Announcement (Semester 1, 2016)

  • First class on Monday Aug 8, 8:00 AM
  • Please read the course syllabus
  • Please register to this course in Courseville applicattion and join the FB group.



Read the homework instruction here.

MATLAB files

Video lectures

All the following lectures are available at my YouTube channel. More lectures are soon to be uploaded.

  • Determinants
  • Proofs of determinant properties under row operations
  • Linear transformation
  • Complex number
  • Analytic functions
  • Integrals
  • Proof of Taylor’s theorem

Lecture notes

All the following slides are combined in EE202_JSS_handouts.pdf (185 pages and ready to print in A4 paper).

Linear algebra

(revised on Jan 27, 2016)

  1. Introduction to mathematical proofs
  2. Systems of linear equations
  3. Vectors and Matrices
  4. Eigenvalues and eigenvectors
  5. Function of square matrices
  6. Vector spaces
  7. Linear transformation

Complex Analysis (revised on Mar, 2017)

  1. Complex numbers
  2. Analytic functions
  3. Elementary functions
  4. Integrals
  5. Series
  6. Residue theorem and its application (revised on Mar 30, 2017)

Course Information

Please read the course syllabus


Mon/Wed 8-9:30 AM, EE404

  • Section 1: Assist. Prof. Suchin Arunsawatwong (SAR), ENG 3 204
  • Section 2: Assoc. Prof. Nisachon Tangsangiumvisai (NTS), ENG 3 205
  • Section 3: Jitkomut Songsiri (JSS), ENG 3 206

to be announced


The first two books are main reference books for this course.

  • J.W. Brown and R.V. Churchill, Complex Variables and Applications, 8th edition, McGraw-Hill, 2008.
  • W.K. Nicholson, Linear Algebra with Applications, 5th edition, McGraw-Hill, 2006.
  • H.Anton and C. Rorres, Elementary Linear Algebra, 10th edition, John Wiley, 2011.
  • M.Dejnakarin, Mathematics for Electrical Engineers, 3rd edition, Chulalongkorn University Press, 2006.
  • P.V. O’Neil, Advanced Engineering Mathematics, 4th edition, WPS Publishing, Boston, 1995.
  • D.C. Lay, Linear Algebra and its applications, 3rd edition, Addison-Wesley, 2003.

The total score consists of

  • Homework (10 pts)
  • Quizzes (30 pts)
  • Midterm (30 pts)
  • Final (30 pts)
Class policies:
  • Students are allowed to take quiz in the registered section only.
  • Copying homework is prohibited. Students must withdrawn from this course if caught.
  • Submit the homework at the beginning of the class ONLY (first 15 mins of the lecture). Late homework is NOT accepted in any case.
  • Cheating (or showing any intention) in quizz, midterm or final exams is highly unacceptable. Students will be penalized according to univ’s rule.
  • Students obtain an F if the total score is less than 40%.

MATLAB Tutorial