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Engineering Mathematics-II | Applied Sciences

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 Duration7 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

Reviews

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Index

No.

Topics of Learning

Duration

1

Differential Equation

1:12

2

Ordinary Differential Equation

1:15

3

Order and Degree of Differential Equation

1:26

4

Formation of Differential Equation

5:00

5

Solution of Differential Equation

2:03

6

Differential Equation with Separable Variables

5:00

7

Homogeneous Differential Equation

5:00

8

Equation Reducible to Homogeneous Form when a/a' ≠ b/b'

5:00

9

Solution of Differential Equation when a/a' = b/b'

5:00

10

Leibnitz Linear Equation

5:00

11

Bernoulli's Equation

5:00

12

Exact Differential Equation

5:00

13

Equation Reducible to Exact Differential Equation

1:54

14

If for an Equation of Type: {f1(xy)ydx - f2(xy)xdy = 0}

5:00

15

If for an Equation of Type: {Mdx + Ndy = 0}

5:00

16

Equation Solvable for p

5:00

17

Equation Solvable for y

2:27

18

Equation Solvable for x

2:33

19

Clairaut's Equation

5:00

20

Linear Differential Equation

1:35

21

Solution of Linear Differential Equation

1:32

22

Rules for Finding Complementary Function

2:19

23

CF if Roots are Real and Different

5:00

24

CF if Two Roots are Real and Equal

5:00

25

CF if One Pair of Roots is Imaginary and Different

5:00

26

CF if Two Pairs of Imaginary Roots be Equal

5:00

27

Rules for Finding Particular Integral

2:42

28

PI when X = eax

5:00

29

PI when X = Sin (ax+b) or X = Cos (ax+b)

5:00

30

PI when X = xm

5:00

31

PI when X = eax V

5:00

32

When X is any other Function of X

5:00

33

Method of Variation of Parameters

5:00

34

Operator Method

3:47

35

Working Procedure to Solve the Linear Differential Equation

5:00

36

Cauchy's Homogeneous Linear Equation

5:00

37

Legendre's Linear Equation

5:00

38

Simultaneous Linear Equations with Constant Coefficient

5:00

39

Simple Harmonic Motion

5:00

40

RLC Circuit

5:00

41

Deflection of Beams

4:10

42

Introduction to Matrices and Determinants

5:00

43

Minors and Cofactors of Determinant

3:39

44

Properties of Dterminants

8:35

45

Types of Matrices

7:02

46

Matrix Algebra

9:13

47

Some Special Matrices

8:47

48

Adjoint of a Matrix

5:00

49

Elementary Row/Column Transformation

5:00

50

Rank of a Matrix

5:00

51

Homogeneous & Non-Homogeneous Equations

6:23

52

Inverse of a Matrix

5:00

53

Gauss Jordan Method

5:00

54

Partition Method of Finding the Inverse

2:44

55

Matrix Method

5:26

56

Cramer's Rule (homog.)

5:26

57

Gauss Elimination Method

3:49

58

Linear Dependence of Vectors

5:00

59

Consistency of Linear System of Equations

2:34

60

Characteristic Equation

5:00

61

Eigen Values and Eigen Vectors

5:18

62

Properties of Eigen Values

2:10

63

Caley-Hamilton Theorem

5:00

64

Normal Form of a Matrix

1:19

65

Reduction to Diagonal Form

3:16

66

Complex Matrices

5:37

67

Sequence

1:56

68

Series

3:33

69

General Properties of Series

2:04

70

Series of Positive Terms

2:11

71

Comparision Test: Case 1

1:11

72

Comparision Test: Case 2

1:04

73

Comparision Test: Case 3

5:00

74

Integral Test

5:00

75

Comparision of Ratios

1:23

76

D'Alembert's Ratio Test

1:29

77

D'Alembert's Ratio Test: Case 1 (λ <1)

5:00

78

D'Alembert's Ratio Test: Case 2 (λ > 1)

5:00

79

Raabe's Test

5:00

80

Logarithmic Test

1:22

81

Cauchy's Ratio Test

5:00

82

Alternating Series

5:00

83

Absolute and Conditionally Convergent

1:21

84

Complex Number

1:31

85

Modulus and Argument of Complex Number

1:27

86

Arithmetic Properties of Complex Number

2:39

87

Conjugate Properties of Complex Number

0:44

88

De-Moivre's Theorem

5:00

89

Expansion of Sin(nθ), Cos(nθ) and Tan(nθ)

5:00

90

Addition Formulae

5:00

91

Expansion of Sinmθ, Cosnθ, or Sinmθ Cosnθ

5:00

92

Exponential Function of a Complex Variable

5:00

93

Circular Function of a Complex Variable

5:00

94

Hyperbolic Function of a Complex Variable

5:00

95

Inverse Hyperbolic Function of a Complex Variable

5:00

96

Logarithmic Function of a Complex Variable

5:00

97

Sin(x+iy) and Cos(x+iy)

1:32

98

Tan(x+iy)

2:38

99

Sec(x+iy)

2:17

100

Sinh(x+iy)

1:25

101

Tanh(x+iy)

2:40

102

Log(x+iy)

1:46

103

(α+iβ) (x+iy)

1:46

104

C + iS Method

5:00

105

Operator D

1:23

 

Total

6 Hr 59 Mins

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.