MAT334--2020S > Quiz 3

Quiz 3 TUT 0401

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**Jiayue Wu**:

Question: Evaluate the given integral using Cauchy's Formula or Theorem.

$$\int_{|z| = 2} \frac{e^z}{z(z-3)}dz$$

Answer:

We can find that on the region $|z| = 2$, $F(z) = \frac{e^z}{z(z-3)}$ not continuous at z = 0. Therefore I'll apply Cauchy's Formula.

$$\int_{|z| = 2} \frac{e^z}{z(z-3)}dz = \int_{|z| = 2} \frac{e^z /(z-3)}{z}dz$$

$$\implies f(z) = \frac{e^z}{z-3}, f(0) = -\frac{1}{3}$$

$$\int_{|z| = 2} \frac{e^z}{z(z-3)}dz = 2\pi i f(0) = -\frac{2\pi i}{3}$$

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