Difference between revisions of "User:ConnieCai"
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'''Interesting Facts:''' | '''Interesting Facts:''' | ||
* I'm from Portland, Oregon | * I'm from Portland, Oregon | ||
− | * I love pickles | + | * I love pickles, Pirate's Booty, and Honey Mustard Pretzels |
− | * My biggest pet peeve is when people walk slowly | + | * My biggest pet peeve is when people walk slowly!!! |
==Grand Challenges for Engineering== | ==Grand Challenges for Engineering== | ||
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Challenge: Secure Cyberspace | Challenge: Secure Cyberspace | ||
− | [http://www.networkworld.com/news/2011/081811-nstic-future-249865.html], Ellen Messmer, NetworkWorld, August 18, 2011, September 8, 2011 (Grand Challenge) | + | [http://www.networkworld.com/news/2011/081811-nstic-future-249865.html NSTIC Director: "We're trying to get rid of passwords'], Ellen Messmer, NetworkWorld, Created on August 18, 2011, Accessed on September 8, 2011 (Grand Challenge) |
− | ==Phonetic Pronunciation== | + | ==Phonetic Pronunciation of My Name== |
KAH-nee ky | KAH-nee ky | ||
Latest revision as of 20:49, 18 September 2011
Contents
About Me
My name is Connie Cai.
Interesting Facts:
- I'm from Portland, Oregon
- I love pickles, Pirate's Booty, and Honey Mustard Pretzels
- My biggest pet peeve is when people walk slowly!!!
Grand Challenges for Engineering
Challenge: Secure Cyberspace
NSTIC Director: "We're trying to get rid of passwords', Ellen Messmer, NetworkWorld, Created on August 18, 2011, Accessed on September 8, 2011 (Grand Challenge)
Phonetic Pronunciation of My Name
KAH-nee ky
MATLAB Demonstrations
My favorite demo from MATLAB Help is the demo for Inverses of Matrices. I enjoyed looking at this particular demo because it shows graphical representations of matrices and their relationship to their respective inverses. The "colormap(hot)" command was especially interesting, because it added another layer of depth into the demo, with various colors showing the various random numbers that were represented in the graph. Lastly, the final graph that illustrated the diagonal band of ones (the inverse matrix) was also graphically intriguing, giving an unexpected graphical representation to matrices and their inverses.