At least one of the answers above is NOT correct. 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 C (for "correct") if the argument is valid, or enter I (for "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 1.) I с I C I I 1. For all n > 2,8 < 22, and the series 2Σ converges, so by the Comparison Test, the series Σ converges, so by the Comparison Test, the series Σ converges. converges. 2. For all n> 1, ¹¹², < 6-1³ and the series 3. For all n>1 arctan(n) converges. 72³ In(n) 15, and the series converges, so by the Comparison Test, the series converges. nln(n) converges. 4. For all n > 1 5. For all n > 1, 6. For all n > 2, arctan(n) 72² In(n) 72²<
At least one of the answers above is NOT correct. 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 C (for "correct") if the argument is valid, or enter I (for "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 1.) I с I C I I 1. For all n > 2,8 < 22, and the series 2Σ converges, so by the Comparison Test, the series Σ converges, so by the Comparison Test, the series Σ converges. converges. 2. For all n> 1, ¹¹², < 6-1³ and the series 3. For all n>1 arctan(n) converges. 72³ In(n) 15, and the series converges, so by the Comparison Test, the series converges. nln(n) converges. 4. For all n > 1 5. For all n > 1, 6. For all n > 2, arctan(n) 72² In(n) 72²<
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter10: Sequences, Series, And Probability
Section10.2: Arithmetic Sequences
Problem 68E
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