2021 Spring Course Syllabus - Mathematics 2061.001
Course: Mathematics 2061.001.
Course Title: Euclidean Geometry.
How this course will be taught: Virtual.
Time: MWF 14:00 - 14:50 PM.
Place: https://temple.zoom.us/j/96257505386.
Instructor: Dumitru Dan Rusu.
Instructor Office: https://temple.zoom.us/j/9644567400.
Instructor Email: dumitru.rusu@temple.edu
Instructor Phone: Please use my email.
Office Hours: MWF 3:00 - 4:00 PM and by appointment. Please note that the office hours may not be used to cover material missed due to unjustified absences.
Prerequisites: Math 1042 (Calculus II) with a grade of C or better or equivalent transfer credits for Math 1042. It is expected that the student will have some, but not a lot, of experience writing proofs. By taking this course, the student will gain more practice and depth.
Textbook: All lecture notes and hand-outs for this course will be provided by the instructor. In addition, we will use "Classical Geometry - Euclidean, Transformational, Inversive, and Projective" by I. E. Leonard, J. E. Lewis, A. C. F. Liu, and G. W. Tokarsky, 1st edition, Wiley 2014, ISBN-13: 978-1118679197 (available ONLINE from the Temple University Libraries). This book provides a source for some of the fundamental theorems (with proofs) of Euclidean plane geometry and some interesting homework problems.
Technology specifications for this course: A working computer with a reliable internet connection, a Webcam, and audio capability. Recommended Internet Speed: 8mbps download & 5mbps upload. You can test your connection at https://www.speedtest.net. Please note: Hard-wired connections are more consistent than Wi-Fi for Zoom sessions. A scanning app such as AdobeScan or CamScanner is required as is access to Zoom and Canvas (the Canvas app is also recommended).
Limited resources are available for students who do not have the technology they need for class. Students with educational technology needs, including no computer or camera or insufficient Wifi-access, should submit a request outlining their needs using the Student Emergency Aid Fund form. The University will endeavor to meet needs, such as with a long-term loan of a laptop or Mifi device, a refurbished computer, or subsidized internet access.
Course Goals: Since Euclid's The Elements, a book written around 300 BCE and used in mathematics instruction until the 20th century, geometry has been taught as a deductive science, with definitions, axioms, theorems and proofs. In the words of Ludwig Wittgenstein: "If you want to know what a mathematical proposition says, look at what its proof proves". Rather than trying to discuss in depth the subtleties of the axiomatic system, I will concentrate on the fundamental theorems, their proofs, and their consequences and adopt a problem solver's perspective on a variety of challenging questions. By studying Euclidean geometry students learn how to think, and how to develop and write geometric proofs.
Topics Covered: We will cover methods of proof, axiomatic system, basic definitions and facts, congruence, parallelism, metric relations, area, similarity, circles, geometric locus, concurrency, and the applications of the intrinsic theory of vectors. We will prove fascinating theorems about triangles, circles, and lines that you likely haven't seen before. You will also be introduced to non-Euclidean geometries although we will only scratch the surface of these "other geometries". Geometry can be developed in several fundamentally different ways, and all should be considered if the subject is to be shown in all its multifaceted power. Therefore, in addition to the synthetic (i.e., coordinateless) approach, we will briefly discuss why geometry is entangled with algebra and how sometimes tortuous arguments can be replaced by simple algebraic calculations. Using analytic geometry tools and complex numbers for solving certain geometric problems will develop your ability to approach a mathematical problem from a variety of perspectives.
Course Grading: Your course grade will be computed according to the following scheme: Homework 25%, Exam 1 - 25%, Exam 2 - 25%, Final Exam - 25%. Correspondence between the numerical and letter grades is: 93-100 A, 90-92 A-, 87-89 B+, 83-86 B, 80-82 B-, 77-79 C+, 73-76 C, 70-72 C-, 65-69 D+, 55-64 D, 50-54 D-, 0-49 F. Please notice that you will be graded both on correctness and on quality of exposition since a major focus of this course is the ability to communicate mathematical ideas clearly. Any work that is confusing, ambiguous, or poorly explained will not receive full credit.
Exam Dates: We will have two exams, tentatively scheduled for February 26th and April 2nd. They will be held during regular course hours. The Final Exam is scheduled on Friday, April 30, 10:30 AM - 12:30 PM. Each exam will consist of a take-home part and an in-class part. The in-class part will consist in problems similar to those of the homework.
Remote proctoring statement: Zoom, Proctorio or a similar proctoring tool may be used to proctor exams and quizzes in this course. These tools verify your identity and record online actions and surroundings. It is your responsibility to have the necessary government or school issued ID, a laptop or desktop computer with a reliable internet connection, the Google Chrome and Proctorio extension, a webcam/built-in camera and microphone, and system requirements for using Proctorio, Zoom, or a similar proctoring tool. Before the exam begins, the proctor may require a scan of the room in which you are taking the exam.
Attendance Policy: You are expected to attend all classes, and you are responsible for all material covered in class. Attendance in lectures will be recorded and will be taken into account in borderline grade cases. Absence will adversely affect your performance on assignments and exams, and could lead to unsatisfactory performance in the course. If you have an excuse for missing a class, you should let me know as soon as possible (preferably before missing the class).
The University's attendance policy (opens in new tab/window) has been standardized to accommodate students who are ill or are required to self-quarantine for a period of time due to the COVID-19 pandemic.
To achieve course learning goals, students must attend in-person classes, and/or participate in classes or portions of classes that are taught remotely, to the extent that they are able. Though increased flexibility will be granted, in all cases, course assessments such as assignments, tests and exams must be completed for learning goals to be reached.
In order to facilitate contact tracing, instructors are required to ensure that attendance is recorded for each in-person meeting using an online attendance system designated by the university. Students who are exhibiting symptoms such as cough, fever, shortness of breath, muscle or body aches, headache, chills, sore throat, congestion, or new loss of taste or smell, or who have been in close contact with others who have symptoms, or who are engaging in self-quarantine at the direction of the Philadelphia Health Department, Student Health Services, or any healthcare professional, should not attend in-person classes. Students will not be required to provide formal documentation from a healthcare provider for COVID-related absences. For more information, see the Student Health Services COVID-19 site (opens in new tab/window).
It is also important to foster a respectful and productive learning environment that includes all students in our diverse community of learners. Treat your classmates and instructor with respect in all communication, class activities, and meetings. All opinions and experiences, no matter how different or controversial they may be perceived, must be respected in the tolerant spirit of academic discourse. You are encouraged to comment, question, or critique an idea but you are not to attack an individual. Our differences, some of which are outlined in the University's nondiscrimination statement (opens in a new tab/window), will add richness to this learning experience.
Please consider that sarcasm, humor and slang can be misconstrued in online interactions and generate unintended disruptions. Profanity should be avoided as should the use of all capital letters when composing responses in discussion threads, which can be construed as "shouting" online. Remember to be careful with your own and others' privacy. In general, have your behavior mirror how you would like to be treated by others.
Online Classroom Etiquette: It is expected that each student attends every class on time for the full duration of each class and behaves, in the same professional manner, as if you are in a regular classroom. This refers in particular to your location and attire. It is not appropriate to eat a large meal, drink alcohol, smoke, or get up often during an online class.
Statement on recording and distribution of recordings of class sessions: Any recordings permitted in this class can only be used for the student's personal educational use. Students are not permitted to copy, publish, or redistribute audio or video recordings of any portion of the class session to individuals who are not students in the course or academic program without the express permission of the faculty member and of any students who are recorded. Distribution without permission may be a violation of educational privacy law known as FERPA as well as certain copyright laws. Any recordings made by the instructor or university of this course are the property of Temple University.
Drawing Tools: In this course, you will not only calculate but will be compelled to draw lots and lots of pictures. Geometry is something for everybody and being able to visualize is as important as being able to reason or to calculate. After all, the constructive approach was Euclid's approach: what good are geometric shapes if we cannot build them? Using a straightedge, a compass, and unlined paper is highly recommended. If after a while you will be able to make your judgments using imperfect figures done by hand, that would be great. Using mathematics software like GeoGebra can also be useful since it allows to quickly draw flexible, accurate pictures that can be easily modified, facilitating further investigation and experimentation. You can download the free of charge GeoGebra on your computer or work on it online: https://www.geogebra.org/geometry?lang=en.
Course Attitude: Due to the broad spectrum of this course, you may find the pace fast. Mathematics is not a spectator game and you are going to work hard consistently throughout the entire semester to be successful in this course. . Often you will be asked to read in advance the lesson that we plan to discuss in class. Asking questions during class is encouraged and appreciated. Be sure to allocate enough time to stay current and keep up with daily work and homework. Please do not read the material passively or assume that you understand and know a topic just because it makes sense when you see the material explained by someone else. Mathematics can be only learned through practice. Reading a mathematics textbook is different from reading any other kind of textbook. When you see phrases like "you can verify" or "obviously" or "it is easy to see", you should use pencil and paper to do the calculations to be sure what the textbook said is correct. This is not a class you want to fall behind in.
Homework: A substantial portion of your learning in this course will take place through homework and for this reason it is essential that you be conscientious about doing them. Every week, I will give you a homework assignment consisting of selected homework problems that I will grade. Your consistent effort will certainly lead to improved understanding, and it will almost certainly lead to you earning high grades. We may go over the most difficult problems at the beginning of each class but it is your responsibility to look for clarification of any other questions during office hours. Your final submission of the assignment for grading must be based solely on your own work and efforts; you are not supposed to copy it or share it with others. Obvious copies of solutions from the work of other students will earn both students 0 points.
Make Up Policy: There will be no regularly scheduled make up exams. In the case of a DOCUMENTED EMERGENCY that prevents a student from taking a test as scheduled, the student must contact their instructor and the course coordinator immediately in order to discuss alternative arrangements.
CANVAS: This is a registered CANVAS course. Please check CANVAS daily for important announcements.
Exam Security Policy: We have a zero tolerance policy towards cheating. Students caught cheating on a problem in a test (receiving outside help, using unauthorized resources or devices such as calculators, online resources, etc.) will receive a score of 0 for the entire test. This is consistent with the Temple University Academic Honor Code (see https://secretary.temple.edu/sites/secretary/files/policies/03.70.12.pdf ) that states: "Every member of the university community is responsible for upholding the highest standards of honesty at all times. Students, as members of the community, are responsible for adhering to the principles of academic honesty and integrity".
Academic Support: The Student Success Center (SSC) and the Math TA and CA Consulting Center (MCC) both provide excellent support services for this course throughout the semester. Information regarding the services these centers provide will be posted on the course Canvas page. Students are strongly encouraged to take advantage of these services! Some information can be found here: https://www.math.temple.edu/ugrad/tutoring/MCC.html and here: https://studentsuccess.temple.edu/.
Any student who has a need for accommodations based on the impact of a documented disability or medical condition should contact Disability Resources and Services (DRS) in 100 Ritter Annex (drs@temple.edu; 215-204-1280) to request accommodations and learn more about the resources available to you. If you have a DRS accommodation letter to share with me, or you would like to discuss your accommodations, please contact me as soon as practical. I will work with you and with DRS to coordinate reasonable accommodations for all students with documented disabilities. All discussions related to your accommodations will be confidential.
Freedom to teach and freedom to learn are inseparable facets of academic freedom. The University has adopted a policy on Student and Faculty Academic Rights and Responsibilities (Policy # 03.70.02) which can be accessed here (opens in new tab/window).
Students will be charged for a course unless dropped by the Drop/Add deadline date. Check the University calendar (opens in new tab/window) for exact dates.
During the Drop/Add period, students may drop a course with no record of the class appearing on their transcript. Students are not financially responsible for any courses dropped during this period. In the following weeks prior to or on the withdrawal date students may withdraw from a course with the grade of "W" appearing on their transcript. After the withdrawal date students may not withdraw from courses. Check the University Calendar (opens in new tab/window) for exact dates. See the full policy by clicking here (opens in new tab/window).
The grade "I" (an "incomplete") is only given if students cannot complete the course work due to circumstances beyond their control. It is necessary for the student to have completed the majority of the course work with a passing average and to sign an incomplete contract which clearly states what is left for the student to do and the deadline by which the work must be completed. The incomplete contract must also include a default grade that will be used in case the "I" grade is not resolved by the agreed deadline. See the full policy by clicking here (opens in new tab/window).