$\"\"$

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The series is $\"\"$ .

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Limit comparison Test:

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Suppose that $\"\"$ and $\"\"$ are series with positive terms.

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If $\"\"$ , where $\"\"$ is a finite number and $\"\"$ , then either both series converges or both series diverges.

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The dominant part of the numerator is $\"\"$ and the dominant part of the denominator is $\"\"$ .

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Compare the given series with the series $\"\"$ .

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Consider $\"\"$ .

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Find $\"\"$ .

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$ .

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Therefore, $\"\"$ and $\"\"$ either both converges or diverges.

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$\"\"$

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The obtained series is $\"\"$ .

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The series is in the form of $\"\"$ -series.

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The $\"\"$ -series is $\"\"$ , if $\"\"$ , then the series is converges.

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Here $\"\"$ .

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Therefore, the series $\"\"$ is converges.

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Hence the series $\"\"$ is converges.

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$\"\"$

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$\"\"$ is convergent.