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GATE 2022 || Important Dates, Syllabus, Eligibility, PYQs and Additional Information

Organising Institute for GATE 2022 is Indian Institute of Technology Kharagpur.

GATE 2022 Information Brochure: Download here

GATE 2022 ActivityDates
Online Application StartsAugust 30, 2021
Closing Date for Online RegistrationSeptember 24, 2021 
End of EXTENDED period for Online Registration (with late fee)October 01, 2021
Admit Card Download -NA-
Date of ExaminationFebruary 05, 06, 12 and13 2022
Announcement of the ResultsMarch 17, 2022 (Tuesday)
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GATE Mathematics(MA) Solutions (Topic-wise & Year-wise)

Handwritten Solution of GATE Mathematics for self preparation. We provide best quality notes for self preparation of GATE Mathematics for those who can not afford coaching. Best way to prepare for GATE 2022 is to do practice of problems from Previous Yr. Questions of GATE Mathematics. Start your preparation of GATE 2022 with P Kalika Notes and make a path to success.

Year-wise Solution

GATE Topic-wise Solution

Buy All PDF Study Materials & Solutions for GATE: Click Here

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CSIR-NET (Maths) Topic-wise & Year-wise Solutions

Handwritten Solutions of CSIR-NET Mathematics Prev. Yr. Que. Papers (Upto November-2020) is available here. Very very helpful in preparation of CSIR-NET, SET, GATE, PSC, …. and other equivalent exams. Self preparation materials(No need of any coaching).

Note: CSIR NET(JRF) Exam of June-2020 has been done in Nov-2020 and Exam for Dec-2020 and June-2021 still not held and also no any information out.

  1. Sol. of Linear algebra(Upto Nov-2020, Pages:205): Download PDF
  2. Sol. of Abstract algebra(Upto Nov-2020, Pages:107): Download PDF
  3. Sol. of Real Analysis(Upto Nov-2020, Pages:210): Download PDF
  4. Sol. of Complex Analysis(Upto June-2020, Pages:118): Download PDF
  5. Sol. of NT, NA, LPP & DS (Upto 2021, Pages:118)Download PDF
  6. Sol. of ODE, PDE, IE & COV(Upto Nov 2020, Pages:205): Download PDF
  7. Combined Solutions (All above Sr. No. 1 – 6): Click Here

CSIR-NET Year wise Complete Solution

  1. CSIR-NET 26 Nov 2020: Download Here
  2. CSIR-NET Dec-2019: Download Here
  3. CSIR-NET June-2019: Download PDF
  4. CSIR-NET Dec-2018: Download PDF
  5. CSIR-NET June-2018: Download PDF
  6. Combined Solutions of 2017D, 2018J, 2018D, 2019J, 2019D & 2020Nov Download Here
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GATE-2021 Mathematics(MA) Modified Syllabus (New)

Note: Syllabus of GATE-2021 have been revised. New Syllabus is presented here. (Check Old Syllabus of GATE-2020)

Calculus: Functions of two or more variables, continuity, directional derivatives, partial derivatives, total derivative, maxima and minima, saddle point, method of Lagrange’s multipliers; Double and Triple integrals and their applications to area, volume and surface area; Vector Calculus: gradient, divergence and curl, Line integrals and Surface integrals, Green’s theorem, Stokes’ theorem, and Gauss divergence theorem.

Abstract Algebra: Groups, subgroups, normal subgroups, quotient groups, homomorphisms, automorphisms; cyclic groups, permutation groups, Group action,Sylow’s theorems and their applications; Rings, ideals, prime and maximal ideals, quotient rings, unique factorization domains, Principle ideal domains, Euclidean domains, polynomial rings, Eisenstein’s irreducibility criterion; Fields, finite fields, field extensions,algebraic extensions, algebraically closed fields.

Linear Algebra: Finite dimensional vector spaces over real or complex fields; Linear transformations and their matrix representations, rank and nullity; systems of linear equations, characteristic polynomial, eigenvalues and eigenvectors, diagonalization, minimal polynomial, Cayley-Hamilton Theorem, Finite dimensional inner product spaces, Gram-Schmidt orthonormalization process, symmetric, skew-symmetric, Hermitian, skew-Hermitian, normal, orthogonal and unitary matrices; diagonalization by a unitary matrix, Jordan canonical form; bilinear and quadratic forms.

Complex Analysis: Functions of a complex variable: continuity, differentiability, analytic functions, harmonic functions; Complex integration: Cauchy’s integral theorem and formula; Liouville’s theorem, maximum modulus principle, Morera’s theorem; zeros and singularities; Power series, radius of convergence, Taylor’s series and Laurent’s series; Residue theorem and applications for evaluating real integrals; Rouche’s theorem, Argument principle, Schwarz lemma; Conformal mappings, Mobius transformations.

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Free Test Series for CSIR-NET, SET, GATE, PSC

We have started providing topic-wise FREE test series for CSIR-NET, GATE, SET Aspirants. After the topic-wise test, we will start full tests. Test your knowledge here.

Note/Instruction:

  1. The result will be released on 08:00 PM on respective days of tests. The result will be sent on your email id which you will enter in a test.
  2. Related information will be shared on Telegram Channel: https://t.me/pkalika_mathematics
  3. We welcome those who are interested in questions setting for a test, write to us on maths.whisperer@gmail.com.
  4. Next Test: ODE+PDE+COV+IE Test-1 on 30/05/2020
  5. Next Test: Abstract Algebra on 01/06/2020

CSIR-NET, SET & PhD Entrance Test(07/06/2020): Attend Test

Algebra(Abstract+Linear) Tests:-

Analysis(Real+Complex) Tests

  • Complex Test-1(28/05/20): Attend Test-1
  • Complex Test-2: – – – – – – – – – – –


Applied Part(ODE+PDE+LPP+NA) Tests

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Que. Papers of CSIR-NET, GATE, JAM, CUCET, BHU, JNU, IIT, NBHM, DU, …etc

Here, you will get the collection of Previous Year Que. Papers (Math & Stat.) for CSIR-NET(JRF), GATE, NBHM, TIFR, IITs, CUCET, …etc and many mores including MSc/PhD Entrance Que. Papers. Practice these questions for your entrance exams. It will be very very helpful and sufficient for qualifying.

Questions Paper of NET, GATE & Ph.D. Entrance

  1. CSIR-NET Mathematics Que. Paper+Ans (2019-2011): Download Here
  2. CUCET PhD Mathematics Que. Paper+Ans (2020-2016): Download PDF
  3. Delhi University PhD Entrance Test(2015-2019): Download PDF
  4. GATE Mathematics Que Paper+Ans (2020-2010): Download PDF
  5. IIT Bombay PhD Screening Test(Dec 2015-May 2019): Download PDF
  6. IIT Kanpur PhD Screening Test(Dec 2015-May 2019): Uploading Soon
  7. IISc Banglore Int. PhD Test(178Pages): Uploading Soon
  8. ISI PhD Entrance Test(2015-2019): Uploading Soon
  9. JNU PhD Mathematics Que. Papers(2018-2015): Download PDF
  10. NBHM PhD Que Paper+Ans (2020-2005): Download PDF
  11. SAU PhD Admission Que. Paper(115 Pages): Download PDF
  12. TIFR Mathematics Que Paper(2020-2010): Download PDF
  13. BHU RET Que Paper(Math & Statistics): Uploading Soon
  14. P Kalika Practices Sets(52Pages): Download Practice Sets
  15. Any others: On Demand

Questions Paper of  MSc Entrance exams

  1. BHU PET Que Paper(Mathematics): Download PDF
  2. BHU PET Que Paper(Statistics): Download PDF
  3. CMI PG Entrance Papers(2010-2019): Uploading Soon
  4. CUCET MSc Maths Que. Paper(2019-2016+Sample): Download PDF
  5. JAM Mathematics(2020-2007): PDF Download
  6. NBHM MSc Que Paper(2019-2008): Uploading Soon
  7. TIFR Mathematics Que Paper(2019-2010): Download PDF
  8. University of Delhi(Central University): Uploading Soon
  9. University of Hyderabad(Central University): Download PDF
  10. Others: On demand

Note:

  • If you need any other Exam paper, write here.
  • If you want to share any Que. Paper, then send it to help@pkalika.in

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CSIR-NET, GATE, MSc/PhD Exams Notes Center (Handwritten Notes)

I. CSIR-NET, GATE, JAM, SET Study Materials

Group  Ring Theory  Calculus for GATE JAM, SET 85Pages(Kalika)_1  Complex  Real Complete_1   Power Series   Linear Algebra_1  Number Theory 76Pages(Kalika)_1  Numerical with sol 61Pages  PDE full Part-1 77Pages Sample 25_1  Integral   Topology 92pages by Kalika_1  LPP   COV (Kalika) 58pages   Functional Analysis by 58pages(Kalika)_1   Prob  Prob Dist        

II. Quick Revision Notes for NET, GATE, SET, NBHM

Group Theory Quick Revision 112Pages_1   Ring Theory Quick Revision 40Pages_1  Quick revision Real_1  Complex Short notes 28pages_1  Quick revision PDE_1    Quick revision ODE_1  

III. CSIR-NET Sol. (Year-wise & Topic Wise)

2019J Sol  2018Dec sol  2018J Sol  NET Solution 2019J-2017D 297Pages(Kalika)_1   Real Sol    Linear Sol  Complex Sol  CSIR Abstract Sol Upto June2019 71Pages_1  Applied Sol  NT, NA, LPP, DS Solutions 79Pages 35_1   GATE 2019 35Pages_1  GATE 2019-2018 (Kalika)94Pages_1

Note: For  ALL-IN-ONE Package/Multiple Notes, Study Material write us on maths.whisperer@gmail.com.

Feedbacks on Our Notes: https://pkalika.in/feedback-on-notes/


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Abstract Algebra & Linear Algebra

Abstract/Modern Algebra

  1. Abstract-1 (Group Theory): Download PDF
  2. Abstract-2 (Ring Theory): (Sample PDF) Buy Now
  3. Sylow Thm, Simple & Solvable Group(Free): Download PDF
  4. Quick Revision Notes(Group Theory): Download PDF
  5. Quick Revision Notes(Ring Theory):  Download PDF
  6. CSIR-NET Abstract Algebra Solution(Upto Nov-2020): Download PDF

All Notes of Abstract Algebra (Available Now)

Linear Algebra

  1. Linear(Only Matrix Theory): Download PDF
  2. Linear Algebra Full Notes: Download PDF
  3. CSIR-NET Linear Algebra Solution(Upto Nov-2020): Download PDF

Check All Study Materials: NET-GATE Notes PDF Center

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Fast Revision Notes for CSIR-NET, GATE, JAM & SET exam

Followings FAST Revision notes are VERY VERY helpful for JAM, CSIR-NET, GATE, SET, NBHM, and PSC examinations. 

  1. Complex Analysis(Sample): Download PDF
  2. Group Theory: Download PDF
  3. Ring Theory(40Pages) Download PDF
  4. Markov Chain with sol Download HERE
  5. Numerical Analysis Download PDF
  6. Ordinary Differential Equations Download PDF
  7. Partial Differential Equations Download PDF
  8. Probability & Prob. Distribution(Sample PDF): Buy Now
  9. Real Analysis:  Download PDF
  10. Linear Programming(LPP) with sol. Buy Now
  11. Linear Algebra  Available Soon

For INSTANT Downloading any PDF Visit Here.

Important Links: CSIR NET Mathematics Solutions, GATE Solutions & NET-GATE Notes PDF Center

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GATE Mathematics(MA) Study Materials & Solutions

GATE2020 Mathematics Detailed Solution: PDF Download Here

GATE Mathematics(MA) Study Materials(View Syllabus)

  1. Abstract: Download Group Theory & Ring Theory
  2. Calculus: Download PDF
  3. Complex Analysis: Download PDF
  4. Functional Analysis: Download PDF
  5. Linear Algebra: Download PDF
  6. LPP With Solution: Download PDF
  7. Numerical Analysis with Sol.: Download PDF
  8. Topology: Download PDF
  9. Ordinary Differential Equations: Download PDF
  10. Partial Differential Equations: Download PDF
  11. Real Analysis: Download PDF
  12. GATE Solution: GATE Problems & Solutions

GATE Statistics(MS) Study materials(Download Syllabus)

  1. Calculus: Download PDF
  2. Linear Algebra: Download PDF
  3. Markov Chain(Only For GATE Statistics): Download PDF
  4. Probability(Only For GATE Statistics): Download PDF

Detailed syllabus for GATE & JAM:
◆◆ GATE Math, ◆◆GATE Statistics, ◆◆ JAM Math, ◆◆JAM Statistics

GATE Mathematics Que Paper+Ans(2020-2010, 187 Pages): Download PDF

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GATE-2020 Mathematics(MA) Detailed Syllabus

Note: Check Here Latest Syllabus of GATE-2021

Calculus: Finite, countable and uncountable sets, Real number system as a complete ordered field, Archimedean property; Sequences and series, convergence; Limits, continuity, uniform continuity, differentiability, mean value theorems; Riemann integration, Improper integrals; Functions of two or three variables, continuity, directional derivatives, partial derivatives, total derivative, maxima and minima, saddle point, method of Lagrange’s multipliers; Double and Triple integrals and their applications; Line integrals and Surface integrals, Green’s theorem, Stokes’ theorem, and Gauss divergence theorem.

Abstract Algebra: Groups, subgroups, normal subgroups, quotient groups, homomorphisms, automorphisms; cyclic groups, permutation groups, Sylow’s theorems and their applications; Rings, ideals, prime and maximal ideals, quotient rings, unique factorization domains, Principle ideal domains, Euclidean domains, polynomial rings and irreducibility criteria; Fields, finite fields, field extensions.

Linear Algebra: Finite dimensional vector spaces over real or complex fields; Linear transformations and their matrix representations, rank and nullity; systems of linear equations, eigenvalues and eigenvectors, minimal polynomial, Cayley-Hamilton Theorem, diagonalization, Jordan canonical form, symmetric, skew-symmetric, Hermitian, skew-Hermitian, orthogonal and unitary matrices; Finite dimensional inner product spaces, Gram-Schmidt orthonormalization process, definite forms.

Complex Analysis: Analytic functions, harmonic functions; Complex integration: Cauchy’s integral theorem and formula; Liouville’s theorem, maximum modulus principle, Morera’s theorem; zeros and singularities; Power series, radius of convergence, Taylor’s theorem and Laurent’s theorem; residue theorem and applications for evaluating real integrals; Rouche’s theorem, Argument principle, Schwarz lemma; conformal mappings, bilinear transformations.

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