This series is the sum of an infinite geometrical progression with the common ratio of 3/p. It is well known that such a series converges if and only if its common ratio is less than 1 by the absolute value.
In this problem we have the condition |3/p| lt 1, or |p| gt 3. Because we are asked about positive p's, we have p gt 3.
The answer: for positive p this series converges if and only if p gt 3.
http://tutorial.math.lamar.edu/Classes/CalcII/Series_Special.aspx
Sunday, December 23, 2012
sum_(n=1)^oo (3/p)^n Find the positive values of p for which the series converges.
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