Course:SLU MATH 124: Math and Escher - Fall 2007 - Dr. Steve Harris
Contents
- 1 General Information
- 2 Schedule
- 2.1 Week of August 27 - Euclidean Geometry
- 2.2 Week of September 3 - Symmetry of Rosettes
- 2.3 Week of September 10 - Basic Tessellations; Frieze Symmetries
- 2.4 Week of September 17 - Wallpaper Symmetries
- 2.5 Week of September 24 - Algebra of Symmetry Groups
- 2.6 Week of October 1 - More on Tessellations
- 2.7 Week of October 8 - Escher's Tessellations
- 2.8 Week of October 15 - Spherical Geometry
- 2.9 Week of October 22 - Spherical Isometries and Tessellations
- 2.10 Week of October 29 - Finishing Up Spherical Geometry, Introduction to Hyperbolic Geometry
- 2.11 Week of November 5 - Spherical Tesselations; More Hyperbolic Geometry
- 2.12 Week of November 12 - Hyperbolic Tessellations, Normal and Ideal
- 2.13 Week of November 19 - Exam II
- 2.14 Week of November 26 - Multiple Geometries; Intro to Fractals
- 2.15 Week of December 3 - Fractals; Other Topological Ideas
- 2.16 Week of December 10 - Summaries, Conclusions, Questions
- 3 Alhambra Pictures
General Information
Class Time: 1:10 PM - 2:00 PM MWF
Where: Ritter 225
Contact Information: • Office: Ritter Hall 208 (office hours: MWF, 4:00--late) • Email: harrissg@slu.edu • Phone: (314) 977-2439
Books:
• M.C. Escher: Visions of Symmetry by D. Schattschneider. W.H. Freeman and Company (1990)
Prerequisite: 3 years of high school mathematics or MT A 120 (College Algebra).
Grading: probably two in-class exams; at least one project; various in-class worksheets and homework assignments; and a final exam
Final: Friday December 14 12:00 N – 1:50 PM
How to do well: Attendance and participation are extremely important. It is very hard to make up this material on one's own.
Syllabus:
This is an inquiry course, meaning that it is exploratory in nature. The course is structured to provide guidance in your own explorations into various facets of geometry and other branches of mathematics, using the art of Escher as a lodestone, a starting place, a goal, and an inspiration. I will demand mathematical endeavor, coherent writing, and artistic creativity. Both individual and group efforts will be engaged.
The emphasis will, indeed, be on exploration; the majority of class time will consist in your exploration by drawing—whether with paper or computer—various visualizations of the concepts at hand; group work is recommended for this, and groups can work very well together on homework as well. Class explorations and individual homework will form a substantial portion of the grade. There will also be one largish project, including an artistic creation and a substantial written report, (likely) two in-class exams, and a final exam; there will be a field trip to the Cathedral Basilica and perhaps other minor projects. I will expect reports to be carefully written with sentences and paragraphs.
There are a number of possible tracks this course can go down; we won’t have time to investigate all of them in detail, so choices will be made according to the way the class develops. Possible tracks:
- creative (primarily artistic)
- mathematical structure of tessellations and symmetries
- different geometries (flat, spherical, hyperbolic), as described by tessellations and other means
- group structures as seen in symmetries and motions
- impossible figures and the fourth dimension
- fractals
Aside from group work and informal homework, all your work should be your own; the University has strict policies on academic dishonesty. For reports, always cite your sources, and do not present anything as your own work if it should be credited to another.
Email is a good way to keep in touch informally, including at night. Stay in touch!
“Any student who feels that he/she may need academic accommodations in order to meet the requirements of this course-as outlined in the syllabus, due to presence of a disability, should contact the Office of Diversity and Affirmative Action. Please telephone the office at 314-977-8885, or visit DuBourg Hall Room 36. Confidentiality will be observed in all inquiries.”
Grading
Letter grades are paramount in my grading scheme, not percentages. I'll always let you know what letter grade corresponds to a given numerical grade. Exams are weighted at 100 points, except for the final which is weighted at 200 points. As a rule, other items are weighted according to the maximum number of points available. But all these weightings are subject to individual adjustment to the benefit of each student (so if you better on the final or on a written project than on other inputs, that item is weighted more heavily in taking the average for the course grade; if you do worse on an exam than other inputs, it can count for less than otherwise).
Missing class is very detrimental to grades, especially in such an active-participation class as this. If you know you're going to be missing a class, let me know and we'll work out what to do about it. If you miss an in-class exploration, quiz, exam, or whatever, be sure to let me know why; if it's for a legitimate reason, we'll work out what to do about it, but I expect every reasonable effort to be made not to miss class.
Schedule
The schedule below is a tentative schedule.
Week of August 27 - Euclidean Geometry
Introduction to the course. We will start with exploring some of the properties of triangles and quardilaterals with an eye towards tesselations.
NOTE: It may frequently be advantageous to open an Explortations page or Exercises page in a new window, instead of having it replace your current window (that way you can still see the instructions listed on this page, back in your original window). To do this on a Mac, for instance, hold the Control key down when clicking on the link, and select "Open Link in New Window".
Explorations:
- Do the Quadrilaterals Exploration (as much as possible in class; turn in)
- Do Tessellations, a first look Exploration (1-5 in class; 6-8 to work on at home, compare in class, then turn in)
Reading:
- Read the Fundamental Concepts with special attention to triangles, quadrilaterals and convexity.
- Schattschneider p. 1-19
Exercises:
- Polygon Exercises: turn in 3-5, 8-11.
Week of September 3 - Symmetry of Rosettes
The concept of symmetry is fundamental to many of our explorations in this course. Here we will look at reflectional and rotational symmetry. We will examine some of Escher's prints, looking for how symmetry is used in his artwork.
Reading:
Explorations:
- Symmetric Figures Exploration ( introduction to the program Kali; play with in class for a while)
- Symmetry of Stars and Polygons Exploration (1-6 in class, turn in)
- Rotational and Reflectional Symmetry in Escher’s Prints (discuss in class)
- Celtic Art Exploration (discuss in class)
Exercises:
- Rosette Exercises
- turn in 3,4,5,8,9,12,14
- work on 15 in class
Other:
- Monday September 3 Labor Day: Official University Holiday
- Friday September 7 Last day to drop without a "W"
Week of September 10 - Basic Tessellations; Frieze Symmetries
Reading:
- Frieze Patterns
- Schattschneider p. 19-34
Explorations:
- Tessellation Exploration: The Basics (read it all, turn in 7-9 in class)
- Moved to another week: Tessellations: Why There Are Only Three Regular Tessellations (discuss in class)
- Identifying Border Patterns Exploration (do 1-6 in class, turn in)
Exercises:
- Frieze Exercises: turn in 1-4, 7, 8
Week of September 17 - Wallpaper Symmetries
Note:
- Friday class cancelled (in order to give you more time to do the Cathedral project)
Reading:
Quiz:
- create a pattern, from a given motif, having a given
- rosette symmetry group
- frieze symmetry group
- may use any notes or print-outs, but not the computer
Explorations:
- Wallpaper Symmetry Exploration (do it all, turn in)
- Escher's Wallpaper Groups Exploration (do as much as we have time for, turn in)
Exercises:
- Wallpaper Exercises: turn in 1, 3, 4, 7
Special Group Project:
- visit the Cathedral Basilica and record symmetry groups, as described in Cathedral Fieldtrip Project
- The regular Mass schedule of the Cathedral includes a Friday service at noon, lasting about a half hour, so plan around that time.
- Also on Friday, the organ will be tuned around 4:00, producing a noisy environment.
Week of September 24 - Algebra of Symmetry Groups
Optional (minor extra credit):
- identify the symmetry groups (ignoring color) in the 3 walls, door, doorway, and mosaic found in my Alhambra Pictures
Reading:
Explorations:
- Regular Triangle Symmetry Group Exploration (turn in 1 & 8)
- Symmetry Group for Border Pattern Exploration (select and turn in 3 of the questions)
Week of October 1 - More on Tessellations
Reading:
Explorations:
- Tessellations: Why There Are Only Three Regular Tessellations (look at 1-6; work on and turn in 7-10)
- playing around with Geometer's Sketchpad:
- following along in class
- GSP Introduction Exploration (use this as a source for explaining the buttons, etc.)
- GSP Quadrilateral Tessellation Exploration (turn in a sketch of how to tessellate using a non-convex quadrilateral)
- techniques in GSP tessellation by a quadrilateral:
- marking a vector (from one vertex to of a figure to the analogous vertex of another figure) and translating the entire diagram by that vector
- marking center of rotation at a midpoint of an edge and rotating the entire diagram 180 degrees about that center
- techniques in GSP tessellation by a quadrilateral:
Exercises:
- Polygonal Tessellation Exercises: turn in 3, 6-9, 15 (not due till after Exam 1)
Week of October 8 - Escher's Tessellations
Monday: Exam 1 (see Diary Week 5 for description)
Reading:
Explorations:
- Escher Tessellations Using Geometer’s Sketchpad (see what you can make with this; save as jpeg what you think looks good and send to mailto:harrissg@slu.edu )
- Escher-Like Tessellations Explorations (turn in the sheet your team likes best)
Week of October 15 - Spherical Geometry
Project:
- Tessellation Art Project
- preliminary sketches due by Wednesday, Oct. 24
- final version due by Wednesday, Nov. 7
Readings:
Explorations:
- Spherical Easel Exploration (turn in 1-6, think about the others)
- Spherical Geometry Exploration (turn in 1-7)
- Spherical Geometry: Polygons (turn in 1-4, 6, 7)
Exercises:
- Spherical Geometry Exercises 1, 3-8
Week of October 22 - Spherical Isometries and Tessellations
Monday, October 22: Fall Break, class cancelled
Reading:
- Spherical Geometry 4, 8
Explorations:
- finish previous week's
- Spherical Geometry: Isometry Exploration (turn in 1-7)
Exercises:
- Spherical Geometry Exercises 12-16 (#16: a, b only)
Week of October 29 - Finishing Up Spherical Geometry, Introduction to Hyperbolic Geometry
Reading:
Explorations:
- finish spherical explorations
- if time, Escher's Circle Limit Exploration (turn in 1-10; 11-13 to be discussed in class)
Week of November 5 - Spherical Tesselations; More Hyperbolic Geometry
Reading:
Explorations:
- Escher's Circle Limit Exploration (turn in 1-10; 11-13 to be discussed in class)
- Moved to next week: Hyperbolic Geometry Exploration (turn in 1-4)
- Moved to next week: Hyperbolic Geometry with Noneuclid II Exploration (turn in 1-4, 7-10)
- Regular pentagonal tessellations of the sphere.
Exercises:
- Moved to next week: Hyperbolic Geometry Exercises 1-6, 9, 11, 16a.
Other: Revision of the description of the Written Report for the Tessellation Art Project:
- The Written Report should contain these elements:
- explanation of what your tessellation geometry is:
- What is the underlying regular or semi-regular polygonal tessellation?
- What changes were made to that (semi-)regular tessellation to give you your final tessellation? (What method did you employ to change the polygonal lines to depict your final motif(s)?)
- What is the symmetry group of your final tessellation?
- explanation of the interaction between your mathematics and your art:
- How did your choice of theme or motif(s) influence your choice of tessellation geometry or choice of alteration method?
- How did your choice of tessellation geometry or choice of alteration method influence your choice of theme or motif(s)?
- explanation of what your tessellation geometry is:
- The Written Report (revised if necessary) is not due until Monday, November 12).
Week of November 12 - Hyperbolic Tessellations, Normal and Ideal
Reading: Hyperbolic Geometry, particularly 4.1, 5, 5.1
Explorations:
- Hyperbolic Tessellations Exploration (turn in 2, 3, 5; 6 for extra credit)
- Ideal Hyperbolic Tessellations Exploration (turn in 1-6; you may ignore the coloring, if you wish)
Exercises:
Special:
Exam II Monday of next week:
- tessellation of the plane:
- show how to tessellate with an irregular, non-convex quadrilateral
- explain why there are only three regular tessellations
- spherical geometry:
- spherical geodesics
- for spherical triangles and other spherical n-gons:
- angle-sum
- defect
- area
- why there are only five regular tessellations
Week of November 19 - Exam II
Exam II, Monday, November 19
Wednesday, Friday: Thanksgiving Vacation
Week of November 26 - Multiple Geometries; Intro to Fractals
Readings:
Explorations:
- Comparison between the three geometries Exploration (turn in table)
- Dilation Exploration (turn in 1-4; bring "Visions of Symmetry" book)
- Iteration Exploration (turn in 1-3)
Exercise:
- thoughts about the shape of the universe (1-2 page paper; to be detailed in class)
Week of December 3 - Fractals; Other Topological Ideas
Readings:
- Fractals
- some selection from among
Explorations:
- Fractal Dimension Exploration (turn in 1-3)
- others: groups may choose ad libitum (do at least one; anything further is extra credit):
Exercises:
- Self-Similarity Exercises 1, 2, 5, 6, 8b, 9, 12, 13, 14
Week of December 10 - Summaries, Conclusions, Questions
Class meets only on Monday.
Final Exams schedued Wednesday through next Tuesday, Dec. 12 - 18.
Final Exam, Friday, Dec. 14, 12:00 - 1:50
You are permitted to bring notes on how to identify frieze and wallpaper groups and one additional page of notes. The computers may not be used during the exam.
- symmetry groups:
- identification of rosette, frieze, and wallpaper groups
- multiplication of rosette or frieze transformations
- regular tessellations:
- why there are five, and only five, regular tessellations of the sphere
- need to know:
- full definition of regular tessellation
- angle-sum for spherical triangles
- angle measure in a regular spherical -gon
- need to know:
- why there are five, and only five, regular tessellations of the sphere
- three geometries:
- differences
- similarities
- similarity transformations and fractals:
- describe a similarity transformation that's present in a drawing
- apply a specified similarity transformation to a figure
- What is different about fractal objects?