Real Analysis-I & Differential Equations -I (Mathematics) B.Sc 3rd Sem Book

Real Analysis-I & Differential Equations -I Book B.Sc 3rd Sem

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Buy Latest (Mathematics) Real Analysis-I & Differential Equations -I Book in Bilingual Edition ( Both English and Hindi ) for B.Sc 3rd Semester University of Rajasthan, Jaipur NEP-2020 By Thakur Publication. Written by Experienced Authors | Fast Delivery |

AUTHORS: Dr. Ajeet Kumar , Manish Gupta

ISBN : 978-93-6180-269-0

Syllabus

Real Analysis

Course Code: MJC-03

Major

Unit

Subject

No. of Lectures

Dedekind theory of real numbers, Algebraic and order properties of R, Archimedean Property, Density Theorem, Completeness property of R, Bounded sets, Theorems on Suprema and lnfima.

Neighbourhood of a point in R, Open and closed sets, Limit points and isolated points of a set, Bolzano-Weierstrass theorem for a set, Derived set, Clouser and Interior of a set.

Sequence and its convergence, Bounded sequence, Monotone sequences, Subsequences, Limit of a sequence, Limit Theorem, Bolzano-Weierstrass theorem for sequences, Limit superior and limit inferior for bounded sequence, Cauchy sequence, Cauchy’s general principle of convergence.

Infinite series and their convergence, Cauchy Criterion, Tests for convergence: Comparison test, D’Alembert Ratio Test, Cauchy's root test, Rabbe’s test, Logarithmic test, D’Morgan and Bertrand’s test, Cauchy integral test, Cauchy condensation test, Gauss’s test, Alternating series, Leibnitz test, Absolute and Conditional convergence.

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Course Code: MJC-03

Major

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No. of Lectures

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Syllabus

Real Analysis

Minor

Course Code: MIC-03

Unit

Subject

No. of Lectures

Dedekind theory of real numbers, Algebraic and order properties of R, Archimedean Property, Density Theorem, Completeness property of R, Bounded sets, Theorems on Suprema and Infima.

Sequence and its convergence, Bounded sequence, Monotone sequences, Subsequences, Limit of a sequence, Limit Theorem, Bolzano-Weierstrass theorem for sequences, Cauchy sequence, Cauchy’s general principle of convergence.

Infinite series and their convergence, Cauchy Criterion, Tests for convergence: Comparison test, D’Alembert Ratio Test, Cauchy’s root test, Rabbe’s test, Logarithmic test, Cauchy integral test, Gauss’s test, Alternating series, Leibnitz test, Absolute and Conditional convergence.

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Minor

Course Code: MIC-03

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No. of Lectures

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