(a) Prove that the sequence defined by x1 = 3 and xn+1 = 1 4 − xn converges. 60 Chapter 2. Sequences and Series (b) Now that we know lim xn exists, explain why lim xn+1 must also exist and equal the same value. (c) Take the limit of each side of the recursive equation in part (a) to explicitly compute lim xn.

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the terms of a geometric sequence can be found by beginning with the first term and multiplying by the common ratio repeatedly. a recursive formula for a geometric sequence with common ratio r is given by an=ran−1 a n = r a n − 1 for n≥2 n ≥ 2 .

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