## Math 116 - College Algebra

 Spring Semester, 1997 Section 01: 10:00 - 10:50 am, MTRF, S137 Instructor: James Jones Office: IT&M Division, Room C223 Phone: 875-7211, ext 490 email: james@richland.edu Web: http://people.richland.edu/james
Text:
College Algebra, A Graphing Approach, 2nd ed. Larson, Hostetler, Edwards. Copyright 1997, Houghton Mifflin Company. (Required)
Prerequisite:
The prerequisite is successful completion of Math 098, Intermediate Algebra, sufficient score on a placement exam, or permission of the Dean of the Industrial Technology and Mathematics Division.
Course Description:
Mathematics 116, College Algebra, is a concentrated study of the topics traditionally found in College Algebra. The topics include a quick and intense review of the topics from Intermediate Algebra, including algebraic expressions, polynomials, equations, problem solving, complex numbers, and graphing. Major topics include functions, exponential and logarithmic functions, matrices, polynomial equations, inequalities, introduction to analytic geometry, conic sections, systems of equations, mathematical induction, and the binomial expansion theorem.
Course Objectives:
The student is expected to: 1) demonstrate an understanding of the concepts related to functions and their inverses. 2) identify and graph quadratic, polynomial, rational, exponential, and logarithmic functions as well as the conic sections; also, demonstrate knowledge of the properties of these functions and relations and apply this knowledge to real world situations. 3) demonstrate proficiency in solving linear and non-linear systems using various algebraic, matrix, and graphical methods. 4) graphically represent the solutions to inequalities and system of inequalities that involve two variables. 5) use appropriate theorems and techniques to locate the roots of second and higher degree polynomial equations. 6) use the notation and formulae associated with arithmetic and geometric sequences and series. 7) demonstrate knowledge of binomial expansion, Pascal's triangle, and combinatorial formulae. 8) use technology appropriately in problem solving and in exploring and developing mathematical concepts.
Type of Instruction:
Lecture, discussion, problem solving, and group work will be used. Students should come to class with a prepared list of questions.
Attendance Policy:
Regular attendance is essential for satisfactory completion of this course. If you have excessive absences, you cannot develop to your fullest potential in the course. Students who, because of excessive absences, cannot complete the course successfully, will be administratively dropped from the class at midterm. If a student stops attending after midterm, it is the student's responsibility to withdraw to avoid an "F".
The student is responsible for all assignments, changes in assignments, or other verbal information given in the class, whether in attendance or not.
If a student must miss class, a call to the instructor (RCC's phone system has an answering system) is to be made, or an email message sent. When a test is going to be missed, the student should contact the instructor ahead of time if at all possible. Under certain circumstances, arrangements can be made to take the test before the scheduled time. If circumstances arise where arrangements cannot be made ahead of time, the instructor should be notified and a brief explanation of why given by either voice or email. This notification must occur before the next class period begins. At the instructors discretion, the score on the final exam may be substituted for the missed exam.

There will be several one hour examinations and a comprehensive final examination. Announced and unannounced quizzes may be given. Laboratory and homework exercises may be used in grading. Collected assignments will lose 10% of the grade for each class period late. A grade may be taken on your notebook. Note: Homework is essential to the study of mathematics. Letter grades will be assigned to final adjusted scores as follows: A=90-100%; B=80-89%; C=70-79%; D=60-69%; F=0-59%.
Consideration will be given to such qualities as attendance, class participation, attentiveness, attitude in class, and cooperation to produce the maximum learning situation for everyone.
Any student who stops attending without dropping will receive a grade of F.
Notebooks:
A notebook should be kept which contains every problem worked in class as well as any comments that are appropriate. In general, it should contain everything written on the chalkboard. Be sure to bring your notebook if you come to the instructor or a tutor for help. I strongly urge you to get a three-ring binder to keep your papers in.
Topics to be covered:
Algebraic Equations and Inequalities; Functions and Graphs; Polynomial Functions: Graphs and Zeros; Rational Functions and Conic Sections; Exponential and Logarithmic Functions; Systems of Equations and Inequalities; Matrices and Determinants; Sequences and Counting Principles.
Calculators:
A TI-82 or TI-83 graphing calculator is required in this course. Calculators may be used to do homework. Calculators may be used on exams and/or quizzes in class unless otherwise announced.