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Suppose that o is an odd positive integer greater than 1, and consider the following series. DO (z - 1) 3n n= Note: on is

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Suppose that o is an odd positive integer greater than 1, and consider the following series. DO (z - 1) 3n n= Note: on is the power of x - 1. a) For which value(s) of c does the above series converge? b) Given that the series converges, find the sum of this series as a function of a (and o). Simplify your answer as much as possible

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