Complex numbers, Argand diagrams, modulus and argument, De Moivre's theorem. Functions of a complex variable, elementary examples, Cauchy-Riemann equations. Contour integrals, Cauchy's theorem and Cauchy's integral formula. Taylor series, Laurent series, zeros, poles and essential singularities, residues. Fourier transform, inversion, convolution, Parseval's theorem, delta function, applications. Elementary partial differential equations, methods of separation. Brief introduction to special functions, e.g., gamma function, beta function, Bessel's function, Legendre's function.
| AUs | 3.0 AUs |
| Grade Type | |
| Prerequisite | MH1801, MH2800, MH1101, MH1200, MH1802, MH1803, MH2802, CY1601, CY1602 |
| Not Available To Programme | EEE, EEEC, IEEC, IEM |
| Not Available To All Programme With | , |
| Not Available As BDE/UE To Programme | |
| Not Available As Core To Programme | |
| Not Available As PE To Programme | |
| Mutually Exclusive With | MH3101 |
| Not Offered As BDE | |
| Not Offered As Unrestricted Elective | |
| Exam |
Available Indexes
| Mon | Tue | Wed | Thu | Fri | |
|---|---|---|---|---|---|
| 930 | COMMON LEC (LE) 0930-1120 Tue SPMS-LT2 | 70756 TUT (T1) 0930-1020 Fri SPMS-TR+14 Wk2-13 | |||
| 1000 | |||||
| 1030 | 70757 TUT (T2) 1030-1120 Fri SPMS-TR+14 Wk2-13 | ||||
| 1100 | |||||
| 1130 | |||||
| 1200 | |||||
| 1230 | |||||
| 1300 | |||||
| 1330 | |||||
| 1400 | |||||
| 1430 | 70758 TUT (T3) 1430-1520 Fri SPMS-TR+14 Wk2-13 | ||||
| 1500 |