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Math-III |Mechanical Engineering

Magic Marks

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  • Product Info
  • Description
  • Demo Videos
  • Reviews
  • Index
  • About the Faculty

Product Info

Kit ContentsFor Online Web: Online Videos, For Pendrive: 8GB USB Pendrive, Installation Guide
Lecture Duration5 Hours
Validity Period1 Month & 12 Months
Total ViewsUnlimited During Subscription
ModeOnline Subscription & Pendrive
Runs OnMobile Application, Laptop or Desktop
System RequirementFor Online Web: On system (Desktop or laptop) allow the flash in browser and download the latest version of flash. For Pendrive: Windows XP, 7 & above | Ram: 2 GB | Processor: 2.0 GHz and above (Note: Pen drive will not install on Mac system)
Video LanguageEnglish
Study Material LanguageEnglish
Applicable CourseEngineering
Technical supportProvided by Magic Marks, Contact number: 9599285622 Email ID: [email protected]
Dispatched ByMagic Marks
Dispatch Time48 Hours
Delivery Time2 - 3 Days

Description

The Magic Marks Kit includes

For Online Web:

1. Online Web Videos or Mobile Application

For Pendrive:

1. 8GB USB Pendrive 

2. Installation Guide

Demo Videos

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Index

No.

Topics of Learning

Duration

1

Fourier Series and Periodic Function

1:07

2

Even and Odd Functions

5:00

3

Change of Interval

5:00

4

Half Range Expansions

5:00

5

Definition of Laplace Transforms

5:00

6

Laplace Transforms of various Standard Functions

5:00

7

Properties of Laplace Transforms

5:00

8

Inverse Laplace Transforms

5:00

9

Transform of Derivatives and Integrals

5:00

10

Convolution Theorem

5:00

11

Laplace Transform of Unit Step Function

5:00

12

Applications to Solution of Ordinary Linear Differential Equations with Constant Coefficients

5:00

13

Frobenius Method for Power Series Solution of Differential Equations

5:00

14

Bessel's Equation

5:00

15

Bessel Functions of the First and Second Kind

5:00

16

Legendre's Equation

5:00

17

Legendre Polynomial

5:00

18

Formation of Partial Differential Equations

5:00

19

Equations Solvable by Direct Integration

5:00

20

Linear Partial Differential Equations

5:00

21

Homogeneous Partial Differential Equations with Constant Coefficients

0:59

22

Solution of Two Dimensional Laplace Equation (Cartesian Co-Ordinates)

1:19

23

Method of Separation of Variables for Solving Partial Differential Equations

5:00

24

Wave Equation upto Two-Dimensions

1:36

25

Laplace Equation in Two-Dimensions

1:00

26

Heat Conduction Equations upto Two-Dimensions

1:02

27

Equations of Transmission Lines

1:07

28

Definition of Limit

5:00

29

Definition of Continuity

5:00

30

Derivative of Complex Functions

5:00

31

Derivative of Analytic Functions

5:00

32

Necessary and Sufficient Conditions for Analytic Function

5:00

33

Cauchy-Riemann Equation (Cartesian and Polar Co-ordinates)

5:00

34

Harmonic Functions

5:00

35

Determination of Conjugate Functions

5:00

36

Miller’s Thosmson Method

5:00

37

Bilinear Transformations

5:00

38

Complex Integration

5:00

39

Line Integrals in the Complex Plane

5:00

40

Cauchy’s Integral Theorem

5:00

41

Cauchy’s Integral Formula for Analytic Function and its Derivatives

5:00

42

Taylor’s and Laurent’s Expansions

5:00

43

Singular Points

5:00

44

Poles

5:00

45

Residue

5:00

46

Cauchy’s Residue Theorem

5:00

47

Evaluation of Real Integrals by Contour Integration (F(cosx, sinx)

5:00

48

Introduction to Moments

5:00

49

Moment Generating Functions

5:00

50

Skewness

5:00

51

Kurtosis

5:00

52

Curve Fitting

5:00

53

Method of Least Squares

5:00

54

Fitting of Straight Lines

5:00

55

Polynomials

1:52

56

Exponential Curves

5:00

57

Correlation

1:03

58

Linear, Non-Linear and Multiple Regression Analysis

2:08

59

Binomial, Poisson and Normal Distributions

1:43

60

Chi-Square Test

1:32

61

Analysis of Variance (One Way)

1:32

62

Time Series and Forecasting (Moving and Semi-Averages)

1:55

63

Statistical Quality Control Methods

1:32

64

Regula-Falsi Method

1:18

65

Newton-Raphson Method

5:00

66

Finite Differences

1:25

67

Difference Tables

0:51

68

Newton’s Forward and Backward Interpolation

1:31

69

Lagrange’s and Newton’s Divided Difference Formula for Unequal Intervals

1:27

70

Gauss-Seidal Method

1:29

71

Crout Method

1:42

72

Numerical Differentiation

1:23

73

Numerical Integration

1:32

74

Trapezoidal Rules

1:01

75

Simpson’s One Third and Three-Eight Rules

1:15

76

Euler’s Method

0:59

77

Picard’s Method

0:59

78

Forth-Order Runge-Kutta Methods

1:13

 

Total

4Hr 44

About the Faculty

The Magic Marks Digital learning solution is for students studying B.tech engineering in Indian colleges and universities. Students studying for competitive examinations can also use these eLearning materials. Our digital learning solution is entirely visual with 2D animations with amazing imagery and an English voice over to help you learn easily.

Each subject has an eLearning plan for engineering, comprising Topics of Learning that are essential to a complete study of the subject. These topics are further classified into DEFINITIONS, DIAGRAMS, DERIVATIONS and APPLICATIONS. The Definition and Diagram topics are for concept-based learning, while the Derivation and Application materials help you solve numerical.

Assessments are a great way to know how well you are doing and how much you have learned. So rather than finding out at the end of term, we allow you to track your engineering learning across semester. Login, select your Subject and get access to a host of multiple choice questions (MCQs) and mock-papers.