ANALYSIS-I

Paper Code: 
MAT 301
Credits: 
3
Contact Hours: 
45.00
Max. Marks: 
100.00
Objective: 
This course will enable the students to -
  1. Develop an understanding of real numbers, limit point, open and closed sets. 
  2. An introduction to limit and convergence of a sequence, continuous functions on closed intervals.
  3. Riemannian integration and proper integrals.

Course Outcomes (COs):

 Course

Learning outcomes

(at course level)

Learning and teaching strategies

Paper Code

Paper Title

MAT 301

 

 

 

 

 

 

 

 

Analysis-I

 

 (Theory)

 

 

 

 

 

 

The students will be able to –

 

CO26: Describe fundamental properties of the real numbers that lead to the formal development of real analysis.

CO27: Demonstrate an understanding of limits and how they are used in sequences, series, differentiation and integration.

CO28: Understand the concept of continuous functions on closed interval and Riemannian integration.

CO29: Construct rigorous mathematical proofs of basic results in real Analysis.

CO30: Appreciate how abstract ideas and rigorous methods in mathematical analysis can be applied to important practical problems.

 

Approach in teaching:

 

Interactive Lectures, Discussion, Power Point Presentations, Informative videos

 

Learning activities for the students:

Self learning assignments, Effective questions, presentations, Giving tasks

 

 

 

 

Unit I: 
I
9.00

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. 

Unit II: 
II
9.00

Real sequences, Limit and convergence of a sequence, Monotonic sequences, Cauchy’s sequences, Sub sequences and Cauchy’s general principle of convergence.

Unit III: 
III
9.00
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.
 
Unit IV: 
IV
9.00
Riemann Integration, Lower and upper Riemann integral, Properties of Riemann integration, Mean value theorem of integral calculus,  Fundamental  theorem of integral calculus.
 
Unit V: 
V
9.00

Improper integrals: Kinds of improper integral, Tests of convergence of improper integrals and related problems.

Essential Readings: 
 
  • Shanti Narayan,  A Course of Mathematical Analysis, S. Chand and Co., New Delhi, 1995.
  • T.M. Apostol, Mathematical Analysis, Norosa Publishing House, New Delhi, 2000.
  • K.C. Sarangi, Real Analysis and Metric Spaces, Ramesh Book Depot, Jaipur, 2006.
  • 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.
    2. S. Lang, Undergraduate Analysis, Springer-Verlag, 1997.
    3. R.R. Goldberg, Real Analysis, Oxford and IBH Publishing Company, New Delhi, 1999.
  • Charles Chapman Pugh, Real Mathematical Analysis, Springer, 2004.
  • Stephen Abbott, Understanding Analysis, Springer, 2010.
Academic Year: 
2020-2021
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