Lesson 2: Summarizing Data

Exercise Answers

Exercise 2.1

1. C
2. A
3. D
4. A
5. D

Exercise 2.2

Exercise 2.3

1. Create frequency distribution (done in Exercise 2.2, above)
2. Identify the value that occurs most often.
   Most common value is 1, so mode is 1 previous vaccination.

Exercise 2.4

1. Arrange the observations in increasing order.
   0, 0, 1, 1, 1, 1, 1, 2, 2, 2, 2, 3, 3, 3, 4, 5, 6, 8, 12
2. Find the middle position of the distribution with 19 observations.
   Middle position = (19 + 1) ⁄ 2 = 10
3. Identify the value at the middle position.
   0, 0, 1, 1, 1, 1, 1, 2, 2, *2*, 2, 3, 3, 3, 4, 5, 6, 8, 12
   Counting from the left or right to the 10^th position, the value is 2. So the median = 2 previous vaccinations.

Exercise 2.5

1. Add all of the observed values in the distribution.
   2 + 0 + 3 + 1 + 0 + 1 + 2 + 2 + 4 + 8 + 1 + 3 + 3 + 12 + 1 + 6 + 2 + 5 + 1 = 57
2. Divide the sum by the number of observations
   57 ⁄ 19 = 3.0
   
   So the mean is 3.0 previous vaccinations

Exercise 2.6

Using Method A:

1. Take the log (in this case, to base 2) of each value.

   ID #	Convalescent	Log base 2
   1	1:512	9
   2	1:512	9
   3	1:128	7
   4	1:512	9
   5	1:1024	10
   6	1:1024	10
   7	1:2048	11
   8	1:128	7
   9	1:4096	12
   10	1:1024	10

2. Calculate the mean of the log values by summing and dividing by the number of observations (10).
   Mean of log₂(x_i) = (9 + 9 + 7 + 9 + 10 + 10 + 11 + 7 + 12 + 10) ⁄ 10 = 94 ⁄ 10 = 9.4
3. Take the antilog of the mean of the log values to get the geometric mean.
   Antilog₂(9.4) = 2^9.4 = 675.59. Therefore, the geometric mean dilution titer is 1:675.6.

Exercise 2.7

1. E or A; equal number of patients in 1999 and 1998.
2. C or B; mean and median are very close, so either would be acceptable.
3. E or A; for a nominal variable, the most frequent category is the mode.
4. D
5. B; mean is skewed, so median is better choice.
6. B; mean is skewed, so median is better choice.

Exercise 2.8

1. Arrange the observations in increasing order.
   0, 0, 1, 1, 1, 1, 1, 2, 2, 2, 2, 3, 3, 3, 4, 5, 6, 8, 12
2. Find the position of the 1^st and 3^rd quartiles. Note that the distribution has 19 observations.
   Position of Q₁ = (n + 1) ⁄ 4 = (19 + 1) ⁄ 4 = 5
   Position of Q₃ = 3(n + 1) ⁄ 4 = 3(19 + 1) ⁄ 4 = 15
3. Identify the value of the 1^st and 3^rd quartiles.
   Value at Q₁ (position 5) = 1
   Value at Q₃ (position 15) = 4
4. Calculate the interquartile range as Q₃ minus Q₁.
   Interquartile range = 4 − 1 = 3
5. The median (at position 10) is 2. Note that the distance between Q₁ and the median is 2 − 1 = 1. The distance between Q₃ and the median is 4 − 2 = 2. This indicates that the vaccination data is skewed slightly to the right (tail points to greater number of previous vaccinations).

Exercise 2.9

1. Calculate the arithmetic mean.
   Mean = (2 + 0 + 3 + 1 + 0 + 1 + 2 + 2 + 4 + 8 + 1 + 3 + 3 + 12 + 1 + 6 + 2 + 5 + 1) ⁄ 19
   = 57 ⁄ 19
   = 3.0
2. Subtract the mean from each observation. Square the difference.
3. Sum the squared differences.

   Value Minus Mean	Difference	Difference Squared
   2 − 3.0	−1.0	1.0
   0 − 3.0	−3.0	9.0
   3 − 3.0	0.0	0.0
   1 − 3.0	−2.0	4.0
   0 − 3.0	− 3.0	9.0
   1 − 3.0	−2.0	4.0
   2 − 3.0	−1.0	1.0
   2 − 3.0	−1.0	1.0
   4 − 3.0	1.0	1.0
   8 −3.0	5.0	25.0
   1 − 3.0	−2.0	4.0
   57 − 57.0 = 0	0.0	162.0

4. Divide the sum of the squared differences by n − 1.
   Variance = 162 ⁄ (19 − 1) = 162 ⁄ 18 = 9.0 previous vaccinations squared
5. Take the square root of the variance. This is the standard deviation.
   Standard deviation = 9.0 = 3.0 previous vaccinations

Exercise 2.10

Standard error of the mean = 42 divided by the square root of 4,462 = 0.629

Exercise 2.11

1. Summarize the blood level data with a frequency distribution.
   Table 2.14 Frequency Distribution (1:g/dL Intervals) of Blood Lead Levels — Rural Village, 1996 (Intervals with No Observations Not Shown)

   Blood Lead Level (g/dL)	Frequency
   17	1
   26	2
   35	1
   38	1
   39	1
   44	1
   45	1
   46	1
   49	1
   50	1
   54	1
   56	1

   Blood Lead Level (g/dL)	Frequency
   57	2
   58	3
   61	1
   63	1
   64	1
   67	1
   68	1
   69	1
   72	1
   73	1
   74	1

   Blood Lead Level (g/dL)	Frequency
   76	2
   78	3
   79	1
   84	1
   86	1
   103	1
   104	1
   Unknown	48

   To summarize the data further you could use intervals of 5, 10, or perhaps even 20 mcg/dL. Table 2.15 below uses 10 mcg/dL intervals.

   Table 2.15 Frequency Distribution (10 mcg/dL Intervals) of Blood Lead Levels — Rural Village, 1996

   Blood Lead Level (g/dL)	Frequency
   0–9	0
   10–19	1
   20–29	2
   30–39	3
   40–49	6
   50–59	8
   60–69	6
   70–79	9
   80–89	2
   90–99	0
   100–110	2
   Total	39

2. Calculate the arithmetic mean.
   Arithmetic mean = sum ⁄ n = 2,363 ⁄ 39 = 60.6 mcg/dL
3. Identify the median and interquartile range.
   Median at (39 + 1) ⁄ 2 = 20^th position. Median = value at 20^th position = 58
   Q₁ at (39 + 1) ⁄ 4 = 10^th position. Q₁ = value at 10^th position = 48
   Q₃ at 3 × Q₁ position = 30^th position. Q₃ = value at 30^th position = 76
4. Subtract the arithmetic mean (question 2) from each of the 39 observed blood level levels.
   Square each of these differences (“deviations”).
   Sum the squared deviations = 14,577.59
   Divide the sum of the squared deviations by n-1 to find the variance.
   14,577.59 ∕ 39 = 383.62
   Take the square root of the variance to find the standard deviation.
   √383.62 = 19.6.
5. Calculate the geometric mean using the log lead levels provided.
   Geometric mean = 10^{(68.45 ⁄ 39)} = 10^(1.7551) = 56.9 mcg/dL