10. Use an appropriate test to determine whether the following series converges. k Σ 7k k = 1 Select the correct choice below and fill in the answer box to complete your choice. (Type an exact answer.) O A. The series diverges by the Integral Test. The value of the integral | dx is 7x B. The series converges. It is a p-series with p = k O C. The series converges by the Divergence Test. The value of lim is 7k k 0o e C D. The series converges by the Integral Test. The value of the integral 00 8 e -7 dx is 7x 49 k DE. The series diverges by the Divergence Test. The value of lim is 7k OF. The series diverges. It is a p-series withp%= k-co e

Question 10

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10, Use an appropriate test to determine whether the following series converges. 00 k Σ e 7k e k=1 Select the correct choice below and fill in the answer box to complete your choice. (Type an exact answer.) 00 O A. The series diverges by the Integral Test. The value of the integral dx is e 7x 1 B. The series converges. It is a p-series with p= O C. The series converges by the Divergence Test. The value of lim is ko e7k C D. The series converges by the Integral Test. The value of the integral 8 e -7 dx is e 49 O E. The series diverges by the Divergence Test. The value of lim k is k o e' 7k OF. The series diverges. It is a p-series with p = 11. Consider the following convergent series. Then complete parts a through d below. 1014.4 Σ k = 1 a. Find an upper bound for the remainder in terms ofn. The upper bound for the remainder is In 2 b. Find how many terms are needed to ensure that the remainder is less than 10 3 The number of terms needed is 11 (Round up to the nearest whole number.) c. Find lower and upper bounds (L, and U,, respectively) on the exact value of the series. Choose the cc VA. 1 2 (n+ 1) %3D 1 2k k = 1 In 2 Un = 2k k = 1 In 2 2-k n- (n + 1) B.