A series is a description of adding infinitely many quantities, one after the other, to a given starting quantity. Although the series has an infinite number of terms, it has a finite sum (sometimes called a converging point). An example is the following infinite series. Evaluate e-s using the series 1+x+ 2! * 3! n! ... Compare with the true value 6.737947 x 10-3. Use six terms (n) to evaluate the series and compute relative true and approximate errors as terms are added. Tabulate your answers with (1) no. of terms n, (2) approximate value, (3) true relative error, and (4) approximate error.

Work on the following problems using your formatted bond papers. Show complete solutions. Work to within 10^–4 , unless indicated otherwise. Enclose all final answers in a box. On the first page of your papers, summarize all your answers and iteration tables.

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1) A series is a description of adding infinitely many quantities, one after the other, to a given starting quantity. Although the series has an infinite number of terms, it has a finite sum (sometimes called a converging point). An example is the following infinite series. Evaluate e-5 using the series 1 x3 2! 3! 1+x+ n! Compare with the true value 6.737947 x 10-3, Use six terms (n) to evaluate the series and compute relative true and approximate errors as terms are added. Tabulate your answers with (1) no. of terms n, (2) approximate value, (3) true relative error, and (4) approximate error.