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William Kingdon Clifford (4 May 1845 – 3 March 1879) was a British mathematician and philosopher.Building on the work of Hermann Grassmann, he introduced what is now termed geometric algebra, a special case of the Clifford algebra named in his honour.
In the context of the novel, the quotes were selected from Long's much longer memoirs (which make up a significant portion of the novel). Some of the quotes are humorous or ironic, some philosophical, and some merely quirky. They range in length from one sentence to multiple paragraphs. For example: Always store beer in a cold, dark place.
Wigner argues that mathematical concepts have applicability far beyond the context in which they were originally developed. He writes: "It is important to point out that the mathematical formulation of the physicist's often crude experience leads in an uncanny number of cases to an amazingly accurate description of a large class of phenomena."
“What makes capitalism work is the fact that if you’re an able-bodied young person, if you refuse to work, you suffer a fair amount of agony, and because of that agony, the whole economic ...
Too many Americans still rely on a famous quote from the movie Reality Bites: I was told there would be no math. But what's fascinating about all of this is that the standard response -- that we ...
A Mathematician's Apology 1st edition Author G. H. Hardy Subjects Philosophy of mathematics, mathematical beauty Publisher Cambridge University Press Publication date 1940 OCLC 488849413 A Mathematician's Apology is a 1940 essay by British mathematician G. H. Hardy which defends the pursuit of mathematics for its own sake. Central to Hardy's "apology" – in the sense of a formal justification ...
How Not to Be Wrong explains the mathematics behind some of simplest day-to-day thinking. [4] It then goes into more complex decisions people make. [5] [6] For example, Ellenberg explains many misconceptions about lotteries and whether or not they can be mathematically beaten.
Aristotelian views of (cardinal or counting) numbers begin with Aristotle's observation that the number of a heap or collection is relative to the unit or measure chosen: "'number' means a measured plurality and a plurality of measures ... the measure must always be some identical thing predicable of all the things it measures, e.g. if the things are horses, the measure is 'horse'."