Solution: Writing In Exercises 41 44, explain how to use the geometric series to find
Chapter 9, Problem 44(choose chapter or problem)
Writing In Exercises 41 - 44, explain how to use the geometric series
\(g(x)=\frac{1}{1-x}=\sum_{n=0}^{\infty} x^{n}, \quad|x|<1\)
to find the series for the function. Do not find the series.
\(f(x)=\ln (1-x)\)
Text Transcription:
g(x) = 1 / 1 - x = sum_{n = 0}^{infty} x^{n}, |x| < 1
f(x) = ln (1 - x)
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