Math 1100 Algebra I Syllabus
Purpose of Math 1100
The purpose of all of the developmental mathematics courses is to support student success academically and beyond by advancing critical thinking and reasoning skills. Specifically in Algebra I, as a team, we will create and critique explanations and justifications. We will also determine which tools/strategies are needed to complete an argument. Many times we will examine given statements and hypothesize if the statement is always, sometime or never true. Then we will justify our claim.
This syllabus is subject to further change or revision, as needed, to best realize the educational goals of the course. Necessary revisions will be announced in class or on course materials with fair prior notice.
This course serves solely as a prerequisite course. Math 1100 does not satisfy any general education or essential studies requirement.
TEACHING TEAM
Course coordinators
Instructors
See the program schedule or course times, rooms, office hours and final exam dates.
Overview
This course is designed to sharpen algebra skills and concepts. Some of the topics covered properties of real numbers and resulting properties for symbolic expressions, three forms of linear functions and the advantage of each, graphing linear functions, solving linear equations, Determining if a statement is always/ sometime/never true and connect this to identity/ conditional /identity / contradiction, systems of linear equations with and without context, linear as compared to exponential functions, creating models for linear and exponential functions. In addition to this, the course is designed to strengthen analytical thinking. You will be asked and encouraged to find patterns, make conjectures, and judge the validity of given conjectures. You will test your conjectures and eventually provide counter examples to disprove invalid conjectures or give justifications for conjectures they determine are valid
Required course materials
- Three-ring notebook at least 2 inches wide so that your textbook, noted and other work will fit in one notebook.
- The Math 1100 Course Pack: The course pack contains all of the worksheets for the course and the writing assignments. The materials in the course pack will be used every day, so it is vital to purchase one as soon as possible. To lower the cost of the course pack, we are working with mycoursepack.com rather than the bookstore. The course pack will be $35 including tax. There are two options when purchasing the pack:
- Order the math 1100 (Algebra 1) course pack by phone with a credit card: (269) 383- 9102 Then the course pack will be delivered to Dr. Eisenhart to distribute to instructors to give out during class.
- Purchase directly from R J's Printing at Monday Through Friday 8am-5pm to purchase the pack.
Note that the Metro Bus 10 has a stop on Mills and Second which is minutes from R J's Printing.
Recommended course materials
- Graphing calculator: If you already own a graphing calculator, then that will suffice for this course. If you do not own a graphing calculator, then determine which course you will be taking to satisfy quantitative literacy essential studies course and then see which graphing calculator best suits your future needs. Your instructor will be demonstrating on a TI 84. Feel free to discuss your graphing calculator needs with either your instructor or the director of the Developmental Mathematics Program.
Course format and participation
This is a laboratory-oriented course in which you will often investigate mathematics collectively (with a partner, in small groups, or whole class). Whole class discussions of different solutions to a problem and the mathematics underlying these solutions will play a central role in this course. Though these discussions will take different forms on different occasions, it will always be the case that your ideas, strategies and questions will guide the discussion. Thus, as a class, we will examine each other鈥檚 thinking and come to a better understanding of the mathematics by doing so. Given the student-centered nature of this course, attendance and participation is of the utmost importance. Satisfactory participation means that you are willing to share your thought process, questions and solutions with the class (even when you don鈥檛 think you have the right answer), that you support your classmates by listening and thoughtfully reacting to their ideas, and that you attempt all of the homework before class so that you can actively participate in our discussions. Consistent and productive participation in class will be considered in determining final grades (see participation rubric below).
Grading policy
If all course requirements have been met, grades will be assigned according to the scale:
A: 90-100 percent
BA: 85-90 percent
B: 80-85 percent
CB: 75-80 percent
C: 70-75 percent
DC: 65-70 percent
D: 60-65 percent
E: Below 60 percent
NOTE: You must attain at least a C in this course in order to take the mathematics course which satisfies Proficiency 3 of your general education requirements.
Course requirements
The following is a tentative outline of the required graded assignments and their weights:
Exams: 40 percent of final grade
Comprehensive final exam: 20 percent of final grade
Writing Assignments: 12 percent of final grade
Desmos: 12 percent of final grade
eLearning online assignments: 12 percent of final grade
Class participation and other assignments: 4 percent of final grade
Attendance policy
As much of the course content is presented in a small-group, problem-solving format, daily attendance is required. Each class utilizes tools and concepts learned from previous classes, so be sure to arrive on time and stay until you are dismissed. Not only do excessive absences, tardiness, and early departure suggest a lack of professionalism and commitment, but they also guarantee that you will not attain the objectives of this course. A class participation grade is included in prep and post work category (see participation rubric below); you will not earn any class prep and post work points if you do not attend class.
Course notebook
You are required to organize your work for this course in a notebook (e.g., one-inch three-ring binder) that includes the following sections:
- Lessons with in-class notes. Use this section to organize your completed work from each lesson along with the notes you took during class. Note that you are expected to finish any lesson not completed in class including assigned prep and post work.
- Post-class notes. It is often the case that you may have difficulty taking notes on the discussions that occur during class. For this reason we require that you take at least 10 minutes after each class to capture important mathematical ideas that have been discussed during class. This will help to solidify your understanding, and highlight areas/issues around which you still have questions. Post-class notes will save you valuable time when studying for an exam. Along with providing the main ideas of the activity, the post class notes could also contain "aha" moments (a defining moment in which you gained real wisdom or insight), a list of questions you still have about the material in the activity, a completed "wrap-up" from lessons that contain wrap-ups and a cheat sheet list (things you would need to know for an exam: definitions, formulas, important examples, calculator key strokes, etc.).
- Scratch work. Use this section to organize scratch work from E-Learning quizzes. Most of the problems on this online homework will require paper and pencil calculations. You will not want to complete the assignment in your head. You will want to keep all of your work (correct and incorrect calculations). Cross out incorrect work rather than erasing it and then write notes as to why your first methods were invalid. This will help you learn from your past errors rather than repeat them.
- This section will contain all of your exams and assignments. You will want to keep both the graded and not-graded assignments in this section as well as all of your drafts of each assignment so that you can reflect on all before tutor sessions, group homework sessions, or an exam.
The goal is to make your notebook into something that will serve as a resource for you over time. This will also serve as your main resource when studying for each exam. Items within your notebook will be assessed through various means. Therefore, it is critical to always bring your notebook to class with you, and to keep up on your daily work and seek help when you don鈥檛 understand an assignment. If you have a more efficient way of organizing your notebook, discuss your plan with your instructor.
Collaboration
Your instructor might allow/encourage students to work together on assignments. What this means is that students can share strategies. You cannot share final versions of assignments. The final polished version of the assignment must be your own work. Similar problems may appear on an exam, so you will want to be sure that you can complete each problem on your own after working with peers.
Assignments
In order to succeed in any class, it is critical that you stay on top of your assignments. Be sure to start your homework early and utilize your instructor and the tutor lab when needed. Also to keep you on schedule, late homework will not be accepted. In the event of circumstances beyond your control, contact your instructor immediately.
Course pack and Desmos assignments
In order to succeed in any class, it is critical that you stay on top of your assignments. Be sure to start your homework early and utilize your instructor and the tutor lab when needed. Also to keep you on schedule, late homework will not be accepted.
Instructors will provide valuable feedback on selected homework assignments to prepare your for exams. Be sure to read over the feedback in Desmos and on course pack assignments and if needed, bring things to your instructor or the tutor lab for further clarification.
E-Learning
We use E-Learning as an online interactive tool that can provide immediate feedback. All quizzes can be attempted infinitely many times, so start early and retake the quiz until you earn a 90 percent or higher. We will be utilizing this tool to help strengthen your mathematical skills and help you to become more efficient. Efficiency will be vital for your success in both this mathematics course and the next. After completing an activity in your course pack, go to E-Learning and take the corresponding assignment (quiz). Be sure to visit E-Learning a few times throughout the week so that you do not miss a due date. If you miss a quiz due date, you can take the quiz with penalty. You can earn at most a 75 percent on the penalty quiz, but this is much better than a zero.
Exams
There will be four unit exams worth a total of 40 percent of your final grade: two 25 minute exams worth 8 percent and two other exams worth 12 percent each. Most of the problems on the unit exams will be similar to, or elaborations of homework and group work. Each exam will contain at least one problem very similar to the writing assignment problems. Other questions may test definitions, example problems, and/or class work. The final will be a comprehensive test worth 20 percent of your grade. If you are unable to attend class on any exam day you must notify Dr. Eisenhart (269) 387-4117 immediately, so that she can assist you in a timely manner.
Accommodations
Any student with a documented disability (e.g., physical, learning, psychiatric, vision, hearing, etc.) who needs to arrange reasonable accommodations must contact their instructor and the Center for Disability Services at the beginning of the semester. If you believe you need some type of accommodation due to a disability, please contact them.
Incompletes
According to University policy, incompletes are given only in those rare instances when extenuating circumstances have prevented a student from completing a small segment of the course. An incomplete is never given as a substitute for a failing grade and the Chair of the Department of Mathematics must approve all incomplete grades. The last day a student can officially withdraw from a class to avoid a failing grade is Monday, October 28 for fall 2024.
Student conduct
Please familiarize yourself with the student code of conduct and the definition of plagiarism. The use of cell phones is strictly prohibited during class, unless it鈥檚 a life-and-death emergency. Silence your phones, tablets, iPods, etc., at the entrance of the classroom and store them. If seen using one of these devices, you will be asked to leave since this is disruptive not only to the class but also the instructor. If there is an emergency situation, place your devise on vibrate, sit close to the door and leave the classroom as inconspicuous as possible. For a complete copy of the student conduct code go to the office of student conduct.
Academic integrity
Students are responsible for making themselves aware of and understanding the University policies and procedures that pertain to Academic Honesty. These policies include cheating, fabrication, falsification and forgery, multiple submission, plagiarism, complicity and computer misuse. The academic policies addressing Student Rights and Responsibilities can be found in the Undergraduate Catalog.If there is reason to believe you have been involved in academic dishonesty, you will be referred to the Office of Student Conduct. You will be given the opportunity to review the charge(s) and if you believe you are not responsible, you will have the opportunity for a hearing. You should consult with your instructor if you are uncertain about an issue of academic honesty prior to the submission of an assignment or test.
Professionalism and Mutual Respect
Students and instructors are responsible for making themselves aware of and abiding by the 鈥湴拿帕喜使偻辈 Sexual and Gender-Based Harassment and Violence, Intimate Partner Violence, and Stalking Policy and Procedures鈥 related to prohibited sexual misconduct under Title IX, the Clery Act and the Violence Against Women Act (VAWA)and Campus Safe. Under this policy, responsible employees (including instructors) are required to report claims of sexual misconduct to the Title IX Coordinator or designee (located in the Office of Institutional Equity). Responsible employees are not confidential resources. For a complete list of resources and more information about the policy see www.wmich.edu/sexualmisconduct
In addition, students are encouraged to access the Code of Conduct, as well as resources and general academic policies on such issues as diversity, religious observance, and student disabilities:
- Office of Student Conduct
- Division of Student Affairs
- Registrar鈥檚 Office
- Disability Services for Students
- Religious Observance
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Class participation rubric
Class participation will be informally assessed on a continuing basis. Class participation grades will be based on participation in both small group and whole group settings.
A: Contributing to others' learning
- This is the goal of the class. This does not mean telling or showing someone else how to do something. Sometimes it means sharing your thoughts about the mathematics so that others can analyze and learn from it. Always it means listening carefully to what others are saying, connecting what you hear to your own thinking and asking questions that will help everyone involved better understand the mathematics. The expectations for receiving this grade will increase as the semester goes on. That is, it is assumed that these are skills that you are learning so in the beginning attempts at doing this will be sufficient to earn the grade. As you develop these skills, it will require competence in them to earn the "A".
B: Contributing to one鈥檚 own learning
- Here you are clearly engaged in learning the mathematics, but haven鈥檛 moved outside yourself to interact well with others. It generally means doing quality work, but not being willing to share your thinking with others or not showing interest in making sense of their thinking. In the context of whole class discussion, it would mean listening and learning, but not sharing your ideas or observations with the class.
C: Getting by
- This involves showing up, minding your own business and doing what you are told.
D: Interfering with learning of self or others
- There are various ways one can do this; the most obvious are distracting group members from the task at hand or being belligerent about what one is asked to do. More subtle ways include implying someone is stupid because they don鈥檛 understand a problem or telling someone how to do a problem and thus undercutting their opportunity to figure it out for themselves.
F: Not there
- This includes not being there physically and/or mentally. Note that whenever you are absent, it is your responsibility to make up the work, preferably before the next class so that you are able to participate in class.