#1  
21st February 2011, 04:53 PM
pagidi
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Posts: 1

Previous year papers of GATE Mathematics?


please send me Previous year papers of GATE Mathematics?

Please reply

thanks




  #2  
22nd February 2011, 02:27 AM
deep_4
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Location: PuNe... :)
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Thumbs up Re: Previous year papers of GATE Mathematics?

GATE Previous Year Mathematics PAPERS...

See the attachments For previous year question papers fOr Gate mathematics... (i have attached 2007-1010 Previous year papers.)

For preparation & More previous year papers you can Refer This Book..

GATE MATHEMATICS Practice Workbook



Click here To get Details.
Attached Files
File Type: pdf Gate Mathematics 2007 Paper.pdf(2.54 MB, 164 views)
File Type: pdf Gate Mathematics 2008 Paper.pdf(2.48 MB, 173 views)
File Type: pdf Gate Mathematics 2010 Paper.pdf(209.3 KB, 158 views)
  #3  
22nd February 2011, 03:08 AM
arvind_singh
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Location: pune
Posts: 2,504
Default Re: Previous year papers of GATE Mathematics?

iam attaching the pdf of previous year exam hope it will help you

just keep in mind do as hard work as u can do
Attached Files
File Type: pdf 2007.pdf(2.54 MB, 137 views)
File Type: pdf 2008.pdf(2.48 MB, 88 views)
File Type: pdf 2009.pdf(1.88 MB, 1988 views)
File Type: pdf 2010.pdf(209.3 KB, 86 views)
  #4  
22nd February 2011, 04:29 AM
nitingoplani88
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Join Date: Jan 2011
Posts: 267
Default Re: Previous year papers of GATE Mathematics?

open this link you will fine gate mathematics previous papers (from 2000 to 2011). it will be more beneficial for you

http://questionpaper.in/QuestionPaper.aspx?id=878&bn=45

READ WHOLE SYLLABUS TOPIC BY TOPIC

Linear Algebra: Finite dimensional vector spaces; Linear transformations and their matrix representations, rank; systems of linear equations, eigen values and eigen vectors, minimal polynomial, Cayley-Hamilton Theroem, diagonalisation, Hermitian, Skew-Hermitian and unitary matrices; Finite dimensional inner product spaces, Gram-Schmidt orthonormalization process, self-adjoint operators.

Complex Analysis: Analytic functions, conformal mappings, bilinear transformations; complex integration: Cauchy's integral theorem and formula; Liouville's theorem, maximum modulus principle; Taylor and Laurent's series; residue theorem and applications for evaluating real integrals.

Real Analysis: Sequences and series of functions, uniform convergence, power series, Fourier series, functions of several variables, maxima, minima; Riemann integration, multiple integrals, line, surface and volume integrals, theorems of Green, Stokes and Gauss; metric spaces, completeness, Weierstrass approximation theorem, compactness; Lebesgue measure, measurable functions; Lebesgue integral, Fatou's lemma, dominated convergence theorem.

Ordinary Differential Equations: First order ordinary differential equations, existence and uniqueness theorems, systems of linear first order ordinary differential equations, linear ordinary differential equations of higher order with constant coefficients; linear second order ordinary differential equations with variable coefficients; method of Laplace transforms for solving ordinary differential equations, series solutions; Legendre and Bessel functions and their orthogonality.

Algebra: Normal subgroups and homomorphism theorems, automorphisms; Group actions, Sylow's theorems and their applications; Euclidean domains, Principle ideal domains and unique factorization domains. Prime ideals and maximal ideals in commutative rings; Fields, finite fields.

Functional Analysis: Banach spaces, Hahn-Banach extension theorem, open mapping and closed graph theorems, principle of uniform boundedness; Hilbert spaces, orthonormal bases, Riesz representation theorem, bounded linear operators.

Numerical Analysis: Numerical solution of algebraic and transcendental equations: bisection, secant method, Newton-Raphson method, fixed point iteration; interpolation: error of polynomial interpolation, Lagrange, Newton interpolations; numerical differentiation; numerical integration: Trapezoidal and Simpson rules, Gauss Legendre quadrature, method of undetermined parameters; least square polynomial approximation; numerical solution of systems of linear equations: direct methods (Gauss elimination, LU decomposition); iterative methods (Jacobi and Gauss-Seidel); matrix eigenvalue problems: power method, numerical solution of ordinary differential equations: initial value problems: Taylor series methods, Euler's method, Runge-Kutta methods.

Partial Differential Equations: Linear and quasilinear first order partial differential equations, method of characteristics; second order linear equations in two variables and their classification; Cauchy, Dirichlet and Neumann problems; solutions of Laplace, wave and diffusion equations in two variables; Fourier series and Fourier transform and Laplace transform methods of solutions for the above equations.

Mechanics: Virtual work, Lagrange's equations for holonomic systems, Hamiltonian equations.

Topology:
Basic concepts of topology, product topology, connectedness, compactness, countability and separation axioms, Urysohn's Lemma.

Probability and Statistics: Probability space, conditional probability, Bayes theorem, independence, Random variables, joint and conditional distributions, standard probability distributions and their properties, expectation, conditional expectation, moments; Weak and strong law of large numbers, central limit theorem; Sampling distributions, UMVU estimators, maximum likelihood estimators, Testing of hypotheses, standard parametric tests based on normal, X2 , t, F - distributions; Linear regression; Interval estimation.

Linear programming: Linear programming problem and its formulation, convex sets and their properties, graphical method, basic feasible solution, simplex method, big-M and two phase methods; infeasible and unbounded LPP's, alternate optima; Dual problem and duality theorems, dual simplex method and its application in post optimality analysis; Balanced and unbalanced transportation problems, u -u method for solving transportation problems; Hungarian method for solving assignment problems.

Calculus of Variation and Integral Equations: Variation problems with fixed boundaries; sufficient conditions for extremum, linear integral equations of Fredholm and Volterra type, their iterative solutions.
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  #5  
22nd February 2011, 06:36 PM
pops07
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Location: Chittaranjan
Posts: 2,717
Default Re: Previous year papers of GATE Mathematics?

here below in the attachment you will get last 15 years GATE papers on mathematics.

please download them.
Attached Files
File Type: pdf GATE Mathematics-1996.pdf(246.3 KB, 181 views)
File Type: pdf GATE Mathematics-1997.pdf(244.1 KB, 148 views)
File Type: pdf GATE Mathematics-1998.pdf(296.4 KB, 155 views)
File Type: pdf GATE Mathematics-1999.pdf(262.4 KB, 196 views)
File Type: pdf GATE Mathematics-2000.pdf(234.4 KB, 145 views)
File Type: pdf GATE Mathematics-2001.pdf(304.8 KB, 160 views)
File Type: pdf GATE Mathematics-2002.pdf(298.5 KB, 156 views)
File Type: pdf GATE Mathematics-2003.pdf(491.7 KB, 158 views)
File Type: pdf GATE Mathematics-2004.pdf(446.9 KB, 137 views)
File Type: pdf GATE Mathematics-2005.pdf(511.9 KB, 179 views)
File Type: pdf GATE Mathematics-2006.pdf(475.6 KB, 149 views)
File Type: pdf GATE Mathematics-2007.pdf(467.9 KB, 148 views)
File Type: pdf GATE Mathematics-2008.pdf(2.48 MB, 107 views)
File Type: pdf GATE Mathematics-2009.pdf(324.6 KB, 120 views)
File Type: pdf GATE Mathematics-2010.pdf(391.4 KB, 143 views)
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  #6  
22nd February 2011, 07:38 PM
Ankur agrawal
Senior Member
 
Join Date: Sep 2010
Posts: 859
Default Re: Previous year papers of GATE Mathematics?

[ATTACH][ATTACH][ATTACH](www.entrance-exam.net)-GATE Mathematics Sample Paper 4.pdf[/ATTACH][/ATTACH][/ATTACH]see the below attachment for gate papers......
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  #7  
23rd February 2011, 01:37 AM
foreturner
Senior Member+
 
Join Date: Feb 2011
Posts: 582
Default Re: Previous year papers of GATE Mathematics?

here is your maths GATE papers of previous years
Attached Files
File Type: pdf ma10.pdf(166.4 KB, 72 views)
File Type: pdf ma09.pdf(1.88 MB, 85 views)
File Type: pdf ma08.pdf(2.44 MB, 89 views)
File Type: pdf ma07.pdf(2.50 MB, 114 views)
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