![]() ![]() MATH 120 Precalculus (5) NSc, RSN Basic properties of functions, graphs with emphasis on linear, quadratic, trigonometric, exponential functions and their inverses. Prerequisite: either a minimum grade of 2.0 in MATH 125, or a minimum score of 4 on BC advanced placement test. MATH 116 Introduction to Taylor Polynomials and Taylor Series (1) Brief introduction to Taylor polynomials, error bounds, and Taylor series. Content varies and must be individually evaluated. 15) Mathematics courses taken through a UW approved study abroad program. MATH 115 Study Abroad Mathematics 1 (1-10, max. Prerequisite: minimum grade of 2.0 in MATH 111. Credit does not apply toward a mathematics major. Techniques of differentiation and integration. MATH 112 Application of Calculus to Business and Economics (5) NSc, RSN Rates of change, tangent, derivative, accumulation, area, integrals in specific contexts, particularly economics. Recommended: completion of Department of Mathematics' Guided Self-Placement. Exponential and logarithm functions various applications to growth of money. Algebraic and graphical manipulations to solve problems. MATH 111 Algebra with Applications (5) NSc, RSN Use of graphs and algebraic functions as found in business and economics. Consult the Admissions Exams for Credit website for more information. MATH 109 International Baccalaureate (IB) Standard Level Mathematics (5) NSc Course awarded based on International Baccalaureate (IB) score. MATH 108 International Baccalaureate (IB) Mathematical Studies (5) NSc Course awarded based on International Baccalaureate (IB) score. MATH 103 Introduction to Elementary Functions (5) Continues the study of algebra begun in MATH 100 and MATH 102 with emphasis on functions (polynomial, rational, logarithmic, exponential, and trigonometric). MATH 102 Algebra (5) Similar to the first three terms of high school algebra. Open only to students in the Educational Opportunity Program or admitted with an entrance deficiency in mathematics. Assumes no previous experience in algebra. MATH 100 Algebra (5) Similar to the first three terms of high school algebra. Consult the Admissions Equivalency Guide website for more information. Course awarded as transfer equivalency only. Includes linear equations and models, linear systems in two variables, quadratic equations, completing the square, graphing parabolas, inequalities, working with roots and radicals, distance formula, functions and graphs, exponential and logarithmic functions. MATH 098 Intermediate Algebra (0) Intermediate algebra equivalent to third semester of high school algebra. Each number system is examined in terms of its algorithms, its applications, and its mathematical structure.Detailed course offerings (Time Schedule) are available for Topics covered include problem solving, sets and functions, numeration systems, whole numbers (including some number theory), and integers. Although only two years of high school mathematics are required, a more complete background including pre-calculus or calculus is desirable. Enrollment is limited to 30 students per section. Class participation is expected and constitutes a significant part of the course grade. The course is conducted using a discussion format. Concepts are heavily emphasized with some attention given to calculation and proof. It is required of all students intending to earn an elementary teaching certificate and is taken almost exclusively by such students. This course, together with its sequel Math 489, provides a coherent overview of the mathematics underlying the elementary and middle school curriculum. No credit granted to those who have takend or are enrolled in Math 485. ![]() While the main effort will be to establish the foundations of the subject, applications will include the Fast Fourier Transform, the heat equation, the wave equation, sampling, and signal processing.ģ Credits. Topics will include properties of complex numbers, the Discrete Fourier Transform, Fourier series, the Dirichlet and Fejer kernals, convolutions, approximations by trigonometric polynomials, uniqueness of Fourier coefficients, Parseval's identity, properties of trigonometric polynomials, absolutely convergent Fourier series, convergence of Fourier series, applications of Fourier series, and the Fourier transform, including the Poisson summation formula and Plancherel's identity. It should be particularly suitable for majors in the sciences and engineering. This is an introduction to Fourier Analysis geared towards advanced undergraduate students from both pure and applied areas. The course also can be viewed as a way of deepening one’s understanding of the 100-and 200-level material by applying it in interesting ways. This course is an introduction to Fourier analysis with emphasis on applications. No credit granted to those who have completed or are enrolled in Math 450 or 454. ![]()
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