BC x
Name:
TI-89 Slope Fields, Euler, etc.
(assuming basic TI-89 knowledge) Mode Graph Diff Equations Y= F1 (9) Graph Formats Set: Solution Method Euler Fields Slpfld
To graph a slope field:
Under Y= , enter the differential equation in y1' =. Example: y1
Review of Dierentiation and Integration for MATH 3200 UCD Department of Mathematical and Statistical Sciences
This is a packet of prerequisite material necessary for understanding material covered in ordinary dierential equations. Many students take this
MATH 3200 Bennethum Review Problems for Final Exam: Laplace Transforms
These are practice problems on the Laplace trasform for the nal exam. For this exam, two sides of an 8.5x11 sheet of paper will be allowed for notes (it can be on two separate sheets).
MATH 3200
Review for Test 2
Bennethum
These are practice problems for test 2. For this exam, one side of an 8.5x11 sheet of paper will be allowed for notes. No technology of any kind will be allowed. The topics covered on this exam include material covere
MATH 3200
Review for Test 1
Bennethum
These are practice problems for test 1. For this exam, one side of an 8.5x11 sheet of paper will be allowed for notes. No technology of any kind will be allowed. The topics covered on this exam include material covere
Form of Particular Solution
(Adapted from Table 3.1 of Kohler and Johnson) The right-hand column gives the proper form to assume for a particular solution of ay + by + cy = g (t). In the right-hand column, choose r to be the smallest nonegative integer su
Math 3200 Mini-Projects
(modied from Bill Briggs 2004) This collection of assorted mini-projects is supported by the material that we will study this semester. You must complete two (2) mini-projects during the semester. The rst mini-project is due no lat
Laplace Transform Table
(Adapted from Table 5.1 of Kohler and Johnson) Time Domain Function f (t), t 0 Laplace Transform F (s) a h(t) = tn , et sin(t) cos(t) sinh(t) cosh(t) et f (t), with |f (t)| M eat et h(t) et tn , et sin(t) et cos(t) n = 1, 2, 3. 1,
Creating Direction Fields with DERIVE 5
Last updated: January 22, 2007 Steve Billups, modified by Lance Lana This tutorial describes how to use DERIVE 5 to generate a direction field for the first order differential equation:
dy -dx = r(x,y)
Direction fie