[ IT ] Information Technology Engineering – Exam Pack – Mathematics – 2, Physics, C Programming, Engineering Graphics
November 11, 2020 2021-01-05 12:27[ IT ] Information Technology Engineering – Exam Pack – Mathematics – 2, Physics, C Programming, Engineering Graphics
[ IT ] Information Technology Engineering – Exam Pack – Mathematics – 2, Physics, C Programming, Engineering Graphics
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Mathematics 2
- Unit One : 1. Differential Equations – Introduction
- Unit One : 2. Applications of Differential Equations – Newton’s Law of Cooling
- Unit One : 3. Types of Differential Equations
- Unit One : 4. Order and Degree of Differential Equation
- Unit One : 5. Solutions and Types
- Unit One : 6. Formation of Differential Equation Solution and Types
- Unit One : 7. Example 1 – Formation of Differential Equations
- Unit One : 8. Families of Plane Curves
- Unit One : 9. Example – Families of Plane Curves
- Unit One : 10. Differential Equation – First Order – First Degree
- Unit One : 11. Example 1 – Variable Separable Method
- Unit One : 12. Example 2 – Variable Separable Method
- Unit One : 13. Equation reduced to Variable Separable form
- Unit One : 14. Example 1 – Equation reduced to Variable Separable Form
- Unit One : 15. Homogenius Differential Equations – Introduction
- Unit One : 16. General Solution of Homogenous Differential Equations
- Unit One: 17. Homogeneous Differential Equations – Example 1
- Unit One: 18. Homogeneous Differential Equations – Example 2
- Unit One: 19. Homogeneous Differential Equations – Example 3
- Unit One: 20. Non-Homogeneous Differential Equations – Introduction
- Unit One: 21. Non-Homogeneous Differential Equations – Example 1
- Unit Two: 1. Exact Differential Equations – Introduction
- Unit Two: 2. Solving Exact Differential Equations
- Unit Two: 3. Exact Differential Equations – Example 1
- Unit Two: 4. Exact Differential Equations – Example 2
- Unit Two: 5. Exact Differential Equations – Example 3
- Unit Two: 6. Equations Reducible to Exact Equations
- Unit Two: 7. Inspection Method – Finding Integrating Factors
- Unit Two: 8. Finding Integrating Factors – Inspection Method – Example 1
- Unit Two: 9. Solving the Differential Equations
- Unit Two: 10. Solve Differential Equations using Operator Form
- Unit Two: 11. Complete Solution of Differential Equation
- Unit Two: 12. Solve Differential Equations
- Unit Two: 13. General Solution of Differential Equation by Auxillary Form
- Unit Two: 14. General Solution for Differential Equation
- Unit Two: 15. Solve Differential Equation
- Unit Two: 16. Solve Differential Equation Using Operator Form
- Unit Two: 17. Solving Differential Equation
- Unit Two: 18. Solving Differential Equation using Auxillary Form
- Unit Two: 19. Solving Differential Equation
- Unit Two: 20. Finding Particular Integral of a Differential Equation
- Unit Two: 21. Solve the Differential Equation
- Unit Two: 22. General Solution for Differential Equation
- Unit Two: 23. General Solution for Differential Equation – Example 2
- Unit Two: 24. General Solution for Differential Equation – Example 3
- Unit Two: 25. Particular Integral for Differential Equations
- Unit Two: 26. Differential Equations – Variation of Parameters
- Unit Two: 27. Differential Equations – Variation of Parameters – Example 2
- Unit Two: 28. Euler – Cauchy Equation – Introduction
- Unit Two: 29. General Solution for Differential Equation – Example 1
- Unit Two: 30. General Solution for Differential Equation – Example 2
- Unit Two: 31. General Solution for Differential Equation – Examplle 3
- Unit Two: 32. Legrande’s Linear Integral
- Unit Two: 33. Solve the Differential Equation
- Unit Three : 1. Multiple Integrals
- Unit Three : 2. Double Integrals – Example 1
- Unit Three : 3. Evaluate Double Integral – Example 2
- Unit Three : 4. Evaluate Double Integral – Example 3
- Unit Three : 5. Evaluate Double Integral in Positive Quadrant
- Unit Three : 6. Evaluate Double Integral by Converting into Polar Co-Ordinates
- Unit Three : 7. Calculate the area between two circles
- Unit Three : 8. Volume of Double Integral
- Unit Three : 9. Applications of Double Integrals
- Unit Three : 10. Transformation of Co-Ordinates
- Unit Three : 11. Change of Order of Integration
- Unit Three : 12. Evaluate Double Integral by changing the order of Integration
- Unit Three : 13. Evaluate Double Integral by Changing the order of Integration – Example 2
- Unit Three : 14. Change of Variables from Cartesian to Spherical Polar Co-Ordinates
- Unit Three : 15. Change of Variables from Cartesian to Cylindrical Polar Co-Ordinates
- Unit Three : 16. Mass of Plane of Lamina
- Unit Three : 17. Evaluate Double Integral – Area bounded by Positive Quadrant of the circle
- Unit Three : 18. Evaluate Double Integral – Area bounded by Hyperbola
- Unit Three : 19. Evaluate Double Integral – Area bounded by Ellipse
- Unit Three : 20. Evaluate Double Integral – Polar Co-Ordinates
- Unit Three : 21. Triple Integrals – Introduction
- Unit Three : 22. Center of Gravity
- Unit Three : 23. Triple Integrals – Example 1
- Unit Three : 24. Triple Integrals – Example 2
- Unit Three : 25. Triple Integrals – Space Bound Problem
- Unit Three : 26. Triple Integrals – Change of Variables
- Unit Three : 27. Change of Variables from Cartesian to Cylinder
- Unit Four : 1. Vector Differential Operators – Introduction
- Unit Four : 2. Divergence of a Vector – Introduction
- Unit Four : 3. Example 1 – Divergence
- Unit Four : 4. Example 2 – Divergence
- Unit Four : 5. Summary
- Unit Four : 6. Example 3 – Divergence
- Unit Four : 7. Example 4 – Divergence
- Unit Four : 8. Example 5 – Divergence
- Unit Four : 9. Problem on Solenoidal Vector
- Unit Four : 10. Example 1 – Directional Derivative
- Unit Four : 11. Example 2 – Directional Derivative
- Unit Four : 12. Curl of a Vector
- Unit Four : 13. Problems on Irrotational Vector
- Unit Four : 14. Problems on Divergence and Curl
- Unit Four : 15. Irrotational Vector – Example
- Unit Four : 16. Vector Identities
- Unit Four : 17. Vector Identities – Example 2
- Unit Four : 18. Vector Identities – Example 3
- Unit Four : 19. Vector Identities – Example 4
- Unit Five : 1. Introduction to Vector Integration
- Unit Five : 2. Vector Integration – Introduction and Types
- Unit Five : 3. Problems on Vector Integratio
- Unit Five : 4. Line Integral – Example
- Unit Five : 5. Problems on Vector Integration
- Unit Five : 6. Evaluation of Work Done – Example 1
- Unit Five : 7. Evaluation of Work Done – Example 2
- Unit Five : 8. Problems on Vector Integration
- Unit Five : 9. Evaluation of Work Done – Example 3
- Unit Five : 10. Evaluation of Work Done – Example 4
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Applied Physics
- Unit One : 1. Introduction to Quantum Physics
- Unit One : 2. Black Body Radiation
- Unit One : 3. Plank’s Radiation Law
- Unit One : 4. Photoelectric Effect
- Unit One : 5. Photoelectric Effect – Example 1
- Unit One : 6. Photoelectric Effect – Example 2
- Unit One : 7. Compton Effect
- Unit One : 8. Compton Effect – Example 1
- Unit One : 9. Wave Particle Duality
- Unit One : 10. De-Broglie’s Hypothesis
- Unit One : 11. Davisson and Germer Experiment
- Unit One : 12. Heisenberg’s Uncertainity Principle
- Unit One : 13. Bohr’s Interpretation of Wave Function
- Unit One : 14. Interpretation of Schrodinger Equation
- Unit One : 15. Particle in One Dimension Box
- Unit One : 16. Schrodinger’s Time Independent Wave Equation
- Unit Two : 1. Introduction to Semi-Conductors
- Unit Two : 2. Intrinsic Semiconductors – Carrier Concentration
- Unit Two : 3. Intrinsic Semiconductors – Fermi Level and Conductivity
- Unit Two : 4. N-Type Semiconductors
- Unit Two : 5. P-Type Semiconductors
- Unit Two : 6. Generation & Recombination
- Unit Two : 7. Drift and Diffusion
- Unit Two : 8. Hall Effec
- Unit Two : 9. Bipolar Junction Transistor ( BJT )
- Unit Two : 10. Zener Diode
- Unit Two : 11. PN Junction
- Unit Three : 1. Radiative and Non-Radiative Recombination Mechanisms in semiconductors
- Unit Three : 2. Basics of LED
- Unit Three : 3. LED: Light Extraction and design issues
- Unit Three : 4. Visible LED: Photometry and colorimetry
- Unit Three : 5. Solar Cell
- Unit Three : 6. Solar Cell – 2 ( Contd. )
- Unit Three : 7. Solar Cell: Shockley Quiesser Limit
- Unit Three : 8. Basics of Photodetectors
- Unit Three : 9. Photodetectors: Figures of merit and types of devices
- Unit Four : 1. Laser – Interaction Between Matter and Radiation
- Unit Four : 2. Einstein Co-efficients
- Unit Four : 3. Characteristics of Laser
- Unit Four : 4. Components of Laser
- Unit Four : 5. Ruby Laser
- Unit Four : 6. He-Ne Laser
- Unit Four : 7. Co2 Lasery
- Unit Four : 8. Semi Conductor Lasers
- Unit Four : 9. Applications of Lasers
- Unit Four : 10. Fiber Optics – Introduction
- Unit Four : 11. Acceptance Angle & NA
- Unit Four : 12. Types of Fibers
- Unit Four : 13. Signal Propogation Through Optical Fibers
- Unit Four : 14. Signal Attenuation in Fibers
- Unit Four : 15. Applications and Advantages of Optical Fibers
- Unit Five : 1. Fundamental Laws of E&M
- Unit Five : 2. Maxwell’s Equations
- Unit Five : 3. Dielectric Definitions
- Unit Five : 4. Types of Polarisation
- Unit Five : 5. Internal Field – Epstein’s Model
- Unit Five : 6. Internal Field – Lorentz Model
- Unit Five : 7. Clausius – Mosotti Equation
- Unit Five : 8. Pizeoelectricity
- Unit Five : 9. Ferroelectricity
- Unit Five : 10. Magnetic materials – Definitions
- Unit Five : 11. Classification of Magnetic Materials
- Unit Five : 12. Antiferro and Ferrimagnetic Materials
- Unit Five : 13. Hysterics
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Engineering Graphics / Engineering Drawing
- Unit One : 1. Cycloid
- Unit One : 2. Epicycloid
- Unit One : 3. Hyperbola
- Unit One : 4. Hypocycloid
- Unit One : 5. Parabola – Eccentricity Method
- Unit One : 6. Rectangular Hyperbola
- Unit One : 7. Scales – Diagonal Scales
- Unit Two : 1. Introduction to Projection of Points
- Unit Two : 2. Line inclined to One Plane
- Unit Two : 3. Line Inclined to Both Reference Planes – 1
- Unit Two : 4. Line Inclined to Both Reference Planes – 2
- Unit Two : 5. Line Inclined to Both Reference Planes – 3
- Unit Two : 7. Projection of Planes
- Unit Two : 8. Plane Inclined to One Reference Plane – 1
- Unit Two : 9. Plane Inclined to Both Reference Plane – 1
- Unit Two : 10. Plane Inclined to Both Reference Plane – 2
- Unit Two : 11. Plane Inclined to Both Reference Plane – 3
- Unit Three : 1. Sections of Solids – Pentagonal Pyramid
- Unit Three : 2. Sections of Solids – Cone
- Unit Three : 3. Sections of Solids – Pentagonal Prism
- Unit Three : 4. Sections of Solids – Plane Inclined to One Reference Plane
- Unit Three : 5. Orthographic Projections of Sections of Solids
- Unit Three : 6. Sections of Solids – True Shape of Hexagonal Pyramid
- Unit Three : 7. Introduction of Solids and Sections of Solids – Simple Position
- Unit Four : 1. Introduction To Development of Surfaces
- Unit Four : 2. Development of Surfaces – Hexagonal Pyramid
- Unit Four : 3. Projections of Solids – Inclined to One Reference Plane
- Unit Four : 4. Development of Surfaces of Solids – Pentagonal Prism
- Unit Four : 5. Lateral and Total Surface Development of a Cylinder
- Unit Four : 6. Development of Surfaces of Sectional Pyramid
- Unit Four : 7. Development of Surfaces – Cone
- Unit Five : 1. Introduction to Isometric Views and Projections
- Unit Five : 2. Introduction to Conversionpy
- Unit Five : 3. Isometric Views of Planes
- Unit Five : 4. Isometric Views of Solids
- Unit Five : 5. Conversion of Isometric to Orthographic Views
- Unit Five : 8. Conversion of Isometric Views to Orthographic Views – Example 1 – Part 1
- Unit Five : 9. Conversion of Isometric Views to Orthographic Views – Example 1 – Part 2
- Unit Five : 10. Conversion of Isometric Views to Orthographic Views – Example 2 – Part 1
- Unit Five : 11. Conversion of Isometric Views to Orthographic Views – Example 2 – Part 1
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PPS (C Programming)
- Unit One : 1. Introduction to components of a computer
- Unit One : 2. Introduction To Algorithms
- Unit One : 3. Introduction To Flowcharts
- Unit One : 4. Introduction to Computers and Programming
- Unit One : 5. Writing your first program
- Unit One : 6. Variables, Operators and Expressions
- Unit One : 7. Variable declarations, more operators and precedence
- Unit One : 8. Input and Output Statements
- Unit One : 9. Conditionals
- Unit One : 10. Loops
- Unit One : 11. Digital Root Programming – Probelm
- Unit Two : 1. Introduction to array
- Unit Two : 2. Working with 1D arrays
- Unit Two : 3. Find prime numbers – Problem
- Unit Two : 4. Debugging demo
- Unit Two : 5. Multi-dimensional arrays
- Unit Two : 6. Pointers
- Unit Two : 7. More on pointers
- Unit Two : 8. Arrays and pointer arithmetic
- Unit Two : 9. Introduction to Strings
- Unit Two : 10. More on Strings
- Unit Two : 11. Intro to Linked Lists
- Unit Two : 12. Print Elements of a Matrix in Spiral Order Programming – Problem
- Unit Three : 1. Commonly used Preprocessor commands
- Unit Three : 2. Pre Processor Directives in C
- Unit Three : 3. File I/O
- Unit Three : 4. fseek
- Unit Three : 5. ftell
- Unit Three : 6. rewind
- Unit Three : 7. File handling functions overview
- Unit Four : 1. Introduction to functions
- Unit Four : 2. More details on functions
- Unit Four : 3. Arguments, variables and parameters
- Unit Four : 4. Pass parameters by reference
- Unit Four : 5. Recursive functions
- Unit Four : 6. Palindrome Checker Programming – Problem
- Unit Four : 7. Finding Factorial using Recursion – Problem
- Unit Four : 8. Recursive Fibonacci Function – Problemy
- Unit Four : 9. Advantage and Disadvantage of Recursion
- Unit Four : 10. Dynamic memory allocation
- Unit Five : 1. Finding roots of a quadratic equations
- Unit Five : 2. Finding minimum and maximum numbers of a given set
- Unit Five : 3. Finding minimum and maximum numbers of a given set – Code
- Unit Five : 4. Finding if a number is prime number
- Unit Five : 5. Linear and Binary Search Analysis
- Unit Five : 6. Introduction to sorting algorithms
- Unit Five : 7. Selection sort algorithm
- Unit Five : 8. Bubble sort algorithm
- Unit Five : 9. Insertion sort algorithm
- Unit Five : 10. Time complexity of a computer program
- Unit Five : 11. How to calculate running time of an Algorithm?
- Unit Five : 12. Time complexity analysis: asymptotic notations – big oh, theta ,omega
- Unit Five : 13. Time complexity analysis – some general rules