Jan 17, 2020  
Graduate Record 2007-2008 
Graduate Record 2007-2008 [ARCHIVED RECORD]

APMA 642 - Engineering Mathematics II

Further and deeper understanding of partial differential equations that govern physical phenomena in science and engineering. Solution of linear partial differential equations by eigenfunction expansion techniques. Green’s functions for time-independent and time-dependent boundary value problems. Fourier transform methods, and Laplace transform methods. Solution of a variety of initial-value, boundary-value problems. Various physical applications. Study of complex variable theory. Functions of a complex variable, and complex integral calculus, Taylor series, Laurent series, and the residue theorem, and various applications. Serious work and efforts in the further development of analytical skills and expertise. Cross-listed as MAE 642. (O)

Prerequisites & Notes
Prerequisite: Graduate standing and APMA 641 or equivalent.

Credits: 3