<< Chapter < Page Chapter >> Page >
This is one of the modules in a collection titled "Programming Oldies But Goodies" that gathers many of my tutorials in their original HTML format into a common location to make them readily available for Connexions users. The contents of these modules cannot be downloaded from cnx.org in PDF format. However, the original HTML files along with image files and other support files can be downloaded in the cnx offline.zip format.

Table of contents

Preface

Over the years, I have published a large number of tutorials in the areas of computer programming and digital signal processing (DSP). As I have time available, I am converting the more significant of those tutorials into cnxml code and re-publishing them at cnx.org.

In the meantime, this is one of the modules in a collection titled Programming Oldies But Goodies that gathers many of the tutorials in their original HTML format into a common location to make them readily available for Connexions users.

The tutorials linked to this module cannot be downloaded from cnx.org in PDF format. However, the original HTML files along with image files and other support files can be downloaded in the Connexions offline.zip format.

Some of the tutorials may require source code that is defined in other tutorials. I have attempted to make certain that all of the source code requiredby all of the tutorials listed below is included in this module. However, if one of these tutorials refers to another tutorial or to a program that is notincluded, try searching for it by title on cnx.org or on the web. It is probably available somewhere.

Many of the tutorials will contain internal links to other tutorials that I have written and published somewhere on the web. Those links may, or may notstill be good. In any event, if you search cnx.org for the tutorial by title or by topic, you will probably find a clean copy of the tutorial on cnx.org.

  • Java1305 Enterprise JavaBeans: Java 2 Platform, Enterprise Edition, Part 1
  • Java1306 Enterprise JavaBeans: Java 2 Platform, Enterprise Edition, Part 2
  • Java1307 Enterprise JavaBeans: Java 2 Platform, Enterprise Edition, Part 3
  • Java1310 Enterprise JavaBeans: Getting Started with EJB, Part 1
  • Java1311 Enterprise JavaBeans: Getting Started with EJB, Part 2
  • Java1312 Enterprise JavaBeans: Getting Started with EJB, Part 3
  • Java1313 Enterprise JavaBeans: Getting Started with EJB, Part 4
  • Java1314 Enterprise JavaBeans: Getting Started with EJB, Part 5
  • Java1315 Enterprise JavaBeans: Getting Started with EJB, Part 6
  • Java1316 Enterprise JavaBeans: Getting Started with EJB, Part 7
  • Java1320 Enterprise JavaBeans: Middle-Tier Servers and J2EE
  • Java1322 Enterprise JavaBeans: Helper Classes

Also see supplemental material published here .

Miscellaneous

This section contains a variety of miscellaneous information.

Housekeeping material
  • Module name: Obg0240: Enterprise JavaBeans
  • File: Obg0240.htm
  • Published: 01/04/13
  • Revised: 01/12/16
Disclaimers:

Financial : Although the Connexions site makes it possible for you to download a PDF file for thismodule at no charge, and also makes it possible for you to purchase a pre-printed version of the PDF file, you should be aware that some of the HTML elements in this module may not translate well intoPDF.

I also want you to know that, I receive no financial compensation from the Connexions website even if you purchase the PDF version of the module.

In the past, unknown individuals have copied my modules from cnx.org, converted them to Kindle books, and placed them for sale on Amazon.com showing me as the author. Ineither receive compensation for those sales nor do I know who does receive compensation. If you purchase such a book, please beaware that it is a copy of a module that is freely available on cnx.org and that it was made and published withoutmy prior knowledge.

Affiliation : I am a professor of Computer Information Technology at Austin Community College in Austin, TX.

-end-

Questions & Answers

show that the set of all natural number form semi group under the composition of addition
Nikhil Reply
explain and give four Example hyperbolic function
Lukman Reply
_3_2_1
felecia
⅗ ⅔½
felecia
_½+⅔-¾
felecia
The denominator of a certain fraction is 9 more than the numerator. If 6 is added to both terms of the fraction, the value of the fraction becomes 2/3. Find the original fraction. 2. The sum of the least and greatest of 3 consecutive integers is 60. What are the valu
SABAL Reply
1. x + 6 2 -------------- = _ x + 9 + 6 3 x + 6 3 ----------- x -- (cross multiply) x + 15 2 3(x + 6) = 2(x + 15) 3x + 18 = 2x + 30 (-2x from both) x + 18 = 30 (-18 from both) x = 12 Test: 12 + 6 18 2 -------------- = --- = --- 12 + 9 + 6 27 3
Pawel
2. (x) + (x + 2) = 60 2x + 2 = 60 2x = 58 x = 29 29, 30, & 31
Pawel
ok
Ifeanyi
on number 2 question How did you got 2x +2
Ifeanyi
combine like terms. x + x + 2 is same as 2x + 2
Pawel
x*x=2
felecia
2+2x=
felecia
Mark and Don are planning to sell each of their marble collections at a garage sale. If Don has 1 more than 3 times the number of marbles Mark has, how many does each boy have to sell if the total number of marbles is 113?
mariel Reply
Mark = x,. Don = 3x + 1 x + 3x + 1 = 113 4x = 112, x = 28 Mark = 28, Don = 85, 28 + 85 = 113
Pawel
how do I set up the problem?
Harshika Reply
what is a solution set?
Harshika
find the subring of gaussian integers?
Rofiqul
hello, I am happy to help!
Shirley Reply
please can go further on polynomials quadratic
Abdullahi
hi mam
Mark
I need quadratic equation link to Alpa Beta
Abdullahi Reply
find the value of 2x=32
Felix Reply
divide by 2 on each side of the equal sign to solve for x
corri
X=16
Michael
Want to review on complex number 1.What are complex number 2.How to solve complex number problems.
Beyan
yes i wantt to review
Mark
use the y -intercept and slope to sketch the graph of the equation y=6x
Only Reply
how do we prove the quadratic formular
Seidu Reply
please help me prove quadratic formula
Darius
hello, if you have a question about Algebra 2. I may be able to help. I am an Algebra 2 Teacher
Shirley Reply
thank you help me with how to prove the quadratic equation
Seidu
may God blessed u for that. Please I want u to help me in sets.
Opoku
what is math number
Tric Reply
4
Trista
x-2y+3z=-3 2x-y+z=7 -x+3y-z=6
Sidiki Reply
can you teacch how to solve that🙏
Mark
Solve for the first variable in one of the equations, then substitute the result into the other equation. Point For: (6111,4111,−411)(6111,4111,-411) Equation Form: x=6111,y=4111,z=−411x=6111,y=4111,z=-411
Brenna
(61/11,41/11,−4/11)
Brenna
x=61/11 y=41/11 z=−4/11 x=61/11 y=41/11 z=-4/11
Brenna
Need help solving this problem (2/7)^-2
Simone Reply
x+2y-z=7
Sidiki
what is the coefficient of -4×
Mehri Reply
-1
Shedrak
how did you get the value of 2000N.What calculations are needed to arrive at it
Smarajit Reply
Privacy Information Security Software Version 1.1a
Good
Got questions? Join the online conversation and get instant answers!
Jobilize.com Reply

Get Jobilize Job Search Mobile App in your pocket Now!

Get it on Google Play




Source:  OpenStax, Programming oldies but goodies. OpenStax CNX. Apr 10, 2014 Download for free at https://legacy.cnx.org/content/col11478/1.23
Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Programming oldies but goodies' conversation and receive update notifications?

Ask