Difference between revisions of "User:Jsj18"

From PrattWiki
Jump to navigation Jump to search
 
(6 intermediate revisions by the same user not shown)
Line 1: Line 1:
 
== About Me ==
 
== About Me ==
  
Hi there. I like long walks on the beach and romantic candlelight dinners.
+
I am currently a sophomore in the Pratt School of Engineering at Duke University. I am majoring in ECE and CS with a minor in Japanese language. I am also currently a TA for EGR103.
  
 
== My Name ==
 
== My Name ==
Line 10: Line 10:
  
 
[http://www.scientificamerican.com/article.cfm?id=virtual-reality-contact-l Virtual Reality Contact Lenses Could Be Available by 2014] , Charles Q. Choi , Scientific American , Created 2 February 2012 , 4 September 2012 (Enhance Virtual Reality)
 
[http://www.scientificamerican.com/article.cfm?id=virtual-reality-contact-l Virtual Reality Contact Lenses Could Be Available by 2014] , Charles Q. Choi , Scientific American , Created 2 February 2012 , 4 September 2012 (Enhance Virtual Reality)
 +
 +
== MATLAB Demonstrations ==
 +
 +
My favorite MATLAB demonstration is 3-D Drawing, where you plot a 2-D outline that is mirrored across a vertical axis and the outline is then revolved around an axis to create a surface of revolution. It showcases just one of MATLAB's unique functions in making 3-D visualizations, and it is quite fun to watch my random assortment of lines come together into a pretty blue vase.

Latest revision as of 17:57, 14 September 2013

About Me

I am currently a sophomore in the Pratt School of Engineering at Duke University. I am majoring in ECE and CS with a minor in Japanese language. I am also currently a TA for EGR103.

My Name

Jennie Ju (JEH-nee JOO)

Grand Challenges of Engineering

Virtual Reality Contact Lenses Could Be Available by 2014 , Charles Q. Choi , Scientific American , Created 2 February 2012 , 4 September 2012 (Enhance Virtual Reality)

MATLAB Demonstrations

My favorite MATLAB demonstration is 3-D Drawing, where you plot a 2-D outline that is mirrored across a vertical axis and the outline is then revolved around an axis to create a surface of revolution. It showcases just one of MATLAB's unique functions in making 3-D visualizations, and it is quite fun to watch my random assortment of lines come together into a pretty blue vase.