HW 38. Let $f: D_1(0) \to \mathbb{C}$ be an analytic function. Suppose that $f$ is analytic on $D_1(0)$. Let $F(w) := \int_{[0, w]} f(z)dz$ for every $w \in D_1(0)$. Find $F$.
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We are given that f is an analytic function on the open disk D(0) centered at 0 in the complex plane. This means that f is differentiable at every point within this disk. Show more…
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