Lecture 60-Applications of Fourier transforms to BVP–III
Mathematical methods and its applications
Lecture 60-Applications of Fourier transforms to BVP–III
31:32
Lecture 59-Applications of Fourier transforms to BVP–II
Mathematical methods and its applications
Lecture 59-Applications of Fourier transforms to BVP–II
29:13
Lecture 58-Applications of Fourier transforms to BVP–I
Mathematical methods and its applications
Lecture 58-Applications of Fourier transforms to BVP–I
33:53
Lecture 57-Convolution theorem for Fourier transforms
Mathematical methods and its applications
Lecture 57-Convolution theorem for Fourier transforms
32:42
Lecture 56-Fourier sine and cosine transforms
Mathematical methods and its applications
Lecture 56-Fourier sine and cosine transforms
19:22
Lecture 55-Fourier transforms
Mathematical methods and its applications
Lecture 55-Fourier transforms
20:01
Lecture 54-Fourier sine and cosine integrals
Mathematical methods and its applications
Lecture 54-Fourier sine and cosine integrals
28:01
Lecture 53-Fourier integrals
Mathematical methods and its applications
Lecture 53-Fourier integrals
26:39
Lecture 52-Complex form of Fourier series
Mathematical methods and its applications
Lecture 52-Complex form of Fourier series
25:48
Lecture 51-Parseval’s Identity
Mathematical methods and its applications
Lecture 51-Parseval’s Identity
25:02
Lecture 50-Fourier half-range series
Mathematical methods and its applications
Lecture 50-Fourier half-range series
25:44
Lecture 49-Fourier Series of Even and Odd functions
Mathematical methods and its applications
Lecture 49-Fourier Series of Even and Odd functions
24:01
Lecture 48-Fourier Series and its Convergence-II
Mathematical methods and its applications
Lecture 48-Fourier Series and its Convergence-II
30:57
Lecture 47-Fourier Series and its Convergence-I
Mathematical methods and its applications
Lecture 47-Fourier Series and its Convergence-I
31:02
Lecture 46- Applications of Z- transform- II
Mathematical methods and its applications
Lecture 46- Applications of Z- transform- II
35:56
Lecture 45- Applications of Z- transforms - I
Mathematical methods and its applications
Lecture 45- Applications of Z- transforms - I
28:56
Lec 44 Convergence of Z transform
Mathematical methods and its applications
Lec 44 Convergence of Z transform
32:43
Lecture 43- Convolution theorem for Z- transforms
Mathematical methods and its applications
Lecture 43- Convolution theorem for Z- transforms
21:38
Lecture 42- Initial and final theorems for Z- transforms
Mathematical methods and its applications
Lecture 42- Initial and final theorems for Z- transforms
26:17
Lecture 41- Properties of Z- transform- II
Mathematical methods and its applications
Lecture 41- Properties of Z- transform- II
38:55
Lecture 40- Properties of Z- transforms- I
Mathematical methods and its applications
Lecture 40- Properties of Z- transforms- I
27:03
Lecture 39- Z- transform and inverse Z- transform of elementary functions
Mathematical methods and its applications
Lecture 39- Z- transform and inverse Z- transform of elementary functions
26:11
Lecture 38-Applications of Laplace Transforms-III
Mathematical methods and its applications
Lecture 38-Applications of Laplace Transforms-III
25:57
Lecture 37-Applications of Laplace Transforms-II
Mathematical methods and its applications
Lecture 37-Applications of Laplace Transforms-II
29:21
Lecture 36-Applications of Laplace Transforms-I
Mathematical methods and its applications
Lecture 36-Applications of Laplace Transforms-I
27:05
Lecture 35-Laplace Transforms of Dirac delta Functions
Mathematical methods and its applications
Lecture 35-Laplace Transforms of Dirac delta Functions
26:26
Lecture 34-Laplace Transforms of Unit Step Function
Mathematical methods and its applications
Lecture 34-Laplace Transforms of Unit Step Function
30:31
Lecture 33-Laplace Transforms of Periodic Functions
Mathematical methods and its applications
Lecture 33-Laplace Transforms of Periodic Functions
28:11
Lecture 31-Convolution Theorem for Laplace Transforms-II
Mathematical methods and its applications
Lecture 31-Convolution Theorem for Laplace Transforms-II
30:45
Lecture 32-Initial and Final Value Theorems for Laplace Transforms
Mathematical methods and its applications
Lecture 32-Initial and Final Value Theorems for Laplace Transforms
31:11
Lecture 30-Convolution Theorem for Laplace Transforms-I
Mathematical methods and its applications
Lecture 30-Convolution Theorem for Laplace Transforms-I
29:45
Lecture 29-Properties of Laplace transforms-IV
Mathematical methods and its applications
Lecture 29-Properties of Laplace transforms-IV
33:06
Lecture 28-Properties of Laplace transforms-III
Mathematical methods and its applications
Lecture 28-Properties of Laplace transforms-III
37:55
Lecture 27-Properties of Laplace transforms-II
Mathematical methods and its applications
Lecture 27-Properties of Laplace transforms-II
37:35
Lecture 26-Properties of Laplace transforms-I
Mathematical methods and its applications
Lecture 26-Properties of Laplace transforms-I
35:38
Lecture 25-Existence theorem for Laplace transforms
Mathematical methods and its applications
Lecture 25-Existence theorem for Laplace transforms
32:29
Lecture 24-Laplace transforms of some standard functions
Mathematical methods and its applications
Lecture 24-Laplace transforms of some standard functions
27:54
Lecture 23-Introduction to Laplace transforms
Mathematical methods and its applications
Lecture 23-Introduction to Laplace transforms
29:40
Lecture 22- Solution of first order non linear equation IV
Mathematical methods and its applications
Lecture 22- Solution of first order non linear equation IV
33:10
Lecture 21- Solution of first order non linear equation III
Mathematical methods and its applications
Lecture 21- Solution of first order non linear equation III
27:55
Lecture 20- Solution of first order non linear equation II
Mathematical methods and its applications
Lecture 20- Solution of first order non linear equation II
31:30
Lecture 19- Solution of first order non linear equation I
Mathematical methods and its applications
Lecture 19- Solution of first order non linear equation I
42:20
Lec 18 - Solution of Langrange's equation II
Mathematical methods and its applications
Lec 18 - Solution of Langrange's equation II
30:17
Lec 17- Solution of Langrange's equation I
Mathematical methods and its applications
Lec 17- Solution of Langrange's equation I
27:55
Lec 16 Formulation of partial differential equations
Mathematical methods and its applications
Lec 16 Formulation of partial differential equations
29:31
Lec 15 Methods for finding particular integral with higher order linear differential equations with
Mathematical methods and its applications
Lec 15 Methods for finding particular integral with higher order linear differential equations with
36:24
Lec 14 Solution of higher order homogenous linear differential equation with constant coefficients
Mathematical methods and its applications
Lec 14 Solution of higher order homogenous linear differential equation with constant coefficients
32:51
Lec 13- Solution of second order differential equations by changing independent variable
Mathematical methods and its applications
Lec 13- Solution of second order differential equations by changing independent variable
27:59
Lec 12- Solution of second order differential equations by changing dependent variable
Mathematical methods and its applications
Lec 12- Solution of second order differential equations by changing dependent variable
21:52
Lec 11- Method of variation of parameters
Mathematical methods and its applications
Lec 11- Method of variation of parameters
30:33
Lec 06 Methods for finding particular integral with second order linear differential equations wit
Mathematical methods and its applications
Lec 06 Methods for finding particular integral with second order linear differential equations wit
45:08
Lec 07 Methods for finding particular integral with second order linear differential equations with
Mathematical methods and its applications
Lec 07 Methods for finding particular integral with second order linear differential equations with
28:26
Lec 10- Method of reduction for second order Linear defferential equtaions
Mathematical methods and its applications
Lec 10- Method of reduction for second order Linear defferential equtaions
34:54
Lec 09- Cauchy Euler equation
Mathematical methods and its applications
Lec 09- Cauchy Euler equation
47:58
Lec 08 Methods for finding particular integral with second order linear differential equations with
Mathematical methods and its applications
Lec 08 Methods for finding particular integral with second order linear differential equations with
21:53
Lec 01- Introduction to Linear Differential equations
Mathematical methods and its applications
Lec 01- Introduction to Linear Differential equations
28:17
Lec 02- Linear dependence, independence and wronskian of functions
Mathematical methods and its applications
Lec 02- Linear dependence, independence and wronskian of functions
42:47
lec 03 - Solution of second order homogenous linear differential equation with constant coefficients
Mathematical methods and its applications
lec 03 - Solution of second order homogenous linear differential equation with constant coefficients
17:53
Lec 04 Solution of second order homogenous linear D. E. with constant coefficients II
Mathematical methods and its applications
Lec 04 Solution of second order homogenous linear D. E. with constant coefficients II
32:16
Lec 05 Method of undetermined coefficients
Mathematical methods and its applications
Lec 05 Method of undetermined coefficients
37:38
Mathematical methods and its applications
Mathematical methods and its applications
Mathematical methods and its applications
2:05