logistic_guy
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Solve \(\displaystyle \int_{C}\frac{e^z - 1}{z^4} \ dz\), where \(\displaystyle C\) is the positively oriented unit circle \(\displaystyle |z| = 1\) as shown in the figure.
complex integral
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logistic_guy
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\(\displaystyle \int_{C}\frac{e^z - 1}{z^4} \ dz = 2\pi i \ \underset{z = 0}{\text{Res}}\left(\frac{e^z - 1}{z^4}\right)\)
If we can just find the residue at \(\displaystyle z = 0\) for the integrand, we are done!
In the next post, we will try to figure out a way to find the residue with the help of the Maclaurin series.
If we can just find the residue at \(\displaystyle z = 0\) for the integrand, we are done!
In the next post, we will try to figure out a way to find the residue with the help of the Maclaurin series.
logistic_guy
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The Maclaurin expansion for \(\displaystyle e^z\) is:
\(\displaystyle e^z = 1 + z + \frac{z^2}{2} + \frac{z^3}{6} + \frac{z^4}{24} + \frac{z^5}{120} + \cdots\)
\(\displaystyle e^z = 1 + z + \frac{z^2}{2} + \frac{z^3}{6} + \frac{z^4}{24} + \frac{z^5}{120} + \cdots\)
logistic_guy
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The Maclaurin expansion for \(\displaystyle e^z - 1\) is:
\(\displaystyle e^z - 1 = z + \frac{z^2}{2} + \frac{z^3}{6} + \frac{z^4}{24} + \frac{z^5}{120} + \cdots\)
\(\displaystyle e^z - 1 = z + \frac{z^2}{2} + \frac{z^3}{6} + \frac{z^4}{24} + \frac{z^5}{120} + \cdots\)