Page 1 : tand the physical interpretation of gradient, divergence and curl. =, jend the difference and connection between Cartesian, spherical and cylindrical coordinate systems., ‘the meaning of 4-vectors, Kronecker delta and Epsilon (Levi Civita) tensors, mudy the origin of pseudo forces in rotating frame,, , dy the response of the classical systems to external forces and their elastic deformation., tand the dynamics of planetary motion and the working of Global Positioning System (GPS)., d the different features of Simple Harmonic Motion (SHIM) and wave propagation., , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , Core Compulsory / Elective, , , , , , Max, Marks: 25475 i Min, Passing Marks:, Total No. of Lectures-Tutorials-Practical (in hours per week): L-T-P: 4-0-0, , , , No. of, Topic!, ae | Lectures}, , PART A, , Basic Mathematical Physics, , Introduction to Indian ancient Physics and contribution of Indian Physicists,, in context with the holistic development of modern science and technology,, should be included under Continuous Internal Evaluation (CIE)., ’, , Vector Algebra |, late rotation, reflection and inversion as the basis for defining scalars, vectors, pseudo+, and pseudo-vectors (include physical examples). Component form in 2D and 3D!, trical and physical interpretation of addition, subtraction, dot product, wedge product, cross, and triple product of vectors. Position, separation and displacement vectors., , Vector Calculus, 0 and physical interpretation of vector differentiation, Gradient, Divergence and Curl, ‘their significance. Vector integration, Line, Surface (flux) and Volume integrals of vector, Gradient theorem, Gauss-divergence theorem, Stoke-curl theorem, Greens theorem =, ‘theorem (statement only). Introduction to Dirac delta function., , Coordinate Systems t, 3D Cartesian, Spherical and Cylindrical coordinate systems, basis vectors, transformation, ‘Expressions for displacement vector, arc length, area clement, volume clement, gradient,, ence and curl in different coordinate systems. Components of velocity and acceleration in, , | coordinate systems. Examples of non-inertial coordinate system and pseudo-acceleration. |, , , , °, , {Page 8 of 48}