I'm trying to solve for sequence and series question. The sequence goes from n=2 to infinity...

Summation from n=2 to infinity of ln(n)/n^2 * x^n a.) Let x=-1, and compute the integral...

Summation from n=2 to infinity of ln(n)/n^2 * x^n a.) Let x=-1, and compute the integral test to determine whether this it is convergent or divergent b.) Compute the ratio test to determine the interval of convergence and explain what this interval represents. I'm really confused with this problem (specifically a)- please write out all of the details of computing the integral so I can understand. Thank you!

Find a general term (as a function of the variable n) for the sequence{?1,?2,?3,?4,…}={45,1625,64125,256625,…}{a1,a2,a3,a4,…}={45,1625,64125,256625,…}. Find a...

Find a general term (as a function of the variable n) for the sequence{?1,?2,?3,?4,…}={45,1625,64125,256625,…}{a1,a2,a3,a4,…}={45,1625,64125,256625,…}. Find a general term (as a function of the variable n) for the sequence {?1,?2,?3,?4,…}={4/5,16/25,64/125,256/625,…} an= Determine whether the sequence is divergent or convergent. If it is convergent, evaluate its limit. (If it diverges to infinity, state your answer as inf . If it diverges to negative infinity, state your answer as -inf . If it diverges without being infinity or negative infinity, state your answer...

I am trying to prove that (sn) is a Cauchy sequence where |sn+1-sn| < 2-n. So...

I am trying to prove that (sn) is a Cauchy sequence where |sn+1-sn| < 2-n. So far, I have figured out that |sm-sn| <= 1/2m+1 + 1/2m+2 + ... + 1/2n. I want to try to not use the geometric series condition. My professor hinted that the right hand side is less than 2/2n but I'm not sure how to find that or how to go from here!

Show that the series \sum_{n=1}^{\infty} 1/(x^2 + n^2) defines a differentiable function f: R -> R...

Show that the series \sum_{n=1}^{\infty} 1/(x^2 + n^2) defines a differentiable function f: R -> R for which f' is continuous. I'm thinking about using Cauchy Criterion to solve it, but I got stuck at trying to find the N such that the sequence of the partial sum from m+1 to n is bounded by epsilon

Use the limit comparison test to determine whether the series Σ∞ n=1 (2^n)/(3+4^n) converges or diverges....

Use the limit comparison test to determine whether the series Σ∞ n=1 (2^n)/(3+4^n) converges or diverges. Show your work. What series did you use for the comparison? How did you figure out the behavior (converge or diverge) of the series that you used for the comparison?

Recently, I've posted a question that goes as follows Two firms are involved in Bertrand competition....

Recently, I've posted a question that goes as follows Two firms are involved in Bertrand competition. The marginal cost for firm 1 and 2 are mc1=1 and mc2=0. As usual, the consumers purchase only from the firm with a lower price. If p1=p2, then each firm will sell to 50% of the consumers. Find any two Nash Equilibria of the game. And explain why they are Nash Equilibria. And the answer that I got went like this To find the...

QUESTION 1 1. Brianna is trying to increase her chances of being promoted to vice president...

QUESTION 1 1. Brianna is trying to increase her chances of being promoted to vice president by working to build good work relationships with other managers outside her own department. Brianna's behavior should be viewed as dysfunctional politics. functional politics. coercive power. functional influence. 2 points QUESTION 2 1. The Gingerbread Factory has a separate unit that makes their chocolate crunch cookies and another unit that is completely responsible for all operations in producing their ginger snap cookies. The Gingerbread...

Please summarize the below article in approximately 100 words: Monumental function in British Neolithic burial practices...

Please summarize the below article in approximately 100 words: Monumental function in British Neolithic burial practices Ian Kinnes The high-risk rate of survival for the non-megalithic series of Neolithic funerary monuments, recently re-emphasized by Piggott (1973: 34), introduces a further variable into the deductive study of burial practices. In Britain and Europe the overall distribution of monumental forms present both lacunae and a marked preponderance of cairns over earthen mounds which are in ill accord with the known or predicted...

do all five questions Question 1 20 pts Ignoring the effects of air resistance, if a...

do all five questions Question 1 20 pts Ignoring the effects of air resistance, if a ball falls freely toward the ground, its total mechanical energy Group of answer choices increases remains the same not enough information decreases Flag this Question Question 2 20 pts A child jumps off a wall from an initial height of 16.4 m and lands on a trampoline. Before the child springs back up into the air the trampoline compresses 1.8 meters. The spring constant...

Please read through the article below and answer the question at the end of the article....

Please read through the article below and answer the question at the end of the article. High-Performing Teams Need Psychological Safety. Here’s How to Create It “There’s no team without trust,” says Paul Santagata, Head of Industry at Google. He knows the results of the tech giant’s massive two-year study on team performance, which revealed that the highest-performing teams have one thing in common: psychological safety, the belief that you won’t be punished when you make a mistake. Studies show...