Skip to content

ME 3255 Computational Mechanics

Notifications You must be signed in to change notification settings

ajp13001/ME3255S2017

master
Switch branches/tags

Name already in use

A tag already exists with the provided branch name. Many Git commands accept both tag and branch names, so creating this branch may cause unexpected behavior. Are you sure you want to create this branch?
Code
This branch is 102 commits ahead of sed12008:master.

Latest commit

 

Git stats

Files

Permalink
Failed to load latest commit information.
Type
Name
Latest commit message
Commit time
 
 
HW1
 
 
HW2
 
 
HW3
 
 
HW4
 
 
HW5
 
 
HW6
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 

Computational Mechanics

ME 3255 Spring 2017

Public (ipynb rendering)[https://github.com/cooperrc/ME3255S2017]

Course Description

This course introduces students to scientific programming utilizing Matlab/Octave. Numerical methods, best programming practices and version control are introduced. These methods will be applied to a number of physics-based problems.

Course Expectations

Students are expected to create numerical approximations for linear and nonlinear problems, understand approximations due to floating point operations and numerical approaches and solve differential equations using numerical differentiation and integration. Students are also expected to learn basics of git version control, matlab/octave functions and programming best practices.

Lectures: TTh 9:30-10:45 AM, Francis L. Castleman bdg (CAST) room 212

Instructor: Prof. Ryan C. Cooper (ryan.c.cooper@uconn.edu)

Office hours: Mon 2:30-4:30pm and Thur 11am-1pm in Engineering II room 315

Teaching Assistants:

  • Graduate: Peiyu Zhang peiyu.zhang@uconn.edu
  • Office hours: Friday 9:00-11:00am in Engineering II room 315

Course Information

Prerequisite: CE 3110, MATH 2410Q

Textbook: Chapra, Steven, Applied Numerical Methods with MATLAB for Engineers and Scientists 3rd edition.

Tools used: Matlab, Octave , Github.

Recommended tools: Github Desktop, git, Atom (text editor), Vim (text editor), Jupiter notebook (with matlab or octave kernel)

Grading

Item Percent Requirement
Homework 50 % Turn in homeworks by assigned due date
Midterm Exam 10 % One midterm exam
Final Project 30 % A final project that will consist of code and documentation
Participation 10 % During class online form will be sent out, you must submit form with your user ID to get credit

Note on Homework and online forms

The Homeworks are graded based upon effort, correctness, and completeness. The forms are not graded at all, if they are completed you get credit. It is your responsibility to make sure your answers are correct. Use the homeworks and forms as a study guide for the exams. In general, I will not post homework solutions.

Academic Integrity:

  • The instructors of this class have a zero-tolerance policy for academic misconduct, that is copying others' work either in the lab, field, or on an exam. Any student work that is found to be in violation of the university policy regarding academic misconduct will be assigned a grade of zero at a minimum.
  • Read and understand The UConn Student Code of Conduct. Students will follow all University regulations concerning the final exam.

Course Schedule (which is subject to change based upon feedback and pace of course)

Week Date Chapter Topic
1 1/17 1 Introduction to Numerical Methods and Github
1/19 4 Intro con’d and Roundoff/Truncation Errors
2 1/24 2 Intro to Matlab/Octave
1/26 3 Intro to m-files
3 1/31 Consistent Coding habits
2/2 5 Root Finding
4 2/7 6 Root Finding con’d
2/9 7 Snow Day
5 2/14 Optimization
2/16 8 Linear Algebra
6 2/21 9 Linear systems: Gauss elimination
2/23 10 Linear Systems: LU factorization
7 2/28 11 Linear Systems: Error analysis
3/2 12 Eigenvalues
8 3/7 1-10 Midterm Review
3/9 1-10 Midterm
9 3/14 N/A Spring Break!
3/16 N/A Spring Break!
10 3/21 12 Linear Systems: Iterative methods
3/23 14 Curve fitting: linear regression
11 3/28 15 Curve fitting: least squares and nonlinear regression
3/30 17 Polynomial interpolation
12 4/4 18 Splines and Piecewise Interpolation
4/6 19 Numerical Integration Formulas
14 4/11 20 Numerical Integration of Functions
4/13 21 Numerical Differentiation
15 4/18 22 ODEs: Initial value problem
4/20 23 ODEs: Adaptive methods and stiff systems
16 4/25 24 ODEs: Boundary value problems
4/27 Wrap up and final project discussions
17 5/1 Finals Finals Best of Lucks!

About

ME 3255 Computational Mechanics

Resources

Stars

Watchers

Forks

Releases

No releases published

Languages

  • TeX 78.8%
  • MATLAB 17.0%
  • Python 2.9%
  • HTML 1.3%