Regulation 2021 Anna University Code – CH3302 deals with the semester – III Mechanics of Solids Syllabus of B.Tech Chemical Engineering. Most of the semester syllabus tries to give both practical and theoretical knowledge to the students. To acquire the proper knowledge regarding the studies to prepare for the examination, need a detailed syllabus right?
This article will assist you in gaining most of the syllabus details. We tried our best to provide the required syllabus info. Chapter-wise syllabus along with reference books written by experts and textbooks added. Hence in this article CH3302 – Mechanics of Solids syllabus, we include all the details regarding the examination. Students can easily get all the data regarding the syllabus on one page. Hope you will understand the syllabus. And All the best for your exams. Don’t forget to share it with your friends.
If you want to know more about the syllabus of B.Tech Chemical Engineering connected to an affiliated institution’s four-year undergraduate degree program. We provide you with a detailed Year-wise, semester-wise, and Subject-wise syllabus in the following link B.Tech Chemical Engineering Syllabus Anna University Regulation 2021.
Aim Of Objectives:
To impart knowledge on designing the support column, beams, pipelines, storage tanks and reaction columns and tanks after undergoing this course. This is a precursor for the study on process equipment design and drawing.
CH3302 – Mechanics of Solids Syllabus
Unit I: Stress, Strain and Deformation Of Solids
Rigid bodies and deformable solids – forces on solids and supports – equilibrium and stability – strength and stiffness – tension, compression, and shear stresses – Hooke’s law and simple problems – compound bars – thermal stresses – elastic constants and Poisson’s ratio.
Unit II: Transverse Loading On Beams
Beams –support conditions–types of Beams –transverse loading on beams–shear force and bending moment in beams–analysis of can levers, simply – supported beams and over hanging beams – relationships between loading, S.F. and B.M.Inbeams and their applications– S.F.& B.M. diagrams.
Unit III: Deflections Of Beams
Double integration method – Macaulay’s method –Area–moment theorems for computation of slopes and deflections in beams.
Unit IV: Stresses In Beams
Theory of simple bending – assumptions and derivation of bending equation (M/I=F/Y= E/R)– analysis of stresses in beams–loads carrying capacity of beams–proportioning beam sections – leaf springs – flitched beams – shear stress distribution in beams – determination of shear stress in flanged beams.
Unit V: Torsionand Columns
Torsion of circular shafts – derivation of torsion equation (T/J = fs/R = Cθ/L) – stress and deformation in circular and hollow shafts – stresses and deformation in circular and hollow shafts– stepped shafts – shafts fixed at both ends– stresses inhelical springs–deflection of springs–spring constant. Axially loaded short columns–columns of unsymmetrical sections– Euler’s theory of long columns – critical loads for prismatic columns with different end conditions – effect of eccentricity.
Text Books:
- Junarkar, S. B., Mechanics of Structure Vol.1, 21st Edition, Character Publishing House, Anand, Indian, (1995).
- William A. Nash, Theory and Problems of Strength of Materials, Schaum’s Outline Series.
- McGraw Hill International Editions, Third Edition, 1994.
- Bansal, R.K, Strength of Materials, Laxmi Publications(P) Ltd., Fourth Edition 2010.
Reference:
- Elangovan A., Thinma VisaiIyal (Mechanics of Solids in Tamil), Anna University, Madras, 1995.
Related Posts On Semester – III:
- MA3356 – Differential Equations
- CH3301 – Basic Mechanical Engineering
- CH3351 – Chemical Process Calculations
- CH3352 – Fluid Mechanics for Chemical Engineers
- CH3303 – Chemical Process Industries