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31 votes
31 votes
Consider the series 1/4+1/6+1/9+2/27+4/81+....

Does the series converge or diverge?


Select answers from the drop-down menus to correctly complete the statements.

User Hasseg
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1 Answer

29 votes
29 votes

Answer:

The series converges as any two consecutive elements of the sum are monotonically decreasing.

Explanation:

The series converges since the consecutive element is monotonically decreasing. That is:


\forall\,i\in \mathbb{N}\,a_(i) > a_(i+1) (1)

Where:


a_(i) - The i-th component of the sum.


a_(i+1) - The (i+1)-th component of the sum.

User Validname
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