Imagining Numbers: (particularly the Square Root of Minus Fifteen)Macmillan, 2003 - 270 strani Imagining Numbers (particularly the square root of minus fifteen) is Barry Mazur's invitation to those who take delight in the imaginative work of reading poetry, but may have no background in math, to make a leap of the imagination in mathematics. Imaginary numbers entered into mathematics in sixteenth-century Italy and were used with immediate success, but nevertheless presented an intriguing challenge to the imagination. It took more than two hundred years for mathematicians to discover a satisfactory way of "imagining" these numbers--Publisher's description. |
Iz vsebine knjige
Zadetki 1–5 od 29
Stran viii
... . So , why does minus times minus equal plus ? PART II Chapter 7 Bombelli's Puzzle 31. The argument between Cardano and Tartaglia 32. Bombelli's L'Algebra 65 77 91 107 33. " I have found another kind of cubic radical viii CONTENTS.
... . So , why does minus times minus equal plus ? PART II Chapter 7 Bombelli's Puzzle 31. The argument between Cardano and Tartaglia 32. Bombelli's L'Algebra 65 77 91 107 33. " I have found another kind of cubic radical viii CONTENTS.
Stran ix
... cubic radical which is very different from the others " 34. Numbers as algorithms 35. The name of the unknown 36. Species and numbers Chapter 8 Stretching the Image 37. The elasticity of the number line 38. " To imagine " versus " to ...
... cubic radical which is very different from the others " 34. Numbers as algorithms 35. The name of the unknown 36. Species and numbers Chapter 8 Stretching the Image 37. The elasticity of the number line 38. " To imagine " versus " to ...
Stran x
... Algebra via Geometry 62. Twins 215 63. Bombelli's cubic radicals revisited : Dal Ferro's expression as algorithm 64. Form and content 65. But ... Appendix : The Quadratic Formula 231 Notes 235 Bibliography 257 X CONTENTS.
... Algebra via Geometry 62. Twins 215 63. Bombelli's cubic radicals revisited : Dal Ferro's expression as algorithm 64. Form and content 65. But ... Appendix : The Quadratic Formula 231 Notes 235 Bibliography 257 X CONTENTS.
Stran 20
Prikaz vsebine te strani ni dovoljen.
Prikaz vsebine te strani ni dovoljen.
Stran 66
Prikaz vsebine te strani ni dovoljen.
Prikaz vsebine te strani ni dovoljen.
Vsebina
II | 3 |
III | 25 |
IV | 42 |
V | 65 |
VI | 77 |
VII | 91 |
VIII | 107 |
IX | 132 |
XI | 180 |
XII | 199 |
XIII | 215 |
XIV | 231 |
XV | 235 |
XVI | 257 |
XVII | 259 |
261 | |
Druge izdaje - Prikaži vse
Imagining Numbers: (particularly the square root of minus fifteen) Barry Mazur Omejen predogled - 2004 |
Imagining Numbers: (Particularly the Square Root of Minus Fifteen) Barry Mazur Omejen predogled - 2004 |
Imagining Numbers: (particularly the Square Root of Minus Fifteen) Barry Mazur Omejen predogled - 2003 |
Pogosti izrazi in povedi
90 degrees Abraham De Moivre algebra André Weil angle answer Ashbery's axis bers Bombelli Brann called Cardano Cartesian coordinates complex numbers complex plane cube roots cubic equations cubic radicals decimal definition discussion distributive law equa equation X3 example expression Ferro's formula Français Français's geometric George Lakoff Gergonne Girolamo Cardano give given horizontal imaginary numbers imagination John Ashbery L'Algebra Magna magnitude math mathematician mathematics minus times minus Moivre Moivre's multiply negative numbers notation number line operation of multiplication Oresme phrase picture poem poetry Poincaré conjecture polynomial positive number positive whole numbers Press problem prose quadratic formula quantities question ratio of whole real numbers real-number referred rotation Scarry sect Servois solutions solve square root subtraction Tartaglia things Thomas Lux three cube roots tion tive trans transformation translation treatise tulip Univ unknown Viète visualize word writing yellow zero