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Exercise 8.5.8

Prove that if a sequence of real numbers $(x_{n})$ converges, then the arithmetic means

y_{n} = \frac{x_{1} + x_{2} + x_{3} + \dots + x_{n}}{n}

also converges to the same limit. Give an example to show that it is possible for the sequence of means $(y_{n})$ to converge even if the original sequence $(x_{n})$ does not.

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See Exercise 2.3.11.

ulissemini

2022-01-27 00:00

Exercise 8.5.8

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