MAC 2312 Midterm: Exam-2-Review-MAC-2312

Exam 2 review fall 18: determine whether the sequence converges or diverges. If it converges, nd the limit: an = (2n 1)! (2n+1), an = n! 2n: an = arctan(ln n, an = ( 1)n+1 n. 3: what happens to the series, what happens to the series. What can be said about: suppose sn = an, lim n . Xn=1 an and that sn = 5 . 6 ai. iv suppose sn = arctan n, then lim n an = 0. 5n2 9n + 1 comparing with x 42. True or false? can be shown convergent using dct by: determine the value of k for which the series your answer in interval notation. Pn=5 (ln n)347 converges by the direct comparison test. Pn=5 n(ln n)2 converges by the direct comparison test. converges by the alternating series test. Find the correct limit of the test. c. 1 n 1(cid:1)n b. f. a. e. i. n52n.