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Contents 1 Course Information 1.1 Exam Information 1.2 Instructor Information 1.3 Course Calander 1.4 Office Hours 1.5 Textbook Information 2 Course Documents 2.1 Handouts 2.1.1 Syllabus 2.2 Assignments 2.3 Course Links 2.3.1 Graphing Utilities

[edit] Course Information

MATH348: Advanced Engineering Mathematics - Introduction to partial differential equations, with applications to physical phenomena. Fourier series. Linear algebra, with emphasis on sets of simultaneous equations. Prerequisite: MATH 225 or equivalent.

[edit] Exam Information

Exam I will be held on February 22nd in class. There will be no notecards or calculators. Please look at the review sheet in the handout section below.

These downloads require Adobe Acrobat Reader Exam I Review List Q+A List

Exam II will be held on April 14th in class. There will be no notecards or calculators.

These downloads require Adobe Acrobat Reader Exam II Review List

The Final Exam will be held on May 3rd. There will be no notecards or calculators.

These downloads require Adobe Acrobat Reader Final Exam Information and Review List

[edit] Instructor Information

Instructor : Scott Strong

Office : Chauvenet Hall 278

Office Phone : 303.384.2446

email : math348.spring2008@gmail.com

[edit] Course Calander

Classes Begin : Janurary 9th, 2008

Meeting Days : Monday, Wednesday, Friday

Meeting Time : 8:00am-8:50am

Meeting Location : Meyer Hall 353

Class Holidays :

    Feburary 18th, 2008 - Presidents Day
    March 10th-14th, 2008 - Spring Break
    April 3rd-5th, 2008 - Engineering Days

Classes End : May 9th, 2008

[edit] Office Hours

Fixed Office Hours :

    Tuesday --- 9:00am-10:00am and 3:00pm-4:00pm,
    Thursday --- 9:00am-10:00am and 2:00pm-3:00pm.

If you cannot meet during the previous office hours then please contact me to schedule another meeting time.

[edit] Textbook Information

    Textbook : Advanced Engineering Mathematics - Erwin Kreyszig,) ISBN 978-0-471-48885-9

[edit] Course Documents

[edit] Handouts

These downloads require Adobe Acrobat Reader A61.TrigIdentities Special Angles and the Unit Circle FS for f(x}=x, x \in (-\pi,\pi) FS for f(x}=Exp(Abs(x)), x \in (-\pi,\pi) Exam I Review List Graphs of different Bessel functions of different types. Graphs of the zeroth and first order Bessel functions of the first kind. Heat Movie 1 - abs(x) Heat Movie 2 - parabola Heat Movie 3 - Double V Vibrating Membrane1 - 12.9.1 Example Vibrating Membrane2 - 12.9.1 Example Vibrating Membrane3 - 12.9.1 Example Vibrating Membrane4 - 12.9.1 Example Vibrating Membrane5 - 12.9.1 Example [edit] Syllabus MATH348.Spring2008.Syllabus [edit] Assignments Homework Assignment 1 Homework Assignment 1 - Solutions Homework Assignment 2 Homework Assignment 2 - Solutions Homework Assignment 3 Homework Assignment 3 - Solutions Homework Assignment 4 Homework Assignment 4 - Solutions Homework Assignment 5 - Edit - A typo has been corrected on problem 2. There was a missing prefactor associated with our FT convention Homework Assignment 5 - Solutions Homework Assignment 6 Homework Assignment 6 - Solutions Homework Assignment 7 - For problem 3b you should use L=1 NOT L=2L. Homework Assignment 7 - Solutions Homework Assignment 8 - Note the change in due date. - Note also a change to eqn (15) Homework Assignment 8 - Solutions Homework Assignment 9 Homework Assignment 9 - Hints Homework Assignment 9 - Solutions Homework Assignment 10 Homework Assignment 10 - Solutions Homework Assignment 10 - Solutions - There was an initial sign change noticed in problem 1. The previous solution is self consistent but this solution set contains the proper initial A matrix.

[edit] Course Links

[edit] Graphing Utilities

   Tutor-Homework Online Grapher
   Graphmatica - Free Download - Shareware Distro 
   Graphmatica Website