Engineering Mathematics - II
Cochin University - Electrical & Electronics Engineering - SEM III


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  • Lectures
  • 92 Lectures
  • Videos
  • 19.48 Hrs Video

Course Description

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Curriculum

Total Chapters: 3 92 Videos

Chapter No. 3 : Laplace Transforms

   

Laplace Transform of 1

Preview 4.55

Laplace Transform of sin at

Preview 6.06

Laplace Transform of cos at

6.21

Laplace Transform of cosh at

11.28

Laplace Transform of sinh at

9.25

Laplace Transform of e ^ at

5.18

Laplace Transform of e ^ -at

4.1

Laplace Transform of t ^ n

7.07

Laplace Transform of Standard Functions - Problem 1

6.04

Laplace Transform of Standard Functions - Problem 2

7.05

Laplace Transform of Standard Functions - Problem 3

8.33

Laplace Transform of Standard Functions - Problem 4

20.37

Laplace Transform of Standard Functions - Problem 5

17.29

Laplace Transform of Standard Functions - Problem 6

7.12

Derivation of Change of Scale Property

6.22

Change of Scale Property - Problem 1

7.22

First Shifting Theorem - Derivation

5.12

First Shifting Theorem - Problem 1

11.01

First Shifting Theorem - Problem 2

10.43

First Shifting Theorem - Problem 3

8.1

First Shifting Theorem - Problem 4

3.5

Complementary Error Function in Laplace Transform - Problem

18.2

Complementary Error Function in Laplace Transform - Derivation

4.14

Multiplication by 't' property - Derivation

17.36

Multiplication by 't' property - Problem 1

13.09

Multiplication by 't' property - Problem 2

10.04

Multiplication by 't' property - Problem 3

12.4

Multiplication by 't' property - Problem 4

8.36

Multiplication by 't' property - Problem 5

7.36

Multiplication by 't' property - Problem 6

8.33

Division by 't' Property - Proof and formula

6.59

Division by 't' Property - Problem 1

9.19

Division by 't' Property - Problem 2

10.05

Division by 't' Property - Problem 3

29.51

Division by 't' Property - Problem 4

11.59

Laplace Transform of Integral Property - Proof & formula

7.02

Laplace Transform of Integral Property - Problem 1

10.08

Laplace Transform of Integral Property - Problem 2

14.05

Laplace Transform of Integral Property - Problem 3

17.55

Laplace Transform of Integral Property - Problem 4

23.05

Laplace Transform of Integral Property - Problem 5

11.08

Definition of Laplace Transform - Problem 1

7.1

Definition of Laplace Transform - Problem 2

8.58

Definition of Laplace Transform - Problem 3

8.31

Definition of Laplace Transform - Problem 4

7.53

Laplace Transform of Derivative Property - Proof and formula

9.3

Laplace Transform of Derivative Property - Problem 1

6.53

Laplace Transform of Derivative Property - Problem 2

15.54

Laplace Transform of Derivative Property - Problem 3

21.1

Laplace Transform of Derivative Property - Problem 4

11.01

Chapter No. 4 : Inverse Laplace Transforms

   

Inverse Laplace Transform - Definition and formulae

Preview 12.07

Inverse Laplace Transform using Standard Results - Problem 1

Preview 7.55

Inverse Laplace Transform using Standard Results - Problem 2

5.4

Inverse Laplace Transform using Standard Results - Problem 3

12.21

Inverse Laplace Transform using Standard Results - Problem 4

7.24

Inverse Laplace Transform using Standard Results - Problem 5

15.26

Inverse Laplace Transform using Standard Results - Problem 6

17.12

Inverse Laplace Transform using Standard Results - Problem 7

19.23

Inverse Laplace transform using Partial Fraction - Problem

9.49

Inverse Laplace Transform using Convolution Theorem - Problem 1

12.12

Inverse Laplace Transform using Convolution Theorem - Problem 2

12.36

Inverse Laplace Transform using Convolution Theorem - Problem 3

12.21

Inverse Laplace Transform using Convolution Theorem - Problem 4

10.58

Inverse Laplace Transform using Convolution Theorem - Problem 5

17.44

Inverse Laplace Transform of log & tan^-1 Function - Problem 1

6.22

Inverse Laplace Transform of log & tan^-1 Function - Problem 2

6.19

Inverse Laplace Transform of log & tan^-1 Function - Problem 3

6.43

Inverse Laplace Transform of log & tan^-1 Function - Problem 4

5.46

Inverse Laplace Transform of log & tan^-1 Function - Problem 5

10.53

Inverse Laplace Transform of log & tan^-1 Function - Problem 6

3.54

Chapter No. 5 : Fourier Series

   

Fourier Series - Important Formulae

Preview 21.28

f(x) =e^-x in (0,2pi) - Fourier Expansion

Preview 25.04

f(x)=cospx in (0,2pi) - Fourier Expansion

28.12

Fourier Expansion of periodic fuction f(x) in (-pi,pi)

29.05

Fourier Expansion of Sinx and Cosx in (-pi,pi)

36.45

Fourier Series of f(x)= |cosx| using Even and Odd Fuctions

8.11

Fourier expansion of f(x)=x+x^2 using Even and Odd Fuction

23.5

Formulae for Fourier Series of Even and Odd Function in (-pi,pi)

25.38

f(x) = pi x in (0,2) - Fourier series

17.37

f(x) = 4-x^2 in (0,2) with Graph of Function - Fourier Series

29.53

f(x) in (-2, 2) - Fourier expansion

19.58

f(x) =Esinwx in (-pi/ w, pi/w ) - Fourier Expansion

34.02

Formula for Fourier Series of Even and Odd Function in (-l , l )

9.39

Fourier Series F(x) = x|x| in (-l,l )

12.24

Fourie Series F(x) = 1 +x & 1 - x in (-2, 2 )

12.42

Parseval's Identity - Formulae and Concept

7.22

Half Range Sine and Cosine Series - Formulae

9.54

Half range Cosine Series F(x) = x in (0,2)

23.23

Half Range Sine Series F(x) in ( o, pi )

12.47

Half range Sine Series F(x) = lx - x^2 in ( o,l)

19.5

Complex Form of Fourier Series - Formulae

11.16

Complex form of fourier Series for f(x) = e^ax in (-pi,pi)

30.18

Instructor Biography

Mahesh Wagh, Instructor and Teacher

Professor Mahesh Wagh has pledged to eradicate the fear of Mathematics from all those students who are afraid of studying this subject. His experience of teaching mathematics stretches over a timespan of around 10 years. He has earned a degree in computer engineering from Mumbai University. Apart from this, he also has an industrial experience in an MNC for 3 years of employment. He is an extraordinary person when it comes to innovation, technology & entrepreneurship. He is the founder of an institution which helps students to add increment to their scores by his authentic style of teaching. He is successfully running a start-up in order to spread quality education, digitally around the globe. You are gonna enjoy studying under him.

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