December 20th, 2018 02:29 PM | ||
Unregistered | The Link through which We got the pdf is enable to show any Kind Of Syllabus so plz Send Us another One. | |
September 30th, 2017 10:40 AM | ||
Unregistered | Quote:
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February 18th, 2017 10:01 AM | ||
Unregistered | Re: SGBAU BSC Final Syllabus I want the syllabus of B.Sc Final year of Sant Gadge Baba Amravati University so will you please provide me? | |
April 25th, 2015 12:46 PM | ||
Rohit Barla | SGBAU BSC Final Syllabus I am a student of the BSC Final year course at Sant Gadge Baba Amravati University (SGBAU) . I lost my syllabus any where . will you please tell how I can download the BSC Final year course syllabus from website of the SGBAU. Ok, I am providing you the syllabus of B.Sc Final year of Sant Gadge Baba Amravati University SGBAU B.Sc Final year Syllabus Semester V- Sr.No. Subject 1 Mathematics (Paper -IX) 2 Mathematics (Paper -X) 3 Science subjects excluding Mathematics Semester VI- Sr.No. Subject 1 Mathematics (Paper -XI) 2 Mathematics (Paper -XII) 3 Science subjects excluding Mathematics 5S Mathematics - Paper – IX (Analysis) Unit I : Riemann Integral. Integrability of continuous and monotonic functions. The fundamental theorem of integral calculus. Mean value theorems of integral calculus. Improper integrals and their convergence. Comparison and limit tests . Unit II : Continuity and differentiability of complex functions. Analytic functions. Cauchy-Riemann equations. Harmonic and Conjugate functions. Milne Thompson method Unit III : Elementary functions Mapping by elementary functions. Mobius transformations. Fixed points. Cross ratio. Inverse points and critical points. Conformal mappings. Unit IV : Metric Spaces :Countable and uncountable sets. Definition & examples of metric spaces. Neighbourhoods. Limit points. Interior points. Open and closed sets. Closure, Interior & boundary points. Sub-space of a metric space. Cauchy sequences. Completeness. Cantor’s intersection theorem. Baire category theorem. Unit V : Compactness. Connectedness. Limit of functions. Uniform continuous functions. Continuity and compactness. Continuity and connectedness. Reference Books : 1. R. R. Goldberg:Methods of Real Analysis, Oxford IBH publishing Co. New Delhi, 1970. 2. T. M. Karade, J. N. Salunke, K. S. Adhav, M. S. Bendre : Lectures on Analysis, Sonu Nilu Publication, Nagpur. 3. Walter Rudin: Principles of Mathematical Analysis, International students edition (Third edition ) 4. T. M. Apostol :Mathematical Analysis, Narosa Publishing House, New Delhi, 1985., 5. S. Lang : Undergraduate Analysis, Springer-Verlag New York, 1983. 6. D. Somasundaram & B. Choudhari : A First Course in Mathematical Analysis, New Delhi. 1997. 7. Shanti Narayan : A Course of Mathematical Analysis, S. Chand & Co., New Delhi. 8. P. K. Jain & S. K. Kaushik : An Introduction to Real Analysis, S. Chand & Co. New Delhi, 2000. 9. R. V. Churchiln and J.W.Brown, Complex Variables and Applications, 5th Edition, McGraw Hill, New York,1990 10. Mark J Ablowitz and : A.S. Fokas, Complex Variable Introduction and Application ,Cambridge University Press ,South Asian Edition ,1998. 11. Shanti Narayan : Theory of functions of Complex Variable,,S.Chand and Co. New Delhi. 12. E.T.Coption,:Metric Spaces, Cambridge University Press ,1968. 13. P.K.Jain and K.Ahmed ,:Metric Spaces ,Narosa Publishing House, New Delhi 1996. 14. G.F.Simmons :Introduction to Topology and Modern Analysis, McGraw Hill, New York,1963 For complete syllabus here is the attachment Contact- Sant Gadge Baba Amravati University Camp Area, Near Tapovan Gate, Amravati, Maharashtra 444602 |