Real Analysis
This course will enable the students to -
- Develop an understanding of real numbers, limit points, open and closed sets.
- Introduction to limit and convergence of a sequence, continuous functions on closed intervals.
- Understand Riemannian integration and improper integrals.
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Course |
Learning outcomes (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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Course Code |
Course Title |
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24CMAT 301 |
Real Analysis (Theory)
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CO23: Explain the basic characteristics of real numbers, such as limit and interior points that led to the development of real analysis. CO24: Demonstrate an understanding of limits and convergence of sequences. CO25: Explain the concept of continuous functions on closed interval and derivable functions. CO26: Demonstrate the ability to integrate knowledge and ideas of Riemannian integration. CO27: Analyze the convergence of Improper integrals and solve related problems. CO28: Contribute effectively in course-specific interaction. |
Approach in teaching: Interactive Lectures, Discussion, Power Point Presentations, Informative videos
Learning activities for the students: Self learning assignments, Effective questions, presentations, Assigned tasks
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Quiz, Power Point Presentations, Individual and group projects, Open Book Test, Semester End Examination
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Real number system as a complete ordered field, Open and closed sets, Limit point of sets, Bolzano Weirstrass theorem, Concept of compactness, Heine Borel theorem.
Limit and convergence of a sequence, Monotonic sequences, Cauchy’s sequences, Sub sequences and Cauchy’s general principle of convergence.
Properties of continuous functions on a closed interval, Derivable functions: Derivative of composite function, Inverse function theorem, Limit and continuity of a function of two variables, Rolle’s and Darboux theorem.
Lower and upper Riemann integral, Properties of Riemann integration, Mean value theorem of integral calculus, Fundamental theorem of integral calculus.
Kinds of improper integral, Tests of convergence of improper integrals and related problems.
- Shanti Narayan, A Course of Mathematical Analysis, S. Chand and Co., New Delhi, 2005.
- T. M. Apostol, Mathematical Analysis, Norosa Publishing House, New Delhi, 2002.
- K. C. Sarangi, Real Analysis and Metric Spaces, Ramesh Book Depot, Jaipur, 2017.
- Robert G. Bartle and Donald R. Sherbert, Introduction to Real Analysis, John Wiley & Sons Canada, 2011.
- P. K. Jain and S.K. Kaushik, An Introduction to Real Analysis, S.Chand and Co., New Delhi, 2000.
- S. Lang, Undergraduate Analysis, Springer-Verlag, 2005.
- R.R. Goldberg, Real Analysis, Oxford and IBH Publishing Company, New Delhi, 2020.
- Charles Chapman Pugh, Real Mathematical Analysis, Springer, 2010.
- Stephen Abbott, Understanding Analysis, Springer, 2010.
e- RESOURCES
- https://s2pnd-matematika.fkip.unpatti.ac.id/wp-content/uploads/2019/03/Real-Analysis-4th-Ed-Royden.pdf
- https://pdfcoffee.com/mathematical-analysis-by-s-c-malik-savita-arora-1906574111pdf-pdf-free.html
- http://www.ru.ac.bd/wp-content/uploads/sites/25/2019/03/205_04_Apostol-Mathematical-Analysis-1973.pdf
- https://nptel.ac.in/courses/111106053
JOURNALS
- https://www.springer.com/journal/41478
- https://www.degruyter.com/journal/key/anly/html?lang=en
- https://www.hindawi.com/journals/ijanal/
- https://www.sciencedirect.com/journal/journal-of-mathematical-analysis-and-applications
- https://www.worldscientific.com/worldscinet/aa
