1. General Overview and the Development of Numbers
(October 1, 2012) Keith Devlin gives an overview of the history of mathematics. He discusses how it has evolved over time and explores many of its practical applications in the world.
Originally presented in the Stanford Continuing Studies Program.
Stanford University:
http://www.stanford.edu/
Stanford Continuing Studies Program:
https://continuingstudies.stanford.edu/
Stanford University Channel on YouTube:
http://www.youtube.com/stanford
Видео 1. General Overview and the Development of Numbers канала Stanford
Originally presented in the Stanford Continuing Studies Program.
Stanford University:
http://www.stanford.edu/
Stanford Continuing Studies Program:
https://continuingstudies.stanford.edu/
Stanford University Channel on YouTube:
http://www.youtube.com/stanford
Видео 1. General Overview and the Development of Numbers канала Stanford
Показать
Комментарии отсутствуют
Информация о видео
Другие видео канала
2. The Golden Ratio & Fibonacci Numbers: Fact versus FictionRoger Penrose - Is Mathematics Invented or Discovered?Justice: What's The Right Thing To Do? Episode 01 "THE MORAL SIDE OF MURDER"4. Calculus: One of the Most Successful Technologies50 Centuries in 50 minutes (A Brief History of Mathematics)Lecture 1: Introduction to Power and Politics in Today’s WorldTimothy Snyder - "What Can European History Teach Us About Trump’s America?"e (Euler's Number) - NumberphileHIDDEN MATHEMATICS - Randall Carlson - Ancient Knowledge of Space, Time & Cosmic CyclesWhere do Mathematical Symbols Come From?What are the limits of mathematical explanation? An interview with David Charles McCartyConvergence Public Lecture: The Genesis and Renaissance of General RelativityNumber Theory: Queen of MathematicsQuantum Computing: Untangling the Hype5. How Did Human Beings Acquire the Ability to do Math?A Tribute to Euler - William DunhamFinding Fibonacci | Keith Devlin | Talks at GoogleNegative Numbers (In Our Time)How Do I Crunch The Numbers On A Real Estate Deal?Pythagoras' theorem (a) | Math History | NJ Wildberger