PK TQ\VFy y imsmanifest.xml
IMS Content
1.1
OCW
CWSpace
0.1
Linear Algebra - Communications Intensive
OCW Master Course Number
18.06CI
Spring 2004
OCW_LOMv1.0
Author
Brooke-Taylor, Andrew
2020-12-25
OCW_LOMv1.0
Author
Lachowska, Anna
2020-12-25
OCW Course Topics
Mathematics
Linear Algebra
OCW Course Topics
Humanities
Literature
Academic Writing
contents/index.htm.xml
Linear Algebra - Communications Intensive
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Linear Algebra - Communications Intensive
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18-06cis04.jpg
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18-06cis04-th.jpg
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Syllabus
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Calendar
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Assignments
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al2.pdf
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hw3.pdf
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al1.pdf
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al2.tex
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al1.tex
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al3.tex
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al1.ps
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al4.ps
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hw2.tex
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hw4.tex
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hw3.tex
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al4.pdf
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al3.pdf
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al4.tex
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hw2.pdf
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hw4.pdf
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al2.ps
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hw1.tex
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al3.ps
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hw1.pdf
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Projects
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rs3.tex
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final_project_5.pdf
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finalproject_2.pdf
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rs61.pdf
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1806ciphil.pdf
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rs4.tex
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rs1.pdf
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rs1.tex
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rs2.pdf
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rs3.pdf
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rs4.ps
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rs2.tex
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rs1.ps
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rs5.pdf
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rs5.tex
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rs2.ps
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rs5.ps
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rs61.ps
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paper4.pdf
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rs61.tex
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jsv_final_project_3.pdf
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rs3.ps
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rs4.pdf
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Study Materials
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sample3.tex
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sample2.tex
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talkhints.pdf
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sample1.tex
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matr1.tex
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sample4.tex
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sample5.tex
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Related Resources
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Legal Notices
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Privacy Statement
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Trademark Notices
contents/assignments/al3.tex.xml
contents/assignments/hw4.pdf.xml
contents/syllabus/index.htm.xml
contents/projects/rs4.ps.xml
contents/18-06cis04-th.jpg.xml
contents/assignments/hw3.pdf.xml
contents/assignments/al2.tex.xml
contents/assignments/al1.pdf.xml
contents/projects/rs5.ps.xml
contents/assignments/al3.ps.xml
contents/projects/rs2.ps.xml
contents/18-06cis04.jpg.xml
contents/projects/rs3.ps.xml
contents/projects/rs1.pdf.xml
contents/assignments/hw1.pdf.xml
contents/projects/rs61.pdf.xml
contents/study-materials/talkhints.pdf.xml
contents/assignments/hw3.tex.xml
contents/assignments/hw4.tex.xml
contents/assignments/al2.ps.xml
contents/related-resources/index.htm.xml
contents/projects/rs2.pdf.xml
contents/study-materials/sample3.tex.xml
contents/assignments/al1.tex.xml
contents/projects/rs1.ps.xml
contents/projects/paper4.pdf.xml
contents/projects/rs5.tex.xml
contents/assignments/hw2.tex.xml
contents/assignments/al1.ps.xml
contents/projects/rs4.pdf.xml
contents/study-materials/matr1.tex.xml
contents/assignments/index.htm.xml
contents/projects/jsv_final_project_3.pdf.xml
contents/projects/finalproject_2.pdf.xml
contents/study-materials/sample4.tex.xml
contents/assignments/al4.ps.xml
contents/assignments/al2.pdf.xml
contents/projects/1806ciphil.pdf.xml
contents/study-materials/index.htm.xml
contents/projects/rs61.tex.xml
contents/assignments/al4.tex.xml
contents/projects/final_project_5.pdf.xml
contents/assignments/hw1.tex.xml
contents/assignments/hw2.pdf.xml
contents/assignments/al4.pdf.xml
contents/projects/rs5.pdf.xml
contents/projects/rs2.tex.xml
contents/index.htm.xml
contents/projects/rs3.tex.xml
contents/projects/rs1.tex.xml
contents/projects/rs3.pdf.xml
contents/assignments/al3.pdf.xml
contents/study-materials/sample5.tex.xml
contents/study-materials/sample2.tex.xml
contents/study-materials/sample1.tex.xml
contents/calendar/index.htm.xml
contents/projects/index.htm.xml
contents/projects/rs61.ps.xml
contents/projects/rs4.tex.xml
PK zQ~3! 18-06ci-spring-2004/ReadMe.txtThis zip package contains the HTML pages and files associated with the course.
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If you have any trouble using this package, please contact us at ocw@mit.edu .PK zQ%aD6 6 18-06ci-spring-2004/START.htm
MIT OpenCourseWare | Welcome
Welcome to MIT Open Course Ware. You will be automatically redirected to Home. If you aren not forwarded to the new page, Click here to access the home page of the downloaded Click Here
PK SQM0 0 2 18-06ci-spring-2004/contents/18-06cis04-th.jpg.xml
18-06cis04-th.jpg
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LOMv1.0
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OCW_LOMv1.0
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2020-12-25
OCW_LOMv1.0
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Lachowska, Anna
2020-12-25
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This site (c) Massachusetts Institute of Technology 2020. Content within individual courses is (c) by the individual authors unless otherwise noted. The Massachusetts Institute of Technology is providing this Work (as defined below) under the terms of this Creative Commons public license ("CCPL" or "license") unless otherwise noted. The Work is protected by copyright and/or other applicable law. Any use of the work other than as authorized under this license is prohibited. By exercising any of the rights to the Work provided here, You (as defined below) accept and agree to be bound by the terms of this license. The Licensor, the Massachusetts Institute of Technology, grants You the rights contained here in consideration of Your acceptance of such terms and conditions.
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OCW Master Course Number
18.06CI Linear Algebra - Communications Intensive Spring 2004
This is a communication intensive supplement to Linear Algebra (18.06). The main emphasis is on the methods of creating rigorous and elegant proofs and presenting them clearly in writing. The course starts with the standard linear algebra syllabus and eventually develops the techniques to approach a more advanced topic: abstract root systems in a Euclidean space.
CIP
270102
Algebra and Number Theory
Linear Alegebra
Latex
LaTeX2e
mathematical writing
linear spaces
basis
dimension
linear mappings
matrices
subspaces
direct sums
reflections
Euclidean space
abstract root systems
simple roots
positive roots
Cartan matrix
Dynkin diagrams
classification
18.06CI
18.06
PK TQ/Ef. f. * 18-06ci-spring-2004/contents/index.htm.xml
Linear Algebra - Communications Intensive
This is a communication intensive supplement to Linear Algebra (18.06). The main emphasis is on the methods of creating rigorous and elegant proofs and presenting them clearly in writing. The course starts with the standard linear algebra syllabus and eventually develops the techniques to approach a more advanced topic: abstract root systems in a Euclidean space.
OCW Master Course Number
18.06CI
en
LOMv1.0
4
Spring 2004
OCW_LOMv1.0
Author
Brooke-Taylor, Andrew
2020-12-25
OCW_LOMv1.0
Author
Lachowska, Anna
2020-12-25
2004/09/09 15:35:45 GMT-4
2017/09/14 07:48:55.389 GMT-4
/courses/mathematics/18-06ci-linear-algebra-communications-intensive-spring-2004/index.htm
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OCW_LOMv1.0
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This site (c) Massachusetts Institute of Technology 2020. Content within individual courses is (c) by the individual authors unless otherwise noted. The Massachusetts Institute of Technology is providing this Work (as defined below) under the terms of this Creative Commons public license ("CCPL" or "license") unless otherwise noted. The Work is protected by copyright and/or other applicable law. Any use of the work other than as authorized under this license is prohibited. By exercising any of the rights to the Work provided here, You (as defined below) accept and agree to be bound by the terms of this license. The Licensor, the Massachusetts Institute of Technology, grants You the rights contained here in consideration of Your acceptance of such terms and conditions.
CIP
270102
Algebra and Number Theory
Linear Alegebra
Latex
LaTeX2e
mathematical writing
linear spaces
basis
dimension
linear mappings
matrices
subspaces
direct sums
reflections
Euclidean space
abstract root systems
simple roots
positive roots
Cartan matrix
Dynkin diagrams
classification
18.06CI
18.06
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