5 Steps to a 5 AP Psychology, 2014-2015 Edition

data can be pictured as a histogram—a bar graph from the frequency distribution—or as

afrequency polygon—a line graph that replaces the bars with single points and connects

the points with a line. With a very large number of data points, the frequency polygon

approaches a smooth curve. Frequency polygons are shown in Figure 6.1.

Measures of Central Tendency

Measures of central tendencydescribe the average or most typical scores for a set of

research data or distribution. Measures of central tendency include the mode, median, and

mean. The modeis the most frequently occurring score in a set of research data. If two

scores appear most frequently, the distribution is bimodal;if three or more scores appear

most frequently, the distribution is multimodal.Themedianis the middle score when the

set of data is ordered by size. For an odd number of scores, the median is the middle one.

For an even number of scores, the median lies halfway between the two middle scores. The

meanis the arithmetic average of the set of scores. The mean is determined by adding up all

of the scores and then dividing by the number of scores. For the set of quiz scores 5, 6, 7,

7, 7, 8, 8, 9, 9, 10; the mode is 7; the median is 7.5; the mean is 7.6. The mode is the least

used measure of central tendency, but can be useful to provide a “quick and dirty” measure

of central tendency especially when the set of data has not been ordered. The mean is gen-

erally the preferred measure of central tendency because it takes into account the informa-

tion in all of the data points; however, it is very sensitive to extremes. The mean is pulled in

the direction of extreme data points. The advantage of the median is that it is less sensitive to

extremes, but it doesn’t take into account all of the information in the data points. The mean,

mode, and median turn out to be the same score in symmetrical distributions. The two sides

of the frequency polygon are mirror images as shown in Figure 6.1a. The normal distribu-

tionor normal curve is a symmetric, bell-shaped curve that represents data about how many

human characteristics are dispersed in the population. Distributions where most of the

scores are squeezed into one end are skewed.A few of the scores stretch out away from the

group like a tail. The skew is named for the direction of the tail. Figure 6.1b pictures a neg-

atively skewed distribution, and Figure 6.1c shows a positively skewed distribution. The

mean is pulled in the direction of the tails, so the mean is lower than the median in a neg-

atively skewed distribution, and higher than the median in a positively skewed distribution.

In very skewed distributions, the median is a better measure of central tendency than the

mean.

Measures of Variability

Variabilitydescribes the spread or dispersion of scores for a set of research data or distribu-

tion. Measures of variability include the range, variance, and standard deviation. The range

is the largest score minus the smallest score. It is a rough measure of dispersion. For the

same set of quiz scores (5, 6, 7, 7, 7, 8, 8, 9, 9, 10), the range is 5. Variance andstandard

deviation (SD)indicate the degree to which scores differ from each other and vary around

the mean value for the set. Variance and standard deviation indicate both how much scores

group together and how dispersed they are. Variance is determined by computing the dif-

ference between each value and the mean, squaring the difference between each value and

the mean (to eliminate negative signs), summing the squared differences and then taking

the average of the sum of squared differences. The standard deviation of the distribution is

the square root of the variance. For a different set of quiz scores (6, 7, 8, 8, 8, 8, 8, 8, 9,

10), the variance is 1 and the SD is 1. Standard deviation must fall between 0 and half the

value of the range. If the standard deviation approaches 0, scores are very similar to each

other and very close to the mean. If the standard deviation approaches half the value of the

range, scores vary greatly from the mean. Frequency polygons with the same mean and the

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