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13 Nov 2019
(1 point) (a) Evaluate the integral 2 40 dx. Jo x2+.4 Your answer should be in the form kn, where k is an integer. What is the value of k? (Hint: darctan(x)- ar x+1 (b) Now, lets evaluate the same integral using power series. First, find the power series for the functionf(x) = x404 . Then, integrate it from 0 to 2, and call it S. S should be an infinite series. What are the first few terms of S? (c) The answers to part (a) and (b) are equal (why?). Hence, if you divide your infinite series from (b) by k (the answer to (a), you have found an estimate for the value of Ï in terms of an infinite series. Approximate the value of Ï by the first 5 terms. (d) What is the upper bound for your error of your estimate if you use the first 8 terms? (Use the alternating series estimation.)
(1 point) (a) Evaluate the integral 2 40 dx. Jo x2+.4 Your answer should be in the form kn, where k is an integer. What is the value of k? (Hint: darctan(x)- ar x+1 (b) Now, lets evaluate the same integral using power series. First, find the power series for the functionf(x) = x404 . Then, integrate it from 0 to 2, and call it S. S should be an infinite series. What are the first few terms of S? (c) The answers to part (a) and (b) are equal (why?). Hence, if you divide your infinite series from (b) by k (the answer to (a), you have found an estimate for the value of Ï in terms of an infinite series. Approximate the value of Ï by the first 5 terms. (d) What is the upper bound for your error of your estimate if you use the first 8 terms? (Use the alternating series estimation.)
Patrina SchowalterLv2
17 Feb 2019