Projective geometry and mathematical progress in mid-Victorian Britain
Identifieur interne : 00E788 ( Main/Exploration ); précédent : 00E787; suivant : 00E789Projective geometry and mathematical progress in mid-Victorian Britain
Auteurs : Joan L. Richards [États-Unis]Source :
- Studies in History and Philosophy of Science [ 0039-3681 ] ; 1986.
English descriptors
- Teeft :
- Algebra, Analytic results, Analytical methods, Anharmonic ratio, Arthur cayley, Baas, Basic foundational issues, Bertrand russell, British association, British mathematicians, Cambridge curriculum, Cayley, Century england, Charles taylor, Conceptual, Conceptual interpretation, Concrete rigor, Concrete view, Conic sections, Continuous transformation, Descriptive geometry, Direct contemplation, Early work, Elliptic space, Encyclopedia britannica, Euclid, External world, First half, First principles, Formal view, French mathematicians, Fuller discussion, Fundamental conceptions, Fundamental quadric, Geometer, Geometrical, Geometrical knowledge, Geometrical reasoning, Geometrical relations, Geometrical teaching, Geometry, George boole, Great britain, Great deal, High rewards, Historical studies, Homogeneous expressions, Homographic projections, Human knowledge, Imaginary objects, Imaginary points, Inductive, Inductive character, Inductive science, Inductive sciences, Infinity, Institutional support, Invariant algebra, John herschel, Liberal education, Linear transformations, Many scientists, Mathematical ideology, Mathematical investigation, Mathematical papers, Mathematical rigor, Mathematical structure, Mathematical studies, Mathematical study, Mathematical truth, Mathematician, Mathematics, Memoir, Metrical geometries, Metrical properties, Modern conceptions, Modern geometry, More points, Natural order, Nineteenth century, Olaus henrici, Other forms, Other hand, Parallel lines, Parliamentary commission, Permanent character, Philosophical transactions, Physics section, Present state, Presidential address, Progressive mathematicians, Projective, Projective geometers, Projective geometry, Projective method, Projective space, Pure mathematics, Quantic, Radical axes, Radical axis, Real knowledge, Real world, Robert ellis, Royal society, Scientific education, Scientific knowledge, Scientific method, Scientific view, Second half, Sixth memoir, Spatial experience, Spatial points, Spatial substratum, Subject matter, Such truths, Sylvester, Synthetic geometry, Transcendental truth, Tripos reform, Unitary view, University college, Victorian britain, Whewell, William clifford, William spottiswoode, William whewell.
Url:
DOI: 10.1016/0039-3681(86)90011-7
Affiliations:
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