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13 Nov 2019
Does the series below converge absolutely, converge conditionally, or diverge? Give a reason for your answer. 1(n+1 (5n)n n=1 Choose the correct answer below. 0 A. B. C. 0 D. 0 E. OF. The series diverges per the nth-Term Test for Divergence The series converges absolutely per the Root Test. The series converges conditionally per the Root Test and the Alternating Series Test. The series converges absolutely per the nth-Term Test for Divergence. The series diverges per the nth-Term Test for Divergence and the Ratio Test. The series converges conditionally per the Comparison Test and the Alternating Series Test.
Does the series below converge absolutely, converge conditionally, or diverge? Give a reason for your answer. 1(n+1 (5n)n n=1 Choose the correct answer below. 0 A. B. C. 0 D. 0 E. OF. The series diverges per the nth-Term Test for Divergence The series converges absolutely per the Root Test. The series converges conditionally per the Root Test and the Alternating Series Test. The series converges absolutely per the nth-Term Test for Divergence. The series diverges per the nth-Term Test for Divergence and the Ratio Test. The series converges conditionally per the Comparison Test and the Alternating Series Test.
Patrina SchowalterLv2
5 Jan 2019