A history of elementary mathematics |
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Page 11
... discovery of this principle and the invention and adoption of the zero , the symbol for the absence of quantity . Of all mathematical dis- coveries , no one has contributed more to the general progress of intelligence than this . While ...
... discovery of this principle and the invention and adoption of the zero , the symbol for the absence of quantity . Of all mathematical dis- coveries , no one has contributed more to the general progress of intelligence than this . While ...
Page 26
... discovery had passed away , do we find in Nicomachus and Diophantus substantial contributors to algebra . Greek mathematicians were in the habit of discriminating between the science of numbers and the art of computation . The former ...
... discovery had passed away , do we find in Nicomachus and Diophantus substantial contributors to algebra . Greek mathematicians were in the habit of discriminating between the science of numbers and the art of computation . The former ...
Page 29
... discovery of irrational quantities ( spoken of elsewhere ) no very substantial contribution was made by the Pythagoreans to the science of numbers . We may add that by the Greeks irrationals were not classified as numbers . The ...
... discovery of irrational quantities ( spoken of elsewhere ) no very substantial contribution was made by the Pythagoreans to the science of numbers . We may add that by the Greeks irrationals were not classified as numbers . The ...
Page 34
... discovery of the Ahmes papyrus , the Arithmetica of Diophantus was the oldest known work on algebra . Diophantus introduces the notion of an algebraic equation expressed in symbols . Being completely 159 . 1 " How far was Diophantos ...
... discovery of the Ahmes papyrus , the Arithmetica of Diophantus was the oldest known work on algebra . Diophantus introduces the notion of an algebraic equation expressed in symbols . Being completely 159 . 1 " How far was Diophantos ...
Page 49
... The truth of the theorem for the special case when the sides are 3 , 4 , and 5 , respectively , he may have learned from the Egyptians . We are told that Py- E thagoras was so jubilant over this great discovery that he GREECE 49.
... The truth of the theorem for the special case when the sides are 3 , 4 , and 5 , respectively , he may have learned from the Egyptians . We are told that Py- E thagoras was so jubilant over this great discovery that he GREECE 49.
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A History of Elementary Mathematics, with Hints on Methods of Teaching Florian Cajori No preview available - 2019 |
Common terms and phrases
abacists abacus Ahmes algebra angles appears Arabic Archimedes arith arithmetic Arithmetick astronomer axioms Boethius Bolyai Brahmagupta Briggs called CANTOR century circle Cocker computation construction cube Cyclopædia Desargues digits Diophantus discovery divided division divisor early edition Egyptian elementary England English equal equations Euclid Euclid's Elements figures G. B. HALSTED geom geometry Gerbert German given gives Greek Greek mathematical HANKEL Heron Hindu numerals invention Italian later Latin Leonardo of Pisa logarithms London LORIA Math mathematical mathematicians method metic modern Morgan multiplication Napier notation numbers origin Pacioli PEACOCK plane Plato polygon postulate pound problem proof proportion published pupil Pythagoreans Regiomontanus right triangle Robert Simson Roman roots rule of three says sexagesimal sides sines sixteenth solution square straight line subtraction symbol Tartaglia teacher teaching text-book theorem theory tion translation treatise trigonometry unit-fractions Vieta vigesimal weights and measures word write written wrote
Popular passages
Page 130 - A cos 6 = cos a cos c + sin a sin c cos B cos c = cos a cos 6 + sin a sin 6 cos C Law of Cosines for Angles cos A = — cos B...
Page 68 - A plane rectilineal angle is the inclination of two straight lines to one another, which meet together, but are not in the same straight line.
Page 71 - If a straight line meets two straight lines, so as to " make the two interior angles on the same side of it taken " together less than two right angles...
Page 284 - The Connexion of Number and Magnitude; An attempt to explain the fifth book of Euclid.
Page 160 - Napier lord of Markinston, hath set my head and hands at work with his new and admirable logarithms. I hope to see him this summer, if it please God ; for I never saw a book which pleased me better, and made me more wonder.
Page 229 - He spoke of imaginary quantities, and inferred by induction that every equation has as many roots as there are units in the number expressing its degree.
Page 100 - These problems are proposed simply for pleasure; the wise man can invent a thousand others, or he can solve the problems of others by the rules given here. As the sun eclipses the stars by his brilliancy, so the man of knowledge will eclipse the fame of others in assemblies of the people if he proposes algebraic problems, and still more if he solves them.
Page 134 - The square of a diagonal of a rectangular parallelopiped is equal to the sum of the squares of the three dimensions.
Page 236 - The neglect which he had shown of the elementary truths of geometry he afterwards regarded as a mistake in his mathematical studies ; and on a future occasion he expressed to Dr. Pemberton his regret that " he had applied himself to the works of Descartes, and other algebraic writers, before he had considered the Elements of Euclid with that attention which so excellent a writer deserved."3 The study of Descartes...
Page 101 - the second value is in this case not to be taken, for it is inadequate ; people do not approve of negative roots.