MATH 2306 sec. 51 & 54 Fall 2015

Course Text: Differential Equations with Boundary Value Problems 8th Ed. by Zill and Wright ISBN 978-1111827069

Projected Semester Schedule (both sections)

Syllabus sec. 51 (8am)

Syllabus sec. 54 (10am)

NOTE: The pdf documents posted here are my creation and are not to be used for any commercial purpose.


Useful Links:

KSU Department of Mathematics

KSU SMART Center        (University Tutoring Services)

Mathispower4u          (Instructional Video Library by James Sousa)

D2L Brightspace

Table of Laplace Transforms   (This is the table to be provided during exams.)

Webwork Practice Sets

You can use these as a study tool. Choose "Guest" log in. These are not recorded in any way.

Calculus 1              Calculus 2           Differential Equations


Final Exam Information:

Section 51: Wednesday 12/9/15 from 8am-10am in D218

Section 54: Monday 12/14/15 from 10:30am-12:30pm in D237

Exam 1 Review                         Exam 1 Review Solutions

Exam 2 Review                         Exam 2 Review Solutions

Exam 3 Review                         Exam 3 Review Solutions

Exam 4 Review                         Exam 4 Review Solutions

Some final exams from past semesters:

Example 1              Example 2                Example 3

This semester's exams with solutions are still posted below.


Material for Exam 4

Exam 4 Solutions section 51        (8am)

Exam 4 Solutions section 54        (10am)


Material for Exam 3

Exam 3 Solutions section 51        (8am)

Exam 3 Solutions section 54        (10am)


Material for Exam 2

Exam 2 Solutions section 51        (8am)

Exam 2 Solutions section 54        (10am)


Material for Exam 1

Exam 1 Solutions section 51            (8am)

Exam 1 Solutions section 54            (10am)

 


Lecture Slides 8am:

Aug 17          Aug 19          Aug 21          Aug 24          Aug 26         Aug 28          Aug 31

Sept 2          Sept 4           Sept 9           Sept 14          Sept 16       Sept 18         Sept 21

Sept 23        Sept 25          Sept 28         Sept 30         Oct 2           Oct 7             Oct 9

Oct 12          Oct 14           Oct 16           Oct 19           Oct 21         Oct 23           Oct 26

Oct 28          Oct 30           Nov 2             Nov 9            Nov 11        Nov 13          Nov 16

Nov 18         Nov 20           Nov 30          Dec 2


 Lecture Slides 10am:

Aug 17          Aug 19          Aug 21          Aug 24          Aug 26          Aug 28          Aug 31   

Sept 2           Sept 4           Sept 9          Sept 14         Sept 16         Sept 18          Sept 21

Sept 23         Sept 25         Sept 28         Sept 30         Oct 2            Oct 7              Oct 9

Oct 12           Oct 14          Oct 16           Oct 19           Oct 21          Oct 26            Oct 28

Oct 30           Nov 2            Nov 9            Nov 11          Nov 13         Nov 16           Nov 18

Nov 20          Nov 30


Homework Problems:

The quiz problems will come from these.

1.1 pg. 10 #1-7odd, 9, 11, 13, 15, 17, 21, 23, 27, 29, 31

1.2 pg. 17 #1, 3, 5, 7, 9, 11, 13, 15, 35, 39, 41, 43, 47 

2.2 pg. 51 #1-21odd, 23, 25, 27, 29, 59(a, b)

2.3 pg. 61 #1-23odd, 25-35odd

1.3 pg. 28 #1, 3, 9, 11

3.1 pg. 90 #1, 5, 9, 21, 23, 25, 27, 29, 31, 35, 41

4.1 pg. 127 #1, 3, 5, 7, 9, 13, 15-21odd, 23-29odd, 31, 33, 35

4.2 pg. 131 #1, 3, 7-15odd, 17

4.3 pg. 137 #1-13odd, 15, 19, 21, 29-35odd, 37, 49-55odd

4.4 pg. 147 #1-21odd, 27-33odd

4.6 pg. 161 #1, 3, 5, 11, 13, 15, 17, 19, 23

4.9 pg. 184 #1, 3, 7, 13, 21

5.1 pg. 205 #1, 3, 5, 9(a, b), 21, 23, 25, 29, 31, 39, 45, 47, 49, 53

7.1 pg. 280 #1, 3, 7, 11, 13, 19-31odd, 37, 39, 43, 45, 55

7.2 pg. 288 #1-29odd, 31-37odd, 41

7.3 pg. 297 #1-19odd, 21-29odd, 37-47odd, 55, 57, 59, 63, 65, 67

11.2 pg. 430 #1, 3, 5, 7, 11, 13, 21

11.3 pg. 437 #1-10all, 11-21odd, 25-31odd, 39


Learning Outcomes:

Upon completing this course students should be able to:

1. Solve first-order separable and linear differential equations, and use these methods to solve applied problems.

2. Solve higher-order constant-coefficient linear differential equations and systems of differential equations, and use these methods to solve applied problems.

3. Find Laplace transforms and inverse transforms, and apply these to solve differential equations.

4. Find the Fourier series of a function.

 

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