3rd Sem, Petro

Engineering Mathematics-III Petro 3rd Sem Syllabus for VTU BE 2017 Scheme

Engineering Mathematics-III detail syllabus for Petroleum Engineering (Petro), 2017 scheme is taken from VTU official website and presented for VTU students. The course code (17MAT311), and for exam duration, Teaching Hr/week, Practical Hr/week, Total Marks, internal marks, theory marks, duration and credits do visit complete sem subjects post given below.

For all other petro 3rd sem syllabus for be 2017 scheme vtu you can visit Petro 3rd Sem syllabus for BE 2017 Scheme VTU Subjects. The detail syllabus for engineering mathematics-iii is as follows.

Course Objectives:

This course will enable students to The objectives of this course is to introduce students to the mostly used analytical and numerical methods in the different engineering fields by making them to learn Fourier series, Fourier transforms and Z-transforms, statistical methods, numerical methods to solve algebraic and transcendental equations, vector integration and calculus of variations.

Module 1
For complete syllabus and results, class timetable and more pls download iStudy. Its a light weight, easy to use, no images, no pdfs platform to make students life easier.

Module 2

Fourier Transforms: Infinite Fourier transforms, Fourier sine and cosine transforms. Inverse Fourier transform. Z-transform: Difference equations, basic definition, z-transform -definition, Standard z-transforms, Damping rule, Shifting rule, Initial value and final value theorems (without proof) and problems, Inverse z-transform. Applications of z-transforms to solve difference equations.

Module 3

Statistical Methods: Review of measures of central tendency and dispersion. Correlation-Karl Pearson’s coefficient of correlation-problems. Regression analysislines of regression (without proof) -problems Curve Fitting: Curve fitting by the method of least squares- fitting of the curves of the form, y= ax + b, y = ax2+ bx + c and y = aebx. Numerical Methods: Numerical solution of algebraic and transcendental equations by Regula- Falsi Method and Newton-Raphson method.

Module 4
For complete syllabus and results, class timetable and more pls download iStudy. Its a light weight, easy to use, no images, no pdfs platform to make students life easier.

Module 5

Vector integration: Line integrals-definition and problems, surface and volume integrals-definition, Green’s theorem in a plane, Stoke s and Gauss-divergence theorem (without proof) and problems. Calculus of Variations: Variation of function and Functional, variational problems. Euler’s equation, Geodesics, hanging chain, problems.

Course Outcomes:

After studying this course, students will be able to:

  1. Know the use of periodic signals and Fourier series to analyze circuits and system communications.
  2. Explain the general linear system theory for continuous-time signals and digital signal processing using the Fourier Transform and z-transform.
  3. Employ appropriate numerical methods to solve algebraic and transcendental equations.
  4. Apply Green’s Theorem, Divergence Theorem and Stokes’ theorem in various applications in the field of electro-magnetic and gravitational fields and fluid flow problems.
  5. Determine the extremals of functionals and solve the simple problems of the calculus of variations

Graduate Attributes (as per NBA):

  • Engineering Knowledge.
  • Problem Analysis.
  • Life-Long Learning.
  • Accomplishment of Complex Problems.

Question paper pattern:

  • The question paper will have ten questions.
  • Each full question consists of 16 marks.
  • There will be 2 full questions (with a maximum of four sub questions) from each module.
  • Each full question will have sub questions covering all the topics under a module.
  • The students will have to answer 5 full questions, selecting one full question from each module.

Text Books:

  1. B.S. Grewal: Higher Engineering Mathematics, Khanna Publishers, 43rd Ed., 2015.
  2. E. Kreyszig: Advanced Engineering Mathematics, John Wiley & Sons, 10th Ed., 2015.

Reference Books:

  1. N.P. Bali and Manish Goyal: A Text Book of Engineering Mathematics, Laxmi Publishers, 7th Ed., 2010.
  2. B.V. Ramana: “Higher Engineering Mathematics” Tata McGraw-Hill, 2006.
  3. H. K. Dass and Er. RajnishVerma: “Higher Engineering Mathematics”, S. Chand publishing, 1st edition, 2011.

For detail syllabus of all other subjects of BE Petro, 2017 scheme do visit Petro 3rd Sem syllabus for 2017 scheme.

Dont forget to download iStudy for latest syllabus and results, class timetable and more.

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