Complex Analysis/Sample Midterm Exam 2

1. Restrict ${\displaystyle -\pi <\arg (z)\le \pi }$, and take the corresponding branch of the logarithm:

a.${\displaystyle \log -1-i\sqrt{3}}$

b.${\displaystyle 1^{7+i}}$

c. Find all 4 roots of ${\displaystyle \sqrt{2}+i\sqrt{2}}$

d ${\displaystyle \left|e^{\log (2)+i\log (\sqrt{2})}\right|}$

2. State the Cauchy-Riemann equations for a complex valued function ${\displaystyle f(z)}$. If you use symbols other then ${\displaystyle f}$ and ${\displaystyle z}$ indicate how they relate to these quantities.

3. State whether the give function is holomorphic on the set where it is defined.

a. ${\displaystyle {\displaystyle 2z+2z^2-\frac{1}{z}}}$

b. Let ${\displaystyle z=x+iy}$ and let ${\displaystyle f(z)=e^{ix}}$.

c. ${\displaystyle zg(z)}$ where ${\displaystyle g(z)}$ satisfies ${\displaystyle {\displaystyle \frac{\partial }{\partial \overline{z}}g(z)=0}}$

d. ${\displaystyle |z|}$

4. Let ${\displaystyle \gamma :[a,b]\to ℂ}$ be a simple closed curve so that ${\displaystyle z=0}$ lies in the interior of the region bounded by ${\displaystyle \gamma }$.

a. Suppose ${\displaystyle n\ge 0}$ and compute

${\displaystyle {{\displaystyle \oint }}_{\gamma }{z}^{n}dz,}$

simply writing the correct value without any explanation will not receive credit.

b. We now consider the case corresponding to ${\displaystyle n=-1}$. Please compute

${\displaystyle {{\displaystyle \oint }}_{\gamma }{z}^{-1}dz,}$

and explain your steps.

c: Now suppose ${\displaystyle n\le -2}$ and compute

${\displaystyle {{\displaystyle \oint }}_{\gamma }{z}^{n}dz.}$

5. Let ${\displaystyle \gamma :[0,2\pi ]\to ℂ}$ be given by ${\displaystyle \gamma (t)=6e^{it}}$. Calculate ${\displaystyle {\displaystyle {{\displaystyle \oint }}_{\gamma }\frac{\cos \zeta }{\zeta +\pi }d\zeta }}$

6. Let ${\displaystyle u(x,y)=x^2-y^2}$ find a function ${\displaystyle v(x,y)}$ so that ${\displaystyle f=u+iv}$ is holomorphic in the complex plane and ${\displaystyle v(0,0)=1}$.

7.

a. Using the limit characterization of the complex derivative show that ${\displaystyle \overline{z}}$ is not holomorphic.

b. On the other hand show that if ${\displaystyle \frac{\partial }{\partial z}\overline{z}=0}$.

c. Do parts (a) and (b) contradict each other, explain why or why not.

8. State Cauchy's integral theorem, and intuitively what you need to know about the function, domain and contour.