Math through the Ages: A Gentle History for Teachers and Others Expanded Second EditionAmerican Mathematical Soc., 5. maj 2020 - 331 strani `Math through the Ages' is a treasure, one of the best history of math books at its level ever written. Somehow, it manages to stay true to a surprisingly sophisticated story, while respecting the needs of its audience. Its overview of the subject captures most of what one needs to know, and the 30 sketches are small gems of exposition that stimulate further exploration. --Glen van Brummelen, Quest University, President (2012-14) of the Canadian Society for History and Philosophy of Mathematics Where did math come from? Who thought up all those algebra symbols, and why? What is the story behind $pi$? ... negative numbers? ... the metric system? ... quadratic equations? ... sine and cosine? ... logs? The 30 independent historical sketches in Math through the Ages answer these questions and many others in an informal, easygoing style that is accessible to teachers, students, and anyone who is curious about the history of mathematical ideas. Each sketch includes Questions and Projects to help you learn more about its topic and to see how the main ideas fit into the bigger picture of history. The 30 short stories are preceded by a 58-page bird's-eye overview of the entire panorama of mathematical history, a whirlwind tour of the most important people, events, and trends that shaped the mathematics we know today. ``What to Read Next'' and reading suggestions after each sketch provide starting points for readers who want to learn more. This book is ideal for a broad spectrum of audiences, including students in history of mathematics courses at the late high school or early college level, pre-service and in-service teachers, and anyone who just wants to know a little more about the origins of mathematics. |
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Stran v
... Theory and its Classical Problems, Charles Hadlock Fourier Series, Rajendra Bhatia Game Theory and Strategy, Philip D. Straffin Geometry Illuminated: An Illustrated Introduction to Euclidean and Hyperbolic Plane Geometry, Matthew Harvey ...
... Theory and its Classical Problems, Charles Hadlock Fourier Series, Rajendra Bhatia Game Theory and Strategy, Philip D. Straffin Geometry Illuminated: An Illustrated Introduction to Euclidean and Hyperbolic Plane Geometry, Matthew Harvey ...
Stran vi
... Theory Through Inquiry, David C. Marshall, Edward Odell, and Michael Starbird Ordinary Differential Equations: from Calculus to Dynamical Systems, V. W. Noonburg A Primer of Real Functions, Ralph P. Boas A Radical Approach to Lebesgue's ...
... Theory Through Inquiry, David C. Marshall, Edward Odell, and Michael Starbird Ordinary Differential Equations: from Calculus to Dynamical Systems, V. W. Noonburg A Primer of Real Functions, Ralph P. Boas A Radical Approach to Lebesgue's ...
Stran xiv
... Theory....... 209 22. Making Sense of Data: Statistics Becomes a Science ........ 217 23. Machines that Think?: Electronic Computers. . . . . . . . . . . . . . . 225 24. The Arithmetic of Reasoning: Boolean Algebra............. 233 25 ...
... Theory....... 209 22. Making Sense of Data: Statistics Becomes a Science ........ 217 23. Machines that Think?: Electronic Computers. . . . . . . . . . . . . . . 225 24. The Arithmetic of Reasoning: Boolean Algebra............. 233 25 ...
Stran 7
... The *Good references for this are [12] and (87). The second includes many ideas for how to use some of this material in the classroom. *For a theory about how this happened, see (205). S Tuskey \ g ofabriz GREECE * Adana o o Beginnings 7.
... The *Good references for this are [12] and (87). The second includes many ideas for how to use some of this material in the classroom. *For a theory about how this happened, see (205). S Tuskey \ g ofabriz GREECE * Adana o o Beginnings 7.
Stran 16
... theory of ratios, astronomy, and mechanics. The latter two were treated very much in geometric and theoretical style. There was no sharp dividing line between “pure” and “applied” mathematics. (In fact, that distinction dates back only ...
... theory of ratios, astronomy, and mechanics. The latter two were treated very much in geometric and theoretical style. There was no sharp dividing line between “pure” and “applied” mathematics. (In fact, that distinction dates back only ...
Vsebina
1 | |
5 | |
Sketches | 67 |
What to Read Next | 287 |
When They Lived | 295 |
Bibliography | 301 |
Index | 319 |
About the Authors | 333 |
Back cover | 334 |
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