SCCI Digital Library
Menu
Home
About Us
Video Library
eBooks
[wpseo_breadcrumb]
19. Method of Undetermined Coefficients (Annihilator Operator Approach)_2 (V-U)
Course:
Differential Equations. (V-U)
Discipline:
Basic and Health Sciences
Institute:
Virtual University
Instructor(s):
Dr. Junaid Zaidi
Level:
Undergraduate
Differential Equations. (V-U)
1. Introduction (V-U)
10. Applications of First Order Differential Equations (V-U)
11. Radioactive Decay (V-U)
12. Applications of Non Linear Equations (V-U)
13. Higher Order Linear Differential Equations (V-U)
14. Solutions of Higher Order Linear Equations (V-U)
32. Solution about Singular Points (other cases) (V-U)
15. Construction of a Second Solution (V-U)
33. Bessel’s Differential Equation (V-U)
16. Homogeneous Linear Equations with Constant Coefficients (V-U)
34. Legendre’s Differential Equation (V-U)
35. Systems of Linear Differential Equations (V-U)
17. Method of Undetermined Coefficients ( Superposition Approach) (V-U)
18. Method of Undetermined Coefficients (Annihilator Operator Approach)_1 (V-U)
36. Systems of Linear Differential Equations (Continued) (V-U)
19. Method of Undetermined Coefficients (Annihilator Operator Approach)_2 (V-U)
37. System of Linear First Order Equation (V-U)
2. Fundamentals (V-U)
38. Introduction to Matrices (V-U)
20. Variation of Parameters (V-U)
39. The Eigenvalue Problem (V-U)
21. Variation of Parameters for Higher-Order Equations (V-U)
4. Homogeneous Differential Equations (V-U)
40. Matrices and Systems of Linear First-Order Equations (V-U)
22. Applications of Second Order Differential Equations (V-U)
23. Damped Motion (V-U)
41. Matrices and Systems of Linear First-Order Equations (Continued) (V-U)
24. Forced Motion (V-U)
42. Homogeneous Linear Systems (V-U)
25. Forced Motion-Examples (V-U)
43. Linear and Repeated Eignevalues (V-U)
26. Differential Equations with Variable Coefficients (V-U)
44. Non-Homogeneous System (V-U)
45. Revision of the course (V-U)
27. Cauchy-Euler Equation Alternative Method of Solution (V-U)
28. Power Series An Introduction (V-U)
5. Exact Differential Equations (V-U)
29. Power Series An Introduction Examples (V-U)
6. Integrating Factor Technique (V-U)
3. Separable Equations (V-U)
7. First Order Linear Equation (V-U)
30. Solution about Ordinary points (V-U)
8. Bernoulli Equations (V-U)
31. Solution about Singular Points (V-U)
9. Mixed Example (V-U)
