| Lesson Plan |
| Name of the Faculty : Navya Goel |
| Discipline : B.Tech. - Civil |
| Semester : 1st |
| Subject : Mathematics- 1 |
| Lesson Plan Duration : 15 weeks (From August, 2018 to November, 2018 ) |
| Work Load (Lecture) per week (in hours) : Lectures - 03 and 01 Tutorial |
|
| Weeks |
Theory |
|
Lecture/Tutorial |
Topic |
| Day |
(Including assignment / Test) |
| 1st |
1st |
Evolutes and involutes |
| 2nd |
Evolutes and involutes |
| 3rd |
Evaluation of definite integrals |
| 4th |
Revision |
| 2nd |
1st |
Evaluation of improper integrals |
| 2nd |
Beta and Gamma functions and their properties |
| 3rd |
Applications of definite integrals to evaluate surface areas |
| 4th |
Test |
| 3rd |
1st |
Applications of definite integrals to evaluate volumes of revolutions / Assignment |
| 2nd |
Rolle’s theorem, Mean value theorems |
| 3rd |
Taylor’s and Maclaurin theorems with remainders |
| 4th |
Revision |
| 4th |
1st |
Indeterminate forms and L'Hospital's rule |
| 2nd |
Maxima and minima / Assignment |
| 3rd |
Test |
| 4th |
Convergence of sequence and series |
| 5th |
1st |
tests for convergence |
| 2nd |
power series, Taylor's series |
| 3rd |
Series for exponential, trigonometric and logarithmic functions |
| 4th |
Revision |
| 6th |
1st |
Fourier series: Half range sine and cosine series |
| 2nd |
Fourier series: Half range sine and cosine series, Parseval’s theorem / Assignment |
| 3rd |
Test |
| 4th |
Limit, continuity and partial derivatives |
| 7th |
1st |
partial derivatives, directional derivatives |
| 2nd |
total derivative , Tangent plane and normal line |
| 3rd |
Maxima, minima and saddle points |
| 4th |
Revision |
| 8th |
1st |
Method of Lagrange multipliers |
| 2nd |
Gradient, curl and divergence / Assignment |
| 3rd |
Test |
| 4th |
Multiple Integration: double and triple integrals (Cartesian and polar) |
| 9th |
1st |
change of order of integration in double integrals |
| 2nd |
Change of variables (Cartesian to polar) |
| 3rd |
Revision |
| 4th |
Applications: areas and volumes by (double integration) Center of mass and Gravity (constant and variable densities). |
| 10th |
1st |
Applications: areas and volumes by (double integration) Center of mass and Gravity (constant and variable densities). |
| 2nd |
Theorems of Green, Gauss and Stokes |
| 3rd |
orthogonal curvilinear coordinates |
| 4th |
Test |
| 11th |
1st |
Simple applications involving cubes, sphere |
| 2nd |
Simple applications involving rectangular parallelepipeds / Assignment |
| 3rd |
Matrices : addition and scalar multiplication, matrix multiplication; Linear systems of equations, linear Independence, rank of a matrix |
| 4th |
Revision |
| 12th |
1st |
rank of a matrix, determinants |
| 2nd |
determinants, Cramer’s Rule, inverse of a matrix |
| 3rd |
Gauss elimination and Gauss-Jordan elimination |
| 4th |
Revision |
| 13th |
1st |
Gauss elimination and Gauss-Jordan elimination / Assignment |
| 2nd |
Vector Space, linear dependence of vectors |
| 3rd |
basis, dimension, |
| 4th |
Test |
| 14th |
1st |
Linear transformations (maps), range and kernel of a linear map, rank and nullity |
| 2nd |
Inverse of a linear transformation, rank- nullity theorem |
| 3rd |
composition of linear maps, Matrix associated with a linear map / Assignment |
| 4th |
Revision |
| 15th |
1st |
Eigen values, eigen vectors, symmetric, skew-symmetric, and orthogonal Matrices |
| 2nd |
symmetric, skew-symmetric, and orthogonal Matrices, eigen bases |
| 3rd |
Diagonalization, Inner product spaces, |
| 4th |
Inner product spaces, Gram-Schmidt orthogonalization /Assignment |
