M408D SPRING 2015 HOMEWORK #8 - cheatham(sc36975 HW08 um(53890 This print-out should have 18 questions Multiple-choice questions may continue on the

# M408D SPRING 2015 HOMEWORK #8 - cheatham(sc36975 HW08...

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cheatham (sc36975) – HW08 – um – (53890) 1 This print-out should have 18 questions. Multiple-choice questions may continue on the next column or page – find all choices before answering. 001 10.0 points Determine if the sequence { a n } converges when a n = 1 n ln 2 4 n + 4 , and if it does, find its limit. 1. the sequence diverges 2. limit = 0 3. limit = ln 1 2 4. limit = ln 1 4 5. limit = ln(4) 002 10.0 points Determine whether the sequence { a n } con- verges or diverges when a n = 8 n 2 4 n + 3 2 n 2 + 8 n + 1 , and if it does, find its limit 1. limit = 0 2. limit = 1 6 3. limit = 1 4 4.the sequence diverges5.limit =1200310.0 pointsDetermine if the sequence{an}converges,and if it does, find its limit whenan=8n+ (1)n 1. converges with limit = 8 5 2. converges with limit = 7 5 3. converges with limit = 4 3 4. sequence does not converge 5. converges with limit = 9 5 004 10.0 points Determine whether the sequence { a n } con- verges or diverges when a n = 3 n 2 2 n + n 2 , and if it converges, find the limit. 1. converges with limit = 2 3 2. converges with limit = 0 3. diverges 4. converges with limit = 1 5. converges with limit = 3 2 005 10.0 points