Give examples of sequences that are: a. convergent and not monotone b.monotone and divergent c.bounded and...

abs convergent, condit. convergent or divergent? A. infinity sigma k=2 (1/(k(lnk)^3) B. infinity sigma k=2 ((-9^(2n))/(n^2*8^n)

abs convergent, condit. convergent or divergent? A. infinity sigma k=2 (1/(k(lnk)^3) B. infinity sigma k=2 ((-9^(2n))/(n^2*8^n)

an = πn / 3n determine if convergent or divergent. if convergent state its limit

an = πn / 3n determine if convergent or divergent. if convergent state its limit

Give an example of each of the following or argue that such a request is impossible...

Give an example of each of the following or argue that such a request is impossible a) a cauchy sequence that is monotone b) a monotone sequence that is not cauchy c) a cauchy sequence with a convergent subsequence d) an unbounded sequence containing a subsequence that is cauchy

Determine whether the given series is convergent or divergent. Show you work and state the theorem/test...

Determine whether the given series is convergent or divergent. Show you work and state the theorem/test you use. Σ (2)/(sqrt(n)+2) n=1 and upper infinity

Determine whether the given series is convergent or divergent. Show you work and state the theorem/test...

Determine whether the given series is convergent or divergent. Show you work and state the theorem/test you use. Σ(-1)^n (sqrt(n))/(2n+3) n=1 and upper infinity

Classify the series as absolutely convergent, conditionally convergent, or divergent: ∞ ∑ ((−1)^?) (1)/√(?(?+1)) ?=1

Classify the series as absolutely convergent, conditionally convergent, or divergent: ∞ ∑ ((−1)^?) (1)/√(?(?+1)) ?=1

Show that sequence {sn} converges if it is monotone and has a convergent subsequence.

Show that sequence {sn} converges if it is monotone and has a convergent subsequence.

(a) Prove that the sum of uniformly convergent sequences is also a uniformly convergent sequence. (b)...

(a) Prove that the sum of uniformly convergent sequences is also a uniformly convergent sequence. (b) Prove that if, in addition to part (a), the sequences are bounded, then the product is also uniformly convergent.

Determine whether the series is convergent or divergent. If it is convergent, find its sum. (a)...

Determine whether the series is convergent or divergent. If it is convergent, find its sum. (a) ∑_(n=1)^∞ (e2/2π)n (b) ∑_(n=1)^∞ 〖[(-0.2)〗n+(0.6)n-1]〗 (c) ∑_(k=0)^∞ (√2)-k

Determine whether the following series is absolutely convergent, conditionally convergent, or divergent. State the name of...

Determine whether the following series is absolutely convergent, conditionally convergent, or divergent. State the name of the test you apply, and show that the series satisfies all hypotheses of the test. Show All Work.