Calculus 3 Practice Exam 1

# Calculus 3 Practice Exam 1 - Math 209 1 Find the limit of...

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Practice Exam 1 Spring 2008 1. Find the limit of the sequence 2 n + 1 5 n - 3 ± 2. Determine whether or not the series converges. State why it does or not does not converge. X n =1 5 n + 1 2 n - 3 3. Determine whether or not the series converges. If it converges, ﬁnd its sum. X n =1 ( - 1) n - 1 4 n 5 n 4. Determine whether or not the series converges. State why it does or does not converge. X n =1 1 n 3 5. Use the integral test to determine whether or not the series converges. X n =1 8 4 n + 1 6. Use the direct comparison test to determine whether or not the series converges. X n =1 1 n 3 + 1 7. Use the limit comparison test to determine whether or not the series converges. X n =1 n n 3 + 1 8. Determine whether or not the alternating series converges. X n =1 ( - 1) n - 1 n 2 n 3 + 1 9. Use the ratio test to determine whether or not the series converges. X

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## This note was uploaded on 04/18/2008 for the course MATH 209 taught by Professor Bales during the Spring '08 term at Tuskegee.

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Calculus 3 Practice Exam 1 - Math 209 1 Find the limit of...

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