35. Find the sum of 20 Σ 4 - 3k-1 k=1
find the radius of convergence 2) Σ(*) k-kak 11 k=0. k=0 24 b) Σ d) Σ (1+ (*). Υ k=1 k=1
(c) Σ k k=1 (c) Σ k k=1
11. (6 points) Find the sum of the following series: (a) Σ 2n +1 3η n=0 ΟΙ (5) Σ n! ΠΟ
Find the sum Σ, (3: +1)
Find the sum of each geometric series: ΣXe) n +3 Σ-5 b) 50 n-0 n-1 Find the sum of each geometric series: ΣXe) n +3 Σ-5 b) 50 n-0 n-1
(a) Starting with the geometric series X?, find the sum of the series η ΕΟ Σ ηχο – 1, 1x] <1. ΠΕ 1 (b) Find the sum of each of the following series. DO Σηχή, 1x <1 η = 1 η (i) Σ. (c) Find the sum of each of the following series. D) Σπίη – 1)x, Ix <1 ΠΕ 2 (i) Σ - η 57 ΠΕ 2 0 i) 22 = 1
evaluate Σ(1) k=1 n (-1)* k+1 Σ(1). A=0
1 00 (1 point) If is represented as an infinite sum Σ an?", find the first few values of an 2+1 10 ao 0 1 A2 = Q3 = 04 Now find a formula for an an
how to find the actual sum and how to find the maxinmum error, do we have any formula? thanks 11 Let *(3n+1) Suppose we estimated Σ a" by computing the partial sum k-1-2+. According to the Alternating Series Estimation Theorem, (ak is an undenestimate, and the maximumerror is 12 (b) is an overestimate, and the maximum error is 24 (e) k is an overestimate, and the maximum error is 12 (d) The Alternating Series Estimation Theorem cannot be used because...