Advanced Mechanics

Paper Code:

24DMAT713

Credits:

Contact Hours:

90.00

Max. Marks:

100.00

Objective:

This course will enable the students to –

Acquaint the students with mechanical systems under generalized coordinate systems, virtual work, energy and momentum.
Aware about the mechanics developed by Newton, Lagrange's, Hamilton.
Understand the motion of fluid and develop concept, models
Understand the techniques which enable us to solve the problems of fluid flow.

Course Outcomes:

Course

Learning outcomes

(at course level)

Learning and teaching strategies

Assessment

Strategies

Course Code

Course Title

24DMAT

713

Advanced Mechanics

(Theory)

CO169: Construct the general equation of motion of a rigid body under fixed and impulsive force about a fixed axis.

CO170: Describe Motion in three dimensions with reference to Euler's dynamical and geometrical equations. Understand the motion of the top under given conditions.

CO171: Analyze the Derivation of Lagrange’s Equations to holonomic Systems. Concept of the Hamilton Equations of Motion and the Principle of Least Action.

CO172: Distinguish the basic principles of ideal fluid, such as Lagrangian and Eulerian approach, conservation of mass, etc.

CO173: Differentiate between rotational and irrotational flow, stream functions, velocity potential and be able to construct complex potential due to sink, source and doublets.

CO174: Contribute effectively in course-specific interaction.

Approach in teaching:

Interactive Lectures, Discussion, Power Point Presentations, Informative videos

Learning activities for the students:

Self learning assignments, Effective questions

Quiz, Individual and group projects,

Open Book Test, Semester End Examination

Unit I:

D'Alembert's principle and applications

18.00

D'Alembert's principle, General equations of motion of a rigid body, Motion of centre of inertia and motion relative to centre of inertia.

Motion about a fixed axis: Finite forces moment of effective forces about a fixed axis of rotation, Angular momentum, Kinetic energy of a rotating body about a fixed line, Equation of motion of the body about the axis of rotation, Principle of conservation of energy.

Unit II:

Motion of a rigid body in three dimensions

18.00

Motion in three dimensions with reference to Euler's dynamical and geometrical equations, Motion under no forces, Motion under impulsive forces, Motion of a top

Unit III:

Lagrange's and Hamilton's equations of motion

18.00

Lagrange's equations for holonomous dynamical system, Energy equation for conservative field, Small oscillations, Motion under impulsive forces, Hamilton's equations of motion, Conservation of energy, Hamilton's principle and principle of least action.

Unit IV:

Kinematics of ideal fluid

18.00

Lagrange's and Euler's methods, Equation of continuity in cartesian, cylindrical and spherical polar coordinates, Boundary surface, Stream-lines, path-lines, velocity potential, Rotational and irrotational motion.

Unit V:

Equation of motion of fluid

18.00

Euler's hydrodynamic equations, Bernoulli's theorem, Helmholtz equations, Cauchy's integral, Motion due to impulsive forces. Motion in two-dimensions, Stream function, Complex potential, Sources, Sinks, Doublets, Images in two dimensions: image of a source with regard to a plane, image of a source with regard to a circle.

Essential Readings:

M.D. Raishinghania, Dynamics, S.Chand & Co. New Delhi, 2016.
J.L. Bansal and P.R. Sharma, Dynamics of a Rigid Body, Jaipur Publishing House, Jaipur, 2009.
P.P. Gupta and G.S. Malik, Rigid Body of Dynamics-I, Krishna Prakashan, 2014.
M.D. Raisinghania, Fluid Dynamics, S. Chand & Co. New Delhi, 2016.
K.P. Goyal and J.K. Gupta, Fluid Dynamics, Pragati Prakashan, Meerut, 2011.

References: