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(Project 5 (Chapter 14))
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* 9. Two ''Mathematica'' Notebooks (8 min.):
 
* 9. Two ''Mathematica'' Notebooks (8 min.):
 
<html><iframe width="280" height="160" src="https://utep.yuja.com/V/Video?v=2144304&node=7996457&a=766636305&preload=false" frameborder="0" webkitallowfullscreen mozallowfullscreen allowfullscreen></iframe></html>
 
<html><iframe width="280" height="160" src="https://utep.yuja.com/V/Video?v=2144304&node=7996457&a=766636305&preload=false" frameborder="0" webkitallowfullscreen mozallowfullscreen allowfullscreen></iframe></html>
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==Project 6 (Chapter 8)==
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<!--''Mathematica'' Notebook(s): [http://helmut.knaust.info/class/202120_4370/6Padic.nb 6Padic.nb] |  [http://helmut.knaust.info/class/202120_4370/601PadicExp.nb 601PadicExp.nb]-->
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*10. Prelude: The real numbers (17 min.)
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<html><iframe width="280" height="160" src="https://utep.yuja.com/V/Video?v=2194729&node=8095673&a=709644111&preload=false" frameborder="0" webkitallowfullscreen mozallowfullscreen allowfullscreen></iframe></html>
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*11. p-adic norms (11 min.)
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<html><iframe width="280" height="160" src="https://utep.yuja.com/V/Video?v=2194966&node=8096099&a=1327452865&preload=false" frameborder="0" webkitallowfullscreen mozallowfullscreen allowfullscreen></iframe></html>
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* Things to do: Work all the exercises and answer all the questions in the chapter.
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* A recent popular science article about p-adics: ''Kelsey Houston-Edwards'', [https://www.quantamagazine.org/how-the-towering-p-adic-numbers-work-20201019/ An Infinite Universe of Number Systems], [https://www.quantamagazine.org/ Quanta Magazine] (10/19/2020)

Revision as of 12:02, 6 December 2021

Contents

Project 1

  • I have assigned you to a team on Blackboard. Please contact your other team members via Blackboard and start working on the first project.
  • 1. Introduction and Syllabus (19 min.) [Sorry for that little transparent rectangle in the video.]

  • 2. Intro to the Project and Mathematica (16 min.):

  • Mathematica Notebook(s): 1Iteration.nb
  • Things to do for Project 1: Answer all questions in the chapter. Questions 6 and 8 are central! Section 1.5 may help with understanding what is going on. Remember that answering "why" is always the most important thing in Mathematics.
  • Here are guidelines for writing your project reports.
  • 3. A Remark on Question 6: (4 min.)

Project 2 (Chapter 3)

  • Mathematica Notebook(s): 2Euclid.nb
  • 4. Introduction to Project 2 (18 min.):

  • Things to do:
  1. Explain how and why the EA works.
  2. Investigate Questions 1-6. What are your conjectures? Why are your conjectures true?
  3. (Skip Section 3.4.)
  4. Investigate the questions posed in Section 3.5: Are there GCD and EA for polynomials?
  • 5. Speed test: EA vs. PF (<2 min., interesting, but not really relevant):

Project 3 (Chapter 9)

  • There are lots of definitions in the text. Make sure you understand all definitions.
  • Things to do: Exercises 12-14, Questions 13-18, 9.5.3. (If you have the book: Exercise 2-4, Questions 1-6, Question 9.5.3.)
  • Make lots of conjectures about symmetries, etc, and prove as many conjectures of yours as possible.
  • I posted two more notebooks for you to look at: 301CurveSalad.nb and 302ProofwithoutWords.nb. Read the accompanying text carefully.

Project 4 (Chapter 11)

  • Mathematica Notebook: 4SeqSer.nb
  • 7. Introduction to Project 4 (13 min.):

  • Things to do: Read and answer all the questions and exercises in Sections 11.1-11.5. Do not do Section 11.6.
  • I know that many of you want to become teachers. The learning theory behind a class like ours was first articulated by the Soviet psychologist Lev Vygotsky and centers around the concept of Zone of Proximal Development. If the textbook does not suffice as MKO: your instructor is just a Zoom screen away. You may also want to check out the Academy for Inquiry Based Learning.

Project 5 (Chapter 14)

  • Things to do: Answer all questions in Sections 14.1-14.3 and 14.5.
  • 9. Two Mathematica Notebooks (8 min.):

Project 6 (Chapter 8)

  • 10. Prelude: The real numbers (17 min.)

  • 11. p-adic norms (11 min.)

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