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Alexander the Great (356–323 BC) • Born in Macedonia, son of Philip II • At 13, Aristotle became his tutor • At 16, as regent in his father’s absence he put down an insurgency Alexander the Great (356–323 BC) • 336 BC, Philip II is assassinated • Alexander is king at 20, puts down revolts, secures northern borders, defeats or coopts other Greek States • 334 BC, he crosses to Asia Minor with an army of 40,000 • 331 BC, conquers Egypt and founds Alexandria Alexander conquers the Persian Empire • • • • 336–323 BC, King of Macedon 332–323 BC, King of Egypt 330–323 BC, Great King of Persia 323 BC, Alexander dies in Babylon After Alexander’s Death • Ptolemy Soter, king of Egypt 323–283 BC • Founds the great library of Alexandria • First chief librarian, Demetrios Phalerus (c.350–283), exiled and poisoned by a snake Summoned from the Void Euclid • Birth: place and date unknown • Death: circumstances and date unknown • “Oh, King, for travelling the country there are royal roads and roads for common citizens, but in geometry there is but one road for all”. The Elements • composed by Euclid in 13 books • starts with 23 definitions and 5 postulates for plane geometry • written using Lemmas, Theorems and proofs Transmission of the Elements • 6th century, Boethius translates parts into Latin • 800, translation into Arabic • 1120 translation from Arabic to Latin • 1260 new edition in Latin, cited by Doctor Mirabilis (a.k.a. Roger Bacon) • 1505 translation from Greek directly to Latin • 1570 English edition Euclid’s Five Postulates • • • • • There is a line between any two points Any finite line can be infinitely extended There is a circle with any centre and radius All right angles are equal If a line crosses two lines, and the sum of the interior angles on the same side is less than 180˚, then the two lines intersect on that side If a line crosses two lines, and the sum of the interior angles on the same side is less than 180˚, then the two lines intersect on that side Al-Haytham (965 Basra–c.1040 Cairo) • Famous work on optics, 1011–21 • used motion to prove Euclid’s Fifth • his work led to a connection between the parallel postulate and the sum of the angles in a quadrilateral Omar Khayyam (1048-1131, Persia) • Refuted earlier work on parallels • There are many things wrong [with Al-Haytham’s proof] • How could a line move, remaining normal to a given line? • How could a proof be based on this idea? • How could geometry and motion be connected? Girolamo Saccheri (1667–1733) • Thought he had proved Euclid’s Fifth • His methods used three cases for the sum of angles in a triangle: • (1) less than 180˚ • (2) exactly 180˚ • (3) greater than 180˚ Any three points lie on a straight line or a circle QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Any three points lie on a straight line or a circle QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Any three points lie on a straight line or a circle QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Proof that L and M intersect QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Proof that L and M intersect QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Proof that L and M intersect QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Proof that L and M intersect QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. Johann Heinrich Lambert (1728–77) • Proved is not a fraction a/b • Introduced hyperbolic functions • Showed that in the area of a triangle in the hyperbolic plane is proportional to 180˚– the sum of its angles • Saw the promised land, but never entered it Ferdinand Karl Schweikart (1780–1857) • Letter to Gauss, 1818. This being assumed we can prove rigorously: • a) that the sum of the angles in a triangle is less than 180˚ • b) that the sum becomes less as the area of the triangle becomes greater • c) that the altitude of a right-angled isosceles triangle continually grows as the sides increase, but it can never become greater than a certain length, which I call the constant Carl Friedrich Gauss (1777–1855) • with Archimedes and Newton one of the three greatest mathematicians of all time • discovered the hyperbolic plane but did not publish anything about it Farkas Bolyai (1775–1856) • Hungarian, fellow student of Gauss at Göttingen; they became lifelong friends • poorly paid, wrote and published dramas, … • Worked on his mathematical masterpiece • Tried to dissuade his son Janos from wasting his life on the parallel postulate Janos Bolyai (1802–1860) • 1820 studied in Vienna • 3 Nov 1823 wrote to his father, … [I have] created a new, another world out of nothing … • In 1832 he published a 24-page appendix to his father’s book • Gauss, “I regard this young geometer Bolyai as a genius of the first order”. • Never published again, but left 20,000 manuscript pages Nikolai Lobachevsky (1792–1856) • strongly influenced by Martin Bartels at Kazan, previously Gauss’s tutor in Braunschweig • 1827 Rector of Kazan University • 1829 work on the hyperbolic plane published in the Kazan Messenger, rejected by St. Petersburg Academy of Sciences • 1846 retired (dismissed) • After 1846 his health deteriorates Back to Saccheri’s Triangles QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. QuickTime™ and a MPEG-4 Video decompressor are needed to see this picture. The fault in my ‘proof’
