1.

For each of the following series, tell whether or not you can apply the 3-condition test (i.e. the alternating series test). If you can apply this test, enter D if the series diverges, or C if the series converges. If you can't apply this test (even if you know how the series behaves by some other test), enter N. (-1)me y n=1 n! 2 . (-1) " Cos (NTT ) 25 3. (-1)"n! en (-1) 2 n! iMoiM& IM &iM & in nn 5 . (-1)nnn n! 6. (-1) 72 n2+5Select the FIRST correct reason why the given series converges. A. Convergent geometric series B. Convergent pseries C. Integral test D. Comparison with a convergent pseries E. Converges by limit comparison test F. Converges by alternating series test mmmmmij Select the FIRST correct reason why the given series diverges. A. Diverges because the terms don't have limit zero B. Divergent geometric series C. Divergent p series D. Integral test E. Comparison with a divergent p series F. Diverges by limit comparison test G. Diverges by alternating series test mmmm Select the FIRST correct reason why the given series converges. A. Convergent geometric series B. Convergentp series C. Comparison (or Limit Comparison) with a geometric orp series D. Alternating Series Test E. None of the above mmmmmm