Correct 1. For all n > 2, and the series 2 2= diverges, so by the Comparison Test, the series diverges. n In(n) n In(n) In(n) Incorrect v 2. For all n > 3, £= diverges, so by the Comparison Test, the series Σ In(n) diverges. and the series n n arctan(n) 1 converges, so by the Comparison Test, the series > arctan(n) Incorrect v 3. For all n > 2, and the series converges. n3 2n3 n3

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Each of the following statements is an attempt to show that a given series is convergent or divergent using the Comparison Test (NOT the Limit Comparison Test). For each statement, enter Correct if the argument is valid, or enter Incorrect if any part of the argument is flawed. (Note: if the conclusion is true but the argument that led to it was wrong, you must enter Incorrect.) 1 1. For all n > 2, s= diverges, so by the Comparison Test, the series 2a In(2). 1 diverges. Correct and the series 2 n In(n) n In(n) Incorrect v 2. For all n > 3, 1 and the series >- diverges, so by the Comparison Test, the series Σ In(n) diverges. n n n arctan(n) arctan(n) Incorrect v 3. For all n > 2, and the series 2 converges, so by the Comparison Test, the series > converges. n³ 2n3 n³ n3 1 and the series n2 n 4. For all n > 2, 7 Σ n2 Correct converges, so by the Comparison Test, the series > converges. n3 7 - n3 n 5. For all n > 3, n³ and the series 2 n2 converges, so by the Comparison Test, the series ) n2 Correct n3 converges. 1 1 1 6. For all n > 3, n2 1 and the series n2 1 1 > converges, so by the Comparison Test, the series ) n² Correct converges. 6 n2 >