Complex Analysis/Quiz

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<quiz> { Calculate the integral ${\displaystyle \underset{\gamma }{\int }\frac{1}{z}v,dz={\displaystyle \underset{0}{\overset{2\pi }{\int }}}\frac{1}{\gamma (t)}\cdot \gamma {}^{\prime }(t)dt}$ with ${\displaystyle \gamma (t):=e^{i\cdot t}}$ as the integration path?Enter the real part and imaginary part up to two decimal places (also e.g. 4.21 for the real and imaginary parts separately). | type="{}" } Answer: { 0.0-0.01 _6}${\displaystyle +}${ 6.27-6.29 _6}${\displaystyle i}$ || Enter the decimal number with a dot

{ Enter you the Residue ${\displaystyle re{s}_{z_0}(f)}$ the Function ${\displaystyle f(z)=\frac{3x+6+i\cdot 5x}{x^2+2x}}$ in the Poitt ${\displaystyle z_0=0}$ an. (Error tolerance 5% for the Real- and Imaginary) | type="{}" } Answer: { 3.0 %5 _6}${\displaystyle +}${ 0.0 %5 _6}${\displaystyle i}$

{ Enter the Residue ${\displaystyle re{s}_{z_0}(f)}$ of the function ${\displaystyle f(z)=\frac{3x+6+i\cdot 5x}{x^2+2x}}$ at the point ${\displaystyle z_0=i}$. Enter the values with a decimal point (e.g., 4.21) for the real and imaginary parts separately (error tolerance 5% for real and imaginary parts). | type="{}" } Answer: { 0.0 %5 _6}${\displaystyle +}${ 0.0 %5 _6}${\displaystyle i}$

{ Enter the Residue ${\displaystyle re{s}_{z_0}(f)}$ of the function ${\displaystyle f(z)=\frac{3x+6+i\cdot 5x}{x^2+2x}}$ at the point ${\displaystyle z_0=3+5i}$. Enter the values with a decimal point (e.g., 4.21) for the real and imaginary parts separately (error tolerance 5% for real and imaginary parts). | type="{}" } Answer: { 0.0 %5 _6}${\displaystyle +}${ 0.0 %5 _6}${\displaystyle i}$

{ Enter the residue ${\displaystyle re{s}_{z_0}(f)}$ of the function ${\displaystyle f(z)=\frac{3x+6+i\cdot 5x}{x^2+2x}}$ at the point ${\displaystyle z_0=-2}$. Enter the values with a decimal point (e.g., 4.21) for the real and imaginary parts separately (error tolerance 5% for real and imaginary parts). | type="{}" } Answer: { 0.0 %5 _6}${\displaystyle +}${ 5.0 %5 _6}${\displaystyle i}$

{ Which of the following properties are holomorphic criteria for a function ${\displaystyle f:G\to ℂ}$? }

+${\displaystyle f}$ can be locally developed into a power series for each ${\displaystyle z_o\in G}$. -The partial derivatives for the real part and imaginary part of ${\displaystyle f}$ exist. -The function is complex differentiable at a single point ${\displaystyle z_o}$. +The function is complex differentiable at every point ${\displaystyle z\in G}$. +The function is infinitely complex differentiable at every point ${\displaystyle z\in G}$. +The real and imaginary parts satisfy the Cauchy-Riemann equations and are at least once continuously real-differentiable. +The function can be developed into a complex power series. +The function is continuous, and the line integral of the function over any closed contractible path is zero. +The function values inside a disk can be determined from the function values on the boundary using the Cauchy integral formula. +${\displaystyle f}$ is real differentiable, and it holds that
${\displaystyle \frac{\partial f}{\partial \overline{z}}=0,}$
where ${\displaystyle \frac{\partial }{\partial \overline{z}}}$ is the Cauchy-Riemann operator defined by ${\displaystyle \frac{\partial }{\partial \overline{z}}:=\frac{1}{2}(\frac{\partial }{\partial x}+i\frac{\partial }{\partial y})}$. +The real part function ${\displaystyle f_1}$ and the imaginary part function ${\displaystyle f_2}$ with ${\displaystyle f=f_1+f_2}$ are real integrable. </quiz>

• Partial fraction decomposition
• Complex Analysis
• Holomorphy Criteria
• Wikiversity help page "Quiz"

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• Source: Kurs:Funktionentheorie/Quiz - URL:

https://de.wikiversity.org/wiki/Kurs:Funktionentheorie/Quiz

• Date: 01/14/2024

de:Kurs:Funktionentheorie/Quiz