2. For each of the following series determine if they converge or diverge. You may use any test we have covered so far. (a) 3+ cos(n!) n=1 玩 (b) Σn sin*(n3/2) n=1 (c) (-1) (3n)! (n!)362n+1 n=1 (d) sin (+) n=2 ∞ (0) Σ n=3 √n2-4 n3+ In(n) (f) 2- Σ n=0 2.5...(3n+2) 2nn! (The expression in the numerator is called a running product It is basically a factorial that skins
2. For each of the following series determine if they converge or diverge. You may use any test we have covered so far. (a) 3+ cos(n!) n=1 玩 (b) Σn sin*(n3/2) n=1 (c) (-1) (3n)! (n!)362n+1 n=1 (d) sin (+) n=2 ∞ (0) Σ n=3 √n2-4 n3+ In(n) (f) 2- Σ n=0 2.5...(3n+2) 2nn! (The expression in the numerator is called a running product It is basically a factorial that skins
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter5: Inverse, Exponential, And Logarithmic Functions
Section5.6: Exponential And Logarithmic Equations
Problem 64E
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Q2 e and f (using one of these : nth term test, direct comparison test, limit comparison test, ratio test, integral test or root test )
Q3 all
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