MATH 305
Applied Real Analysis
Spring 2013
Division III
Quantitative/Formal Reasoning
This is not the current course catalog
Class Details
Real analysis or the theory of calculus–derivatives, integrals, continuity, convergence–starts with a deeper understanding of real numbers and limits. Applications in the calculus of variations or “infinite-dimensional calculus” include geodesics, harmonic functions, minimal surfaces, Hamilton’s action and Lagrange’s equations, optimal economic strategies, nonEuclidean geometry, and general relativity.
The Class:
Format: lecture
Limit: none
Expected: 35
Class#: 3207
Grading: yes pass/fail option, yes fifth course option
Limit: none
Expected: 35
Class#: 3207
Grading: yes pass/fail option, yes fifth course option
Requirements/Evaluation:
evaluation will be based primarily on homework, classwork, and exams
Prerequisites:
Mathematics 105 and 211, or permission of instructor
Distributions:
Division III
Quantitative/Formal Reasoning
Class Grid
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HEADERS
Column header 1
CLASSESColumn header 2DREQColumn header 3INSTRUCTORSColumn header 4TIMESColumn header 5CLASS#
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MATH 305 - 01 (S) LEC Applied Real Analysis
MATH 305 - 01 (S) LEC Applied Real AnalysisDivision III Quantitative/Formal ReasoningFrank MorganMWF 9:00 am - 9:50 am
Bronfman 1053207
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