Consider the complex function w = 3.2.1 Determine the singularity points of this function. (2) 3.2.2 Identify the singularity point(s) that lie outside the circle C : |z| = 1/2, using a sketch. (3) 5.2.3 Construct a Laurent series that converges for the singularity point lying within the circle C:|2|= 1/2. (1) 5.2.4 Calculate the residue for the point. 5.2.5 Evaluate the integral dz. (2) (5) [13] [25]
