1 n=2 n(In n)5 is convergent. (A). According to the Remainder Estimate for the Integral Test, the error in the approximation s 2 Sn (where s is the value of the infinite sum and s, is the n-th partial...

1<br>n=2 n(In n)5<br>is convergent.<br>(A). According to the Remainder Estimate for the Integral Test, the error in the approximation s 2 Sn (where s is the value of the infinite sum and s, is the n-th<br>partial sum) is<br>|s – Sn| <<br>(B). Find the smallest value of n such that this upper bound is less than 0.006.<br>п —<br>

Extracted text: 1 n=2 n(In n)5 is convergent. (A). According to the Remainder Estimate for the Integral Test, the error in the approximation s 2 Sn (where s is the value of the infinite sum and s, is the n-th partial sum) is |s – Sn| < (b).="" find="" the="" smallest="" value="" of="" n="" such="" that="" this="" upper="" bound="" is="" less="" than="" 0.006.="" п="">

Jun 04, 2022

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1 n=2 n(In n)5 is convergent. (A). According to the Remainder Estimate for the Integral Test, the error in the approximation s 2 Sn (where s is the value of the infinite sum and s, is the n-th partial...

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