Let Σ (-1)+¹, be a convergent alternating series with terms that are nonincreasing in magnitude. Let R₁ = S-S₁ be the remainder in approximating the value of that series by the sum of its first n terms. Then Rn/san-1. In other words, the magnitude of the remainder is less than or equal to the magnitude of the fir k=1 evaluate the nth partial sum for n=2. Then find an upper bound for the error |S-Sn in using the nth partial sum S, to estimate the value of the series S neglected term. For the convergent alternating series ko (3k+1)³ The nth partial sum for the given value of n is 0.984375. (Type an integer or a decimal. Round to seven decimal places as needed.). Using the provided theorem, the upper bound for the error is (Type an integer or a decimal. Round to seven decimal places as needed.).

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Let (-1)+1 ak be a convergent alternating series with terms that are nonincreasing in magnitude. Let R₁ = S-S₁ be the remainder in approximating the value of that series by the sum of its first n terms. Then |R₁|san+1. In other words, the magnitude of the remainder is less than or equal to the magnitude of the first k=1 neglected term. For the convergent alternating series 00 (-1)k k=0 (3k+1) evaluate the nth partial sum for n=2. Then find an upper bound for the error S-S₁ in using the nth partial sum S, to estimate the value of the series S. The nth partial sum for the given value of n is 0.984375. (Type an integer or a decimal. Round to seven decimal places as needed.) Using the provided theorem, the upper bound for the error is. (Type an integer or a decimal. Round to seven decimal places as needed.)