hmm, ok, I'm not sure where you got that... but here's what i see as a list of topics... i edited the really long descriptions. But you can all get an idea of what's going on...
REAL NUMBERS
The field axioms and properties of real numbers including the subsets: whole numbers, integers, rational numbers, and irrational numbers. The decimal representation of real numbers with special constants to many digits and in different bases...
TABLES OF FUNCTIONAL VALUES
Tables of values of real valued functions of a real variable; for example, trigonometric, logarithmic, and exponential tables are included, as well as, many more transcendental functions. Many complex valued functions are also tablulated...
GRAPHS OF FUNCTIONS
Graphs of real valued functions of a real variable; for example, lines, quadratic, cubic, polynomial, rational, trigonometric, logarithmic, and exponential are included, as well as, many more transcendental functions. Many complex valued functions are also graphed. Many animation are included...
COMPLEX NUMBERS
The field axioms, operations on complex numbers, and properties of complex numbers including the subsets: imaginary numbers and the Gaussian intgers. The exponential (and trigonometric) representation of complex numbers with special constants to many digits...
COLLEGE ALGEBRA
Linear, quadratic and higher order polynomial equations and inequalities solved algebraically, graphically and numerically; graphs and operations on relations and functions; real and complex zeros of polynomials and rational functions; exponential and logarithmic functions; systems of linear equations; matrices...
TRIGONOMETRY
Trigonometric functions, radian measure, solution of triangles, graphs of trigonometric functions, trigonometric identities and equations, and complex numbers...
ANALYTIC GEOMETRY
Vectors, lines in two dimensions, circles, conics, transformation of coordinates, polar coordinates, parametric equations, and the solid analytic geometry of vectors, lines, planes, cylinders, spherical and cylindrical coordinates...
CALCULUS I
Calculus I consists of the concepts of limit, continuity, differentiation and integration; and the applications of these concepts. In general... [i edited, its long, it just says a lot about what calc 1 is.]
CALCULUS II
Calculus II is intended to complete the basic introduction to calculus for students in the mathematical and physical sciences, and for others who require a solid introduction to calculus; and consists of the applications of integration, techniques of integration, parametric equations, polar coordinates, sequences and series... [edit this one too... it says a lot]
CALCULUS III
Calculus III consists of the concepts of
partial differentiation, multiple integrals (with applications), line integrals, Green’s Theorem, surface integrals, Stokes’ Theorem, and the divergence theorem... [lots again]
DIFFERENTIAL EQUATIONS
Ordinary differential equations with emphasis on the solutions and analysis of first and higher order differential equations drawn from fields of physics, chemistry, geometry, and engineering...
LINEAR ALGEBRA
Solving systems of linear equations, matrix operations, determinants, vector spaces, linear transformation, orthogonality, Gram-Schmidt process, projections, and eigenvalues and eigenvectors...
PROBABILITY
Permutations, combinations, events and their probabilities, Bayes formula, random variables, probability distributions, expected value, functions of random variables, moment generating functions, central limit theorem and its role in statistics...
STATISTICS
Descriptive statistics, relationships between variables, interpretation of data and graphs, rudiments of probability, elementary statistical models, hypothesis testing, inference, and estimation. Topics in multivariate data analysis with applications in various areas of interest, including multiple regression, analysis of experimental designs, covariate adjustment, non-linear regression and the use of standard multivariate statistical packages. A comprehensive study of basic statistical methods. Topics include descriptive statistics, numeracy, report writing, basic probability, experimental design and analysis...
FINANCIAL MATHEMATICS
Presents material covered in a traditional algebra course but with emphasis toward business applications. Linear equations, systems of linear equations, systems of linear inequalities, elements of matrix algebra and probability. Presents some of the mathematical tools that are useful in the analysis of business and economic problems. Topics are: compound interest, annuities, differential and integral calculus...
EUCLIDEAN GEOMETRY
The word "geometry" comes from the Greek geometrein (geo,"earth", and "metrein, "to measure"); geometry was originally the science of measuring the land... [a TON of stuff...]
NUMBER THEORY
Various topics in elementary number theory. Divisibility, congruences, quadratic reciprocity, and multiplicative functions...
GROUP THEORY
Zorn’s Lemma, groups, including free groups and dihedral groups. Rings including factorization, localization, rings of polynomials, and formal power series. An introduction to modules...
RING THEORY
Rings and field theory, including polynomial rings and field extensions...
ADVANCED CALCULUS
The properties of continuous mappings from N-dimensional Euclidean space to M-dimensional Euclidean space; an introduction to differential forms and vector calculus, based upon line integrals, surface integrals, and the general Stokes theorem...
GALOIS THEORY
The basic principles of Galois theory are introduced in this course. Topics covered are rings, polynomial rings, fields, algebraic extensions, normal extensions, and the fundamental theorem of Galois theory.
