Once you have a set of data, you will need to organize it so that you can analyze how frequently each datum occurs in the set. However, when calculating the frequency, you may need to round your answers so that they are as precise as possible.
A simple way to round off answers is to carry your final answer one more decimal place than was present in the original data. Round off only the final answer. Do not round off any intermediate results, if possible. If it becomes necessary to round off intermediate results, carry them to at least twice as many decimal places as the final answer. Expect that some of your answers will vary from the text due to rounding errors.
It is not necessary to reduce most fractions in this course. Especially in Probability Topics, the chapter on probability, it is more helpful to leave an answer as an unreduced fraction.
The way a set of data is measured is called its level of measurement. Correct statistical procedures depend on a researcher being familiar with levels of measurement. Not every statistical operation can be used with every set of data. Data can be classified into four levels of measurement. They are as follows (from lowest to highest level):
Data that is measured using a nominal scale is qualitative (categorical). Categories, colors, names, labels, and favorite foods along with yes or no responses are examples of nominal level data. Nominal scale data are not ordered. For example, trying to classify people according to their favorite food does not make any sense. Putting pizza first and sushi second is not meaningful.
Smartphone companies are another example of nominal scale data. The data are the names of the companies that make smartphones, but there is no agreed upon order of these brands, even though people may have personal preferences. Nominal scale data cannot be used in calculations.
Data that is measured using an ordinal scale is similar to nominal scale data but there is a big difference. The ordinal scale data can be ordered. An example of ordinal scale data is a list of the top five national parks in the United States. The top five national parks in the United States can be ranked from one to five but we cannot measure differences between the data.
Another example of using the ordinal scale is a cruise survey where the responses to questions about the cruise are excellent, good, satisfactory, and unsatisfactory. These responses are ordered from the most desired response to the least desired. But the differences between two pieces of data cannot be measured. Like the nominal scale data, ordinal scale data cannot be used in calculations.
Data that is measured using the interval scale is similar to ordinal level data because it has a definite ordering but there is a difference between data. The differences between interval scale data can be measured though the data does not have a starting point.
Temperature scales like Celsius (C) and Fahrenheit (F) are measured by using the interval scale. In both temperature measurements, 40° is equal to 100° minus 60°. Differences make sense. But 0 degrees does not because, in both scales, 0 is not the absolute lowest temperature. Temperatures like –10 °F and –15 °C exist and are colder than 0.
Interval level data can be used in calculations, but one type of comparison cannot be done. 80 °C is not four times as hot as 20 °C (nor is 80 °F four times as hot as 20 °F). There is no meaning to the ratio of 80 to 20 (or four to one).
Data that is measured using the ratio scale takes care of the ratio problem and gives you the most information. Ratio scale data is like interval scale data, but it has a 0 point and ratios can be calculated. For example, four multiple choice statistics final exam scores are 80, 68, 20 and 92 (out of a possible 100 points). The exams are machine-graded.
The data can be put in order from lowest to highest 20, 68, 80, 92.
The differences between the data have meaning. The score 92 is more than the score 68 by 24 points. Ratios can be calculated. The smallest score is 0. So 80 is four times 20. The score of 80 is four times better than the score of 20.
Twenty students were asked how many hours they worked per day. Their responses, in hours, are as follows:
5, 6, 3, 3, 2, 4, 7, 5, 2, 3, 5, 6, 5, 4, 4, 3, 5, 2, 5, 3.
Table 1.12 lists the different data values in ascending order and their frequencies.
| DATA VALUE | FREQUENCY |
|---|---|
| 2 | 3 |
| 3 | 5 |
| 4 | 3 |
| 5 | 6 |
| 6 | 2 |
| 7 | 1 |
A frequency is the number of times a value of the data occurs. According to Table 1.12, there are three students who work two hours, five students who work three hours, and so on. The sum of the values in the frequency column, 20, represents the total number of students included in the sample.
A relative frequency is the ratio (fraction or proportion) of the number of times a value of the data occurs in the set of all outcomes to the total number of outcomes. To find the relative frequencies, divide each frequency by the total number of students in the sample—in this case, 20. Relative frequencies can be written as fractions, percents, or decimals.
| DATA VALUE | FREQUENCY | RELATIVE FREQUENCY |
|---|---|---|
| 2 | 3 | or .15 |
| 3 | 5 | or .25 |
| 4 | 3 | or .15 |
| 5 | 6 | or .30 |
| 6 | 2 | or .10 |
| 7 | 1 | or .05 |
The sum of the values in the relative frequency column of Table 1.13 is , or 1.
Cumulative relative frequency is the accumulation of the previous relative frequencies. To find the cumulative relative frequencies, add all the previous relative frequencies to the relative frequency for the current row, as shown in Table 1.14.
In the first row, the cumulative frequency is simply .15 because it is the only one. In the second row, the relative frequency was .25, so adding that to .15, we get a relative frequency of .40. Continue adding the relative frequencies in each row to get the rest of the column.
| DATA VALUE | FREQUENCY | RELATIVE
FREQUENCY
|
CUMULATIVE RELATIVE
FREQUENCY
|
|---|---|---|---|
| 2 | 3 | or .15 | .15 |
| 3 | 5 | or .25 | .15 + .25 = .40 |
| 4 | 3 | or .15 | .40 + .15 = .55 |
| 5 | 6 | or .30 | .55 + .30 = .85 |
| 6 | 2 | or .10 | .85 + .10 = .95 |
| 7 | 1 | or .05 | .95 + .05 = 1.00 |
The last entry of the cumulative relative frequency column is one, indicating that one hundred percent of the data has been accumulated.
Because of rounding, the relative frequency column may not always sum to one, and the last entry in the cumulative relative frequency column may not be one. However, they each should be close to one.
Table 1.15 represents the heights, in inches, of a sample of 100 male semiprofessional soccer players.
| HEIGHTS
(INCHES)
|
FREQUENCY | RELATIVE
FREQUENCY
|
CUMULATIVE
RELATIVE
FREQUENCY
|
|---|---|---|---|
| 59.95–61.95 | 5 | = .05 | .05 |
| 61.95–63.95 | 3 | = .03 | .05 + .03 = .08 |
| 63.95–65.95 | 15 | = .15 | .08 + .15 = .23 |
| 65.95–67.95 | 40 | = .40 | .23 + .40 = .63 |
| 67.95–69.95 | 17 | = .17 | .63 + .17 = .80 |
| 69.95–71.95 | 12 | = .12 | .80 + .12 = .92 |
| 71.95–73.95 | 7 | = .07 | .92 + .07 = .99 |
| 73.95–75.95 | 1 | = .01 | .99 + .01 = 1.00 |
| Total = 100 | Total = 1.00 |
The data in this table have been grouped into the following intervals:
This example is used again in Descriptive Statistics, where the method used to compute the intervals will be explained.
In this sample, there are five players whose heights fall within the interval 59.95–61.95 inches, three players whose heights fall within the interval 61.95–63.95 inches, 15 players whose heights fall within the interval 63.95–65.95 inches, 40 players whose heights fall within the interval 65.95–67.95 inches, 17 players whose heights fall within the interval 67.95–69.95 inches, 12 players whose heights fall within the interval 69.95–71.95, seven players whose heights fall within the interval 71.95–73.95, and one player whose heights fall within the interval 73.95–75.95. All heights fall between the endpoints of an interval and not at the endpoints.
From Table 1.15, find the percentage of heights that are less than 65.95 inches.
If you look at the first, second, and third rows, the heights are all less than 65.95 inches. There are 5 + 3 + 15 = 23 players whose heights are less than 65.95 inches. The percentage of heights less than 65.95 inches is then or 23 percent. This percentage is the cumulative relative frequency entry in the third row.
Table 1.16 shows the amount, in inches, of annual rainfall in a sample of towns.
| Rainfall (Inches) | Frequency | Relative Frequency | Cumulative Relative Frequency |
|---|---|---|---|
| 2.95–4.97 | 6 | = .12 | .12 |
| 4.97–6.99 | 7 | = .14 | .12 + .14 = .26 |
| 6.99–9.01 | 15 | = .30 | .26 + .30 = .56 |
| 9.01–11.03 | 8 | = .16 | .56 + .16 = .72 |
| 11.03–13.05 | 9 | = .18 | .72 + .18 = .90 |
| 13.05–15.07 | 5 | = .10 | .90 + .10 = 1.00 |
| Total = 50 | Total = 1.00 |
From Table 1.16, find the percentage of rainfall that is less than 9.01 inches.
From Table 1.15, find the percentage of heights that fall between 61.95 and 65.95 inches.
Add the relative frequencies in the second and third rows: .03 + .15 = .18 or 18 percent.
From Table 1.16, find the percentage of rainfall that is between 6.99 and 13.05 inches.
Use the heights of the 100 male semiprofessional soccer players in Table 1.15. Fill in the blanks and check your answers.
Remember, you count frequencies. To find the relative frequency, divide the frequency by the total number of data values. To find the cumulative relative frequency, add all of the previous relative frequencies to the relative frequency for the current row.
From Table 1.16, find the number of towns that have rainfall between 2.95 and 9.01 inches.
In your class, have someone conduct a survey of the number of siblings (brothers and sisters) each student has. Create a frequency table. Add to it a relative frequency column and a cumulative relative frequency column. Answer the following questions:
Nineteen people were asked how many miles, to the nearest mile, they commute to work each day. The data are as follows:
2, 5, 7, 3, 2, 10, 18, 15, 20, 7, 10, 18, 5, 12, 13, 12, 4, 5, 10. Table 1.17 was produced.
| DATA | FREQUENCY | RELATIVE
FREQUENCY
|
CUMULATIVE
RELATIVE
FREQUENCY
|
|---|---|---|---|
| 3 | 3 | .1579 | |
| 4 | 1 | .2105 | |
| 5 | 3 | .1579 | |
| 7 | 2 | .2632 | |
| 10 | 3 | .4737 | |
| 12 | 2 | .7895 | |
| 13 | 1 | .8421 | |
| 15 | 1 | .8948 | |
| 18 | 1 | .9474 | |
| 20 | 1 | 1.0000 |
Table 1.16 represents the amount, in inches, of annual rainfall in a sample of towns. What fraction of towns surveyed get between 11.03 and 13.05 inches of rainfall each year?
Table 1.18 contains the total number of deaths worldwide as a result of earthquakes for the period from 2000 to 2012.
| Year | Total Number of Deaths |
|---|---|
| 2000 | 231 |
| 2001 | 21,357 |
| 2002 | 11,685 |
| 2003 | 33,819 |
| 2004 | 228,802 |
| 2005 | 88,003 |
| 2006 | 6,605 |
| 2007 | 712 |
| 2008 | 88,011 |
| 2009 | 1,790 |
| 2010 | 320,120 |
| 2011 | 21,953 |
| 2012 | 768 |
| Total | 823,856 |
Answer the following questions:
Table 1.19 contains the total number of fatal motor vehicle traffic crashes in the United States for the period from 1994–2011.
| Year | Total Number of Crashes | Year | Total Number of Crashes |
|---|---|---|---|
| 1994 | 36,254 | 2004 | 38,444 |
| 1995 | 37,241 | 2005 | 39,252 |
| 1996 | 37,494 | 2006 | 38,648 |
| 1997 | 37,324 | 2007 | 37,435 |
| 1998 | 37,107 | 2008 | 34,172 |
| 1999 | 37,140 | 2009 | 30,862 |
| 2000 | 37,526 | 2010 | 30,296 |
| 2001 | 37,862 | 2011 | 29,757 |
| 2002 | 38,491 | Total | 653,782 |
| 2003 | 38,477 |
Answer the following questions: