Now consider the series V8(4n)!(1103 + 26390n) This series was discovered by the extraordinary Indian 9801 - 3964n (n!)4 n=0 mathematician Srinivasa Ramanujan (1887-1920). This series converges to -. 1 (You do NOT need to prove that, and it is much more difficult than finding the sum of the series in problem 1.) This series has been used to compute T to over 17 million digits (which was a world record at the time). V8(4n)!(1103 + 26390n) 9801 - 3964n (n!)4 (a) Use any test for convergence/divergence to show that the series n=0 converges. k V8(4n)!(1103 + 26390n) Σ 9801 - 39647 (n!)4 (b) The partial sums for this series are Sk = n=0 Use a calculator to evaluate and , and write down as many digits as your calculator can display. How many digits are the same as the digits of n? Note: 7 3.1415926535 8979323846 2643383279...
Now consider the series V8(4n)!(1103 + 26390n) This series was discovered by the extraordinary Indian 9801 - 3964n (n!)4 n=0 mathematician Srinivasa Ramanujan (1887-1920). This series converges to -. 1 (You do NOT need to prove that, and it is much more difficult than finding the sum of the series in problem 1.) This series has been used to compute T to over 17 million digits (which was a world record at the time). V8(4n)!(1103 + 26390n) 9801 - 3964n (n!)4 (a) Use any test for convergence/divergence to show that the series n=0 converges. k V8(4n)!(1103 + 26390n) Σ 9801 - 39647 (n!)4 (b) The partial sums for this series are Sk = n=0 Use a calculator to evaluate and , and write down as many digits as your calculator can display. How many digits are the same as the digits of n? Note: 7 3.1415926535 8979323846 2643383279...
Chapter9: Sequences, Probability And Counting Theory
Section9.4: Series And Their Notations
Problem 10TI: Determine whether the sum of the infinite series is defined. 24+(12)+6+(3)+
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