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Does the series below converge or diverge? Give a reason for your answer. (When checking your answer, remember there may be more than one way to determine the series' convergence or divergence.) (ln n)8/n Does the series converge or diverge? The series diverges because the limit found using the ratio test is less than 1. The ratio test is inconclusive, but the series diverges by the integral test. The ratio test is inconclusive, but the series converges by the integral test. The series converges because the limit found using the ratio test is greater than 1. The series diverges because the limit found using the ratio test is greater than 1. The series converges because the limit found using the ratio test is less than 1.
Show transcribed image text Does the series below converge or diverge? Give a reason for your answer. (When checking your answer, remember there may be more than one way to determine the series' convergence or divergence.) (ln n)8/n Does the series converge or diverge? The series diverges because the limit found using the ratio test is less than 1. The ratio test is inconclusive, but the series diverges by the integral test. The ratio test is inconclusive, but the series converges by the integral test. The series converges because the limit found using the ratio test is greater than 1. The series diverges because the limit found using the ratio test is greater than 1. The series converges because the limit found using the ratio test is less than 1.