(a) Consider the following statement. The direct comparison test can be used to show that the first series converges by comparing it to the second series. 1 = 2 n = 2 The following is a proposed proof for the statement. 1. We have - 7 for all n s 2. n' + 5 2. The summation - converges because it is a p-series with 2 n= 2 p = 2> 1. 3. So converges by part (i) of the direct comparison test. 1 = 2 no+ 5 Identify the error(s) in the proposed proof. (Select all that apply.) O The first sentence should say n3+ 5 - instead of - 73 +5 The first sentence should say n 2 2 instead of n s 2. The second sentence states that the summation is a p-series when this is not the case. The second sentence should say diverges instead of converges. The third sentence should say diverges instead of converges. (b) Consider the following statement. The limit comparison test can be used to show that the first series converges by comparing it to the second series. n=2 n=2 The following is a proposed proof for the statement. 1. Use the limit comparison test with a n 3 - 5 and b 2. We take lim - on = lim : lim non - 5 n - on 1 - - 3 1 = lim 5 = -1 1], the series n = 2 n 3 - - converges. 1 = 2 Identify the error(s) in the proposed proof. (Select all that apply.) The first sentence should say an = = n 73 + 5 - instead of an The first sentence should say by, instead of by The second sentence should say n - - instead of n - co. The second sentence should conclude with the statement = 1 > 0 instead of = -1