In your answer state: (a) whether the above series Use the Limit Comparison Test to determine...
n-arctan(n) We want to use comparison test in order to determine whether the series is convergent or divergent. Which of the following is correct? n=2n2n+2n +5 Select one O a. It is divergent by comparison test with the series nen O b. It is convergent by comparison test with the series SIS M8 n c. It is divergent by comparison test with the series n=1nn о d. It is convergent by comparison test with the series 1n2 e. It is...
divergent 3. Using comparison test determine whether the following series is convergent or 21/n OC (a) n=1 ( b) Σ n n2-cos2 n ( c) Σ e n =1 n2+cos2 n n 2 =1_2n ( d) Σ ( e) Σ n n n=1 divergent 3. Using comparison test determine whether the following series is convergent or 21/n OC (a) n=1 ( b) Σ n n2-cos2 n ( c) Σ e n =1 n2+cos2 n n 2 =1_2n ( d) Σ...
7) Use the Ordinary Comparison Test to determine whether the series is convergent or divergent. Υ n (a) (6) Σ η η 5" 3η – 4 M8 M8 (Inn) 2 (c) η (d) tan n2 n3 η-2 1 (e) Σ (6) Σ 2n + 3 2n + 3 ή-1 1-1
Use the Limit Comparison Test to determine whether the series converges. The Limit Comparison Test with § 13K-3K) shows that the series diverges. k= 1 Consider the following convergent series. Complete parts a through c below. a. Use Sn to estimate the sum of the series. S2 (Round to seven decimal places as needed.) Determine how many terms of the following convergent series must be summed to be sure that the remainder is less than 10-in magnitude. (-1) k=0 (2k...
-/1.78 points ROGACALCET3 10.3.041. Use the Limit Comparison Test to determine whether the infinite series is convergent. 2n +1 Identify be in the following limit. Vn +1 = n-+ L = lim b The series converges. The series diverges. Submit Answer
(1 point) We will determine whether the series n3 + 2n an - is convergent or divergent using the Limit Comparison Test (note that the Comparison Test is difficult to apply in this case). The given series has positive terms, which is a requirement for applying the Limit Comparison Test. First we must find an appropriate series bn for comparison (this series must also have positive terms). The most reasonable choice is ba - (choose something of the form 1/mp...
Determine whether 〉· is convergent. Specifically, use the Comparison Test to compare this series to a geometric series. Claim: is convergent (please answer true or false) The common ratio of the geometric series suitable for applying the Comparison Test isr- Claim: bn = 22n+7. 2+7. and an satisfy (1) 0 3 an n for all large n 2 1 or (2)0 Sbn al large n 2 1) (please enter (1) or (2). Determine whether 〉· is convergent. Specifically, use the...
Use the Ordinary Comparison Test to determine whether the series is convergent or divergent. 7 n - 1 n= 1 3. n = 1 n= 2
(1 point) Each of the following statements is an attempt to show that a given series is convergent or divergent using the Comparison Test (NOT the Limit Comparison Test.) For each statement, enter C (for "correct") if the argument is valid, or enter (for "incorrect") if any part of the argument is flawed. (Note: if the conclusion is true but the argument that led to it was wrong, you must enter l.) 1. For all n > 2, -16く흘, and...
Determine whether the series converges or diverges. n + 1 Σ +n n = 1 The series converges by the Limit Comparison Test. Each term is less than that of a convergent geometric series. The series converges by the Limit Comparison Test. The limit of the ratio of its terms and a convergent p-series is greater than 0. The series diverges by the Limit Comparison Test. The limit of the ratio of its terms and a divergent p-series is greater...