The Collected Mathematical Papers of Ar... A source page for quotes linked to Arthur Cayley. 0 quotes
“As for everything else, so for a mathematical theory: beauty can be perceived but not explained.” BeautyTheoryMathematicsMathMathematicalMathematical LogicMathematical Beauty Book:The Collected Mathematical Papers of Arthur Cayley Source: The Collected Mathematical Papers of Arthur Cayley
“Euclid avoids it [the treatment of the infinite]; in modern mathematics it is systematically introduced, for only then is generality obtained.” ModernInfiniteMathematicsTreatmentGeneralitiesEuclid Author:Arthur Cayley
“Not that the propositions of geometry are only approximately true, but that they remain absolutely true in regard to that Euclidean space which has been so long regarded as being the physical space of our experience.” LongHas BeensSpaceRegardPropositionsGeometry Author:Arthur Cayley
“So much the worse, it may be, for a particular meeting: but the meeting is the individual, which on evolution principles, must be sacrificed for the development of the race.” MayIndividualRacePrinciplesParticularDevelopmentEvolutionMeetings Book:The Collected Mathematical Papers of Arthur Cayley Source: The Collected Mathematical Papers of Arthur Cayley
“And in another point of view, I think it is right that the address of a president should be on his own subject, and that different subjects should be thus brought in turn before the meetings.” ThinkingShouldDifferentTurnsPresidentViewsSubjectsMeetingsPoint Of ViewAddressesDifferent Subjects Book:The Collected Mathematical Papers of Arthur Cayley Source: The Collected Mathematical Papers of Arthur Cayley
“But be that as it may, I think it is more respectful to you that I should speak to you upon and do my best to interest you in the subject which has occupied me, and in which I am myself most interested.” ThinkingShouldMaySpeakInterestSubjectsRespectful Book:The Collected Mathematical Papers of Arthur Cayley Source: The Collected Mathematical Papers of Arthur Cayley
“Metrical geometry is thus a part of descriptive geometry, and descriptive geometry is all geometry.” ScienceGeometry Author:Arthur Cayley