(1 pt) Consider the seriesMεΣan wheren=1an =(5)"(2n+1)!In this problem you must attempt to use the Ratio Test to decide whether the series converges.(a) We want to computeL = liman+1n→XAnThe ratio simplifies towhere p =And so the limit is L=An+1=Anand q=61Enter INF if it diverges to infinity, MINF if it diverges to negative infinity, or DNE if the limit doesnot exist.(b) What is the conclusion of the ratio test?A. The ratio test says that the series does not converge.B. The ratio test says that the series converges.C. None of the above.(c) Which test should you apply to this series?A. Limit comparison with a p-series.B. The ratio test worked. No need for another test.C. The geometric test.D. The p-series test.E. The integral test.F. The root test.G. None of the above.

Question

(1 pt) Consider the seriesMεΣan wheren=1an =(5)&#34;(2n+1)!In this problem you must attempt to use the Ratio Test to decide whether the series converges.(a) We want to computeL = liman+1n→XAnThe ratio simplifies towhere p =And so the limit is L=An+1=Anand q=61Enter INF if it diverges to infinity, MINF if it diverges to negative infinity, or DNE if the limit doesnot exist.(b) What is the conclusion of the ratio test?A. The ratio test says that the series does not converge.B. The ratio test says that the series converges.C. None of the above.(c) Which test should you apply to this series?A. Limit comparison with a p-series.B. The ratio test worked. No need for another test.C. The geometric test.D. The p-series test.E. The integral test.F. The root test.G. None of the above.

Accepted Answer

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