Basic Information for MATH 5002 Spring 2010 University of Georgia, Dr

Basic Information for MATH 5002 Spring 2010 University of Georgia, Dr. Beckmann’s section

This page describes a general plan for the course. Changes may be necessary.

Text: Mathematics for Elementary Teachers , second edition, (purple with zebras) and the accompanying Class Activities manual by Sybilla Beckmann, published by Addison-Wesley. These can be purchased from the UGA bookstore and other bookstores. Supplementary materials will be posted on E-Learning Commons. Please bring the activity manual to class.

Course topics: Chapters 8 – 11 on geometry and measurement.

Course objectives: To strengthen and deepen knowledge and understanding of measurement and basic geometry and how they are used to solve a wide variety of problems. In particular, to strengthen the understanding of and the ability to explain why various procedures and formulas in mathematics work. To strengthen the ability to communicate clearly about mathematics, both orally and in writing. To promote the exploration and explanation of mathematical phenomena. To show that many problems can be solved in a variety of ways.

Preparation for your teaching: This course is part of your preparation to teach math in grades PreK through 5. We will focus on the geometry and measurement topics that children learn in PreK through grade 5. We will also study how some of these topics develop a few grades beyond grade 5 because when you teach you need a bigger picture view to guide your students toward “where the math goes next.” Sometimes we will go more deeply into the mathematical ideas than you could with students in PreK through grade 5 so that you will have a more comprehensive understanding of the concepts than you could expect of your students.

Teachers are so important! We know that teacher quality a major factor in student achievement. You really can make a difference in your students’ lives! In this course we want to put you on a path toward becoming a good math teacher. To be a good math teacher you will need to do much more that just demonstrate how to solve math problems. Good teachers help their students understand mathematical ideas by asking questions, by orchestrating discussions, and by expecting students to reason about and make sense of math. To engage your students in high quality instructional conversations you will have to know the math you teach well. The importance of understanding the math you will teach well cannot be overstated.

Teaching is a big responsibility, but don’t let this scare you – you don’t have to be perfect! Teaching should be a path of lifelong learning. Good teachers are always striving to learn more about the subjects they teach and about how students think and learn. Good teachers have a “growth mindset” – they know that intelligence is not fixed, but is something that they and their students can improve. In fact, “[A] proven intervention is to tell junior-high-school students that I.Q. is expandable, and that their intelligence is something they can help shape. Students exposed to that idea work harder and get better grades. That’s particularly true of girls and math, apparently because some girls assume that they are genetically disadvantaged at numbers; deprived of an excuse for failure, they excel.” (From the NY Times 4/16/2009 article How to Raise our I.Q. by Nicholas Kristof. ) And: “People who believe in the power of talent tend not to fulfill their potential because they’re so concerned with looking smart and not making mistakes. But people who believe that talent can be developed are the ones who really push, stretch, confront their own mistakes and learn from them.” (Dr. Carol Dweck, as quoted in the NY Times 7/6/2008, If You’re Open to Growth You Tend to Grow) Good teachers know that persistence and commitment to continued learning are critically important to success in the long run, much more so than being talented or “quick.”

As a teacher, your own attitude about learning math is especially important. Be willing to think about mathematical ideas in new ways. Keep striving to learn and know more. Keep trying to understand an idea even when you don’t “get it” right away. Monitor your understanding and look for ways to extend and improve it. Look for interesting connections. Look for things that are surprising or neat. We hope you will find the course interesting and engaging and that you will seek to develop an enthusiasm for math that you will pass on to your students. We will work hard in this course, but we are also going to have a lot of fun doing it!

Class work: As a teacher, you will have the important responsibility of helping your students understand mathematical ideas and ways to solve math problems. To help prepare you, we will often ask you to explain a mathematical idea, a line of reasoning, or why a solution method is valid to a classmate or to the whole class. As a teacher you will also need to determine how your students are thinking about mathematical ideas so that you can address misconceptions and build on what your students know. This means you will need to listen carefully to your students’ mathematical ideas. So in class, we will ask you to listen carefully to other students’ methods of solution, and we will sometimes ask you to restate or ask a question about another student’s idea, or whether you agree or disagree with a statement. Class time is a time for us to think ideas through and to evaluate the ideas. Even answers that ultimately prove to be incorrect can provide invaluable learning opportunities when we determine where the flaws lie. In order to make productive use of our class time, and as part of your preparation to teach mathematics to children, all students (and the instructor and teaching assistants too!) are asked to do the following in class:

Show interest in mathematical ideas
Show interest in different ways of approaching mathematical ideas
Listen carefully to different ways of solving a problem
Carefully evaluate a proposed method of solution
State whether you agree or disagree with a statement (you may feel more comfortable saying you “respectfully disagree”)
Show interest in learning with and from others

Because our interactive work in class is an important component of this course, class attendance is required. In the event of an illness or emergency, please contact Dr. Beckmann as soon as possible. Students with four or more unexcused absences may be dropped from the course.

Writing Intensive Program: This section of MATH 5002 is part of the Writing Intensive Program. The Writing Intensive Program is designed to help courses teach the writing process within various disciplines. Although you have taken English courses on writing, and although these courses will help you with all your writing, mathematical writing has its own special features. In mathematics, we seek coherent, logical explanations, in which the desired conclusion is deduced from starting assumptions.

Our graduate teaching assistant, Laura Nunley, has been trained by the Writing Intensive Program to help you learn to write good mathematical explanations. Laura will give you feedback to help you improve your explanations over the course of the semester.

Why are we emphasizing writing in this course? To be an effective teacher of mathematics, you need to understand the mathematical ideas you will teach well and beyond the level at which you will discuss them with your students. By writing your initial thoughts and then revising your writing to produce clear, thorough, well thought out explanations, you will have a chance to develop and refine your understanding of the ideas you will teach. Because of the benefits of writing, we think that the writing intensive format is a perfect fit for this course.

Types of assignments: All assignments will be posted on the links on the main course page. Some assignments may require that you access E-Learning Commons. You should expect to spend at least 2 to 3 hours outside of class for each hour in class.

Written homework assignments to turn in: Expect to have a written assignment due at least once a week and sometimes more often. These assignments must be typed. You may write by hand any equations, pictures, diagrams, or the like. Pictures and diagrams can be inserted either within the body of the text or they can be labeled and placed at the end of the document (and in this case you should refer to them by their label within the text). Your written assignments will generally be fairly short, but we expect your work to be highly polished. Turn in only well thought out second or third (or fourth ...) drafts. Mathematics requires precise language, so attend closely to the way you express your ideas. When you teach, you will also need to take care to use correct and precise language, but we will hold you to an even higher standard of expression than would be realistic all the time in a classroom with children. In grading your work we will be looking for the extent to which it meets the following criteria:

The work is factually correct, or nearly so, with only minor, inconsequential flaws.
The work addresses the specific question or problem that was posed. It is focused, detailed, and precise. Key points are emphasized. There are no irrelevant or distracting points.
The work could be used to teach a student: either a child or another college student, whichever is most appropriate.
The work is clear, convincing, and logical. An explanation should be convincing to a skeptic and should not require the reader to make a leap of faith.
Clear, complete sentences are used. Mathematical terms and symbols are used correctly. If applicable, supporting pictures, diagrams, and/or equations are used appropriately and as needed.
The work is coherent.

Explain all your solutions unless there are explicit instructions not to.

You are encouraged to form study groups and to work on homework assignments with your classmates. (Perhaps some of you might like to form facebook groups.) Of course, you must adhere to UGA's Academic Honesty Policy. Therefore, always write your homework up on your own, using your own words to express the ideas you have discussed with others. It is not academically honest to simply read someone else’s work and then put it in your own words. Instead, when you work with others, you must participate in the development and refinement of the ideas by discussing them. All partners should “give and take” in the discussion. It is not academically honest to allow others to copy your work.

Homework is due at the beginning of class and must be turned in on time. Do not email homework except in the case of an emergency or illness or specifically requested. Please contact Dr. Beckmann as soon as possible if you are unable to hand in an assignment due to an illness or emergency.

Please save returned homework since we expect to allow you to revise and resubmit a few selected assignments.

Reading and “don’t hand in” assignments: Expect to have a reading assignment due after every class. The reading is designed to help you shore up the ideas discussed in class and be ready for the topic to be discussed in the next class. The “don’t hand in” assignments will consist mainly of problems whose solutions are given in the book. You should work the problems first without looking at the solutions and then read the solutions and compare them with your own. It’s a good idea to discuss the “don’t hand in” problems with a study group. Expect quizzes on the “don’t hand in” problems and the reading.

Minute papers: Occasional “minute papers” will be assigned to do either at the end of class or to post on E Learning Commons before the next class. These minute papers are an opportunity to think through the day’s material by writing freely and quickly about it, capturing any insights you had or questions and stumbling blocks you hope to follow up on. Minute papers will be graded only for completion, not for accuracy.

How your grade will be calculated:

We will grade all your work on a 10 point scale, and we will assign points as follows:

# of points	description	characteristics
10.5 points	exemplary	work that could serve as a model for other students
10 points	very good	correct work that is thorough and carefully done
9 points		Work that contains only a minor flaw
8 points	competent	good, solid work that is largely correct
7 points		Work that has merit but also has some shortcomings
6 points	basic	work that has merit but also has significant shortcomings
4 points	emerging	work that shows effort but is seriously flawed
0 points	no credit	no work submitted, or no serious effort shown

Your course grade will be based on 3 hour tests, quizzes, homework assignments, and a comprehensive final exam. The tests and final exam will emphasize problems that require you to write clear, complete, logical explanations.

hour tests, 3 at 15% each	45%
quizzes and minute papers, total	15%
homework	10%
final exam	30%

Letter grades are expected to be assigned as follows.

for scores from	up to	letter grade
9.2	10 or above	A
9.0	9.1	A-
8.8	8.9	B+
8.2	8.7	B
8.0	8.1	B-
7.8	7.9	C+
7.2	7.7	C
7.0	7.1	C-
5.0	6.9	D
below 5.0		F

Materials needed: Please bring your activity manual to class. We’ll be doing some drawing and cutting so you might like to have your own scissors, ruler, compass (for drawing circles), protractor (for measuring angles), and colored pencils or markers.

Observers: You may notice that some students never turn in any work and never take any tests! How do they get away with it? These students are graduate students and postdoctoral fellows who are observing MATH 5002 in preparation for eventually teaching courses for prospective elementary or middle grades teachers.