g) MAP 2302 Test 3 Print NAME:
Section Number:
NOTE: Work on these sheets for full credit. Please circle our ma] answers.
(7 Pts.) Qn. # I. Find a general power series solution about A: = 0 of the form y = 2 0,136" for the
differential equation (1- x) y
Exam 1
9-19-00
1. What is the order of
MAP 2302.02
Name: ANSWERS
-9=a>b .>L .L =/- a> "bL $> ?
#
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2nd order
2. a) Give an example of a linear differential equation.
Any equation which does NOT have any derivative of "C" multiplied by another derivat
COP 3502: Computer Science I
Fall 2016 Course Syllabus
Professor: Dr. Sean Szumlanski (seansz@cs.ucf.edu) (Office: HEC-219)
Course Meeting Time: MWF, 9:30 10:20 AM in CB1-104
Course Website: http:/webcourses.ucf.edu
Text: Data Structures, Algorithms & Sof
1 1 A B r:
= = = _+_+_
iris) E52+35+235 (5+13[5+235 5
*1 = iiimji = i
3 = iwlim = '
3' = seiwtm = i
Aside: the sheet eut shave can reduce time for simple Fertiel freetien
expensiens. A simple proof for nding E sleeve is given in this hes.
1 A E C
= _+_+_
UNIVERSITY OF CENTRAL FLORIDA
Department of Mathematics
Spring 2017
Course:
Class Meets:
Instructor:
Office:
Office Phone
E-mail:
Office Hours:
Textbook:
Contents to course:
MAP 2302.12, ORDINARY DIFFERENTIAL EQUATIONS
MSB 108, 9:00 - 10:20a.m., MW
Dr. Ma
g! MAP 2302 Test 2 Print NAME:
NOTE: Work on these sheets for full credit: In all seve s t is the independent variable.
(8 Pts.) Qn. # I. Given the DE: )2”) — 4 ya) + 4 ya) = f (I). In parts (2) - (4) give only the form
(that is, do not solve for the co
MAP 2302 Summer 2016 Suggested Problems
The following problems are from the text Differential Equations, 10th edition, by Boyce and
DiPrima.
The following groupings of problems (separated by commas) represent potential exam problems.
Exam 1, 6/10
1.1: 15
Name:
October 2, 2015
Week 6 Worksheet
MAP 2302 Ordinary Differential Equations 1
1. Find the solution of the initial value problem 3y 00 + 5y 0 2y = 0, y(0) = 5, y 0 (0) = 3.
(a) Find the characteristic equation.
(b) Find the roots of the characteristic
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University of Central Florida, Summer 2016
MAP 2302: Ordinary Differential Equations 1 (3 credits)
Course description: Methods of solution for first order equations. Linear equations. Laplace
transforms. Series solutions. Selected applications.
Course g
Chapter 10
Bonding and Molecular Structure:
Orbital Hybridization and
Molecular Orbitals
Goals
Understand the differences between
valence bond theory and molecular orbital
theory.
Identify the hybridization of an atom in a
molecule or ion.
Understand t
Chapter 3
Molecules,
Compounds,
and Chemical
Equations
Chemical Bonds
Compounds are composed of atoms held together by
chemical bonds
Bonds result from the attraction between the charged
particles (electron and protons) within atoms
Types of Bonds
Ionic
C
Linear momentum and
Collisions
Chapter 9
I. Linear Momentum and its Conservation
II. Impulse and Momentum
III. Collisions in One Dimension
IV. Collisions in Two Dimensions
V. The Center of Mass
VI. Motion of a System of Particles
VII. Deformable Systems
V
Chapter 3
Molecules,
Compounds,
and Chemical
Equations
Elemental Form
Molecules composed of only one element
http:/chemwiki.ucdavis.edu/
Compounds
Molecules of compounds are composed of more than one kind of atom
Compounds
When two or more elements combin
Quiz 2
MAP 2302, Ordinary Differential Equations, Spring 2017
1/20/2017
Name:
For the following problems, determine if the given differential equations are homogeneous or exact and use the appropriate method to solve. You must show your work and
use prope
Quiz 1
MAP 2302, Ordinary Differential Equation, Spring 2017
1/13/2017
Name:
You must show your work to receive full credit.
1) Determine whether each differential equation is linear or nonlinear (circle one), and
determine its order.
d2 y
dy
(a) (1 + y)