Use the definition of the series to determine if the following series are convergent or divergent.

1)
∑
𝑛
=
1
∞
𝑐
𝑜
𝑠
(
𝑛
𝜋
)
is
[ Select ]
divergent
convergent
.

2)
∑
𝑛
=
1
∞
1
2
𝑛
is
[ Select ]
convergent
divergent
.

3)
∑
𝑘
=
1
∞
ln
⁡
(
𝑘
𝑘
+
1
)
is
[ Select ]
divergent
convergent
. Hint: you may need to use the property of logarithmic function to rewrite
ln
⁡
(
𝑘
𝑘
+
1
)
.

4)
∑
𝑛
=
1
∞
1
𝑛
2
+
3
𝑛
+
2
is
[ Select ]
divergent
convergent
. Hint: you may need to use the partial fraction here to find your partial sum.

Question

Use the definition of the series to determine if the following series are convergent or divergent.

1) 
∑
𝑛
=
1
∞
𝑐
𝑜
𝑠
(
𝑛
𝜋
)
 is 
[ Select ]
divergent
convergent
 .

2) 
∑
𝑛
=
1
∞
1
2
𝑛
 is 
[ Select ]
convergent
divergent
 .

3) 
∑
𝑘
=
1
∞
ln
⁡
(
𝑘
𝑘
+
1
)
 is 
[ Select ]
divergent
convergent
 . Hint: you may need to use the property of logarithmic function to rewrite 
ln
⁡
(
𝑘
𝑘
+
1
)
.

4) 
∑
𝑛
=
1
∞
1
𝑛
2
+
3
𝑛
+
2
 is 
[ Select ]
divergent
convergent
 . Hint: you may need to use the partial fraction here to find your partial sum.

BlackTom AI · Accepted Answer

To analyze each series, I’ll consider the definition or a standard test that applies to the general form.
Option 1: The series ∑_{n=1}^∞ cos(nπ). Since cos(nπ) = (-1)^n, the terms do not tend to 0 (they alternate between -1 and 1). A necessary condition for convergence is that the terms go to 0, so this series diverges regardless of any alternating behavior.
Option 2: The series ∑_{n=1}^∞ (1/2^n). This is a geometric series with ratio r = 1/2, which satisfies |r| < 1. Geometric series with such a ratio converge, with sum equal to (1/2)/(1 - 1/2) = 1. Hence this one converges.
Option 3: The series ∑_{k=1}^∞ ln(k/(k+1)). Note that ln(k/(k+1)) = ln(k) - ln(k+1). The partial sum up to N is ∑_{k=1}^N [ln(k) - ln(k+1)] = ln(1) - ln(N+1) = -ln(N+1). As N → ∞, -ln(N+1) → -∞, so the series diverges (to negative infinity). It does not settle to a finite value.
Option 4: The series ∑_{n=1}^∞ 1/(n^2 + 3n + 2). Factor the denominator: n^2 + 3n + 2 = (n+1)(n+2). Use partial fraction decomposition: 1/[(n+1)(n+2)] = 1/(n+1) - 1/(n+2). The partial sums telescope: ∑_{n=1}^N [1/(n+1) - 1/(n+2)] = 1/2 - 1/(N+2), which tends to 1/2 as N → ∞. Therefore, this series converges.

MAT137Y1 LEC 20249: Calculus with Proofs (all lecture sections) Pre-Class Quiz 57 (13.1-13.4)

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