I am very thankful to Dubey sir and all faculties for their valuable guidance. Because of their guidance I could clear GATE as well as JRF in the FIRST attempt. I got the clarity of definitions and hence I could understand the topics and could use the proper results at proper questions.
My experience with Dips Academy was great. I am very graceful to Dubey sir and entire faculty for their guidance and teachings. The teachings of Dubey sir about life and education will always remain with me and motivate me in my life. Also, the study material provided by Dips academy is very appropriate and helps us in our preparation and the video lecture faculty helps us to understand our subject better if the class is missed which according to me is a very helpful.
I am very glad that I have cracked JRF with the help of Dubey sir. He is an amazing mentor and a very humble person. Dips Academy has a lot of contribution in my success. I am very much thankful to the whole team of Dips. My experience here was great and the study material and video lectures were also every helpful to me.
If you do not want to leave the comfort of your home or cannot attend our regular classroom program due to any issue, then you can opt our correspondence study material which is designed by our research and development cell in a student friendly manner so that they can avail maximum benefit from it and clear their exams and achieve desired success. Our Research and development cell update the study material in a timely manner, so that students can get the material according to latest pattern of the exams and questions as per the exam weight-age. In our study material you can get to the point summaries of concept which are in the curriculum of the exam and huge number of questions which are enough for practice for the exam. You will not need to refer any other book for the exam except our study material.
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Chapter 1 :Fundamental concepts of complex analysis
Chapter 2 :Stereograpic Projection and Point Set Topology
Chapter 3 :Limit continuity and differentiability
Chapter 4 :Singularities of analytic functions
Chapter 5 :Complex integration
Chapter 6 :Some important theorems and their application
Chapter 7 :Power series
Chapter 8 :Taylor and laurent expansion
Chapter 9 :Some special functions related to the exponential functions
Chapter 10 :Argument and Rouche’s theorem
Chapter 11 :Calculus of residues
Chapter 12 :Comformal mapping
Chapter 12 :Maximum and minimum modulus principle and schwarz lemma
Chapter 1 :Number System
Chapter 2 :Time and Distance
Chapter 3 :Time and Work
Chapter 4 :Schedule Day/Date/Time
Chapter 5 :Profit and Loss
Chapter 6 :Permutations and Combination
Chapter 7 :Probability
Chapter 8 :Introduction to Data Interpretation
Chapter 9 :Area of Plane Figures
Chapter 10 :Area of Volumes of Solids
Chapter 1 :Set and Relations
Chapter 2 :Basic Algebraic Structure
Chapter 3 :Groups within Groups
Chapter 4 :Some important groups of finite order
Chapter 5 :Symmetric Group or Permutationn
Chapter 6 :Some Important Groups of Infinite Order
Chapter 7 :Conjugate Classes and Class equation
Chapter 8 :Invariant Normal Subgroup
Chapter 9 :Homomorphism and their counting
Chapter 10 :Sylow Theorems
Chapter 1 :Integral Equation
Chapter 2 :Volterra’s Integral Equation
Chapter 3 :Fredholm Integral Equation
Chapter 4 :Hilbert Schmidt Theory
Chapter 1 :Calculus of Variation
Chapter 1 :Linear Programming
Chapter 2 :Graphical Method
Chapter 3 :Convex Sets and Their Properties
Chapter 4 :Basic Solutions and Properties
Chapter 5 :Simplex Method
Chapter 6 :Duality
Chapter 1 :Vector Spaces
Chapter 2 :Linear Transformation and Its Properties
Chapter 3 :Matrices and Their Properties
Chapter 4 :Diagonalizability and Canonical Forms
Chapter 5 :Inner Product Spaces
Chapter 6 :Bilinear Form and Quadratic Form
Chapter 1 :Introduction & Priliminaries
Chapter 2 :First order First degree differential equation
Chapter 3 :General theory of linear differential equation of higher order
Chapter 4 :Solution of linear diff. equation with const. and variable coefficient
Chapter 5 :Uniqueness and Existence
Chapter 6 :System of Differential Equations
Chapter 7 :Boundary Value Problems
Chapter 8 :Equations of the First Order but not of the First Degree
Chapter 1 :Classification and formation of PDE
Chapter 2 :Linear PDE of order One
Chapter 3 :Non Linear PDE
Chapter 4 :Linear PDE with Constant Coefficients and Equations with Variable Coefficients
Chapter 5 :Classification of Second Order PDE , Characteristic Curves and Reduction To Canonical Form
Chapter 6 :Heat, Wave and Laplace Equation
Chapter 7 :Green’s Function
Chapter 1 :Elementary Set theory and Countability
Chapter 2 :Point Set Topology
Chapter 3 :Sequence of real numbers
Chapter 4 :Series of Real Numbers
Chapter 5 :Functions and their Properties
Chapter 6 :Continuity
Chapter 7 :Differentiability
Chapter 8 :Riemann Integral
Chapter 9 :Uniform Convergence
Chapter 10 :Function of Several variables
Chapter 1 :Basic Concepts and Definitions
Chapter 2 :Some Important Structures
Chapter 3 :Subring & Ideals
Chapter 4 :Ring of Homomorphism
Chapter 5 :PID, ED, UFD
Chapter 6 :Ring Homomorphism
Chapter 7 :Algebraic Extension of Fields
Chapter 1 :Probability
Chapter 2 :Random Variables
Chapter 3 :Special Univariate Distributions
Chapter 4 :Joint and Conditional Distributions
Chapter 5 : Inference
Chapter 6 :Maximum Likelihood Estimation
Chapter 7 :Hypothesis Testing
Chapter 8 :Elements of Bayesian Inference
Chapter 9 :Markov Chains
Chapter 10 :Miscellaneous
Chapter 1 :Friendly Definitions
Chapter 2 :Topologies on Subspaces and Superspaces
Section 2.1 :Some Set Theory
Chapter 3 :Important Spaces and Continuity
Chapter 4 : Convergence
Chapter 5 : Compactness
Chapter 6 : Connectedness
Chapter 7 : Banach and Hilbert Space
Chapter 1 :Fundamental concepts of complex analysis
Chapter 2 :Stereograpic Projection and Point Set Topology
Chapter 3 :Limit continuity and differentiability
Chapter 4 :Singularities of analytic functions
Chapter 5 :Complex integration
Chapter 6 :Some important theorems and their application
Chapter 7 :Power series
Chapter 8 :Taylor and laurent expansion
Chapter 9 :Some special functions related to the exponential functions
Chapter 10 :Argument and Rouche’s theorem
Chapter 11 :Calculus of residues
Chapter 12 :Comformal mapping
Chapter 12 :Maximum and minimum modulus principle and schwarz lemma
Chapter 1 :Number System
Chapter 2 :Time and Distance
Chapter 3 :Time and Work
Chapter 4 :Schedule Day/Date/Time
Chapter 5 :Profit and Loss
Chapter 6 :Permutations and Combination
Chapter 7 :Probability
Chapter 8 :Introduction to Data Interpretation
Chapter 9 :Area of Plane Figures
Chapter 10 :Area of Volumes of Solids
Chapter 1 :Set and Relations
Chapter 2 :Basic Algebraic Structure
Chapter 3 :Groups within Groups
Chapter 4 :Some important groups of finite order
Chapter 5 :Symmetric Group or Permutationn
Chapter 6 :Some Important Groups of Infinite Order
Chapter 7 :Conjugate Classes and Class equation
Chapter 8 :Invariant Normal Subgroup
Chapter 9 :Homomorphism and their counting
Chapter 10 :Sylow Theorems
Chapter 1 :Integral Equation
Chapter 2 :Volterra’s Integral Equation
Chapter 3 :Fredholm Integral Equation
Chapter 4 :Hilbert Schmidt Theory
Chapter 1 :Calculus of Variation
Chapter 1 :Linear Programming
Chapter 2 :Graphical Method
Chapter 3 :Convex Sets and Their Properties
Chapter 4 :Basic Solutions and Properties
Chapter 5 :Simplex Method
Chapter 6 :Duality
Chapter 1 :Vector Spaces
Chapter 2 :Linear Transformation and Its Properties
Chapter 3 :Matrices and Their Properties
Chapter 4 :Diagonalizability and Canonical Forms
Chapter 5 :Inner Product Spaces
Chapter 6 :Bilinear Form and Quadratic Form
Chapter 1 :Introduction & Priliminaries
Chapter 2 :First order First degree differential equation
Chapter 3 :General theory of linear differential equation of higher order
Chapter 4 :Solution of linear diff. equation with const. and variable coefficient
Chapter 5 :Uniqueness and Existence
Chapter 6 :System of Differential Equations
Chapter 7 :Boundary Value Problems
Chapter 8 :Equations of the First Order but not of the First Degree
Chapter 1 :Classification and formation of PDE
Chapter 2 :Linear PDE of order One
Chapter 3 :Non Linear PDE
Chapter 4 :Linear PDE with Constant Coefficients and Equations with Variable Coefficients
Chapter 5 :Classification of Second Order PDE , Characteristic Curves and Reduction To Canonical Form
Chapter 6 :Heat, Wave and Laplace Equation
Chapter 7 :Green’s Function
Chapter 1 :Elementary Set theory and Countability
Chapter 2 :Point Set Topology
Chapter 3 :Sequence of real numbers
Chapter 4 :Series of Real Numbers
Chapter 5 :Functions and their Properties
Chapter 6 :Continuity
Chapter 7 :Differentiability
Chapter 8 :Riemann Integral
Chapter 9 :Uniform Convergence
Chapter 10 :Function of Several variables
Chapter 1 :Basic Concepts and Definitions
Chapter 2 :Some Important Structures
Chapter 3 :Subring & Ideals
Chapter 4 :Ring of Homomorphism
Chapter 5 :PID, ED, UFD
Chapter 6 :Ring Homomorphism
Chapter 7 :Algebraic Extension of Fields
Chapter 1 :Probability
Chapter 2 :Random Variables
Chapter 3 :Special Univariate Distributions
Chapter 4 :Joint and Conditional Distributions
Chapter 5 : Inference
Chapter 6 :Maximum Likelihood Estimation
Chapter 7 :Hypothesis Testing
Chapter 8 :Elements of Bayesian Inference
Chapter 9 :Markov Chains
Chapter 10 :Miscellaneous
Chapter 1 :Friendly Definitions
Chapter 2 :Topologies on Subspaces and Superspaces
Section 2.1 :Some Set Theory
Chapter 3 :Important Spaces and Continuity
Chapter 4 : Convergence
Chapter 5 : Compactness
Chapter 6 : Connectedness
Chapter 7 : Banach and Hilbert Space
Chapter 1 :Indefinite Integration
Chapter 2 :Definite Integral
Chapter 3 :Area of Curves
Chapter 4 :Surface Area
Chapter 5 :Triple Integrals
Chapter 1 :Vector Algebra and Vector Valued Function
Chapter 2 :Gradient, Divergence and Curl
Chapter 3 :Line Integral and Green’s Theorem
Chapter 4 :Surface Integral & Gauss Divergence Theorem
Chapter 5 :Stroke’s Theorem, Conservative Vector Field and Curvilinear Co-ordinates
Chapter 1 :Elementary Set theory and Countability
Chapter 2 :Point Set Topology
Chapter 3 :Sequence of real numbers
Chapter 4 :Series of Real Numbers
Chapter 5 :Functions and their Properties
Chapter 6 :Continuity
Chapter 7 :Differentiability
Chapter 8 :Power Series and Function of Several Variables
Chapter 1 :Vector Spaces
Chapter 2 :Linear Transformation and Its Properties
Chapter 3 :Matrices and System of Equations
Chapter 4 :Eigen Values and Eign Vectors
Chapter 5 :Inner Product Spaces
Chapter 6 :Bilinear Form and Quadratic Form
Chapter 1 :Set and Relations
Chapter 2 :Basic Algebraic Structure
Chapter 3 :Groups within Groups
Chapter 4 :Some important groups of finite order
Chapter 5 :Symmetric Group or Permutationn Group
Chapter 6 :Some Important Groups of Infinite Order
Chapter 7 :Conjugate Classes and Class equation
Chapter 8 :Invariant Normal Subgroup
Chapter 9 :Homomorphism and their counting
Chapter 10 :Sylow Theorems
Chapter 1 :Introduction and Preliminaries
Chapter 2 :First Order First Degree Differential Equation
Chapter 3 :General Theory of Linear Differential Equation of Higher Order
Chapter 4 :Solution of Linear Differential Equation with Constant and Variable Coefficients
Chapter 5 :Uniqueness and Existence
Chapter 6 :Orthogonal Trajectories
Chapter 1 :Indefinite Integration
Chapter 2 :Definite Integral
Chapter 3 :Area of Curves
Chapter 4 :Surface Area
Chapter 5 :Triple Integrals
Chapter 1 :Vector Algebra and Vector Valued Function
Chapter 2 :Gradient, Divergence and Curl
Chapter 3 :Line Integral and Green’s Theorem
Chapter 4 :Surface Integral & Gauss Divergence Theorem
Chapter 5 :Stroke’s Theorem, Conservative Vector Field and Curvilinear Co-ordinates
Chapter 1 :Some Special Discrete Distributions
Chapter 2 :Some Special Continuous Distributions
Chapter 1 :Sampling Distribution
Chapter 2 :Central Limit Theorem and Law of Numbers
Chapter 3 :Joint Distribution and Marginal Distribution
Chapter 4 :Regression and Correlation
Chapter 5 :Methods of Estimation
Chapter 6 :The Neymann-Pearson Lemma and Application
Chapter 1 :Sampling Distribution
Chapter 2 :Central Limit Theorem and Law of Numbers
Chapter 3 :Joint Distribution and Marginal Distribution
Chapter 4 :Regression and Correlation
Chapter 5 :Methods of Estimation
Chapter 6 :The Neymann-Pearson Lemma and Application
Chapter 1 :Indefinite Integration
Chapter 2 :Definite Integral
Chapter 3 :Area of Curves
Chapter 4 :Surface Area
Chapter 5 :Triple Integrals
Chapter 1 :Linear Transformation and Its Properties
Chapter 2 :Matrices and Their Properties
Chapter 3 :Eigen Values and Eigen Vectors
Chapter 1 :Sequences of Real Numbers
Chapter 2 :Series of Real Numbers
Chapter 3 :Function and their Properties
Chapter 4 :Continuity
Chapter 5 :Differentiability
Chapter 6 :Power Series and Function of Several Variables
I am very thankful to Dubey sir and all faculties for their valuable guidance. Because of their guidance I could clear GATE as well as JRF in the FIRST attempt. I got the clarity of definitions and hence I could understand the topics and could use the proper results at proper questions.
My experience with Dips Academy was great. I am very graceful to Dubey sir and entire faculty for their guidance and teachings. The teachings of Dubey sir about life and education will always remain with me and motivate me in my life. Also, the study material provided by Dips academy is very appropriate and helps us in our preparation and the video lecture faculty helps us to understand our subject better if the class is missed which according to me is a very helpful.
I am very glad that I have cracked JRF with the help of Dubey sir. He is an amazing mentor and a very humble person. Dips Academy has a lot of contribution in my success. I am very much thankful to the whole team of Dips. My experience here was great and the study material and video lectures were also every helpful to me.