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13 Nov 2019
Does the series below converge absolutely, converge conditionally, or diverge? Give a reason for your answer. 1n+1) (2n)n n=1 Choose the correct answer below. 0 A. The series converges absolutely per the nth-Term Test for Divergence. OB. The series diverges per the nth-Term Test for Divergence and the Ratio Test. ° C. The series converges conditionally per the Comparison Test and the Alternating Series Test. 0 D. The series converges conditionally per the Root Test and the Alternating Series Test. The series diverges per the nth-Term Test for Divergence. The series converges absolutely per the Root Test. E. F.
Does the series below converge absolutely, converge conditionally, or diverge? Give a reason for your answer. 1n+1) (2n)n n=1 Choose the correct answer below. 0 A. The series converges absolutely per the nth-Term Test for Divergence. OB. The series diverges per the nth-Term Test for Divergence and the Ratio Test. ° C. The series converges conditionally per the Comparison Test and the Alternating Series Test. 0 D. The series converges conditionally per the Root Test and the Alternating Series Test. The series diverges per the nth-Term Test for Divergence. The series converges absolutely per the Root Test. E. F.
Trinidad TremblayLv2
13 Nov 2019