![]() Optional Additional Topics: Professors should feel free toĪdd or replace some topics with others of comparable value, Problems in other coordinate systems, making use of variousĬhapter 15, sections 15.3-15.4: Introduction to the Separation of variables, with application of the methods ofįourier expansions to boundary value problems involving theĬlassical linear partial differential equations encounteredĬhapter 14, sections 14.1-14.3: Boundary value Including the Frobenius method and its application to theĬhapter 12, sections 12.1-12.6.2: Orthogonalįunctions, Fourier series, Sturm-Liouville problems,įourier-Bessel and Fourier-Legendre series.Ĭhapter 13, sections 13.1-13.8: Introduction to Linear differential equations by the method of power series, Optional additional topics listed at the end:Ĭhapter 5, sections 5.1-5.3.2: Solution of ordinary Thus the syllabus is organized as follows, with Generalization of the power series method) for regular singular Forīessel functions, one needs also the Frobenius method (a Series to solve ordinary linear differential equations. Students in this course have not studied the use of power More general orthogonal function expansions, such asįourier-Legendre and Fourier-Bessel series. There are also important applications of this method requiring ![]() Partial differential equations by separation of variables. The latter course no longer exists, so it is important in MathĤ038 to teach enough Fourier analysis for the treatment of Ordinary differential equations that included Fourier analysis. Many years ago, this course was preceded by a course in Method of separation of variables in linear partialĭifferential equations, with applications to importantĮquations of classical physics such as the wave equation, the The most important goal of this course is to teach the Undergraduate Engineering majors who are preparing for graduate Incoming graduate students in engineering who did not have suchĪ course in preparation for graduate study, together with It is intended as a course that serves the needs of This course is cross listed with Mechanical EngineeringĤ563, though it is being taught only by the Mathematicsĭepartment. ![]() Variables for partial differential equations with boundary Bessel functions andĬhapter 12 - 15: Fourier analysis, Sturm-Liouville Remember that you need to learn to solve the problems without Manual, but I think that most students find this helpful. Think it is better for you as an engineer to have the wholeīook as a permanent reference on your own bookshelf, but that Of Zill's book, but only for the semester of this course. Webassign access includes the use of the online e-book version The campus bookstore should have the package deal available, or you can contact Customer Service at the Publisher to purchase the package deal, if it is your choice.ħ of the correct text, and also remember that there will be aĬharge for WebAssign if you need to buy it separately. This ISBN is non-returnable and the special package price is This ISBN package price includes the printed book, the student solutions manual, and WebAssign for a custom price. Zill, and published by Jones and Bartlett. – 9781284273960 ADVANCED ENGINEERING MATHEMATICSħth Edition, by Dennis G. Students in Math 4038: The ISBN for the special package The publisher has the following package deal for LSU Show WebAssign that you have already paid their fee. If you buy theīook with WebAssign you'll have a code to use so that you can You'll need to pay WebAssign a fee directly. The textbook can be purchased either with or without Instructor Leonard Richardson, and the following class Link and self-register for Math 4038, section 1, with I answer email many times daily-usually quickly.Įach student needs to click the WebAssign Email first to make sure I'm able meet with you. However, I can meet with several of you at the same time if the students are comfortable with this. There is a Zoom Waiting Room in case more than one person comes at the same time. TTh 1PM - 2 PM online only, at this Zoom link. ![]() MWF Noon - 1 PM in person in my office, 386 Lockett Hall.The Final Exam will be Saturday, December 10, 10:00 AM - NOON Our class meets starting Monday, August 22, 2022. Please note: This is a room change-different from what you may have seen before. The course will meet in room 239 Lockett Hall. Math 4038 Syllabus and downloads Math 4038-1, Fall 2022: Information for Students
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