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MA 135 College Algebra
Koratich, Lee E.


Mission Statement: The mission of Park University, an entrepreneurial institution of learning, is to provide access to academic excellence, which will prepare learners to think critically, communicate effectively and engage in lifelong learning while serving a global community.

Vision Statement: Park University will be a renowned international leader in providing innovative educational opportunities for learners within the global society.

Course

MA 135 College Algebra

Semester

F1T 2010 DLA

Faculty

Koratich, Lee E.

Title

Senior Instructor

Degrees/Certificates

M.A. Mathematics - Indiana University
M.A. Music Theory Pedagogy - Eastman School of Music
B.S. Mathematics - Ohio Northern University

Daytime Phone

(407) 616-5772

E-Mail

Lee.Koratich@park.edu

Semester Dates

Aug 16, 2010 - Oct 10, 2010

Class Days

TBA

Class Time

TBA

Credit Hours

3


Textbook:

Your lab fee for MyMathLab includes the e-book version of the textbook.

If you wish to have a hardcopy version of the text you may order it from MBS, the Park online bookstore at http://direct.mbsbooks.com/park.htm.

OPTIONAL:
Hardcopy Text:
College Algebra, 10th Ed.
Authors: Lial, Hornsby, & Schneider
Publisher: Addison-Wesley
ISBN: 0321499131



 
Links in the course are provided for downloading required FREE software for the multimedia presentations of the course. 

CALCULATOR:  It is expected that you will have access to a graphing calculator.  You will be allowed to use it on the Final Exam, so it is important that you practice using it throughout the course.  I do not have a brand requirement, but I do recommend the TI-83 calculator.  It can be found in office supply stores or department stores.  There are many online graphing calculator resources available.  While you are welcome to use them, you will need to have an actual calculator if you wish to use one on the Final (which I recommend). 
 
PLEASE NOTE:  At the time of submitting this Syllabus, I believe the information regarding the textbook and calculator is correct.  Should this information change, I will let you know immediately.

Textbooks can be purchased through the MBS bookstore

Additional Resources:
Advising - Park University would like to assist you in achieving your educational goals. Please contact your Campus Center for advising or enrollment adjustment information.
Online Classroom Technical Support - For technical assistance with the Online classroom, email helpdesk@parkonline.org or call the helpdesk at 866-301-PARK (7275). To see the technical requirements for Online courses, please visit the http://parkonline.org website, and click on the "Technical Requirements" link, and click on "BROWSER Test" to see if your system is ready.
FAQ's for Online Students - You might find the answer to your questions here.

McAfee Memorial Library - Online information, links, electronic databases and the Online catalog. Contact the library for further assistance via email or at 800-270-4347.
Career Counseling - The Career Development Center (CDC) provides services for all stages of career development.  The mission of the CDC is to provide the career planning tools to ensure a lifetime of career success.
Park Helpdesk - If you have forgotten your OPEN ID or Password, or need assistance with your PirateMail account, please email helpdesk@park.edu or call 800-927-3024
Resources for Current Students - A great place to look for all kinds of information http://www.park.edu/Current/.
Advising - Park University would like to assist you in achieving your educational goals. Please contact your Campus Center for advising or enrollment adjustment information.
Online Classroom Technical Support - For technical assistance with the Online classroom, email helpdesk@parkonline.org or call the helpdesk at 866-301-PARK (7275). To see the technical requirements for Online courses, please visit the http://parkonline.org website, and click on the "Technical Requirements" link, and click on "BROWSER Test" to see if your system is ready.
FAQ's for Online Students - You might find the answer to your questions here.


Course Description:
MA 135 College Algebra.  Prerequisite: MA 125, or a high school or transfer course equivalent to MA 125, or an ACT math score >_ 23, or an SAT math score >_ 510, or a COMPASS score >_ 66 in the Algebra placement domain, or a COMPASS score 0-45 in the College Algebra placement domain. A consideration of those topics in algebra necessary for the calculus. Topics include: Solving equations and inequalities, graphing, functions, complex numbers, the theory of equations, exponential and logarithmic functions. 3:0:3

Class Assessment:

THE COURSE LEARNING ACTIVITIES

Introductions - By the end of the first week of the course submit a short paragraph to introduce yourself, and respond to someone else's introduction

Each week you will have these regular learning activities:

Reading – Read the assigned chapter sections in your textbook 

Lecture –
Read the Content Lecture Files contained within the course

Media - View videos, flash files, and PowerPoint presentations

Webliography - Enhance the learning experience with varying presentations and examples of the weekly topics beyond the course lectures, textbook, and MyMathLab 

Discussions - Answer one question for each week, and post a response to someone else's answer (graded activity)

Homework - Complete the MyMathLab weekly homework assignment (graded activity)

Quiz - Complete the MyMathLab weekly quiz (graded activity)

Final Exam - Complete the final exam in week 8 (graded activity)

Grading:
 

Assignment

Possible Points

Total Points

Total %

Discussion Answer  

10 pts each

80

13.3

Discussion Response 5 pts each

40

6.7

Homework 20 pts each

160

26.7

Quiz

20 pts each

160

26.7

Final Exam

160 pts

160

26.7

TOTAL

 

 600 

 


Letter Grade

Letter

Number of Points

Percentage

A

540 - 600

90 - 100%

B

480 - 539

80 - 89.9%

C

420 - 479

70 - 79.9%

D

360 - 419

60 - 69.9%

F

000 - 359

00 - 59.9%

Late Submission of Course Materials:

It is unfair to other students to allow some individuals to submit assignments after the scheduled due date. Therefore, all assignments are expected to be completed by set deadlines. An exception to the rule is a 24 hour extension provided only for thread postings; but using it will mean you will be assessed with a 50% penalty on earned points for the assignment. The only other considerations for allowable late assignments are limited to the following valid list of emergency reasons. Please note even these reasons are only acceptable at the discretion of your instructor.

  • A medical emergency or a serious acute illness. All medical emergencies and illnesses must be verified by a note on letterhead by an M.D., D.O., P.A., or R.N. I will not normally accept a note from other health professionals (e.g., Ph.D., MSW, D.C., Physical Therapist) because their professional functions rarely involve medical emergencies or acute illnesses. I will accept late work for students who can provide evidence of a verified medical emergency (but not acute illness) involving a child, spouse, parent, sibling, or grandparent.
  • An Accident or Police Emergency. I will require an accident report or note on letterhead from an appropriate law enforcement officer to accept late work due to accidents or police emergencies (e.g., assault on student, student taken hostage, detained witness of a crime).
  • Unforeseen Jury or Witness Duty. I will require a note on letterhead from a judge or attorney stating you had no advance notice of duty to accept late work due to jury or witness duty.
  • Unforeseen Military Deployment or Activation. I will require a note on official letterhead from your commanding officer stating you had no advance notice of deployment or activation.
  • Funerals for Immediate Family Member (e.g., parents, siblings, grandparents, aunts/uncles, first cousins). I will require a copy of the obituary or a note from a minister or funeral director.

Course Topic/Dates/Assignments:

Week 1 The material we’ll cover during week 1 and week 2 is a review of the topics you have studied in the previous math courses that you will need for the study of college algebra. These basic concepts represent the fundaments to further develop the subjects in this course. Because we want to give the students the greatest chance to succeed we are reviewing pre-college algebra in two consecutive weeks.

Week 2 This is the second part of the review chapter. Because we want to give the students the greatest chance to succeed we are reviewing pre-college algebra in two consecutive weeks. This material covers a review of the topics you have studied in the previous math courses that you will need for the study of college algebra. These basic concepts represent the fundaments to further develop the subjects in this course.
 
Week 3 This week is about equations and their applications. We are going to study several kinds of equations. We will start with linear equations, then quadratic equations and radical equations. This week we will cover chapter one of the textbook, this chapter includes 8 sections 
 
WeekThis week is about functions, their graphs and some applications. We are going to study graphs in general and in specific as it relates to some basic functions or relations. We will start with linear functions, then circles and quadratic functions. This week we will cover chapter two of the textbook, this chapter includes 8 sections.
 
Week 5 This week we will study polynomial functions. Polynomial functions, their graphs and some applications. We already know what polynomials are. Polynomials in x are expressions involving sum of terms which have only x raised to a positive integer power. For example x^2 + x  - 3 is a polynomial because the variable x is only being raised to the first power and to the second power. A polynomial function is just a function based on a polynomial. For example the function f(x) = x^2 + x – 3  is a polynomial function. We can graph it, we can find zeros of the function and etcetera. We will study half of chapter 3 of the textbook.
 
Week 6 This week well be divided into two parts. The first part is the conclusion of chapter 3 we started week 5. The second part is a single section on inverse functions from chapter 4. This might seem a bit unusual but the reason we are doing that is for matters of balancing the load in each week.First part is related to rational functions. A rational function is related to rational expressions. Rational functions have unique characteristics related to continuity. For example the basic rational function y = 1/x is discontinuous at x = 0. As a matter of fact the behavior of the function around x =0 is quite pathological. To the left of x = 0 the function can be as small as you want, and to the right of x= 0 the function can be as large as you want. Inverse functions on the other hand are part of a basic concept needed to understand logarithmic and exponential functions. We will study half of chapter 3 of the textbook and the first section of chapter 4.

Week 7 We will study logarithmic and exponential functions now. We know about inverse functions by now. For every logarithmic function there is an associated exponential function that is its inverse and this is based on the base. A base for this type of function is a real positive number different than one. For example 2 can be a base, 0.5 can be a base, Pi can be a base. For example we know that 2^2 = 4 and 2^5 = 32. The base in this case is 2 and the logarithm of 4 is 2, and the logarithm of 32 is 5. We always need to refer to the base. We normally say logarithm of 4 base 2 is 2, logarithm of 32 base 2 is 5. The expressions we have just discussed relate the exponential function y = 2^x and logarithmic function y = log2(x).  

Week 8 This week we will study linear systems, matrices and determinants. We can have 2x2 systems or 3x3 systems or 4x4 systems and etcetera. ( we say 2 by2 system or 3 by 3 system, etcetera.)  A 2x2 system consist of two equations with two variables. In general we solve these systems by using matrices, especially if we are using computers. The reason we do that is because the process of solving a system using matrices is very easy to write as a set of steps that involves just adding and multiplying numbers. We are going to study determinants not only to solve linear systems but because determinants are of theoretical interest.

Academic Honesty:
Academic integrity is the foundation of the academic community. Because each student has the primary responsibility for being academically honest, students are advised to read and understand all sections of this policy relating to standards of conduct and academic life. Park University students and faculty members are encouraged to take advantage of the University resources available for learning about academic honesty (www.park.edu/current or http://www.park.edu/faculty/).from Park University 2010-2011 Undergraduate Catalog Page 92
Academic dishonesty includes committing or the attempt to commit cheating, plagiarism, falsifying academic records, and other acts intentionally designed to provide unfair advantage to the students.

Cheating includes, but is not limited to, intentionally giving or receiving unauthorized aid or notes on examinations, papers, laboratory reports, exercises, projects, or class assignments which are intended to be individually completed.  Cheating also includes the unauthorized copying of tests or any other deceit or fraud related to the student's academic conduct.

Falsifying academic records includes, but is not limited to, altering grades or other academic records.

Other acts that constitute academic dishonesty include:

Stealing, manipulating, or interfering with an academic work of another student or faculty member.

Collusion with other students on work to be completed by one student.

Lying to or deceiving a faculty member.

Plagiarism:
Plagiarism involves the use of quotations without quotation marks, the use of quotations without indication of the source, the use of another's idea without acknowledging the source, the submission of a paper, laboratory report, project, or class assignment (any portion of such) prepared by another person, or incorrect paraphrasing. from Park University 2010-2011 Undergraduate Catalog Page 92-93
ALL GRADED WORK FOR THIS COURSE MUST BE YOUR OWN.  YOU ARE NOT TO RECEIVE OUTSIDE ASSISTANCE FROM ANYONE OTHER THAN YOUR INSTRUCTOR.  To further clarify; classmates, spouses, co-workers, tutors, clergy, librarians, friends, relatives, and pets are included as OUTSIDE ASSISTANCE.  PLEASE DO NOT VIOLATE THIS RULE.

When discussion questions request you to answer in your own words, do not copy words from the textbook as your own.  State YOUR understanding of the concept, not the understanding of some other person.  If you are allowed to quote the textbook, or other sources, you must use proper quotation markings and declare the source including web URL address or book page number from which you copied the text.  Not following these rules constitutes plagiarism, and will not be tolerated.  (This means you will not earn points for the assignment, and if the plagiarism does not stop immediately you will FAIL the course.  Additionally, a report of the incident will be sent to your permanent academic file.)

Attendance Policy:
Instructors are required to maintain attendance records and to report absences via the online attendance reporting system.

  1. The instructor may excuse absences for valid reasons, but missed work must be made up within the semester/term of enrollment.
  2. Work missed through unexcused absences must also be made up within the semester/term of enrollment, but unexcused absences may carry further penalties.
  3. In the event of two consecutive weeks of unexcused absences in a semester/term of enrollment, the student will be administratively withdrawn, resulting in a grade of "F".
  4. A "Contract for Incomplete" will not be issued to a student who has unexcused or excessive absences recorded for a course.
  5. Students receiving Military Tuition Assistance or Veterans Administration educational benefits must not exceed three unexcused absences in the semester/term of enrollment. Excessive absences will be reported to the appropriate agency and may result in a monetary penalty to the student.
  6. Report of a "F" grade (attendance or academic) resulting from excessive absence for those students who are receiving financial assistance from agencies not mentioned in item 5 above will be reported to the appropriate agency.
ONLINE NOTE: An attendance report of "P" (present) will be recorded for students who have logged in to the Online classroom at least once during each week of the term. Recording of attendance is not equivalent to participation. Participation grades will be assigned by each instructor according to the criteria in the Grading Policy section of the syllabus.

Park University 2010-2011 Undergraduate Catalog Page 95-96

Disability Guidelines:
Park University is committed to meeting the needs of all students that meet the criteria for special assistance. These guidelines are designed to supply directions to students concerning the information necessary to accomplish this goal. It is Park University's policy to comply fully with federal and state law, including Section 504 of the Rehabilitation Act of 1973 and the Americans with Disabilities Act of 1990, regarding students with disabilities. In the case of any inconsistency between these guidelines and federal and/or state law, the provisions of the law will apply. Additional information concerning Park University's policies and procedures related to disability can be found on the Park University web page: http://www.park.edu/disability .

Additional Information:

INCOMPLETE POLICY




Incompletes are NOT a right, but a rare exception that are granted only in the most extraordinary of situations.




If you feel that you will require an incomplete (again, the exception, not the rule), it is your responsibility to contact your instructor BEFORE THE END OF THE COURSE and make this request. In most cases, written third party documentation will be required to support your request. It is at the discretion of the instructor whether an incomplete will be granted and for what length of time it will be granted, with an absolute maximum extension period of 90 days. Furthermore, incomplete grades will be assigned following all the requirements indicated by the Park University Incomplete Policy.




Click here to view Park University's Incomplete Policy 

Copyright:

This material is protected by copyright and can not be reused without author permission.

Last Updated:7/31/2010 9:26:38 AM