| 1 | Some reminders for ordinary differential equations and examples | [5] p. 1-46 |
| 2 | Initial and boundary value problems for ordinary differential equations | [2] p. 343-345 |
| 3 | Picard Method | [6] S. 432-436 |
| 4 | Single step methods, Taylor series method, Euler methods | [2] p. 345-349, [4] S. 223-227 |
| 5 | Corrected Euler method, Runge-Kutta methods, | [2] p. 349-352, [4] S. 227-231 |
| 6 | High degree Runge-Kutta methods | [2] p. 352-356 |
| 7 | Step to the half, Multi step methods, | [2] P. 356-358 |
| 8 | Step to the half, Multi step methods, | [2] P. 356-358 |
| 9 | Adams, Milne and Adams-Moulton methods | [2] p. 358-362, [4] S. 238-241 |
| 10 | Stiff differential equations | [2] p. 366-368 |
| 11 | Boundary value problem, Shothing method | [2] p. 368-370 |
| 12 | Finite difference method | [2] p. 370-380 |
| 13 | Numerical soluton of the high degree equations | [3] p. 244-250, [4] S. 316-324 |
| 14 | Numerical solutions of systems of equations | [3] p. 250-258, [4] S. 231-234 |