Let no one ignorant of geometry enter here
 
 
Inscription above door to Plato's Academy
Text:
The following is the required text for this course:
Another useful source is
Geometry by Its History by
Alexander Ostermann and Gerhard Wanner. A free electronic version can
be obtained for free via the Rutgers
Springer Mathematics E-books package---Rutgers affiliated users
can also order each print copy for $24.95 (Shipping and handling are
included). The specific Springer link
for the book
is here.
This book will not be used
systematically in this course, but it provides a lot of interesting
geometric arguments which complement
the more algebraic approach of our textbook, and one
can browse through and work on specific topics without too much
difficulty.
Lecture: ARC 207 TF 8:40-10:00 AM
Office Hours: Tuesday 10:30-11:30, 12:30-1:30,
Hill 546
Course Syllabus
Grading Scheme:
Exam I: Friday 10/11/19 in class Exam II: Friday 11/22/19 in class Final Exam : Thursday 12/19/19 8:00-11:00AM ARC-207 Office Hours before Final Exam : Thursday 12/12/19 10:30-11:30 AM
Homework: There will be weekly written homework assignments, each due at the beginning of lecture on Tuesdays. Late homework will not be accepted. You may discuss your homework with other classmates, but the work you hand in must be your own.
Out hope is that, after the course, you will have an appreciation for the liveliness, diversity and connectedness of mathematics, and the excitement and pleasure of discovering mathematics, and that you would be comfortable to attack geometric problems using a combination of methods learned in this course.
Emphasis will be placed on geometric understanding and logical reasoning. As such, mere memorization of facts would be of little help. Nor can most regular assignments be completed by simply looking up a magic formula on a page from the texts. Instead, you should be prepared to fully participate in the discussions(in-class and out-class), do extra readings and research, develop and communicate your ideas. You are also encouraged to try to use a combination of geometric exploration, model making, and thought experiments to help you in the learning process. Group discussions and brainstorms will be strongly encouraged. An important aspect of the course is to help you sort out your ideas and present them in a logical way. So it is expected that you present your work in a coherent way, using complete English sentences. More guidelines are given below.
This course uses a fair amount of linear algebra, especially from chapter 3 on. The attached file here contains a list of review problems for the relevant material. Please review these topics on your own in the first two weeks. You can focus your review to 2x2 or 3x3 matrices.
Homework and Quizzes: You will have weekly regular assignments. The regular assignments are to help you work through the ideas discussed in class and gain a fuller understanding of the technical aspect of the ideas. Discussion and cooperation with each other is strongly encouraged at every stage of the course work, except at the writing-up. In your submitted work, ideas that come from other people should be given proper attribution. If your work has emerged from work with other people, write down whom you have worked with. If you have referred to some sources, cite them. Short quizzes may occasionally be given to test basic understanding on concepts.
Attendance and Make-up Policy: Class attendance is expected. Poor attendance will be used to decide borderline grade situations. Any changes to the syllabus, homework assignment and any announcement for the midterms and final exam will be made in the lectures. No late work will be accepted. There will be no make-ups for quizzes. A make-up midterm will be given only if you have a valid reason such as serious illness (not a slight cold) or a family emergency, and provide an acceptable, written excuse (not an email message), or you will receive a grade of zero. If possible (particularly if you want to be sure that your excuse is an acceptable one), contact me before missing an exam.