Unformatted text preview: s 1. S = 2
7 ∞ 002 (part 2 of 3) 10.0 points 8· (−1)n 3 · 4. S = 4 5. S = ∞ 1. S = 3. S = ∞ 4. S = 2
7 29+n
+ ...+
79+n using summation notation. n 2. S = 3 3. S = 2
7 n (iii) Rewrite the series (i) Rewrite the series 3 2
7 (−1)n−2 8 · 5. S = 1 4. convergent, sum = −6 nanni (arn437) – LM 11.2: Inﬁnite series – maxwell – (56110)
5. convergent, sum =
005 6
7 10.0 points Determine if the series
∞ n=1 5 + 2n
4n converges or diverges, and if it converges, ﬁnd
its sum.
1. converges with sum = 3
2. converges with sum = 5
2 3. series diverges
4. converges with sum = 8
3 5. converges with sum = 19
6 6. converges with sum = 17
6 006 0.0 points
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This note was uploaded on 03/25/2013 for the course M 408S taught by Professor Stepp during the Spring '11 term at University of Texas.
 Spring '11
 STEPP
 Calculus, Infinite Series

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