| Weeks |
Theory |
| 1st |
Lecture |
Topic |
| Day |
(including assignment / test) |
| 1st |
Introduction of ordinary differential equation |
| Exact differential equation |
| 2nd |
Equation reducible to exact equation |
| (by inspection and for homogeneous equation ) |
| 3rd |
Equation reducible to exact equation |
| (type 3) |
| 4th |
Equation reducible to exact equation |
| (type 4) |
|
1st |
Introduction of linear differential equation |
| 2nd |
2nd |
Complementary function of L.D.E. |
|
3rd |
Particular integral of L.D.E. |
|
4th |
Particular integral of L.D.E. |
|
1st |
Method of variation of parameters to find P.I |
| 3rd |
2nd |
Cauchy’s linear equation |
|
3rd |
Legendre’s linear equation |
|
4th |
Simultaneous linear equation with constant |
|
co-efficient |
|
1st |
Application of L.D.E. to electric circuit(LC,LCR circuit) |
| 4th |
2nd |
Application of L.D.E. to electric circuit(LC,LCR circuit) : problems |
|
3rd |
Newton’s Law of cooling and heat flow |
|
4th |
Orthogonal trajectory |
|
Assignment : O.D.E. of first order |
|
1st |
Test : O.D.E. of first order |
| 5th |
2nd |
Introduction of partial differential Equation |
|
Formation of pde |
|
3rd |
Solution of pde |
|
4th |
Lagrange’s linear pde |
|
1st |
Non linearpde of first order |
| 6th |
a) f(p,q) =0 |
|
b) clairaut equation |
|
2nd |
Non linearpde of first order |
|
c) f(z,p,q) =0 |
|
d) f1(x,p) = f2(y,q) |
|
3rd |
Charpit’s method |
|
4th |
Homogeneous linear pde with constant coefficient |
|
Rules to write Complementary function |
|
1st |
Homogeneous linear pde with constant coefficient |
| 7th |
Rules to write particular integral |
|
2nd |
Homogeneous linear pde with constant coefficient |
|
Rules to write particular integral |
|
3rd |
Homogeneous linear pde with constant coefficient |
|
Rules to write particular integral |
|
4th |
Application of pde |
|
Method of separation of variables |
|
1st |
Wave equation |
| 8th |
2nd |
Wave equation : problems |
|
3rd |
One dimentional heat equation |
|
Assignment : P.D.E. and its application |
|
4th |
Introduction of laplace transform |
|
Laplace transform of elementary function and its properties |
|
1st |
Test : P.D.E. and its application |
| 9th |
2nd |
Inverse laplace transform |
|
3rd |
Inverse laplace transform : problems |
|
4th |
Existenence condition of laplace transform |
|
Transform of derivatives |
|
Transform of integrals |
|
1st |
Multiplication by tn |
| 10th |
Division by t |
|
2nd |
Evaluation of integral by laplace transform |
|
3rd |
Convolution theorem |
|
4th |
Application of L.D.E. to solve boundary value problem with constant coefficient |
|
1st |
Simultaneous L.D.E with constant coefficient |
| 11th |
Second shifting theorem |
|
Assignment : Laplace Transform |
|
2nd |
Concept of sequences |
|
3rd |
Concept of sequence |
|
4th |
Test :Laplace Transform |
|
1st |
Infinite series : concept , convergence and divergence |
| 12th |
of series |
|
2nd |
Infinite series : geometric series , convergence |
|
3rd |
Necessary and sufficient condition for convergence of series |
|
4th |
Comparison test : concept |
|
1st |
Comparison test : problems |
| 13th |
2nd |
D’ Alembert’s Ratio test : concept |
|
3rd |
D’ Alembert’s Ratio test (problems) |
|
4th |
Cauchy’s Root test : concept |
|
1st |
Cauchy’s Root test: problems |
| 14th |
2nd |
Raabe’s test, Logarithmic test , Gauss test : concept |
|
3rd |
Raabe’s test, Logarithmic test , Gauss test : problems |
|
4th |
Cauchy’s integral test |
|
1st |
Alternating series |
| 15th |
2nd |
Absolute convergence and conditional convergence |
|
3rd |
Absolute convergence and conditional convergence : problems |
|
Assignment : infinite series |
|
4th |
Test : infinite series |
