#1
7th May 2015, 09:38 AM
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Shivaji University Chemical Engineering Syllabus
I have completed 12th in PCM and now want to take admission in B.E. (Chemical Engineering) at Shivaji University so please give me details about course including required eligibility criteria? Is Shivaji University conducts any entrance exam for admission in B.Tech?
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#2
12th July 2018, 09:02 PM
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Re: Shivaji University Chemical Engineering Syllabus
Can you provide me the syllabus of S.E. Chemical Engineering Sem III & IV of Shivaji University, Kolhapur as I need it for preparation of the Examination?
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#3
12th July 2018, 09:03 PM
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Re: Shivaji University Chemical Engineering Syllabus
The syllabus of S.E. Chemical Engineering Sem III & IV of Shivaji University, Kolhapur is as follows: SECOND YEAR CHEMCIAL ENGINEERING SEMESTER III 1. ENGINEERING MATHEMATICS III Teaching Scheme Examination Scheme Lectures: 3 hours/week Theory: 100 marks Tutorial: 1 hour/week Term work: 25 marks Objective 1) To reach mathematical methodologies and models. 2) To develop mathematical skills and enhance logical thinking power of students. 3) To provide students with skills in integral calculus, differtial equation and numericaltechniques which would enable them to devise engineering solution for given situation may encounter in their profession 4) To produce graduates with mathematical knowledge, computational skills and the ability to deploy these skills effectively in the solution of problems, principally in the area of engineering. SECTION -1 Unit 1 Linear Differential Equations: (6L) 1.1 Linear Differential Equations with constant coefficients Defination, Complementary function and Particular integral (without method of Parameters). 1.2 Homogenous linear differential equations. Unit 2 Application to Linear differential equations (7L) 2.1 System of simultaneous Linear differential with constant coefficients. 2.2 Chemical reactions and solutions (mixture problems). 2.3 Conduction of heat. Unit 3 Numerical Analysis (7L) 3.1 Approximation and round of errors, significant digits 3.2 Truncation errors and Taylors series 3.3 Determination of roots of polynomials and transcendental equations by 3.3.1 Bisection method 3.3.2 Newton Raphson method 3.3.3 Secant method SECTION-II Unit 4 Laplace Transform: (6L) 4.1 Defination, Transforms of elementary functions 4.2 Properties of Laplace transform 4.3 Transform of derivatives and integral Unit 5 Inverse Laplace Transform: (7L) 5.1 Inverse Laplace Transforms formulae. 5.2 Inverse Laplace Transforms. 5.3 Solution of Linear differential equation with constants coefficients by Laplace Transforms method. Unit 6 Curve fitting: (7L) 6.1 Lines of regression of bivariate data 6.2 Fitting of curves by method of least-squares 6.2.1 Fitting of the straight line 6.2.2 Fitting of parabola 6.2.3 Fitting of exponential curve General Instructions: 1. For the term work of 25 marks, batch wise tutorials are to be conducted. The number of Students per batch should be as per university pattern for practical batches. 2. Minimum number of assignments should be 8 covering all topics. Nature of Question paper: 1. There will be two sections carrying 50 marks each. 2. There will be four questions in each section and three questions should be attempted from each section. Reference Books: 1. A text book of Applied Mathematics: Vol. I, II and III by J. N. Wartikar & P. N. Wartikar, Vidyarthi Griha Prakashan, Pune. 2. Higher Engineering Mathematics by Dr. B. S. Grewal. 3. Advanced Engineering Mathematics by Erwin Kreyszig. 4. Advanced Engineering Mathematics by H.K.Das(S.Chand Publication) 5. Advanced Engineering Mathematics by Merle C.Potter (OXFORD University Press) 6. Numerical Methods by Saumyn Gupa, Rajesh Srivastava(OXFORD University Press) 7. Higher Engineering Mathematics by B.V.Ramana (Tata McGraw Hill Education) |
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