Theory of Elasticity detail syllabus for Mechanical & Industrial Engineering (Mech & IE), 2019-20 scheme is taken from AKTU official website and presented for AKTU students. The course code (RME088), and for exam duration, Teaching Hr/Week, Practical Hr/Week, Total Marks, internal marks, theory marks, and credits do visit complete sem subjects post given below.
For all other mech & ie 8th sem syllabus for b.tech 2019-20 scheme aktu you can visit Mech & IE 8th Sem syllabus for B.Tech 2019-20 Scheme AKTU Subjects. For all other Departmental Elective-6 subjects do refer to Departmental Elective-6. The detail syllabus for theory of elasticity is as follows.
Unit I
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Unit II
Plane Stress and Plane Strain Problems: Airy’s Stress Function, Bi-Harmonic Equations, Polynomial Solutions, Simple Two-Dimensional Problems in Cartesian Coordinates Like Bending of Cantilever and Simply Supported Beams.
Unit III
Polar Coordinates: Equations of Equilibrium, Strain-Displacement Relations, Stress-Strain Relations, Airy’s Stress Function, Axis-Symmetric Problems, Introduction to Dunder’s Table, Curved Beam Analysis, Lame’s, Kirsch, Michell’s And Boussinesque Problems-Rotating Discs.
Unit IV
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Unit V
Introduction to Theory of Plates and Shells: Classical Plate Theory-Assumptions-Governing Equations-Boundary conditions-Navier’s Method of Solution for Simply Supported Rectangular Plates Levy’s Method of Solution for Rectangular Plates Under Different Boundary Conditions.
Books and References:
- Wang, C. T., Applied Elasticity, McGraw-Hill Co., New York, 1993.
- Sokolnikoff, I. S., Mathematical Theory of Elasticity, McGraw-Hill, New York, 1978.
- Volterra & J.H. Caines, Advanced Strength of Materials, Prentice Hall, New Jersey, 1991.
- Barber, J. R., Elasticity, Kluwer Academic Publishers, 2004.
- Theory of elasticity by S.Timoshenko.
For detail syllabus of all other subjects of B.Tech Mech & Ie, 2019-20 regulation do visit Mech & Ie 8th Sem syllabus for 2019-20 Regulation.
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