Difference between revisions of "User:Kle13"

From PrattWiki
Jump to navigation Jump to search
Line 1: Line 1:
 
== About Me ==
 
== About Me ==
 
My name is Kate Ernst. I am a student in the Pratt School of Engineering at Duke University.
 
My name is Kate Ernst. I am a student in the Pratt School of Engineering at Duke University.
 
  
 
== Name Pronunciation ==
 
== Name Pronunciation ==
Line 10: Line 9:
  
 
[http://www.purdue.edu/newsroom/research/2011/110830ZiaieOxygen.html Tiny Oxygen Generators Boost Effectiveness of Anticancer Treatment], Emil Venere, Purdue University, updated 30 August 2011, accessed 20 September 2011 (Engineering better medicine)
 
[http://www.purdue.edu/newsroom/research/2011/110830ZiaieOxygen.html Tiny Oxygen Generators Boost Effectiveness of Anticancer Treatment], Emil Venere, Purdue University, updated 30 August 2011, accessed 20 September 2011 (Engineering better medicine)
 +
 +
 +
== MatLab Demo ==
 +
My favorite demo on MatLab is the 3D knot because it helps me visualize the difficult concept of 3D graphing. The function must be put into parametric equation form. Taking the derivatives will result in more 3D graphs which represent velocity and acceleration. When you plot the surface, you can make changes to the lighting and the color to make the knot look nice.

Revision as of 04:42, 21 September 2011

About Me

My name is Kate Ernst. I am a student in the Pratt School of Engineering at Duke University.

Name Pronunciation

My given name is Katherine Ernst, but I choose to go by Kate. That my last name, Ernst, is one syllable. It is NOT pronounced Ernest!

Grand Challenges for Engineering

Engineering better medicine is a challenge that I am very interested in.

Tiny Oxygen Generators Boost Effectiveness of Anticancer Treatment, Emil Venere, Purdue University, updated 30 August 2011, accessed 20 September 2011 (Engineering better medicine)


MatLab Demo

My favorite demo on MatLab is the 3D knot because it helps me visualize the difficult concept of 3D graphing. The function must be put into parametric equation form. Taking the derivatives will result in more 3D graphs which represent velocity and acceleration. When you plot the surface, you can make changes to the lighting and the color to make the knot look nice.