Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Introduction_to_Mathematical_Philosophy> ?p ?o. }
Showing items 1 to 36 of
36
with 100 items per page.
- Introduction_to_Mathematical_Philosophy abstract "Introduction to Mathematical Philosophy is a book by Bertrand Russell, published in 1919, written in part to exposit in a less technical way the main ideas of his and Whitehead's Principia Mathematica (1910–1913), including the theory of descriptions.Mathematics and logic, historically speaking, have been entirely distinct studies. Mathematics has been connected with science, logic with Greek. But both have developed in modern times: logic has become more mathematical and mathematics has become more logical. The consequence is that it has now become wholly impossible to draw a line between the two; in fact, the two are one. They differ as boy and man: logic is the youth of mathematics and mathematics is the manhood of logic. This view is resented by logicians who, having spent their time in the study of classical texts, are incapable of following a piece of symbolic reasoning, and by mathematicians who have learnt a technique without troubling to inquire into its meaning or justification. Both types are now fortunately growing rarer. So much of modern mathematical work is obviously on the border-line of logic, so much of modern logic is symbolic and formal, that the very close relationship of logic and mathematics has become obvious to every instructed student. The proof of their identity is, of course, a matter of detail: starting with premises which would be universally admitted to belong to logic, and arriving by deduction at results which as obviously belong to mathematics, we find that there is no point at which a sharp line can be drawn, with logic to the left and mathematics to the right. If there are still those who do not admit the identity of logic and mathematics, we may challenge them to indicate at what point, in the successive definitions and deductions of Principia Mathematica, they consider that logic ends and mathematics begins. It will then be obvious that any answer must be quite arbitrary. (Russell 1919, 194–195).".
- Introduction_to_Mathematical_Philosophy wikiPageExternalLink russell-imp.html.
- Introduction_to_Mathematical_Philosophy wikiPageExternalLink introductiontoma00russuoft.
- Introduction_to_Mathematical_Philosophy wikiPageID "5387218".
- Introduction_to_Mathematical_Philosophy wikiPageRevisionID "602695822".
- Introduction_to_Mathematical_Philosophy hasPhotoCollection Introduction_to_Mathematical_Philosophy.
- Introduction_to_Mathematical_Philosophy subject Category:1919_books.
- Introduction_to_Mathematical_Philosophy subject Category:Allen_&_Unwin_books.
- Introduction_to_Mathematical_Philosophy subject Category:Analytic_philosophy_literature.
- Introduction_to_Mathematical_Philosophy subject Category:Books_by_Bertrand_Russell.
- Introduction_to_Mathematical_Philosophy subject Category:Logic_books.
- Introduction_to_Mathematical_Philosophy type Artifact100021939.
- Introduction_to_Mathematical_Philosophy type Book106410904.
- Introduction_to_Mathematical_Philosophy type BooksByBertrandRussell.
- Introduction_to_Mathematical_Philosophy type Creation103129123.
- Introduction_to_Mathematical_Philosophy type LogicBooks.
- Introduction_to_Mathematical_Philosophy type Object100002684.
- Introduction_to_Mathematical_Philosophy type PhysicalEntity100001930.
- Introduction_to_Mathematical_Philosophy type Product104007894.
- Introduction_to_Mathematical_Philosophy type Publication106589574.
- Introduction_to_Mathematical_Philosophy type Whole100003553.
- Introduction_to_Mathematical_Philosophy type Work104599396.
- Introduction_to_Mathematical_Philosophy comment "Introduction to Mathematical Philosophy is a book by Bertrand Russell, published in 1919, written in part to exposit in a less technical way the main ideas of his and Whitehead's Principia Mathematica (1910–1913), including the theory of descriptions.Mathematics and logic, historically speaking, have been entirely distinct studies. Mathematics has been connected with science, logic with Greek.".
- Introduction_to_Mathematical_Philosophy label "Einführung in die mathematische Philosophie".
- Introduction_to_Mathematical_Philosophy label "Introduction to Mathematical Philosophy".
- Introduction_to_Mathematical_Philosophy label "Introduction à la philosophie mathématique".
- Introduction_to_Mathematical_Philosophy label "Introdução à Filosofia da Matemática".
- Introduction_to_Mathematical_Philosophy sameAs Einführung_in_die_mathematische_Philosophie.
- Introduction_to_Mathematical_Philosophy sameAs Introduction_à_la_philosophie_mathématique.
- Introduction_to_Mathematical_Philosophy sameAs Introdução_à_Filosofia_da_Matemática.
- Introduction_to_Mathematical_Philosophy sameAs m.0djk01.
- Introduction_to_Mathematical_Philosophy sameAs Q544347.
- Introduction_to_Mathematical_Philosophy sameAs Q544347.
- Introduction_to_Mathematical_Philosophy sameAs Introduction_to_Mathematical_Philosophy.
- Introduction_to_Mathematical_Philosophy wasDerivedFrom Introduction_to_Mathematical_Philosophy?oldid=602695822.
- Introduction_to_Mathematical_Philosophy isPrimaryTopicOf Introduction_to_Mathematical_Philosophy.