sarah.glaz@uconn.edux
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A historical study of the growth of the various fields of mathematics.

Please purchase the two main textbooks (available new at UCONN Bookstore and, both new and used, at amazon.com)

• Journey through Genius: The Great Theorems of Mathematics by William Dunham
  
• Math through the Ages: A Gentle History for Teachers and Others (Expanded Second Edition) by William P. Berlinghoff and Fernando Q. Gouvea
  

In addition, we will use the following online resource (browse to become familiar with the many biographies and mathematics topics available at this website):

• The MacTutor History of Mathematics Archives (University of St Andrews)
  

• A few delightful math-history novels

The course grade will be determined as follows:

• Individual and Group-Work Assignments: 20%
• Paper 1 (3 pages): 20%
  
• Paper 2 (5 pages): 30%
  
• Paper 3 (7 pages): 30%
  

The final version of each paper will be graded using the following grading scheme: 40% content (writing style, depth and elaboration of points, evidence of supporting research), 40% structure (organization and focus), 20% mechanics (grammar and citation style). For details see the Paper Grading Rubric.

According to UCONN policies for W courses, you cannot pass this course unless you receive a passing grade for its writing component (papers 1, 2, and 3).

Individual and Group-Work Assignments

Individual or group-work assignments, aimed at practicing mathematical concepts and writing techniques, will be given every week. Some of the assignments will be worked at during class-time; others will be given as homework. In all cases, assignments done in class (usually group-works) are due the same day, and assignments given as homework (usually individual) are due on the Tuesday after they were assigned. Each week's assignment will be graded on a scale of 0 to 10 (divided among the various components). For group-works: the group will submit one completed assignment and each member of the group will receive the grade awarded for this joint submission. Most group-works will be completed and collected during class, and absent students will not be able to receive credit for the group-work they missed, unless there is a serious reason for their absence for which proof is provided.

The Papers (1, 2 and 3)

Consult these links before starting to work on your first writing assignment.

• A recommended citation style: APA citation style (Cornell University)
• Free Bibliography Generator (APA, MLA, and other styles): EasyBib.com
  
• Evaluating reliability of printed and online sources: CRAAP test (California State University, Chico)
• How to recognize plagiarism: Tutorial and test (Indiana University)
• Online Writing Lab: Owl (Purdue University)

I encourage you to come to my office for help during office hours, and I will be happy to find other times when we can meet if my office hours schedule does not fit your schedule. Since part of the purpose of this course is to help you learn how to write effectively, you may also wish to consult the tutors at the UCONN Writing Center.

The actual pace of the course may be slightly different than listed in the syllabus below. It will depend on the students' response to the material. Individual homework assignments and in- class group-work will be given every week. Please check the course's website for updates on a weekly basis.

Notes: * Below we will denote by: D =  Journey through Genius by W. Dunham,  B&G = Math through the Ages (Expanded 2nd Edition) by W. P. Berlinghoff and F. Q. Gouvea,  MTM = The MacTutor History of Mathematics Archives.                                                                                  

Week + Papers due dates	Topic	Reading for each week's topic To be read before the Tuesday class of that week	Homework and Classwork Homework is due on the Tuesday after they were assigned, classwork is collected the day they are done in class
Week 1: Aug 28	* Overviews of the history of mathematics * The history of numerals * The history of zero	* Important historical names, dates, and events * Mathematical Periods MTM: An overview of the history of mathematics B&G: Sketch 1(p 67-72); Sketch 3 (p 81-84)	Individual Assignment: * Math Autobiography (Guidelines) * How to recognize plagiarism: Tutorial and test (complete test and hand in the signed, completed certificate) Group-Work 1: Ancient Numerals
Week 2: Sep 4	* Babylonian mathematics * Egyptian mathematics	MTM: An overview of Babylonian mathematics An overview of Egyptian mathematics The new Plimpton 322 controversy (Read for fun!) * Mystery of the Babylonian Clay Tablet, Plimpton 322 * Don't Fall for Babylonian Trigonometry Hype	Individual Assignment: Paper 1 draft and draft cover letter (see guidelines in Papers section) Group-Work 2: Eliminating Wordiness (use Conciseness and Active versus passive voice)
Week 3: Sep 11 Paper 1 draft: Due Tue, Sept 11	* Early Greek mathematics * Euclid's Elements: Geometry	D: Chapter 1 (p 1-11) D: Chapter 2 (p 27- 53,  may skip the proof of book I:15, 16, 26, 27, 32, 41)	Group-Work 3: Pythagoras Theorem
Week 4: Sep 18 Shorter class	* Euclid's Elements: Number theory	D:  Chapter 3 (p 68-75 and 81-83)	Individual Assignment: Paper 1 final version and final version cover letter (see guidelines in Papers section)
Week 5: Sep 25 Paper 1 final version: Due Tue, Sept 25	* Archimedes and the circular area * The history of  π	* Archimedes Cattle Problem * TED Talk: Revealing the lost codex of Archimedes  * The Mountains of Pi by Richard Preston    (Not required. Check them all for fun!) D: Chapter 4 (p 84-112, you may skip the proofs) B&G: Sketch 7 (p 109-112)	Group-Work 4: Comma Usage (use Rules for using commas)
Week 6: Oct 2	* Greek mathematics after Archimedes * Non-Euclidean geometries	D: Chapter 2 (p 53-60, you may skip the proof of Theorem AAA) D: Chapter 5 (p 113-132, you may skip the proofs) B&G: Sketch 19 (p 195-200) * Non-Euclidean art: Daina Taimina crocheted hyperbolic planes Dick Termes painted termespheres	Individual Assignment: Paper 2 draft and draft cover letter (see guidelines in Papers section) Group-Work 5: Late Greek Mathematics
Week 7: Oct 9 Paper 2 draft: Due Tue, Oct 9	*  Arabic mathematics *  The cossic art	MTM:  An overview of Arabic mathematics * Earliest Uses of Various Mathematical Symbols     (Not required. Check for fun!)  B&G: Sketch 8 (p 115-120)	Group-Work 6: Organization and Focus (use: Structure of a general expository essay)
Week 8: Oct 16	* Renaissance: solutions to    cubic and quartic equations *  The quintic equation and group theory:      Abel and Galois	B&G: Sketch 11 (p 135-138) D: Chapter 6 (p 133-154) MTM: A biography of Abel            A biography of Galois	Individual Assignment: Paper 2 final version and final version cover letter (see guidelines in Papers section) Group-Work 7: Cubic Equations
Week 9: Oct 23 Paper 2 final version: Due: Tue, Oct 23	* Descartes, Fermat and a gem from Isaac Newton * Fermat's last theorem	D: Chapter 7 (p 155-174 and 177-183) * The enigmatic number e    (Not required. Read for fun!) * BBC-Horizon-1996: Fermat's Last Theorem (Not required. Watch for fun this amazing 50 minute documentary directed by Simon Singh)	Group-Work 8: Common Mistakes
Week 10: Oct 30	* Calculus: Newton, Leibniz, and the Bernoulli brothers	D: Chapter 8 (p 184-206) B&G: Sketch 30 (p279-284)	Individual Assignment: Paper 3 draft and draft cover letter (see guidelines in Papers section) Group-Work 9: Some Series of Newton and Leibniz
Week 11: Nov 6	* Euler and his legacy	D: Chapter 9 (p 207-222)      Chapter 10 (p223-235,You may skip the proofs) * An evening with Leonhard Euler, by William Dunham    (Not required. Watch for fun!)	Group-Work 10: Euler's 7 Bridges of Konigsberg
Week 12: Nov 13 Paper 3 draft: Due Tue, Nov 13	* From Gauss to Cantor * Overview of 19 century mathematics	MTM: A biography of Gauss B&G: Sketch 6 (p 103-106) D: Chapter 11 (p 245-266) * Weierstrass' continuous and nowhere differentiable function    (Fun animation!)	Individual Assignment: Paper 3 Peer Review Forms (see guidelines and the list of peer review groups in Papers section) Group-Work 11: Gauss' Congruent Integers
Thanksgiving Recess Nov 18 - 24	Enjoy and have fun!
Week 13: Nov 27 Peer Review Forms: Due Tue, Nov 27	* The foundations of mathematics:    Cantor, Hilbert, Russell, Goedel * Mandatory Attendance:    Peer-Review Workshop for Paper 3     (Counts as a Group-Work)	* Hilbert's Problems * Goedel and the limits of logic D: Chapter 12 (p 267-283) B&G: Sketch 25 (p 239-244) B&G: Sketch 29 (p271-276)	Individual Assignment: Paper 3 final version and final version cover letter (see guidelines in Papers section) Group-Work 12: Peer-Review Workshop for Paper 3
Week 14: Dec 4 Paper 3 final version: Due Tue, Dec 4	* A brief look at today's mathematics.	Recommended reading (not required): * Poetry Inspired by Mathematics:     A brief journey through history * List of Unsolved Problems in Mathematics * Watch fractal art in action! B&G: Sketch 23 (p225-230)	Group-Work 13: Map Coloring
Final Exams Dec 10 - 16	Good Luck with all your finals!		No final Exam in this course.

A fundamental tenet of all educational institutions is academic honesty; academic work depends upon respect for and acknowledgment of the research and ideas of others. Misrepresenting someone else's work as one's own is a serious offense in any academic setting and it will not be condoned. Academic misconduct includes, but is not limited to, providing or receiving assistance in a manner not authorized by the instructor in the creation of work to be submitted for academic evaluation (e.g. papers, projects, and examinations); any attempt to influence improperly (e.g. bribery, threats)any member of the faculty, staff, or administration of the University in any matter pertaining to academics or research; presenting, as one's own,the ideas or words of another for academic evaluation; doing unauthorized academic work for which another person will receive credit or be evaluated; and presenting the same or substantially the same papers or projects in two or more courses without the explicit permission of the instructors involved. A student who knowingly assists another student in committing an act of academic misconduct shall be equally accountable for the violation, and shall be subject to the sanctions and other remedies described in The Student Code.

Student Support Services

• Counseling and Mental Health Services  486-4705 (after hours, use 486-3427)
• Career Services  486-3013
• Alcohol and Other Drug Services 486-9431
• Dean of Students Office 486-3426
• Center for Students with Disabilities  486-2020 (voice),  486-2077 (TDD)
• Academic Calendar 2018 - 2019
  

This page is maintained by Sarah Glaz                   
Last modified: Fall 2018