PT9216 MATHEMATICS FOR PLASTIC TECHNOLOGY SYLLABUS | ANNA UNIVERSITY MTECH PLASTIC TECHNOLOGY 1ST SEM SYLLABUS REGULATION 2009 2011 2012-2013 BELOW IS THE ANNA UNIVERSITY FIRST SEMESTER M.TECH PLASTIC TECHNOLOGY DEPARTMENT SYLLABUS, TEXTBOOKS, REFERENCE BOOKS,EXAM PORTIONS,QUESTION BANK,PREVIOUS YEAR QUESTION PAPERS,MODEL QUESTION PAPERS, CLASS NOTES, IMPORTANT 2 MARKS, 8 MARKS, 16 MARKS TOPICS. IT IS APPLICABLE FOR ALL STUDENTS ADMITTED IN THE YEAR 2011 2012-2013 (ANNA UNIVERSITY CHENNAI,TRICHY,MADURAI, TIRUNELVELI,COIMBATORE), 2009 REGULATION OF ANNA UNIVERSITY CHENNAI AND STUDENTS ADMITTED IN ANNA UNIVERSITY CHENNAI DURING 2009
PT9216 MATHEMATICS FOR PLASTIC TECHNOLOGY L T P C
3 0 0 3
UNIT I 9
Numerical Solutions of Ordinary Differential Equations: Engineering application: motion
in a viscous fluid, Numerical solution of first –order ordinary differential equations
UNIT II 9
Partial Differential Equations : Linear and quasilinear first order partial differential
equations, second order linear equations in two variables and their classifications,
Cauchy, Dirichlet and Newman problems, Green functions, Solutions of Laplace, wave.
UNIT III 9
Vector and tensor analysis, Matrices and Determinants, Laplace and Fourier
transforms. Introduction to numeric use of the above techniques in plastics engineering
and calculations.
UNIT IV 9
Probability: Random experiment, classical and statistical definition of probability,.
Distribution Functions:- Binomial, Normal, Poisson, Uniform, Mean, Variance, Moment
dispersion, Kertosis, Median, Mode, Least square method of curve fitting, Regression
Analysis, correlation co-efficient.
UNIT V 9
Statistics: Sampling theory, populations, Sampling errors and bias, Sampling methods:
random, multistage, sampling distribution. Estimation and testing of hypothesis –
theory of estimation, point estimates, consistent and uniased estimates. Methods of
point estimation – method of maximum likelihood, interval estimation, Null hypothesis
TOTAL : 45 PERIODS
REFERENCES
1. Krayszig, “Advanced Engineering Mathematics”
2. Bali.N.P- A Texk book of Engg. Mathematics – Laxmi Publication 2008
3. Glyn James. Advanced Modern Engineering Mathematics – Pearson Edn - 2008
4. Raman “Higher Engg. Mathematics –Tata Mcgrawhill -2008
5. Kandasamy & Others – Engg. Mathematics – S. Chand 2008
6. Jain & Iyengar – Advanced Engg. Mathematics- Dorling Kindersley 2007.
PT9216 MATHEMATICS FOR PLASTIC TECHNOLOGY L T P C
3 0 0 3
UNIT I 9
Numerical Solutions of Ordinary Differential Equations: Engineering application: motion
in a viscous fluid, Numerical solution of first –order ordinary differential equations
UNIT II 9
Partial Differential Equations : Linear and quasilinear first order partial differential
equations, second order linear equations in two variables and their classifications,
Cauchy, Dirichlet and Newman problems, Green functions, Solutions of Laplace, wave.
UNIT III 9
Vector and tensor analysis, Matrices and Determinants, Laplace and Fourier
transforms. Introduction to numeric use of the above techniques in plastics engineering
and calculations.
UNIT IV 9
Probability: Random experiment, classical and statistical definition of probability,.
Distribution Functions:- Binomial, Normal, Poisson, Uniform, Mean, Variance, Moment
dispersion, Kertosis, Median, Mode, Least square method of curve fitting, Regression
Analysis, correlation co-efficient.
UNIT V 9
Statistics: Sampling theory, populations, Sampling errors and bias, Sampling methods:
random, multistage, sampling distribution. Estimation and testing of hypothesis –
theory of estimation, point estimates, consistent and uniased estimates. Methods of
point estimation – method of maximum likelihood, interval estimation, Null hypothesis
TOTAL : 45 PERIODS
REFERENCES
1. Krayszig, “Advanced Engineering Mathematics”
2. Bali.N.P- A Texk book of Engg. Mathematics – Laxmi Publication 2008
3. Glyn James. Advanced Modern Engineering Mathematics – Pearson Edn - 2008
4. Raman “Higher Engg. Mathematics –Tata Mcgrawhill -2008
5. Kandasamy & Others – Engg. Mathematics – S. Chand 2008
6. Jain & Iyengar – Advanced Engg. Mathematics- Dorling Kindersley 2007.
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