Test Bank For Applied Calculus 3rd Edition By Hughes-Hallett Thrash

460 Chapter Eleven /SOLUTIONS


Chapter 11 Exam Questions
Problems and Solutions for Section 11.1

1. Find the sum, if it exists, of
4 + 42 + 43 + · · · + 410
ANSWER:
This is a finite geometric series with a = 4, r = 4, n = 11. Thus

4(1 − 411 )
S= = 5, 592, 404
1−4

2. Find the sum, if it exists, of
100 + 100(1.03) + 100(1.03)2 + 100(1.03)3 + · · ·
ANSWER:
This is an infinite geometric series with a = 100, r = 1.03. Since r > 1, the series diverges.
3. Find the sum, if it exists, of
500 + 250 + 125 + 62.5 + · · ·
ANSWER:
This is an infinite geometric series with a = 500, r = 12 . Since −1 < r < 1, we get

a 500
S= = = 1000
1−r 1 − 21

4. Find the sum, if it exists, of
1 1 1
1− + − + ···
2 4 8
ANSWER:
This is an infinite geometric series with a = 1, r = − 12 . Since −1 < r < 1, we get

a 1 2
S= =
=
1−r 1 − − 12 3

5. Each quarter, $1000 is deposited into an account earning 1.2% interest a quarter, compounded quarterly.
(a) How much is in the account right before the 8th deposit?
(b) How much is in the account right after the 12th deposit?
ANSWER:
(a) The quantity in the account after n deposits is represented by the sum

Bn = 1000 + 1000(1.012) + 1000(1.012)2 + · · · + 1000(1.012)n−1 .

This is a finite geometric series with a = 1000, r = 1.012. Right after the 8 th deposit,

a(1 − r n ) 1000(1 − (1.012)8 )
S7 = = ≈ $8344.12.
1−r 1 − 1.012

Therefore, the amount right before the 8th deposit is

8344.12 − 1000 = $7344.12.

(b) Right after the 12th deposit,

a(1 − r n ) 1000(1 − (1.012)12 )
S12 = = ≈ $12, 824.55.
1−r 1 − 1.012

, 11.1 SOLUTIONS 461

6. Estimate the sum
10 + 10(0.3) + 10(0.3)2 + 10(0.3)3 + · · ·
by calculating the partial sums Sn for n = 1, 5, 10, and 50. Verify your estimate by calculating the infinite sum directly.
ANSWER:
For a finite geometric series with a = 10, r = 0.3,
S1 = 10
10(1 − (0.3)5 )
S5 = = 14.251
1 − 0.3
10(1 − (0.3)10 )
S10 = = 14.2856
1 − 0.3
10(1 − (0.3)50 )
S50 = = 14.2857
1 − 0.3
For an infinite series with a = 10, r = 0.3,
10
S= = 14.2857
1 − 0.3
7. Each week, a patient is given a 40 mg dose of an experimental vaccine, and 25% of the vaccine remains in the body after
one week. Find the quantity in the body
(a) Right after the 4th dose.
(b) After 1 year (52 doses).
ANSWER:
(a) The quantity in the body after n doses is represented by the sum
Qn = 40 + 40(0.25) + 40(0.25)2 + · · · + 40(0.25)n−1
This is a finite geometric series with a = 40, r = 0.25. Thus
40(1 − (0.25)4 )
Q4 = = 53.125mg
1 − 0.25
(b)
40(1 − (0.25)52 )
Q52 = ≈ 53.333mg
1 − 0.25
8. Does the infinite series
4 4 4 4
4 + √ + + 3/2 + 2 + · · ·
3 3 3 3
converge or diverge?
ANSWER:
4 4 4 4
4 + √ + + 3/2 + 2 + · · ·
3 3 3 3
is
a + ax + ax2 + ax3 + · · ·
1
with a = 4 and x = √ .
3
1
Since √ < 1, it converges.
3
9. Find the sum of the first 5 and the sum of the first 10 terms of the series in Exercise 8.
ANSWER:
  5 
4 1− √1
3
S5 = ≈ 8.857
1− √1
3
  10 
4 1− √1
3
S10 = ≈ 9.425
1− √1
3

,462 Chapter Eleven /SOLUTIONS

10. Find the sum of the series
15  
X 4 n
3
n=5

ANSWER:

15  
X  5  6  15
4 n 4 4 4
= + + ··· +
3 3 3 3
n=5
 5   2  10 
4 4 4 4
= 1+ + + ··· +
3 3 3 3
4 5



4 11
3
1− 3
= 4
≈ 286.68
1− 3

 
a a a a 1 2 1
11. If the sum of the series S = a + + + + is 3 − 3 , what is a?
3 9 27 81 2 3
ANSWER:
 
1 1 1 1
S =a 1+ + 2 + 3 + 4
3 3 3 3


a 1− 1 5 1

  
3 a 1− 35 1 1
Sum = 1
= 2
= 3a 1 − 5
1− 3 3
2 3
 
1 a
= 3a − 4 . So a = 3.
2 3
2
12. A ball is dropped from a height of 14 feet and bounces. Each bounce is of the height of the bounce before.
3
(a) Find an expression for the height to which the ball rises after it hits the floor for the h th time.
(b) Find the total vertical distance the ball has traveled when it hits the floor for the 4 th time.
ANSWER:
(a) Let hn be the height of the nth bounce after the ball hits the floor for the nth time. Then from Figure 11.1.331,


h0 = height before first bounce = 14 feet
 
2
h1 = height after first bounce = 14 feet
3
 2
2
h2 = height after second bounce = 14 feet
3


2 n
Generalizing gives hn = 14 3
.



6

6
14 6
14( 2 )
3
14( 2 )2
3
···
6
hn ···
? ? ? ?
Figure 11.1.331

, 11.1 SOLUTIONS 463

(b) Total vertical distance when the ball hits the floor for the 4th time is
     2    3 
2 2 2
14 + 2 14 + 2 14 + 2 14 ≈ 53.41 feet
3 3 3
1
13. A tennis ball is dropped from a height of 40 feet and bounces. Each bounce is the height of the bounce before. A
2
3
superball has a bounce the height of the bounce before, and is dropped from a height of 30 feet. Which ball bounces a
4
greater total vertical distance?
ANSWER:
Tennis ball:


6


6

40 6
40( 12 )
40( 1 )2
2
6
40( 1 )3
2


? ? ? ?

Figure 11.1.332


After the first drop of 40 feet, the total vertical distance is a geometric series with a = 40 and r = 1
2
:
1 1 1
40 + 2 · 40( ) + 2 · 40( )2 + 2 · 40( )3 + · · ·
2 2 2
which converges to 40 + 40/(1 − 12 ) = 120 feet.
Superball:



6


6

30 6
30( 34 )
30( 3 )2
4
6
30( 3 )3
4


? ? ? ?

Figure 11.1.333


After the first drop of 30 feet, the total vertical distance is a geometric series with a = 45 and r = 3
4
:
3 3 3
30 + 2 · 30( ) + 2 · 30( )2 + 2 · 30( )3 + · · ·
4 4 4
which converges to 30 + 45/(1 − 34 ) = 210 feet. So the superball travels more vertical distance than the tennis ball.