00 π Esin 7n n=1 00 π Cos 13η n=1

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For each of the series below you find two answer fields. In the first answer field enter: (inputs are case sensitive) DV if the series is divergent and not equal to too CV if the series is convergent (to a non-zero number) Z if the series converges to 0 INF if the series equals to oo NIF if the series equals to -00 WD if the series is not well defined In the second answer field select one of the following reasons that can be used to prove your claim in the first answer field: DT The Divergency Test IT The Integral Test AS The Alternating Series Test RO The Root Test RA The Ratio Test D The sequence of summands decreases to 0 L The limit of summands exists and equals to 0 C Comparison with a geometric series o q" CH Comparison with the harmonic series AH Comparison with the alternating harmonic series P Comparison with p-series, where p >1 LP Comparison with p-series, where p <1 sin because n=1 00 COS 13n because n=1