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Deck 10: Sequences, Series, and Power Series

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Question
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? (a) increasing (or ultimately increasing) (b) decreasing (or ultimately decreasing) (c) positive (or ultimately positive) (d) negative (or ultimately negative) (e) bounded below only (f) bounded above only (g) bounded (h) unbounded above and below (i) alternating (j) divergent (but not to \infty or - \infty ) (k) divergent to \infty (l) divergent to - \infty (m) convergent</strong> A) (a), (c), (e), (m) B) (a), (c), (f), (j) C) (a), (c), (g), (m) D) (b), (c), (g), (l) E) (a), (c), (e), (k) <div style=padding-top: 35px> ?
(a) increasing (or ultimately increasing)
(b) decreasing (or ultimately decreasing)
(c) positive (or ultimately positive)
(d) negative (or ultimately negative)
(e) bounded below only
(f) bounded above only
(g) bounded
(h) unbounded above and below
(i) alternating
(j) divergent (but not to \infty or - \infty )
(k) divergent to \infty
(l) divergent to - \infty
(m) convergent

A) (a), (c), (e), (m)
B) (a), (c), (f), (j)
C) (a), (c), (g), (m)
D) (b), (c), (g), (l)
E) (a), (c), (e), (k)
Use Space or
up arrow
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to flip the card.
Question
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) <div style=padding-top: 35px> .

A) 0
B) 1
C) 2
D) 3
E) <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) <div style=padding-top: 35px>
Question
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? </strong> A) (g), (i), (m) B) (b), (f), (m) C) (g), (i), (j) D) (b), (c), (i), (l) E) (g), (i), (k) <div style=padding-top: 35px> ?<strong>Which of the following descriptors apply to the sequence ? </strong> A) (g), (i), (m) B) (b), (f), (m) C) (g), (i), (j) D) (b), (c), (i), (l) E) (g), (i), (k) <div style=padding-top: 35px>

A) (g), (i), (m)
B) (b), (f), (m)
C) (g), (i), (j)
D) (b), (c), (i), (l)
E) (g), (i), (k)
Question
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) -1 <div style=padding-top: 35px> .

A) 0
B) 1
C) 2
D) 3
E) -1
Question
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? (a) increasing (or ultimately increasing) (b) decreasing (or ultimately decreasing) (c) positive (or ultimately positive) (d) negative (or ultimately negative) (e) bounded below only (f) bounded above only (g) bounded (h) unbounded above and below (i) alternating (j) divergent (but not to \infty or - \infty ) (k) divergent to \infty (l) divergent to - \infty (m) convergent</strong> A) (g), (i), (m) B) (a), (f), (m) C) (g), (i), (j) D) (b), (c), (i), (l) E) (g), (i), (k) <div style=padding-top: 35px> ?
(a) increasing (or ultimately increasing)
(b) decreasing (or ultimately decreasing)
(c) positive (or ultimately positive)
(d) negative (or ultimately negative)
(e) bounded below only
(f) bounded above only
(g) bounded
(h) unbounded above and below
(i) alternating
(j) divergent (but not to \infty or - \infty )
(k) divergent to \infty
(l) divergent to - \infty
(m) convergent

A) (g), (i), (m)
B) (a), (f), (m)
C) (g), (i), (j)
D) (b), (c), (i), (l)
E) (g), (i), (k)
Question
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? (a) increasing (or ultimately increasing) (b) decreasing (or ultimately decreasing) (c) positive (or ultimately positive) (d) negative (or ultimately negative) (e) bounded below only (f) bounded above only (g) bounded (h) unbounded above and below (i) alternating (j) divergent (but not to \infty or - \infty ) (k) divergent to \infty (l) divergent to - \infty (m) convergent</strong> A) (a), (d), (f), (l) B) (a), (f), (m) C) (a), (c), (e), (k) D) (b), (f), (j) E) (b), (d), (f), (l) <div style=padding-top: 35px> ?
(a) increasing (or ultimately increasing)
(b) decreasing (or ultimately decreasing)
(c) positive (or ultimately positive)
(d) negative (or ultimately negative)
(e) bounded below only
(f) bounded above only
(g) bounded
(h) unbounded above and below
(i) alternating
(j) divergent (but not to \infty or - \infty )
(k) divergent to \infty
(l) divergent to - \infty
(m) convergent

A) (a), (d), (f), (l)
B) (a), (f), (m)
C) (a), (c), (e), (k)
D) (b), (f), (j)
E) (b), (d), (f), (l)
Question
Let <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . <div style=padding-top: 35px> = <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . <div style=padding-top: 35px> , n = 1, 2, 3,...
Which of the following statements about the sequence <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . <div style=padding-top: 35px> is true?

A) The sequence is decreasing with a lower bound equal to . <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . <div style=padding-top: 35px>
B) The sequence is increasing with an upper bound equal to . <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . <div style=padding-top: 35px>
C) The sequence is increasing with a lower bound equal to 0.
D) The sequence is not monotonic and also unbounded.
E) The sequence is decreasing with an upper bound equal to . <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . <div style=padding-top: 35px>
Question
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) 6 <div style=padding-top: 35px> .

A) 0
B) 1
C) 2
D) 3
E) 6
Question
The sequence <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 <div style=padding-top: 35px> is defined recursively by <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 <div style=padding-top: 35px> = <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 <div style=padding-top: 35px> , <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 <div style=padding-top: 35px> = <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 <div style=padding-top: 35px> , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.

A) 1
B) -4 or 1
C) -1 or 4
D) -1
E) 4
Question
Find the limit of the sequence { <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty <div style=padding-top: 35px> }, where <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty <div style=padding-top: 35px> = <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty <div style=padding-top: 35px> - <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty <div style=padding-top: 35px> .

A) -54
B) 54
C) - \infty
D) 0
E) \infty
Question
Show that the sequence Show that the sequence converges, and find its limit.<div style=padding-top: 35px> converges, and find its limit.
Question
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) This sequence is divergent. <div style=padding-top: 35px> .

A) 0
B) 1
C) 2
D) 3
E) This sequence is divergent.
Question
Find, if it exists, the limit of the sequence { <strong>Find, if it exists, the limit of the sequence { }, where a<sub>n</sub> = .</strong> A) 0 B) 1 C) 2 D) 3 E) The limit does not exist. <div style=padding-top: 35px> }, where an = <strong>Find, if it exists, the limit of the sequence { }, where a<sub>n</sub> = .</strong> A) 0 B) 1 C) 2 D) 3 E) The limit does not exist. <div style=padding-top: 35px> .

A) 0
B) 1
C) 2
D) 3
E) The limit does not exist.
Question
The sequence <strong>The sequence </strong> A) diverges to - \infty . B) converges to 0. C) converges to 3. D) diverges to + \infty . E) converges to - 4. <div style=padding-top: 35px>

A) diverges to - \infty .
B) converges to 0.
C) converges to 3.
D) diverges to + \infty .
E) converges to - 4.
Question
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 9 B) 3 C) -3 D) 0 E) -9 <div style=padding-top: 35px> .

A) 9
B) 3
C) -3
D) 0
E) -9
Question
If {| If {| |} converges, then { } converges.<div style=padding-top: 35px> |} converges, then { If {| |} converges, then { } converges.<div style=padding-top: 35px> } converges.
Question
If { If { } converges, then {| |} converges.<div style=padding-top: 35px> } converges, then {| If { } converges, then {| |} converges.<div style=padding-top: 35px> |} converges.
Question
If { If { } converges, then must diverge.<div style=padding-top: 35px> } converges, then If { } converges, then must diverge.<div style=padding-top: 35px> must diverge.
Question
If { If { } converges and { } converges, then must converge.<div style=padding-top: 35px> } converges and { If { } converges and { } converges, then must converge.<div style=padding-top: 35px> } converges, then If { } converges and { } converges, then must converge.<div style=padding-top: 35px> must converge.
Question
<strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> is the <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> partial sum of an infinite series <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> . Find <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> . Determine if the series is convergent or divergent, and if convergent find its sum.

A) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> , <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = - <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> for n \ge 2; series converges, sum is 0
B) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> for n \ge 1; series converges, sum is 1
C) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> , <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = - <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> for n \ge 2; series converges, sum is <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px>
D) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> for n \ge 1; series converges, sum is <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px>
E) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px> for n \ge 1; series converges, sum is <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is <div style=padding-top: 35px>
Question
<strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> is the <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> partial sum of an infinite series <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> . Find <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> . Determine if the series is convergent or divergent, and if convergent find its sum.

A) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> , series diverges to \infty

B) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> , series diverges to \infty

C) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> , series converges to 1
D) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> , series converges to 2
E) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 <div style=padding-top: 35px> , series converges to 1
Question
<strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> is the <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> partial sum of an infinite series <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> . Find <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> . Determine if the series is convergent or divergent, and if convergent find its sum.

A) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> , series converges to <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px>
B) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> , series converges to 1
C) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> , series converges to 2
D) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> , series diverges to \infty

E) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty <div style=padding-top: 35px> , series diverges to \infty
Question
Find the sum of the series 4 - 1 + <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px> - <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px> +...

A) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px>
B) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px>
C) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px>
D) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px>
E) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) <div style=padding-top: 35px>
Question
On what interval of values of x does the series <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = <div style=padding-top: 35px> converge? What is its sum for x in that interval?

A) (-1, 1), sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = <div style=padding-top: 35px>
B) (-1, 1), sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = <div style=padding-top: 35px>
C) (-1, 1], sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = <div style=padding-top: 35px>
D) [-1, 1), sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = <div style=padding-top: 35px>
E) [-1, 1], sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = <div style=padding-top: 35px>
Question
Find the sum of the series <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px> + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px> + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px> +... + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px> +... = <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px> .

A) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px>
B) 1
C) 2
D) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) <div style=padding-top: 35px>
E) \infty (series diverges)
Question
The geometric series <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is . <div style=padding-top: 35px>

A) converges and its sum is . <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is . <div style=padding-top: 35px>
B) converges and its sum is . <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is . <div style=padding-top: 35px>
C) diverges and hence it has no sum.
D) converges and its sum is 4.
E) converges and its sum is . <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is . <div style=padding-top: 35px>
Question
Find the sum of the series <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px> + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px> + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px> +... + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px> +... = <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px> .

A) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px>
B) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px>
C) 1
D) \infty (series diverges)
E) none of the above
Question
Find the sum of the series <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>

A) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
B) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
C) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
D) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
E) \infty (series diverges)
Question
Evaluate . <strong>Evaluate . </strong> A) B) C) D) E) series diverges <div style=padding-top: 35px> <strong>Evaluate . </strong> A) B) C) D) E) series diverges <div style=padding-top: 35px>

A) <strong>Evaluate . </strong> A) B) C) D) E) series diverges <div style=padding-top: 35px>
B) <strong>Evaluate . </strong> A) B) C) D) E) series diverges <div style=padding-top: 35px>
C) <strong>Evaluate . </strong> A) B) C) D) E) series diverges <div style=padding-top: 35px>
D) <strong>Evaluate . </strong> A) B) C) D) E) series diverges <div style=padding-top: 35px>
E) series diverges
Question
Evaluate <strong>Evaluate .</strong> A) e B) 1 C) D) E) \infty (series diverges) <div style=padding-top: 35px> .

A) e
B) 1
C) <strong>Evaluate .</strong> A) e B) 1 C) D) E) \infty (series diverges) <div style=padding-top: 35px>
D) <strong>Evaluate .</strong> A) e B) 1 C) D) E) \infty (series diverges) <div style=padding-top: 35px>
E) \infty (series diverges)
Question
Show that the infinite series Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px> converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px> Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px> Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px> Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px> Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px> Show that the infinite series converges, and find its sum.Hint : Verify that = - . <div style=padding-top: 35px>
Question
Evaluate <strong>Evaluate .</strong> A) -1 B) 0 C) 1 D) E) no sum, series diverges <div style=padding-top: 35px> .

A) -1
B) 0
C) 1
D) <strong>Evaluate .</strong> A) -1 B) 0 C) 1 D) E) no sum, series diverges <div style=padding-top: 35px>
E) no sum, series diverges
Question
Find the sum <strong>Find the sum .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px> .

A) <strong>Find the sum .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px>
B) <strong>Find the sum .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above <div style=padding-top: 35px>
C) 1
D) \infty (series diverges)
E) none of the above
Question
Find the sum of the series <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px> .

A) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
B) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
C) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
D) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges) <div style=padding-top: 35px>
E) \infty (series diverges)
Question
Find the sum of the series <strong>Find the sum of the series .</strong> A) 2 B) 3 C) 1 D) 4 E) \infty (series diverges) <div style=padding-top: 35px> .

A) 2
B) 3
C) 1
D) 4
E) \infty (series diverges)
Question
If If diverges to infinity and \neq 0 for all n, then converges.<div style=padding-top: 35px> diverges to infinity and If diverges to infinity and \neq 0 for all n, then converges.<div style=padding-top: 35px> \neq 0 for all n, then If diverges to infinity and \neq 0 for all n, then converges.<div style=padding-top: 35px> converges.
Question
If If and both diverge, then also diverges.<div style=padding-top: 35px> and If and both diverge, then also diverges.<div style=padding-top: 35px> both diverge, then If and both diverge, then also diverges.<div style=padding-top: 35px> also diverges.
Question
If If converges, then = 0.<div style=padding-top: 35px> converges, then If converges, then = 0.<div style=padding-top: 35px> If converges, then = 0.<div style=padding-top: 35px> = 0.
Question
<div style=padding-top: 35px>
Question
The series The series converges.<div style=padding-top: 35px> converges.
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The series The series converges.<div style=padding-top: 35px> converges.
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The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
For exactly what values of the constant k does the series <strong>For exactly what values of the constant k does the series converge?</strong> A) p > 2 B) p \ge 2 C) p < 1 D) p \le 1 E) p > 1 <div style=padding-top: 35px> converge?

A) p > 2
B) p \ge 2
C) p < 1
D) p \le 1
E) p > 1
Question
Find all values of the nonzero constant real number p such that the series <strong>Find all values of the nonzero constant real number p such that the series is convergent.</strong> A) p > 1 B) 0 < P \le 1 C) 0 < P \le D) p < 0 E) p > 0 <div style=padding-top: 35px> is convergent.

A) p > 1
B) 0 < P \le 1
C) 0 < P \le <strong>Find all values of the nonzero constant real number p such that the series is convergent.</strong> A) p > 1 B) 0 < P \le 1 C) 0 < P \le D) p < 0 E) p > 0 <div style=padding-top: 35px>
D) p < 0
E) p > 0
Question
For exactly what values of the constant p does the series <strong>For exactly what values of the constant p does the series converge?</strong> A) p \ge 1 B) p > 1 C) p \ge 2 D) p > 2 E) p > 0 <div style=padding-top: 35px> converge?

A) p \ge 1
B) p > 1
C) p \ge 2
D) p > 2
E) p > 0
Question
For exactly what values of the constant p does the series <strong>For exactly what values of the constant p does the series converge?</strong> A) -3 < p < 3 B) -3 \le p \le 3 C) 0 \le p \le 3 D) 0 < p < 3 E) -3 < p < 0 <div style=padding-top: 35px> converge?

A) -3 < p < 3
B) -3 \le p \le 3
C) 0 \le p \le 3
D) 0 < p < 3
E) -3 < p < 0
Question
The P-series <strong>The P-series , x > 0 converges for all x such that:</strong> A) x > 1 B) x \ge 1 C) 0 < x < 1 D) 0 < x \le 1 E) x (- \infty , \infty ) <div style=padding-top: 35px> , x > 0 converges for all x such that:

A) x > 1
B) x \ge 1
C) 0 < x < 1
D) 0 < x \le 1
E) x <strong>The P-series , x > 0 converges for all x such that:</strong> A) x > 1 B) x \ge 1 C) 0 < x < 1 D) 0 < x \le 1 E) x (- \infty , \infty ) <div style=padding-top: 35px> (- \infty , \infty )
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
Use the integral test bounds to estimate the sum of the series <strong>Use the integral test bounds to estimate the sum of the series using the first three terms.</strong> A) 104 B) 140 C) 119 D) 101 E) 98 <div style=padding-top: 35px> using the first three terms.

A) 104
B) 140
C) 119
D) 101
E) 98
Question
What is the largest positive constant K such that if 0 < p < K, then <strong>What is the largest positive constant K such that if 0 < p < K, then must converge?</strong> A) 1 B) 2 C) 4 D) 8 E) 9 <div style=padding-top: 35px> must converge?

A) 1
B) 2
C) 4
D) 8
E) 9
Question
Give an upper bound for the error when <strong>Give an upper bound for the error when is approximated by the partial sum .</strong> A) 0.0004 B) 0.0001 C) 0.00004 D) 0.00001 E) 0.004 <div style=padding-top: 35px> is approximated by the partial sum <strong>Give an upper bound for the error when is approximated by the partial sum .</strong> A) 0.0004 B) 0.0001 C) 0.00004 D) 0.00001 E) 0.004 <div style=padding-top: 35px> .

A) 0.0004
B) 0.0001
C) 0.00004
D) 0.00001
E) 0.004
Question
Give an upper bound for the error when e = <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> is approximated by the partial sum <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> . How large should n be taken to ensure that the error is less than 0.001?

A) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> , n = 7
B) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> , n = 8
C) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> , n = 7
D) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> , n = 8
E) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 <div style=padding-top: 35px> , n = 6
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
<div style=padding-top: 35px>
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series converges.<div style=padding-top: 35px> converges.
Question
The series The series is an alternating series.<div style=padding-top: 35px> is an alternating series.
Question
For what values of x does the series <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) x = 0 only, ~~~~~~~~ (b) nowhere B) (a) -1 < x < 1, ~~~~~~~~ (b) nowhere C) (a) -1 < x < 1, ~~~~~~~~ (b) x = -1 and x = 1 D) (a) all real x, ~~~~~~~~ (b) nowhere E) (a) -1 < x < 1, ~~~~~~~~ (b) x = 1 <div style=padding-top: 35px>
(a) converge absolutely?
(b) converge conditionally?

A) (a) x = 0 only,         ~~~~~~~~ (b) nowhere
B) (a) -1 < x < 1,         ~~~~~~~~ (b) nowhere
C) (a) -1 < x < 1,         ~~~~~~~~ (b) x = -1 and x = 1
D) (a) all real x,         ~~~~~~~~ (b) nowhere
E) (a) -1 < x < 1,         ~~~~~~~~ (b) x = 1
Question
For what values of x does the series <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = 1 B) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = -1 and x = 5 C) (a) on the interval [1, 5], ~~~~~~~~ (b) nowhere D) (a) on the interval [1, 5), ~~~~~~~~ (b) at x = 5 E) (a) all real x, ~~~~~~~~ (b) nowhere <div style=padding-top: 35px> <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = 1 B) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = -1 and x = 5 C) (a) on the interval [1, 5], ~~~~~~~~ (b) nowhere D) (a) on the interval [1, 5), ~~~~~~~~ (b) at x = 5 E) (a) all real x, ~~~~~~~~ (b) nowhere <div style=padding-top: 35px>
(a) converge absolutely?
(b) converge conditionally?

A) (a) on the interval (1, 5),         ~~~~~~~~ (b) at x = 1
B) (a) on the interval (1, 5),         ~~~~~~~~ (b) at x = -1 and x = 5
C) (a) on the interval [1, 5],         ~~~~~~~~ (b) nowhere
D) (a) on the interval [1, 5),         ~~~~~~~~ (b) at x = 5
E) (a) all real x,         ~~~~~~~~ (b) nowhere
Question
For what values of x does the series <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) on the interval (-2, -1), ~~~~~~~~ (b) at x = -2 and x = -1 B) (a) on the interval [-2, -1] ~~~~~~~~ (b) nowhere C) (a) on the interval (-2, -1), ~~~~~~~~ (b) for x < -2 D) (a) on the interval (-3, 0), ~~~~~~~~ (b) at x = -3 and x = 0 E) (a) on the interval [-2, -1), ~~~~~~~~ (b) at x = -1 <div style=padding-top: 35px>
(a) converge absolutely?
(b) converge conditionally?

A) (a) on the interval (-2, -1),         ~~~~~~~~ (b) at x = -2 and x = -1
B) (a) on the interval [-2, -1]         ~~~~~~~~ (b) nowhere
C) (a) on the interval (-2, -1),         ~~~~~~~~ (b) for x < -2
D) (a) on the interval (-3, 0),         ~~~~~~~~ (b) at x = -3 and x = 0
E) (a) on the interval [-2, -1),         ~~~~~~~~ (b) at x = -1
Question
Which of the three series (i) <strong>Which of the three series (i) (ii) (iii) is conditionally convergent?</strong> A) series (iii) B) series (i) C) series (i) and (iii) D) series (ii) E) All three <div style=padding-top: 35px> (ii) <strong>Which of the three series (i) (ii) (iii) is conditionally convergent?</strong> A) series (iii) B) series (i) C) series (i) and (iii) D) series (ii) E) All three <div style=padding-top: 35px> (iii) <strong>Which of the three series (i) (ii) (iii) is conditionally convergent?</strong> A) series (iii) B) series (i) C) series (i) and (iii) D) series (ii) E) All three <div style=padding-top: 35px>
is conditionally convergent?

A) series (iii)
B) series (i)
C) series (i) and (iii)
D) series (ii)
E) All three
Question
Which of the three series (i) <strong>Which of the three series (i) (ii) (iii) is absolutely convergent?</strong> A) series (i) and (ii) B) series (i) C) series (ii) and (iii) D) series (i) and (iii) E) none of the series <div style=padding-top: 35px> (ii) <strong>Which of the three series (i) (ii) (iii) is absolutely convergent?</strong> A) series (i) and (ii) B) series (i) C) series (ii) and (iii) D) series (i) and (iii) E) none of the series <div style=padding-top: 35px> (iii) <strong>Which of the three series (i) (ii) (iii) is absolutely convergent?</strong> A) series (i) and (ii) B) series (i) C) series (ii) and (iii) D) series (i) and (iii) E) none of the series <div style=padding-top: 35px> is absolutely convergent?

A) series (i) and (ii)
B) series (i)
C) series (ii) and (iii)
D) series (i) and (iii)
E) none of the series
Question
For what values of x does the series <strong>For what values of x does the series converge? </strong> A) on the interval [1, \infty ) B) on the intervals (- \infty , -1] and [1, \infty ) C) for all x \neq 0 D) for x = 2 only E) on the interval (- \infty , -1] <div style=padding-top: 35px> <strong>For what values of x does the series converge? </strong> A) on the interval [1, \infty ) B) on the intervals (- \infty , -1] and [1, \infty ) C) for all x \neq 0 D) for x = 2 only E) on the interval (- \infty , -1] <div style=padding-top: 35px>
converge?

A) on the interval [1, \infty )
B) on the intervals (- \infty , -1] and [1, \infty )
C) for all x \neq 0
D) for x = 2 only
E) on the interval (- \infty , -1]
Question
For what values of x does the series <strong>For what values of x does the series converge?</strong> A) on the intervals (- \infty , -1] and [1, \infty ) B) on the intervals (- \infty , -1) and (1, \infty ) C) on the interval [-1, 1] D) on the interval (-1, 1) E) on the interval [1, \infty ) <div style=padding-top: 35px> converge?

A) on the intervals (- \infty , -1] and [1, \infty )
B) on the intervals (- \infty , -1) and (1, \infty )
C) on the interval [-1, 1]
D) on the interval (-1, 1)
E) on the interval [1, \infty )
Question
For what values of x does the series ln x + <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 <div style=padding-top: 35px> + <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 <div style=padding-top: 35px> + <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 <div style=padding-top: 35px> +... converge?

A) <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 <div style=padding-top: 35px> < x < e
B) 0 < x < e
C) 1 < x < e
D) 0 < x < \infty
E) 0 < x < 1
Question
If If is conditionally convergent, then must be divergent.<div style=padding-top: 35px> is conditionally convergent, then If is conditionally convergent, then must be divergent.<div style=padding-top: 35px> must be divergent.
Question
If If is divergent, then must be conditionally convergent.<div style=padding-top: 35px> is divergent, then If is divergent, then must be conditionally convergent.<div style=padding-top: 35px> must be conditionally convergent.
Question
By possibly rearranging its terms, the series By possibly rearranging its terms, the series can be forced to have the sum 17.<div style=padding-top: 35px> can be forced to have the sum 17.
Question
Find the radius, centre, and interval of convergence of the series <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 0, radius 1, interval [-1, 1) B) centre 0, radius 1, interval [-1, 1] C) centre 0, radius 1, interval (-1, 1) D) centre 0, radius \infty , interval (- \infty , \infty ) E) centre 0, radius 1, interval (-1, 1] <div style=padding-top: 35px> .

A) centre 0, radius 1, interval [-1, 1)
B) centre 0, radius 1, interval [-1, 1]
C) centre 0, radius 1, interval (-1, 1)
D) centre 0, radius \infty , interval (- \infty , \infty )
E) centre 0, radius 1, interval (-1, 1]
Question
Find the radius, centre, and interval of convergence of the series <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> .

A) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px>
B) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px>
C) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px>
D) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px>
E) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px> , <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <div style=padding-top: 35px>
Question
The interval of convergence of the power series <strong>The interval of convergence of the power series is given by [-7, -3).Find the centre c and the radius of convergence R of the power series.</strong> A) c = -10, R = 4 B) c = -5, R = 2 C) c = -4, R = 10 D) c = -2, R = 5 E) c = 2, R = -5 <div style=padding-top: 35px> is given by [-7, -3).Find the centre c and the radius of convergence R of the power series.

A) c = -10, R = 4
B) c = -5, R = 2
C) c = -4, R = 10
D) c = -2, R = 5
E) c = 2, R = -5
Question
Find the centre, radius, and interval of convergence of the series <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre 0, radius 1, interval [-1, 1] B) centre 0, radius 1, interval (-1, 1] C) centre 0, radius 1, interval (-1, 1) D) centre 0, radius 2, interval (-2, 2) E) centre 0, radius 1, interval [-1, 1) <div style=padding-top: 35px>

A) centre 0, radius 1, interval [-1, 1]
B) centre 0, radius 1, interval (-1, 1]
C) centre 0, radius 1, interval (-1, 1)
D) centre 0, radius 2, interval (-2, 2)
E) centre 0, radius 1, interval [-1, 1)
Question
Find the centre, radius, and interval of convergence of the series <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre 4, radius 3, interval (1, 7] B) centre 4, radius 3, interval [1, 7) C) centre 4, radius 1, interval [3, 5] D) centre 4, radius 1, interval (3, 5) E) centre 4, radius 1, interval (3, 5] <div style=padding-top: 35px>

A) centre 4, radius 3, interval (1, 7]
B) centre 4, radius 3, interval [1, 7)
C) centre 4, radius 1, interval [3, 5]
D) centre 4, radius 1, interval (3, 5)
E) centre 4, radius 1, interval (3, 5]
Question
Find the centre, radius, and interval of convergence of the series <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre -3, radius 1, interval [-4, -2] B) centre -3, radius 1, interval (-4, -2) C) centre 0, radius \infty , interval (- \infty , \infty ) D) centre -3, radius \infty , interval (- \infty , \infty ) E) centre -3, radius , interval <div style=padding-top: 35px>

A) centre -3, radius 1, interval [-4, -2]
B) centre -3, radius 1, interval (-4, -2)
C) centre 0, radius \infty , interval (- \infty , \infty )
D) centre -3, radius \infty , interval (- \infty , \infty )
E) centre -3, radius <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre -3, radius 1, interval [-4, -2] B) centre -3, radius 1, interval (-4, -2) C) centre 0, radius \infty , interval (- \infty , \infty ) D) centre -3, radius \infty , interval (- \infty , \infty ) E) centre -3, radius , interval <div style=padding-top: 35px> , interval <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre -3, radius 1, interval [-4, -2] B) centre -3, radius 1, interval (-4, -2) C) centre 0, radius \infty , interval (- \infty , \infty ) D) centre -3, radius \infty , interval (- \infty , \infty ) E) centre -3, radius , interval <div style=padding-top: 35px>
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Deck 10: Sequences, Series, and Power Series
1
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? (a) increasing (or ultimately increasing) (b) decreasing (or ultimately decreasing) (c) positive (or ultimately positive) (d) negative (or ultimately negative) (e) bounded below only (f) bounded above only (g) bounded (h) unbounded above and below (i) alternating (j) divergent (but not to \infty or - \infty ) (k) divergent to \infty (l) divergent to - \infty (m) convergent</strong> A) (a), (c), (e), (m) B) (a), (c), (f), (j) C) (a), (c), (g), (m) D) (b), (c), (g), (l) E) (a), (c), (e), (k) ?
(a) increasing (or ultimately increasing)
(b) decreasing (or ultimately decreasing)
(c) positive (or ultimately positive)
(d) negative (or ultimately negative)
(e) bounded below only
(f) bounded above only
(g) bounded
(h) unbounded above and below
(i) alternating
(j) divergent (but not to \infty or - \infty )
(k) divergent to \infty
(l) divergent to - \infty
(m) convergent

A) (a), (c), (e), (m)
B) (a), (c), (f), (j)
C) (a), (c), (g), (m)
D) (b), (c), (g), (l)
E) (a), (c), (e), (k)
(a), (c), (g), (m)
2
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) .

A) 0
B) 1
C) 2
D) 3
E) <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E)
2
3
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? </strong> A) (g), (i), (m) B) (b), (f), (m) C) (g), (i), (j) D) (b), (c), (i), (l) E) (g), (i), (k) ?<strong>Which of the following descriptors apply to the sequence ? </strong> A) (g), (i), (m) B) (b), (f), (m) C) (g), (i), (j) D) (b), (c), (i), (l) E) (g), (i), (k)

A) (g), (i), (m)
B) (b), (f), (m)
C) (g), (i), (j)
D) (b), (c), (i), (l)
E) (g), (i), (k)
(g), (i), (m)
4
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) -1 .

A) 0
B) 1
C) 2
D) 3
E) -1
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5
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? (a) increasing (or ultimately increasing) (b) decreasing (or ultimately decreasing) (c) positive (or ultimately positive) (d) negative (or ultimately negative) (e) bounded below only (f) bounded above only (g) bounded (h) unbounded above and below (i) alternating (j) divergent (but not to \infty or - \infty ) (k) divergent to \infty (l) divergent to - \infty (m) convergent</strong> A) (g), (i), (m) B) (a), (f), (m) C) (g), (i), (j) D) (b), (c), (i), (l) E) (g), (i), (k) ?
(a) increasing (or ultimately increasing)
(b) decreasing (or ultimately decreasing)
(c) positive (or ultimately positive)
(d) negative (or ultimately negative)
(e) bounded below only
(f) bounded above only
(g) bounded
(h) unbounded above and below
(i) alternating
(j) divergent (but not to \infty or - \infty )
(k) divergent to \infty
(l) divergent to - \infty
(m) convergent

A) (g), (i), (m)
B) (a), (f), (m)
C) (g), (i), (j)
D) (b), (c), (i), (l)
E) (g), (i), (k)
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6
Which of the following descriptors apply to the sequence <strong>Which of the following descriptors apply to the sequence ? (a) increasing (or ultimately increasing) (b) decreasing (or ultimately decreasing) (c) positive (or ultimately positive) (d) negative (or ultimately negative) (e) bounded below only (f) bounded above only (g) bounded (h) unbounded above and below (i) alternating (j) divergent (but not to \infty or - \infty ) (k) divergent to \infty (l) divergent to - \infty (m) convergent</strong> A) (a), (d), (f), (l) B) (a), (f), (m) C) (a), (c), (e), (k) D) (b), (f), (j) E) (b), (d), (f), (l) ?
(a) increasing (or ultimately increasing)
(b) decreasing (or ultimately decreasing)
(c) positive (or ultimately positive)
(d) negative (or ultimately negative)
(e) bounded below only
(f) bounded above only
(g) bounded
(h) unbounded above and below
(i) alternating
(j) divergent (but not to \infty or - \infty )
(k) divergent to \infty
(l) divergent to - \infty
(m) convergent

A) (a), (d), (f), (l)
B) (a), (f), (m)
C) (a), (c), (e), (k)
D) (b), (f), (j)
E) (b), (d), (f), (l)
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7
Let <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . = <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . , n = 1, 2, 3,...
Which of the following statements about the sequence <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to . is true?

A) The sequence is decreasing with a lower bound equal to . <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to .
B) The sequence is increasing with an upper bound equal to . <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to .
C) The sequence is increasing with a lower bound equal to 0.
D) The sequence is not monotonic and also unbounded.
E) The sequence is decreasing with an upper bound equal to . <strong>Let = , n = 1, 2, 3,... Which of the following statements about the sequence is true?</strong> A) The sequence is decreasing with a lower bound equal to . B) The sequence is increasing with an upper bound equal to . C) The sequence is increasing with a lower bound equal to 0. D) The sequence is not monotonic and also unbounded. E) The sequence is decreasing with an upper bound equal to .
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8
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) 6 .

A) 0
B) 1
C) 2
D) 3
E) 6
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9
The sequence <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 is defined recursively by <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 = <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 , <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 = <strong>The sequence is defined recursively by = , = , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.</strong> A) 1 B) -4 or 1 C) -1 or 4 D) -1 E) 4 , n = 1, 2, 3,...Assuming the sequence converges to the real number L, find L.

A) 1
B) -4 or 1
C) -1 or 4
D) -1
E) 4
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10
Find the limit of the sequence { <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty }, where <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty = <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty - <strong>Find the limit of the sequence { }, where = - .</strong> A) -54 B) 54 C) - \infty D) 0 E) \infty .

A) -54
B) 54
C) - \infty
D) 0
E) \infty
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11
Show that the sequence Show that the sequence converges, and find its limit. converges, and find its limit.
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12
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 0 B) 1 C) 2 D) 3 E) This sequence is divergent. .

A) 0
B) 1
C) 2
D) 3
E) This sequence is divergent.
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13
Find, if it exists, the limit of the sequence { <strong>Find, if it exists, the limit of the sequence { }, where a<sub>n</sub> = .</strong> A) 0 B) 1 C) 2 D) 3 E) The limit does not exist. }, where an = <strong>Find, if it exists, the limit of the sequence { }, where a<sub>n</sub> = .</strong> A) 0 B) 1 C) 2 D) 3 E) The limit does not exist. .

A) 0
B) 1
C) 2
D) 3
E) The limit does not exist.
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14
The sequence <strong>The sequence </strong> A) diverges to - \infty . B) converges to 0. C) converges to 3. D) diverges to + \infty . E) converges to - 4.

A) diverges to - \infty .
B) converges to 0.
C) converges to 3.
D) diverges to + \infty .
E) converges to - 4.
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15
Find the limit of the sequence <strong>Find the limit of the sequence .</strong> A) 9 B) 3 C) -3 D) 0 E) -9 .

A) 9
B) 3
C) -3
D) 0
E) -9
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16
If {| If {| |} converges, then { } converges. |} converges, then { If {| |} converges, then { } converges. } converges.
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17
If { If { } converges, then {| |} converges. } converges, then {| If { } converges, then {| |} converges. |} converges.
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18
If { If { } converges, then must diverge. } converges, then If { } converges, then must diverge. must diverge.
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19
If { If { } converges and { } converges, then must converge. } converges and { If { } converges and { } converges, then must converge. } converges, then If { } converges and { } converges, then must converge. must converge.
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20
<strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is is the <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is partial sum of an infinite series <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is . Find <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is . Determine if the series is convergent or divergent, and if convergent find its sum.

A) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is , <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = - <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is for n \ge 2; series converges, sum is 0
B) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is for n \ge 1; series converges, sum is 1
C) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is , <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = - <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is for n \ge 2; series converges, sum is <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is
D) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is for n \ge 1; series converges, sum is <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is
E) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is for n \ge 1; series converges, sum is <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , = - for n \ge 2; series converges, sum is 0 B) = for n \ge 1; series converges, sum is 1 C) = , = - for n \ge 2; series converges, sum is D) = for n \ge 1; series converges, sum is E) = for n \ge 1; series converges, sum is
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21
<strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 is the <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 partial sum of an infinite series <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 . Find <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 . Determine if the series is convergent or divergent, and if convergent find its sum.

A) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 , series diverges to \infty

B) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 , series diverges to \infty

C) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 , series converges to 1
D) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 , series converges to 2
E) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series diverges to \infty B) = , series diverges to \infty C) = , series converges to 1 D) = , series converges to 2 E) = , series converges to 1 , series converges to 1
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22
<strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty is the <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty partial sum of an infinite series <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty . Find <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty . Determine if the series is convergent or divergent, and if convergent find its sum.

A) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty , series converges to <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty
B) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty , series converges to 1
C) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty , series converges to 2
D) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty , series diverges to \infty

E) <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty = <strong> = is the partial sum of an infinite series . Find . Determine if the series is convergent or divergent, and if convergent find its sum.</strong> A) = , series converges to B) = , series converges to 1 C) = , series converges to 2 D) = , series diverges to \infty E) = , series diverges to \infty , series diverges to \infty
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23
Find the sum of the series 4 - 1 + <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) - <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E) +...

A) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E)
B) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E)
C) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E)
D) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E)
E) <strong>Find the sum of the series 4 - 1 + - +...</strong> A) B) C) D) E)
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24
On what interval of values of x does the series <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum = converge? What is its sum for x in that interval?

A) (-1, 1), sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum =
B) (-1, 1), sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum =
C) (-1, 1], sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum =
D) [-1, 1), sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum =
E) [-1, 1], sum = <strong>On what interval of values of x does the series converge? What is its sum for x in that interval?</strong> A) (-1, 1), sum = B) (-1, 1), sum = C) (-1, 1], sum = D) [-1, 1), sum = E) [-1, 1], sum =
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25
Find the sum of the series <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) +... + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) +... = <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges) .

A) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges)
B) 1
C) 2
D) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) 1 C) 2 D) E) \infty (series diverges)
E) \infty (series diverges)
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26
The geometric series <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is .

A) converges and its sum is . <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is .
B) converges and its sum is . <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is .
C) diverges and hence it has no sum.
D) converges and its sum is 4.
E) converges and its sum is . <strong>The geometric series </strong> A) converges and its sum is . B) converges and its sum is . C) diverges and hence it has no sum. D) converges and its sum is 4. E) converges and its sum is .
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27
Find the sum of the series <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above +... + <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above +... = <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above .

A) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above
B) <strong>Find the sum of the series + + +... + +... = .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above
C) 1
D) \infty (series diverges)
E) none of the above
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28
Find the sum of the series <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges)

A) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges)
B) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges)
C) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges)
D) <strong>Find the sum of the series </strong> A) B) C) D) E) \infty (series diverges)
E) \infty (series diverges)
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29
Evaluate . <strong>Evaluate . </strong> A) B) C) D) E) series diverges <strong>Evaluate . </strong> A) B) C) D) E) series diverges

A) <strong>Evaluate . </strong> A) B) C) D) E) series diverges
B) <strong>Evaluate . </strong> A) B) C) D) E) series diverges
C) <strong>Evaluate . </strong> A) B) C) D) E) series diverges
D) <strong>Evaluate . </strong> A) B) C) D) E) series diverges
E) series diverges
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30
Evaluate <strong>Evaluate .</strong> A) e B) 1 C) D) E) \infty (series diverges) .

A) e
B) 1
C) <strong>Evaluate .</strong> A) e B) 1 C) D) E) \infty (series diverges)
D) <strong>Evaluate .</strong> A) e B) 1 C) D) E) \infty (series diverges)
E) \infty (series diverges)
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31
Show that the infinite series Show that the infinite series converges, and find its sum.Hint : Verify that = - . converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - . Show that the infinite series converges, and find its sum.Hint : Verify that = - .
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32
Evaluate <strong>Evaluate .</strong> A) -1 B) 0 C) 1 D) E) no sum, series diverges .

A) -1
B) 0
C) 1
D) <strong>Evaluate .</strong> A) -1 B) 0 C) 1 D) E) no sum, series diverges
E) no sum, series diverges
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33
Find the sum <strong>Find the sum .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above .

A) <strong>Find the sum .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above
B) <strong>Find the sum .</strong> A) B) C) 1 D) \infty (series diverges) E) none of the above
C) 1
D) \infty (series diverges)
E) none of the above
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34
Find the sum of the series <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges) .

A) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges)
B) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges)
C) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges)
D) <strong>Find the sum of the series .</strong> A) B) C) D) E) \infty (series diverges)
E) \infty (series diverges)
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35
Find the sum of the series <strong>Find the sum of the series .</strong> A) 2 B) 3 C) 1 D) 4 E) \infty (series diverges) .

A) 2
B) 3
C) 1
D) 4
E) \infty (series diverges)
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36
If If diverges to infinity and \neq 0 for all n, then converges. diverges to infinity and If diverges to infinity and \neq 0 for all n, then converges. \neq 0 for all n, then If diverges to infinity and \neq 0 for all n, then converges. converges.
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37
If If and both diverge, then also diverges. and If and both diverge, then also diverges. both diverge, then If and both diverge, then also diverges. also diverges.
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38
If If converges, then = 0. converges, then If converges, then = 0. If converges, then = 0. = 0.
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39
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40
The series The series converges. converges.
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41
The series The series converges. converges.
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42
The series The series converges. converges.
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43
The series The series converges. converges.
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44
For exactly what values of the constant k does the series <strong>For exactly what values of the constant k does the series converge?</strong> A) p > 2 B) p \ge 2 C) p < 1 D) p \le 1 E) p > 1 converge?

A) p > 2
B) p \ge 2
C) p < 1
D) p \le 1
E) p > 1
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45
Find all values of the nonzero constant real number p such that the series <strong>Find all values of the nonzero constant real number p such that the series is convergent.</strong> A) p > 1 B) 0 < P \le 1 C) 0 < P \le D) p < 0 E) p > 0 is convergent.

A) p > 1
B) 0 < P \le 1
C) 0 < P \le <strong>Find all values of the nonzero constant real number p such that the series is convergent.</strong> A) p > 1 B) 0 < P \le 1 C) 0 < P \le D) p < 0 E) p > 0
D) p < 0
E) p > 0
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46
For exactly what values of the constant p does the series <strong>For exactly what values of the constant p does the series converge?</strong> A) p \ge 1 B) p > 1 C) p \ge 2 D) p > 2 E) p > 0 converge?

A) p \ge 1
B) p > 1
C) p \ge 2
D) p > 2
E) p > 0
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47
For exactly what values of the constant p does the series <strong>For exactly what values of the constant p does the series converge?</strong> A) -3 < p < 3 B) -3 \le p \le 3 C) 0 \le p \le 3 D) 0 < p < 3 E) -3 < p < 0 converge?

A) -3 < p < 3
B) -3 \le p \le 3
C) 0 \le p \le 3
D) 0 < p < 3
E) -3 < p < 0
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48
The P-series <strong>The P-series , x > 0 converges for all x such that:</strong> A) x > 1 B) x \ge 1 C) 0 < x < 1 D) 0 < x \le 1 E) x (- \infty , \infty ) , x > 0 converges for all x such that:

A) x > 1
B) x \ge 1
C) 0 < x < 1
D) 0 < x \le 1
E) x <strong>The P-series , x > 0 converges for all x such that:</strong> A) x > 1 B) x \ge 1 C) 0 < x < 1 D) 0 < x \le 1 E) x (- \infty , \infty ) (- \infty , \infty )
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49
The series The series converges. converges.
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50
The series The series converges. converges.
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51
The series The series converges. converges.
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52
Use the integral test bounds to estimate the sum of the series <strong>Use the integral test bounds to estimate the sum of the series using the first three terms.</strong> A) 104 B) 140 C) 119 D) 101 E) 98 using the first three terms.

A) 104
B) 140
C) 119
D) 101
E) 98
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53
What is the largest positive constant K such that if 0 < p < K, then <strong>What is the largest positive constant K such that if 0 < p < K, then must converge?</strong> A) 1 B) 2 C) 4 D) 8 E) 9 must converge?

A) 1
B) 2
C) 4
D) 8
E) 9
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54
Give an upper bound for the error when <strong>Give an upper bound for the error when is approximated by the partial sum .</strong> A) 0.0004 B) 0.0001 C) 0.00004 D) 0.00001 E) 0.004 is approximated by the partial sum <strong>Give an upper bound for the error when is approximated by the partial sum .</strong> A) 0.0004 B) 0.0001 C) 0.00004 D) 0.00001 E) 0.004 .

A) 0.0004
B) 0.0001
C) 0.00004
D) 0.00001
E) 0.004
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55
Give an upper bound for the error when e = <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 is approximated by the partial sum <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 . How large should n be taken to ensure that the error is less than 0.001?

A) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 , n = 7
B) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 , n = 8
C) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 , n = 7
D) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 , n = 8
E) <strong>Give an upper bound for the error when e = is approximated by the partial sum . How large should n be taken to ensure that the error is less than 0.001?</strong> A) , n = 7 B) , n = 8 C) , n = 7 D) , n = 8 E) , n = 6 , n = 6
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56
The series The series converges. converges.
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57
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58
The series The series converges. converges.
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59
The series The series converges. converges.
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60
The series The series converges. converges.
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61
The series The series converges. converges.
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62
The series The series converges. converges.
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63
The series The series is an alternating series. is an alternating series.
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64
For what values of x does the series <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) x = 0 only, ~~~~~~~~ (b) nowhere B) (a) -1 < x < 1, ~~~~~~~~ (b) nowhere C) (a) -1 < x < 1, ~~~~~~~~ (b) x = -1 and x = 1 D) (a) all real x, ~~~~~~~~ (b) nowhere E) (a) -1 < x < 1, ~~~~~~~~ (b) x = 1
(a) converge absolutely?
(b) converge conditionally?

A) (a) x = 0 only,         ~~~~~~~~ (b) nowhere
B) (a) -1 < x < 1,         ~~~~~~~~ (b) nowhere
C) (a) -1 < x < 1,         ~~~~~~~~ (b) x = -1 and x = 1
D) (a) all real x,         ~~~~~~~~ (b) nowhere
E) (a) -1 < x < 1,         ~~~~~~~~ (b) x = 1
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65
For what values of x does the series <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = 1 B) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = -1 and x = 5 C) (a) on the interval [1, 5], ~~~~~~~~ (b) nowhere D) (a) on the interval [1, 5), ~~~~~~~~ (b) at x = 5 E) (a) all real x, ~~~~~~~~ (b) nowhere <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = 1 B) (a) on the interval (1, 5), ~~~~~~~~ (b) at x = -1 and x = 5 C) (a) on the interval [1, 5], ~~~~~~~~ (b) nowhere D) (a) on the interval [1, 5), ~~~~~~~~ (b) at x = 5 E) (a) all real x, ~~~~~~~~ (b) nowhere
(a) converge absolutely?
(b) converge conditionally?

A) (a) on the interval (1, 5),         ~~~~~~~~ (b) at x = 1
B) (a) on the interval (1, 5),         ~~~~~~~~ (b) at x = -1 and x = 5
C) (a) on the interval [1, 5],         ~~~~~~~~ (b) nowhere
D) (a) on the interval [1, 5),         ~~~~~~~~ (b) at x = 5
E) (a) all real x,         ~~~~~~~~ (b) nowhere
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66
For what values of x does the series <strong>For what values of x does the series (a) converge absolutely? (b) converge conditionally?</strong> A) (a) on the interval (-2, -1), ~~~~~~~~ (b) at x = -2 and x = -1 B) (a) on the interval [-2, -1] ~~~~~~~~ (b) nowhere C) (a) on the interval (-2, -1), ~~~~~~~~ (b) for x < -2 D) (a) on the interval (-3, 0), ~~~~~~~~ (b) at x = -3 and x = 0 E) (a) on the interval [-2, -1), ~~~~~~~~ (b) at x = -1
(a) converge absolutely?
(b) converge conditionally?

A) (a) on the interval (-2, -1),         ~~~~~~~~ (b) at x = -2 and x = -1
B) (a) on the interval [-2, -1]         ~~~~~~~~ (b) nowhere
C) (a) on the interval (-2, -1),         ~~~~~~~~ (b) for x < -2
D) (a) on the interval (-3, 0),         ~~~~~~~~ (b) at x = -3 and x = 0
E) (a) on the interval [-2, -1),         ~~~~~~~~ (b) at x = -1
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67
Which of the three series (i) <strong>Which of the three series (i) (ii) (iii) is conditionally convergent?</strong> A) series (iii) B) series (i) C) series (i) and (iii) D) series (ii) E) All three (ii) <strong>Which of the three series (i) (ii) (iii) is conditionally convergent?</strong> A) series (iii) B) series (i) C) series (i) and (iii) D) series (ii) E) All three (iii) <strong>Which of the three series (i) (ii) (iii) is conditionally convergent?</strong> A) series (iii) B) series (i) C) series (i) and (iii) D) series (ii) E) All three
is conditionally convergent?

A) series (iii)
B) series (i)
C) series (i) and (iii)
D) series (ii)
E) All three
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68
Which of the three series (i) <strong>Which of the three series (i) (ii) (iii) is absolutely convergent?</strong> A) series (i) and (ii) B) series (i) C) series (ii) and (iii) D) series (i) and (iii) E) none of the series (ii) <strong>Which of the three series (i) (ii) (iii) is absolutely convergent?</strong> A) series (i) and (ii) B) series (i) C) series (ii) and (iii) D) series (i) and (iii) E) none of the series (iii) <strong>Which of the three series (i) (ii) (iii) is absolutely convergent?</strong> A) series (i) and (ii) B) series (i) C) series (ii) and (iii) D) series (i) and (iii) E) none of the series is absolutely convergent?

A) series (i) and (ii)
B) series (i)
C) series (ii) and (iii)
D) series (i) and (iii)
E) none of the series
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69
For what values of x does the series <strong>For what values of x does the series converge? </strong> A) on the interval [1, \infty ) B) on the intervals (- \infty , -1] and [1, \infty ) C) for all x \neq 0 D) for x = 2 only E) on the interval (- \infty , -1] <strong>For what values of x does the series converge? </strong> A) on the interval [1, \infty ) B) on the intervals (- \infty , -1] and [1, \infty ) C) for all x \neq 0 D) for x = 2 only E) on the interval (- \infty , -1]
converge?

A) on the interval [1, \infty )
B) on the intervals (- \infty , -1] and [1, \infty )
C) for all x \neq 0
D) for x = 2 only
E) on the interval (- \infty , -1]
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70
For what values of x does the series <strong>For what values of x does the series converge?</strong> A) on the intervals (- \infty , -1] and [1, \infty ) B) on the intervals (- \infty , -1) and (1, \infty ) C) on the interval [-1, 1] D) on the interval (-1, 1) E) on the interval [1, \infty ) converge?

A) on the intervals (- \infty , -1] and [1, \infty )
B) on the intervals (- \infty , -1) and (1, \infty )
C) on the interval [-1, 1]
D) on the interval (-1, 1)
E) on the interval [1, \infty )
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71
For what values of x does the series ln x + <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 + <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 + <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 +... converge?

A) <strong>For what values of x does the series ln x + + + +... converge?</strong> A) < x < e B) 0 < x < e C) 1 < x < e D) 0 < x < \infty E) 0 < x < 1 < x < e
B) 0 < x < e
C) 1 < x < e
D) 0 < x < \infty
E) 0 < x < 1
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72
If If is conditionally convergent, then must be divergent. is conditionally convergent, then If is conditionally convergent, then must be divergent. must be divergent.
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73
If If is divergent, then must be conditionally convergent. is divergent, then If is divergent, then must be conditionally convergent. must be conditionally convergent.
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74
By possibly rearranging its terms, the series By possibly rearranging its terms, the series can be forced to have the sum 17. can be forced to have the sum 17.
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75
Find the radius, centre, and interval of convergence of the series <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 0, radius 1, interval [-1, 1) B) centre 0, radius 1, interval [-1, 1] C) centre 0, radius 1, interval (-1, 1) D) centre 0, radius \infty , interval (- \infty , \infty ) E) centre 0, radius 1, interval (-1, 1] .

A) centre 0, radius 1, interval [-1, 1)
B) centre 0, radius 1, interval [-1, 1]
C) centre 0, radius 1, interval (-1, 1)
D) centre 0, radius \infty , interval (- \infty , \infty )
E) centre 0, radius 1, interval (-1, 1]
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76
Find the radius, centre, and interval of convergence of the series <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , .

A) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval ,
B) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval ,
C) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval ,
D) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval ,
E) centre 1, radius <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , , interval <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval , , <strong>Find the radius, centre, and interval of convergence of the series .</strong> A) centre 1, radius , interval B) centre 1, radius , interval C) centre 1, radius , interval D) centre 1, radius , interval E) centre 1, radius , interval ,
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77
The interval of convergence of the power series <strong>The interval of convergence of the power series is given by [-7, -3).Find the centre c and the radius of convergence R of the power series.</strong> A) c = -10, R = 4 B) c = -5, R = 2 C) c = -4, R = 10 D) c = -2, R = 5 E) c = 2, R = -5 is given by [-7, -3).Find the centre c and the radius of convergence R of the power series.

A) c = -10, R = 4
B) c = -5, R = 2
C) c = -4, R = 10
D) c = -2, R = 5
E) c = 2, R = -5
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78
Find the centre, radius, and interval of convergence of the series <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre 0, radius 1, interval [-1, 1] B) centre 0, radius 1, interval (-1, 1] C) centre 0, radius 1, interval (-1, 1) D) centre 0, radius 2, interval (-2, 2) E) centre 0, radius 1, interval [-1, 1)

A) centre 0, radius 1, interval [-1, 1]
B) centre 0, radius 1, interval (-1, 1]
C) centre 0, radius 1, interval (-1, 1)
D) centre 0, radius 2, interval (-2, 2)
E) centre 0, radius 1, interval [-1, 1)
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79
Find the centre, radius, and interval of convergence of the series <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre 4, radius 3, interval (1, 7] B) centre 4, radius 3, interval [1, 7) C) centre 4, radius 1, interval [3, 5] D) centre 4, radius 1, interval (3, 5) E) centre 4, radius 1, interval (3, 5]

A) centre 4, radius 3, interval (1, 7]
B) centre 4, radius 3, interval [1, 7)
C) centre 4, radius 1, interval [3, 5]
D) centre 4, radius 1, interval (3, 5)
E) centre 4, radius 1, interval (3, 5]
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80
Find the centre, radius, and interval of convergence of the series <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre -3, radius 1, interval [-4, -2] B) centre -3, radius 1, interval (-4, -2) C) centre 0, radius \infty , interval (- \infty , \infty ) D) centre -3, radius \infty , interval (- \infty , \infty ) E) centre -3, radius , interval

A) centre -3, radius 1, interval [-4, -2]
B) centre -3, radius 1, interval (-4, -2)
C) centre 0, radius \infty , interval (- \infty , \infty )
D) centre -3, radius \infty , interval (- \infty , \infty )
E) centre -3, radius <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre -3, radius 1, interval [-4, -2] B) centre -3, radius 1, interval (-4, -2) C) centre 0, radius \infty , interval (- \infty , \infty ) D) centre -3, radius \infty , interval (- \infty , \infty ) E) centre -3, radius , interval , interval <strong>Find the centre, radius, and interval of convergence of the series </strong> A) centre -3, radius 1, interval [-4, -2] B) centre -3, radius 1, interval (-4, -2) C) centre 0, radius \infty , interval (- \infty , \infty ) D) centre -3, radius \infty , interval (- \infty , \infty ) E) centre -3, radius , interval
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