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Re: Sant Gadge Baba Amravati University M.sc Maths 1st Year Question Papers
As you are looking for the M.sc Maths 1st Year Question Papers of Sant Gadge Baba Amravati University, so I have .sc Maths 1st Year Question Papers of following subjects, check the below subjects and let me know for which you are lookimg M.Sc. PartI Semester I : Compulsory Papers Paper  1 MTH1 Real Analysis Paper  1 MTH2 Advanced Abstract AlgebraI Paper  1 MTH3 Comples AnalysisI Paper  1 MTH4 TopologyI Optional Papers : Choose Any One. Paper  1 MTH5 i) Differential GeometryI OR Paper  1 MTH6 ii) Advanced Discrete MathematicsI OR Paper  1 MTH7 iii) Differential and Integral EquationsI M.Sc. PartI Semester II : Compulsory Papers Paper  2 MTH1 Measure and Integration Theory Paper  2 MTH2 Advanced Abstract AlgebraII Paper  2 MTH3 Comples AnalysisII Paper  2 MTH4 TopologyII Optional Papers : Choose Any One. Paper  2 MTH5 Rienannian Geometry OR Paper  2 MTH6 Advanced Discrete MathematicsII OR Paper  2 MTH7 Differential and Integral EquationsII Address: Sant Gadge Baba Amravati University Tapovan Gate, Camp, SRPF Colony, Amravati, Maharashtra,444602, St Gadge Baba Amravati University, SRPF Colony, Amravati, Maharashtra 444602 0721 266 2173 Map:
__________________ Answered By StudyChaCha Member Last edited by Vinodt; April 19th, 2014 at 02:58 PM. 
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Re: Sant Gadge Baba Amravati University M.sc Maths 1st Year Question Papers
Sant Gadge Baba Amravati University is affiliated to UGC . It was established in the year 1983 . It offers two year M.sc Maths course . M.sc Maths 1st Year syllabus UnitI : Definition and existence of Riemann Stieltjes integral, properties of the integral, Integration and differentiation. The fundamental theorem of calculas, integral of Vector valued function, rectifiable curves. UnitII : Sequences and uniform convergence, Cauchy criterion for uniform convergence, Weierstrass Mtest, Abel’ s and Dirichlet’s tests for uniform convergence, uniform convergence and continuity , uniform conver gence and integration, uniform convergence and differentiation, Weierstrass approximation theorem. UnitIII : Rearrangement of terms of a series, Riemann’s theorem. Power series, Uniqueness theorem for power series, Abel’s limit theorem, Tauber’s first theorem. UnitIV : Functions of several variables, linear tranformation, derivatives in an open subset of Rn, Chain Rule, partial derivatives, interchange of order of differentiation,Derivatives of higher order , Taylor’s theorem. UnitV : Inverse function theorem. Implicit function theorem, Jacobians, Extremum problems with constraints, Lagrange’s multiplier method, Examples on Maxima and Minima, Differentiation of integrals. Paper II (102): Advanced Abstract Algebra UnitI : Automorphisms, conjugacy, Class Equation of Finite Groups and GSets. Normal series,solvable groups, Nilpotent groups. UnitII : Direct products, fundamental theorem of finitely generated Abelian group, Invariants of a finite Abelian group, Sylow’ s theorems, group of order P 2 , pq, UnitIII : Ideals, Nil Potent and Nil Ideals, Euclidean Ring . UnitIV : Polynomial Ring, Integral Domain,Principal Ideal Domain, Unique Factorization Domain,Euclidian Domain, Polnomial Rings over unique factorization domain. UnitV : Cyclic modules, simple modules, Shur’s lemma, free module, Noetherian and Artiniam Module and rings, Hilbert basics theorem, For detailed syllabus , here is the attachment Contact: Sant Gadge Baba Amravati University Camp Area,Near Tapovan Gate, Amravati, Maharashtra 444602 0721 266 2173 Map:
__________________ Answered By StudyChaCha Member 
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let X,Y,X*,Y* be the topological spaces. If X is homomorphic to X* and Y is homomorphic to Y* then show that X×Y to homomorphic toX*×Y*

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