Question: When applicable, the Alternating Series Estimation Theorem provides an upper bound for the error of approximationg a convergent alternating series by a specified partial sum.

for the error of approximationg a convergent alternating series by a specified

When applicable, the Alternating Series Estimation Theorem provides an upper bound for the error of approximationg a convergent alternating series by a specified partial sum. Verify that it is applicable, then apply this theorem to the alternating series S = > (-1)72 n=3 n (Inn)4 and its partial sum 6 S6 = E (-1)n2 n=3 n (Inn)4 Compute the corresponding upper bound for the error S - S . Give your answer to five decimals accuracy

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