Calculus2
Improper Integrals
� 1, 2 For the given area function A(t), do the following:
a) Compute the integral to find the formula for A(t).
b) Use your formula to evaluate A(t) at t = 10, 100, and 1000.
c) Calculate lim t→∞
A(t).
1. A(t) =
∫ t 1
1
x3 dx.
2. A(t) =
∫ t 1
1 √ x dx.
� 3–10 (a) Sketch the curve at issue, and (b) compute the integral.
3.
∫ ∞ 0
x
(x2 + 1)2 dx 4.
∫ ∞ 2π
sin θdθ
5.
∫ ∞ 1
ln x
x dx 6.
∫ ∞ 1
ln x
x2 dx
7.
∫ ∞ −∞
ye−y 2
dy 8.
∫ 3 2
1 √
3 −z dz
9.
∫ 1 −1
ex
ex − 1 dx 10.
∫ 1 0
1 √
1 −x2 dx Hint: You may use tables.
. . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .
11. Consider
∫ ∞ 1
1
xp dx.
We showed in class that this integral diverges when p = 1. Determine whether the integral converges or diverges for (a) p > 1 and (b) p < 1.
Hint: You only need to compute the integral once. Then evaluate the resulting limit for the cases separately.
� 12, 13 Use the Comparison Test to determine whether the integral is convergent or divergent. You may cite your result from Problem (11) if applicable.
12.
∫ ∞ 1
x √ x3 − 1
dx
13.
∫ ∞ 1
cos2 x
1 + x2 dx Hint: cos2 x ≤ 1 for all x.
1 of 2
Solutions to Selected Problems
1. a) A(t) = t2 − 1
2t2
b) A(10) = 0.495 A(100) = 0.49995 A(1, 000) = 0.4999995
c) 1 2
2. a) A(t) = 2 √ t− 2
b) A(10) ≈ 4.32 A(100) = 18 A(1, 000) ≈ 61.25
c) ∞
3. 1 2
4. Diverges
5. Diverges
6. 1
7. 0
8. 2
9. Diverges
10. π 2
11. a) Converges if p > 1
b) Diverges if p < 1
12. Divergent
13. Convergent
2 of 2