Say the ratio test and give an example of an alternating series that converges absolutely by...

*answer in detail, give example Suppose a given alternating series diverges. Can it converge absolutely? (yes...

*answer in detail, give example Suppose a given alternating series diverges. Can it converge absolutely? (yes or no?) Justify your answer.

Give an example of a convergent alternating series where the conditions of the alternating series test...

Give an example of a convergent alternating series where the conditions of the alternating series test do not hold. You don’t need to give an explicit formula for the terms of the series. Just describe it in words if you prefer. Carefully justify your answer.

Test the series for convergence using the Alternating Series Test: X∞ m=2 (−1)^m/ (m 2^m). If...

Test the series for convergence using the Alternating Series Test: X∞ m=2 (−1)^m/ (m 2^m). If convergent, determine whether this series converges absolutely or conditionally

18. Give an example. 1. A series whose first term is 20 and whose sum converges...

18. Give an example. 1. A series whose first term is 20 and whose sum converges to 30. 2. A series that converges conditionally and whose denominator is 7k^7. 3. A series that diverges but is inconclusive when applying the Ratio Test.

1. Test the series below for convergence using the Root Test. ∞∑n=1 (4n/10n+1)^n The limit of...

1. Test the series below for convergence using the Root Test. ∞∑n=1 (4n/10n+1)^n The limit of the root test simplifies to lim n→∞ |f(n)| where f(n)= The limit is:     Based on this, the series Diverges Converges 2. We want to use the Alternating Series Test to determine if the series: ∞∑k=4 (−1)^k+2 k^2/√k^5+3 converges or diverges. We can conclude that: The Alternating Series Test does not apply because the terms of the series do not alternate. The Alternating Series Test...

Determine if the series converges conditionally, converges absolutely, or diverges. /sum(n=1 to infinity) ((-1)^n(2n^2))/(n^2+4) /sum(n=1 to...

Determine if the series converges conditionally, converges absolutely, or diverges. /sum(n=1 to infinity) ((-1)^n(2n^2))/(n^2+4) /sum(n=1 to infinity) sin(4n)/4^n

Consider the series ∑n=1 ∞ an where an=(5n+5)^(9n+1)/ 12^n In this problem you must attempt to...

Consider the series ∑n=1 ∞ an where an=(5n+5)^(9n+1)/ 12^n In this problem you must attempt to use the Ratio Test to decide whether the series converges. Compute L= lim n→∞ ∣∣∣an+1/an∣∣ Enter the numerical value of the limit L if it converges, INF if the limit for L diverges to infinity, MINF if it diverges to negative infinity, or DIV if it diverges but not to infinity or negative infinity. L= Which of the following statements is true? A. The...

Given the alternating series:    n=2∞(-1)^n/ln(n) (7 pts) Determine if the series converge absolutely.    (Use the fact...

Given the alternating series:    n=2∞(-1)^n/ln(n) (7 pts) Determine if the series converge absolutely.    (Use the fact that: ln n < n ) (7 pts) Determine if the series converge conditionally. (7 pts) Estimate the sum of the infinite series using the first 4 terms in the series and estimate the error. (7 pts) How many terms should we use to approximate the sum of the infinite series in question, if we want the error to be less than 0.5?

Let pp be a polynomial, and let θ∈(−1,1)θ∈(−1,1). Show that the series ∑∞k=1p(k)θk∑k=1∞p(k)θk converges absolutely.

Let pp be a polynomial, and let θ∈(−1,1)θ∈(−1,1). Show that the series ∑∞k=1p(k)θk∑k=1∞p(k)θk converges absolutely.

determine whether the alternating series ∑ (1 to ^ infinity) (-1)^(n+1) 3^n / (n +1)! is...

determine whether the alternating series ∑ (1 to ^ infinity) (-1)^(n+1) 3^n / (n +1)! is absolutely convergent, conditionally convergent or divergent.