MATH 2250, Fall 2019

MATH 2250-04 — Differential Equations and Linear Algebra

Fall 2019

Instructor:	Akil Narayan
Email:	akilsci.utah.edu
Office phone:	+1 801-581-8984
Office location:	WEB 4666, LCB 116
Office hours:	Akil Narayan: Monday, Wednesday 10:00am-11:30am (WEB 4666) Junpeng Jiao: Wednesday 10am-12pm (WEB 1705) Catherine Warner: Monday, Tuesday 9:30am-10:30am (WEB 1705)

Class meeting time:	Monday, Tuesday, Wednesday, Thursday (lab section), Friday 8:35am - 9:25am (MTWF lecture). Labs (sections 05-08) are held at various times on Thursdays
Class meeting location:	JWB 335 (MWF), JFB 103 (Tu)
Textbook (required):	H. C. Edwards and D. E. Penney and D. Calvis, Differential Equations and Linear Algebra (4th edition), Pearson (2017), ISBN-13: 978-0-13-449718-1, ISBN-10: 0-13-449718-X. NOTE: Unless you opt-out, you will be charged for electronic access to the text through the Inclusive Access program on Canvas. You may opt out by following the instructions here.

This is a hybrid course which teaches the allied subjects of linear algebra and differential equations. These topics underpin the mathematics required for most students in the Colleges of Science, Engineering, Mines & Earth Science.

Engineering students interested in pursuing further mathematics courses can elect to earn a minor in Mathematics by taking 2-4 additional courses. More details are available on this PDF flier. Please consult with your Engineering advisor for further information.

The course syllabus is here: PDF

The Department of Mathematics provides drop-in tutoring services for this course. Please see https://www.math.utah.edu/undergrad/mathcenter.php for details. Note that you should schedule your visit during a time when a knowledgable tutor is available who can address your questions. Each tutor's specialties and schedule are shown on the webpage above.

Graded assignments

Individual grades for each assignment will be posted to Canvas. (uNID login required.) Note that the letter grades appearing on Canvas are not representative of predicted final letter grades for the course. Final letter grades will be computed according to the rubric and policies on the syllabus.

Homework assignments

Homework will be collected in-class on Thursdays. Late work will not be accepted without advance approval from the instructor.

Problem set description	Due date	Homework
1 : Basics of differential equations	August 29, 2019	PDF
L1 : Lab Assignment 1	August 29, 2019	PDF
2 : First-order linear equations and equilibrium solutions	September 5, 2019	PDF
L2 : Lab Assignment 2	September 5, 2019	PDF
3 : Numerical methods and linear systems	September 19, 2019	PDF
L3 : Lab Assignment 3	September 19, 2019	PDF
4 : Matrix manipulations	September 26, 2019	PDF
L4 : Lab Assignment 4	September 26, 2019	PDF
5 : Vector spaces	October 3, 2019	PDF
L5 : Lab Assignment 5	October 3, 2019	PDF
6 : Second order equations	October 24, 2019	PDF
L6 : Lab Assignment 6	October 24, 2019	PDF
7 : Nonhomogeneous equations	October 31, 2019	PDF
L7 : Lab Assignment 7	October 31, 2019	PDF
8 : Laplace transforms	November 7, 2019	PDF
L8 : Lab Assignment 8	November 7, 2019	PDF
9 : Eigenvalues	November 21, 2019	PDF
L9 : Lab Assignment 9	November 21, 2019	PDF
10 : Systems of DEs	December 5, 2019	PDF
L10 : Lab Assignment 10	December 5, 2019	PDF

Miscellaneous handouts

The following are various relevant handouts.

Description	Posting date	Download
Lecture 00 slides: Introduction	August 15, 2019	PDF
Lecture 01 slides: Models and differential equations	August 15, 2019	PDF
Lecture 02 slides: Integrating differential equations	August 15, 2019	PDF
Lecture 03 slides: Slope/direction fields	August 15, 2019	PDF
Midterm 1 practice	August 20, 2019	PDF
Midterm 1 practice solutions	Septebmer 4, 2019	PDF
Midterm 1	Septebmer 25, 2019	PDF
Lecture 04 slides: Separable equations	August 25, 2019	PDF
Lecture 05 slides: First-order linear DE's	August 25, 2019	PDF
Lecture 06 slides: Applications	August 25, 2019	PDF
Lecture 07 slides: Equilibrium solutions and stability	August 25, 2019	PDF
Lecture 08 slides: Acceleration and velocity models	September 8, 2019	PDF
Lecture 09 slides: Numerical methods	September 8, 2019	PDF
Lecture 10 slides: Introduction to linear systems	September 8, 2019	PDF
Lecture 11 slides: Gaussian elimination	September 15, 2019	PDF
Lecture 12 slides: Reduced Echelon form	September 15, 2019	PDF
Lecture 13 slides: Matrix arithmetic	September 15, 2019	PDF
Lecture 14 slides: Matrix inverses	September 16, 2019	PDF
Instructions to install Python with the Anaconda distribution	September 17, 2019	PDF
Lecture 15 slides: Matrix determinants	September 23, 2019	PDF
Lecture 16 slides: The vector space R³	September 24, 2019	PDF
Lecture 17 slides: The vector space Rⁿ	September 24, 2019	PDF
Midterm 2 practice	September 25, 2019	PDF
Lecture 18 slides: Linear independence and span	September 26, 2019	PDF
Lecture 19 slides: Basis and dimension	September 26, 2019	PDF
Vector space terminology and glossary	October 3, 2019	PDF
Lecture 20 slides: Second order linear equations	October 13, 2019	PDF
Lecture 21 slides: Higher order linear equations	October 13, 2019	PDF
Lecture 22 slides: Constant coefficient homogeneous equations	October 13, 2019	PDF
Lecture 23 slides: Mechanical vibrations	October 20, 2019	PDF
Lecture 24 slides: Undetermined coefficients	October 20, 2019	PDF
Lecture 25 slides: Forcing and resonance	October 20, 2019	PDF
Lecture 26 slides: Laplace Transforms	October 25, 2019	PDF
Lecture 27 slides: DE's and Laplace transforms	October 31, 2019	PDF
Laplace transforms table	November 1, 2019	PDF
Lecture 28 slides: Laplace transform manipulations	November 3, 2019	PDF
Lecture 29 slides: More Laplace transform properties	November 10, 2019	PDF
Lecture 30 slides: Step functions and temporal shifts	November 11, 2019	PDF
Lecture 31 slides: Eigenvalues and eigenvectors	November 14, 2019	PDF
Lecture 32 slides: Matrix diagonalization	November 17, 2019	PDF
Lecture 33 slides: Systems of DE's	November 17, 2019	PDF
Lecture 34 slides: DE system properties	November 23, 2019	PDF
Lecture 35 slides: Eigenvalue methods for DE systems	November 23, 2019	PDF
Midterm 2	December 2, 2019	PDF
Midterm 3	December 2, 2019	PDF
Laplace transforms table (full)	December 2, 2019	PDF

Software

The following are links to software used during class demonstrations.

Description	Language	Download
Lab 4 code	IPython notebook + matlab	github
All code below	Python + IPython notebook	github
Plotting slope fields	Python	slopefield.ipynb
Numerical methods utilities	Python	numerical_utils.py
Euler's method (requires numerical_utils.py)	Python	euler_demo.ipynb
Improved Euler's method (requires numerical_utils.py)	Python	improved_euler_demo.ipynb
Runge-Kutta methods (requires numerical_utils.py)	Python	runge_kutta_demo.ipynb
Convergence of numerical methods (requires numerical_utils.py)	Python	numerical_convergence.ipynb

Resources

IPython + Jupyter

https://www.anaconda.com/distribution/: Download and install the Anacanda distribution, which will install versions of Python, R, and Jupyter notebook. It is recommended that you install the latest Python version of the distribution.
https://www.youtube.com/watch?v=z_AbtVXOZvk: How to open IPython Notebook .ipynb files from a terminal command line. (After installing the Anaconda distribution above.)
https://www.youtube.com/watch?v=F5NsvOUDXi8: How to open IPython Notebook .ipynb files in Windows. (After installing the Anaconda distribution above.)
https://www.youtube.com/watch?v=HW29067qVWk: Long (30 min-ish) description of usage of Jupyter, including explanation of what Jupyter is.

Python

https://docs.python.org/3/tutorial/: 'The' Python tutorial
https://www.w3schools.com/python/: Another tutorial
https://www.learnpython.org/: ...and another tutorial