(New page: == Introduction== ---- I, and I assume other students, often find learning experience enhanced when the context of the study, i.e. origin and the application, clearly visible. (e.g. Stude...)
 
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I, and I assume other students, often find learning experience enhanced when the context of the study, i.e. origin and the application, clearly visible. (e.g. Students like psychology class - it's about themselves) And it is with this intent of identifying the context of linear algebra I sought to compile articles and notes for the project.
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I, and I assume other students, often find learning experience enhanced when the context of the study, i.e. origin and the application, clearly visible. (e.g. Students like psychology class - it's about themselves) And it is with this intent of identifying the context of [http://en.wikipedia.org/wiki/Linear_algebra linear algebra] I sought to compile articles and notes for the project.  
 
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Perhaps I should define what [http://en.wikipedia.org/wiki/Linear_algebra linear algebra] is.
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I set forth to identify an individual responsible for the invention of linear algebra, a progenitor of the principles of linear algebra as Newton was to Calculus [http://en.wikipedia.org/wiki/Leibniz_and_Newton_calculus_controversy (or was he?)]. I no longer think of doing so. Theorems and rules are attributed to single/group of mathematicians; linear algebra, I think, cannot. Rather, linear algebra appears to be a fundamental faculty in mathematics, and as I lend Professor Uli's words, "Linear algebra to mathematician is what addition and multiplication is to non-mathematicians." Perhaps as one cannot find a sole author of a particular language, one cannot find one for linear algebra.
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Unfortunately, I use the term linear algebra and mathematics indiscriminately- probably because I do not understand both well.  
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I set forth to identify an individual responsible for the invention of linear algebra, a progenitor of the principles of linear algebra as Newton was to Calculus [http://en.wikipedia.org/wiki/Leibniz_and_Newton_calculus_controversy (or was he?)]. I no longer think of doing so. Theorems and rules are attributed to single/group of mathematicians; linear algebra, I think, cannot. Rather, linear algebra appears to be a fundamental faculty in mathematics, and as I lend Professor Uli's words, "Linear algebra to mathematician is what addition and multiplication is to non-mathematicians." Perhaps as one cannot find a sole author of a particular language, one cannot find one for linear algebra. Rather, I will compile brief biography of intriguing mathematicians who may have had some say in advances in linear algebra, though I worry t
  
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In the search for application, few application matrix theory are readily noted, including its use in the Google's PageRank algorithm and alternate representation of geometry/graphs, but I'm rather unsatisfied with such selections since I also see them as general application of mathematics. What I mean by the previous statement is that I use the term linear algebra and mathematics indiscriminately because I do not understand both well.
  
  
 
In adolescence, I hated life and was continually on the verge of suicide, from which, however, I was restrained by the desire to know more mathematics.
 
In adolescence, I hated life and was continually on the verge of suicide, from which, however, I was restrained by the desire to know more mathematics.

Revision as of 17:25, 5 October 2011

Introduction


I, and I assume other students, often find learning experience enhanced when the context of the study, i.e. origin and the application, clearly visible. (e.g. Students like psychology class - it's about themselves) And it is with this intent of identifying the context of linear algebra I sought to compile articles and notes for the project.

I set forth to identify an individual responsible for the invention of linear algebra, a progenitor of the principles of linear algebra as Newton was to Calculus (or was he?). I no longer think of doing so. Theorems and rules are attributed to single/group of mathematicians; linear algebra, I think, cannot. Rather, linear algebra appears to be a fundamental faculty in mathematics, and as I lend Professor Uli's words, "Linear algebra to mathematician is what addition and multiplication is to non-mathematicians." Perhaps as one cannot find a sole author of a particular language, one cannot find one for linear algebra. Rather, I will compile brief biography of intriguing mathematicians who may have had some say in advances in linear algebra, though I worry t

In the search for application, few application matrix theory are readily noted, including its use in the Google's PageRank algorithm and alternate representation of geometry/graphs, but I'm rather unsatisfied with such selections since I also see them as general application of mathematics. What I mean by the previous statement is that I use the term linear algebra and mathematics indiscriminately because I do not understand both well.


In adolescence, I hated life and was continually on the verge of suicide, from which, however, I was restrained by the desire to know more mathematics.

Alumni Liaison

has a message for current ECE438 students.

Sean Hu, ECE PhD 2009