Trending: Anna University 8th Sem Results April 2014 May/June 2014 Time Table/ Internal Marks Calculate CGPA Online SSLC Results 2014 12th Result 2014

Test Footer 1

Sunday, October 21, 2012

MA 9322 APPLIED MATHEMATICS FOR AERONAUTICAL SYLLABUS | ANNA UNIVERSITY ME AERONAUTICAL ENGINEERING 1ST SEM SYLLABUS REGULATION 2009 2011 2012-2013

Latest: TNEA 2014 Engineering Application Status, Counselling Date, Rank List
MA 9322 APPLIED MATHEMATICS FOR AERONAUTICAL SYLLABUS | ANNA UNIVERSITY ME AERONAUTICAL ENGINEERING 1ST SEM SYLLABUS REGULATION 2009 2011 2012-2013 BELOW IS THE ANNA UNIVERSITY FIRST SEMESTER ME AERONAUTICAL ENGINEERING 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

MA 9322 APPLIED MATHEMATICS FOR AERONAUTICAL L T P C
ENGINEERING 3 1 0 4
AIM:
To make available the advanced concepts of Engineering Mathematics to the engineers
and to provide the necessary mathematical skills that are needed in modeling physical
processes.
OBJECTIVE:
The engineers will have an exposure on various topics such as Matrix Theory, Calculus
of Variations, Differential equations, Interpolation and Integration and Linear
Programming problems to understand their applications in engineering problems.
UNIT I MATRIX THEORY 12
Eigen values using QR transformations – generalized eigenvectors – canonical forms –
singular value decomposition and applications – pseudo inverse – least square
approximations
UNIT II DIFFERENTIAL EQUATIONS – NONLINEAR ORDINARY
DIFFERENTIAL & PARTIAL DIFFERENTIAL EQUATIONS 12
Introduction – Equations, with separable variables – Equations reducible to linear form –
Bernoulli’s equation – Riccati’s equation – Special forms of Riccati’s equation – Laplace
transform methods for one dimensional wave equation – Displacement in a long string –
Longitudinal vibration of an elastic bar.
UNIT III CALCULUS OF VARIATION 12
Introduction – Euler’s equation – several dependent variables Lagrange’s equations of
Dynamics – Integrals involving derivatives higher than the first – Problems with
constraints – Direct methods and eigen value problems.
UNIT IV INTERPOLATION AND INTEGRATION 12
Hermite’s Interpolation – Cubic Spline Interpolation – Gaussian Qundraline – Cubature.
UNIT V LINEAR PROGRAMMING PROBLEM 12
Simplex algorithm – Two phase and Big M Techniques – Duality theory – Dual simplex
method – Integer programming
L : 45 T:15 TOTAL NUMBER OF PERIODS: 60
TEXT BOOKS
1. Stephenson, G, Radmore, P.M., Advanced Mathematical Methods for Engineering
and Science students, Cambridge University Press 1999.
2. Bronson, R., Matrix Operations, Schaum’s outline series, McGraw Hill, New York,
1989.
3. Kreyszig,E., Advanced Engineering Mathematics, John Wiley, 8th Edition, 2004.
3
REFERENCES
1. Froberg, C.E. Numerical Mathematics, The Benjaminn/Cummings Pulblishing Co.,
Inc., 1985.
2. Jain, M.K., Iyengar, S.R.K., and Jain, R.K., Numerical Methods for Scientific &
Engineering computation, Wiley Eastern Ltd., 1987.
3. Gupta, A.S. Calculus of Variations with Applications, Prentice Hall of India Pvt. Ltd.,
New Delhi, 1997.
4. Sankara Rao, K., Introduction to Partial Differential Equations, Prentice Hall of India
Pvt Ltd., New Delhi 1997.
5. Boyce & DiPrima, Elementary Differential Equations and Boundary value problems,
with ODE Architect CD, 8th Edition, 2005.

No comments:

Post a Comment

Any doubt ??? Just throw it Here...