicist and engineer, sometimes described as a polymath.
Robert Hooke FRS (/ h ʊ k /; 18 July 1635 – 3 March 1703) [4] [a] was an English polymath who was active as a physicist ("natural philosopher"), astronomer, geologist, meteorologist and architect. [5] He is credited as one of the first scientists to investigate living things at microscopic scale in 1665, [6] using a compound microscope that ...
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Euler describes 18 such genres, with the general definition 2 m A, where A is the "exponent" of the genre (i.e. the sum of the exponents of 3 and 5) and 2 m (where "m is an indefinite number, small or large, so long as the sounds are perceptible" [114]), expresses that the relation holds independently of the number of octaves concerned.