Applied Mathematics - III
Mumbai University - Electronics and Telecommunication Engineering - SEM III


1500 3000 50 % OFF


  • Lectures
  • 126 Lectures
  • Videos
  • 28.95 Hrs Video

Course Description

No Records To Display

What are the requirements?

No Records To Display

What am I going to get from this course?

No Records To Display

Curriculum

Total Chapters: 4 126 Videos

Chapter No. 1 : Laplace Transform

   

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

Problem 1 based on Laplace Transform of Standard Functions

6.04

Problem 2 based on Laplace Transform of Standard Functions

7.05

Problem 3 based on Laplace Transform of Standard Functions

8.33

Problem 4 based on Laplace Transform of Standard Functions

20.37

Problem 5 based on Laplace Transform of Standard Functions

17.29

Problem 6 based on Laplace Transform of Standard Functions

7.12

Change of Scale Property

6.22

Problem 1 on Change of Scale Property

7.22

First Shifting Theorem

5.12

Problem 1 based on First Shifting Theorem

11.01

Problem 2 based on First Shifting Theorem

10.43

Problem 3 based on First Shifting Theorem

8.1

Problem 4 based on First Shifting Theorem

3.5

Problem on Complementary Error Function in Laplace Transform

18.2

How to Derive Complementary Error Function in Laplace Transform

4.14

Multiplication by 't' property

17.36

Problem 1 based on Multiplication by 't' property

13.32

Problem 2 based on Multiplication by 't' property

10.25

Problem 3 based on Multiplication by 't' property

12.4

Problem 4 based on Multiplication by 't' property

8.36

Problem 5 based on Multiplication by 't' property

6.45

Problem 6 based on Multiplication by 't' property

8.33

Division by 't' Property - Proof & formula

6.59

Problem 1 based on Division by 't' Property

9.19

Problem 2 based on Division by 't' Property

11.59

Problem 3 based on Division by 't' Property

29.51

Problem 4 based on Division by 't' Property

11.59

Laplace Transform of Integral Property - Proof & formula

7.02

Problem 1 based on Laplace Transform of Integral Property

10.08

Problem 2 based on Laplace Transform of Integral Property

14.05

Problem 3 based on Laplace Transform of Integral Property

17.55

Problem 4 based on Laplace Transform of Integral Property

23.05

Problem 5 based on Laplace Transform of Integral Property

11.08

Problem 1 based on Definition of Laplace Transform

7.1

Problem 2 based on Definition of Laplace Transform

8.58

Problem 3 based on Definition of Laplace Transform

8.31

Problem 4 based on Definition of Laplace Transform

7.53

Laplace Transform of Derivative Property - Proof & formula

9.3

Problem 1 based on Laplace Transform of Derivative Property

6.53

Problem 2 based on Laplace Transform of Derivative Property

15.54

Problem 3 based on Laplace Transform of Derivative Property

21.1

Problem 4 based on Laplace Transform of Derivative Property

11.01

Chapter No. 2 : Inverse Laplace Transform & its Applications

   

Definition & formulae of Inverse Laplace Transform

Preview 12.07

Problem 2 based on Inverse Laplace Transform using Standard Results

5.4

Problem 1 based on Inverse Laplace Transform using Shifting theorem

12.21

Problem 2 based on Inverse Laplace Transform using Shifting theorem

7.24

Problem 3 based on Inverse Laplace Transform using Shifting theorem

15.26

Problem 4 based on Inverse Laplace Transform using Shifting theorem

17.12

Problem 5 based on Inverse Laplace Transform using Shifting theorem

19.23

Problem on Inverse Laplace transform using Partial Fraction

9.49

Chapter No. 3 : Fourier Series

   

Important Formulae of Fourier Series

Preview 21.28

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

Preview 25.04

Important Formulae of Fourier Series

21.08

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

28.12

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

29.05

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

25.04

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

28.12

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

36.45

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

8.11

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

29.05

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

36.45

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

23.5

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

25.38

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

17.37

Fourier expansion of f(x)=x+x^2 using Even & Odd Function

23.5

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

29.53

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

8.11

Formulae for Fourier Series of Even & Odd Fuction in (-pi,pi)

25.38

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

19.58

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

34.02

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

17.37

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

29.53

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

9.39

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

12.24

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

19.58

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

34.02

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

12.42

Formulae & Concept of Parseval's Identity

7.22

Formulae for Fourier Series of Even & Odd Function in (-l , l )

9.39

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

12.24

Formulae for Half Range Sine & Cosine Series

9.54

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

23.23

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

12.42

Formulae & Concept of Parseval's Identity

7.22

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

12.47

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

19.5

Formulae for Half Range Sine & Cosine Series

9.54

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

23.23

Formulae for Complex Form of Fourier Series

11.16

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

30.18

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

12.47

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

19.5

Problem 1 based on Gamma Function

7.4

Formulae for Complex Form of Fourier Series

11.16

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

30.18

Chapter No. 6 : Complex Variable & Bessel Functions

   

Cauchy Rieman Equation in Cartesian Co-ordinates ( Concept & Formula )

Preview 3.51

Problem No.1 on Cauchy Riemann Equation in Cartesian Co-ordinates

Preview 14.10

Problem No.2 on Cauchy Riemann Equation in Cartesian Co-ordinates

13.11

Problem No.3 on Cauchy Riemann Equation in Cartesian Co-ordinates

6.31

Problem No.4 on Cauchy Riemann Equation in Cartesian Co-ordinates

6.36

Problem No.5 on Cauchy Riemann Equation in Cartesian Co-ordinates

10.13

Problem No.6 on Cauchy Riemann Equation in Cartesian Co-ordinates

14.38

Cauchy Rieman Equation in Polar Co-ordinates ( Concept & Formula )

3.38

Problem No.1 on Cauchy Riemann Equation in Polar Co-ordinates

4.4

Problem No.2 on Cauchy Riemann Equation in Polar Co-ordinates

5.49

Concept of Harmonic Function

5.55

Problem No.1 on Harmonic Function

12.21

Problem No.2 on Harmonic Function

8.59

Problem No.3 on Harmonic Function

6.05

How to find Analytic Function (Imaginary Part is given) | Ekeeda.com

17.06

How to find Analytic Function (when u+v or u-v is given) | Ekeeda.com

24.33

How to find Analytic Function (Real Part is Given in Polar Form)

7.22

How to find Analytic function when Harmonic function is given

11.09

Problem No.1 Based on Analytic Function (Harmonic Function is given)

8.39

Problem No.2 Based on Analytic Function (Harmonic Function is given)

11.35

Problem No.3 Based on Analytic Function (Harmonic Function is given)

9.32

Problem No.4 Based on Analytic Function (Harmonic Function is given)

7.58

Problem No.5 Based on Analytic Function (Harmonic Function is given)

15.4

Instructor Biography