Determine whether the following series converges or diverges. In the case of convergence, state whether the convergence is conditional or absolute. sigma^infinity_k = 0 9(-1)^k/k^4 + 2 Which test should be used to test whether the given series converges? The Test with a_k = Find lim_k rightarrow infinity a_k. lim_k rightarrow infinity a_k = Are the terms of the series nonincreasing in magnitude for k greater than some index N? A. Yes. because there is an exponent in the denominator and whenever there is an exponent in the denominator, the terms of a series are nonincreasing in magnitude. B. No. only the first two terms of the series are nonincreasing in magnitude, and the rest of the terms increase. C. No. only the first five terms of the series are nonincreasing in magnitude, and the rest of the terms increase. D. Yes. all the terms of the series are nonincreasing in magnitude. Does the series converge or diverge? A. The series diverges. B. The series converges. In the case of convergence, state whether the convergence is conditional or absolute. Choose the correct answer below. A. From the Limit Comparison Test, the series converges conditionally. B. From the Integral Test, the series converges absolutely. C. From the Limit Comparison Test, the series converges absolutely. D. From the Integral Test, the series converges conditionally. E. The series diverges.